diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/categories/tests/test_drawing.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/categories/tests/test_drawing.py new file mode 100644 index 0000000000000000000000000000000000000000..63a13266cd6b58f6a85aad4af0813b395acbb5e1 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/categories/tests/test_drawing.py @@ -0,0 +1,919 @@ +from sympy.categories.diagram_drawing import _GrowableGrid, ArrowStringDescription +from sympy.categories import (DiagramGrid, Object, NamedMorphism, + Diagram, XypicDiagramDrawer, xypic_draw_diagram) +from sympy.sets.sets import FiniteSet + + +def test_GrowableGrid(): + grid = _GrowableGrid(1, 2) + + # Check dimensions. + assert grid.width == 1 + assert grid.height == 2 + + # Check initialization of elements. + assert grid[0, 0] is None + assert grid[1, 0] is None + + # Check assignment to elements. + grid[0, 0] = 1 + grid[1, 0] = "two" + + assert grid[0, 0] == 1 + assert grid[1, 0] == "two" + + # Check appending a row. + grid.append_row() + + assert grid.width == 1 + assert grid.height == 3 + + assert grid[0, 0] == 1 + assert grid[1, 0] == "two" + assert grid[2, 0] is None + + # Check appending a column. + grid.append_column() + assert grid.width == 2 + assert grid.height == 3 + + assert grid[0, 0] == 1 + assert grid[1, 0] == "two" + assert grid[2, 0] is None + + assert grid[0, 1] is None + assert grid[1, 1] is None + assert grid[2, 1] is None + + grid = _GrowableGrid(1, 2) + grid[0, 0] = 1 + grid[1, 0] = "two" + + # Check prepending a row. + grid.prepend_row() + assert grid.width == 1 + assert grid.height == 3 + + assert grid[0, 0] is None + assert grid[1, 0] == 1 + assert grid[2, 0] == "two" + + # Check prepending a column. + grid.prepend_column() + assert grid.width == 2 + assert grid.height == 3 + + assert grid[0, 0] is None + assert grid[1, 0] is None + assert grid[2, 0] is None + + assert grid[0, 1] is None + assert grid[1, 1] == 1 + assert grid[2, 1] == "two" + + +def test_DiagramGrid(): + # Set up some objects and morphisms. + A = Object("A") + B = Object("B") + C = Object("C") + D = Object("D") + E = Object("E") + + f = NamedMorphism(A, B, "f") + g = NamedMorphism(B, C, "g") + h = NamedMorphism(D, A, "h") + k = NamedMorphism(D, B, "k") + + # A one-morphism diagram. + d = Diagram([f]) + grid = DiagramGrid(d) + + assert grid.width == 2 + assert grid.height == 1 + assert grid[0, 0] == A + assert grid[0, 1] == B + assert grid.morphisms == {f: FiniteSet()} + + # A triangle. + d = Diagram([f, g], {g * f: "unique"}) + grid = DiagramGrid(d) + + assert grid.width == 2 + assert grid.height == 2 + assert grid[0, 0] == A + assert grid[0, 1] == B + assert grid[1, 0] == C + assert grid[1, 1] is None + assert grid.morphisms == {f: FiniteSet(), g: FiniteSet(), + g * f: FiniteSet("unique")} + + # A triangle with a "loop" morphism. + l_A = NamedMorphism(A, A, "l_A") + d = Diagram([f, g, l_A]) + grid = DiagramGrid(d) + + assert grid.width == 2 + assert grid.height == 2 + assert grid[0, 0] == A + assert grid[0, 1] == B + assert grid[1, 0] is None + assert grid[1, 1] == C + assert grid.morphisms == {f: FiniteSet(), g: FiniteSet(), l_A: FiniteSet()} + + # A simple diagram. + d = Diagram([f, g, h, k]) + grid = DiagramGrid(d) + + assert grid.width == 3 + assert grid.height == 2 + assert grid[0, 0] == A + assert grid[0, 1] == B + assert grid[0, 2] == D + assert grid[1, 0] is None + assert grid[1, 1] == C + assert grid[1, 2] is None + assert grid.morphisms == {f: FiniteSet(), g: FiniteSet(), h: FiniteSet(), + k: FiniteSet()} + + assert str(grid) == '[[Object("A"), Object("B"), Object("D")], ' \ + '[None, Object("C"), None]]' + + # A chain of morphisms. + f = NamedMorphism(A, B, "f") + g = NamedMorphism(B, C, "g") + h = NamedMorphism(C, D, "h") + k = NamedMorphism(D, E, "k") + d = Diagram([f, g, h, k]) + grid = DiagramGrid(d) + + assert grid.width == 3 + assert grid.height == 3 + assert grid[0, 0] == A + assert grid[0, 1] == B + assert grid[0, 2] is None + assert grid[1, 0] is None + assert grid[1, 1] == C + assert grid[1, 2] == D + assert grid[2, 0] is None + assert grid[2, 1] is None + assert grid[2, 2] == E + assert grid.morphisms == {f: FiniteSet(), g: FiniteSet(), h: FiniteSet(), + k: FiniteSet()} + + # A square. + f = NamedMorphism(A, B, "f") + g = NamedMorphism(B, D, "g") + h = NamedMorphism(A, C, "h") + k = NamedMorphism(C, D, "k") + d = Diagram([f, g, h, k]) + grid = DiagramGrid(d) + + assert grid.width == 2 + assert grid.height == 2 + assert grid[0, 0] == A + assert grid[0, 1] == B + assert grid[1, 0] == C + assert grid[1, 1] == D + assert grid.morphisms == {f: FiniteSet(), g: FiniteSet(), h: FiniteSet(), + k: FiniteSet()} + + # A strange diagram which resulted from a typo when creating a + # test for five lemma, but which allowed to stop one extra problem + # in the algorithm. + A = Object("A") + B = Object("B") + C = Object("C") + D = Object("D") + E = Object("E") + A_ = Object("A'") + B_ = Object("B'") + C_ = Object("C'") + D_ = Object("D'") + E_ = Object("E'") + + f = NamedMorphism(A, B, "f") + g = NamedMorphism(B, C, "g") + h = NamedMorphism(C, D, "h") + i = NamedMorphism(D, E, "i") + + # These 4 morphisms should be between primed objects. + j = NamedMorphism(A, B, "j") + k = NamedMorphism(B, C, "k") + l = NamedMorphism(C, D, "l") + m = NamedMorphism(D, E, "m") + + o = NamedMorphism(A, A_, "o") + p = NamedMorphism(B, B_, "p") + q = NamedMorphism(C, C_, "q") + r = NamedMorphism(D, D_, "r") + s = NamedMorphism(E, E_, "s") + + d = Diagram([f, g, h, i, j, k, l, m, o, p, q, r, s]) + grid = DiagramGrid(d) + + assert grid.width == 3 + assert grid.height == 4 + assert grid[0, 0] is None + assert grid[0, 1] == A + assert grid[0, 2] == A_ + assert grid[1, 0] == C + assert grid[1, 1] == B + assert grid[1, 2] == B_ + assert grid[2, 0] == C_ + assert grid[2, 1] == D + assert grid[2, 2] == D_ + assert grid[3, 0] is None + assert grid[3, 1] == E + assert grid[3, 2] == E_ + + morphisms = {} + for m in [f, g, h, i, j, k, l, m, o, p, q, r, s]: + morphisms[m] = FiniteSet() + assert grid.morphisms == morphisms + + # A cube. + A1 = Object("A1") + A2 = Object("A2") + A3 = Object("A3") + A4 = Object("A4") + A5 = Object("A5") + A6 = Object("A6") + A7 = Object("A7") + A8 = Object("A8") + + # The top face of the cube. + f1 = NamedMorphism(A1, A2, "f1") + f2 = NamedMorphism(A1, A3, "f2") + f3 = NamedMorphism(A2, A4, "f3") + f4 = NamedMorphism(A3, A4, "f3") + + # The bottom face of the cube. + f5 = NamedMorphism(A5, A6, "f5") + f6 = NamedMorphism(A5, A7, "f6") + f7 = NamedMorphism(A6, A8, "f7") + f8 = NamedMorphism(A7, A8, "f8") + + # The remaining morphisms. + f9 = NamedMorphism(A1, A5, "f9") + f10 = NamedMorphism(A2, A6, "f10") + f11 = NamedMorphism(A3, A7, "f11") + f12 = NamedMorphism(A4, A8, "f11") + + d = Diagram([f1, f2, f3, f4, f5, f6, f7, f8, f9, f10, f11, f12]) + grid = DiagramGrid(d) + + assert grid.width == 4 + assert grid.height == 3 + assert grid[0, 0] is None + assert grid[0, 1] == A5 + assert grid[0, 2] == A6 + assert grid[0, 3] is None + assert grid[1, 0] is None + assert grid[1, 1] == A1 + assert grid[1, 2] == A2 + assert grid[1, 3] is None + assert grid[2, 0] == A7 + assert grid[2, 1] == A3 + assert grid[2, 2] == A4 + assert grid[2, 3] == A8 + + morphisms = {} + for m in [f1, f2, f3, f4, f5, f6, f7, f8, f9, f10, f11, f12]: + morphisms[m] = FiniteSet() + assert grid.morphisms == morphisms + + # A line diagram. + A = Object("A") + B = Object("B") + C = Object("C") + D = Object("D") + E = Object("E") + + f = NamedMorphism(A, B, "f") + g = NamedMorphism(B, C, "g") + h = NamedMorphism(C, D, "h") + i = NamedMorphism(D, E, "i") + d = Diagram([f, g, h, i]) + grid = DiagramGrid(d, layout="sequential") + + assert grid.width == 5 + assert grid.height == 1 + assert grid[0, 0] == A + assert grid[0, 1] == B + assert grid[0, 2] == C + assert grid[0, 3] == D + assert grid[0, 4] == E + assert grid.morphisms == {f: FiniteSet(), g: FiniteSet(), h: FiniteSet(), + i: FiniteSet()} + + # Test the transposed version. + grid = DiagramGrid(d, layout="sequential", transpose=True) + + assert grid.width == 1 + assert grid.height == 5 + assert grid[0, 0] == A + assert grid[1, 0] == B + assert grid[2, 0] == C + assert grid[3, 0] == D + assert grid[4, 0] == E + assert grid.morphisms == {f: FiniteSet(), g: FiniteSet(), h: FiniteSet(), + i: FiniteSet()} + + # A pullback. + m1 = NamedMorphism(A, B, "m1") + m2 = NamedMorphism(A, C, "m2") + s1 = NamedMorphism(B, D, "s1") + s2 = NamedMorphism(C, D, "s2") + f1 = NamedMorphism(E, B, "f1") + f2 = NamedMorphism(E, C, "f2") + g = NamedMorphism(E, A, "g") + + d = Diagram([m1, m2, s1, s2, f1, f2], {g: "unique"}) + grid = DiagramGrid(d) + + assert grid.width == 3 + assert grid.height == 2 + assert grid[0, 0] == A + assert grid[0, 1] == B + assert grid[0, 2] == E + assert grid[1, 0] == C + assert grid[1, 1] == D + assert grid[1, 2] is None + + morphisms = {g: FiniteSet("unique")} + for m in [m1, m2, s1, s2, f1, f2]: + morphisms[m] = FiniteSet() + assert grid.morphisms == morphisms + + # Test the pullback with sequential layout, just for stress + # testing. + grid = DiagramGrid(d, layout="sequential") + + assert grid.width == 5 + assert grid.height == 1 + assert grid[0, 0] == D + assert grid[0, 1] == B + assert grid[0, 2] == A + assert grid[0, 3] == C + assert grid[0, 4] == E + assert grid.morphisms == morphisms + + # Test a pullback with object grouping. + grid = DiagramGrid(d, groups=FiniteSet(E, FiniteSet(A, B, C, D))) + + assert grid.width == 3 + assert grid.height == 2 + assert grid[0, 0] == E + assert grid[0, 1] == A + assert grid[0, 2] == B + assert grid[1, 0] is None + assert grid[1, 1] == C + assert grid[1, 2] == D + assert grid.morphisms == morphisms + + # Five lemma, actually. + A = Object("A") + B = Object("B") + C = Object("C") + D = Object("D") + E = Object("E") + A_ = Object("A'") + B_ = Object("B'") + C_ = Object("C'") + D_ = Object("D'") + E_ = Object("E'") + + f = NamedMorphism(A, B, "f") + g = NamedMorphism(B, C, "g") + h = NamedMorphism(C, D, "h") + i = NamedMorphism(D, E, "i") + + j = NamedMorphism(A_, B_, "j") + k = NamedMorphism(B_, C_, "k") + l = NamedMorphism(C_, D_, "l") + m = NamedMorphism(D_, E_, "m") + + o = NamedMorphism(A, A_, "o") + p = NamedMorphism(B, B_, "p") + q = NamedMorphism(C, C_, "q") + r = NamedMorphism(D, D_, "r") + s = NamedMorphism(E, E_, "s") + + d = Diagram([f, g, h, i, j, k, l, m, o, p, q, r, s]) + grid = DiagramGrid(d) + + assert grid.width == 5 + assert grid.height == 3 + assert grid[0, 0] is None + assert grid[0, 1] == A + assert grid[0, 2] == A_ + assert grid[0, 3] is None + assert grid[0, 4] is None + assert grid[1, 0] == C + assert grid[1, 1] == B + assert grid[1, 2] == B_ + assert grid[1, 3] == C_ + assert grid[1, 4] is None + assert grid[2, 0] == D + assert grid[2, 1] == E + assert grid[2, 2] is None + assert grid[2, 3] == D_ + assert grid[2, 4] == E_ + + morphisms = {} + for m in [f, g, h, i, j, k, l, m, o, p, q, r, s]: + morphisms[m] = FiniteSet() + assert grid.morphisms == morphisms + + # Test the five lemma with object grouping. + grid = DiagramGrid(d, FiniteSet( + FiniteSet(A, B, C, D, E), FiniteSet(A_, B_, C_, D_, E_))) + + assert grid.width == 6 + assert grid.height == 3 + assert grid[0, 0] == A + assert grid[0, 1] == B + assert grid[0, 2] is None + assert grid[0, 3] == A_ + assert grid[0, 4] == B_ + assert grid[0, 5] is None + assert grid[1, 0] is None + assert grid[1, 1] == C + assert grid[1, 2] == D + assert grid[1, 3] is None + assert grid[1, 4] == C_ + assert grid[1, 5] == D_ + assert grid[2, 0] is None + assert grid[2, 1] is None + assert grid[2, 2] == E + assert grid[2, 3] is None + assert grid[2, 4] is None + assert grid[2, 5] == E_ + assert grid.morphisms == morphisms + + # Test the five lemma with object grouping, but mixing containers + # to represent groups. + grid = DiagramGrid(d, [(A, B, C, D, E), {A_, B_, C_, D_, E_}]) + + assert grid.width == 6 + assert grid.height == 3 + assert grid[0, 0] == A + assert grid[0, 1] == B + assert grid[0, 2] is None + assert grid[0, 3] == A_ + assert grid[0, 4] == B_ + assert grid[0, 5] is None + assert grid[1, 0] is None + assert grid[1, 1] == C + assert grid[1, 2] == D + assert grid[1, 3] is None + assert grid[1, 4] == C_ + assert grid[1, 5] == D_ + assert grid[2, 0] is None + assert grid[2, 1] is None + assert grid[2, 2] == E + assert grid[2, 3] is None + assert grid[2, 4] is None + assert grid[2, 5] == E_ + assert grid.morphisms == morphisms + + # Test the five lemma with object grouping and hints. + grid = DiagramGrid(d, { + FiniteSet(A, B, C, D, E): {"layout": "sequential", + "transpose": True}, + FiniteSet(A_, B_, C_, D_, E_): {"layout": "sequential", + "transpose": True}}, + transpose=True) + + assert grid.width == 5 + assert grid.height == 2 + assert grid[0, 0] == A + assert grid[0, 1] == B + assert grid[0, 2] == C + assert grid[0, 3] == D + assert grid[0, 4] == E + assert grid[1, 0] == A_ + assert grid[1, 1] == B_ + assert grid[1, 2] == C_ + assert grid[1, 3] == D_ + assert grid[1, 4] == E_ + assert grid.morphisms == morphisms + + # A two-triangle disconnected diagram. + f = NamedMorphism(A, B, "f") + g = NamedMorphism(B, C, "g") + f_ = NamedMorphism(A_, B_, "f") + g_ = NamedMorphism(B_, C_, "g") + d = Diagram([f, g, f_, g_], {g * f: "unique", g_ * f_: "unique"}) + grid = DiagramGrid(d) + + assert grid.width == 4 + assert grid.height == 2 + assert grid[0, 0] == A + assert grid[0, 1] == B + assert grid[0, 2] == A_ + assert grid[0, 3] == B_ + assert grid[1, 0] == C + assert grid[1, 1] is None + assert grid[1, 2] == C_ + assert grid[1, 3] is None + assert grid.morphisms == {f: FiniteSet(), g: FiniteSet(), f_: FiniteSet(), + g_: FiniteSet(), g * f: FiniteSet("unique"), + g_ * f_: FiniteSet("unique")} + + # A two-morphism disconnected diagram. + f = NamedMorphism(A, B, "f") + g = NamedMorphism(C, D, "g") + d = Diagram([f, g]) + grid = DiagramGrid(d) + + assert grid.width == 4 + assert grid.height == 1 + assert grid[0, 0] == A + assert grid[0, 1] == B + assert grid[0, 2] == C + assert grid[0, 3] == D + assert grid.morphisms == {f: FiniteSet(), g: FiniteSet()} + + # Test a one-object diagram. + f = NamedMorphism(A, A, "f") + d = Diagram([f]) + grid = DiagramGrid(d) + + assert grid.width == 1 + assert grid.height == 1 + assert grid[0, 0] == A + + # Test a two-object disconnected diagram. + g = NamedMorphism(B, B, "g") + d = Diagram([f, g]) + grid = DiagramGrid(d) + + assert grid.width == 2 + assert grid.height == 1 + assert grid[0, 0] == A + assert grid[0, 1] == B + + +def test_DiagramGrid_pseudopod(): + # Test a diagram in which even growing a pseudopod does not + # eventually help. + A = Object("A") + B = Object("B") + C = Object("C") + D = Object("D") + E = Object("E") + F = Object("F") + A_ = Object("A'") + B_ = Object("B'") + C_ = Object("C'") + D_ = Object("D'") + E_ = Object("E'") + + f1 = NamedMorphism(A, B, "f1") + f2 = NamedMorphism(A, C, "f2") + f3 = NamedMorphism(A, D, "f3") + f4 = NamedMorphism(A, E, "f4") + f5 = NamedMorphism(A, A_, "f5") + f6 = NamedMorphism(A, B_, "f6") + f7 = NamedMorphism(A, C_, "f7") + f8 = NamedMorphism(A, D_, "f8") + f9 = NamedMorphism(A, E_, "f9") + f10 = NamedMorphism(A, F, "f10") + d = Diagram([f1, f2, f3, f4, f5, f6, f7, f8, f9, f10]) + grid = DiagramGrid(d) + + assert grid.width == 5 + assert grid.height == 3 + assert grid[0, 0] == E + assert grid[0, 1] == C + assert grid[0, 2] == C_ + assert grid[0, 3] == E_ + assert grid[0, 4] == F + assert grid[1, 0] == D + assert grid[1, 1] == A + assert grid[1, 2] == A_ + assert grid[1, 3] is None + assert grid[1, 4] is None + assert grid[2, 0] == D_ + assert grid[2, 1] == B + assert grid[2, 2] == B_ + assert grid[2, 3] is None + assert grid[2, 4] is None + + morphisms = {} + for f in [f1, f2, f3, f4, f5, f6, f7, f8, f9, f10]: + morphisms[f] = FiniteSet() + assert grid.morphisms == morphisms + + +def test_ArrowStringDescription(): + astr = ArrowStringDescription("cm", "", None, "", "", "d", "r", "_", "f") + assert str(astr) == "\\ar[dr]_{f}" + + astr = ArrowStringDescription("cm", "", 12, "", "", "d", "r", "_", "f") + assert str(astr) == "\\ar[dr]_{f}" + + astr = ArrowStringDescription("cm", "^", 12, "", "", "d", "r", "_", "f") + assert str(astr) == "\\ar@/^12cm/[dr]_{f}" + + astr = ArrowStringDescription("cm", "", 12, "r", "", "d", "r", "_", "f") + assert str(astr) == "\\ar[dr]_{f}" + + astr = ArrowStringDescription("cm", "", 12, "r", "u", "d", "r", "_", "f") + assert str(astr) == "\\ar@(r,u)[dr]_{f}" + + astr = ArrowStringDescription("cm", "", 12, "r", "u", "d", "r", "_", "f") + assert str(astr) == "\\ar@(r,u)[dr]_{f}" + + astr = ArrowStringDescription("cm", "", 12, "r", "u", "d", "r", "_", "f") + astr.arrow_style = "{-->}" + assert str(astr) == "\\ar@(r,u)@{-->}[dr]_{f}" + + astr = ArrowStringDescription("cm", "_", 12, "", "", "d", "r", "_", "f") + astr.arrow_style = "{-->}" + assert str(astr) == "\\ar@/_12cm/@{-->}[dr]_{f}" + + +def test_XypicDiagramDrawer_line(): + # A linear diagram. + A = Object("A") + B = Object("B") + C = Object("C") + D = Object("D") + E = Object("E") + + f = NamedMorphism(A, B, "f") + g = NamedMorphism(B, C, "g") + h = NamedMorphism(C, D, "h") + i = NamedMorphism(D, E, "i") + d = Diagram([f, g, h, i]) + grid = DiagramGrid(d, layout="sequential") + drawer = XypicDiagramDrawer() + assert drawer.draw(d, grid) == "\\xymatrix{\n" \ + "A \\ar[r]^{f} & B \\ar[r]^{g} & C \\ar[r]^{h} & D \\ar[r]^{i} & E \n" \ + "}\n" + + # The same diagram, transposed. + grid = DiagramGrid(d, layout="sequential", transpose=True) + drawer = XypicDiagramDrawer() + assert drawer.draw(d, grid) == "\\xymatrix{\n" \ + "A \\ar[d]^{f} \\\\\n" \ + "B \\ar[d]^{g} \\\\\n" \ + "C \\ar[d]^{h} \\\\\n" \ + "D \\ar[d]^{i} \\\\\n" \ + "E \n" \ + "}\n" + + +def test_XypicDiagramDrawer_triangle(): + # A triangle diagram. + A = Object("A") + B = Object("B") + C = Object("C") + f = NamedMorphism(A, B, "f") + g = NamedMorphism(B, C, "g") + + d = Diagram([f, g], {g * f: "unique"}) + grid = DiagramGrid(d) + drawer = XypicDiagramDrawer() + assert drawer.draw(d, grid) == "\\xymatrix{\n" \ + "A \\ar[d]_{g\\circ f} \\ar[r]^{f} & B \\ar[ld]^{g} \\\\\n" \ + "C & \n" \ + "}\n" + + # The same diagram, transposed. + grid = DiagramGrid(d, transpose=True) + drawer = XypicDiagramDrawer() + assert drawer.draw(d, grid) == "\\xymatrix{\n" \ + "A \\ar[r]^{g\\circ f} \\ar[d]_{f} & C \\\\\n" \ + "B \\ar[ru]_{g} & \n" \ + "}\n" + + # The same diagram, with a masked morphism. + assert drawer.draw(d, grid, masked=[g]) == "\\xymatrix{\n" \ + "A \\ar[r]^{g\\circ f} \\ar[d]_{f} & C \\\\\n" \ + "B & \n" \ + "}\n" + + # The same diagram with a formatter for "unique". + def formatter(astr): + astr.label = "\\exists !" + astr.label + astr.arrow_style = "{-->}" + + drawer.arrow_formatters["unique"] = formatter + assert drawer.draw(d, grid) == "\\xymatrix{\n" \ + "A \\ar@{-->}[r]^{\\exists !g\\circ f} \\ar[d]_{f} & C \\\\\n" \ + "B \\ar[ru]_{g} & \n" \ + "}\n" + + # The same diagram with a default formatter. + def default_formatter(astr): + astr.label_displacement = "(0.45)" + + drawer.default_arrow_formatter = default_formatter + assert drawer.draw(d, grid) == "\\xymatrix{\n" \ + "A \\ar@{-->}[r]^(0.45){\\exists !g\\circ f} \\ar[d]_(0.45){f} & C \\\\\n" \ + "B \\ar[ru]_(0.45){g} & \n" \ + "}\n" + + # A triangle diagram with a lot of morphisms between the same + # objects. + f1 = NamedMorphism(B, A, "f1") + f2 = NamedMorphism(A, B, "f2") + g1 = NamedMorphism(C, B, "g1") + g2 = NamedMorphism(B, C, "g2") + d = Diagram([f, f1, f2, g, g1, g2], {f1 * g1: "unique", g2 * f2: "unique"}) + + grid = DiagramGrid(d, transpose=True) + drawer = XypicDiagramDrawer() + assert drawer.draw(d, grid, masked=[f1*g1*g2*f2, g2*f2*f1*g1]) == \ + "\\xymatrix{\n" \ + "A \\ar[r]^{g_{2}\\circ f_{2}} \\ar[d]_{f} \\ar@/^3mm/[d]^{f_{2}} " \ + "& C \\ar@/^3mm/[l]^{f_{1}\\circ g_{1}} \\ar@/^3mm/[ld]^{g_{1}} \\\\\n" \ + "B \\ar@/^3mm/[u]^{f_{1}} \\ar[ru]_{g} \\ar@/^3mm/[ru]^{g_{2}} & \n" \ + "}\n" + + +def test_XypicDiagramDrawer_cube(): + # A cube diagram. + A1 = Object("A1") + A2 = Object("A2") + A3 = Object("A3") + A4 = Object("A4") + A5 = Object("A5") + A6 = Object("A6") + A7 = Object("A7") + A8 = Object("A8") + + # The top face of the cube. + f1 = NamedMorphism(A1, A2, "f1") + f2 = NamedMorphism(A1, A3, "f2") + f3 = NamedMorphism(A2, A4, "f3") + f4 = NamedMorphism(A3, A4, "f3") + + # The bottom face of the cube. + f5 = NamedMorphism(A5, A6, "f5") + f6 = NamedMorphism(A5, A7, "f6") + f7 = NamedMorphism(A6, A8, "f7") + f8 = NamedMorphism(A7, A8, "f8") + + # The remaining morphisms. + f9 = NamedMorphism(A1, A5, "f9") + f10 = NamedMorphism(A2, A6, "f10") + f11 = NamedMorphism(A3, A7, "f11") + f12 = NamedMorphism(A4, A8, "f11") + + d = Diagram([f1, f2, f3, f4, f5, f6, f7, f8, f9, f10, f11, f12]) + grid = DiagramGrid(d) + drawer = XypicDiagramDrawer() + assert drawer.draw(d, grid) == "\\xymatrix{\n" \ + "& A_{5} \\ar[r]^{f_{5}} \\ar[ldd]_{f_{6}} & A_{6} \\ar[rdd]^{f_{7}} " \ + "& \\\\\n" \ + "& A_{1} \\ar[r]^{f_{1}} \\ar[d]^{f_{2}} \\ar[u]^{f_{9}} & A_{2} " \ + "\\ar[d]^{f_{3}} \\ar[u]_{f_{10}} & \\\\\n" \ + "A_{7} \\ar@/_3mm/[rrr]_{f_{8}} & A_{3} \\ar[r]^{f_{3}} \\ar[l]_{f_{11}} " \ + "& A_{4} \\ar[r]^{f_{11}} & A_{8} \n" \ + "}\n" + + # The same diagram, transposed. + grid = DiagramGrid(d, transpose=True) + drawer = XypicDiagramDrawer() + assert drawer.draw(d, grid) == "\\xymatrix{\n" \ + "& & A_{7} \\ar@/^3mm/[ddd]^{f_{8}} \\\\\n" \ + "A_{5} \\ar[d]_{f_{5}} \\ar[rru]^{f_{6}} & A_{1} \\ar[d]^{f_{1}} " \ + "\\ar[r]^{f_{2}} \\ar[l]^{f_{9}} & A_{3} \\ar[d]_{f_{3}} " \ + "\\ar[u]^{f_{11}} \\\\\n" \ + "A_{6} \\ar[rrd]_{f_{7}} & A_{2} \\ar[r]^{f_{3}} \\ar[l]^{f_{10}} " \ + "& A_{4} \\ar[d]_{f_{11}} \\\\\n" \ + "& & A_{8} \n" \ + "}\n" + + +def test_XypicDiagramDrawer_curved_and_loops(): + # A simple diagram, with a curved arrow. + A = Object("A") + B = Object("B") + C = Object("C") + D = Object("D") + + f = NamedMorphism(A, B, "f") + g = NamedMorphism(B, C, "g") + h = NamedMorphism(D, A, "h") + k = NamedMorphism(D, B, "k") + d = Diagram([f, g, h, k]) + grid = DiagramGrid(d) + drawer = XypicDiagramDrawer() + assert drawer.draw(d, grid) == "\\xymatrix{\n" \ + "A \\ar[r]_{f} & B \\ar[d]^{g} & D \\ar[l]^{k} \\ar@/_3mm/[ll]_{h} \\\\\n" \ + "& C & \n" \ + "}\n" + + # The same diagram, transposed. + grid = DiagramGrid(d, transpose=True) + drawer = XypicDiagramDrawer() + assert drawer.draw(d, grid) == "\\xymatrix{\n" \ + "A \\ar[d]^{f} & \\\\\n" \ + "B \\ar[r]^{g} & C \\\\\n" \ + "D \\ar[u]_{k} \\ar@/^3mm/[uu]^{h} & \n" \ + "}\n" + + # The same diagram, larger and rotated. + assert drawer.draw(d, grid, diagram_format="@+1cm@dr") == \ + "\\xymatrix@+1cm@dr{\n" \ + "A \\ar[d]^{f} & \\\\\n" \ + "B \\ar[r]^{g} & C \\\\\n" \ + "D \\ar[u]_{k} \\ar@/^3mm/[uu]^{h} & \n" \ + "}\n" + + # A simple diagram with three curved arrows. + h1 = NamedMorphism(D, A, "h1") + h2 = NamedMorphism(A, D, "h2") + k = NamedMorphism(D, B, "k") + d = Diagram([f, g, h, k, h1, h2]) + grid = DiagramGrid(d) + drawer = XypicDiagramDrawer() + assert drawer.draw(d, grid) == "\\xymatrix{\n" \ + "A \\ar[r]_{f} \\ar@/^3mm/[rr]^{h_{2}} & B \\ar[d]^{g} & D \\ar[l]^{k} " \ + "\\ar@/_7mm/[ll]_{h} \\ar@/_11mm/[ll]_{h_{1}} \\\\\n" \ + "& C & \n" \ + "}\n" + + # The same diagram, transposed. + grid = DiagramGrid(d, transpose=True) + drawer = XypicDiagramDrawer() + assert drawer.draw(d, grid) == "\\xymatrix{\n" \ + "A \\ar[d]^{f} \\ar@/_3mm/[dd]_{h_{2}} & \\\\\n" \ + "B \\ar[r]^{g} & C \\\\\n" \ + "D \\ar[u]_{k} \\ar@/^7mm/[uu]^{h} \\ar@/^11mm/[uu]^{h_{1}} & \n" \ + "}\n" + + # The same diagram, with "loop" morphisms. + l_A = NamedMorphism(A, A, "l_A") + l_D = NamedMorphism(D, D, "l_D") + l_C = NamedMorphism(C, C, "l_C") + d = Diagram([f, g, h, k, h1, h2, l_A, l_D, l_C]) + grid = DiagramGrid(d) + drawer = XypicDiagramDrawer() + assert drawer.draw(d, grid) == "\\xymatrix{\n" \ + "A \\ar[r]_{f} \\ar@/^3mm/[rr]^{h_{2}} \\ar@(u,l)[]^{l_{A}} " \ + "& B \\ar[d]^{g} & D \\ar[l]^{k} \\ar@/_7mm/[ll]_{h} " \ + "\\ar@/_11mm/[ll]_{h_{1}} \\ar@(r,u)[]^{l_{D}} \\\\\n" \ + "& C \\ar@(l,d)[]^{l_{C}} & \n" \ + "}\n" + + # The same diagram with "loop" morphisms, transposed. + grid = DiagramGrid(d, transpose=True) + drawer = XypicDiagramDrawer() + assert drawer.draw(d, grid) == "\\xymatrix{\n" \ + "A \\ar[d]^{f} \\ar@/_3mm/[dd]_{h_{2}} \\ar@(r,u)[]^{l_{A}} & \\\\\n" \ + "B \\ar[r]^{g} & C \\ar@(r,u)[]^{l_{C}} \\\\\n" \ + "D \\ar[u]_{k} \\ar@/^7mm/[uu]^{h} \\ar@/^11mm/[uu]^{h_{1}} " \ + "\\ar@(l,d)[]^{l_{D}} & \n" \ + "}\n" + + # The same diagram with two "loop" morphisms per object. + l_A_ = NamedMorphism(A, A, "n_A") + l_D_ = NamedMorphism(D, D, "n_D") + l_C_ = NamedMorphism(C, C, "n_C") + d = Diagram([f, g, h, k, h1, h2, l_A, l_D, l_C, l_A_, l_D_, l_C_]) + grid = DiagramGrid(d) + drawer = XypicDiagramDrawer() + assert drawer.draw(d, grid) == "\\xymatrix{\n" \ + "A \\ar[r]_{f} \\ar@/^3mm/[rr]^{h_{2}} \\ar@(u,l)[]^{l_{A}} " \ + "\\ar@/^3mm/@(l,d)[]^{n_{A}} & B \\ar[d]^{g} & D \\ar[l]^{k} " \ + "\\ar@/_7mm/[ll]_{h} \\ar@/_11mm/[ll]_{h_{1}} \\ar@(r,u)[]^{l_{D}} " \ + "\\ar@/^3mm/@(d,r)[]^{n_{D}} \\\\\n" \ + "& C \\ar@(l,d)[]^{l_{C}} \\ar@/^3mm/@(d,r)[]^{n_{C}} & \n" \ + "}\n" + + # The same diagram with two "loop" morphisms per object, transposed. + grid = DiagramGrid(d, transpose=True) + drawer = XypicDiagramDrawer() + assert drawer.draw(d, grid) == "\\xymatrix{\n" \ + "A \\ar[d]^{f} \\ar@/_3mm/[dd]_{h_{2}} \\ar@(r,u)[]^{l_{A}} " \ + "\\ar@/^3mm/@(u,l)[]^{n_{A}} & \\\\\n" \ + "B \\ar[r]^{g} & C \\ar@(r,u)[]^{l_{C}} \\ar@/^3mm/@(d,r)[]^{n_{C}} \\\\\n" \ + "D \\ar[u]_{k} \\ar@/^7mm/[uu]^{h} \\ar@/^11mm/[uu]^{h_{1}} " \ + "\\ar@(l,d)[]^{l_{D}} \\ar@/^3mm/@(d,r)[]^{n_{D}} & \n" \ + "}\n" + + +def test_xypic_draw_diagram(): + # A linear diagram. + A = Object("A") + B = Object("B") + C = Object("C") + D = Object("D") + E = Object("E") + + f = NamedMorphism(A, B, "f") + g = NamedMorphism(B, C, "g") + h = NamedMorphism(C, D, "h") + i = NamedMorphism(D, E, "i") + d = Diagram([f, g, h, i]) + + grid = DiagramGrid(d, layout="sequential") + drawer = XypicDiagramDrawer() + assert drawer.draw(d, grid) == xypic_draw_diagram(d, layout="sequential") diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..62b195633bae28371bdf9e79317050d7fa7125ae --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/__init__.py @@ -0,0 +1,24 @@ +""" The ``sympy.codegen`` module contains classes and functions for building +abstract syntax trees of algorithms. These trees may then be printed by the +code-printers in ``sympy.printing``. + +There are several submodules available: +- ``sympy.codegen.ast``: AST nodes useful across multiple languages. +- ``sympy.codegen.cnodes``: AST nodes useful for the C family of languages. +- ``sympy.codegen.fnodes``: AST nodes useful for Fortran. +- ``sympy.codegen.cfunctions``: functions specific to C (C99 math functions) +- ``sympy.codegen.ffunctions``: functions specific to Fortran (e.g. ``kind``). + + + +""" +from .ast import ( + Assignment, aug_assign, CodeBlock, For, Attribute, Variable, Declaration, + While, Scope, Print, FunctionPrototype, FunctionDefinition, FunctionCall +) + +__all__ = [ + 'Assignment', 'aug_assign', 'CodeBlock', 'For', 'Attribute', 'Variable', + 'Declaration', 'While', 'Scope', 'Print', 'FunctionPrototype', + 'FunctionDefinition', 'FunctionCall', +] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/abstract_nodes.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/abstract_nodes.py new file mode 100644 index 0000000000000000000000000000000000000000..ae0a8b3e996a7112edf2568c00138e11c3f3327d --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/abstract_nodes.py @@ -0,0 +1,18 @@ +"""This module provides containers for python objects that are valid +printing targets but are not a subclass of SymPy's Printable. +""" + + +from sympy.core.containers import Tuple + + +class List(Tuple): + """Represents a (frozen) (Python) list (for code printing purposes).""" + def __eq__(self, other): + if isinstance(other, list): + return self == List(*other) + else: + return self.args == other + + def __hash__(self): + return super().__hash__() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/algorithms.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/algorithms.py new file mode 100644 index 0000000000000000000000000000000000000000..f4890eb8c25e565095600e2713c0de270aa0cf97 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/algorithms.py @@ -0,0 +1,180 @@ +from sympy.core.containers import Tuple +from sympy.core.numbers import oo +from sympy.core.relational import (Gt, Lt) +from sympy.core.symbol import (Dummy, Symbol) +from sympy.functions.elementary.complexes import Abs +from sympy.functions.elementary.miscellaneous import Min, Max +from sympy.logic.boolalg import And +from sympy.codegen.ast import ( + Assignment, AddAugmentedAssignment, break_, CodeBlock, Declaration, FunctionDefinition, + Print, Return, Scope, While, Variable, Pointer, real +) +from sympy.codegen.cfunctions import isnan + +""" This module collects functions for constructing ASTs representing algorithms. """ + +def newtons_method(expr, wrt, atol=1e-12, delta=None, *, rtol=4e-16, debug=False, + itermax=None, counter=None, delta_fn=lambda e, x: -e/e.diff(x), + cse=False, handle_nan=None, + bounds=None): + """ Generates an AST for Newton-Raphson method (a root-finding algorithm). + + Explanation + =========== + + Returns an abstract syntax tree (AST) based on ``sympy.codegen.ast`` for Netwon's + method of root-finding. + + Parameters + ========== + + expr : expression + wrt : Symbol + With respect to, i.e. what is the variable. + atol : number or expression + Absolute tolerance (stopping criterion) + rtol : number or expression + Relative tolerance (stopping criterion) + delta : Symbol + Will be a ``Dummy`` if ``None``. + debug : bool + Whether to print convergence information during iterations + itermax : number or expr + Maximum number of iterations. + counter : Symbol + Will be a ``Dummy`` if ``None``. + delta_fn: Callable[[Expr, Symbol], Expr] + computes the step, default is newtons method. For e.g. Halley's method + use delta_fn=lambda e, x: -2*e*e.diff(x)/(2*e.diff(x)**2 - e*e.diff(x, 2)) + cse: bool + Perform common sub-expression elimination on delta expression + handle_nan: Token + How to handle occurrence of not-a-number (NaN). + bounds: Optional[tuple[Expr, Expr]] + Perform optimization within bounds + + Examples + ======== + + >>> from sympy import symbols, cos + >>> from sympy.codegen.ast import Assignment + >>> from sympy.codegen.algorithms import newtons_method + >>> x, dx, atol = symbols('x dx atol') + >>> expr = cos(x) - x**3 + >>> algo = newtons_method(expr, x, atol=atol, delta=dx) + >>> algo.has(Assignment(dx, -expr/expr.diff(x))) + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Newton%27s_method + + """ + + if delta is None: + delta = Dummy() + Wrapper = Scope + name_d = 'delta' + else: + Wrapper = lambda x: x + name_d = delta.name + + delta_expr = delta_fn(expr, wrt) + if cse: + from sympy.simplify.cse_main import cse + cses, (red,) = cse([delta_expr.factor()]) + whl_bdy = [Assignment(dum, sub_e) for dum, sub_e in cses] + whl_bdy += [Assignment(delta, red)] + else: + whl_bdy = [Assignment(delta, delta_expr)] + if handle_nan is not None: + whl_bdy += [While(isnan(delta), CodeBlock(handle_nan, break_))] + whl_bdy += [AddAugmentedAssignment(wrt, delta)] + if bounds is not None: + whl_bdy += [Assignment(wrt, Min(Max(wrt, bounds[0]), bounds[1]))] + if debug: + prnt = Print([wrt, delta], r"{}=%12.5g {}=%12.5g\n".format(wrt.name, name_d)) + whl_bdy += [prnt] + req = Gt(Abs(delta), atol + rtol*Abs(wrt)) + declars = [Declaration(Variable(delta, type=real, value=oo))] + if itermax is not None: + counter = counter or Dummy(integer=True) + v_counter = Variable.deduced(counter, 0) + declars.append(Declaration(v_counter)) + whl_bdy.append(AddAugmentedAssignment(counter, 1)) + req = And(req, Lt(counter, itermax)) + whl = While(req, CodeBlock(*whl_bdy)) + blck = declars + if debug: + blck.append(Print([wrt], r"{}=%12.5g\n".format(wrt.name))) + blck += [whl] + return Wrapper(CodeBlock(*blck)) + + +def _symbol_of(arg): + if isinstance(arg, Declaration): + arg = arg.variable.symbol + elif isinstance(arg, Variable): + arg = arg.symbol + return arg + + +def newtons_method_function(expr, wrt, params=None, func_name="newton", attrs=Tuple(), *, delta=None, **kwargs): + """ Generates an AST for a function implementing the Newton-Raphson method. + + Parameters + ========== + + expr : expression + wrt : Symbol + With respect to, i.e. what is the variable + params : iterable of symbols + Symbols appearing in expr that are taken as constants during the iterations + (these will be accepted as parameters to the generated function). + func_name : str + Name of the generated function. + attrs : Tuple + Attribute instances passed as ``attrs`` to ``FunctionDefinition``. + \\*\\*kwargs : + Keyword arguments passed to :func:`sympy.codegen.algorithms.newtons_method`. + + Examples + ======== + + >>> from sympy import symbols, cos + >>> from sympy.codegen.algorithms import newtons_method_function + >>> from sympy.codegen.pyutils import render_as_module + >>> x = symbols('x') + >>> expr = cos(x) - x**3 + >>> func = newtons_method_function(expr, x) + >>> py_mod = render_as_module(func) # source code as string + >>> namespace = {} + >>> exec(py_mod, namespace, namespace) + >>> res = eval('newton(0.5)', namespace) + >>> abs(res - 0.865474033102) < 1e-12 + True + + See Also + ======== + + sympy.codegen.algorithms.newtons_method + + """ + if params is None: + params = (wrt,) + pointer_subs = {p.symbol: Symbol('(*%s)' % p.symbol.name) + for p in params if isinstance(p, Pointer)} + if delta is None: + delta = Symbol('d_' + wrt.name) + if expr.has(delta): + delta = None # will use Dummy + algo = newtons_method(expr, wrt, delta=delta, **kwargs).xreplace(pointer_subs) + if isinstance(algo, Scope): + algo = algo.body + not_in_params = expr.free_symbols.difference({_symbol_of(p) for p in params}) + if not_in_params: + raise ValueError("Missing symbols in params: %s" % ', '.join(map(str, not_in_params))) + declars = tuple(Variable(p, real) for p in params) + body = CodeBlock(algo, Return(wrt)) + return FunctionDefinition(real, func_name, declars, body, attrs=attrs) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/approximations.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/approximations.py new file mode 100644 index 0000000000000000000000000000000000000000..c6486926938224c5052dc5adfac29807e82eb4d8 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/approximations.py @@ -0,0 +1,187 @@ +import math +from sympy.sets.sets import Interval +from sympy.calculus.singularities import is_increasing, is_decreasing +from sympy.codegen.rewriting import Optimization +from sympy.core.function import UndefinedFunction + +""" +This module collects classes useful for approximate rewriting of expressions. +This can be beneficial when generating numeric code for which performance is +of greater importance than precision (e.g. for preconditioners used in iterative +methods). +""" + +class SumApprox(Optimization): + """ + Approximates sum by neglecting small terms. + + Explanation + =========== + + If terms are expressions which can be determined to be monotonic, then + bounds for those expressions are added. + + Parameters + ========== + + bounds : dict + Mapping expressions to length 2 tuple of bounds (low, high). + reltol : number + Threshold for when to ignore a term. Taken relative to the largest + lower bound among bounds. + + Examples + ======== + + >>> from sympy import exp + >>> from sympy.abc import x, y, z + >>> from sympy.codegen.rewriting import optimize + >>> from sympy.codegen.approximations import SumApprox + >>> bounds = {x: (-1, 1), y: (1000, 2000), z: (-10, 3)} + >>> sum_approx3 = SumApprox(bounds, reltol=1e-3) + >>> sum_approx2 = SumApprox(bounds, reltol=1e-2) + >>> sum_approx1 = SumApprox(bounds, reltol=1e-1) + >>> expr = 3*(x + y + exp(z)) + >>> optimize(expr, [sum_approx3]) + 3*(x + y + exp(z)) + >>> optimize(expr, [sum_approx2]) + 3*y + 3*exp(z) + >>> optimize(expr, [sum_approx1]) + 3*y + + """ + + def __init__(self, bounds, reltol, **kwargs): + super().__init__(**kwargs) + self.bounds = bounds + self.reltol = reltol + + def __call__(self, expr): + return expr.factor().replace(self.query, lambda arg: self.value(arg)) + + def query(self, expr): + return expr.is_Add + + def value(self, add): + for term in add.args: + if term.is_number or term in self.bounds or len(term.free_symbols) != 1: + continue + fs, = term.free_symbols + if fs not in self.bounds: + continue + intrvl = Interval(*self.bounds[fs]) + if is_increasing(term, intrvl, fs): + self.bounds[term] = ( + term.subs({fs: self.bounds[fs][0]}), + term.subs({fs: self.bounds[fs][1]}) + ) + elif is_decreasing(term, intrvl, fs): + self.bounds[term] = ( + term.subs({fs: self.bounds[fs][1]}), + term.subs({fs: self.bounds[fs][0]}) + ) + else: + return add + + if all(term.is_number or term in self.bounds for term in add.args): + bounds = [(term, term) if term.is_number else self.bounds[term] for term in add.args] + largest_abs_guarantee = 0 + for lo, hi in bounds: + if lo <= 0 <= hi: + continue + largest_abs_guarantee = max(largest_abs_guarantee, + min(abs(lo), abs(hi))) + new_terms = [] + for term, (lo, hi) in zip(add.args, bounds): + if max(abs(lo), abs(hi)) >= largest_abs_guarantee*self.reltol: + new_terms.append(term) + return add.func(*new_terms) + else: + return add + + +class SeriesApprox(Optimization): + """ Approximates functions by expanding them as a series. + + Parameters + ========== + + bounds : dict + Mapping expressions to length 2 tuple of bounds (low, high). + reltol : number + Threshold for when to ignore a term. Taken relative to the largest + lower bound among bounds. + max_order : int + Largest order to include in series expansion + n_point_checks : int (even) + The validity of an expansion (with respect to reltol) is checked at + discrete points (linearly spaced over the bounds of the variable). The + number of points used in this numerical check is given by this number. + + Examples + ======== + + >>> from sympy import sin, pi + >>> from sympy.abc import x, y + >>> from sympy.codegen.rewriting import optimize + >>> from sympy.codegen.approximations import SeriesApprox + >>> bounds = {x: (-.1, .1), y: (pi-1, pi+1)} + >>> series_approx2 = SeriesApprox(bounds, reltol=1e-2) + >>> series_approx3 = SeriesApprox(bounds, reltol=1e-3) + >>> series_approx8 = SeriesApprox(bounds, reltol=1e-8) + >>> expr = sin(x)*sin(y) + >>> optimize(expr, [series_approx2]) + x*(-y + (y - pi)**3/6 + pi) + >>> optimize(expr, [series_approx3]) + (-x**3/6 + x)*sin(y) + >>> optimize(expr, [series_approx8]) + sin(x)*sin(y) + + """ + def __init__(self, bounds, reltol, max_order=4, n_point_checks=4, **kwargs): + super().__init__(**kwargs) + self.bounds = bounds + self.reltol = reltol + self.max_order = max_order + if n_point_checks % 2 == 1: + raise ValueError("Checking the solution at expansion point is not helpful") + self.n_point_checks = n_point_checks + self._prec = math.ceil(-math.log10(self.reltol)) + + def __call__(self, expr): + return expr.factor().replace(self.query, lambda arg: self.value(arg)) + + def query(self, expr): + return (expr.is_Function and not isinstance(expr, UndefinedFunction) + and len(expr.args) == 1) + + def value(self, fexpr): + free_symbols = fexpr.free_symbols + if len(free_symbols) != 1: + return fexpr + symb, = free_symbols + if symb not in self.bounds: + return fexpr + lo, hi = self.bounds[symb] + x0 = (lo + hi)/2 + cheapest = None + for n in range(self.max_order+1, 0, -1): + fseri = fexpr.series(symb, x0=x0, n=n).removeO() + n_ok = True + for idx in range(self.n_point_checks): + x = lo + idx*(hi - lo)/(self.n_point_checks - 1) + val = fseri.xreplace({symb: x}) + ref = fexpr.xreplace({symb: x}) + if abs((1 - val/ref).evalf(self._prec)) > self.reltol: + n_ok = False + break + + if n_ok: + cheapest = fseri + else: + break + + if cheapest is None: + return fexpr + else: + return cheapest diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/ast.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/ast.py new file mode 100644 index 0000000000000000000000000000000000000000..dd774ca87c5c9d4b55c8ea7a3b68837035b0d06d --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/ast.py @@ -0,0 +1,1906 @@ +""" +Types used to represent a full function/module as an Abstract Syntax Tree. + +Most types are small, and are merely used as tokens in the AST. A tree diagram +has been included below to illustrate the relationships between the AST types. + + +AST Type Tree +------------- +:: + + *Basic* + | + | + CodegenAST + | + |--->AssignmentBase + | |--->Assignment + | |--->AugmentedAssignment + | |--->AddAugmentedAssignment + | |--->SubAugmentedAssignment + | |--->MulAugmentedAssignment + | |--->DivAugmentedAssignment + | |--->ModAugmentedAssignment + | + |--->CodeBlock + | + | + |--->Token + |--->Attribute + |--->For + |--->String + | |--->QuotedString + | |--->Comment + |--->Type + | |--->IntBaseType + | | |--->_SizedIntType + | | |--->SignedIntType + | | |--->UnsignedIntType + | |--->FloatBaseType + | |--->FloatType + | |--->ComplexBaseType + | |--->ComplexType + |--->Node + | |--->Variable + | | |---> Pointer + | |--->FunctionPrototype + | |--->FunctionDefinition + |--->Element + |--->Declaration + |--->While + |--->Scope + |--->Stream + |--->Print + |--->FunctionCall + |--->BreakToken + |--->ContinueToken + |--->NoneToken + |--->Return + + +Predefined types +---------------- + +A number of ``Type`` instances are provided in the ``sympy.codegen.ast`` module +for convenience. Perhaps the two most common ones for code-generation (of numeric +codes) are ``float32`` and ``float64`` (known as single and double precision respectively). +There are also precision generic versions of Types (for which the codeprinters selects the +underlying data type at time of printing): ``real``, ``integer``, ``complex_``, ``bool_``. + +The other ``Type`` instances defined are: + +- ``intc``: Integer type used by C's "int". +- ``intp``: Integer type used by C's "unsigned". +- ``int8``, ``int16``, ``int32``, ``int64``: n-bit integers. +- ``uint8``, ``uint16``, ``uint32``, ``uint64``: n-bit unsigned integers. +- ``float80``: known as "extended precision" on modern x86/amd64 hardware. +- ``complex64``: Complex number represented by two ``float32`` numbers +- ``complex128``: Complex number represented by two ``float64`` numbers + +Using the nodes +--------------- + +It is possible to construct simple algorithms using the AST nodes. Let's construct a loop applying +Newton's method:: + + >>> from sympy import symbols, cos + >>> from sympy.codegen.ast import While, Assignment, aug_assign, Print, QuotedString + >>> t, dx, x = symbols('tol delta val') + >>> expr = cos(x) - x**3 + >>> whl = While(abs(dx) > t, [ + ... Assignment(dx, -expr/expr.diff(x)), + ... aug_assign(x, '+', dx), + ... Print([x]) + ... ]) + >>> from sympy import pycode + >>> py_str = pycode(whl) + >>> print(py_str) + while (abs(delta) > tol): + delta = (val**3 - math.cos(val))/(-3*val**2 - math.sin(val)) + val += delta + print(val) + >>> import math + >>> tol, val, delta = 1e-5, 0.5, float('inf') + >>> exec(py_str) + 1.1121416371 + 0.909672693737 + 0.867263818209 + 0.865477135298 + 0.865474033111 + >>> print('%3.1g' % (math.cos(val) - val**3)) + -3e-11 + +If we want to generate Fortran code for the same while loop we simple call ``fcode``:: + + >>> from sympy import fcode + >>> print(fcode(whl, standard=2003, source_format='free')) + do while (abs(delta) > tol) + delta = (val**3 - cos(val))/(-3*val**2 - sin(val)) + val = val + delta + print *, val + end do + +There is a function constructing a loop (or a complete function) like this in +:mod:`sympy.codegen.algorithms`. + +""" + +from __future__ import annotations +from typing import Any + +from collections import defaultdict + +from sympy.core.relational import (Ge, Gt, Le, Lt) +from sympy.core import Symbol, Tuple, Dummy +from sympy.core.basic import Basic +from sympy.core.expr import Expr, Atom +from sympy.core.numbers import Float, Integer, oo +from sympy.core.sympify import _sympify, sympify, SympifyError +from sympy.utilities.iterables import (iterable, topological_sort, + numbered_symbols, filter_symbols) + + +def _mk_Tuple(args): + """ + Create a SymPy Tuple object from an iterable, converting Python strings to + AST strings. + + Parameters + ========== + + args: iterable + Arguments to :class:`sympy.Tuple`. + + Returns + ======= + + sympy.Tuple + """ + args = [String(arg) if isinstance(arg, str) else arg for arg in args] + return Tuple(*args) + + +class CodegenAST(Basic): + __slots__ = () + + +class Token(CodegenAST): + """ Base class for the AST types. + + Explanation + =========== + + Defining fields are set in ``_fields``. Attributes (defined in _fields) + are only allowed to contain instances of Basic (unless atomic, see + ``String``). The arguments to ``__new__()`` correspond to the attributes in + the order defined in ``_fields`. The ``defaults`` class attribute is a + dictionary mapping attribute names to their default values. + + Subclasses should not need to override the ``__new__()`` method. They may + define a class or static method named ``_construct_`` for each + attribute to process the value passed to ``__new__()``. Attributes listed + in the class attribute ``not_in_args`` are not passed to :class:`~.Basic`. + """ + + __slots__: tuple[str, ...] = () + _fields = __slots__ + defaults: dict[str, Any] = {} + not_in_args: list[str] = [] + indented_args = ['body'] + + @property + def is_Atom(self): + return len(self._fields) == 0 + + @classmethod + def _get_constructor(cls, attr): + """ Get the constructor function for an attribute by name. """ + return getattr(cls, '_construct_%s' % attr, lambda x: x) + + @classmethod + def _construct(cls, attr, arg): + """ Construct an attribute value from argument passed to ``__new__()``. """ + # arg may be ``NoneToken()``, so comparison is done using == instead of ``is`` operator + if arg == None: + return cls.defaults.get(attr, none) + else: + if isinstance(arg, Dummy): # SymPy's replace uses Dummy instances + return arg + else: + return cls._get_constructor(attr)(arg) + + def __new__(cls, *args, **kwargs): + # Pass through existing instances when given as sole argument + if len(args) == 1 and not kwargs and isinstance(args[0], cls): + return args[0] + + if len(args) > len(cls._fields): + raise ValueError("Too many arguments (%d), expected at most %d" % (len(args), len(cls._fields))) + + attrvals = [] + + # Process positional arguments + for attrname, argval in zip(cls._fields, args): + if attrname in kwargs: + raise TypeError('Got multiple values for attribute %r' % attrname) + + attrvals.append(cls._construct(attrname, argval)) + + # Process keyword arguments + for attrname in cls._fields[len(args):]: + if attrname in kwargs: + argval = kwargs.pop(attrname) + + elif attrname in cls.defaults: + argval = cls.defaults[attrname] + + else: + raise TypeError('No value for %r given and attribute has no default' % attrname) + + attrvals.append(cls._construct(attrname, argval)) + + if kwargs: + raise ValueError("Unknown keyword arguments: %s" % ' '.join(kwargs)) + + # Parent constructor + basic_args = [ + val for attr, val in zip(cls._fields, attrvals) + if attr not in cls.not_in_args + ] + obj = CodegenAST.__new__(cls, *basic_args) + + # Set attributes + for attr, arg in zip(cls._fields, attrvals): + setattr(obj, attr, arg) + + return obj + + def __eq__(self, other): + if not isinstance(other, self.__class__): + return False + for attr in self._fields: + if getattr(self, attr) != getattr(other, attr): + return False + return True + + def _hashable_content(self): + return tuple([getattr(self, attr) for attr in self._fields]) + + def __hash__(self): + return super().__hash__() + + def _joiner(self, k, indent_level): + return (',\n' + ' '*indent_level) if k in self.indented_args else ', ' + + def _indented(self, printer, k, v, *args, **kwargs): + il = printer._context['indent_level'] + def _print(arg): + if isinstance(arg, Token): + return printer._print(arg, *args, joiner=self._joiner(k, il), **kwargs) + else: + return printer._print(arg, *args, **kwargs) + + if isinstance(v, Tuple): + joined = self._joiner(k, il).join([_print(arg) for arg in v.args]) + if k in self.indented_args: + return '(\n' + ' '*il + joined + ',\n' + ' '*(il - 4) + ')' + else: + return ('({0},)' if len(v.args) == 1 else '({0})').format(joined) + else: + return _print(v) + + def _sympyrepr(self, printer, *args, joiner=', ', **kwargs): + from sympy.printing.printer import printer_context + exclude = kwargs.get('exclude', ()) + values = [getattr(self, k) for k in self._fields] + indent_level = printer._context.get('indent_level', 0) + + arg_reprs = [] + + for i, (attr, value) in enumerate(zip(self._fields, values)): + if attr in exclude: + continue + + # Skip attributes which have the default value + if attr in self.defaults and value == self.defaults[attr]: + continue + + ilvl = indent_level + 4 if attr in self.indented_args else 0 + with printer_context(printer, indent_level=ilvl): + indented = self._indented(printer, attr, value, *args, **kwargs) + arg_reprs.append(('{1}' if i == 0 else '{0}={1}').format(attr, indented.lstrip())) + + return "{}({})".format(self.__class__.__name__, joiner.join(arg_reprs)) + + _sympystr = _sympyrepr + + def __repr__(self): # sympy.core.Basic.__repr__ uses sstr + from sympy.printing import srepr + return srepr(self) + + def kwargs(self, exclude=(), apply=None): + """ Get instance's attributes as dict of keyword arguments. + + Parameters + ========== + + exclude : collection of str + Collection of keywords to exclude. + + apply : callable, optional + Function to apply to all values. + """ + kwargs = {k: getattr(self, k) for k in self._fields if k not in exclude} + if apply is not None: + return {k: apply(v) for k, v in kwargs.items()} + else: + return kwargs + +class BreakToken(Token): + """ Represents 'break' in C/Python ('exit' in Fortran). + + Use the premade instance ``break_`` or instantiate manually. + + Examples + ======== + + >>> from sympy import ccode, fcode + >>> from sympy.codegen.ast import break_ + >>> ccode(break_) + 'break' + >>> fcode(break_, source_format='free') + 'exit' + """ + +break_ = BreakToken() + + +class ContinueToken(Token): + """ Represents 'continue' in C/Python ('cycle' in Fortran) + + Use the premade instance ``continue_`` or instantiate manually. + + Examples + ======== + + >>> from sympy import ccode, fcode + >>> from sympy.codegen.ast import continue_ + >>> ccode(continue_) + 'continue' + >>> fcode(continue_, source_format='free') + 'cycle' + """ + +continue_ = ContinueToken() + +class NoneToken(Token): + """ The AST equivalence of Python's NoneType + + The corresponding instance of Python's ``None`` is ``none``. + + Examples + ======== + + >>> from sympy.codegen.ast import none, Variable + >>> from sympy import pycode + >>> print(pycode(Variable('x').as_Declaration(value=none))) + x = None + + """ + def __eq__(self, other): + return other is None or isinstance(other, NoneToken) + + def _hashable_content(self): + return () + + def __hash__(self): + return super().__hash__() + + +none = NoneToken() + + +class AssignmentBase(CodegenAST): + """ Abstract base class for Assignment and AugmentedAssignment. + + Attributes: + =========== + + op : str + Symbol for assignment operator, e.g. "=", "+=", etc. + """ + + def __new__(cls, lhs, rhs): + lhs = _sympify(lhs) + rhs = _sympify(rhs) + + cls._check_args(lhs, rhs) + + return super().__new__(cls, lhs, rhs) + + @property + def lhs(self): + return self.args[0] + + @property + def rhs(self): + return self.args[1] + + @classmethod + def _check_args(cls, lhs, rhs): + """ Check arguments to __new__ and raise exception if any problems found. + + Derived classes may wish to override this. + """ + from sympy.matrices.expressions.matexpr import ( + MatrixElement, MatrixSymbol) + from sympy.tensor.indexed import Indexed + from sympy.tensor.array.expressions import ArrayElement + + # Tuple of things that can be on the lhs of an assignment + assignable = (Symbol, MatrixSymbol, MatrixElement, Indexed, Element, Variable, + ArrayElement) + if not isinstance(lhs, assignable): + raise TypeError("Cannot assign to lhs of type %s." % type(lhs)) + + # Indexed types implement shape, but don't define it until later. This + # causes issues in assignment validation. For now, matrices are defined + # as anything with a shape that is not an Indexed + lhs_is_mat = hasattr(lhs, 'shape') and not isinstance(lhs, Indexed) + rhs_is_mat = hasattr(rhs, 'shape') and not isinstance(rhs, Indexed) + + # If lhs and rhs have same structure, then this assignment is ok + if lhs_is_mat: + if not rhs_is_mat: + raise ValueError("Cannot assign a scalar to a matrix.") + elif lhs.shape != rhs.shape: + raise ValueError("Dimensions of lhs and rhs do not align.") + elif rhs_is_mat and not lhs_is_mat: + raise ValueError("Cannot assign a matrix to a scalar.") + + +class Assignment(AssignmentBase): + """ + Represents variable assignment for code generation. + + Parameters + ========== + + lhs : Expr + SymPy object representing the lhs of the expression. These should be + singular objects, such as one would use in writing code. Notable types + include Symbol, MatrixSymbol, MatrixElement, and Indexed. Types that + subclass these types are also supported. + + rhs : Expr + SymPy object representing the rhs of the expression. This can be any + type, provided its shape corresponds to that of the lhs. For example, + a Matrix type can be assigned to MatrixSymbol, but not to Symbol, as + the dimensions will not align. + + Examples + ======== + + >>> from sympy import symbols, MatrixSymbol, Matrix + >>> from sympy.codegen.ast import Assignment + >>> x, y, z = symbols('x, y, z') + >>> Assignment(x, y) + Assignment(x, y) + >>> Assignment(x, 0) + Assignment(x, 0) + >>> A = MatrixSymbol('A', 1, 3) + >>> mat = Matrix([x, y, z]).T + >>> Assignment(A, mat) + Assignment(A, Matrix([[x, y, z]])) + >>> Assignment(A[0, 1], x) + Assignment(A[0, 1], x) + """ + + op = ':=' + + +class AugmentedAssignment(AssignmentBase): + """ + Base class for augmented assignments. + + Attributes: + =========== + + binop : str + Symbol for binary operation being applied in the assignment, such as "+", + "*", etc. + """ + binop: str | None + + @property + def op(self): + return self.binop + '=' + + +class AddAugmentedAssignment(AugmentedAssignment): + binop = '+' + + +class SubAugmentedAssignment(AugmentedAssignment): + binop = '-' + + +class MulAugmentedAssignment(AugmentedAssignment): + binop = '*' + + +class DivAugmentedAssignment(AugmentedAssignment): + binop = '/' + + +class ModAugmentedAssignment(AugmentedAssignment): + binop = '%' + + +# Mapping from binary op strings to AugmentedAssignment subclasses +augassign_classes = { + cls.binop: cls for cls in [ + AddAugmentedAssignment, SubAugmentedAssignment, MulAugmentedAssignment, + DivAugmentedAssignment, ModAugmentedAssignment + ] +} + + +def aug_assign(lhs, op, rhs): + """ + Create 'lhs op= rhs'. + + Explanation + =========== + + Represents augmented variable assignment for code generation. This is a + convenience function. You can also use the AugmentedAssignment classes + directly, like AddAugmentedAssignment(x, y). + + Parameters + ========== + + lhs : Expr + SymPy object representing the lhs of the expression. These should be + singular objects, such as one would use in writing code. Notable types + include Symbol, MatrixSymbol, MatrixElement, and Indexed. Types that + subclass these types are also supported. + + op : str + Operator (+, -, /, \\*, %). + + rhs : Expr + SymPy object representing the rhs of the expression. This can be any + type, provided its shape corresponds to that of the lhs. For example, + a Matrix type can be assigned to MatrixSymbol, but not to Symbol, as + the dimensions will not align. + + Examples + ======== + + >>> from sympy import symbols + >>> from sympy.codegen.ast import aug_assign + >>> x, y = symbols('x, y') + >>> aug_assign(x, '+', y) + AddAugmentedAssignment(x, y) + """ + if op not in augassign_classes: + raise ValueError("Unrecognized operator %s" % op) + return augassign_classes[op](lhs, rhs) + + +class CodeBlock(CodegenAST): + """ + Represents a block of code. + + Explanation + =========== + + For now only assignments are supported. This restriction will be lifted in + the future. + + Useful attributes on this object are: + + ``left_hand_sides``: + Tuple of left-hand sides of assignments, in order. + ``left_hand_sides``: + Tuple of right-hand sides of assignments, in order. + ``free_symbols``: Free symbols of the expressions in the right-hand sides + which do not appear in the left-hand side of an assignment. + + Useful methods on this object are: + + ``topological_sort``: + Class method. Return a CodeBlock with assignments + sorted so that variables are assigned before they + are used. + ``cse``: + Return a new CodeBlock with common subexpressions eliminated and + pulled out as assignments. + + Examples + ======== + + >>> from sympy import symbols, ccode + >>> from sympy.codegen.ast import CodeBlock, Assignment + >>> x, y = symbols('x y') + >>> c = CodeBlock(Assignment(x, 1), Assignment(y, x + 1)) + >>> print(ccode(c)) + x = 1; + y = x + 1; + + """ + def __new__(cls, *args): + left_hand_sides = [] + right_hand_sides = [] + for i in args: + if isinstance(i, Assignment): + lhs, rhs = i.args + left_hand_sides.append(lhs) + right_hand_sides.append(rhs) + + obj = CodegenAST.__new__(cls, *args) + + obj.left_hand_sides = Tuple(*left_hand_sides) + obj.right_hand_sides = Tuple(*right_hand_sides) + return obj + + def __iter__(self): + return iter(self.args) + + def _sympyrepr(self, printer, *args, **kwargs): + il = printer._context.get('indent_level', 0) + joiner = ',\n' + ' '*il + joined = joiner.join(map(printer._print, self.args)) + return ('{}(\n'.format(' '*(il-4) + self.__class__.__name__,) + + ' '*il + joined + '\n' + ' '*(il - 4) + ')') + + _sympystr = _sympyrepr + + @property + def free_symbols(self): + return super().free_symbols - set(self.left_hand_sides) + + @classmethod + def topological_sort(cls, assignments): + """ + Return a CodeBlock with topologically sorted assignments so that + variables are assigned before they are used. + + Examples + ======== + + The existing order of assignments is preserved as much as possible. + + This function assumes that variables are assigned to only once. + + This is a class constructor so that the default constructor for + CodeBlock can error when variables are used before they are assigned. + + >>> from sympy import symbols + >>> from sympy.codegen.ast import CodeBlock, Assignment + >>> x, y, z = symbols('x y z') + + >>> assignments = [ + ... Assignment(x, y + z), + ... Assignment(y, z + 1), + ... Assignment(z, 2), + ... ] + >>> CodeBlock.topological_sort(assignments) + CodeBlock( + Assignment(z, 2), + Assignment(y, z + 1), + Assignment(x, y + z) + ) + + """ + + if not all(isinstance(i, Assignment) for i in assignments): + # Will support more things later + raise NotImplementedError("CodeBlock.topological_sort only supports Assignments") + + if any(isinstance(i, AugmentedAssignment) for i in assignments): + raise NotImplementedError("CodeBlock.topological_sort does not yet work with AugmentedAssignments") + + # Create a graph where the nodes are assignments and there is a directed edge + # between nodes that use a variable and nodes that assign that + # variable, like + + # [(x := 1, y := x + 1), (x := 1, z := y + z), (y := x + 1, z := y + z)] + + # If we then topologically sort these nodes, they will be in + # assignment order, like + + # x := 1 + # y := x + 1 + # z := y + z + + # A = The nodes + # + # enumerate keeps nodes in the same order they are already in if + # possible. It will also allow us to handle duplicate assignments to + # the same variable when those are implemented. + A = list(enumerate(assignments)) + + # var_map = {variable: [nodes for which this variable is assigned to]} + # like {x: [(1, x := y + z), (4, x := 2 * w)], ...} + var_map = defaultdict(list) + for node in A: + i, a = node + var_map[a.lhs].append(node) + + # E = Edges in the graph + E = [] + for dst_node in A: + i, a = dst_node + for s in a.rhs.free_symbols: + for src_node in var_map[s]: + E.append((src_node, dst_node)) + + ordered_assignments = topological_sort([A, E]) + + # De-enumerate the result + return cls(*[a for i, a in ordered_assignments]) + + def cse(self, symbols=None, optimizations=None, postprocess=None, + order='canonical'): + """ + Return a new code block with common subexpressions eliminated. + + Explanation + =========== + + See the docstring of :func:`sympy.simplify.cse_main.cse` for more + information. + + Examples + ======== + + >>> from sympy import symbols, sin + >>> from sympy.codegen.ast import CodeBlock, Assignment + >>> x, y, z = symbols('x y z') + + >>> c = CodeBlock( + ... Assignment(x, 1), + ... Assignment(y, sin(x) + 1), + ... Assignment(z, sin(x) - 1), + ... ) + ... + >>> c.cse() + CodeBlock( + Assignment(x, 1), + Assignment(x0, sin(x)), + Assignment(y, x0 + 1), + Assignment(z, x0 - 1) + ) + + """ + from sympy.simplify.cse_main import cse + + # Check that the CodeBlock only contains assignments to unique variables + if not all(isinstance(i, Assignment) for i in self.args): + # Will support more things later + raise NotImplementedError("CodeBlock.cse only supports Assignments") + + if any(isinstance(i, AugmentedAssignment) for i in self.args): + raise NotImplementedError("CodeBlock.cse does not yet work with AugmentedAssignments") + + for i, lhs in enumerate(self.left_hand_sides): + if lhs in self.left_hand_sides[:i]: + raise NotImplementedError("Duplicate assignments to the same " + "variable are not yet supported (%s)" % lhs) + + # Ensure new symbols for subexpressions do not conflict with existing + existing_symbols = self.atoms(Symbol) + if symbols is None: + symbols = numbered_symbols() + symbols = filter_symbols(symbols, existing_symbols) + + replacements, reduced_exprs = cse(list(self.right_hand_sides), + symbols=symbols, optimizations=optimizations, postprocess=postprocess, + order=order) + + new_block = [Assignment(var, expr) for var, expr in + zip(self.left_hand_sides, reduced_exprs)] + new_assignments = [Assignment(var, expr) for var, expr in replacements] + return self.topological_sort(new_assignments + new_block) + + +class For(Token): + """Represents a 'for-loop' in the code. + + Expressions are of the form: + "for target in iter: + body..." + + Parameters + ========== + + target : symbol + iter : iterable + body : CodeBlock or iterable +! When passed an iterable it is used to instantiate a CodeBlock. + + Examples + ======== + + >>> from sympy import symbols, Range + >>> from sympy.codegen.ast import aug_assign, For + >>> x, i, j, k = symbols('x i j k') + >>> for_i = For(i, Range(10), [aug_assign(x, '+', i*j*k)]) + >>> for_i # doctest: -NORMALIZE_WHITESPACE + For(i, iterable=Range(0, 10, 1), body=CodeBlock( + AddAugmentedAssignment(x, i*j*k) + )) + >>> for_ji = For(j, Range(7), [for_i]) + >>> for_ji # doctest: -NORMALIZE_WHITESPACE + For(j, iterable=Range(0, 7, 1), body=CodeBlock( + For(i, iterable=Range(0, 10, 1), body=CodeBlock( + AddAugmentedAssignment(x, i*j*k) + )) + )) + >>> for_kji =For(k, Range(5), [for_ji]) + >>> for_kji # doctest: -NORMALIZE_WHITESPACE + For(k, iterable=Range(0, 5, 1), body=CodeBlock( + For(j, iterable=Range(0, 7, 1), body=CodeBlock( + For(i, iterable=Range(0, 10, 1), body=CodeBlock( + AddAugmentedAssignment(x, i*j*k) + )) + )) + )) + """ + __slots__ = _fields = ('target', 'iterable', 'body') + _construct_target = staticmethod(_sympify) + + @classmethod + def _construct_body(cls, itr): + if isinstance(itr, CodeBlock): + return itr + else: + return CodeBlock(*itr) + + @classmethod + def _construct_iterable(cls, itr): + if not iterable(itr): + raise TypeError("iterable must be an iterable") + if isinstance(itr, list): # _sympify errors on lists because they are mutable + itr = tuple(itr) + return _sympify(itr) + + +class String(Atom, Token): + """ SymPy object representing a string. + + Atomic object which is not an expression (as opposed to Symbol). + + Parameters + ========== + + text : str + + Examples + ======== + + >>> from sympy.codegen.ast import String + >>> f = String('foo') + >>> f + foo + >>> str(f) + 'foo' + >>> f.text + 'foo' + >>> print(repr(f)) + String('foo') + + """ + __slots__ = _fields = ('text',) + not_in_args = ['text'] + is_Atom = True + + @classmethod + def _construct_text(cls, text): + if not isinstance(text, str): + raise TypeError("Argument text is not a string type.") + return text + + def _sympystr(self, printer, *args, **kwargs): + return self.text + + def kwargs(self, exclude = (), apply = None): + return {} + + #to be removed when Atom is given a suitable func + @property + def func(self): + return lambda: self + + def _latex(self, printer): + from sympy.printing.latex import latex_escape + return r'\texttt{{"{}"}}'.format(latex_escape(self.text)) + +class QuotedString(String): + """ Represents a string which should be printed with quotes. """ + +class Comment(String): + """ Represents a comment. """ + +class Node(Token): + """ Subclass of Token, carrying the attribute 'attrs' (Tuple) + + Examples + ======== + + >>> from sympy.codegen.ast import Node, value_const, pointer_const + >>> n1 = Node([value_const]) + >>> n1.attr_params('value_const') # get the parameters of attribute (by name) + () + >>> from sympy.codegen.fnodes import dimension + >>> n2 = Node([value_const, dimension(5, 3)]) + >>> n2.attr_params(value_const) # get the parameters of attribute (by Attribute instance) + () + >>> n2.attr_params('dimension') # get the parameters of attribute (by name) + (5, 3) + >>> n2.attr_params(pointer_const) is None + True + + """ + + __slots__: tuple[str, ...] = ('attrs',) + _fields = __slots__ + + defaults: dict[str, Any] = {'attrs': Tuple()} + + _construct_attrs = staticmethod(_mk_Tuple) + + def attr_params(self, looking_for): + """ Returns the parameters of the Attribute with name ``looking_for`` in self.attrs """ + for attr in self.attrs: + if str(attr.name) == str(looking_for): + return attr.parameters + + +class Type(Token): + """ Represents a type. + + Explanation + =========== + + The naming is a super-set of NumPy naming. Type has a classmethod + ``from_expr`` which offer type deduction. It also has a method + ``cast_check`` which casts the argument to its type, possibly raising an + exception if rounding error is not within tolerances, or if the value is not + representable by the underlying data type (e.g. unsigned integers). + + Parameters + ========== + + name : str + Name of the type, e.g. ``object``, ``int16``, ``float16`` (where the latter two + would use the ``Type`` sub-classes ``IntType`` and ``FloatType`` respectively). + If a ``Type`` instance is given, the said instance is returned. + + Examples + ======== + + >>> from sympy.codegen.ast import Type + >>> t = Type.from_expr(42) + >>> t + integer + >>> print(repr(t)) + IntBaseType(String('integer')) + >>> from sympy.codegen.ast import uint8 + >>> uint8.cast_check(-1) # doctest: +ELLIPSIS + Traceback (most recent call last): + ... + ValueError: Minimum value for data type bigger than new value. + >>> from sympy.codegen.ast import float32 + >>> v6 = 0.123456 + >>> float32.cast_check(v6) + 0.123456 + >>> v10 = 12345.67894 + >>> float32.cast_check(v10) # doctest: +ELLIPSIS + Traceback (most recent call last): + ... + ValueError: Casting gives a significantly different value. + >>> boost_mp50 = Type('boost::multiprecision::cpp_dec_float_50') + >>> from sympy import cxxcode + >>> from sympy.codegen.ast import Declaration, Variable + >>> cxxcode(Declaration(Variable('x', type=boost_mp50))) + 'boost::multiprecision::cpp_dec_float_50 x' + + References + ========== + + .. [1] https://numpy.org/doc/stable/user/basics.types.html + + """ + __slots__: tuple[str, ...] = ('name',) + _fields = __slots__ + + _construct_name = String + + def _sympystr(self, printer, *args, **kwargs): + return str(self.name) + + @classmethod + def from_expr(cls, expr): + """ Deduces type from an expression or a ``Symbol``. + + Parameters + ========== + + expr : number or SymPy object + The type will be deduced from type or properties. + + Examples + ======== + + >>> from sympy.codegen.ast import Type, integer, complex_ + >>> Type.from_expr(2) == integer + True + >>> from sympy import Symbol + >>> Type.from_expr(Symbol('z', complex=True)) == complex_ + True + >>> Type.from_expr(sum) # doctest: +ELLIPSIS + Traceback (most recent call last): + ... + ValueError: Could not deduce type from expr. + + Raises + ====== + + ValueError when type deduction fails. + + """ + if isinstance(expr, (float, Float)): + return real + if isinstance(expr, (int, Integer)) or getattr(expr, 'is_integer', False): + return integer + if getattr(expr, 'is_real', False): + return real + if isinstance(expr, complex) or getattr(expr, 'is_complex', False): + return complex_ + if isinstance(expr, bool) or getattr(expr, 'is_Relational', False): + return bool_ + else: + raise ValueError("Could not deduce type from expr.") + + def _check(self, value): + pass + + def cast_check(self, value, rtol=None, atol=0, precision_targets=None): + """ Casts a value to the data type of the instance. + + Parameters + ========== + + value : number + rtol : floating point number + Relative tolerance. (will be deduced if not given). + atol : floating point number + Absolute tolerance (in addition to ``rtol``). + type_aliases : dict + Maps substitutions for Type, e.g. {integer: int64, real: float32} + + Examples + ======== + + >>> from sympy.codegen.ast import integer, float32, int8 + >>> integer.cast_check(3.0) == 3 + True + >>> float32.cast_check(1e-40) # doctest: +ELLIPSIS + Traceback (most recent call last): + ... + ValueError: Minimum value for data type bigger than new value. + >>> int8.cast_check(256) # doctest: +ELLIPSIS + Traceback (most recent call last): + ... + ValueError: Maximum value for data type smaller than new value. + >>> v10 = 12345.67894 + >>> float32.cast_check(v10) # doctest: +ELLIPSIS + Traceback (most recent call last): + ... + ValueError: Casting gives a significantly different value. + >>> from sympy.codegen.ast import float64 + >>> float64.cast_check(v10) + 12345.67894 + >>> from sympy import Float + >>> v18 = Float('0.123456789012345646') + >>> float64.cast_check(v18) + Traceback (most recent call last): + ... + ValueError: Casting gives a significantly different value. + >>> from sympy.codegen.ast import float80 + >>> float80.cast_check(v18) + 0.123456789012345649 + + """ + val = sympify(value) + + ten = Integer(10) + exp10 = getattr(self, 'decimal_dig', None) + + if rtol is None: + rtol = 1e-15 if exp10 is None else 2.0*ten**(-exp10) + + def tol(num): + return atol + rtol*abs(num) + + new_val = self.cast_nocheck(value) + self._check(new_val) + + delta = new_val - val + if abs(delta) > tol(val): # rounding, e.g. int(3.5) != 3.5 + raise ValueError("Casting gives a significantly different value.") + + return new_val + + def _latex(self, printer): + from sympy.printing.latex import latex_escape + type_name = latex_escape(self.__class__.__name__) + name = latex_escape(self.name.text) + return r"\text{{{}}}\left(\texttt{{{}}}\right)".format(type_name, name) + + +class IntBaseType(Type): + """ Integer base type, contains no size information. """ + __slots__ = () + cast_nocheck = lambda self, i: Integer(int(i)) + + +class _SizedIntType(IntBaseType): + __slots__ = ('nbits',) + _fields = Type._fields + __slots__ + + _construct_nbits = Integer + + def _check(self, value): + if value < self.min: + raise ValueError("Value is too small: %d < %d" % (value, self.min)) + if value > self.max: + raise ValueError("Value is too big: %d > %d" % (value, self.max)) + + +class SignedIntType(_SizedIntType): + """ Represents a signed integer type. """ + __slots__ = () + @property + def min(self): + return -2**(self.nbits-1) + + @property + def max(self): + return 2**(self.nbits-1) - 1 + + +class UnsignedIntType(_SizedIntType): + """ Represents an unsigned integer type. """ + __slots__ = () + @property + def min(self): + return 0 + + @property + def max(self): + return 2**self.nbits - 1 + +two = Integer(2) + +class FloatBaseType(Type): + """ Represents a floating point number type. """ + __slots__ = () + cast_nocheck = Float + +class FloatType(FloatBaseType): + """ Represents a floating point type with fixed bit width. + + Base 2 & one sign bit is assumed. + + Parameters + ========== + + name : str + Name of the type. + nbits : integer + Number of bits used (storage). + nmant : integer + Number of bits used to represent the mantissa. + nexp : integer + Number of bits used to represent the mantissa. + + Examples + ======== + + >>> from sympy import S + >>> from sympy.codegen.ast import FloatType + >>> half_precision = FloatType('f16', nbits=16, nmant=10, nexp=5) + >>> half_precision.max + 65504 + >>> half_precision.tiny == S(2)**-14 + True + >>> half_precision.eps == S(2)**-10 + True + >>> half_precision.dig == 3 + True + >>> half_precision.decimal_dig == 5 + True + >>> half_precision.cast_check(1.0) + 1.0 + >>> half_precision.cast_check(1e5) # doctest: +ELLIPSIS + Traceback (most recent call last): + ... + ValueError: Maximum value for data type smaller than new value. + """ + + __slots__ = ('nbits', 'nmant', 'nexp',) + _fields = Type._fields + __slots__ + + _construct_nbits = _construct_nmant = _construct_nexp = Integer + + + @property + def max_exponent(self): + """ The largest positive number n, such that 2**(n - 1) is a representable finite value. """ + # cf. C++'s ``std::numeric_limits::max_exponent`` + return two**(self.nexp - 1) + + @property + def min_exponent(self): + """ The lowest negative number n, such that 2**(n - 1) is a valid normalized number. """ + # cf. C++'s ``std::numeric_limits::min_exponent`` + return 3 - self.max_exponent + + @property + def max(self): + """ Maximum value representable. """ + return (1 - two**-(self.nmant+1))*two**self.max_exponent + + @property + def tiny(self): + """ The minimum positive normalized value. """ + # See C macros: FLT_MIN, DBL_MIN, LDBL_MIN + # or C++'s ``std::numeric_limits::min`` + # or numpy.finfo(dtype).tiny + return two**(self.min_exponent - 1) + + + @property + def eps(self): + """ Difference between 1.0 and the next representable value. """ + return two**(-self.nmant) + + @property + def dig(self): + """ Number of decimal digits that are guaranteed to be preserved in text. + + When converting text -> float -> text, you are guaranteed that at least ``dig`` + number of digits are preserved with respect to rounding or overflow. + """ + from sympy.functions import floor, log + return floor(self.nmant * log(2)/log(10)) + + @property + def decimal_dig(self): + """ Number of digits needed to store & load without loss. + + Explanation + =========== + + Number of decimal digits needed to guarantee that two consecutive conversions + (float -> text -> float) to be idempotent. This is useful when one do not want + to loose precision due to rounding errors when storing a floating point value + as text. + """ + from sympy.functions import ceiling, log + return ceiling((self.nmant + 1) * log(2)/log(10) + 1) + + def cast_nocheck(self, value): + """ Casts without checking if out of bounds or subnormal. """ + if value == oo: # float(oo) or oo + return float(oo) + elif value == -oo: # float(-oo) or -oo + return float(-oo) + return Float(str(sympify(value).evalf(self.decimal_dig)), self.decimal_dig) + + def _check(self, value): + if value < -self.max: + raise ValueError("Value is too small: %d < %d" % (value, -self.max)) + if value > self.max: + raise ValueError("Value is too big: %d > %d" % (value, self.max)) + if abs(value) < self.tiny: + raise ValueError("Smallest (absolute) value for data type bigger than new value.") + +class ComplexBaseType(FloatBaseType): + + __slots__ = () + + def cast_nocheck(self, value): + """ Casts without checking if out of bounds or subnormal. """ + from sympy.functions import re, im + return ( + super().cast_nocheck(re(value)) + + super().cast_nocheck(im(value))*1j + ) + + def _check(self, value): + from sympy.functions import re, im + super()._check(re(value)) + super()._check(im(value)) + + +class ComplexType(ComplexBaseType, FloatType): + """ Represents a complex floating point number. """ + __slots__ = () + + +# NumPy types: +intc = IntBaseType('intc') +intp = IntBaseType('intp') +int8 = SignedIntType('int8', 8) +int16 = SignedIntType('int16', 16) +int32 = SignedIntType('int32', 32) +int64 = SignedIntType('int64', 64) +uint8 = UnsignedIntType('uint8', 8) +uint16 = UnsignedIntType('uint16', 16) +uint32 = UnsignedIntType('uint32', 32) +uint64 = UnsignedIntType('uint64', 64) +float16 = FloatType('float16', 16, nexp=5, nmant=10) # IEEE 754 binary16, Half precision +float32 = FloatType('float32', 32, nexp=8, nmant=23) # IEEE 754 binary32, Single precision +float64 = FloatType('float64', 64, nexp=11, nmant=52) # IEEE 754 binary64, Double precision +float80 = FloatType('float80', 80, nexp=15, nmant=63) # x86 extended precision (1 integer part bit), "long double" +float128 = FloatType('float128', 128, nexp=15, nmant=112) # IEEE 754 binary128, Quadruple precision +float256 = FloatType('float256', 256, nexp=19, nmant=236) # IEEE 754 binary256, Octuple precision + +complex64 = ComplexType('complex64', nbits=64, **float32.kwargs(exclude=('name', 'nbits'))) +complex128 = ComplexType('complex128', nbits=128, **float64.kwargs(exclude=('name', 'nbits'))) + +# Generic types (precision may be chosen by code printers): +untyped = Type('untyped') +real = FloatBaseType('real') +integer = IntBaseType('integer') +complex_ = ComplexBaseType('complex') +bool_ = Type('bool') + + +class Attribute(Token): + """ Attribute (possibly parametrized) + + For use with :class:`sympy.codegen.ast.Node` (which takes instances of + ``Attribute`` as ``attrs``). + + Parameters + ========== + + name : str + parameters : Tuple + + Examples + ======== + + >>> from sympy.codegen.ast import Attribute + >>> volatile = Attribute('volatile') + >>> volatile + volatile + >>> print(repr(volatile)) + Attribute(String('volatile')) + >>> a = Attribute('foo', [1, 2, 3]) + >>> a + foo(1, 2, 3) + >>> a.parameters == (1, 2, 3) + True + """ + __slots__ = _fields = ('name', 'parameters') + defaults = {'parameters': Tuple()} + + _construct_name = String + _construct_parameters = staticmethod(_mk_Tuple) + + def _sympystr(self, printer, *args, **kwargs): + result = str(self.name) + if self.parameters: + result += '(%s)' % ', '.join((printer._print( + arg, *args, **kwargs) for arg in self.parameters)) + return result + +value_const = Attribute('value_const') +pointer_const = Attribute('pointer_const') + + +class Variable(Node): + """ Represents a variable. + + Parameters + ========== + + symbol : Symbol + type : Type (optional) + Type of the variable. + attrs : iterable of Attribute instances + Will be stored as a Tuple. + + Examples + ======== + + >>> from sympy import Symbol + >>> from sympy.codegen.ast import Variable, float32, integer + >>> x = Symbol('x') + >>> v = Variable(x, type=float32) + >>> v.attrs + () + >>> v == Variable('x') + False + >>> v == Variable('x', type=float32) + True + >>> v + Variable(x, type=float32) + + One may also construct a ``Variable`` instance with the type deduced from + assumptions about the symbol using the ``deduced`` classmethod: + + >>> i = Symbol('i', integer=True) + >>> v = Variable.deduced(i) + >>> v.type == integer + True + >>> v == Variable('i') + False + >>> from sympy.codegen.ast import value_const + >>> value_const in v.attrs + False + >>> w = Variable('w', attrs=[value_const]) + >>> w + Variable(w, attrs=(value_const,)) + >>> value_const in w.attrs + True + >>> w.as_Declaration(value=42) + Declaration(Variable(w, value=42, attrs=(value_const,))) + + """ + + __slots__ = ('symbol', 'type', 'value') + _fields = __slots__ + Node._fields + + defaults = Node.defaults.copy() + defaults.update({'type': untyped, 'value': none}) + + _construct_symbol = staticmethod(sympify) + _construct_value = staticmethod(sympify) + + @classmethod + def deduced(cls, symbol, value=None, attrs=Tuple(), cast_check=True): + """ Alt. constructor with type deduction from ``Type.from_expr``. + + Deduces type primarily from ``symbol``, secondarily from ``value``. + + Parameters + ========== + + symbol : Symbol + value : expr + (optional) value of the variable. + attrs : iterable of Attribute instances + cast_check : bool + Whether to apply ``Type.cast_check`` on ``value``. + + Examples + ======== + + >>> from sympy import Symbol + >>> from sympy.codegen.ast import Variable, complex_ + >>> n = Symbol('n', integer=True) + >>> str(Variable.deduced(n).type) + 'integer' + >>> x = Symbol('x', real=True) + >>> v = Variable.deduced(x) + >>> v.type + real + >>> z = Symbol('z', complex=True) + >>> Variable.deduced(z).type == complex_ + True + + """ + if isinstance(symbol, Variable): + return symbol + + try: + type_ = Type.from_expr(symbol) + except ValueError: + type_ = Type.from_expr(value) + + if value is not None and cast_check: + value = type_.cast_check(value) + return cls(symbol, type=type_, value=value, attrs=attrs) + + def as_Declaration(self, **kwargs): + """ Convenience method for creating a Declaration instance. + + Explanation + =========== + + If the variable of the Declaration need to wrap a modified + variable keyword arguments may be passed (overriding e.g. + the ``value`` of the Variable instance). + + Examples + ======== + + >>> from sympy.codegen.ast import Variable, NoneToken + >>> x = Variable('x') + >>> decl1 = x.as_Declaration() + >>> # value is special NoneToken() which must be tested with == operator + >>> decl1.variable.value is None # won't work + False + >>> decl1.variable.value == None # not PEP-8 compliant + True + >>> decl1.variable.value == NoneToken() # OK + True + >>> decl2 = x.as_Declaration(value=42.0) + >>> decl2.variable.value == 42.0 + True + + """ + kw = self.kwargs() + kw.update(kwargs) + return Declaration(self.func(**kw)) + + def _relation(self, rhs, op): + try: + rhs = _sympify(rhs) + except SympifyError: + raise TypeError("Invalid comparison %s < %s" % (self, rhs)) + return op(self, rhs, evaluate=False) + + __lt__ = lambda self, other: self._relation(other, Lt) + __le__ = lambda self, other: self._relation(other, Le) + __ge__ = lambda self, other: self._relation(other, Ge) + __gt__ = lambda self, other: self._relation(other, Gt) + +class Pointer(Variable): + """ Represents a pointer. See ``Variable``. + + Examples + ======== + + Can create instances of ``Element``: + + >>> from sympy import Symbol + >>> from sympy.codegen.ast import Pointer + >>> i = Symbol('i', integer=True) + >>> p = Pointer('x') + >>> p[i+1] + Element(x, indices=(i + 1,)) + + """ + __slots__ = () + + def __getitem__(self, key): + try: + return Element(self.symbol, key) + except TypeError: + return Element(self.symbol, (key,)) + + +class Element(Token): + """ Element in (a possibly N-dimensional) array. + + Examples + ======== + + >>> from sympy.codegen.ast import Element + >>> elem = Element('x', 'ijk') + >>> elem.symbol.name == 'x' + True + >>> elem.indices + (i, j, k) + >>> from sympy import ccode + >>> ccode(elem) + 'x[i][j][k]' + >>> ccode(Element('x', 'ijk', strides='lmn', offset='o')) + 'x[i*l + j*m + k*n + o]' + + """ + __slots__ = _fields = ('symbol', 'indices', 'strides', 'offset') + defaults = {'strides': none, 'offset': none} + _construct_symbol = staticmethod(sympify) + _construct_indices = staticmethod(lambda arg: Tuple(*arg)) + _construct_strides = staticmethod(lambda arg: Tuple(*arg)) + _construct_offset = staticmethod(sympify) + + +class Declaration(Token): + """ Represents a variable declaration + + Parameters + ========== + + variable : Variable + + Examples + ======== + + >>> from sympy.codegen.ast import Declaration, NoneToken, untyped + >>> z = Declaration('z') + >>> z.variable.type == untyped + True + >>> # value is special NoneToken() which must be tested with == operator + >>> z.variable.value is None # won't work + False + >>> z.variable.value == None # not PEP-8 compliant + True + >>> z.variable.value == NoneToken() # OK + True + """ + __slots__ = _fields = ('variable',) + _construct_variable = Variable + + +class While(Token): + """ Represents a 'for-loop' in the code. + + Expressions are of the form: + "while condition: + body..." + + Parameters + ========== + + condition : expression convertible to Boolean + body : CodeBlock or iterable + When passed an iterable it is used to instantiate a CodeBlock. + + Examples + ======== + + >>> from sympy import symbols, Gt, Abs + >>> from sympy.codegen import aug_assign, Assignment, While + >>> x, dx = symbols('x dx') + >>> expr = 1 - x**2 + >>> whl = While(Gt(Abs(dx), 1e-9), [ + ... Assignment(dx, -expr/expr.diff(x)), + ... aug_assign(x, '+', dx) + ... ]) + + """ + __slots__ = _fields = ('condition', 'body') + _construct_condition = staticmethod(lambda cond: _sympify(cond)) + + @classmethod + def _construct_body(cls, itr): + if isinstance(itr, CodeBlock): + return itr + else: + return CodeBlock(*itr) + + +class Scope(Token): + """ Represents a scope in the code. + + Parameters + ========== + + body : CodeBlock or iterable + When passed an iterable it is used to instantiate a CodeBlock. + + """ + __slots__ = _fields = ('body',) + + @classmethod + def _construct_body(cls, itr): + if isinstance(itr, CodeBlock): + return itr + else: + return CodeBlock(*itr) + + +class Stream(Token): + """ Represents a stream. + + There are two predefined Stream instances ``stdout`` & ``stderr``. + + Parameters + ========== + + name : str + + Examples + ======== + + >>> from sympy import pycode, Symbol + >>> from sympy.codegen.ast import Print, stderr, QuotedString + >>> print(pycode(Print(['x'], file=stderr))) + print(x, file=sys.stderr) + >>> x = Symbol('x') + >>> print(pycode(Print([QuotedString('x')], file=stderr))) # print literally "x" + print("x", file=sys.stderr) + + """ + __slots__ = _fields = ('name',) + _construct_name = String + +stdout = Stream('stdout') +stderr = Stream('stderr') + + +class Print(Token): + r""" Represents print command in the code. + + Parameters + ========== + + formatstring : str + *args : Basic instances (or convertible to such through sympify) + + Examples + ======== + + >>> from sympy.codegen.ast import Print + >>> from sympy import pycode + >>> print(pycode(Print('x y'.split(), "coordinate: %12.5g %12.5g\\n"))) + print("coordinate: %12.5g %12.5g\n" % (x, y), end="") + + """ + + __slots__ = _fields = ('print_args', 'format_string', 'file') + defaults = {'format_string': none, 'file': none} + + _construct_print_args = staticmethod(_mk_Tuple) + _construct_format_string = QuotedString + _construct_file = Stream + + +class FunctionPrototype(Node): + """ Represents a function prototype + + Allows the user to generate forward declaration in e.g. C/C++. + + Parameters + ========== + + return_type : Type + name : str + parameters: iterable of Variable instances + attrs : iterable of Attribute instances + + Examples + ======== + + >>> from sympy import ccode, symbols + >>> from sympy.codegen.ast import real, FunctionPrototype + >>> x, y = symbols('x y', real=True) + >>> fp = FunctionPrototype(real, 'foo', [x, y]) + >>> ccode(fp) + 'double foo(double x, double y)' + + """ + + __slots__ = ('return_type', 'name', 'parameters') + _fields: tuple[str, ...] = __slots__ + Node._fields + + _construct_return_type = Type + _construct_name = String + + @staticmethod + def _construct_parameters(args): + def _var(arg): + if isinstance(arg, Declaration): + return arg.variable + elif isinstance(arg, Variable): + return arg + else: + return Variable.deduced(arg) + return Tuple(*map(_var, args)) + + @classmethod + def from_FunctionDefinition(cls, func_def): + if not isinstance(func_def, FunctionDefinition): + raise TypeError("func_def is not an instance of FunctionDefinition") + return cls(**func_def.kwargs(exclude=('body',))) + + +class FunctionDefinition(FunctionPrototype): + """ Represents a function definition in the code. + + Parameters + ========== + + return_type : Type + name : str + parameters: iterable of Variable instances + body : CodeBlock or iterable + attrs : iterable of Attribute instances + + Examples + ======== + + >>> from sympy import ccode, symbols + >>> from sympy.codegen.ast import real, FunctionPrototype + >>> x, y = symbols('x y', real=True) + >>> fp = FunctionPrototype(real, 'foo', [x, y]) + >>> ccode(fp) + 'double foo(double x, double y)' + >>> from sympy.codegen.ast import FunctionDefinition, Return + >>> body = [Return(x*y)] + >>> fd = FunctionDefinition.from_FunctionPrototype(fp, body) + >>> print(ccode(fd)) + double foo(double x, double y){ + return x*y; + } + """ + + __slots__ = ('body', ) + _fields = FunctionPrototype._fields[:-1] + __slots__ + Node._fields + + @classmethod + def _construct_body(cls, itr): + if isinstance(itr, CodeBlock): + return itr + else: + return CodeBlock(*itr) + + @classmethod + def from_FunctionPrototype(cls, func_proto, body): + if not isinstance(func_proto, FunctionPrototype): + raise TypeError("func_proto is not an instance of FunctionPrototype") + return cls(body=body, **func_proto.kwargs()) + + +class Return(Token): + """ Represents a return command in the code. + + Parameters + ========== + + return : Basic + + Examples + ======== + + >>> from sympy.codegen.ast import Return + >>> from sympy.printing.pycode import pycode + >>> from sympy import Symbol + >>> x = Symbol('x') + >>> print(pycode(Return(x))) + return x + + """ + __slots__ = _fields = ('return',) + _construct_return=staticmethod(_sympify) + + +class FunctionCall(Token, Expr): + """ Represents a call to a function in the code. + + Parameters + ========== + + name : str + function_args : Tuple + + Examples + ======== + + >>> from sympy.codegen.ast import FunctionCall + >>> from sympy import pycode + >>> fcall = FunctionCall('foo', 'bar baz'.split()) + >>> print(pycode(fcall)) + foo(bar, baz) + + """ + __slots__ = _fields = ('name', 'function_args') + + _construct_name = String + _construct_function_args = staticmethod(lambda args: Tuple(*args)) + + +class Raise(Token): + """ Prints as 'raise ...' in Python, 'throw ...' in C++""" + __slots__ = _fields = ('exception',) + + +class RuntimeError_(Token): + """ Represents 'std::runtime_error' in C++ and 'RuntimeError' in Python. + + Note that the latter is uncommon, and you might want to use e.g. ValueError. + """ + __slots__ = _fields = ('message',) + _construct_message = String diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/cfunctions.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/cfunctions.py new file mode 100644 index 0000000000000000000000000000000000000000..7b79291f128aef1cb83b327782840508e59a9cc8 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/cfunctions.py @@ -0,0 +1,558 @@ +""" +This module contains SymPy functions mathcin corresponding to special math functions in the +C standard library (since C99, also available in C++11). + +The functions defined in this module allows the user to express functions such as ``expm1`` +as a SymPy function for symbolic manipulation. + +""" +from sympy.core.function import ArgumentIndexError, Function +from sympy.core.numbers import Rational +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.functions.elementary.exponential import exp, log +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.logic.boolalg import BooleanFunction, true, false + +def _expm1(x): + return exp(x) - S.One + + +class expm1(Function): + """ + Represents the exponential function minus one. + + Explanation + =========== + + The benefit of using ``expm1(x)`` over ``exp(x) - 1`` + is that the latter is prone to cancellation under finite precision + arithmetic when x is close to zero. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy.codegen.cfunctions import expm1 + >>> '%.0e' % expm1(1e-99).evalf() + '1e-99' + >>> from math import exp + >>> exp(1e-99) - 1 + 0.0 + >>> expm1(x).diff(x) + exp(x) + + See Also + ======== + + log1p + """ + nargs = 1 + + def fdiff(self, argindex=1): + """ + Returns the first derivative of this function. + """ + if argindex == 1: + return exp(*self.args) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_expand_func(self, **hints): + return _expm1(*self.args) + + def _eval_rewrite_as_exp(self, arg, **kwargs): + return exp(arg) - S.One + + _eval_rewrite_as_tractable = _eval_rewrite_as_exp + + @classmethod + def eval(cls, arg): + exp_arg = exp.eval(arg) + if exp_arg is not None: + return exp_arg - S.One + + def _eval_is_real(self): + return self.args[0].is_real + + def _eval_is_finite(self): + return self.args[0].is_finite + + +def _log1p(x): + return log(x + S.One) + + +class log1p(Function): + """ + Represents the natural logarithm of a number plus one. + + Explanation + =========== + + The benefit of using ``log1p(x)`` over ``log(x + 1)`` + is that the latter is prone to cancellation under finite precision + arithmetic when x is close to zero. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy.codegen.cfunctions import log1p + >>> from sympy import expand_log + >>> '%.0e' % expand_log(log1p(1e-99)).evalf() + '1e-99' + >>> from math import log + >>> log(1 + 1e-99) + 0.0 + >>> log1p(x).diff(x) + 1/(x + 1) + + See Also + ======== + + expm1 + """ + nargs = 1 + + + def fdiff(self, argindex=1): + """ + Returns the first derivative of this function. + """ + if argindex == 1: + return S.One/(self.args[0] + S.One) + else: + raise ArgumentIndexError(self, argindex) + + + def _eval_expand_func(self, **hints): + return _log1p(*self.args) + + def _eval_rewrite_as_log(self, arg, **kwargs): + return _log1p(arg) + + _eval_rewrite_as_tractable = _eval_rewrite_as_log + + @classmethod + def eval(cls, arg): + if arg.is_Rational: + return log(arg + S.One) + elif not arg.is_Float: # not safe to add 1 to Float + return log.eval(arg + S.One) + elif arg.is_number: + return log(Rational(arg) + S.One) + + def _eval_is_real(self): + return (self.args[0] + S.One).is_nonnegative + + def _eval_is_finite(self): + if (self.args[0] + S.One).is_zero: + return False + return self.args[0].is_finite + + def _eval_is_positive(self): + return self.args[0].is_positive + + def _eval_is_zero(self): + return self.args[0].is_zero + + def _eval_is_nonnegative(self): + return self.args[0].is_nonnegative + +_Two = S(2) + +def _exp2(x): + return Pow(_Two, x) + +class exp2(Function): + """ + Represents the exponential function with base two. + + Explanation + =========== + + The benefit of using ``exp2(x)`` over ``2**x`` + is that the latter is not as efficient under finite precision + arithmetic. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy.codegen.cfunctions import exp2 + >>> exp2(2).evalf() == 4.0 + True + >>> exp2(x).diff(x) + log(2)*exp2(x) + + See Also + ======== + + log2 + """ + nargs = 1 + + + def fdiff(self, argindex=1): + """ + Returns the first derivative of this function. + """ + if argindex == 1: + return self*log(_Two) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_Pow(self, arg, **kwargs): + return _exp2(arg) + + _eval_rewrite_as_tractable = _eval_rewrite_as_Pow + + def _eval_expand_func(self, **hints): + return _exp2(*self.args) + + @classmethod + def eval(cls, arg): + if arg.is_number: + return _exp2(arg) + + +def _log2(x): + return log(x)/log(_Two) + + +class log2(Function): + """ + Represents the logarithm function with base two. + + Explanation + =========== + + The benefit of using ``log2(x)`` over ``log(x)/log(2)`` + is that the latter is not as efficient under finite precision + arithmetic. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy.codegen.cfunctions import log2 + >>> log2(4).evalf() == 2.0 + True + >>> log2(x).diff(x) + 1/(x*log(2)) + + See Also + ======== + + exp2 + log10 + """ + nargs = 1 + + def fdiff(self, argindex=1): + """ + Returns the first derivative of this function. + """ + if argindex == 1: + return S.One/(log(_Two)*self.args[0]) + else: + raise ArgumentIndexError(self, argindex) + + + @classmethod + def eval(cls, arg): + if arg.is_number: + result = log.eval(arg, base=_Two) + if result.is_Atom: + return result + elif arg.is_Pow and arg.base == _Two: + return arg.exp + + def _eval_evalf(self, *args, **kwargs): + return self.rewrite(log).evalf(*args, **kwargs) + + def _eval_expand_func(self, **hints): + return _log2(*self.args) + + def _eval_rewrite_as_log(self, arg, **kwargs): + return _log2(arg) + + _eval_rewrite_as_tractable = _eval_rewrite_as_log + + +def _fma(x, y, z): + return x*y + z + + +class fma(Function): + """ + Represents "fused multiply add". + + Explanation + =========== + + The benefit of using ``fma(x, y, z)`` over ``x*y + z`` + is that, under finite precision arithmetic, the former is + supported by special instructions on some CPUs. + + Examples + ======== + + >>> from sympy.abc import x, y, z + >>> from sympy.codegen.cfunctions import fma + >>> fma(x, y, z).diff(x) + y + + """ + nargs = 3 + + def fdiff(self, argindex=1): + """ + Returns the first derivative of this function. + """ + if argindex in (1, 2): + return self.args[2 - argindex] + elif argindex == 3: + return S.One + else: + raise ArgumentIndexError(self, argindex) + + + def _eval_expand_func(self, **hints): + return _fma(*self.args) + + def _eval_rewrite_as_tractable(self, arg, limitvar=None, **kwargs): + return _fma(arg) + + +_Ten = S(10) + + +def _log10(x): + return log(x)/log(_Ten) + + +class log10(Function): + """ + Represents the logarithm function with base ten. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy.codegen.cfunctions import log10 + >>> log10(100).evalf() == 2.0 + True + >>> log10(x).diff(x) + 1/(x*log(10)) + + See Also + ======== + + log2 + """ + nargs = 1 + + def fdiff(self, argindex=1): + """ + Returns the first derivative of this function. + """ + if argindex == 1: + return S.One/(log(_Ten)*self.args[0]) + else: + raise ArgumentIndexError(self, argindex) + + + @classmethod + def eval(cls, arg): + if arg.is_number: + result = log.eval(arg, base=_Ten) + if result.is_Atom: + return result + elif arg.is_Pow and arg.base == _Ten: + return arg.exp + + def _eval_expand_func(self, **hints): + return _log10(*self.args) + + def _eval_rewrite_as_log(self, arg, **kwargs): + return _log10(arg) + + _eval_rewrite_as_tractable = _eval_rewrite_as_log + + +def _Sqrt(x): + return Pow(x, S.Half) + + +class Sqrt(Function): # 'sqrt' already defined in sympy.functions.elementary.miscellaneous + """ + Represents the square root function. + + Explanation + =========== + + The reason why one would use ``Sqrt(x)`` over ``sqrt(x)`` + is that the latter is internally represented as ``Pow(x, S.Half)`` which + may not be what one wants when doing code-generation. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy.codegen.cfunctions import Sqrt + >>> Sqrt(x) + Sqrt(x) + >>> Sqrt(x).diff(x) + 1/(2*sqrt(x)) + + See Also + ======== + + Cbrt + """ + nargs = 1 + + def fdiff(self, argindex=1): + """ + Returns the first derivative of this function. + """ + if argindex == 1: + return Pow(self.args[0], Rational(-1, 2))/_Two + else: + raise ArgumentIndexError(self, argindex) + + def _eval_expand_func(self, **hints): + return _Sqrt(*self.args) + + def _eval_rewrite_as_Pow(self, arg, **kwargs): + return _Sqrt(arg) + + _eval_rewrite_as_tractable = _eval_rewrite_as_Pow + + +def _Cbrt(x): + return Pow(x, Rational(1, 3)) + + +class Cbrt(Function): # 'cbrt' already defined in sympy.functions.elementary.miscellaneous + """ + Represents the cube root function. + + Explanation + =========== + + The reason why one would use ``Cbrt(x)`` over ``cbrt(x)`` + is that the latter is internally represented as ``Pow(x, Rational(1, 3))`` which + may not be what one wants when doing code-generation. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy.codegen.cfunctions import Cbrt + >>> Cbrt(x) + Cbrt(x) + >>> Cbrt(x).diff(x) + 1/(3*x**(2/3)) + + See Also + ======== + + Sqrt + """ + nargs = 1 + + def fdiff(self, argindex=1): + """ + Returns the first derivative of this function. + """ + if argindex == 1: + return Pow(self.args[0], Rational(-_Two/3))/3 + else: + raise ArgumentIndexError(self, argindex) + + + def _eval_expand_func(self, **hints): + return _Cbrt(*self.args) + + def _eval_rewrite_as_Pow(self, arg, **kwargs): + return _Cbrt(arg) + + _eval_rewrite_as_tractable = _eval_rewrite_as_Pow + + +def _hypot(x, y): + return sqrt(Pow(x, 2) + Pow(y, 2)) + + +class hypot(Function): + """ + Represents the hypotenuse function. + + Explanation + =========== + + The hypotenuse function is provided by e.g. the math library + in the C99 standard, hence one may want to represent the function + symbolically when doing code-generation. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy.codegen.cfunctions import hypot + >>> hypot(3, 4).evalf() == 5.0 + True + >>> hypot(x, y) + hypot(x, y) + >>> hypot(x, y).diff(x) + x/hypot(x, y) + + """ + nargs = 2 + + def fdiff(self, argindex=1): + """ + Returns the first derivative of this function. + """ + if argindex in (1, 2): + return 2*self.args[argindex-1]/(_Two*self.func(*self.args)) + else: + raise ArgumentIndexError(self, argindex) + + + def _eval_expand_func(self, **hints): + return _hypot(*self.args) + + def _eval_rewrite_as_Pow(self, arg, **kwargs): + return _hypot(arg) + + _eval_rewrite_as_tractable = _eval_rewrite_as_Pow + + +class isnan(BooleanFunction): + nargs = 1 + + @classmethod + def eval(cls, arg): + if arg is S.NaN: + return true + elif arg.is_number: + return false + else: + return None + + +class isinf(BooleanFunction): + nargs = 1 + + @classmethod + def eval(cls, arg): + if arg.is_infinite: + return true + elif arg.is_finite: + return false + else: + return None diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/cnodes.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/cnodes.py new file mode 100644 index 0000000000000000000000000000000000000000..dd2a324ee49cabcd42e99ca5d8e5379cc9262c4e --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/cnodes.py @@ -0,0 +1,156 @@ +""" +AST nodes specific to the C family of languages +""" + +from sympy.codegen.ast import ( + Attribute, Declaration, Node, String, Token, Type, none, + FunctionCall, CodeBlock + ) +from sympy.core.basic import Basic +from sympy.core.containers import Tuple +from sympy.core.sympify import sympify + +void = Type('void') + +restrict = Attribute('restrict') # guarantees no pointer aliasing +volatile = Attribute('volatile') +static = Attribute('static') + + +def alignof(arg): + """ Generate of FunctionCall instance for calling 'alignof' """ + return FunctionCall('alignof', [String(arg) if isinstance(arg, str) else arg]) + + +def sizeof(arg): + """ Generate of FunctionCall instance for calling 'sizeof' + + Examples + ======== + + >>> from sympy.codegen.ast import real + >>> from sympy.codegen.cnodes import sizeof + >>> from sympy import ccode + >>> ccode(sizeof(real)) + 'sizeof(double)' + """ + return FunctionCall('sizeof', [String(arg) if isinstance(arg, str) else arg]) + + +class CommaOperator(Basic): + """ Represents the comma operator in C """ + def __new__(cls, *args): + return Basic.__new__(cls, *[sympify(arg) for arg in args]) + + +class Label(Node): + """ Label for use with e.g. goto statement. + + Examples + ======== + + >>> from sympy import ccode, Symbol + >>> from sympy.codegen.cnodes import Label, PreIncrement + >>> print(ccode(Label('foo'))) + foo: + >>> print(ccode(Label('bar', [PreIncrement(Symbol('a'))]))) + bar: + ++(a); + + """ + __slots__ = _fields = ('name', 'body') + defaults = {'body': none} + _construct_name = String + + @classmethod + def _construct_body(cls, itr): + if isinstance(itr, CodeBlock): + return itr + else: + return CodeBlock(*itr) + + +class goto(Token): + """ Represents goto in C """ + __slots__ = _fields = ('label',) + _construct_label = Label + + +class PreDecrement(Basic): + """ Represents the pre-decrement operator + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy.codegen.cnodes import PreDecrement + >>> from sympy import ccode + >>> ccode(PreDecrement(x)) + '--(x)' + + """ + nargs = 1 + + +class PostDecrement(Basic): + """ Represents the post-decrement operator + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy.codegen.cnodes import PostDecrement + >>> from sympy import ccode + >>> ccode(PostDecrement(x)) + '(x)--' + + """ + nargs = 1 + + +class PreIncrement(Basic): + """ Represents the pre-increment operator + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy.codegen.cnodes import PreIncrement + >>> from sympy import ccode + >>> ccode(PreIncrement(x)) + '++(x)' + + """ + nargs = 1 + + +class PostIncrement(Basic): + """ Represents the post-increment operator + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy.codegen.cnodes import PostIncrement + >>> from sympy import ccode + >>> ccode(PostIncrement(x)) + '(x)++' + + """ + nargs = 1 + + +class struct(Node): + """ Represents a struct in C """ + __slots__ = _fields = ('name', 'declarations') + defaults = {'name': none} + _construct_name = String + + @classmethod + def _construct_declarations(cls, args): + return Tuple(*[Declaration(arg) for arg in args]) + + +class union(struct): + """ Represents a union in C """ + __slots__ = () diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/cutils.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/cutils.py new file mode 100644 index 0000000000000000000000000000000000000000..2182ac1f3455da490a0bb57f8d6731fe8a29a232 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/cutils.py @@ -0,0 +1,8 @@ +from sympy.printing.c import C99CodePrinter + +def render_as_source_file(content, Printer=C99CodePrinter, settings=None): + """ Renders a C source file (with required #include statements) """ + printer = Printer(settings or {}) + code_str = printer.doprint(content) + includes = '\n'.join(['#include <%s>' % h for h in printer.headers]) + return includes + '\n\n' + code_str diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/cxxnodes.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/cxxnodes.py new file mode 100644 index 0000000000000000000000000000000000000000..7f7aafd01ab2de99ad0f668275889863fc73f5aa --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/cxxnodes.py @@ -0,0 +1,14 @@ +""" +AST nodes specific to C++. +""" + +from sympy.codegen.ast import Attribute, String, Token, Type, none + +class using(Token): + """ Represents a 'using' statement in C++ """ + __slots__ = _fields = ('type', 'alias') + defaults = {'alias': none} + _construct_type = Type + _construct_alias = String + +constexpr = Attribute('constexpr') diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/fnodes.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/fnodes.py new file mode 100644 index 0000000000000000000000000000000000000000..8b972fcfe4d4de4cfe74d75705f42c5e112a9b43 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/fnodes.py @@ -0,0 +1,658 @@ +""" +AST nodes specific to Fortran. + +The functions defined in this module allows the user to express functions such as ``dsign`` +as a SymPy function for symbolic manipulation. +""" + +from __future__ import annotations +from sympy.codegen.ast import ( + Attribute, CodeBlock, FunctionCall, Node, none, String, + Token, _mk_Tuple, Variable +) +from sympy.core.basic import Basic +from sympy.core.containers import Tuple +from sympy.core.expr import Expr +from sympy.core.function import Function +from sympy.core.numbers import Float, Integer +from sympy.core.symbol import Str +from sympy.core.sympify import sympify +from sympy.logic import true, false +from sympy.utilities.iterables import iterable + + + +pure = Attribute('pure') +elemental = Attribute('elemental') # (all elemental procedures are also pure) + +intent_in = Attribute('intent_in') +intent_out = Attribute('intent_out') +intent_inout = Attribute('intent_inout') + +allocatable = Attribute('allocatable') + +class Program(Token): + """ Represents a 'program' block in Fortran. + + Examples + ======== + + >>> from sympy.codegen.ast import Print + >>> from sympy.codegen.fnodes import Program + >>> prog = Program('myprogram', [Print([42])]) + >>> from sympy import fcode + >>> print(fcode(prog, source_format='free')) + program myprogram + print *, 42 + end program + + """ + __slots__ = _fields = ('name', 'body') + _construct_name = String + _construct_body = staticmethod(lambda body: CodeBlock(*body)) + + +class use_rename(Token): + """ Represents a renaming in a use statement in Fortran. + + Examples + ======== + + >>> from sympy.codegen.fnodes import use_rename, use + >>> from sympy import fcode + >>> ren = use_rename("thingy", "convolution2d") + >>> print(fcode(ren, source_format='free')) + thingy => convolution2d + >>> full = use('signallib', only=['snr', ren]) + >>> print(fcode(full, source_format='free')) + use signallib, only: snr, thingy => convolution2d + + """ + __slots__ = _fields = ('local', 'original') + _construct_local = String + _construct_original = String + +def _name(arg): + if hasattr(arg, 'name'): + return arg.name + else: + return String(arg) + +class use(Token): + """ Represents a use statement in Fortran. + + Examples + ======== + + >>> from sympy.codegen.fnodes import use + >>> from sympy import fcode + >>> fcode(use('signallib'), source_format='free') + 'use signallib' + >>> fcode(use('signallib', [('metric', 'snr')]), source_format='free') + 'use signallib, metric => snr' + >>> fcode(use('signallib', only=['snr', 'convolution2d']), source_format='free') + 'use signallib, only: snr, convolution2d' + + """ + __slots__ = _fields = ('namespace', 'rename', 'only') + defaults = {'rename': none, 'only': none} + _construct_namespace = staticmethod(_name) + _construct_rename = staticmethod(lambda args: Tuple(*[arg if isinstance(arg, use_rename) else use_rename(*arg) for arg in args])) + _construct_only = staticmethod(lambda args: Tuple(*[arg if isinstance(arg, use_rename) else _name(arg) for arg in args])) + + +class Module(Token): + """ Represents a module in Fortran. + + Examples + ======== + + >>> from sympy.codegen.fnodes import Module + >>> from sympy import fcode + >>> print(fcode(Module('signallib', ['implicit none'], []), source_format='free')) + module signallib + implicit none + + contains + + + end module + + """ + __slots__ = _fields = ('name', 'declarations', 'definitions') + defaults = {'declarations': Tuple()} + _construct_name = String + + @classmethod + def _construct_declarations(cls, args): + args = [Str(arg) if isinstance(arg, str) else arg for arg in args] + return CodeBlock(*args) + + _construct_definitions = staticmethod(lambda arg: CodeBlock(*arg)) + + +class Subroutine(Node): + """ Represents a subroutine in Fortran. + + Examples + ======== + + >>> from sympy import fcode, symbols + >>> from sympy.codegen.ast import Print + >>> from sympy.codegen.fnodes import Subroutine + >>> x, y = symbols('x y', real=True) + >>> sub = Subroutine('mysub', [x, y], [Print([x**2 + y**2, x*y])]) + >>> print(fcode(sub, source_format='free', standard=2003)) + subroutine mysub(x, y) + real*8 :: x + real*8 :: y + print *, x**2 + y**2, x*y + end subroutine + + """ + __slots__ = ('name', 'parameters', 'body') + _fields = __slots__ + Node._fields + _construct_name = String + _construct_parameters = staticmethod(lambda params: Tuple(*map(Variable.deduced, params))) + + @classmethod + def _construct_body(cls, itr): + if isinstance(itr, CodeBlock): + return itr + else: + return CodeBlock(*itr) + +class SubroutineCall(Token): + """ Represents a call to a subroutine in Fortran. + + Examples + ======== + + >>> from sympy.codegen.fnodes import SubroutineCall + >>> from sympy import fcode + >>> fcode(SubroutineCall('mysub', 'x y'.split())) + ' call mysub(x, y)' + + """ + __slots__ = _fields = ('name', 'subroutine_args') + _construct_name = staticmethod(_name) + _construct_subroutine_args = staticmethod(_mk_Tuple) + + +class Do(Token): + """ Represents a Do loop in in Fortran. + + Examples + ======== + + >>> from sympy import fcode, symbols + >>> from sympy.codegen.ast import aug_assign, Print + >>> from sympy.codegen.fnodes import Do + >>> i, n = symbols('i n', integer=True) + >>> r = symbols('r', real=True) + >>> body = [aug_assign(r, '+', 1/i), Print([i, r])] + >>> do1 = Do(body, i, 1, n) + >>> print(fcode(do1, source_format='free')) + do i = 1, n + r = r + 1d0/i + print *, i, r + end do + >>> do2 = Do(body, i, 1, n, 2) + >>> print(fcode(do2, source_format='free')) + do i = 1, n, 2 + r = r + 1d0/i + print *, i, r + end do + + """ + + __slots__ = _fields = ('body', 'counter', 'first', 'last', 'step', 'concurrent') + defaults = {'step': Integer(1), 'concurrent': false} + _construct_body = staticmethod(lambda body: CodeBlock(*body)) + _construct_counter = staticmethod(sympify) + _construct_first = staticmethod(sympify) + _construct_last = staticmethod(sympify) + _construct_step = staticmethod(sympify) + _construct_concurrent = staticmethod(lambda arg: true if arg else false) + + +class ArrayConstructor(Token): + """ Represents an array constructor. + + Examples + ======== + + >>> from sympy import fcode + >>> from sympy.codegen.fnodes import ArrayConstructor + >>> ac = ArrayConstructor([1, 2, 3]) + >>> fcode(ac, standard=95, source_format='free') + '(/1, 2, 3/)' + >>> fcode(ac, standard=2003, source_format='free') + '[1, 2, 3]' + + """ + __slots__ = _fields = ('elements',) + _construct_elements = staticmethod(_mk_Tuple) + + +class ImpliedDoLoop(Token): + """ Represents an implied do loop in Fortran. + + Examples + ======== + + >>> from sympy import Symbol, fcode + >>> from sympy.codegen.fnodes import ImpliedDoLoop, ArrayConstructor + >>> i = Symbol('i', integer=True) + >>> idl = ImpliedDoLoop(i**3, i, -3, 3, 2) # -27, -1, 1, 27 + >>> ac = ArrayConstructor([-28, idl, 28]) # -28, -27, -1, 1, 27, 28 + >>> fcode(ac, standard=2003, source_format='free') + '[-28, (i**3, i = -3, 3, 2), 28]' + + """ + __slots__ = _fields = ('expr', 'counter', 'first', 'last', 'step') + defaults = {'step': Integer(1)} + _construct_expr = staticmethod(sympify) + _construct_counter = staticmethod(sympify) + _construct_first = staticmethod(sympify) + _construct_last = staticmethod(sympify) + _construct_step = staticmethod(sympify) + + +class Extent(Basic): + """ Represents a dimension extent. + + Examples + ======== + + >>> from sympy.codegen.fnodes import Extent + >>> e = Extent(-3, 3) # -3, -2, -1, 0, 1, 2, 3 + >>> from sympy import fcode + >>> fcode(e, source_format='free') + '-3:3' + >>> from sympy.codegen.ast import Variable, real + >>> from sympy.codegen.fnodes import dimension, intent_out + >>> dim = dimension(e, e) + >>> arr = Variable('x', real, attrs=[dim, intent_out]) + >>> fcode(arr.as_Declaration(), source_format='free', standard=2003) + 'real*8, dimension(-3:3, -3:3), intent(out) :: x' + + """ + def __new__(cls, *args): + if len(args) == 2: + low, high = args + return Basic.__new__(cls, sympify(low), sympify(high)) + elif len(args) == 0 or (len(args) == 1 and args[0] in (':', None)): + return Basic.__new__(cls) # assumed shape + else: + raise ValueError("Expected 0 or 2 args (or one argument == None or ':')") + + def _sympystr(self, printer): + if len(self.args) == 0: + return ':' + return ":".join(str(arg) for arg in self.args) + +assumed_extent = Extent() # or Extent(':'), Extent(None) + + +def dimension(*args): + """ Creates a 'dimension' Attribute with (up to 7) extents. + + Examples + ======== + + >>> from sympy import fcode + >>> from sympy.codegen.fnodes import dimension, intent_in + >>> dim = dimension('2', ':') # 2 rows, runtime determined number of columns + >>> from sympy.codegen.ast import Variable, integer + >>> arr = Variable('a', integer, attrs=[dim, intent_in]) + >>> fcode(arr.as_Declaration(), source_format='free', standard=2003) + 'integer*4, dimension(2, :), intent(in) :: a' + + """ + if len(args) > 7: + raise ValueError("Fortran only supports up to 7 dimensional arrays") + parameters = [] + for arg in args: + if isinstance(arg, Extent): + parameters.append(arg) + elif isinstance(arg, str): + if arg == ':': + parameters.append(Extent()) + else: + parameters.append(String(arg)) + elif iterable(arg): + parameters.append(Extent(*arg)) + else: + parameters.append(sympify(arg)) + if len(args) == 0: + raise ValueError("Need at least one dimension") + return Attribute('dimension', parameters) + + +assumed_size = dimension('*') + +def array(symbol, dim, intent=None, *, attrs=(), value=None, type=None): + """ Convenience function for creating a Variable instance for a Fortran array. + + Parameters + ========== + + symbol : symbol + dim : Attribute or iterable + If dim is an ``Attribute`` it need to have the name 'dimension'. If it is + not an ``Attribute``, then it is passed to :func:`dimension` as ``*dim`` + intent : str + One of: 'in', 'out', 'inout' or None + \\*\\*kwargs: + Keyword arguments for ``Variable`` ('type' & 'value') + + Examples + ======== + + >>> from sympy import fcode + >>> from sympy.codegen.ast import integer, real + >>> from sympy.codegen.fnodes import array + >>> arr = array('a', '*', 'in', type=integer) + >>> print(fcode(arr.as_Declaration(), source_format='free', standard=2003)) + integer*4, dimension(*), intent(in) :: a + >>> x = array('x', [3, ':', ':'], intent='out', type=real) + >>> print(fcode(x.as_Declaration(value=1), source_format='free', standard=2003)) + real*8, dimension(3, :, :), intent(out) :: x = 1 + + """ + if isinstance(dim, Attribute): + if str(dim.name) != 'dimension': + raise ValueError("Got an unexpected Attribute argument as dim: %s" % str(dim)) + else: + dim = dimension(*dim) + + attrs = list(attrs) + [dim] + if intent is not None: + if intent not in (intent_in, intent_out, intent_inout): + intent = {'in': intent_in, 'out': intent_out, 'inout': intent_inout}[intent] + attrs.append(intent) + if type is None: + return Variable.deduced(symbol, value=value, attrs=attrs) + else: + return Variable(symbol, type, value=value, attrs=attrs) + +def _printable(arg): + return String(arg) if isinstance(arg, str) else sympify(arg) + + +def allocated(array): + """ Creates an AST node for a function call to Fortran's "allocated(...)" + + Examples + ======== + + >>> from sympy import fcode + >>> from sympy.codegen.fnodes import allocated + >>> alloc = allocated('x') + >>> fcode(alloc, source_format='free') + 'allocated(x)' + + """ + return FunctionCall('allocated', [_printable(array)]) + + +def lbound(array, dim=None, kind=None): + """ Creates an AST node for a function call to Fortran's "lbound(...)" + + Parameters + ========== + + array : Symbol or String + dim : expr + kind : expr + + Examples + ======== + + >>> from sympy import fcode + >>> from sympy.codegen.fnodes import lbound + >>> lb = lbound('arr', dim=2) + >>> fcode(lb, source_format='free') + 'lbound(arr, 2)' + + """ + return FunctionCall( + 'lbound', + [_printable(array)] + + ([_printable(dim)] if dim else []) + + ([_printable(kind)] if kind else []) + ) + + +def ubound(array, dim=None, kind=None): + return FunctionCall( + 'ubound', + [_printable(array)] + + ([_printable(dim)] if dim else []) + + ([_printable(kind)] if kind else []) + ) + + +def shape(source, kind=None): + """ Creates an AST node for a function call to Fortran's "shape(...)" + + Parameters + ========== + + source : Symbol or String + kind : expr + + Examples + ======== + + >>> from sympy import fcode + >>> from sympy.codegen.fnodes import shape + >>> shp = shape('x') + >>> fcode(shp, source_format='free') + 'shape(x)' + + """ + return FunctionCall( + 'shape', + [_printable(source)] + + ([_printable(kind)] if kind else []) + ) + + +def size(array, dim=None, kind=None): + """ Creates an AST node for a function call to Fortran's "size(...)" + + Examples + ======== + + >>> from sympy import fcode, Symbol + >>> from sympy.codegen.ast import FunctionDefinition, real, Return + >>> from sympy.codegen.fnodes import array, sum_, size + >>> a = Symbol('a', real=True) + >>> body = [Return((sum_(a**2)/size(a))**.5)] + >>> arr = array(a, dim=[':'], intent='in') + >>> fd = FunctionDefinition(real, 'rms', [arr], body) + >>> print(fcode(fd, source_format='free', standard=2003)) + real*8 function rms(a) + real*8, dimension(:), intent(in) :: a + rms = sqrt(sum(a**2)*1d0/size(a)) + end function + + """ + return FunctionCall( + 'size', + [_printable(array)] + + ([_printable(dim)] if dim else []) + + ([_printable(kind)] if kind else []) + ) + + +def reshape(source, shape, pad=None, order=None): + """ Creates an AST node for a function call to Fortran's "reshape(...)" + + Parameters + ========== + + source : Symbol or String + shape : ArrayExpr + + """ + return FunctionCall( + 'reshape', + [_printable(source), _printable(shape)] + + ([_printable(pad)] if pad else []) + + ([_printable(order)] if pad else []) + ) + + +def bind_C(name=None): + """ Creates an Attribute ``bind_C`` with a name. + + Parameters + ========== + + name : str + + Examples + ======== + + >>> from sympy import fcode, Symbol + >>> from sympy.codegen.ast import FunctionDefinition, real, Return + >>> from sympy.codegen.fnodes import array, sum_, bind_C + >>> a = Symbol('a', real=True) + >>> s = Symbol('s', integer=True) + >>> arr = array(a, dim=[s], intent='in') + >>> body = [Return((sum_(a**2)/s)**.5)] + >>> fd = FunctionDefinition(real, 'rms', [arr, s], body, attrs=[bind_C('rms')]) + >>> print(fcode(fd, source_format='free', standard=2003)) + real*8 function rms(a, s) bind(C, name="rms") + real*8, dimension(s), intent(in) :: a + integer*4 :: s + rms = sqrt(sum(a**2)/s) + end function + + """ + return Attribute('bind_C', [String(name)] if name else []) + +class GoTo(Token): + """ Represents a goto statement in Fortran + + Examples + ======== + + >>> from sympy.codegen.fnodes import GoTo + >>> go = GoTo([10, 20, 30], 'i') + >>> from sympy import fcode + >>> fcode(go, source_format='free') + 'go to (10, 20, 30), i' + + """ + __slots__ = _fields = ('labels', 'expr') + defaults = {'expr': none} + _construct_labels = staticmethod(_mk_Tuple) + _construct_expr = staticmethod(sympify) + + +class FortranReturn(Token): + """ AST node explicitly mapped to a fortran "return". + + Explanation + =========== + + Because a return statement in fortran is different from C, and + in order to aid reuse of our codegen ASTs the ordinary + ``.codegen.ast.Return`` is interpreted as assignment to + the result variable of the function. If one for some reason needs + to generate a fortran RETURN statement, this node should be used. + + Examples + ======== + + >>> from sympy.codegen.fnodes import FortranReturn + >>> from sympy import fcode + >>> fcode(FortranReturn('x')) + ' return x' + + """ + __slots__ = _fields = ('return_value',) + defaults = {'return_value': none} + _construct_return_value = staticmethod(sympify) + + +class FFunction(Function): + _required_standard = 77 + + def _fcode(self, printer): + name = self.__class__.__name__ + if printer._settings['standard'] < self._required_standard: + raise NotImplementedError("%s requires Fortran %d or newer" % + (name, self._required_standard)) + return '{}({})'.format(name, ', '.join(map(printer._print, self.args))) + + +class F95Function(FFunction): + _required_standard = 95 + + +class isign(FFunction): + """ Fortran sign intrinsic for integer arguments. """ + nargs = 2 + + +class dsign(FFunction): + """ Fortran sign intrinsic for double precision arguments. """ + nargs = 2 + + +class cmplx(FFunction): + """ Fortran complex conversion function. """ + nargs = 2 # may be extended to (2, 3) at a later point + + +class kind(FFunction): + """ Fortran kind function. """ + nargs = 1 + + +class merge(F95Function): + """ Fortran merge function """ + nargs = 3 + + +class _literal(Float): + _token: str + _decimals: int + + def _fcode(self, printer, *args, **kwargs): + mantissa, sgnd_ex = ('%.{}e'.format(self._decimals) % self).split('e') + mantissa = mantissa.strip('0').rstrip('.') + ex_sgn, ex_num = sgnd_ex[0], sgnd_ex[1:].lstrip('0') + ex_sgn = '' if ex_sgn == '+' else ex_sgn + return (mantissa or '0') + self._token + ex_sgn + (ex_num or '0') + + +class literal_sp(_literal): + """ Fortran single precision real literal """ + _token = 'e' + _decimals = 9 + + +class literal_dp(_literal): + """ Fortran double precision real literal """ + _token = 'd' + _decimals = 17 + + +class sum_(Token, Expr): + __slots__ = _fields = ('array', 'dim', 'mask') + defaults = {'dim': none, 'mask': none} + _construct_array = staticmethod(sympify) + _construct_dim = staticmethod(sympify) + + +class product_(Token, Expr): + __slots__ = _fields = ('array', 'dim', 'mask') + defaults = {'dim': none, 'mask': none} + _construct_array = staticmethod(sympify) + _construct_dim = staticmethod(sympify) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/futils.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/futils.py new file mode 100644 index 0000000000000000000000000000000000000000..4a1f5751fbd4d6b44d99c69a74ad89a8496f8648 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/futils.py @@ -0,0 +1,40 @@ +from itertools import chain +from sympy.codegen.fnodes import Module +from sympy.core.symbol import Dummy +from sympy.printing.fortran import FCodePrinter + +""" This module collects utilities for rendering Fortran code. """ + + +def render_as_module(definitions, name, declarations=(), printer_settings=None): + """ Creates a ``Module`` instance and renders it as a string. + + This generates Fortran source code for a module with the correct ``use`` statements. + + Parameters + ========== + + definitions : iterable + Passed to :class:`sympy.codegen.fnodes.Module`. + name : str + Passed to :class:`sympy.codegen.fnodes.Module`. + declarations : iterable + Passed to :class:`sympy.codegen.fnodes.Module`. It will be extended with + use statements, 'implicit none' and public list generated from ``definitions``. + printer_settings : dict + Passed to ``FCodePrinter`` (default: ``{'standard': 2003, 'source_format': 'free'}``). + + """ + printer_settings = printer_settings or {'standard': 2003, 'source_format': 'free'} + printer = FCodePrinter(printer_settings) + dummy = Dummy() + if isinstance(definitions, Module): + raise ValueError("This function expects to construct a module on its own.") + mod = Module(name, chain(declarations, [dummy]), definitions) + fstr = printer.doprint(mod) + module_use_str = ' %s\n' % ' \n'.join(['use %s, only: %s' % (k, ', '.join(v)) for + k, v in printer.module_uses.items()]) + module_use_str += ' implicit none\n' + module_use_str += ' private\n' + module_use_str += ' public %s\n' % ', '.join([str(node.name) for node in definitions if getattr(node, 'name', None)]) + return fstr.replace(printer.doprint(dummy), module_use_str) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/matrix_nodes.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/matrix_nodes.py new file mode 100644 index 0000000000000000000000000000000000000000..cf0a13a81c963e2c9e2b885dabd0ff3e2d2b3eb9 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/matrix_nodes.py @@ -0,0 +1,71 @@ +""" +Additional AST nodes for operations on matrices. The nodes in this module +are meant to represent optimization of matrix expressions within codegen's +target languages that cannot be represented by SymPy expressions. + +As an example, we can use :meth:`sympy.codegen.rewriting.optimize` and the +``matin_opt`` optimization provided in :mod:`sympy.codegen.rewriting` to +transform matrix multiplication under certain assumptions: + + >>> from sympy import symbols, MatrixSymbol + >>> n = symbols('n', integer=True) + >>> A = MatrixSymbol('A', n, n) + >>> x = MatrixSymbol('x', n, 1) + >>> expr = A**(-1) * x + >>> from sympy import assuming, Q + >>> from sympy.codegen.rewriting import matinv_opt, optimize + >>> with assuming(Q.fullrank(A)): + ... optimize(expr, [matinv_opt]) + MatrixSolve(A, vector=x) +""" + +from .ast import Token +from sympy.matrices import MatrixExpr +from sympy.core.sympify import sympify + + +class MatrixSolve(Token, MatrixExpr): + """Represents an operation to solve a linear matrix equation. + + Parameters + ========== + + matrix : MatrixSymbol + + Matrix representing the coefficients of variables in the linear + equation. This matrix must be square and full-rank (i.e. all columns must + be linearly independent) for the solving operation to be valid. + + vector : MatrixSymbol + + One-column matrix representing the solutions to the equations + represented in ``matrix``. + + Examples + ======== + + >>> from sympy import symbols, MatrixSymbol + >>> from sympy.codegen.matrix_nodes import MatrixSolve + >>> n = symbols('n', integer=True) + >>> A = MatrixSymbol('A', n, n) + >>> x = MatrixSymbol('x', n, 1) + >>> from sympy.printing.numpy import NumPyPrinter + >>> NumPyPrinter().doprint(MatrixSolve(A, x)) + 'numpy.linalg.solve(A, x)' + >>> from sympy import octave_code + >>> octave_code(MatrixSolve(A, x)) + 'A \\\\ x' + + """ + __slots__ = _fields = ('matrix', 'vector') + + _construct_matrix = staticmethod(sympify) + _construct_vector = staticmethod(sympify) + + @property + def shape(self): + return self.vector.shape + + def _eval_derivative(self, x): + A, b = self.matrix, self.vector + return MatrixSolve(A, b.diff(x) - A.diff(x) * MatrixSolve(A, b)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/numpy_nodes.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/numpy_nodes.py new file mode 100644 index 0000000000000000000000000000000000000000..c47c87f0e1df74cd314bb70674ebff732fe500aa --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/numpy_nodes.py @@ -0,0 +1,177 @@ +from sympy.core.function import Add, ArgumentIndexError, Function +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.sorting import default_sort_key +from sympy.core.sympify import sympify +from sympy.functions.elementary.exponential import exp, log +from sympy.functions.elementary.miscellaneous import Max, Min +from .ast import Token, none + + +def _logaddexp(x1, x2, *, evaluate=True): + return log(Add(exp(x1, evaluate=evaluate), exp(x2, evaluate=evaluate), evaluate=evaluate)) + + +_two = S.One*2 +_ln2 = log(_two) + + +def _lb(x, *, evaluate=True): + return log(x, evaluate=evaluate)/_ln2 + + +def _exp2(x, *, evaluate=True): + return Pow(_two, x, evaluate=evaluate) + + +def _logaddexp2(x1, x2, *, evaluate=True): + return _lb(Add(_exp2(x1, evaluate=evaluate), + _exp2(x2, evaluate=evaluate), evaluate=evaluate)) + + +class logaddexp(Function): + """ Logarithm of the sum of exponentiations of the inputs. + + Helper class for use with e.g. numpy.logaddexp + + See Also + ======== + + https://numpy.org/doc/stable/reference/generated/numpy.logaddexp.html + """ + nargs = 2 + + def __new__(cls, *args): + return Function.__new__(cls, *sorted(args, key=default_sort_key)) + + def fdiff(self, argindex=1): + """ + Returns the first derivative of this function. + """ + if argindex == 1: + wrt, other = self.args + elif argindex == 2: + other, wrt = self.args + else: + raise ArgumentIndexError(self, argindex) + return S.One/(S.One + exp(other-wrt)) + + def _eval_rewrite_as_log(self, x1, x2, **kwargs): + return _logaddexp(x1, x2) + + def _eval_evalf(self, *args, **kwargs): + return self.rewrite(log).evalf(*args, **kwargs) + + def _eval_simplify(self, *args, **kwargs): + a, b = (x.simplify(**kwargs) for x in self.args) + candidate = _logaddexp(a, b) + if candidate != _logaddexp(a, b, evaluate=False): + return candidate + else: + return logaddexp(a, b) + + +class logaddexp2(Function): + """ Logarithm of the sum of exponentiations of the inputs in base-2. + + Helper class for use with e.g. numpy.logaddexp2 + + See Also + ======== + + https://numpy.org/doc/stable/reference/generated/numpy.logaddexp2.html + """ + nargs = 2 + + def __new__(cls, *args): + return Function.__new__(cls, *sorted(args, key=default_sort_key)) + + def fdiff(self, argindex=1): + """ + Returns the first derivative of this function. + """ + if argindex == 1: + wrt, other = self.args + elif argindex == 2: + other, wrt = self.args + else: + raise ArgumentIndexError(self, argindex) + return S.One/(S.One + _exp2(other-wrt)) + + def _eval_rewrite_as_log(self, x1, x2, **kwargs): + return _logaddexp2(x1, x2) + + def _eval_evalf(self, *args, **kwargs): + return self.rewrite(log).evalf(*args, **kwargs) + + def _eval_simplify(self, *args, **kwargs): + a, b = (x.simplify(**kwargs).factor() for x in self.args) + candidate = _logaddexp2(a, b) + if candidate != _logaddexp2(a, b, evaluate=False): + return candidate + else: + return logaddexp2(a, b) + + +class amin(Token): + """ Minimum value along an axis. + + Helper class for use with e.g. numpy.amin + + + See Also + ======== + + https://numpy.org/doc/stable/reference/generated/numpy.amin.html + """ + __slots__ = _fields = ('array', 'axis') + defaults = {'axis': none} + _construct_axis = staticmethod(sympify) + + +class amax(Token): + """ Maximum value along an axis. + + Helper class for use with e.g. numpy.amax + + + See Also + ======== + + https://numpy.org/doc/stable/reference/generated/numpy.amax.html + """ + __slots__ = _fields = ('array', 'axis') + defaults = {'axis': none} + _construct_axis = staticmethod(sympify) + + +class maximum(Function): + """ Element-wise maximum of array elements. + + Helper class for use with e.g. numpy.maximum + + + See Also + ======== + + https://numpy.org/doc/stable/reference/generated/numpy.maximum.html + """ + + def _eval_rewrite_as_Max(self, *args): + return Max(*self.args) + + +class minimum(Function): + """ Element-wise minimum of array elements. + + Helper class for use with e.g. numpy.minimum + + + See Also + ======== + + https://numpy.org/doc/stable/reference/generated/numpy.minimum.html + """ + + def _eval_rewrite_as_Min(self, *args): + return Min(*self.args) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/pynodes.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/pynodes.py new file mode 100644 index 0000000000000000000000000000000000000000..f0a08b4a79d32f63d345947d6be310b44504dbf5 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/pynodes.py @@ -0,0 +1,11 @@ +from .abstract_nodes import List as AbstractList +from .ast import Token + + +class List(AbstractList): + pass + + +class NumExprEvaluate(Token): + """represents a call to :class:`numexpr`s :func:`evaluate`""" + __slots__ = _fields = ('expr',) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/pyutils.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/pyutils.py new file mode 100644 index 0000000000000000000000000000000000000000..e14eabe92ce50105a4055b71a49767aae04610b9 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/pyutils.py @@ -0,0 +1,24 @@ +from sympy.printing.pycode import PythonCodePrinter + +""" This module collects utilities for rendering Python code. """ + + +def render_as_module(content, standard='python3'): + """Renders Python code as a module (with the required imports). + + Parameters + ========== + + standard : + See the parameter ``standard`` in + :meth:`sympy.printing.pycode.pycode` + """ + + printer = PythonCodePrinter({'standard':standard}) + pystr = printer.doprint(content) + if printer._settings['fully_qualified_modules']: + module_imports_str = '\n'.join('import %s' % k for k in printer.module_imports) + else: + module_imports_str = '\n'.join(['from %s import %s' % (k, ', '.join(v)) for + k, v in printer.module_imports.items()]) + return module_imports_str + '\n\n' + pystr diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/rewriting.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/rewriting.py new file mode 100644 index 0000000000000000000000000000000000000000..274b7770b46ded6711468ab2a01db3a53d6fde87 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/rewriting.py @@ -0,0 +1,357 @@ +""" +Classes and functions useful for rewriting expressions for optimized code +generation. Some languages (or standards thereof), e.g. C99, offer specialized +math functions for better performance and/or precision. + +Using the ``optimize`` function in this module, together with a collection of +rules (represented as instances of ``Optimization``), one can rewrite the +expressions for this purpose:: + + >>> from sympy import Symbol, exp, log + >>> from sympy.codegen.rewriting import optimize, optims_c99 + >>> x = Symbol('x') + >>> optimize(3*exp(2*x) - 3, optims_c99) + 3*expm1(2*x) + >>> optimize(exp(2*x) - 1 - exp(-33), optims_c99) + expm1(2*x) - exp(-33) + >>> optimize(log(3*x + 3), optims_c99) + log1p(x) + log(3) + >>> optimize(log(2*x + 3), optims_c99) + log(2*x + 3) + +The ``optims_c99`` imported above is tuple containing the following instances +(which may be imported from ``sympy.codegen.rewriting``): + +- ``expm1_opt`` +- ``log1p_opt`` +- ``exp2_opt`` +- ``log2_opt`` +- ``log2const_opt`` + + +""" +from sympy.core.function import expand_log +from sympy.core.singleton import S +from sympy.core.symbol import Wild +from sympy.functions.elementary.complexes import sign +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import (Max, Min) +from sympy.functions.elementary.trigonometric import (cos, sin, sinc) +from sympy.assumptions import Q, ask +from sympy.codegen.cfunctions import log1p, log2, exp2, expm1 +from sympy.codegen.matrix_nodes import MatrixSolve +from sympy.core.expr import UnevaluatedExpr +from sympy.core.power import Pow +from sympy.codegen.numpy_nodes import logaddexp, logaddexp2 +from sympy.codegen.scipy_nodes import cosm1, powm1 +from sympy.core.mul import Mul +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.utilities.iterables import sift + + +class Optimization: + """ Abstract base class for rewriting optimization. + + Subclasses should implement ``__call__`` taking an expression + as argument. + + Parameters + ========== + cost_function : callable returning number + priority : number + + """ + def __init__(self, cost_function=None, priority=1): + self.cost_function = cost_function + self.priority=priority + + def cheapest(self, *args): + return min(args, key=self.cost_function) + + +class ReplaceOptim(Optimization): + """ Rewriting optimization calling replace on expressions. + + Explanation + =========== + + The instance can be used as a function on expressions for which + it will apply the ``replace`` method (see + :meth:`sympy.core.basic.Basic.replace`). + + Parameters + ========== + + query : + First argument passed to replace. + value : + Second argument passed to replace. + + Examples + ======== + + >>> from sympy import Symbol + >>> from sympy.codegen.rewriting import ReplaceOptim + >>> from sympy.codegen.cfunctions import exp2 + >>> x = Symbol('x') + >>> exp2_opt = ReplaceOptim(lambda p: p.is_Pow and p.base == 2, + ... lambda p: exp2(p.exp)) + >>> exp2_opt(2**x) + exp2(x) + + """ + + def __init__(self, query, value, **kwargs): + super().__init__(**kwargs) + self.query = query + self.value = value + + def __call__(self, expr): + return expr.replace(self.query, self.value) + + +def optimize(expr, optimizations): + """ Apply optimizations to an expression. + + Parameters + ========== + + expr : expression + optimizations : iterable of ``Optimization`` instances + The optimizations will be sorted with respect to ``priority`` (highest first). + + Examples + ======== + + >>> from sympy import log, Symbol + >>> from sympy.codegen.rewriting import optims_c99, optimize + >>> x = Symbol('x') + >>> optimize(log(x+3)/log(2) + log(x**2 + 1), optims_c99) + log1p(x**2) + log2(x + 3) + + """ + + for optim in sorted(optimizations, key=lambda opt: opt.priority, reverse=True): + new_expr = optim(expr) + if optim.cost_function is None: + expr = new_expr + else: + expr = optim.cheapest(expr, new_expr) + return expr + + +exp2_opt = ReplaceOptim( + lambda p: p.is_Pow and p.base == 2, + lambda p: exp2(p.exp) +) + + +_d = Wild('d', properties=[lambda x: x.is_Dummy]) +_u = Wild('u', properties=[lambda x: not x.is_number and not x.is_Add]) +_v = Wild('v') +_w = Wild('w') +_n = Wild('n', properties=[lambda x: x.is_number]) + +sinc_opt1 = ReplaceOptim( + sin(_w)/_w, sinc(_w) +) +sinc_opt2 = ReplaceOptim( + sin(_n*_w)/_w, _n*sinc(_n*_w) +) +sinc_opts = (sinc_opt1, sinc_opt2) + +log2_opt = ReplaceOptim(_v*log(_w)/log(2), _v*log2(_w), cost_function=lambda expr: expr.count( + lambda e: ( # division & eval of transcendentals are expensive floating point operations... + e.is_Pow and e.exp.is_negative # division + or (isinstance(e, (log, log2)) and not e.args[0].is_number)) # transcendental + ) +) + +log2const_opt = ReplaceOptim(log(2)*log2(_w), log(_w)) + +logsumexp_2terms_opt = ReplaceOptim( + lambda l: (isinstance(l, log) + and l.args[0].is_Add + and len(l.args[0].args) == 2 + and all(isinstance(t, exp) for t in l.args[0].args)), + lambda l: ( + Max(*[e.args[0] for e in l.args[0].args]) + + log1p(exp(Min(*[e.args[0] for e in l.args[0].args]))) + ) +) + + +class FuncMinusOneOptim(ReplaceOptim): + """Specialization of ReplaceOptim for functions evaluating "f(x) - 1". + + Explanation + =========== + + Numerical functions which go toward one as x go toward zero is often best + implemented by a dedicated function in order to avoid catastrophic + cancellation. One such example is ``expm1(x)`` in the C standard library + which evaluates ``exp(x) - 1``. Such functions preserves many more + significant digits when its argument is much smaller than one, compared + to subtracting one afterwards. + + Parameters + ========== + + func : + The function which is subtracted by one. + func_m_1 : + The specialized function evaluating ``func(x) - 1``. + opportunistic : bool + When ``True``, apply the transformation as long as the magnitude of the + remaining number terms decreases. When ``False``, only apply the + transformation if it completely eliminates the number term. + + Examples + ======== + + >>> from sympy import symbols, exp + >>> from sympy.codegen.rewriting import FuncMinusOneOptim + >>> from sympy.codegen.cfunctions import expm1 + >>> x, y = symbols('x y') + >>> expm1_opt = FuncMinusOneOptim(exp, expm1) + >>> expm1_opt(exp(x) + 2*exp(5*y) - 3) + expm1(x) + 2*expm1(5*y) + + + """ + + def __init__(self, func, func_m_1, opportunistic=True): + weight = 10 # <-- this is an arbitrary number (heuristic) + super().__init__(lambda e: e.is_Add, self.replace_in_Add, + cost_function=lambda expr: expr.count_ops() - weight*expr.count(func_m_1)) + self.func = func + self.func_m_1 = func_m_1 + self.opportunistic = opportunistic + + def _group_Add_terms(self, add): + numbers, non_num = sift(add.args, lambda arg: arg.is_number, binary=True) + numsum = sum(numbers) + terms_with_func, other = sift(non_num, lambda arg: arg.has(self.func), binary=True) + return numsum, terms_with_func, other + + def replace_in_Add(self, e): + """ passed as second argument to Basic.replace(...) """ + numsum, terms_with_func, other_non_num_terms = self._group_Add_terms(e) + if numsum == 0: + return e + substituted, untouched = [], [] + for with_func in terms_with_func: + if with_func.is_Mul: + func, coeff = sift(with_func.args, lambda arg: arg.func == self.func, binary=True) + if len(func) == 1 and len(coeff) == 1: + func, coeff = func[0], coeff[0] + else: + coeff = None + elif with_func.func == self.func: + func, coeff = with_func, S.One + else: + coeff = None + + if coeff is not None and coeff.is_number and sign(coeff) == -sign(numsum): + if self.opportunistic: + do_substitute = abs(coeff+numsum) < abs(numsum) + else: + do_substitute = coeff+numsum == 0 + + if do_substitute: # advantageous substitution + numsum += coeff + substituted.append(coeff*self.func_m_1(*func.args)) + continue + untouched.append(with_func) + + return e.func(numsum, *substituted, *untouched, *other_non_num_terms) + + def __call__(self, expr): + alt1 = super().__call__(expr) + alt2 = super().__call__(expr.factor()) + return self.cheapest(alt1, alt2) + + +expm1_opt = FuncMinusOneOptim(exp, expm1) +cosm1_opt = FuncMinusOneOptim(cos, cosm1) +powm1_opt = FuncMinusOneOptim(Pow, powm1) + +log1p_opt = ReplaceOptim( + lambda e: isinstance(e, log), + lambda l: expand_log(l.replace( + log, lambda arg: log(arg.factor()) + )).replace(log(_u+1), log1p(_u)) +) + +def create_expand_pow_optimization(limit, *, base_req=lambda b: b.is_symbol): + """ Creates an instance of :class:`ReplaceOptim` for expanding ``Pow``. + + Explanation + =========== + + The requirements for expansions are that the base needs to be a symbol + and the exponent needs to be an Integer (and be less than or equal to + ``limit``). + + Parameters + ========== + + limit : int + The highest power which is expanded into multiplication. + base_req : function returning bool + Requirement on base for expansion to happen, default is to return + the ``is_symbol`` attribute of the base. + + Examples + ======== + + >>> from sympy import Symbol, sin + >>> from sympy.codegen.rewriting import create_expand_pow_optimization + >>> x = Symbol('x') + >>> expand_opt = create_expand_pow_optimization(3) + >>> expand_opt(x**5 + x**3) + x**5 + x*x*x + >>> expand_opt(x**5 + x**3 + sin(x)**3) + x**5 + sin(x)**3 + x*x*x + >>> opt2 = create_expand_pow_optimization(3, base_req=lambda b: not b.is_Function) + >>> opt2((x+1)**2 + sin(x)**2) + sin(x)**2 + (x + 1)*(x + 1) + + """ + return ReplaceOptim( + lambda e: e.is_Pow and base_req(e.base) and e.exp.is_Integer and abs(e.exp) <= limit, + lambda p: ( + UnevaluatedExpr(Mul(*([p.base]*+p.exp), evaluate=False)) if p.exp > 0 else + 1/UnevaluatedExpr(Mul(*([p.base]*-p.exp), evaluate=False)) + )) + +# Optimization procedures for turning A**(-1) * x into MatrixSolve(A, x) +def _matinv_predicate(expr): + # TODO: We should be able to support more than 2 elements + if expr.is_MatMul and len(expr.args) == 2: + left, right = expr.args + if left.is_Inverse and right.shape[1] == 1: + inv_arg = left.arg + if isinstance(inv_arg, MatrixSymbol): + return bool(ask(Q.fullrank(left.arg))) + + return False + +def _matinv_transform(expr): + left, right = expr.args + inv_arg = left.arg + return MatrixSolve(inv_arg, right) + + +matinv_opt = ReplaceOptim(_matinv_predicate, _matinv_transform) + + +logaddexp_opt = ReplaceOptim(log(exp(_v)+exp(_w)), logaddexp(_v, _w)) +logaddexp2_opt = ReplaceOptim(log(Pow(2, _v)+Pow(2, _w)), logaddexp2(_v, _w)*log(2)) + +# Collections of optimizations: +optims_c99 = (expm1_opt, log1p_opt, exp2_opt, log2_opt, log2const_opt) + +optims_numpy = optims_c99 + (logaddexp_opt, logaddexp2_opt,) + sinc_opts + +optims_scipy = (cosm1_opt, powm1_opt) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/scipy_nodes.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/scipy_nodes.py new file mode 100644 index 0000000000000000000000000000000000000000..059a853fc8cac6e0b9a1a3c7395dd3a15384dcba --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/scipy_nodes.py @@ -0,0 +1,79 @@ +from sympy.core.function import Add, ArgumentIndexError, Function +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.functions.elementary.exponential import log +from sympy.functions.elementary.trigonometric import cos, sin + + +def _cosm1(x, *, evaluate=True): + return Add(cos(x, evaluate=evaluate), -S.One, evaluate=evaluate) + + +class cosm1(Function): + """ Minus one plus cosine of x, i.e. cos(x) - 1. For use when x is close to zero. + + Helper class for use with e.g. scipy.special.cosm1 + See: https://docs.scipy.org/doc/scipy/reference/generated/scipy.special.cosm1.html + """ + nargs = 1 + + def fdiff(self, argindex=1): + """ + Returns the first derivative of this function. + """ + if argindex == 1: + return -sin(*self.args) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_cos(self, x, **kwargs): + return _cosm1(x) + + def _eval_evalf(self, *args, **kwargs): + return self.rewrite(cos).evalf(*args, **kwargs) + + def _eval_simplify(self, **kwargs): + x, = self.args + candidate = _cosm1(x.simplify(**kwargs)) + if candidate != _cosm1(x, evaluate=False): + return candidate + else: + return cosm1(x) + + +def _powm1(x, y, *, evaluate=True): + return Add(Pow(x, y, evaluate=evaluate), -S.One, evaluate=evaluate) + + +class powm1(Function): + """ Minus one plus x to the power of y, i.e. x**y - 1. For use when x is close to one or y is close to zero. + + Helper class for use with e.g. scipy.special.powm1 + See: https://docs.scipy.org/doc/scipy/reference/generated/scipy.special.powm1.html + """ + nargs = 2 + + def fdiff(self, argindex=1): + """ + Returns the first derivative of this function. + """ + if argindex == 1: + return Pow(self.args[0], self.args[1])*self.args[1]/self.args[0] + elif argindex == 2: + return log(self.args[0])*Pow(*self.args) + else: + raise ArgumentIndexError(self, argindex) + + def _eval_rewrite_as_Pow(self, x, y, **kwargs): + return _powm1(x, y) + + def _eval_evalf(self, *args, **kwargs): + return self.rewrite(Pow).evalf(*args, **kwargs) + + def _eval_simplify(self, **kwargs): + x, y = self.args + candidate = _powm1(x.simplify(**kwargs), y.simplify(**kwargs)) + if candidate != _powm1(x, y, evaluate=False): + return candidate + else: + return powm1(x, y) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_abstract_nodes.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_abstract_nodes.py new file mode 100644 index 0000000000000000000000000000000000000000..89e1f73ff8cb24a4a865aa51304ec66e9901e3cb --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_abstract_nodes.py @@ -0,0 +1,14 @@ +from sympy.core.symbol import symbols +from sympy.codegen.abstract_nodes import List + + +def test_List(): + l = List(2, 3, 4) + assert l == List(2, 3, 4) + assert str(l) == "[2, 3, 4]" + x, y, z = symbols('x y z') + l = List(x**2,y**3,z**4) + # contrary to python's built-in list, we can call e.g. "replace" on List. + m = l.replace(lambda arg: arg.is_Pow and arg.exp>2, lambda p: p.base-p.exp) + assert m == [x**2, y-3, z-4] + hash(m) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_algorithms.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_algorithms.py new file mode 100644 index 0000000000000000000000000000000000000000..c684229ec18a1e02a97eee6db8537b8d12af0582 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_algorithms.py @@ -0,0 +1,180 @@ +import tempfile +from sympy import log, Min, Max, sqrt +from sympy.core.numbers import Float +from sympy.core.symbol import Symbol, symbols +from sympy.functions.elementary.trigonometric import cos +from sympy.codegen.ast import Assignment, Raise, RuntimeError_, QuotedString +from sympy.codegen.algorithms import newtons_method, newtons_method_function +from sympy.codegen.cfunctions import expm1 +from sympy.codegen.fnodes import bind_C +from sympy.codegen.futils import render_as_module as f_module +from sympy.codegen.pyutils import render_as_module as py_module +from sympy.external import import_module +from sympy.printing.codeprinter import ccode +from sympy.utilities._compilation import compile_link_import_strings, has_c, has_fortran +from sympy.utilities._compilation.util import may_xfail +from sympy.testing.pytest import skip, raises, skip_under_pyodide + +cython = import_module('cython') +wurlitzer = import_module('wurlitzer') + +def test_newtons_method(): + x, dx, atol = symbols('x dx atol') + expr = cos(x) - x**3 + algo = newtons_method(expr, x, atol, dx) + assert algo.has(Assignment(dx, -expr/expr.diff(x))) + + +@may_xfail +def test_newtons_method_function__ccode(): + x = Symbol('x', real=True) + expr = cos(x) - x**3 + func = newtons_method_function(expr, x) + + if not cython: + skip("cython not installed.") + if not has_c(): + skip("No C compiler found.") + + compile_kw = {"std": 'c99'} + with tempfile.TemporaryDirectory() as folder: + mod, info = compile_link_import_strings([ + ('newton.c', ('#include \n' + '#include \n') + ccode(func)), + ('_newton.pyx', ("#cython: language_level={}\n".format("3") + + "cdef extern double newton(double)\n" + "def py_newton(x):\n" + " return newton(x)\n")) + ], build_dir=folder, compile_kwargs=compile_kw) + assert abs(mod.py_newton(0.5) - 0.865474033102) < 1e-12 + + +@may_xfail +def test_newtons_method_function__fcode(): + x = Symbol('x', real=True) + expr = cos(x) - x**3 + func = newtons_method_function(expr, x, attrs=[bind_C(name='newton')]) + + if not cython: + skip("cython not installed.") + if not has_fortran(): + skip("No Fortran compiler found.") + + f_mod = f_module([func], 'mod_newton') + with tempfile.TemporaryDirectory() as folder: + mod, info = compile_link_import_strings([ + ('newton.f90', f_mod), + ('_newton.pyx', ("#cython: language_level={}\n".format("3") + + "cdef extern double newton(double*)\n" + "def py_newton(double x):\n" + " return newton(&x)\n")) + ], build_dir=folder) + assert abs(mod.py_newton(0.5) - 0.865474033102) < 1e-12 + + +def test_newtons_method_function__pycode(): + x = Symbol('x', real=True) + expr = cos(x) - x**3 + func = newtons_method_function(expr, x) + py_mod = py_module(func) + namespace = {} + exec(py_mod, namespace, namespace) + res = eval('newton(0.5)', namespace) + assert abs(res - 0.865474033102) < 1e-12 + + +@may_xfail +@skip_under_pyodide("Emscripten does not support process spawning") +def test_newtons_method_function__ccode_parameters(): + args = x, A, k, p = symbols('x A k p') + expr = A*cos(k*x) - p*x**3 + raises(ValueError, lambda: newtons_method_function(expr, x)) + use_wurlitzer = wurlitzer + + func = newtons_method_function(expr, x, args, debug=use_wurlitzer) + + if not has_c(): + skip("No C compiler found.") + if not cython: + skip("cython not installed.") + + compile_kw = {"std": 'c99'} + with tempfile.TemporaryDirectory() as folder: + mod, info = compile_link_import_strings([ + ('newton_par.c', ('#include \n' + '#include \n') + ccode(func)), + ('_newton_par.pyx', ("#cython: language_level={}\n".format("3") + + "cdef extern double newton(double, double, double, double)\n" + "def py_newton(x, A=1, k=1, p=1):\n" + " return newton(x, A, k, p)\n")) + ], compile_kwargs=compile_kw, build_dir=folder) + + if use_wurlitzer: + with wurlitzer.pipes() as (out, err): + result = mod.py_newton(0.5) + else: + result = mod.py_newton(0.5) + + assert abs(result - 0.865474033102) < 1e-12 + + if not use_wurlitzer: + skip("C-level output only tested when package 'wurlitzer' is available.") + + out, err = out.read(), err.read() + assert err == '' + assert out == """\ +x= 0.5 +x= 1.1121 d_x= 0.61214 +x= 0.90967 d_x= -0.20247 +x= 0.86726 d_x= -0.042409 +x= 0.86548 d_x= -0.0017867 +x= 0.86547 d_x= -3.1022e-06 +x= 0.86547 d_x= -9.3421e-12 +x= 0.86547 d_x= 3.6902e-17 +""" # try to run tests with LC_ALL=C if this assertion fails + + +def test_newtons_method_function__rtol_cse_nan(): + a, b, c, N_geo, N_tot = symbols('a b c N_geo N_tot', real=True, nonnegative=True) + i = Symbol('i', integer=True, nonnegative=True) + N_ari = N_tot - N_geo - 1 + delta_ari = (c-b)/N_ari + ln_delta_geo = log(b) + log(-expm1((log(a)-log(b))/N_geo)) + eqb_log = ln_delta_geo - log(delta_ari) + + def _clamp(low, expr, high): + return Min(Max(low, expr), high) + + meth_kw = { + 'clamped_newton': {'delta_fn': lambda e, x: _clamp( + (sqrt(a*x)-x)*0.99, + -e/e.diff(x), + (sqrt(c*x)-x)*0.99 + )}, + 'halley': {'delta_fn': lambda e, x: (-2*(e*e.diff(x))/(2*e.diff(x)**2 - e*e.diff(x, 2)))}, + 'halley_alt': {'delta_fn': lambda e, x: (-e/e.diff(x)/(1-e/e.diff(x)*e.diff(x,2)/2/e.diff(x)))}, + } + args = eqb_log, b + for use_cse in [False, True]: + kwargs = { + 'params': (b, a, c, N_geo, N_tot), 'itermax': 60, 'debug': True, 'cse': use_cse, + 'counter': i, 'atol': 1e-100, 'rtol': 2e-16, 'bounds': (a,c), + 'handle_nan': Raise(RuntimeError_(QuotedString("encountered NaN."))) + } + func = {k: newtons_method_function(*args, func_name=f"{k}_b", **dict(kwargs, **kw)) for k, kw in meth_kw.items()} + py_mod = {k: py_module(v) for k, v in func.items()} + namespace = {} + root_find_b = {} + for k, v in py_mod.items(): + ns = namespace[k] = {} + exec(v, ns, ns) + root_find_b[k] = ns[f'{k}_b'] + ref = Float('13.2261515064168768938151923226496') + reftol = {'clamped_newton': 2e-16, 'halley': 2e-16, 'halley_alt': 3e-16} + guess = 4.0 + for meth, func in root_find_b.items(): + result = func(guess, 1e-2, 1e2, 50, 100) + req = ref*reftol[meth] + if use_cse: + req *= 2 + assert abs(result - ref) < req diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_applications.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_applications.py new file mode 100644 index 0000000000000000000000000000000000000000..9519c06b96042b383314ef928d2ad0c1a2f92650 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_applications.py @@ -0,0 +1,58 @@ +# This file contains tests that exercise multiple AST nodes + +import tempfile + +from sympy.external import import_module +from sympy.printing.codeprinter import ccode +from sympy.utilities._compilation import compile_link_import_strings, has_c +from sympy.utilities._compilation.util import may_xfail +from sympy.testing.pytest import skip, skip_under_pyodide +from sympy.codegen.ast import ( + FunctionDefinition, FunctionPrototype, Variable, Pointer, real, Assignment, + integer, CodeBlock, While +) +from sympy.codegen.cnodes import void, PreIncrement +from sympy.codegen.cutils import render_as_source_file + +cython = import_module('cython') +np = import_module('numpy') + +def _mk_func1(): + declars = n, inp, out = Variable('n', integer), Pointer('inp', real), Pointer('out', real) + i = Variable('i', integer) + whl = While(i2, lambda p: p.base-p.exp) + assert m == [x**2, y-3, z-4] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_pyutils.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_pyutils.py new file mode 100644 index 0000000000000000000000000000000000000000..0a2f0ff358f333635c8d44195a5c39d63ac8f16f --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_pyutils.py @@ -0,0 +1,7 @@ +from sympy.codegen.ast import Print +from sympy.codegen.pyutils import render_as_module + +def test_standard(): + ast = Print('x y'.split(), r"coordinate: %12.5g %12.5g\n") + assert render_as_module(ast, standard='python3') == \ + '\n\nprint("coordinate: %12.5g %12.5g\\n" % (x, y), end="")' diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_rewriting.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_rewriting.py new file mode 100644 index 0000000000000000000000000000000000000000..51e0c9ecc940f60186cc04d4bf15650281d31cd8 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_rewriting.py @@ -0,0 +1,479 @@ +import tempfile +from sympy.core.numbers import pi, Rational +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.elementary.complexes import Abs +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.trigonometric import (cos, sin, sinc) +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.assumptions import assuming, Q +from sympy.external import import_module +from sympy.printing.codeprinter import ccode +from sympy.codegen.matrix_nodes import MatrixSolve +from sympy.codegen.cfunctions import log2, exp2, expm1, log1p +from sympy.codegen.numpy_nodes import logaddexp, logaddexp2 +from sympy.codegen.scipy_nodes import cosm1, powm1 +from sympy.codegen.rewriting import ( + optimize, cosm1_opt, log2_opt, exp2_opt, expm1_opt, log1p_opt, powm1_opt, optims_c99, + create_expand_pow_optimization, matinv_opt, logaddexp_opt, logaddexp2_opt, + optims_numpy, optims_scipy, sinc_opts, FuncMinusOneOptim +) +from sympy.testing.pytest import XFAIL, skip +from sympy.utilities import lambdify +from sympy.utilities._compilation import compile_link_import_strings, has_c +from sympy.utilities._compilation.util import may_xfail + +cython = import_module('cython') +numpy = import_module('numpy') +scipy = import_module('scipy') + + +def test_log2_opt(): + x = Symbol('x') + expr1 = 7*log(3*x + 5)/(log(2)) + opt1 = optimize(expr1, [log2_opt]) + assert opt1 == 7*log2(3*x + 5) + assert opt1.rewrite(log) == expr1 + + expr2 = 3*log(5*x + 7)/(13*log(2)) + opt2 = optimize(expr2, [log2_opt]) + assert opt2 == 3*log2(5*x + 7)/13 + assert opt2.rewrite(log) == expr2 + + expr3 = log(x)/log(2) + opt3 = optimize(expr3, [log2_opt]) + assert opt3 == log2(x) + assert opt3.rewrite(log) == expr3 + + expr4 = log(x)/log(2) + log(x+1) + opt4 = optimize(expr4, [log2_opt]) + assert opt4 == log2(x) + log(2)*log2(x+1) + assert opt4.rewrite(log) == expr4 + + expr5 = log(17) + opt5 = optimize(expr5, [log2_opt]) + assert opt5 == expr5 + + expr6 = log(x + 3)/log(2) + opt6 = optimize(expr6, [log2_opt]) + assert str(opt6) == 'log2(x + 3)' + assert opt6.rewrite(log) == expr6 + + +def test_exp2_opt(): + x = Symbol('x') + expr1 = 1 + 2**x + opt1 = optimize(expr1, [exp2_opt]) + assert opt1 == 1 + exp2(x) + assert opt1.rewrite(Pow) == expr1 + + expr2 = 1 + 3**x + assert expr2 == optimize(expr2, [exp2_opt]) + + +def test_expm1_opt(): + x = Symbol('x') + + expr1 = exp(x) - 1 + opt1 = optimize(expr1, [expm1_opt]) + assert expm1(x) - opt1 == 0 + assert opt1.rewrite(exp) == expr1 + + expr2 = 3*exp(x) - 3 + opt2 = optimize(expr2, [expm1_opt]) + assert 3*expm1(x) == opt2 + assert opt2.rewrite(exp) == expr2 + + expr3 = 3*exp(x) - 5 + opt3 = optimize(expr3, [expm1_opt]) + assert 3*expm1(x) - 2 == opt3 + assert opt3.rewrite(exp) == expr3 + expm1_opt_non_opportunistic = FuncMinusOneOptim(exp, expm1, opportunistic=False) + assert expr3 == optimize(expr3, [expm1_opt_non_opportunistic]) + assert opt1 == optimize(expr1, [expm1_opt_non_opportunistic]) + assert opt2 == optimize(expr2, [expm1_opt_non_opportunistic]) + + expr4 = 3*exp(x) + log(x) - 3 + opt4 = optimize(expr4, [expm1_opt]) + assert 3*expm1(x) + log(x) == opt4 + assert opt4.rewrite(exp) == expr4 + + expr5 = 3*exp(2*x) - 3 + opt5 = optimize(expr5, [expm1_opt]) + assert 3*expm1(2*x) == opt5 + assert opt5.rewrite(exp) == expr5 + + expr6 = (2*exp(x) + 1)/(exp(x) + 1) + 1 + opt6 = optimize(expr6, [expm1_opt]) + assert opt6.count_ops() <= expr6.count_ops() + + def ev(e): + return e.subs(x, 3).evalf() + assert abs(ev(expr6) - ev(opt6)) < 1e-15 + + y = Symbol('y') + expr7 = (2*exp(x) - 1)/(1 - exp(y)) - 1/(1-exp(y)) + opt7 = optimize(expr7, [expm1_opt]) + assert -2*expm1(x)/expm1(y) == opt7 + assert (opt7.rewrite(exp) - expr7).factor() == 0 + + expr8 = (1+exp(x))**2 - 4 + opt8 = optimize(expr8, [expm1_opt]) + tgt8a = (exp(x) + 3)*expm1(x) + tgt8b = 2*expm1(x) + expm1(2*x) + # Both tgt8a & tgt8b seem to give full precision (~16 digits for double) + # for x=1e-7 (compare with expr8 which only achieves ~8 significant digits). + # If we can show that either tgt8a or tgt8b is preferable, we can + # change this test to ensure the preferable version is returned. + assert (tgt8a - tgt8b).rewrite(exp).factor() == 0 + assert opt8 in (tgt8a, tgt8b) + assert (opt8.rewrite(exp) - expr8).factor() == 0 + + expr9 = sin(expr8) + opt9 = optimize(expr9, [expm1_opt]) + tgt9a = sin(tgt8a) + tgt9b = sin(tgt8b) + assert opt9 in (tgt9a, tgt9b) + assert (opt9.rewrite(exp) - expr9.rewrite(exp)).factor().is_zero + + +def test_expm1_two_exp_terms(): + x, y = map(Symbol, 'x y'.split()) + expr1 = exp(x) + exp(y) - 2 + opt1 = optimize(expr1, [expm1_opt]) + assert opt1 == expm1(x) + expm1(y) + + +def test_cosm1_opt(): + x = Symbol('x') + + expr1 = cos(x) - 1 + opt1 = optimize(expr1, [cosm1_opt]) + assert cosm1(x) - opt1 == 0 + assert opt1.rewrite(cos) == expr1 + + expr2 = 3*cos(x) - 3 + opt2 = optimize(expr2, [cosm1_opt]) + assert 3*cosm1(x) == opt2 + assert opt2.rewrite(cos) == expr2 + + expr3 = 3*cos(x) - 5 + opt3 = optimize(expr3, [cosm1_opt]) + assert 3*cosm1(x) - 2 == opt3 + assert opt3.rewrite(cos) == expr3 + cosm1_opt_non_opportunistic = FuncMinusOneOptim(cos, cosm1, opportunistic=False) + assert expr3 == optimize(expr3, [cosm1_opt_non_opportunistic]) + assert opt1 == optimize(expr1, [cosm1_opt_non_opportunistic]) + assert opt2 == optimize(expr2, [cosm1_opt_non_opportunistic]) + + expr4 = 3*cos(x) + log(x) - 3 + opt4 = optimize(expr4, [cosm1_opt]) + assert 3*cosm1(x) + log(x) == opt4 + assert opt4.rewrite(cos) == expr4 + + expr5 = 3*cos(2*x) - 3 + opt5 = optimize(expr5, [cosm1_opt]) + assert 3*cosm1(2*x) == opt5 + assert opt5.rewrite(cos) == expr5 + + expr6 = 2 - 2*cos(x) + opt6 = optimize(expr6, [cosm1_opt]) + assert -2*cosm1(x) == opt6 + assert opt6.rewrite(cos) == expr6 + + +def test_cosm1_two_cos_terms(): + x, y = map(Symbol, 'x y'.split()) + expr1 = cos(x) + cos(y) - 2 + opt1 = optimize(expr1, [cosm1_opt]) + assert opt1 == cosm1(x) + cosm1(y) + + +def test_expm1_cosm1_mixed(): + x = Symbol('x') + expr1 = exp(x) + cos(x) - 2 + opt1 = optimize(expr1, [expm1_opt, cosm1_opt]) + assert opt1 == cosm1(x) + expm1(x) + + +def _check_num_lambdify(expr, opt, val_subs, approx_ref, lambdify_kw=None, poorness=1e10): + """ poorness=1e10 signifies that `expr` loses precision of at least ten decimal digits. """ + num_ref = expr.subs(val_subs).evalf() + eps = numpy.finfo(numpy.float64).eps + assert abs(num_ref - approx_ref) < approx_ref*eps + f1 = lambdify(list(val_subs.keys()), opt, **(lambdify_kw or {})) + args_float = tuple(map(float, val_subs.values())) + num_err1 = abs(f1(*args_float) - approx_ref) + assert num_err1 < abs(num_ref*eps) + f2 = lambdify(list(val_subs.keys()), expr, **(lambdify_kw or {})) + num_err2 = abs(f2(*args_float) - approx_ref) + assert num_err2 > abs(num_ref*eps*poorness) # this only ensures that the *test* works as intended + + +def test_cosm1_apart(): + x = Symbol('x') + + expr1 = 1/cos(x) - 1 + opt1 = optimize(expr1, [cosm1_opt]) + assert opt1 == -cosm1(x)/cos(x) + if scipy: + _check_num_lambdify(expr1, opt1, {x: S(10)**-30}, 5e-61, lambdify_kw={"modules": 'scipy'}) + + expr2 = 2/cos(x) - 2 + opt2 = optimize(expr2, optims_scipy) + assert opt2 == -2*cosm1(x)/cos(x) + if scipy: + _check_num_lambdify(expr2, opt2, {x: S(10)**-30}, 1e-60, lambdify_kw={"modules": 'scipy'}) + + expr3 = pi/cos(3*x) - pi + opt3 = optimize(expr3, [cosm1_opt]) + assert opt3 == -pi*cosm1(3*x)/cos(3*x) + if scipy: + _check_num_lambdify(expr3, opt3, {x: S(10)**-30/3}, float(5e-61*pi), lambdify_kw={"modules": 'scipy'}) + + +def test_powm1(): + args = x, y = map(Symbol, "xy") + + expr1 = x**y - 1 + opt1 = optimize(expr1, [powm1_opt]) + assert opt1 == powm1(x, y) + for arg in args: + assert expr1.diff(arg) == opt1.diff(arg) + if scipy and tuple(map(int, scipy.version.version.split('.')[:3])) >= (1, 10, 0): + subs1_a = {x: Rational(*(1.0+1e-13).as_integer_ratio()), y: pi} + ref1_f64_a = 3.139081648208105e-13 + _check_num_lambdify(expr1, opt1, subs1_a, ref1_f64_a, lambdify_kw={"modules": 'scipy'}, poorness=10**11) + + subs1_b = {x: pi, y: Rational(*(1e-10).as_integer_ratio())} + ref1_f64_b = 1.1447298859149205e-10 + _check_num_lambdify(expr1, opt1, subs1_b, ref1_f64_b, lambdify_kw={"modules": 'scipy'}, poorness=10**9) + + +def test_log1p_opt(): + x = Symbol('x') + expr1 = log(x + 1) + opt1 = optimize(expr1, [log1p_opt]) + assert log1p(x) - opt1 == 0 + assert opt1.rewrite(log) == expr1 + + expr2 = log(3*x + 3) + opt2 = optimize(expr2, [log1p_opt]) + assert log1p(x) + log(3) == opt2 + assert (opt2.rewrite(log) - expr2).simplify() == 0 + + expr3 = log(2*x + 1) + opt3 = optimize(expr3, [log1p_opt]) + assert log1p(2*x) - opt3 == 0 + assert opt3.rewrite(log) == expr3 + + expr4 = log(x+3) + opt4 = optimize(expr4, [log1p_opt]) + assert str(opt4) == 'log(x + 3)' + + +def test_optims_c99(): + x = Symbol('x') + + expr1 = 2**x + log(x)/log(2) + log(x + 1) + exp(x) - 1 + opt1 = optimize(expr1, optims_c99).simplify() + assert opt1 == exp2(x) + log2(x) + log1p(x) + expm1(x) + assert opt1.rewrite(exp).rewrite(log).rewrite(Pow) == expr1 + + expr2 = log(x)/log(2) + log(x + 1) + opt2 = optimize(expr2, optims_c99) + assert opt2 == log2(x) + log1p(x) + assert opt2.rewrite(log) == expr2 + + expr3 = log(x)/log(2) + log(17*x + 17) + opt3 = optimize(expr3, optims_c99) + delta3 = opt3 - (log2(x) + log(17) + log1p(x)) + assert delta3 == 0 + assert (opt3.rewrite(log) - expr3).simplify() == 0 + + expr4 = 2**x + 3*log(5*x + 7)/(13*log(2)) + 11*exp(x) - 11 + log(17*x + 17) + opt4 = optimize(expr4, optims_c99).simplify() + delta4 = opt4 - (exp2(x) + 3*log2(5*x + 7)/13 + 11*expm1(x) + log(17) + log1p(x)) + assert delta4 == 0 + assert (opt4.rewrite(exp).rewrite(log).rewrite(Pow) - expr4).simplify() == 0 + + expr5 = 3*exp(2*x) - 3 + opt5 = optimize(expr5, optims_c99) + delta5 = opt5 - 3*expm1(2*x) + assert delta5 == 0 + assert opt5.rewrite(exp) == expr5 + + expr6 = exp(2*x) - 3 + opt6 = optimize(expr6, optims_c99) + assert opt6 in (expm1(2*x) - 2, expr6) # expm1(2*x) - 2 is not better or worse + + expr7 = log(3*x + 3) + opt7 = optimize(expr7, optims_c99) + delta7 = opt7 - (log(3) + log1p(x)) + assert delta7 == 0 + assert (opt7.rewrite(log) - expr7).simplify() == 0 + + expr8 = log(2*x + 3) + opt8 = optimize(expr8, optims_c99) + assert opt8 == expr8 + + +def test_create_expand_pow_optimization(): + cc = lambda x: ccode( + optimize(x, [create_expand_pow_optimization(4)])) + x = Symbol('x') + assert cc(x**4) == 'x*x*x*x' + assert cc(x**4 + x**2) == 'x*x + x*x*x*x' + assert cc(x**5 + x**4) == 'pow(x, 5) + x*x*x*x' + assert cc(sin(x)**4) == 'pow(sin(x), 4)' + # gh issue 15335 + assert cc(x**(-4)) == '1.0/(x*x*x*x)' + assert cc(x**(-5)) == 'pow(x, -5)' + assert cc(-x**4) == '-(x*x*x*x)' + assert cc(x**4 - x**2) == '-(x*x) + x*x*x*x' + i = Symbol('i', integer=True) + assert cc(x**i - x**2) == 'pow(x, i) - (x*x)' + y = Symbol('y', real=True) + assert cc(Abs(exp(y**4))) == "exp(y*y*y*y)" + + # gh issue 20753 + cc2 = lambda x: ccode(optimize(x, [create_expand_pow_optimization( + 4, base_req=lambda b: b.is_Function)])) + assert cc2(x**3 + sin(x)**3) == "pow(x, 3) + sin(x)*sin(x)*sin(x)" + + +def test_matsolve(): + n = Symbol('n', integer=True) + A = MatrixSymbol('A', n, n) + x = MatrixSymbol('x', n, 1) + + with assuming(Q.fullrank(A)): + assert optimize(A**(-1) * x, [matinv_opt]) == MatrixSolve(A, x) + assert optimize(A**(-1) * x + x, [matinv_opt]) == MatrixSolve(A, x) + x + + +def test_logaddexp_opt(): + x, y = map(Symbol, 'x y'.split()) + expr1 = log(exp(x) + exp(y)) + opt1 = optimize(expr1, [logaddexp_opt]) + assert logaddexp(x, y) - opt1 == 0 + assert logaddexp(y, x) - opt1 == 0 + assert opt1.rewrite(log) == expr1 + + +def test_logaddexp2_opt(): + x, y = map(Symbol, 'x y'.split()) + expr1 = log(2**x + 2**y)/log(2) + opt1 = optimize(expr1, [logaddexp2_opt]) + assert logaddexp2(x, y) - opt1 == 0 + assert logaddexp2(y, x) - opt1 == 0 + assert opt1.rewrite(log) == expr1 + + +def test_sinc_opts(): + def check(d): + for k, v in d.items(): + assert optimize(k, sinc_opts) == v + + x = Symbol('x') + check({ + sin(x)/x : sinc(x), + sin(2*x)/(2*x) : sinc(2*x), + sin(3*x)/x : 3*sinc(3*x), + x*sin(x) : x*sin(x) + }) + + y = Symbol('y') + check({ + sin(x*y)/(x*y) : sinc(x*y), + y*sin(x/y)/x : sinc(x/y), + sin(sin(x))/sin(x) : sinc(sin(x)), + sin(3*sin(x))/sin(x) : 3*sinc(3*sin(x)), + sin(x)/y : sin(x)/y + }) + + +def test_optims_numpy(): + def check(d): + for k, v in d.items(): + assert optimize(k, optims_numpy) == v + + x = Symbol('x') + check({ + sin(2*x)/(2*x) + exp(2*x) - 1: sinc(2*x) + expm1(2*x), + log(x+3)/log(2) + log(x**2 + 1): log1p(x**2) + log2(x+3) + }) + + +@XFAIL # room for improvement, ideally this test case should pass. +def test_optims_numpy_TODO(): + def check(d): + for k, v in d.items(): + assert optimize(k, optims_numpy) == v + + x, y = map(Symbol, 'x y'.split()) + check({ + log(x*y)*sin(x*y)*log(x*y+1)/(log(2)*x*y): log2(x*y)*sinc(x*y)*log1p(x*y), + exp(x*sin(y)/y) - 1: expm1(x*sinc(y)) + }) + + +@may_xfail +def test_compiled_ccode_with_rewriting(): + if not cython: + skip("cython not installed.") + if not has_c(): + skip("No C compiler found.") + + x = Symbol('x') + about_two = 2**(58/S(117))*3**(97/S(117))*5**(4/S(39))*7**(92/S(117))/S(30)*pi + # about_two: 1.999999999999581826 + unchanged = 2*exp(x) - about_two + xval = S(10)**-11 + ref = unchanged.subs(x, xval).n(19) # 2.0418173913673213e-11 + + rewritten = optimize(2*exp(x) - about_two, [expm1_opt]) + + # Unfortunately, we need to call ``.n()`` on our expressions before we hand them + # to ``ccode``, and we need to request a large number of significant digits. + # In this test, results converged for double precision when the following number + # of significant digits were chosen: + NUMBER_OF_DIGITS = 25 # TODO: this should ideally be automatically handled. + + func_c = ''' +#include + +double func_unchanged(double x) { + return %(unchanged)s; +} +double func_rewritten(double x) { + return %(rewritten)s; +} +''' % {"unchanged": ccode(unchanged.n(NUMBER_OF_DIGITS)), + "rewritten": ccode(rewritten.n(NUMBER_OF_DIGITS))} + + func_pyx = ''' +#cython: language_level=3 +cdef extern double func_unchanged(double) +cdef extern double func_rewritten(double) +def py_unchanged(x): + return func_unchanged(x) +def py_rewritten(x): + return func_rewritten(x) +''' + with tempfile.TemporaryDirectory() as folder: + mod, info = compile_link_import_strings( + [('func.c', func_c), ('_func.pyx', func_pyx)], + build_dir=folder, compile_kwargs={"std": 'c99'} + ) + err_rewritten = abs(mod.py_rewritten(1e-11) - ref) + err_unchanged = abs(mod.py_unchanged(1e-11) - ref) + assert 1e-27 < err_rewritten < 1e-25 # highly accurate. + assert 1e-19 < err_unchanged < 1e-16 # quite poor. + + # Tolerances used above were determined as follows: + # >>> no_opt = unchanged.subs(x, xval.evalf()).evalf() + # >>> with_opt = rewritten.n(25).subs(x, 1e-11).evalf() + # >>> with_opt - ref, no_opt - ref + # (1.1536301877952077e-26, 1.6547074214222335e-18) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_scipy_nodes.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_scipy_nodes.py new file mode 100644 index 0000000000000000000000000000000000000000..c0d1461037eec81ade0c99b18fbbf5a4517ce0b7 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/codegen/tests/test_scipy_nodes.py @@ -0,0 +1,44 @@ +from itertools import product +from sympy.core.power import Pow +from sympy.core.symbol import symbols +from sympy.functions.elementary.exponential import exp, log +from sympy.functions.elementary.trigonometric import cos +from sympy.core.numbers import pi +from sympy.codegen.scipy_nodes import cosm1, powm1 + +x, y, z = symbols('x y z') + + +def test_cosm1(): + cm1_xy = cosm1(x*y) + ref_xy = cos(x*y) - 1 + for wrt, deriv_order in product([x, y, z], range(3)): + assert ( + cm1_xy.diff(wrt, deriv_order) - + ref_xy.diff(wrt, deriv_order) + ).rewrite(cos).simplify() == 0 + + expr_minus2 = cosm1(pi) + assert expr_minus2.rewrite(cos) == -2 + assert cosm1(3.14).simplify() == cosm1(3.14) # cannot simplify with 3.14 + assert cosm1(pi/2).simplify() == -1 + assert (1/cos(x) - 1 + cosm1(x)/cos(x)).simplify() == 0 + + +def test_powm1(): + cases = { + powm1(x, y): x**y - 1, + powm1(x*y, z): (x*y)**z - 1, + powm1(x, y*z): x**(y*z)-1, + powm1(x*y*z, x*y*z): (x*y*z)**(x*y*z)-1 + } + for pm1_e, ref_e in cases.items(): + for wrt, deriv_order in product([x, y, z], range(3)): + der = pm1_e.diff(wrt, deriv_order) + ref = ref_e.diff(wrt, deriv_order) + delta = (der - ref).rewrite(Pow) + assert delta.simplify() == 0 + + eulers_constant_m1 = powm1(x, 1/log(x)) + assert eulers_constant_m1.rewrite(Pow) == exp(1) - 1 + assert eulers_constant_m1.simplify() == exp(1) - 1 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..220c27a42975555f8fe7770fcef0dd18475c89e1 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/__init__.py @@ -0,0 +1,43 @@ +from sympy.combinatorics.permutations import Permutation, Cycle +from sympy.combinatorics.prufer import Prufer +from sympy.combinatorics.generators import cyclic, alternating, symmetric, dihedral +from sympy.combinatorics.subsets import Subset +from sympy.combinatorics.partitions import (Partition, IntegerPartition, + RGS_rank, RGS_unrank, RGS_enum) +from sympy.combinatorics.polyhedron import (Polyhedron, tetrahedron, cube, + octahedron, dodecahedron, icosahedron) +from sympy.combinatorics.perm_groups import PermutationGroup, Coset, SymmetricPermutationGroup +from sympy.combinatorics.group_constructs import DirectProduct +from sympy.combinatorics.graycode import GrayCode +from sympy.combinatorics.named_groups import (SymmetricGroup, DihedralGroup, + CyclicGroup, AlternatingGroup, AbelianGroup, RubikGroup) +from sympy.combinatorics.pc_groups import PolycyclicGroup, Collector +from sympy.combinatorics.free_groups import free_group + +__all__ = [ + 'Permutation', 'Cycle', + + 'Prufer', + + 'cyclic', 'alternating', 'symmetric', 'dihedral', + + 'Subset', + + 'Partition', 'IntegerPartition', 'RGS_rank', 'RGS_unrank', 'RGS_enum', + + 'Polyhedron', 'tetrahedron', 'cube', 'octahedron', 'dodecahedron', + 'icosahedron', + + 'PermutationGroup', 'Coset', 'SymmetricPermutationGroup', + + 'DirectProduct', + + 'GrayCode', + + 'SymmetricGroup', 'DihedralGroup', 'CyclicGroup', 'AlternatingGroup', + 'AbelianGroup', 'RubikGroup', + + 'PolycyclicGroup', 'Collector', + + 'free_group', +] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/coset_table.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/coset_table.py new file mode 100644 index 0000000000000000000000000000000000000000..0687aa34ec70e9062f65ff6413213848cf03e51b --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/coset_table.py @@ -0,0 +1,1259 @@ +from sympy.combinatorics.free_groups import free_group +from sympy.printing.defaults import DefaultPrinting + +from itertools import chain, product +from bisect import bisect_left + + +############################################################################### +# COSET TABLE # +############################################################################### + +class CosetTable(DefaultPrinting): + # coset_table: Mathematically a coset table + # represented using a list of lists + # alpha: Mathematically a coset (precisely, a live coset) + # represented by an integer between i with 1 <= i <= n + # alpha in c + # x: Mathematically an element of "A" (set of generators and + # their inverses), represented using "FpGroupElement" + # fp_grp: Finitely Presented Group with < X|R > as presentation. + # H: subgroup of fp_grp. + # NOTE: We start with H as being only a list of words in generators + # of "fp_grp". Since `.subgroup` method has not been implemented. + + r""" + + Properties + ========== + + [1] `0 \in \Omega` and `\tau(1) = \epsilon` + [2] `\alpha^x = \beta \Leftrightarrow \beta^{x^{-1}} = \alpha` + [3] If `\alpha^x = \beta`, then `H \tau(\alpha)x = H \tau(\beta)` + [4] `\forall \alpha \in \Omega, 1^{\tau(\alpha)} = \alpha` + + References + ========== + + .. [1] Holt, D., Eick, B., O'Brien, E. + "Handbook of Computational Group Theory" + + .. [2] John J. Cannon; Lucien A. Dimino; George Havas; Jane M. Watson + Mathematics of Computation, Vol. 27, No. 123. (Jul., 1973), pp. 463-490. + "Implementation and Analysis of the Todd-Coxeter Algorithm" + + """ + # default limit for the number of cosets allowed in a + # coset enumeration. + coset_table_max_limit = 4096000 + # limit for the current instance + coset_table_limit = None + # maximum size of deduction stack above or equal to + # which it is emptied + max_stack_size = 100 + + def __init__(self, fp_grp, subgroup, max_cosets=None): + if not max_cosets: + max_cosets = CosetTable.coset_table_max_limit + self.fp_group = fp_grp + self.subgroup = subgroup + self.coset_table_limit = max_cosets + # "p" is setup independent of Omega and n + self.p = [0] + # a list of the form `[gen_1, gen_1^{-1}, ... , gen_k, gen_k^{-1}]` + self.A = list(chain.from_iterable((gen, gen**-1) \ + for gen in self.fp_group.generators)) + #P[alpha, x] Only defined when alpha^x is defined. + self.P = [[None]*len(self.A)] + # the mathematical coset table which is a list of lists + self.table = [[None]*len(self.A)] + self.A_dict = {x: self.A.index(x) for x in self.A} + self.A_dict_inv = {} + for x, index in self.A_dict.items(): + if index % 2 == 0: + self.A_dict_inv[x] = self.A_dict[x] + 1 + else: + self.A_dict_inv[x] = self.A_dict[x] - 1 + # used in the coset-table based method of coset enumeration. Each of + # the element is called a "deduction" which is the form (alpha, x) whenever + # a value is assigned to alpha^x during a definition or "deduction process" + self.deduction_stack = [] + # Attributes for modified methods. + H = self.subgroup + self._grp = free_group(', ' .join(["a_%d" % i for i in range(len(H))]))[0] + self.P = [[None]*len(self.A)] + self.p_p = {} + + @property + def omega(self): + """Set of live cosets. """ + return [coset for coset in range(len(self.p)) if self.p[coset] == coset] + + def copy(self): + """ + Return a shallow copy of Coset Table instance ``self``. + + """ + self_copy = self.__class__(self.fp_group, self.subgroup) + self_copy.table = [list(perm_rep) for perm_rep in self.table] + self_copy.p = list(self.p) + self_copy.deduction_stack = list(self.deduction_stack) + return self_copy + + def __str__(self): + return "Coset Table on %s with %s as subgroup generators" \ + % (self.fp_group, self.subgroup) + + __repr__ = __str__ + + @property + def n(self): + """The number `n` represents the length of the sublist containing the + live cosets. + + """ + if not self.table: + return 0 + return max(self.omega) + 1 + + # Pg. 152 [1] + def is_complete(self): + r""" + The coset table is called complete if it has no undefined entries + on the live cosets; that is, `\alpha^x` is defined for all + `\alpha \in \Omega` and `x \in A`. + + """ + return not any(None in self.table[coset] for coset in self.omega) + + # Pg. 153 [1] + def define(self, alpha, x, modified=False): + r""" + This routine is used in the relator-based strategy of Todd-Coxeter + algorithm if some `\alpha^x` is undefined. We check whether there is + space available for defining a new coset. If there is enough space + then we remedy this by adjoining a new coset `\beta` to `\Omega` + (i.e to set of live cosets) and put that equal to `\alpha^x`, then + make an assignment satisfying Property[1]. If there is not enough space + then we halt the Coset Table creation. The maximum amount of space that + can be used by Coset Table can be manipulated using the class variable + ``CosetTable.coset_table_max_limit``. + + See Also + ======== + + define_c + + """ + A = self.A + table = self.table + len_table = len(table) + if len_table >= self.coset_table_limit: + # abort the further generation of cosets + raise ValueError("the coset enumeration has defined more than " + "%s cosets. Try with a greater value max number of cosets " + % self.coset_table_limit) + table.append([None]*len(A)) + self.P.append([None]*len(self.A)) + # beta is the new coset generated + beta = len_table + self.p.append(beta) + table[alpha][self.A_dict[x]] = beta + table[beta][self.A_dict_inv[x]] = alpha + # P[alpha][x] = epsilon, P[beta][x**-1] = epsilon + if modified: + self.P[alpha][self.A_dict[x]] = self._grp.identity + self.P[beta][self.A_dict_inv[x]] = self._grp.identity + self.p_p[beta] = self._grp.identity + + def define_c(self, alpha, x): + r""" + A variation of ``define`` routine, described on Pg. 165 [1], used in + the coset table-based strategy of Todd-Coxeter algorithm. It differs + from ``define`` routine in that for each definition it also adds the + tuple `(\alpha, x)` to the deduction stack. + + See Also + ======== + + define + + """ + A = self.A + table = self.table + len_table = len(table) + if len_table >= self.coset_table_limit: + # abort the further generation of cosets + raise ValueError("the coset enumeration has defined more than " + "%s cosets. Try with a greater value max number of cosets " + % self.coset_table_limit) + table.append([None]*len(A)) + # beta is the new coset generated + beta = len_table + self.p.append(beta) + table[alpha][self.A_dict[x]] = beta + table[beta][self.A_dict_inv[x]] = alpha + # append to deduction stack + self.deduction_stack.append((alpha, x)) + + def scan_c(self, alpha, word): + """ + A variation of ``scan`` routine, described on pg. 165 of [1], which + puts at tuple, whenever a deduction occurs, to deduction stack. + + See Also + ======== + + scan, scan_check, scan_and_fill, scan_and_fill_c + + """ + # alpha is an integer representing a "coset" + # since scanning can be in two cases + # 1. for alpha=0 and w in Y (i.e generating set of H) + # 2. alpha in Omega (set of live cosets), w in R (relators) + A_dict = self.A_dict + A_dict_inv = self.A_dict_inv + table = self.table + f = alpha + i = 0 + r = len(word) + b = alpha + j = r - 1 + # list of union of generators and their inverses + while i <= j and table[f][A_dict[word[i]]] is not None: + f = table[f][A_dict[word[i]]] + i += 1 + if i > j: + if f != b: + self.coincidence_c(f, b) + return + while j >= i and table[b][A_dict_inv[word[j]]] is not None: + b = table[b][A_dict_inv[word[j]]] + j -= 1 + if j < i: + # we have an incorrect completed scan with coincidence f ~ b + # run the "coincidence" routine + self.coincidence_c(f, b) + elif j == i: + # deduction process + table[f][A_dict[word[i]]] = b + table[b][A_dict_inv[word[i]]] = f + self.deduction_stack.append((f, word[i])) + # otherwise scan is incomplete and yields no information + + # alpha, beta coincide, i.e. alpha, beta represent the pair of cosets where + # coincidence occurs + def coincidence_c(self, alpha, beta): + """ + A variation of ``coincidence`` routine used in the coset-table based + method of coset enumeration. The only difference being on addition of + a new coset in coset table(i.e new coset introduction), then it is + appended to ``deduction_stack``. + + See Also + ======== + + coincidence + + """ + A_dict = self.A_dict + A_dict_inv = self.A_dict_inv + table = self.table + # behaves as a queue + q = [] + self.merge(alpha, beta, q) + while len(q) > 0: + gamma = q.pop(0) + for x in A_dict: + delta = table[gamma][A_dict[x]] + if delta is not None: + table[delta][A_dict_inv[x]] = None + # only line of difference from ``coincidence`` routine + self.deduction_stack.append((delta, x**-1)) + mu = self.rep(gamma) + nu = self.rep(delta) + if table[mu][A_dict[x]] is not None: + self.merge(nu, table[mu][A_dict[x]], q) + elif table[nu][A_dict_inv[x]] is not None: + self.merge(mu, table[nu][A_dict_inv[x]], q) + else: + table[mu][A_dict[x]] = nu + table[nu][A_dict_inv[x]] = mu + + def scan(self, alpha, word, y=None, fill=False, modified=False): + r""" + ``scan`` performs a scanning process on the input ``word``. + It first locates the largest prefix ``s`` of ``word`` for which + `\alpha^s` is defined (i.e is not ``None``), ``s`` may be empty. Let + ``word=sv``, let ``t`` be the longest suffix of ``v`` for which + `\alpha^{t^{-1}}` is defined, and let ``v=ut``. Then three + possibilities are there: + + 1. If ``t=v``, then we say that the scan completes, and if, in addition + `\alpha^s = \alpha^{t^{-1}}`, then we say that the scan completes + correctly. + + 2. It can also happen that scan does not complete, but `|u|=1`; that + is, the word ``u`` consists of a single generator `x \in A`. In that + case, if `\alpha^s = \beta` and `\alpha^{t^{-1}} = \gamma`, then we can + set `\beta^x = \gamma` and `\gamma^{x^{-1}} = \beta`. These assignments + are known as deductions and enable the scan to complete correctly. + + 3. See ``coicidence`` routine for explanation of third condition. + + Notes + ===== + + The code for the procedure of scanning `\alpha \in \Omega` + under `w \in A*` is defined on pg. 155 [1] + + See Also + ======== + + scan_c, scan_check, scan_and_fill, scan_and_fill_c + + Scan and Fill + ============= + + Performed when the default argument fill=True. + + Modified Scan + ============= + + Performed when the default argument modified=True + + """ + # alpha is an integer representing a "coset" + # since scanning can be in two cases + # 1. for alpha=0 and w in Y (i.e generating set of H) + # 2. alpha in Omega (set of live cosets), w in R (relators) + A_dict = self.A_dict + A_dict_inv = self.A_dict_inv + table = self.table + f = alpha + i = 0 + r = len(word) + b = alpha + j = r - 1 + b_p = y + if modified: + f_p = self._grp.identity + flag = 0 + while fill or flag == 0: + flag = 1 + while i <= j and table[f][A_dict[word[i]]] is not None: + if modified: + f_p = f_p*self.P[f][A_dict[word[i]]] + f = table[f][A_dict[word[i]]] + i += 1 + if i > j: + if f != b: + if modified: + self.modified_coincidence(f, b, f_p**-1*y) + else: + self.coincidence(f, b) + return + while j >= i and table[b][A_dict_inv[word[j]]] is not None: + if modified: + b_p = b_p*self.P[b][self.A_dict_inv[word[j]]] + b = table[b][A_dict_inv[word[j]]] + j -= 1 + if j < i: + # we have an incorrect completed scan with coincidence f ~ b + # run the "coincidence" routine + if modified: + self.modified_coincidence(f, b, f_p**-1*b_p) + else: + self.coincidence(f, b) + elif j == i: + # deduction process + table[f][A_dict[word[i]]] = b + table[b][A_dict_inv[word[i]]] = f + if modified: + self.P[f][self.A_dict[word[i]]] = f_p**-1*b_p + self.P[b][self.A_dict_inv[word[i]]] = b_p**-1*f_p + return + elif fill: + self.define(f, word[i], modified=modified) + # otherwise scan is incomplete and yields no information + + # used in the low-index subgroups algorithm + def scan_check(self, alpha, word): + r""" + Another version of ``scan`` routine, described on, it checks whether + `\alpha` scans correctly under `word`, it is a straightforward + modification of ``scan``. ``scan_check`` returns ``False`` (rather than + calling ``coincidence``) if the scan completes incorrectly; otherwise + it returns ``True``. + + See Also + ======== + + scan, scan_c, scan_and_fill, scan_and_fill_c + + """ + # alpha is an integer representing a "coset" + # since scanning can be in two cases + # 1. for alpha=0 and w in Y (i.e generating set of H) + # 2. alpha in Omega (set of live cosets), w in R (relators) + A_dict = self.A_dict + A_dict_inv = self.A_dict_inv + table = self.table + f = alpha + i = 0 + r = len(word) + b = alpha + j = r - 1 + while i <= j and table[f][A_dict[word[i]]] is not None: + f = table[f][A_dict[word[i]]] + i += 1 + if i > j: + return f == b + while j >= i and table[b][A_dict_inv[word[j]]] is not None: + b = table[b][A_dict_inv[word[j]]] + j -= 1 + if j < i: + # we have an incorrect completed scan with coincidence f ~ b + # return False, instead of calling coincidence routine + return False + elif j == i: + # deduction process + table[f][A_dict[word[i]]] = b + table[b][A_dict_inv[word[i]]] = f + return True + + def merge(self, k, lamda, q, w=None, modified=False): + """ + Merge two classes with representatives ``k`` and ``lamda``, described + on Pg. 157 [1] (for pseudocode), start by putting ``p[k] = lamda``. + It is more efficient to choose the new representative from the larger + of the two classes being merged, i.e larger among ``k`` and ``lamda``. + procedure ``merge`` performs the merging operation, adds the deleted + class representative to the queue ``q``. + + Parameters + ========== + + 'k', 'lamda' being the two class representatives to be merged. + + Notes + ===== + + Pg. 86-87 [1] contains a description of this method. + + See Also + ======== + + coincidence, rep + + """ + p = self.p + rep = self.rep + phi = rep(k, modified=modified) + psi = rep(lamda, modified=modified) + if phi != psi: + mu = min(phi, psi) + v = max(phi, psi) + p[v] = mu + if modified: + if v == phi: + self.p_p[phi] = self.p_p[k]**-1*w*self.p_p[lamda] + else: + self.p_p[psi] = self.p_p[lamda]**-1*w**-1*self.p_p[k] + q.append(v) + + def rep(self, k, modified=False): + r""" + Parameters + ========== + + `k \in [0 \ldots n-1]`, as for ``self`` only array ``p`` is used + + Returns + ======= + + Representative of the class containing ``k``. + + Returns the representative of `\sim` class containing ``k``, it also + makes some modification to array ``p`` of ``self`` to ease further + computations, described on Pg. 157 [1]. + + The information on classes under `\sim` is stored in array `p` of + ``self`` argument, which will always satisfy the property: + + `p[\alpha] \sim \alpha` and `p[\alpha]=\alpha \iff \alpha=rep(\alpha)` + `\forall \in [0 \ldots n-1]`. + + So, for `\alpha \in [0 \ldots n-1]`, we find `rep(self, \alpha)` by + continually replacing `\alpha` by `p[\alpha]` until it becomes + constant (i.e satisfies `p[\alpha] = \alpha`):w + + To increase the efficiency of later ``rep`` calculations, whenever we + find `rep(self, \alpha)=\beta`, we set + `p[\gamma] = \beta \forall \gamma \in p-chain` from `\alpha` to `\beta` + + Notes + ===== + + ``rep`` routine is also described on Pg. 85-87 [1] in Atkinson's + algorithm, this results from the fact that ``coincidence`` routine + introduces functionality similar to that introduced by the + ``minimal_block`` routine on Pg. 85-87 [1]. + + See Also + ======== + + coincidence, merge + + """ + p = self.p + lamda = k + rho = p[lamda] + if modified: + s = p[:] + while rho != lamda: + if modified: + s[rho] = lamda + lamda = rho + rho = p[lamda] + if modified: + rho = s[lamda] + while rho != k: + mu = rho + rho = s[mu] + p[rho] = lamda + self.p_p[rho] = self.p_p[rho]*self.p_p[mu] + else: + mu = k + rho = p[mu] + while rho != lamda: + p[mu] = lamda + mu = rho + rho = p[mu] + return lamda + + # alpha, beta coincide, i.e. alpha, beta represent the pair of cosets + # where coincidence occurs + def coincidence(self, alpha, beta, w=None, modified=False): + r""" + The third situation described in ``scan`` routine is handled by this + routine, described on Pg. 156-161 [1]. + + The unfortunate situation when the scan completes but not correctly, + then ``coincidence`` routine is run. i.e when for some `i` with + `1 \le i \le r+1`, we have `w=st` with `s = x_1 x_2 \dots x_{i-1}`, + `t = x_i x_{i+1} \dots x_r`, and `\beta = \alpha^s` and + `\gamma = \alpha^{t-1}` are defined but unequal. This means that + `\beta` and `\gamma` represent the same coset of `H` in `G`. Described + on Pg. 156 [1]. ``rep`` + + See Also + ======== + + scan + + """ + A_dict = self.A_dict + A_dict_inv = self.A_dict_inv + table = self.table + # behaves as a queue + q = [] + if modified: + self.modified_merge(alpha, beta, w, q) + else: + self.merge(alpha, beta, q) + while len(q) > 0: + gamma = q.pop(0) + for x in A_dict: + delta = table[gamma][A_dict[x]] + if delta is not None: + table[delta][A_dict_inv[x]] = None + mu = self.rep(gamma, modified=modified) + nu = self.rep(delta, modified=modified) + if table[mu][A_dict[x]] is not None: + if modified: + v = self.p_p[delta]**-1*self.P[gamma][self.A_dict[x]]**-1 + v = v*self.p_p[gamma]*self.P[mu][self.A_dict[x]] + self.modified_merge(nu, table[mu][self.A_dict[x]], v, q) + else: + self.merge(nu, table[mu][A_dict[x]], q) + elif table[nu][A_dict_inv[x]] is not None: + if modified: + v = self.p_p[gamma]**-1*self.P[gamma][self.A_dict[x]] + v = v*self.p_p[delta]*self.P[mu][self.A_dict_inv[x]] + self.modified_merge(mu, table[nu][self.A_dict_inv[x]], v, q) + else: + self.merge(mu, table[nu][A_dict_inv[x]], q) + else: + table[mu][A_dict[x]] = nu + table[nu][A_dict_inv[x]] = mu + if modified: + v = self.p_p[gamma]**-1*self.P[gamma][self.A_dict[x]]*self.p_p[delta] + self.P[mu][self.A_dict[x]] = v + self.P[nu][self.A_dict_inv[x]] = v**-1 + + # method used in the HLT strategy + def scan_and_fill(self, alpha, word): + """ + A modified version of ``scan`` routine used in the relator-based + method of coset enumeration, described on pg. 162-163 [1], which + follows the idea that whenever the procedure is called and the scan + is incomplete then it makes new definitions to enable the scan to + complete; i.e it fills in the gaps in the scan of the relator or + subgroup generator. + + """ + self.scan(alpha, word, fill=True) + + def scan_and_fill_c(self, alpha, word): + """ + A modified version of ``scan`` routine, described on Pg. 165 second + para. [1], with modification similar to that of ``scan_anf_fill`` the + only difference being it calls the coincidence procedure used in the + coset-table based method i.e. the routine ``coincidence_c`` is used. + + See Also + ======== + + scan, scan_and_fill + + """ + A_dict = self.A_dict + A_dict_inv = self.A_dict_inv + table = self.table + r = len(word) + f = alpha + i = 0 + b = alpha + j = r - 1 + # loop until it has filled the alpha row in the table. + while True: + # do the forward scanning + while i <= j and table[f][A_dict[word[i]]] is not None: + f = table[f][A_dict[word[i]]] + i += 1 + if i > j: + if f != b: + self.coincidence_c(f, b) + return + # forward scan was incomplete, scan backwards + while j >= i and table[b][A_dict_inv[word[j]]] is not None: + b = table[b][A_dict_inv[word[j]]] + j -= 1 + if j < i: + self.coincidence_c(f, b) + elif j == i: + table[f][A_dict[word[i]]] = b + table[b][A_dict_inv[word[i]]] = f + self.deduction_stack.append((f, word[i])) + else: + self.define_c(f, word[i]) + + # method used in the HLT strategy + def look_ahead(self): + """ + When combined with the HLT method this is known as HLT+Lookahead + method of coset enumeration, described on pg. 164 [1]. Whenever + ``define`` aborts due to lack of space available this procedure is + executed. This routine helps in recovering space resulting from + "coincidence" of cosets. + + """ + R = self.fp_group.relators + p = self.p + # complete scan all relators under all cosets(obviously live) + # without making new definitions + for beta in self.omega: + for w in R: + self.scan(beta, w) + if p[beta] < beta: + break + + # Pg. 166 + def process_deductions(self, R_c_x, R_c_x_inv): + """ + Processes the deductions that have been pushed onto ``deduction_stack``, + described on Pg. 166 [1] and is used in coset-table based enumeration. + + See Also + ======== + + deduction_stack + + """ + p = self.p + table = self.table + while len(self.deduction_stack) > 0: + if len(self.deduction_stack) >= CosetTable.max_stack_size: + self.look_ahead() + del self.deduction_stack[:] + continue + else: + alpha, x = self.deduction_stack.pop() + if p[alpha] == alpha: + for w in R_c_x: + self.scan_c(alpha, w) + if p[alpha] < alpha: + break + beta = table[alpha][self.A_dict[x]] + if beta is not None and p[beta] == beta: + for w in R_c_x_inv: + self.scan_c(beta, w) + if p[beta] < beta: + break + + def process_deductions_check(self, R_c_x, R_c_x_inv): + """ + A variation of ``process_deductions``, this calls ``scan_check`` + wherever ``process_deductions`` calls ``scan``, described on Pg. [1]. + + See Also + ======== + + process_deductions + + """ + table = self.table + while len(self.deduction_stack) > 0: + alpha, x = self.deduction_stack.pop() + if not all(self.scan_check(alpha, w) for w in R_c_x): + return False + beta = table[alpha][self.A_dict[x]] + if beta is not None: + if not all(self.scan_check(beta, w) for w in R_c_x_inv): + return False + return True + + def switch(self, beta, gamma): + r"""Switch the elements `\beta, \gamma \in \Omega` of ``self``, used + by the ``standardize`` procedure, described on Pg. 167 [1]. + + See Also + ======== + + standardize + + """ + A = self.A + A_dict = self.A_dict + table = self.table + for x in A: + z = table[gamma][A_dict[x]] + table[gamma][A_dict[x]] = table[beta][A_dict[x]] + table[beta][A_dict[x]] = z + for alpha in range(len(self.p)): + if self.p[alpha] == alpha: + if table[alpha][A_dict[x]] == beta: + table[alpha][A_dict[x]] = gamma + elif table[alpha][A_dict[x]] == gamma: + table[alpha][A_dict[x]] = beta + + def standardize(self): + r""" + A coset table is standardized if when running through the cosets and + within each coset through the generator images (ignoring generator + inverses), the cosets appear in order of the integers + `0, 1, \dots, n`. "Standardize" reorders the elements of `\Omega` + such that, if we scan the coset table first by elements of `\Omega` + and then by elements of A, then the cosets occur in ascending order. + ``standardize()`` is used at the end of an enumeration to permute the + cosets so that they occur in some sort of standard order. + + Notes + ===== + + procedure is described on pg. 167-168 [1], it also makes use of the + ``switch`` routine to replace by smaller integer value. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> from sympy.combinatorics.fp_groups import FpGroup, coset_enumeration_r + >>> F, x, y = free_group("x, y") + + # Example 5.3 from [1] + >>> f = FpGroup(F, [x**2*y**2, x**3*y**5]) + >>> C = coset_enumeration_r(f, []) + >>> C.compress() + >>> C.table + [[1, 3, 1, 3], [2, 0, 2, 0], [3, 1, 3, 1], [0, 2, 0, 2]] + >>> C.standardize() + >>> C.table + [[1, 2, 1, 2], [3, 0, 3, 0], [0, 3, 0, 3], [2, 1, 2, 1]] + + """ + A = self.A + A_dict = self.A_dict + gamma = 1 + for alpha, x in product(range(self.n), A): + beta = self.table[alpha][A_dict[x]] + if beta >= gamma: + if beta > gamma: + self.switch(gamma, beta) + gamma += 1 + if gamma == self.n: + return + + # Compression of a Coset Table + def compress(self): + """Removes the non-live cosets from the coset table, described on + pg. 167 [1]. + + """ + gamma = -1 + A = self.A + A_dict = self.A_dict + A_dict_inv = self.A_dict_inv + table = self.table + chi = tuple([i for i in range(len(self.p)) if self.p[i] != i]) + for alpha in self.omega: + gamma += 1 + if gamma != alpha: + # replace alpha by gamma in coset table + for x in A: + beta = table[alpha][A_dict[x]] + table[gamma][A_dict[x]] = beta + # XXX: The line below uses == rather than = which means + # that it has no effect. It is not clear though if it is + # correct simply to delete the line or to change it to + # use =. Changing it causes some tests to fail. + # + # https://github.com/sympy/sympy/issues/27633 + table[beta][A_dict_inv[x]] == gamma # noqa: B015 + # all the cosets in the table are live cosets + self.p = list(range(gamma + 1)) + # delete the useless columns + del table[len(self.p):] + # re-define values + for row in table: + for j in range(len(self.A)): + row[j] -= bisect_left(chi, row[j]) + + def conjugates(self, R): + R_c = list(chain.from_iterable((rel.cyclic_conjugates(), \ + (rel**-1).cyclic_conjugates()) for rel in R)) + R_set = set() + for conjugate in R_c: + R_set = R_set.union(conjugate) + R_c_list = [] + for x in self.A: + r = {word for word in R_set if word[0] == x} + R_c_list.append(r) + R_set.difference_update(r) + return R_c_list + + def coset_representative(self, coset): + ''' + Compute the coset representative of a given coset. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> from sympy.combinatorics.fp_groups import FpGroup, coset_enumeration_r + >>> F, x, y = free_group("x, y") + >>> f = FpGroup(F, [x**3, y**3, x**-1*y**-1*x*y]) + >>> C = coset_enumeration_r(f, [x]) + >>> C.compress() + >>> C.table + [[0, 0, 1, 2], [1, 1, 2, 0], [2, 2, 0, 1]] + >>> C.coset_representative(0) + + >>> C.coset_representative(1) + y + >>> C.coset_representative(2) + y**-1 + + ''' + for x in self.A: + gamma = self.table[coset][self.A_dict[x]] + if coset == 0: + return self.fp_group.identity + if gamma < coset: + return self.coset_representative(gamma)*x**-1 + + ############################## + # Modified Methods # + ############################## + + def modified_define(self, alpha, x): + r""" + Define a function p_p from from [1..n] to A* as + an additional component of the modified coset table. + + Parameters + ========== + + \alpha \in \Omega + x \in A* + + See Also + ======== + + define + + """ + self.define(alpha, x, modified=True) + + def modified_scan(self, alpha, w, y, fill=False): + r""" + Parameters + ========== + \alpha \in \Omega + w \in A* + y \in (YUY^-1) + fill -- `modified_scan_and_fill` when set to True. + + See Also + ======== + + scan + """ + self.scan(alpha, w, y=y, fill=fill, modified=True) + + def modified_scan_and_fill(self, alpha, w, y): + self.modified_scan(alpha, w, y, fill=True) + + def modified_merge(self, k, lamda, w, q): + r""" + Parameters + ========== + + 'k', 'lamda' -- the two class representatives to be merged. + q -- queue of length l of elements to be deleted from `\Omega` *. + w -- Word in (YUY^-1) + + See Also + ======== + + merge + """ + self.merge(k, lamda, q, w=w, modified=True) + + def modified_rep(self, k): + r""" + Parameters + ========== + + `k \in [0 \ldots n-1]` + + See Also + ======== + + rep + """ + self.rep(k, modified=True) + + def modified_coincidence(self, alpha, beta, w): + r""" + Parameters + ========== + + A coincident pair `\alpha, \beta \in \Omega, w \in Y \cup Y^{-1}` + + See Also + ======== + + coincidence + + """ + self.coincidence(alpha, beta, w=w, modified=True) + +############################################################################### +# COSET ENUMERATION # +############################################################################### + +# relator-based method +def coset_enumeration_r(fp_grp, Y, max_cosets=None, draft=None, + incomplete=False, modified=False): + """ + This is easier of the two implemented methods of coset enumeration. + and is often called the HLT method, after Hazelgrove, Leech, Trotter + The idea is that we make use of ``scan_and_fill`` makes new definitions + whenever the scan is incomplete to enable the scan to complete; this way + we fill in the gaps in the scan of the relator or subgroup generator, + that's why the name relator-based method. + + An instance of `CosetTable` for `fp_grp` can be passed as the keyword + argument `draft` in which case the coset enumeration will start with + that instance and attempt to complete it. + + When `incomplete` is `True` and the function is unable to complete for + some reason, the partially complete table will be returned. + + # TODO: complete the docstring + + See Also + ======== + + scan_and_fill, + + Examples + ======== + + >>> from sympy.combinatorics.free_groups import free_group + >>> from sympy.combinatorics.fp_groups import FpGroup, coset_enumeration_r + >>> F, x, y = free_group("x, y") + + # Example 5.1 from [1] + >>> f = FpGroup(F, [x**3, y**3, x**-1*y**-1*x*y]) + >>> C = coset_enumeration_r(f, [x]) + >>> for i in range(len(C.p)): + ... if C.p[i] == i: + ... print(C.table[i]) + [0, 0, 1, 2] + [1, 1, 2, 0] + [2, 2, 0, 1] + >>> C.p + [0, 1, 2, 1, 1] + + # Example from exercises Q2 [1] + >>> f = FpGroup(F, [x**2*y**2, y**-1*x*y*x**-3]) + >>> C = coset_enumeration_r(f, []) + >>> C.compress(); C.standardize() + >>> C.table + [[1, 2, 3, 4], + [5, 0, 6, 7], + [0, 5, 7, 6], + [7, 6, 5, 0], + [6, 7, 0, 5], + [2, 1, 4, 3], + [3, 4, 2, 1], + [4, 3, 1, 2]] + + # Example 5.2 + >>> f = FpGroup(F, [x**2, y**3, (x*y)**3]) + >>> Y = [x*y] + >>> C = coset_enumeration_r(f, Y) + >>> for i in range(len(C.p)): + ... if C.p[i] == i: + ... print(C.table[i]) + [1, 1, 2, 1] + [0, 0, 0, 2] + [3, 3, 1, 0] + [2, 2, 3, 3] + + # Example 5.3 + >>> f = FpGroup(F, [x**2*y**2, x**3*y**5]) + >>> Y = [] + >>> C = coset_enumeration_r(f, Y) + >>> for i in range(len(C.p)): + ... if C.p[i] == i: + ... print(C.table[i]) + [1, 3, 1, 3] + [2, 0, 2, 0] + [3, 1, 3, 1] + [0, 2, 0, 2] + + # Example 5.4 + >>> F, a, b, c, d, e = free_group("a, b, c, d, e") + >>> f = FpGroup(F, [a*b*c**-1, b*c*d**-1, c*d*e**-1, d*e*a**-1, e*a*b**-1]) + >>> Y = [a] + >>> C = coset_enumeration_r(f, Y) + >>> for i in range(len(C.p)): + ... if C.p[i] == i: + ... print(C.table[i]) + [0, 0, 0, 0, 0, 0, 0, 0, 0, 0] + + # example of "compress" method + >>> C.compress() + >>> C.table + [[0, 0, 0, 0, 0, 0, 0, 0, 0, 0]] + + # Exercises Pg. 161, Q2. + >>> F, x, y = free_group("x, y") + >>> f = FpGroup(F, [x**2*y**2, y**-1*x*y*x**-3]) + >>> Y = [] + >>> C = coset_enumeration_r(f, Y) + >>> C.compress() + >>> C.standardize() + >>> C.table + [[1, 2, 3, 4], + [5, 0, 6, 7], + [0, 5, 7, 6], + [7, 6, 5, 0], + [6, 7, 0, 5], + [2, 1, 4, 3], + [3, 4, 2, 1], + [4, 3, 1, 2]] + + # John J. Cannon; Lucien A. Dimino; George Havas; Jane M. Watson + # Mathematics of Computation, Vol. 27, No. 123. (Jul., 1973), pp. 463-490 + # from 1973chwd.pdf + # Table 1. Ex. 1 + >>> F, r, s, t = free_group("r, s, t") + >>> E1 = FpGroup(F, [t**-1*r*t*r**-2, r**-1*s*r*s**-2, s**-1*t*s*t**-2]) + >>> C = coset_enumeration_r(E1, [r]) + >>> for i in range(len(C.p)): + ... if C.p[i] == i: + ... print(C.table[i]) + [0, 0, 0, 0, 0, 0] + + Ex. 2 + >>> F, a, b = free_group("a, b") + >>> Cox = FpGroup(F, [a**6, b**6, (a*b)**2, (a**2*b**2)**2, (a**3*b**3)**5]) + >>> C = coset_enumeration_r(Cox, [a]) + >>> index = 0 + >>> for i in range(len(C.p)): + ... if C.p[i] == i: + ... index += 1 + >>> index + 500 + + # Ex. 3 + >>> F, a, b = free_group("a, b") + >>> B_2_4 = FpGroup(F, [a**4, b**4, (a*b)**4, (a**-1*b)**4, (a**2*b)**4, \ + (a*b**2)**4, (a**2*b**2)**4, (a**-1*b*a*b)**4, (a*b**-1*a*b)**4]) + >>> C = coset_enumeration_r(B_2_4, [a]) + >>> index = 0 + >>> for i in range(len(C.p)): + ... if C.p[i] == i: + ... index += 1 + >>> index + 1024 + + References + ========== + + .. [1] Holt, D., Eick, B., O'Brien, E. + "Handbook of computational group theory" + + """ + # 1. Initialize a coset table C for < X|R > + C = CosetTable(fp_grp, Y, max_cosets=max_cosets) + # Define coset table methods. + if modified: + _scan_and_fill = C.modified_scan_and_fill + _define = C.modified_define + else: + _scan_and_fill = C.scan_and_fill + _define = C.define + if draft: + C.table = draft.table[:] + C.p = draft.p[:] + R = fp_grp.relators + A_dict = C.A_dict + p = C.p + for i in range(len(Y)): + if modified: + _scan_and_fill(0, Y[i], C._grp.generators[i]) + else: + _scan_and_fill(0, Y[i]) + alpha = 0 + while alpha < C.n: + if p[alpha] == alpha: + try: + for w in R: + if modified: + _scan_and_fill(alpha, w, C._grp.identity) + else: + _scan_and_fill(alpha, w) + # if alpha was eliminated during the scan then break + if p[alpha] < alpha: + break + if p[alpha] == alpha: + for x in A_dict: + if C.table[alpha][A_dict[x]] is None: + _define(alpha, x) + except ValueError as e: + if incomplete: + return C + raise e + alpha += 1 + return C + +def modified_coset_enumeration_r(fp_grp, Y, max_cosets=None, draft=None, + incomplete=False): + r""" + Introduce a new set of symbols y \in Y that correspond to the + generators of the subgroup. Store the elements of Y as a + word P[\alpha, x] and compute the coset table similar to that of + the regular coset enumeration methods. + + Examples + ======== + + >>> from sympy.combinatorics.free_groups import free_group + >>> from sympy.combinatorics.fp_groups import FpGroup + >>> from sympy.combinatorics.coset_table import modified_coset_enumeration_r + >>> F, x, y = free_group("x, y") + >>> f = FpGroup(F, [x**3, y**3, x**-1*y**-1*x*y]) + >>> C = modified_coset_enumeration_r(f, [x]) + >>> C.table + [[0, 0, 1, 2], [1, 1, 2, 0], [2, 2, 0, 1], [None, 1, None, None], [1, 3, None, None]] + + See Also + ======== + + coset_enumertation_r + + References + ========== + + .. [1] Holt, D., Eick, B., O'Brien, E., + "Handbook of Computational Group Theory", + Section 5.3.2 + """ + return coset_enumeration_r(fp_grp, Y, max_cosets=max_cosets, draft=draft, + incomplete=incomplete, modified=True) + +# Pg. 166 +# coset-table based method +def coset_enumeration_c(fp_grp, Y, max_cosets=None, draft=None, + incomplete=False): + """ + >>> from sympy.combinatorics.free_groups import free_group + >>> from sympy.combinatorics.fp_groups import FpGroup, coset_enumeration_c + >>> F, x, y = free_group("x, y") + >>> f = FpGroup(F, [x**3, y**3, x**-1*y**-1*x*y]) + >>> C = coset_enumeration_c(f, [x]) + >>> C.table + [[0, 0, 1, 2], [1, 1, 2, 0], [2, 2, 0, 1]] + + """ + # Initialize a coset table C for < X|R > + X = fp_grp.generators + R = fp_grp.relators + C = CosetTable(fp_grp, Y, max_cosets=max_cosets) + if draft: + C.table = draft.table[:] + C.p = draft.p[:] + C.deduction_stack = draft.deduction_stack + for alpha, x in product(range(len(C.table)), X): + if C.table[alpha][C.A_dict[x]] is not None: + C.deduction_stack.append((alpha, x)) + A = C.A + # replace all the elements by cyclic reductions + R_cyc_red = [rel.identity_cyclic_reduction() for rel in R] + R_c = list(chain.from_iterable((rel.cyclic_conjugates(), (rel**-1).cyclic_conjugates()) \ + for rel in R_cyc_red)) + R_set = set() + for conjugate in R_c: + R_set = R_set.union(conjugate) + # a list of subsets of R_c whose words start with "x". + R_c_list = [] + for x in C.A: + r = {word for word in R_set if word[0] == x} + R_c_list.append(r) + R_set.difference_update(r) + for w in Y: + C.scan_and_fill_c(0, w) + for x in A: + C.process_deductions(R_c_list[C.A_dict[x]], R_c_list[C.A_dict_inv[x]]) + alpha = 0 + while alpha < len(C.table): + if C.p[alpha] == alpha: + try: + for x in C.A: + if C.p[alpha] != alpha: + break + if C.table[alpha][C.A_dict[x]] is None: + C.define_c(alpha, x) + C.process_deductions(R_c_list[C.A_dict[x]], R_c_list[C.A_dict_inv[x]]) + except ValueError as e: + if incomplete: + return C + raise e + alpha += 1 + return C diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/fp_groups.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/fp_groups.py new file mode 100644 index 0000000000000000000000000000000000000000..95530ccd44f025eca5f029c6ba60d3727cbcb29d --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/fp_groups.py @@ -0,0 +1,1352 @@ +"""Finitely Presented Groups and its algorithms. """ + +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.combinatorics.free_groups import (FreeGroup, FreeGroupElement, + free_group) +from sympy.combinatorics.rewritingsystem import RewritingSystem +from sympy.combinatorics.coset_table import (CosetTable, + coset_enumeration_r, + coset_enumeration_c) +from sympy.combinatorics import PermutationGroup +from sympy.matrices.normalforms import invariant_factors +from sympy.matrices import Matrix +from sympy.polys.polytools import gcd +from sympy.printing.defaults import DefaultPrinting +from sympy.utilities import public +from sympy.utilities.magic import pollute + +from itertools import product + + +@public +def fp_group(fr_grp, relators=()): + _fp_group = FpGroup(fr_grp, relators) + return (_fp_group,) + tuple(_fp_group._generators) + +@public +def xfp_group(fr_grp, relators=()): + _fp_group = FpGroup(fr_grp, relators) + return (_fp_group, _fp_group._generators) + +# Does not work. Both symbols and pollute are undefined. Never tested. +@public +def vfp_group(fr_grpm, relators): + _fp_group = FpGroup(symbols, relators) + pollute([sym.name for sym in _fp_group.symbols], _fp_group.generators) + return _fp_group + + +def _parse_relators(rels): + """Parse the passed relators.""" + return rels + + +############################################################################### +# FINITELY PRESENTED GROUPS # +############################################################################### + + +class FpGroup(DefaultPrinting): + """ + The FpGroup would take a FreeGroup and a list/tuple of relators, the + relators would be specified in such a way that each of them be equal to the + identity of the provided free group. + + """ + is_group = True + is_FpGroup = True + is_PermutationGroup = False + + def __init__(self, fr_grp, relators): + relators = _parse_relators(relators) + self.free_group = fr_grp + self.relators = relators + self.generators = self._generators() + self.dtype = type("FpGroupElement", (FpGroupElement,), {"group": self}) + + # CosetTable instance on identity subgroup + self._coset_table = None + # returns whether coset table on identity subgroup + # has been standardized + self._is_standardized = False + + self._order = None + self._center = None + + self._rewriting_system = RewritingSystem(self) + self._perm_isomorphism = None + return + + def _generators(self): + return self.free_group.generators + + def make_confluent(self): + ''' + Try to make the group's rewriting system confluent + + ''' + self._rewriting_system.make_confluent() + return + + def reduce(self, word): + ''' + Return the reduced form of `word` in `self` according to the group's + rewriting system. If it's confluent, the reduced form is the unique normal + form of the word in the group. + + ''' + return self._rewriting_system.reduce(word) + + def equals(self, word1, word2): + ''' + Compare `word1` and `word2` for equality in the group + using the group's rewriting system. If the system is + confluent, the returned answer is necessarily correct. + (If it is not, `False` could be returned in some cases + where in fact `word1 == word2`) + + ''' + if self.reduce(word1*word2**-1) == self.identity: + return True + elif self._rewriting_system.is_confluent: + return False + return None + + @property + def identity(self): + return self.free_group.identity + + def __contains__(self, g): + return g in self.free_group + + def subgroup(self, gens, C=None, homomorphism=False): + ''' + Return the subgroup generated by `gens` using the + Reidemeister-Schreier algorithm + homomorphism -- When set to True, return a dictionary containing the images + of the presentation generators in the original group. + + Examples + ======== + + >>> from sympy.combinatorics.fp_groups import FpGroup + >>> from sympy.combinatorics import free_group + >>> F, x, y = free_group("x, y") + >>> f = FpGroup(F, [x**3, y**5, (x*y)**2]) + >>> H = [x*y, x**-1*y**-1*x*y*x] + >>> K, T = f.subgroup(H, homomorphism=True) + >>> T(K.generators) + [x*y, x**-1*y**2*x**-1] + + ''' + + if not all(isinstance(g, FreeGroupElement) for g in gens): + raise ValueError("Generators must be `FreeGroupElement`s") + if not all(g.group == self.free_group for g in gens): + raise ValueError("Given generators are not members of the group") + if homomorphism: + g, rels, _gens = reidemeister_presentation(self, gens, C=C, homomorphism=True) + else: + g, rels = reidemeister_presentation(self, gens, C=C) + if g: + g = FpGroup(g[0].group, rels) + else: + g = FpGroup(free_group('')[0], []) + if homomorphism: + from sympy.combinatorics.homomorphisms import homomorphism + return g, homomorphism(g, self, g.generators, _gens, check=False) + return g + + def coset_enumeration(self, H, strategy="relator_based", max_cosets=None, + draft=None, incomplete=False): + """ + Return an instance of ``coset table``, when Todd-Coxeter algorithm is + run over the ``self`` with ``H`` as subgroup, using ``strategy`` + argument as strategy. The returned coset table is compressed but not + standardized. + + An instance of `CosetTable` for `fp_grp` can be passed as the keyword + argument `draft` in which case the coset enumeration will start with + that instance and attempt to complete it. + + When `incomplete` is `True` and the function is unable to complete for + some reason, the partially complete table will be returned. + + """ + if not max_cosets: + max_cosets = CosetTable.coset_table_max_limit + if strategy == 'relator_based': + C = coset_enumeration_r(self, H, max_cosets=max_cosets, + draft=draft, incomplete=incomplete) + else: + C = coset_enumeration_c(self, H, max_cosets=max_cosets, + draft=draft, incomplete=incomplete) + if C.is_complete(): + C.compress() + return C + + def standardize_coset_table(self): + """ + Standardized the coset table ``self`` and makes the internal variable + ``_is_standardized`` equal to ``True``. + + """ + self._coset_table.standardize() + self._is_standardized = True + + def coset_table(self, H, strategy="relator_based", max_cosets=None, + draft=None, incomplete=False): + """ + Return the mathematical coset table of ``self`` in ``H``. + + """ + if not H: + if self._coset_table is not None: + if not self._is_standardized: + self.standardize_coset_table() + else: + C = self.coset_enumeration([], strategy, max_cosets=max_cosets, + draft=draft, incomplete=incomplete) + self._coset_table = C + self.standardize_coset_table() + return self._coset_table.table + else: + C = self.coset_enumeration(H, strategy, max_cosets=max_cosets, + draft=draft, incomplete=incomplete) + C.standardize() + return C.table + + def order(self, strategy="relator_based"): + """ + Returns the order of the finitely presented group ``self``. It uses + the coset enumeration with identity group as subgroup, i.e ``H=[]``. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> from sympy.combinatorics.fp_groups import FpGroup + >>> F, x, y = free_group("x, y") + >>> f = FpGroup(F, [x, y**2]) + >>> f.order(strategy="coset_table_based") + 2 + + """ + if self._order is not None: + return self._order + if self._coset_table is not None: + self._order = len(self._coset_table.table) + elif len(self.relators) == 0: + self._order = self.free_group.order() + elif len(self.generators) == 1: + self._order = abs(gcd([r.array_form[0][1] for r in self.relators])) + elif self._is_infinite(): + self._order = S.Infinity + else: + gens, C = self._finite_index_subgroup() + if C: + ind = len(C.table) + self._order = ind*self.subgroup(gens, C=C).order() + else: + self._order = self.index([]) + return self._order + + def _is_infinite(self): + ''' + Test if the group is infinite. Return `True` if the test succeeds + and `None` otherwise + + ''' + used_gens = set() + for r in self.relators: + used_gens.update(r.contains_generators()) + if not set(self.generators) <= used_gens: + return True + # Abelianisation test: check is the abelianisation is infinite + abelian_rels = [] + for rel in self.relators: + abelian_rels.append([rel.exponent_sum(g) for g in self.generators]) + m = Matrix(Matrix(abelian_rels)) + if 0 in invariant_factors(m): + return True + else: + return None + + + def _finite_index_subgroup(self, s=None): + ''' + Find the elements of `self` that generate a finite index subgroup + and, if found, return the list of elements and the coset table of `self` by + the subgroup, otherwise return `(None, None)` + + ''' + gen = self.most_frequent_generator() + rels = list(self.generators) + rels.extend(self.relators) + if not s: + if len(self.generators) == 2: + s = [gen] + [g for g in self.generators if g != gen] + else: + rand = self.free_group.identity + i = 0 + while ((rand in rels or rand**-1 in rels or rand.is_identity) + and i<10): + rand = self.random() + i += 1 + s = [gen, rand] + [g for g in self.generators if g != gen] + mid = (len(s)+1)//2 + half1 = s[:mid] + half2 = s[mid:] + draft1 = None + draft2 = None + m = 200 + C = None + while not C and (m/2 < CosetTable.coset_table_max_limit): + m = min(m, CosetTable.coset_table_max_limit) + draft1 = self.coset_enumeration(half1, max_cosets=m, + draft=draft1, incomplete=True) + if draft1.is_complete(): + C = draft1 + half = half1 + else: + draft2 = self.coset_enumeration(half2, max_cosets=m, + draft=draft2, incomplete=True) + if draft2.is_complete(): + C = draft2 + half = half2 + if not C: + m *= 2 + if not C: + return None, None + C.compress() + return half, C + + def most_frequent_generator(self): + gens = self.generators + rels = self.relators + freqs = [sum(r.generator_count(g) for r in rels) for g in gens] + return gens[freqs.index(max(freqs))] + + def random(self): + import random + r = self.free_group.identity + for i in range(random.randint(2,3)): + r = r*random.choice(self.generators)**random.choice([1,-1]) + return r + + def index(self, H, strategy="relator_based"): + """ + Return the index of subgroup ``H`` in group ``self``. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> from sympy.combinatorics.fp_groups import FpGroup + >>> F, x, y = free_group("x, y") + >>> f = FpGroup(F, [x**5, y**4, y*x*y**3*x**3]) + >>> f.index([x]) + 4 + + """ + # TODO: use |G:H| = |G|/|H| (currently H can't be made into a group) + # when we know |G| and |H| + + if H == []: + return self.order() + else: + C = self.coset_enumeration(H, strategy) + return len(C.table) + + def __str__(self): + if self.free_group.rank > 30: + str_form = "" % self.free_group.rank + else: + str_form = "" % str(self.generators) + return str_form + + __repr__ = __str__ + +#============================================================================== +# PERMUTATION GROUP METHODS +#============================================================================== + + def _to_perm_group(self): + ''' + Return an isomorphic permutation group and the isomorphism. + The implementation is dependent on coset enumeration so + will only terminate for finite groups. + + ''' + from sympy.combinatorics import Permutation + from sympy.combinatorics.homomorphisms import homomorphism + if self.order() is S.Infinity: + raise NotImplementedError("Permutation presentation of infinite " + "groups is not implemented") + if self._perm_isomorphism: + T = self._perm_isomorphism + P = T.image() + else: + C = self.coset_table([]) + gens = self.generators + images = [[C[i][2*gens.index(g)] for i in range(len(C))] for g in gens] + images = [Permutation(i) for i in images] + P = PermutationGroup(images) + T = homomorphism(self, P, gens, images, check=False) + self._perm_isomorphism = T + return P, T + + def _perm_group_list(self, method_name, *args): + ''' + Given the name of a `PermutationGroup` method (returning a subgroup + or a list of subgroups) and (optionally) additional arguments it takes, + return a list or a list of lists containing the generators of this (or + these) subgroups in terms of the generators of `self`. + + ''' + P, T = self._to_perm_group() + perm_result = getattr(P, method_name)(*args) + single = False + if isinstance(perm_result, PermutationGroup): + perm_result, single = [perm_result], True + result = [] + for group in perm_result: + gens = group.generators + result.append(T.invert(gens)) + return result[0] if single else result + + def derived_series(self): + ''' + Return the list of lists containing the generators + of the subgroups in the derived series of `self`. + + ''' + return self._perm_group_list('derived_series') + + def lower_central_series(self): + ''' + Return the list of lists containing the generators + of the subgroups in the lower central series of `self`. + + ''' + return self._perm_group_list('lower_central_series') + + def center(self): + ''' + Return the list of generators of the center of `self`. + + ''' + return self._perm_group_list('center') + + + def derived_subgroup(self): + ''' + Return the list of generators of the derived subgroup of `self`. + + ''' + return self._perm_group_list('derived_subgroup') + + + def centralizer(self, other): + ''' + Return the list of generators of the centralizer of `other` + (a list of elements of `self`) in `self`. + + ''' + T = self._to_perm_group()[1] + other = T(other) + return self._perm_group_list('centralizer', other) + + def normal_closure(self, other): + ''' + Return the list of generators of the normal closure of `other` + (a list of elements of `self`) in `self`. + + ''' + T = self._to_perm_group()[1] + other = T(other) + return self._perm_group_list('normal_closure', other) + + def _perm_property(self, attr): + ''' + Given an attribute of a `PermutationGroup`, return + its value for a permutation group isomorphic to `self`. + + ''' + P = self._to_perm_group()[0] + return getattr(P, attr) + + @property + def is_abelian(self): + ''' + Check if `self` is abelian. + + ''' + return self._perm_property("is_abelian") + + @property + def is_nilpotent(self): + ''' + Check if `self` is nilpotent. + + ''' + return self._perm_property("is_nilpotent") + + @property + def is_solvable(self): + ''' + Check if `self` is solvable. + + ''' + return self._perm_property("is_solvable") + + @property + def elements(self): + ''' + List the elements of `self`. + + ''' + P, T = self._to_perm_group() + return T.invert(P.elements) + + @property + def is_cyclic(self): + """ + Return ``True`` if group is Cyclic. + + """ + if len(self.generators) <= 1: + return True + try: + P, T = self._to_perm_group() + except NotImplementedError: + raise NotImplementedError("Check for infinite Cyclic group " + "is not implemented") + return P.is_cyclic + + def abelian_invariants(self): + """ + Return Abelian Invariants of a group. + """ + try: + P, T = self._to_perm_group() + except NotImplementedError: + raise NotImplementedError("abelian invariants is not implemented" + "for infinite group") + return P.abelian_invariants() + + def composition_series(self): + """ + Return subnormal series of maximum length for a group. + """ + try: + P, T = self._to_perm_group() + except NotImplementedError: + raise NotImplementedError("composition series is not implemented" + "for infinite group") + return P.composition_series() + + +class FpSubgroup(DefaultPrinting): + ''' + The class implementing a subgroup of an FpGroup or a FreeGroup + (only finite index subgroups are supported at this point). This + is to be used if one wishes to check if an element of the original + group belongs to the subgroup + + ''' + def __init__(self, G, gens, normal=False): + super().__init__() + self.parent = G + self.generators = list({g for g in gens if g != G.identity}) + self._min_words = None #for use in __contains__ + self.C = None + self.normal = normal + + def __contains__(self, g): + + if isinstance(self.parent, FreeGroup): + if self._min_words is None: + # make _min_words - a list of subwords such that + # g is in the subgroup if and only if it can be + # partitioned into these subwords. Infinite families of + # subwords are presented by tuples, e.g. (r, w) + # stands for the family of subwords r*w**n*r**-1 + + def _process(w): + # this is to be used before adding new words + # into _min_words; if the word w is not cyclically + # reduced, it will generate an infinite family of + # subwords so should be written as a tuple; + # if it is, w**-1 should be added to the list + # as well + p, r = w.cyclic_reduction(removed=True) + if not r.is_identity: + return [(r, p)] + else: + return [w, w**-1] + + # make the initial list + gens = [] + for w in self.generators: + if self.normal: + w = w.cyclic_reduction() + gens.extend(_process(w)) + + for w1 in gens: + for w2 in gens: + # if w1 and w2 are equal or are inverses, continue + if w1 == w2 or (not isinstance(w1, tuple) + and w1**-1 == w2): + continue + + # if the start of one word is the inverse of the + # end of the other, their multiple should be added + # to _min_words because of cancellation + if isinstance(w1, tuple): + # start, end + s1, s2 = w1[0][0], w1[0][0]**-1 + else: + s1, s2 = w1[0], w1[len(w1)-1] + + if isinstance(w2, tuple): + # start, end + r1, r2 = w2[0][0], w2[0][0]**-1 + else: + r1, r2 = w2[0], w2[len(w1)-1] + + # p1 and p2 are w1 and w2 or, in case when + # w1 or w2 is an infinite family, a representative + p1, p2 = w1, w2 + if isinstance(w1, tuple): + p1 = w1[0]*w1[1]*w1[0]**-1 + if isinstance(w2, tuple): + p2 = w2[0]*w2[1]*w2[0]**-1 + + # add the product of the words to the list is necessary + if r1**-1 == s2 and not (p1*p2).is_identity: + new = _process(p1*p2) + if new not in gens: + gens.extend(new) + + if r2**-1 == s1 and not (p2*p1).is_identity: + new = _process(p2*p1) + if new not in gens: + gens.extend(new) + + self._min_words = gens + + min_words = self._min_words + + def _is_subword(w): + # check if w is a word in _min_words or one of + # the infinite families in it + w, r = w.cyclic_reduction(removed=True) + if r.is_identity or self.normal: + return w in min_words + else: + t = [s[1] for s in min_words if isinstance(s, tuple) + and s[0] == r] + return [s for s in t if w.power_of(s)] != [] + + # store the solution of words for which the result of + # _word_break (below) is known + known = {} + + def _word_break(w): + # check if w can be written as a product of words + # in min_words + if len(w) == 0: + return True + i = 0 + while i < len(w): + i += 1 + prefix = w.subword(0, i) + if not _is_subword(prefix): + continue + rest = w.subword(i, len(w)) + if rest not in known: + known[rest] = _word_break(rest) + if known[rest]: + return True + return False + + if self.normal: + g = g.cyclic_reduction() + return _word_break(g) + else: + if self.C is None: + C = self.parent.coset_enumeration(self.generators) + self.C = C + i = 0 + C = self.C + for j in range(len(g)): + i = C.table[i][C.A_dict[g[j]]] + return i == 0 + + def order(self): + if not self.generators: + return S.One + if isinstance(self.parent, FreeGroup): + return S.Infinity + if self.C is None: + C = self.parent.coset_enumeration(self.generators) + self.C = C + # This is valid because `len(self.C.table)` (the index of the subgroup) + # will always be finite - otherwise coset enumeration doesn't terminate + return self.parent.order()/len(self.C.table) + + def to_FpGroup(self): + if isinstance(self.parent, FreeGroup): + gen_syms = [('x_%d'%i) for i in range(len(self.generators))] + return free_group(', '.join(gen_syms))[0] + return self.parent.subgroup(C=self.C) + + def __str__(self): + if len(self.generators) > 30: + str_form = "" % len(self.generators) + else: + str_form = "" % str(self.generators) + return str_form + + __repr__ = __str__ + + +############################################################################### +# LOW INDEX SUBGROUPS # +############################################################################### + +def low_index_subgroups(G, N, Y=()): + """ + Implements the Low Index Subgroups algorithm, i.e find all subgroups of + ``G`` upto a given index ``N``. This implements the method described in + [Sim94]. This procedure involves a backtrack search over incomplete Coset + Tables, rather than over forced coincidences. + + Parameters + ========== + + G: An FpGroup < X|R > + N: positive integer, representing the maximum index value for subgroups + Y: (an optional argument) specifying a list of subgroup generators, such + that each of the resulting subgroup contains the subgroup generated by Y. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> from sympy.combinatorics.fp_groups import FpGroup, low_index_subgroups + >>> F, x, y = free_group("x, y") + >>> f = FpGroup(F, [x**2, y**3, (x*y)**4]) + >>> L = low_index_subgroups(f, 4) + >>> for coset_table in L: + ... print(coset_table.table) + [[0, 0, 0, 0]] + [[0, 0, 1, 2], [1, 1, 2, 0], [3, 3, 0, 1], [2, 2, 3, 3]] + [[0, 0, 1, 2], [2, 2, 2, 0], [1, 1, 0, 1]] + [[1, 1, 0, 0], [0, 0, 1, 1]] + + References + ========== + + .. [1] Holt, D., Eick, B., O'Brien, E. + "Handbook of Computational Group Theory" + Section 5.4 + + .. [2] Marston Conder and Peter Dobcsanyi + "Applications and Adaptions of the Low Index Subgroups Procedure" + + """ + C = CosetTable(G, []) + R = G.relators + # length chosen for the length of the short relators + len_short_rel = 5 + # elements of R2 only checked at the last step for complete + # coset tables + R2 = {rel for rel in R if len(rel) > len_short_rel} + # elements of R1 are used in inner parts of the process to prune + # branches of the search tree, + R1 = {rel.identity_cyclic_reduction() for rel in set(R) - R2} + R1_c_list = C.conjugates(R1) + S = [] + descendant_subgroups(S, C, R1_c_list, C.A[0], R2, N, Y) + return S + + +def descendant_subgroups(S, C, R1_c_list, x, R2, N, Y): + A_dict = C.A_dict + A_dict_inv = C.A_dict_inv + if C.is_complete(): + # if C is complete then it only needs to test + # whether the relators in R2 are satisfied + for w, alpha in product(R2, C.omega): + if not C.scan_check(alpha, w): + return + # relators in R2 are satisfied, append the table to list + S.append(C) + else: + # find the first undefined entry in Coset Table + for alpha, x in product(range(len(C.table)), C.A): + if C.table[alpha][A_dict[x]] is None: + # this is "x" in pseudo-code (using "y" makes it clear) + undefined_coset, undefined_gen = alpha, x + break + # for filling up the undefine entry we try all possible values + # of beta in Omega or beta = n where beta^(undefined_gen^-1) is undefined + reach = C.omega + [C.n] + for beta in reach: + if beta < N: + if beta == C.n or C.table[beta][A_dict_inv[undefined_gen]] is None: + try_descendant(S, C, R1_c_list, R2, N, undefined_coset, \ + undefined_gen, beta, Y) + + +def try_descendant(S, C, R1_c_list, R2, N, alpha, x, beta, Y): + r""" + Solves the problem of trying out each individual possibility + for `\alpha^x. + + """ + D = C.copy() + if beta == D.n and beta < N: + D.table.append([None]*len(D.A)) + D.p.append(beta) + D.table[alpha][D.A_dict[x]] = beta + D.table[beta][D.A_dict_inv[x]] = alpha + D.deduction_stack.append((alpha, x)) + if not D.process_deductions_check(R1_c_list[D.A_dict[x]], \ + R1_c_list[D.A_dict_inv[x]]): + return + for w in Y: + if not D.scan_check(0, w): + return + if first_in_class(D, Y): + descendant_subgroups(S, D, R1_c_list, x, R2, N, Y) + + +def first_in_class(C, Y=()): + """ + Checks whether the subgroup ``H=G1`` corresponding to the Coset Table + could possibly be the canonical representative of its conjugacy class. + + Parameters + ========== + + C: CosetTable + + Returns + ======= + + bool: True/False + + If this returns False, then no descendant of C can have that property, and + so we can abandon C. If it returns True, then we need to process further + the node of the search tree corresponding to C, and so we call + ``descendant_subgroups`` recursively on C. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> from sympy.combinatorics.fp_groups import FpGroup, CosetTable, first_in_class + >>> F, x, y = free_group("x, y") + >>> f = FpGroup(F, [x**2, y**3, (x*y)**4]) + >>> C = CosetTable(f, []) + >>> C.table = [[0, 0, None, None]] + >>> first_in_class(C) + True + >>> C.table = [[1, 1, 1, None], [0, 0, None, 1]]; C.p = [0, 1] + >>> first_in_class(C) + True + >>> C.table = [[1, 1, 2, 1], [0, 0, 0, None], [None, None, None, 0]] + >>> C.p = [0, 1, 2] + >>> first_in_class(C) + False + >>> C.table = [[1, 1, 1, 2], [0, 0, 2, 0], [2, None, 0, 1]] + >>> first_in_class(C) + False + + # TODO:: Sims points out in [Sim94] that performance can be improved by + # remembering some of the information computed by ``first_in_class``. If + # the ``continue alpha`` statement is executed at line 14, then the same thing + # will happen for that value of alpha in any descendant of the table C, and so + # the values the values of alpha for which this occurs could profitably be + # stored and passed through to the descendants of C. Of course this would + # make the code more complicated. + + # The code below is taken directly from the function on page 208 of [Sim94] + # nu[alpha] + + """ + n = C.n + # lamda is the largest numbered point in Omega_c_alpha which is currently defined + lamda = -1 + # for alpha in Omega_c, nu[alpha] is the point in Omega_c_alpha corresponding to alpha + nu = [None]*n + # for alpha in Omega_c_alpha, mu[alpha] is the point in Omega_c corresponding to alpha + mu = [None]*n + # mutually nu and mu are the mutually-inverse equivalence maps between + # Omega_c_alpha and Omega_c + next_alpha = False + # For each 0!=alpha in [0 .. nc-1], we start by constructing the equivalent + # standardized coset table C_alpha corresponding to H_alpha + for alpha in range(1, n): + # reset nu to "None" after previous value of alpha + for beta in range(lamda+1): + nu[mu[beta]] = None + # we only want to reject our current table in favour of a preceding + # table in the ordering in which 1 is replaced by alpha, if the subgroup + # G_alpha corresponding to this preceding table definitely contains the + # given subgroup + for w in Y: + # TODO: this should support input of a list of general words + # not just the words which are in "A" (i.e gen and gen^-1) + if C.table[alpha][C.A_dict[w]] != alpha: + # continue with alpha + next_alpha = True + break + if next_alpha: + next_alpha = False + continue + # try alpha as the new point 0 in Omega_C_alpha + mu[0] = alpha + nu[alpha] = 0 + # compare corresponding entries in C and C_alpha + lamda = 0 + for beta in range(n): + for x in C.A: + gamma = C.table[beta][C.A_dict[x]] + delta = C.table[mu[beta]][C.A_dict[x]] + # if either of the entries is undefined, + # we move with next alpha + if gamma is None or delta is None: + # continue with alpha + next_alpha = True + break + if nu[delta] is None: + # delta becomes the next point in Omega_C_alpha + lamda += 1 + nu[delta] = lamda + mu[lamda] = delta + if nu[delta] < gamma: + return False + if nu[delta] > gamma: + # continue with alpha + next_alpha = True + break + if next_alpha: + next_alpha = False + break + return True + +#======================================================================== +# Simplifying Presentation +#======================================================================== + +def simplify_presentation(*args, change_gens=False): + ''' + For an instance of `FpGroup`, return a simplified isomorphic copy of + the group (e.g. remove redundant generators or relators). Alternatively, + a list of generators and relators can be passed in which case the + simplified lists will be returned. + + By default, the generators of the group are unchanged. If you would + like to remove redundant generators, set the keyword argument + `change_gens = True`. + + ''' + if len(args) == 1: + if not isinstance(args[0], FpGroup): + raise TypeError("The argument must be an instance of FpGroup") + G = args[0] + gens, rels = simplify_presentation(G.generators, G.relators, + change_gens=change_gens) + if gens: + return FpGroup(gens[0].group, rels) + return FpGroup(FreeGroup([]), []) + elif len(args) == 2: + gens, rels = args[0][:], args[1][:] + if not gens: + return gens, rels + identity = gens[0].group.identity + else: + if len(args) == 0: + m = "Not enough arguments" + else: + m = "Too many arguments" + raise RuntimeError(m) + + prev_gens = [] + prev_rels = [] + while not set(prev_rels) == set(rels): + prev_rels = rels + while change_gens and not set(prev_gens) == set(gens): + prev_gens = gens + gens, rels = elimination_technique_1(gens, rels, identity) + rels = _simplify_relators(rels) + + if change_gens: + syms = [g.array_form[0][0] for g in gens] + F = free_group(syms)[0] + identity = F.identity + gens = F.generators + subs = dict(zip(syms, gens)) + for j, r in enumerate(rels): + a = r.array_form + rel = identity + for sym, p in a: + rel = rel*subs[sym]**p + rels[j] = rel + return gens, rels + +def _simplify_relators(rels): + """ + Simplifies a set of relators. All relators are checked to see if they are + of the form `gen^n`. If any such relators are found then all other relators + are processed for strings in the `gen` known order. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> from sympy.combinatorics.fp_groups import _simplify_relators + >>> F, x, y = free_group("x, y") + >>> w1 = [x**2*y**4, x**3] + >>> _simplify_relators(w1) + [x**3, x**-1*y**4] + + >>> w2 = [x**2*y**-4*x**5, x**3, x**2*y**8, y**5] + >>> _simplify_relators(w2) + [x**-1*y**-2, x**-1*y*x**-1, x**3, y**5] + + >>> w3 = [x**6*y**4, x**4] + >>> _simplify_relators(w3) + [x**4, x**2*y**4] + + >>> w4 = [x**2, x**5, y**3] + >>> _simplify_relators(w4) + [x, y**3] + + """ + rels = rels[:] + + if not rels: + return [] + + identity = rels[0].group.identity + + # build dictionary with "gen: n" where gen^n is one of the relators + exps = {} + for i in range(len(rels)): + rel = rels[i] + if rel.number_syllables() == 1: + g = rel[0] + exp = abs(rel.array_form[0][1]) + if rel.array_form[0][1] < 0: + rels[i] = rels[i]**-1 + g = g**-1 + if g in exps: + exp = gcd(exp, exps[g].array_form[0][1]) + exps[g] = g**exp + + one_syllables_words = list(exps.values()) + # decrease some of the exponents in relators, making use of the single + # syllable relators + for i, rel in enumerate(rels): + if rel in one_syllables_words: + continue + rel = rel.eliminate_words(one_syllables_words, _all = True) + # if rels[i] contains g**n where abs(n) is greater than half of the power p + # of g in exps, g**n can be replaced by g**(n-p) (or g**(p-n) if n<0) + for g in rel.contains_generators(): + if g in exps: + exp = exps[g].array_form[0][1] + max_exp = (exp + 1)//2 + rel = rel.eliminate_word(g**(max_exp), g**(max_exp-exp), _all = True) + rel = rel.eliminate_word(g**(-max_exp), g**(-(max_exp-exp)), _all = True) + rels[i] = rel + + rels = [r.identity_cyclic_reduction() for r in rels] + + rels += one_syllables_words # include one_syllable_words in the list of relators + rels = list(set(rels)) # get unique values in rels + rels.sort() + + # remove entries in rels + try: + rels.remove(identity) + except ValueError: + pass + return rels + +# Pg 350, section 2.5.1 from [2] +def elimination_technique_1(gens, rels, identity): + rels = rels[:] + # the shorter relators are examined first so that generators selected for + # elimination will have shorter strings as equivalent + rels.sort() + gens = gens[:] + redundant_gens = {} + redundant_rels = [] + used_gens = set() + # examine each relator in relator list for any generator occurring exactly + # once + for rel in rels: + # don't look for a redundant generator in a relator which + # depends on previously found ones + contained_gens = rel.contains_generators() + if any(g in contained_gens for g in redundant_gens): + continue + contained_gens = list(contained_gens) + contained_gens.sort(reverse = True) + for gen in contained_gens: + if rel.generator_count(gen) == 1 and gen not in used_gens: + k = rel.exponent_sum(gen) + gen_index = rel.index(gen**k) + bk = rel.subword(gen_index + 1, len(rel)) + fw = rel.subword(0, gen_index) + chi = bk*fw + redundant_gens[gen] = chi**(-1*k) + used_gens.update(chi.contains_generators()) + redundant_rels.append(rel) + break + rels = [r for r in rels if r not in redundant_rels] + # eliminate the redundant generators from remaining relators + rels = [r.eliminate_words(redundant_gens, _all = True).identity_cyclic_reduction() for r in rels] + rels = list(set(rels)) + try: + rels.remove(identity) + except ValueError: + pass + gens = [g for g in gens if g not in redundant_gens] + return gens, rels + +############################################################################### +# SUBGROUP PRESENTATIONS # +############################################################################### + +# Pg 175 [1] +def define_schreier_generators(C, homomorphism=False): + ''' + Parameters + ========== + + C -- Coset table. + homomorphism -- When set to True, return a dictionary containing the images + of the presentation generators in the original group. + ''' + y = [] + gamma = 1 + f = C.fp_group + X = f.generators + if homomorphism: + # `_gens` stores the elements of the parent group to + # to which the schreier generators correspond to. + _gens = {} + # compute the schreier Traversal + tau = {} + tau[0] = f.identity + C.P = [[None]*len(C.A) for i in range(C.n)] + for alpha, x in product(C.omega, C.A): + beta = C.table[alpha][C.A_dict[x]] + if beta == gamma: + C.P[alpha][C.A_dict[x]] = "" + C.P[beta][C.A_dict_inv[x]] = "" + gamma += 1 + if homomorphism: + tau[beta] = tau[alpha]*x + elif x in X and C.P[alpha][C.A_dict[x]] is None: + y_alpha_x = '%s_%s' % (x, alpha) + y.append(y_alpha_x) + C.P[alpha][C.A_dict[x]] = y_alpha_x + if homomorphism: + _gens[y_alpha_x] = tau[alpha]*x*tau[beta]**-1 + grp_gens = list(free_group(', '.join(y))) + C._schreier_free_group = grp_gens.pop(0) + C._schreier_generators = grp_gens + if homomorphism: + C._schreier_gen_elem = _gens + # replace all elements of P by, free group elements + for i, j in product(range(len(C.P)), range(len(C.A))): + # if equals "", replace by identity element + if C.P[i][j] == "": + C.P[i][j] = C._schreier_free_group.identity + elif isinstance(C.P[i][j], str): + r = C._schreier_generators[y.index(C.P[i][j])] + C.P[i][j] = r + beta = C.table[i][j] + C.P[beta][j + 1] = r**-1 + +def reidemeister_relators(C): + R = C.fp_group.relators + rels = [rewrite(C, coset, word) for word in R for coset in range(C.n)] + order_1_gens = {i for i in rels if len(i) == 1} + + # remove all the order 1 generators from relators + rels = list(filter(lambda rel: rel not in order_1_gens, rels)) + + # replace order 1 generators by identity element in reidemeister relators + for i in range(len(rels)): + w = rels[i] + w = w.eliminate_words(order_1_gens, _all=True) + rels[i] = w + + C._schreier_generators = [i for i in C._schreier_generators + if not (i in order_1_gens or i**-1 in order_1_gens)] + + # Tietze transformation 1 i.e TT_1 + # remove cyclic conjugate elements from relators + i = 0 + while i < len(rels): + w = rels[i] + j = i + 1 + while j < len(rels): + if w.is_cyclic_conjugate(rels[j]): + del rels[j] + else: + j += 1 + i += 1 + + C._reidemeister_relators = rels + + +def rewrite(C, alpha, w): + """ + Parameters + ========== + + C: CosetTable + alpha: A live coset + w: A word in `A*` + + Returns + ======= + + rho(tau(alpha), w) + + Examples + ======== + + >>> from sympy.combinatorics.fp_groups import FpGroup, CosetTable, define_schreier_generators, rewrite + >>> from sympy.combinatorics import free_group + >>> F, x, y = free_group("x, y") + >>> f = FpGroup(F, [x**2, y**3, (x*y)**6]) + >>> C = CosetTable(f, []) + >>> C.table = [[1, 1, 2, 3], [0, 0, 4, 5], [4, 4, 3, 0], [5, 5, 0, 2], [2, 2, 5, 1], [3, 3, 1, 4]] + >>> C.p = [0, 1, 2, 3, 4, 5] + >>> define_schreier_generators(C) + >>> rewrite(C, 0, (x*y)**6) + x_4*y_2*x_3*x_1*x_2*y_4*x_5 + + """ + v = C._schreier_free_group.identity + for i in range(len(w)): + x_i = w[i] + v = v*C.P[alpha][C.A_dict[x_i]] + alpha = C.table[alpha][C.A_dict[x_i]] + return v + +# Pg 350, section 2.5.2 from [2] +def elimination_technique_2(C): + """ + This technique eliminates one generator at a time. Heuristically this + seems superior in that we may select for elimination the generator with + shortest equivalent string at each stage. + + >>> from sympy.combinatorics import free_group + >>> from sympy.combinatorics.fp_groups import FpGroup, coset_enumeration_r, \ + reidemeister_relators, define_schreier_generators, elimination_technique_2 + >>> F, x, y = free_group("x, y") + >>> f = FpGroup(F, [x**3, y**5, (x*y)**2]); H = [x*y, x**-1*y**-1*x*y*x] + >>> C = coset_enumeration_r(f, H) + >>> C.compress(); C.standardize() + >>> define_schreier_generators(C) + >>> reidemeister_relators(C) + >>> elimination_technique_2(C) + ([y_1, y_2], [y_2**-3, y_2*y_1*y_2*y_1*y_2*y_1, y_1**2]) + + """ + rels = C._reidemeister_relators + rels.sort(reverse=True) + gens = C._schreier_generators + for i in range(len(gens) - 1, -1, -1): + rel = rels[i] + for j in range(len(gens) - 1, -1, -1): + gen = gens[j] + if rel.generator_count(gen) == 1: + k = rel.exponent_sum(gen) + gen_index = rel.index(gen**k) + bk = rel.subword(gen_index + 1, len(rel)) + fw = rel.subword(0, gen_index) + rep_by = (bk*fw)**(-1*k) + del rels[i] + del gens[j] + rels = [rel.eliminate_word(gen, rep_by) for rel in rels] + break + C._reidemeister_relators = rels + C._schreier_generators = gens + return C._schreier_generators, C._reidemeister_relators + +def reidemeister_presentation(fp_grp, H, C=None, homomorphism=False): + """ + Parameters + ========== + + fp_group: A finitely presented group, an instance of FpGroup + H: A subgroup whose presentation is to be found, given as a list + of words in generators of `fp_grp` + homomorphism: When set to True, return a homomorphism from the subgroup + to the parent group + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> from sympy.combinatorics.fp_groups import FpGroup, reidemeister_presentation + >>> F, x, y = free_group("x, y") + + Example 5.6 Pg. 177 from [1] + >>> f = FpGroup(F, [x**3, y**5, (x*y)**2]) + >>> H = [x*y, x**-1*y**-1*x*y*x] + >>> reidemeister_presentation(f, H) + ((y_1, y_2), (y_1**2, y_2**3, y_2*y_1*y_2*y_1*y_2*y_1)) + + Example 5.8 Pg. 183 from [1] + >>> f = FpGroup(F, [x**3, y**3, (x*y)**3]) + >>> H = [x*y, x*y**-1] + >>> reidemeister_presentation(f, H) + ((x_0, y_0), (x_0**3, y_0**3, x_0*y_0*x_0*y_0*x_0*y_0)) + + Exercises Q2. Pg 187 from [1] + >>> f = FpGroup(F, [x**2*y**2, y**-1*x*y*x**-3]) + >>> H = [x] + >>> reidemeister_presentation(f, H) + ((x_0,), (x_0**4,)) + + Example 5.9 Pg. 183 from [1] + >>> f = FpGroup(F, [x**3*y**-3, (x*y)**3, (x*y**-1)**2]) + >>> H = [x] + >>> reidemeister_presentation(f, H) + ((x_0,), (x_0**6,)) + + """ + if not C: + C = coset_enumeration_r(fp_grp, H) + C.compress(); C.standardize() + define_schreier_generators(C, homomorphism=homomorphism) + reidemeister_relators(C) + gens, rels = C._schreier_generators, C._reidemeister_relators + gens, rels = simplify_presentation(gens, rels, change_gens=True) + + C.schreier_generators = tuple(gens) + C.reidemeister_relators = tuple(rels) + + if homomorphism: + _gens = [C._schreier_gen_elem[str(gen)] for gen in gens] + return C.schreier_generators, C.reidemeister_relators, _gens + + return C.schreier_generators, C.reidemeister_relators + + +FpGroupElement = FreeGroupElement diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/free_groups.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/free_groups.py new file mode 100644 index 0000000000000000000000000000000000000000..2ec85f4fac73fba95d4644a37ecb27140e45a4c5 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/free_groups.py @@ -0,0 +1,1360 @@ +from __future__ import annotations + +from sympy.core import S +from sympy.core.expr import Expr +from sympy.core.symbol import Symbol, symbols as _symbols +from sympy.core.sympify import CantSympify +from sympy.printing.defaults import DefaultPrinting +from sympy.utilities import public +from sympy.utilities.iterables import flatten, is_sequence +from sympy.utilities.magic import pollute +from sympy.utilities.misc import as_int + + +@public +def free_group(symbols): + """Construct a free group returning ``(FreeGroup, (f_0, f_1, ..., f_(n-1))``. + + Parameters + ========== + + symbols : str, Symbol/Expr or sequence of str, Symbol/Expr (may be empty) + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> F, x, y, z = free_group("x, y, z") + >>> F + + >>> x**2*y**-1 + x**2*y**-1 + >>> type(_) + + + """ + _free_group = FreeGroup(symbols) + return (_free_group,) + tuple(_free_group.generators) + +@public +def xfree_group(symbols): + """Construct a free group returning ``(FreeGroup, (f_0, f_1, ..., f_(n-1)))``. + + Parameters + ========== + + symbols : str, Symbol/Expr or sequence of str, Symbol/Expr (may be empty) + + Examples + ======== + + >>> from sympy.combinatorics.free_groups import xfree_group + >>> F, (x, y, z) = xfree_group("x, y, z") + >>> F + + >>> y**2*x**-2*z**-1 + y**2*x**-2*z**-1 + >>> type(_) + + + """ + _free_group = FreeGroup(symbols) + return (_free_group, _free_group.generators) + +@public +def vfree_group(symbols): + """Construct a free group and inject ``f_0, f_1, ..., f_(n-1)`` as symbols + into the global namespace. + + Parameters + ========== + + symbols : str, Symbol/Expr or sequence of str, Symbol/Expr (may be empty) + + Examples + ======== + + >>> from sympy.combinatorics.free_groups import vfree_group + >>> vfree_group("x, y, z") + + >>> x**2*y**-2*z # noqa: F821 + x**2*y**-2*z + >>> type(_) + + + """ + _free_group = FreeGroup(symbols) + pollute([sym.name for sym in _free_group.symbols], _free_group.generators) + return _free_group + + +def _parse_symbols(symbols): + if not symbols: + return () + if isinstance(symbols, str): + return _symbols(symbols, seq=True) + elif isinstance(symbols, (Expr, FreeGroupElement)): + return (symbols,) + elif is_sequence(symbols): + if all(isinstance(s, str) for s in symbols): + return _symbols(symbols) + elif all(isinstance(s, Expr) for s in symbols): + return symbols + raise ValueError("The type of `symbols` must be one of the following: " + "a str, Symbol/Expr or a sequence of " + "one of these types") + + +############################################################################## +# FREE GROUP # +############################################################################## + +_free_group_cache: dict[int, FreeGroup] = {} + +class FreeGroup(DefaultPrinting): + """ + Free group with finite or infinite number of generators. Its input API + is that of a str, Symbol/Expr or a sequence of one of + these types (which may be empty) + + See Also + ======== + + sympy.polys.rings.PolyRing + + References + ========== + + .. [1] https://www.gap-system.org/Manuals/doc/ref/chap37.html + + .. [2] https://en.wikipedia.org/wiki/Free_group + + """ + is_associative = True + is_group = True + is_FreeGroup = True + is_PermutationGroup = False + relators: list[Expr] = [] + + def __new__(cls, symbols): + symbols = tuple(_parse_symbols(symbols)) + rank = len(symbols) + _hash = hash((cls.__name__, symbols, rank)) + obj = _free_group_cache.get(_hash) + + if obj is None: + obj = object.__new__(cls) + obj._hash = _hash + obj._rank = rank + # dtype method is used to create new instances of FreeGroupElement + obj.dtype = type("FreeGroupElement", (FreeGroupElement,), {"group": obj}) + obj.symbols = symbols + obj.generators = obj._generators() + obj._gens_set = set(obj.generators) + for symbol, generator in zip(obj.symbols, obj.generators): + if isinstance(symbol, Symbol): + name = symbol.name + if hasattr(obj, name): + setattr(obj, name, generator) + + _free_group_cache[_hash] = obj + + return obj + + def __getnewargs__(self): + """Return a tuple of arguments that must be passed to __new__ in order to support pickling this object.""" + return (self.symbols,) + + def __getstate__(self): + # Don't pickle any fields because they are regenerated within __new__ + return None + + def _generators(group): + """Returns the generators of the FreeGroup. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> F, x, y, z = free_group("x, y, z") + >>> F.generators + (x, y, z) + + """ + gens = [] + for sym in group.symbols: + elm = ((sym, 1),) + gens.append(group.dtype(elm)) + return tuple(gens) + + def clone(self, symbols=None): + return self.__class__(symbols or self.symbols) + + def __contains__(self, i): + """Return True if ``i`` is contained in FreeGroup.""" + if not isinstance(i, FreeGroupElement): + return False + group = i.group + return self == group + + def __hash__(self): + return self._hash + + def __len__(self): + return self.rank + + def __str__(self): + if self.rank > 30: + str_form = "" % self.rank + else: + str_form = "" + return str_form + + __repr__ = __str__ + + def __getitem__(self, index): + symbols = self.symbols[index] + return self.clone(symbols=symbols) + + def __eq__(self, other): + """No ``FreeGroup`` is equal to any "other" ``FreeGroup``. + """ + return self is other + + def index(self, gen): + """Return the index of the generator `gen` from ``(f_0, ..., f_(n-1))``. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> F, x, y = free_group("x, y") + >>> F.index(y) + 1 + >>> F.index(x) + 0 + + """ + if isinstance(gen, self.dtype): + return self.generators.index(gen) + else: + raise ValueError("expected a generator of Free Group %s, got %s" % (self, gen)) + + def order(self): + """Return the order of the free group. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> F, x, y = free_group("x, y") + >>> F.order() + oo + + >>> free_group("")[0].order() + 1 + + """ + if self.rank == 0: + return S.One + else: + return S.Infinity + + @property + def elements(self): + """ + Return the elements of the free group. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> (z,) = free_group("") + >>> z.elements + {} + + """ + if self.rank == 0: + # A set containing Identity element of `FreeGroup` self is returned + return {self.identity} + else: + raise ValueError("Group contains infinitely many elements" + ", hence cannot be represented") + + @property + def rank(self): + r""" + In group theory, the `rank` of a group `G`, denoted `G.rank`, + can refer to the smallest cardinality of a generating set + for G, that is + + \operatorname{rank}(G)=\min\{ |X|: X\subseteq G, \left\langle X\right\rangle =G\}. + + """ + return self._rank + + @property + def is_abelian(self): + """Returns if the group is Abelian. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, x, y, z = free_group("x y z") + >>> f.is_abelian + False + + """ + return self.rank in (0, 1) + + @property + def identity(self): + """Returns the identity element of free group.""" + return self.dtype() + + def contains(self, g): + """Tests if Free Group element ``g`` belong to self, ``G``. + + In mathematical terms any linear combination of generators + of a Free Group is contained in it. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, x, y, z = free_group("x y z") + >>> f.contains(x**3*y**2) + True + + """ + if not isinstance(g, FreeGroupElement): + return False + elif self != g.group: + return False + else: + return True + + def center(self): + """Returns the center of the free group `self`.""" + return {self.identity} + + +############################################################################ +# FreeGroupElement # +############################################################################ + + +class FreeGroupElement(CantSympify, DefaultPrinting, tuple): + """Used to create elements of FreeGroup. It cannot be used directly to + create a free group element. It is called by the `dtype` method of the + `FreeGroup` class. + + """ + __slots__ = () + is_assoc_word = True + + def new(self, init): + return self.__class__(init) + + _hash = None + + def __hash__(self): + _hash = self._hash + if _hash is None: + self._hash = _hash = hash((self.group, frozenset(tuple(self)))) + return _hash + + def copy(self): + return self.new(self) + + @property + def is_identity(self): + return not self.array_form + + @property + def array_form(self): + """ + SymPy provides two different internal kinds of representation + of associative words. The first one is called the `array_form` + which is a tuple containing `tuples` as its elements, where the + size of each tuple is two. At the first position the tuple + contains the `symbol-generator`, while at the second position + of tuple contains the exponent of that generator at the position. + Since elements (i.e. words) do not commute, the indexing of tuple + makes that property to stay. + + The structure in ``array_form`` of ``FreeGroupElement`` is of form: + + ``( ( symbol_of_gen, exponent ), ( , ), ... ( , ) )`` + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, x, y, z = free_group("x y z") + >>> (x*z).array_form + ((x, 1), (z, 1)) + >>> (x**2*z*y*x**2).array_form + ((x, 2), (z, 1), (y, 1), (x, 2)) + + See Also + ======== + + letter_repr + + """ + return tuple(self) + + @property + def letter_form(self): + """ + The letter representation of a ``FreeGroupElement`` is a tuple + of generator symbols, with each entry corresponding to a group + generator. Inverses of the generators are represented by + negative generator symbols. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, a, b, c, d = free_group("a b c d") + >>> (a**3).letter_form + (a, a, a) + >>> (a**2*d**-2*a*b**-4).letter_form + (a, a, -d, -d, a, -b, -b, -b, -b) + >>> (a**-2*b**3*d).letter_form + (-a, -a, b, b, b, d) + + See Also + ======== + + array_form + + """ + return tuple(flatten([(i,)*j if j > 0 else (-i,)*(-j) + for i, j in self.array_form])) + + def __getitem__(self, i): + group = self.group + r = self.letter_form[i] + if r.is_Symbol: + return group.dtype(((r, 1),)) + else: + return group.dtype(((-r, -1),)) + + def index(self, gen): + if len(gen) != 1: + raise ValueError() + return (self.letter_form).index(gen.letter_form[0]) + + @property + def letter_form_elm(self): + """ + """ + group = self.group + r = self.letter_form + return [group.dtype(((elm,1),)) if elm.is_Symbol \ + else group.dtype(((-elm,-1),)) for elm in r] + + @property + def ext_rep(self): + """This is called the External Representation of ``FreeGroupElement`` + """ + return tuple(flatten(self.array_form)) + + def __contains__(self, gen): + return gen.array_form[0][0] in tuple([r[0] for r in self.array_form]) + + def __str__(self): + if self.is_identity: + return "" + + str_form = "" + array_form = self.array_form + for i in range(len(array_form)): + if i == len(array_form) - 1: + if array_form[i][1] == 1: + str_form += str(array_form[i][0]) + else: + str_form += str(array_form[i][0]) + \ + "**" + str(array_form[i][1]) + else: + if array_form[i][1] == 1: + str_form += str(array_form[i][0]) + "*" + else: + str_form += str(array_form[i][0]) + \ + "**" + str(array_form[i][1]) + "*" + return str_form + + __repr__ = __str__ + + def __pow__(self, n): + n = as_int(n) + result = self.group.identity + if n == 0: + return result + if n < 0: + n = -n + x = self.inverse() + else: + x = self + while True: + if n % 2: + result *= x + n >>= 1 + if not n: + break + x *= x + return result + + def __mul__(self, other): + """Returns the product of elements belonging to the same ``FreeGroup``. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, x, y, z = free_group("x y z") + >>> x*y**2*y**-4 + x*y**-2 + >>> z*y**-2 + z*y**-2 + >>> x**2*y*y**-1*x**-2 + + + """ + group = self.group + if not isinstance(other, group.dtype): + raise TypeError("only FreeGroup elements of same FreeGroup can " + "be multiplied") + if self.is_identity: + return other + if other.is_identity: + return self + r = list(self.array_form + other.array_form) + zero_mul_simp(r, len(self.array_form) - 1) + return group.dtype(tuple(r)) + + def __truediv__(self, other): + group = self.group + if not isinstance(other, group.dtype): + raise TypeError("only FreeGroup elements of same FreeGroup can " + "be multiplied") + return self*(other.inverse()) + + def __rtruediv__(self, other): + group = self.group + if not isinstance(other, group.dtype): + raise TypeError("only FreeGroup elements of same FreeGroup can " + "be multiplied") + return other*(self.inverse()) + + def __add__(self, other): + return NotImplemented + + def inverse(self): + """ + Returns the inverse of a ``FreeGroupElement`` element + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, x, y, z = free_group("x y z") + >>> x.inverse() + x**-1 + >>> (x*y).inverse() + y**-1*x**-1 + + """ + group = self.group + r = tuple([(i, -j) for i, j in self.array_form[::-1]]) + return group.dtype(r) + + def order(self): + """Find the order of a ``FreeGroupElement``. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, x, y = free_group("x y") + >>> (x**2*y*y**-1*x**-2).order() + 1 + + """ + if self.is_identity: + return S.One + else: + return S.Infinity + + def commutator(self, other): + """ + Return the commutator of `self` and `x`: ``~x*~self*x*self`` + + """ + group = self.group + if not isinstance(other, group.dtype): + raise ValueError("commutator of only FreeGroupElement of the same " + "FreeGroup exists") + else: + return self.inverse()*other.inverse()*self*other + + def eliminate_words(self, words, _all=False, inverse=True): + ''' + Replace each subword from the dictionary `words` by words[subword]. + If words is a list, replace the words by the identity. + + ''' + again = True + new = self + if isinstance(words, dict): + while again: + again = False + for sub in words: + prev = new + new = new.eliminate_word(sub, words[sub], _all=_all, inverse=inverse) + if new != prev: + again = True + else: + while again: + again = False + for sub in words: + prev = new + new = new.eliminate_word(sub, _all=_all, inverse=inverse) + if new != prev: + again = True + return new + + def eliminate_word(self, gen, by=None, _all=False, inverse=True): + """ + For an associative word `self`, a subword `gen`, and an associative + word `by` (identity by default), return the associative word obtained by + replacing each occurrence of `gen` in `self` by `by`. If `_all = True`, + the occurrences of `gen` that may appear after the first substitution will + also be replaced and so on until no occurrences are found. This might not + always terminate (e.g. `(x).eliminate_word(x, x**2, _all=True)`). + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, x, y = free_group("x y") + >>> w = x**5*y*x**2*y**-4*x + >>> w.eliminate_word( x, x**2 ) + x**10*y*x**4*y**-4*x**2 + >>> w.eliminate_word( x, y**-1 ) + y**-11 + >>> w.eliminate_word(x**5) + y*x**2*y**-4*x + >>> w.eliminate_word(x*y, y) + x**4*y*x**2*y**-4*x + + See Also + ======== + substituted_word + + """ + if by is None: + by = self.group.identity + if self.is_independent(gen) or gen == by: + return self + if gen == self: + return by + if gen**-1 == by: + _all = False + word = self + l = len(gen) + + try: + i = word.subword_index(gen) + k = 1 + except ValueError: + if not inverse: + return word + try: + i = word.subword_index(gen**-1) + k = -1 + except ValueError: + return word + + word = word.subword(0, i)*by**k*word.subword(i+l, len(word)).eliminate_word(gen, by) + + if _all: + return word.eliminate_word(gen, by, _all=True, inverse=inverse) + else: + return word + + def __len__(self): + """ + For an associative word `self`, returns the number of letters in it. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, a, b = free_group("a b") + >>> w = a**5*b*a**2*b**-4*a + >>> len(w) + 13 + >>> len(a**17) + 17 + >>> len(w**0) + 0 + + """ + return sum(abs(j) for (i, j) in self) + + def __eq__(self, other): + """ + Two associative words are equal if they are words over the + same alphabet and if they are sequences of the same letters. + This is equivalent to saying that the external representations + of the words are equal. + There is no "universal" empty word, every alphabet has its own + empty word. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, swapnil0, swapnil1 = free_group("swapnil0 swapnil1") + >>> f + + >>> g, swap0, swap1 = free_group("swap0 swap1") + >>> g + + + >>> swapnil0 == swapnil1 + False + >>> swapnil0*swapnil1 == swapnil1/swapnil1*swapnil0*swapnil1 + True + >>> swapnil0*swapnil1 == swapnil1*swapnil0 + False + >>> swapnil1**0 == swap0**0 + False + + """ + group = self.group + if not isinstance(other, group.dtype): + return False + return tuple.__eq__(self, other) + + def __lt__(self, other): + """ + The ordering of associative words is defined by length and + lexicography (this ordering is called short-lex ordering), that + is, shorter words are smaller than longer words, and words of the + same length are compared w.r.t. the lexicographical ordering induced + by the ordering of generators. Generators are sorted according + to the order in which they were created. If the generators are + invertible then each generator `g` is larger than its inverse `g^{-1}`, + and `g^{-1}` is larger than every generator that is smaller than `g`. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, a, b = free_group("a b") + >>> b < a + False + >>> a < a.inverse() + False + + """ + group = self.group + if not isinstance(other, group.dtype): + raise TypeError("only FreeGroup elements of same FreeGroup can " + "be compared") + l = len(self) + m = len(other) + # implement lenlex order + if l < m: + return True + elif l > m: + return False + for i in range(l): + a = self[i].array_form[0] + b = other[i].array_form[0] + p = group.symbols.index(a[0]) + q = group.symbols.index(b[0]) + if p < q: + return True + elif p > q: + return False + elif a[1] < b[1]: + return True + elif a[1] > b[1]: + return False + return False + + def __le__(self, other): + return (self == other or self < other) + + def __gt__(self, other): + """ + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, x, y, z = free_group("x y z") + >>> y**2 > x**2 + True + >>> y*z > z*y + False + >>> x > x.inverse() + True + + """ + group = self.group + if not isinstance(other, group.dtype): + raise TypeError("only FreeGroup elements of same FreeGroup can " + "be compared") + return not self <= other + + def __ge__(self, other): + return not self < other + + def exponent_sum(self, gen): + """ + For an associative word `self` and a generator or inverse of generator + `gen`, ``exponent_sum`` returns the number of times `gen` appears in + `self` minus the number of times its inverse appears in `self`. If + neither `gen` nor its inverse occur in `self` then 0 is returned. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> F, x, y = free_group("x, y") + >>> w = x**2*y**3 + >>> w.exponent_sum(x) + 2 + >>> w.exponent_sum(x**-1) + -2 + >>> w = x**2*y**4*x**-3 + >>> w.exponent_sum(x) + -1 + + See Also + ======== + + generator_count + + """ + if len(gen) != 1: + raise ValueError("gen must be a generator or inverse of a generator") + s = gen.array_form[0] + return s[1]*sum(i[1] for i in self.array_form if i[0] == s[0]) + + def generator_count(self, gen): + """ + For an associative word `self` and a generator `gen`, + ``generator_count`` returns the multiplicity of generator + `gen` in `self`. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> F, x, y = free_group("x, y") + >>> w = x**2*y**3 + >>> w.generator_count(x) + 2 + >>> w = x**2*y**4*x**-3 + >>> w.generator_count(x) + 5 + + See Also + ======== + + exponent_sum + + """ + if len(gen) != 1 or gen.array_form[0][1] < 0: + raise ValueError("gen must be a generator") + s = gen.array_form[0] + return s[1]*sum(abs(i[1]) for i in self.array_form if i[0] == s[0]) + + def subword(self, from_i, to_j, strict=True): + """ + For an associative word `self` and two positive integers `from_i` and + `to_j`, `subword` returns the subword of `self` that begins at position + `from_i` and ends at `to_j - 1`, indexing is done with origin 0. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, a, b = free_group("a b") + >>> w = a**5*b*a**2*b**-4*a + >>> w.subword(2, 6) + a**3*b + + """ + group = self.group + if not strict: + from_i = max(from_i, 0) + to_j = min(len(self), to_j) + if from_i < 0 or to_j > len(self): + raise ValueError("`from_i`, `to_j` must be positive and no greater than " + "the length of associative word") + if to_j <= from_i: + return group.identity + else: + letter_form = self.letter_form[from_i: to_j] + array_form = letter_form_to_array_form(letter_form, group) + return group.dtype(array_form) + + def subword_index(self, word, start = 0): + ''' + Find the index of `word` in `self`. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, a, b = free_group("a b") + >>> w = a**2*b*a*b**3 + >>> w.subword_index(a*b*a*b) + 1 + + ''' + l = len(word) + self_lf = self.letter_form + word_lf = word.letter_form + index = None + for i in range(start,len(self_lf)-l+1): + if self_lf[i:i+l] == word_lf: + index = i + break + if index is not None: + return index + else: + raise ValueError("The given word is not a subword of self") + + def is_dependent(self, word): + """ + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> F, x, y = free_group("x, y") + >>> (x**4*y**-3).is_dependent(x**4*y**-2) + True + >>> (x**2*y**-1).is_dependent(x*y) + False + >>> (x*y**2*x*y**2).is_dependent(x*y**2) + True + >>> (x**12).is_dependent(x**-4) + True + + See Also + ======== + + is_independent + + """ + try: + return self.subword_index(word) is not None + except ValueError: + pass + try: + return self.subword_index(word**-1) is not None + except ValueError: + return False + + def is_independent(self, word): + """ + + See Also + ======== + + is_dependent + + """ + return not self.is_dependent(word) + + def contains_generators(self): + """ + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> F, x, y, z = free_group("x, y, z") + >>> (x**2*y**-1).contains_generators() + {x, y} + >>> (x**3*z).contains_generators() + {x, z} + + """ + group = self.group + gens = {group.dtype(((syllable[0], 1),)) for syllable in self.array_form} + return gens + + def cyclic_subword(self, from_i, to_j): + group = self.group + l = len(self) + letter_form = self.letter_form + period1 = int(from_i/l) + if from_i >= l: + from_i -= l*period1 + to_j -= l*period1 + diff = to_j - from_i + word = letter_form[from_i: to_j] + period2 = int(to_j/l) - 1 + word += letter_form*period2 + letter_form[:diff-l+from_i-l*period2] + word = letter_form_to_array_form(word, group) + return group.dtype(word) + + def cyclic_conjugates(self): + """Returns a words which are cyclic to the word `self`. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> F, x, y = free_group("x, y") + >>> w = x*y*x*y*x + >>> w.cyclic_conjugates() + {x*y*x**2*y, x**2*y*x*y, y*x*y*x**2, y*x**2*y*x, x*y*x*y*x} + >>> s = x*y*x**2*y*x + >>> s.cyclic_conjugates() + {x**2*y*x**2*y, y*x**2*y*x**2, x*y*x**2*y*x} + + References + ========== + + .. [1] https://planetmath.org/cyclicpermutation + + """ + return {self.cyclic_subword(i, i+len(self)) for i in range(len(self))} + + def is_cyclic_conjugate(self, w): + """ + Checks whether words ``self``, ``w`` are cyclic conjugates. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> F, x, y = free_group("x, y") + >>> w1 = x**2*y**5 + >>> w2 = x*y**5*x + >>> w1.is_cyclic_conjugate(w2) + True + >>> w3 = x**-1*y**5*x**-1 + >>> w3.is_cyclic_conjugate(w2) + False + + """ + l1 = len(self) + l2 = len(w) + if l1 != l2: + return False + w1 = self.identity_cyclic_reduction() + w2 = w.identity_cyclic_reduction() + letter1 = w1.letter_form + letter2 = w2.letter_form + str1 = ' '.join(map(str, letter1)) + str2 = ' '.join(map(str, letter2)) + if len(str1) != len(str2): + return False + + return str1 in str2 + ' ' + str2 + + def number_syllables(self): + """Returns the number of syllables of the associative word `self`. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, swapnil0, swapnil1 = free_group("swapnil0 swapnil1") + >>> (swapnil1**3*swapnil0*swapnil1**-1).number_syllables() + 3 + + """ + return len(self.array_form) + + def exponent_syllable(self, i): + """ + Returns the exponent of the `i`-th syllable of the associative word + `self`. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, a, b = free_group("a b") + >>> w = a**5*b*a**2*b**-4*a + >>> w.exponent_syllable( 2 ) + 2 + + """ + return self.array_form[i][1] + + def generator_syllable(self, i): + """ + Returns the symbol of the generator that is involved in the + i-th syllable of the associative word `self`. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, a, b = free_group("a b") + >>> w = a**5*b*a**2*b**-4*a + >>> w.generator_syllable( 3 ) + b + + """ + return self.array_form[i][0] + + def sub_syllables(self, from_i, to_j): + """ + `sub_syllables` returns the subword of the associative word `self` that + consists of syllables from positions `from_to` to `to_j`, where + `from_to` and `to_j` must be positive integers and indexing is done + with origin 0. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> f, a, b = free_group("a, b") + >>> w = a**5*b*a**2*b**-4*a + >>> w.sub_syllables(1, 2) + b + >>> w.sub_syllables(3, 3) + + + """ + if not isinstance(from_i, int) or not isinstance(to_j, int): + raise ValueError("both arguments should be integers") + group = self.group + if to_j <= from_i: + return group.identity + else: + r = tuple(self.array_form[from_i: to_j]) + return group.dtype(r) + + def substituted_word(self, from_i, to_j, by): + """ + Returns the associative word obtained by replacing the subword of + `self` that begins at position `from_i` and ends at position `to_j - 1` + by the associative word `by`. `from_i` and `to_j` must be positive + integers, indexing is done with origin 0. In other words, + `w.substituted_word(w, from_i, to_j, by)` is the product of the three + words: `w.subword(0, from_i)`, `by`, and + `w.subword(to_j len(w))`. + + See Also + ======== + + eliminate_word + + """ + lw = len(self) + if from_i >= to_j or from_i > lw or to_j > lw: + raise ValueError("values should be within bounds") + + # otherwise there are four possibilities + + # first if from=1 and to=lw then + if from_i == 0 and to_j == lw: + return by + elif from_i == 0: # second if from_i=1 (and to_j < lw) then + return by*self.subword(to_j, lw) + elif to_j == lw: # third if to_j=1 (and from_i > 1) then + return self.subword(0, from_i)*by + else: # finally + return self.subword(0, from_i)*by*self.subword(to_j, lw) + + def is_cyclically_reduced(self): + r"""Returns whether the word is cyclically reduced or not. + A word is cyclically reduced if by forming the cycle of the + word, the word is not reduced, i.e a word w = `a_1 ... a_n` + is called cyclically reduced if `a_1 \ne a_n^{-1}`. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> F, x, y = free_group("x, y") + >>> (x**2*y**-1*x**-1).is_cyclically_reduced() + False + >>> (y*x**2*y**2).is_cyclically_reduced() + True + + """ + if not self: + return True + return self[0] != self[-1]**-1 + + def identity_cyclic_reduction(self): + """Return a unique cyclically reduced version of the word. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> F, x, y = free_group("x, y") + >>> (x**2*y**2*x**-1).identity_cyclic_reduction() + x*y**2 + >>> (x**-3*y**-1*x**5).identity_cyclic_reduction() + x**2*y**-1 + + References + ========== + + .. [1] https://planetmath.org/cyclicallyreduced + + """ + word = self.copy() + group = self.group + while not word.is_cyclically_reduced(): + exp1 = word.exponent_syllable(0) + exp2 = word.exponent_syllable(-1) + r = exp1 + exp2 + if r == 0: + rep = word.array_form[1: word.number_syllables() - 1] + else: + rep = ((word.generator_syllable(0), exp1 + exp2),) + \ + word.array_form[1: word.number_syllables() - 1] + word = group.dtype(rep) + return word + + def cyclic_reduction(self, removed=False): + """Return a cyclically reduced version of the word. Unlike + `identity_cyclic_reduction`, this will not cyclically permute + the reduced word - just remove the "unreduced" bits on either + side of it. Compare the examples with those of + `identity_cyclic_reduction`. + + When `removed` is `True`, return a tuple `(word, r)` where + self `r` is such that before the reduction the word was either + `r*word*r**-1`. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> F, x, y = free_group("x, y") + >>> (x**2*y**2*x**-1).cyclic_reduction() + x*y**2 + >>> (x**-3*y**-1*x**5).cyclic_reduction() + y**-1*x**2 + >>> (x**-3*y**-1*x**5).cyclic_reduction(removed=True) + (y**-1*x**2, x**-3) + + """ + word = self.copy() + g = self.group.identity + while not word.is_cyclically_reduced(): + exp1 = abs(word.exponent_syllable(0)) + exp2 = abs(word.exponent_syllable(-1)) + exp = min(exp1, exp2) + start = word[0]**abs(exp) + end = word[-1]**abs(exp) + word = start**-1*word*end**-1 + g = g*start + if removed: + return word, g + return word + + def power_of(self, other): + ''' + Check if `self == other**n` for some integer n. + + Examples + ======== + + >>> from sympy.combinatorics import free_group + >>> F, x, y = free_group("x, y") + >>> ((x*y)**2).power_of(x*y) + True + >>> (x**-3*y**-2*x**3).power_of(x**-3*y*x**3) + True + + ''' + if self.is_identity: + return True + + l = len(other) + if l == 1: + # self has to be a power of one generator + gens = self.contains_generators() + s = other in gens or other**-1 in gens + return len(gens) == 1 and s + + # if self is not cyclically reduced and it is a power of other, + # other isn't cyclically reduced and the parts removed during + # their reduction must be equal + reduced, r1 = self.cyclic_reduction(removed=True) + if not r1.is_identity: + other, r2 = other.cyclic_reduction(removed=True) + if r1 == r2: + return reduced.power_of(other) + return False + + if len(self) < l or len(self) % l: + return False + + prefix = self.subword(0, l) + if prefix == other or prefix**-1 == other: + rest = self.subword(l, len(self)) + return rest.power_of(other) + return False + + +def letter_form_to_array_form(array_form, group): + """ + This method converts a list given with possible repetitions of elements in + it. It returns a new list such that repetitions of consecutive elements is + removed and replace with a tuple element of size two such that the first + index contains `value` and the second index contains the number of + consecutive repetitions of `value`. + + """ + a = list(array_form[:]) + new_array = [] + n = 1 + symbols = group.symbols + for i in range(len(a)): + if i == len(a) - 1: + if a[i] == a[i - 1]: + if (-a[i]) in symbols: + new_array.append((-a[i], -n)) + else: + new_array.append((a[i], n)) + else: + if (-a[i]) in symbols: + new_array.append((-a[i], -1)) + else: + new_array.append((a[i], 1)) + return new_array + elif a[i] == a[i + 1]: + n += 1 + else: + if (-a[i]) in symbols: + new_array.append((-a[i], -n)) + else: + new_array.append((a[i], n)) + n = 1 + + +def zero_mul_simp(l, index): + """Used to combine two reduced words.""" + while index >=0 and index < len(l) - 1 and l[index][0] == l[index + 1][0]: + exp = l[index][1] + l[index + 1][1] + base = l[index][0] + l[index] = (base, exp) + del l[index + 1] + if l[index][1] == 0: + del l[index] + index -= 1 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/galois.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/galois.py new file mode 100644 index 0000000000000000000000000000000000000000..f8ff89886283903e116bf40e1be6f6131386e802 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/galois.py @@ -0,0 +1,611 @@ +r""" +Construct transitive subgroups of symmetric groups, useful in Galois theory. + +Besides constructing instances of the :py:class:`~.PermutationGroup` class to +represent the transitive subgroups of $S_n$ for small $n$, this module provides +*names* for these groups. + +In some applications, it may be preferable to know the name of a group, +rather than receive an instance of the :py:class:`~.PermutationGroup` +class, and then have to do extra work to determine which group it is, by +checking various properties. + +Names are instances of ``Enum`` classes defined in this module. With a name in +hand, the name's ``get_perm_group`` method can then be used to retrieve a +:py:class:`~.PermutationGroup`. + +The names used for groups in this module are taken from [1]. + +References +========== + +.. [1] Cohen, H. *A Course in Computational Algebraic Number Theory*. + +""" + +from collections import defaultdict +from enum import Enum +import itertools + +from sympy.combinatorics.named_groups import ( + SymmetricGroup, AlternatingGroup, CyclicGroup, DihedralGroup, + set_symmetric_group_properties, set_alternating_group_properties, +) +from sympy.combinatorics.perm_groups import PermutationGroup +from sympy.combinatorics.permutations import Permutation + + +class S1TransitiveSubgroups(Enum): + """ + Names for the transitive subgroups of S1. + """ + S1 = "S1" + + def get_perm_group(self): + return SymmetricGroup(1) + + +class S2TransitiveSubgroups(Enum): + """ + Names for the transitive subgroups of S2. + """ + S2 = "S2" + + def get_perm_group(self): + return SymmetricGroup(2) + + +class S3TransitiveSubgroups(Enum): + """ + Names for the transitive subgroups of S3. + """ + A3 = "A3" + S3 = "S3" + + def get_perm_group(self): + if self == S3TransitiveSubgroups.A3: + return AlternatingGroup(3) + elif self == S3TransitiveSubgroups.S3: + return SymmetricGroup(3) + + +class S4TransitiveSubgroups(Enum): + """ + Names for the transitive subgroups of S4. + """ + C4 = "C4" + V = "V" + D4 = "D4" + A4 = "A4" + S4 = "S4" + + def get_perm_group(self): + if self == S4TransitiveSubgroups.C4: + return CyclicGroup(4) + elif self == S4TransitiveSubgroups.V: + return four_group() + elif self == S4TransitiveSubgroups.D4: + return DihedralGroup(4) + elif self == S4TransitiveSubgroups.A4: + return AlternatingGroup(4) + elif self == S4TransitiveSubgroups.S4: + return SymmetricGroup(4) + + +class S5TransitiveSubgroups(Enum): + """ + Names for the transitive subgroups of S5. + """ + C5 = "C5" + D5 = "D5" + M20 = "M20" + A5 = "A5" + S5 = "S5" + + def get_perm_group(self): + if self == S5TransitiveSubgroups.C5: + return CyclicGroup(5) + elif self == S5TransitiveSubgroups.D5: + return DihedralGroup(5) + elif self == S5TransitiveSubgroups.M20: + return M20() + elif self == S5TransitiveSubgroups.A5: + return AlternatingGroup(5) + elif self == S5TransitiveSubgroups.S5: + return SymmetricGroup(5) + + +class S6TransitiveSubgroups(Enum): + """ + Names for the transitive subgroups of S6. + """ + C6 = "C6" + S3 = "S3" + D6 = "D6" + A4 = "A4" + G18 = "G18" + A4xC2 = "A4 x C2" + S4m = "S4-" + S4p = "S4+" + G36m = "G36-" + G36p = "G36+" + S4xC2 = "S4 x C2" + PSL2F5 = "PSL2(F5)" + G72 = "G72" + PGL2F5 = "PGL2(F5)" + A6 = "A6" + S6 = "S6" + + def get_perm_group(self): + if self == S6TransitiveSubgroups.C6: + return CyclicGroup(6) + elif self == S6TransitiveSubgroups.S3: + return S3_in_S6() + elif self == S6TransitiveSubgroups.D6: + return DihedralGroup(6) + elif self == S6TransitiveSubgroups.A4: + return A4_in_S6() + elif self == S6TransitiveSubgroups.G18: + return G18() + elif self == S6TransitiveSubgroups.A4xC2: + return A4xC2() + elif self == S6TransitiveSubgroups.S4m: + return S4m() + elif self == S6TransitiveSubgroups.S4p: + return S4p() + elif self == S6TransitiveSubgroups.G36m: + return G36m() + elif self == S6TransitiveSubgroups.G36p: + return G36p() + elif self == S6TransitiveSubgroups.S4xC2: + return S4xC2() + elif self == S6TransitiveSubgroups.PSL2F5: + return PSL2F5() + elif self == S6TransitiveSubgroups.G72: + return G72() + elif self == S6TransitiveSubgroups.PGL2F5: + return PGL2F5() + elif self == S6TransitiveSubgroups.A6: + return AlternatingGroup(6) + elif self == S6TransitiveSubgroups.S6: + return SymmetricGroup(6) + + +def four_group(): + """ + Return a representation of the Klein four-group as a transitive subgroup + of S4. + """ + return PermutationGroup( + Permutation(0, 1)(2, 3), + Permutation(0, 2)(1, 3) + ) + + +def M20(): + """ + Return a representation of the metacyclic group M20, a transitive subgroup + of S5 that is one of the possible Galois groups for polys of degree 5. + + Notes + ===== + + See [1], Page 323. + + """ + G = PermutationGroup(Permutation(0, 1, 2, 3, 4), Permutation(1, 2, 4, 3)) + G._degree = 5 + G._order = 20 + G._is_transitive = True + G._is_sym = False + G._is_alt = False + G._is_cyclic = False + G._is_dihedral = False + return G + + +def S3_in_S6(): + """ + Return a representation of S3 as a transitive subgroup of S6. + + Notes + ===== + + The representation is found by viewing the group as the symmetries of a + triangular prism. + + """ + G = PermutationGroup(Permutation(0, 1, 2)(3, 4, 5), Permutation(0, 3)(2, 4)(1, 5)) + set_symmetric_group_properties(G, 3, 6) + return G + + +def A4_in_S6(): + """ + Return a representation of A4 as a transitive subgroup of S6. + + Notes + ===== + + This was computed using :py:func:`~.find_transitive_subgroups_of_S6`. + + """ + G = PermutationGroup(Permutation(0, 4, 5)(1, 3, 2), Permutation(0, 1, 2)(3, 5, 4)) + set_alternating_group_properties(G, 4, 6) + return G + + +def S4m(): + """ + Return a representation of the S4- transitive subgroup of S6. + + Notes + ===== + + This was computed using :py:func:`~.find_transitive_subgroups_of_S6`. + + """ + G = PermutationGroup(Permutation(1, 4, 5, 3), Permutation(0, 4)(1, 5)(2, 3)) + set_symmetric_group_properties(G, 4, 6) + return G + + +def S4p(): + """ + Return a representation of the S4+ transitive subgroup of S6. + + Notes + ===== + + This was computed using :py:func:`~.find_transitive_subgroups_of_S6`. + + """ + G = PermutationGroup(Permutation(0, 2, 4, 1)(3, 5), Permutation(0, 3)(4, 5)) + set_symmetric_group_properties(G, 4, 6) + return G + + +def A4xC2(): + """ + Return a representation of the (A4 x C2) transitive subgroup of S6. + + Notes + ===== + + This was computed using :py:func:`~.find_transitive_subgroups_of_S6`. + + """ + return PermutationGroup( + Permutation(0, 4, 5)(1, 3, 2), Permutation(0, 1, 2)(3, 5, 4), + Permutation(5)(2, 4)) + + +def S4xC2(): + """ + Return a representation of the (S4 x C2) transitive subgroup of S6. + + Notes + ===== + + This was computed using :py:func:`~.find_transitive_subgroups_of_S6`. + + """ + return PermutationGroup( + Permutation(1, 4, 5, 3), Permutation(0, 4)(1, 5)(2, 3), + Permutation(1, 4)(3, 5)) + + +def G18(): + """ + Return a representation of the group G18, a transitive subgroup of S6 + isomorphic to the semidirect product of C3^2 with C2. + + Notes + ===== + + This was computed using :py:func:`~.find_transitive_subgroups_of_S6`. + + """ + return PermutationGroup( + Permutation(5)(0, 1, 2), Permutation(3, 4, 5), + Permutation(0, 4)(1, 5)(2, 3)) + + +def G36m(): + """ + Return a representation of the group G36-, a transitive subgroup of S6 + isomorphic to the semidirect product of C3^2 with C2^2. + + Notes + ===== + + This was computed using :py:func:`~.find_transitive_subgroups_of_S6`. + + """ + return PermutationGroup( + Permutation(5)(0, 1, 2), Permutation(3, 4, 5), + Permutation(1, 2)(3, 5), Permutation(0, 4)(1, 5)(2, 3)) + + +def G36p(): + """ + Return a representation of the group G36+, a transitive subgroup of S6 + isomorphic to the semidirect product of C3^2 with C4. + + Notes + ===== + + This was computed using :py:func:`~.find_transitive_subgroups_of_S6`. + + """ + return PermutationGroup( + Permutation(5)(0, 1, 2), Permutation(3, 4, 5), + Permutation(0, 5, 2, 3)(1, 4)) + + +def G72(): + """ + Return a representation of the group G72, a transitive subgroup of S6 + isomorphic to the semidirect product of C3^2 with D4. + + Notes + ===== + + See [1], Page 325. + + """ + return PermutationGroup( + Permutation(5)(0, 1, 2), + Permutation(0, 4, 1, 3)(2, 5), Permutation(0, 3)(1, 4)(2, 5)) + + +def PSL2F5(): + r""" + Return a representation of the group $PSL_2(\mathbb{F}_5)$, as a transitive + subgroup of S6, isomorphic to $A_5$. + + Notes + ===== + + This was computed using :py:func:`~.find_transitive_subgroups_of_S6`. + + """ + G = PermutationGroup( + Permutation(0, 4, 5)(1, 3, 2), Permutation(0, 4, 3, 1, 5)) + set_alternating_group_properties(G, 5, 6) + return G + + +def PGL2F5(): + r""" + Return a representation of the group $PGL_2(\mathbb{F}_5)$, as a transitive + subgroup of S6, isomorphic to $S_5$. + + Notes + ===== + + See [1], Page 325. + + """ + G = PermutationGroup( + Permutation(0, 1, 2, 3, 4), Permutation(0, 5)(1, 2)(3, 4)) + set_symmetric_group_properties(G, 5, 6) + return G + + +def find_transitive_subgroups_of_S6(*targets, print_report=False): + r""" + Search for certain transitive subgroups of $S_6$. + + The symmetric group $S_6$ has 16 different transitive subgroups, up to + conjugacy. Some are more easily constructed than others. For example, the + dihedral group $D_6$ is immediately found, but it is not at all obvious how + to realize $S_4$ or $S_5$ *transitively* within $S_6$. + + In some cases there are well-known constructions that can be used. For + example, $S_5$ is isomorphic to $PGL_2(\mathbb{F}_5)$, which acts in a + natural way on the projective line $P^1(\mathbb{F}_5)$, a set of order 6. + + In absence of such special constructions however, we can simply search for + generators. For example, transitive instances of $A_4$ and $S_4$ can be + found within $S_6$ in this way. + + Once we are engaged in such searches, it may then be easier (if less + elegant) to find even those groups like $S_5$ that do have special + constructions, by mere search. + + This function locates generators for transitive instances in $S_6$ of the + following subgroups: + + * $A_4$ + * $S_4^-$ ($S_4$ not contained within $A_6$) + * $S_4^+$ ($S_4$ contained within $A_6$) + * $A_4 \times C_2$ + * $S_4 \times C_2$ + * $G_{18} = C_3^2 \rtimes C_2$ + * $G_{36}^- = C_3^2 \rtimes C_2^2$ + * $G_{36}^+ = C_3^2 \rtimes C_4$ + * $G_{72} = C_3^2 \rtimes D_4$ + * $A_5$ + * $S_5$ + + Note: Each of these groups also has a dedicated function in this module + that returns the group immediately, using generators that were found by + this search procedure. + + The search procedure serves as a record of how these generators were + found. Also, due to randomness in the generation of the elements of + permutation groups, it can be called again, in order to (probably) get + different generators for the same groups. + + Parameters + ========== + + targets : list of :py:class:`~.S6TransitiveSubgroups` values + The groups you want to find. + + print_report : bool (default False) + If True, print to stdout the generators found for each group. + + Returns + ======= + + dict + mapping each name in *targets* to the :py:class:`~.PermutationGroup` + that was found + + References + ========== + + .. [2] https://en.wikipedia.org/wiki/Projective_linear_group#Exceptional_isomorphisms + .. [3] https://en.wikipedia.org/wiki/Automorphisms_of_the_symmetric_and_alternating_groups#PGL%282,5%29 + + """ + def elts_by_order(G): + """Sort the elements of a group by their order. """ + elts = defaultdict(list) + for g in G.elements: + elts[g.order()].append(g) + return elts + + def order_profile(G, name=None): + """Determine how many elements a group has, of each order. """ + elts = elts_by_order(G) + profile = {o:len(e) for o, e in elts.items()} + if name: + print(f'{name}: ' + ' '.join(f'{len(profile[r])}@{r}' for r in sorted(profile.keys()))) + return profile + + S6 = SymmetricGroup(6) + A6 = AlternatingGroup(6) + S6_by_order = elts_by_order(S6) + + def search(existing_gens, needed_gen_orders, order, alt=None, profile=None, anti_profile=None): + """ + Find a transitive subgroup of S6. + + Parameters + ========== + + existing_gens : list of Permutation + Optionally empty list of generators that must be in the group. + + needed_gen_orders : list of positive int + Nonempty list of the orders of the additional generators that are + to be found. + + order: int + The order of the group being sought. + + alt: bool, None + If True, require the group to be contained in A6. + If False, require the group not to be contained in A6. + + profile : dict + If given, the group's order profile must equal this. + + anti_profile : dict + If given, the group's order profile must *not* equal this. + + """ + for gens in itertools.product(*[S6_by_order[n] for n in needed_gen_orders]): + if len(set(gens)) < len(gens): + continue + G = PermutationGroup(existing_gens + list(gens)) + if G.order() == order and G.is_transitive(): + if alt is not None and G.is_subgroup(A6) != alt: + continue + if profile and order_profile(G) != profile: + continue + if anti_profile and order_profile(G) == anti_profile: + continue + return G + + def match_known_group(G, alt=None): + needed = [g.order() for g in G.generators] + return search([], needed, G.order(), alt=alt, profile=order_profile(G)) + + found = {} + + def finish_up(name, G): + found[name] = G + if print_report: + print("=" * 40) + print(f"{name}:") + print(G.generators) + + if S6TransitiveSubgroups.A4 in targets or S6TransitiveSubgroups.A4xC2 in targets: + A4_in_S6 = match_known_group(AlternatingGroup(4)) + finish_up(S6TransitiveSubgroups.A4, A4_in_S6) + + if S6TransitiveSubgroups.S4m in targets or S6TransitiveSubgroups.S4xC2 in targets: + S4m_in_S6 = match_known_group(SymmetricGroup(4), alt=False) + finish_up(S6TransitiveSubgroups.S4m, S4m_in_S6) + + if S6TransitiveSubgroups.S4p in targets: + S4p_in_S6 = match_known_group(SymmetricGroup(4), alt=True) + finish_up(S6TransitiveSubgroups.S4p, S4p_in_S6) + + if S6TransitiveSubgroups.A4xC2 in targets: + A4xC2_in_S6 = search(A4_in_S6.generators, [2], 24, anti_profile=order_profile(SymmetricGroup(4))) + finish_up(S6TransitiveSubgroups.A4xC2, A4xC2_in_S6) + + if S6TransitiveSubgroups.S4xC2 in targets: + S4xC2_in_S6 = search(S4m_in_S6.generators, [2], 48) + finish_up(S6TransitiveSubgroups.S4xC2, S4xC2_in_S6) + + # For the normal factor N = C3^2 in any of the G_n subgroups, we take one + # obvious instance of C3^2 in S6: + N_gens = [Permutation(5)(0, 1, 2), Permutation(5)(3, 4, 5)] + + if S6TransitiveSubgroups.G18 in targets: + G18_in_S6 = search(N_gens, [2], 18) + finish_up(S6TransitiveSubgroups.G18, G18_in_S6) + + if S6TransitiveSubgroups.G36m in targets: + G36m_in_S6 = search(N_gens, [2, 2], 36, alt=False) + finish_up(S6TransitiveSubgroups.G36m, G36m_in_S6) + + if S6TransitiveSubgroups.G36p in targets: + G36p_in_S6 = search(N_gens, [4], 36, alt=True) + finish_up(S6TransitiveSubgroups.G36p, G36p_in_S6) + + if S6TransitiveSubgroups.G72 in targets: + G72_in_S6 = search(N_gens, [4, 2], 72) + finish_up(S6TransitiveSubgroups.G72, G72_in_S6) + + # The PSL2(F5) and PGL2(F5) subgroups are isomorphic to A5 and S5, resp. + + if S6TransitiveSubgroups.PSL2F5 in targets: + PSL2F5_in_S6 = match_known_group(AlternatingGroup(5)) + finish_up(S6TransitiveSubgroups.PSL2F5, PSL2F5_in_S6) + + if S6TransitiveSubgroups.PGL2F5 in targets: + PGL2F5_in_S6 = match_known_group(SymmetricGroup(5)) + finish_up(S6TransitiveSubgroups.PGL2F5, PGL2F5_in_S6) + + # There is little need to "search" for any of the groups C6, S3, D6, A6, + # or S6, since they all have obvious realizations within S6. However, we + # support them here just in case a random representation is desired. + + if S6TransitiveSubgroups.C6 in targets: + C6 = match_known_group(CyclicGroup(6)) + finish_up(S6TransitiveSubgroups.C6, C6) + + if S6TransitiveSubgroups.S3 in targets: + S3 = match_known_group(SymmetricGroup(3)) + finish_up(S6TransitiveSubgroups.S3, S3) + + if S6TransitiveSubgroups.D6 in targets: + D6 = match_known_group(DihedralGroup(6)) + finish_up(S6TransitiveSubgroups.D6, D6) + + if S6TransitiveSubgroups.A6 in targets: + A6 = match_known_group(A6) + finish_up(S6TransitiveSubgroups.A6, A6) + + if S6TransitiveSubgroups.S6 in targets: + S6 = match_known_group(S6) + finish_up(S6TransitiveSubgroups.S6, S6) + + return found diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/generators.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/generators.py new file mode 100644 index 0000000000000000000000000000000000000000..19e274a4c5b4bf0781855db6bc6bf499349fff31 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/generators.py @@ -0,0 +1,301 @@ +from sympy.combinatorics.permutations import Permutation +from sympy.core.symbol import symbols +from sympy.matrices import Matrix +from sympy.utilities.iterables import variations, rotate_left + + +def symmetric(n): + """ + Generates the symmetric group of order n, Sn. + + Examples + ======== + + >>> from sympy.combinatorics.generators import symmetric + >>> list(symmetric(3)) + [(2), (1 2), (2)(0 1), (0 1 2), (0 2 1), (0 2)] + """ + yield from (Permutation(perm) for perm in variations(range(n), n)) + + +def cyclic(n): + """ + Generates the cyclic group of order n, Cn. + + Examples + ======== + + >>> from sympy.combinatorics.generators import cyclic + >>> list(cyclic(5)) + [(4), (0 1 2 3 4), (0 2 4 1 3), + (0 3 1 4 2), (0 4 3 2 1)] + + See Also + ======== + + dihedral + """ + gen = list(range(n)) + for i in range(n): + yield Permutation(gen) + gen = rotate_left(gen, 1) + + +def alternating(n): + """ + Generates the alternating group of order n, An. + + Examples + ======== + + >>> from sympy.combinatorics.generators import alternating + >>> list(alternating(3)) + [(2), (0 1 2), (0 2 1)] + """ + for perm in variations(range(n), n): + p = Permutation(perm) + if p.is_even: + yield p + + +def dihedral(n): + """ + Generates the dihedral group of order 2n, Dn. + + The result is given as a subgroup of Sn, except for the special cases n=1 + (the group S2) and n=2 (the Klein 4-group) where that's not possible + and embeddings in S2 and S4 respectively are given. + + Examples + ======== + + >>> from sympy.combinatorics.generators import dihedral + >>> list(dihedral(3)) + [(2), (0 2), (0 1 2), (1 2), (0 2 1), (2)(0 1)] + + See Also + ======== + + cyclic + """ + if n == 1: + yield Permutation([0, 1]) + yield Permutation([1, 0]) + elif n == 2: + yield Permutation([0, 1, 2, 3]) + yield Permutation([1, 0, 3, 2]) + yield Permutation([2, 3, 0, 1]) + yield Permutation([3, 2, 1, 0]) + else: + gen = list(range(n)) + for i in range(n): + yield Permutation(gen) + yield Permutation(gen[::-1]) + gen = rotate_left(gen, 1) + + +def rubik_cube_generators(): + """Return the permutations of the 3x3 Rubik's cube, see + https://www.gap-system.org/Doc/Examples/rubik.html + """ + a = [ + [(1, 3, 8, 6), (2, 5, 7, 4), (9, 33, 25, 17), (10, 34, 26, 18), + (11, 35, 27, 19)], + [(9, 11, 16, 14), (10, 13, 15, 12), (1, 17, 41, 40), (4, 20, 44, 37), + (6, 22, 46, 35)], + [(17, 19, 24, 22), (18, 21, 23, 20), (6, 25, 43, 16), (7, 28, 42, 13), + (8, 30, 41, 11)], + [(25, 27, 32, 30), (26, 29, 31, 28), (3, 38, 43, 19), (5, 36, 45, 21), + (8, 33, 48, 24)], + [(33, 35, 40, 38), (34, 37, 39, 36), (3, 9, 46, 32), (2, 12, 47, 29), + (1, 14, 48, 27)], + [(41, 43, 48, 46), (42, 45, 47, 44), (14, 22, 30, 38), + (15, 23, 31, 39), (16, 24, 32, 40)] + ] + return [Permutation([[i - 1 for i in xi] for xi in x], size=48) for x in a] + + +def rubik(n): + """Return permutations for an nxn Rubik's cube. + + Permutations returned are for rotation of each of the slice + from the face up to the last face for each of the 3 sides (in this order): + front, right and bottom. Hence, the first n - 1 permutations are for the + slices from the front. + """ + + if n < 2: + raise ValueError('dimension of cube must be > 1') + + # 1-based reference to rows and columns in Matrix + def getr(f, i): + return faces[f].col(n - i) + + def getl(f, i): + return faces[f].col(i - 1) + + def getu(f, i): + return faces[f].row(i - 1) + + def getd(f, i): + return faces[f].row(n - i) + + def setr(f, i, s): + faces[f][:, n - i] = Matrix(n, 1, s) + + def setl(f, i, s): + faces[f][:, i - 1] = Matrix(n, 1, s) + + def setu(f, i, s): + faces[f][i - 1, :] = Matrix(1, n, s) + + def setd(f, i, s): + faces[f][n - i, :] = Matrix(1, n, s) + + # motion of a single face + def cw(F, r=1): + for _ in range(r): + face = faces[F] + rv = [] + for c in range(n): + for r in range(n - 1, -1, -1): + rv.append(face[r, c]) + faces[F] = Matrix(n, n, rv) + + def ccw(F): + cw(F, 3) + + # motion of plane i from the F side; + # fcw(0) moves the F face, fcw(1) moves the plane + # just behind the front face, etc... + def fcw(i, r=1): + for _ in range(r): + if i == 0: + cw(F) + i += 1 + temp = getr(L, i) + setr(L, i, list(getu(D, i))) + setu(D, i, list(reversed(getl(R, i)))) + setl(R, i, list(getd(U, i))) + setd(U, i, list(reversed(temp))) + i -= 1 + + def fccw(i): + fcw(i, 3) + + # motion of the entire cube from the F side + def FCW(r=1): + for _ in range(r): + cw(F) + ccw(B) + cw(U) + t = faces[U] + cw(L) + faces[U] = faces[L] + cw(D) + faces[L] = faces[D] + cw(R) + faces[D] = faces[R] + faces[R] = t + + def FCCW(): + FCW(3) + + # motion of the entire cube from the U side + def UCW(r=1): + for _ in range(r): + cw(U) + ccw(D) + t = faces[F] + faces[F] = faces[R] + faces[R] = faces[B] + faces[B] = faces[L] + faces[L] = t + + def UCCW(): + UCW(3) + + # defining the permutations for the cube + + U, F, R, B, L, D = names = symbols('U, F, R, B, L, D') + + # the faces are represented by nxn matrices + faces = {} + count = 0 + for fi in range(6): + f = [] + for a in range(n**2): + f.append(count) + count += 1 + faces[names[fi]] = Matrix(n, n, f) + + # this will either return the value of the current permutation + # (show != 1) or else append the permutation to the group, g + def perm(show=0): + # add perm to the list of perms + p = [] + for f in names: + p.extend(faces[f]) + if show: + return p + g.append(Permutation(p)) + + g = [] # container for the group's permutations + I = list(range(6*n**2)) # the identity permutation used for checking + + # define permutations corresponding to cw rotations of the planes + # up TO the last plane from that direction; by not including the + # last plane, the orientation of the cube is maintained. + + # F slices + for i in range(n - 1): + fcw(i) + perm() + fccw(i) # restore + assert perm(1) == I + + # R slices + # bring R to front + UCW() + for i in range(n - 1): + fcw(i) + # put it back in place + UCCW() + # record + perm() + # restore + # bring face to front + UCW() + fccw(i) + # restore + UCCW() + assert perm(1) == I + + # D slices + # bring up bottom + FCW() + UCCW() + FCCW() + for i in range(n - 1): + # turn strip + fcw(i) + # put bottom back on the bottom + FCW() + UCW() + FCCW() + # record + perm() + # restore + # bring up bottom + FCW() + UCCW() + FCCW() + # turn strip + fccw(i) + # put bottom back on the bottom + FCW() + UCW() + FCCW() + assert perm(1) == I + + return g diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/graycode.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/graycode.py new file mode 100644 index 0000000000000000000000000000000000000000..930fd337862a70e920a985947d74375b27741293 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/graycode.py @@ -0,0 +1,430 @@ +from sympy.core import Basic, Integer + +import random + + +class GrayCode(Basic): + """ + A Gray code is essentially a Hamiltonian walk on + a n-dimensional cube with edge length of one. + The vertices of the cube are represented by vectors + whose values are binary. The Hamilton walk visits + each vertex exactly once. The Gray code for a 3d + cube is ['000','100','110','010','011','111','101', + '001']. + + A Gray code solves the problem of sequentially + generating all possible subsets of n objects in such + a way that each subset is obtained from the previous + one by either deleting or adding a single object. + In the above example, 1 indicates that the object is + present, and 0 indicates that its absent. + + Gray codes have applications in statistics as well when + we want to compute various statistics related to subsets + in an efficient manner. + + Examples + ======== + + >>> from sympy.combinatorics import GrayCode + >>> a = GrayCode(3) + >>> list(a.generate_gray()) + ['000', '001', '011', '010', '110', '111', '101', '100'] + >>> a = GrayCode(4) + >>> list(a.generate_gray()) + ['0000', '0001', '0011', '0010', '0110', '0111', '0101', '0100', \ + '1100', '1101', '1111', '1110', '1010', '1011', '1001', '1000'] + + References + ========== + + .. [1] Nijenhuis,A. and Wilf,H.S.(1978). + Combinatorial Algorithms. Academic Press. + .. [2] Knuth, D. (2011). The Art of Computer Programming, Vol 4 + Addison Wesley + + + """ + + _skip = False + _current = 0 + _rank = None + + def __new__(cls, n, *args, **kw_args): + """ + Default constructor. + + It takes a single argument ``n`` which gives the dimension of the Gray + code. The starting Gray code string (``start``) or the starting ``rank`` + may also be given; the default is to start at rank = 0 ('0...0'). + + Examples + ======== + + >>> from sympy.combinatorics import GrayCode + >>> a = GrayCode(3) + >>> a + GrayCode(3) + >>> a.n + 3 + + >>> a = GrayCode(3, start='100') + >>> a.current + '100' + + >>> a = GrayCode(4, rank=4) + >>> a.current + '0110' + >>> a.rank + 4 + + """ + if n < 1 or int(n) != n: + raise ValueError( + 'Gray code dimension must be a positive integer, not %i' % n) + n = Integer(n) + args = (n,) + args + obj = Basic.__new__(cls, *args) + if 'start' in kw_args: + obj._current = kw_args["start"] + if len(obj._current) > n: + raise ValueError('Gray code start has length %i but ' + 'should not be greater than %i' % (len(obj._current), n)) + elif 'rank' in kw_args: + if int(kw_args["rank"]) != kw_args["rank"]: + raise ValueError('Gray code rank must be a positive integer, ' + 'not %i' % kw_args["rank"]) + obj._rank = int(kw_args["rank"]) % obj.selections + obj._current = obj.unrank(n, obj._rank) + return obj + + def next(self, delta=1): + """ + Returns the Gray code a distance ``delta`` (default = 1) from the + current value in canonical order. + + + Examples + ======== + + >>> from sympy.combinatorics import GrayCode + >>> a = GrayCode(3, start='110') + >>> a.next().current + '111' + >>> a.next(-1).current + '010' + """ + return GrayCode(self.n, rank=(self.rank + delta) % self.selections) + + @property + def selections(self): + """ + Returns the number of bit vectors in the Gray code. + + Examples + ======== + + >>> from sympy.combinatorics import GrayCode + >>> a = GrayCode(3) + >>> a.selections + 8 + """ + return 2**self.n + + @property + def n(self): + """ + Returns the dimension of the Gray code. + + Examples + ======== + + >>> from sympy.combinatorics import GrayCode + >>> a = GrayCode(5) + >>> a.n + 5 + """ + return self.args[0] + + def generate_gray(self, **hints): + """ + Generates the sequence of bit vectors of a Gray Code. + + Examples + ======== + + >>> from sympy.combinatorics import GrayCode + >>> a = GrayCode(3) + >>> list(a.generate_gray()) + ['000', '001', '011', '010', '110', '111', '101', '100'] + >>> list(a.generate_gray(start='011')) + ['011', '010', '110', '111', '101', '100'] + >>> list(a.generate_gray(rank=4)) + ['110', '111', '101', '100'] + + See Also + ======== + + skip + + References + ========== + + .. [1] Knuth, D. (2011). The Art of Computer Programming, + Vol 4, Addison Wesley + + """ + bits = self.n + start = None + if "start" in hints: + start = hints["start"] + elif "rank" in hints: + start = GrayCode.unrank(self.n, hints["rank"]) + if start is not None: + self._current = start + current = self.current + graycode_bin = gray_to_bin(current) + if len(graycode_bin) > self.n: + raise ValueError('Gray code start has length %i but should ' + 'not be greater than %i' % (len(graycode_bin), bits)) + self._current = int(current, 2) + graycode_int = int(''.join(graycode_bin), 2) + for i in range(graycode_int, 1 << bits): + if self._skip: + self._skip = False + else: + yield self.current + bbtc = (i ^ (i + 1)) + gbtc = (bbtc ^ (bbtc >> 1)) + self._current = (self._current ^ gbtc) + self._current = 0 + + def skip(self): + """ + Skips the bit generation. + + Examples + ======== + + >>> from sympy.combinatorics import GrayCode + >>> a = GrayCode(3) + >>> for i in a.generate_gray(): + ... if i == '010': + ... a.skip() + ... print(i) + ... + 000 + 001 + 011 + 010 + 111 + 101 + 100 + + See Also + ======== + + generate_gray + """ + self._skip = True + + @property + def rank(self): + """ + Ranks the Gray code. + + A ranking algorithm determines the position (or rank) + of a combinatorial object among all the objects w.r.t. + a given order. For example, the 4 bit binary reflected + Gray code (BRGC) '0101' has a rank of 6 as it appears in + the 6th position in the canonical ordering of the family + of 4 bit Gray codes. + + Examples + ======== + + >>> from sympy.combinatorics import GrayCode + >>> a = GrayCode(3) + >>> list(a.generate_gray()) + ['000', '001', '011', '010', '110', '111', '101', '100'] + >>> GrayCode(3, start='100').rank + 7 + >>> GrayCode(3, rank=7).current + '100' + + See Also + ======== + + unrank + + References + ========== + + .. [1] https://web.archive.org/web/20200224064753/http://statweb.stanford.edu/~susan/courses/s208/node12.html + + """ + if self._rank is None: + self._rank = int(gray_to_bin(self.current), 2) + return self._rank + + @property + def current(self): + """ + Returns the currently referenced Gray code as a bit string. + + Examples + ======== + + >>> from sympy.combinatorics import GrayCode + >>> GrayCode(3, start='100').current + '100' + """ + rv = self._current or '0' + if not isinstance(rv, str): + rv = bin(rv)[2:] + return rv.rjust(self.n, '0') + + @classmethod + def unrank(self, n, rank): + """ + Unranks an n-bit sized Gray code of rank k. This method exists + so that a derivative GrayCode class can define its own code of + a given rank. + + The string here is generated in reverse order to allow for tail-call + optimization. + + Examples + ======== + + >>> from sympy.combinatorics import GrayCode + >>> GrayCode(5, rank=3).current + '00010' + >>> GrayCode.unrank(5, 3) + '00010' + + See Also + ======== + + rank + """ + def _unrank(k, n): + if n == 1: + return str(k % 2) + m = 2**(n - 1) + if k < m: + return '0' + _unrank(k, n - 1) + return '1' + _unrank(m - (k % m) - 1, n - 1) + return _unrank(rank, n) + + +def random_bitstring(n): + """ + Generates a random bitlist of length n. + + Examples + ======== + + >>> from sympy.combinatorics.graycode import random_bitstring + >>> random_bitstring(3) # doctest: +SKIP + 100 + """ + return ''.join([random.choice('01') for i in range(n)]) + + +def gray_to_bin(bin_list): + """ + Convert from Gray coding to binary coding. + + We assume big endian encoding. + + Examples + ======== + + >>> from sympy.combinatorics.graycode import gray_to_bin + >>> gray_to_bin('100') + '111' + + See Also + ======== + + bin_to_gray + """ + b = [bin_list[0]] + for i in range(1, len(bin_list)): + b += str(int(b[i - 1] != bin_list[i])) + return ''.join(b) + + +def bin_to_gray(bin_list): + """ + Convert from binary coding to gray coding. + + We assume big endian encoding. + + Examples + ======== + + >>> from sympy.combinatorics.graycode import bin_to_gray + >>> bin_to_gray('111') + '100' + + See Also + ======== + + gray_to_bin + """ + b = [bin_list[0]] + for i in range(1, len(bin_list)): + b += str(int(bin_list[i]) ^ int(bin_list[i - 1])) + return ''.join(b) + + +def get_subset_from_bitstring(super_set, bitstring): + """ + Gets the subset defined by the bitstring. + + Examples + ======== + + >>> from sympy.combinatorics.graycode import get_subset_from_bitstring + >>> get_subset_from_bitstring(['a', 'b', 'c', 'd'], '0011') + ['c', 'd'] + >>> get_subset_from_bitstring(['c', 'a', 'c', 'c'], '1100') + ['c', 'a'] + + See Also + ======== + + graycode_subsets + """ + if len(super_set) != len(bitstring): + raise ValueError("The sizes of the lists are not equal") + return [super_set[i] for i, j in enumerate(bitstring) + if bitstring[i] == '1'] + + +def graycode_subsets(gray_code_set): + """ + Generates the subsets as enumerated by a Gray code. + + Examples + ======== + + >>> from sympy.combinatorics.graycode import graycode_subsets + >>> list(graycode_subsets(['a', 'b', 'c'])) + [[], ['c'], ['b', 'c'], ['b'], ['a', 'b'], ['a', 'b', 'c'], \ + ['a', 'c'], ['a']] + >>> list(graycode_subsets(['a', 'b', 'c', 'c'])) + [[], ['c'], ['c', 'c'], ['c'], ['b', 'c'], ['b', 'c', 'c'], \ + ['b', 'c'], ['b'], ['a', 'b'], ['a', 'b', 'c'], ['a', 'b', 'c', 'c'], \ + ['a', 'b', 'c'], ['a', 'c'], ['a', 'c', 'c'], ['a', 'c'], ['a']] + + See Also + ======== + + get_subset_from_bitstring + """ + for bitstring in list(GrayCode(len(gray_code_set)).generate_gray()): + yield get_subset_from_bitstring(gray_code_set, bitstring) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/group_constructs.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/group_constructs.py new file mode 100644 index 0000000000000000000000000000000000000000..a5c16ec254191646b26eee869763e2926e187da5 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/group_constructs.py @@ -0,0 +1,61 @@ +from sympy.combinatorics.perm_groups import PermutationGroup +from sympy.combinatorics.permutations import Permutation +from sympy.utilities.iterables import uniq + +_af_new = Permutation._af_new + + +def DirectProduct(*groups): + """ + Returns the direct product of several groups as a permutation group. + + Explanation + =========== + + This is implemented much like the __mul__ procedure for taking the direct + product of two permutation groups, but the idea of shifting the + generators is realized in the case of an arbitrary number of groups. + A call to DirectProduct(G1, G2, ..., Gn) is generally expected to be faster + than a call to G1*G2*...*Gn (and thus the need for this algorithm). + + Examples + ======== + + >>> from sympy.combinatorics.group_constructs import DirectProduct + >>> from sympy.combinatorics.named_groups import CyclicGroup + >>> C = CyclicGroup(4) + >>> G = DirectProduct(C, C, C) + >>> G.order() + 64 + + See Also + ======== + + sympy.combinatorics.perm_groups.PermutationGroup.__mul__ + + """ + degrees = [] + gens_count = [] + total_degree = 0 + total_gens = 0 + for group in groups: + current_deg = group.degree + current_num_gens = len(group.generators) + degrees.append(current_deg) + total_degree += current_deg + gens_count.append(current_num_gens) + total_gens += current_num_gens + array_gens = [] + for i in range(total_gens): + array_gens.append(list(range(total_degree))) + current_gen = 0 + current_deg = 0 + for i in range(len(gens_count)): + for j in range(current_gen, current_gen + gens_count[i]): + gen = ((groups[i].generators)[j - current_gen]).array_form + array_gens[j][current_deg:current_deg + degrees[i]] = \ + [x + current_deg for x in gen] + current_gen += gens_count[i] + current_deg += degrees[i] + perm_gens = list(uniq([_af_new(list(a)) for a in array_gens])) + return PermutationGroup(perm_gens, dups=False) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/group_numbers.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/group_numbers.py new file mode 100644 index 0000000000000000000000000000000000000000..8099dfc2ed8a6943aa1261f9374ed84f0ad3c522 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/group_numbers.py @@ -0,0 +1,294 @@ +from itertools import chain, combinations + +from sympy.external.gmpy import gcd +from sympy.ntheory.factor_ import factorint +from sympy.utilities.misc import as_int + + +def _is_nilpotent_number(factors: dict) -> bool: + """ Check whether `n` is a nilpotent number. + Note that ``factors`` is a prime factorization of `n`. + + This is a low-level helper for ``is_nilpotent_number``, for internal use. + """ + for p in factors.keys(): + for q, e in factors.items(): + # We want to calculate + # any(pow(q, k, p) == 1 for k in range(1, e + 1)) + m = 1 + for _ in range(e): + m = m*q % p + if m == 1: + return False + return True + + +def is_nilpotent_number(n) -> bool: + """ + Check whether `n` is a nilpotent number. A number `n` is said to be + nilpotent if and only if every finite group of order `n` is nilpotent. + For more information see [1]_. + + Examples + ======== + + >>> from sympy.combinatorics.group_numbers import is_nilpotent_number + >>> from sympy import randprime + >>> is_nilpotent_number(21) + False + >>> is_nilpotent_number(randprime(1, 30)**12) + True + + References + ========== + + .. [1] Pakianathan, J., Shankar, K., Nilpotent Numbers, + The American Mathematical Monthly, 107(7), 631-634. + .. [2] https://oeis.org/A056867 + + """ + n = as_int(n) + if n <= 0: + raise ValueError("n must be a positive integer, not %i" % n) + return _is_nilpotent_number(factorint(n)) + + +def is_abelian_number(n) -> bool: + """ + Check whether `n` is an abelian number. A number `n` is said to be abelian + if and only if every finite group of order `n` is abelian. For more + information see [1]_. + + Examples + ======== + + >>> from sympy.combinatorics.group_numbers import is_abelian_number + >>> from sympy import randprime + >>> is_abelian_number(4) + True + >>> is_abelian_number(randprime(1, 2000)**2) + True + >>> is_abelian_number(60) + False + + References + ========== + + .. [1] Pakianathan, J., Shankar, K., Nilpotent Numbers, + The American Mathematical Monthly, 107(7), 631-634. + .. [2] https://oeis.org/A051532 + + """ + n = as_int(n) + if n <= 0: + raise ValueError("n must be a positive integer, not %i" % n) + factors = factorint(n) + return all(e < 3 for e in factors.values()) and _is_nilpotent_number(factors) + + +def is_cyclic_number(n) -> bool: + """ + Check whether `n` is a cyclic number. A number `n` is said to be cyclic + if and only if every finite group of order `n` is cyclic. For more + information see [1]_. + + Examples + ======== + + >>> from sympy.combinatorics.group_numbers import is_cyclic_number + >>> from sympy import randprime + >>> is_cyclic_number(15) + True + >>> is_cyclic_number(randprime(1, 2000)**2) + False + >>> is_cyclic_number(4) + False + + References + ========== + + .. [1] Pakianathan, J., Shankar, K., Nilpotent Numbers, + The American Mathematical Monthly, 107(7), 631-634. + .. [2] https://oeis.org/A003277 + + """ + n = as_int(n) + if n <= 0: + raise ValueError("n must be a positive integer, not %i" % n) + factors = factorint(n) + return all(e == 1 for e in factors.values()) and _is_nilpotent_number(factors) + + +def _holder_formula(prime_factors): + r""" Number of groups of order `n`. + where `n` is squarefree and its prime factors are ``prime_factors``. + i.e., ``n == math.prod(prime_factors)`` + + Explanation + =========== + + When `n` is squarefree, the number of groups of order `n` is expressed by + + .. math :: + \sum_{d \mid n} \prod_p \frac{p^{c(p, d)} - 1}{p - 1} + + where `n=de`, `p` is the prime factor of `e`, + and `c(p, d)` is the number of prime factors `q` of `d` such that `q \equiv 1 \pmod{p}` [2]_. + + The formula is elegant, but can be improved when implemented as an algorithm. + Since `n` is assumed to be squarefree, the divisor `d` of `n` can be identified with the power set of prime factors. + We let `N` be the set of prime factors of `n`. + `F = \{p \in N : \forall q \in N, q \not\equiv 1 \pmod{p} \}, M = N \setminus F`, we have the following. + + .. math :: + \sum_{d \in 2^{M}} \prod_{p \in M \setminus d} \frac{p^{c(p, F \cup d)} - 1}{p - 1} + + Practically, many prime factors are expected to be members of `F`, thus reducing computation time. + + Parameters + ========== + + prime_factors : set + The set of prime factors of ``n``. where `n` is squarefree. + + Returns + ======= + + int : Number of groups of order ``n`` + + Examples + ======== + + >>> from sympy.combinatorics.group_numbers import _holder_formula + >>> _holder_formula({2}) # n = 2 + 1 + >>> _holder_formula({2, 3}) # n = 2*3 = 6 + 2 + + See Also + ======== + + groups_count + + References + ========== + + .. [1] Otto Holder, Die Gruppen der Ordnungen p^3, pq^2, pqr, p^4, + Math. Ann. 43 pp. 301-412 (1893). + http://dx.doi.org/10.1007/BF01443651 + .. [2] John H. Conway, Heiko Dietrich and E.A. O'Brien, + Counting groups: gnus, moas and other exotica + The Mathematical Intelligencer 30, 6-15 (2008) + https://doi.org/10.1007/BF02985731 + + """ + F = {p for p in prime_factors if all(q % p != 1 for q in prime_factors)} + M = prime_factors - F + + s = 0 + powerset = chain.from_iterable(combinations(M, r) for r in range(len(M)+1)) + for ps in powerset: + ps = set(ps) + prod = 1 + for p in M - ps: + c = len([q for q in F | ps if q % p == 1]) + prod *= (p**c - 1) // (p - 1) + if not prod: + break + s += prod + return s + + +def groups_count(n): + r""" Number of groups of order `n`. + In [1]_, ``gnu(n)`` is given, so we follow this notation here as well. + + Parameters + ========== + + n : Integer + ``n`` is a positive integer + + Returns + ======= + + int : ``gnu(n)`` + + Raises + ====== + + ValueError + Number of groups of order ``n`` is unknown or not implemented. + For example, gnu(`2^{11}`) is not yet known. + On the other hand, gnu(99) is known to be 2, + but this has not yet been implemented in this function. + + Examples + ======== + + >>> from sympy.combinatorics.group_numbers import groups_count + >>> groups_count(3) # There is only one cyclic group of order 3 + 1 + >>> # There are two groups of order 10: the cyclic group and the dihedral group + >>> groups_count(10) + 2 + + See Also + ======== + + is_cyclic_number + `n` is cyclic iff gnu(n) = 1 + + References + ========== + + .. [1] John H. Conway, Heiko Dietrich and E.A. O'Brien, + Counting groups: gnus, moas and other exotica + The Mathematical Intelligencer 30, 6-15 (2008) + https://doi.org/10.1007/BF02985731 + .. [2] https://oeis.org/A000001 + + """ + n = as_int(n) + if n <= 0: + raise ValueError("n must be a positive integer, not %i" % n) + factors = factorint(n) + if len(factors) == 1: + (p, e) = list(factors.items())[0] + if p == 2: + A000679 = [1, 1, 2, 5, 14, 51, 267, 2328, 56092, 10494213, 49487367289] + if e < len(A000679): + return A000679[e] + if p == 3: + A090091 = [1, 1, 2, 5, 15, 67, 504, 9310, 1396077, 5937876645] + if e < len(A090091): + return A090091[e] + if e <= 2: # gnu(p) = 1, gnu(p**2) = 2 + return e + if e == 3: # gnu(p**3) = 5 + return 5 + if e == 4: # if p is an odd prime, gnu(p**4) = 15 + return 15 + if e == 5: # if p >= 5, gnu(p**5) is expressed by the following equation + return 61 + 2*p + 2*gcd(p-1, 3) + gcd(p-1, 4) + if e == 6: # if p >= 6, gnu(p**6) is expressed by the following equation + return 3*p**2 + 39*p + 344 +\ + 24*gcd(p-1, 3) + 11*gcd(p-1, 4) + 2*gcd(p-1, 5) + if e == 7: # if p >= 7, gnu(p**7) is expressed by the following equation + if p == 5: + return 34297 + return 3*p**5 + 12*p**4 + 44*p**3 + 170*p**2 + 707*p + 2455 +\ + (4*p**2 + 44*p + 291)*gcd(p-1, 3) + (p**2 + 19*p + 135)*gcd(p-1, 4) + \ + (3*p + 31)*gcd(p-1, 5) + 4*gcd(p-1, 7) + 5*gcd(p-1, 8) + gcd(p-1, 9) + if any(e > 1 for e in factors.values()): # n is not squarefree + # some known values for small n that have more than 1 factor and are not square free (https://oeis.org/A000001) + small = {12: 5, 18: 5, 20: 5, 24: 15, 28: 4, 36: 14, 40: 14, 44: 4, 45: 2, 48: 52, + 50: 5, 52: 5, 54: 15, 56: 13, 60: 13, 63: 4, 68: 5, 72: 50, 75: 3, 76: 4, + 80: 52, 84: 15, 88: 12, 90: 10, 92: 4} + if n in small: + return small[n] + raise ValueError("Number of groups of order n is unknown or not implemented") + if len(factors) == 2: # n is squarefree semiprime + p, q = sorted(factors.keys()) + return 2 if q % p == 1 else 1 + return _holder_formula(set(factors.keys())) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/homomorphisms.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/homomorphisms.py new file mode 100644 index 0000000000000000000000000000000000000000..256f56b3aa7c5404d332f42e37d4f1117ea81db7 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/homomorphisms.py @@ -0,0 +1,549 @@ +import itertools +from sympy.combinatorics.fp_groups import FpGroup, FpSubgroup, simplify_presentation +from sympy.combinatorics.free_groups import FreeGroup +from sympy.combinatorics.perm_groups import PermutationGroup +from sympy.core.intfunc import igcd +from sympy.functions.combinatorial.numbers import totient +from sympy.core.singleton import S + +class GroupHomomorphism: + ''' + A class representing group homomorphisms. Instantiate using `homomorphism()`. + + References + ========== + + .. [1] Holt, D., Eick, B. and O'Brien, E. (2005). Handbook of computational group theory. + + ''' + + def __init__(self, domain, codomain, images): + self.domain = domain + self.codomain = codomain + self.images = images + self._inverses = None + self._kernel = None + self._image = None + + def _invs(self): + ''' + Return a dictionary with `{gen: inverse}` where `gen` is a rewriting + generator of `codomain` (e.g. strong generator for permutation groups) + and `inverse` is an element of its preimage + + ''' + image = self.image() + inverses = {} + for k in list(self.images.keys()): + v = self.images[k] + if not (v in inverses + or v.is_identity): + inverses[v] = k + if isinstance(self.codomain, PermutationGroup): + gens = image.strong_gens + else: + gens = image.generators + for g in gens: + if g in inverses or g.is_identity: + continue + w = self.domain.identity + if isinstance(self.codomain, PermutationGroup): + parts = image._strong_gens_slp[g][::-1] + else: + parts = g + for s in parts: + if s in inverses: + w = w*inverses[s] + else: + w = w*inverses[s**-1]**-1 + inverses[g] = w + + return inverses + + def invert(self, g): + ''' + Return an element of the preimage of ``g`` or of each element + of ``g`` if ``g`` is a list. + + Explanation + =========== + + If the codomain is an FpGroup, the inverse for equal + elements might not always be the same unless the FpGroup's + rewriting system is confluent. However, making a system + confluent can be time-consuming. If it's important, try + `self.codomain.make_confluent()` first. + + ''' + from sympy.combinatorics import Permutation + from sympy.combinatorics.free_groups import FreeGroupElement + if isinstance(g, (Permutation, FreeGroupElement)): + if isinstance(self.codomain, FpGroup): + g = self.codomain.reduce(g) + if self._inverses is None: + self._inverses = self._invs() + image = self.image() + w = self.domain.identity + if isinstance(self.codomain, PermutationGroup): + gens = image.generator_product(g)[::-1] + else: + gens = g + # the following can't be "for s in gens:" + # because that would be equivalent to + # "for s in gens.array_form:" when g is + # a FreeGroupElement. On the other hand, + # when you call gens by index, the generator + # (or inverse) at position i is returned. + for i in range(len(gens)): + s = gens[i] + if s.is_identity: + continue + if s in self._inverses: + w = w*self._inverses[s] + else: + w = w*self._inverses[s**-1]**-1 + return w + elif isinstance(g, list): + return [self.invert(e) for e in g] + + def kernel(self): + ''' + Compute the kernel of `self`. + + ''' + if self._kernel is None: + self._kernel = self._compute_kernel() + return self._kernel + + def _compute_kernel(self): + G = self.domain + G_order = G.order() + if G_order is S.Infinity: + raise NotImplementedError( + "Kernel computation is not implemented for infinite groups") + gens = [] + if isinstance(G, PermutationGroup): + K = PermutationGroup(G.identity) + else: + K = FpSubgroup(G, gens, normal=True) + i = self.image().order() + while K.order()*i != G_order: + r = G.random() + k = r*self.invert(self(r))**-1 + if k not in K: + gens.append(k) + if isinstance(G, PermutationGroup): + K = PermutationGroup(gens) + else: + K = FpSubgroup(G, gens, normal=True) + return K + + def image(self): + ''' + Compute the image of `self`. + + ''' + if self._image is None: + values = list(set(self.images.values())) + if isinstance(self.codomain, PermutationGroup): + self._image = self.codomain.subgroup(values) + else: + self._image = FpSubgroup(self.codomain, values) + return self._image + + def _apply(self, elem): + ''' + Apply `self` to `elem`. + + ''' + if elem not in self.domain: + if isinstance(elem, (list, tuple)): + return [self._apply(e) for e in elem] + raise ValueError("The supplied element does not belong to the domain") + if elem.is_identity: + return self.codomain.identity + else: + images = self.images + value = self.codomain.identity + if isinstance(self.domain, PermutationGroup): + gens = self.domain.generator_product(elem, original=True) + for g in gens: + if g in self.images: + value = images[g]*value + else: + value = images[g**-1]**-1*value + else: + i = 0 + for _, p in elem.array_form: + if p < 0: + g = elem[i]**-1 + else: + g = elem[i] + value = value*images[g]**p + i += abs(p) + return value + + def __call__(self, elem): + return self._apply(elem) + + def is_injective(self): + ''' + Check if the homomorphism is injective + + ''' + return self.kernel().order() == 1 + + def is_surjective(self): + ''' + Check if the homomorphism is surjective + + ''' + im = self.image().order() + oth = self.codomain.order() + if im is S.Infinity and oth is S.Infinity: + return None + else: + return im == oth + + def is_isomorphism(self): + ''' + Check if `self` is an isomorphism. + + ''' + return self.is_injective() and self.is_surjective() + + def is_trivial(self): + ''' + Check is `self` is a trivial homomorphism, i.e. all elements + are mapped to the identity. + + ''' + return self.image().order() == 1 + + def compose(self, other): + ''' + Return the composition of `self` and `other`, i.e. + the homomorphism phi such that for all g in the domain + of `other`, phi(g) = self(other(g)) + + ''' + if not other.image().is_subgroup(self.domain): + raise ValueError("The image of `other` must be a subgroup of " + "the domain of `self`") + images = {g: self(other(g)) for g in other.images} + return GroupHomomorphism(other.domain, self.codomain, images) + + def restrict_to(self, H): + ''' + Return the restriction of the homomorphism to the subgroup `H` + of the domain. + + ''' + if not isinstance(H, PermutationGroup) or not H.is_subgroup(self.domain): + raise ValueError("Given H is not a subgroup of the domain") + domain = H + images = {g: self(g) for g in H.generators} + return GroupHomomorphism(domain, self.codomain, images) + + def invert_subgroup(self, H): + ''' + Return the subgroup of the domain that is the inverse image + of the subgroup ``H`` of the homomorphism image + + ''' + if not H.is_subgroup(self.image()): + raise ValueError("Given H is not a subgroup of the image") + gens = [] + P = PermutationGroup(self.image().identity) + for h in H.generators: + h_i = self.invert(h) + if h_i not in P: + gens.append(h_i) + P = PermutationGroup(gens) + for k in self.kernel().generators: + if k*h_i not in P: + gens.append(k*h_i) + P = PermutationGroup(gens) + return P + +def homomorphism(domain, codomain, gens, images=(), check=True): + ''' + Create (if possible) a group homomorphism from the group ``domain`` + to the group ``codomain`` defined by the images of the domain's + generators ``gens``. ``gens`` and ``images`` can be either lists or tuples + of equal sizes. If ``gens`` is a proper subset of the group's generators, + the unspecified generators will be mapped to the identity. If the + images are not specified, a trivial homomorphism will be created. + + If the given images of the generators do not define a homomorphism, + an exception is raised. + + If ``check`` is ``False``, do not check whether the given images actually + define a homomorphism. + + ''' + if not isinstance(domain, (PermutationGroup, FpGroup, FreeGroup)): + raise TypeError("The domain must be a group") + if not isinstance(codomain, (PermutationGroup, FpGroup, FreeGroup)): + raise TypeError("The codomain must be a group") + + generators = domain.generators + if not all(g in generators for g in gens): + raise ValueError("The supplied generators must be a subset of the domain's generators") + if not all(g in codomain for g in images): + raise ValueError("The images must be elements of the codomain") + + if images and len(images) != len(gens): + raise ValueError("The number of images must be equal to the number of generators") + + gens = list(gens) + images = list(images) + + images.extend([codomain.identity]*(len(generators)-len(images))) + gens.extend([g for g in generators if g not in gens]) + images = dict(zip(gens,images)) + + if check and not _check_homomorphism(domain, codomain, images): + raise ValueError("The given images do not define a homomorphism") + return GroupHomomorphism(domain, codomain, images) + +def _check_homomorphism(domain, codomain, images): + """ + Check that a given mapping of generators to images defines a homomorphism. + + Parameters + ========== + domain : PermutationGroup, FpGroup, FreeGroup + codomain : PermutationGroup, FpGroup, FreeGroup + images : dict + The set of keys must be equal to domain.generators. + The values must be elements of the codomain. + + """ + pres = domain if hasattr(domain, 'relators') else domain.presentation() + rels = pres.relators + gens = pres.generators + symbols = [g.ext_rep[0] for g in gens] + symbols_to_domain_generators = dict(zip(symbols, domain.generators)) + identity = codomain.identity + + def _image(r): + w = identity + for symbol, power in r.array_form: + g = symbols_to_domain_generators[symbol] + w *= images[g]**power + return w + + for r in rels: + if isinstance(codomain, FpGroup): + s = codomain.equals(_image(r), identity) + if s is None: + # only try to make the rewriting system + # confluent when it can't determine the + # truth of equality otherwise + success = codomain.make_confluent() + s = codomain.equals(_image(r), identity) + if s is None and not success: + raise RuntimeError("Can't determine if the images " + "define a homomorphism. Try increasing " + "the maximum number of rewriting rules " + "(group._rewriting_system.set_max(new_value); " + "the current value is stored in group._rewriting" + "_system.maxeqns)") + else: + s = _image(r).is_identity + if not s: + return False + return True + +def orbit_homomorphism(group, omega): + ''' + Return the homomorphism induced by the action of the permutation + group ``group`` on the set ``omega`` that is closed under the action. + + ''' + from sympy.combinatorics import Permutation + from sympy.combinatorics.named_groups import SymmetricGroup + codomain = SymmetricGroup(len(omega)) + identity = codomain.identity + omega = list(omega) + images = {g: identity*Permutation([omega.index(o^g) for o in omega]) for g in group.generators} + group._schreier_sims(base=omega) + H = GroupHomomorphism(group, codomain, images) + if len(group.basic_stabilizers) > len(omega): + H._kernel = group.basic_stabilizers[len(omega)] + else: + H._kernel = PermutationGroup([group.identity]) + return H + +def block_homomorphism(group, blocks): + ''' + Return the homomorphism induced by the action of the permutation + group ``group`` on the block system ``blocks``. The latter should be + of the same form as returned by the ``minimal_block`` method for + permutation groups, namely a list of length ``group.degree`` where + the i-th entry is a representative of the block i belongs to. + + ''' + from sympy.combinatorics import Permutation + from sympy.combinatorics.named_groups import SymmetricGroup + + n = len(blocks) + + # number the blocks; m is the total number, + # b is such that b[i] is the number of the block i belongs to, + # p is the list of length m such that p[i] is the representative + # of the i-th block + m = 0 + p = [] + b = [None]*n + for i in range(n): + if blocks[i] == i: + p.append(i) + b[i] = m + m += 1 + for i in range(n): + b[i] = b[blocks[i]] + + codomain = SymmetricGroup(m) + # the list corresponding to the identity permutation in codomain + identity = range(m) + images = {g: Permutation([b[p[i]^g] for i in identity]) for g in group.generators} + H = GroupHomomorphism(group, codomain, images) + return H + +def group_isomorphism(G, H, isomorphism=True): + ''' + Compute an isomorphism between 2 given groups. + + Parameters + ========== + + G : A finite ``FpGroup`` or a ``PermutationGroup``. + First group. + + H : A finite ``FpGroup`` or a ``PermutationGroup`` + Second group. + + isomorphism : bool + This is used to avoid the computation of homomorphism + when the user only wants to check if there exists + an isomorphism between the groups. + + Returns + ======= + + If isomorphism = False -- Returns a boolean. + If isomorphism = True -- Returns a boolean and an isomorphism between `G` and `H`. + + Examples + ======== + + >>> from sympy.combinatorics import free_group, Permutation + >>> from sympy.combinatorics.perm_groups import PermutationGroup + >>> from sympy.combinatorics.fp_groups import FpGroup + >>> from sympy.combinatorics.homomorphisms import group_isomorphism + >>> from sympy.combinatorics.named_groups import DihedralGroup, AlternatingGroup + + >>> D = DihedralGroup(8) + >>> p = Permutation(0, 1, 2, 3, 4, 5, 6, 7) + >>> P = PermutationGroup(p) + >>> group_isomorphism(D, P) + (False, None) + + >>> F, a, b = free_group("a, b") + >>> G = FpGroup(F, [a**3, b**3, (a*b)**2]) + >>> H = AlternatingGroup(4) + >>> (check, T) = group_isomorphism(G, H) + >>> check + True + >>> T(b*a*b**-1*a**-1*b**-1) + (0 2 3) + + Notes + ===== + + Uses the approach suggested by Robert Tarjan to compute the isomorphism between two groups. + First, the generators of ``G`` are mapped to the elements of ``H`` and + we check if the mapping induces an isomorphism. + + ''' + if not isinstance(G, (PermutationGroup, FpGroup)): + raise TypeError("The group must be a PermutationGroup or an FpGroup") + if not isinstance(H, (PermutationGroup, FpGroup)): + raise TypeError("The group must be a PermutationGroup or an FpGroup") + + if isinstance(G, FpGroup) and isinstance(H, FpGroup): + G = simplify_presentation(G) + H = simplify_presentation(H) + # Two infinite FpGroups with the same generators are isomorphic + # when the relators are same but are ordered differently. + if G.generators == H.generators and (G.relators).sort() == (H.relators).sort(): + if not isomorphism: + return True + return (True, homomorphism(G, H, G.generators, H.generators)) + + # `_H` is the permutation group isomorphic to `H`. + _H = H + g_order = G.order() + h_order = H.order() + + if g_order is S.Infinity: + raise NotImplementedError("Isomorphism methods are not implemented for infinite groups.") + + if isinstance(H, FpGroup): + if h_order is S.Infinity: + raise NotImplementedError("Isomorphism methods are not implemented for infinite groups.") + _H, h_isomorphism = H._to_perm_group() + + if (g_order != h_order) or (G.is_abelian != H.is_abelian): + if not isomorphism: + return False + return (False, None) + + if not isomorphism: + # Two groups of the same cyclic numbered order + # are isomorphic to each other. + n = g_order + if (igcd(n, totient(n))) == 1: + return True + + # Match the generators of `G` with subsets of `_H` + gens = list(G.generators) + for subset in itertools.permutations(_H, len(gens)): + images = list(subset) + images.extend([_H.identity]*(len(G.generators)-len(images))) + _images = dict(zip(gens,images)) + if _check_homomorphism(G, _H, _images): + if isinstance(H, FpGroup): + images = h_isomorphism.invert(images) + T = homomorphism(G, H, G.generators, images, check=False) + if T.is_isomorphism(): + # It is a valid isomorphism + if not isomorphism: + return True + return (True, T) + + if not isomorphism: + return False + return (False, None) + +def is_isomorphic(G, H): + ''' + Check if the groups are isomorphic to each other + + Parameters + ========== + + G : A finite ``FpGroup`` or a ``PermutationGroup`` + First group. + + H : A finite ``FpGroup`` or a ``PermutationGroup`` + Second group. + + Returns + ======= + + boolean + ''' + return group_isomorphism(G, H, isomorphism=False) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/named_groups.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/named_groups.py new file mode 100644 index 0000000000000000000000000000000000000000..59f10c40ef716e3b644e00f936323e9f6936eb88 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/named_groups.py @@ -0,0 +1,332 @@ +from sympy.combinatorics.group_constructs import DirectProduct +from sympy.combinatorics.perm_groups import PermutationGroup +from sympy.combinatorics.permutations import Permutation + +_af_new = Permutation._af_new + + +def AbelianGroup(*cyclic_orders): + """ + Returns the direct product of cyclic groups with the given orders. + + Explanation + =========== + + According to the structure theorem for finite abelian groups ([1]), + every finite abelian group can be written as the direct product of + finitely many cyclic groups. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import AbelianGroup + >>> AbelianGroup(3, 4) + PermutationGroup([ + (6)(0 1 2), + (3 4 5 6)]) + >>> _.is_group + True + + See Also + ======== + + DirectProduct + + References + ========== + + .. [1] https://groupprops.subwiki.org/wiki/Structure_theorem_for_finitely_generated_abelian_groups + + """ + groups = [] + degree = 0 + order = 1 + for size in cyclic_orders: + degree += size + order *= size + groups.append(CyclicGroup(size)) + G = DirectProduct(*groups) + G._is_abelian = True + G._degree = degree + G._order = order + + return G + + +def AlternatingGroup(n): + """ + Generates the alternating group on ``n`` elements as a permutation group. + + Explanation + =========== + + For ``n > 2``, the generators taken are ``(0 1 2), (0 1 2 ... n-1)`` for + ``n`` odd + and ``(0 1 2), (1 2 ... n-1)`` for ``n`` even (See [1], p.31, ex.6.9.). + After the group is generated, some of its basic properties are set. + The cases ``n = 1, 2`` are handled separately. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import AlternatingGroup + >>> G = AlternatingGroup(4) + >>> G.is_group + True + >>> a = list(G.generate_dimino()) + >>> len(a) + 12 + >>> all(perm.is_even for perm in a) + True + + See Also + ======== + + SymmetricGroup, CyclicGroup, DihedralGroup + + References + ========== + + .. [1] Armstrong, M. "Groups and Symmetry" + + """ + # small cases are special + if n in (1, 2): + return PermutationGroup([Permutation([0])]) + + a = list(range(n)) + a[0], a[1], a[2] = a[1], a[2], a[0] + gen1 = a + if n % 2: + a = list(range(1, n)) + a.append(0) + gen2 = a + else: + a = list(range(2, n)) + a.append(1) + a.insert(0, 0) + gen2 = a + gens = [gen1, gen2] + if gen1 == gen2: + gens = gens[:1] + G = PermutationGroup([_af_new(a) for a in gens], dups=False) + + set_alternating_group_properties(G, n, n) + G._is_alt = True + return G + + +def set_alternating_group_properties(G, n, degree): + """Set known properties of an alternating group. """ + if n < 4: + G._is_abelian = True + G._is_nilpotent = True + else: + G._is_abelian = False + G._is_nilpotent = False + if n < 5: + G._is_solvable = True + else: + G._is_solvable = False + G._degree = degree + G._is_transitive = True + G._is_dihedral = False + + +def CyclicGroup(n): + """ + Generates the cyclic group of order ``n`` as a permutation group. + + Explanation + =========== + + The generator taken is the ``n``-cycle ``(0 1 2 ... n-1)`` + (in cycle notation). After the group is generated, some of its basic + properties are set. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import CyclicGroup + >>> G = CyclicGroup(6) + >>> G.is_group + True + >>> G.order() + 6 + >>> list(G.generate_schreier_sims(af=True)) + [[0, 1, 2, 3, 4, 5], [1, 2, 3, 4, 5, 0], [2, 3, 4, 5, 0, 1], + [3, 4, 5, 0, 1, 2], [4, 5, 0, 1, 2, 3], [5, 0, 1, 2, 3, 4]] + + See Also + ======== + + SymmetricGroup, DihedralGroup, AlternatingGroup + + """ + a = list(range(1, n)) + a.append(0) + gen = _af_new(a) + G = PermutationGroup([gen]) + + G._is_abelian = True + G._is_nilpotent = True + G._is_solvable = True + G._degree = n + G._is_transitive = True + G._order = n + G._is_dihedral = (n == 2) + return G + + +def DihedralGroup(n): + r""" + Generates the dihedral group `D_n` as a permutation group. + + Explanation + =========== + + The dihedral group `D_n` is the group of symmetries of the regular + ``n``-gon. The generators taken are the ``n``-cycle ``a = (0 1 2 ... n-1)`` + (a rotation of the ``n``-gon) and ``b = (0 n-1)(1 n-2)...`` + (a reflection of the ``n``-gon) in cycle rotation. It is easy to see that + these satisfy ``a**n = b**2 = 1`` and ``bab = ~a`` so they indeed generate + `D_n` (See [1]). After the group is generated, some of its basic properties + are set. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> G = DihedralGroup(5) + >>> G.is_group + True + >>> a = list(G.generate_dimino()) + >>> [perm.cyclic_form for perm in a] + [[], [[0, 1, 2, 3, 4]], [[0, 2, 4, 1, 3]], + [[0, 3, 1, 4, 2]], [[0, 4, 3, 2, 1]], [[0, 4], [1, 3]], + [[1, 4], [2, 3]], [[0, 1], [2, 4]], [[0, 2], [3, 4]], + [[0, 3], [1, 2]]] + + See Also + ======== + + SymmetricGroup, CyclicGroup, AlternatingGroup + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Dihedral_group + + """ + # small cases are special + if n == 1: + return PermutationGroup([Permutation([1, 0])]) + if n == 2: + return PermutationGroup([Permutation([1, 0, 3, 2]), + Permutation([2, 3, 0, 1]), Permutation([3, 2, 1, 0])]) + + a = list(range(1, n)) + a.append(0) + gen1 = _af_new(a) + a = list(range(n)) + a.reverse() + gen2 = _af_new(a) + G = PermutationGroup([gen1, gen2]) + # if n is a power of 2, group is nilpotent + if n & (n-1) == 0: + G._is_nilpotent = True + else: + G._is_nilpotent = False + G._is_dihedral = True + G._is_abelian = False + G._is_solvable = True + G._degree = n + G._is_transitive = True + G._order = 2*n + return G + + +def SymmetricGroup(n): + """ + Generates the symmetric group on ``n`` elements as a permutation group. + + Explanation + =========== + + The generators taken are the ``n``-cycle + ``(0 1 2 ... n-1)`` and the transposition ``(0 1)`` (in cycle notation). + (See [1]). After the group is generated, some of its basic properties + are set. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> G = SymmetricGroup(4) + >>> G.is_group + True + >>> G.order() + 24 + >>> list(G.generate_schreier_sims(af=True)) + [[0, 1, 2, 3], [1, 2, 3, 0], [2, 3, 0, 1], [3, 1, 2, 0], [0, 2, 3, 1], + [1, 3, 0, 2], [2, 0, 1, 3], [3, 2, 0, 1], [0, 3, 1, 2], [1, 0, 2, 3], + [2, 1, 3, 0], [3, 0, 1, 2], [0, 1, 3, 2], [1, 2, 0, 3], [2, 3, 1, 0], + [3, 1, 0, 2], [0, 2, 1, 3], [1, 3, 2, 0], [2, 0, 3, 1], [3, 2, 1, 0], + [0, 3, 2, 1], [1, 0, 3, 2], [2, 1, 0, 3], [3, 0, 2, 1]] + + See Also + ======== + + CyclicGroup, DihedralGroup, AlternatingGroup + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Symmetric_group#Generators_and_relations + + """ + if n == 1: + G = PermutationGroup([Permutation([0])]) + elif n == 2: + G = PermutationGroup([Permutation([1, 0])]) + else: + a = list(range(1, n)) + a.append(0) + gen1 = _af_new(a) + a = list(range(n)) + a[0], a[1] = a[1], a[0] + gen2 = _af_new(a) + G = PermutationGroup([gen1, gen2]) + set_symmetric_group_properties(G, n, n) + G._is_sym = True + return G + + +def set_symmetric_group_properties(G, n, degree): + """Set known properties of a symmetric group. """ + if n < 3: + G._is_abelian = True + G._is_nilpotent = True + else: + G._is_abelian = False + G._is_nilpotent = False + if n < 5: + G._is_solvable = True + else: + G._is_solvable = False + G._degree = degree + G._is_transitive = True + G._is_dihedral = (n in [2, 3]) # cf Landau's func and Stirling's approx + + +def RubikGroup(n): + """Return a group of Rubik's cube generators + + >>> from sympy.combinatorics.named_groups import RubikGroup + >>> RubikGroup(2).is_group + True + """ + from sympy.combinatorics.generators import rubik + if n <= 1: + raise ValueError("Invalid cube. n has to be greater than 1") + return PermutationGroup(rubik(n)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/partitions.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/partitions.py new file mode 100644 index 0000000000000000000000000000000000000000..dfe646baabbb5bf2350cba859a265ac32bbfaf53 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/partitions.py @@ -0,0 +1,745 @@ +from sympy.core import Basic, Dict, sympify, Tuple +from sympy.core.numbers import Integer +from sympy.core.sorting import default_sort_key +from sympy.core.sympify import _sympify +from sympy.functions.combinatorial.numbers import bell +from sympy.matrices import zeros +from sympy.sets.sets import FiniteSet, Union +from sympy.utilities.iterables import flatten, group +from sympy.utilities.misc import as_int + + +from collections import defaultdict + + +class Partition(FiniteSet): + """ + This class represents an abstract partition. + + A partition is a set of disjoint sets whose union equals a given set. + + See Also + ======== + + sympy.utilities.iterables.partitions, + sympy.utilities.iterables.multiset_partitions + """ + + _rank = None + _partition = None + + def __new__(cls, *partition): + """ + Generates a new partition object. + + This method also verifies if the arguments passed are + valid and raises a ValueError if they are not. + + Examples + ======== + + Creating Partition from Python lists: + + >>> from sympy.combinatorics import Partition + >>> a = Partition([1, 2], [3]) + >>> a + Partition({3}, {1, 2}) + >>> a.partition + [[1, 2], [3]] + >>> len(a) + 2 + >>> a.members + (1, 2, 3) + + Creating Partition from Python sets: + + >>> Partition({1, 2, 3}, {4, 5}) + Partition({4, 5}, {1, 2, 3}) + + Creating Partition from SymPy finite sets: + + >>> from sympy import FiniteSet + >>> a = FiniteSet(1, 2, 3) + >>> b = FiniteSet(4, 5) + >>> Partition(a, b) + Partition({4, 5}, {1, 2, 3}) + """ + args = [] + dups = False + for arg in partition: + if isinstance(arg, list): + as_set = set(arg) + if len(as_set) < len(arg): + dups = True + break # error below + arg = as_set + args.append(_sympify(arg)) + + if not all(isinstance(part, FiniteSet) for part in args): + raise ValueError( + "Each argument to Partition should be " \ + "a list, set, or a FiniteSet") + + # sort so we have a canonical reference for RGS + U = Union(*args) + if dups or len(U) < sum(len(arg) for arg in args): + raise ValueError("Partition contained duplicate elements.") + + obj = FiniteSet.__new__(cls, *args) + obj.members = tuple(U) + obj.size = len(U) + return obj + + def sort_key(self, order=None): + """Return a canonical key that can be used for sorting. + + Ordering is based on the size and sorted elements of the partition + and ties are broken with the rank. + + Examples + ======== + + >>> from sympy import default_sort_key + >>> from sympy.combinatorics import Partition + >>> from sympy.abc import x + >>> a = Partition([1, 2]) + >>> b = Partition([3, 4]) + >>> c = Partition([1, x]) + >>> d = Partition(list(range(4))) + >>> l = [d, b, a + 1, a, c] + >>> l.sort(key=default_sort_key); l + [Partition({1, 2}), Partition({1}, {2}), Partition({1, x}), Partition({3, 4}), Partition({0, 1, 2, 3})] + """ + if order is None: + members = self.members + else: + members = tuple(sorted(self.members, + key=lambda w: default_sort_key(w, order))) + return tuple(map(default_sort_key, (self.size, members, self.rank))) + + @property + def partition(self): + """Return partition as a sorted list of lists. + + Examples + ======== + + >>> from sympy.combinatorics import Partition + >>> Partition([1], [2, 3]).partition + [[1], [2, 3]] + """ + if self._partition is None: + self._partition = sorted([sorted(p, key=default_sort_key) + for p in self.args]) + return self._partition + + def __add__(self, other): + """ + Return permutation whose rank is ``other`` greater than current rank, + (mod the maximum rank for the set). + + Examples + ======== + + >>> from sympy.combinatorics import Partition + >>> a = Partition([1, 2], [3]) + >>> a.rank + 1 + >>> (a + 1).rank + 2 + >>> (a + 100).rank + 1 + """ + other = as_int(other) + offset = self.rank + other + result = RGS_unrank((offset) % + RGS_enum(self.size), + self.size) + return Partition.from_rgs(result, self.members) + + def __sub__(self, other): + """ + Return permutation whose rank is ``other`` less than current rank, + (mod the maximum rank for the set). + + Examples + ======== + + >>> from sympy.combinatorics import Partition + >>> a = Partition([1, 2], [3]) + >>> a.rank + 1 + >>> (a - 1).rank + 0 + >>> (a - 100).rank + 1 + """ + return self.__add__(-other) + + def __le__(self, other): + """ + Checks if a partition is less than or equal to + the other based on rank. + + Examples + ======== + + >>> from sympy.combinatorics import Partition + >>> a = Partition([1, 2], [3, 4, 5]) + >>> b = Partition([1], [2, 3], [4], [5]) + >>> a.rank, b.rank + (9, 34) + >>> a <= a + True + >>> a <= b + True + """ + return self.sort_key() <= sympify(other).sort_key() + + def __lt__(self, other): + """ + Checks if a partition is less than the other. + + Examples + ======== + + >>> from sympy.combinatorics import Partition + >>> a = Partition([1, 2], [3, 4, 5]) + >>> b = Partition([1], [2, 3], [4], [5]) + >>> a.rank, b.rank + (9, 34) + >>> a < b + True + """ + return self.sort_key() < sympify(other).sort_key() + + @property + def rank(self): + """ + Gets the rank of a partition. + + Examples + ======== + + >>> from sympy.combinatorics import Partition + >>> a = Partition([1, 2], [3], [4, 5]) + >>> a.rank + 13 + """ + if self._rank is not None: + return self._rank + self._rank = RGS_rank(self.RGS) + return self._rank + + @property + def RGS(self): + """ + Returns the "restricted growth string" of the partition. + + Explanation + =========== + + The RGS is returned as a list of indices, L, where L[i] indicates + the block in which element i appears. For example, in a partition + of 3 elements (a, b, c) into 2 blocks ([c], [a, b]) the RGS is + [1, 1, 0]: "a" is in block 1, "b" is in block 1 and "c" is in block 0. + + Examples + ======== + + >>> from sympy.combinatorics import Partition + >>> a = Partition([1, 2], [3], [4, 5]) + >>> a.members + (1, 2, 3, 4, 5) + >>> a.RGS + (0, 0, 1, 2, 2) + >>> a + 1 + Partition({3}, {4}, {5}, {1, 2}) + >>> _.RGS + (0, 0, 1, 2, 3) + """ + rgs = {} + partition = self.partition + for i, part in enumerate(partition): + for j in part: + rgs[j] = i + return tuple([rgs[i] for i in sorted( + [i for p in partition for i in p], key=default_sort_key)]) + + @classmethod + def from_rgs(self, rgs, elements): + """ + Creates a set partition from a restricted growth string. + + Explanation + =========== + + The indices given in rgs are assumed to be the index + of the element as given in elements *as provided* (the + elements are not sorted by this routine). Block numbering + starts from 0. If any block was not referenced in ``rgs`` + an error will be raised. + + Examples + ======== + + >>> from sympy.combinatorics import Partition + >>> Partition.from_rgs([0, 1, 2, 0, 1], list('abcde')) + Partition({c}, {a, d}, {b, e}) + >>> Partition.from_rgs([0, 1, 2, 0, 1], list('cbead')) + Partition({e}, {a, c}, {b, d}) + >>> a = Partition([1, 4], [2], [3, 5]) + >>> Partition.from_rgs(a.RGS, a.members) + Partition({2}, {1, 4}, {3, 5}) + """ + if len(rgs) != len(elements): + raise ValueError('mismatch in rgs and element lengths') + max_elem = max(rgs) + 1 + partition = [[] for i in range(max_elem)] + j = 0 + for i in rgs: + partition[i].append(elements[j]) + j += 1 + if not all(p for p in partition): + raise ValueError('some blocks of the partition were empty.') + return Partition(*partition) + + +class IntegerPartition(Basic): + """ + This class represents an integer partition. + + Explanation + =========== + + In number theory and combinatorics, a partition of a positive integer, + ``n``, also called an integer partition, is a way of writing ``n`` as a + list of positive integers that sum to n. Two partitions that differ only + in the order of summands are considered to be the same partition; if order + matters then the partitions are referred to as compositions. For example, + 4 has five partitions: [4], [3, 1], [2, 2], [2, 1, 1], and [1, 1, 1, 1]; + the compositions [1, 2, 1] and [1, 1, 2] are the same as partition + [2, 1, 1]. + + See Also + ======== + + sympy.utilities.iterables.partitions, + sympy.utilities.iterables.multiset_partitions + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Partition_%28number_theory%29 + """ + + _dict = None + _keys = None + + def __new__(cls, partition, integer=None): + """ + Generates a new IntegerPartition object from a list or dictionary. + + Explanation + =========== + + The partition can be given as a list of positive integers or a + dictionary of (integer, multiplicity) items. If the partition is + preceded by an integer an error will be raised if the partition + does not sum to that given integer. + + Examples + ======== + + >>> from sympy.combinatorics.partitions import IntegerPartition + >>> a = IntegerPartition([5, 4, 3, 1, 1]) + >>> a + IntegerPartition(14, (5, 4, 3, 1, 1)) + >>> print(a) + [5, 4, 3, 1, 1] + >>> IntegerPartition({1:3, 2:1}) + IntegerPartition(5, (2, 1, 1, 1)) + + If the value that the partition should sum to is given first, a check + will be made to see n error will be raised if there is a discrepancy: + + >>> IntegerPartition(10, [5, 4, 3, 1]) + Traceback (most recent call last): + ... + ValueError: The partition is not valid + + """ + if integer is not None: + integer, partition = partition, integer + if isinstance(partition, (dict, Dict)): + _ = [] + for k, v in sorted(partition.items(), reverse=True): + if not v: + continue + k, v = as_int(k), as_int(v) + _.extend([k]*v) + partition = tuple(_) + else: + partition = tuple(sorted(map(as_int, partition), reverse=True)) + sum_ok = False + if integer is None: + integer = sum(partition) + sum_ok = True + else: + integer = as_int(integer) + + if not sum_ok and sum(partition) != integer: + raise ValueError("Partition did not add to %s" % integer) + if any(i < 1 for i in partition): + raise ValueError("All integer summands must be greater than one") + + obj = Basic.__new__(cls, Integer(integer), Tuple(*partition)) + obj.partition = list(partition) + obj.integer = integer + return obj + + def prev_lex(self): + """Return the previous partition of the integer, n, in lexical order, + wrapping around to [1, ..., 1] if the partition is [n]. + + Examples + ======== + + >>> from sympy.combinatorics.partitions import IntegerPartition + >>> p = IntegerPartition([4]) + >>> print(p.prev_lex()) + [3, 1] + >>> p.partition > p.prev_lex().partition + True + """ + d = defaultdict(int) + d.update(self.as_dict()) + keys = self._keys + if keys == [1]: + return IntegerPartition({self.integer: 1}) + if keys[-1] != 1: + d[keys[-1]] -= 1 + if keys[-1] == 2: + d[1] = 2 + else: + d[keys[-1] - 1] = d[1] = 1 + else: + d[keys[-2]] -= 1 + left = d[1] + keys[-2] + new = keys[-2] + d[1] = 0 + while left: + new -= 1 + if left - new >= 0: + d[new] += left//new + left -= d[new]*new + return IntegerPartition(self.integer, d) + + def next_lex(self): + """Return the next partition of the integer, n, in lexical order, + wrapping around to [n] if the partition is [1, ..., 1]. + + Examples + ======== + + >>> from sympy.combinatorics.partitions import IntegerPartition + >>> p = IntegerPartition([3, 1]) + >>> print(p.next_lex()) + [4] + >>> p.partition < p.next_lex().partition + True + """ + d = defaultdict(int) + d.update(self.as_dict()) + key = self._keys + a = key[-1] + if a == self.integer: + d.clear() + d[1] = self.integer + elif a == 1: + if d[a] > 1: + d[a + 1] += 1 + d[a] -= 2 + else: + b = key[-2] + d[b + 1] += 1 + d[1] = (d[b] - 1)*b + d[b] = 0 + else: + if d[a] > 1: + if len(key) == 1: + d.clear() + d[a + 1] = 1 + d[1] = self.integer - a - 1 + else: + a1 = a + 1 + d[a1] += 1 + d[1] = d[a]*a - a1 + d[a] = 0 + else: + b = key[-2] + b1 = b + 1 + d[b1] += 1 + need = d[b]*b + d[a]*a - b1 + d[a] = d[b] = 0 + d[1] = need + return IntegerPartition(self.integer, d) + + def as_dict(self): + """Return the partition as a dictionary whose keys are the + partition integers and the values are the multiplicity of that + integer. + + Examples + ======== + + >>> from sympy.combinatorics.partitions import IntegerPartition + >>> IntegerPartition([1]*3 + [2] + [3]*4).as_dict() + {1: 3, 2: 1, 3: 4} + """ + if self._dict is None: + groups = group(self.partition, multiple=False) + self._keys = [g[0] for g in groups] + self._dict = dict(groups) + return self._dict + + @property + def conjugate(self): + """ + Computes the conjugate partition of itself. + + Examples + ======== + + >>> from sympy.combinatorics.partitions import IntegerPartition + >>> a = IntegerPartition([6, 3, 3, 2, 1]) + >>> a.conjugate + [5, 4, 3, 1, 1, 1] + """ + j = 1 + temp_arr = list(self.partition) + [0] + k = temp_arr[0] + b = [0]*k + while k > 0: + while k > temp_arr[j]: + b[k - 1] = j + k -= 1 + j += 1 + return b + + def __lt__(self, other): + """Return True if self is less than other when the partition + is listed from smallest to biggest. + + Examples + ======== + + >>> from sympy.combinatorics.partitions import IntegerPartition + >>> a = IntegerPartition([3, 1]) + >>> a < a + False + >>> b = a.next_lex() + >>> a < b + True + >>> a == b + False + """ + return list(reversed(self.partition)) < list(reversed(other.partition)) + + def __le__(self, other): + """Return True if self is less than other when the partition + is listed from smallest to biggest. + + Examples + ======== + + >>> from sympy.combinatorics.partitions import IntegerPartition + >>> a = IntegerPartition([4]) + >>> a <= a + True + """ + return list(reversed(self.partition)) <= list(reversed(other.partition)) + + def as_ferrers(self, char='#'): + """ + Prints the ferrer diagram of a partition. + + Examples + ======== + + >>> from sympy.combinatorics.partitions import IntegerPartition + >>> print(IntegerPartition([1, 1, 5]).as_ferrers()) + ##### + # + # + """ + return "\n".join([char*i for i in self.partition]) + + def __str__(self): + return str(list(self.partition)) + + +def random_integer_partition(n, seed=None): + """ + Generates a random integer partition summing to ``n`` as a list + of reverse-sorted integers. + + Examples + ======== + + >>> from sympy.combinatorics.partitions import random_integer_partition + + For the following, a seed is given so a known value can be shown; in + practice, the seed would not be given. + + >>> random_integer_partition(100, seed=[1, 1, 12, 1, 2, 1, 85, 1]) + [85, 12, 2, 1] + >>> random_integer_partition(10, seed=[1, 2, 3, 1, 5, 1]) + [5, 3, 1, 1] + >>> random_integer_partition(1) + [1] + """ + from sympy.core.random import _randint + + n = as_int(n) + if n < 1: + raise ValueError('n must be a positive integer') + + randint = _randint(seed) + + partition = [] + while (n > 0): + k = randint(1, n) + mult = randint(1, n//k) + partition.append((k, mult)) + n -= k*mult + partition.sort(reverse=True) + partition = flatten([[k]*m for k, m in partition]) + return partition + + +def RGS_generalized(m): + """ + Computes the m + 1 generalized unrestricted growth strings + and returns them as rows in matrix. + + Examples + ======== + + >>> from sympy.combinatorics.partitions import RGS_generalized + >>> RGS_generalized(6) + Matrix([ + [ 1, 1, 1, 1, 1, 1, 1], + [ 1, 2, 3, 4, 5, 6, 0], + [ 2, 5, 10, 17, 26, 0, 0], + [ 5, 15, 37, 77, 0, 0, 0], + [ 15, 52, 151, 0, 0, 0, 0], + [ 52, 203, 0, 0, 0, 0, 0], + [203, 0, 0, 0, 0, 0, 0]]) + """ + d = zeros(m + 1) + for i in range(m + 1): + d[0, i] = 1 + + for i in range(1, m + 1): + for j in range(m): + if j <= m - i: + d[i, j] = j * d[i - 1, j] + d[i - 1, j + 1] + else: + d[i, j] = 0 + return d + + +def RGS_enum(m): + """ + RGS_enum computes the total number of restricted growth strings + possible for a superset of size m. + + Examples + ======== + + >>> from sympy.combinatorics.partitions import RGS_enum + >>> from sympy.combinatorics import Partition + >>> RGS_enum(4) + 15 + >>> RGS_enum(5) + 52 + >>> RGS_enum(6) + 203 + + We can check that the enumeration is correct by actually generating + the partitions. Here, the 15 partitions of 4 items are generated: + + >>> a = Partition(list(range(4))) + >>> s = set() + >>> for i in range(20): + ... s.add(a) + ... a += 1 + ... + >>> assert len(s) == 15 + + """ + if (m < 1): + return 0 + elif (m == 1): + return 1 + else: + return bell(m) + + +def RGS_unrank(rank, m): + """ + Gives the unranked restricted growth string for a given + superset size. + + Examples + ======== + + >>> from sympy.combinatorics.partitions import RGS_unrank + >>> RGS_unrank(14, 4) + [0, 1, 2, 3] + >>> RGS_unrank(0, 4) + [0, 0, 0, 0] + """ + if m < 1: + raise ValueError("The superset size must be >= 1") + if rank < 0 or RGS_enum(m) <= rank: + raise ValueError("Invalid arguments") + + L = [1] * (m + 1) + j = 1 + D = RGS_generalized(m) + for i in range(2, m + 1): + v = D[m - i, j] + cr = j*v + if cr <= rank: + L[i] = j + 1 + rank -= cr + j += 1 + else: + L[i] = int(rank / v + 1) + rank %= v + return [x - 1 for x in L[1:]] + + +def RGS_rank(rgs): + """ + Computes the rank of a restricted growth string. + + Examples + ======== + + >>> from sympy.combinatorics.partitions import RGS_rank, RGS_unrank + >>> RGS_rank([0, 1, 2, 1, 3]) + 42 + >>> RGS_rank(RGS_unrank(4, 7)) + 4 + """ + rgs_size = len(rgs) + rank = 0 + D = RGS_generalized(rgs_size) + for i in range(1, rgs_size): + n = len(rgs[(i + 1):]) + m = max(rgs[0:i]) + rank += D[n, m + 1] * rgs[i] + return rank diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/pc_groups.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/pc_groups.py new file mode 100644 index 0000000000000000000000000000000000000000..abf7b82258d8bb61ba350509fcbb3110a035fc88 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/pc_groups.py @@ -0,0 +1,710 @@ +from sympy.ntheory.primetest import isprime +from sympy.combinatorics.perm_groups import PermutationGroup +from sympy.printing.defaults import DefaultPrinting +from sympy.combinatorics.free_groups import free_group + + +class PolycyclicGroup(DefaultPrinting): + + is_group = True + is_solvable = True + + def __init__(self, pc_sequence, pc_series, relative_order, collector=None): + """ + + Parameters + ========== + + pc_sequence : list + A sequence of elements whose classes generate the cyclic factor + groups of pc_series. + pc_series : list + A subnormal sequence of subgroups where each factor group is cyclic. + relative_order : list + The orders of factor groups of pc_series. + collector : Collector + By default, it is None. Collector class provides the + polycyclic presentation with various other functionalities. + + """ + self.pcgs = pc_sequence + self.pc_series = pc_series + self.relative_order = relative_order + self.collector = Collector(self.pcgs, pc_series, relative_order) if not collector else collector + + def is_prime_order(self): + return all(isprime(order) for order in self.relative_order) + + def length(self): + return len(self.pcgs) + + +class Collector(DefaultPrinting): + + """ + References + ========== + + .. [1] Holt, D., Eick, B., O'Brien, E. + "Handbook of Computational Group Theory" + Section 8.1.3 + """ + + def __init__(self, pcgs, pc_series, relative_order, free_group_=None, pc_presentation=None): + """ + + Most of the parameters for the Collector class are the same as for PolycyclicGroup. + Others are described below. + + Parameters + ========== + + free_group_ : tuple + free_group_ provides the mapping of polycyclic generating + sequence with the free group elements. + pc_presentation : dict + Provides the presentation of polycyclic groups with the + help of power and conjugate relators. + + See Also + ======== + + PolycyclicGroup + + """ + self.pcgs = pcgs + self.pc_series = pc_series + self.relative_order = relative_order + self.free_group = free_group('x:{}'.format(len(pcgs)))[0] if not free_group_ else free_group_ + self.index = {s: i for i, s in enumerate(self.free_group.symbols)} + self.pc_presentation = self.pc_relators() + + def minimal_uncollected_subword(self, word): + r""" + Returns the minimal uncollected subwords. + + Explanation + =========== + + A word ``v`` defined on generators in ``X`` is a minimal + uncollected subword of the word ``w`` if ``v`` is a subword + of ``w`` and it has one of the following form + + * `v = {x_{i+1}}^{a_j}x_i` + + * `v = {x_{i+1}}^{a_j}{x_i}^{-1}` + + * `v = {x_i}^{a_j}` + + for `a_j` not in `\{1, \ldots, s-1\}`. Where, ``s`` is the power + exponent of the corresponding generator. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> from sympy.combinatorics import free_group + >>> G = SymmetricGroup(4) + >>> PcGroup = G.polycyclic_group() + >>> collector = PcGroup.collector + >>> F, x1, x2 = free_group("x1, x2") + >>> word = x2**2*x1**7 + >>> collector.minimal_uncollected_subword(word) + ((x2, 2),) + + """ + # To handle the case word = + if not word: + return None + + array = word.array_form + re = self.relative_order + index = self.index + + for i in range(len(array)): + s1, e1 = array[i] + + if re[index[s1]] and (e1 < 0 or e1 > re[index[s1]]-1): + return ((s1, e1), ) + + for i in range(len(array)-1): + s1, e1 = array[i] + s2, e2 = array[i+1] + + if index[s1] > index[s2]: + e = 1 if e2 > 0 else -1 + return ((s1, e1), (s2, e)) + + return None + + def relations(self): + """ + Separates the given relators of pc presentation in power and + conjugate relations. + + Returns + ======= + + (power_rel, conj_rel) + Separates pc presentation into power and conjugate relations. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> G = SymmetricGroup(3) + >>> PcGroup = G.polycyclic_group() + >>> collector = PcGroup.collector + >>> power_rel, conj_rel = collector.relations() + >>> power_rel + {x0**2: (), x1**3: ()} + >>> conj_rel + {x0**-1*x1*x0: x1**2} + + See Also + ======== + + pc_relators + + """ + power_relators = {} + conjugate_relators = {} + for key, value in self.pc_presentation.items(): + if len(key.array_form) == 1: + power_relators[key] = value + else: + conjugate_relators[key] = value + return power_relators, conjugate_relators + + def subword_index(self, word, w): + """ + Returns the start and ending index of a given + subword in a word. + + Parameters + ========== + + word : FreeGroupElement + word defined on free group elements for a + polycyclic group. + w : FreeGroupElement + subword of a given word, whose starting and + ending index to be computed. + + Returns + ======= + + (i, j) + A tuple containing starting and ending index of ``w`` + in the given word. If not exists, (-1,-1) is returned. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> from sympy.combinatorics import free_group + >>> G = SymmetricGroup(4) + >>> PcGroup = G.polycyclic_group() + >>> collector = PcGroup.collector + >>> F, x1, x2 = free_group("x1, x2") + >>> word = x2**2*x1**7 + >>> w = x2**2*x1 + >>> collector.subword_index(word, w) + (0, 3) + >>> w = x1**7 + >>> collector.subword_index(word, w) + (2, 9) + >>> w = x1**8 + >>> collector.subword_index(word, w) + (-1, -1) + + """ + low = -1 + high = -1 + for i in range(len(word)-len(w)+1): + if word.subword(i, i+len(w)) == w: + low = i + high = i+len(w) + break + return low, high + + def map_relation(self, w): + """ + Return a conjugate relation. + + Explanation + =========== + + Given a word formed by two free group elements, the + corresponding conjugate relation with those free + group elements is formed and mapped with the collected + word in the polycyclic presentation. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> from sympy.combinatorics import free_group + >>> G = SymmetricGroup(3) + >>> PcGroup = G.polycyclic_group() + >>> collector = PcGroup.collector + >>> F, x0, x1 = free_group("x0, x1") + >>> w = x1*x0 + >>> collector.map_relation(w) + x1**2 + + See Also + ======== + + pc_presentation + + """ + array = w.array_form + s1 = array[0][0] + s2 = array[1][0] + key = ((s2, -1), (s1, 1), (s2, 1)) + key = self.free_group.dtype(key) + return self.pc_presentation[key] + + + def collected_word(self, word): + r""" + Return the collected form of a word. + + Explanation + =========== + + A word ``w`` is called collected, if `w = {x_{i_1}}^{a_1} * \ldots * + {x_{i_r}}^{a_r}` with `i_1 < i_2< \ldots < i_r` and `a_j` is in + `\{1, \ldots, {s_j}-1\}`. + + Otherwise w is uncollected. + + Parameters + ========== + + word : FreeGroupElement + An uncollected word. + + Returns + ======= + + word + A collected word of form `w = {x_{i_1}}^{a_1}, \ldots, + {x_{i_r}}^{a_r}` with `i_1, i_2, \ldots, i_r` and `a_j \in + \{1, \ldots, {s_j}-1\}`. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> from sympy.combinatorics.perm_groups import PermutationGroup + >>> from sympy.combinatorics import free_group + >>> G = SymmetricGroup(4) + >>> PcGroup = G.polycyclic_group() + >>> collector = PcGroup.collector + >>> F, x0, x1, x2, x3 = free_group("x0, x1, x2, x3") + >>> word = x3*x2*x1*x0 + >>> collected_word = collector.collected_word(word) + >>> free_to_perm = {} + >>> free_group = collector.free_group + >>> for sym, gen in zip(free_group.symbols, collector.pcgs): + ... free_to_perm[sym] = gen + >>> G1 = PermutationGroup() + >>> for w in word: + ... sym = w[0] + ... perm = free_to_perm[sym] + ... G1 = PermutationGroup([perm] + G1.generators) + >>> G2 = PermutationGroup() + >>> for w in collected_word: + ... sym = w[0] + ... perm = free_to_perm[sym] + ... G2 = PermutationGroup([perm] + G2.generators) + + The two are not identical, but they are equivalent: + + >>> G1.equals(G2), G1 == G2 + (True, False) + + See Also + ======== + + minimal_uncollected_subword + + """ + free_group = self.free_group + while True: + w = self.minimal_uncollected_subword(word) + if not w: + break + + low, high = self.subword_index(word, free_group.dtype(w)) + if low == -1: + continue + + s1, e1 = w[0] + if len(w) == 1: + re = self.relative_order[self.index[s1]] + q = e1 // re + r = e1-q*re + + key = ((w[0][0], re), ) + key = free_group.dtype(key) + if self.pc_presentation[key]: + presentation = self.pc_presentation[key].array_form + sym, exp = presentation[0] + word_ = ((w[0][0], r), (sym, q*exp)) + word_ = free_group.dtype(word_) + else: + if r != 0: + word_ = ((w[0][0], r), ) + word_ = free_group.dtype(word_) + else: + word_ = None + word = word.eliminate_word(free_group.dtype(w), word_) + + if len(w) == 2 and w[1][1] > 0: + s2, e2 = w[1] + s2 = ((s2, 1), ) + s2 = free_group.dtype(s2) + word_ = self.map_relation(free_group.dtype(w)) + word_ = s2*word_**e1 + word_ = free_group.dtype(word_) + word = word.substituted_word(low, high, word_) + + elif len(w) == 2 and w[1][1] < 0: + s2, e2 = w[1] + s2 = ((s2, 1), ) + s2 = free_group.dtype(s2) + word_ = self.map_relation(free_group.dtype(w)) + word_ = s2**-1*word_**e1 + word_ = free_group.dtype(word_) + word = word.substituted_word(low, high, word_) + + return word + + + def pc_relators(self): + r""" + Return the polycyclic presentation. + + Explanation + =========== + + There are two types of relations used in polycyclic + presentation. + + * Power relations : Power relators are of the form `x_i^{re_i}`, + where `i \in \{0, \ldots, \mathrm{len(pcgs)}\}`, ``x`` represents polycyclic + generator and ``re`` is the corresponding relative order. + + * Conjugate relations : Conjugate relators are of the form `x_j^-1x_ix_j`, + where `j < i \in \{0, \ldots, \mathrm{len(pcgs)}\}`. + + Returns + ======= + + A dictionary with power and conjugate relations as key and + their collected form as corresponding values. + + Notes + ===== + + Identity Permutation is mapped with empty ``()``. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> from sympy.combinatorics.permutations import Permutation + >>> S = SymmetricGroup(49).sylow_subgroup(7) + >>> der = S.derived_series() + >>> G = der[len(der)-2] + >>> PcGroup = G.polycyclic_group() + >>> collector = PcGroup.collector + >>> pcgs = PcGroup.pcgs + >>> len(pcgs) + 6 + >>> free_group = collector.free_group + >>> pc_resentation = collector.pc_presentation + >>> free_to_perm = {} + >>> for s, g in zip(free_group.symbols, pcgs): + ... free_to_perm[s] = g + + >>> for k, v in pc_resentation.items(): + ... k_array = k.array_form + ... if v != (): + ... v_array = v.array_form + ... lhs = Permutation() + ... for gen in k_array: + ... s = gen[0] + ... e = gen[1] + ... lhs = lhs*free_to_perm[s]**e + ... if v == (): + ... assert lhs.is_identity + ... continue + ... rhs = Permutation() + ... for gen in v_array: + ... s = gen[0] + ... e = gen[1] + ... rhs = rhs*free_to_perm[s]**e + ... assert lhs == rhs + + """ + free_group = self.free_group + rel_order = self.relative_order + pc_relators = {} + perm_to_free = {} + pcgs = self.pcgs + + for gen, s in zip(pcgs, free_group.generators): + perm_to_free[gen**-1] = s**-1 + perm_to_free[gen] = s + + pcgs = pcgs[::-1] + series = self.pc_series[::-1] + rel_order = rel_order[::-1] + collected_gens = [] + + for i, gen in enumerate(pcgs): + re = rel_order[i] + relation = perm_to_free[gen]**re + G = series[i] + + l = G.generator_product(gen**re, original = True) + l.reverse() + + word = free_group.identity + for g in l: + word = word*perm_to_free[g] + + word = self.collected_word(word) + pc_relators[relation] = word if word else () + self.pc_presentation = pc_relators + + collected_gens.append(gen) + if len(collected_gens) > 1: + conj = collected_gens[len(collected_gens)-1] + conjugator = perm_to_free[conj] + + for j in range(len(collected_gens)-1): + conjugated = perm_to_free[collected_gens[j]] + + relation = conjugator**-1*conjugated*conjugator + gens = conj**-1*collected_gens[j]*conj + + l = G.generator_product(gens, original = True) + l.reverse() + word = free_group.identity + for g in l: + word = word*perm_to_free[g] + + word = self.collected_word(word) + pc_relators[relation] = word if word else () + self.pc_presentation = pc_relators + + return pc_relators + + def exponent_vector(self, element): + r""" + Return the exponent vector of length equal to the + length of polycyclic generating sequence. + + Explanation + =========== + + For a given generator/element ``g`` of the polycyclic group, + it can be represented as `g = {x_1}^{e_1}, \ldots, {x_n}^{e_n}`, + where `x_i` represents polycyclic generators and ``n`` is + the number of generators in the free_group equal to the length + of pcgs. + + Parameters + ========== + + element : Permutation + Generator of a polycyclic group. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> from sympy.combinatorics.permutations import Permutation + >>> G = SymmetricGroup(4) + >>> PcGroup = G.polycyclic_group() + >>> collector = PcGroup.collector + >>> pcgs = PcGroup.pcgs + >>> collector.exponent_vector(G[0]) + [1, 0, 0, 0] + >>> exp = collector.exponent_vector(G[1]) + >>> g = Permutation() + >>> for i in range(len(exp)): + ... g = g*pcgs[i]**exp[i] if exp[i] else g + >>> assert g == G[1] + + References + ========== + + .. [1] Holt, D., Eick, B., O'Brien, E. + "Handbook of Computational Group Theory" + Section 8.1.1, Definition 8.4 + + """ + free_group = self.free_group + G = PermutationGroup() + for g in self.pcgs: + G = PermutationGroup([g] + G.generators) + gens = G.generator_product(element, original = True) + gens.reverse() + + perm_to_free = {} + for sym, g in zip(free_group.generators, self.pcgs): + perm_to_free[g**-1] = sym**-1 + perm_to_free[g] = sym + w = free_group.identity + for g in gens: + w = w*perm_to_free[g] + + word = self.collected_word(w) + + index = self.index + exp_vector = [0]*len(free_group) + word = word.array_form + for t in word: + exp_vector[index[t[0]]] = t[1] + return exp_vector + + def depth(self, element): + r""" + Return the depth of a given element. + + Explanation + =========== + + The depth of a given element ``g`` is defined by + `\mathrm{dep}[g] = i` if `e_1 = e_2 = \ldots = e_{i-1} = 0` + and `e_i != 0`, where ``e`` represents the exponent-vector. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> G = SymmetricGroup(3) + >>> PcGroup = G.polycyclic_group() + >>> collector = PcGroup.collector + >>> collector.depth(G[0]) + 2 + >>> collector.depth(G[1]) + 1 + + References + ========== + + .. [1] Holt, D., Eick, B., O'Brien, E. + "Handbook of Computational Group Theory" + Section 8.1.1, Definition 8.5 + + """ + exp_vector = self.exponent_vector(element) + return next((i+1 for i, x in enumerate(exp_vector) if x), len(self.pcgs)+1) + + def leading_exponent(self, element): + r""" + Return the leading non-zero exponent. + + Explanation + =========== + + The leading exponent for a given element `g` is defined + by `\mathrm{leading\_exponent}[g]` `= e_i`, if `\mathrm{depth}[g] = i`. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> G = SymmetricGroup(3) + >>> PcGroup = G.polycyclic_group() + >>> collector = PcGroup.collector + >>> collector.leading_exponent(G[1]) + 1 + + """ + exp_vector = self.exponent_vector(element) + depth = self.depth(element) + if depth != len(self.pcgs)+1: + return exp_vector[depth-1] + return None + + def _sift(self, z, g): + h = g + d = self.depth(h) + while d < len(self.pcgs) and z[d-1] != 1: + k = z[d-1] + e = self.leading_exponent(h)*(self.leading_exponent(k))**-1 + e = e % self.relative_order[d-1] + h = k**-e*h + d = self.depth(h) + return h + + def induced_pcgs(self, gens): + """ + + Parameters + ========== + + gens : list + A list of generators on which polycyclic subgroup + is to be defined. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> S = SymmetricGroup(8) + >>> G = S.sylow_subgroup(2) + >>> PcGroup = G.polycyclic_group() + >>> collector = PcGroup.collector + >>> gens = [G[0], G[1]] + >>> ipcgs = collector.induced_pcgs(gens) + >>> [gen.order() for gen in ipcgs] + [2, 2, 2] + >>> G = S.sylow_subgroup(3) + >>> PcGroup = G.polycyclic_group() + >>> collector = PcGroup.collector + >>> gens = [G[0], G[1]] + >>> ipcgs = collector.induced_pcgs(gens) + >>> [gen.order() for gen in ipcgs] + [3] + + """ + z = [1]*len(self.pcgs) + G = gens + while G: + g = G.pop(0) + h = self._sift(z, g) + d = self.depth(h) + if d < len(self.pcgs): + for gen in z: + if gen != 1: + G.append(h**-1*gen**-1*h*gen) + z[d-1] = h + z = [gen for gen in z if gen != 1] + return z + + def constructive_membership_test(self, ipcgs, g): + """ + Return the exponent vector for induced pcgs. + """ + e = [0]*len(ipcgs) + h = g + d = self.depth(h) + for i, gen in enumerate(ipcgs): + while self.depth(gen) == d: + f = self.leading_exponent(h)*self.leading_exponent(gen) + f = f % self.relative_order[d-1] + h = gen**(-f)*h + e[i] = f + d = self.depth(h) + if h == 1: + return e + return False diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/perm_groups.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/perm_groups.py new file mode 100644 index 0000000000000000000000000000000000000000..24359cb546246d63470de92b2fb2ab0804fc9886 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/perm_groups.py @@ -0,0 +1,5459 @@ +from math import factorial as _factorial, log, prod +from itertools import chain, product + + +from sympy.combinatorics import Permutation +from sympy.combinatorics.permutations import (_af_commutes_with, _af_invert, + _af_rmul, _af_rmuln, _af_pow, Cycle) +from sympy.combinatorics.util import (_check_cycles_alt_sym, + _distribute_gens_by_base, _orbits_transversals_from_bsgs, + _handle_precomputed_bsgs, _base_ordering, _strong_gens_from_distr, + _strip, _strip_af) +from sympy.core import Basic +from sympy.core.random import _randrange, randrange, choice +from sympy.core.symbol import Symbol +from sympy.core.sympify import _sympify +from sympy.functions.combinatorial.factorials import factorial +from sympy.ntheory import primefactors, sieve +from sympy.ntheory.factor_ import (factorint, multiplicity) +from sympy.ntheory.primetest import isprime +from sympy.utilities.iterables import has_variety, is_sequence, uniq + +rmul = Permutation.rmul_with_af +_af_new = Permutation._af_new + + +class PermutationGroup(Basic): + r"""The class defining a Permutation group. + + Explanation + =========== + + ``PermutationGroup([p1, p2, ..., pn])`` returns the permutation group + generated by the list of permutations. This group can be supplied + to Polyhedron if one desires to decorate the elements to which the + indices of the permutation refer. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> from sympy.combinatorics import Polyhedron + + The permutations corresponding to motion of the front, right and + bottom face of a $2 \times 2$ Rubik's cube are defined: + + >>> F = Permutation(2, 19, 21, 8)(3, 17, 20, 10)(4, 6, 7, 5) + >>> R = Permutation(1, 5, 21, 14)(3, 7, 23, 12)(8, 10, 11, 9) + >>> D = Permutation(6, 18, 14, 10)(7, 19, 15, 11)(20, 22, 23, 21) + + These are passed as permutations to PermutationGroup: + + >>> G = PermutationGroup(F, R, D) + >>> G.order() + 3674160 + + The group can be supplied to a Polyhedron in order to track the + objects being moved. An example involving the $2 \times 2$ Rubik's cube is + given there, but here is a simple demonstration: + + >>> a = Permutation(2, 1) + >>> b = Permutation(1, 0) + >>> G = PermutationGroup(a, b) + >>> P = Polyhedron(list('ABC'), pgroup=G) + >>> P.corners + (A, B, C) + >>> P.rotate(0) # apply permutation 0 + >>> P.corners + (A, C, B) + >>> P.reset() + >>> P.corners + (A, B, C) + + Or one can make a permutation as a product of selected permutations + and apply them to an iterable directly: + + >>> P10 = G.make_perm([0, 1]) + >>> P10('ABC') + ['C', 'A', 'B'] + + See Also + ======== + + sympy.combinatorics.polyhedron.Polyhedron, + sympy.combinatorics.permutations.Permutation + + References + ========== + + .. [1] Holt, D., Eick, B., O'Brien, E. + "Handbook of Computational Group Theory" + + .. [2] Seress, A. + "Permutation Group Algorithms" + + .. [3] https://en.wikipedia.org/wiki/Schreier_vector + + .. [4] https://en.wikipedia.org/wiki/Nielsen_transformation#Product_replacement_algorithm + + .. [5] Frank Celler, Charles R.Leedham-Green, Scott H.Murray, + Alice C.Niemeyer, and E.A.O'Brien. "Generating Random + Elements of a Finite Group" + + .. [6] https://en.wikipedia.org/wiki/Block_%28permutation_group_theory%29 + + .. [7] https://algorithmist.com/wiki/Union_find + + .. [8] https://en.wikipedia.org/wiki/Multiply_transitive_group#Multiply_transitive_groups + + .. [9] https://en.wikipedia.org/wiki/Center_%28group_theory%29 + + .. [10] https://en.wikipedia.org/wiki/Centralizer_and_normalizer + + .. [11] https://groupprops.subwiki.org/wiki/Derived_subgroup + + .. [12] https://en.wikipedia.org/wiki/Nilpotent_group + + .. [13] https://www.math.colostate.edu/~hulpke/CGT/cgtnotes.pdf + + .. [14] https://docs.gap-system.org/doc/ref/manual.pdf + + """ + is_group = True + + def __new__(cls, *args, dups=True, **kwargs): + """The default constructor. Accepts Cycle and Permutation forms. + Removes duplicates unless ``dups`` keyword is ``False``. + """ + if not args: + args = [Permutation()] + else: + args = list(args[0] if is_sequence(args[0]) else args) + if not args: + args = [Permutation()] + if any(isinstance(a, Cycle) for a in args): + args = [Permutation(a) for a in args] + if has_variety(a.size for a in args): + degree = kwargs.pop('degree', None) + if degree is None: + degree = max(a.size for a in args) + for i in range(len(args)): + if args[i].size != degree: + args[i] = Permutation(args[i], size=degree) + if dups: + args = list(uniq([_af_new(list(a)) for a in args])) + if len(args) > 1: + args = [g for g in args if not g.is_identity] + return Basic.__new__(cls, *args, **kwargs) + + def __init__(self, *args, **kwargs): + self._generators = list(self.args) + self._order = None + self._elements = [] + self._center = None + self._is_abelian = None + self._is_transitive = None + self._is_sym = None + self._is_alt = None + self._is_primitive = None + self._is_nilpotent = None + self._is_solvable = None + self._is_trivial = None + self._transitivity_degree = None + self._max_div = None + self._is_perfect = None + self._is_cyclic = None + self._is_dihedral = None + self._r = len(self._generators) + self._degree = self._generators[0].size + + # these attributes are assigned after running schreier_sims + self._base = [] + self._strong_gens = [] + self._strong_gens_slp = [] + self._basic_orbits = [] + self._transversals = [] + self._transversal_slp = [] + + # these attributes are assigned after running _random_pr_init + self._random_gens = [] + + # finite presentation of the group as an instance of `FpGroup` + self._fp_presentation = None + + def __getitem__(self, i): + return self._generators[i] + + def __contains__(self, i): + """Return ``True`` if *i* is contained in PermutationGroup. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> p = Permutation(1, 2, 3) + >>> Permutation(3) in PermutationGroup(p) + True + + """ + if not isinstance(i, Permutation): + raise TypeError("A PermutationGroup contains only Permutations as " + "elements, not elements of type %s" % type(i)) + return self.contains(i) + + def __len__(self): + return len(self._generators) + + def equals(self, other): + """Return ``True`` if PermutationGroup generated by elements in the + group are same i.e they represent the same PermutationGroup. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> p = Permutation(0, 1, 2, 3, 4, 5) + >>> G = PermutationGroup([p, p**2]) + >>> H = PermutationGroup([p**2, p]) + >>> G.generators == H.generators + False + >>> G.equals(H) + True + + """ + if not isinstance(other, PermutationGroup): + return False + + set_self_gens = set(self.generators) + set_other_gens = set(other.generators) + + # before reaching the general case there are also certain + # optimisation and obvious cases requiring less or no actual + # computation. + if set_self_gens == set_other_gens: + return True + + # in the most general case it will check that each generator of + # one group belongs to the other PermutationGroup and vice-versa + for gen1 in set_self_gens: + if not other.contains(gen1): + return False + for gen2 in set_other_gens: + if not self.contains(gen2): + return False + return True + + def __mul__(self, other): + """ + Return the direct product of two permutation groups as a permutation + group. + + Explanation + =========== + + This implementation realizes the direct product by shifting the index + set for the generators of the second group: so if we have ``G`` acting + on ``n1`` points and ``H`` acting on ``n2`` points, ``G*H`` acts on + ``n1 + n2`` points. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import CyclicGroup + >>> G = CyclicGroup(5) + >>> H = G*G + >>> H + PermutationGroup([ + (9)(0 1 2 3 4), + (5 6 7 8 9)]) + >>> H.order() + 25 + + """ + if isinstance(other, Permutation): + return Coset(other, self, dir='+') + gens1 = [perm._array_form for perm in self.generators] + gens2 = [perm._array_form for perm in other.generators] + n1 = self._degree + n2 = other._degree + start = list(range(n1)) + end = list(range(n1, n1 + n2)) + for i in range(len(gens2)): + gens2[i] = [x + n1 for x in gens2[i]] + gens2 = [start + gen for gen in gens2] + gens1 = [gen + end for gen in gens1] + together = gens1 + gens2 + gens = [_af_new(x) for x in together] + return PermutationGroup(gens) + + def _random_pr_init(self, r, n, _random_prec_n=None): + r"""Initialize random generators for the product replacement algorithm. + + Explanation + =========== + + The implementation uses a modification of the original product + replacement algorithm due to Leedham-Green, as described in [1], + pp. 69-71; also, see [2], pp. 27-29 for a detailed theoretical + analysis of the original product replacement algorithm, and [4]. + + The product replacement algorithm is used for producing random, + uniformly distributed elements of a group `G` with a set of generators + `S`. For the initialization ``_random_pr_init``, a list ``R`` of + `\max\{r, |S|\}` group generators is created as the attribute + ``G._random_gens``, repeating elements of `S` if necessary, and the + identity element of `G` is appended to ``R`` - we shall refer to this + last element as the accumulator. Then the function ``random_pr()`` + is called ``n`` times, randomizing the list ``R`` while preserving + the generation of `G` by ``R``. The function ``random_pr()`` itself + takes two random elements ``g, h`` among all elements of ``R`` but + the accumulator and replaces ``g`` with a randomly chosen element + from `\{gh, g(~h), hg, (~h)g\}`. Then the accumulator is multiplied + by whatever ``g`` was replaced by. The new value of the accumulator is + then returned by ``random_pr()``. + + The elements returned will eventually (for ``n`` large enough) become + uniformly distributed across `G` ([5]). For practical purposes however, + the values ``n = 50, r = 11`` are suggested in [1]. + + Notes + ===== + + THIS FUNCTION HAS SIDE EFFECTS: it changes the attribute + self._random_gens + + See Also + ======== + + random_pr + + """ + deg = self.degree + random_gens = [x._array_form for x in self.generators] + k = len(random_gens) + if k < r: + for i in range(k, r): + random_gens.append(random_gens[i - k]) + acc = list(range(deg)) + random_gens.append(acc) + self._random_gens = random_gens + + # handle randomized input for testing purposes + if _random_prec_n is None: + for i in range(n): + self.random_pr() + else: + for i in range(n): + self.random_pr(_random_prec=_random_prec_n[i]) + + def _union_find_merge(self, first, second, ranks, parents, not_rep): + """Merges two classes in a union-find data structure. + + Explanation + =========== + + Used in the implementation of Atkinson's algorithm as suggested in [1], + pp. 83-87. The class merging process uses union by rank as an + optimization. ([7]) + + Notes + ===== + + THIS FUNCTION HAS SIDE EFFECTS: the list of class representatives, + ``parents``, the list of class sizes, ``ranks``, and the list of + elements that are not representatives, ``not_rep``, are changed due to + class merging. + + See Also + ======== + + minimal_block, _union_find_rep + + References + ========== + + .. [1] Holt, D., Eick, B., O'Brien, E. + "Handbook of computational group theory" + + .. [7] https://algorithmist.com/wiki/Union_find + + """ + rep_first = self._union_find_rep(first, parents) + rep_second = self._union_find_rep(second, parents) + if rep_first != rep_second: + # union by rank + if ranks[rep_first] >= ranks[rep_second]: + new_1, new_2 = rep_first, rep_second + else: + new_1, new_2 = rep_second, rep_first + total_rank = ranks[new_1] + ranks[new_2] + if total_rank > self.max_div: + return -1 + parents[new_2] = new_1 + ranks[new_1] = total_rank + not_rep.append(new_2) + return 1 + return 0 + + def _union_find_rep(self, num, parents): + """Find representative of a class in a union-find data structure. + + Explanation + =========== + + Used in the implementation of Atkinson's algorithm as suggested in [1], + pp. 83-87. After the representative of the class to which ``num`` + belongs is found, path compression is performed as an optimization + ([7]). + + Notes + ===== + + THIS FUNCTION HAS SIDE EFFECTS: the list of class representatives, + ``parents``, is altered due to path compression. + + See Also + ======== + + minimal_block, _union_find_merge + + References + ========== + + .. [1] Holt, D., Eick, B., O'Brien, E. + "Handbook of computational group theory" + + .. [7] https://algorithmist.com/wiki/Union_find + + """ + rep, parent = num, parents[num] + while parent != rep: + rep = parent + parent = parents[rep] + # path compression + temp, parent = num, parents[num] + while parent != rep: + parents[temp] = rep + temp = parent + parent = parents[temp] + return rep + + @property + def base(self): + r"""Return a base from the Schreier-Sims algorithm. + + Explanation + =========== + + For a permutation group `G`, a base is a sequence of points + `B = (b_1, b_2, \dots, b_k)` such that no element of `G` apart + from the identity fixes all the points in `B`. The concepts of + a base and strong generating set and their applications are + discussed in depth in [1], pp. 87-89 and [2], pp. 55-57. + + An alternative way to think of `B` is that it gives the + indices of the stabilizer cosets that contain more than the + identity permutation. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> G = PermutationGroup([Permutation(0, 1, 3)(2, 4)]) + >>> G.base + [0, 2] + + See Also + ======== + + strong_gens, basic_transversals, basic_orbits, basic_stabilizers + + """ + if self._base == []: + self.schreier_sims() + return self._base + + def baseswap(self, base, strong_gens, pos, randomized=False, + transversals=None, basic_orbits=None, strong_gens_distr=None): + r"""Swap two consecutive base points in base and strong generating set. + + Explanation + =========== + + If a base for a group `G` is given by `(b_1, b_2, \dots, b_k)`, this + function returns a base `(b_1, b_2, \dots, b_{i+1}, b_i, \dots, b_k)`, + where `i` is given by ``pos``, and a strong generating set relative + to that base. The original base and strong generating set are not + modified. + + The randomized version (default) is of Las Vegas type. + + Parameters + ========== + + base, strong_gens + The base and strong generating set. + pos + The position at which swapping is performed. + randomized + A switch between randomized and deterministic version. + transversals + The transversals for the basic orbits, if known. + basic_orbits + The basic orbits, if known. + strong_gens_distr + The strong generators distributed by basic stabilizers, if known. + + Returns + ======= + + (base, strong_gens) + ``base`` is the new base, and ``strong_gens`` is a generating set + relative to it. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> from sympy.combinatorics.testutil import _verify_bsgs + >>> from sympy.combinatorics.perm_groups import PermutationGroup + >>> S = SymmetricGroup(4) + >>> S.schreier_sims() + >>> S.base + [0, 1, 2] + >>> base, gens = S.baseswap(S.base, S.strong_gens, 1, randomized=False) + >>> base, gens + ([0, 2, 1], + [(0 1 2 3), (3)(0 1), (1 3 2), + (2 3), (1 3)]) + + check that base, gens is a BSGS + + >>> S1 = PermutationGroup(gens) + >>> _verify_bsgs(S1, base, gens) + True + + See Also + ======== + + schreier_sims + + Notes + ===== + + The deterministic version of the algorithm is discussed in + [1], pp. 102-103; the randomized version is discussed in [1], p.103, and + [2], p.98. It is of Las Vegas type. + Notice that [1] contains a mistake in the pseudocode and + discussion of BASESWAP: on line 3 of the pseudocode, + `|\beta_{i+1}^{\left\langle T\right\rangle}|` should be replaced by + `|\beta_{i}^{\left\langle T\right\rangle}|`, and the same for the + discussion of the algorithm. + + """ + # construct the basic orbits, generators for the stabilizer chain + # and transversal elements from whatever was provided + transversals, basic_orbits, strong_gens_distr = \ + _handle_precomputed_bsgs(base, strong_gens, transversals, + basic_orbits, strong_gens_distr) + base_len = len(base) + degree = self.degree + # size of orbit of base[pos] under the stabilizer we seek to insert + # in the stabilizer chain at position pos + 1 + size = len(basic_orbits[pos])*len(basic_orbits[pos + 1]) \ + //len(_orbit(degree, strong_gens_distr[pos], base[pos + 1])) + # initialize the wanted stabilizer by a subgroup + if pos + 2 > base_len - 1: + T = [] + else: + T = strong_gens_distr[pos + 2][:] + # randomized version + if randomized is True: + stab_pos = PermutationGroup(strong_gens_distr[pos]) + schreier_vector = stab_pos.schreier_vector(base[pos + 1]) + # add random elements of the stabilizer until they generate it + while len(_orbit(degree, T, base[pos])) != size: + new = stab_pos.random_stab(base[pos + 1], + schreier_vector=schreier_vector) + T.append(new) + # deterministic version + else: + Gamma = set(basic_orbits[pos]) + Gamma.remove(base[pos]) + if base[pos + 1] in Gamma: + Gamma.remove(base[pos + 1]) + # add elements of the stabilizer until they generate it by + # ruling out member of the basic orbit of base[pos] along the way + while len(_orbit(degree, T, base[pos])) != size: + gamma = next(iter(Gamma)) + x = transversals[pos][gamma] + temp = x._array_form.index(base[pos + 1]) # (~x)(base[pos + 1]) + if temp not in basic_orbits[pos + 1]: + Gamma = Gamma - _orbit(degree, T, gamma) + else: + y = transversals[pos + 1][temp] + el = rmul(x, y) + if el(base[pos]) not in _orbit(degree, T, base[pos]): + T.append(el) + Gamma = Gamma - _orbit(degree, T, base[pos]) + # build the new base and strong generating set + strong_gens_new_distr = strong_gens_distr[:] + strong_gens_new_distr[pos + 1] = T + base_new = base[:] + base_new[pos], base_new[pos + 1] = base_new[pos + 1], base_new[pos] + strong_gens_new = _strong_gens_from_distr(strong_gens_new_distr) + for gen in T: + if gen not in strong_gens_new: + strong_gens_new.append(gen) + return base_new, strong_gens_new + + @property + def basic_orbits(self): + r""" + Return the basic orbits relative to a base and strong generating set. + + Explanation + =========== + + If `(b_1, b_2, \dots, b_k)` is a base for a group `G`, and + `G^{(i)} = G_{b_1, b_2, \dots, b_{i-1}}` is the ``i``-th basic stabilizer + (so that `G^{(1)} = G`), the ``i``-th basic orbit relative to this base + is the orbit of `b_i` under `G^{(i)}`. See [1], pp. 87-89 for more + information. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> S = SymmetricGroup(4) + >>> S.basic_orbits + [[0, 1, 2, 3], [1, 2, 3], [2, 3]] + + See Also + ======== + + base, strong_gens, basic_transversals, basic_stabilizers + + """ + if self._basic_orbits == []: + self.schreier_sims() + return self._basic_orbits + + @property + def basic_stabilizers(self): + r""" + Return a chain of stabilizers relative to a base and strong generating + set. + + Explanation + =========== + + The ``i``-th basic stabilizer `G^{(i)}` relative to a base + `(b_1, b_2, \dots, b_k)` is `G_{b_1, b_2, \dots, b_{i-1}}`. For more + information, see [1], pp. 87-89. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import AlternatingGroup + >>> A = AlternatingGroup(4) + >>> A.schreier_sims() + >>> A.base + [0, 1] + >>> for g in A.basic_stabilizers: + ... print(g) + ... + PermutationGroup([ + (3)(0 1 2), + (1 2 3)]) + PermutationGroup([ + (1 2 3)]) + + See Also + ======== + + base, strong_gens, basic_orbits, basic_transversals + + """ + + if self._transversals == []: + self.schreier_sims() + strong_gens = self._strong_gens + base = self._base + if not base: # e.g. if self is trivial + return [] + strong_gens_distr = _distribute_gens_by_base(base, strong_gens) + basic_stabilizers = [] + for gens in strong_gens_distr: + basic_stabilizers.append(PermutationGroup(gens)) + return basic_stabilizers + + @property + def basic_transversals(self): + """ + Return basic transversals relative to a base and strong generating set. + + Explanation + =========== + + The basic transversals are transversals of the basic orbits. They + are provided as a list of dictionaries, each dictionary having + keys - the elements of one of the basic orbits, and values - the + corresponding transversal elements. See [1], pp. 87-89 for more + information. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import AlternatingGroup + >>> A = AlternatingGroup(4) + >>> A.basic_transversals + [{0: (3), 1: (3)(0 1 2), 2: (3)(0 2 1), 3: (0 3 1)}, {1: (3), 2: (1 2 3), 3: (1 3 2)}] + + See Also + ======== + + strong_gens, base, basic_orbits, basic_stabilizers + + """ + + if self._transversals == []: + self.schreier_sims() + return self._transversals + + def composition_series(self): + r""" + Return the composition series for a group as a list + of permutation groups. + + Explanation + =========== + + The composition series for a group `G` is defined as a + subnormal series `G = H_0 > H_1 > H_2 \ldots` A composition + series is a subnormal series such that each factor group + `H(i+1) / H(i)` is simple. + A subnormal series is a composition series only if it is of + maximum length. + + The algorithm works as follows: + Starting with the derived series the idea is to fill + the gap between `G = der[i]` and `H = der[i+1]` for each + `i` independently. Since, all subgroups of the abelian group + `G/H` are normal so, first step is to take the generators + `g` of `G` and add them to generators of `H` one by one. + + The factor groups formed are not simple in general. Each + group is obtained from the previous one by adding one + generator `g`, if the previous group is denoted by `H` + then the next group `K` is generated by `g` and `H`. + The factor group `K/H` is cyclic and it's order is + `K.order()//G.order()`. The series is then extended between + `K` and `H` by groups generated by powers of `g` and `H`. + The series formed is then prepended to the already existing + series. + + Examples + ======== + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> from sympy.combinatorics.named_groups import CyclicGroup + >>> S = SymmetricGroup(12) + >>> G = S.sylow_subgroup(2) + >>> C = G.composition_series() + >>> [H.order() for H in C] + [1024, 512, 256, 128, 64, 32, 16, 8, 4, 2, 1] + >>> G = S.sylow_subgroup(3) + >>> C = G.composition_series() + >>> [H.order() for H in C] + [243, 81, 27, 9, 3, 1] + >>> G = CyclicGroup(12) + >>> C = G.composition_series() + >>> [H.order() for H in C] + [12, 6, 3, 1] + + """ + der = self.derived_series() + if not all(g.is_identity for g in der[-1].generators): + raise NotImplementedError('Group should be solvable') + series = [] + + for i in range(len(der)-1): + H = der[i+1] + up_seg = [] + for g in der[i].generators: + K = PermutationGroup([g] + H.generators) + order = K.order() // H.order() + down_seg = [] + for p, e in factorint(order).items(): + for _ in range(e): + down_seg.append(PermutationGroup([g] + H.generators)) + g = g**p + up_seg = down_seg + up_seg + H = K + up_seg[0] = der[i] + series.extend(up_seg) + series.append(der[-1]) + return series + + def coset_transversal(self, H): + """Return a transversal of the right cosets of self by its subgroup H + using the second method described in [1], Subsection 4.6.7 + + """ + + if not H.is_subgroup(self): + raise ValueError("The argument must be a subgroup") + + if H.order() == 1: + return self.elements + + self._schreier_sims(base=H.base) # make G.base an extension of H.base + + base = self.base + base_ordering = _base_ordering(base, self.degree) + identity = Permutation(self.degree - 1) + + transversals = self.basic_transversals[:] + # transversals is a list of dictionaries. Get rid of the keys + # so that it is a list of lists and sort each list in + # the increasing order of base[l]^x + for l, t in enumerate(transversals): + transversals[l] = sorted(t.values(), + key = lambda x: base_ordering[base[l]^x]) + + orbits = H.basic_orbits + h_stabs = H.basic_stabilizers + g_stabs = self.basic_stabilizers + + indices = [x.order()//y.order() for x, y in zip(g_stabs, h_stabs)] + + # T^(l) should be a right transversal of H^(l) in G^(l) for + # 1<=l<=len(base). While H^(l) is the trivial group, T^(l) + # contains all the elements of G^(l) so we might just as well + # start with l = len(h_stabs)-1 + if len(g_stabs) > len(h_stabs): + T = g_stabs[len(h_stabs)].elements + else: + T = [identity] + l = len(h_stabs)-1 + t_len = len(T) + while l > -1: + T_next = [] + for u in transversals[l]: + if u == identity: + continue + b = base_ordering[base[l]^u] + for t in T: + p = t*u + if all(base_ordering[h^p] >= b for h in orbits[l]): + T_next.append(p) + if t_len + len(T_next) == indices[l]: + break + if t_len + len(T_next) == indices[l]: + break + T += T_next + t_len += len(T_next) + l -= 1 + T.remove(identity) + T = [identity] + T + return T + + def _coset_representative(self, g, H): + """Return the representative of Hg from the transversal that + would be computed by ``self.coset_transversal(H)``. + + """ + if H.order() == 1: + return g + # The base of self must be an extension of H.base. + if not(self.base[:len(H.base)] == H.base): + self._schreier_sims(base=H.base) + orbits = H.basic_orbits[:] + h_transversals = [list(_.values()) for _ in H.basic_transversals] + transversals = [list(_.values()) for _ in self.basic_transversals] + base = self.base + base_ordering = _base_ordering(base, self.degree) + def step(l, x): + gamma = min(orbits[l], key = lambda y: base_ordering[y^x]) + i = [base[l]^h for h in h_transversals[l]].index(gamma) + x = h_transversals[l][i]*x + if l < len(orbits)-1: + for u in transversals[l]: + if base[l]^u == base[l]^x: + break + x = step(l+1, x*u**-1)*u + return x + return step(0, g) + + def coset_table(self, H): + """Return the standardised (right) coset table of self in H as + a list of lists. + """ + # Maybe this should be made to return an instance of CosetTable + # from fp_groups.py but the class would need to be changed first + # to be compatible with PermutationGroups + + if not H.is_subgroup(self): + raise ValueError("The argument must be a subgroup") + T = self.coset_transversal(H) + n = len(T) + + A = list(chain.from_iterable((gen, gen**-1) + for gen in self.generators)) + + table = [] + for i in range(n): + row = [self._coset_representative(T[i]*x, H) for x in A] + row = [T.index(r) for r in row] + table.append(row) + + # standardize (this is the same as the algorithm used in coset_table) + # If CosetTable is made compatible with PermutationGroups, this + # should be replaced by table.standardize() + A = range(len(A)) + gamma = 1 + for alpha, a in product(range(n), A): + beta = table[alpha][a] + if beta >= gamma: + if beta > gamma: + for x in A: + z = table[gamma][x] + table[gamma][x] = table[beta][x] + table[beta][x] = z + for i in range(n): + if table[i][x] == beta: + table[i][x] = gamma + elif table[i][x] == gamma: + table[i][x] = beta + gamma += 1 + if gamma >= n-1: + return table + + def center(self): + r""" + Return the center of a permutation group. + + Explanation + =========== + + The center for a group `G` is defined as + `Z(G) = \{z\in G | \forall g\in G, zg = gz \}`, + the set of elements of `G` that commute with all elements of `G`. + It is equal to the centralizer of `G` inside `G`, and is naturally a + subgroup of `G` ([9]). + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> D = DihedralGroup(4) + >>> G = D.center() + >>> G.order() + 2 + + See Also + ======== + + centralizer + + Notes + ===== + + This is a naive implementation that is a straightforward application + of ``.centralizer()`` + + """ + if not self._center: + self._center = self.centralizer(self) + return self._center + + def centralizer(self, other): + r""" + Return the centralizer of a group/set/element. + + Explanation + =========== + + The centralizer of a set of permutations ``S`` inside + a group ``G`` is the set of elements of ``G`` that commute with all + elements of ``S``:: + + `C_G(S) = \{ g \in G | gs = sg \forall s \in S\}` ([10]) + + Usually, ``S`` is a subset of ``G``, but if ``G`` is a proper subgroup of + the full symmetric group, we allow for ``S`` to have elements outside + ``G``. + + It is naturally a subgroup of ``G``; the centralizer of a permutation + group is equal to the centralizer of any set of generators for that + group, since any element commuting with the generators commutes with + any product of the generators. + + Parameters + ========== + + other + a permutation group/list of permutations/single permutation + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import (SymmetricGroup, + ... CyclicGroup) + >>> S = SymmetricGroup(6) + >>> C = CyclicGroup(6) + >>> H = S.centralizer(C) + >>> H.is_subgroup(C) + True + + See Also + ======== + + subgroup_search + + Notes + ===== + + The implementation is an application of ``.subgroup_search()`` with + tests using a specific base for the group ``G``. + + """ + if hasattr(other, 'generators'): + if other.is_trivial or self.is_trivial: + return self + degree = self.degree + identity = _af_new(list(range(degree))) + orbits = other.orbits() + num_orbits = len(orbits) + orbits.sort(key=lambda x: -len(x)) + long_base = [] + orbit_reps = [None]*num_orbits + orbit_reps_indices = [None]*num_orbits + orbit_descr = [None]*degree + for i in range(num_orbits): + orbit = list(orbits[i]) + orbit_reps[i] = orbit[0] + orbit_reps_indices[i] = len(long_base) + for point in orbit: + orbit_descr[point] = i + long_base = long_base + orbit + base, strong_gens = self.schreier_sims_incremental(base=long_base) + strong_gens_distr = _distribute_gens_by_base(base, strong_gens) + i = 0 + for i in range(len(base)): + if strong_gens_distr[i] == [identity]: + break + base = base[:i] + base_len = i + for j in range(num_orbits): + if base[base_len - 1] in orbits[j]: + break + rel_orbits = orbits[: j + 1] + num_rel_orbits = len(rel_orbits) + transversals = [None]*num_rel_orbits + for j in range(num_rel_orbits): + rep = orbit_reps[j] + transversals[j] = dict( + other.orbit_transversal(rep, pairs=True)) + trivial_test = lambda x: True + tests = [None]*base_len + for l in range(base_len): + if base[l] in orbit_reps: + tests[l] = trivial_test + else: + def test(computed_words, l=l): + g = computed_words[l] + rep_orb_index = orbit_descr[base[l]] + rep = orbit_reps[rep_orb_index] + im = g._array_form[base[l]] + im_rep = g._array_form[rep] + tr_el = transversals[rep_orb_index][base[l]] + # using the definition of transversal, + # base[l]^g = rep^(tr_el*g); + # if g belongs to the centralizer, then + # base[l]^g = (rep^g)^tr_el + return im == tr_el._array_form[im_rep] + tests[l] = test + + def prop(g): + return [rmul(g, gen) for gen in other.generators] == \ + [rmul(gen, g) for gen in other.generators] + return self.subgroup_search(prop, base=base, + strong_gens=strong_gens, tests=tests) + elif hasattr(other, '__getitem__'): + gens = list(other) + return self.centralizer(PermutationGroup(gens)) + elif hasattr(other, 'array_form'): + return self.centralizer(PermutationGroup([other])) + + def commutator(self, G, H): + """ + Return the commutator of two subgroups. + + Explanation + =========== + + For a permutation group ``K`` and subgroups ``G``, ``H``, the + commutator of ``G`` and ``H`` is defined as the group generated + by all the commutators `[g, h] = hgh^{-1}g^{-1}` for ``g`` in ``G`` and + ``h`` in ``H``. It is naturally a subgroup of ``K`` ([1], p.27). + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import (SymmetricGroup, + ... AlternatingGroup) + >>> S = SymmetricGroup(5) + >>> A = AlternatingGroup(5) + >>> G = S.commutator(S, A) + >>> G.is_subgroup(A) + True + + See Also + ======== + + derived_subgroup + + Notes + ===== + + The commutator of two subgroups `H, G` is equal to the normal closure + of the commutators of all the generators, i.e. `hgh^{-1}g^{-1}` for `h` + a generator of `H` and `g` a generator of `G` ([1], p.28) + + """ + ggens = G.generators + hgens = H.generators + commutators = [] + for ggen in ggens: + for hgen in hgens: + commutator = rmul(hgen, ggen, ~hgen, ~ggen) + if commutator not in commutators: + commutators.append(commutator) + res = self.normal_closure(commutators) + return res + + def coset_factor(self, g, factor_index=False): + """Return ``G``'s (self's) coset factorization of ``g`` + + Explanation + =========== + + If ``g`` is an element of ``G`` then it can be written as the product + of permutations drawn from the Schreier-Sims coset decomposition, + + The permutations returned in ``f`` are those for which + the product gives ``g``: ``g = f[n]*...f[1]*f[0]`` where ``n = len(B)`` + and ``B = G.base``. f[i] is one of the permutations in + ``self._basic_orbits[i]``. + + If factor_index==True, + returns a tuple ``[b[0],..,b[n]]``, where ``b[i]`` + belongs to ``self._basic_orbits[i]`` + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation(0, 1, 3, 7, 6, 4)(2, 5) + >>> b = Permutation(0, 1, 3, 2)(4, 5, 7, 6) + >>> G = PermutationGroup([a, b]) + + Define g: + + >>> g = Permutation(7)(1, 2, 4)(3, 6, 5) + + Confirm that it is an element of G: + + >>> G.contains(g) + True + + Thus, it can be written as a product of factors (up to + 3) drawn from u. See below that a factor from u1 and u2 + and the Identity permutation have been used: + + >>> f = G.coset_factor(g) + >>> f[2]*f[1]*f[0] == g + True + >>> f1 = G.coset_factor(g, True); f1 + [0, 4, 4] + >>> tr = G.basic_transversals + >>> f[0] == tr[0][f1[0]] + True + + If g is not an element of G then [] is returned: + + >>> c = Permutation(5, 6, 7) + >>> G.coset_factor(c) + [] + + See Also + ======== + + sympy.combinatorics.util._strip + + """ + if isinstance(g, (Cycle, Permutation)): + g = g.list() + if len(g) != self._degree: + # this could either adjust the size or return [] immediately + # but we don't choose between the two and just signal a possible + # error + raise ValueError('g should be the same size as permutations of G') + I = list(range(self._degree)) + basic_orbits = self.basic_orbits + transversals = self._transversals + factors = [] + base = self.base + h = g + for i in range(len(base)): + beta = h[base[i]] + if beta == base[i]: + factors.append(beta) + continue + if beta not in basic_orbits[i]: + return [] + u = transversals[i][beta]._array_form + h = _af_rmul(_af_invert(u), h) + factors.append(beta) + if h != I: + return [] + if factor_index: + return factors + tr = self.basic_transversals + factors = [tr[i][factors[i]] for i in range(len(base))] + return factors + + def generator_product(self, g, original=False): + r''' + Return a list of strong generators `[s1, \dots, sn]` + s.t `g = sn \times \dots \times s1`. If ``original=True``, make the + list contain only the original group generators + + ''' + product = [] + if g.is_identity: + return [] + if g in self.strong_gens: + if not original or g in self.generators: + return [g] + else: + slp = self._strong_gens_slp[g] + for s in slp: + product.extend(self.generator_product(s, original=True)) + return product + elif g**-1 in self.strong_gens: + g = g**-1 + if not original or g in self.generators: + return [g**-1] + else: + slp = self._strong_gens_slp[g] + for s in slp: + product.extend(self.generator_product(s, original=True)) + l = len(product) + product = [product[l-i-1]**-1 for i in range(l)] + return product + + f = self.coset_factor(g, True) + for i, j in enumerate(f): + slp = self._transversal_slp[i][j] + for s in slp: + if not original: + product.append(self.strong_gens[s]) + else: + s = self.strong_gens[s] + product.extend(self.generator_product(s, original=True)) + return product + + def coset_rank(self, g): + """rank using Schreier-Sims representation. + + Explanation + =========== + + The coset rank of ``g`` is the ordering number in which + it appears in the lexicographic listing according to the + coset decomposition + + The ordering is the same as in G.generate(method='coset'). + If ``g`` does not belong to the group it returns None. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation(0, 1, 3, 7, 6, 4)(2, 5) + >>> b = Permutation(0, 1, 3, 2)(4, 5, 7, 6) + >>> G = PermutationGroup([a, b]) + >>> c = Permutation(7)(2, 4)(3, 5) + >>> G.coset_rank(c) + 16 + >>> G.coset_unrank(16) + (7)(2 4)(3 5) + + See Also + ======== + + coset_factor + + """ + factors = self.coset_factor(g, True) + if not factors: + return None + rank = 0 + b = 1 + transversals = self._transversals + base = self._base + basic_orbits = self._basic_orbits + for i in range(len(base)): + k = factors[i] + j = basic_orbits[i].index(k) + rank += b*j + b = b*len(transversals[i]) + return rank + + def coset_unrank(self, rank, af=False): + """unrank using Schreier-Sims representation + + coset_unrank is the inverse operation of coset_rank + if 0 <= rank < order; otherwise it returns None. + + """ + if rank < 0 or rank >= self.order(): + return None + base = self.base + transversals = self.basic_transversals + basic_orbits = self.basic_orbits + m = len(base) + v = [0]*m + for i in range(m): + rank, c = divmod(rank, len(transversals[i])) + v[i] = basic_orbits[i][c] + a = [transversals[i][v[i]]._array_form for i in range(m)] + h = _af_rmuln(*a) + if af: + return h + else: + return _af_new(h) + + @property + def degree(self): + """Returns the size of the permutations in the group. + + Explanation + =========== + + The number of permutations comprising the group is given by + ``len(group)``; the number of permutations that can be generated + by the group is given by ``group.order()``. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation([1, 0, 2]) + >>> G = PermutationGroup([a]) + >>> G.degree + 3 + >>> len(G) + 1 + >>> G.order() + 2 + >>> list(G.generate()) + [(2), (2)(0 1)] + + See Also + ======== + + order + """ + return self._degree + + @property + def identity(self): + ''' + Return the identity element of the permutation group. + + ''' + return _af_new(list(range(self.degree))) + + @property + def elements(self): + """Returns all the elements of the permutation group as a list + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> p = PermutationGroup(Permutation(1, 3), Permutation(1, 2)) + >>> p.elements + [(3), (3)(1 2), (1 3), (2 3), (1 2 3), (1 3 2)] + + """ + if not self._elements: + self._elements = list(self.generate()) + + return self._elements + + def derived_series(self): + r"""Return the derived series for the group. + + Explanation + =========== + + The derived series for a group `G` is defined as + `G = G_0 > G_1 > G_2 > \ldots` where `G_i = [G_{i-1}, G_{i-1}]`, + i.e. `G_i` is the derived subgroup of `G_{i-1}`, for + `i\in\mathbb{N}`. When we have `G_k = G_{k-1}` for some + `k\in\mathbb{N}`, the series terminates. + + Returns + ======= + + A list of permutation groups containing the members of the derived + series in the order `G = G_0, G_1, G_2, \ldots`. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import (SymmetricGroup, + ... AlternatingGroup, DihedralGroup) + >>> A = AlternatingGroup(5) + >>> len(A.derived_series()) + 1 + >>> S = SymmetricGroup(4) + >>> len(S.derived_series()) + 4 + >>> S.derived_series()[1].is_subgroup(AlternatingGroup(4)) + True + >>> S.derived_series()[2].is_subgroup(DihedralGroup(2)) + True + + See Also + ======== + + derived_subgroup + + """ + res = [self] + current = self + nxt = self.derived_subgroup() + while not current.is_subgroup(nxt): + res.append(nxt) + current = nxt + nxt = nxt.derived_subgroup() + return res + + def derived_subgroup(self): + r"""Compute the derived subgroup. + + Explanation + =========== + + The derived subgroup, or commutator subgroup is the subgroup generated + by all commutators `[g, h] = hgh^{-1}g^{-1}` for `g, h\in G` ; it is + equal to the normal closure of the set of commutators of the generators + ([1], p.28, [11]). + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation([1, 0, 2, 4, 3]) + >>> b = Permutation([0, 1, 3, 2, 4]) + >>> G = PermutationGroup([a, b]) + >>> C = G.derived_subgroup() + >>> list(C.generate(af=True)) + [[0, 1, 2, 3, 4], [0, 1, 3, 4, 2], [0, 1, 4, 2, 3]] + + See Also + ======== + + derived_series + + """ + r = self._r + gens = [p._array_form for p in self.generators] + set_commutators = set() + degree = self._degree + rng = list(range(degree)) + for i in range(r): + for j in range(r): + p1 = gens[i] + p2 = gens[j] + c = list(range(degree)) + for k in rng: + c[p2[p1[k]]] = p1[p2[k]] + ct = tuple(c) + if ct not in set_commutators: + set_commutators.add(ct) + cms = [_af_new(p) for p in set_commutators] + G2 = self.normal_closure(cms) + return G2 + + def generate(self, method="coset", af=False): + """Return iterator to generate the elements of the group. + + Explanation + =========== + + Iteration is done with one of these methods:: + + method='coset' using the Schreier-Sims coset representation + method='dimino' using the Dimino method + + If ``af = True`` it yields the array form of the permutations + + Examples + ======== + + >>> from sympy.combinatorics import PermutationGroup + >>> from sympy.combinatorics.polyhedron import tetrahedron + + The permutation group given in the tetrahedron object is also + true groups: + + >>> G = tetrahedron.pgroup + >>> G.is_group + True + + Also the group generated by the permutations in the tetrahedron + pgroup -- even the first two -- is a proper group: + + >>> H = PermutationGroup(G[0], G[1]) + >>> J = PermutationGroup(list(H.generate())); J + PermutationGroup([ + (0 1)(2 3), + (1 2 3), + (1 3 2), + (0 3 1), + (0 2 3), + (0 3)(1 2), + (0 1 3), + (3)(0 2 1), + (0 3 2), + (3)(0 1 2), + (0 2)(1 3)]) + >>> _.is_group + True + """ + if method == "coset": + return self.generate_schreier_sims(af) + elif method == "dimino": + return self.generate_dimino(af) + else: + raise NotImplementedError('No generation defined for %s' % method) + + def generate_dimino(self, af=False): + """Yield group elements using Dimino's algorithm. + + If ``af == True`` it yields the array form of the permutations. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation([0, 2, 1, 3]) + >>> b = Permutation([0, 2, 3, 1]) + >>> g = PermutationGroup([a, b]) + >>> list(g.generate_dimino(af=True)) + [[0, 1, 2, 3], [0, 2, 1, 3], [0, 2, 3, 1], + [0, 1, 3, 2], [0, 3, 2, 1], [0, 3, 1, 2]] + + References + ========== + + .. [1] The Implementation of Various Algorithms for Permutation Groups in + the Computer Algebra System: AXIOM, N.J. Doye, M.Sc. Thesis + + """ + idn = list(range(self.degree)) + order = 0 + element_list = [idn] + set_element_list = {tuple(idn)} + if af: + yield idn + else: + yield _af_new(idn) + gens = [p._array_form for p in self.generators] + + for i in range(len(gens)): + # D elements of the subgroup G_i generated by gens[:i] + D = element_list.copy() + N = [idn] + while N: + A = N + N = [] + for a in A: + for g in gens[:i + 1]: + ag = _af_rmul(a, g) + if tuple(ag) not in set_element_list: + # produce G_i*g + for d in D: + order += 1 + ap = _af_rmul(d, ag) + if af: + yield ap + else: + p = _af_new(ap) + yield p + element_list.append(ap) + set_element_list.add(tuple(ap)) + N.append(ap) + self._order = len(element_list) + + def generate_schreier_sims(self, af=False): + """Yield group elements using the Schreier-Sims representation + in coset_rank order + + If ``af = True`` it yields the array form of the permutations + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation([0, 2, 1, 3]) + >>> b = Permutation([0, 2, 3, 1]) + >>> g = PermutationGroup([a, b]) + >>> list(g.generate_schreier_sims(af=True)) + [[0, 1, 2, 3], [0, 2, 1, 3], [0, 3, 2, 1], + [0, 1, 3, 2], [0, 2, 3, 1], [0, 3, 1, 2]] + """ + + n = self._degree + u = self.basic_transversals + basic_orbits = self._basic_orbits + if len(u) == 0: + for x in self.generators: + if af: + yield x._array_form + else: + yield x + return + if len(u) == 1: + for i in basic_orbits[0]: + if af: + yield u[0][i]._array_form + else: + yield u[0][i] + return + + u = list(reversed(u)) + basic_orbits = basic_orbits[::-1] + # stg stack of group elements + stg = [list(range(n))] + posmax = [len(x) for x in u] + n1 = len(posmax) - 1 + pos = [0]*n1 + h = 0 + while 1: + # backtrack when finished iterating over coset + if pos[h] >= posmax[h]: + if h == 0: + return + pos[h] = 0 + h -= 1 + stg.pop() + continue + p = _af_rmul(u[h][basic_orbits[h][pos[h]]]._array_form, stg[-1]) + pos[h] += 1 + stg.append(p) + h += 1 + if h == n1: + if af: + for i in basic_orbits[-1]: + p = _af_rmul(u[-1][i]._array_form, stg[-1]) + yield p + else: + for i in basic_orbits[-1]: + p = _af_rmul(u[-1][i]._array_form, stg[-1]) + p1 = _af_new(p) + yield p1 + stg.pop() + h -= 1 + + @property + def generators(self): + """Returns the generators of the group. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation([0, 2, 1]) + >>> b = Permutation([1, 0, 2]) + >>> G = PermutationGroup([a, b]) + >>> G.generators + [(1 2), (2)(0 1)] + + """ + return self._generators + + def contains(self, g, strict=True): + """Test if permutation ``g`` belong to self, ``G``. + + Explanation + =========== + + If ``g`` is an element of ``G`` it can be written as a product + of factors drawn from the cosets of ``G``'s stabilizers. To see + if ``g`` is one of the actual generators defining the group use + ``G.has(g)``. + + If ``strict`` is not ``True``, ``g`` will be resized, if necessary, + to match the size of permutations in ``self``. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + + >>> a = Permutation(1, 2) + >>> b = Permutation(2, 3, 1) + >>> G = PermutationGroup(a, b, degree=5) + >>> G.contains(G[0]) # trivial check + True + >>> elem = Permutation([[2, 3]], size=5) + >>> G.contains(elem) + True + >>> G.contains(Permutation(4)(0, 1, 2, 3)) + False + + If strict is False, a permutation will be resized, if + necessary: + + >>> H = PermutationGroup(Permutation(5)) + >>> H.contains(Permutation(3)) + False + >>> H.contains(Permutation(3), strict=False) + True + + To test if a given permutation is present in the group: + + >>> elem in G.generators + False + >>> G.has(elem) + False + + See Also + ======== + + coset_factor, sympy.core.basic.Basic.has, __contains__ + + """ + if not isinstance(g, Permutation): + return False + if g.size != self.degree: + if strict: + return False + g = Permutation(g, size=self.degree) + if g in self.generators: + return True + return bool(self.coset_factor(g.array_form, True)) + + @property + def is_perfect(self): + """Return ``True`` if the group is perfect. + A group is perfect if it equals to its derived subgroup. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation(1,2,3)(4,5) + >>> b = Permutation(1,2,3,4,5) + >>> G = PermutationGroup([a, b]) + >>> G.is_perfect + False + + """ + if self._is_perfect is None: + self._is_perfect = self.equals(self.derived_subgroup()) + return self._is_perfect + + @property + def is_abelian(self): + """Test if the group is Abelian. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation([0, 2, 1]) + >>> b = Permutation([1, 0, 2]) + >>> G = PermutationGroup([a, b]) + >>> G.is_abelian + False + >>> a = Permutation([0, 2, 1]) + >>> G = PermutationGroup([a]) + >>> G.is_abelian + True + + """ + if self._is_abelian is not None: + return self._is_abelian + + self._is_abelian = True + gens = [p._array_form for p in self.generators] + for x in gens: + for y in gens: + if y <= x: + continue + if not _af_commutes_with(x, y): + self._is_abelian = False + return False + return True + + def abelian_invariants(self): + """ + Returns the abelian invariants for the given group. + Let ``G`` be a nontrivial finite abelian group. Then G is isomorphic to + the direct product of finitely many nontrivial cyclic groups of + prime-power order. + + Explanation + =========== + + The prime-powers that occur as the orders of the factors are uniquely + determined by G. More precisely, the primes that occur in the orders of the + factors in any such decomposition of ``G`` are exactly the primes that divide + ``|G|`` and for any such prime ``p``, if the orders of the factors that are + p-groups in one such decomposition of ``G`` are ``p^{t_1} >= p^{t_2} >= ... p^{t_r}``, + then the orders of the factors that are p-groups in any such decomposition of ``G`` + are ``p^{t_1} >= p^{t_2} >= ... p^{t_r}``. + + The uniquely determined integers ``p^{t_1} >= p^{t_2} >= ... p^{t_r}``, taken + for all primes that divide ``|G|`` are called the invariants of the nontrivial + group ``G`` as suggested in ([14], p. 542). + + Notes + ===== + + We adopt the convention that the invariants of a trivial group are []. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation([0, 2, 1]) + >>> b = Permutation([1, 0, 2]) + >>> G = PermutationGroup([a, b]) + >>> G.abelian_invariants() + [2] + >>> from sympy.combinatorics import CyclicGroup + >>> G = CyclicGroup(7) + >>> G.abelian_invariants() + [7] + + """ + if self.is_trivial: + return [] + gns = self.generators + inv = [] + G = self + H = G.derived_subgroup() + Hgens = H.generators + for p in primefactors(G.order()): + ranks = [] + while True: + pows = [] + for g in gns: + elm = g**p + if not H.contains(elm): + pows.append(elm) + K = PermutationGroup(Hgens + pows) if pows else H + r = G.order()//K.order() + G = K + gns = pows + if r == 1: + break + ranks.append(multiplicity(p, r)) + + if ranks: + pows = [1]*ranks[0] + for i in ranks: + for j in range(i): + pows[j] = pows[j]*p + inv.extend(pows) + inv.sort() + return inv + + def is_elementary(self, p): + """Return ``True`` if the group is elementary abelian. An elementary + abelian group is a finite abelian group, where every nontrivial + element has order `p`, where `p` is a prime. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation([0, 2, 1]) + >>> G = PermutationGroup([a]) + >>> G.is_elementary(2) + True + >>> a = Permutation([0, 2, 1, 3]) + >>> b = Permutation([3, 1, 2, 0]) + >>> G = PermutationGroup([a, b]) + >>> G.is_elementary(2) + True + >>> G.is_elementary(3) + False + + """ + return self.is_abelian and all(g.order() == p for g in self.generators) + + def _eval_is_alt_sym_naive(self, only_sym=False, only_alt=False): + """A naive test using the group order.""" + if only_sym and only_alt: + raise ValueError( + "Both {} and {} cannot be set to True" + .format(only_sym, only_alt)) + + n = self.degree + sym_order = _factorial(n) + order = self.order() + + if order == sym_order: + self._is_sym = True + self._is_alt = False + return not only_alt + + if 2*order == sym_order: + self._is_sym = False + self._is_alt = True + return not only_sym + + return False + + def _eval_is_alt_sym_monte_carlo(self, eps=0.05, perms=None): + """A test using monte-carlo algorithm. + + Parameters + ========== + + eps : float, optional + The criterion for the incorrect ``False`` return. + + perms : list[Permutation], optional + If explicitly given, it tests over the given candidates + for testing. + + If ``None``, it randomly computes ``N_eps`` and chooses + ``N_eps`` sample of the permutation from the group. + + See Also + ======== + + _check_cycles_alt_sym + """ + if perms is None: + n = self.degree + if n < 17: + c_n = 0.34 + else: + c_n = 0.57 + d_n = (c_n*log(2))/log(n) + N_eps = int(-log(eps)/d_n) + + perms = (self.random_pr() for i in range(N_eps)) + return self._eval_is_alt_sym_monte_carlo(perms=perms) + + for perm in perms: + if _check_cycles_alt_sym(perm): + return True + return False + + def is_alt_sym(self, eps=0.05, _random_prec=None): + r"""Monte Carlo test for the symmetric/alternating group for degrees + >= 8. + + Explanation + =========== + + More specifically, it is one-sided Monte Carlo with the + answer True (i.e., G is symmetric/alternating) guaranteed to be + correct, and the answer False being incorrect with probability eps. + + For degree < 8, the order of the group is checked so the test + is deterministic. + + Notes + ===== + + The algorithm itself uses some nontrivial results from group theory and + number theory: + 1) If a transitive group ``G`` of degree ``n`` contains an element + with a cycle of length ``n/2 < p < n-2`` for ``p`` a prime, ``G`` is the + symmetric or alternating group ([1], pp. 81-82) + 2) The proportion of elements in the symmetric/alternating group having + the property described in 1) is approximately `\log(2)/\log(n)` + ([1], p.82; [2], pp. 226-227). + The helper function ``_check_cycles_alt_sym`` is used to + go over the cycles in a permutation and look for ones satisfying 1). + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> D = DihedralGroup(10) + >>> D.is_alt_sym() + False + + See Also + ======== + + _check_cycles_alt_sym + + """ + if _random_prec is not None: + N_eps = _random_prec['N_eps'] + perms= (_random_prec[i] for i in range(N_eps)) + return self._eval_is_alt_sym_monte_carlo(perms=perms) + + if self._is_sym or self._is_alt: + return True + if self._is_sym is False and self._is_alt is False: + return False + + n = self.degree + if n < 8: + return self._eval_is_alt_sym_naive() + elif self.is_transitive(): + return self._eval_is_alt_sym_monte_carlo(eps=eps) + + self._is_sym, self._is_alt = False, False + return False + + @property + def is_nilpotent(self): + """Test if the group is nilpotent. + + Explanation + =========== + + A group `G` is nilpotent if it has a central series of finite length. + Alternatively, `G` is nilpotent if its lower central series terminates + with the trivial group. Every nilpotent group is also solvable + ([1], p.29, [12]). + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import (SymmetricGroup, + ... CyclicGroup) + >>> C = CyclicGroup(6) + >>> C.is_nilpotent + True + >>> S = SymmetricGroup(5) + >>> S.is_nilpotent + False + + See Also + ======== + + lower_central_series, is_solvable + + """ + if self._is_nilpotent is None: + lcs = self.lower_central_series() + terminator = lcs[len(lcs) - 1] + gens = terminator.generators + degree = self.degree + identity = _af_new(list(range(degree))) + if all(g == identity for g in gens): + self._is_solvable = True + self._is_nilpotent = True + return True + else: + self._is_nilpotent = False + return False + else: + return self._is_nilpotent + + def is_normal(self, gr, strict=True): + """Test if ``G=self`` is a normal subgroup of ``gr``. + + Explanation + =========== + + G is normal in gr if + for each g2 in G, g1 in gr, ``g = g1*g2*g1**-1`` belongs to G + It is sufficient to check this for each g1 in gr.generators and + g2 in G.generators. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation([1, 2, 0]) + >>> b = Permutation([1, 0, 2]) + >>> G = PermutationGroup([a, b]) + >>> G1 = PermutationGroup([a, Permutation([2, 0, 1])]) + >>> G1.is_normal(G) + True + + """ + if not self.is_subgroup(gr, strict=strict): + return False + d_self = self.degree + d_gr = gr.degree + if self.is_trivial and (d_self == d_gr or not strict): + return True + if self._is_abelian: + return True + new_self = self.copy() + if not strict and d_self != d_gr: + if d_self < d_gr: + new_self = PermGroup(new_self.generators + [Permutation(d_gr - 1)]) + else: + gr = PermGroup(gr.generators + [Permutation(d_self - 1)]) + gens2 = [p._array_form for p in new_self.generators] + gens1 = [p._array_form for p in gr.generators] + for g1 in gens1: + for g2 in gens2: + p = _af_rmuln(g1, g2, _af_invert(g1)) + if not new_self.coset_factor(p, True): + return False + return True + + def is_primitive(self, randomized=True): + r"""Test if a group is primitive. + + Explanation + =========== + + A permutation group ``G`` acting on a set ``S`` is called primitive if + ``S`` contains no nontrivial block under the action of ``G`` + (a block is nontrivial if its cardinality is more than ``1``). + + Notes + ===== + + The algorithm is described in [1], p.83, and uses the function + minimal_block to search for blocks of the form `\{0, k\}` for ``k`` + ranging over representatives for the orbits of `G_0`, the stabilizer of + ``0``. This algorithm has complexity `O(n^2)` where ``n`` is the degree + of the group, and will perform badly if `G_0` is small. + + There are two implementations offered: one finds `G_0` + deterministically using the function ``stabilizer``, and the other + (default) produces random elements of `G_0` using ``random_stab``, + hoping that they generate a subgroup of `G_0` with not too many more + orbits than `G_0` (this is suggested in [1], p.83). Behavior is changed + by the ``randomized`` flag. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> D = DihedralGroup(10) + >>> D.is_primitive() + False + + See Also + ======== + + minimal_block, random_stab + + """ + if self._is_primitive is not None: + return self._is_primitive + + if self.is_transitive() is False: + return False + + if randomized: + random_stab_gens = [] + v = self.schreier_vector(0) + for _ in range(len(self)): + random_stab_gens.append(self.random_stab(0, v)) + stab = PermutationGroup(random_stab_gens) + else: + stab = self.stabilizer(0) + orbits = stab.orbits() + for orb in orbits: + x = orb.pop() + if x != 0 and any(e != 0 for e in self.minimal_block([0, x])): + self._is_primitive = False + return False + self._is_primitive = True + return True + + def minimal_blocks(self, randomized=True): + ''' + For a transitive group, return the list of all minimal + block systems. If a group is intransitive, return `False`. + + Examples + ======== + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> DihedralGroup(6).minimal_blocks() + [[0, 1, 0, 1, 0, 1], [0, 1, 2, 0, 1, 2]] + >>> G = PermutationGroup(Permutation(1,2,5)) + >>> G.minimal_blocks() + False + + See Also + ======== + + minimal_block, is_transitive, is_primitive + + ''' + def _number_blocks(blocks): + # number the blocks of a block system + # in order and return the number of + # blocks and the tuple with the + # reordering + n = len(blocks) + appeared = {} + m = 0 + b = [None]*n + for i in range(n): + if blocks[i] not in appeared: + appeared[blocks[i]] = m + b[i] = m + m += 1 + else: + b[i] = appeared[blocks[i]] + return tuple(b), m + + if not self.is_transitive(): + return False + blocks = [] + num_blocks = [] + rep_blocks = [] + if randomized: + random_stab_gens = [] + v = self.schreier_vector(0) + for i in range(len(self)): + random_stab_gens.append(self.random_stab(0, v)) + stab = PermutationGroup(random_stab_gens) + else: + stab = self.stabilizer(0) + orbits = stab.orbits() + for orb in orbits: + x = orb.pop() + if x != 0: + block = self.minimal_block([0, x]) + num_block, _ = _number_blocks(block) + # a representative block (containing 0) + rep = {j for j in range(self.degree) if num_block[j] == 0} + # check if the system is minimal with + # respect to the already discovere ones + minimal = True + blocks_remove_mask = [False] * len(blocks) + for i, r in enumerate(rep_blocks): + if len(r) > len(rep) and rep.issubset(r): + # i-th block system is not minimal + blocks_remove_mask[i] = True + elif len(r) < len(rep) and r.issubset(rep): + # the system being checked is not minimal + minimal = False + break + # remove non-minimal representative blocks + blocks = [b for i, b in enumerate(blocks) if not blocks_remove_mask[i]] + num_blocks = [n for i, n in enumerate(num_blocks) if not blocks_remove_mask[i]] + rep_blocks = [r for i, r in enumerate(rep_blocks) if not blocks_remove_mask[i]] + + if minimal and num_block not in num_blocks: + blocks.append(block) + num_blocks.append(num_block) + rep_blocks.append(rep) + return blocks + + @property + def is_solvable(self): + """Test if the group is solvable. + + ``G`` is solvable if its derived series terminates with the trivial + group ([1], p.29). + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> S = SymmetricGroup(3) + >>> S.is_solvable + True + + See Also + ======== + + is_nilpotent, derived_series + + """ + if self._is_solvable is None: + if self.order() % 2 != 0: + return True + ds = self.derived_series() + terminator = ds[len(ds) - 1] + gens = terminator.generators + degree = self.degree + identity = _af_new(list(range(degree))) + if all(g == identity for g in gens): + self._is_solvable = True + return True + else: + self._is_solvable = False + return False + else: + return self._is_solvable + + def is_subgroup(self, G, strict=True): + """Return ``True`` if all elements of ``self`` belong to ``G``. + + If ``strict`` is ``False`` then if ``self``'s degree is smaller + than ``G``'s, the elements will be resized to have the same degree. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> from sympy.combinatorics import SymmetricGroup, CyclicGroup + + Testing is strict by default: the degree of each group must be the + same: + + >>> p = Permutation(0, 1, 2, 3, 4, 5) + >>> G1 = PermutationGroup([Permutation(0, 1, 2), Permutation(0, 1)]) + >>> G2 = PermutationGroup([Permutation(0, 2), Permutation(0, 1, 2)]) + >>> G3 = PermutationGroup([p, p**2]) + >>> assert G1.order() == G2.order() == G3.order() == 6 + >>> G1.is_subgroup(G2) + True + >>> G1.is_subgroup(G3) + False + >>> G3.is_subgroup(PermutationGroup(G3[1])) + False + >>> G3.is_subgroup(PermutationGroup(G3[0])) + True + + To ignore the size, set ``strict`` to ``False``: + + >>> S3 = SymmetricGroup(3) + >>> S5 = SymmetricGroup(5) + >>> S3.is_subgroup(S5, strict=False) + True + >>> C7 = CyclicGroup(7) + >>> G = S5*C7 + >>> S5.is_subgroup(G, False) + True + >>> C7.is_subgroup(G, 0) + False + + """ + if isinstance(G, SymmetricPermutationGroup): + if self.degree != G.degree: + return False + return True + if not isinstance(G, PermutationGroup): + return False + if self == G or self.generators[0]==Permutation(): + return True + if G.order() % self.order() != 0: + return False + if self.degree == G.degree or \ + (self.degree < G.degree and not strict): + gens = self.generators + else: + return False + return all(G.contains(g, strict=strict) for g in gens) + + @property + def is_polycyclic(self): + """Return ``True`` if a group is polycyclic. A group is polycyclic if + it has a subnormal series with cyclic factors. For finite groups, + this is the same as if the group is solvable. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation([0, 2, 1, 3]) + >>> b = Permutation([2, 0, 1, 3]) + >>> G = PermutationGroup([a, b]) + >>> G.is_polycyclic + True + + """ + return self.is_solvable + + def is_transitive(self, strict=True): + """Test if the group is transitive. + + Explanation + =========== + + A group is transitive if it has a single orbit. + + If ``strict`` is ``False`` the group is transitive if it has + a single orbit of length different from 1. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation([0, 2, 1, 3]) + >>> b = Permutation([2, 0, 1, 3]) + >>> G1 = PermutationGroup([a, b]) + >>> G1.is_transitive() + False + >>> G1.is_transitive(strict=False) + True + >>> c = Permutation([2, 3, 0, 1]) + >>> G2 = PermutationGroup([a, c]) + >>> G2.is_transitive() + True + >>> d = Permutation([1, 0, 2, 3]) + >>> e = Permutation([0, 1, 3, 2]) + >>> G3 = PermutationGroup([d, e]) + >>> G3.is_transitive() or G3.is_transitive(strict=False) + False + + """ + if self._is_transitive: # strict or not, if True then True + return self._is_transitive + if strict: + if self._is_transitive is not None: # we only store strict=True + return self._is_transitive + + ans = len(self.orbit(0)) == self.degree + self._is_transitive = ans + return ans + + got_orb = False + for x in self.orbits(): + if len(x) > 1: + if got_orb: + return False + got_orb = True + return got_orb + + @property + def is_trivial(self): + """Test if the group is the trivial group. + + This is true if the group contains only the identity permutation. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> G = PermutationGroup([Permutation([0, 1, 2])]) + >>> G.is_trivial + True + + """ + if self._is_trivial is None: + self._is_trivial = len(self) == 1 and self[0].is_Identity + return self._is_trivial + + def lower_central_series(self): + r"""Return the lower central series for the group. + + The lower central series for a group `G` is the series + `G = G_0 > G_1 > G_2 > \ldots` where + `G_k = [G, G_{k-1}]`, i.e. every term after the first is equal to the + commutator of `G` and the previous term in `G1` ([1], p.29). + + Returns + ======= + + A list of permutation groups in the order `G = G_0, G_1, G_2, \ldots` + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import (AlternatingGroup, + ... DihedralGroup) + >>> A = AlternatingGroup(4) + >>> len(A.lower_central_series()) + 2 + >>> A.lower_central_series()[1].is_subgroup(DihedralGroup(2)) + True + + See Also + ======== + + commutator, derived_series + + """ + res = [self] + current = self + nxt = self.commutator(self, current) + while not current.is_subgroup(nxt): + res.append(nxt) + current = nxt + nxt = self.commutator(self, current) + return res + + @property + def max_div(self): + """Maximum proper divisor of the degree of a permutation group. + + Explanation + =========== + + Obviously, this is the degree divided by its minimal proper divisor + (larger than ``1``, if one exists). As it is guaranteed to be prime, + the ``sieve`` from ``sympy.ntheory`` is used. + This function is also used as an optimization tool for the functions + ``minimal_block`` and ``_union_find_merge``. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> G = PermutationGroup([Permutation([0, 2, 1, 3])]) + >>> G.max_div + 2 + + See Also + ======== + + minimal_block, _union_find_merge + + """ + if self._max_div is not None: + return self._max_div + n = self.degree + if n == 1: + return 1 + for x in sieve: + if n % x == 0: + d = n//x + self._max_div = d + return d + + def minimal_block(self, points): + r"""For a transitive group, finds the block system generated by + ``points``. + + Explanation + =========== + + If a group ``G`` acts on a set ``S``, a nonempty subset ``B`` of ``S`` + is called a block under the action of ``G`` if for all ``g`` in ``G`` + we have ``gB = B`` (``g`` fixes ``B``) or ``gB`` and ``B`` have no + common points (``g`` moves ``B`` entirely). ([1], p.23; [6]). + + The distinct translates ``gB`` of a block ``B`` for ``g`` in ``G`` + partition the set ``S`` and this set of translates is known as a block + system. Moreover, we obviously have that all blocks in the partition + have the same size, hence the block size divides ``|S|`` ([1], p.23). + A ``G``-congruence is an equivalence relation ``~`` on the set ``S`` + such that ``a ~ b`` implies ``g(a) ~ g(b)`` for all ``g`` in ``G``. + For a transitive group, the equivalence classes of a ``G``-congruence + and the blocks of a block system are the same thing ([1], p.23). + + The algorithm below checks the group for transitivity, and then finds + the ``G``-congruence generated by the pairs ``(p_0, p_1), (p_0, p_2), + ..., (p_0,p_{k-1})`` which is the same as finding the maximal block + system (i.e., the one with minimum block size) such that + ``p_0, ..., p_{k-1}`` are in the same block ([1], p.83). + + It is an implementation of Atkinson's algorithm, as suggested in [1], + and manipulates an equivalence relation on the set ``S`` using a + union-find data structure. The running time is just above + `O(|points||S|)`. ([1], pp. 83-87; [7]). + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> D = DihedralGroup(10) + >>> D.minimal_block([0, 5]) + [0, 1, 2, 3, 4, 0, 1, 2, 3, 4] + >>> D.minimal_block([0, 1]) + [0, 0, 0, 0, 0, 0, 0, 0, 0, 0] + + See Also + ======== + + _union_find_rep, _union_find_merge, is_transitive, is_primitive + + """ + if not self.is_transitive(): + return False + n = self.degree + gens = self.generators + # initialize the list of equivalence class representatives + parents = list(range(n)) + ranks = [1]*n + not_rep = [] + k = len(points) + # the block size must divide the degree of the group + if k > self.max_div: + return [0]*n + for i in range(k - 1): + parents[points[i + 1]] = points[0] + not_rep.append(points[i + 1]) + ranks[points[0]] = k + i = 0 + len_not_rep = k - 1 + while i < len_not_rep: + gamma = not_rep[i] + i += 1 + for gen in gens: + # find has side effects: performs path compression on the list + # of representatives + delta = self._union_find_rep(gamma, parents) + # union has side effects: performs union by rank on the list + # of representatives + temp = self._union_find_merge(gen(gamma), gen(delta), ranks, + parents, not_rep) + if temp == -1: + return [0]*n + len_not_rep += temp + for i in range(n): + # force path compression to get the final state of the equivalence + # relation + self._union_find_rep(i, parents) + + # rewrite result so that block representatives are minimal + new_reps = {} + return [new_reps.setdefault(r, i) for i, r in enumerate(parents)] + + def conjugacy_class(self, x): + r"""Return the conjugacy class of an element in the group. + + Explanation + =========== + + The conjugacy class of an element ``g`` in a group ``G`` is the set of + elements ``x`` in ``G`` that are conjugate with ``g``, i.e. for which + + ``g = xax^{-1}`` + + for some ``a`` in ``G``. + + Note that conjugacy is an equivalence relation, and therefore that + conjugacy classes are partitions of ``G``. For a list of all the + conjugacy classes of the group, use the conjugacy_classes() method. + + In a permutation group, each conjugacy class corresponds to a particular + `cycle structure': for example, in ``S_3``, the conjugacy classes are: + + * the identity class, ``{()}`` + * all transpositions, ``{(1 2), (1 3), (2 3)}`` + * all 3-cycles, ``{(1 2 3), (1 3 2)}`` + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, SymmetricGroup + >>> S3 = SymmetricGroup(3) + >>> S3.conjugacy_class(Permutation(0, 1, 2)) + {(0 1 2), (0 2 1)} + + Notes + ===== + + This procedure computes the conjugacy class directly by finding the + orbit of the element under conjugation in G. This algorithm is only + feasible for permutation groups of relatively small order, but is like + the orbit() function itself in that respect. + """ + # Ref: "Computing the conjugacy classes of finite groups"; Butler, G. + # Groups '93 Galway/St Andrews; edited by Campbell, C. M. + new_class = {x} + last_iteration = new_class + + while len(last_iteration) > 0: + this_iteration = set() + + for y in last_iteration: + for s in self.generators: + conjugated = s * y * (~s) + if conjugated not in new_class: + this_iteration.add(conjugated) + + new_class.update(last_iteration) + last_iteration = this_iteration + + return new_class + + + def conjugacy_classes(self): + r"""Return the conjugacy classes of the group. + + Explanation + =========== + + As described in the documentation for the .conjugacy_class() function, + conjugacy is an equivalence relation on a group G which partitions the + set of elements. This method returns a list of all these conjugacy + classes of G. + + Examples + ======== + + >>> from sympy.combinatorics import SymmetricGroup + >>> SymmetricGroup(3).conjugacy_classes() + [{(2)}, {(0 1 2), (0 2 1)}, {(0 2), (1 2), (2)(0 1)}] + + """ + identity = _af_new(list(range(self.degree))) + known_elements = {identity} + classes = [known_elements.copy()] + + for x in self.generate(): + if x not in known_elements: + new_class = self.conjugacy_class(x) + classes.append(new_class) + known_elements.update(new_class) + + return classes + + def normal_closure(self, other, k=10): + r"""Return the normal closure of a subgroup/set of permutations. + + Explanation + =========== + + If ``S`` is a subset of a group ``G``, the normal closure of ``A`` in ``G`` + is defined as the intersection of all normal subgroups of ``G`` that + contain ``A`` ([1], p.14). Alternatively, it is the group generated by + the conjugates ``x^{-1}yx`` for ``x`` a generator of ``G`` and ``y`` a + generator of the subgroup ``\left\langle S\right\rangle`` generated by + ``S`` (for some chosen generating set for ``\left\langle S\right\rangle``) + ([1], p.73). + + Parameters + ========== + + other + a subgroup/list of permutations/single permutation + k + an implementation-specific parameter that determines the number + of conjugates that are adjoined to ``other`` at once + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import (SymmetricGroup, + ... CyclicGroup, AlternatingGroup) + >>> S = SymmetricGroup(5) + >>> C = CyclicGroup(5) + >>> G = S.normal_closure(C) + >>> G.order() + 60 + >>> G.is_subgroup(AlternatingGroup(5)) + True + + See Also + ======== + + commutator, derived_subgroup, random_pr + + Notes + ===== + + The algorithm is described in [1], pp. 73-74; it makes use of the + generation of random elements for permutation groups by the product + replacement algorithm. + + """ + if hasattr(other, 'generators'): + degree = self.degree + identity = _af_new(list(range(degree))) + + if all(g == identity for g in other.generators): + return other + Z = PermutationGroup(other.generators[:]) + base, strong_gens = Z.schreier_sims_incremental() + strong_gens_distr = _distribute_gens_by_base(base, strong_gens) + basic_orbits, basic_transversals = \ + _orbits_transversals_from_bsgs(base, strong_gens_distr) + + self._random_pr_init(r=10, n=20) + + _loop = True + while _loop: + Z._random_pr_init(r=10, n=10) + for _ in range(k): + g = self.random_pr() + h = Z.random_pr() + conj = h^g + res = _strip(conj, base, basic_orbits, basic_transversals) + if res[0] != identity or res[1] != len(base) + 1: + gens = Z.generators + gens.append(conj) + Z = PermutationGroup(gens) + strong_gens.append(conj) + temp_base, temp_strong_gens = \ + Z.schreier_sims_incremental(base, strong_gens) + base, strong_gens = temp_base, temp_strong_gens + strong_gens_distr = \ + _distribute_gens_by_base(base, strong_gens) + basic_orbits, basic_transversals = \ + _orbits_transversals_from_bsgs(base, + strong_gens_distr) + _loop = False + for g in self.generators: + for h in Z.generators: + conj = h^g + res = _strip(conj, base, basic_orbits, + basic_transversals) + if res[0] != identity or res[1] != len(base) + 1: + _loop = True + break + if _loop: + break + return Z + elif hasattr(other, '__getitem__'): + return self.normal_closure(PermutationGroup(other)) + elif hasattr(other, 'array_form'): + return self.normal_closure(PermutationGroup([other])) + + def orbit(self, alpha, action='tuples'): + r"""Compute the orbit of alpha `\{g(\alpha) | g \in G\}` as a set. + + Explanation + =========== + + The time complexity of the algorithm used here is `O(|Orb|*r)` where + `|Orb|` is the size of the orbit and ``r`` is the number of generators of + the group. For a more detailed analysis, see [1], p.78, [2], pp. 19-21. + Here alpha can be a single point, or a list of points. + + If alpha is a single point, the ordinary orbit is computed. + if alpha is a list of points, there are three available options: + + 'union' - computes the union of the orbits of the points in the list + 'tuples' - computes the orbit of the list interpreted as an ordered + tuple under the group action ( i.e., g((1,2,3)) = (g(1), g(2), g(3)) ) + 'sets' - computes the orbit of the list interpreted as a sets + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation([1, 2, 0, 4, 5, 6, 3]) + >>> G = PermutationGroup([a]) + >>> G.orbit(0) + {0, 1, 2} + >>> G.orbit([0, 4], 'union') + {0, 1, 2, 3, 4, 5, 6} + + See Also + ======== + + orbit_transversal + + """ + return _orbit(self.degree, self.generators, alpha, action) + + def orbit_rep(self, alpha, beta, schreier_vector=None): + """Return a group element which sends ``alpha`` to ``beta``. + + Explanation + =========== + + If ``beta`` is not in the orbit of ``alpha``, the function returns + ``False``. This implementation makes use of the schreier vector. + For a proof of correctness, see [1], p.80 + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import AlternatingGroup + >>> G = AlternatingGroup(5) + >>> G.orbit_rep(0, 4) + (0 4 1 2 3) + + See Also + ======== + + schreier_vector + + """ + if schreier_vector is None: + schreier_vector = self.schreier_vector(alpha) + if schreier_vector[beta] is None: + return False + k = schreier_vector[beta] + gens = [x._array_form for x in self.generators] + a = [] + while k != -1: + a.append(gens[k]) + beta = gens[k].index(beta) # beta = (~gens[k])(beta) + k = schreier_vector[beta] + if a: + return _af_new(_af_rmuln(*a)) + else: + return _af_new(list(range(self._degree))) + + def orbit_transversal(self, alpha, pairs=False): + r"""Computes a transversal for the orbit of ``alpha`` as a set. + + Explanation + =========== + + For a permutation group `G`, a transversal for the orbit + `Orb = \{g(\alpha) | g \in G\}` is a set + `\{g_\beta | g_\beta(\alpha) = \beta\}` for `\beta \in Orb`. + Note that there may be more than one possible transversal. + If ``pairs`` is set to ``True``, it returns the list of pairs + `(\beta, g_\beta)`. For a proof of correctness, see [1], p.79 + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> G = DihedralGroup(6) + >>> G.orbit_transversal(0) + [(5), (0 1 2 3 4 5), (0 5)(1 4)(2 3), (0 2 4)(1 3 5), (5)(0 4)(1 3), (0 3)(1 4)(2 5)] + + See Also + ======== + + orbit + + """ + return _orbit_transversal(self._degree, self.generators, alpha, pairs) + + def orbits(self, rep=False): + """Return the orbits of ``self``, ordered according to lowest element + in each orbit. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation(1, 5)(2, 3)(4, 0, 6) + >>> b = Permutation(1, 5)(3, 4)(2, 6, 0) + >>> G = PermutationGroup([a, b]) + >>> G.orbits() + [{0, 2, 3, 4, 6}, {1, 5}] + """ + return _orbits(self._degree, self._generators) + + def order(self): + """Return the order of the group: the number of permutations that + can be generated from elements of the group. + + The number of permutations comprising the group is given by + ``len(group)``; the length of each permutation in the group is + given by ``group.size``. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + + >>> a = Permutation([1, 0, 2]) + >>> G = PermutationGroup([a]) + >>> G.degree + 3 + >>> len(G) + 1 + >>> G.order() + 2 + >>> list(G.generate()) + [(2), (2)(0 1)] + + >>> a = Permutation([0, 2, 1]) + >>> b = Permutation([1, 0, 2]) + >>> G = PermutationGroup([a, b]) + >>> G.order() + 6 + + See Also + ======== + + degree + + """ + if self._order is not None: + return self._order + if self._is_sym: + n = self._degree + self._order = factorial(n) + return self._order + if self._is_alt: + n = self._degree + self._order = factorial(n)/2 + return self._order + + m = prod([len(x) for x in self.basic_transversals]) + self._order = m + return m + + def index(self, H): + """ + Returns the index of a permutation group. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation(1,2,3) + >>> b =Permutation(3) + >>> G = PermutationGroup([a]) + >>> H = PermutationGroup([b]) + >>> G.index(H) + 3 + + """ + if H.is_subgroup(self): + return self.order()//H.order() + + @property + def is_symmetric(self): + """Return ``True`` if the group is symmetric. + + Examples + ======== + + >>> from sympy.combinatorics import SymmetricGroup + >>> g = SymmetricGroup(5) + >>> g.is_symmetric + True + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> g = PermutationGroup( + ... Permutation(0, 1, 2, 3, 4), + ... Permutation(2, 3)) + >>> g.is_symmetric + True + + Notes + ===== + + This uses a naive test involving the computation of the full + group order. + If you need more quicker taxonomy for large groups, you can use + :meth:`PermutationGroup.is_alt_sym`. + However, :meth:`PermutationGroup.is_alt_sym` may not be accurate + and is not able to distinguish between an alternating group and + a symmetric group. + + See Also + ======== + + is_alt_sym + """ + _is_sym = self._is_sym + if _is_sym is not None: + return _is_sym + + n = self.degree + if n >= 8: + if self.is_transitive(): + _is_alt_sym = self._eval_is_alt_sym_monte_carlo() + if _is_alt_sym: + if any(g.is_odd for g in self.generators): + self._is_sym, self._is_alt = True, False + return True + + self._is_sym, self._is_alt = False, True + return False + + return self._eval_is_alt_sym_naive(only_sym=True) + + self._is_sym, self._is_alt = False, False + return False + + return self._eval_is_alt_sym_naive(only_sym=True) + + + @property + def is_alternating(self): + """Return ``True`` if the group is alternating. + + Examples + ======== + + >>> from sympy.combinatorics import AlternatingGroup + >>> g = AlternatingGroup(5) + >>> g.is_alternating + True + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> g = PermutationGroup( + ... Permutation(0, 1, 2, 3, 4), + ... Permutation(2, 3, 4)) + >>> g.is_alternating + True + + Notes + ===== + + This uses a naive test involving the computation of the full + group order. + If you need more quicker taxonomy for large groups, you can use + :meth:`PermutationGroup.is_alt_sym`. + However, :meth:`PermutationGroup.is_alt_sym` may not be accurate + and is not able to distinguish between an alternating group and + a symmetric group. + + See Also + ======== + + is_alt_sym + """ + _is_alt = self._is_alt + if _is_alt is not None: + return _is_alt + + n = self.degree + if n >= 8: + if self.is_transitive(): + _is_alt_sym = self._eval_is_alt_sym_monte_carlo() + if _is_alt_sym: + if all(g.is_even for g in self.generators): + self._is_sym, self._is_alt = False, True + return True + + self._is_sym, self._is_alt = True, False + return False + + return self._eval_is_alt_sym_naive(only_alt=True) + + self._is_sym, self._is_alt = False, False + return False + + return self._eval_is_alt_sym_naive(only_alt=True) + + @classmethod + def _distinct_primes_lemma(cls, primes): + """Subroutine to test if there is only one cyclic group for the + order.""" + primes = sorted(primes) + l = len(primes) + for i in range(l): + for j in range(i+1, l): + if primes[j] % primes[i] == 1: + return None + return True + + @property + def is_cyclic(self): + r""" + Return ``True`` if the group is Cyclic. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import AbelianGroup + >>> G = AbelianGroup(3, 4) + >>> G.is_cyclic + True + >>> G = AbelianGroup(4, 4) + >>> G.is_cyclic + False + + Notes + ===== + + If the order of a group $n$ can be factored into the distinct + primes $p_1, p_2, \dots , p_s$ and if + + .. math:: + \forall i, j \in \{1, 2, \dots, s \}: + p_i \not \equiv 1 \pmod {p_j} + + holds true, there is only one group of the order $n$ which + is a cyclic group [1]_. This is a generalization of the lemma + that the group of order $15, 35, \dots$ are cyclic. + + And also, these additional lemmas can be used to test if a + group is cyclic if the order of the group is already found. + + - If the group is abelian and the order of the group is + square-free, the group is cyclic. + - If the order of the group is less than $6$ and is not $4$, the + group is cyclic. + - If the order of the group is prime, the group is cyclic. + + References + ========== + + .. [1] 1978: John S. Rose: A Course on Group Theory, + Introduction to Finite Group Theory: 1.4 + """ + if self._is_cyclic is not None: + return self._is_cyclic + + if len(self.generators) == 1: + self._is_cyclic = True + self._is_abelian = True + return True + + if self._is_abelian is False: + self._is_cyclic = False + return False + + order = self.order() + + if order < 6: + self._is_abelian = True + if order != 4: + self._is_cyclic = True + return True + + factors = factorint(order) + if all(v == 1 for v in factors.values()): + if self._is_abelian: + self._is_cyclic = True + return True + + primes = list(factors.keys()) + if PermutationGroup._distinct_primes_lemma(primes) is True: + self._is_cyclic = True + self._is_abelian = True + return True + + if not self.is_abelian: + self._is_cyclic = False + return False + + self._is_cyclic = all( + any(g**(order//p) != self.identity for g in self.generators) + for p, e in factors.items() if e > 1 + ) + return self._is_cyclic + + @property + def is_dihedral(self): + r""" + Return ``True`` if the group is dihedral. + + Examples + ======== + + >>> from sympy.combinatorics.perm_groups import PermutationGroup + >>> from sympy.combinatorics.permutations import Permutation + >>> from sympy.combinatorics.named_groups import SymmetricGroup, CyclicGroup + >>> G = PermutationGroup(Permutation(1, 6)(2, 5)(3, 4), Permutation(0, 1, 2, 3, 4, 5, 6)) + >>> G.is_dihedral + True + >>> G = SymmetricGroup(3) + >>> G.is_dihedral + True + >>> G = CyclicGroup(6) + >>> G.is_dihedral + False + + References + ========== + + .. [Di1] https://math.stackexchange.com/questions/827230/given-a-cayley-table-is-there-an-algorithm-to-determine-if-it-is-a-dihedral-gro/827273#827273 + .. [Di2] https://kconrad.math.uconn.edu/blurbs/grouptheory/dihedral.pdf + .. [Di3] https://kconrad.math.uconn.edu/blurbs/grouptheory/dihedral2.pdf + .. [Di4] https://en.wikipedia.org/wiki/Dihedral_group + """ + if self._is_dihedral is not None: + return self._is_dihedral + + order = self.order() + + if order % 2 == 1: + self._is_dihedral = False + return False + if order == 2: + self._is_dihedral = True + return True + if order == 4: + # The dihedral group of order 4 is the Klein 4-group. + self._is_dihedral = not self.is_cyclic + return self._is_dihedral + if self.is_abelian: + # The only abelian dihedral groups are the ones of orders 2 and 4. + self._is_dihedral = False + return False + + # Now we know the group is of even order >= 6, and nonabelian. + n = order // 2 + + # Handle special cases where there are exactly two generators. + gens = self.generators + if len(gens) == 2: + x, y = gens + a, b = x.order(), y.order() + # Make a >= b + if a < b: + x, y, a, b = y, x, b, a + # Using Theorem 2.1 of [Di3]: + if a == 2 == b: + self._is_dihedral = True + return True + # Using Theorem 1.1 of [Di3]: + if a == n and b == 2 and y*x*y == ~x: + self._is_dihedral = True + return True + + # Proceed with algorithm of [Di1] + # Find elements of orders 2 and n + order_2, order_n = [], [] + for p in self.elements: + k = p.order() + if k == 2: + order_2.append(p) + elif k == n: + order_n.append(p) + + if len(order_2) != n + 1 - (n % 2): + self._is_dihedral = False + return False + + if not order_n: + self._is_dihedral = False + return False + + x = order_n[0] + # Want an element y of order 2 that is not a power of x + # (i.e. that is not the 180-deg rotation, when n is even). + y = order_2[0] + if n % 2 == 0 and y == x**(n//2): + y = order_2[1] + + self._is_dihedral = (y*x*y == ~x) + return self._is_dihedral + + def pointwise_stabilizer(self, points, incremental=True): + r"""Return the pointwise stabilizer for a set of points. + + Explanation + =========== + + For a permutation group `G` and a set of points + `\{p_1, p_2,\ldots, p_k\}`, the pointwise stabilizer of + `p_1, p_2, \ldots, p_k` is defined as + `G_{p_1,\ldots, p_k} = + \{g\in G | g(p_i) = p_i \forall i\in\{1, 2,\ldots,k\}\}` ([1],p20). + It is a subgroup of `G`. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> S = SymmetricGroup(7) + >>> Stab = S.pointwise_stabilizer([2, 3, 5]) + >>> Stab.is_subgroup(S.stabilizer(2).stabilizer(3).stabilizer(5)) + True + + See Also + ======== + + stabilizer, schreier_sims_incremental + + Notes + ===== + + When incremental == True, + rather than the obvious implementation using successive calls to + ``.stabilizer()``, this uses the incremental Schreier-Sims algorithm + to obtain a base with starting segment - the given points. + + """ + if incremental: + base, strong_gens = self.schreier_sims_incremental(base=points) + stab_gens = [] + degree = self.degree + for gen in strong_gens: + if [gen(point) for point in points] == points: + stab_gens.append(gen) + if not stab_gens: + stab_gens = _af_new(list(range(degree))) + return PermutationGroup(stab_gens) + else: + gens = self._generators + degree = self.degree + for x in points: + gens = _stabilizer(degree, gens, x) + return PermutationGroup(gens) + + def make_perm(self, n, seed=None): + """ + Multiply ``n`` randomly selected permutations from + pgroup together, starting with the identity + permutation. If ``n`` is a list of integers, those + integers will be used to select the permutations and they + will be applied in L to R order: make_perm((A, B, C)) will + give CBA(I) where I is the identity permutation. + + ``seed`` is used to set the seed for the random selection + of permutations from pgroup. If this is a list of integers, + the corresponding permutations from pgroup will be selected + in the order give. This is mainly used for testing purposes. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a, b = [Permutation([1, 0, 3, 2]), Permutation([1, 3, 0, 2])] + >>> G = PermutationGroup([a, b]) + >>> G.make_perm(1, [0]) + (0 1)(2 3) + >>> G.make_perm(3, [0, 1, 0]) + (0 2 3 1) + >>> G.make_perm([0, 1, 0]) + (0 2 3 1) + + See Also + ======== + + random + """ + if is_sequence(n): + if seed is not None: + raise ValueError('If n is a sequence, seed should be None') + n, seed = len(n), n + else: + try: + n = int(n) + except TypeError: + raise ValueError('n must be an integer or a sequence.') + randomrange = _randrange(seed) + + # start with the identity permutation + result = Permutation(list(range(self.degree))) + m = len(self) + for _ in range(n): + p = self[randomrange(m)] + result = rmul(result, p) + return result + + def random(self, af=False): + """Return a random group element + """ + rank = randrange(self.order()) + return self.coset_unrank(rank, af) + + def random_pr(self, gen_count=11, iterations=50, _random_prec=None): + """Return a random group element using product replacement. + + Explanation + =========== + + For the details of the product replacement algorithm, see + ``_random_pr_init`` In ``random_pr`` the actual 'product replacement' + is performed. Notice that if the attribute ``_random_gens`` + is empty, it needs to be initialized by ``_random_pr_init``. + + See Also + ======== + + _random_pr_init + + """ + if self._random_gens == []: + self._random_pr_init(gen_count, iterations) + random_gens = self._random_gens + r = len(random_gens) - 1 + + # handle randomized input for testing purposes + if _random_prec is None: + s = randrange(r) + t = randrange(r - 1) + if t == s: + t = r - 1 + x = choice([1, 2]) + e = choice([-1, 1]) + else: + s = _random_prec['s'] + t = _random_prec['t'] + if t == s: + t = r - 1 + x = _random_prec['x'] + e = _random_prec['e'] + + if x == 1: + random_gens[s] = _af_rmul(random_gens[s], _af_pow(random_gens[t], e)) + random_gens[r] = _af_rmul(random_gens[r], random_gens[s]) + else: + random_gens[s] = _af_rmul(_af_pow(random_gens[t], e), random_gens[s]) + random_gens[r] = _af_rmul(random_gens[s], random_gens[r]) + return _af_new(random_gens[r]) + + def random_stab(self, alpha, schreier_vector=None, _random_prec=None): + """Random element from the stabilizer of ``alpha``. + + The schreier vector for ``alpha`` is an optional argument used + for speeding up repeated calls. The algorithm is described in [1], p.81 + + See Also + ======== + + random_pr, orbit_rep + + """ + if schreier_vector is None: + schreier_vector = self.schreier_vector(alpha) + if _random_prec is None: + rand = self.random_pr() + else: + rand = _random_prec['rand'] + beta = rand(alpha) + h = self.orbit_rep(alpha, beta, schreier_vector) + return rmul(~h, rand) + + def schreier_sims(self): + """Schreier-Sims algorithm. + + Explanation + =========== + + It computes the generators of the chain of stabilizers + `G > G_{b_1} > .. > G_{b1,..,b_r} > 1` + in which `G_{b_1,..,b_i}` stabilizes `b_1,..,b_i`, + and the corresponding ``s`` cosets. + An element of the group can be written as the product + `h_1*..*h_s`. + + We use the incremental Schreier-Sims algorithm. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation([0, 2, 1]) + >>> b = Permutation([1, 0, 2]) + >>> G = PermutationGroup([a, b]) + >>> G.schreier_sims() + >>> G.basic_transversals + [{0: (2)(0 1), 1: (2), 2: (1 2)}, + {0: (2), 2: (0 2)}] + """ + if self._transversals: + return + self._schreier_sims() + return + + def _schreier_sims(self, base=None): + schreier = self.schreier_sims_incremental(base=base, slp_dict=True) + base, strong_gens = schreier[:2] + self._base = base + self._strong_gens = strong_gens + self._strong_gens_slp = schreier[2] + if not base: + self._transversals = [] + self._basic_orbits = [] + return + + strong_gens_distr = _distribute_gens_by_base(base, strong_gens) + basic_orbits, transversals, slps = _orbits_transversals_from_bsgs(base,\ + strong_gens_distr, slp=True) + + # rewrite the indices stored in slps in terms of strong_gens + for i, slp in enumerate(slps): + gens = strong_gens_distr[i] + for k in slp: + slp[k] = [strong_gens.index(gens[s]) for s in slp[k]] + + self._transversals = transversals + self._basic_orbits = [sorted(x) for x in basic_orbits] + self._transversal_slp = slps + + def schreier_sims_incremental(self, base=None, gens=None, slp_dict=False): + """Extend a sequence of points and generating set to a base and strong + generating set. + + Parameters + ========== + + base + The sequence of points to be extended to a base. Optional + parameter with default value ``[]``. + gens + The generating set to be extended to a strong generating set + relative to the base obtained. Optional parameter with default + value ``self.generators``. + + slp_dict + If `True`, return a dictionary `{g: gens}` for each strong + generator `g` where `gens` is a list of strong generators + coming before `g` in `strong_gens`, such that the product + of the elements of `gens` is equal to `g`. + + Returns + ======= + + (base, strong_gens) + ``base`` is the base obtained, and ``strong_gens`` is the strong + generating set relative to it. The original parameters ``base``, + ``gens`` remain unchanged. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import AlternatingGroup + >>> from sympy.combinatorics.testutil import _verify_bsgs + >>> A = AlternatingGroup(7) + >>> base = [2, 3] + >>> seq = [2, 3] + >>> base, strong_gens = A.schreier_sims_incremental(base=seq) + >>> _verify_bsgs(A, base, strong_gens) + True + >>> base[:2] + [2, 3] + + Notes + ===== + + This version of the Schreier-Sims algorithm runs in polynomial time. + There are certain assumptions in the implementation - if the trivial + group is provided, ``base`` and ``gens`` are returned immediately, + as any sequence of points is a base for the trivial group. If the + identity is present in the generators ``gens``, it is removed as + it is a redundant generator. + The implementation is described in [1], pp. 90-93. + + See Also + ======== + + schreier_sims, schreier_sims_random + + """ + if base is None: + base = [] + if gens is None: + gens = self.generators[:] + degree = self.degree + id_af = list(range(degree)) + # handle the trivial group + if len(gens) == 1 and gens[0].is_Identity: + if slp_dict: + return base, gens, {gens[0]: [gens[0]]} + return base, gens + # prevent side effects + _base, _gens = base[:], gens[:] + # remove the identity as a generator + _gens = [x for x in _gens if not x.is_Identity] + # make sure no generator fixes all base points + for gen in _gens: + if all(x == gen._array_form[x] for x in _base): + for new in id_af: + if gen._array_form[new] != new: + break + else: + assert None # can this ever happen? + _base.append(new) + # distribute generators according to basic stabilizers + strong_gens_distr = _distribute_gens_by_base(_base, _gens) + strong_gens_slp = [] + # initialize the basic stabilizers, basic orbits and basic transversals + orbs = {} + transversals = {} + slps = {} + base_len = len(_base) + for i in range(base_len): + transversals[i], slps[i] = _orbit_transversal(degree, strong_gens_distr[i], + _base[i], pairs=True, af=True, slp=True) + transversals[i] = dict(transversals[i]) + orbs[i] = list(transversals[i].keys()) + # main loop: amend the stabilizer chain until we have generators + # for all stabilizers + i = base_len - 1 + while i >= 0: + # this flag is used to continue with the main loop from inside + # a nested loop + continue_i = False + # test the generators for being a strong generating set + db = {} + for beta, u_beta in list(transversals[i].items()): + for j, gen in enumerate(strong_gens_distr[i]): + gb = gen._array_form[beta] + u1 = transversals[i][gb] + g1 = _af_rmul(gen._array_form, u_beta) + slp = [(i, g) for g in slps[i][beta]] + slp = [(i, j)] + slp + if g1 != u1: + # test if the schreier generator is in the i+1-th + # would-be basic stabilizer + y = True + try: + u1_inv = db[gb] + except KeyError: + u1_inv = db[gb] = _af_invert(u1) + schreier_gen = _af_rmul(u1_inv, g1) + u1_inv_slp = slps[i][gb][:] + u1_inv_slp.reverse() + u1_inv_slp = [(i, (g,)) for g in u1_inv_slp] + slp = u1_inv_slp + slp + h, j, slp = _strip_af(schreier_gen, _base, orbs, transversals, i, slp=slp, slps=slps) + if j <= base_len: + # new strong generator h at level j + y = False + elif h: + # h fixes all base points + y = False + moved = 0 + while h[moved] == moved: + moved += 1 + _base.append(moved) + base_len += 1 + strong_gens_distr.append([]) + if y is False: + # if a new strong generator is found, update the + # data structures and start over + h = _af_new(h) + strong_gens_slp.append((h, slp)) + for l in range(i + 1, j): + strong_gens_distr[l].append(h) + transversals[l], slps[l] =\ + _orbit_transversal(degree, strong_gens_distr[l], + _base[l], pairs=True, af=True, slp=True) + transversals[l] = dict(transversals[l]) + orbs[l] = list(transversals[l].keys()) + i = j - 1 + # continue main loop using the flag + continue_i = True + if continue_i is True: + break + if continue_i is True: + break + if continue_i is True: + continue + i -= 1 + + strong_gens = _gens[:] + + if slp_dict: + # create the list of the strong generators strong_gens and + # rewrite the indices of strong_gens_slp in terms of the + # elements of strong_gens + for k, slp in strong_gens_slp: + strong_gens.append(k) + for i in range(len(slp)): + s = slp[i] + if isinstance(s[1], tuple): + slp[i] = strong_gens_distr[s[0]][s[1][0]]**-1 + else: + slp[i] = strong_gens_distr[s[0]][s[1]] + strong_gens_slp = dict(strong_gens_slp) + # add the original generators + for g in _gens: + strong_gens_slp[g] = [g] + return (_base, strong_gens, strong_gens_slp) + + strong_gens.extend([k for k, _ in strong_gens_slp]) + return _base, strong_gens + + def schreier_sims_random(self, base=None, gens=None, consec_succ=10, + _random_prec=None): + r"""Randomized Schreier-Sims algorithm. + + Explanation + =========== + + The randomized Schreier-Sims algorithm takes the sequence ``base`` + and the generating set ``gens``, and extends ``base`` to a base, and + ``gens`` to a strong generating set relative to that base with + probability of a wrong answer at most `2^{-consec\_succ}`, + provided the random generators are sufficiently random. + + Parameters + ========== + + base + The sequence to be extended to a base. + gens + The generating set to be extended to a strong generating set. + consec_succ + The parameter defining the probability of a wrong answer. + _random_prec + An internal parameter used for testing purposes. + + Returns + ======= + + (base, strong_gens) + ``base`` is the base and ``strong_gens`` is the strong generating + set relative to it. + + Examples + ======== + + >>> from sympy.combinatorics.testutil import _verify_bsgs + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> S = SymmetricGroup(5) + >>> base, strong_gens = S.schreier_sims_random(consec_succ=5) + >>> _verify_bsgs(S, base, strong_gens) #doctest: +SKIP + True + + Notes + ===== + + The algorithm is described in detail in [1], pp. 97-98. It extends + the orbits ``orbs`` and the permutation groups ``stabs`` to + basic orbits and basic stabilizers for the base and strong generating + set produced in the end. + The idea of the extension process + is to "sift" random group elements through the stabilizer chain + and amend the stabilizers/orbits along the way when a sift + is not successful. + The helper function ``_strip`` is used to attempt + to decompose a random group element according to the current + state of the stabilizer chain and report whether the element was + fully decomposed (successful sift) or not (unsuccessful sift). In + the latter case, the level at which the sift failed is reported and + used to amend ``stabs``, ``base``, ``gens`` and ``orbs`` accordingly. + The halting condition is for ``consec_succ`` consecutive successful + sifts to pass. This makes sure that the current ``base`` and ``gens`` + form a BSGS with probability at least `1 - 1/\text{consec\_succ}`. + + See Also + ======== + + schreier_sims + + """ + if base is None: + base = [] + if gens is None: + gens = self.generators + base_len = len(base) + n = self.degree + # make sure no generator fixes all base points + for gen in gens: + if all(gen(x) == x for x in base): + new = 0 + while gen._array_form[new] == new: + new += 1 + base.append(new) + base_len += 1 + # distribute generators according to basic stabilizers + strong_gens_distr = _distribute_gens_by_base(base, gens) + # initialize the basic stabilizers, basic transversals and basic orbits + transversals = {} + orbs = {} + for i in range(base_len): + transversals[i] = dict(_orbit_transversal(n, strong_gens_distr[i], + base[i], pairs=True)) + orbs[i] = list(transversals[i].keys()) + # initialize the number of consecutive elements sifted + c = 0 + # start sifting random elements while the number of consecutive sifts + # is less than consec_succ + while c < consec_succ: + if _random_prec is None: + g = self.random_pr() + else: + g = _random_prec['g'].pop() + h, j = _strip(g, base, orbs, transversals) + y = True + # determine whether a new base point is needed + if j <= base_len: + y = False + elif not h.is_Identity: + y = False + moved = 0 + while h(moved) == moved: + moved += 1 + base.append(moved) + base_len += 1 + strong_gens_distr.append([]) + # if the element doesn't sift, amend the strong generators and + # associated stabilizers and orbits + if y is False: + for l in range(1, j): + strong_gens_distr[l].append(h) + transversals[l] = dict(_orbit_transversal(n, + strong_gens_distr[l], base[l], pairs=True)) + orbs[l] = list(transversals[l].keys()) + c = 0 + else: + c += 1 + # build the strong generating set + strong_gens = strong_gens_distr[0][:] + for gen in strong_gens_distr[1]: + if gen not in strong_gens: + strong_gens.append(gen) + return base, strong_gens + + def schreier_vector(self, alpha): + """Computes the schreier vector for ``alpha``. + + Explanation + =========== + + The Schreier vector efficiently stores information + about the orbit of ``alpha``. It can later be used to quickly obtain + elements of the group that send ``alpha`` to a particular element + in the orbit. Notice that the Schreier vector depends on the order + in which the group generators are listed. For a definition, see [3]. + Since list indices start from zero, we adopt the convention to use + "None" instead of 0 to signify that an element does not belong + to the orbit. + For the algorithm and its correctness, see [2], pp.78-80. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation([2, 4, 6, 3, 1, 5, 0]) + >>> b = Permutation([0, 1, 3, 5, 4, 6, 2]) + >>> G = PermutationGroup([a, b]) + >>> G.schreier_vector(0) + [-1, None, 0, 1, None, 1, 0] + + See Also + ======== + + orbit + + """ + n = self.degree + v = [None]*n + v[alpha] = -1 + orb = [alpha] + used = [False]*n + used[alpha] = True + gens = self.generators + r = len(gens) + for b in orb: + for i in range(r): + temp = gens[i]._array_form[b] + if used[temp] is False: + orb.append(temp) + used[temp] = True + v[temp] = i + return v + + def stabilizer(self, alpha): + r"""Return the stabilizer subgroup of ``alpha``. + + Explanation + =========== + + The stabilizer of `\alpha` is the group `G_\alpha = + \{g \in G | g(\alpha) = \alpha\}`. + For a proof of correctness, see [1], p.79. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> G = DihedralGroup(6) + >>> G.stabilizer(5) + PermutationGroup([ + (5)(0 4)(1 3)]) + + See Also + ======== + + orbit + + """ + return PermGroup(_stabilizer(self._degree, self._generators, alpha)) + + @property + def strong_gens(self): + r"""Return a strong generating set from the Schreier-Sims algorithm. + + Explanation + =========== + + A generating set `S = \{g_1, g_2, \dots, g_t\}` for a permutation group + `G` is a strong generating set relative to the sequence of points + (referred to as a "base") `(b_1, b_2, \dots, b_k)` if, for + `1 \leq i \leq k` we have that the intersection of the pointwise + stabilizer `G^{(i+1)} := G_{b_1, b_2, \dots, b_i}` with `S` generates + the pointwise stabilizer `G^{(i+1)}`. The concepts of a base and + strong generating set and their applications are discussed in depth + in [1], pp. 87-89 and [2], pp. 55-57. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> D = DihedralGroup(4) + >>> D.strong_gens + [(0 1 2 3), (0 3)(1 2), (1 3)] + >>> D.base + [0, 1] + + See Also + ======== + + base, basic_transversals, basic_orbits, basic_stabilizers + + """ + if self._strong_gens == []: + self.schreier_sims() + return self._strong_gens + + def subgroup(self, gens): + """ + Return the subgroup generated by `gens` which is a list of + elements of the group + """ + + if not all(g in self for g in gens): + raise ValueError("The group does not contain the supplied generators") + + G = PermutationGroup(gens) + return G + + def subgroup_search(self, prop, base=None, strong_gens=None, tests=None, + init_subgroup=None): + """Find the subgroup of all elements satisfying the property ``prop``. + + Explanation + =========== + + This is done by a depth-first search with respect to base images that + uses several tests to prune the search tree. + + Parameters + ========== + + prop + The property to be used. Has to be callable on group elements + and always return ``True`` or ``False``. It is assumed that + all group elements satisfying ``prop`` indeed form a subgroup. + base + A base for the supergroup. + strong_gens + A strong generating set for the supergroup. + tests + A list of callables of length equal to the length of ``base``. + These are used to rule out group elements by partial base images, + so that ``tests[l](g)`` returns False if the element ``g`` is known + not to satisfy prop base on where g sends the first ``l + 1`` base + points. + init_subgroup + if a subgroup of the sought group is + known in advance, it can be passed to the function as this + parameter. + + Returns + ======= + + res + The subgroup of all elements satisfying ``prop``. The generating + set for this group is guaranteed to be a strong generating set + relative to the base ``base``. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import (SymmetricGroup, + ... AlternatingGroup) + >>> from sympy.combinatorics.testutil import _verify_bsgs + >>> S = SymmetricGroup(7) + >>> prop_even = lambda x: x.is_even + >>> base, strong_gens = S.schreier_sims_incremental() + >>> G = S.subgroup_search(prop_even, base=base, strong_gens=strong_gens) + >>> G.is_subgroup(AlternatingGroup(7)) + True + >>> _verify_bsgs(G, base, G.generators) + True + + Notes + ===== + + This function is extremely lengthy and complicated and will require + some careful attention. The implementation is described in + [1], pp. 114-117, and the comments for the code here follow the lines + of the pseudocode in the book for clarity. + + The complexity is exponential in general, since the search process by + itself visits all members of the supergroup. However, there are a lot + of tests which are used to prune the search tree, and users can define + their own tests via the ``tests`` parameter, so in practice, and for + some computations, it's not terrible. + + A crucial part in the procedure is the frequent base change performed + (this is line 11 in the pseudocode) in order to obtain a new basic + stabilizer. The book mentiones that this can be done by using + ``.baseswap(...)``, however the current implementation uses a more + straightforward way to find the next basic stabilizer - calling the + function ``.stabilizer(...)`` on the previous basic stabilizer. + + """ + # initialize BSGS and basic group properties + def get_reps(orbits): + # get the minimal element in the base ordering + return [min(orbit, key = lambda x: base_ordering[x]) \ + for orbit in orbits] + + def update_nu(l): + temp_index = len(basic_orbits[l]) + 1 -\ + len(res_basic_orbits_init_base[l]) + # this corresponds to the element larger than all points + if temp_index >= len(sorted_orbits[l]): + nu[l] = base_ordering[degree] + else: + nu[l] = sorted_orbits[l][temp_index] + + if base is None: + base, strong_gens = self.schreier_sims_incremental() + base_len = len(base) + degree = self.degree + identity = _af_new(list(range(degree))) + base_ordering = _base_ordering(base, degree) + # add an element larger than all points + base_ordering.append(degree) + # add an element smaller than all points + base_ordering.append(-1) + # compute BSGS-related structures + strong_gens_distr = _distribute_gens_by_base(base, strong_gens) + basic_orbits, transversals = _orbits_transversals_from_bsgs(base, + strong_gens_distr) + # handle subgroup initialization and tests + if init_subgroup is None: + init_subgroup = PermutationGroup([identity]) + if tests is None: + trivial_test = lambda x: True + tests = [] + for i in range(base_len): + tests.append(trivial_test) + # line 1: more initializations. + res = init_subgroup + f = base_len - 1 + l = base_len - 1 + # line 2: set the base for K to the base for G + res_base = base[:] + # line 3: compute BSGS and related structures for K + res_base, res_strong_gens = res.schreier_sims_incremental( + base=res_base) + res_strong_gens_distr = _distribute_gens_by_base(res_base, + res_strong_gens) + res_generators = res.generators + res_basic_orbits_init_base = \ + [_orbit(degree, res_strong_gens_distr[i], res_base[i])\ + for i in range(base_len)] + # initialize orbit representatives + orbit_reps = [None]*base_len + # line 4: orbit representatives for f-th basic stabilizer of K + orbits = _orbits(degree, res_strong_gens_distr[f]) + orbit_reps[f] = get_reps(orbits) + # line 5: remove the base point from the representatives to avoid + # getting the identity element as a generator for K + orbit_reps[f].remove(base[f]) + # line 6: more initializations + c = [0]*base_len + u = [identity]*base_len + sorted_orbits = [None]*base_len + for i in range(base_len): + sorted_orbits[i] = basic_orbits[i][:] + sorted_orbits[i].sort(key=lambda point: base_ordering[point]) + # line 7: initializations + mu = [None]*base_len + nu = [None]*base_len + # this corresponds to the element smaller than all points + mu[l] = degree + 1 + update_nu(l) + # initialize computed words + computed_words = [identity]*base_len + # line 8: main loop + while True: + # apply all the tests + while l < base_len - 1 and \ + computed_words[l](base[l]) in orbit_reps[l] and \ + base_ordering[mu[l]] < \ + base_ordering[computed_words[l](base[l])] < \ + base_ordering[nu[l]] and \ + tests[l](computed_words): + # line 11: change the (partial) base of K + new_point = computed_words[l](base[l]) + res_base[l] = new_point + new_stab_gens = _stabilizer(degree, res_strong_gens_distr[l], + new_point) + res_strong_gens_distr[l + 1] = new_stab_gens + # line 12: calculate minimal orbit representatives for the + # l+1-th basic stabilizer + orbits = _orbits(degree, new_stab_gens) + orbit_reps[l + 1] = get_reps(orbits) + # line 13: amend sorted orbits + l += 1 + temp_orbit = [computed_words[l - 1](point) for point + in basic_orbits[l]] + temp_orbit.sort(key=lambda point: base_ordering[point]) + sorted_orbits[l] = temp_orbit + # lines 14 and 15: update variables used minimality tests + new_mu = degree + 1 + for i in range(l): + if base[l] in res_basic_orbits_init_base[i]: + candidate = computed_words[i](base[i]) + if base_ordering[candidate] > base_ordering[new_mu]: + new_mu = candidate + mu[l] = new_mu + update_nu(l) + # line 16: determine the new transversal element + c[l] = 0 + temp_point = sorted_orbits[l][c[l]] + gamma = computed_words[l - 1]._array_form.index(temp_point) + u[l] = transversals[l][gamma] + # update computed words + computed_words[l] = rmul(computed_words[l - 1], u[l]) + # lines 17 & 18: apply the tests to the group element found + g = computed_words[l] + temp_point = g(base[l]) + if l == base_len - 1 and \ + base_ordering[mu[l]] < \ + base_ordering[temp_point] < base_ordering[nu[l]] and \ + temp_point in orbit_reps[l] and \ + tests[l](computed_words) and \ + prop(g): + # line 19: reset the base of K + res_generators.append(g) + res_base = base[:] + # line 20: recalculate basic orbits (and transversals) + res_strong_gens.append(g) + res_strong_gens_distr = _distribute_gens_by_base(res_base, + res_strong_gens) + res_basic_orbits_init_base = \ + [_orbit(degree, res_strong_gens_distr[i], res_base[i]) \ + for i in range(base_len)] + # line 21: recalculate orbit representatives + # line 22: reset the search depth + orbit_reps[f] = get_reps(orbits) + l = f + # line 23: go up the tree until in the first branch not fully + # searched + while l >= 0 and c[l] == len(basic_orbits[l]) - 1: + l = l - 1 + # line 24: if the entire tree is traversed, return K + if l == -1: + return PermutationGroup(res_generators) + # lines 25-27: update orbit representatives + if l < f: + # line 26 + f = l + c[l] = 0 + # line 27 + temp_orbits = _orbits(degree, res_strong_gens_distr[f]) + orbit_reps[f] = get_reps(temp_orbits) + # line 28: update variables used for minimality testing + mu[l] = degree + 1 + temp_index = len(basic_orbits[l]) + 1 - \ + len(res_basic_orbits_init_base[l]) + if temp_index >= len(sorted_orbits[l]): + nu[l] = base_ordering[degree] + else: + nu[l] = sorted_orbits[l][temp_index] + # line 29: set the next element from the current branch and update + # accordingly + c[l] += 1 + if l == 0: + gamma = sorted_orbits[l][c[l]] + else: + gamma = computed_words[l - 1]._array_form.index(sorted_orbits[l][c[l]]) + + u[l] = transversals[l][gamma] + if l == 0: + computed_words[l] = u[l] + else: + computed_words[l] = rmul(computed_words[l - 1], u[l]) + + @property + def transitivity_degree(self): + r"""Compute the degree of transitivity of the group. + + Explanation + =========== + + A permutation group `G` acting on `\Omega = \{0, 1, \dots, n-1\}` is + ``k``-fold transitive, if, for any `k` points + `(a_1, a_2, \dots, a_k) \in \Omega` and any `k` points + `(b_1, b_2, \dots, b_k) \in \Omega` there exists `g \in G` such that + `g(a_1) = b_1, g(a_2) = b_2, \dots, g(a_k) = b_k` + The degree of transitivity of `G` is the maximum ``k`` such that + `G` is ``k``-fold transitive. ([8]) + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> a = Permutation([1, 2, 0]) + >>> b = Permutation([1, 0, 2]) + >>> G = PermutationGroup([a, b]) + >>> G.transitivity_degree + 3 + + See Also + ======== + + is_transitive, orbit + + """ + if self._transitivity_degree is None: + n = self.degree + G = self + # if G is k-transitive, a tuple (a_0,..,a_k) + # can be brought to (b_0,...,b_(k-1), b_k) + # where b_0,...,b_(k-1) are fixed points; + # consider the group G_k which stabilizes b_0,...,b_(k-1) + # if G_k is transitive on the subset excluding b_0,...,b_(k-1) + # then G is (k+1)-transitive + for i in range(n): + orb = G.orbit(i) + if len(orb) != n - i: + self._transitivity_degree = i + return i + G = G.stabilizer(i) + self._transitivity_degree = n + return n + else: + return self._transitivity_degree + + def _p_elements_group(self, p): + ''' + For an abelian p-group, return the subgroup consisting of + all elements of order p (and the identity) + + ''' + gens = self.generators[:] + gens = sorted(gens, key=lambda x: x.order(), reverse=True) + gens_p = [g**(g.order()/p) for g in gens] + gens_r = [] + for i in range(len(gens)): + x = gens[i] + x_order = x.order() + # x_p has order p + x_p = x**(x_order/p) + if i > 0: + P = PermutationGroup(gens_p[:i]) + else: + P = PermutationGroup(self.identity) + if x**(x_order/p) not in P: + gens_r.append(x**(x_order/p)) + else: + # replace x by an element of order (x.order()/p) + # so that gens still generates G + g = P.generator_product(x_p, original=True) + for s in g: + x = x*s**-1 + x_order = x_order/p + # insert x to gens so that the sorting is preserved + del gens[i] + del gens_p[i] + j = i - 1 + while j < len(gens) and gens[j].order() >= x_order: + j += 1 + gens = gens[:j] + [x] + gens[j:] + gens_p = gens_p[:j] + [x] + gens_p[j:] + return PermutationGroup(gens_r) + + def _sylow_alt_sym(self, p): + ''' + Return a p-Sylow subgroup of a symmetric or an + alternating group. + + Explanation + =========== + + The algorithm for this is hinted at in [1], Chapter 4, + Exercise 4. + + For Sym(n) with n = p^i, the idea is as follows. Partition + the interval [0..n-1] into p equal parts, each of length p^(i-1): + [0..p^(i-1)-1], [p^(i-1)..2*p^(i-1)-1]...[(p-1)*p^(i-1)..p^i-1]. + Find a p-Sylow subgroup of Sym(p^(i-1)) (treated as a subgroup + of ``self``) acting on each of the parts. Call the subgroups + P_1, P_2...P_p. The generators for the subgroups P_2...P_p + can be obtained from those of P_1 by applying a "shifting" + permutation to them, that is, a permutation mapping [0..p^(i-1)-1] + to the second part (the other parts are obtained by using the shift + multiple times). The union of this permutation and the generators + of P_1 is a p-Sylow subgroup of ``self``. + + For n not equal to a power of p, partition + [0..n-1] in accordance with how n would be written in base p. + E.g. for p=2 and n=11, 11 = 2^3 + 2^2 + 1 so the partition + is [[0..7], [8..9], {10}]. To generate a p-Sylow subgroup, + take the union of the generators for each of the parts. + For the above example, {(0 1), (0 2)(1 3), (0 4), (1 5)(2 7)} + from the first part, {(8 9)} from the second part and + nothing from the third. This gives 4 generators in total, and + the subgroup they generate is p-Sylow. + + Alternating groups are treated the same except when p=2. In this + case, (0 1)(s s+1) should be added for an appropriate s (the start + of a part) for each part in the partitions. + + See Also + ======== + + sylow_subgroup, is_alt_sym + + ''' + n = self.degree + gens = [] + identity = Permutation(n-1) + # the case of 2-sylow subgroups of alternating groups + # needs special treatment + alt = p == 2 and all(g.is_even for g in self.generators) + + # find the presentation of n in base p + coeffs = [] + m = n + while m > 0: + coeffs.append(m % p) + m = m // p + + power = len(coeffs)-1 + # for a symmetric group, gens[:i] is the generating + # set for a p-Sylow subgroup on [0..p**(i-1)-1]. For + # alternating groups, the same is given by gens[:2*(i-1)] + for i in range(1, power+1): + if i == 1 and alt: + # (0 1) shouldn't be added for alternating groups + continue + gen = Permutation([(j + p**(i-1)) % p**i for j in range(p**i)]) + gens.append(identity*gen) + if alt: + gen = Permutation(0, 1)*gen*Permutation(0, 1)*gen + gens.append(gen) + + # the first point in the current part (see the algorithm + # description in the docstring) + start = 0 + + while power > 0: + a = coeffs[power] + + # make the permutation shifting the start of the first + # part ([0..p^i-1] for some i) to the current one + for _ in range(a): + shift = Permutation() + if start > 0: + for i in range(p**power): + shift = shift(i, start + i) + + if alt: + gen = Permutation(0, 1)*shift*Permutation(0, 1)*shift + gens.append(gen) + j = 2*(power - 1) + else: + j = power + + for i, gen in enumerate(gens[:j]): + if alt and i % 2 == 1: + continue + # shift the generator to the start of the + # partition part + gen = shift*gen*shift + gens.append(gen) + + start += p**power + power = power-1 + + return gens + + def sylow_subgroup(self, p): + ''' + Return a p-Sylow subgroup of the group. + + The algorithm is described in [1], Chapter 4, Section 7 + + Examples + ======== + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> from sympy.combinatorics.named_groups import SymmetricGroup + >>> from sympy.combinatorics.named_groups import AlternatingGroup + + >>> D = DihedralGroup(6) + >>> S = D.sylow_subgroup(2) + >>> S.order() + 4 + >>> G = SymmetricGroup(6) + >>> S = G.sylow_subgroup(5) + >>> S.order() + 5 + + >>> G1 = AlternatingGroup(3) + >>> G2 = AlternatingGroup(5) + >>> G3 = AlternatingGroup(9) + + >>> S1 = G1.sylow_subgroup(3) + >>> S2 = G2.sylow_subgroup(3) + >>> S3 = G3.sylow_subgroup(3) + + >>> len1 = len(S1.lower_central_series()) + >>> len2 = len(S2.lower_central_series()) + >>> len3 = len(S3.lower_central_series()) + + >>> len1 == len2 + True + >>> len1 < len3 + True + + ''' + from sympy.combinatorics.homomorphisms import ( + orbit_homomorphism, block_homomorphism) + + if not isprime(p): + raise ValueError("p must be a prime") + + def is_p_group(G): + # check if the order of G is a power of p + # and return the power + m = G.order() + n = 0 + while m % p == 0: + m = m/p + n += 1 + if m == 1: + return True, n + return False, n + + def _sylow_reduce(mu, nu): + # reduction based on two homomorphisms + # mu and nu with trivially intersecting + # kernels + Q = mu.image().sylow_subgroup(p) + Q = mu.invert_subgroup(Q) + nu = nu.restrict_to(Q) + R = nu.image().sylow_subgroup(p) + return nu.invert_subgroup(R) + + order = self.order() + if order % p != 0: + return PermutationGroup([self.identity]) + p_group, n = is_p_group(self) + if p_group: + return self + + if self.is_alt_sym(): + return PermutationGroup(self._sylow_alt_sym(p)) + + # if there is a non-trivial orbit with size not divisible + # by p, the sylow subgroup is contained in its stabilizer + # (by orbit-stabilizer theorem) + orbits = self.orbits() + non_p_orbits = [o for o in orbits if len(o) % p != 0 and len(o) != 1] + if non_p_orbits: + G = self.stabilizer(list(non_p_orbits[0]).pop()) + return G.sylow_subgroup(p) + + if not self.is_transitive(): + # apply _sylow_reduce to orbit actions + orbits = sorted(orbits, key=len) + omega1 = orbits.pop() + omega2 = orbits[0].union(*orbits) + mu = orbit_homomorphism(self, omega1) + nu = orbit_homomorphism(self, omega2) + return _sylow_reduce(mu, nu) + + blocks = self.minimal_blocks() + if len(blocks) > 1: + # apply _sylow_reduce to block system actions + mu = block_homomorphism(self, blocks[0]) + nu = block_homomorphism(self, blocks[1]) + return _sylow_reduce(mu, nu) + elif len(blocks) == 1: + block = list(blocks)[0] + if any(e != 0 for e in block): + # self is imprimitive + mu = block_homomorphism(self, block) + if not is_p_group(mu.image())[0]: + S = mu.image().sylow_subgroup(p) + return mu.invert_subgroup(S).sylow_subgroup(p) + + # find an element of order p + g = self.random() + g_order = g.order() + while g_order % p != 0 or g_order == 0: + g = self.random() + g_order = g.order() + g = g**(g_order // p) + if order % p**2 != 0: + return PermutationGroup(g) + + C = self.centralizer(g) + while C.order() % p**n != 0: + S = C.sylow_subgroup(p) + s_order = S.order() + Z = S.center() + P = Z._p_elements_group(p) + h = P.random() + C_h = self.centralizer(h) + while C_h.order() % p*s_order != 0: + h = P.random() + C_h = self.centralizer(h) + C = C_h + + return C.sylow_subgroup(p) + + def _block_verify(self, L, alpha): + delta = sorted(self.orbit(alpha)) + # p[i] will be the number of the block + # delta[i] belongs to + p = [-1]*len(delta) + blocks = [-1]*len(delta) + + B = [[]] # future list of blocks + u = [0]*len(delta) # u[i] in L s.t. alpha^u[i] = B[0][i] + + t = L.orbit_transversal(alpha, pairs=True) + for a, beta in t: + B[0].append(a) + i_a = delta.index(a) + p[i_a] = 0 + blocks[i_a] = alpha + u[i_a] = beta + + rho = 0 + m = 0 # number of blocks - 1 + + while rho <= m: + beta = B[rho][0] + for g in self.generators: + d = beta^g + i_d = delta.index(d) + sigma = p[i_d] + if sigma < 0: + # define a new block + m += 1 + sigma = m + u[i_d] = u[delta.index(beta)]*g + p[i_d] = sigma + rep = d + blocks[i_d] = rep + newb = [rep] + for gamma in B[rho][1:]: + i_gamma = delta.index(gamma) + d = gamma^g + i_d = delta.index(d) + if p[i_d] < 0: + u[i_d] = u[i_gamma]*g + p[i_d] = sigma + blocks[i_d] = rep + newb.append(d) + else: + # B[rho] is not a block + s = u[i_gamma]*g*u[i_d]**(-1) + return False, s + + B.append(newb) + else: + for h in B[rho][1:]: + if h^g not in B[sigma]: + # B[rho] is not a block + s = u[delta.index(beta)]*g*u[i_d]**(-1) + return False, s + rho += 1 + + return True, blocks + + def _verify(H, K, phi, z, alpha): + ''' + Return a list of relators ``rels`` in generators ``gens`_h` that + are mapped to ``H.generators`` by ``phi`` so that given a finite + presentation of ``K`` on a subset of ``gens_h`` + is a finite presentation of ``H``. + + Explanation + =========== + + ``H`` should be generated by the union of ``K.generators`` and ``z`` + (a single generator), and ``H.stabilizer(alpha) == K``; ``phi`` is a + canonical injection from a free group into a permutation group + containing ``H``. + + The algorithm is described in [1], Chapter 6. + + Examples + ======== + + >>> from sympy.combinatorics import free_group, Permutation, PermutationGroup + >>> from sympy.combinatorics.homomorphisms import homomorphism + >>> from sympy.combinatorics.fp_groups import FpGroup + + >>> H = PermutationGroup(Permutation(0, 2), Permutation (1, 5)) + >>> K = PermutationGroup(Permutation(5)(0, 2)) + >>> F = free_group("x_0 x_1")[0] + >>> gens = F.generators + >>> phi = homomorphism(F, H, F.generators, H.generators) + >>> rels_k = [gens[0]**2] # relators for presentation of K + >>> z= Permutation(1, 5) + >>> check, rels_h = H._verify(K, phi, z, 1) + >>> check + True + >>> rels = rels_k + rels_h + >>> G = FpGroup(F, rels) # presentation of H + >>> G.order() == H.order() + True + + See also + ======== + + strong_presentation, presentation, stabilizer + + ''' + + orbit = H.orbit(alpha) + beta = alpha^(z**-1) + + K_beta = K.stabilizer(beta) + + # orbit representatives of K_beta + gammas = [alpha, beta] + orbits = list({tuple(K_beta.orbit(o)) for o in orbit}) + orbit_reps = [orb[0] for orb in orbits] + for rep in orbit_reps: + if rep not in gammas: + gammas.append(rep) + + # orbit transversal of K + betas = [alpha, beta] + transversal = {alpha: phi.invert(H.identity), beta: phi.invert(z**-1)} + + for s, g in K.orbit_transversal(beta, pairs=True): + if s not in transversal: + transversal[s] = transversal[beta]*phi.invert(g) + + + union = K.orbit(alpha).union(K.orbit(beta)) + while (len(union) < len(orbit)): + for gamma in gammas: + if gamma in union: + r = gamma^z + if r not in union: + betas.append(r) + transversal[r] = transversal[gamma]*phi.invert(z) + for s, g in K.orbit_transversal(r, pairs=True): + if s not in transversal: + transversal[s] = transversal[r]*phi.invert(g) + union = union.union(K.orbit(r)) + break + + # compute relators + rels = [] + + for b in betas: + k_gens = K.stabilizer(b).generators + for y in k_gens: + new_rel = transversal[b] + gens = K.generator_product(y, original=True) + for g in gens[::-1]: + new_rel = new_rel*phi.invert(g) + new_rel = new_rel*transversal[b]**-1 + + perm = phi(new_rel) + try: + gens = K.generator_product(perm, original=True) + except ValueError: + return False, perm + for g in gens: + new_rel = new_rel*phi.invert(g)**-1 + if new_rel not in rels: + rels.append(new_rel) + + for gamma in gammas: + new_rel = transversal[gamma]*phi.invert(z)*transversal[gamma^z]**-1 + perm = phi(new_rel) + try: + gens = K.generator_product(perm, original=True) + except ValueError: + return False, perm + for g in gens: + new_rel = new_rel*phi.invert(g)**-1 + if new_rel not in rels: + rels.append(new_rel) + + return True, rels + + def strong_presentation(self): + ''' + Return a strong finite presentation of group. The generators + of the returned group are in the same order as the strong + generators of group. + + The algorithm is based on Sims' Verify algorithm described + in [1], Chapter 6. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> P = DihedralGroup(4) + >>> G = P.strong_presentation() + >>> P.order() == G.order() + True + + See Also + ======== + + presentation, _verify + + ''' + from sympy.combinatorics.fp_groups import (FpGroup, + simplify_presentation) + from sympy.combinatorics.free_groups import free_group + from sympy.combinatorics.homomorphisms import (block_homomorphism, + homomorphism, GroupHomomorphism) + + strong_gens = self.strong_gens[:] + stabs = self.basic_stabilizers[:] + base = self.base[:] + + # injection from a free group on len(strong_gens) + # generators into G + gen_syms = [('x_%d'%i) for i in range(len(strong_gens))] + F = free_group(', '.join(gen_syms))[0] + phi = homomorphism(F, self, F.generators, strong_gens) + + H = PermutationGroup(self.identity) + while stabs: + alpha = base.pop() + K = H + H = stabs.pop() + new_gens = [g for g in H.generators if g not in K] + + if K.order() == 1: + z = new_gens.pop() + rels = [F.generators[-1]**z.order()] + intermediate_gens = [z] + K = PermutationGroup(intermediate_gens) + + # add generators one at a time building up from K to H + while new_gens: + z = new_gens.pop() + intermediate_gens = [z] + intermediate_gens + K_s = PermutationGroup(intermediate_gens) + orbit = K_s.orbit(alpha) + orbit_k = K.orbit(alpha) + + # split into cases based on the orbit of K_s + if orbit_k == orbit: + if z in K: + rel = phi.invert(z) + perm = z + else: + t = K.orbit_rep(alpha, alpha^z) + rel = phi.invert(z)*phi.invert(t)**-1 + perm = z*t**-1 + for g in K.generator_product(perm, original=True): + rel = rel*phi.invert(g)**-1 + new_rels = [rel] + elif len(orbit_k) == 1: + # `success` is always true because `strong_gens` + # and `base` are already a verified BSGS. Later + # this could be changed to start with a randomly + # generated (potential) BSGS, and then new elements + # would have to be appended to it when `success` + # is false. + success, new_rels = K_s._verify(K, phi, z, alpha) + else: + # K.orbit(alpha) should be a block + # under the action of K_s on K_s.orbit(alpha) + check, block = K_s._block_verify(K, alpha) + if check: + # apply _verify to the action of K_s + # on the block system; for convenience, + # add the blocks as additional points + # that K_s should act on + t = block_homomorphism(K_s, block) + m = t.codomain.degree # number of blocks + d = K_s.degree + + # conjugating with p will shift + # permutations in t.image() to + # higher numbers, e.g. + # p*(0 1)*p = (m m+1) + p = Permutation() + for i in range(m): + p *= Permutation(i, i+d) + + t_img = t.images + # combine generators of K_s with their + # action on the block system + images = {g: g*p*t_img[g]*p for g in t_img} + for g in self.strong_gens[:-len(K_s.generators)]: + images[g] = g + K_s_act = PermutationGroup(list(images.values())) + f = GroupHomomorphism(self, K_s_act, images) + + K_act = PermutationGroup([f(g) for g in K.generators]) + success, new_rels = K_s_act._verify(K_act, f.compose(phi), f(z), d) + + for n in new_rels: + if n not in rels: + rels.append(n) + K = K_s + + group = FpGroup(F, rels) + return simplify_presentation(group) + + def presentation(self, eliminate_gens=True): + ''' + Return an `FpGroup` presentation of the group. + + The algorithm is described in [1], Chapter 6.1. + + ''' + from sympy.combinatorics.fp_groups import (FpGroup, + simplify_presentation) + from sympy.combinatorics.coset_table import CosetTable + from sympy.combinatorics.free_groups import free_group + from sympy.combinatorics.homomorphisms import homomorphism + + if self._fp_presentation: + return self._fp_presentation + + def _factor_group_by_rels(G, rels): + if isinstance(G, FpGroup): + rels.extend(G.relators) + return FpGroup(G.free_group, list(set(rels))) + return FpGroup(G, rels) + + gens = self.generators + len_g = len(gens) + + if len_g == 1: + order = gens[0].order() + # handle the trivial group + if order == 1: + return free_group([])[0] + F, x = free_group('x') + return FpGroup(F, [x**order]) + + if self.order() > 20: + half_gens = self.generators[0:(len_g+1)//2] + else: + half_gens = [] + H = PermutationGroup(half_gens) + H_p = H.presentation() + + len_h = len(H_p.generators) + + C = self.coset_table(H) + n = len(C) # subgroup index + + gen_syms = [('x_%d'%i) for i in range(len(gens))] + F = free_group(', '.join(gen_syms))[0] + + # mapping generators of H_p to those of F + images = [F.generators[i] for i in range(len_h)] + R = homomorphism(H_p, F, H_p.generators, images, check=False) + + # rewrite relators + rels = R(H_p.relators) + G_p = FpGroup(F, rels) + + # injective homomorphism from G_p into self + T = homomorphism(G_p, self, G_p.generators, gens) + + C_p = CosetTable(G_p, []) + + C_p.table = [[None]*(2*len_g) for i in range(n)] + + # initiate the coset transversal + transversal = [None]*n + transversal[0] = G_p.identity + + # fill in the coset table as much as possible + for i in range(2*len_h): + C_p.table[0][i] = 0 + + gamma = 1 + for alpha, x in product(range(n), range(2*len_g)): + beta = C[alpha][x] + if beta == gamma: + gen = G_p.generators[x//2]**((-1)**(x % 2)) + transversal[beta] = transversal[alpha]*gen + C_p.table[alpha][x] = beta + C_p.table[beta][x + (-1)**(x % 2)] = alpha + gamma += 1 + if gamma == n: + break + + C_p.p = list(range(n)) + beta = x = 0 + + while not C_p.is_complete(): + # find the first undefined entry + while C_p.table[beta][x] == C[beta][x]: + x = (x + 1) % (2*len_g) + if x == 0: + beta = (beta + 1) % n + + # define a new relator + gen = G_p.generators[x//2]**((-1)**(x % 2)) + new_rel = transversal[beta]*gen*transversal[C[beta][x]]**-1 + perm = T(new_rel) + nxt = G_p.identity + for s in H.generator_product(perm, original=True): + nxt = nxt*T.invert(s)**-1 + new_rel = new_rel*nxt + + # continue coset enumeration + G_p = _factor_group_by_rels(G_p, [new_rel]) + C_p.scan_and_fill(0, new_rel) + C_p = G_p.coset_enumeration([], strategy="coset_table", + draft=C_p, max_cosets=n, incomplete=True) + + self._fp_presentation = simplify_presentation(G_p) + return self._fp_presentation + + def polycyclic_group(self): + """ + Return the PolycyclicGroup instance with below parameters: + + Explanation + =========== + + * pc_sequence : Polycyclic sequence is formed by collecting all + the missing generators between the adjacent groups in the + derived series of given permutation group. + + * pc_series : Polycyclic series is formed by adding all the missing + generators of ``der[i+1]`` in ``der[i]``, where ``der`` represents + the derived series. + + * relative_order : A list, computed by the ratio of adjacent groups in + pc_series. + + """ + from sympy.combinatorics.pc_groups import PolycyclicGroup + if not self.is_polycyclic: + raise ValueError("The group must be solvable") + + der = self.derived_series() + pc_series = [] + pc_sequence = [] + relative_order = [] + pc_series.append(der[-1]) + der.reverse() + + for i in range(len(der)-1): + H = der[i] + for g in der[i+1].generators: + if g not in H: + H = PermutationGroup([g] + H.generators) + pc_series.insert(0, H) + pc_sequence.insert(0, g) + + G1 = pc_series[0].order() + G2 = pc_series[1].order() + relative_order.insert(0, G1 // G2) + + return PolycyclicGroup(pc_sequence, pc_series, relative_order, collector=None) + + +def _orbit(degree, generators, alpha, action='tuples'): + r"""Compute the orbit of alpha `\{g(\alpha) | g \in G\}` as a set. + + Explanation + =========== + + The time complexity of the algorithm used here is `O(|Orb|*r)` where + `|Orb|` is the size of the orbit and ``r`` is the number of generators of + the group. For a more detailed analysis, see [1], p.78, [2], pp. 19-21. + Here alpha can be a single point, or a list of points. + + If alpha is a single point, the ordinary orbit is computed. + if alpha is a list of points, there are three available options: + + 'union' - computes the union of the orbits of the points in the list + 'tuples' - computes the orbit of the list interpreted as an ordered + tuple under the group action ( i.e., g((1, 2, 3)) = (g(1), g(2), g(3)) ) + 'sets' - computes the orbit of the list interpreted as a sets + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> from sympy.combinatorics.perm_groups import _orbit + >>> a = Permutation([1, 2, 0, 4, 5, 6, 3]) + >>> G = PermutationGroup([a]) + >>> _orbit(G.degree, G.generators, 0) + {0, 1, 2} + >>> _orbit(G.degree, G.generators, [0, 4], 'union') + {0, 1, 2, 3, 4, 5, 6} + + See Also + ======== + + orbit, orbit_transversal + + """ + if not hasattr(alpha, '__getitem__'): + alpha = [alpha] + + gens = [x._array_form for x in generators] + if len(alpha) == 1 or action == 'union': + orb = alpha + used = [False]*degree + for el in alpha: + used[el] = True + for b in orb: + for gen in gens: + temp = gen[b] + if used[temp] == False: + orb.append(temp) + used[temp] = True + return set(orb) + elif action == 'tuples': + alpha = tuple(alpha) + orb = [alpha] + used = {alpha} + for b in orb: + for gen in gens: + temp = tuple([gen[x] for x in b]) + if temp not in used: + orb.append(temp) + used.add(temp) + return set(orb) + elif action == 'sets': + alpha = frozenset(alpha) + orb = [alpha] + used = {alpha} + for b in orb: + for gen in gens: + temp = frozenset([gen[x] for x in b]) + if temp not in used: + orb.append(temp) + used.add(temp) + return {tuple(x) for x in orb} + + +def _orbits(degree, generators): + """Compute the orbits of G. + + If ``rep=False`` it returns a list of sets else it returns a list of + representatives of the orbits + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> from sympy.combinatorics.perm_groups import _orbits + >>> a = Permutation([0, 2, 1]) + >>> b = Permutation([1, 0, 2]) + >>> _orbits(a.size, [a, b]) + [{0, 1, 2}] + """ + + orbs = [] + sorted_I = list(range(degree)) + I = set(sorted_I) + while I: + i = sorted_I[0] + orb = _orbit(degree, generators, i) + orbs.append(orb) + # remove all indices that are in this orbit + I -= orb + sorted_I = [i for i in sorted_I if i not in orb] + return orbs + + +def _orbit_transversal(degree, generators, alpha, pairs, af=False, slp=False): + r"""Computes a transversal for the orbit of ``alpha`` as a set. + + Explanation + =========== + + generators generators of the group ``G`` + + For a permutation group ``G``, a transversal for the orbit + `Orb = \{g(\alpha) | g \in G\}` is a set + `\{g_\beta | g_\beta(\alpha) = \beta\}` for `\beta \in Orb`. + Note that there may be more than one possible transversal. + If ``pairs`` is set to ``True``, it returns the list of pairs + `(\beta, g_\beta)`. For a proof of correctness, see [1], p.79 + + if ``af`` is ``True``, the transversal elements are given in + array form. + + If `slp` is `True`, a dictionary `{beta: slp_beta}` is returned + for `\beta \in Orb` where `slp_beta` is a list of indices of the + generators in `generators` s.t. if `slp_beta = [i_1 \dots i_n]` + `g_\beta = generators[i_n] \times \dots \times generators[i_1]`. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> from sympy.combinatorics.perm_groups import _orbit_transversal + >>> G = DihedralGroup(6) + >>> _orbit_transversal(G.degree, G.generators, 0, False) + [(5), (0 1 2 3 4 5), (0 5)(1 4)(2 3), (0 2 4)(1 3 5), (5)(0 4)(1 3), (0 3)(1 4)(2 5)] + """ + + tr = [(alpha, list(range(degree)))] + slp_dict = {alpha: []} + used = [False]*degree + used[alpha] = True + gens = [x._array_form for x in generators] + for x, px in tr: + px_slp = slp_dict[x] + for gen in gens: + temp = gen[x] + if used[temp] == False: + slp_dict[temp] = [gens.index(gen)] + px_slp + tr.append((temp, _af_rmul(gen, px))) + used[temp] = True + if pairs: + if not af: + tr = [(x, _af_new(y)) for x, y in tr] + if not slp: + return tr + return tr, slp_dict + + if af: + tr = [y for _, y in tr] + if not slp: + return tr + return tr, slp_dict + + tr = [_af_new(y) for _, y in tr] + if not slp: + return tr + return tr, slp_dict + + +def _stabilizer(degree, generators, alpha): + r"""Return the stabilizer subgroup of ``alpha``. + + Explanation + =========== + + The stabilizer of `\alpha` is the group `G_\alpha = + \{g \in G | g(\alpha) = \alpha\}`. + For a proof of correctness, see [1], p.79. + + degree : degree of G + generators : generators of G + + Examples + ======== + + >>> from sympy.combinatorics.perm_groups import _stabilizer + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> G = DihedralGroup(6) + >>> _stabilizer(G.degree, G.generators, 5) + [(5)(0 4)(1 3), (5)] + + See Also + ======== + + orbit + + """ + orb = [alpha] + table = {alpha: list(range(degree))} + table_inv = {alpha: list(range(degree))} + used = [False]*degree + used[alpha] = True + gens = [x._array_form for x in generators] + stab_gens = [] + for b in orb: + for gen in gens: + temp = gen[b] + if used[temp] is False: + gen_temp = _af_rmul(gen, table[b]) + orb.append(temp) + table[temp] = gen_temp + table_inv[temp] = _af_invert(gen_temp) + used[temp] = True + else: + schreier_gen = _af_rmuln(table_inv[temp], gen, table[b]) + if schreier_gen not in stab_gens: + stab_gens.append(schreier_gen) + return [_af_new(x) for x in stab_gens] + + +PermGroup = PermutationGroup + + +class SymmetricPermutationGroup(Basic): + """ + The class defining the lazy form of SymmetricGroup. + + deg : int + + """ + def __new__(cls, deg): + deg = _sympify(deg) + obj = Basic.__new__(cls, deg) + return obj + + def __init__(self, *args, **kwargs): + self._deg = self.args[0] + self._order = None + + def __contains__(self, i): + """Return ``True`` if *i* is contained in SymmetricPermutationGroup. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, SymmetricPermutationGroup + >>> G = SymmetricPermutationGroup(4) + >>> Permutation(1, 2, 3) in G + True + + """ + if not isinstance(i, Permutation): + raise TypeError("A SymmetricPermutationGroup contains only Permutations as " + "elements, not elements of type %s" % type(i)) + return i.size == self.degree + + def order(self): + """ + Return the order of the SymmetricPermutationGroup. + + Examples + ======== + + >>> from sympy.combinatorics import SymmetricPermutationGroup + >>> G = SymmetricPermutationGroup(4) + >>> G.order() + 24 + """ + if self._order is not None: + return self._order + n = self._deg + self._order = factorial(n) + return self._order + + @property + def degree(self): + """ + Return the degree of the SymmetricPermutationGroup. + + Examples + ======== + + >>> from sympy.combinatorics import SymmetricPermutationGroup + >>> G = SymmetricPermutationGroup(4) + >>> G.degree + 4 + + """ + return self._deg + + @property + def identity(self): + ''' + Return the identity element of the SymmetricPermutationGroup. + + Examples + ======== + + >>> from sympy.combinatorics import SymmetricPermutationGroup + >>> G = SymmetricPermutationGroup(4) + >>> G.identity() + (3) + + ''' + return _af_new(list(range(self._deg))) + + +class Coset(Basic): + """A left coset of a permutation group with respect to an element. + + Parameters + ========== + + g : Permutation + + H : PermutationGroup + + dir : "+" or "-", If not specified by default it will be "+" + here ``dir`` specified the type of coset "+" represent the + right coset and "-" represent the left coset. + + G : PermutationGroup, optional + The group which contains *H* as its subgroup and *g* as its + element. + + If not specified, it would automatically become a symmetric + group ``SymmetricPermutationGroup(g.size)`` and + ``SymmetricPermutationGroup(H.degree)`` if ``g.size`` and ``H.degree`` + are matching.``SymmetricPermutationGroup`` is a lazy form of SymmetricGroup + used for representation purpose. + + """ + + def __new__(cls, g, H, G=None, dir="+"): + g = _sympify(g) + if not isinstance(g, Permutation): + raise NotImplementedError + + H = _sympify(H) + if not isinstance(H, PermutationGroup): + raise NotImplementedError + + if G is not None: + G = _sympify(G) + if not isinstance(G, (PermutationGroup, SymmetricPermutationGroup)): + raise NotImplementedError + if not H.is_subgroup(G): + raise ValueError("{} must be a subgroup of {}.".format(H, G)) + if g not in G: + raise ValueError("{} must be an element of {}.".format(g, G)) + else: + g_size = g.size + h_degree = H.degree + if g_size != h_degree: + raise ValueError( + "The size of the permutation {} and the degree of " + "the permutation group {} should be matching " + .format(g, H)) + G = SymmetricPermutationGroup(g.size) + + if isinstance(dir, str): + dir = Symbol(dir) + elif not isinstance(dir, Symbol): + raise TypeError("dir must be of type basestring or " + "Symbol, not %s" % type(dir)) + if str(dir) not in ('+', '-'): + raise ValueError("dir must be one of '+' or '-' not %s" % dir) + obj = Basic.__new__(cls, g, H, G, dir) + return obj + + def __init__(self, *args, **kwargs): + self._dir = self.args[3] + + @property + def is_left_coset(self): + """ + Check if the coset is left coset that is ``gH``. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup, Coset + >>> a = Permutation(1, 2) + >>> b = Permutation(0, 1) + >>> G = PermutationGroup([a, b]) + >>> cst = Coset(a, G, dir="-") + >>> cst.is_left_coset + True + + """ + return str(self._dir) == '-' + + @property + def is_right_coset(self): + """ + Check if the coset is right coset that is ``Hg``. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, PermutationGroup, Coset + >>> a = Permutation(1, 2) + >>> b = Permutation(0, 1) + >>> G = PermutationGroup([a, b]) + >>> cst = Coset(a, G, dir="+") + >>> cst.is_right_coset + True + + """ + return str(self._dir) == '+' + + def as_list(self): + """ + Return all the elements of coset in the form of list. + """ + g = self.args[0] + H = self.args[1] + cst = [] + if str(self._dir) == '+': + for h in H.elements: + cst.append(h*g) + else: + for h in H.elements: + cst.append(g*h) + return cst diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/permutations.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/permutations.py new file mode 100644 index 0000000000000000000000000000000000000000..3718467b69cbab2b9b0dd73e8fa160cceb0324bf --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/permutations.py @@ -0,0 +1,3114 @@ +import random +from collections import defaultdict +from collections.abc import Iterable +from functools import reduce + +from sympy.core.parameters import global_parameters +from sympy.core.basic import Atom +from sympy.core.expr import Expr +from sympy.core.numbers import int_valued +from sympy.core.numbers import Integer +from sympy.core.sympify import _sympify +from sympy.matrices import zeros +from sympy.polys.polytools import lcm +from sympy.printing.repr import srepr +from sympy.utilities.iterables import (flatten, has_variety, minlex, + has_dups, runs, is_sequence) +from sympy.utilities.misc import as_int +from mpmath.libmp.libintmath import ifac +from sympy.multipledispatch import dispatch + +def _af_rmul(a, b): + """ + Return the product b*a; input and output are array forms. The ith value + is a[b[i]]. + + Examples + ======== + + >>> from sympy.combinatorics.permutations import _af_rmul, Permutation + + >>> a, b = [1, 0, 2], [0, 2, 1] + >>> _af_rmul(a, b) + [1, 2, 0] + >>> [a[b[i]] for i in range(3)] + [1, 2, 0] + + This handles the operands in reverse order compared to the ``*`` operator: + + >>> a = Permutation(a) + >>> b = Permutation(b) + >>> list(a*b) + [2, 0, 1] + >>> [b(a(i)) for i in range(3)] + [2, 0, 1] + + See Also + ======== + + rmul, _af_rmuln + """ + return [a[i] for i in b] + + +def _af_rmuln(*abc): + """ + Given [a, b, c, ...] return the product of ...*c*b*a using array forms. + The ith value is a[b[c[i]]]. + + Examples + ======== + + >>> from sympy.combinatorics.permutations import _af_rmul, Permutation + + >>> a, b = [1, 0, 2], [0, 2, 1] + >>> _af_rmul(a, b) + [1, 2, 0] + >>> [a[b[i]] for i in range(3)] + [1, 2, 0] + + This handles the operands in reverse order compared to the ``*`` operator: + + >>> a = Permutation(a); b = Permutation(b) + >>> list(a*b) + [2, 0, 1] + >>> [b(a(i)) for i in range(3)] + [2, 0, 1] + + See Also + ======== + + rmul, _af_rmul + """ + a = abc + m = len(a) + if m == 3: + p0, p1, p2 = a + return [p0[p1[i]] for i in p2] + if m == 4: + p0, p1, p2, p3 = a + return [p0[p1[p2[i]]] for i in p3] + if m == 5: + p0, p1, p2, p3, p4 = a + return [p0[p1[p2[p3[i]]]] for i in p4] + if m == 6: + p0, p1, p2, p3, p4, p5 = a + return [p0[p1[p2[p3[p4[i]]]]] for i in p5] + if m == 7: + p0, p1, p2, p3, p4, p5, p6 = a + return [p0[p1[p2[p3[p4[p5[i]]]]]] for i in p6] + if m == 8: + p0, p1, p2, p3, p4, p5, p6, p7 = a + return [p0[p1[p2[p3[p4[p5[p6[i]]]]]]] for i in p7] + if m == 1: + return a[0][:] + if m == 2: + a, b = a + return [a[i] for i in b] + if m == 0: + raise ValueError("String must not be empty") + p0 = _af_rmuln(*a[:m//2]) + p1 = _af_rmuln(*a[m//2:]) + return [p0[i] for i in p1] + + +def _af_parity(pi): + """ + Computes the parity of a permutation in array form. + + Explanation + =========== + + The parity of a permutation reflects the parity of the + number of inversions in the permutation, i.e., the + number of pairs of x and y such that x > y but p[x] < p[y]. + + Examples + ======== + + >>> from sympy.combinatorics.permutations import _af_parity + >>> _af_parity([0, 1, 2, 3]) + 0 + >>> _af_parity([3, 2, 0, 1]) + 1 + + See Also + ======== + + Permutation + """ + n = len(pi) + a = [0] * n + c = 0 + for j in range(n): + if a[j] == 0: + c += 1 + a[j] = 1 + i = j + while pi[i] != j: + i = pi[i] + a[i] = 1 + return (n - c) % 2 + + +def _af_invert(a): + """ + Finds the inverse, ~A, of a permutation, A, given in array form. + + Examples + ======== + + >>> from sympy.combinatorics.permutations import _af_invert, _af_rmul + >>> A = [1, 2, 0, 3] + >>> _af_invert(A) + [2, 0, 1, 3] + >>> _af_rmul(_, A) + [0, 1, 2, 3] + + See Also + ======== + + Permutation, __invert__ + """ + inv_form = [0] * len(a) + for i, ai in enumerate(a): + inv_form[ai] = i + return inv_form + + +def _af_pow(a, n): + """ + Routine for finding powers of a permutation. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> from sympy.combinatorics.permutations import _af_pow + >>> p = Permutation([2, 0, 3, 1]) + >>> p.order() + 4 + >>> _af_pow(p._array_form, 4) + [0, 1, 2, 3] + """ + if n == 0: + return list(range(len(a))) + if n < 0: + return _af_pow(_af_invert(a), -n) + if n == 1: + return a[:] + elif n == 2: + b = [a[i] for i in a] + elif n == 3: + b = [a[a[i]] for i in a] + elif n == 4: + b = [a[a[a[i]]] for i in a] + else: + # use binary multiplication + b = list(range(len(a))) + while 1: + if n & 1: + b = [b[i] for i in a] + n -= 1 + if not n: + break + if n % 4 == 0: + a = [a[a[a[i]]] for i in a] + n = n // 4 + elif n % 2 == 0: + a = [a[i] for i in a] + n = n // 2 + return b + + +def _af_commutes_with(a, b): + """ + Checks if the two permutations with array forms + given by ``a`` and ``b`` commute. + + Examples + ======== + + >>> from sympy.combinatorics.permutations import _af_commutes_with + >>> _af_commutes_with([1, 2, 0], [0, 2, 1]) + False + + See Also + ======== + + Permutation, commutes_with + """ + return not any(a[b[i]] != b[a[i]] for i in range(len(a) - 1)) + + +class Cycle(dict): + """ + Wrapper around dict which provides the functionality of a disjoint cycle. + + Explanation + =========== + + A cycle shows the rule to use to move subsets of elements to obtain + a permutation. The Cycle class is more flexible than Permutation in + that 1) all elements need not be present in order to investigate how + multiple cycles act in sequence and 2) it can contain singletons: + + >>> from sympy.combinatorics.permutations import Perm, Cycle + + A Cycle will automatically parse a cycle given as a tuple on the rhs: + + >>> Cycle(1, 2)(2, 3) + (1 3 2) + + The identity cycle, Cycle(), can be used to start a product: + + >>> Cycle()(1, 2)(2, 3) + (1 3 2) + + The array form of a Cycle can be obtained by calling the list + method (or passing it to the list function) and all elements from + 0 will be shown: + + >>> a = Cycle(1, 2) + >>> a.list() + [0, 2, 1] + >>> list(a) + [0, 2, 1] + + If a larger (or smaller) range is desired use the list method and + provide the desired size -- but the Cycle cannot be truncated to + a size smaller than the largest element that is out of place: + + >>> b = Cycle(2, 4)(1, 2)(3, 1, 4)(1, 3) + >>> b.list() + [0, 2, 1, 3, 4] + >>> b.list(b.size + 1) + [0, 2, 1, 3, 4, 5] + >>> b.list(-1) + [0, 2, 1] + + Singletons are not shown when printing with one exception: the largest + element is always shown -- as a singleton if necessary: + + >>> Cycle(1, 4, 10)(4, 5) + (1 5 4 10) + >>> Cycle(1, 2)(4)(5)(10) + (1 2)(10) + + The array form can be used to instantiate a Permutation so other + properties of the permutation can be investigated: + + >>> Perm(Cycle(1, 2)(3, 4).list()).transpositions() + [(1, 2), (3, 4)] + + Notes + ===== + + The underlying structure of the Cycle is a dictionary and although + the __iter__ method has been redefined to give the array form of the + cycle, the underlying dictionary items are still available with the + such methods as items(): + + >>> list(Cycle(1, 2).items()) + [(1, 2), (2, 1)] + + See Also + ======== + + Permutation + """ + def __missing__(self, arg): + """Enter arg into dictionary and return arg.""" + return as_int(arg) + + def __iter__(self): + yield from self.list() + + def __call__(self, *other): + """Return product of cycles processed from R to L. + + Examples + ======== + + >>> from sympy.combinatorics import Cycle + >>> Cycle(1, 2)(2, 3) + (1 3 2) + + An instance of a Cycle will automatically parse list-like + objects and Permutations that are on the right. It is more + flexible than the Permutation in that all elements need not + be present: + + >>> a = Cycle(1, 2) + >>> a(2, 3) + (1 3 2) + >>> a(2, 3)(4, 5) + (1 3 2)(4 5) + + """ + rv = Cycle(*other) + for k, v in zip(list(self.keys()), [rv[self[k]] for k in self.keys()]): + rv[k] = v + return rv + + def list(self, size=None): + """Return the cycles as an explicit list starting from 0 up + to the greater of the largest value in the cycles and size. + + Truncation of trailing unmoved items will occur when size + is less than the maximum element in the cycle; if this is + desired, setting ``size=-1`` will guarantee such trimming. + + Examples + ======== + + >>> from sympy.combinatorics import Cycle + >>> p = Cycle(2, 3)(4, 5) + >>> p.list() + [0, 1, 3, 2, 5, 4] + >>> p.list(10) + [0, 1, 3, 2, 5, 4, 6, 7, 8, 9] + + Passing a length too small will trim trailing, unchanged elements + in the permutation: + + >>> Cycle(2, 4)(1, 2, 4).list(-1) + [0, 2, 1] + """ + if not self and size is None: + raise ValueError('must give size for empty Cycle') + if size is not None: + big = max([i for i in self.keys() if self[i] != i] + [0]) + size = max(size, big + 1) + else: + size = self.size + return [self[i] for i in range(size)] + + def __repr__(self): + """We want it to print as a Cycle, not as a dict. + + Examples + ======== + + >>> from sympy.combinatorics import Cycle + >>> Cycle(1, 2) + (1 2) + >>> print(_) + (1 2) + >>> list(Cycle(1, 2).items()) + [(1, 2), (2, 1)] + """ + if not self: + return 'Cycle()' + cycles = Permutation(self).cyclic_form + s = ''.join(str(tuple(c)) for c in cycles) + big = self.size - 1 + if not any(i == big for c in cycles for i in c): + s += '(%s)' % big + return 'Cycle%s' % s + + def __str__(self): + """We want it to be printed in a Cycle notation with no + comma in-between. + + Examples + ======== + + >>> from sympy.combinatorics import Cycle + >>> Cycle(1, 2) + (1 2) + >>> Cycle(1, 2, 4)(5, 6) + (1 2 4)(5 6) + """ + if not self: + return '()' + cycles = Permutation(self).cyclic_form + s = ''.join(str(tuple(c)) for c in cycles) + big = self.size - 1 + if not any(i == big for c in cycles for i in c): + s += '(%s)' % big + s = s.replace(',', '') + return s + + def __init__(self, *args): + """Load up a Cycle instance with the values for the cycle. + + Examples + ======== + + >>> from sympy.combinatorics import Cycle + >>> Cycle(1, 2, 6) + (1 2 6) + """ + + if not args: + return + if len(args) == 1: + if isinstance(args[0], Permutation): + for c in args[0].cyclic_form: + self.update(self(*c)) + return + elif isinstance(args[0], Cycle): + for k, v in args[0].items(): + self[k] = v + return + args = [as_int(a) for a in args] + if any(i < 0 for i in args): + raise ValueError('negative integers are not allowed in a cycle.') + if has_dups(args): + raise ValueError('All elements must be unique in a cycle.') + for i in range(-len(args), 0): + self[args[i]] = args[i + 1] + + @property + def size(self): + if not self: + return 0 + return max(self.keys()) + 1 + + def copy(self): + return Cycle(self) + + +class Permutation(Atom): + r""" + A permutation, alternatively known as an 'arrangement number' or 'ordering' + is an arrangement of the elements of an ordered list into a one-to-one + mapping with itself. The permutation of a given arrangement is given by + indicating the positions of the elements after re-arrangement [2]_. For + example, if one started with elements ``[x, y, a, b]`` (in that order) and + they were reordered as ``[x, y, b, a]`` then the permutation would be + ``[0, 1, 3, 2]``. Notice that (in SymPy) the first element is always referred + to as 0 and the permutation uses the indices of the elements in the + original ordering, not the elements ``(a, b, ...)`` themselves. + + >>> from sympy.combinatorics import Permutation + >>> from sympy import init_printing + >>> init_printing(perm_cyclic=False, pretty_print=False) + + Permutations Notation + ===================== + + Permutations are commonly represented in disjoint cycle or array forms. + + Array Notation and 2-line Form + ------------------------------------ + + In the 2-line form, the elements and their final positions are shown + as a matrix with 2 rows: + + [0 1 2 ... n-1] + [p(0) p(1) p(2) ... p(n-1)] + + Since the first line is always ``range(n)``, where n is the size of p, + it is sufficient to represent the permutation by the second line, + referred to as the "array form" of the permutation. This is entered + in brackets as the argument to the Permutation class: + + >>> p = Permutation([0, 2, 1]); p + Permutation([0, 2, 1]) + + Given i in range(p.size), the permutation maps i to i^p + + >>> [i^p for i in range(p.size)] + [0, 2, 1] + + The composite of two permutations p*q means first apply p, then q, so + i^(p*q) = (i^p)^q which is i^p^q according to Python precedence rules: + + >>> q = Permutation([2, 1, 0]) + >>> [i^p^q for i in range(3)] + [2, 0, 1] + >>> [i^(p*q) for i in range(3)] + [2, 0, 1] + + One can use also the notation p(i) = i^p, but then the composition + rule is (p*q)(i) = q(p(i)), not p(q(i)): + + >>> [(p*q)(i) for i in range(p.size)] + [2, 0, 1] + >>> [q(p(i)) for i in range(p.size)] + [2, 0, 1] + >>> [p(q(i)) for i in range(p.size)] + [1, 2, 0] + + Disjoint Cycle Notation + ----------------------- + + In disjoint cycle notation, only the elements that have shifted are + indicated. + + For example, [1, 3, 2, 0] can be represented as (0, 1, 3)(2). + This can be understood from the 2 line format of the given permutation. + In the 2-line form, + [0 1 2 3] + [1 3 2 0] + + The element in the 0th position is 1, so 0 -> 1. The element in the 1st + position is three, so 1 -> 3. And the element in the third position is again + 0, so 3 -> 0. Thus, 0 -> 1 -> 3 -> 0, and 2 -> 2. Thus, this can be represented + as 2 cycles: (0, 1, 3)(2). + In common notation, singular cycles are not explicitly written as they can be + inferred implicitly. + + Only the relative ordering of elements in a cycle matter: + + >>> Permutation(1,2,3) == Permutation(2,3,1) == Permutation(3,1,2) + True + + The disjoint cycle notation is convenient when representing + permutations that have several cycles in them: + + >>> Permutation(1, 2)(3, 5) == Permutation([[1, 2], [3, 5]]) + True + + It also provides some economy in entry when computing products of + permutations that are written in disjoint cycle notation: + + >>> Permutation(1, 2)(1, 3)(2, 3) + Permutation([0, 3, 2, 1]) + >>> _ == Permutation([[1, 2]])*Permutation([[1, 3]])*Permutation([[2, 3]]) + True + + Caution: when the cycles have common elements between them then the order + in which the permutations are applied matters. This module applies + the permutations from *left to right*. + + >>> Permutation(1, 2)(2, 3) == Permutation([(1, 2), (2, 3)]) + True + >>> Permutation(1, 2)(2, 3).list() + [0, 3, 1, 2] + + In the above case, (1,2) is computed before (2,3). + As 0 -> 0, 0 -> 0, element in position 0 is 0. + As 1 -> 2, 2 -> 3, element in position 1 is 3. + As 2 -> 1, 1 -> 1, element in position 2 is 1. + As 3 -> 3, 3 -> 2, element in position 3 is 2. + + If the first and second elements had been + swapped first, followed by the swapping of the second + and third, the result would have been [0, 2, 3, 1]. + If, you want to apply the cycles in the conventional + right to left order, call the function with arguments in reverse order + as demonstrated below: + + >>> Permutation([(1, 2), (2, 3)][::-1]).list() + [0, 2, 3, 1] + + Entering a singleton in a permutation is a way to indicate the size of the + permutation. The ``size`` keyword can also be used. + + Array-form entry: + + >>> Permutation([[1, 2], [9]]) + Permutation([0, 2, 1], size=10) + >>> Permutation([[1, 2]], size=10) + Permutation([0, 2, 1], size=10) + + Cyclic-form entry: + + >>> Permutation(1, 2, size=10) + Permutation([0, 2, 1], size=10) + >>> Permutation(9)(1, 2) + Permutation([0, 2, 1], size=10) + + Caution: no singleton containing an element larger than the largest + in any previous cycle can be entered. This is an important difference + in how Permutation and Cycle handle the ``__call__`` syntax. A singleton + argument at the start of a Permutation performs instantiation of the + Permutation and is permitted: + + >>> Permutation(5) + Permutation([], size=6) + + A singleton entered after instantiation is a call to the permutation + -- a function call -- and if the argument is out of range it will + trigger an error. For this reason, it is better to start the cycle + with the singleton: + + The following fails because there is no element 3: + + >>> Permutation(1, 2)(3) + Traceback (most recent call last): + ... + IndexError: list index out of range + + This is ok: only the call to an out of range singleton is prohibited; + otherwise the permutation autosizes: + + >>> Permutation(3)(1, 2) + Permutation([0, 2, 1, 3]) + >>> Permutation(1, 2)(3, 4) == Permutation(3, 4)(1, 2) + True + + + Equality testing + ---------------- + + The array forms must be the same in order for permutations to be equal: + + >>> Permutation([1, 0, 2, 3]) == Permutation([1, 0]) + False + + + Identity Permutation + -------------------- + + The identity permutation is a permutation in which no element is out of + place. It can be entered in a variety of ways. All the following create + an identity permutation of size 4: + + >>> I = Permutation([0, 1, 2, 3]) + >>> all(p == I for p in [ + ... Permutation(3), + ... Permutation(range(4)), + ... Permutation([], size=4), + ... Permutation(size=4)]) + True + + Watch out for entering the range *inside* a set of brackets (which is + cycle notation): + + >>> I == Permutation([range(4)]) + False + + + Permutation Printing + ==================== + + There are a few things to note about how Permutations are printed. + + .. deprecated:: 1.6 + + Configuring Permutation printing by setting + ``Permutation.print_cyclic`` is deprecated. Users should use the + ``perm_cyclic`` flag to the printers, as described below. + + 1) If you prefer one form (array or cycle) over another, you can set + ``init_printing`` with the ``perm_cyclic`` flag. + + >>> from sympy import init_printing + >>> p = Permutation(1, 2)(4, 5)(3, 4) + >>> p + Permutation([0, 2, 1, 4, 5, 3]) + + >>> init_printing(perm_cyclic=True, pretty_print=False) + >>> p + (1 2)(3 4 5) + + 2) Regardless of the setting, a list of elements in the array for cyclic + form can be obtained and either of those can be copied and supplied as + the argument to Permutation: + + >>> p.array_form + [0, 2, 1, 4, 5, 3] + >>> p.cyclic_form + [[1, 2], [3, 4, 5]] + >>> Permutation(_) == p + True + + 3) Printing is economical in that as little as possible is printed while + retaining all information about the size of the permutation: + + >>> init_printing(perm_cyclic=False, pretty_print=False) + >>> Permutation([1, 0, 2, 3]) + Permutation([1, 0, 2, 3]) + >>> Permutation([1, 0, 2, 3], size=20) + Permutation([1, 0], size=20) + >>> Permutation([1, 0, 2, 4, 3, 5, 6], size=20) + Permutation([1, 0, 2, 4, 3], size=20) + + >>> p = Permutation([1, 0, 2, 3]) + >>> init_printing(perm_cyclic=True, pretty_print=False) + >>> p + (3)(0 1) + >>> init_printing(perm_cyclic=False, pretty_print=False) + + The 2 was not printed but it is still there as can be seen with the + array_form and size methods: + + >>> p.array_form + [1, 0, 2, 3] + >>> p.size + 4 + + Short introduction to other methods + =================================== + + The permutation can act as a bijective function, telling what element is + located at a given position + + >>> q = Permutation([5, 2, 3, 4, 1, 0]) + >>> q.array_form[1] # the hard way + 2 + >>> q(1) # the easy way + 2 + >>> {i: q(i) for i in range(q.size)} # showing the bijection + {0: 5, 1: 2, 2: 3, 3: 4, 4: 1, 5: 0} + + The full cyclic form (including singletons) can be obtained: + + >>> p.full_cyclic_form + [[0, 1], [2], [3]] + + Any permutation can be factored into transpositions of pairs of elements: + + >>> Permutation([[1, 2], [3, 4, 5]]).transpositions() + [(1, 2), (3, 5), (3, 4)] + >>> Permutation.rmul(*[Permutation([ti], size=6) for ti in _]).cyclic_form + [[1, 2], [3, 4, 5]] + + The number of permutations on a set of n elements is given by n! and is + called the cardinality. + + >>> p.size + 4 + >>> p.cardinality + 24 + + A given permutation has a rank among all the possible permutations of the + same elements, but what that rank is depends on how the permutations are + enumerated. (There are a number of different methods of doing so.) The + lexicographic rank is given by the rank method and this rank is used to + increment a permutation with addition/subtraction: + + >>> p.rank() + 6 + >>> p + 1 + Permutation([1, 0, 3, 2]) + >>> p.next_lex() + Permutation([1, 0, 3, 2]) + >>> _.rank() + 7 + >>> p.unrank_lex(p.size, rank=7) + Permutation([1, 0, 3, 2]) + + The product of two permutations p and q is defined as their composition as + functions, (p*q)(i) = q(p(i)) [6]_. + + >>> p = Permutation([1, 0, 2, 3]) + >>> q = Permutation([2, 3, 1, 0]) + >>> list(q*p) + [2, 3, 0, 1] + >>> list(p*q) + [3, 2, 1, 0] + >>> [q(p(i)) for i in range(p.size)] + [3, 2, 1, 0] + + The permutation can be 'applied' to any list-like object, not only + Permutations: + + >>> p(['zero', 'one', 'four', 'two']) + ['one', 'zero', 'four', 'two'] + >>> p('zo42') + ['o', 'z', '4', '2'] + + If you have a list of arbitrary elements, the corresponding permutation + can be found with the from_sequence method: + + >>> Permutation.from_sequence('SymPy') + Permutation([1, 3, 2, 0, 4]) + + Checking if a Permutation is contained in a Group + ================================================= + + Generally if you have a group of permutations G on n symbols, and + you're checking if a permutation on less than n symbols is part + of that group, the check will fail. + + Here is an example for n=5 and we check if the cycle + (1,2,3) is in G: + + >>> from sympy import init_printing + >>> init_printing(perm_cyclic=True, pretty_print=False) + >>> from sympy.combinatorics import Cycle, Permutation + >>> from sympy.combinatorics.perm_groups import PermutationGroup + >>> G = PermutationGroup(Cycle(2, 3)(4, 5), Cycle(1, 2, 3, 4, 5)) + >>> p1 = Permutation(Cycle(2, 5, 3)) + >>> p2 = Permutation(Cycle(1, 2, 3)) + >>> a1 = Permutation(Cycle(1, 2, 3).list(6)) + >>> a2 = Permutation(Cycle(1, 2, 3)(5)) + >>> a3 = Permutation(Cycle(1, 2, 3),size=6) + >>> for p in [p1,p2,a1,a2,a3]: p, G.contains(p) + ((2 5 3), True) + ((1 2 3), False) + ((5)(1 2 3), True) + ((5)(1 2 3), True) + ((5)(1 2 3), True) + + The check for p2 above will fail. + + Checking if p1 is in G works because SymPy knows + G is a group on 5 symbols, and p1 is also on 5 symbols + (its largest element is 5). + + For ``a1``, the ``.list(6)`` call will extend the permutation to 5 + symbols, so the test will work as well. In the case of ``a2`` the + permutation is being extended to 5 symbols by using a singleton, + and in the case of ``a3`` it's extended through the constructor + argument ``size=6``. + + There is another way to do this, which is to tell the ``contains`` + method that the number of symbols the group is on does not need to + match perfectly the number of symbols for the permutation: + + >>> G.contains(p2,strict=False) + True + + This can be via the ``strict`` argument to the ``contains`` method, + and SymPy will try to extend the permutation on its own and then + perform the containment check. + + See Also + ======== + + Cycle + + References + ========== + + .. [1] Skiena, S. 'Permutations.' 1.1 in Implementing Discrete Mathematics + Combinatorics and Graph Theory with Mathematica. Reading, MA: + Addison-Wesley, pp. 3-16, 1990. + + .. [2] Knuth, D. E. The Art of Computer Programming, Vol. 4: Combinatorial + Algorithms, 1st ed. Reading, MA: Addison-Wesley, 2011. + + .. [3] Wendy Myrvold and Frank Ruskey. 2001. Ranking and unranking + permutations in linear time. Inf. Process. Lett. 79, 6 (September 2001), + 281-284. DOI=10.1016/S0020-0190(01)00141-7 + + .. [4] D. L. Kreher, D. R. Stinson 'Combinatorial Algorithms' + CRC Press, 1999 + + .. [5] Graham, R. L.; Knuth, D. E.; and Patashnik, O. + Concrete Mathematics: A Foundation for Computer Science, 2nd ed. + Reading, MA: Addison-Wesley, 1994. + + .. [6] https://en.wikipedia.org/w/index.php?oldid=499948155#Product_and_inverse + + .. [7] https://en.wikipedia.org/wiki/Lehmer_code + + """ + + is_Permutation = True + + _array_form = None + _cyclic_form = None + _cycle_structure = None + _size = None + _rank = None + + def __new__(cls, *args, size=None, **kwargs): + """ + Constructor for the Permutation object from a list or a + list of lists in which all elements of the permutation may + appear only once. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> from sympy import init_printing + >>> init_printing(perm_cyclic=False, pretty_print=False) + + Permutations entered in array-form are left unaltered: + + >>> Permutation([0, 2, 1]) + Permutation([0, 2, 1]) + + Permutations entered in cyclic form are converted to array form; + singletons need not be entered, but can be entered to indicate the + largest element: + + >>> Permutation([[4, 5, 6], [0, 1]]) + Permutation([1, 0, 2, 3, 5, 6, 4]) + >>> Permutation([[4, 5, 6], [0, 1], [19]]) + Permutation([1, 0, 2, 3, 5, 6, 4], size=20) + + All manipulation of permutations assumes that the smallest element + is 0 (in keeping with 0-based indexing in Python) so if the 0 is + missing when entering a permutation in array form, an error will be + raised: + + >>> Permutation([2, 1]) + Traceback (most recent call last): + ... + ValueError: Integers 0 through 2 must be present. + + If a permutation is entered in cyclic form, it can be entered without + singletons and the ``size`` specified so those values can be filled + in, otherwise the array form will only extend to the maximum value + in the cycles: + + >>> Permutation([[1, 4], [3, 5, 2]], size=10) + Permutation([0, 4, 3, 5, 1, 2], size=10) + >>> _.array_form + [0, 4, 3, 5, 1, 2, 6, 7, 8, 9] + """ + if size is not None: + size = int(size) + + #a) () + #b) (1) = identity + #c) (1, 2) = cycle + #d) ([1, 2, 3]) = array form + #e) ([[1, 2]]) = cyclic form + #f) (Cycle) = conversion to permutation + #g) (Permutation) = adjust size or return copy + ok = True + if not args: # a + return cls._af_new(list(range(size or 0))) + elif len(args) > 1: # c + return cls._af_new(Cycle(*args).list(size)) + if len(args) == 1: + a = args[0] + if isinstance(a, cls): # g + if size is None or size == a.size: + return a + return cls(a.array_form, size=size) + if isinstance(a, Cycle): # f + return cls._af_new(a.list(size)) + if not is_sequence(a): # b + if size is not None and a + 1 > size: + raise ValueError('size is too small when max is %s' % a) + return cls._af_new(list(range(a + 1))) + if has_variety(is_sequence(ai) for ai in a): + ok = False + else: + ok = False + if not ok: + raise ValueError("Permutation argument must be a list of ints, " + "a list of lists, Permutation or Cycle.") + + # safe to assume args are valid; this also makes a copy + # of the args + args = list(args[0]) + + is_cycle = args and is_sequence(args[0]) + if is_cycle: # e + args = [[int(i) for i in c] for c in args] + else: # d + args = [int(i) for i in args] + + # if there are n elements present, 0, 1, ..., n-1 should be present + # unless a cycle notation has been provided. A 0 will be added + # for convenience in case one wants to enter permutations where + # counting starts from 1. + + temp = flatten(args) + if has_dups(temp) and not is_cycle: + raise ValueError('there were repeated elements.') + temp = set(temp) + + if not is_cycle: + if temp != set(range(len(temp))): + raise ValueError('Integers 0 through %s must be present.' % + max(temp)) + if size is not None and temp and max(temp) + 1 > size: + raise ValueError('max element should not exceed %s' % (size - 1)) + + if is_cycle: + # it's not necessarily canonical so we won't store + # it -- use the array form instead + c = Cycle() + for ci in args: + c = c(*ci) + aform = c.list() + else: + aform = list(args) + if size and size > len(aform): + # don't allow for truncation of permutation which + # might split a cycle and lead to an invalid aform + # but do allow the permutation size to be increased + aform.extend(list(range(len(aform), size))) + + return cls._af_new(aform) + + @classmethod + def _af_new(cls, perm): + """A method to produce a Permutation object from a list; + the list is bound to the _array_form attribute, so it must + not be modified; this method is meant for internal use only; + the list ``a`` is supposed to be generated as a temporary value + in a method, so p = Perm._af_new(a) is the only object + to hold a reference to ``a``:: + + Examples + ======== + + >>> from sympy.combinatorics.permutations import Perm + >>> from sympy import init_printing + >>> init_printing(perm_cyclic=False, pretty_print=False) + >>> a = [2, 1, 3, 0] + >>> p = Perm._af_new(a) + >>> p + Permutation([2, 1, 3, 0]) + + """ + p = super().__new__(cls) + p._array_form = perm + p._size = len(perm) + return p + + def copy(self): + return self.__class__(self.array_form) + + def __getnewargs__(self): + return (self.array_form,) + + def _hashable_content(self): + # the array_form (a list) is the Permutation arg, so we need to + # return a tuple, instead + return tuple(self.array_form) + + @property + def array_form(self): + """ + Return a copy of the attribute _array_form + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([[2, 0], [3, 1]]) + >>> p.array_form + [2, 3, 0, 1] + >>> Permutation([[2, 0, 3, 1]]).array_form + [3, 2, 0, 1] + >>> Permutation([2, 0, 3, 1]).array_form + [2, 0, 3, 1] + >>> Permutation([[1, 2], [4, 5]]).array_form + [0, 2, 1, 3, 5, 4] + """ + return self._array_form[:] + + def list(self, size=None): + """Return the permutation as an explicit list, possibly + trimming unmoved elements if size is less than the maximum + element in the permutation; if this is desired, setting + ``size=-1`` will guarantee such trimming. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation(2, 3)(4, 5) + >>> p.list() + [0, 1, 3, 2, 5, 4] + >>> p.list(10) + [0, 1, 3, 2, 5, 4, 6, 7, 8, 9] + + Passing a length too small will trim trailing, unchanged elements + in the permutation: + + >>> Permutation(2, 4)(1, 2, 4).list(-1) + [0, 2, 1] + >>> Permutation(3).list(-1) + [] + """ + if not self and size is None: + raise ValueError('must give size for empty Cycle') + rv = self.array_form + if size is not None: + if size > self.size: + rv.extend(list(range(self.size, size))) + else: + # find first value from rhs where rv[i] != i + i = self.size - 1 + while rv: + if rv[-1] != i: + break + rv.pop() + i -= 1 + return rv + + @property + def cyclic_form(self): + """ + This is used to convert to the cyclic notation + from the canonical notation. Singletons are omitted. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([0, 3, 1, 2]) + >>> p.cyclic_form + [[1, 3, 2]] + >>> Permutation([1, 0, 2, 4, 3, 5]).cyclic_form + [[0, 1], [3, 4]] + + See Also + ======== + + array_form, full_cyclic_form + """ + if self._cyclic_form is not None: + return list(self._cyclic_form) + array_form = self.array_form + unchecked = [True] * len(array_form) + cyclic_form = [] + for i in range(len(array_form)): + if unchecked[i]: + cycle = [] + cycle.append(i) + unchecked[i] = False + j = i + while unchecked[array_form[j]]: + j = array_form[j] + cycle.append(j) + unchecked[j] = False + if len(cycle) > 1: + cyclic_form.append(cycle) + assert cycle == list(minlex(cycle)) + cyclic_form.sort() + self._cyclic_form = cyclic_form.copy() + return cyclic_form + + @property + def full_cyclic_form(self): + """Return permutation in cyclic form including singletons. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> Permutation([0, 2, 1]).full_cyclic_form + [[0], [1, 2]] + """ + need = set(range(self.size)) - set(flatten(self.cyclic_form)) + rv = self.cyclic_form + [[i] for i in need] + rv.sort() + return rv + + @property + def size(self): + """ + Returns the number of elements in the permutation. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> Permutation([[3, 2], [0, 1]]).size + 4 + + See Also + ======== + + cardinality, length, order, rank + """ + return self._size + + def support(self): + """Return the elements in permutation, P, for which P[i] != i. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([[3, 2], [0, 1], [4]]) + >>> p.array_form + [1, 0, 3, 2, 4] + >>> p.support() + [0, 1, 2, 3] + """ + a = self.array_form + return [i for i, e in enumerate(a) if e != i] + + def __add__(self, other): + """Return permutation that is other higher in rank than self. + + The rank is the lexicographical rank, with the identity permutation + having rank of 0. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> I = Permutation([0, 1, 2, 3]) + >>> a = Permutation([2, 1, 3, 0]) + >>> I + a.rank() == a + True + + See Also + ======== + + __sub__, inversion_vector + + """ + rank = (self.rank() + other) % self.cardinality + rv = self.unrank_lex(self.size, rank) + rv._rank = rank + return rv + + def __sub__(self, other): + """Return the permutation that is other lower in rank than self. + + See Also + ======== + + __add__ + """ + return self.__add__(-other) + + @staticmethod + def rmul(*args): + """ + Return product of Permutations [a, b, c, ...] as the Permutation whose + ith value is a(b(c(i))). + + a, b, c, ... can be Permutation objects or tuples. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + + >>> a, b = [1, 0, 2], [0, 2, 1] + >>> a = Permutation(a); b = Permutation(b) + >>> list(Permutation.rmul(a, b)) + [1, 2, 0] + >>> [a(b(i)) for i in range(3)] + [1, 2, 0] + + This handles the operands in reverse order compared to the ``*`` operator: + + >>> a = Permutation(a); b = Permutation(b) + >>> list(a*b) + [2, 0, 1] + >>> [b(a(i)) for i in range(3)] + [2, 0, 1] + + Notes + ===== + + All items in the sequence will be parsed by Permutation as + necessary as long as the first item is a Permutation: + + >>> Permutation.rmul(a, [0, 2, 1]) == Permutation.rmul(a, b) + True + + The reverse order of arguments will raise a TypeError. + + """ + rv = args[0] + for i in range(1, len(args)): + rv = args[i]*rv + return rv + + @classmethod + def rmul_with_af(cls, *args): + """ + same as rmul, but the elements of args are Permutation objects + which have _array_form + """ + a = [x._array_form for x in args] + rv = cls._af_new(_af_rmuln(*a)) + return rv + + def mul_inv(self, other): + """ + other*~self, self and other have _array_form + """ + a = _af_invert(self._array_form) + b = other._array_form + return self._af_new(_af_rmul(a, b)) + + def __rmul__(self, other): + """This is needed to coerce other to Permutation in rmul.""" + cls = type(self) + return cls(other)*self + + def __mul__(self, other): + """ + Return the product a*b as a Permutation; the ith value is b(a(i)). + + Examples + ======== + + >>> from sympy.combinatorics.permutations import _af_rmul, Permutation + + >>> a, b = [1, 0, 2], [0, 2, 1] + >>> a = Permutation(a); b = Permutation(b) + >>> list(a*b) + [2, 0, 1] + >>> [b(a(i)) for i in range(3)] + [2, 0, 1] + + This handles operands in reverse order compared to _af_rmul and rmul: + + >>> al = list(a); bl = list(b) + >>> _af_rmul(al, bl) + [1, 2, 0] + >>> [al[bl[i]] for i in range(3)] + [1, 2, 0] + + It is acceptable for the arrays to have different lengths; the shorter + one will be padded to match the longer one: + + >>> from sympy import init_printing + >>> init_printing(perm_cyclic=False, pretty_print=False) + >>> b*Permutation([1, 0]) + Permutation([1, 2, 0]) + >>> Permutation([1, 0])*b + Permutation([2, 0, 1]) + + It is also acceptable to allow coercion to handle conversion of a + single list to the left of a Permutation: + + >>> [0, 1]*a # no change: 2-element identity + Permutation([1, 0, 2]) + >>> [[0, 1]]*a # exchange first two elements + Permutation([0, 1, 2]) + + You cannot use more than 1 cycle notation in a product of cycles + since coercion can only handle one argument to the left. To handle + multiple cycles it is convenient to use Cycle instead of Permutation: + + >>> [[1, 2]]*[[2, 3]]*Permutation([]) # doctest: +SKIP + >>> from sympy.combinatorics.permutations import Cycle + >>> Cycle(1, 2)(2, 3) + (1 3 2) + + """ + from sympy.combinatorics.perm_groups import PermutationGroup, Coset + if isinstance(other, PermutationGroup): + return Coset(self, other, dir='-') + a = self.array_form + # __rmul__ makes sure the other is a Permutation + b = other.array_form + if not b: + perm = a + else: + b.extend(list(range(len(b), len(a)))) + perm = [b[i] for i in a] + b[len(a):] + return self._af_new(perm) + + def commutes_with(self, other): + """ + Checks if the elements are commuting. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> a = Permutation([1, 4, 3, 0, 2, 5]) + >>> b = Permutation([0, 1, 2, 3, 4, 5]) + >>> a.commutes_with(b) + True + >>> b = Permutation([2, 3, 5, 4, 1, 0]) + >>> a.commutes_with(b) + False + """ + a = self.array_form + b = other.array_form + return _af_commutes_with(a, b) + + def __pow__(self, n): + """ + Routine for finding powers of a permutation. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> from sympy import init_printing + >>> init_printing(perm_cyclic=False, pretty_print=False) + >>> p = Permutation([2, 0, 3, 1]) + >>> p.order() + 4 + >>> p**4 + Permutation([0, 1, 2, 3]) + """ + if isinstance(n, Permutation): + raise NotImplementedError( + 'p**p is not defined; do you mean p^p (conjugate)?') + n = int(n) + return self._af_new(_af_pow(self.array_form, n)) + + def __rxor__(self, i): + """Return self(i) when ``i`` is an int. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation(1, 2, 9) + >>> 2^p == p(2) == 9 + True + """ + if int_valued(i): + return self(i) + else: + raise NotImplementedError( + "i^p = p(i) when i is an integer, not %s." % i) + + def __xor__(self, h): + """Return the conjugate permutation ``~h*self*h` `. + + Explanation + =========== + + If ``a`` and ``b`` are conjugates, ``a = h*b*~h`` and + ``b = ~h*a*h`` and both have the same cycle structure. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation(1, 2, 9) + >>> q = Permutation(6, 9, 8) + >>> p*q != q*p + True + + Calculate and check properties of the conjugate: + + >>> c = p^q + >>> c == ~q*p*q and p == q*c*~q + True + + The expression q^p^r is equivalent to q^(p*r): + + >>> r = Permutation(9)(4, 6, 8) + >>> q^p^r == q^(p*r) + True + + If the term to the left of the conjugate operator, i, is an integer + then this is interpreted as selecting the ith element from the + permutation to the right: + + >>> all(i^p == p(i) for i in range(p.size)) + True + + Note that the * operator as higher precedence than the ^ operator: + + >>> q^r*p^r == q^(r*p)^r == Permutation(9)(1, 6, 4) + True + + Notes + ===== + + In Python the precedence rule is p^q^r = (p^q)^r which differs + in general from p^(q^r) + + >>> q^p^r + (9)(1 4 8) + >>> q^(p^r) + (9)(1 8 6) + + For a given r and p, both of the following are conjugates of p: + ~r*p*r and r*p*~r. But these are not necessarily the same: + + >>> ~r*p*r == r*p*~r + True + + >>> p = Permutation(1, 2, 9)(5, 6) + >>> ~r*p*r == r*p*~r + False + + The conjugate ~r*p*r was chosen so that ``p^q^r`` would be equivalent + to ``p^(q*r)`` rather than ``p^(r*q)``. To obtain r*p*~r, pass ~r to + this method: + + >>> p^~r == r*p*~r + True + """ + + if self.size != h.size: + raise ValueError("The permutations must be of equal size.") + a = [None]*self.size + h = h._array_form + p = self._array_form + for i in range(self.size): + a[h[i]] = h[p[i]] + return self._af_new(a) + + def transpositions(self): + """ + Return the permutation decomposed into a list of transpositions. + + Explanation + =========== + + It is always possible to express a permutation as the product of + transpositions, see [1] + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([[1, 2, 3], [0, 4, 5, 6, 7]]) + >>> t = p.transpositions() + >>> t + [(0, 7), (0, 6), (0, 5), (0, 4), (1, 3), (1, 2)] + >>> print(''.join(str(c) for c in t)) + (0, 7)(0, 6)(0, 5)(0, 4)(1, 3)(1, 2) + >>> Permutation.rmul(*[Permutation([ti], size=p.size) for ti in t]) == p + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Transposition_%28mathematics%29#Properties + + """ + a = self.cyclic_form + res = [] + for x in a: + nx = len(x) + if nx == 2: + res.append(tuple(x)) + elif nx > 2: + first = x[0] + res.extend((first, y) for y in x[nx - 1:0:-1]) + return res + + @classmethod + def from_sequence(self, i, key=None): + """Return the permutation needed to obtain ``i`` from the sorted + elements of ``i``. If custom sorting is desired, a key can be given. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + + >>> Permutation.from_sequence('SymPy') + (4)(0 1 3) + >>> _(sorted("SymPy")) + ['S', 'y', 'm', 'P', 'y'] + >>> Permutation.from_sequence('SymPy', key=lambda x: x.lower()) + (4)(0 2)(1 3) + """ + ic = list(zip(i, list(range(len(i))))) + if key: + ic.sort(key=lambda x: key(x[0])) + else: + ic.sort() + return ~Permutation([i[1] for i in ic]) + + def __invert__(self): + """ + Return the inverse of the permutation. + + A permutation multiplied by its inverse is the identity permutation. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> from sympy import init_printing + >>> init_printing(perm_cyclic=False, pretty_print=False) + >>> p = Permutation([[2, 0], [3, 1]]) + >>> ~p + Permutation([2, 3, 0, 1]) + >>> _ == p**-1 + True + >>> p*~p == ~p*p == Permutation([0, 1, 2, 3]) + True + """ + return self._af_new(_af_invert(self._array_form)) + + def __iter__(self): + """Yield elements from array form. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> list(Permutation(range(3))) + [0, 1, 2] + """ + yield from self.array_form + + def __repr__(self): + return srepr(self) + + def __call__(self, *i): + """ + Allows applying a permutation instance as a bijective function. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([[2, 0], [3, 1]]) + >>> p.array_form + [2, 3, 0, 1] + >>> [p(i) for i in range(4)] + [2, 3, 0, 1] + + If an array is given then the permutation selects the items + from the array (i.e. the permutation is applied to the array): + + >>> from sympy.abc import x + >>> p([x, 1, 0, x**2]) + [0, x**2, x, 1] + """ + # list indices can be Integer or int; leave this + # as it is (don't test or convert it) because this + # gets called a lot and should be fast + if len(i) == 1: + i = i[0] + if not isinstance(i, Iterable): + i = as_int(i) + if i < 0 or i > self.size: + raise TypeError( + "{} should be an integer between 0 and {}" + .format(i, self.size-1)) + return self._array_form[i] + # P([a, b, c]) + if len(i) != self.size: + raise TypeError( + "{} should have the length {}.".format(i, self.size)) + return [i[j] for j in self._array_form] + # P(1, 2, 3) + return self*Permutation(Cycle(*i), size=self.size) + + def atoms(self): + """ + Returns all the elements of a permutation + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> Permutation([0, 1, 2, 3, 4, 5]).atoms() + {0, 1, 2, 3, 4, 5} + >>> Permutation([[0, 1], [2, 3], [4, 5]]).atoms() + {0, 1, 2, 3, 4, 5} + """ + return set(self.array_form) + + def apply(self, i): + r"""Apply the permutation to an expression. + + Parameters + ========== + + i : Expr + It should be an integer between $0$ and $n-1$ where $n$ + is the size of the permutation. + + If it is a symbol or a symbolic expression that can + have integer values, an ``AppliedPermutation`` object + will be returned which can represent an unevaluated + function. + + Notes + ===== + + Any permutation can be defined as a bijective function + $\sigma : \{ 0, 1, \dots, n-1 \} \rightarrow \{ 0, 1, \dots, n-1 \}$ + where $n$ denotes the size of the permutation. + + The definition may even be extended for any set with distinctive + elements, such that the permutation can even be applied for + real numbers or such, however, it is not implemented for now for + computational reasons and the integrity with the group theory + module. + + This function is similar to the ``__call__`` magic, however, + ``__call__`` magic already has some other applications like + permuting an array or attaching new cycles, which would + not always be mathematically consistent. + + This also guarantees that the return type is a SymPy integer, + which guarantees the safety to use assumptions. + """ + i = _sympify(i) + if i.is_integer is False: + raise NotImplementedError("{} should be an integer.".format(i)) + + n = self.size + if (i < 0) == True or (i >= n) == True: + raise NotImplementedError( + "{} should be an integer between 0 and {}".format(i, n-1)) + + if i.is_Integer: + return Integer(self._array_form[i]) + return AppliedPermutation(self, i) + + def next_lex(self): + """ + Returns the next permutation in lexicographical order. + If self is the last permutation in lexicographical order + it returns None. + See [4] section 2.4. + + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([2, 3, 1, 0]) + >>> p = Permutation([2, 3, 1, 0]); p.rank() + 17 + >>> p = p.next_lex(); p.rank() + 18 + + See Also + ======== + + rank, unrank_lex + """ + perm = self.array_form[:] + n = len(perm) + i = n - 2 + while perm[i + 1] < perm[i]: + i -= 1 + if i == -1: + return None + else: + j = n - 1 + while perm[j] < perm[i]: + j -= 1 + perm[j], perm[i] = perm[i], perm[j] + i += 1 + j = n - 1 + while i < j: + perm[j], perm[i] = perm[i], perm[j] + i += 1 + j -= 1 + return self._af_new(perm) + + @classmethod + def unrank_nonlex(self, n, r): + """ + This is a linear time unranking algorithm that does not + respect lexicographic order [3]. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> from sympy import init_printing + >>> init_printing(perm_cyclic=False, pretty_print=False) + >>> Permutation.unrank_nonlex(4, 5) + Permutation([2, 0, 3, 1]) + >>> Permutation.unrank_nonlex(4, -1) + Permutation([0, 1, 2, 3]) + + See Also + ======== + + next_nonlex, rank_nonlex + """ + def _unrank1(n, r, a): + if n > 0: + a[n - 1], a[r % n] = a[r % n], a[n - 1] + _unrank1(n - 1, r//n, a) + + id_perm = list(range(n)) + n = int(n) + r = r % ifac(n) + _unrank1(n, r, id_perm) + return self._af_new(id_perm) + + def rank_nonlex(self, inv_perm=None): + """ + This is a linear time ranking algorithm that does not + enforce lexicographic order [3]. + + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([0, 1, 2, 3]) + >>> p.rank_nonlex() + 23 + + See Also + ======== + + next_nonlex, unrank_nonlex + """ + def _rank1(n, perm, inv_perm): + if n == 1: + return 0 + s = perm[n - 1] + t = inv_perm[n - 1] + perm[n - 1], perm[t] = perm[t], s + inv_perm[n - 1], inv_perm[s] = inv_perm[s], t + return s + n*_rank1(n - 1, perm, inv_perm) + + if inv_perm is None: + inv_perm = (~self).array_form + if not inv_perm: + return 0 + perm = self.array_form[:] + r = _rank1(len(perm), perm, inv_perm) + return r + + def next_nonlex(self): + """ + Returns the next permutation in nonlex order [3]. + If self is the last permutation in this order it returns None. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> from sympy import init_printing + >>> init_printing(perm_cyclic=False, pretty_print=False) + >>> p = Permutation([2, 0, 3, 1]); p.rank_nonlex() + 5 + >>> p = p.next_nonlex(); p + Permutation([3, 0, 1, 2]) + >>> p.rank_nonlex() + 6 + + See Also + ======== + + rank_nonlex, unrank_nonlex + """ + r = self.rank_nonlex() + if r == ifac(self.size) - 1: + return None + return self.unrank_nonlex(self.size, r + 1) + + def rank(self): + """ + Returns the lexicographic rank of the permutation. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([0, 1, 2, 3]) + >>> p.rank() + 0 + >>> p = Permutation([3, 2, 1, 0]) + >>> p.rank() + 23 + + See Also + ======== + + next_lex, unrank_lex, cardinality, length, order, size + """ + if self._rank is not None: + return self._rank + rank = 0 + rho = self.array_form[:] + n = self.size - 1 + size = n + 1 + psize = int(ifac(n)) + for j in range(size - 1): + rank += rho[j]*psize + for i in range(j + 1, size): + if rho[i] > rho[j]: + rho[i] -= 1 + psize //= n + n -= 1 + self._rank = rank + return rank + + @property + def cardinality(self): + """ + Returns the number of all possible permutations. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([0, 1, 2, 3]) + >>> p.cardinality + 24 + + See Also + ======== + + length, order, rank, size + """ + return int(ifac(self.size)) + + def parity(self): + """ + Computes the parity of a permutation. + + Explanation + =========== + + The parity of a permutation reflects the parity of the + number of inversions in the permutation, i.e., the + number of pairs of x and y such that ``x > y`` but ``p[x] < p[y]``. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([0, 1, 2, 3]) + >>> p.parity() + 0 + >>> p = Permutation([3, 2, 0, 1]) + >>> p.parity() + 1 + + See Also + ======== + + _af_parity + """ + if self._cyclic_form is not None: + return (self.size - self.cycles) % 2 + + return _af_parity(self.array_form) + + @property + def is_even(self): + """ + Checks if a permutation is even. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([0, 1, 2, 3]) + >>> p.is_even + True + >>> p = Permutation([3, 2, 1, 0]) + >>> p.is_even + True + + See Also + ======== + + is_odd + """ + return not self.is_odd + + @property + def is_odd(self): + """ + Checks if a permutation is odd. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([0, 1, 2, 3]) + >>> p.is_odd + False + >>> p = Permutation([3, 2, 0, 1]) + >>> p.is_odd + True + + See Also + ======== + + is_even + """ + return bool(self.parity() % 2) + + @property + def is_Singleton(self): + """ + Checks to see if the permutation contains only one number and is + thus the only possible permutation of this set of numbers + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> Permutation([0]).is_Singleton + True + >>> Permutation([0, 1]).is_Singleton + False + + See Also + ======== + + is_Empty + """ + return self.size == 1 + + @property + def is_Empty(self): + """ + Checks to see if the permutation is a set with zero elements + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> Permutation([]).is_Empty + True + >>> Permutation([0]).is_Empty + False + + See Also + ======== + + is_Singleton + """ + return self.size == 0 + + @property + def is_identity(self): + return self.is_Identity + + @property + def is_Identity(self): + """ + Returns True if the Permutation is an identity permutation. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([]) + >>> p.is_Identity + True + >>> p = Permutation([[0], [1], [2]]) + >>> p.is_Identity + True + >>> p = Permutation([0, 1, 2]) + >>> p.is_Identity + True + >>> p = Permutation([0, 2, 1]) + >>> p.is_Identity + False + + See Also + ======== + + order + """ + af = self.array_form + return not af or all(i == af[i] for i in range(self.size)) + + def ascents(self): + """ + Returns the positions of ascents in a permutation, ie, the location + where p[i] < p[i+1] + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([4, 0, 1, 3, 2]) + >>> p.ascents() + [1, 2] + + See Also + ======== + + descents, inversions, min, max + """ + a = self.array_form + pos = [i for i in range(len(a) - 1) if a[i] < a[i + 1]] + return pos + + def descents(self): + """ + Returns the positions of descents in a permutation, ie, the location + where p[i] > p[i+1] + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([4, 0, 1, 3, 2]) + >>> p.descents() + [0, 3] + + See Also + ======== + + ascents, inversions, min, max + """ + a = self.array_form + pos = [i for i in range(len(a) - 1) if a[i] > a[i + 1]] + return pos + + def max(self) -> int: + """ + The maximum element moved by the permutation. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([1, 0, 2, 3, 4]) + >>> p.max() + 1 + + See Also + ======== + + min, descents, ascents, inversions + """ + a = self.array_form + if not a: + return 0 + return max(_a for i, _a in enumerate(a) if _a != i) + + def min(self) -> int: + """ + The minimum element moved by the permutation. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([0, 1, 4, 3, 2]) + >>> p.min() + 2 + + See Also + ======== + + max, descents, ascents, inversions + """ + a = self.array_form + if not a: + return 0 + return min(_a for i, _a in enumerate(a) if _a != i) + + def inversions(self): + """ + Computes the number of inversions of a permutation. + + Explanation + =========== + + An inversion is where i > j but p[i] < p[j]. + + For small length of p, it iterates over all i and j + values and calculates the number of inversions. + For large length of p, it uses a variation of merge + sort to calculate the number of inversions. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([0, 1, 2, 3, 4, 5]) + >>> p.inversions() + 0 + >>> Permutation([3, 2, 1, 0]).inversions() + 6 + + See Also + ======== + + descents, ascents, min, max + + References + ========== + + .. [1] https://www.cp.eng.chula.ac.th/~prabhas//teaching/algo/algo2008/count-inv.htm + + """ + inversions = 0 + a = self.array_form + n = len(a) + if n < 130: + for i in range(n - 1): + b = a[i] + for c in a[i + 1:]: + if b > c: + inversions += 1 + else: + k = 1 + right = 0 + arr = a[:] + temp = a[:] + while k < n: + i = 0 + while i + k < n: + right = i + k * 2 - 1 + if right >= n: + right = n - 1 + inversions += _merge(arr, temp, i, i + k, right) + i = i + k * 2 + k = k * 2 + return inversions + + def commutator(self, x): + """Return the commutator of ``self`` and ``x``: ``~x*~self*x*self`` + + If f and g are part of a group, G, then the commutator of f and g + is the group identity iff f and g commute, i.e. fg == gf. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> from sympy import init_printing + >>> init_printing(perm_cyclic=False, pretty_print=False) + >>> p = Permutation([0, 2, 3, 1]) + >>> x = Permutation([2, 0, 3, 1]) + >>> c = p.commutator(x); c + Permutation([2, 1, 3, 0]) + >>> c == ~x*~p*x*p + True + + >>> I = Permutation(3) + >>> p = [I + i for i in range(6)] + >>> for i in range(len(p)): + ... for j in range(len(p)): + ... c = p[i].commutator(p[j]) + ... if p[i]*p[j] == p[j]*p[i]: + ... assert c == I + ... else: + ... assert c != I + ... + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Commutator + """ + + a = self.array_form + b = x.array_form + n = len(a) + if len(b) != n: + raise ValueError("The permutations must be of equal size.") + inva = [None]*n + for i in range(n): + inva[a[i]] = i + invb = [None]*n + for i in range(n): + invb[b[i]] = i + return self._af_new([a[b[inva[i]]] for i in invb]) + + def signature(self): + """ + Gives the signature of the permutation needed to place the + elements of the permutation in canonical order. + + The signature is calculated as (-1)^ + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([0, 1, 2]) + >>> p.inversions() + 0 + >>> p.signature() + 1 + >>> q = Permutation([0,2,1]) + >>> q.inversions() + 1 + >>> q.signature() + -1 + + See Also + ======== + + inversions + """ + if self.is_even: + return 1 + return -1 + + def order(self): + """ + Computes the order of a permutation. + + When the permutation is raised to the power of its + order it equals the identity permutation. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> from sympy import init_printing + >>> init_printing(perm_cyclic=False, pretty_print=False) + >>> p = Permutation([3, 1, 5, 2, 4, 0]) + >>> p.order() + 4 + >>> (p**(p.order())) + Permutation([], size=6) + + See Also + ======== + + identity, cardinality, length, rank, size + """ + + return reduce(lcm, [len(cycle) for cycle in self.cyclic_form], 1) + + def length(self): + """ + Returns the number of integers moved by a permutation. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> Permutation([0, 3, 2, 1]).length() + 2 + >>> Permutation([[0, 1], [2, 3]]).length() + 4 + + See Also + ======== + + min, max, support, cardinality, order, rank, size + """ + + return len(self.support()) + + @property + def cycle_structure(self): + """Return the cycle structure of the permutation as a dictionary + indicating the multiplicity of each cycle length. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> Permutation(3).cycle_structure + {1: 4} + >>> Permutation(0, 4, 3)(1, 2)(5, 6).cycle_structure + {2: 2, 3: 1} + """ + if self._cycle_structure: + rv = self._cycle_structure + else: + rv = defaultdict(int) + singletons = self.size + for c in self.cyclic_form: + rv[len(c)] += 1 + singletons -= len(c) + if singletons: + rv[1] = singletons + self._cycle_structure = rv + return dict(rv) # make a copy + + @property + def cycles(self): + """ + Returns the number of cycles contained in the permutation + (including singletons). + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> Permutation([0, 1, 2]).cycles + 3 + >>> Permutation([0, 1, 2]).full_cyclic_form + [[0], [1], [2]] + >>> Permutation(0, 1)(2, 3).cycles + 2 + + See Also + ======== + sympy.functions.combinatorial.numbers.stirling + """ + return len(self.full_cyclic_form) + + def index(self): + """ + Returns the index of a permutation. + + The index of a permutation is the sum of all subscripts j such + that p[j] is greater than p[j+1]. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([3, 0, 2, 1, 4]) + >>> p.index() + 2 + """ + a = self.array_form + + return sum(j for j in range(len(a) - 1) if a[j] > a[j + 1]) + + def runs(self): + """ + Returns the runs of a permutation. + + An ascending sequence in a permutation is called a run [5]. + + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([2, 5, 7, 3, 6, 0, 1, 4, 8]) + >>> p.runs() + [[2, 5, 7], [3, 6], [0, 1, 4, 8]] + >>> q = Permutation([1,3,2,0]) + >>> q.runs() + [[1, 3], [2], [0]] + """ + return runs(self.array_form) + + def inversion_vector(self): + """Return the inversion vector of the permutation. + + The inversion vector consists of elements whose value + indicates the number of elements in the permutation + that are lesser than it and lie on its right hand side. + + The inversion vector is the same as the Lehmer encoding of a + permutation. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([4, 8, 0, 7, 1, 5, 3, 6, 2]) + >>> p.inversion_vector() + [4, 7, 0, 5, 0, 2, 1, 1] + >>> p = Permutation([3, 2, 1, 0]) + >>> p.inversion_vector() + [3, 2, 1] + + The inversion vector increases lexicographically with the rank + of the permutation, the -ith element cycling through 0..i. + + >>> p = Permutation(2) + >>> while p: + ... print('%s %s %s' % (p, p.inversion_vector(), p.rank())) + ... p = p.next_lex() + (2) [0, 0] 0 + (1 2) [0, 1] 1 + (2)(0 1) [1, 0] 2 + (0 1 2) [1, 1] 3 + (0 2 1) [2, 0] 4 + (0 2) [2, 1] 5 + + See Also + ======== + + from_inversion_vector + """ + self_array_form = self.array_form + n = len(self_array_form) + inversion_vector = [0] * (n - 1) + + for i in range(n - 1): + val = 0 + for j in range(i + 1, n): + if self_array_form[j] < self_array_form[i]: + val += 1 + inversion_vector[i] = val + return inversion_vector + + def rank_trotterjohnson(self): + """ + Returns the Trotter Johnson rank, which we get from the minimal + change algorithm. See [4] section 2.4. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([0, 1, 2, 3]) + >>> p.rank_trotterjohnson() + 0 + >>> p = Permutation([0, 2, 1, 3]) + >>> p.rank_trotterjohnson() + 7 + + See Also + ======== + + unrank_trotterjohnson, next_trotterjohnson + """ + if self.array_form == [] or self.is_Identity: + return 0 + if self.array_form == [1, 0]: + return 1 + perm = self.array_form + n = self.size + rank = 0 + for j in range(1, n): + k = 1 + i = 0 + while perm[i] != j: + if perm[i] < j: + k += 1 + i += 1 + j1 = j + 1 + if rank % 2 == 0: + rank = j1*rank + j1 - k + else: + rank = j1*rank + k - 1 + return rank + + @classmethod + def unrank_trotterjohnson(cls, size, rank): + """ + Trotter Johnson permutation unranking. See [4] section 2.4. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> from sympy import init_printing + >>> init_printing(perm_cyclic=False, pretty_print=False) + >>> Permutation.unrank_trotterjohnson(5, 10) + Permutation([0, 3, 1, 2, 4]) + + See Also + ======== + + rank_trotterjohnson, next_trotterjohnson + """ + perm = [0]*size + r2 = 0 + n = ifac(size) + pj = 1 + for j in range(2, size + 1): + pj *= j + r1 = (rank * pj) // n + k = r1 - j*r2 + if r2 % 2 == 0: + for i in range(j - 1, j - k - 1, -1): + perm[i] = perm[i - 1] + perm[j - k - 1] = j - 1 + else: + for i in range(j - 1, k, -1): + perm[i] = perm[i - 1] + perm[k] = j - 1 + r2 = r1 + return cls._af_new(perm) + + def next_trotterjohnson(self): + """ + Returns the next permutation in Trotter-Johnson order. + If self is the last permutation it returns None. + See [4] section 2.4. If it is desired to generate all such + permutations, they can be generated in order more quickly + with the ``generate_bell`` function. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> from sympy import init_printing + >>> init_printing(perm_cyclic=False, pretty_print=False) + >>> p = Permutation([3, 0, 2, 1]) + >>> p.rank_trotterjohnson() + 4 + >>> p = p.next_trotterjohnson(); p + Permutation([0, 3, 2, 1]) + >>> p.rank_trotterjohnson() + 5 + + See Also + ======== + + rank_trotterjohnson, unrank_trotterjohnson, sympy.utilities.iterables.generate_bell + """ + pi = self.array_form[:] + n = len(pi) + st = 0 + rho = pi[:] + done = False + m = n-1 + while m > 0 and not done: + d = rho.index(m) + for i in range(d, m): + rho[i] = rho[i + 1] + par = _af_parity(rho[:m]) + if par == 1: + if d == m: + m -= 1 + else: + pi[st + d], pi[st + d + 1] = pi[st + d + 1], pi[st + d] + done = True + else: + if d == 0: + m -= 1 + st += 1 + else: + pi[st + d], pi[st + d - 1] = pi[st + d - 1], pi[st + d] + done = True + if m == 0: + return None + return self._af_new(pi) + + def get_precedence_matrix(self): + """ + Gets the precedence matrix. This is used for computing the + distance between two permutations. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> from sympy import init_printing + >>> init_printing(perm_cyclic=False, pretty_print=False) + >>> p = Permutation.josephus(3, 6, 1) + >>> p + Permutation([2, 5, 3, 1, 4, 0]) + >>> p.get_precedence_matrix() + Matrix([ + [0, 0, 0, 0, 0, 0], + [1, 0, 0, 0, 1, 0], + [1, 1, 0, 1, 1, 1], + [1, 1, 0, 0, 1, 0], + [1, 0, 0, 0, 0, 0], + [1, 1, 0, 1, 1, 0]]) + + See Also + ======== + + get_precedence_distance, get_adjacency_matrix, get_adjacency_distance + """ + m = zeros(self.size) + perm = self.array_form + for i in range(m.rows): + for j in range(i + 1, m.cols): + m[perm[i], perm[j]] = 1 + return m + + def get_precedence_distance(self, other): + """ + Computes the precedence distance between two permutations. + + Explanation + =========== + + Suppose p and p' represent n jobs. The precedence metric + counts the number of times a job j is preceded by job i + in both p and p'. This metric is commutative. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([2, 0, 4, 3, 1]) + >>> q = Permutation([3, 1, 2, 4, 0]) + >>> p.get_precedence_distance(q) + 7 + >>> q.get_precedence_distance(p) + 7 + + See Also + ======== + + get_precedence_matrix, get_adjacency_matrix, get_adjacency_distance + """ + if self.size != other.size: + raise ValueError("The permutations must be of equal size.") + self_prec_mat = self.get_precedence_matrix() + other_prec_mat = other.get_precedence_matrix() + n_prec = 0 + for i in range(self.size): + for j in range(self.size): + if i == j: + continue + if self_prec_mat[i, j] * other_prec_mat[i, j] == 1: + n_prec += 1 + d = self.size * (self.size - 1)//2 - n_prec + return d + + def get_adjacency_matrix(self): + """ + Computes the adjacency matrix of a permutation. + + Explanation + =========== + + If job i is adjacent to job j in a permutation p + then we set m[i, j] = 1 where m is the adjacency + matrix of p. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation.josephus(3, 6, 1) + >>> p.get_adjacency_matrix() + Matrix([ + [0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 1, 0], + [0, 0, 0, 0, 0, 1], + [0, 1, 0, 0, 0, 0], + [1, 0, 0, 0, 0, 0], + [0, 0, 0, 1, 0, 0]]) + >>> q = Permutation([0, 1, 2, 3]) + >>> q.get_adjacency_matrix() + Matrix([ + [0, 1, 0, 0], + [0, 0, 1, 0], + [0, 0, 0, 1], + [0, 0, 0, 0]]) + + See Also + ======== + + get_precedence_matrix, get_precedence_distance, get_adjacency_distance + """ + m = zeros(self.size) + perm = self.array_form + for i in range(self.size - 1): + m[perm[i], perm[i + 1]] = 1 + return m + + def get_adjacency_distance(self, other): + """ + Computes the adjacency distance between two permutations. + + Explanation + =========== + + This metric counts the number of times a pair i,j of jobs is + adjacent in both p and p'. If n_adj is this quantity then + the adjacency distance is n - n_adj - 1 [1] + + [1] Reeves, Colin R. Landscapes, Operators and Heuristic search, Annals + of Operational Research, 86, pp 473-490. (1999) + + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([0, 3, 1, 2, 4]) + >>> q = Permutation.josephus(4, 5, 2) + >>> p.get_adjacency_distance(q) + 3 + >>> r = Permutation([0, 2, 1, 4, 3]) + >>> p.get_adjacency_distance(r) + 4 + + See Also + ======== + + get_precedence_matrix, get_precedence_distance, get_adjacency_matrix + """ + if self.size != other.size: + raise ValueError("The permutations must be of the same size.") + self_adj_mat = self.get_adjacency_matrix() + other_adj_mat = other.get_adjacency_matrix() + n_adj = 0 + for i in range(self.size): + for j in range(self.size): + if i == j: + continue + if self_adj_mat[i, j] * other_adj_mat[i, j] == 1: + n_adj += 1 + d = self.size - n_adj - 1 + return d + + def get_positional_distance(self, other): + """ + Computes the positional distance between two permutations. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> p = Permutation([0, 3, 1, 2, 4]) + >>> q = Permutation.josephus(4, 5, 2) + >>> r = Permutation([3, 1, 4, 0, 2]) + >>> p.get_positional_distance(q) + 12 + >>> p.get_positional_distance(r) + 12 + + See Also + ======== + + get_precedence_distance, get_adjacency_distance + """ + a = self.array_form + b = other.array_form + if len(a) != len(b): + raise ValueError("The permutations must be of the same size.") + return sum(abs(a[i] - b[i]) for i in range(len(a))) + + @classmethod + def josephus(cls, m, n, s=1): + """Return as a permutation the shuffling of range(n) using the Josephus + scheme in which every m-th item is selected until all have been chosen. + The returned permutation has elements listed by the order in which they + were selected. + + The parameter ``s`` stops the selection process when there are ``s`` + items remaining and these are selected by continuing the selection, + counting by 1 rather than by ``m``. + + Consider selecting every 3rd item from 6 until only 2 remain:: + + choices chosen + ======== ====== + 012345 + 01 345 2 + 01 34 25 + 01 4 253 + 0 4 2531 + 0 25314 + 253140 + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> Permutation.josephus(3, 6, 2).array_form + [2, 5, 3, 1, 4, 0] + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Flavius_Josephus + .. [2] https://en.wikipedia.org/wiki/Josephus_problem + .. [3] https://web.archive.org/web/20171008094331/http://www.wou.edu/~burtonl/josephus.html + + """ + from collections import deque + m -= 1 + Q = deque(list(range(n))) + perm = [] + while len(Q) > max(s, 1): + for dp in range(m): + Q.append(Q.popleft()) + perm.append(Q.popleft()) + perm.extend(list(Q)) + return cls(perm) + + @classmethod + def from_inversion_vector(cls, inversion): + """ + Calculates the permutation from the inversion vector. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> from sympy import init_printing + >>> init_printing(perm_cyclic=False, pretty_print=False) + >>> Permutation.from_inversion_vector([3, 2, 1, 0, 0]) + Permutation([3, 2, 1, 0, 4, 5]) + + """ + size = len(inversion) + N = list(range(size + 1)) + perm = [] + try: + for k in range(size): + val = N[inversion[k]] + perm.append(val) + N.remove(val) + except IndexError: + raise ValueError("The inversion vector is not valid.") + perm.extend(N) + return cls._af_new(perm) + + @classmethod + def random(cls, n): + """ + Generates a random permutation of length ``n``. + + Uses the underlying Python pseudo-random number generator. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> Permutation.random(2) in (Permutation([1, 0]), Permutation([0, 1])) + True + + """ + perm_array = list(range(n)) + random.shuffle(perm_array) + return cls._af_new(perm_array) + + @classmethod + def unrank_lex(cls, size, rank): + """ + Lexicographic permutation unranking. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> from sympy import init_printing + >>> init_printing(perm_cyclic=False, pretty_print=False) + >>> a = Permutation.unrank_lex(5, 10) + >>> a.rank() + 10 + >>> a + Permutation([0, 2, 4, 1, 3]) + + See Also + ======== + + rank, next_lex + """ + perm_array = [0] * size + psize = 1 + for i in range(size): + new_psize = psize*(i + 1) + d = (rank % new_psize) // psize + rank -= d*psize + perm_array[size - i - 1] = d + for j in range(size - i, size): + if perm_array[j] > d - 1: + perm_array[j] += 1 + psize = new_psize + return cls._af_new(perm_array) + + def resize(self, n): + """Resize the permutation to the new size ``n``. + + Parameters + ========== + + n : int + The new size of the permutation. + + Raises + ====== + + ValueError + If the permutation cannot be resized to the given size. + This may only happen when resized to a smaller size than + the original. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + + Increasing the size of a permutation: + + >>> p = Permutation(0, 1, 2) + >>> p = p.resize(5) + >>> p + (4)(0 1 2) + + Decreasing the size of the permutation: + + >>> p = p.resize(4) + >>> p + (3)(0 1 2) + + If resizing to the specific size breaks the cycles: + + >>> p.resize(2) + Traceback (most recent call last): + ... + ValueError: The permutation cannot be resized to 2 because the + cycle (0, 1, 2) may break. + """ + aform = self.array_form + l = len(aform) + if n > l: + aform += list(range(l, n)) + return Permutation._af_new(aform) + + elif n < l: + cyclic_form = self.full_cyclic_form + new_cyclic_form = [] + for cycle in cyclic_form: + cycle_min = min(cycle) + cycle_max = max(cycle) + if cycle_min <= n-1: + if cycle_max > n-1: + raise ValueError( + "The permutation cannot be resized to {} " + "because the cycle {} may break." + .format(n, tuple(cycle))) + + new_cyclic_form.append(cycle) + return Permutation(new_cyclic_form) + + return self + + # XXX Deprecated flag + print_cyclic = None + + +def _merge(arr, temp, left, mid, right): + """ + Merges two sorted arrays and calculates the inversion count. + + Helper function for calculating inversions. This method is + for internal use only. + """ + i = k = left + j = mid + inv_count = 0 + while i < mid and j <= right: + if arr[i] < arr[j]: + temp[k] = arr[i] + k += 1 + i += 1 + else: + temp[k] = arr[j] + k += 1 + j += 1 + inv_count += (mid -i) + while i < mid: + temp[k] = arr[i] + k += 1 + i += 1 + if j <= right: + k += right - j + 1 + j += right - j + 1 + arr[left:k + 1] = temp[left:k + 1] + else: + arr[left:right + 1] = temp[left:right + 1] + return inv_count + +Perm = Permutation +_af_new = Perm._af_new + + +class AppliedPermutation(Expr): + """A permutation applied to a symbolic variable. + + Parameters + ========== + + perm : Permutation + x : Expr + + Examples + ======== + + >>> from sympy import Symbol + >>> from sympy.combinatorics import Permutation + + Creating a symbolic permutation function application: + + >>> x = Symbol('x') + >>> p = Permutation(0, 1, 2) + >>> p.apply(x) + AppliedPermutation((0 1 2), x) + >>> _.subs(x, 1) + 2 + """ + def __new__(cls, perm, x, evaluate=None): + if evaluate is None: + evaluate = global_parameters.evaluate + + perm = _sympify(perm) + x = _sympify(x) + + if not isinstance(perm, Permutation): + raise ValueError("{} must be a Permutation instance." + .format(perm)) + + if evaluate: + if x.is_Integer: + return perm.apply(x) + + obj = super().__new__(cls, perm, x) + return obj + + +@dispatch(Permutation, Permutation) +def _eval_is_eq(lhs, rhs): + if lhs._size != rhs._size: + return None + return lhs._array_form == rhs._array_form diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/polyhedron.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/polyhedron.py new file mode 100644 index 0000000000000000000000000000000000000000..2bc05d7d97c840649661f3290442499c841ca7c1 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/polyhedron.py @@ -0,0 +1,1019 @@ +from sympy.combinatorics import Permutation as Perm +from sympy.combinatorics.perm_groups import PermutationGroup +from sympy.core import Basic, Tuple, default_sort_key +from sympy.sets import FiniteSet +from sympy.utilities.iterables import (minlex, unflatten, flatten) +from sympy.utilities.misc import as_int + +rmul = Perm.rmul + + +class Polyhedron(Basic): + """ + Represents the polyhedral symmetry group (PSG). + + Explanation + =========== + + The PSG is one of the symmetry groups of the Platonic solids. + There are three polyhedral groups: the tetrahedral group + of order 12, the octahedral group of order 24, and the + icosahedral group of order 60. + + All doctests have been given in the docstring of the + constructor of the object. + + References + ========== + + .. [1] https://mathworld.wolfram.com/PolyhedralGroup.html + + """ + _edges = None + + def __new__(cls, corners, faces=(), pgroup=()): + """ + The constructor of the Polyhedron group object. + + Explanation + =========== + + It takes up to three parameters: the corners, faces, and + allowed transformations. + + The corners/vertices are entered as a list of arbitrary + expressions that are used to identify each vertex. + + The faces are entered as a list of tuples of indices; a tuple + of indices identifies the vertices which define the face. They + should be entered in a cw or ccw order; they will be standardized + by reversal and rotation to be give the lowest lexical ordering. + If no faces are given then no edges will be computed. + + >>> from sympy.combinatorics.polyhedron import Polyhedron + >>> Polyhedron(list('abc'), [(1, 2, 0)]).faces + {(0, 1, 2)} + >>> Polyhedron(list('abc'), [(1, 0, 2)]).faces + {(0, 1, 2)} + + The allowed transformations are entered as allowable permutations + of the vertices for the polyhedron. Instance of Permutations + (as with faces) should refer to the supplied vertices by index. + These permutation are stored as a PermutationGroup. + + Examples + ======== + + >>> from sympy.combinatorics.permutations import Permutation + >>> from sympy import init_printing + >>> from sympy.abc import w, x, y, z + >>> init_printing(pretty_print=False, perm_cyclic=False) + + Here we construct the Polyhedron object for a tetrahedron. + + >>> corners = [w, x, y, z] + >>> faces = [(0, 1, 2), (0, 2, 3), (0, 3, 1), (1, 2, 3)] + + Next, allowed transformations of the polyhedron must be given. This + is given as permutations of vertices. + + Although the vertices of a tetrahedron can be numbered in 24 (4!) + different ways, there are only 12 different orientations for a + physical tetrahedron. The following permutations, applied once or + twice, will generate all 12 of the orientations. (The identity + permutation, Permutation(range(4)), is not included since it does + not change the orientation of the vertices.) + + >>> pgroup = [Permutation([[0, 1, 2], [3]]), \ + Permutation([[0, 1, 3], [2]]), \ + Permutation([[0, 2, 3], [1]]), \ + Permutation([[1, 2, 3], [0]]), \ + Permutation([[0, 1], [2, 3]]), \ + Permutation([[0, 2], [1, 3]]), \ + Permutation([[0, 3], [1, 2]])] + + The Polyhedron is now constructed and demonstrated: + + >>> tetra = Polyhedron(corners, faces, pgroup) + >>> tetra.size + 4 + >>> tetra.edges + {(0, 1), (0, 2), (0, 3), (1, 2), (1, 3), (2, 3)} + >>> tetra.corners + (w, x, y, z) + + It can be rotated with an arbitrary permutation of vertices, e.g. + the following permutation is not in the pgroup: + + >>> tetra.rotate(Permutation([0, 1, 3, 2])) + >>> tetra.corners + (w, x, z, y) + + An allowed permutation of the vertices can be constructed by + repeatedly applying permutations from the pgroup to the vertices. + Here is a demonstration that applying p and p**2 for every p in + pgroup generates all the orientations of a tetrahedron and no others: + + >>> all = ( (w, x, y, z), \ + (x, y, w, z), \ + (y, w, x, z), \ + (w, z, x, y), \ + (z, w, y, x), \ + (w, y, z, x), \ + (y, z, w, x), \ + (x, z, y, w), \ + (z, y, x, w), \ + (y, x, z, w), \ + (x, w, z, y), \ + (z, x, w, y) ) + + >>> got = [] + >>> for p in (pgroup + [p**2 for p in pgroup]): + ... h = Polyhedron(corners) + ... h.rotate(p) + ... got.append(h.corners) + ... + >>> set(got) == set(all) + True + + The make_perm method of a PermutationGroup will randomly pick + permutations, multiply them together, and return the permutation that + can be applied to the polyhedron to give the orientation produced + by those individual permutations. + + Here, 3 permutations are used: + + >>> tetra.pgroup.make_perm(3) # doctest: +SKIP + Permutation([0, 3, 1, 2]) + + To select the permutations that should be used, supply a list + of indices to the permutations in pgroup in the order they should + be applied: + + >>> use = [0, 0, 2] + >>> p002 = tetra.pgroup.make_perm(3, use) + >>> p002 + Permutation([1, 0, 3, 2]) + + + Apply them one at a time: + + >>> tetra.reset() + >>> for i in use: + ... tetra.rotate(pgroup[i]) + ... + >>> tetra.vertices + (x, w, z, y) + >>> sequentially = tetra.vertices + + Apply the composite permutation: + + >>> tetra.reset() + >>> tetra.rotate(p002) + >>> tetra.corners + (x, w, z, y) + >>> tetra.corners in all and tetra.corners == sequentially + True + + Notes + ===== + + Defining permutation groups + --------------------------- + + It is not necessary to enter any permutations, nor is necessary to + enter a complete set of transformations. In fact, for a polyhedron, + all configurations can be constructed from just two permutations. + For example, the orientations of a tetrahedron can be generated from + an axis passing through a vertex and face and another axis passing + through a different vertex or from an axis passing through the + midpoints of two edges opposite of each other. + + For simplicity of presentation, consider a square -- + not a cube -- with vertices 1, 2, 3, and 4: + + 1-----2 We could think of axes of rotation being: + | | 1) through the face + | | 2) from midpoint 1-2 to 3-4 or 1-3 to 2-4 + 3-----4 3) lines 1-4 or 2-3 + + + To determine how to write the permutations, imagine 4 cameras, + one at each corner, labeled A-D: + + A B A B + 1-----2 1-----3 vertex index: + | | | | 1 0 + | | | | 2 1 + 3-----4 2-----4 3 2 + C D C D 4 3 + + original after rotation + along 1-4 + + A diagonal and a face axis will be chosen for the "permutation group" + from which any orientation can be constructed. + + >>> pgroup = [] + + Imagine a clockwise rotation when viewing 1-4 from camera A. The new + orientation is (in camera-order): 1, 3, 2, 4 so the permutation is + given using the *indices* of the vertices as: + + >>> pgroup.append(Permutation((0, 2, 1, 3))) + + Now imagine rotating clockwise when looking down an axis entering the + center of the square as viewed. The new camera-order would be + 3, 1, 4, 2 so the permutation is (using indices): + + >>> pgroup.append(Permutation((2, 0, 3, 1))) + + The square can now be constructed: + ** use real-world labels for the vertices, entering them in + camera order + ** for the faces we use zero-based indices of the vertices + in *edge-order* as the face is traversed; neither the + direction nor the starting point matter -- the faces are + only used to define edges (if so desired). + + >>> square = Polyhedron((1, 2, 3, 4), [(0, 1, 3, 2)], pgroup) + + To rotate the square with a single permutation we can do: + + >>> square.rotate(square.pgroup[0]) + >>> square.corners + (1, 3, 2, 4) + + To use more than one permutation (or to use one permutation more + than once) it is more convenient to use the make_perm method: + + >>> p011 = square.pgroup.make_perm([0, 1, 1]) # diag flip + 2 rotations + >>> square.reset() # return to initial orientation + >>> square.rotate(p011) + >>> square.corners + (4, 2, 3, 1) + + Thinking outside the box + ------------------------ + + Although the Polyhedron object has a direct physical meaning, it + actually has broader application. In the most general sense it is + just a decorated PermutationGroup, allowing one to connect the + permutations to something physical. For example, a Rubik's cube is + not a proper polyhedron, but the Polyhedron class can be used to + represent it in a way that helps to visualize the Rubik's cube. + + >>> from sympy import flatten, unflatten, symbols + >>> from sympy.combinatorics import RubikGroup + >>> facelets = flatten([symbols(s+'1:5') for s in 'UFRBLD']) + >>> def show(): + ... pairs = unflatten(r2.corners, 2) + ... print(pairs[::2]) + ... print(pairs[1::2]) + ... + >>> r2 = Polyhedron(facelets, pgroup=RubikGroup(2)) + >>> show() + [(U1, U2), (F1, F2), (R1, R2), (B1, B2), (L1, L2), (D1, D2)] + [(U3, U4), (F3, F4), (R3, R4), (B3, B4), (L3, L4), (D3, D4)] + >>> r2.rotate(0) # cw rotation of F + >>> show() + [(U1, U2), (F3, F1), (U3, R2), (B1, B2), (L1, D1), (R3, R1)] + [(L4, L2), (F4, F2), (U4, R4), (B3, B4), (L3, D2), (D3, D4)] + + Predefined Polyhedra + ==================== + + For convenience, the vertices and faces are defined for the following + standard solids along with a permutation group for transformations. + When the polyhedron is oriented as indicated below, the vertices in + a given horizontal plane are numbered in ccw direction, starting from + the vertex that will give the lowest indices in a given face. (In the + net of the vertices, indices preceded by "-" indicate replication of + the lhs index in the net.) + + tetrahedron, tetrahedron_faces + ------------------------------ + + 4 vertices (vertex up) net: + + 0 0-0 + 1 2 3-1 + + 4 faces: + + (0, 1, 2) (0, 2, 3) (0, 3, 1) (1, 2, 3) + + cube, cube_faces + ---------------- + + 8 vertices (face up) net: + + 0 1 2 3-0 + 4 5 6 7-4 + + 6 faces: + + (0, 1, 2, 3) + (0, 1, 5, 4) (1, 2, 6, 5) (2, 3, 7, 6) (0, 3, 7, 4) + (4, 5, 6, 7) + + octahedron, octahedron_faces + ---------------------------- + + 6 vertices (vertex up) net: + + 0 0 0-0 + 1 2 3 4-1 + 5 5 5-5 + + 8 faces: + + (0, 1, 2) (0, 2, 3) (0, 3, 4) (0, 1, 4) + (1, 2, 5) (2, 3, 5) (3, 4, 5) (1, 4, 5) + + dodecahedron, dodecahedron_faces + -------------------------------- + + 20 vertices (vertex up) net: + + 0 1 2 3 4 -0 + 5 6 7 8 9 -5 + 14 10 11 12 13-14 + 15 16 17 18 19-15 + + 12 faces: + + (0, 1, 2, 3, 4) (0, 1, 6, 10, 5) (1, 2, 7, 11, 6) + (2, 3, 8, 12, 7) (3, 4, 9, 13, 8) (0, 4, 9, 14, 5) + (5, 10, 16, 15, 14) (6, 10, 16, 17, 11) (7, 11, 17, 18, 12) + (8, 12, 18, 19, 13) (9, 13, 19, 15, 14)(15, 16, 17, 18, 19) + + icosahedron, icosahedron_faces + ------------------------------ + + 12 vertices (face up) net: + + 0 0 0 0 -0 + 1 2 3 4 5 -1 + 6 7 8 9 10 -6 + 11 11 11 11 -11 + + 20 faces: + + (0, 1, 2) (0, 2, 3) (0, 3, 4) + (0, 4, 5) (0, 1, 5) (1, 2, 6) + (2, 3, 7) (3, 4, 8) (4, 5, 9) + (1, 5, 10) (2, 6, 7) (3, 7, 8) + (4, 8, 9) (5, 9, 10) (1, 6, 10) + (6, 7, 11) (7, 8, 11) (8, 9, 11) + (9, 10, 11) (6, 10, 11) + + >>> from sympy.combinatorics.polyhedron import cube + >>> cube.edges + {(0, 1), (0, 3), (0, 4), (1, 2), (1, 5), (2, 3), (2, 6), (3, 7), (4, 5), (4, 7), (5, 6), (6, 7)} + + If you want to use letters or other names for the corners you + can still use the pre-calculated faces: + + >>> corners = list('abcdefgh') + >>> Polyhedron(corners, cube.faces).corners + (a, b, c, d, e, f, g, h) + + References + ========== + + .. [1] www.ocf.berkeley.edu/~wwu/articles/platonicsolids.pdf + + """ + faces = [minlex(f, directed=False, key=default_sort_key) for f in faces] + corners, faces, pgroup = args = \ + [Tuple(*a) for a in (corners, faces, pgroup)] + obj = Basic.__new__(cls, *args) + obj._corners = tuple(corners) # in order given + obj._faces = FiniteSet(*faces) + if pgroup and pgroup[0].size != len(corners): + raise ValueError("Permutation size unequal to number of corners.") + # use the identity permutation if none are given + obj._pgroup = PermutationGroup( + pgroup or [Perm(range(len(corners)))] ) + return obj + + @property + def corners(self): + """ + Get the corners of the Polyhedron. + + The method ``vertices`` is an alias for ``corners``. + + Examples + ======== + + >>> from sympy.combinatorics import Polyhedron + >>> from sympy.abc import a, b, c, d + >>> p = Polyhedron(list('abcd')) + >>> p.corners == p.vertices == (a, b, c, d) + True + + See Also + ======== + + array_form, cyclic_form + """ + return self._corners + vertices = corners + + @property + def array_form(self): + """Return the indices of the corners. + + The indices are given relative to the original position of corners. + + Examples + ======== + + >>> from sympy.combinatorics.polyhedron import tetrahedron + >>> tetrahedron = tetrahedron.copy() + >>> tetrahedron.array_form + [0, 1, 2, 3] + + >>> tetrahedron.rotate(0) + >>> tetrahedron.array_form + [0, 2, 3, 1] + >>> tetrahedron.pgroup[0].array_form + [0, 2, 3, 1] + + See Also + ======== + + corners, cyclic_form + """ + corners = list(self.args[0]) + return [corners.index(c) for c in self.corners] + + @property + def cyclic_form(self): + """Return the indices of the corners in cyclic notation. + + The indices are given relative to the original position of corners. + + See Also + ======== + + corners, array_form + """ + return Perm._af_new(self.array_form).cyclic_form + + @property + def size(self): + """ + Get the number of corners of the Polyhedron. + """ + return len(self._corners) + + @property + def faces(self): + """ + Get the faces of the Polyhedron. + """ + return self._faces + + @property + def pgroup(self): + """ + Get the permutations of the Polyhedron. + """ + return self._pgroup + + @property + def edges(self): + """ + Given the faces of the polyhedra we can get the edges. + + Examples + ======== + + >>> from sympy.combinatorics import Polyhedron + >>> from sympy.abc import a, b, c + >>> corners = (a, b, c) + >>> faces = [(0, 1, 2)] + >>> Polyhedron(corners, faces).edges + {(0, 1), (0, 2), (1, 2)} + + """ + if self._edges is None: + output = set() + for face in self.faces: + for i in range(len(face)): + edge = tuple(sorted([face[i], face[i - 1]])) + output.add(edge) + self._edges = FiniteSet(*output) + return self._edges + + def rotate(self, perm): + """ + Apply a permutation to the polyhedron *in place*. The permutation + may be given as a Permutation instance or an integer indicating + which permutation from pgroup of the Polyhedron should be + applied. + + This is an operation that is analogous to rotation about + an axis by a fixed increment. + + Notes + ===== + + When a Permutation is applied, no check is done to see if that + is a valid permutation for the Polyhedron. For example, a cube + could be given a permutation which effectively swaps only 2 + vertices. A valid permutation (that rotates the object in a + physical way) will be obtained if one only uses + permutations from the ``pgroup`` of the Polyhedron. On the other + hand, allowing arbitrary rotations (applications of permutations) + gives a way to follow named elements rather than indices since + Polyhedron allows vertices to be named while Permutation works + only with indices. + + Examples + ======== + + >>> from sympy.combinatorics import Polyhedron, Permutation + >>> from sympy.combinatorics.polyhedron import cube + >>> cube = cube.copy() + >>> cube.corners + (0, 1, 2, 3, 4, 5, 6, 7) + >>> cube.rotate(0) + >>> cube.corners + (1, 2, 3, 0, 5, 6, 7, 4) + + A non-physical "rotation" that is not prohibited by this method: + + >>> cube.reset() + >>> cube.rotate(Permutation([[1, 2]], size=8)) + >>> cube.corners + (0, 2, 1, 3, 4, 5, 6, 7) + + Polyhedron can be used to follow elements of set that are + identified by letters instead of integers: + + >>> shadow = h5 = Polyhedron(list('abcde')) + >>> p = Permutation([3, 0, 1, 2, 4]) + >>> h5.rotate(p) + >>> h5.corners + (d, a, b, c, e) + >>> _ == shadow.corners + True + >>> copy = h5.copy() + >>> h5.rotate(p) + >>> h5.corners == copy.corners + False + """ + if not isinstance(perm, Perm): + perm = self.pgroup[perm] + # and we know it's valid + else: + if perm.size != self.size: + raise ValueError('Polyhedron and Permutation sizes differ.') + a = perm.array_form + corners = [self.corners[a[i]] for i in range(len(self.corners))] + self._corners = tuple(corners) + + def reset(self): + """Return corners to their original positions. + + Examples + ======== + + >>> from sympy.combinatorics.polyhedron import tetrahedron as T + >>> T = T.copy() + >>> T.corners + (0, 1, 2, 3) + >>> T.rotate(0) + >>> T.corners + (0, 2, 3, 1) + >>> T.reset() + >>> T.corners + (0, 1, 2, 3) + """ + self._corners = self.args[0] + + +def _pgroup_calcs(): + """Return the permutation groups for each of the polyhedra and the face + definitions: tetrahedron, cube, octahedron, dodecahedron, icosahedron, + tetrahedron_faces, cube_faces, octahedron_faces, dodecahedron_faces, + icosahedron_faces + + Explanation + =========== + + (This author did not find and did not know of a better way to do it though + there likely is such a way.) + + Although only 2 permutations are needed for a polyhedron in order to + generate all the possible orientations, a group of permutations is + provided instead. A set of permutations is called a "group" if:: + + a*b = c (for any pair of permutations in the group, a and b, their + product, c, is in the group) + + a*(b*c) = (a*b)*c (for any 3 permutations in the group associativity holds) + + there is an identity permutation, I, such that I*a = a*I for all elements + in the group + + a*b = I (the inverse of each permutation is also in the group) + + None of the polyhedron groups defined follow these definitions of a group. + Instead, they are selected to contain those permutations whose powers + alone will construct all orientations of the polyhedron, i.e. for + permutations ``a``, ``b``, etc... in the group, ``a, a**2, ..., a**o_a``, + ``b, b**2, ..., b**o_b``, etc... (where ``o_i`` is the order of + permutation ``i``) generate all permutations of the polyhedron instead of + mixed products like ``a*b``, ``a*b**2``, etc.... + + Note that for a polyhedron with n vertices, the valid permutations of the + vertices exclude those that do not maintain its faces. e.g. the + permutation BCDE of a square's four corners, ABCD, is a valid + permutation while CBDE is not (because this would twist the square). + + Examples + ======== + + The is_group checks for: closure, the presence of the Identity permutation, + and the presence of the inverse for each of the elements in the group. This + confirms that none of the polyhedra are true groups: + + >>> from sympy.combinatorics.polyhedron import ( + ... tetrahedron, cube, octahedron, dodecahedron, icosahedron) + ... + >>> polyhedra = (tetrahedron, cube, octahedron, dodecahedron, icosahedron) + >>> [h.pgroup.is_group for h in polyhedra] + ... + [True, True, True, True, True] + + Although tests in polyhedron's test suite check that powers of the + permutations in the groups generate all permutations of the vertices + of the polyhedron, here we also demonstrate the powers of the given + permutations create a complete group for the tetrahedron: + + >>> from sympy.combinatorics import Permutation, PermutationGroup + >>> for h in polyhedra[:1]: + ... G = h.pgroup + ... perms = set() + ... for g in G: + ... for e in range(g.order()): + ... p = tuple((g**e).array_form) + ... perms.add(p) + ... + ... perms = [Permutation(p) for p in perms] + ... assert PermutationGroup(perms).is_group + + In addition to doing the above, the tests in the suite confirm that the + faces are all present after the application of each permutation. + + References + ========== + + .. [1] https://dogschool.tripod.com/trianglegroup.html + + """ + def _pgroup_of_double(polyh, ordered_faces, pgroup): + n = len(ordered_faces[0]) + # the vertices of the double which sits inside a give polyhedron + # can be found by tracking the faces of the outer polyhedron. + # A map between face and the vertex of the double is made so that + # after rotation the position of the vertices can be located + fmap = dict(zip(ordered_faces, + range(len(ordered_faces)))) + flat_faces = flatten(ordered_faces) + new_pgroup = [] + for p in pgroup: + h = polyh.copy() + h.rotate(p) + c = h.corners + # reorder corners in the order they should appear when + # enumerating the faces + reorder = unflatten([c[j] for j in flat_faces], n) + # make them canonical + reorder = [tuple(map(as_int, + minlex(f, directed=False))) + for f in reorder] + # map face to vertex: the resulting list of vertices are the + # permutation that we seek for the double + new_pgroup.append(Perm([fmap[f] for f in reorder])) + return new_pgroup + + tetrahedron_faces = [ + (0, 1, 2), (0, 2, 3), (0, 3, 1), # upper 3 + (1, 2, 3), # bottom + ] + + # cw from top + # + _t_pgroup = [ + Perm([[1, 2, 3], [0]]), # cw from top + Perm([[0, 1, 2], [3]]), # cw from front face + Perm([[0, 3, 2], [1]]), # cw from back right face + Perm([[0, 3, 1], [2]]), # cw from back left face + Perm([[0, 1], [2, 3]]), # through front left edge + Perm([[0, 2], [1, 3]]), # through front right edge + Perm([[0, 3], [1, 2]]), # through back edge + ] + + tetrahedron = Polyhedron( + range(4), + tetrahedron_faces, + _t_pgroup) + + cube_faces = [ + (0, 1, 2, 3), # upper + (0, 1, 5, 4), (1, 2, 6, 5), (2, 3, 7, 6), (0, 3, 7, 4), # middle 4 + (4, 5, 6, 7), # lower + ] + + # U, D, F, B, L, R = up, down, front, back, left, right + _c_pgroup = [Perm(p) for p in + [ + [1, 2, 3, 0, 5, 6, 7, 4], # cw from top, U + [4, 0, 3, 7, 5, 1, 2, 6], # cw from F face + [4, 5, 1, 0, 7, 6, 2, 3], # cw from R face + + [1, 0, 4, 5, 2, 3, 7, 6], # cw through UF edge + [6, 2, 1, 5, 7, 3, 0, 4], # cw through UR edge + [6, 7, 3, 2, 5, 4, 0, 1], # cw through UB edge + [3, 7, 4, 0, 2, 6, 5, 1], # cw through UL edge + [4, 7, 6, 5, 0, 3, 2, 1], # cw through FL edge + [6, 5, 4, 7, 2, 1, 0, 3], # cw through FR edge + + [0, 3, 7, 4, 1, 2, 6, 5], # cw through UFL vertex + [5, 1, 0, 4, 6, 2, 3, 7], # cw through UFR vertex + [5, 6, 2, 1, 4, 7, 3, 0], # cw through UBR vertex + [7, 4, 0, 3, 6, 5, 1, 2], # cw through UBL + ]] + + cube = Polyhedron( + range(8), + cube_faces, + _c_pgroup) + + octahedron_faces = [ + (0, 1, 2), (0, 2, 3), (0, 3, 4), (0, 1, 4), # top 4 + (1, 2, 5), (2, 3, 5), (3, 4, 5), (1, 4, 5), # bottom 4 + ] + + octahedron = Polyhedron( + range(6), + octahedron_faces, + _pgroup_of_double(cube, cube_faces, _c_pgroup)) + + dodecahedron_faces = [ + (0, 1, 2, 3, 4), # top + (0, 1, 6, 10, 5), (1, 2, 7, 11, 6), (2, 3, 8, 12, 7), # upper 5 + (3, 4, 9, 13, 8), (0, 4, 9, 14, 5), + (5, 10, 16, 15, 14), (6, 10, 16, 17, 11), (7, 11, 17, 18, + 12), # lower 5 + (8, 12, 18, 19, 13), (9, 13, 19, 15, 14), + (15, 16, 17, 18, 19) # bottom + ] + + def _string_to_perm(s): + rv = [Perm(range(20))] + p = None + for si in s: + if si not in '01': + count = int(si) - 1 + else: + count = 1 + if si == '0': + p = _f0 + elif si == '1': + p = _f1 + rv.extend([p]*count) + return Perm.rmul(*rv) + + # top face cw + _f0 = Perm([ + 1, 2, 3, 4, 0, 6, 7, 8, 9, 5, 11, + 12, 13, 14, 10, 16, 17, 18, 19, 15]) + # front face cw + _f1 = Perm([ + 5, 0, 4, 9, 14, 10, 1, 3, 13, 15, + 6, 2, 8, 19, 16, 17, 11, 7, 12, 18]) + # the strings below, like 0104 are shorthand for F0*F1*F0**4 and are + # the remaining 4 face rotations, 15 edge permutations, and the + # 10 vertex rotations. + _dodeca_pgroup = [_f0, _f1] + [_string_to_perm(s) for s in ''' + 0104 140 014 0410 + 010 1403 03104 04103 102 + 120 1304 01303 021302 03130 + 0412041 041204103 04120410 041204104 041204102 + 10 01 1402 0140 04102 0412 1204 1302 0130 03120'''.strip().split()] + + dodecahedron = Polyhedron( + range(20), + dodecahedron_faces, + _dodeca_pgroup) + + icosahedron_faces = [ + (0, 1, 2), (0, 2, 3), (0, 3, 4), (0, 4, 5), (0, 1, 5), + (1, 6, 7), (1, 2, 7), (2, 7, 8), (2, 3, 8), (3, 8, 9), + (3, 4, 9), (4, 9, 10), (4, 5, 10), (5, 6, 10), (1, 5, 6), + (6, 7, 11), (7, 8, 11), (8, 9, 11), (9, 10, 11), (6, 10, 11)] + + icosahedron = Polyhedron( + range(12), + icosahedron_faces, + _pgroup_of_double( + dodecahedron, dodecahedron_faces, _dodeca_pgroup)) + + return (tetrahedron, cube, octahedron, dodecahedron, icosahedron, + tetrahedron_faces, cube_faces, octahedron_faces, + dodecahedron_faces, icosahedron_faces) + +# ----------------------------------------------------------------------- +# Standard Polyhedron groups +# +# These are generated using _pgroup_calcs() above. However to save +# import time we encode them explicitly here. +# ----------------------------------------------------------------------- + +tetrahedron = Polyhedron( + Tuple(0, 1, 2, 3), + Tuple( + Tuple(0, 1, 2), + Tuple(0, 2, 3), + Tuple(0, 1, 3), + Tuple(1, 2, 3)), + Tuple( + Perm(1, 2, 3), + Perm(3)(0, 1, 2), + Perm(0, 3, 2), + Perm(0, 3, 1), + Perm(0, 1)(2, 3), + Perm(0, 2)(1, 3), + Perm(0, 3)(1, 2) + )) + +cube = Polyhedron( + Tuple(0, 1, 2, 3, 4, 5, 6, 7), + Tuple( + Tuple(0, 1, 2, 3), + Tuple(0, 1, 5, 4), + Tuple(1, 2, 6, 5), + Tuple(2, 3, 7, 6), + Tuple(0, 3, 7, 4), + Tuple(4, 5, 6, 7)), + Tuple( + Perm(0, 1, 2, 3)(4, 5, 6, 7), + Perm(0, 4, 5, 1)(2, 3, 7, 6), + Perm(0, 4, 7, 3)(1, 5, 6, 2), + Perm(0, 1)(2, 4)(3, 5)(6, 7), + Perm(0, 6)(1, 2)(3, 5)(4, 7), + Perm(0, 6)(1, 7)(2, 3)(4, 5), + Perm(0, 3)(1, 7)(2, 4)(5, 6), + Perm(0, 4)(1, 7)(2, 6)(3, 5), + Perm(0, 6)(1, 5)(2, 4)(3, 7), + Perm(1, 3, 4)(2, 7, 5), + Perm(7)(0, 5, 2)(3, 4, 6), + Perm(0, 5, 7)(1, 6, 3), + Perm(0, 7, 2)(1, 4, 6))) + +octahedron = Polyhedron( + Tuple(0, 1, 2, 3, 4, 5), + Tuple( + Tuple(0, 1, 2), + Tuple(0, 2, 3), + Tuple(0, 3, 4), + Tuple(0, 1, 4), + Tuple(1, 2, 5), + Tuple(2, 3, 5), + Tuple(3, 4, 5), + Tuple(1, 4, 5)), + Tuple( + Perm(5)(1, 2, 3, 4), + Perm(0, 4, 5, 2), + Perm(0, 1, 5, 3), + Perm(0, 1)(2, 4)(3, 5), + Perm(0, 2)(1, 3)(4, 5), + Perm(0, 3)(1, 5)(2, 4), + Perm(0, 4)(1, 3)(2, 5), + Perm(0, 5)(1, 4)(2, 3), + Perm(0, 5)(1, 2)(3, 4), + Perm(0, 4, 1)(2, 3, 5), + Perm(0, 1, 2)(3, 4, 5), + Perm(0, 2, 3)(1, 5, 4), + Perm(0, 4, 3)(1, 5, 2))) + +dodecahedron = Polyhedron( + Tuple(0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18, 19), + Tuple( + Tuple(0, 1, 2, 3, 4), + Tuple(0, 1, 6, 10, 5), + Tuple(1, 2, 7, 11, 6), + Tuple(2, 3, 8, 12, 7), + Tuple(3, 4, 9, 13, 8), + Tuple(0, 4, 9, 14, 5), + Tuple(5, 10, 16, 15, 14), + Tuple(6, 10, 16, 17, 11), + Tuple(7, 11, 17, 18, 12), + Tuple(8, 12, 18, 19, 13), + Tuple(9, 13, 19, 15, 14), + Tuple(15, 16, 17, 18, 19)), + Tuple( + Perm(0, 1, 2, 3, 4)(5, 6, 7, 8, 9)(10, 11, 12, 13, 14)(15, 16, 17, 18, 19), + Perm(0, 5, 10, 6, 1)(2, 4, 14, 16, 11)(3, 9, 15, 17, 7)(8, 13, 19, 18, 12), + Perm(0, 10, 17, 12, 3)(1, 6, 11, 7, 2)(4, 5, 16, 18, 8)(9, 14, 15, 19, 13), + Perm(0, 6, 17, 19, 9)(1, 11, 18, 13, 4)(2, 7, 12, 8, 3)(5, 10, 16, 15, 14), + Perm(0, 2, 12, 19, 14)(1, 7, 18, 15, 5)(3, 8, 13, 9, 4)(6, 11, 17, 16, 10), + Perm(0, 4, 9, 14, 5)(1, 3, 13, 15, 10)(2, 8, 19, 16, 6)(7, 12, 18, 17, 11), + Perm(0, 1)(2, 5)(3, 10)(4, 6)(7, 14)(8, 16)(9, 11)(12, 15)(13, 17)(18, 19), + Perm(0, 7)(1, 2)(3, 6)(4, 11)(5, 12)(8, 10)(9, 17)(13, 16)(14, 18)(15, 19), + Perm(0, 12)(1, 8)(2, 3)(4, 7)(5, 18)(6, 13)(9, 11)(10, 19)(14, 17)(15, 16), + Perm(0, 8)(1, 13)(2, 9)(3, 4)(5, 12)(6, 19)(7, 14)(10, 18)(11, 15)(16, 17), + Perm(0, 4)(1, 9)(2, 14)(3, 5)(6, 13)(7, 15)(8, 10)(11, 19)(12, 16)(17, 18), + Perm(0, 5)(1, 14)(2, 15)(3, 16)(4, 10)(6, 9)(7, 19)(8, 17)(11, 13)(12, 18), + Perm(0, 11)(1, 6)(2, 10)(3, 16)(4, 17)(5, 7)(8, 15)(9, 18)(12, 14)(13, 19), + Perm(0, 18)(1, 12)(2, 7)(3, 11)(4, 17)(5, 19)(6, 8)(9, 16)(10, 13)(14, 15), + Perm(0, 18)(1, 19)(2, 13)(3, 8)(4, 12)(5, 17)(6, 15)(7, 9)(10, 16)(11, 14), + Perm(0, 13)(1, 19)(2, 15)(3, 14)(4, 9)(5, 8)(6, 18)(7, 16)(10, 12)(11, 17), + Perm(0, 16)(1, 15)(2, 19)(3, 18)(4, 17)(5, 10)(6, 14)(7, 13)(8, 12)(9, 11), + Perm(0, 18)(1, 17)(2, 16)(3, 15)(4, 19)(5, 12)(6, 11)(7, 10)(8, 14)(9, 13), + Perm(0, 15)(1, 19)(2, 18)(3, 17)(4, 16)(5, 14)(6, 13)(7, 12)(8, 11)(9, 10), + Perm(0, 17)(1, 16)(2, 15)(3, 19)(4, 18)(5, 11)(6, 10)(7, 14)(8, 13)(9, 12), + Perm(0, 19)(1, 18)(2, 17)(3, 16)(4, 15)(5, 13)(6, 12)(7, 11)(8, 10)(9, 14), + Perm(1, 4, 5)(2, 9, 10)(3, 14, 6)(7, 13, 16)(8, 15, 11)(12, 19, 17), + Perm(19)(0, 6, 2)(3, 5, 11)(4, 10, 7)(8, 14, 17)(9, 16, 12)(13, 15, 18), + Perm(0, 11, 8)(1, 7, 3)(4, 6, 12)(5, 17, 13)(9, 10, 18)(14, 16, 19), + Perm(0, 7, 13)(1, 12, 9)(2, 8, 4)(5, 11, 19)(6, 18, 14)(10, 17, 15), + Perm(0, 3, 9)(1, 8, 14)(2, 13, 5)(6, 12, 15)(7, 19, 10)(11, 18, 16), + Perm(0, 14, 10)(1, 9, 16)(2, 13, 17)(3, 19, 11)(4, 15, 6)(7, 8, 18), + Perm(0, 16, 7)(1, 10, 11)(2, 5, 17)(3, 14, 18)(4, 15, 12)(8, 9, 19), + Perm(0, 16, 13)(1, 17, 8)(2, 11, 12)(3, 6, 18)(4, 10, 19)(5, 15, 9), + Perm(0, 11, 15)(1, 17, 14)(2, 18, 9)(3, 12, 13)(4, 7, 19)(5, 6, 16), + Perm(0, 8, 15)(1, 12, 16)(2, 18, 10)(3, 19, 5)(4, 13, 14)(6, 7, 17))) + +icosahedron = Polyhedron( + Tuple(0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11), + Tuple( + Tuple(0, 1, 2), + Tuple(0, 2, 3), + Tuple(0, 3, 4), + Tuple(0, 4, 5), + Tuple(0, 1, 5), + Tuple(1, 6, 7), + Tuple(1, 2, 7), + Tuple(2, 7, 8), + Tuple(2, 3, 8), + Tuple(3, 8, 9), + Tuple(3, 4, 9), + Tuple(4, 9, 10), + Tuple(4, 5, 10), + Tuple(5, 6, 10), + Tuple(1, 5, 6), + Tuple(6, 7, 11), + Tuple(7, 8, 11), + Tuple(8, 9, 11), + Tuple(9, 10, 11), + Tuple(6, 10, 11)), + Tuple( + Perm(11)(1, 2, 3, 4, 5)(6, 7, 8, 9, 10), + Perm(0, 5, 6, 7, 2)(3, 4, 10, 11, 8), + Perm(0, 1, 7, 8, 3)(4, 5, 6, 11, 9), + Perm(0, 2, 8, 9, 4)(1, 7, 11, 10, 5), + Perm(0, 3, 9, 10, 5)(1, 2, 8, 11, 6), + Perm(0, 4, 10, 6, 1)(2, 3, 9, 11, 7), + Perm(0, 1)(2, 5)(3, 6)(4, 7)(8, 10)(9, 11), + Perm(0, 2)(1, 3)(4, 7)(5, 8)(6, 9)(10, 11), + Perm(0, 3)(1, 9)(2, 4)(5, 8)(6, 11)(7, 10), + Perm(0, 4)(1, 9)(2, 10)(3, 5)(6, 8)(7, 11), + Perm(0, 5)(1, 4)(2, 10)(3, 6)(7, 9)(8, 11), + Perm(0, 6)(1, 5)(2, 10)(3, 11)(4, 7)(8, 9), + Perm(0, 7)(1, 2)(3, 6)(4, 11)(5, 8)(9, 10), + Perm(0, 8)(1, 9)(2, 3)(4, 7)(5, 11)(6, 10), + Perm(0, 9)(1, 11)(2, 10)(3, 4)(5, 8)(6, 7), + Perm(0, 10)(1, 9)(2, 11)(3, 6)(4, 5)(7, 8), + Perm(0, 11)(1, 6)(2, 10)(3, 9)(4, 8)(5, 7), + Perm(0, 11)(1, 8)(2, 7)(3, 6)(4, 10)(5, 9), + Perm(0, 11)(1, 10)(2, 9)(3, 8)(4, 7)(5, 6), + Perm(0, 11)(1, 7)(2, 6)(3, 10)(4, 9)(5, 8), + Perm(0, 11)(1, 9)(2, 8)(3, 7)(4, 6)(5, 10), + Perm(0, 5, 1)(2, 4, 6)(3, 10, 7)(8, 9, 11), + Perm(0, 1, 2)(3, 5, 7)(4, 6, 8)(9, 10, 11), + Perm(0, 2, 3)(1, 8, 4)(5, 7, 9)(6, 11, 10), + Perm(0, 3, 4)(1, 8, 10)(2, 9, 5)(6, 7, 11), + Perm(0, 4, 5)(1, 3, 10)(2, 9, 6)(7, 8, 11), + Perm(0, 10, 7)(1, 5, 6)(2, 4, 11)(3, 9, 8), + Perm(0, 6, 8)(1, 7, 2)(3, 5, 11)(4, 10, 9), + Perm(0, 7, 9)(1, 11, 4)(2, 8, 3)(5, 6, 10), + Perm(0, 8, 10)(1, 7, 6)(2, 11, 5)(3, 9, 4), + Perm(0, 9, 6)(1, 3, 11)(2, 8, 7)(4, 10, 5))) + +tetrahedron_faces = [tuple(arg) for arg in tetrahedron.faces] + +cube_faces = [tuple(arg) for arg in cube.faces] + +octahedron_faces = [tuple(arg) for arg in octahedron.faces] + +dodecahedron_faces = [tuple(arg) for arg in dodecahedron.faces] + +icosahedron_faces = [tuple(arg) for arg in icosahedron.faces] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/prufer.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/prufer.py new file mode 100644 index 0000000000000000000000000000000000000000..e389df87cddc0152b2376e18b9f3df2e94d3d2fb --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/prufer.py @@ -0,0 +1,435 @@ +from sympy.core import Basic +from sympy.core.containers import Tuple +from sympy.tensor.array import Array +from sympy.core.sympify import _sympify +from sympy.utilities.iterables import flatten, iterable +from sympy.utilities.misc import as_int + +from collections import defaultdict + + +class Prufer(Basic): + """ + The Prufer correspondence is an algorithm that describes the + bijection between labeled trees and the Prufer code. A Prufer + code of a labeled tree is unique up to isomorphism and has + a length of n - 2. + + Prufer sequences were first used by Heinz Prufer to give a + proof of Cayley's formula. + + References + ========== + + .. [1] https://mathworld.wolfram.com/LabeledTree.html + + """ + _prufer_repr = None + _tree_repr = None + _nodes = None + _rank = None + + @property + def prufer_repr(self): + """Returns Prufer sequence for the Prufer object. + + This sequence is found by removing the highest numbered vertex, + recording the node it was attached to, and continuing until only + two vertices remain. The Prufer sequence is the list of recorded nodes. + + Examples + ======== + + >>> from sympy.combinatorics.prufer import Prufer + >>> Prufer([[0, 3], [1, 3], [2, 3], [3, 4], [4, 5]]).prufer_repr + [3, 3, 3, 4] + >>> Prufer([1, 0, 0]).prufer_repr + [1, 0, 0] + + See Also + ======== + + to_prufer + + """ + if self._prufer_repr is None: + self._prufer_repr = self.to_prufer(self._tree_repr[:], self.nodes) + return self._prufer_repr + + @property + def tree_repr(self): + """Returns the tree representation of the Prufer object. + + Examples + ======== + + >>> from sympy.combinatorics.prufer import Prufer + >>> Prufer([[0, 3], [1, 3], [2, 3], [3, 4], [4, 5]]).tree_repr + [[0, 3], [1, 3], [2, 3], [3, 4], [4, 5]] + >>> Prufer([1, 0, 0]).tree_repr + [[1, 2], [0, 1], [0, 3], [0, 4]] + + See Also + ======== + + to_tree + + """ + if self._tree_repr is None: + self._tree_repr = self.to_tree(self._prufer_repr[:]) + return self._tree_repr + + @property + def nodes(self): + """Returns the number of nodes in the tree. + + Examples + ======== + + >>> from sympy.combinatorics.prufer import Prufer + >>> Prufer([[0, 3], [1, 3], [2, 3], [3, 4], [4, 5]]).nodes + 6 + >>> Prufer([1, 0, 0]).nodes + 5 + + """ + return self._nodes + + @property + def rank(self): + """Returns the rank of the Prufer sequence. + + Examples + ======== + + >>> from sympy.combinatorics.prufer import Prufer + >>> p = Prufer([[0, 3], [1, 3], [2, 3], [3, 4], [4, 5]]) + >>> p.rank + 778 + >>> p.next(1).rank + 779 + >>> p.prev().rank + 777 + + See Also + ======== + + prufer_rank, next, prev, size + + """ + if self._rank is None: + self._rank = self.prufer_rank() + return self._rank + + @property + def size(self): + """Return the number of possible trees of this Prufer object. + + Examples + ======== + + >>> from sympy.combinatorics.prufer import Prufer + >>> Prufer([0]*4).size == Prufer([6]*4).size == 1296 + True + + See Also + ======== + + prufer_rank, rank, next, prev + + """ + return self.prev(self.rank).prev().rank + 1 + + @staticmethod + def to_prufer(tree, n): + """Return the Prufer sequence for a tree given as a list of edges where + ``n`` is the number of nodes in the tree. + + Examples + ======== + + >>> from sympy.combinatorics.prufer import Prufer + >>> a = Prufer([[0, 1], [0, 2], [0, 3]]) + >>> a.prufer_repr + [0, 0] + >>> Prufer.to_prufer([[0, 1], [0, 2], [0, 3]], 4) + [0, 0] + + See Also + ======== + prufer_repr: returns Prufer sequence of a Prufer object. + + """ + d = defaultdict(int) + L = [] + for edge in tree: + # Increment the value of the corresponding + # node in the degree list as we encounter an + # edge involving it. + d[edge[0]] += 1 + d[edge[1]] += 1 + for i in range(n - 2): + # find the smallest leaf + for x in range(n): + if d[x] == 1: + break + # find the node it was connected to + y = None + for edge in tree: + if x == edge[0]: + y = edge[1] + elif x == edge[1]: + y = edge[0] + if y is not None: + break + # record and update + L.append(y) + for j in (x, y): + d[j] -= 1 + if not d[j]: + d.pop(j) + tree.remove(edge) + return L + + @staticmethod + def to_tree(prufer): + """Return the tree (as a list of edges) of the given Prufer sequence. + + Examples + ======== + + >>> from sympy.combinatorics.prufer import Prufer + >>> a = Prufer([0, 2], 4) + >>> a.tree_repr + [[0, 1], [0, 2], [2, 3]] + >>> Prufer.to_tree([0, 2]) + [[0, 1], [0, 2], [2, 3]] + + References + ========== + + .. [1] https://hamberg.no/erlend/posts/2010-11-06-prufer-sequence-compact-tree-representation.html + + See Also + ======== + tree_repr: returns tree representation of a Prufer object. + + """ + tree = [] + last = [] + n = len(prufer) + 2 + d = defaultdict(lambda: 1) + for p in prufer: + d[p] += 1 + for i in prufer: + for j in range(n): + # find the smallest leaf (degree = 1) + if d[j] == 1: + break + # (i, j) is the new edge that we append to the tree + # and remove from the degree dictionary + d[i] -= 1 + d[j] -= 1 + tree.append(sorted([i, j])) + last = [i for i in range(n) if d[i] == 1] or [0, 1] + tree.append(last) + + return tree + + @staticmethod + def edges(*runs): + """Return a list of edges and the number of nodes from the given runs + that connect nodes in an integer-labelled tree. + + All node numbers will be shifted so that the minimum node is 0. It is + not a problem if edges are repeated in the runs; only unique edges are + returned. There is no assumption made about what the range of the node + labels should be, but all nodes from the smallest through the largest + must be present. + + Examples + ======== + + >>> from sympy.combinatorics.prufer import Prufer + >>> Prufer.edges([1, 2, 3], [2, 4, 5]) # a T + ([[0, 1], [1, 2], [1, 3], [3, 4]], 5) + + Duplicate edges are removed: + + >>> Prufer.edges([0, 1, 2, 3], [1, 4, 5], [1, 4, 6]) # a K + ([[0, 1], [1, 2], [1, 4], [2, 3], [4, 5], [4, 6]], 7) + + """ + e = set() + nmin = runs[0][0] + for r in runs: + for i in range(len(r) - 1): + a, b = r[i: i + 2] + if b < a: + a, b = b, a + e.add((a, b)) + rv = [] + got = set() + nmin = nmax = None + for ei in e: + got.update(ei) + nmin = min(ei[0], nmin) if nmin is not None else ei[0] + nmax = max(ei[1], nmax) if nmax is not None else ei[1] + rv.append(list(ei)) + missing = set(range(nmin, nmax + 1)) - got + if missing: + missing = [i + nmin for i in missing] + if len(missing) == 1: + msg = 'Node %s is missing.' % missing.pop() + else: + msg = 'Nodes %s are missing.' % sorted(missing) + raise ValueError(msg) + if nmin != 0: + for i, ei in enumerate(rv): + rv[i] = [n - nmin for n in ei] + nmax -= nmin + return sorted(rv), nmax + 1 + + def prufer_rank(self): + """Computes the rank of a Prufer sequence. + + Examples + ======== + + >>> from sympy.combinatorics.prufer import Prufer + >>> a = Prufer([[0, 1], [0, 2], [0, 3]]) + >>> a.prufer_rank() + 0 + + See Also + ======== + + rank, next, prev, size + + """ + r = 0 + p = 1 + for i in range(self.nodes - 3, -1, -1): + r += p*self.prufer_repr[i] + p *= self.nodes + return r + + @classmethod + def unrank(self, rank, n): + """Finds the unranked Prufer sequence. + + Examples + ======== + + >>> from sympy.combinatorics.prufer import Prufer + >>> Prufer.unrank(0, 4) + Prufer([0, 0]) + + """ + n, rank = as_int(n), as_int(rank) + L = defaultdict(int) + for i in range(n - 3, -1, -1): + L[i] = rank % n + rank = (rank - L[i])//n + return Prufer([L[i] for i in range(len(L))]) + + def __new__(cls, *args, **kw_args): + """The constructor for the Prufer object. + + Examples + ======== + + >>> from sympy.combinatorics.prufer import Prufer + + A Prufer object can be constructed from a list of edges: + + >>> a = Prufer([[0, 1], [0, 2], [0, 3]]) + >>> a.prufer_repr + [0, 0] + + If the number of nodes is given, no checking of the nodes will + be performed; it will be assumed that nodes 0 through n - 1 are + present: + + >>> Prufer([[0, 1], [0, 2], [0, 3]], 4) + Prufer([[0, 1], [0, 2], [0, 3]], 4) + + A Prufer object can be constructed from a Prufer sequence: + + >>> b = Prufer([1, 3]) + >>> b.tree_repr + [[0, 1], [1, 3], [2, 3]] + + """ + arg0 = Array(args[0]) if args[0] else Tuple() + args = (arg0,) + tuple(_sympify(arg) for arg in args[1:]) + ret_obj = Basic.__new__(cls, *args, **kw_args) + args = [list(args[0])] + if args[0] and iterable(args[0][0]): + if not args[0][0]: + raise ValueError( + 'Prufer expects at least one edge in the tree.') + if len(args) > 1: + nnodes = args[1] + else: + nodes = set(flatten(args[0])) + nnodes = max(nodes) + 1 + if nnodes != len(nodes): + missing = set(range(nnodes)) - nodes + if len(missing) == 1: + msg = 'Node %s is missing.' % missing.pop() + else: + msg = 'Nodes %s are missing.' % sorted(missing) + raise ValueError(msg) + ret_obj._tree_repr = [list(i) for i in args[0]] + ret_obj._nodes = nnodes + else: + ret_obj._prufer_repr = args[0] + ret_obj._nodes = len(ret_obj._prufer_repr) + 2 + return ret_obj + + def next(self, delta=1): + """Generates the Prufer sequence that is delta beyond the current one. + + Examples + ======== + + >>> from sympy.combinatorics.prufer import Prufer + >>> a = Prufer([[0, 1], [0, 2], [0, 3]]) + >>> b = a.next(1) # == a.next() + >>> b.tree_repr + [[0, 2], [0, 1], [1, 3]] + >>> b.rank + 1 + + See Also + ======== + + prufer_rank, rank, prev, size + + """ + return Prufer.unrank(self.rank + delta, self.nodes) + + def prev(self, delta=1): + """Generates the Prufer sequence that is -delta before the current one. + + Examples + ======== + + >>> from sympy.combinatorics.prufer import Prufer + >>> a = Prufer([[0, 1], [1, 2], [2, 3], [1, 4]]) + >>> a.rank + 36 + >>> b = a.prev() + >>> b + Prufer([1, 2, 0]) + >>> b.rank + 35 + + See Also + ======== + + prufer_rank, rank, next, size + + """ + return Prufer.unrank(self.rank -delta, self.nodes) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/rewritingsystem.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/rewritingsystem.py new file mode 100644 index 0000000000000000000000000000000000000000..b9e8dfe4c831db6490c987c85a57d0d1a939de61 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/rewritingsystem.py @@ -0,0 +1,453 @@ +from collections import deque +from sympy.combinatorics.rewritingsystem_fsm import StateMachine + +class RewritingSystem: + ''' + A class implementing rewriting systems for `FpGroup`s. + + References + ========== + .. [1] Epstein, D., Holt, D. and Rees, S. (1991). + The use of Knuth-Bendix methods to solve the word problem in automatic groups. + Journal of Symbolic Computation, 12(4-5), pp.397-414. + + .. [2] GAP's Manual on its KBMAG package + https://www.gap-system.org/Manuals/pkg/kbmag-1.5.3/doc/manual.pdf + + ''' + def __init__(self, group): + self.group = group + self.alphabet = group.generators + self._is_confluent = None + + # these values are taken from [2] + self.maxeqns = 32767 # max rules + self.tidyint = 100 # rules before tidying + + # _max_exceeded is True if maxeqns is exceeded + # at any point + self._max_exceeded = False + + # Reduction automaton + self.reduction_automaton = None + self._new_rules = {} + + # dictionary of reductions + self.rules = {} + self.rules_cache = deque([], 50) + self._init_rules() + + + # All the transition symbols in the automaton + generators = list(self.alphabet) + generators += [gen**-1 for gen in generators] + # Create a finite state machine as an instance of the StateMachine object + self.reduction_automaton = StateMachine('Reduction automaton for '+ repr(self.group), generators) + self.construct_automaton() + + def set_max(self, n): + ''' + Set the maximum number of rules that can be defined + + ''' + if n > self.maxeqns: + self._max_exceeded = False + self.maxeqns = n + return + + @property + def is_confluent(self): + ''' + Return `True` if the system is confluent + + ''' + if self._is_confluent is None: + self._is_confluent = self._check_confluence() + return self._is_confluent + + def _init_rules(self): + identity = self.group.free_group.identity + for r in self.group.relators: + self.add_rule(r, identity) + self._remove_redundancies() + return + + def _add_rule(self, r1, r2): + ''' + Add the rule r1 -> r2 with no checking or further + deductions + + ''' + if len(self.rules) + 1 > self.maxeqns: + self._is_confluent = self._check_confluence() + self._max_exceeded = True + raise RuntimeError("Too many rules were defined.") + self.rules[r1] = r2 + # Add the newly added rule to the `new_rules` dictionary. + if self.reduction_automaton: + self._new_rules[r1] = r2 + + def add_rule(self, w1, w2, check=False): + new_keys = set() + + if w1 == w2: + return new_keys + + if w1 < w2: + w1, w2 = w2, w1 + + if (w1, w2) in self.rules_cache: + return new_keys + self.rules_cache.append((w1, w2)) + + s1, s2 = w1, w2 + + # The following is the equivalent of checking + # s1 for overlaps with the implicit reductions + # {g*g**-1 -> } and {g**-1*g -> } + # for any generator g without installing the + # redundant rules that would result from processing + # the overlaps. See [1], Section 3 for details. + + if len(s1) - len(s2) < 3: + if s1 not in self.rules: + new_keys.add(s1) + if not check: + self._add_rule(s1, s2) + if s2**-1 > s1**-1 and s2**-1 not in self.rules: + new_keys.add(s2**-1) + if not check: + self._add_rule(s2**-1, s1**-1) + + # overlaps on the right + while len(s1) - len(s2) > -1: + g = s1[len(s1)-1] + s1 = s1.subword(0, len(s1)-1) + s2 = s2*g**-1 + if len(s1) - len(s2) < 0: + if s2 not in self.rules: + if not check: + self._add_rule(s2, s1) + new_keys.add(s2) + elif len(s1) - len(s2) < 3: + new = self.add_rule(s1, s2, check) + new_keys.update(new) + + # overlaps on the left + while len(w1) - len(w2) > -1: + g = w1[0] + w1 = w1.subword(1, len(w1)) + w2 = g**-1*w2 + if len(w1) - len(w2) < 0: + if w2 not in self.rules: + if not check: + self._add_rule(w2, w1) + new_keys.add(w2) + elif len(w1) - len(w2) < 3: + new = self.add_rule(w1, w2, check) + new_keys.update(new) + + return new_keys + + def _remove_redundancies(self, changes=False): + ''' + Reduce left- and right-hand sides of reduction rules + and remove redundant equations (i.e. those for which + lhs == rhs). If `changes` is `True`, return a set + containing the removed keys and a set containing the + added keys + + ''' + removed = set() + added = set() + rules = self.rules.copy() + for r in rules: + v = self.reduce(r, exclude=r) + w = self.reduce(rules[r]) + if v != r: + del self.rules[r] + removed.add(r) + if v > w: + added.add(v) + self.rules[v] = w + elif v < w: + added.add(w) + self.rules[w] = v + else: + self.rules[v] = w + if changes: + return removed, added + return + + def make_confluent(self, check=False): + ''' + Try to make the system confluent using the Knuth-Bendix + completion algorithm + + ''' + if self._max_exceeded: + return self._is_confluent + lhs = list(self.rules.keys()) + + def _overlaps(r1, r2): + len1 = len(r1) + len2 = len(r2) + result = [] + for j in range(1, len1 + len2): + if (r1.subword(len1 - j, len1 + len2 - j, strict=False) + == r2.subword(j - len1, j, strict=False)): + a = r1.subword(0, len1-j, strict=False) + a = a*r2.subword(0, j-len1, strict=False) + b = r2.subword(j-len1, j, strict=False) + c = r2.subword(j, len2, strict=False) + c = c*r1.subword(len1 + len2 - j, len1, strict=False) + result.append(a*b*c) + return result + + def _process_overlap(w, r1, r2, check): + s = w.eliminate_word(r1, self.rules[r1]) + s = self.reduce(s) + t = w.eliminate_word(r2, self.rules[r2]) + t = self.reduce(t) + if s != t: + if check: + # system not confluent + return [0] + try: + new_keys = self.add_rule(t, s, check) + return new_keys + except RuntimeError: + return False + return + + added = 0 + i = 0 + while i < len(lhs): + r1 = lhs[i] + i += 1 + # j could be i+1 to not + # check each pair twice but lhs + # is extended in the loop and the new + # elements have to be checked with the + # preceding ones. there is probably a better way + # to handle this + j = 0 + while j < len(lhs): + r2 = lhs[j] + j += 1 + if r1 == r2: + continue + overlaps = _overlaps(r1, r2) + overlaps.extend(_overlaps(r1**-1, r2)) + if not overlaps: + continue + for w in overlaps: + new_keys = _process_overlap(w, r1, r2, check) + if new_keys: + if check: + return False + lhs.extend(new_keys) + added += len(new_keys) + elif new_keys == False: + # too many rules were added so the process + # couldn't complete + return self._is_confluent + + if added > self.tidyint and not check: + # tidy up + r, a = self._remove_redundancies(changes=True) + added = 0 + if r: + # reset i since some elements were removed + i = min(lhs.index(s) for s in r) + lhs = [l for l in lhs if l not in r] + lhs.extend(a) + if r1 in r: + # r1 was removed as redundant + break + + self._is_confluent = True + if not check: + self._remove_redundancies() + return True + + def _check_confluence(self): + return self.make_confluent(check=True) + + def reduce(self, word, exclude=None): + ''' + Apply reduction rules to `word` excluding the reduction rule + for the lhs equal to `exclude` + + ''' + rules = {r: self.rules[r] for r in self.rules if r != exclude} + # the following is essentially `eliminate_words()` code from the + # `FreeGroupElement` class, the only difference being the first + # "if" statement + again = True + new = word + while again: + again = False + for r in rules: + prev = new + if rules[r]**-1 > r**-1: + new = new.eliminate_word(r, rules[r], _all=True, inverse=False) + else: + new = new.eliminate_word(r, rules[r], _all=True) + if new != prev: + again = True + return new + + def _compute_inverse_rules(self, rules): + ''' + Compute the inverse rules for a given set of rules. + The inverse rules are used in the automaton for word reduction. + + Arguments: + rules (dictionary): Rules for which the inverse rules are to computed. + + Returns: + Dictionary of inverse_rules. + + ''' + inverse_rules = {} + for r in rules: + rule_key_inverse = r**-1 + rule_value_inverse = (rules[r])**-1 + if (rule_value_inverse < rule_key_inverse): + inverse_rules[rule_key_inverse] = rule_value_inverse + else: + inverse_rules[rule_value_inverse] = rule_key_inverse + return inverse_rules + + def construct_automaton(self): + ''' + Construct the automaton based on the set of reduction rules of the system. + + Automata Design: + The accept states of the automaton are the proper prefixes of the left hand side of the rules. + The complete left hand side of the rules are the dead states of the automaton. + + ''' + self._add_to_automaton(self.rules) + + def _add_to_automaton(self, rules): + ''' + Add new states and transitions to the automaton. + + Summary: + States corresponding to the new rules added to the system are computed and added to the automaton. + Transitions in the previously added states are also modified if necessary. + + Arguments: + rules (dictionary) -- Dictionary of the newly added rules. + + ''' + # Automaton variables + automaton_alphabet = [] + proper_prefixes = {} + + # compute the inverses of all the new rules added + all_rules = rules + inverse_rules = self._compute_inverse_rules(all_rules) + all_rules.update(inverse_rules) + + # Keep track of the accept_states. + accept_states = [] + + for rule in all_rules: + # The symbols present in the new rules are the symbols to be verified at each state. + # computes the automaton_alphabet, as the transitions solely depend upon the new states. + automaton_alphabet += rule.letter_form_elm + # Compute the proper prefixes for every rule. + proper_prefixes[rule] = [] + letter_word_array = list(rule.letter_form_elm) + len_letter_word_array = len(letter_word_array) + for i in range (1, len_letter_word_array): + letter_word_array[i] = letter_word_array[i-1]*letter_word_array[i] + # Add accept states. + elem = letter_word_array[i-1] + if elem not in self.reduction_automaton.states: + self.reduction_automaton.add_state(elem, state_type='a') + accept_states.append(elem) + proper_prefixes[rule] = letter_word_array + # Check for overlaps between dead and accept states. + if rule in accept_states: + self.reduction_automaton.states[rule].state_type = 'd' + self.reduction_automaton.states[rule].rh_rule = all_rules[rule] + accept_states.remove(rule) + # Add dead states + if rule not in self.reduction_automaton.states: + self.reduction_automaton.add_state(rule, state_type='d', rh_rule=all_rules[rule]) + + automaton_alphabet = set(automaton_alphabet) + + # Add new transitions for every state. + for state in self.reduction_automaton.states: + current_state_name = state + current_state_type = self.reduction_automaton.states[state].state_type + # Transitions will be modified only when suffixes of the current_state + # belongs to the proper_prefixes of the new rules. + # The rest are ignored if they cannot lead to a dead state after a finite number of transisitons. + if current_state_type == 's': + for letter in automaton_alphabet: + if letter in self.reduction_automaton.states: + self.reduction_automaton.states[state].add_transition(letter, letter) + else: + self.reduction_automaton.states[state].add_transition(letter, current_state_name) + elif current_state_type == 'a': + # Check if the transition to any new state in possible. + for letter in automaton_alphabet: + _next = current_state_name*letter + while len(_next) and _next not in self.reduction_automaton.states: + _next = _next.subword(1, len(_next)) + if not len(_next): + _next = 'start' + self.reduction_automaton.states[state].add_transition(letter, _next) + + # Add transitions for new states. All symbols used in the automaton are considered here. + # Ignore this if `reduction_automaton.automaton_alphabet` = `automaton_alphabet`. + if len(self.reduction_automaton.automaton_alphabet) != len(automaton_alphabet): + for state in accept_states: + current_state_name = state + for letter in self.reduction_automaton.automaton_alphabet: + _next = current_state_name*letter + while len(_next) and _next not in self.reduction_automaton.states: + _next = _next.subword(1, len(_next)) + if not len(_next): + _next = 'start' + self.reduction_automaton.states[state].add_transition(letter, _next) + + def reduce_using_automaton(self, word): + ''' + Reduce a word using an automaton. + + Summary: + All the symbols of the word are stored in an array and are given as the input to the automaton. + If the automaton reaches a dead state that subword is replaced and the automaton is run from the beginning. + The complete word has to be replaced when the word is read and the automaton reaches a dead state. + So, this process is repeated until the word is read completely and the automaton reaches the accept state. + + Arguments: + word (instance of FreeGroupElement) -- Word that needs to be reduced. + + ''' + # Modify the automaton if new rules are found. + if self._new_rules: + self._add_to_automaton(self._new_rules) + self._new_rules = {} + + flag = 1 + while flag: + flag = 0 + current_state = self.reduction_automaton.states['start'] + for i, s in enumerate(word.letter_form_elm): + next_state_name = current_state.transitions[s] + next_state = self.reduction_automaton.states[next_state_name] + if next_state.state_type == 'd': + subst = next_state.rh_rule + word = word.substituted_word(i - len(next_state_name) + 1, i+1, subst) + flag = 1 + break + current_state = next_state + return word diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/rewritingsystem_fsm.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/rewritingsystem_fsm.py new file mode 100644 index 0000000000000000000000000000000000000000..21916530040ac321180692d1a0811da4ae36a056 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/rewritingsystem_fsm.py @@ -0,0 +1,60 @@ +class State: + ''' + A representation of a state managed by a ``StateMachine``. + + Attributes: + name (instance of FreeGroupElement or string) -- State name which is also assigned to the Machine. + transisitons (OrderedDict) -- Represents all the transitions of the state object. + state_type (string) -- Denotes the type (accept/start/dead) of the state. + rh_rule (instance of FreeGroupElement) -- right hand rule for dead state. + state_machine (instance of StateMachine object) -- The finite state machine that the state belongs to. + ''' + + def __init__(self, name, state_machine, state_type=None, rh_rule=None): + self.name = name + self.transitions = {} + self.state_machine = state_machine + self.state_type = state_type[0] + self.rh_rule = rh_rule + + def add_transition(self, letter, state): + ''' + Add a transition from the current state to a new state. + + Keyword Arguments: + letter -- The alphabet element the current state reads to make the state transition. + state -- This will be an instance of the State object which represents a new state after in the transition after the alphabet is read. + + ''' + self.transitions[letter] = state + +class StateMachine: + ''' + Representation of a finite state machine the manages the states and the transitions of the automaton. + + Attributes: + states (dictionary) -- Collection of all registered `State` objects. + name (str) -- Name of the state machine. + ''' + + def __init__(self, name, automaton_alphabet): + self.name = name + self.automaton_alphabet = automaton_alphabet + self.states = {} # Contains all the states in the machine. + self.add_state('start', state_type='s') + + def add_state(self, state_name, state_type=None, rh_rule=None): + ''' + Instantiate a state object and stores it in the 'states' dictionary. + + Arguments: + state_name (instance of FreeGroupElement or string) -- name of the new states. + state_type (string) -- Denotes the type (accept/start/dead) of the state added. + rh_rule (instance of FreeGroupElement) -- right hand rule for dead state. + + ''' + new_state = State(state_name, self, state_type, rh_rule) + self.states[state_name] = new_state + + def __repr__(self): + return "%s" % (self.name) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/schur_number.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/schur_number.py new file mode 100644 index 0000000000000000000000000000000000000000..83aac98e543d4b54d4e6af17adca6e4f4de1b9ac --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/schur_number.py @@ -0,0 +1,160 @@ +""" +The Schur number S(k) is the largest integer n for which the interval [1,n] +can be partitioned into k sum-free sets.(https://mathworld.wolfram.com/SchurNumber.html) +""" +import math +from sympy.core import S +from sympy.core.basic import Basic +from sympy.core.function import Function +from sympy.core.numbers import Integer + + +class SchurNumber(Function): + r""" + This function creates a SchurNumber object + which is evaluated for `k \le 5` otherwise only + the lower bound information can be retrieved. + + Examples + ======== + + >>> from sympy.combinatorics.schur_number import SchurNumber + + Since S(3) = 13, hence the output is a number + >>> SchurNumber(3) + 13 + + We do not know the Schur number for values greater than 5, hence + only the object is returned + >>> SchurNumber(6) + SchurNumber(6) + + Now, the lower bound information can be retrieved using lower_bound() + method + >>> SchurNumber(6).lower_bound() + 536 + + """ + + @classmethod + def eval(cls, k): + if k.is_Number: + if k is S.Infinity: + return S.Infinity + if k.is_zero: + return S.Zero + if not k.is_integer or k.is_negative: + raise ValueError("k should be a positive integer") + first_known_schur_numbers = {1: 1, 2: 4, 3: 13, 4: 44, 5: 160} + if k <= 5: + return Integer(first_known_schur_numbers[k]) + + def lower_bound(self): + f_ = self.args[0] + # Improved lower bounds known for S(6) and S(7) + if f_ == 6: + return Integer(536) + if f_ == 7: + return Integer(1680) + # For other cases, use general expression + if f_.is_Integer: + return 3*self.func(f_ - 1).lower_bound() - 1 + return (3**f_ - 1)/2 + + +def _schur_subsets_number(n): + + if n is S.Infinity: + raise ValueError("Input must be finite") + if n <= 0: + raise ValueError("n must be a non-zero positive integer.") + elif n <= 3: + min_k = 1 + else: + min_k = math.ceil(math.log(2*n + 1, 3)) + + return Integer(min_k) + + +def schur_partition(n): + """ + + This function returns the partition in the minimum number of sum-free subsets + according to the lower bound given by the Schur Number. + + Parameters + ========== + + n: a number + n is the upper limit of the range [1, n] for which we need to find and + return the minimum number of free subsets according to the lower bound + of schur number + + Returns + ======= + + List of lists + List of the minimum number of sum-free subsets + + Notes + ===== + + It is possible for some n to make the partition into less + subsets since the only known Schur numbers are: + S(1) = 1, S(2) = 4, S(3) = 13, S(4) = 44. + e.g for n = 44 the lower bound from the function above is 5 subsets but it has been proven + that can be done with 4 subsets. + + Examples + ======== + + For n = 1, 2, 3 the answer is the set itself + + >>> from sympy.combinatorics.schur_number import schur_partition + >>> schur_partition(2) + [[1, 2]] + + For n > 3, the answer is the minimum number of sum-free subsets: + + >>> schur_partition(5) + [[3, 2], [5], [1, 4]] + + >>> schur_partition(8) + [[3, 2], [6, 5, 8], [1, 4, 7]] + """ + + if isinstance(n, Basic) and not n.is_Number: + raise ValueError("Input value must be a number") + + number_of_subsets = _schur_subsets_number(n) + if n == 1: + sum_free_subsets = [[1]] + elif n == 2: + sum_free_subsets = [[1, 2]] + elif n == 3: + sum_free_subsets = [[1, 2, 3]] + else: + sum_free_subsets = [[1, 4], [2, 3]] + + while len(sum_free_subsets) < number_of_subsets: + sum_free_subsets = _generate_next_list(sum_free_subsets, n) + missed_elements = [3*k + 1 for k in range(len(sum_free_subsets), (n-1)//3 + 1)] + sum_free_subsets[-1] += missed_elements + + return sum_free_subsets + + +def _generate_next_list(current_list, n): + new_list = [] + + for item in current_list: + temp_1 = [number*3 for number in item if number*3 <= n] + temp_2 = [number*3 - 1 for number in item if number*3 - 1 <= n] + new_item = temp_1 + temp_2 + new_list.append(new_item) + + last_list = [3*k + 1 for k in range(len(current_list)+1) if 3*k + 1 <= n] + new_list.append(last_list) + current_list = new_list + + return current_list diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/subsets.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/subsets.py new file mode 100644 index 0000000000000000000000000000000000000000..e540cb2395cb27e04c9d513831cb834a05ec2abd --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/subsets.py @@ -0,0 +1,619 @@ +from itertools import combinations + +from sympy.combinatorics.graycode import GrayCode + + +class Subset(): + """ + Represents a basic subset object. + + Explanation + =========== + + We generate subsets using essentially two techniques, + binary enumeration and lexicographic enumeration. + The Subset class takes two arguments, the first one + describes the initial subset to consider and the second + describes the superset. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset(['c', 'd'], ['a', 'b', 'c', 'd']) + >>> a.next_binary().subset + ['b'] + >>> a.prev_binary().subset + ['c'] + """ + + _rank_binary = None + _rank_lex = None + _rank_graycode = None + _subset = None + _superset = None + + def __new__(cls, subset, superset): + """ + Default constructor. + + It takes the ``subset`` and its ``superset`` as its parameters. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset(['c', 'd'], ['a', 'b', 'c', 'd']) + >>> a.subset + ['c', 'd'] + >>> a.superset + ['a', 'b', 'c', 'd'] + >>> a.size + 2 + """ + if len(subset) > len(superset): + raise ValueError('Invalid arguments have been provided. The ' + 'superset must be larger than the subset.') + for elem in subset: + if elem not in superset: + raise ValueError('The superset provided is invalid as it does ' + 'not contain the element {}'.format(elem)) + obj = object.__new__(cls) + obj._subset = subset + obj._superset = superset + return obj + + def __eq__(self, other): + """Return a boolean indicating whether a == b on the basis of + whether both objects are of the class Subset and if the values + of the subset and superset attributes are the same. + """ + if not isinstance(other, Subset): + return NotImplemented + return self.subset == other.subset and self.superset == other.superset + + def iterate_binary(self, k): + """ + This is a helper function. It iterates over the + binary subsets by ``k`` steps. This variable can be + both positive or negative. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset(['c', 'd'], ['a', 'b', 'c', 'd']) + >>> a.iterate_binary(-2).subset + ['d'] + >>> a = Subset(['a', 'b', 'c'], ['a', 'b', 'c', 'd']) + >>> a.iterate_binary(2).subset + [] + + See Also + ======== + + next_binary, prev_binary + """ + bin_list = Subset.bitlist_from_subset(self.subset, self.superset) + n = (int(''.join(bin_list), 2) + k) % 2**self.superset_size + bits = bin(n)[2:].rjust(self.superset_size, '0') + return Subset.subset_from_bitlist(self.superset, bits) + + def next_binary(self): + """ + Generates the next binary ordered subset. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset(['c', 'd'], ['a', 'b', 'c', 'd']) + >>> a.next_binary().subset + ['b'] + >>> a = Subset(['a', 'b', 'c', 'd'], ['a', 'b', 'c', 'd']) + >>> a.next_binary().subset + [] + + See Also + ======== + + prev_binary, iterate_binary + """ + return self.iterate_binary(1) + + def prev_binary(self): + """ + Generates the previous binary ordered subset. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset([], ['a', 'b', 'c', 'd']) + >>> a.prev_binary().subset + ['a', 'b', 'c', 'd'] + >>> a = Subset(['c', 'd'], ['a', 'b', 'c', 'd']) + >>> a.prev_binary().subset + ['c'] + + See Also + ======== + + next_binary, iterate_binary + """ + return self.iterate_binary(-1) + + def next_lexicographic(self): + """ + Generates the next lexicographically ordered subset. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset(['c', 'd'], ['a', 'b', 'c', 'd']) + >>> a.next_lexicographic().subset + ['d'] + >>> a = Subset(['d'], ['a', 'b', 'c', 'd']) + >>> a.next_lexicographic().subset + [] + + See Also + ======== + + prev_lexicographic + """ + i = self.superset_size - 1 + indices = Subset.subset_indices(self.subset, self.superset) + + if i in indices: + if i - 1 in indices: + indices.remove(i - 1) + else: + indices.remove(i) + i = i - 1 + while i >= 0 and i not in indices: + i = i - 1 + if i >= 0: + indices.remove(i) + indices.append(i+1) + else: + while i not in indices and i >= 0: + i = i - 1 + indices.append(i + 1) + + ret_set = [] + super_set = self.superset + for i in indices: + ret_set.append(super_set[i]) + return Subset(ret_set, super_set) + + def prev_lexicographic(self): + """ + Generates the previous lexicographically ordered subset. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset([], ['a', 'b', 'c', 'd']) + >>> a.prev_lexicographic().subset + ['d'] + >>> a = Subset(['c','d'], ['a', 'b', 'c', 'd']) + >>> a.prev_lexicographic().subset + ['c'] + + See Also + ======== + + next_lexicographic + """ + i = self.superset_size - 1 + indices = Subset.subset_indices(self.subset, self.superset) + + while i >= 0 and i not in indices: + i = i - 1 + + if i == 0 or i - 1 in indices: + indices.remove(i) + else: + if i >= 0: + indices.remove(i) + indices.append(i - 1) + indices.append(self.superset_size - 1) + + ret_set = [] + super_set = self.superset + for i in indices: + ret_set.append(super_set[i]) + return Subset(ret_set, super_set) + + def iterate_graycode(self, k): + """ + Helper function used for prev_gray and next_gray. + It performs ``k`` step overs to get the respective Gray codes. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset([1, 2, 3], [1, 2, 3, 4]) + >>> a.iterate_graycode(3).subset + [1, 4] + >>> a.iterate_graycode(-2).subset + [1, 2, 4] + + See Also + ======== + + next_gray, prev_gray + """ + unranked_code = GrayCode.unrank(self.superset_size, + (self.rank_gray + k) % self.cardinality) + return Subset.subset_from_bitlist(self.superset, + unranked_code) + + def next_gray(self): + """ + Generates the next Gray code ordered subset. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset([1, 2, 3], [1, 2, 3, 4]) + >>> a.next_gray().subset + [1, 3] + + See Also + ======== + + iterate_graycode, prev_gray + """ + return self.iterate_graycode(1) + + def prev_gray(self): + """ + Generates the previous Gray code ordered subset. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset([2, 3, 4], [1, 2, 3, 4, 5]) + >>> a.prev_gray().subset + [2, 3, 4, 5] + + See Also + ======== + + iterate_graycode, next_gray + """ + return self.iterate_graycode(-1) + + @property + def rank_binary(self): + """ + Computes the binary ordered rank. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset([], ['a','b','c','d']) + >>> a.rank_binary + 0 + >>> a = Subset(['c', 'd'], ['a', 'b', 'c', 'd']) + >>> a.rank_binary + 3 + + See Also + ======== + + iterate_binary, unrank_binary + """ + if self._rank_binary is None: + self._rank_binary = int("".join( + Subset.bitlist_from_subset(self.subset, + self.superset)), 2) + return self._rank_binary + + @property + def rank_lexicographic(self): + """ + Computes the lexicographic ranking of the subset. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset(['c', 'd'], ['a', 'b', 'c', 'd']) + >>> a.rank_lexicographic + 14 + >>> a = Subset([2, 4, 5], [1, 2, 3, 4, 5, 6]) + >>> a.rank_lexicographic + 43 + """ + if self._rank_lex is None: + def _ranklex(self, subset_index, i, n): + if subset_index == [] or i > n: + return 0 + if i in subset_index: + subset_index.remove(i) + return 1 + _ranklex(self, subset_index, i + 1, n) + return 2**(n - i - 1) + _ranklex(self, subset_index, i + 1, n) + indices = Subset.subset_indices(self.subset, self.superset) + self._rank_lex = _ranklex(self, indices, 0, self.superset_size) + return self._rank_lex + + @property + def rank_gray(self): + """ + Computes the Gray code ranking of the subset. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset(['c','d'], ['a','b','c','d']) + >>> a.rank_gray + 2 + >>> a = Subset([2, 4, 5], [1, 2, 3, 4, 5, 6]) + >>> a.rank_gray + 27 + + See Also + ======== + + iterate_graycode, unrank_gray + """ + if self._rank_graycode is None: + bits = Subset.bitlist_from_subset(self.subset, self.superset) + self._rank_graycode = GrayCode(len(bits), start=bits).rank + return self._rank_graycode + + @property + def subset(self): + """ + Gets the subset represented by the current instance. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset(['c', 'd'], ['a', 'b', 'c', 'd']) + >>> a.subset + ['c', 'd'] + + See Also + ======== + + superset, size, superset_size, cardinality + """ + return self._subset + + @property + def size(self): + """ + Gets the size of the subset. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset(['c', 'd'], ['a', 'b', 'c', 'd']) + >>> a.size + 2 + + See Also + ======== + + subset, superset, superset_size, cardinality + """ + return len(self.subset) + + @property + def superset(self): + """ + Gets the superset of the subset. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset(['c', 'd'], ['a', 'b', 'c', 'd']) + >>> a.superset + ['a', 'b', 'c', 'd'] + + See Also + ======== + + subset, size, superset_size, cardinality + """ + return self._superset + + @property + def superset_size(self): + """ + Returns the size of the superset. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset(['c', 'd'], ['a', 'b', 'c', 'd']) + >>> a.superset_size + 4 + + See Also + ======== + + subset, superset, size, cardinality + """ + return len(self.superset) + + @property + def cardinality(self): + """ + Returns the number of all possible subsets. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> a = Subset(['c', 'd'], ['a', 'b', 'c', 'd']) + >>> a.cardinality + 16 + + See Also + ======== + + subset, superset, size, superset_size + """ + return 2**(self.superset_size) + + @classmethod + def subset_from_bitlist(self, super_set, bitlist): + """ + Gets the subset defined by the bitlist. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> Subset.subset_from_bitlist(['a', 'b', 'c', 'd'], '0011').subset + ['c', 'd'] + + See Also + ======== + + bitlist_from_subset + """ + if len(super_set) != len(bitlist): + raise ValueError("The sizes of the lists are not equal") + ret_set = [] + for i in range(len(bitlist)): + if bitlist[i] == '1': + ret_set.append(super_set[i]) + return Subset(ret_set, super_set) + + @classmethod + def bitlist_from_subset(self, subset, superset): + """ + Gets the bitlist corresponding to a subset. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> Subset.bitlist_from_subset(['c', 'd'], ['a', 'b', 'c', 'd']) + '0011' + + See Also + ======== + + subset_from_bitlist + """ + bitlist = ['0'] * len(superset) + if isinstance(subset, Subset): + subset = subset.subset + for i in Subset.subset_indices(subset, superset): + bitlist[i] = '1' + return ''.join(bitlist) + + @classmethod + def unrank_binary(self, rank, superset): + """ + Gets the binary ordered subset of the specified rank. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> Subset.unrank_binary(4, ['a', 'b', 'c', 'd']).subset + ['b'] + + See Also + ======== + + iterate_binary, rank_binary + """ + bits = bin(rank)[2:].rjust(len(superset), '0') + return Subset.subset_from_bitlist(superset, bits) + + @classmethod + def unrank_gray(self, rank, superset): + """ + Gets the Gray code ordered subset of the specified rank. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> Subset.unrank_gray(4, ['a', 'b', 'c']).subset + ['a', 'b'] + >>> Subset.unrank_gray(0, ['a', 'b', 'c']).subset + [] + + See Also + ======== + + iterate_graycode, rank_gray + """ + graycode_bitlist = GrayCode.unrank(len(superset), rank) + return Subset.subset_from_bitlist(superset, graycode_bitlist) + + @classmethod + def subset_indices(self, subset, superset): + """Return indices of subset in superset in a list; the list is empty + if all elements of ``subset`` are not in ``superset``. + + Examples + ======== + + >>> from sympy.combinatorics import Subset + >>> superset = [1, 3, 2, 5, 4] + >>> Subset.subset_indices([3, 2, 1], superset) + [1, 2, 0] + >>> Subset.subset_indices([1, 6], superset) + [] + >>> Subset.subset_indices([], superset) + [] + + """ + a, b = superset, subset + sb = set(b) + d = {} + for i, ai in enumerate(a): + if ai in sb: + d[ai] = i + sb.remove(ai) + if not sb: + break + else: + return [] + return [d[bi] for bi in b] + + +def ksubsets(superset, k): + """ + Finds the subsets of size ``k`` in lexicographic order. + + This uses the itertools generator. + + Examples + ======== + + >>> from sympy.combinatorics.subsets import ksubsets + >>> list(ksubsets([1, 2, 3], 2)) + [(1, 2), (1, 3), (2, 3)] + >>> list(ksubsets([1, 2, 3, 4, 5], 2)) + [(1, 2), (1, 3), (1, 4), (1, 5), (2, 3), (2, 4), \ + (2, 5), (3, 4), (3, 5), (4, 5)] + + See Also + ======== + + Subset + """ + return combinations(superset, k) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tensor_can.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tensor_can.py new file mode 100644 index 0000000000000000000000000000000000000000..d43e96ed27a21f988aaaa8fd16827987541f7373 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tensor_can.py @@ -0,0 +1,1189 @@ +from sympy.combinatorics.permutations import Permutation, _af_rmul, \ + _af_invert, _af_new +from sympy.combinatorics.perm_groups import PermutationGroup, _orbit, \ + _orbit_transversal +from sympy.combinatorics.util import _distribute_gens_by_base, \ + _orbits_transversals_from_bsgs + +""" + References for tensor canonicalization: + + [1] R. Portugal "Algorithmic simplification of tensor expressions", + J. Phys. A 32 (1999) 7779-7789 + + [2] R. Portugal, B.F. Svaiter "Group-theoretic Approach for Symbolic + Tensor Manipulation: I. Free Indices" + arXiv:math-ph/0107031v1 + + [3] L.R.U. Manssur, R. Portugal "Group-theoretic Approach for Symbolic + Tensor Manipulation: II. Dummy Indices" + arXiv:math-ph/0107032v1 + + [4] xperm.c part of XPerm written by J. M. Martin-Garcia + http://www.xact.es/index.html +""" + + +def dummy_sgs(dummies, sym, n): + """ + Return the strong generators for dummy indices. + + Parameters + ========== + + dummies : List of dummy indices. + `dummies[2k], dummies[2k+1]` are paired indices. + In base form, the dummy indices are always in + consecutive positions. + sym : symmetry under interchange of contracted dummies:: + * None no symmetry + * 0 commuting + * 1 anticommuting + + n : number of indices + + Examples + ======== + + >>> from sympy.combinatorics.tensor_can import dummy_sgs + >>> dummy_sgs(list(range(2, 8)), 0, 8) + [[0, 1, 3, 2, 4, 5, 6, 7, 8, 9], [0, 1, 2, 3, 5, 4, 6, 7, 8, 9], + [0, 1, 2, 3, 4, 5, 7, 6, 8, 9], [0, 1, 4, 5, 2, 3, 6, 7, 8, 9], + [0, 1, 2, 3, 6, 7, 4, 5, 8, 9]] + """ + if len(dummies) > n: + raise ValueError("List too large") + res = [] + # exchange of contravariant and covariant indices + if sym is not None: + for j in dummies[::2]: + a = list(range(n + 2)) + if sym == 1: + a[n] = n + 1 + a[n + 1] = n + a[j], a[j + 1] = a[j + 1], a[j] + res.append(a) + # rename dummy indices + for j in dummies[:-3:2]: + a = list(range(n + 2)) + a[j:j + 4] = a[j + 2], a[j + 3], a[j], a[j + 1] + res.append(a) + return res + + +def _min_dummies(dummies, sym, indices): + """ + Return list of minima of the orbits of indices in group of dummies. + See ``double_coset_can_rep`` for the description of ``dummies`` and ``sym``. + ``indices`` is the initial list of dummy indices. + + Examples + ======== + + >>> from sympy.combinatorics.tensor_can import _min_dummies + >>> _min_dummies([list(range(2, 8))], [0], list(range(10))) + [0, 1, 2, 2, 2, 2, 2, 2, 8, 9] + """ + num_types = len(sym) + m = [min(dx) if dx else None for dx in dummies] + res = indices[:] + for i in range(num_types): + for c, i in enumerate(indices): + for j in range(num_types): + if i in dummies[j]: + res[c] = m[j] + break + return res + + +def _trace_S(s, j, b, S_cosets): + """ + Return the representative h satisfying s[h[b]] == j + + If there is not such a representative return None + """ + for h in S_cosets[b]: + if s[h[b]] == j: + return h + return None + + +def _trace_D(gj, p_i, Dxtrav): + """ + Return the representative h satisfying h[gj] == p_i + + If there is not such a representative return None + """ + for h in Dxtrav: + if h[gj] == p_i: + return h + return None + + +def _dumx_remove(dumx, dumx_flat, p0): + """ + remove p0 from dumx + """ + res = [] + for dx in dumx: + if p0 not in dx: + res.append(dx) + continue + k = dx.index(p0) + if k % 2 == 0: + p0_paired = dx[k + 1] + else: + p0_paired = dx[k - 1] + dx.remove(p0) + dx.remove(p0_paired) + dumx_flat.remove(p0) + dumx_flat.remove(p0_paired) + res.append(dx) + + +def transversal2coset(size, base, transversal): + a = [] + j = 0 + for i in range(size): + if i in base: + a.append(sorted(transversal[j].values())) + j += 1 + else: + a.append([list(range(size))]) + j = len(a) - 1 + while a[j] == [list(range(size))]: + j -= 1 + return a[:j + 1] + + +def double_coset_can_rep(dummies, sym, b_S, sgens, S_transversals, g): + r""" + Butler-Portugal algorithm for tensor canonicalization with dummy indices. + + Parameters + ========== + + dummies + list of lists of dummy indices, + one list for each type of index; + the dummy indices are put in order contravariant, covariant + [d0, -d0, d1, -d1, ...]. + + sym + list of the symmetries of the index metric for each type. + + possible symmetries of the metrics + * 0 symmetric + * 1 antisymmetric + * None no symmetry + + b_S + base of a minimal slot symmetry BSGS. + + sgens + generators of the slot symmetry BSGS. + + S_transversals + transversals for the slot BSGS. + + g + permutation representing the tensor. + + Returns + ======= + + Return 0 if the tensor is zero, else return the array form of + the permutation representing the canonical form of the tensor. + + Notes + ===== + + A tensor with dummy indices can be represented in a number + of equivalent ways which typically grows exponentially with + the number of indices. To be able to establish if two tensors + with many indices are equal becomes computationally very slow + in absence of an efficient algorithm. + + The Butler-Portugal algorithm [3] is an efficient algorithm to + put tensors in canonical form, solving the above problem. + + Portugal observed that a tensor can be represented by a permutation, + and that the class of tensors equivalent to it under slot and dummy + symmetries is equivalent to the double coset `D*g*S` + (Note: in this documentation we use the conventions for multiplication + of permutations p, q with (p*q)(i) = p[q[i]] which is opposite + to the one used in the Permutation class) + + Using the algorithm by Butler to find a representative of the + double coset one can find a canonical form for the tensor. + + To see this correspondence, + let `g` be a permutation in array form; a tensor with indices `ind` + (the indices including both the contravariant and the covariant ones) + can be written as + + `t = T(ind[g[0]], \dots, ind[g[n-1]])`, + + where `n = len(ind)`; + `g` has size `n + 2`, the last two indices for the sign of the tensor + (trick introduced in [4]). + + A slot symmetry transformation `s` is a permutation acting on the slots + `t \rightarrow T(ind[(g*s)[0]], \dots, ind[(g*s)[n-1]])` + + A dummy symmetry transformation acts on `ind` + `t \rightarrow T(ind[(d*g)[0]], \dots, ind[(d*g)[n-1]])` + + Being interested only in the transformations of the tensor under + these symmetries, one can represent the tensor by `g`, which transforms + as + + `g -> d*g*s`, so it belongs to the coset `D*g*S`, or in other words + to the set of all permutations allowed by the slot and dummy symmetries. + + Let us explain the conventions by an example. + + Given a tensor `T^{d3 d2 d1}{}_{d1 d2 d3}` with the slot symmetries + `T^{a0 a1 a2 a3 a4 a5} = -T^{a2 a1 a0 a3 a4 a5}` + + `T^{a0 a1 a2 a3 a4 a5} = -T^{a4 a1 a2 a3 a0 a5}` + + and symmetric metric, find the tensor equivalent to it which + is the lowest under the ordering of indices: + lexicographic ordering `d1, d2, d3` and then contravariant + before covariant index; that is the canonical form of the tensor. + + The canonical form is `-T^{d1 d2 d3}{}_{d1 d2 d3}` + obtained using `T^{a0 a1 a2 a3 a4 a5} = -T^{a2 a1 a0 a3 a4 a5}`. + + To convert this problem in the input for this function, + use the following ordering of the index names + (- for covariant for short) `d1, -d1, d2, -d2, d3, -d3` + + `T^{d3 d2 d1}{}_{d1 d2 d3}` corresponds to `g = [4, 2, 0, 1, 3, 5, 6, 7]` + where the last two indices are for the sign + + `sgens = [Permutation(0, 2)(6, 7), Permutation(0, 4)(6, 7)]` + + sgens[0] is the slot symmetry `-(0, 2)` + `T^{a0 a1 a2 a3 a4 a5} = -T^{a2 a1 a0 a3 a4 a5}` + + sgens[1] is the slot symmetry `-(0, 4)` + `T^{a0 a1 a2 a3 a4 a5} = -T^{a4 a1 a2 a3 a0 a5}` + + The dummy symmetry group D is generated by the strong base generators + `[(0, 1), (2, 3), (4, 5), (0, 2)(1, 3), (0, 4)(1, 5)]` + where the first three interchange covariant and contravariant + positions of the same index (d1 <-> -d1) and the last two interchange + the dummy indices themselves (d1 <-> d2). + + The dummy symmetry acts from the left + `d = [1, 0, 2, 3, 4, 5, 6, 7]` exchange `d1 \leftrightarrow -d1` + `T^{d3 d2 d1}{}_{d1 d2 d3} == T^{d3 d2}{}_{d1}{}^{d1}{}_{d2 d3}` + + `g=[4, 2, 0, 1, 3, 5, 6, 7] -> [4, 2, 1, 0, 3, 5, 6, 7] = _af_rmul(d, g)` + which differs from `_af_rmul(g, d)`. + + The slot symmetry acts from the right + `s = [2, 1, 0, 3, 4, 5, 7, 6]` exchanges slots 0 and 2 and changes sign + `T^{d3 d2 d1}{}_{d1 d2 d3} == -T^{d1 d2 d3}{}_{d1 d2 d3}` + + `g=[4,2,0,1,3,5,6,7] -> [0, 2, 4, 1, 3, 5, 7, 6] = _af_rmul(g, s)` + + Example in which the tensor is zero, same slot symmetries as above: + `T^{d2}{}_{d1 d3}{}^{d1 d3}{}_{d2}` + + `= -T^{d3}{}_{d1 d3}{}^{d1 d2}{}_{d2}` under slot symmetry `-(0,4)`; + + `= T_{d3 d1}{}^{d3}{}^{d1 d2}{}_{d2}` under slot symmetry `-(0,2)`; + + `= T^{d3}{}_{d1 d3}{}^{d1 d2}{}_{d2}` symmetric metric; + + `= 0` since two of these lines have tensors differ only for the sign. + + The double coset D*g*S consists of permutations `h = d*g*s` corresponding + to equivalent tensors; if there are two `h` which are the same apart + from the sign, return zero; otherwise + choose as representative the tensor with indices + ordered lexicographically according to `[d1, -d1, d2, -d2, d3, -d3]` + that is ``rep = min(D*g*S) = min([d*g*s for d in D for s in S])`` + + The indices are fixed one by one; first choose the lowest index + for slot 0, then the lowest remaining index for slot 1, etc. + Doing this one obtains a chain of stabilizers + + `S \rightarrow S_{b0} \rightarrow S_{b0,b1} \rightarrow \dots` and + `D \rightarrow D_{p0} \rightarrow D_{p0,p1} \rightarrow \dots` + + where ``[b0, b1, ...] = range(b)`` is a base of the symmetric group; + the strong base `b_S` of S is an ordered sublist of it; + therefore it is sufficient to compute once the + strong base generators of S using the Schreier-Sims algorithm; + the stabilizers of the strong base generators are the + strong base generators of the stabilizer subgroup. + + ``dbase = [p0, p1, ...]`` is not in general in lexicographic order, + so that one must recompute the strong base generators each time; + however this is trivial, there is no need to use the Schreier-Sims + algorithm for D. + + The algorithm keeps a TAB of elements `(s_i, d_i, h_i)` + where `h_i = d_i \times g \times s_i` satisfying `h_i[j] = p_j` for `0 \le j < i` + starting from `s_0 = id, d_0 = id, h_0 = g`. + + The equations `h_0[0] = p_0, h_1[1] = p_1, \dots` are solved in this order, + choosing each time the lowest possible value of p_i + + For `j < i` + `d_i*g*s_i*S_{b_0, \dots, b_{i-1}}*b_j = D_{p_0, \dots, p_{i-1}}*p_j` + so that for dx in `D_{p_0,\dots,p_{i-1}}` and sx in + `S_{base[0], \dots, base[i-1]}` one has `dx*d_i*g*s_i*sx*b_j = p_j` + + Search for dx, sx such that this equation holds for `j = i`; + it can be written as `s_i*sx*b_j = J, dx*d_i*g*J = p_j` + `sx*b_j = s_i**-1*J; sx = trace(s_i**-1, S_{b_0,...,b_{i-1}})` + `dx**-1*p_j = d_i*g*J; dx = trace(d_i*g*J, D_{p_0,...,p_{i-1}})` + + `s_{i+1} = s_i*trace(s_i**-1*J, S_{b_0,...,b_{i-1}})` + `d_{i+1} = trace(d_i*g*J, D_{p_0,...,p_{i-1}})**-1*d_i` + `h_{i+1}*b_i = d_{i+1}*g*s_{i+1}*b_i = p_i` + + `h_n*b_j = p_j` for all j, so that `h_n` is the solution. + + Add the found `(s, d, h)` to TAB1. + + At the end of the iteration sort TAB1 with respect to the `h`; + if there are two consecutive `h` in TAB1 which differ only for the + sign, the tensor is zero, so return 0; + if there are two consecutive `h` which are equal, keep only one. + + Then stabilize the slot generators under `i` and the dummy generators + under `p_i`. + + Assign `TAB = TAB1` at the end of the iteration step. + + At the end `TAB` contains a unique `(s, d, h)`, since all the slots + of the tensor `h` have been fixed to have the minimum value according + to the symmetries. The algorithm returns `h`. + + It is important that the slot BSGS has lexicographic minimal base, + otherwise there is an `i` which does not belong to the slot base + for which `p_i` is fixed by the dummy symmetry only, while `i` + is not invariant from the slot stabilizer, so `p_i` is not in + general the minimal value. + + This algorithm differs slightly from the original algorithm [3]: + the canonical form is minimal lexicographically, and + the BSGS has minimal base under lexicographic order. + Equal tensors `h` are eliminated from TAB. + + + Examples + ======== + + >>> from sympy.combinatorics.permutations import Permutation + >>> from sympy.combinatorics.tensor_can import double_coset_can_rep, get_transversals + >>> gens = [Permutation(x) for x in [[2, 1, 0, 3, 4, 5, 7, 6], [4, 1, 2, 3, 0, 5, 7, 6]]] + >>> base = [0, 2] + >>> g = Permutation([4, 2, 0, 1, 3, 5, 6, 7]) + >>> transversals = get_transversals(base, gens) + >>> double_coset_can_rep([list(range(6))], [0], base, gens, transversals, g) + [0, 1, 2, 3, 4, 5, 7, 6] + + >>> g = Permutation([4, 1, 3, 0, 5, 2, 6, 7]) + >>> double_coset_can_rep([list(range(6))], [0], base, gens, transversals, g) + 0 + """ + size = g.size + g = g.array_form + num_dummies = size - 2 + indices = list(range(num_dummies)) + all_metrics_with_sym = not any(_ is None for _ in sym) + num_types = len(sym) + dumx = dummies[:] + dumx_flat = [] + for dx in dumx: + dumx_flat.extend(dx) + b_S = b_S[:] + sgensx = [h._array_form for h in sgens] + if b_S: + S_transversals = transversal2coset(size, b_S, S_transversals) + # strong generating set for D + dsgsx = [] + for i in range(num_types): + dsgsx.extend(dummy_sgs(dumx[i], sym[i], num_dummies)) + idn = list(range(size)) + # TAB = list of entries (s, d, h) where h = _af_rmuln(d,g,s) + # for short, in the following d*g*s means _af_rmuln(d,g,s) + TAB = [(idn, idn, g)] + for i in range(size - 2): + b = i + testb = b in b_S and sgensx + if testb: + sgensx1 = [_af_new(_) for _ in sgensx] + deltab = _orbit(size, sgensx1, b) + else: + deltab = {b} + # p1 = min(IMAGES) = min(Union D_p*h*deltab for h in TAB) + if all_metrics_with_sym: + md = _min_dummies(dumx, sym, indices) + else: + md = [min(_orbit(size, [_af_new( + ddx) for ddx in dsgsx], ii)) for ii in range(size - 2)] + + p_i = min(min(md[h[x]] for x in deltab) for s, d, h in TAB) + dsgsx1 = [_af_new(_) for _ in dsgsx] + Dxtrav = _orbit_transversal(size, dsgsx1, p_i, False, af=True) \ + if dsgsx else None + if Dxtrav: + Dxtrav = [_af_invert(x) for x in Dxtrav] + # compute the orbit of p_i + for ii in range(num_types): + if p_i in dumx[ii]: + # the orbit is made by all the indices in dum[ii] + if sym[ii] is not None: + deltap = dumx[ii] + else: + # the orbit is made by all the even indices if p_i + # is even, by all the odd indices if p_i is odd + p_i_index = dumx[ii].index(p_i) % 2 + deltap = dumx[ii][p_i_index::2] + break + else: + deltap = [p_i] + TAB1 = [] + while TAB: + s, d, h = TAB.pop() + if min(md[h[x]] for x in deltab) != p_i: + continue + deltab1 = [x for x in deltab if md[h[x]] == p_i] + # NEXT = s*deltab1 intersection (d*g)**-1*deltap + dg = _af_rmul(d, g) + dginv = _af_invert(dg) + sdeltab = [s[x] for x in deltab1] + gdeltap = [dginv[x] for x in deltap] + NEXT = [x for x in sdeltab if x in gdeltap] + # d, s satisfy + # d*g*s*base[i-1] = p_{i-1}; using the stabilizers + # d*g*s*S_{base[0],...,base[i-1]}*base[i-1] = + # D_{p_0,...,p_{i-1}}*p_{i-1} + # so that to find d1, s1 satisfying d1*g*s1*b = p_i + # one can look for dx in D_{p_0,...,p_{i-1}} and + # sx in S_{base[0],...,base[i-1]} + # d1 = dx*d; s1 = s*sx + # d1*g*s1*b = dx*d*g*s*sx*b = p_i + for j in NEXT: + if testb: + # solve s1*b = j with s1 = s*sx for some element sx + # of the stabilizer of ..., base[i-1] + # sx*b = s**-1*j; sx = _trace_S(s, j,...) + # s1 = s*trace_S(s**-1*j,...) + s1 = _trace_S(s, j, b, S_transversals) + if not s1: + continue + else: + s1 = [s[ix] for ix in s1] + else: + s1 = s + # assert s1[b] == j # invariant + # solve d1*g*j = p_i with d1 = dx*d for some element dg + # of the stabilizer of ..., p_{i-1} + # dx**-1*p_i = d*g*j; dx**-1 = trace_D(d*g*j,...) + # d1 = trace_D(d*g*j,...)**-1*d + # to save an inversion in the inner loop; notice we did + # Dxtrav = [perm_af_invert(x) for x in Dxtrav] out of the loop + if Dxtrav: + d1 = _trace_D(dg[j], p_i, Dxtrav) + if not d1: + continue + else: + if p_i != dg[j]: + continue + d1 = idn + assert d1[dg[j]] == p_i # invariant + d1 = [d1[ix] for ix in d] + h1 = [d1[g[ix]] for ix in s1] + # assert h1[b] == p_i # invariant + TAB1.append((s1, d1, h1)) + + # if TAB contains equal permutations, keep only one of them; + # if TAB contains equal permutations up to the sign, return 0 + TAB1.sort(key=lambda x: x[-1]) + prev = [0] * size + while TAB1: + s, d, h = TAB1.pop() + if h[:-2] == prev[:-2]: + if h[-1] != prev[-1]: + return 0 + else: + TAB.append((s, d, h)) + prev = h + + # stabilize the SGS + sgensx = [h for h in sgensx if h[b] == b] + if b in b_S: + b_S.remove(b) + _dumx_remove(dumx, dumx_flat, p_i) + dsgsx = [] + for i in range(num_types): + dsgsx.extend(dummy_sgs(dumx[i], sym[i], num_dummies)) + return TAB[0][-1] + + +def canonical_free(base, gens, g, num_free): + """ + Canonicalization of a tensor with respect to free indices + choosing the minimum with respect to lexicographical ordering + in the free indices. + + Explanation + =========== + + ``base``, ``gens`` BSGS for slot permutation group + ``g`` permutation representing the tensor + ``num_free`` number of free indices + The indices must be ordered with first the free indices + + See explanation in double_coset_can_rep + The algorithm is a variation of the one given in [2]. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> from sympy.combinatorics.tensor_can import canonical_free + >>> gens = [[1, 0, 2, 3, 5, 4], [2, 3, 0, 1, 4, 5],[0, 1, 3, 2, 5, 4]] + >>> gens = [Permutation(h) for h in gens] + >>> base = [0, 2] + >>> g = Permutation([2, 1, 0, 3, 4, 5]) + >>> canonical_free(base, gens, g, 4) + [0, 3, 1, 2, 5, 4] + + Consider the product of Riemann tensors + ``T = R^{a}_{d0}^{d1,d2}*R_{d2,d1}^{d0,b}`` + The order of the indices is ``[a, b, d0, -d0, d1, -d1, d2, -d2]`` + The permutation corresponding to the tensor is + ``g = [0, 3, 4, 6, 7, 5, 2, 1, 8, 9]`` + + In particular ``a`` is position ``0``, ``b`` is in position ``9``. + Use the slot symmetries to get `T` is a form which is the minimal + in lexicographic order in the free indices ``a`` and ``b``, e.g. + ``-R^{a}_{d0}^{d1,d2}*R^{b,d0}_{d2,d1}`` corresponding to + ``[0, 3, 4, 6, 1, 2, 7, 5, 9, 8]`` + + >>> from sympy.combinatorics.tensor_can import riemann_bsgs, tensor_gens + >>> base, gens = riemann_bsgs + >>> size, sbase, sgens = tensor_gens(base, gens, [[], []], 0) + >>> g = Permutation([0, 3, 4, 6, 7, 5, 2, 1, 8, 9]) + >>> canonical_free(sbase, [Permutation(h) for h in sgens], g, 2) + [0, 3, 4, 6, 1, 2, 7, 5, 9, 8] + """ + g = g.array_form + size = len(g) + if not base: + return g[:] + + transversals = get_transversals(base, gens) + for x in sorted(g[:-2]): + if x not in base: + base.append(x) + h = g + for transv in transversals: + h_i = [size]*num_free + # find the element s in transversals[i] such that + # _af_rmul(h, s) has its free elements with the lowest position in h + s = None + for sk in transv.values(): + h1 = _af_rmul(h, sk) + hi = [h1.index(ix) for ix in range(num_free)] + if hi < h_i: + h_i = hi + s = sk + if s: + h = _af_rmul(h, s) + return h + + +def _get_map_slots(size, fixed_slots): + res = list(range(size)) + pos = 0 + for i in range(size): + if i in fixed_slots: + continue + res[i] = pos + pos += 1 + return res + + +def _lift_sgens(size, fixed_slots, free, s): + a = [] + j = k = 0 + fd = [y for _, y in sorted(zip(fixed_slots, free))] + num_free = len(free) + for i in range(size): + if i in fixed_slots: + a.append(fd[k]) + k += 1 + else: + a.append(s[j] + num_free) + j += 1 + return a + + +def canonicalize(g, dummies, msym, *v): + """ + canonicalize tensor formed by tensors + + Parameters + ========== + + g : permutation representing the tensor + + dummies : list representing the dummy indices + it can be a list of dummy indices of the same type + or a list of lists of dummy indices, one list for each + type of index; + the dummy indices must come after the free indices, + and put in order contravariant, covariant + [d0, -d0, d1,-d1,...] + + msym : symmetry of the metric(s) + it can be an integer or a list; + in the first case it is the symmetry of the dummy index metric; + in the second case it is the list of the symmetries of the + index metric for each type + + v : list, (base_i, gens_i, n_i, sym_i) for tensors of type `i` + + base_i, gens_i : BSGS for tensors of this type. + The BSGS should have minimal base under lexicographic ordering; + if not, an attempt is made do get the minimal BSGS; + in case of failure, + canonicalize_naive is used, which is much slower. + + n_i : number of tensors of type `i`. + + sym_i : symmetry under exchange of component tensors of type `i`. + + Both for msym and sym_i the cases are + * None no symmetry + * 0 commuting + * 1 anticommuting + + Returns + ======= + + 0 if the tensor is zero, else return the array form of + the permutation representing the canonical form of the tensor. + + Algorithm + ========= + + First one uses canonical_free to get the minimum tensor under + lexicographic order, using only the slot symmetries. + If the component tensors have not minimal BSGS, it is attempted + to find it; if the attempt fails canonicalize_naive + is used instead. + + Compute the residual slot symmetry keeping fixed the free indices + using tensor_gens(base, gens, list_free_indices, sym). + + Reduce the problem eliminating the free indices. + + Then use double_coset_can_rep and lift back the result reintroducing + the free indices. + + Examples + ======== + + one type of index with commuting metric; + + `A_{a b}` and `B_{a b}` antisymmetric and commuting + + `T = A_{d0 d1} * B^{d0}{}_{d2} * B^{d2 d1}` + + `ord = [d0,-d0,d1,-d1,d2,-d2]` order of the indices + + g = [1, 3, 0, 5, 4, 2, 6, 7] + + `T_c = 0` + + >>> from sympy.combinatorics.tensor_can import get_symmetric_group_sgs, canonicalize, bsgs_direct_product + >>> from sympy.combinatorics import Permutation + >>> base2a, gens2a = get_symmetric_group_sgs(2, 1) + >>> t0 = (base2a, gens2a, 1, 0) + >>> t1 = (base2a, gens2a, 2, 0) + >>> g = Permutation([1, 3, 0, 5, 4, 2, 6, 7]) + >>> canonicalize(g, range(6), 0, t0, t1) + 0 + + same as above, but with `B_{a b}` anticommuting + + `T_c = -A^{d0 d1} * B_{d0}{}^{d2} * B_{d1 d2}` + + can = [0,2,1,4,3,5,7,6] + + >>> t1 = (base2a, gens2a, 2, 1) + >>> canonicalize(g, range(6), 0, t0, t1) + [0, 2, 1, 4, 3, 5, 7, 6] + + two types of indices `[a,b,c,d,e,f]` and `[m,n]`, in this order, + both with commuting metric + + `f^{a b c}` antisymmetric, commuting + + `A_{m a}` no symmetry, commuting + + `T = f^c{}_{d a} * f^f{}_{e b} * A_m{}^d * A^{m b} * A_n{}^a * A^{n e}` + + ord = [c,f,a,-a,b,-b,d,-d,e,-e,m,-m,n,-n] + + g = [0,7,3, 1,9,5, 11,6, 10,4, 13,2, 12,8, 14,15] + + The canonical tensor is + `T_c = -f^{c a b} * f^{f d e} * A^m{}_a * A_{m d} * A^n{}_b * A_{n e}` + + can = [0,2,4, 1,6,8, 10,3, 11,7, 12,5, 13,9, 15,14] + + >>> base_f, gens_f = get_symmetric_group_sgs(3, 1) + >>> base1, gens1 = get_symmetric_group_sgs(1) + >>> base_A, gens_A = bsgs_direct_product(base1, gens1, base1, gens1) + >>> t0 = (base_f, gens_f, 2, 0) + >>> t1 = (base_A, gens_A, 4, 0) + >>> dummies = [range(2, 10), range(10, 14)] + >>> g = Permutation([0, 7, 3, 1, 9, 5, 11, 6, 10, 4, 13, 2, 12, 8, 14, 15]) + >>> canonicalize(g, dummies, [0, 0], t0, t1) + [0, 2, 4, 1, 6, 8, 10, 3, 11, 7, 12, 5, 13, 9, 15, 14] + """ + from sympy.combinatorics.testutil import canonicalize_naive + if not isinstance(msym, list): + if msym not in (0, 1, None): + raise ValueError('msym must be 0, 1 or None') + num_types = 1 + else: + num_types = len(msym) + if not all(msymx in (0, 1, None) for msymx in msym): + raise ValueError('msym entries must be 0, 1 or None') + if len(dummies) != num_types: + raise ValueError( + 'dummies and msym must have the same number of elements') + size = g.size + num_tensors = 0 + v1 = [] + for base_i, gens_i, n_i, sym_i in v: + # check that the BSGS is minimal; + # this property is used in double_coset_can_rep; + # if it is not minimal use canonicalize_naive + if not _is_minimal_bsgs(base_i, gens_i): + mbsgs = get_minimal_bsgs(base_i, gens_i) + if not mbsgs: + can = canonicalize_naive(g, dummies, msym, *v) + return can + base_i, gens_i = mbsgs + v1.append((base_i, gens_i, [[]] * n_i, sym_i)) + num_tensors += n_i + + if num_types == 1 and not isinstance(msym, list): + dummies = [dummies] + msym = [msym] + flat_dummies = [] + for dumx in dummies: + flat_dummies.extend(dumx) + + if flat_dummies and flat_dummies != list(range(flat_dummies[0], flat_dummies[-1] + 1)): + raise ValueError('dummies is not valid') + + # slot symmetry of the tensor + size1, sbase, sgens = gens_products(*v1) + if size != size1: + raise ValueError( + 'g has size %d, generators have size %d' % (size, size1)) + free = [i for i in range(size - 2) if i not in flat_dummies] + num_free = len(free) + + # g1 minimal tensor under slot symmetry + g1 = canonical_free(sbase, sgens, g, num_free) + if not flat_dummies: + return g1 + # save the sign of g1 + sign = 0 if g1[-1] == size - 1 else 1 + + # the free indices are kept fixed. + # Determine free_i, the list of slots of tensors which are fixed + # since they are occupied by free indices, which are fixed. + start = 0 + for i, (base_i, gens_i, n_i, sym_i) in enumerate(v): + free_i = [] + len_tens = gens_i[0].size - 2 + # for each component tensor get a list od fixed islots + for j in range(n_i): + # get the elements corresponding to the component tensor + h = g1[start:(start + len_tens)] + fr = [] + # get the positions of the fixed elements in h + for k in free: + if k in h: + fr.append(h.index(k)) + free_i.append(fr) + start += len_tens + v1[i] = (base_i, gens_i, free_i, sym_i) + # BSGS of the tensor with fixed free indices + # if tensor_gens fails in gens_product, use canonicalize_naive + size, sbase, sgens = gens_products(*v1) + + # reduce the permutations getting rid of the free indices + pos_free = [g1.index(x) for x in range(num_free)] + size_red = size - num_free + g1_red = [x - num_free for x in g1 if x in flat_dummies] + if sign: + g1_red.extend([size_red - 1, size_red - 2]) + else: + g1_red.extend([size_red - 2, size_red - 1]) + map_slots = _get_map_slots(size, pos_free) + sbase_red = [map_slots[i] for i in sbase if i not in pos_free] + sgens_red = [_af_new([map_slots[i] for i in y._array_form if i not in pos_free]) for y in sgens] + dummies_red = [[x - num_free for x in y] for y in dummies] + transv_red = get_transversals(sbase_red, sgens_red) + g1_red = _af_new(g1_red) + g2 = double_coset_can_rep( + dummies_red, msym, sbase_red, sgens_red, transv_red, g1_red) + if g2 == 0: + return 0 + # lift to the case with the free indices + g3 = _lift_sgens(size, pos_free, free, g2) + return g3 + + +def perm_af_direct_product(gens1, gens2, signed=True): + """ + Direct products of the generators gens1 and gens2. + + Examples + ======== + + >>> from sympy.combinatorics.tensor_can import perm_af_direct_product + >>> gens1 = [[1, 0, 2, 3], [0, 1, 3, 2]] + >>> gens2 = [[1, 0]] + >>> perm_af_direct_product(gens1, gens2, False) + [[1, 0, 2, 3, 4, 5], [0, 1, 3, 2, 4, 5], [0, 1, 2, 3, 5, 4]] + >>> gens1 = [[1, 0, 2, 3, 5, 4], [0, 1, 3, 2, 4, 5]] + >>> gens2 = [[1, 0, 2, 3]] + >>> perm_af_direct_product(gens1, gens2, True) + [[1, 0, 2, 3, 4, 5, 7, 6], [0, 1, 3, 2, 4, 5, 6, 7], [0, 1, 2, 3, 5, 4, 6, 7]] + """ + gens1 = [list(x) for x in gens1] + gens2 = [list(x) for x in gens2] + s = 2 if signed else 0 + n1 = len(gens1[0]) - s + n2 = len(gens2[0]) - s + start = list(range(n1)) + end = list(range(n1, n1 + n2)) + if signed: + gens1 = [gen[:-2] + end + [gen[-2] + n2, gen[-1] + n2] + for gen in gens1] + gens2 = [start + [x + n1 for x in gen] for gen in gens2] + else: + gens1 = [gen + end for gen in gens1] + gens2 = [start + [x + n1 for x in gen] for gen in gens2] + + res = gens1 + gens2 + + return res + + +def bsgs_direct_product(base1, gens1, base2, gens2, signed=True): + """ + Direct product of two BSGS. + + Parameters + ========== + + base1 : base of the first BSGS. + + gens1 : strong generating sequence of the first BSGS. + + base2, gens2 : similarly for the second BSGS. + + signed : flag for signed permutations. + + Examples + ======== + + >>> from sympy.combinatorics.tensor_can import (get_symmetric_group_sgs, bsgs_direct_product) + >>> base1, gens1 = get_symmetric_group_sgs(1) + >>> base2, gens2 = get_symmetric_group_sgs(2) + >>> bsgs_direct_product(base1, gens1, base2, gens2) + ([1], [(4)(1 2)]) + """ + s = 2 if signed else 0 + n1 = gens1[0].size - s + base = list(base1) + base += [x + n1 for x in base2] + gens1 = [h._array_form for h in gens1] + gens2 = [h._array_form for h in gens2] + gens = perm_af_direct_product(gens1, gens2, signed) + size = len(gens[0]) + id_af = list(range(size)) + gens = [h for h in gens if h != id_af] + if not gens: + gens = [id_af] + return base, [_af_new(h) for h in gens] + + +def get_symmetric_group_sgs(n, antisym=False): + """ + Return base, gens of the minimal BSGS for (anti)symmetric tensor + + Parameters + ========== + + n : rank of the tensor + antisym : bool + ``antisym = False`` symmetric tensor + ``antisym = True`` antisymmetric tensor + + Examples + ======== + + >>> from sympy.combinatorics.tensor_can import get_symmetric_group_sgs + >>> get_symmetric_group_sgs(3) + ([0, 1], [(4)(0 1), (4)(1 2)]) + """ + if n == 1: + return [], [_af_new(list(range(3)))] + gens = [Permutation(n - 1)(i, i + 1)._array_form for i in range(n - 1)] + if antisym == 0: + gens = [x + [n, n + 1] for x in gens] + else: + gens = [x + [n + 1, n] for x in gens] + base = list(range(n - 1)) + return base, [_af_new(h) for h in gens] + +riemann_bsgs = [0, 2], [Permutation(0, 1)(4, 5), Permutation(2, 3)(4, 5), + Permutation(5)(0, 2)(1, 3)] + + +def get_transversals(base, gens): + """ + Return transversals for the group with BSGS base, gens + """ + if not base: + return [] + stabs = _distribute_gens_by_base(base, gens) + orbits, transversals = _orbits_transversals_from_bsgs(base, stabs) + transversals = [{x: h._array_form for x, h in y.items()} for y in + transversals] + return transversals + + +def _is_minimal_bsgs(base, gens): + """ + Check if the BSGS has minimal base under lexigographic order. + + base, gens BSGS + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> from sympy.combinatorics.tensor_can import riemann_bsgs, _is_minimal_bsgs + >>> _is_minimal_bsgs(*riemann_bsgs) + True + >>> riemann_bsgs1 = ([2, 0], ([Permutation(5)(0, 1)(4, 5), Permutation(5)(0, 2)(1, 3)])) + >>> _is_minimal_bsgs(*riemann_bsgs1) + False + """ + base1 = [] + sgs1 = gens[:] + size = gens[0].size + for i in range(size): + if not all(h._array_form[i] == i for h in sgs1): + base1.append(i) + sgs1 = [h for h in sgs1 if h._array_form[i] == i] + return base1 == base + + +def get_minimal_bsgs(base, gens): + """ + Compute a minimal GSGS + + base, gens BSGS + + If base, gens is a minimal BSGS return it; else return a minimal BSGS + if it fails in finding one, it returns None + + TODO: use baseswap in the case in which if it fails in finding a + minimal BSGS + + Examples + ======== + + >>> from sympy.combinatorics import Permutation + >>> from sympy.combinatorics.tensor_can import get_minimal_bsgs + >>> riemann_bsgs1 = ([2, 0], ([Permutation(5)(0, 1)(4, 5), Permutation(5)(0, 2)(1, 3)])) + >>> get_minimal_bsgs(*riemann_bsgs1) + ([0, 2], [(0 1)(4 5), (5)(0 2)(1 3), (2 3)(4 5)]) + """ + G = PermutationGroup(gens) + base, gens = G.schreier_sims_incremental() + if not _is_minimal_bsgs(base, gens): + return None + return base, gens + + +def tensor_gens(base, gens, list_free_indices, sym=0): + """ + Returns size, res_base, res_gens BSGS for n tensors of the + same type. + + Explanation + =========== + + base, gens BSGS for tensors of this type + list_free_indices list of the slots occupied by fixed indices + for each of the tensors + + sym symmetry under commutation of two tensors + sym None no symmetry + sym 0 commuting + sym 1 anticommuting + + Examples + ======== + + >>> from sympy.combinatorics.tensor_can import tensor_gens, get_symmetric_group_sgs + + two symmetric tensors with 3 indices without free indices + + >>> base, gens = get_symmetric_group_sgs(3) + >>> tensor_gens(base, gens, [[], []]) + (8, [0, 1, 3, 4], [(7)(0 1), (7)(1 2), (7)(3 4), (7)(4 5), (7)(0 3)(1 4)(2 5)]) + + two symmetric tensors with 3 indices with free indices in slot 1 and 0 + + >>> tensor_gens(base, gens, [[1], [0]]) + (8, [0, 4], [(7)(0 2), (7)(4 5)]) + + four symmetric tensors with 3 indices, two of which with free indices + + """ + def _get_bsgs(G, base, gens, free_indices): + """ + return the BSGS for G.pointwise_stabilizer(free_indices) + """ + if not free_indices: + return base[:], gens[:] + else: + H = G.pointwise_stabilizer(free_indices) + base, sgs = H.schreier_sims_incremental() + return base, sgs + + # if not base there is no slot symmetry for the component tensors + # if list_free_indices.count([]) < 2 there is no commutation symmetry + # so there is no resulting slot symmetry + if not base and list_free_indices.count([]) < 2: + n = len(list_free_indices) + size = gens[0].size + size = n * (size - 2) + 2 + return size, [], [_af_new(list(range(size)))] + + # if any(list_free_indices) one needs to compute the pointwise + # stabilizer, so G is needed + if any(list_free_indices): + G = PermutationGroup(gens) + else: + G = None + + # no_free list of lists of indices for component tensors without fixed + # indices + no_free = [] + size = gens[0].size + id_af = list(range(size)) + num_indices = size - 2 + if not list_free_indices[0]: + no_free.append(list(range(num_indices))) + res_base, res_gens = _get_bsgs(G, base, gens, list_free_indices[0]) + for i in range(1, len(list_free_indices)): + base1, gens1 = _get_bsgs(G, base, gens, list_free_indices[i]) + res_base, res_gens = bsgs_direct_product(res_base, res_gens, + base1, gens1, 1) + if not list_free_indices[i]: + no_free.append(list(range(size - 2, size - 2 + num_indices))) + size += num_indices + nr = size - 2 + res_gens = [h for h in res_gens if h._array_form != id_af] + # if sym there are no commuting tensors stop here + if sym is None or not no_free: + if not res_gens: + res_gens = [_af_new(id_af)] + return size, res_base, res_gens + + # if the component tensors have moinimal BSGS, so is their direct + # product P; the slot symmetry group is S = P*C, where C is the group + # to (anti)commute the component tensors with no free indices + # a stabilizer has the property S_i = P_i*C_i; + # the BSGS of P*C has SGS_P + SGS_C and the base is + # the ordered union of the bases of P and C. + # If P has minimal BSGS, so has S with this base. + base_comm = [] + for i in range(len(no_free) - 1): + ind1 = no_free[i] + ind2 = no_free[i + 1] + a = list(range(ind1[0])) + a.extend(ind2) + a.extend(ind1) + base_comm.append(ind1[0]) + a.extend(list(range(ind2[-1] + 1, nr))) + if sym == 0: + a.extend([nr, nr + 1]) + else: + a.extend([nr + 1, nr]) + res_gens.append(_af_new(a)) + res_base = list(res_base) + # each base is ordered; order the union of the two bases + for i in base_comm: + if i not in res_base: + res_base.append(i) + res_base.sort() + if not res_gens: + res_gens = [_af_new(id_af)] + + return size, res_base, res_gens + + +def gens_products(*v): + """ + Returns size, res_base, res_gens BSGS for n tensors of different types. + + Explanation + =========== + + v is a sequence of (base_i, gens_i, free_i, sym_i) + where + base_i, gens_i BSGS of tensor of type `i` + free_i list of the fixed slots for each of the tensors + of type `i`; if there are `n_i` tensors of type `i` + and none of them have fixed slots, `free = [[]]*n_i` + sym 0 (1) if the tensors of type `i` (anti)commute among themselves + + Examples + ======== + + >>> from sympy.combinatorics.tensor_can import get_symmetric_group_sgs, gens_products + >>> base, gens = get_symmetric_group_sgs(2) + >>> gens_products((base, gens, [[], []], 0)) + (6, [0, 2], [(5)(0 1), (5)(2 3), (5)(0 2)(1 3)]) + >>> gens_products((base, gens, [[1], []], 0)) + (6, [2], [(5)(2 3)]) + """ + res_size, res_base, res_gens = tensor_gens(*v[0]) + for i in range(1, len(v)): + size, base, gens = tensor_gens(*v[i]) + res_base, res_gens = bsgs_direct_product(res_base, res_gens, base, + gens, 1) + res_size = res_gens[0].size + id_af = list(range(res_size)) + res_gens = [h for h in res_gens if h != id_af] + if not res_gens: + res_gens = [id_af] + return res_size, res_base, res_gens diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_coset_table.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_coset_table.py new file mode 100644 index 0000000000000000000000000000000000000000..ab3f62880445c5deb526797ee0623fe3510bcbc3 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_coset_table.py @@ -0,0 +1,825 @@ +from sympy.combinatorics.fp_groups import FpGroup +from sympy.combinatorics.coset_table import (CosetTable, + coset_enumeration_r, coset_enumeration_c) +from sympy.combinatorics.coset_table import modified_coset_enumeration_r +from sympy.combinatorics.free_groups import free_group + +from sympy.testing.pytest import slow + +""" +References +========== + +[1] Holt, D., Eick, B., O'Brien, E. +"Handbook of Computational Group Theory" + +[2] John J. Cannon; Lucien A. Dimino; George Havas; Jane M. Watson +Mathematics of Computation, Vol. 27, No. 123. (Jul., 1973), pp. 463-490. +"Implementation and Analysis of the Todd-Coxeter Algorithm" + +""" + +def test_scan_1(): + # Example 5.1 from [1] + F, x, y = free_group("x, y") + f = FpGroup(F, [x**3, y**3, x**-1*y**-1*x*y]) + c = CosetTable(f, [x]) + + c.scan_and_fill(0, x) + assert c.table == [[0, 0, None, None]] + assert c.p == [0] + assert c.n == 1 + assert c.omega == [0] + + c.scan_and_fill(0, x**3) + assert c.table == [[0, 0, None, None]] + assert c.p == [0] + assert c.n == 1 + assert c.omega == [0] + + c.scan_and_fill(0, y**3) + assert c.table == [[0, 0, 1, 2], [None, None, 2, 0], [None, None, 0, 1]] + assert c.p == [0, 1, 2] + assert c.n == 3 + assert c.omega == [0, 1, 2] + + c.scan_and_fill(0, x**-1*y**-1*x*y) + assert c.table == [[0, 0, 1, 2], [None, None, 2, 0], [2, 2, 0, 1]] + assert c.p == [0, 1, 2] + assert c.n == 3 + assert c.omega == [0, 1, 2] + + c.scan_and_fill(1, x**3) + assert c.table == [[0, 0, 1, 2], [3, 4, 2, 0], [2, 2, 0, 1], \ + [4, 1, None, None], [1, 3, None, None]] + assert c.p == [0, 1, 2, 3, 4] + assert c.n == 5 + assert c.omega == [0, 1, 2, 3, 4] + + c.scan_and_fill(1, y**3) + assert c.table == [[0, 0, 1, 2], [3, 4, 2, 0], [2, 2, 0, 1], \ + [4, 1, None, None], [1, 3, None, None]] + assert c.p == [0, 1, 2, 3, 4] + assert c.n == 5 + assert c.omega == [0, 1, 2, 3, 4] + + c.scan_and_fill(1, x**-1*y**-1*x*y) + assert c.table == [[0, 0, 1, 2], [1, 1, 2, 0], [2, 2, 0, 1], \ + [None, 1, None, None], [1, 3, None, None]] + assert c.p == [0, 1, 2, 1, 1] + assert c.n == 3 + assert c.omega == [0, 1, 2] + + # Example 5.2 from [1] + f = FpGroup(F, [x**2, y**3, (x*y)**3]) + c = CosetTable(f, [x*y]) + + c.scan_and_fill(0, x*y) + assert c.table == [[1, None, None, 1], [None, 0, 0, None]] + assert c.p == [0, 1] + assert c.n == 2 + assert c.omega == [0, 1] + + c.scan_and_fill(0, x**2) + assert c.table == [[1, 1, None, 1], [0, 0, 0, None]] + assert c.p == [0, 1] + assert c.n == 2 + assert c.omega == [0, 1] + + c.scan_and_fill(0, y**3) + assert c.table == [[1, 1, 2, 1], [0, 0, 0, 2], [None, None, 1, 0]] + assert c.p == [0, 1, 2] + assert c.n == 3 + assert c.omega == [0, 1, 2] + + c.scan_and_fill(0, (x*y)**3) + assert c.table == [[1, 1, 2, 1], [0, 0, 0, 2], [None, None, 1, 0]] + assert c.p == [0, 1, 2] + assert c.n == 3 + assert c.omega == [0, 1, 2] + + c.scan_and_fill(1, x**2) + assert c.table == [[1, 1, 2, 1], [0, 0, 0, 2], [None, None, 1, 0]] + assert c.p == [0, 1, 2] + assert c.n == 3 + assert c.omega == [0, 1, 2] + + c.scan_and_fill(1, y**3) + assert c.table == [[1, 1, 2, 1], [0, 0, 0, 2], [None, None, 1, 0]] + assert c.p == [0, 1, 2] + assert c.n == 3 + assert c.omega == [0, 1, 2] + + c.scan_and_fill(1, (x*y)**3) + assert c.table == [[1, 1, 2, 1], [0, 0, 0, 2], [3, 4, 1, 0], [None, 2, 4, None], [2, None, None, 3]] + assert c.p == [0, 1, 2, 3, 4] + assert c.n == 5 + assert c.omega == [0, 1, 2, 3, 4] + + c.scan_and_fill(2, x**2) + assert c.table == [[1, 1, 2, 1], [0, 0, 0, 2], [3, 3, 1, 0], [2, 2, 3, 3], [2, None, None, 3]] + assert c.p == [0, 1, 2, 3, 3] + assert c.n == 4 + assert c.omega == [0, 1, 2, 3] + + +@slow +def test_coset_enumeration(): + # this test function contains the combined tests for the two strategies + # i.e. HLT and Felsch strategies. + + # Example 5.1 from [1] + F, x, y = free_group("x, y") + f = FpGroup(F, [x**3, y**3, x**-1*y**-1*x*y]) + C_r = coset_enumeration_r(f, [x]) + C_r.compress(); C_r.standardize() + C_c = coset_enumeration_c(f, [x]) + C_c.compress(); C_c.standardize() + table1 = [[0, 0, 1, 2], [1, 1, 2, 0], [2, 2, 0, 1]] + assert C_r.table == table1 + assert C_c.table == table1 + + # E1 from [2] Pg. 474 + F, r, s, t = free_group("r, s, t") + E1 = FpGroup(F, [t**-1*r*t*r**-2, r**-1*s*r*s**-2, s**-1*t*s*t**-2]) + C_r = coset_enumeration_r(E1, []) + C_r.compress() + C_c = coset_enumeration_c(E1, []) + C_c.compress() + table2 = [[0, 0, 0, 0, 0, 0]] + assert C_r.table == table2 + # test for issue #11449 + assert C_c.table == table2 + + # Cox group from [2] Pg. 474 + F, a, b = free_group("a, b") + Cox = FpGroup(F, [a**6, b**6, (a*b)**2, (a**2*b**2)**2, (a**3*b**3)**5]) + C_r = coset_enumeration_r(Cox, [a]) + C_r.compress(); C_r.standardize() + C_c = coset_enumeration_c(Cox, [a]) + C_c.compress(); C_c.standardize() + table3 = [[0, 0, 1, 2], + [2, 3, 4, 0], + [5, 1, 0, 6], + [1, 7, 8, 9], + [9, 10, 11, 1], + [12, 2, 9, 13], + [14, 9, 2, 11], + [3, 12, 15, 16], + [16, 17, 18, 3], + [6, 4, 3, 5], + [4, 19, 20, 21], + [21, 22, 6, 4], + [7, 5, 23, 24], + [25, 23, 5, 18], + [19, 6, 22, 26], + [24, 27, 28, 7], + [29, 8, 7, 30], + [8, 31, 32, 33], + [33, 34, 13, 8], + [10, 14, 35, 35], + [35, 36, 37, 10], + [30, 11, 10, 29], + [11, 38, 39, 14], + [13, 39, 38, 12], + [40, 15, 12, 41], + [42, 13, 34, 43], + [44, 35, 14, 45], + [15, 46, 47, 34], + [34, 48, 49, 15], + [50, 16, 21, 51], + [52, 21, 16, 49], + [17, 50, 53, 54], + [54, 55, 56, 17], + [41, 18, 17, 40], + [18, 28, 27, 25], + [26, 20, 19, 19], + [20, 57, 58, 59], + [59, 60, 51, 20], + [22, 52, 61, 23], + [23, 62, 63, 22], + [64, 24, 33, 65], + [48, 33, 24, 61], + [62, 25, 54, 66], + [67, 54, 25, 68], + [57, 26, 59, 69], + [70, 59, 26, 63], + [27, 64, 71, 72], + [72, 73, 68, 27], + [28, 41, 74, 75], + [75, 76, 30, 28], + [31, 29, 77, 78], + [79, 77, 29, 37], + [38, 30, 76, 80], + [78, 81, 82, 31], + [43, 32, 31, 42], + [32, 83, 84, 85], + [85, 86, 65, 32], + [36, 44, 87, 88], + [88, 89, 90, 36], + [45, 37, 36, 44], + [37, 82, 81, 79], + [80, 74, 41, 38], + [39, 42, 91, 92], + [92, 93, 45, 39], + [46, 40, 94, 95], + [96, 94, 40, 56], + [97, 91, 42, 82], + [83, 43, 98, 99], + [100, 98, 43, 47], + [101, 87, 44, 90], + [82, 45, 93, 97], + [95, 102, 103, 46], + [104, 47, 46, 105], + [47, 106, 107, 100], + [61, 108, 109, 48], + [105, 49, 48, 104], + [49, 110, 111, 52], + [51, 111, 110, 50], + [112, 53, 50, 113], + [114, 51, 60, 115], + [116, 61, 52, 117], + [53, 118, 119, 60], + [60, 70, 66, 53], + [55, 67, 120, 121], + [121, 122, 123, 55], + [113, 56, 55, 112], + [56, 103, 102, 96], + [69, 124, 125, 57], + [115, 58, 57, 114], + [58, 126, 127, 128], + [128, 128, 69, 58], + [66, 129, 130, 62], + [117, 63, 62, 116], + [63, 125, 124, 70], + [65, 109, 108, 64], + [131, 71, 64, 132], + [133, 65, 86, 134], + [135, 66, 70, 136], + [68, 130, 129, 67], + [137, 120, 67, 138], + [132, 68, 73, 131], + [139, 69, 128, 140], + [71, 141, 142, 86], + [86, 143, 144, 71], + [145, 72, 75, 146], + [147, 75, 72, 144], + [73, 145, 148, 120], + [120, 149, 150, 73], + [74, 151, 152, 94], + [94, 153, 146, 74], + [76, 147, 154, 77], + [77, 155, 156, 76], + [157, 78, 85, 158], + [143, 85, 78, 154], + [155, 79, 88, 159], + [160, 88, 79, 161], + [151, 80, 92, 162], + [163, 92, 80, 156], + [81, 157, 164, 165], + [165, 166, 161, 81], + [99, 107, 106, 83], + [134, 84, 83, 133], + [84, 167, 168, 169], + [169, 170, 158, 84], + [87, 171, 172, 93], + [93, 163, 159, 87], + [89, 160, 173, 174], + [174, 175, 176, 89], + [90, 90, 89, 101], + [91, 177, 178, 98], + [98, 179, 162, 91], + [180, 95, 100, 181], + [179, 100, 95, 152], + [153, 96, 121, 148], + [182, 121, 96, 183], + [177, 97, 165, 184], + [185, 165, 97, 172], + [186, 99, 169, 187], + [188, 169, 99, 178], + [171, 101, 174, 189], + [190, 174, 101, 176], + [102, 180, 191, 192], + [192, 193, 183, 102], + [103, 113, 194, 195], + [195, 196, 105, 103], + [106, 104, 197, 198], + [199, 197, 104, 109], + [110, 105, 196, 200], + [198, 201, 133, 106], + [107, 186, 202, 203], + [203, 204, 181, 107], + [108, 116, 205, 206], + [206, 207, 132, 108], + [109, 133, 201, 199], + [200, 194, 113, 110], + [111, 114, 208, 209], + [209, 210, 117, 111], + [118, 112, 211, 212], + [213, 211, 112, 123], + [214, 208, 114, 125], + [126, 115, 215, 216], + [217, 215, 115, 119], + [218, 205, 116, 130], + [125, 117, 210, 214], + [212, 219, 220, 118], + [136, 119, 118, 135], + [119, 221, 222, 217], + [122, 182, 223, 224], + [224, 225, 226, 122], + [138, 123, 122, 137], + [123, 220, 219, 213], + [124, 139, 227, 228], + [228, 229, 136, 124], + [216, 222, 221, 126], + [140, 127, 126, 139], + [127, 230, 231, 232], + [232, 233, 140, 127], + [129, 135, 234, 235], + [235, 236, 138, 129], + [130, 132, 207, 218], + [141, 131, 237, 238], + [239, 237, 131, 150], + [167, 134, 240, 241], + [242, 240, 134, 142], + [243, 234, 135, 220], + [221, 136, 229, 244], + [149, 137, 245, 246], + [247, 245, 137, 226], + [220, 138, 236, 243], + [244, 227, 139, 221], + [230, 140, 233, 248], + [238, 249, 250, 141], + [251, 142, 141, 252], + [142, 253, 254, 242], + [154, 255, 256, 143], + [252, 144, 143, 251], + [144, 257, 258, 147], + [146, 258, 257, 145], + [259, 148, 145, 260], + [261, 146, 153, 262], + [263, 154, 147, 264], + [148, 265, 266, 153], + [246, 267, 268, 149], + [260, 150, 149, 259], + [150, 250, 249, 239], + [162, 269, 270, 151], + [262, 152, 151, 261], + [152, 271, 272, 179], + [159, 273, 274, 155], + [264, 156, 155, 263], + [156, 270, 269, 163], + [158, 256, 255, 157], + [275, 164, 157, 276], + [277, 158, 170, 278], + [279, 159, 163, 280], + [161, 274, 273, 160], + [281, 173, 160, 282], + [276, 161, 166, 275], + [283, 162, 179, 284], + [164, 285, 286, 170], + [170, 188, 184, 164], + [166, 185, 189, 173], + [173, 287, 288, 166], + [241, 254, 253, 167], + [278, 168, 167, 277], + [168, 289, 290, 291], + [291, 292, 187, 168], + [189, 293, 294, 171], + [280, 172, 171, 279], + [172, 295, 296, 185], + [175, 190, 297, 297], + [297, 298, 299, 175], + [282, 176, 175, 281], + [176, 294, 293, 190], + [184, 296, 295, 177], + [284, 178, 177, 283], + [178, 300, 301, 188], + [181, 272, 271, 180], + [302, 191, 180, 303], + [304, 181, 204, 305], + [183, 266, 265, 182], + [306, 223, 182, 307], + [303, 183, 193, 302], + [308, 184, 188, 309], + [310, 189, 185, 311], + [187, 301, 300, 186], + [305, 202, 186, 304], + [312, 187, 292, 313], + [314, 297, 190, 315], + [191, 316, 317, 204], + [204, 318, 319, 191], + [320, 192, 195, 321], + [322, 195, 192, 319], + [193, 320, 323, 223], + [223, 324, 325, 193], + [194, 326, 327, 211], + [211, 328, 321, 194], + [196, 322, 329, 197], + [197, 330, 331, 196], + [332, 198, 203, 333], + [318, 203, 198, 329], + [330, 199, 206, 334], + [335, 206, 199, 336], + [326, 200, 209, 337], + [338, 209, 200, 331], + [201, 332, 339, 240], + [240, 340, 336, 201], + [202, 341, 342, 292], + [292, 343, 333, 202], + [205, 344, 345, 210], + [210, 338, 334, 205], + [207, 335, 346, 237], + [237, 347, 348, 207], + [208, 349, 350, 215], + [215, 351, 337, 208], + [352, 212, 217, 353], + [351, 217, 212, 327], + [328, 213, 224, 323], + [354, 224, 213, 355], + [349, 214, 228, 356], + [357, 228, 214, 345], + [358, 216, 232, 359], + [360, 232, 216, 350], + [344, 218, 235, 361], + [362, 235, 218, 348], + [219, 352, 363, 364], + [364, 365, 355, 219], + [222, 358, 366, 367], + [367, 368, 353, 222], + [225, 354, 369, 370], + [370, 371, 372, 225], + [307, 226, 225, 306], + [226, 268, 267, 247], + [227, 373, 374, 233], + [233, 360, 356, 227], + [229, 357, 361, 234], + [234, 375, 376, 229], + [248, 231, 230, 230], + [231, 377, 378, 379], + [379, 380, 359, 231], + [236, 362, 381, 245], + [245, 382, 383, 236], + [384, 238, 242, 385], + [340, 242, 238, 346], + [347, 239, 246, 381], + [386, 246, 239, 387], + [388, 241, 291, 389], + [343, 291, 241, 339], + [375, 243, 364, 390], + [391, 364, 243, 383], + [373, 244, 367, 392], + [393, 367, 244, 376], + [382, 247, 370, 394], + [395, 370, 247, 396], + [377, 248, 379, 397], + [398, 379, 248, 374], + [249, 384, 399, 400], + [400, 401, 387, 249], + [250, 260, 402, 403], + [403, 404, 252, 250], + [253, 251, 405, 406], + [407, 405, 251, 256], + [257, 252, 404, 408], + [406, 409, 277, 253], + [254, 388, 410, 411], + [411, 412, 385, 254], + [255, 263, 413, 414], + [414, 415, 276, 255], + [256, 277, 409, 407], + [408, 402, 260, 257], + [258, 261, 416, 417], + [417, 418, 264, 258], + [265, 259, 419, 420], + [421, 419, 259, 268], + [422, 416, 261, 270], + [271, 262, 423, 424], + [425, 423, 262, 266], + [426, 413, 263, 274], + [270, 264, 418, 422], + [420, 427, 307, 265], + [266, 303, 428, 425], + [267, 386, 429, 430], + [430, 431, 396, 267], + [268, 307, 427, 421], + [269, 283, 432, 433], + [433, 434, 280, 269], + [424, 428, 303, 271], + [272, 304, 435, 436], + [436, 437, 284, 272], + [273, 279, 438, 439], + [439, 440, 282, 273], + [274, 276, 415, 426], + [285, 275, 441, 442], + [443, 441, 275, 288], + [289, 278, 444, 445], + [446, 444, 278, 286], + [447, 438, 279, 294], + [295, 280, 434, 448], + [287, 281, 449, 450], + [451, 449, 281, 299], + [294, 282, 440, 447], + [448, 432, 283, 295], + [300, 284, 437, 452], + [442, 453, 454, 285], + [309, 286, 285, 308], + [286, 455, 456, 446], + [450, 457, 458, 287], + [311, 288, 287, 310], + [288, 454, 453, 443], + [445, 456, 455, 289], + [313, 290, 289, 312], + [290, 459, 460, 461], + [461, 462, 389, 290], + [293, 310, 463, 464], + [464, 465, 315, 293], + [296, 308, 466, 467], + [467, 468, 311, 296], + [298, 314, 469, 470], + [470, 471, 472, 298], + [315, 299, 298, 314], + [299, 458, 457, 451], + [452, 435, 304, 300], + [301, 312, 473, 474], + [474, 475, 309, 301], + [316, 302, 476, 477], + [478, 476, 302, 325], + [341, 305, 479, 480], + [481, 479, 305, 317], + [324, 306, 482, 483], + [484, 482, 306, 372], + [485, 466, 308, 454], + [455, 309, 475, 486], + [487, 463, 310, 458], + [454, 311, 468, 485], + [486, 473, 312, 455], + [459, 313, 488, 489], + [490, 488, 313, 342], + [491, 469, 314, 472], + [458, 315, 465, 487], + [477, 492, 485, 316], + [463, 317, 316, 468], + [317, 487, 493, 481], + [329, 447, 464, 318], + [468, 319, 318, 463], + [319, 467, 448, 322], + [321, 448, 467, 320], + [475, 323, 320, 466], + [432, 321, 328, 437], + [438, 329, 322, 434], + [323, 474, 452, 328], + [483, 494, 486, 324], + [466, 325, 324, 475], + [325, 485, 492, 478], + [337, 422, 433, 326], + [437, 327, 326, 432], + [327, 436, 424, 351], + [334, 426, 439, 330], + [434, 331, 330, 438], + [331, 433, 422, 338], + [333, 464, 447, 332], + [449, 339, 332, 440], + [465, 333, 343, 469], + [413, 334, 338, 418], + [336, 439, 426, 335], + [441, 346, 335, 415], + [440, 336, 340, 449], + [416, 337, 351, 423], + [339, 451, 470, 343], + [346, 443, 450, 340], + [480, 493, 487, 341], + [469, 342, 341, 465], + [342, 491, 495, 490], + [361, 407, 414, 344], + [418, 345, 344, 413], + [345, 417, 408, 357], + [381, 446, 442, 347], + [415, 348, 347, 441], + [348, 414, 407, 362], + [356, 408, 417, 349], + [423, 350, 349, 416], + [350, 425, 420, 360], + [353, 424, 436, 352], + [479, 363, 352, 435], + [428, 353, 368, 476], + [355, 452, 474, 354], + [488, 369, 354, 473], + [435, 355, 365, 479], + [402, 356, 360, 419], + [405, 361, 357, 404], + [359, 420, 425, 358], + [476, 366, 358, 428], + [427, 359, 380, 482], + [444, 381, 362, 409], + [363, 481, 477, 368], + [368, 393, 390, 363], + [365, 391, 394, 369], + [369, 490, 480, 365], + [366, 478, 483, 380], + [380, 398, 392, 366], + [371, 395, 496, 497], + [497, 498, 489, 371], + [473, 372, 371, 488], + [372, 486, 494, 484], + [392, 400, 403, 373], + [419, 374, 373, 402], + [374, 421, 430, 398], + [390, 411, 406, 375], + [404, 376, 375, 405], + [376, 403, 400, 393], + [397, 430, 421, 377], + [482, 378, 377, 427], + [378, 484, 497, 499], + [499, 499, 397, 378], + [394, 461, 445, 382], + [409, 383, 382, 444], + [383, 406, 411, 391], + [385, 450, 443, 384], + [492, 399, 384, 453], + [457, 385, 412, 493], + [387, 442, 446, 386], + [494, 429, 386, 456], + [453, 387, 401, 492], + [389, 470, 451, 388], + [493, 410, 388, 457], + [471, 389, 462, 495], + [412, 390, 393, 399], + [462, 394, 391, 410], + [401, 392, 398, 429], + [396, 445, 461, 395], + [498, 496, 395, 460], + [456, 396, 431, 494], + [431, 397, 499, 496], + [399, 477, 481, 412], + [429, 483, 478, 401], + [410, 480, 490, 462], + [496, 497, 484, 431], + [489, 495, 491, 459], + [495, 460, 459, 471], + [460, 489, 498, 498], + [472, 472, 471, 491]] + + assert C_r.table == table3 + assert C_c.table == table3 + + # Group denoted by B2,4 from [2] Pg. 474 + F, a, b = free_group("a, b") + B_2_4 = FpGroup(F, [a**4, b**4, (a*b)**4, (a**-1*b)**4, (a**2*b)**4, \ + (a*b**2)**4, (a**2*b**2)**4, (a**-1*b*a*b)**4, (a*b**-1*a*b)**4]) + C_r = coset_enumeration_r(B_2_4, [a]) + C_c = coset_enumeration_c(B_2_4, [a]) + index_r = 0 + for i in range(len(C_r.p)): + if C_r.p[i] == i: + index_r += 1 + assert index_r == 1024 + + index_c = 0 + for i in range(len(C_c.p)): + if C_c.p[i] == i: + index_c += 1 + assert index_c == 1024 + + # trivial Macdonald group G(2,2) from [2] Pg. 480 + M = FpGroup(F, [b**-1*a**-1*b*a*b**-1*a*b*a**-2, a**-1*b**-1*a*b*a**-1*b*a*b**-2]) + C_r = coset_enumeration_r(M, [a]) + C_r.compress(); C_r.standardize() + C_c = coset_enumeration_c(M, [a]) + C_c.compress(); C_c.standardize() + table4 = [[0, 0, 0, 0]] + assert C_r.table == table4 + assert C_c.table == table4 + + +def test_look_ahead(): + # Section 3.2 [Test Example] Example (d) from [2] + F, a, b, c = free_group("a, b, c") + f = FpGroup(F, [a**11, b**5, c**4, (a*c)**3, b**2*c**-1*b**-1*c, a**4*b**-1*a**-1*b]) + H = [c, b, c**2] + table0 = [[1, 2, 0, 0, 0, 0], + [3, 0, 4, 5, 6, 7], + [0, 8, 9, 10, 11, 12], + [5, 1, 10, 13, 14, 15], + [16, 5, 16, 1, 17, 18], + [4, 3, 1, 8, 19, 20], + [12, 21, 22, 23, 24, 1], + [25, 26, 27, 28, 1, 24], + [2, 10, 5, 16, 22, 28], + [10, 13, 13, 2, 29, 30]] + CosetTable.max_stack_size = 10 + C_c = coset_enumeration_c(f, H) + C_c.compress(); C_c.standardize() + assert C_c.table[: 10] == table0 + +def test_modified_methods(): + ''' + Tests for modified coset table methods. + Example 5.7 from [1] Holt, D., Eick, B., O'Brien + "Handbook of Computational Group Theory". + + ''' + F, x, y = free_group("x, y") + f = FpGroup(F, [x**3, y**5, (x*y)**2]) + H = [x*y, x**-1*y**-1*x*y*x] + C = CosetTable(f, H) + C.modified_define(0, x) + identity = C._grp.identity + a_0 = C._grp.generators[0] + a_1 = C._grp.generators[1] + + assert C.P == [[identity, None, None, None], + [None, identity, None, None]] + assert C.table == [[1, None, None, None], + [None, 0, None, None]] + + C.modified_define(1, x) + assert C.table == [[1, None, None, None], + [2, 0, None, None], + [None, 1, None, None]] + assert C.P == [[identity, None, None, None], + [identity, identity, None, None], + [None, identity, None, None]] + + C.modified_scan(0, x**3, C._grp.identity, fill=False) + assert C.P == [[identity, identity, None, None], + [identity, identity, None, None], + [identity, identity, None, None]] + assert C.table == [[1, 2, None, None], + [2, 0, None, None], + [0, 1, None, None]] + + C.modified_scan(0, x*y, C._grp.generators[0], fill=False) + assert C.P == [[identity, identity, None, a_0**-1], + [identity, identity, a_0, None], + [identity, identity, None, None]] + assert C.table == [[1, 2, None, 1], + [2, 0, 0, None], + [0, 1, None, None]] + + C.modified_define(2, y**-1) + assert C.table == [[1, 2, None, 1], + [2, 0, 0, None], + [0, 1, None, 3], + [None, None, 2, None]] + assert C.P == [[identity, identity, None, a_0**-1], + [identity, identity, a_0, None], + [identity, identity, None, identity], + [None, None, identity, None]] + + C.modified_scan(0, x**-1*y**-1*x*y*x, C._grp.generators[1]) + assert C.table == [[1, 2, None, 1], + [2, 0, 0, None], + [0, 1, None, 3], + [3, 3, 2, None]] + assert C.P == [[identity, identity, None, a_0**-1], + [identity, identity, a_0, None], + [identity, identity, None, identity], + [a_1, a_1**-1, identity, None]] + + C.modified_scan(2, (x*y)**2, C._grp.identity) + assert C.table == [[1, 2, 3, 1], + [2, 0, 0, None], + [0, 1, None, 3], + [3, 3, 2, 0]] + assert C.P == [[identity, identity, a_1**-1, a_0**-1], + [identity, identity, a_0, None], + [identity, identity, None, identity], + [a_1, a_1**-1, identity, a_1]] + + C.modified_define(2, y) + assert C.table == [[1, 2, 3, 1], + [2, 0, 0, None], + [0, 1, 4, 3], + [3, 3, 2, 0], + [None, None, None, 2]] + assert C.P == [[identity, identity, a_1**-1, a_0**-1], + [identity, identity, a_0, None], + [identity, identity, identity, identity], + [a_1, a_1**-1, identity, a_1], + [None, None, None, identity]] + + C.modified_scan(0, y**5, C._grp.identity) + assert C.table == [[1, 2, 3, 1], [2, 0, 0, 4], [0, 1, 4, 3], [3, 3, 2, 0], [None, None, 1, 2]] + assert C.P == [[identity, identity, a_1**-1, a_0**-1], + [identity, identity, a_0, a_0*a_1**-1], + [identity, identity, identity, identity], + [a_1, a_1**-1, identity, a_1], + [None, None, a_1*a_0**-1, identity]] + + C.modified_scan(1, (x*y)**2, C._grp.identity) + assert C.table == [[1, 2, 3, 1], + [2, 0, 0, 4], + [0, 1, 4, 3], + [3, 3, 2, 0], + [4, 4, 1, 2]] + assert C.P == [[identity, identity, a_1**-1, a_0**-1], + [identity, identity, a_0, a_0*a_1**-1], + [identity, identity, identity, identity], + [a_1, a_1**-1, identity, a_1], + [a_0*a_1**-1, a_1*a_0**-1, a_1*a_0**-1, identity]] + + # Modified coset enumeration test + f = FpGroup(F, [x**3, y**3, x**-1*y**-1*x*y]) + C = coset_enumeration_r(f, [x]) + C_m = modified_coset_enumeration_r(f, [x]) + assert C_m.table == C.table diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_fp_groups.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_fp_groups.py new file mode 100644 index 0000000000000000000000000000000000000000..3f57bdf8eff92a3022d8e01cd74ce98575987929 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_fp_groups.py @@ -0,0 +1,257 @@ +from sympy.core.singleton import S +from sympy.combinatorics.fp_groups import (FpGroup, low_index_subgroups, + reidemeister_presentation, FpSubgroup, + simplify_presentation) +from sympy.combinatorics.free_groups import (free_group, FreeGroup) + +from sympy.testing.pytest import slow + +""" +References +========== + +[1] Holt, D., Eick, B., O'Brien, E. +"Handbook of Computational Group Theory" + +[2] John J. Cannon; Lucien A. Dimino; George Havas; Jane M. Watson +Mathematics of Computation, Vol. 27, No. 123. (Jul., 1973), pp. 463-490. +"Implementation and Analysis of the Todd-Coxeter Algorithm" + +[3] PROC. SECOND INTERNAT. CONF. THEORY OF GROUPS, CANBERRA 1973, +pp. 347-356. "A Reidemeister-Schreier program" by George Havas. +http://staff.itee.uq.edu.au/havas/1973cdhw.pdf + +""" + +def test_low_index_subgroups(): + F, x, y = free_group("x, y") + + # Example 5.10 from [1] Pg. 194 + f = FpGroup(F, [x**2, y**3, (x*y)**4]) + L = low_index_subgroups(f, 4) + t1 = [[[0, 0, 0, 0]], + [[0, 0, 1, 2], [1, 1, 2, 0], [3, 3, 0, 1], [2, 2, 3, 3]], + [[0, 0, 1, 2], [2, 2, 2, 0], [1, 1, 0, 1]], + [[1, 1, 0, 0], [0, 0, 1, 1]]] + for i in range(len(t1)): + assert L[i].table == t1[i] + + f = FpGroup(F, [x**2, y**3, (x*y)**7]) + L = low_index_subgroups(f, 15) + t2 = [[[0, 0, 0, 0]], + [[0, 0, 1, 2], [1, 1, 2, 0], [3, 3, 0, 1], [2, 2, 4, 5], + [4, 4, 5, 3], [6, 6, 3, 4], [5, 5, 6, 6]], + [[0, 0, 1, 2], [1, 1, 2, 0], [3, 3, 0, 1], [2, 2, 4, 5], + [6, 6, 5, 3], [5, 5, 3, 4], [4, 4, 6, 6]], + [[0, 0, 1, 2], [1, 1, 2, 0], [3, 3, 0, 1], [2, 2, 4, 5], + [6, 6, 5, 3], [7, 7, 3, 4], [4, 4, 8, 9], [5, 5, 10, 11], + [11, 11, 9, 6], [9, 9, 6, 8], [12, 12, 11, 7], [8, 8, 7, 10], + [10, 10, 13, 14], [14, 14, 14, 12], [13, 13, 12, 13]], + [[0, 0, 1, 2], [1, 1, 2, 0], [3, 3, 0, 1], [2, 2, 4, 5], + [6, 6, 5, 3], [7, 7, 3, 4], [4, 4, 8, 9], [5, 5, 10, 11], + [11, 11, 9, 6], [12, 12, 6, 8], [10, 10, 11, 7], [8, 8, 7, 10], + [9, 9, 13, 14], [14, 14, 14, 12], [13, 13, 12, 13]], + [[0, 0, 1, 2], [1, 1, 2, 0], [3, 3, 0, 1], [2, 2, 4, 5], + [6, 6, 5, 3], [7, 7, 3, 4], [4, 4, 8, 9], [5, 5, 10, 11], + [11, 11, 9, 6], [12, 12, 6, 8], [13, 13, 11, 7], [8, 8, 7, 10], + [9, 9, 12, 12], [10, 10, 13, 13]], + [[0, 0, 1, 2], [3, 3, 2, 0], [4, 4, 0, 1], [1, 1, 3, 3], [2, 2, 5, 6] + , [7, 7, 6, 4], [8, 8, 4, 5], [5, 5, 8, 9], [6, 6, 9, 7], + [10, 10, 7, 8], [9, 9, 11, 12], [11, 11, 12, 10], [13, 13, 10, 11], + [12, 12, 13, 13]], + [[0, 0, 1, 2], [3, 3, 2, 0], [4, 4, 0, 1], [1, 1, 3, 3], [2, 2, 5, 6] + , [7, 7, 6, 4], [8, 8, 4, 5], [5, 5, 8, 9], [6, 6, 9, 7], + [10, 10, 7, 8], [9, 9, 11, 12], [13, 13, 12, 10], [12, 12, 10, 11], + [11, 11, 13, 13]], + [[0, 0, 1, 2], [3, 3, 2, 0], [4, 4, 0, 1], [1, 1, 5, 6], [2, 2, 4, 4] + , [7, 7, 6, 3], [8, 8, 3, 5], [5, 5, 8, 9], [6, 6, 9, 7], + [10, 10, 7, 8], [9, 9, 11, 12], [13, 13, 12, 10], [12, 12, 10, 11], + [11, 11, 13, 13]], + [[0, 0, 1, 2], [3, 3, 2, 0], [4, 4, 0, 1], [1, 1, 5, 6], [2, 2, 7, 8] + , [5, 5, 6, 3], [9, 9, 3, 5], [10, 10, 8, 4], [8, 8, 4, 7], + [6, 6, 10, 11], [7, 7, 11, 9], [12, 12, 9, 10], [11, 11, 13, 14], + [14, 14, 14, 12], [13, 13, 12, 13]], + [[0, 0, 1, 2], [3, 3, 2, 0], [4, 4, 0, 1], [1, 1, 5, 6], [2, 2, 7, 8] + , [6, 6, 6, 3], [5, 5, 3, 5], [8, 8, 8, 4], [7, 7, 4, 7]], + [[0, 0, 1, 2], [3, 3, 2, 0], [4, 4, 0, 1], [1, 1, 5, 6], [2, 2, 7, 8] + , [9, 9, 6, 3], [6, 6, 3, 5], [10, 10, 8, 4], [11, 11, 4, 7], + [5, 5, 10, 12], [7, 7, 12, 9], [8, 8, 11, 11], [13, 13, 9, 10], + [12, 12, 13, 13]], + [[0, 0, 1, 2], [3, 3, 2, 0], [4, 4, 0, 1], [1, 1, 5, 6], [2, 2, 7, 8] + , [9, 9, 6, 3], [6, 6, 3, 5], [10, 10, 8, 4], [11, 11, 4, 7], + [5, 5, 12, 11], [7, 7, 10, 10], [8, 8, 9, 12], [13, 13, 11, 9], + [12, 12, 13, 13]], + [[0, 0, 1, 2], [3, 3, 2, 0], [4, 4, 0, 1], [1, 1, 5, 6], [2, 2, 7, 8] + , [9, 9, 6, 3], [10, 10, 3, 5], [7, 7, 8, 4], [11, 11, 4, 7], + [5, 5, 9, 9], [6, 6, 11, 12], [8, 8, 12, 10], [13, 13, 10, 11], + [12, 12, 13, 13]], + [[0, 0, 1, 2], [3, 3, 2, 0], [4, 4, 0, 1], [1, 1, 5, 6], [2, 2, 7, 8] + , [9, 9, 6, 3], [10, 10, 3, 5], [7, 7, 8, 4], [11, 11, 4, 7], + [5, 5, 12, 11], [6, 6, 10, 10], [8, 8, 9, 12], [13, 13, 11, 9], + [12, 12, 13, 13]], + [[0, 0, 1, 2], [3, 3, 2, 0], [4, 4, 0, 1], [1, 1, 5, 6], [2, 2, 7, 8] + , [9, 9, 6, 3], [10, 10, 3, 5], [11, 11, 8, 4], [12, 12, 4, 7], + [5, 5, 9, 9], [6, 6, 12, 13], [7, 7, 11, 11], [8, 8, 13, 10], + [13, 13, 10, 12]], + [[1, 1, 0, 0], [0, 0, 2, 3], [4, 4, 3, 1], [5, 5, 1, 2], [2, 2, 4, 4] + , [3, 3, 6, 7], [7, 7, 7, 5], [6, 6, 5, 6]]] + for i in range(len(t2)): + assert L[i].table == t2[i] + + f = FpGroup(F, [x**2, y**3, (x*y)**7]) + L = low_index_subgroups(f, 10, [x]) + t3 = [[[0, 0, 0, 0]], + [[0, 0, 1, 2], [1, 1, 2, 0], [3, 3, 0, 1], [2, 2, 4, 5], [4, 4, 5, 3], + [6, 6, 3, 4], [5, 5, 6, 6]], + [[0, 0, 1, 2], [1, 1, 2, 0], [3, 3, 0, 1], [2, 2, 4, 5], [6, 6, 5, 3], + [5, 5, 3, 4], [4, 4, 6, 6]], + [[0, 0, 1, 2], [3, 3, 2, 0], [4, 4, 0, 1], [1, 1, 5, 6], [2, 2, 7, 8], + [6, 6, 6, 3], [5, 5, 3, 5], [8, 8, 8, 4], [7, 7, 4, 7]]] + for i in range(len(t3)): + assert L[i].table == t3[i] + + +def test_subgroup_presentations(): + F, x, y = free_group("x, y") + f = FpGroup(F, [x**3, y**5, (x*y)**2]) + H = [x*y, x**-1*y**-1*x*y*x] + p1 = reidemeister_presentation(f, H) + assert str(p1) == "((y_1, y_2), (y_1**2, y_2**3, y_2*y_1*y_2*y_1*y_2*y_1))" + + H = f.subgroup(H) + assert (H.generators, H.relators) == p1 + + f = FpGroup(F, [x**3, y**3, (x*y)**3]) + H = [x*y, x*y**-1] + p2 = reidemeister_presentation(f, H) + assert str(p2) == "((x_0, y_0), (x_0**3, y_0**3, x_0*y_0*x_0*y_0*x_0*y_0))" + + f = FpGroup(F, [x**2*y**2, y**-1*x*y*x**-3]) + H = [x] + p3 = reidemeister_presentation(f, H) + assert str(p3) == "((x_0,), (x_0**4,))" + + f = FpGroup(F, [x**3*y**-3, (x*y)**3, (x*y**-1)**2]) + H = [x] + p4 = reidemeister_presentation(f, H) + assert str(p4) == "((x_0,), (x_0**6,))" + + # this presentation can be improved, the most simplified form + # of presentation is + # See [2] Pg 474 group PSL_2(11) + # This is the group PSL_2(11) + F, a, b, c = free_group("a, b, c") + f = FpGroup(F, [a**11, b**5, c**4, (b*c**2)**2, (a*b*c)**3, (a**4*c**2)**3, b**2*c**-1*b**-1*c, a**4*b**-1*a**-1*b]) + H = [a, b, c**2] + gens, rels = reidemeister_presentation(f, H) + assert str(gens) == "(b_1, c_3)" + assert len(rels) == 18 + + +@slow +def test_order(): + F, x, y = free_group("x, y") + f = FpGroup(F, [x**4, y**2, x*y*x**-1*y]) + assert f.order() == 8 + + f = FpGroup(F, [x*y*x**-1*y**-1, y**2]) + assert f.order() is S.Infinity + + F, a, b, c = free_group("a, b, c") + f = FpGroup(F, [a**250, b**2, c*b*c**-1*b, c**4, c**-1*a**-1*c*a, a**-1*b**-1*a*b]) + assert f.order() == 2000 + + F, x = free_group("x") + f = FpGroup(F, []) + assert f.order() is S.Infinity + + f = FpGroup(free_group('')[0], []) + assert f.order() == 1 + +def test_fp_subgroup(): + def _test_subgroup(K, T, S): + _gens = T(K.generators) + assert all(elem in S for elem in _gens) + assert T.is_injective() + assert T.image().order() == S.order() + F, x, y = free_group("x, y") + f = FpGroup(F, [x**4, y**2, x*y*x**-1*y]) + S = FpSubgroup(f, [x*y]) + assert (x*y)**-3 in S + K, T = f.subgroup([x*y], homomorphism=True) + assert T(K.generators) == [y*x**-1] + _test_subgroup(K, T, S) + + S = FpSubgroup(f, [x**-1*y*x]) + assert x**-1*y**4*x in S + assert x**-1*y**4*x**2 not in S + K, T = f.subgroup([x**-1*y*x], homomorphism=True) + assert T(K.generators[0]**3) == y**3 + _test_subgroup(K, T, S) + + f = FpGroup(F, [x**3, y**5, (x*y)**2]) + H = [x*y, x**-1*y**-1*x*y*x] + K, T = f.subgroup(H, homomorphism=True) + S = FpSubgroup(f, H) + _test_subgroup(K, T, S) + +def test_permutation_methods(): + F, x, y = free_group("x, y") + # DihedralGroup(8) + G = FpGroup(F, [x**2, y**8, x*y*x**-1*y]) + T = G._to_perm_group()[1] + assert T.is_isomorphism() + assert G.center() == [y**4] + + # DiheadralGroup(4) + G = FpGroup(F, [x**2, y**4, x*y*x**-1*y]) + S = FpSubgroup(G, G.normal_closure([x])) + assert x in S + assert y**-1*x*y in S + + # Z_5xZ_4 + G = FpGroup(F, [x*y*x**-1*y**-1, y**5, x**4]) + assert G.is_abelian + assert G.is_solvable + + # AlternatingGroup(5) + G = FpGroup(F, [x**3, y**2, (x*y)**5]) + assert not G.is_solvable + + # AlternatingGroup(4) + G = FpGroup(F, [x**3, y**2, (x*y)**3]) + assert len(G.derived_series()) == 3 + S = FpSubgroup(G, G.derived_subgroup()) + assert S.order() == 4 + + +def test_simplify_presentation(): + # ref #16083 + G = simplify_presentation(FpGroup(FreeGroup([]), [])) + assert not G.generators + assert not G.relators + + # CyclicGroup(3) + # The second generator in is trivial due to relators {x^2, x^5} + F, x, y = free_group("x, y") + G = simplify_presentation(FpGroup(F, [x**2, x**5, y**3])) + assert x in G.relators + +def test_cyclic(): + F, x, y = free_group("x, y") + f = FpGroup(F, [x*y, x**-1*y**-1*x*y*x]) + assert f.is_cyclic + f = FpGroup(F, [x*y, x*y**-1]) + assert f.is_cyclic + f = FpGroup(F, [x**4, y**2, x*y*x**-1*y]) + assert not f.is_cyclic + + +def test_abelian_invariants(): + F, x, y = free_group("x, y") + f = FpGroup(F, [x*y, x**-1*y**-1*x*y*x]) + assert f.abelian_invariants() == [] + f = FpGroup(F, [x*y, x*y**-1]) + assert f.abelian_invariants() == [2] + f = FpGroup(F, [x**4, y**2, x*y*x**-1*y]) + assert f.abelian_invariants() == [2, 4] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_free_groups.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_free_groups.py new file mode 100644 index 0000000000000000000000000000000000000000..439be4b7c5e8bb5ff592c9b7f07773e82952b3d5 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_free_groups.py @@ -0,0 +1,226 @@ +from sympy.combinatorics.free_groups import free_group, FreeGroup +from sympy.core import Symbol +from sympy.testing.pytest import raises +from sympy.core.numbers import oo + +F, x, y, z = free_group("x, y, z") + + +def test_FreeGroup__init__(): + x, y, z = map(Symbol, "xyz") + + assert len(FreeGroup("x, y, z").generators) == 3 + assert len(FreeGroup(x).generators) == 1 + assert len(FreeGroup(("x", "y", "z"))) == 3 + assert len(FreeGroup((x, y, z)).generators) == 3 + + +def test_FreeGroup__getnewargs__(): + x, y, z = map(Symbol, "xyz") + assert FreeGroup("x, y, z").__getnewargs__() == ((x, y, z),) + + +def test_free_group(): + G, a, b, c = free_group("a, b, c") + assert F.generators == (x, y, z) + assert x*z**2 in F + assert x in F + assert y*z**-1 in F + assert (y*z)**0 in F + assert a not in F + assert a**0 not in F + assert len(F) == 3 + assert str(F) == '' + assert not F == G + assert F.order() is oo + assert F.is_abelian == False + assert F.center() == {F.identity} + + (e,) = free_group("") + assert e.order() == 1 + assert e.generators == () + assert e.elements == {e.identity} + assert e.is_abelian == True + + +def test_FreeGroup__hash__(): + assert hash(F) + + +def test_FreeGroup__eq__(): + assert free_group("x, y, z")[0] == free_group("x, y, z")[0] + assert free_group("x, y, z")[0] is free_group("x, y, z")[0] + + assert free_group("x, y, z")[0] != free_group("a, x, y")[0] + assert free_group("x, y, z")[0] is not free_group("a, x, y")[0] + + assert free_group("x, y")[0] != free_group("x, y, z")[0] + assert free_group("x, y")[0] is not free_group("x, y, z")[0] + + assert free_group("x, y, z")[0] != free_group("x, y")[0] + assert free_group("x, y, z")[0] is not free_group("x, y")[0] + + +def test_FreeGroup__getitem__(): + assert F[0:] == FreeGroup("x, y, z") + assert F[1:] == FreeGroup("y, z") + assert F[2:] == FreeGroup("z") + + +def test_FreeGroupElm__hash__(): + assert hash(x*y*z) + + +def test_FreeGroupElm_copy(): + f = x*y*z**3 + g = f.copy() + h = x*y*z**7 + + assert f == g + assert f != h + + +def test_FreeGroupElm_inverse(): + assert x.inverse() == x**-1 + assert (x*y).inverse() == y**-1*x**-1 + assert (y*x*y**-1).inverse() == y*x**-1*y**-1 + assert (y**2*x**-1).inverse() == x*y**-2 + + +def test_FreeGroupElm_type_error(): + raises(TypeError, lambda: 2/x) + raises(TypeError, lambda: x**2 + y**2) + raises(TypeError, lambda: x/2) + + +def test_FreeGroupElm_methods(): + assert (x**0).order() == 1 + assert (y**2).order() is oo + assert (x**-1*y).commutator(x) == y**-1*x**-1*y*x + assert len(x**2*y**-1) == 3 + assert len(x**-1*y**3*z) == 5 + + +def test_FreeGroupElm_eliminate_word(): + w = x**5*y*x**2*y**-4*x + assert w.eliminate_word( x, x**2 ) == x**10*y*x**4*y**-4*x**2 + w3 = x**2*y**3*x**-1*y + assert w3.eliminate_word(x, x**2) == x**4*y**3*x**-2*y + assert w3.eliminate_word(x, y) == y**5 + assert w3.eliminate_word(x, y**4) == y**8 + assert w3.eliminate_word(y, x**-1) == x**-3 + assert w3.eliminate_word(x, y*z) == y*z*y*z*y**3*z**-1 + assert (y**-3).eliminate_word(y, x**-1*z**-1) == z*x*z*x*z*x + #assert w3.eliminate_word(x, y*x) == y*x*y*x**2*y*x*y*x*y*x*z**3 + #assert w3.eliminate_word(x, x*y) == x*y*x**2*y*x*y*x*y*x*y*z**3 + + +def test_FreeGroupElm_array_form(): + assert (x*z).array_form == ((Symbol('x'), 1), (Symbol('z'), 1)) + assert (x**2*z*y*x**-2).array_form == \ + ((Symbol('x'), 2), (Symbol('z'), 1), (Symbol('y'), 1), (Symbol('x'), -2)) + assert (x**-2*y**-1).array_form == ((Symbol('x'), -2), (Symbol('y'), -1)) + + +def test_FreeGroupElm_letter_form(): + assert (x**3).letter_form == (Symbol('x'), Symbol('x'), Symbol('x')) + assert (x**2*z**-2*x).letter_form == \ + (Symbol('x'), Symbol('x'), -Symbol('z'), -Symbol('z'), Symbol('x')) + + +def test_FreeGroupElm_ext_rep(): + assert (x**2*z**-2*x).ext_rep == \ + (Symbol('x'), 2, Symbol('z'), -2, Symbol('x'), 1) + assert (x**-2*y**-1).ext_rep == (Symbol('x'), -2, Symbol('y'), -1) + assert (x*z).ext_rep == (Symbol('x'), 1, Symbol('z'), 1) + + +def test_FreeGroupElm__mul__pow__(): + x1 = x.group.dtype(((Symbol('x'), 1),)) + assert x**2 == x1*x + + assert (x**2*y*x**-2)**4 == x**2*y**4*x**-2 + assert (x**2)**2 == x**4 + assert (x**-1)**-1 == x + assert (x**-1)**0 == F.identity + assert (y**2)**-2 == y**-4 + + assert x**2*x**-1 == x + assert x**2*y**2*y**-1 == x**2*y + assert x*x**-1 == F.identity + + assert x/x == F.identity + assert x/x**2 == x**-1 + assert (x**2*y)/(x**2*y**-1) == x**2*y**2*x**-2 + assert (x**2*y)/(y**-1*x**2) == x**2*y*x**-2*y + + assert x*(x**-1*y*z*y**-1) == y*z*y**-1 + assert x**2*(x**-2*y**-1*z**2*y) == y**-1*z**2*y + + a = F.identity + for n in range(10): + assert a == x**n + assert a**-1 == x**-n + a *= x + + +def test_FreeGroupElm__len__(): + assert len(x**5*y*x**2*y**-4*x) == 13 + assert len(x**17) == 17 + assert len(y**0) == 0 + + +def test_FreeGroupElm_comparison(): + assert not (x*y == y*x) + assert x**0 == y**0 + + assert x**2 < y**3 + assert not x**3 < y**2 + assert x*y < x**2*y + assert x**2*y**2 < y**4 + assert not y**4 < y**-4 + assert not y**4 < x**-4 + assert y**-2 < y**2 + + assert x**2 <= y**2 + assert x**2 <= x**2 + + assert not y*z > z*y + assert x > x**-1 + + assert not x**2 >= y**2 + + +def test_FreeGroupElm_syllables(): + w = x**5*y*x**2*y**-4*x + assert w.number_syllables() == 5 + assert w.exponent_syllable(2) == 2 + assert w.generator_syllable(3) == Symbol('y') + assert w.sub_syllables(1, 2) == y + assert w.sub_syllables(3, 3) == F.identity + + +def test_FreeGroup_exponents(): + w1 = x**2*y**3 + assert w1.exponent_sum(x) == 2 + assert w1.exponent_sum(x**-1) == -2 + assert w1.generator_count(x) == 2 + + w2 = x**2*y**4*x**-3 + assert w2.exponent_sum(x) == -1 + assert w2.generator_count(x) == 5 + + +def test_FreeGroup_generators(): + assert (x**2*y**4*z**-1).contains_generators() == {x, y, z} + assert (x**-1*y**3).contains_generators() == {x, y} + + +def test_FreeGroupElm_words(): + w = x**5*y*x**2*y**-4*x + assert w.subword(2, 6) == x**3*y + assert w.subword(3, 2) == F.identity + assert w.subword(6, 10) == x**2*y**-2 + + assert w.substituted_word(0, 7, y**-1) == y**-1*x*y**-4*x + assert w.substituted_word(0, 7, y**2*x) == y**2*x**2*y**-4*x diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_galois.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_galois.py new file mode 100644 index 0000000000000000000000000000000000000000..0d2ac29a846db88444d275b72a85ce3debaeaf05 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_galois.py @@ -0,0 +1,82 @@ +"""Test groups defined by the galois module. """ + +from sympy.combinatorics.galois import ( + S4TransitiveSubgroups, S5TransitiveSubgroups, S6TransitiveSubgroups, + find_transitive_subgroups_of_S6, +) +from sympy.combinatorics.homomorphisms import is_isomorphic +from sympy.combinatorics.named_groups import ( + SymmetricGroup, AlternatingGroup, CyclicGroup, +) + + +def test_four_group(): + G = S4TransitiveSubgroups.V.get_perm_group() + A4 = AlternatingGroup(4) + assert G.is_subgroup(A4) + assert G.degree == 4 + assert G.is_transitive() + assert G.order() == 4 + assert not G.is_cyclic + + +def test_M20(): + G = S5TransitiveSubgroups.M20.get_perm_group() + S5 = SymmetricGroup(5) + A5 = AlternatingGroup(5) + assert G.is_subgroup(S5) + assert not G.is_subgroup(A5) + assert G.degree == 5 + assert G.is_transitive() + assert G.order() == 20 + + +# Setting this True means that for each of the transitive subgroups of S6, +# we run a test not only on the fixed representation, but also on one freshly +# generated by the search procedure. +INCLUDE_SEARCH_REPS = False +S6_randomized = {} +if INCLUDE_SEARCH_REPS: + S6_randomized = find_transitive_subgroups_of_S6(*list(S6TransitiveSubgroups)) + + +def get_versions_of_S6_subgroup(name): + vers = [name.get_perm_group()] + if INCLUDE_SEARCH_REPS: + vers.append(S6_randomized[name]) + return vers + + +def test_S6_transitive_subgroups(): + """ + Test enough characteristics to distinguish all 16 transitive subgroups. + """ + ts = S6TransitiveSubgroups + A6 = AlternatingGroup(6) + for name, alt, order, is_isom, not_isom in [ + (ts.C6, False, 6, CyclicGroup(6), None), + (ts.S3, False, 6, SymmetricGroup(3), None), + (ts.D6, False, 12, None, None), + (ts.A4, True, 12, None, None), + (ts.G18, False, 18, None, None), + (ts.A4xC2, False, 24, None, SymmetricGroup(4)), + (ts.S4m, False, 24, SymmetricGroup(4), None), + (ts.S4p, True, 24, None, None), + (ts.G36m, False, 36, None, None), + (ts.G36p, True, 36, None, None), + (ts.S4xC2, False, 48, None, None), + (ts.PSL2F5, True, 60, None, None), + (ts.G72, False, 72, None, None), + (ts.PGL2F5, False, 120, None, None), + (ts.A6, True, 360, None, None), + (ts.S6, False, 720, None, None), + ]: + for G in get_versions_of_S6_subgroup(name): + assert G.is_transitive() + assert G.degree == 6 + assert G.is_subgroup(A6) is alt + assert G.order() == order + if is_isom: + assert is_isomorphic(G, is_isom) + if not_isom: + assert not is_isomorphic(G, not_isom) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_generators.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_generators.py new file mode 100644 index 0000000000000000000000000000000000000000..795ef8f08f6ec212879f528c6a0c2f0bd73037f0 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_generators.py @@ -0,0 +1,105 @@ +from sympy.combinatorics.generators import symmetric, cyclic, alternating, \ + dihedral, rubik +from sympy.combinatorics.permutations import Permutation +from sympy.testing.pytest import raises + +def test_generators(): + + assert list(cyclic(6)) == [ + Permutation([0, 1, 2, 3, 4, 5]), + Permutation([1, 2, 3, 4, 5, 0]), + Permutation([2, 3, 4, 5, 0, 1]), + Permutation([3, 4, 5, 0, 1, 2]), + Permutation([4, 5, 0, 1, 2, 3]), + Permutation([5, 0, 1, 2, 3, 4])] + + assert list(cyclic(10)) == [ + Permutation([0, 1, 2, 3, 4, 5, 6, 7, 8, 9]), + Permutation([1, 2, 3, 4, 5, 6, 7, 8, 9, 0]), + Permutation([2, 3, 4, 5, 6, 7, 8, 9, 0, 1]), + Permutation([3, 4, 5, 6, 7, 8, 9, 0, 1, 2]), + Permutation([4, 5, 6, 7, 8, 9, 0, 1, 2, 3]), + Permutation([5, 6, 7, 8, 9, 0, 1, 2, 3, 4]), + Permutation([6, 7, 8, 9, 0, 1, 2, 3, 4, 5]), + Permutation([7, 8, 9, 0, 1, 2, 3, 4, 5, 6]), + Permutation([8, 9, 0, 1, 2, 3, 4, 5, 6, 7]), + Permutation([9, 0, 1, 2, 3, 4, 5, 6, 7, 8])] + + assert list(alternating(4)) == [ + Permutation([0, 1, 2, 3]), + Permutation([0, 2, 3, 1]), + Permutation([0, 3, 1, 2]), + Permutation([1, 0, 3, 2]), + Permutation([1, 2, 0, 3]), + Permutation([1, 3, 2, 0]), + Permutation([2, 0, 1, 3]), + Permutation([2, 1, 3, 0]), + Permutation([2, 3, 0, 1]), + Permutation([3, 0, 2, 1]), + Permutation([3, 1, 0, 2]), + Permutation([3, 2, 1, 0])] + + assert list(symmetric(3)) == [ + Permutation([0, 1, 2]), + Permutation([0, 2, 1]), + Permutation([1, 0, 2]), + Permutation([1, 2, 0]), + Permutation([2, 0, 1]), + Permutation([2, 1, 0])] + + assert list(symmetric(4)) == [ + Permutation([0, 1, 2, 3]), + Permutation([0, 1, 3, 2]), + Permutation([0, 2, 1, 3]), + Permutation([0, 2, 3, 1]), + Permutation([0, 3, 1, 2]), + Permutation([0, 3, 2, 1]), + Permutation([1, 0, 2, 3]), + Permutation([1, 0, 3, 2]), + Permutation([1, 2, 0, 3]), + Permutation([1, 2, 3, 0]), + Permutation([1, 3, 0, 2]), + Permutation([1, 3, 2, 0]), + Permutation([2, 0, 1, 3]), + Permutation([2, 0, 3, 1]), + Permutation([2, 1, 0, 3]), + Permutation([2, 1, 3, 0]), + Permutation([2, 3, 0, 1]), + Permutation([2, 3, 1, 0]), + Permutation([3, 0, 1, 2]), + Permutation([3, 0, 2, 1]), + Permutation([3, 1, 0, 2]), + Permutation([3, 1, 2, 0]), + Permutation([3, 2, 0, 1]), + Permutation([3, 2, 1, 0])] + + assert list(dihedral(1)) == [ + Permutation([0, 1]), Permutation([1, 0])] + + assert list(dihedral(2)) == [ + Permutation([0, 1, 2, 3]), + Permutation([1, 0, 3, 2]), + Permutation([2, 3, 0, 1]), + Permutation([3, 2, 1, 0])] + + assert list(dihedral(3)) == [ + Permutation([0, 1, 2]), + Permutation([2, 1, 0]), + Permutation([1, 2, 0]), + Permutation([0, 2, 1]), + Permutation([2, 0, 1]), + Permutation([1, 0, 2])] + + assert list(dihedral(5)) == [ + Permutation([0, 1, 2, 3, 4]), + Permutation([4, 3, 2, 1, 0]), + Permutation([1, 2, 3, 4, 0]), + Permutation([0, 4, 3, 2, 1]), + Permutation([2, 3, 4, 0, 1]), + Permutation([1, 0, 4, 3, 2]), + Permutation([3, 4, 0, 1, 2]), + Permutation([2, 1, 0, 4, 3]), + Permutation([4, 0, 1, 2, 3]), + Permutation([3, 2, 1, 0, 4])] + + raises(ValueError, lambda: rubik(1)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_graycode.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_graycode.py new file mode 100644 index 0000000000000000000000000000000000000000..a754a3c401b07c9c12cb9bdeeefdfc94f6cb8b5c --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_graycode.py @@ -0,0 +1,72 @@ +from sympy.combinatorics.graycode import (GrayCode, bin_to_gray, + random_bitstring, get_subset_from_bitstring, graycode_subsets, + gray_to_bin) +from sympy.testing.pytest import raises + +def test_graycode(): + g = GrayCode(2) + got = [] + for i in g.generate_gray(): + if i.startswith('0'): + g.skip() + got.append(i) + assert got == '00 11 10'.split() + a = GrayCode(6) + assert a.current == '0'*6 + assert a.rank == 0 + assert len(list(a.generate_gray())) == 64 + codes = ['011001', '011011', '011010', + '011110', '011111', '011101', '011100', '010100', '010101', '010111', + '010110', '010010', '010011', '010001', '010000', '110000', '110001', + '110011', '110010', '110110', '110111', '110101', '110100', '111100', + '111101', '111111', '111110', '111010', '111011', '111001', '111000', + '101000', '101001', '101011', '101010', '101110', '101111', '101101', + '101100', '100100', '100101', '100111', '100110', '100010', '100011', + '100001', '100000'] + assert list(a.generate_gray(start='011001')) == codes + assert list( + a.generate_gray(rank=GrayCode(6, start='011001').rank)) == codes + assert a.next().current == '000001' + assert a.next(2).current == '000011' + assert a.next(-1).current == '100000' + + a = GrayCode(5, start='10010') + assert a.rank == 28 + a = GrayCode(6, start='101000') + assert a.rank == 48 + + assert GrayCode(6, rank=4).current == '000110' + assert GrayCode(6, rank=4).rank == 4 + assert [GrayCode(4, start=s).rank for s in + GrayCode(4).generate_gray()] == [0, 1, 2, 3, 4, 5, 6, 7, 8, + 9, 10, 11, 12, 13, 14, 15] + a = GrayCode(15, rank=15) + assert a.current == '000000000001000' + + assert bin_to_gray('111') == '100' + + a = random_bitstring(5) + assert type(a) is str + assert len(a) == 5 + assert all(i in ['0', '1'] for i in a) + + assert get_subset_from_bitstring( + ['a', 'b', 'c', 'd'], '0011') == ['c', 'd'] + assert get_subset_from_bitstring('abcd', '1001') == ['a', 'd'] + assert list(graycode_subsets(['a', 'b', 'c'])) == \ + [[], ['c'], ['b', 'c'], ['b'], ['a', 'b'], ['a', 'b', 'c'], + ['a', 'c'], ['a']] + + raises(ValueError, lambda: GrayCode(0)) + raises(ValueError, lambda: GrayCode(2.2)) + raises(ValueError, lambda: GrayCode(2, start=[1, 1, 0])) + raises(ValueError, lambda: GrayCode(2, rank=2.5)) + raises(ValueError, lambda: get_subset_from_bitstring(['c', 'a', 'c'], '1100')) + raises(ValueError, lambda: list(GrayCode(3).generate_gray(start="1111"))) + + +def test_live_issue_117(): + assert bin_to_gray('0100') == '0110' + assert bin_to_gray('0101') == '0111' + for bits in ('0100', '0101'): + assert gray_to_bin(bin_to_gray(bits)) == bits diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_group_constructs.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_group_constructs.py new file mode 100644 index 0000000000000000000000000000000000000000..d0f7d6394bbc2e285650ea95d36be8e2ed5ea69e --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_group_constructs.py @@ -0,0 +1,15 @@ +from sympy.combinatorics.group_constructs import DirectProduct +from sympy.combinatorics.named_groups import CyclicGroup, DihedralGroup + + +def test_direct_product_n(): + C = CyclicGroup(4) + D = DihedralGroup(4) + G = DirectProduct(C, C, C) + assert G.order() == 64 + assert G.degree == 12 + assert len(G.orbits()) == 3 + assert G.is_abelian is True + H = DirectProduct(D, C) + assert H.order() == 32 + assert H.is_abelian is False diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_group_numbers.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_group_numbers.py new file mode 100644 index 0000000000000000000000000000000000000000..743f1dcc8b642c19706687eeeddf6c9070b59166 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_group_numbers.py @@ -0,0 +1,110 @@ +from sympy.combinatorics.group_numbers import (is_nilpotent_number, + is_abelian_number, is_cyclic_number, _holder_formula, groups_count) +from sympy.ntheory.factor_ import factorint +from sympy.ntheory.generate import prime +from sympy.testing.pytest import raises +from sympy import randprime + + +def test_is_nilpotent_number(): + assert is_nilpotent_number(21) == False + assert is_nilpotent_number(randprime(1, 30)**12) == True + raises(ValueError, lambda: is_nilpotent_number(-5)) + + A056867 = [1, 2, 3, 4, 5, 7, 8, 9, 11, 13, 15, 16, 17, 19, + 23, 25, 27, 29, 31, 32, 33, 35, 37, 41, 43, 45, + 47, 49, 51, 53, 59, 61, 64, 65, 67, 69, 71, 73, + 77, 79, 81, 83, 85, 87, 89, 91, 95, 97, 99] + for n in range(1, 100): + assert is_nilpotent_number(n) == (n in A056867) + + +def test_is_abelian_number(): + assert is_abelian_number(4) == True + assert is_abelian_number(randprime(1, 2000)**2) == True + assert is_abelian_number(randprime(1000, 100000)) == True + assert is_abelian_number(60) == False + assert is_abelian_number(24) == False + raises(ValueError, lambda: is_abelian_number(-5)) + + A051532 = [1, 2, 3, 4, 5, 7, 9, 11, 13, 15, 17, 19, 23, 25, + 29, 31, 33, 35, 37, 41, 43, 45, 47, 49, 51, 53, + 59, 61, 65, 67, 69, 71, 73, 77, 79, 83, 85, 87, + 89, 91, 95, 97, 99] + for n in range(1, 100): + assert is_abelian_number(n) == (n in A051532) + + +A003277 = [1, 2, 3, 5, 7, 11, 13, 15, 17, 19, 23, 29, + 31, 33, 35, 37, 41, 43, 47, 51, 53, 59, 61, + 65, 67, 69, 71, 73, 77, 79, 83, 85, 87, 89, + 91, 95, 97] + + +def test_is_cyclic_number(): + assert is_cyclic_number(15) == True + assert is_cyclic_number(randprime(1, 2000)**2) == False + assert is_cyclic_number(randprime(1000, 100000)) == True + assert is_cyclic_number(4) == False + raises(ValueError, lambda: is_cyclic_number(-5)) + + for n in range(1, 100): + assert is_cyclic_number(n) == (n in A003277) + + +def test_holder_formula(): + # semiprime + assert _holder_formula({3, 5}) == 1 + assert _holder_formula({5, 11}) == 2 + # n in A003277 is always 1 + for n in A003277: + assert _holder_formula(set(factorint(n).keys())) == 1 + # otherwise + assert _holder_formula({2, 3, 5, 7}) == 12 + + +def test_groups_count(): + A000001 = [0, 1, 1, 1, 2, 1, 2, 1, 5, 2, 2, 1, 5, 1, + 2, 1, 14, 1, 5, 1, 5, 2, 2, 1, 15, 2, 2, + 5, 4, 1, 4, 1, 51, 1, 2, 1, 14, 1, 2, 2, + 14, 1, 6, 1, 4, 2, 2, 1, 52, 2, 5, 1, 5, + 1, 15, 2, 13, 2, 2, 1, 13, 1, 2, 4, 267, + 1, 4, 1, 5, 1, 4, 1, 50, 1, 2, 3, 4, 1, + 6, 1, 52, 15, 2, 1, 15, 1, 2, 1, 12, 1, + 10, 1, 4, 2] + for n in range(1, len(A000001)): + try: + assert groups_count(n) == A000001[n] + except ValueError: + pass + + A000679 = [1, 1, 2, 5, 14, 51, 267, 2328, 56092, 10494213, 49487367289] + for e in range(1, len(A000679)): + assert groups_count(2**e) == A000679[e] + + A090091 = [1, 1, 2, 5, 15, 67, 504, 9310, 1396077, 5937876645] + for e in range(1, len(A090091)): + assert groups_count(3**e) == A090091[e] + + A090130 = [1, 1, 2, 5, 15, 77, 684, 34297] + for e in range(1, len(A090130)): + assert groups_count(5**e) == A090130[e] + + A090140 = [1, 1, 2, 5, 15, 83, 860, 113147] + for e in range(1, len(A090140)): + assert groups_count(7**e) == A090140[e] + + A232105 = [51, 67, 77, 83, 87, 97, 101, 107, 111, 125, 131, + 145, 149, 155, 159, 173, 183, 193, 203, 207, 217] + for i in range(len(A232105)): + assert groups_count(prime(i+1)**5) == A232105[i] + + A232106 = [267, 504, 684, 860, 1192, 1476, 1944, 2264, 2876, + 4068, 4540, 6012, 7064, 7664, 8852, 10908, 13136] + for i in range(len(A232106)): + assert groups_count(prime(i+1)**6) == A232106[i] + + A232107 = [2328, 9310, 34297, 113147, 750735, 1600573, + 5546909, 9380741, 23316851, 71271069, 98488755] + for i in range(len(A232107)): + assert groups_count(prime(i+1)**7) == A232107[i] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_homomorphisms.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_homomorphisms.py new file mode 100644 index 0000000000000000000000000000000000000000..0936bbddf46a16dccdfbaebda8d1c675c131f05a --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_homomorphisms.py @@ -0,0 +1,114 @@ +from sympy.combinatorics import Permutation +from sympy.combinatorics.perm_groups import PermutationGroup +from sympy.combinatorics.homomorphisms import homomorphism, group_isomorphism, is_isomorphic +from sympy.combinatorics.free_groups import free_group +from sympy.combinatorics.fp_groups import FpGroup +from sympy.combinatorics.named_groups import AlternatingGroup, DihedralGroup, CyclicGroup +from sympy.testing.pytest import raises + +def test_homomorphism(): + # FpGroup -> PermutationGroup + F, a, b = free_group("a, b") + G = FpGroup(F, [a**3, b**3, (a*b)**2]) + + c = Permutation(3)(0, 1, 2) + d = Permutation(3)(1, 2, 3) + A = AlternatingGroup(4) + T = homomorphism(G, A, [a, b], [c, d]) + assert T(a*b**2*a**-1) == c*d**2*c**-1 + assert T.is_isomorphism() + assert T(T.invert(Permutation(3)(0, 2, 3))) == Permutation(3)(0, 2, 3) + + T = homomorphism(G, AlternatingGroup(4), G.generators) + assert T.is_trivial() + assert T.kernel().order() == G.order() + + E, e = free_group("e") + G = FpGroup(E, [e**8]) + P = PermutationGroup([Permutation(0, 1, 2, 3), Permutation(0, 2)]) + T = homomorphism(G, P, [e], [Permutation(0, 1, 2, 3)]) + assert T.image().order() == 4 + assert T(T.invert(Permutation(0, 2)(1, 3))) == Permutation(0, 2)(1, 3) + + T = homomorphism(E, AlternatingGroup(4), E.generators, [c]) + assert T.invert(c**2) == e**-1 #order(c) == 3 so c**2 == c**-1 + + # FreeGroup -> FreeGroup + T = homomorphism(F, E, [a], [e]) + assert T(a**-2*b**4*a**2).is_identity + + # FreeGroup -> FpGroup + G = FpGroup(F, [a*b*a**-1*b**-1]) + T = homomorphism(F, G, F.generators, G.generators) + assert T.invert(a**-1*b**-1*a**2) == a*b**-1 + + # PermutationGroup -> PermutationGroup + D = DihedralGroup(8) + p = Permutation(0, 1, 2, 3, 4, 5, 6, 7) + P = PermutationGroup(p) + T = homomorphism(P, D, [p], [p]) + assert T.is_injective() + assert not T.is_isomorphism() + assert T.invert(p**3) == p**3 + + T2 = homomorphism(F, P, [F.generators[0]], P.generators) + T = T.compose(T2) + assert T.domain == F + assert T.codomain == D + assert T(a*b) == p + + D3 = DihedralGroup(3) + T = homomorphism(D3, D3, D3.generators, D3.generators) + assert T.is_isomorphism() + + +def test_isomorphisms(): + + F, a, b = free_group("a, b") + E, c, d = free_group("c, d") + # Infinite groups with differently ordered relators. + G = FpGroup(F, [a**2, b**3]) + H = FpGroup(F, [b**3, a**2]) + assert is_isomorphic(G, H) + + # Trivial Case + # FpGroup -> FpGroup + H = FpGroup(F, [a**3, b**3, (a*b)**2]) + F, c, d = free_group("c, d") + G = FpGroup(F, [c**3, d**3, (c*d)**2]) + check, T = group_isomorphism(G, H) + assert check + assert T(c**3*d**2) == a**3*b**2 + + # FpGroup -> PermutationGroup + # FpGroup is converted to the equivalent isomorphic group. + F, a, b = free_group("a, b") + G = FpGroup(F, [a**3, b**3, (a*b)**2]) + H = AlternatingGroup(4) + check, T = group_isomorphism(G, H) + assert check + assert T(b*a*b**-1*a**-1*b**-1) == Permutation(0, 2, 3) + assert T(b*a*b*a**-1*b**-1) == Permutation(0, 3, 2) + + # PermutationGroup -> PermutationGroup + D = DihedralGroup(8) + p = Permutation(0, 1, 2, 3, 4, 5, 6, 7) + P = PermutationGroup(p) + assert not is_isomorphic(D, P) + + A = CyclicGroup(5) + B = CyclicGroup(7) + assert not is_isomorphic(A, B) + + # Two groups of the same prime order are isomorphic to each other. + G = FpGroup(F, [a, b**5]) + H = CyclicGroup(5) + assert G.order() == H.order() + assert is_isomorphic(G, H) + + +def test_check_homomorphism(): + a = Permutation(1,2,3,4) + b = Permutation(1,3) + G = PermutationGroup([a, b]) + raises(ValueError, lambda: homomorphism(G, G, [a], [a])) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_named_groups.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_named_groups.py new file mode 100644 index 0000000000000000000000000000000000000000..59bcb6ef3f020335de76d7a72152a0b58cbc6976 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_named_groups.py @@ -0,0 +1,70 @@ +from sympy.combinatorics.named_groups import (SymmetricGroup, CyclicGroup, + DihedralGroup, AlternatingGroup, + AbelianGroup, RubikGroup) +from sympy.testing.pytest import raises + + +def test_SymmetricGroup(): + G = SymmetricGroup(5) + elements = list(G.generate()) + assert (G.generators[0]).size == 5 + assert len(elements) == 120 + assert G.is_solvable is False + assert G.is_abelian is False + assert G.is_nilpotent is False + assert G.is_transitive() is True + H = SymmetricGroup(1) + assert H.order() == 1 + L = SymmetricGroup(2) + assert L.order() == 2 + + +def test_CyclicGroup(): + G = CyclicGroup(10) + elements = list(G.generate()) + assert len(elements) == 10 + assert (G.derived_subgroup()).order() == 1 + assert G.is_abelian is True + assert G.is_solvable is True + assert G.is_nilpotent is True + H = CyclicGroup(1) + assert H.order() == 1 + L = CyclicGroup(2) + assert L.order() == 2 + + +def test_DihedralGroup(): + G = DihedralGroup(6) + elements = list(G.generate()) + assert len(elements) == 12 + assert G.is_transitive() is True + assert G.is_abelian is False + assert G.is_solvable is True + assert G.is_nilpotent is False + H = DihedralGroup(1) + assert H.order() == 2 + L = DihedralGroup(2) + assert L.order() == 4 + assert L.is_abelian is True + assert L.is_nilpotent is True + + +def test_AlternatingGroup(): + G = AlternatingGroup(5) + elements = list(G.generate()) + assert len(elements) == 60 + assert [perm.is_even for perm in elements] == [True]*60 + H = AlternatingGroup(1) + assert H.order() == 1 + L = AlternatingGroup(2) + assert L.order() == 1 + + +def test_AbelianGroup(): + A = AbelianGroup(3, 3, 3) + assert A.order() == 27 + assert A.is_abelian is True + + +def test_RubikGroup(): + raises(ValueError, lambda: RubikGroup(1)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_partitions.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_partitions.py new file mode 100644 index 0000000000000000000000000000000000000000..32e70e53a53aadbb17c8292bbef8f52d1144d6e0 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_partitions.py @@ -0,0 +1,118 @@ +from sympy.core.sorting import ordered, default_sort_key +from sympy.combinatorics.partitions import (Partition, IntegerPartition, + RGS_enum, RGS_unrank, RGS_rank, + random_integer_partition) +from sympy.testing.pytest import raises +from sympy.utilities.iterables import partitions +from sympy.sets.sets import Set, FiniteSet + + +def test_partition_constructor(): + raises(ValueError, lambda: Partition([1, 1, 2])) + raises(ValueError, lambda: Partition([1, 2, 3], [2, 3, 4])) + raises(ValueError, lambda: Partition(1, 2, 3)) + raises(ValueError, lambda: Partition(*list(range(3)))) + + assert Partition([1, 2, 3], [4, 5]) == Partition([4, 5], [1, 2, 3]) + assert Partition({1, 2, 3}, {4, 5}) == Partition([1, 2, 3], [4, 5]) + + a = FiniteSet(1, 2, 3) + b = FiniteSet(4, 5) + assert Partition(a, b) == Partition([1, 2, 3], [4, 5]) + assert Partition({a, b}) == Partition(FiniteSet(a, b)) + assert Partition({a, b}) != Partition(a, b) + +def test_partition(): + from sympy.abc import x + + a = Partition([1, 2, 3], [4]) + b = Partition([1, 2], [3, 4]) + c = Partition([x]) + l = [a, b, c] + l.sort(key=default_sort_key) + assert l == [c, a, b] + l.sort(key=lambda w: default_sort_key(w, order='rev-lex')) + assert l == [c, a, b] + + assert (a == b) is False + assert a <= b + assert (a > b) is False + assert a != b + assert a < b + + assert (a + 2).partition == [[1, 2], [3, 4]] + assert (b - 1).partition == [[1, 2, 4], [3]] + + assert (a - 1).partition == [[1, 2, 3, 4]] + assert (a + 1).partition == [[1, 2, 4], [3]] + assert (b + 1).partition == [[1, 2], [3], [4]] + + assert a.rank == 1 + assert b.rank == 3 + + assert a.RGS == (0, 0, 0, 1) + assert b.RGS == (0, 0, 1, 1) + + +def test_integer_partition(): + # no zeros in partition + raises(ValueError, lambda: IntegerPartition(list(range(3)))) + # check fails since 1 + 2 != 100 + raises(ValueError, lambda: IntegerPartition(100, list(range(1, 3)))) + a = IntegerPartition(8, [1, 3, 4]) + b = a.next_lex() + c = IntegerPartition([1, 3, 4]) + d = IntegerPartition(8, {1: 3, 3: 1, 2: 1}) + assert a == c + assert a.integer == d.integer + assert a.conjugate == [3, 2, 2, 1] + assert (a == b) is False + assert a <= b + assert (a > b) is False + assert a != b + + for i in range(1, 11): + next = set() + prev = set() + a = IntegerPartition([i]) + ans = {IntegerPartition(p) for p in partitions(i)} + n = len(ans) + for j in range(n): + next.add(a) + a = a.next_lex() + IntegerPartition(i, a.partition) # check it by giving i + for j in range(n): + prev.add(a) + a = a.prev_lex() + IntegerPartition(i, a.partition) # check it by giving i + assert next == ans + assert prev == ans + + assert IntegerPartition([1, 2, 3]).as_ferrers() == '###\n##\n#' + assert IntegerPartition([1, 1, 3]).as_ferrers('o') == 'ooo\no\no' + assert str(IntegerPartition([1, 1, 3])) == '[3, 1, 1]' + assert IntegerPartition([1, 1, 3]).partition == [3, 1, 1] + + raises(ValueError, lambda: random_integer_partition(-1)) + assert random_integer_partition(1) == [1] + assert random_integer_partition(10, seed=[1, 3, 2, 1, 5, 1] + ) == [5, 2, 1, 1, 1] + + +def test_rgs(): + raises(ValueError, lambda: RGS_unrank(-1, 3)) + raises(ValueError, lambda: RGS_unrank(3, 0)) + raises(ValueError, lambda: RGS_unrank(10, 1)) + + raises(ValueError, lambda: Partition.from_rgs(list(range(3)), list(range(2)))) + raises(ValueError, lambda: Partition.from_rgs(list(range(1, 3)), list(range(2)))) + assert RGS_enum(-1) == 0 + assert RGS_enum(1) == 1 + assert RGS_unrank(7, 5) == [0, 0, 1, 0, 2] + assert RGS_unrank(23, 14) == [0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 0, 2, 2] + assert RGS_rank(RGS_unrank(40, 100)) == 40 + +def test_ordered_partition_9608(): + a = Partition([1, 2, 3], [4]) + b = Partition([1, 2], [3, 4]) + assert list(ordered([a,b], Set._infimum_key)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_pc_groups.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_pc_groups.py new file mode 100644 index 0000000000000000000000000000000000000000..b0c146279921e1e6499534fe9e33b993348d1503 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_pc_groups.py @@ -0,0 +1,87 @@ +from sympy.combinatorics.permutations import Permutation +from sympy.combinatorics.named_groups import SymmetricGroup, AlternatingGroup, DihedralGroup +from sympy.matrices import Matrix + +def test_pc_presentation(): + Groups = [SymmetricGroup(3), SymmetricGroup(4), SymmetricGroup(9).sylow_subgroup(3), + SymmetricGroup(9).sylow_subgroup(2), SymmetricGroup(8).sylow_subgroup(2), DihedralGroup(10)] + + S = SymmetricGroup(125).sylow_subgroup(5) + G = S.derived_series()[2] + Groups.append(G) + + G = SymmetricGroup(25).sylow_subgroup(5) + Groups.append(G) + + S = SymmetricGroup(11**2).sylow_subgroup(11) + G = S.derived_series()[2] + Groups.append(G) + + for G in Groups: + PcGroup = G.polycyclic_group() + collector = PcGroup.collector + pc_presentation = collector.pc_presentation + + pcgs = PcGroup.pcgs + free_group = collector.free_group + free_to_perm = {} + for s, g in zip(free_group.symbols, pcgs): + free_to_perm[s] = g + + for k, v in pc_presentation.items(): + k_array = k.array_form + if v != (): + v_array = v.array_form + + lhs = Permutation() + for gen in k_array: + s = gen[0] + e = gen[1] + lhs = lhs*free_to_perm[s]**e + + if v == (): + assert lhs.is_identity + continue + + rhs = Permutation() + for gen in v_array: + s = gen[0] + e = gen[1] + rhs = rhs*free_to_perm[s]**e + + assert lhs == rhs + + +def test_exponent_vector(): + + Groups = [SymmetricGroup(3), SymmetricGroup(4), SymmetricGroup(9).sylow_subgroup(3), + SymmetricGroup(9).sylow_subgroup(2), SymmetricGroup(8).sylow_subgroup(2)] + + for G in Groups: + PcGroup = G.polycyclic_group() + collector = PcGroup.collector + + pcgs = PcGroup.pcgs + # free_group = collector.free_group + + for gen in G.generators: + exp = collector.exponent_vector(gen) + g = Permutation() + for i in range(len(exp)): + g = g*pcgs[i]**exp[i] if exp[i] else g + assert g == gen + + +def test_induced_pcgs(): + G = [SymmetricGroup(9).sylow_subgroup(3), SymmetricGroup(20).sylow_subgroup(2), AlternatingGroup(4), + DihedralGroup(4), DihedralGroup(10), DihedralGroup(9), SymmetricGroup(3), SymmetricGroup(4)] + + for g in G: + PcGroup = g.polycyclic_group() + collector = PcGroup.collector + gens = list(g.generators) + ipcgs = collector.induced_pcgs(gens) + m = [] + for i in ipcgs: + m.append(collector.exponent_vector(i)) + assert Matrix(m).is_upper diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_perm_groups.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_perm_groups.py new file mode 100644 index 0000000000000000000000000000000000000000..763b8fb0ae357500d68c29fe1c9e6b156e224949 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_perm_groups.py @@ -0,0 +1,1243 @@ +from sympy.core.containers import Tuple +from sympy.combinatorics.generators import rubik_cube_generators +from sympy.combinatorics.homomorphisms import is_isomorphic +from sympy.combinatorics.named_groups import SymmetricGroup, CyclicGroup,\ + DihedralGroup, AlternatingGroup, AbelianGroup, RubikGroup +from sympy.combinatorics.perm_groups import (PermutationGroup, + _orbit_transversal, Coset, SymmetricPermutationGroup) +from sympy.combinatorics.permutations import Permutation +from sympy.combinatorics.polyhedron import tetrahedron as Tetra, cube +from sympy.combinatorics.testutil import _verify_bsgs, _verify_centralizer,\ + _verify_normal_closure +from sympy.testing.pytest import skip, XFAIL, slow + +rmul = Permutation.rmul + + +def test_has(): + a = Permutation([1, 0]) + G = PermutationGroup([a]) + assert G.is_abelian + a = Permutation([2, 0, 1]) + b = Permutation([2, 1, 0]) + G = PermutationGroup([a, b]) + assert not G.is_abelian + + G = PermutationGroup([a]) + assert G.has(a) + assert not G.has(b) + + a = Permutation([2, 0, 1, 3, 4, 5]) + b = Permutation([0, 2, 1, 3, 4]) + assert PermutationGroup(a, b).degree == \ + PermutationGroup(a, b).degree == 6 + + g = PermutationGroup(Permutation(0, 2, 1)) + assert Tuple(1, g).has(g) + + +def test_generate(): + a = Permutation([1, 0]) + g = list(PermutationGroup([a]).generate()) + assert g == [Permutation([0, 1]), Permutation([1, 0])] + assert len(list(PermutationGroup(Permutation((0, 1))).generate())) == 1 + g = PermutationGroup([a]).generate(method='dimino') + assert list(g) == [Permutation([0, 1]), Permutation([1, 0])] + a = Permutation([2, 0, 1]) + b = Permutation([2, 1, 0]) + G = PermutationGroup([a, b]) + g = G.generate() + v1 = [p.array_form for p in list(g)] + v1.sort() + assert v1 == [[0, 1, 2], [0, 2, 1], [1, 0, 2], [1, 2, 0], [2, 0, + 1], [2, 1, 0]] + v2 = list(G.generate(method='dimino', af=True)) + assert v1 == sorted(v2) + a = Permutation([2, 0, 1, 3, 4, 5]) + b = Permutation([2, 1, 3, 4, 5, 0]) + g = PermutationGroup([a, b]).generate(af=True) + assert len(list(g)) == 360 + + +def test_order(): + a = Permutation([2, 0, 1, 3, 4, 5, 6, 7, 8, 9]) + b = Permutation([2, 1, 3, 4, 5, 6, 7, 8, 9, 0]) + g = PermutationGroup([a, b]) + assert g.order() == 1814400 + assert PermutationGroup().order() == 1 + + +def test_equality(): + p_1 = Permutation(0, 1, 3) + p_2 = Permutation(0, 2, 3) + p_3 = Permutation(0, 1, 2) + p_4 = Permutation(0, 1, 3) + g_1 = PermutationGroup(p_1, p_2) + g_2 = PermutationGroup(p_3, p_4) + g_3 = PermutationGroup(p_2, p_1) + g_4 = PermutationGroup(p_1, p_2) + + assert g_1 != g_2 + assert g_1.generators != g_2.generators + assert g_1.equals(g_2) + assert g_1 != g_3 + assert g_1.equals(g_3) + assert g_1 == g_4 + + +def test_stabilizer(): + S = SymmetricGroup(2) + H = S.stabilizer(0) + assert H.generators == [Permutation(1)] + a = Permutation([2, 0, 1, 3, 4, 5]) + b = Permutation([2, 1, 3, 4, 5, 0]) + G = PermutationGroup([a, b]) + G0 = G.stabilizer(0) + assert G0.order() == 60 + + gens_cube = [[1, 3, 5, 7, 0, 2, 4, 6], [1, 3, 0, 2, 5, 7, 4, 6]] + gens = [Permutation(p) for p in gens_cube] + G = PermutationGroup(gens) + G2 = G.stabilizer(2) + assert G2.order() == 6 + G2_1 = G2.stabilizer(1) + v = list(G2_1.generate(af=True)) + assert v == [[0, 1, 2, 3, 4, 5, 6, 7], [3, 1, 2, 0, 7, 5, 6, 4]] + + gens = ( + (1, 2, 0, 4, 5, 3, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18, 19), + (0, 1, 2, 3, 4, 5, 19, 6, 8, 9, 10, 11, 12, 13, 14, + 15, 16, 7, 17, 18), + (0, 1, 2, 3, 4, 5, 6, 7, 9, 18, 16, 11, 12, 13, 14, 15, 8, 17, 10, 19)) + gens = [Permutation(p) for p in gens] + G = PermutationGroup(gens) + G2 = G.stabilizer(2) + assert G2.order() == 181440 + S = SymmetricGroup(3) + assert [G.order() for G in S.basic_stabilizers] == [6, 2] + + +def test_center(): + # the center of the dihedral group D_n is of order 2 for even n + for i in (4, 6, 10): + D = DihedralGroup(i) + assert (D.center()).order() == 2 + # the center of the dihedral group D_n is of order 1 for odd n>2 + for i in (3, 5, 7): + D = DihedralGroup(i) + assert (D.center()).order() == 1 + # the center of an abelian group is the group itself + for i in (2, 3, 5): + for j in (1, 5, 7): + for k in (1, 1, 11): + G = AbelianGroup(i, j, k) + assert G.center().is_subgroup(G) + # the center of a nonabelian simple group is trivial + for i in(1, 5, 9): + A = AlternatingGroup(i) + assert (A.center()).order() == 1 + # brute-force verifications + D = DihedralGroup(5) + A = AlternatingGroup(3) + C = CyclicGroup(4) + G.is_subgroup(D*A*C) + assert _verify_centralizer(G, G) + + +def test_centralizer(): + # the centralizer of the trivial group is the entire group + S = SymmetricGroup(2) + assert S.centralizer(Permutation(list(range(2)))).is_subgroup(S) + A = AlternatingGroup(5) + assert A.centralizer(Permutation(list(range(5)))).is_subgroup(A) + # a centralizer in the trivial group is the trivial group itself + triv = PermutationGroup([Permutation([0, 1, 2, 3])]) + D = DihedralGroup(4) + assert triv.centralizer(D).is_subgroup(triv) + # brute-force verifications for centralizers of groups + for i in (4, 5, 6): + S = SymmetricGroup(i) + A = AlternatingGroup(i) + C = CyclicGroup(i) + D = DihedralGroup(i) + for gp in (S, A, C, D): + for gp2 in (S, A, C, D): + if not gp2.is_subgroup(gp): + assert _verify_centralizer(gp, gp2) + # verify the centralizer for all elements of several groups + S = SymmetricGroup(5) + elements = list(S.generate_dimino()) + for element in elements: + assert _verify_centralizer(S, element) + A = AlternatingGroup(5) + elements = list(A.generate_dimino()) + for element in elements: + assert _verify_centralizer(A, element) + D = DihedralGroup(7) + elements = list(D.generate_dimino()) + for element in elements: + assert _verify_centralizer(D, element) + # verify centralizers of small groups within small groups + small = [] + for i in (1, 2, 3): + small.append(SymmetricGroup(i)) + small.append(AlternatingGroup(i)) + small.append(DihedralGroup(i)) + small.append(CyclicGroup(i)) + for gp in small: + for gp2 in small: + if gp.degree == gp2.degree: + assert _verify_centralizer(gp, gp2) + + +def test_coset_rank(): + gens_cube = [[1, 3, 5, 7, 0, 2, 4, 6], [1, 3, 0, 2, 5, 7, 4, 6]] + gens = [Permutation(p) for p in gens_cube] + G = PermutationGroup(gens) + i = 0 + for h in G.generate(af=True): + rk = G.coset_rank(h) + assert rk == i + h1 = G.coset_unrank(rk, af=True) + assert h == h1 + i += 1 + assert G.coset_unrank(48) is None + assert G.coset_unrank(G.coset_rank(gens[0])) == gens[0] + + +def test_coset_factor(): + a = Permutation([0, 2, 1]) + G = PermutationGroup([a]) + c = Permutation([2, 1, 0]) + assert not G.coset_factor(c) + assert G.coset_rank(c) is None + + a = Permutation([2, 0, 1, 3, 4, 5]) + b = Permutation([2, 1, 3, 4, 5, 0]) + g = PermutationGroup([a, b]) + assert g.order() == 360 + d = Permutation([1, 0, 2, 3, 4, 5]) + assert not g.coset_factor(d.array_form) + assert not g.contains(d) + assert Permutation(2) in G + c = Permutation([1, 0, 2, 3, 5, 4]) + v = g.coset_factor(c, True) + tr = g.basic_transversals + p = Permutation.rmul(*[tr[i][v[i]] for i in range(len(g.base))]) + assert p == c + v = g.coset_factor(c) + p = Permutation.rmul(*v) + assert p == c + assert g.contains(c) + G = PermutationGroup([Permutation([2, 1, 0])]) + p = Permutation([1, 0, 2]) + assert G.coset_factor(p) == [] + + +def test_orbits(): + a = Permutation([2, 0, 1]) + b = Permutation([2, 1, 0]) + g = PermutationGroup([a, b]) + assert g.orbit(0) == {0, 1, 2} + assert g.orbits() == [{0, 1, 2}] + assert g.is_transitive() and g.is_transitive(strict=False) + assert g.orbit_transversal(0) == \ + [Permutation( + [0, 1, 2]), Permutation([2, 0, 1]), Permutation([1, 2, 0])] + assert g.orbit_transversal(0, True) == \ + [(0, Permutation([0, 1, 2])), (2, Permutation([2, 0, 1])), + (1, Permutation([1, 2, 0]))] + + G = DihedralGroup(6) + transversal, slps = _orbit_transversal(G.degree, G.generators, 0, True, slp=True) + for i, t in transversal: + slp = slps[i] + w = G.identity + for s in slp: + w = G.generators[s]*w + assert w == t + + a = Permutation(list(range(1, 100)) + [0]) + G = PermutationGroup([a]) + assert [min(o) for o in G.orbits()] == [0] + G = PermutationGroup(rubik_cube_generators()) + assert [min(o) for o in G.orbits()] == [0, 1] + assert not G.is_transitive() and not G.is_transitive(strict=False) + G = PermutationGroup([Permutation(0, 1, 3), Permutation(3)(0, 1)]) + assert not G.is_transitive() and G.is_transitive(strict=False) + assert PermutationGroup( + Permutation(3)).is_transitive(strict=False) is False + + +def test_is_normal(): + gens_s5 = [Permutation(p) for p in [[1, 2, 3, 4, 0], [2, 1, 4, 0, 3]]] + G1 = PermutationGroup(gens_s5) + assert G1.order() == 120 + gens_a5 = [Permutation(p) for p in [[1, 0, 3, 2, 4], [2, 1, 4, 3, 0]]] + G2 = PermutationGroup(gens_a5) + assert G2.order() == 60 + assert G2.is_normal(G1) + gens3 = [Permutation(p) for p in [[2, 1, 3, 0, 4], [1, 2, 0, 3, 4]]] + G3 = PermutationGroup(gens3) + assert not G3.is_normal(G1) + assert G3.order() == 12 + G4 = G1.normal_closure(G3.generators) + assert G4.order() == 60 + gens5 = [Permutation(p) for p in [[1, 2, 3, 0, 4], [1, 2, 0, 3, 4]]] + G5 = PermutationGroup(gens5) + assert G5.order() == 24 + G6 = G1.normal_closure(G5.generators) + assert G6.order() == 120 + assert G1.is_subgroup(G6) + assert not G1.is_subgroup(G4) + assert G2.is_subgroup(G4) + I5 = PermutationGroup(Permutation(4)) + assert I5.is_normal(G5) + assert I5.is_normal(G6, strict=False) + p1 = Permutation([1, 0, 2, 3, 4]) + p2 = Permutation([0, 1, 2, 4, 3]) + p3 = Permutation([3, 4, 2, 1, 0]) + id_ = Permutation([0, 1, 2, 3, 4]) + H = PermutationGroup([p1, p3]) + H_n1 = PermutationGroup([p1, p2]) + H_n2_1 = PermutationGroup(p1) + H_n2_2 = PermutationGroup(p2) + H_id = PermutationGroup(id_) + assert H_n1.is_normal(H) + assert H_n2_1.is_normal(H_n1) + assert H_n2_2.is_normal(H_n1) + assert H_id.is_normal(H_n2_1) + assert H_id.is_normal(H_n1) + assert H_id.is_normal(H) + assert not H_n2_1.is_normal(H) + assert not H_n2_2.is_normal(H) + + +def test_eq(): + a = [[1, 2, 0, 3, 4, 5], [1, 0, 2, 3, 4, 5], [2, 1, 0, 3, 4, 5], [ + 1, 2, 0, 3, 4, 5]] + a = [Permutation(p) for p in a + [[1, 2, 3, 4, 5, 0]]] + g = Permutation([1, 2, 3, 4, 5, 0]) + G1, G2, G3 = [PermutationGroup(x) for x in [a[:2], a[2:4], [g, g**2]]] + assert G1.order() == G2.order() == G3.order() == 6 + assert G1.is_subgroup(G2) + assert not G1.is_subgroup(G3) + G4 = PermutationGroup([Permutation([0, 1])]) + assert not G1.is_subgroup(G4) + assert G4.is_subgroup(G1, 0) + assert PermutationGroup(g, g).is_subgroup(PermutationGroup(g)) + assert SymmetricGroup(3).is_subgroup(SymmetricGroup(4), 0) + assert SymmetricGroup(3).is_subgroup(SymmetricGroup(3)*CyclicGroup(5), 0) + assert not CyclicGroup(5).is_subgroup(SymmetricGroup(3)*CyclicGroup(5), 0) + assert CyclicGroup(3).is_subgroup(SymmetricGroup(3)*CyclicGroup(5), 0) + + +def test_derived_subgroup(): + a = Permutation([1, 0, 2, 4, 3]) + b = Permutation([0, 1, 3, 2, 4]) + G = PermutationGroup([a, b]) + C = G.derived_subgroup() + assert C.order() == 3 + assert C.is_normal(G) + assert C.is_subgroup(G, 0) + assert not G.is_subgroup(C, 0) + gens_cube = [[1, 3, 5, 7, 0, 2, 4, 6], [1, 3, 0, 2, 5, 7, 4, 6]] + gens = [Permutation(p) for p in gens_cube] + G = PermutationGroup(gens) + C = G.derived_subgroup() + assert C.order() == 12 + + +def test_is_solvable(): + a = Permutation([1, 2, 0]) + b = Permutation([1, 0, 2]) + G = PermutationGroup([a, b]) + assert G.is_solvable + G = PermutationGroup([a]) + assert G.is_solvable + a = Permutation([1, 2, 3, 4, 0]) + b = Permutation([1, 0, 2, 3, 4]) + G = PermutationGroup([a, b]) + assert not G.is_solvable + P = SymmetricGroup(10) + S = P.sylow_subgroup(3) + assert S.is_solvable + +def test_rubik1(): + gens = rubik_cube_generators() + gens1 = [gens[-1]] + [p**2 for p in gens[1:]] + G1 = PermutationGroup(gens1) + assert G1.order() == 19508428800 + gens2 = [p**2 for p in gens] + G2 = PermutationGroup(gens2) + assert G2.order() == 663552 + assert G2.is_subgroup(G1, 0) + C1 = G1.derived_subgroup() + assert C1.order() == 4877107200 + assert C1.is_subgroup(G1, 0) + assert not G2.is_subgroup(C1, 0) + + G = RubikGroup(2) + assert G.order() == 3674160 + + +@XFAIL +def test_rubik(): + skip('takes too much time') + G = PermutationGroup(rubik_cube_generators()) + assert G.order() == 43252003274489856000 + G1 = PermutationGroup(G[:3]) + assert G1.order() == 170659735142400 + assert not G1.is_normal(G) + G2 = G.normal_closure(G1.generators) + assert G2.is_subgroup(G) + + +def test_direct_product(): + C = CyclicGroup(4) + D = DihedralGroup(4) + G = C*C*C + assert G.order() == 64 + assert G.degree == 12 + assert len(G.orbits()) == 3 + assert G.is_abelian is True + H = D*C + assert H.order() == 32 + assert H.is_abelian is False + + +def test_orbit_rep(): + G = DihedralGroup(6) + assert G.orbit_rep(1, 3) in [Permutation([2, 3, 4, 5, 0, 1]), + Permutation([4, 3, 2, 1, 0, 5])] + H = CyclicGroup(4)*G + assert H.orbit_rep(1, 5) is False + + +def test_schreier_vector(): + G = CyclicGroup(50) + v = [0]*50 + v[23] = -1 + assert G.schreier_vector(23) == v + H = DihedralGroup(8) + assert H.schreier_vector(2) == [0, 1, -1, 0, 0, 1, 0, 0] + L = SymmetricGroup(4) + assert L.schreier_vector(1) == [1, -1, 0, 0] + + +def test_random_pr(): + D = DihedralGroup(6) + r = 11 + n = 3 + _random_prec_n = {} + _random_prec_n[0] = {'s': 7, 't': 3, 'x': 2, 'e': -1} + _random_prec_n[1] = {'s': 5, 't': 5, 'x': 1, 'e': -1} + _random_prec_n[2] = {'s': 3, 't': 4, 'x': 2, 'e': 1} + D._random_pr_init(r, n, _random_prec_n=_random_prec_n) + assert D._random_gens[11] == [0, 1, 2, 3, 4, 5] + _random_prec = {'s': 2, 't': 9, 'x': 1, 'e': -1} + assert D.random_pr(_random_prec=_random_prec) == \ + Permutation([0, 5, 4, 3, 2, 1]) + + +def test_is_alt_sym(): + G = DihedralGroup(10) + assert G.is_alt_sym() is False + assert G._eval_is_alt_sym_naive() is False + assert G._eval_is_alt_sym_naive(only_alt=True) is False + assert G._eval_is_alt_sym_naive(only_sym=True) is False + + S = SymmetricGroup(10) + assert S._eval_is_alt_sym_naive() is True + assert S._eval_is_alt_sym_naive(only_alt=True) is False + assert S._eval_is_alt_sym_naive(only_sym=True) is True + + N_eps = 10 + _random_prec = {'N_eps': N_eps, + 0: Permutation([[2], [1, 4], [0, 6, 7, 8, 9, 3, 5]]), + 1: Permutation([[1, 8, 7, 6, 3, 5, 2, 9], [0, 4]]), + 2: Permutation([[5, 8], [4, 7], [0, 1, 2, 3, 6, 9]]), + 3: Permutation([[3], [0, 8, 2, 7, 4, 1, 6, 9, 5]]), + 4: Permutation([[8], [4, 7, 9], [3, 6], [0, 5, 1, 2]]), + 5: Permutation([[6], [0, 2, 4, 5, 1, 8, 3, 9, 7]]), + 6: Permutation([[6, 9, 8], [4, 5], [1, 3, 7], [0, 2]]), + 7: Permutation([[4], [0, 2, 9, 1, 3, 8, 6, 5, 7]]), + 8: Permutation([[1, 5, 6, 3], [0, 2, 7, 8, 4, 9]]), + 9: Permutation([[8], [6, 7], [2, 3, 4, 5], [0, 1, 9]])} + assert S.is_alt_sym(_random_prec=_random_prec) is True + + A = AlternatingGroup(10) + assert A._eval_is_alt_sym_naive() is True + assert A._eval_is_alt_sym_naive(only_alt=True) is True + assert A._eval_is_alt_sym_naive(only_sym=True) is False + + _random_prec = {'N_eps': N_eps, + 0: Permutation([[1, 6, 4, 2, 7, 8, 5, 9, 3], [0]]), + 1: Permutation([[1], [0, 5, 8, 4, 9, 2, 3, 6, 7]]), + 2: Permutation([[1, 9, 8, 3, 2, 5], [0, 6, 7, 4]]), + 3: Permutation([[6, 8, 9], [4, 5], [1, 3, 7, 2], [0]]), + 4: Permutation([[8], [5], [4], [2, 6, 9, 3], [1], [0, 7]]), + 5: Permutation([[3, 6], [0, 8, 1, 7, 5, 9, 4, 2]]), + 6: Permutation([[5], [2, 9], [1, 8, 3], [0, 4, 7, 6]]), + 7: Permutation([[1, 8, 4, 7, 2, 3], [0, 6, 9, 5]]), + 8: Permutation([[5, 8, 7], [3], [1, 4, 2, 6], [0, 9]]), + 9: Permutation([[4, 9, 6], [3, 8], [1, 2], [0, 5, 7]])} + assert A.is_alt_sym(_random_prec=_random_prec) is False + + G = PermutationGroup( + Permutation(1, 3, size=8)(0, 2, 4, 6), + Permutation(5, 7, size=8)(0, 2, 4, 6)) + assert G.is_alt_sym() is False + + # Tests for monte-carlo c_n parameter setting, and which guarantees + # to give False. + G = DihedralGroup(10) + assert G._eval_is_alt_sym_monte_carlo() is False + G = DihedralGroup(20) + assert G._eval_is_alt_sym_monte_carlo() is False + + # A dry-running test to check if it looks up for the updated cache. + G = DihedralGroup(6) + G.is_alt_sym() + assert G.is_alt_sym() is False + + +def test_minimal_block(): + D = DihedralGroup(6) + block_system = D.minimal_block([0, 3]) + for i in range(3): + assert block_system[i] == block_system[i + 3] + S = SymmetricGroup(6) + assert S.minimal_block([0, 1]) == [0, 0, 0, 0, 0, 0] + + assert Tetra.pgroup.minimal_block([0, 1]) == [0, 0, 0, 0] + + P1 = PermutationGroup(Permutation(1, 5)(2, 4), Permutation(0, 1, 2, 3, 4, 5)) + P2 = PermutationGroup(Permutation(0, 1, 2, 3, 4, 5), Permutation(1, 5)(2, 4)) + assert P1.minimal_block([0, 2]) == [0, 1, 0, 1, 0, 1] + assert P2.minimal_block([0, 2]) == [0, 1, 0, 1, 0, 1] + + +def test_minimal_blocks(): + P = PermutationGroup(Permutation(1, 5)(2, 4), Permutation(0, 1, 2, 3, 4, 5)) + assert P.minimal_blocks() == [[0, 1, 0, 1, 0, 1], [0, 1, 2, 0, 1, 2]] + + P = SymmetricGroup(5) + assert P.minimal_blocks() == [[0]*5] + + P = PermutationGroup(Permutation(0, 3)) + assert P.minimal_blocks() is False + + +def test_max_div(): + S = SymmetricGroup(10) + assert S.max_div == 5 + + +def test_is_primitive(): + S = SymmetricGroup(5) + assert S.is_primitive() is True + C = CyclicGroup(7) + assert C.is_primitive() is True + + a = Permutation(0, 1, 2, size=6) + b = Permutation(3, 4, 5, size=6) + G = PermutationGroup(a, b) + assert G.is_primitive() is False + + +def test_random_stab(): + S = SymmetricGroup(5) + _random_el = Permutation([1, 3, 2, 0, 4]) + _random_prec = {'rand': _random_el} + g = S.random_stab(2, _random_prec=_random_prec) + assert g == Permutation([1, 3, 2, 0, 4]) + h = S.random_stab(1) + assert h(1) == 1 + + +def test_transitivity_degree(): + perm = Permutation([1, 2, 0]) + C = PermutationGroup([perm]) + assert C.transitivity_degree == 1 + gen1 = Permutation([1, 2, 0, 3, 4]) + gen2 = Permutation([1, 2, 3, 4, 0]) + # alternating group of degree 5 + Alt = PermutationGroup([gen1, gen2]) + assert Alt.transitivity_degree == 3 + + +def test_schreier_sims_random(): + assert sorted(Tetra.pgroup.base) == [0, 1] + + S = SymmetricGroup(3) + base = [0, 1] + strong_gens = [Permutation([1, 2, 0]), Permutation([1, 0, 2]), + Permutation([0, 2, 1])] + assert S.schreier_sims_random(base, strong_gens, 5) == (base, strong_gens) + D = DihedralGroup(3) + _random_prec = {'g': [Permutation([2, 0, 1]), Permutation([1, 2, 0]), + Permutation([1, 0, 2])]} + base = [0, 1] + strong_gens = [Permutation([1, 2, 0]), Permutation([2, 1, 0]), + Permutation([0, 2, 1])] + assert D.schreier_sims_random([], D.generators, 2, + _random_prec=_random_prec) == (base, strong_gens) + + +def test_baseswap(): + S = SymmetricGroup(4) + S.schreier_sims() + base = S.base + strong_gens = S.strong_gens + assert base == [0, 1, 2] + deterministic = S.baseswap(base, strong_gens, 1, randomized=False) + randomized = S.baseswap(base, strong_gens, 1) + assert deterministic[0] == [0, 2, 1] + assert _verify_bsgs(S, deterministic[0], deterministic[1]) is True + assert randomized[0] == [0, 2, 1] + assert _verify_bsgs(S, randomized[0], randomized[1]) is True + + +def test_schreier_sims_incremental(): + identity = Permutation([0, 1, 2, 3, 4]) + TrivialGroup = PermutationGroup([identity]) + base, strong_gens = TrivialGroup.schreier_sims_incremental(base=[0, 1, 2]) + assert _verify_bsgs(TrivialGroup, base, strong_gens) is True + S = SymmetricGroup(5) + base, strong_gens = S.schreier_sims_incremental(base=[0, 1, 2]) + assert _verify_bsgs(S, base, strong_gens) is True + D = DihedralGroup(2) + base, strong_gens = D.schreier_sims_incremental(base=[1]) + assert _verify_bsgs(D, base, strong_gens) is True + A = AlternatingGroup(7) + gens = A.generators[:] + gen0 = gens[0] + gen1 = gens[1] + gen1 = rmul(gen1, ~gen0) + gen0 = rmul(gen0, gen1) + gen1 = rmul(gen0, gen1) + base, strong_gens = A.schreier_sims_incremental(base=[0, 1], gens=gens) + assert _verify_bsgs(A, base, strong_gens) is True + C = CyclicGroup(11) + gen = C.generators[0] + base, strong_gens = C.schreier_sims_incremental(gens=[gen**3]) + assert _verify_bsgs(C, base, strong_gens) is True + + +def _subgroup_search(i, j, k): + prop_true = lambda x: True + prop_fix_points = lambda x: [x(point) for point in points] == points + prop_comm_g = lambda x: rmul(x, g) == rmul(g, x) + prop_even = lambda x: x.is_even + for i in range(i, j, k): + S = SymmetricGroup(i) + A = AlternatingGroup(i) + C = CyclicGroup(i) + Sym = S.subgroup_search(prop_true) + assert Sym.is_subgroup(S) + Alt = S.subgroup_search(prop_even) + assert Alt.is_subgroup(A) + Sym = S.subgroup_search(prop_true, init_subgroup=C) + assert Sym.is_subgroup(S) + points = [7] + assert S.stabilizer(7).is_subgroup(S.subgroup_search(prop_fix_points)) + points = [3, 4] + assert S.stabilizer(3).stabilizer(4).is_subgroup( + S.subgroup_search(prop_fix_points)) + points = [3, 5] + fix35 = A.subgroup_search(prop_fix_points) + points = [5] + fix5 = A.subgroup_search(prop_fix_points) + assert A.subgroup_search(prop_fix_points, init_subgroup=fix35 + ).is_subgroup(fix5) + base, strong_gens = A.schreier_sims_incremental() + g = A.generators[0] + comm_g = \ + A.subgroup_search(prop_comm_g, base=base, strong_gens=strong_gens) + assert _verify_bsgs(comm_g, base, comm_g.generators) is True + assert [prop_comm_g(gen) is True for gen in comm_g.generators] + + +def test_subgroup_search(): + _subgroup_search(10, 15, 2) + + +@XFAIL +def test_subgroup_search2(): + skip('takes too much time') + _subgroup_search(16, 17, 1) + + +def test_normal_closure(): + # the normal closure of the trivial group is trivial + S = SymmetricGroup(3) + identity = Permutation([0, 1, 2]) + closure = S.normal_closure(identity) + assert closure.is_trivial + # the normal closure of the entire group is the entire group + A = AlternatingGroup(4) + assert A.normal_closure(A).is_subgroup(A) + # brute-force verifications for subgroups + for i in (3, 4, 5): + S = SymmetricGroup(i) + A = AlternatingGroup(i) + D = DihedralGroup(i) + C = CyclicGroup(i) + for gp in (A, D, C): + assert _verify_normal_closure(S, gp) + # brute-force verifications for all elements of a group + S = SymmetricGroup(5) + elements = list(S.generate_dimino()) + for element in elements: + assert _verify_normal_closure(S, element) + # small groups + small = [] + for i in (1, 2, 3): + small.append(SymmetricGroup(i)) + small.append(AlternatingGroup(i)) + small.append(DihedralGroup(i)) + small.append(CyclicGroup(i)) + for gp in small: + for gp2 in small: + if gp2.is_subgroup(gp, 0) and gp2.degree == gp.degree: + assert _verify_normal_closure(gp, gp2) + + +def test_derived_series(): + # the derived series of the trivial group consists only of the trivial group + triv = PermutationGroup([Permutation([0, 1, 2])]) + assert triv.derived_series()[0].is_subgroup(triv) + # the derived series for a simple group consists only of the group itself + for i in (5, 6, 7): + A = AlternatingGroup(i) + assert A.derived_series()[0].is_subgroup(A) + # the derived series for S_4 is S_4 > A_4 > K_4 > triv + S = SymmetricGroup(4) + series = S.derived_series() + assert series[1].is_subgroup(AlternatingGroup(4)) + assert series[2].is_subgroup(DihedralGroup(2)) + assert series[3].is_trivial + + +def test_lower_central_series(): + # the lower central series of the trivial group consists of the trivial + # group + triv = PermutationGroup([Permutation([0, 1, 2])]) + assert triv.lower_central_series()[0].is_subgroup(triv) + # the lower central series of a simple group consists of the group itself + for i in (5, 6, 7): + A = AlternatingGroup(i) + assert A.lower_central_series()[0].is_subgroup(A) + # GAP-verified example + S = SymmetricGroup(6) + series = S.lower_central_series() + assert len(series) == 2 + assert series[1].is_subgroup(AlternatingGroup(6)) + + +def test_commutator(): + # the commutator of the trivial group and the trivial group is trivial + S = SymmetricGroup(3) + triv = PermutationGroup([Permutation([0, 1, 2])]) + assert S.commutator(triv, triv).is_subgroup(triv) + # the commutator of the trivial group and any other group is again trivial + A = AlternatingGroup(3) + assert S.commutator(triv, A).is_subgroup(triv) + # the commutator is commutative + for i in (3, 4, 5): + S = SymmetricGroup(i) + A = AlternatingGroup(i) + D = DihedralGroup(i) + assert S.commutator(A, D).is_subgroup(S.commutator(D, A)) + # the commutator of an abelian group is trivial + S = SymmetricGroup(7) + A1 = AbelianGroup(2, 5) + A2 = AbelianGroup(3, 4) + triv = PermutationGroup([Permutation([0, 1, 2, 3, 4, 5, 6])]) + assert S.commutator(A1, A1).is_subgroup(triv) + assert S.commutator(A2, A2).is_subgroup(triv) + # examples calculated by hand + S = SymmetricGroup(3) + A = AlternatingGroup(3) + assert S.commutator(A, S).is_subgroup(A) + + +def test_is_nilpotent(): + # every abelian group is nilpotent + for i in (1, 2, 3): + C = CyclicGroup(i) + Ab = AbelianGroup(i, i + 2) + assert C.is_nilpotent + assert Ab.is_nilpotent + Ab = AbelianGroup(5, 7, 10) + assert Ab.is_nilpotent + # A_5 is not solvable and thus not nilpotent + assert AlternatingGroup(5).is_nilpotent is False + + +def test_is_trivial(): + for i in range(5): + triv = PermutationGroup([Permutation(list(range(i)))]) + assert triv.is_trivial + + +def test_pointwise_stabilizer(): + S = SymmetricGroup(2) + stab = S.pointwise_stabilizer([0]) + assert stab.generators == [Permutation(1)] + S = SymmetricGroup(5) + points = [] + stab = S + for point in (2, 0, 3, 4, 1): + stab = stab.stabilizer(point) + points.append(point) + assert S.pointwise_stabilizer(points).is_subgroup(stab) + + +def test_make_perm(): + assert cube.pgroup.make_perm(5, seed=list(range(5))) == \ + Permutation([4, 7, 6, 5, 0, 3, 2, 1]) + assert cube.pgroup.make_perm(7, seed=list(range(7))) == \ + Permutation([6, 7, 3, 2, 5, 4, 0, 1]) + + +def test_elements(): + from sympy.sets.sets import FiniteSet + + p = Permutation(2, 3) + assert set(PermutationGroup(p).elements) == {Permutation(3), Permutation(2, 3)} + assert FiniteSet(*PermutationGroup(p).elements) \ + == FiniteSet(Permutation(2, 3), Permutation(3)) + + +def test_is_group(): + assert PermutationGroup(Permutation(1,2), Permutation(2,4)).is_group is True + assert SymmetricGroup(4).is_group is True + + +def test_PermutationGroup(): + assert PermutationGroup() == PermutationGroup(Permutation()) + assert (PermutationGroup() == 0) is False + + +def test_coset_transvesal(): + G = AlternatingGroup(5) + H = PermutationGroup(Permutation(0,1,2),Permutation(1,2)(3,4)) + assert G.coset_transversal(H) == \ + [Permutation(4), Permutation(2, 3, 4), Permutation(2, 4, 3), + Permutation(1, 2, 4), Permutation(4)(1, 2, 3), Permutation(1, 3)(2, 4), + Permutation(0, 1, 2, 3, 4), Permutation(0, 1, 2, 4, 3), + Permutation(0, 1, 3, 2, 4), Permutation(0, 2, 4, 1, 3)] + + +def test_coset_table(): + G = PermutationGroup(Permutation(0,1,2,3), Permutation(0,1,2), + Permutation(0,4,2,7), Permutation(5,6), Permutation(0,7)) + H = PermutationGroup(Permutation(0,1,2,3), Permutation(0,7)) + assert G.coset_table(H) == \ + [[0, 0, 0, 0, 1, 2, 3, 3, 0, 0], [4, 5, 2, 5, 6, 0, 7, 7, 1, 1], + [5, 4, 5, 1, 0, 6, 8, 8, 6, 6], [3, 3, 3, 3, 7, 8, 0, 0, 3, 3], + [2, 1, 4, 4, 4, 4, 9, 9, 4, 4], [1, 2, 1, 2, 5, 5, 10, 10, 5, 5], + [6, 6, 6, 6, 2, 1, 11, 11, 2, 2], [9, 10, 8, 10, 11, 3, 1, 1, 7, 7], + [10, 9, 10, 7, 3, 11, 2, 2, 11, 11], [8, 7, 9, 9, 9, 9, 4, 4, 9, 9], + [7, 8, 7, 8, 10, 10, 5, 5, 10, 10], [11, 11, 11, 11, 8, 7, 6, 6, 8, 8]] + + +def test_subgroup(): + G = PermutationGroup(Permutation(0,1,2), Permutation(0,2,3)) + H = G.subgroup([Permutation(0,1,3)]) + assert H.is_subgroup(G) + + +def test_generator_product(): + G = SymmetricGroup(5) + p = Permutation(0, 2, 3)(1, 4) + gens = G.generator_product(p) + assert all(g in G.strong_gens for g in gens) + w = G.identity + for g in gens: + w = g*w + assert w == p + + +def test_sylow_subgroup(): + P = PermutationGroup(Permutation(1, 5)(2, 4), Permutation(0, 1, 2, 3, 4, 5)) + S = P.sylow_subgroup(2) + assert S.order() == 4 + + P = DihedralGroup(12) + S = P.sylow_subgroup(3) + assert S.order() == 3 + + P = PermutationGroup( + Permutation(1, 5)(2, 4), Permutation(0, 1, 2, 3, 4, 5), Permutation(0, 2)) + S = P.sylow_subgroup(3) + assert S.order() == 9 + S = P.sylow_subgroup(2) + assert S.order() == 8 + + P = SymmetricGroup(10) + S = P.sylow_subgroup(2) + assert S.order() == 256 + S = P.sylow_subgroup(3) + assert S.order() == 81 + S = P.sylow_subgroup(5) + assert S.order() == 25 + + # the length of the lower central series + # of a p-Sylow subgroup of Sym(n) grows with + # the highest exponent exp of p such + # that n >= p**exp + exp = 1 + length = 0 + for i in range(2, 9): + P = SymmetricGroup(i) + S = P.sylow_subgroup(2) + ls = S.lower_central_series() + if i // 2**exp > 0: + # length increases with exponent + assert len(ls) > length + length = len(ls) + exp += 1 + else: + assert len(ls) == length + + G = SymmetricGroup(100) + S = G.sylow_subgroup(3) + assert G.order() % S.order() == 0 + assert G.order()/S.order() % 3 > 0 + + G = AlternatingGroup(100) + S = G.sylow_subgroup(2) + assert G.order() % S.order() == 0 + assert G.order()/S.order() % 2 > 0 + + G = DihedralGroup(18) + S = G.sylow_subgroup(p=2) + assert S.order() == 4 + + G = DihedralGroup(50) + S = G.sylow_subgroup(p=2) + assert S.order() == 4 + + +@slow +def test_presentation(): + def _test(P): + G = P.presentation() + return G.order() == P.order() + + def _strong_test(P): + G = P.strong_presentation() + chk = len(G.generators) == len(P.strong_gens) + return chk and G.order() == P.order() + + P = PermutationGroup(Permutation(0,1,5,2)(3,7,4,6), Permutation(0,3,5,4)(1,6,2,7)) + assert _test(P) + + P = AlternatingGroup(5) + assert _test(P) + + P = SymmetricGroup(5) + assert _test(P) + + P = PermutationGroup( + [Permutation(0,3,1,2), Permutation(3)(0,1), Permutation(0,1)(2,3)]) + assert _strong_test(P) + + P = DihedralGroup(6) + assert _strong_test(P) + + a = Permutation(0,1)(2,3) + b = Permutation(0,2)(3,1) + c = Permutation(4,5) + P = PermutationGroup(c, a, b) + assert _strong_test(P) + + +def test_polycyclic(): + a = Permutation([0, 1, 2]) + b = Permutation([2, 1, 0]) + G = PermutationGroup([a, b]) + assert G.is_polycyclic is True + + a = Permutation([1, 2, 3, 4, 0]) + b = Permutation([1, 0, 2, 3, 4]) + G = PermutationGroup([a, b]) + assert G.is_polycyclic is False + + +def test_elementary(): + a = Permutation([1, 5, 2, 0, 3, 6, 4]) + G = PermutationGroup([a]) + assert G.is_elementary(7) is False + + a = Permutation(0, 1)(2, 3) + b = Permutation(0, 2)(3, 1) + G = PermutationGroup([a, b]) + assert G.is_elementary(2) is True + c = Permutation(4, 5, 6) + G = PermutationGroup([a, b, c]) + assert G.is_elementary(2) is False + + G = SymmetricGroup(4).sylow_subgroup(2) + assert G.is_elementary(2) is False + H = AlternatingGroup(4).sylow_subgroup(2) + assert H.is_elementary(2) is True + + +def test_perfect(): + G = AlternatingGroup(3) + assert G.is_perfect is False + G = AlternatingGroup(5) + assert G.is_perfect is True + + +def test_index(): + G = PermutationGroup(Permutation(0,1,2), Permutation(0,2,3)) + H = G.subgroup([Permutation(0,1,3)]) + assert G.index(H) == 4 + + +def test_cyclic(): + G = SymmetricGroup(2) + assert G.is_cyclic + G = AbelianGroup(3, 7) + assert G.is_cyclic + G = AbelianGroup(7, 7) + assert not G.is_cyclic + G = AlternatingGroup(3) + assert G.is_cyclic + G = AlternatingGroup(4) + assert not G.is_cyclic + + # Order less than 6 + G = PermutationGroup(Permutation(0, 1, 2), Permutation(0, 2, 1)) + assert G.is_cyclic + G = PermutationGroup( + Permutation(0, 1, 2, 3), + Permutation(0, 2)(1, 3) + ) + assert G.is_cyclic + G = PermutationGroup( + Permutation(3), + Permutation(0, 1)(2, 3), + Permutation(0, 2)(1, 3), + Permutation(0, 3)(1, 2) + ) + assert G.is_cyclic is False + + # Order 15 + G = PermutationGroup( + Permutation(0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14), + Permutation(0, 2, 4, 6, 8, 10, 12, 14, 1, 3, 5, 7, 9, 11, 13) + ) + assert G.is_cyclic + + # Distinct prime orders + assert PermutationGroup._distinct_primes_lemma([3, 5]) is True + assert PermutationGroup._distinct_primes_lemma([5, 7]) is True + assert PermutationGroup._distinct_primes_lemma([2, 3]) is None + assert PermutationGroup._distinct_primes_lemma([3, 5, 7]) is None + assert PermutationGroup._distinct_primes_lemma([5, 7, 13]) is True + + G = PermutationGroup( + Permutation(0, 1, 2, 3), + Permutation(0, 2)(1, 3)) + assert G.is_cyclic + assert G._is_abelian + + # Non-abelian and therefore not cyclic + G = PermutationGroup(*SymmetricGroup(3).generators) + assert G.is_cyclic is False + + # Abelian and cyclic + G = PermutationGroup( + Permutation(0, 1, 2, 3), + Permutation(4, 5, 6) + ) + assert G.is_cyclic + + # Abelian but not cyclic + G = PermutationGroup( + Permutation(0, 1), + Permutation(2, 3), + Permutation(4, 5, 6) + ) + assert G.is_cyclic is False + + +def test_dihedral(): + G = SymmetricGroup(2) + assert G.is_dihedral + G = SymmetricGroup(3) + assert G.is_dihedral + + G = AbelianGroup(2, 2) + assert G.is_dihedral + G = CyclicGroup(4) + assert not G.is_dihedral + + G = AbelianGroup(3, 5) + assert not G.is_dihedral + G = AbelianGroup(2) + assert G.is_dihedral + G = AbelianGroup(6) + assert not G.is_dihedral + + # D6, generated by two adjacent flips + G = PermutationGroup( + Permutation(1, 5)(2, 4), + Permutation(0, 1)(3, 4)(2, 5)) + assert G.is_dihedral + + # D7, generated by a flip and a rotation + G = PermutationGroup( + Permutation(1, 6)(2, 5)(3, 4), + Permutation(0, 1, 2, 3, 4, 5, 6)) + assert G.is_dihedral + + # S4, presented by three generators, fails due to having exactly 9 + # elements of order 2: + G = PermutationGroup( + Permutation(0, 1), Permutation(0, 2), + Permutation(0, 3)) + assert not G.is_dihedral + + # D7, given by three generators + G = PermutationGroup( + Permutation(1, 6)(2, 5)(3, 4), + Permutation(2, 0)(3, 6)(4, 5), + Permutation(0, 1, 2, 3, 4, 5, 6)) + assert G.is_dihedral + + +def test_abelian_invariants(): + G = AbelianGroup(2, 3, 4) + assert G.abelian_invariants() == [2, 3, 4] + G=PermutationGroup([Permutation(1, 2, 3, 4), Permutation(1, 2), Permutation(5, 6)]) + assert G.abelian_invariants() == [2, 2] + G = AlternatingGroup(7) + assert G.abelian_invariants() == [] + G = AlternatingGroup(4) + assert G.abelian_invariants() == [3] + G = DihedralGroup(4) + assert G.abelian_invariants() == [2, 2] + + G = PermutationGroup([Permutation(1, 2, 3, 4, 5, 6, 7)]) + assert G.abelian_invariants() == [7] + G = DihedralGroup(12) + S = G.sylow_subgroup(3) + assert S.abelian_invariants() == [3] + G = PermutationGroup(Permutation(0, 1, 2), Permutation(0, 2, 3)) + assert G.abelian_invariants() == [3] + G = PermutationGroup([Permutation(0, 1), Permutation(0, 2, 4, 6)(1, 3, 5, 7)]) + assert G.abelian_invariants() == [2, 4] + G = SymmetricGroup(30) + S = G.sylow_subgroup(2) + assert S.abelian_invariants() == [2, 2, 2, 2, 2, 2, 2, 2, 2, 2] + S = G.sylow_subgroup(3) + assert S.abelian_invariants() == [3, 3, 3, 3] + S = G.sylow_subgroup(5) + assert S.abelian_invariants() == [5, 5, 5] + + +def test_composition_series(): + a = Permutation(1, 2, 3) + b = Permutation(1, 2) + G = PermutationGroup([a, b]) + comp_series = G.composition_series() + assert comp_series == G.derived_series() + # The first group in the composition series is always the group itself and + # the last group in the series is the trivial group. + S = SymmetricGroup(4) + assert S.composition_series()[0] == S + assert len(S.composition_series()) == 5 + A = AlternatingGroup(4) + assert A.composition_series()[0] == A + assert len(A.composition_series()) == 4 + + # the composition series for C_8 is C_8 > C_4 > C_2 > triv + G = CyclicGroup(8) + series = G.composition_series() + assert is_isomorphic(series[1], CyclicGroup(4)) + assert is_isomorphic(series[2], CyclicGroup(2)) + assert series[3].is_trivial + + +def test_is_symmetric(): + a = Permutation(0, 1, 2) + b = Permutation(0, 1, size=3) + assert PermutationGroup(a, b).is_symmetric is True + + a = Permutation(0, 2, 1) + b = Permutation(1, 2, size=3) + assert PermutationGroup(a, b).is_symmetric is True + + a = Permutation(0, 1, 2, 3) + b = Permutation(0, 3)(1, 2) + assert PermutationGroup(a, b).is_symmetric is False + +def test_conjugacy_class(): + S = SymmetricGroup(4) + x = Permutation(1, 2, 3) + C = {Permutation(0, 1, 2, size = 4), Permutation(0, 1, 3), + Permutation(0, 2, 1, size = 4), Permutation(0, 2, 3), + Permutation(0, 3, 1), Permutation(0, 3, 2), + Permutation(1, 2, 3), Permutation(1, 3, 2)} + assert S.conjugacy_class(x) == C + +def test_conjugacy_classes(): + S = SymmetricGroup(3) + expected = [{Permutation(size = 3)}, + {Permutation(0, 1, size = 3), Permutation(0, 2), Permutation(1, 2)}, + {Permutation(0, 1, 2), Permutation(0, 2, 1)}] + computed = S.conjugacy_classes() + + assert len(expected) == len(computed) + assert all(e in computed for e in expected) + +def test_coset_class(): + a = Permutation(1, 2) + b = Permutation(0, 1) + G = PermutationGroup([a, b]) + #Creating right coset + rht_coset = G*a + #Checking whether it is left coset or right coset + assert rht_coset.is_right_coset + assert not rht_coset.is_left_coset + #Creating list representation of coset + list_repr = rht_coset.as_list() + expected = [Permutation(0, 2), Permutation(0, 2, 1), Permutation(1, 2), + Permutation(2), Permutation(2)(0, 1), Permutation(0, 1, 2)] + for ele in list_repr: + assert ele in expected + #Creating left coset + left_coset = a*G + #Checking whether it is left coset or right coset + assert not left_coset.is_right_coset + assert left_coset.is_left_coset + #Creating list representation of Coset + list_repr = left_coset.as_list() + expected = [Permutation(2)(0, 1), Permutation(0, 1, 2), Permutation(1, 2), + Permutation(2), Permutation(0, 2), Permutation(0, 2, 1)] + for ele in list_repr: + assert ele in expected + + G = PermutationGroup(Permutation(1, 2, 3, 4), Permutation(2, 3, 4)) + H = PermutationGroup(Permutation(1, 2, 3, 4)) + g = Permutation(1, 3)(2, 4) + rht_coset = Coset(g, H, G, dir='+') + assert rht_coset.is_right_coset + list_repr = rht_coset.as_list() + expected = [Permutation(1, 2, 3, 4), Permutation(4), Permutation(1, 3)(2, 4), + Permutation(1, 4, 3, 2)] + for ele in list_repr: + assert ele in expected + +def test_symmetricpermutationgroup(): + a = SymmetricPermutationGroup(5) + assert a.degree == 5 + assert a.order() == 120 + assert a.identity() == Permutation(4) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_permutations.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_permutations.py new file mode 100644 index 0000000000000000000000000000000000000000..b52fcfec0e2fb3be872efaa814077760e121c748 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_permutations.py @@ -0,0 +1,564 @@ +from itertools import permutations +from copy import copy + +from sympy.core.expr import unchanged +from sympy.core.numbers import Integer +from sympy.core.relational import Eq +from sympy.core.symbol import Symbol +from sympy.core.singleton import S +from sympy.combinatorics.permutations import \ + Permutation, _af_parity, _af_rmul, _af_rmuln, AppliedPermutation, Cycle +from sympy.printing import sstr, srepr, pretty, latex +from sympy.testing.pytest import raises, warns_deprecated_sympy + + +rmul = Permutation.rmul +a = Symbol('a', integer=True) + + +def test_Permutation(): + # don't auto fill 0 + raises(ValueError, lambda: Permutation([1])) + p = Permutation([0, 1, 2, 3]) + # call as bijective + assert [p(i) for i in range(p.size)] == list(p) + # call as operator + assert p(list(range(p.size))) == list(p) + # call as function + assert list(p(1, 2)) == [0, 2, 1, 3] + raises(TypeError, lambda: p(-1)) + raises(TypeError, lambda: p(5)) + # conversion to list + assert list(p) == list(range(4)) + assert p.copy() == p + assert copy(p) == p + assert Permutation(size=4) == Permutation(3) + assert Permutation(Permutation(3), size=5) == Permutation(4) + # cycle form with size + assert Permutation([[1, 2]], size=4) == Permutation([[1, 2], [0], [3]]) + # random generation + assert Permutation.random(2) in (Permutation([1, 0]), Permutation([0, 1])) + + p = Permutation([2, 5, 1, 6, 3, 0, 4]) + q = Permutation([[1], [0, 3, 5, 6, 2, 4]]) + assert len({p, p}) == 1 + r = Permutation([1, 3, 2, 0, 4, 6, 5]) + ans = Permutation(_af_rmuln(*[w.array_form for w in (p, q, r)])).array_form + assert rmul(p, q, r).array_form == ans + # make sure no other permutation of p, q, r could have given + # that answer + for a, b, c in permutations((p, q, r)): + if (a, b, c) == (p, q, r): + continue + assert rmul(a, b, c).array_form != ans + + assert p.support() == list(range(7)) + assert q.support() == [0, 2, 3, 4, 5, 6] + assert Permutation(p.cyclic_form).array_form == p.array_form + assert p.cardinality == 5040 + assert q.cardinality == 5040 + assert q.cycles == 2 + assert rmul(q, p) == Permutation([4, 6, 1, 2, 5, 3, 0]) + assert rmul(p, q) == Permutation([6, 5, 3, 0, 2, 4, 1]) + assert _af_rmul(p.array_form, q.array_form) == \ + [6, 5, 3, 0, 2, 4, 1] + + assert rmul(Permutation([[1, 2, 3], [0, 4]]), + Permutation([[1, 2, 4], [0], [3]])).cyclic_form == \ + [[0, 4, 2], [1, 3]] + assert q.array_form == [3, 1, 4, 5, 0, 6, 2] + assert q.cyclic_form == [[0, 3, 5, 6, 2, 4]] + assert q.full_cyclic_form == [[0, 3, 5, 6, 2, 4], [1]] + assert p.cyclic_form == [[0, 2, 1, 5], [3, 6, 4]] + t = p.transpositions() + assert t == [(0, 5), (0, 1), (0, 2), (3, 4), (3, 6)] + assert Permutation.rmul(*[Permutation(Cycle(*ti)) for ti in (t)]) + assert Permutation([1, 0]).transpositions() == [(0, 1)] + + assert p**13 == p + assert q**0 == Permutation(list(range(q.size))) + assert q**-2 == ~q**2 + assert q**2 == Permutation([5, 1, 0, 6, 3, 2, 4]) + assert q**3 == q**2*q + assert q**4 == q**2*q**2 + + a = Permutation(1, 3) + b = Permutation(2, 0, 3) + I = Permutation(3) + assert ~a == a**-1 + assert a*~a == I + assert a*b**-1 == a*~b + + ans = Permutation(0, 5, 3, 1, 6)(2, 4) + assert (p + q.rank()).rank() == ans.rank() + assert (p + q.rank())._rank == ans.rank() + assert (q + p.rank()).rank() == ans.rank() + raises(TypeError, lambda: p + Permutation(list(range(10)))) + + assert (p - q.rank()).rank() == Permutation(0, 6, 3, 1, 2, 5, 4).rank() + assert p.rank() - q.rank() < 0 # for coverage: make sure mod is used + assert (q - p.rank()).rank() == Permutation(1, 4, 6, 2)(3, 5).rank() + + assert p*q == Permutation(_af_rmuln(*[list(w) for w in (q, p)])) + assert p*Permutation([]) == p + assert Permutation([])*p == p + assert p*Permutation([[0, 1]]) == Permutation([2, 5, 0, 6, 3, 1, 4]) + assert Permutation([[0, 1]])*p == Permutation([5, 2, 1, 6, 3, 0, 4]) + + pq = p ^ q + assert pq == Permutation([5, 6, 0, 4, 1, 2, 3]) + assert pq == rmul(q, p, ~q) + qp = q ^ p + assert qp == Permutation([4, 3, 6, 2, 1, 5, 0]) + assert qp == rmul(p, q, ~p) + raises(ValueError, lambda: p ^ Permutation([])) + + assert p.commutator(q) == Permutation(0, 1, 3, 4, 6, 5, 2) + assert q.commutator(p) == Permutation(0, 2, 5, 6, 4, 3, 1) + assert p.commutator(q) == ~q.commutator(p) + raises(ValueError, lambda: p.commutator(Permutation([]))) + + assert len(p.atoms()) == 7 + assert q.atoms() == {0, 1, 2, 3, 4, 5, 6} + + assert p.inversion_vector() == [2, 4, 1, 3, 1, 0] + assert q.inversion_vector() == [3, 1, 2, 2, 0, 1] + + assert Permutation.from_inversion_vector(p.inversion_vector()) == p + assert Permutation.from_inversion_vector(q.inversion_vector()).array_form\ + == q.array_form + raises(ValueError, lambda: Permutation.from_inversion_vector([0, 2])) + assert Permutation(list(range(500, -1, -1))).inversions() == 125250 + + s = Permutation([0, 4, 1, 3, 2]) + assert s.parity() == 0 + _ = s.cyclic_form # needed to create a value for _cyclic_form + assert len(s._cyclic_form) != s.size and s.parity() == 0 + assert not s.is_odd + assert s.is_even + assert Permutation([0, 1, 4, 3, 2]).parity() == 1 + assert _af_parity([0, 4, 1, 3, 2]) == 0 + assert _af_parity([0, 1, 4, 3, 2]) == 1 + + s = Permutation([0]) + + assert s.is_Singleton + assert Permutation([]).is_Empty + + r = Permutation([3, 2, 1, 0]) + assert (r**2).is_Identity + + assert rmul(~p, p).is_Identity + assert (~p)**13 == Permutation([5, 2, 0, 4, 6, 1, 3]) + assert p.max() == 6 + assert p.min() == 0 + + q = Permutation([[6], [5], [0, 1, 2, 3, 4]]) + + assert q.max() == 4 + assert q.min() == 0 + + p = Permutation([1, 5, 2, 0, 3, 6, 4]) + q = Permutation([[1, 2, 3, 5, 6], [0, 4]]) + + assert p.ascents() == [0, 3, 4] + assert q.ascents() == [1, 2, 4] + assert r.ascents() == [] + + assert p.descents() == [1, 2, 5] + assert q.descents() == [0, 3, 5] + assert Permutation(r.descents()).is_Identity + + assert p.inversions() == 7 + # test the merge-sort with a longer permutation + big = list(p) + list(range(p.max() + 1, p.max() + 130)) + assert Permutation(big).inversions() == 7 + assert p.signature() == -1 + assert q.inversions() == 11 + assert q.signature() == -1 + assert rmul(p, ~p).inversions() == 0 + assert rmul(p, ~p).signature() == 1 + + assert p.order() == 6 + assert q.order() == 10 + assert (p**(p.order())).is_Identity + + assert p.length() == 6 + assert q.length() == 7 + assert r.length() == 4 + + assert p.runs() == [[1, 5], [2], [0, 3, 6], [4]] + assert q.runs() == [[4], [2, 3, 5], [0, 6], [1]] + assert r.runs() == [[3], [2], [1], [0]] + + assert p.index() == 8 + assert q.index() == 8 + assert r.index() == 3 + + assert p.get_precedence_distance(q) == q.get_precedence_distance(p) + assert p.get_adjacency_distance(q) == p.get_adjacency_distance(q) + assert p.get_positional_distance(q) == p.get_positional_distance(q) + p = Permutation([0, 1, 2, 3]) + q = Permutation([3, 2, 1, 0]) + assert p.get_precedence_distance(q) == 6 + assert p.get_adjacency_distance(q) == 3 + assert p.get_positional_distance(q) == 8 + p = Permutation([0, 3, 1, 2, 4]) + q = Permutation.josephus(4, 5, 2) + assert p.get_adjacency_distance(q) == 3 + raises(ValueError, lambda: p.get_adjacency_distance(Permutation([]))) + raises(ValueError, lambda: p.get_positional_distance(Permutation([]))) + raises(ValueError, lambda: p.get_precedence_distance(Permutation([]))) + + a = [Permutation.unrank_nonlex(4, i) for i in range(5)] + iden = Permutation([0, 1, 2, 3]) + for i in range(5): + for j in range(i + 1, 5): + assert a[i].commutes_with(a[j]) == \ + (rmul(a[i], a[j]) == rmul(a[j], a[i])) + if a[i].commutes_with(a[j]): + assert a[i].commutator(a[j]) == iden + assert a[j].commutator(a[i]) == iden + + a = Permutation(3) + b = Permutation(0, 6, 3)(1, 2) + assert a.cycle_structure == {1: 4} + assert b.cycle_structure == {2: 1, 3: 1, 1: 2} + # issue 11130 + raises(ValueError, lambda: Permutation(3, size=3)) + raises(ValueError, lambda: Permutation([1, 2, 0, 3], size=3)) + + +def test_Permutation_subclassing(): + # Subclass that adds permutation application on iterables + class CustomPermutation(Permutation): + def __call__(self, *i): + try: + return super().__call__(*i) + except TypeError: + pass + + try: + perm_obj = i[0] + return [self._array_form[j] for j in perm_obj] + except TypeError: + raise TypeError('unrecognized argument') + + def __eq__(self, other): + if isinstance(other, Permutation): + return self._hashable_content() == other._hashable_content() + else: + return super().__eq__(other) + + def __hash__(self): + return super().__hash__() + + p = CustomPermutation([1, 2, 3, 0]) + q = Permutation([1, 2, 3, 0]) + + assert p == q + raises(TypeError, lambda: q([1, 2])) + assert [2, 3] == p([1, 2]) + + assert type(p * q) == CustomPermutation + assert type(q * p) == Permutation # True because q.__mul__(p) is called! + + # Run all tests for the Permutation class also on the subclass + def wrapped_test_Permutation(): + # Monkeypatch the class definition in the globals + globals()['__Perm'] = globals()['Permutation'] + globals()['Permutation'] = CustomPermutation + test_Permutation() + globals()['Permutation'] = globals()['__Perm'] # Restore + del globals()['__Perm'] + + wrapped_test_Permutation() + + +def test_josephus(): + assert Permutation.josephus(4, 6, 1) == Permutation([3, 1, 0, 2, 5, 4]) + assert Permutation.josephus(1, 5, 1).is_Identity + + +def test_ranking(): + assert Permutation.unrank_lex(5, 10).rank() == 10 + p = Permutation.unrank_lex(15, 225) + assert p.rank() == 225 + p1 = p.next_lex() + assert p1.rank() == 226 + assert Permutation.unrank_lex(15, 225).rank() == 225 + assert Permutation.unrank_lex(10, 0).is_Identity + p = Permutation.unrank_lex(4, 23) + assert p.rank() == 23 + assert p.array_form == [3, 2, 1, 0] + assert p.next_lex() is None + + p = Permutation([1, 5, 2, 0, 3, 6, 4]) + q = Permutation([[1, 2, 3, 5, 6], [0, 4]]) + a = [Permutation.unrank_trotterjohnson(4, i).array_form for i in range(5)] + assert a == [[0, 1, 2, 3], [0, 1, 3, 2], [0, 3, 1, 2], [3, 0, 1, + 2], [3, 0, 2, 1] ] + assert [Permutation(pa).rank_trotterjohnson() for pa in a] == list(range(5)) + assert Permutation([0, 1, 2, 3]).next_trotterjohnson() == \ + Permutation([0, 1, 3, 2]) + + assert q.rank_trotterjohnson() == 2283 + assert p.rank_trotterjohnson() == 3389 + assert Permutation([1, 0]).rank_trotterjohnson() == 1 + a = Permutation(list(range(3))) + b = a + l = [] + tj = [] + for i in range(6): + l.append(a) + tj.append(b) + a = a.next_lex() + b = b.next_trotterjohnson() + assert a == b is None + assert {tuple(a) for a in l} == {tuple(a) for a in tj} + + p = Permutation([2, 5, 1, 6, 3, 0, 4]) + q = Permutation([[6], [5], [0, 1, 2, 3, 4]]) + assert p.rank() == 1964 + assert q.rank() == 870 + assert Permutation([]).rank_nonlex() == 0 + prank = p.rank_nonlex() + assert prank == 1600 + assert Permutation.unrank_nonlex(7, 1600) == p + qrank = q.rank_nonlex() + assert qrank == 41 + assert Permutation.unrank_nonlex(7, 41) == Permutation(q.array_form) + + a = [Permutation.unrank_nonlex(4, i).array_form for i in range(24)] + assert a == [ + [1, 2, 3, 0], [3, 2, 0, 1], [1, 3, 0, 2], [1, 2, 0, 3], [2, 3, 1, 0], + [2, 0, 3, 1], [3, 0, 1, 2], [2, 0, 1, 3], [1, 3, 2, 0], [3, 0, 2, 1], + [1, 0, 3, 2], [1, 0, 2, 3], [2, 1, 3, 0], [2, 3, 0, 1], [3, 1, 0, 2], + [2, 1, 0, 3], [3, 2, 1, 0], [0, 2, 3, 1], [0, 3, 1, 2], [0, 2, 1, 3], + [3, 1, 2, 0], [0, 3, 2, 1], [0, 1, 3, 2], [0, 1, 2, 3]] + + N = 10 + p1 = Permutation(a[0]) + for i in range(1, N+1): + p1 = p1*Permutation(a[i]) + p2 = Permutation.rmul_with_af(*[Permutation(h) for h in a[N::-1]]) + assert p1 == p2 + + ok = [] + p = Permutation([1, 0]) + for i in range(3): + ok.append(p.array_form) + p = p.next_nonlex() + if p is None: + ok.append(None) + break + assert ok == [[1, 0], [0, 1], None] + assert Permutation([3, 2, 0, 1]).next_nonlex() == Permutation([1, 3, 0, 2]) + assert [Permutation(pa).rank_nonlex() for pa in a] == list(range(24)) + + +def test_mul(): + a, b = [0, 2, 1, 3], [0, 1, 3, 2] + assert _af_rmul(a, b) == [0, 2, 3, 1] + assert _af_rmuln(a, b, list(range(4))) == [0, 2, 3, 1] + assert rmul(Permutation(a), Permutation(b)).array_form == [0, 2, 3, 1] + + a = Permutation([0, 2, 1, 3]) + b = (0, 1, 3, 2) + c = (3, 1, 2, 0) + assert Permutation.rmul(a, b, c) == Permutation([1, 2, 3, 0]) + assert Permutation.rmul(a, c) == Permutation([3, 2, 1, 0]) + raises(TypeError, lambda: Permutation.rmul(b, c)) + + n = 6 + m = 8 + a = [Permutation.unrank_nonlex(n, i).array_form for i in range(m)] + h = list(range(n)) + for i in range(m): + h = _af_rmul(h, a[i]) + h2 = _af_rmuln(*a[:i + 1]) + assert h == h2 + + +def test_args(): + p = Permutation([(0, 3, 1, 2), (4, 5)]) + assert p._cyclic_form is None + assert Permutation(p) == p + assert p.cyclic_form == [[0, 3, 1, 2], [4, 5]] + assert p._array_form == [3, 2, 0, 1, 5, 4] + p = Permutation((0, 3, 1, 2)) + assert p._cyclic_form is None + assert p._array_form == [0, 3, 1, 2] + assert Permutation([0]) == Permutation((0, )) + assert Permutation([[0], [1]]) == Permutation(((0, ), (1, ))) == \ + Permutation(((0, ), [1])) + assert Permutation([[1, 2]]) == Permutation([0, 2, 1]) + assert Permutation([[1], [4, 2]]) == Permutation([0, 1, 4, 3, 2]) + assert Permutation([[1], [4, 2]], size=1) == Permutation([0, 1, 4, 3, 2]) + assert Permutation( + [[1], [4, 2]], size=6) == Permutation([0, 1, 4, 3, 2, 5]) + assert Permutation([[0, 1], [0, 2]]) == Permutation(0, 1, 2) + assert Permutation([], size=3) == Permutation([0, 1, 2]) + assert Permutation(3).list(5) == [0, 1, 2, 3, 4] + assert Permutation(3).list(-1) == [] + assert Permutation(5)(1, 2).list(-1) == [0, 2, 1] + assert Permutation(5)(1, 2).list() == [0, 2, 1, 3, 4, 5] + raises(ValueError, lambda: Permutation([1, 2], [0])) + # enclosing brackets needed + raises(ValueError, lambda: Permutation([[1, 2], 0])) + # enclosing brackets needed on 0 + raises(ValueError, lambda: Permutation([1, 1, 0])) + raises(ValueError, lambda: Permutation([4, 5], size=10)) # where are 0-3? + # but this is ok because cycles imply that only those listed moved + assert Permutation(4, 5) == Permutation([0, 1, 2, 3, 5, 4]) + + +def test_Cycle(): + assert str(Cycle()) == '()' + assert Cycle(Cycle(1,2)) == Cycle(1, 2) + assert Cycle(1,2).copy() == Cycle(1,2) + assert list(Cycle(1, 3, 2)) == [0, 3, 1, 2] + assert Cycle(1, 2)(2, 3) == Cycle(1, 3, 2) + assert Cycle(1, 2)(2, 3)(4, 5) == Cycle(1, 3, 2)(4, 5) + assert Permutation(Cycle(1, 2)(2, 1, 0, 3)).cyclic_form, Cycle(0, 2, 1) + raises(ValueError, lambda: Cycle().list()) + assert Cycle(1, 2).list() == [0, 2, 1] + assert Cycle(1, 2).list(4) == [0, 2, 1, 3] + assert Cycle(3).list(2) == [0, 1] + assert Cycle(3).list(6) == [0, 1, 2, 3, 4, 5] + assert Permutation(Cycle(1, 2), size=4) == \ + Permutation([0, 2, 1, 3]) + assert str(Cycle(1, 2)(4, 5)) == '(1 2)(4 5)' + assert str(Cycle(1, 2)) == '(1 2)' + assert Cycle(Permutation(list(range(3)))) == Cycle() + assert Cycle(1, 2).list() == [0, 2, 1] + assert Cycle(1, 2).list(4) == [0, 2, 1, 3] + assert Cycle().size == 0 + raises(ValueError, lambda: Cycle((1, 2))) + raises(ValueError, lambda: Cycle(1, 2, 1)) + raises(TypeError, lambda: Cycle(1, 2)*{}) + raises(ValueError, lambda: Cycle(4)[a]) + raises(ValueError, lambda: Cycle(2, -4, 3)) + + # check round-trip + p = Permutation([[1, 2], [4, 3]], size=5) + assert Permutation(Cycle(p)) == p + + +def test_from_sequence(): + assert Permutation.from_sequence('SymPy') == Permutation(4)(0, 1, 3) + assert Permutation.from_sequence('SymPy', key=lambda x: x.lower()) == \ + Permutation(4)(0, 2)(1, 3) + + +def test_resize(): + p = Permutation(0, 1, 2) + assert p.resize(5) == Permutation(0, 1, 2, size=5) + assert p.resize(4) == Permutation(0, 1, 2, size=4) + assert p.resize(3) == p + raises(ValueError, lambda: p.resize(2)) + + p = Permutation(0, 1, 2)(3, 4)(5, 6) + assert p.resize(3) == Permutation(0, 1, 2) + raises(ValueError, lambda: p.resize(4)) + + +def test_printing_cyclic(): + p1 = Permutation([0, 2, 1]) + assert repr(p1) == 'Permutation(1, 2)' + assert str(p1) == '(1 2)' + p2 = Permutation() + assert repr(p2) == 'Permutation()' + assert str(p2) == '()' + p3 = Permutation([1, 2, 0, 3]) + assert repr(p3) == 'Permutation(3)(0, 1, 2)' + + +def test_printing_non_cyclic(): + p1 = Permutation([0, 1, 2, 3, 4, 5]) + assert srepr(p1, perm_cyclic=False) == 'Permutation([], size=6)' + assert sstr(p1, perm_cyclic=False) == 'Permutation([], size=6)' + p2 = Permutation([0, 1, 2]) + assert srepr(p2, perm_cyclic=False) == 'Permutation([0, 1, 2])' + assert sstr(p2, perm_cyclic=False) == 'Permutation([0, 1, 2])' + + p3 = Permutation([0, 2, 1]) + assert srepr(p3, perm_cyclic=False) == 'Permutation([0, 2, 1])' + assert sstr(p3, perm_cyclic=False) == 'Permutation([0, 2, 1])' + p4 = Permutation([0, 1, 3, 2, 4, 5, 6, 7]) + assert srepr(p4, perm_cyclic=False) == 'Permutation([0, 1, 3, 2], size=8)' + + +def test_deprecated_print_cyclic(): + p = Permutation(0, 1, 2) + try: + Permutation.print_cyclic = True + with warns_deprecated_sympy(): + assert sstr(p) == '(0 1 2)' + with warns_deprecated_sympy(): + assert srepr(p) == 'Permutation(0, 1, 2)' + with warns_deprecated_sympy(): + assert pretty(p) == '(0 1 2)' + with warns_deprecated_sympy(): + assert latex(p) == r'\left( 0\; 1\; 2\right)' + + Permutation.print_cyclic = False + with warns_deprecated_sympy(): + assert sstr(p) == 'Permutation([1, 2, 0])' + with warns_deprecated_sympy(): + assert srepr(p) == 'Permutation([1, 2, 0])' + with warns_deprecated_sympy(): + assert pretty(p, use_unicode=False) == '/0 1 2\\\n\\1 2 0/' + with warns_deprecated_sympy(): + assert latex(p) == \ + r'\begin{pmatrix} 0 & 1 & 2 \\ 1 & 2 & 0 \end{pmatrix}' + finally: + Permutation.print_cyclic = None + + +def test_permutation_equality(): + a = Permutation(0, 1, 2) + b = Permutation(0, 1, 2) + assert Eq(a, b) is S.true + c = Permutation(0, 2, 1) + assert Eq(a, c) is S.false + + d = Permutation(0, 1, 2, size=4) + assert unchanged(Eq, a, d) + e = Permutation(0, 2, 1, size=4) + assert unchanged(Eq, a, e) + + i = Permutation() + assert unchanged(Eq, i, 0) + assert unchanged(Eq, 0, i) + + +def test_issue_17661(): + c1 = Cycle(1,2) + c2 = Cycle(1,2) + assert c1 == c2 + assert repr(c1) == 'Cycle(1, 2)' + assert c1 == c2 + + +def test_permutation_apply(): + x = Symbol('x') + p = Permutation(0, 1, 2) + assert p.apply(0) == 1 + assert isinstance(p.apply(0), Integer) + assert p.apply(x) == AppliedPermutation(p, x) + assert AppliedPermutation(p, x).subs(x, 0) == 1 + + x = Symbol('x', integer=False) + raises(NotImplementedError, lambda: p.apply(x)) + x = Symbol('x', negative=True) + raises(NotImplementedError, lambda: p.apply(x)) + + +def test_AppliedPermutation(): + x = Symbol('x') + p = Permutation(0, 1, 2) + raises(ValueError, lambda: AppliedPermutation((0, 1, 2), x)) + assert AppliedPermutation(p, 1, evaluate=True) == 2 + assert AppliedPermutation(p, 1, evaluate=False).__class__ == \ + AppliedPermutation diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_polyhedron.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_polyhedron.py new file mode 100644 index 0000000000000000000000000000000000000000..abf469bb560eef1f378eff4740a84b80b696035f --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_polyhedron.py @@ -0,0 +1,105 @@ +from sympy.core.symbol import symbols +from sympy.sets.sets import FiniteSet +from sympy.combinatorics.polyhedron import (Polyhedron, + tetrahedron, cube as square, octahedron, dodecahedron, icosahedron, + cube_faces) +from sympy.combinatorics.permutations import Permutation +from sympy.combinatorics.perm_groups import PermutationGroup +from sympy.testing.pytest import raises + +rmul = Permutation.rmul + + +def test_polyhedron(): + raises(ValueError, lambda: Polyhedron(list('ab'), + pgroup=[Permutation([0])])) + pgroup = [Permutation([[0, 7, 2, 5], [6, 1, 4, 3]]), + Permutation([[0, 7, 1, 6], [5, 2, 4, 3]]), + Permutation([[3, 6, 0, 5], [4, 1, 7, 2]]), + Permutation([[7, 4, 5], [1, 3, 0], [2], [6]]), + Permutation([[1, 3, 2], [7, 6, 5], [4], [0]]), + Permutation([[4, 7, 6], [2, 0, 3], [1], [5]]), + Permutation([[1, 2, 0], [4, 5, 6], [3], [7]]), + Permutation([[4, 2], [0, 6], [3, 7], [1, 5]]), + Permutation([[3, 5], [7, 1], [2, 6], [0, 4]]), + Permutation([[2, 5], [1, 6], [0, 4], [3, 7]]), + Permutation([[4, 3], [7, 0], [5, 1], [6, 2]]), + Permutation([[4, 1], [0, 5], [6, 2], [7, 3]]), + Permutation([[7, 2], [3, 6], [0, 4], [1, 5]]), + Permutation([0, 1, 2, 3, 4, 5, 6, 7])] + corners = tuple(symbols('A:H')) + faces = cube_faces + cube = Polyhedron(corners, faces, pgroup) + + assert cube.edges == FiniteSet(*( + (0, 1), (6, 7), (1, 2), (5, 6), (0, 3), (2, 3), + (4, 7), (4, 5), (3, 7), (1, 5), (0, 4), (2, 6))) + + for i in range(3): # add 180 degree face rotations + cube.rotate(cube.pgroup[i]**2) + + assert cube.corners == corners + + for i in range(3, 7): # add 240 degree axial corner rotations + cube.rotate(cube.pgroup[i]**2) + + assert cube.corners == corners + cube.rotate(1) + raises(ValueError, lambda: cube.rotate(Permutation([0, 1]))) + assert cube.corners != corners + assert cube.array_form == [7, 6, 4, 5, 3, 2, 0, 1] + assert cube.cyclic_form == [[0, 7, 1, 6], [2, 4, 3, 5]] + cube.reset() + assert cube.corners == corners + + def check(h, size, rpt, target): + + assert len(h.faces) + len(h.vertices) - len(h.edges) == 2 + assert h.size == size + + got = set() + for p in h.pgroup: + # make sure it restores original + P = h.copy() + hit = P.corners + for i in range(rpt): + P.rotate(p) + if P.corners == hit: + break + else: + print('error in permutation', p.array_form) + for i in range(rpt): + P.rotate(p) + got.add(tuple(P.corners)) + c = P.corners + f = [[c[i] for i in f] for f in P.faces] + assert h.faces == Polyhedron(c, f).faces + assert len(got) == target + assert PermutationGroup([Permutation(g) for g in got]).is_group + + for h, size, rpt, target in zip( + (tetrahedron, square, octahedron, dodecahedron, icosahedron), + (4, 8, 6, 20, 12), + (3, 4, 4, 5, 5), + (12, 24, 24, 60, 60)): + check(h, size, rpt, target) + + +def test_pgroups(): + from sympy.combinatorics.polyhedron import (cube, tetrahedron_faces, + octahedron_faces, dodecahedron_faces, icosahedron_faces) + from sympy.combinatorics.polyhedron import _pgroup_calcs + (tetrahedron2, cube2, octahedron2, dodecahedron2, icosahedron2, + tetrahedron_faces2, cube_faces2, octahedron_faces2, + dodecahedron_faces2, icosahedron_faces2) = _pgroup_calcs() + + assert tetrahedron == tetrahedron2 + assert cube == cube2 + assert octahedron == octahedron2 + assert dodecahedron == dodecahedron2 + assert icosahedron == icosahedron2 + assert sorted(map(sorted, tetrahedron_faces)) == sorted(map(sorted, tetrahedron_faces2)) + assert sorted(cube_faces) == sorted(cube_faces2) + assert sorted(octahedron_faces) == sorted(octahedron_faces2) + assert sorted(dodecahedron_faces) == sorted(dodecahedron_faces2) + assert sorted(icosahedron_faces) == sorted(icosahedron_faces2) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_prufer.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_prufer.py new file mode 100644 index 0000000000000000000000000000000000000000..b077c7cf3f023a4c36d7039505e6165ab29f275a --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_prufer.py @@ -0,0 +1,74 @@ +from sympy.combinatorics.prufer import Prufer +from sympy.testing.pytest import raises + + +def test_prufer(): + # number of nodes is optional + assert Prufer([[0, 1], [0, 2], [0, 3], [0, 4]], 5).nodes == 5 + assert Prufer([[0, 1], [0, 2], [0, 3], [0, 4]]).nodes == 5 + + a = Prufer([[0, 1], [0, 2], [0, 3], [0, 4]]) + assert a.rank == 0 + assert a.nodes == 5 + assert a.prufer_repr == [0, 0, 0] + + a = Prufer([[2, 4], [1, 4], [1, 3], [0, 5], [0, 4]]) + assert a.rank == 924 + assert a.nodes == 6 + assert a.tree_repr == [[2, 4], [1, 4], [1, 3], [0, 5], [0, 4]] + assert a.prufer_repr == [4, 1, 4, 0] + + assert Prufer.edges([0, 1, 2, 3], [1, 4, 5], [1, 4, 6]) == \ + ([[0, 1], [1, 2], [1, 4], [2, 3], [4, 5], [4, 6]], 7) + assert Prufer([0]*4).size == Prufer([6]*4).size == 1296 + + # accept iterables but convert to list of lists + tree = [(0, 1), (1, 5), (0, 3), (0, 2), (2, 6), (4, 7), (2, 4)] + tree_lists = [list(t) for t in tree] + assert Prufer(tree).tree_repr == tree_lists + assert sorted(Prufer(set(tree)).tree_repr) == sorted(tree_lists) + + raises(ValueError, lambda: Prufer([[1, 2], [3, 4]])) # 0 is missing + raises(ValueError, lambda: Prufer([[2, 3], [3, 4]])) # 0, 1 are missing + assert Prufer(*Prufer.edges([1, 2], [3, 4])).prufer_repr == [1, 3] + raises(ValueError, lambda: Prufer.edges( + [1, 3], [3, 4])) # a broken tree but edges doesn't care + raises(ValueError, lambda: Prufer.edges([1, 2], [5, 6])) + raises(ValueError, lambda: Prufer([[]])) + + a = Prufer([[0, 1], [0, 2], [0, 3]]) + b = a.next() + assert b.tree_repr == [[0, 2], [0, 1], [1, 3]] + assert b.rank == 1 + + +def test_round_trip(): + def doit(t, b): + e, n = Prufer.edges(*t) + t = Prufer(e, n) + a = sorted(t.tree_repr) + b = [i - 1 for i in b] + assert t.prufer_repr == b + assert sorted(Prufer(b).tree_repr) == a + assert Prufer.unrank(t.rank, n).prufer_repr == b + + doit([[1, 2]], []) + doit([[2, 1, 3]], [1]) + doit([[1, 3, 2]], [3]) + doit([[1, 2, 3]], [2]) + doit([[2, 1, 4], [1, 3]], [1, 1]) + doit([[3, 2, 1, 4]], [2, 1]) + doit([[3, 2, 1], [2, 4]], [2, 2]) + doit([[1, 3, 2, 4]], [3, 2]) + doit([[1, 4, 2, 3]], [4, 2]) + doit([[3, 1, 4, 2]], [4, 1]) + doit([[4, 2, 1, 3]], [1, 2]) + doit([[1, 2, 4, 3]], [2, 4]) + doit([[1, 3, 4, 2]], [3, 4]) + doit([[2, 4, 1], [4, 3]], [4, 4]) + doit([[1, 2, 3, 4]], [2, 3]) + doit([[2, 3, 1], [3, 4]], [3, 3]) + doit([[1, 4, 3, 2]], [4, 3]) + doit([[2, 1, 4, 3]], [1, 4]) + doit([[2, 1, 3, 4]], [1, 3]) + doit([[6, 2, 1, 4], [1, 3, 5, 8], [3, 7]], [1, 2, 1, 3, 3, 5]) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_rewriting.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_rewriting.py new file mode 100644 index 0000000000000000000000000000000000000000..97c562bd57a2cd6318fa1dcb13c6f6278c861cca --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_rewriting.py @@ -0,0 +1,49 @@ +from sympy.combinatorics.fp_groups import FpGroup +from sympy.combinatorics.free_groups import free_group +from sympy.testing.pytest import raises + + +def test_rewriting(): + F, a, b = free_group("a, b") + G = FpGroup(F, [a*b*a**-1*b**-1]) + a, b = G.generators + R = G._rewriting_system + assert R.is_confluent + + assert G.reduce(b**-1*a) == a*b**-1 + assert G.reduce(b**3*a**4*b**-2*a) == a**5*b + assert G.equals(b**2*a**-1*b, b**4*a**-1*b**-1) + + assert R.reduce_using_automaton(b*a*a**2*b**-1) == a**3 + assert R.reduce_using_automaton(b**3*a**4*b**-2*a) == a**5*b + assert R.reduce_using_automaton(b**-1*a) == a*b**-1 + + G = FpGroup(F, [a**3, b**3, (a*b)**2]) + R = G._rewriting_system + R.make_confluent() + # R._is_confluent should be set to True after + # a successful run of make_confluent + assert R.is_confluent + # but also the system should actually be confluent + assert R._check_confluence() + assert G.reduce(b*a**-1*b**-1*a**3*b**4*a**-1*b**-15) == a**-1*b**-1 + # check for automaton reduction + assert R.reduce_using_automaton(b*a**-1*b**-1*a**3*b**4*a**-1*b**-15) == a**-1*b**-1 + + G = FpGroup(F, [a**2, b**3, (a*b)**4]) + R = G._rewriting_system + assert G.reduce(a**2*b**-2*a**2*b) == b**-1 + assert R.reduce_using_automaton(a**2*b**-2*a**2*b) == b**-1 + assert G.reduce(a**3*b**-2*a**2*b) == a**-1*b**-1 + assert R.reduce_using_automaton(a**3*b**-2*a**2*b) == a**-1*b**-1 + # Check after adding a rule + R.add_rule(a**2, b) + assert R.reduce_using_automaton(a**2*b**-2*a**2*b) == b**-1 + assert R.reduce_using_automaton(a**4*b**-2*a**2*b**3) == b + + R.set_max(15) + raises(RuntimeError, lambda: R.add_rule(a**-3, b)) + R.set_max(20) + R.add_rule(a**-3, b) + + assert R.add_rule(a, a) == set() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_schur_number.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_schur_number.py new file mode 100644 index 0000000000000000000000000000000000000000..e6beb9b11fa993a99b71d89b8485050fc3575b8e --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_schur_number.py @@ -0,0 +1,55 @@ +from sympy.core import S, Rational +from sympy.combinatorics.schur_number import schur_partition, SchurNumber +from sympy.core.random import _randint +from sympy.testing.pytest import raises +from sympy.core.symbol import symbols + + +def _sum_free_test(subset): + """ + Checks if subset is sum-free(There are no x,y,z in the subset such that + x + y = z) + """ + for i in subset: + for j in subset: + assert (i + j in subset) is False + + +def test_schur_partition(): + raises(ValueError, lambda: schur_partition(S.Infinity)) + raises(ValueError, lambda: schur_partition(-1)) + raises(ValueError, lambda: schur_partition(0)) + assert schur_partition(2) == [[1, 2]] + + random_number_generator = _randint(1000) + for _ in range(5): + n = random_number_generator(1, 1000) + result = schur_partition(n) + t = 0 + numbers = [] + for item in result: + _sum_free_test(item) + """ + Checks if the occurrence of all numbers is exactly one + """ + t += len(item) + for l in item: + assert (l in numbers) is False + numbers.append(l) + assert n == t + + x = symbols("x") + raises(ValueError, lambda: schur_partition(x)) + +def test_schur_number(): + first_known_schur_numbers = {1: 1, 2: 4, 3: 13, 4: 44, 5: 160} + for k in first_known_schur_numbers: + assert SchurNumber(k) == first_known_schur_numbers[k] + + assert SchurNumber(S.Infinity) == S.Infinity + assert SchurNumber(0) == 0 + raises(ValueError, lambda: SchurNumber(0.5)) + + n = symbols("n") + assert SchurNumber(n).lower_bound() == 3**n/2 - Rational(1, 2) + assert SchurNumber(8).lower_bound() == 5039 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_subsets.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_subsets.py new file mode 100644 index 0000000000000000000000000000000000000000..1d50076da1c685294c2d2561dcc2a6af629eaf83 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_subsets.py @@ -0,0 +1,63 @@ +from sympy.combinatorics.subsets import Subset, ksubsets +from sympy.testing.pytest import raises + + +def test_subset(): + a = Subset(['c', 'd'], ['a', 'b', 'c', 'd']) + assert a.next_binary() == Subset(['b'], ['a', 'b', 'c', 'd']) + assert a.prev_binary() == Subset(['c'], ['a', 'b', 'c', 'd']) + assert a.next_lexicographic() == Subset(['d'], ['a', 'b', 'c', 'd']) + assert a.prev_lexicographic() == Subset(['c'], ['a', 'b', 'c', 'd']) + assert a.next_gray() == Subset(['c'], ['a', 'b', 'c', 'd']) + assert a.prev_gray() == Subset(['d'], ['a', 'b', 'c', 'd']) + assert a.rank_binary == 3 + assert a.rank_lexicographic == 14 + assert a.rank_gray == 2 + assert a.cardinality == 16 + assert a.size == 2 + assert Subset.bitlist_from_subset(a, ['a', 'b', 'c', 'd']) == '0011' + + a = Subset([2, 5, 7], [1, 2, 3, 4, 5, 6, 7]) + assert a.next_binary() == Subset([2, 5, 6], [1, 2, 3, 4, 5, 6, 7]) + assert a.prev_binary() == Subset([2, 5], [1, 2, 3, 4, 5, 6, 7]) + assert a.next_lexicographic() == Subset([2, 6], [1, 2, 3, 4, 5, 6, 7]) + assert a.prev_lexicographic() == Subset([2, 5, 6, 7], [1, 2, 3, 4, 5, 6, 7]) + assert a.next_gray() == Subset([2, 5, 6, 7], [1, 2, 3, 4, 5, 6, 7]) + assert a.prev_gray() == Subset([2, 5], [1, 2, 3, 4, 5, 6, 7]) + assert a.rank_binary == 37 + assert a.rank_lexicographic == 93 + assert a.rank_gray == 57 + assert a.cardinality == 128 + + superset = ['a', 'b', 'c', 'd'] + assert Subset.unrank_binary(4, superset).rank_binary == 4 + assert Subset.unrank_gray(10, superset).rank_gray == 10 + + superset = [1, 2, 3, 4, 5, 6, 7, 8, 9] + assert Subset.unrank_binary(33, superset).rank_binary == 33 + assert Subset.unrank_gray(25, superset).rank_gray == 25 + + a = Subset([], ['a', 'b', 'c', 'd']) + i = 1 + while a.subset != Subset(['d'], ['a', 'b', 'c', 'd']).subset: + a = a.next_lexicographic() + i = i + 1 + assert i == 16 + + i = 1 + while a.subset != Subset([], ['a', 'b', 'c', 'd']).subset: + a = a.prev_lexicographic() + i = i + 1 + assert i == 16 + + raises(ValueError, lambda: Subset(['a', 'b'], ['a'])) + raises(ValueError, lambda: Subset(['a'], ['b', 'c'])) + raises(ValueError, lambda: Subset.subset_from_bitlist(['a', 'b'], '010')) + + assert Subset(['a'], ['a', 'b']) != Subset(['b'], ['a', 'b']) + assert Subset(['a'], ['a', 'b']) != Subset(['a'], ['a', 'c']) + +def test_ksubsets(): + assert list(ksubsets([1, 2, 3], 2)) == [(1, 2), (1, 3), (2, 3)] + assert list(ksubsets([1, 2, 3, 4, 5], 2)) == [(1, 2), (1, 3), (1, 4), + (1, 5), (2, 3), (2, 4), (2, 5), (3, 4), (3, 5), (4, 5)] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_tensor_can.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_tensor_can.py new file mode 100644 index 0000000000000000000000000000000000000000..3922419f20b92536426bfaae4b7e94df5db671b5 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_tensor_can.py @@ -0,0 +1,560 @@ +from sympy.combinatorics.permutations import Permutation, Perm +from sympy.combinatorics.tensor_can import (perm_af_direct_product, dummy_sgs, + riemann_bsgs, get_symmetric_group_sgs, canonicalize, bsgs_direct_product) +from sympy.combinatorics.testutil import canonicalize_naive, graph_certificate +from sympy.testing.pytest import skip, XFAIL + +def test_perm_af_direct_product(): + gens1 = [[1,0,2,3], [0,1,3,2]] + gens2 = [[1,0]] + assert perm_af_direct_product(gens1, gens2, 0) == [[1, 0, 2, 3, 4, 5], [0, 1, 3, 2, 4, 5], [0, 1, 2, 3, 5, 4]] + gens1 = [[1,0,2,3,5,4], [0,1,3,2,4,5]] + gens2 = [[1,0,2,3]] + assert [[1, 0, 2, 3, 4, 5, 7, 6], [0, 1, 3, 2, 4, 5, 6, 7], [0, 1, 2, 3, 5, 4, 6, 7]] + +def test_dummy_sgs(): + a = dummy_sgs([1,2], 0, 4) + assert a == [[0,2,1,3,4,5]] + a = dummy_sgs([2,3,4,5], 0, 8) + assert a == [x._array_form for x in [Perm(9)(2,3), Perm(9)(4,5), + Perm(9)(2,4)(3,5)]] + + a = dummy_sgs([2,3,4,5], 1, 8) + assert a == [x._array_form for x in [Perm(2,3)(8,9), Perm(4,5)(8,9), + Perm(9)(2,4)(3,5)]] + +def test_get_symmetric_group_sgs(): + assert get_symmetric_group_sgs(2) == ([0], [Permutation(3)(0,1)]) + assert get_symmetric_group_sgs(2, 1) == ([0], [Permutation(0,1)(2,3)]) + assert get_symmetric_group_sgs(3) == ([0,1], [Permutation(4)(0,1), Permutation(4)(1,2)]) + assert get_symmetric_group_sgs(3, 1) == ([0,1], [Permutation(0,1)(3,4), Permutation(1,2)(3,4)]) + assert get_symmetric_group_sgs(4) == ([0,1,2], [Permutation(5)(0,1), Permutation(5)(1,2), Permutation(5)(2,3)]) + assert get_symmetric_group_sgs(4, 1) == ([0,1,2], [Permutation(0,1)(4,5), Permutation(1,2)(4,5), Permutation(2,3)(4,5)]) + + +def test_canonicalize_no_slot_sym(): + # cases in which there is no slot symmetry after fixing the + # free indices; here and in the following if the symmetry of the + # metric is not specified, it is assumed to be symmetric. + # If it is not specified, tensors are commuting. + + # A_d0 * B^d0; g = [1,0, 2,3]; T_c = A^d0*B_d0; can = [0,1,2,3] + base1, gens1 = get_symmetric_group_sgs(1) + dummies = [0, 1] + g = Permutation([1,0,2,3]) + can = canonicalize(g, dummies, 0, (base1,gens1,1,0), (base1,gens1,1,0)) + assert can == [0,1,2,3] + # equivalently + can = canonicalize(g, dummies, 0, (base1, gens1, 2, None)) + assert can == [0,1,2,3] + + # with antisymmetric metric; T_c = -A^d0*B_d0; can = [0,1,3,2] + can = canonicalize(g, dummies, 1, (base1,gens1,1,0), (base1,gens1,1,0)) + assert can == [0,1,3,2] + + # A^a * B^b; ord = [a,b]; g = [0,1,2,3]; can = g + g = Permutation([0,1,2,3]) + dummies = [] + t0 = t1 = (base1, gens1, 1, 0) + can = canonicalize(g, dummies, 0, t0, t1) + assert can == [0,1,2,3] + # B^b * A^a + g = Permutation([1,0,2,3]) + can = canonicalize(g, dummies, 0, t0, t1) + assert can == [1,0,2,3] + + # A symmetric + # A^{b}_{d0}*A^{d0, a} order a,b,d0,-d0; T_c = A^{a d0}*A{b}_{d0} + # g = [1,3,2,0,4,5]; can = [0,2,1,3,4,5] + base2, gens2 = get_symmetric_group_sgs(2) + dummies = [2,3] + g = Permutation([1,3,2,0,4,5]) + can = canonicalize(g, dummies, 0, (base2, gens2, 2, 0)) + assert can == [0, 2, 1, 3, 4, 5] + # with antisymmetric metric + can = canonicalize(g, dummies, 1, (base2, gens2, 2, 0)) + assert can == [0, 2, 1, 3, 4, 5] + # A^{a}_{d0}*A^{d0, b} + g = Permutation([0,3,2,1,4,5]) + can = canonicalize(g, dummies, 1, (base2, gens2, 2, 0)) + assert can == [0, 2, 1, 3, 5, 4] + + # A, B symmetric + # A^b_d0*B^{d0,a}; g=[1,3,2,0,4,5] + # T_c = A^{b,d0}*B_{a,d0}; can = [1,2,0,3,4,5] + dummies = [2,3] + g = Permutation([1,3,2,0,4,5]) + can = canonicalize(g, dummies, 0, (base2,gens2,1,0), (base2,gens2,1,0)) + assert can == [1,2,0,3,4,5] + # same with antisymmetric metric + can = canonicalize(g, dummies, 1, (base2,gens2,1,0), (base2,gens2,1,0)) + assert can == [1,2,0,3,5,4] + + # A^{d1}_{d0}*B^d0*C_d1 ord=[d0,-d0,d1,-d1]; g = [2,1,0,3,4,5] + # T_c = A^{d0 d1}*B_d0*C_d1; can = [0,2,1,3,4,5] + base1, gens1 = get_symmetric_group_sgs(1) + base2, gens2 = get_symmetric_group_sgs(2) + g = Permutation([2,1,0,3,4,5]) + dummies = [0,1,2,3] + t0 = (base2, gens2, 1, 0) + t1 = t2 = (base1, gens1, 1, 0) + can = canonicalize(g, dummies, 0, t0, t1, t2) + assert can == [0, 2, 1, 3, 4, 5] + + # A without symmetry + # A^{d1}_{d0}*B^d0*C_d1 ord=[d0,-d0,d1,-d1]; g = [2,1,0,3,4,5] + # T_c = A^{d0 d1}*B_d1*C_d0; can = [0,2,3,1,4,5] + g = Permutation([2,1,0,3,4,5]) + dummies = [0,1,2,3] + t0 = ([], [Permutation(list(range(4)))], 1, 0) + can = canonicalize(g, dummies, 0, t0, t1, t2) + assert can == [0,2,3,1,4,5] + # A, B without symmetry + # A^{d1}_{d0}*B_{d1}^{d0}; g = [2,1,3,0,4,5] + # T_c = A^{d0 d1}*B_{d0 d1}; can = [0,2,1,3,4,5] + t0 = t1 = ([], [Permutation(list(range(4)))], 1, 0) + dummies = [0,1,2,3] + g = Permutation([2,1,3,0,4,5]) + can = canonicalize(g, dummies, 0, t0, t1) + assert can == [0, 2, 1, 3, 4, 5] + # A_{d0}^{d1}*B_{d1}^{d0}; g = [1,2,3,0,4,5] + # T_c = A^{d0 d1}*B_{d1 d0}; can = [0,2,3,1,4,5] + g = Permutation([1,2,3,0,4,5]) + can = canonicalize(g, dummies, 0, t0, t1) + assert can == [0,2,3,1,4,5] + + # A, B, C without symmetry + # A^{d1 d0}*B_{a d0}*C_{d1 b} ord=[a,b,d0,-d0,d1,-d1] + # g=[4,2,0,3,5,1,6,7] + # T_c=A^{d0 d1}*B_{a d1}*C_{d0 b}; can = [2,4,0,5,3,1,6,7] + t0 = t1 = t2 = ([], [Permutation(list(range(4)))], 1, 0) + dummies = [2,3,4,5] + g = Permutation([4,2,0,3,5,1,6,7]) + can = canonicalize(g, dummies, 0, t0, t1, t2) + assert can == [2,4,0,5,3,1,6,7] + + # A symmetric, B and C without symmetry + # A^{d1 d0}*B_{a d0}*C_{d1 b} ord=[a,b,d0,-d0,d1,-d1] + # g=[4,2,0,3,5,1,6,7] + # T_c = A^{d0 d1}*B_{a d0}*C_{d1 b}; can = [2,4,0,3,5,1,6,7] + t0 = (base2,gens2,1,0) + t1 = t2 = ([], [Permutation(list(range(4)))], 1, 0) + dummies = [2,3,4,5] + g = Permutation([4,2,0,3,5,1,6,7]) + can = canonicalize(g, dummies, 0, t0, t1, t2) + assert can == [2,4,0,3,5,1,6,7] + + # A and C symmetric, B without symmetry + # A^{d1 d0}*B_{a d0}*C_{d1 b} ord=[a,b,d0,-d0,d1,-d1] + # g=[4,2,0,3,5,1,6,7] + # T_c = A^{d0 d1}*B_{a d0}*C_{b d1}; can = [2,4,0,3,1,5,6,7] + t0 = t2 = (base2,gens2,1,0) + t1 = ([], [Permutation(list(range(4)))], 1, 0) + dummies = [2,3,4,5] + g = Permutation([4,2,0,3,5,1,6,7]) + can = canonicalize(g, dummies, 0, t0, t1, t2) + assert can == [2,4,0,3,1,5,6,7] + + # A symmetric, B without symmetry, C antisymmetric + # A^{d1 d0}*B_{a d0}*C_{d1 b} ord=[a,b,d0,-d0,d1,-d1] + # g=[4,2,0,3,5,1,6,7] + # T_c = -A^{d0 d1}*B_{a d0}*C_{b d1}; can = [2,4,0,3,1,5,7,6] + t0 = (base2,gens2, 1, 0) + t1 = ([], [Permutation(list(range(4)))], 1, 0) + base2a, gens2a = get_symmetric_group_sgs(2, 1) + t2 = (base2a, gens2a, 1, 0) + dummies = [2,3,4,5] + g = Permutation([4,2,0,3,5,1,6,7]) + can = canonicalize(g, dummies, 0, t0, t1, t2) + assert can == [2,4,0,3,1,5,7,6] + + +def test_canonicalize_no_dummies(): + base1, gens1 = get_symmetric_group_sgs(1) + base2, gens2 = get_symmetric_group_sgs(2) + base2a, gens2a = get_symmetric_group_sgs(2, 1) + + # A commuting + # A^c A^b A^a; ord = [a,b,c]; g = [2,1,0,3,4] + # T_c = A^a A^b A^c; can = list(range(5)) + g = Permutation([2,1,0,3,4]) + can = canonicalize(g, [], 0, (base1, gens1, 3, 0)) + assert can == list(range(5)) + + # A anticommuting + # A^c A^b A^a; ord = [a,b,c]; g = [2,1,0,3,4] + # T_c = -A^a A^b A^c; can = [0,1,2,4,3] + g = Permutation([2,1,0,3,4]) + can = canonicalize(g, [], 0, (base1, gens1, 3, 1)) + assert can == [0,1,2,4,3] + + # A commuting and symmetric + # A^{b,d}*A^{c,a}; ord = [a,b,c,d]; g = [1,3,2,0,4,5] + # T_c = A^{a c}*A^{b d}; can = [0,2,1,3,4,5] + g = Permutation([1,3,2,0,4,5]) + can = canonicalize(g, [], 0, (base2, gens2, 2, 0)) + assert can == [0,2,1,3,4,5] + + # A anticommuting and symmetric + # A^{b,d}*A^{c,a}; ord = [a,b,c,d]; g = [1,3,2,0,4,5] + # T_c = -A^{a c}*A^{b d}; can = [0,2,1,3,5,4] + g = Permutation([1,3,2,0,4,5]) + can = canonicalize(g, [], 0, (base2, gens2, 2, 1)) + assert can == [0,2,1,3,5,4] + # A^{c,a}*A^{b,d} ; g = [2,0,1,3,4,5] + # T_c = A^{a c}*A^{b d}; can = [0,2,1,3,4,5] + g = Permutation([2,0,1,3,4,5]) + can = canonicalize(g, [], 0, (base2, gens2, 2, 1)) + assert can == [0,2,1,3,4,5] + +def test_no_metric_symmetry(): + # no metric symmetry + # A^d1_d0 * A^d0_d1; ord = [d0,-d0,d1,-d1]; g= [2,1,0,3,4,5] + # T_c = A^d0_d1 * A^d1_d0; can = [0,3,2,1,4,5] + g = Permutation([2,1,0,3,4,5]) + can = canonicalize(g, list(range(4)), None, [[], [Permutation(list(range(4)))], 2, 0]) + assert can == [0,3,2,1,4,5] + + # A^d1_d2 * A^d0_d3 * A^d2_d1 * A^d3_d0 + # ord = [d0,-d0,d1,-d1,d2,-d2,d3,-d3] + # 0 1 2 3 4 5 6 7 + # g = [2,5,0,7,4,3,6,1,8,9] + # T_c = A^d0_d1 * A^d1_d0 * A^d2_d3 * A^d3_d2 + # can = [0,3,2,1,4,7,6,5,8,9] + g = Permutation([2,5,0,7,4,3,6,1,8,9]) + #can = canonicalize(g, list(range(8)), 0, [[], [list(range(4))], 4, 0]) + #assert can == [0, 2, 3, 1, 4, 6, 7, 5, 8, 9] + can = canonicalize(g, list(range(8)), None, [[], [Permutation(list(range(4)))], 4, 0]) + assert can == [0, 3, 2, 1, 4, 7, 6, 5, 8, 9] + + # A^d0_d2 * A^d1_d3 * A^d3_d0 * A^d2_d1 + # g = [0,5,2,7,6,1,4,3,8,9] + # T_c = A^d0_d1 * A^d1_d2 * A^d2_d3 * A^d3_d0 + # can = [0,3,2,5,4,7,6,1,8,9] + g = Permutation([0,5,2,7,6,1,4,3,8,9]) + can = canonicalize(g, list(range(8)), None, [[], [Permutation(list(range(4)))], 4, 0]) + assert can == [0,3,2,5,4,7,6,1,8,9] + + g = Permutation([12,7,10,3,14,13,4,11,6,1,2,9,0,15,8,5,16,17]) + can = canonicalize(g, list(range(16)), None, [[], [Permutation(list(range(4)))], 8, 0]) + assert can == [0,3,2,5,4,7,6,1,8,11,10,13,12,15,14,9,16,17] + +def test_canonical_free(): + # t = A^{d0 a1}*A_d0^a0 + # ord = [a0,a1,d0,-d0]; g = [2,1,3,0,4,5]; dummies = [[2,3]] + # t_c = A_d0^a0*A^{d0 a1} + # can = [3,0, 2,1, 4,5] + g = Permutation([2,1,3,0,4,5]) + dummies = [[2,3]] + can = canonicalize(g, dummies, [None], ([], [Permutation(3)], 2, 0)) + assert can == [3,0, 2,1, 4,5] + +def test_canonicalize1(): + base1, gens1 = get_symmetric_group_sgs(1) + base1a, gens1a = get_symmetric_group_sgs(1, 1) + base2, gens2 = get_symmetric_group_sgs(2) + base3, gens3 = get_symmetric_group_sgs(3) + base2a, gens2a = get_symmetric_group_sgs(2, 1) + base3a, gens3a = get_symmetric_group_sgs(3, 1) + + # A_d0*A^d0; ord = [d0,-d0]; g = [1,0,2,3] + # T_c = A^d0*A_d0; can = [0,1,2,3] + g = Permutation([1,0,2,3]) + can = canonicalize(g, [0, 1], 0, (base1, gens1, 2, 0)) + assert can == list(range(4)) + + # A commuting + # A_d0*A_d1*A_d2*A^d2*A^d1*A^d0; ord=[d0,-d0,d1,-d1,d2,-d2] + # g = [1,3,5,4,2,0,6,7] + # T_c = A^d0*A_d0*A^d1*A_d1*A^d2*A_d2; can = list(range(8)) + g = Permutation([1,3,5,4,2,0,6,7]) + can = canonicalize(g, list(range(6)), 0, (base1, gens1, 6, 0)) + assert can == list(range(8)) + + # A anticommuting + # A_d0*A_d1*A_d2*A^d2*A^d1*A^d0; ord=[d0,-d0,d1,-d1,d2,-d2] + # g = [1,3,5,4,2,0,6,7] + # T_c 0; can = 0 + g = Permutation([1,3,5,4,2,0,6,7]) + can = canonicalize(g, list(range(6)), 0, (base1, gens1, 6, 1)) + assert can == 0 + can1 = canonicalize_naive(g, list(range(6)), 0, (base1, gens1, 6, 1)) + assert can1 == 0 + + # A commuting symmetric + # A^{d0 b}*A^a_d1*A^d1_d0; ord=[a,b,d0,-d0,d1,-d1] + # g = [2,1,0,5,4,3,6,7] + # T_c = A^{a d0}*A^{b d1}*A_{d0 d1}; can = [0,2,1,4,3,5,6,7] + g = Permutation([2,1,0,5,4,3,6,7]) + can = canonicalize(g, list(range(2,6)), 0, (base2, gens2, 3, 0)) + assert can == [0,2,1,4,3,5,6,7] + + # A, B commuting symmetric + # A^{d0 b}*A^d1_d0*B^a_d1; ord=[a,b,d0,-d0,d1,-d1] + # g = [2,1,4,3,0,5,6,7] + # T_c = A^{b d0}*A_d0^d1*B^a_d1; can = [1,2,3,4,0,5,6,7] + g = Permutation([2,1,4,3,0,5,6,7]) + can = canonicalize(g, list(range(2,6)), 0, (base2,gens2,2,0), (base2,gens2,1,0)) + assert can == [1,2,3,4,0,5,6,7] + + # A commuting symmetric + # A^{d1 d0 b}*A^{a}_{d1 d0}; ord=[a,b, d0,-d0,d1,-d1] + # g = [4,2,1,0,5,3,6,7] + # T_c = A^{a d0 d1}*A^{b}_{d0 d1}; can = [0,2,4,1,3,5,6,7] + g = Permutation([4,2,1,0,5,3,6,7]) + can = canonicalize(g, list(range(2,6)), 0, (base3, gens3, 2, 0)) + assert can == [0,2,4,1,3,5,6,7] + + + # A^{d3 d0 d2}*A^a0_{d1 d2}*A^d1_d3^a1*A^{a2 a3}_d0 + # ord = [a0,a1,a2,a3,d0,-d0,d1,-d1,d2,-d2,d3,-d3] + # 0 1 2 3 4 5 6 7 8 9 10 11 + # g = [10,4,8, 0,7,9, 6,11,1, 2,3,5, 12,13] + # T_c = A^{a0 d0 d1}*A^a1_d0^d2*A^{a2 a3 d3}*A_{d1 d2 d3} + # can = [0,4,6, 1,5,8, 2,3,10, 7,9,11, 12,13] + g = Permutation([10,4,8, 0,7,9, 6,11,1, 2,3,5, 12,13]) + can = canonicalize(g, list(range(4,12)), 0, (base3, gens3, 4, 0)) + assert can == [0,4,6, 1,5,8, 2,3,10, 7,9,11, 12,13] + + # A commuting symmetric, B antisymmetric + # A^{d0 d1 d2} * A_{d2 d3 d1} * B_d0^d3 + # ord = [d0,-d0,d1,-d1,d2,-d2,d3,-d3] + # g = [0,2,4,5,7,3,1,6,8,9] + # in this esxample and in the next three, + # renaming dummy indices and using symmetry of A, + # T = A^{d0 d1 d2} * A_{d0 d1 d3} * B_d2^d3 + # can = 0 + g = Permutation([0,2,4,5,7,3,1,6,8,9]) + can = canonicalize(g, list(range(8)), 0, (base3, gens3,2,0), (base2a,gens2a,1,0)) + assert can == 0 + # A anticommuting symmetric, B anticommuting + # A^{d0 d1 d2} * A_{d2 d3 d1} * B_d0^d3 + # T_c = A^{d0 d1 d2} * A_{d0 d1}^d3 * B_{d2 d3} + # can = [0,2,4, 1,3,6, 5,7, 8,9] + can = canonicalize(g, list(range(8)), 0, (base3, gens3,2,1), (base2a,gens2a,1,0)) + assert can == [0,2,4, 1,3,6, 5,7, 8,9] + # A anticommuting symmetric, B antisymmetric commuting, antisymmetric metric + # A^{d0 d1 d2} * A_{d2 d3 d1} * B_d0^d3 + # T_c = -A^{d0 d1 d2} * A_{d0 d1}^d3 * B_{d2 d3} + # can = [0,2,4, 1,3,6, 5,7, 9,8] + can = canonicalize(g, list(range(8)), 1, (base3, gens3,2,1), (base2a,gens2a,1,0)) + assert can == [0,2,4, 1,3,6, 5,7, 9,8] + + # A anticommuting symmetric, B anticommuting anticommuting, + # no metric symmetry + # A^{d0 d1 d2} * A_{d2 d3 d1} * B_d0^d3 + # T_c = A^{d0 d1 d2} * A_{d0 d1 d3} * B_d2^d3 + # can = [0,2,4, 1,3,7, 5,6, 8,9] + can = canonicalize(g, list(range(8)), None, (base3, gens3,2,1), (base2a,gens2a,1,0)) + assert can == [0,2,4,1,3,7,5,6,8,9] + + # Gamma anticommuting + # Gamma_{mu nu} * gamma^rho * Gamma^{nu mu alpha} + # ord = [alpha, rho, mu,-mu,nu,-nu] + # g = [3,5,1,4,2,0,6,7] + # T_c = -Gamma^{mu nu} * gamma^rho * Gamma_{alpha mu nu} + # can = [2,4,1,0,3,5,7,6]] + g = Permutation([3,5,1,4,2,0,6,7]) + t0 = (base2a, gens2a, 1, None) + t1 = (base1, gens1, 1, None) + t2 = (base3a, gens3a, 1, None) + can = canonicalize(g, list(range(2, 6)), 0, t0, t1, t2) + assert can == [2,4,1,0,3,5,7,6] + + # Gamma_{mu nu} * Gamma^{gamma beta} * gamma_rho * Gamma^{nu mu alpha} + # ord = [alpha, beta, gamma, -rho, mu,-mu,nu,-nu] + # 0 1 2 3 4 5 6 7 + # g = [5,7,2,1,3,6,4,0,8,9] + # T_c = Gamma^{mu nu} * Gamma^{beta gamma} * gamma_rho * Gamma^alpha_{mu nu} # can = [4,6,1,2,3,0,5,7,8,9] + t0 = (base2a, gens2a, 2, None) + g = Permutation([5,7,2,1,3,6,4,0,8,9]) + can = canonicalize(g, list(range(4, 8)), 0, t0, t1, t2) + assert can == [4,6,1,2,3,0,5,7,8,9] + + # f^a_{b,c} antisymmetric in b,c; A_mu^a no symmetry + # f^c_{d a} * f_{c e b} * A_mu^d * A_nu^a * A^{nu e} * A^{mu b} + # ord = [mu,-mu,nu,-nu,a,-a,b,-b,c,-c,d,-d, e, -e] + # 0 1 2 3 4 5 6 7 8 9 10 11 12 13 + # g = [8,11,5, 9,13,7, 1,10, 3,4, 2,12, 0,6, 14,15] + # T_c = -f^{a b c} * f_a^{d e} * A^mu_b * A_{mu d} * A^nu_c * A_{nu e} + # can = [4,6,8, 5,10,12, 0,7, 1,11, 2,9, 3,13, 15,14] + g = Permutation([8,11,5, 9,13,7, 1,10, 3,4, 2,12, 0,6, 14,15]) + base_f, gens_f = bsgs_direct_product(base1, gens1, base2a, gens2a) + base_A, gens_A = bsgs_direct_product(base1, gens1, base1, gens1) + t0 = (base_f, gens_f, 2, 0) + t1 = (base_A, gens_A, 4, 0) + can = canonicalize(g, [list(range(4)), list(range(4, 14))], [0, 0], t0, t1) + assert can == [4,6,8, 5,10,12, 0,7, 1,11, 2,9, 3,13, 15,14] + + +def test_riemann_invariants(): + baser, gensr = riemann_bsgs + # R^{d0 d1}_{d1 d0}; ord = [d0,-d0,d1,-d1]; g = [0,2,3,1,4,5] + # T_c = -R^{d0 d1}_{d0 d1}; can = [0,2,1,3,5,4] + g = Permutation([0,2,3,1,4,5]) + can = canonicalize(g, list(range(2, 4)), 0, (baser, gensr, 1, 0)) + assert can == [0,2,1,3,5,4] + # use a non minimal BSGS + can = canonicalize(g, list(range(2, 4)), 0, ([2, 0], [Permutation([1,0,2,3,5,4]), Permutation([2,3,0,1,4,5])], 1, 0)) + assert can == [0,2,1,3,5,4] + + """ + The following tests in test_riemann_invariants and in + test_riemann_invariants1 have been checked using xperm.c from XPerm in + in [1] and with an older version contained in [2] + + [1] xperm.c part of xPerm written by J. M. Martin-Garcia + http://www.xact.es/index.html + [2] test_xperm.cc in cadabra by Kasper Peeters, http://cadabra.phi-sci.com/ + """ + # R_d11^d1_d0^d5 * R^{d6 d4 d0}_d5 * R_{d7 d2 d8 d9} * + # R_{d10 d3 d6 d4} * R^{d2 d7 d11}_d1 * R^{d8 d9 d3 d10} + # ord: contravariant d_k ->2*k, covariant d_k -> 2*k+1 + # T_c = R^{d0 d1 d2 d3} * R_{d0 d1}^{d4 d5} * R_{d2 d3}^{d6 d7} * + # R_{d4 d5}^{d8 d9} * R_{d6 d7}^{d10 d11} * R_{d8 d9 d10 d11} + g = Permutation([23,2,1,10,12,8,0,11,15,5,17,19,21,7,13,9,4,14,22,3,16,18,6,20,24,25]) + can = canonicalize(g, list(range(24)), 0, (baser, gensr, 6, 0)) + assert can == [0,2,4,6,1,3,8,10,5,7,12,14,9,11,16,18,13,15,20,22,17,19,21,23,24,25] + + # use a non minimal BSGS + can = canonicalize(g, list(range(24)), 0, ([2, 0], [Permutation([1,0,2,3,5,4]), Permutation([2,3,0,1,4,5])], 6, 0)) + assert can == [0,2,4,6,1,3,8,10,5,7,12,14,9,11,16,18,13,15,20,22,17,19,21,23,24,25] + + g = Permutation([0,2,5,7,4,6,9,11,8,10,13,15,12,14,17,19,16,18,21,23,20,22,25,27,24,26,29,31,28,30,33,35,32,34,37,39,36,38,1,3,40,41]) + can = canonicalize(g, list(range(40)), 0, (baser, gensr, 10, 0)) + assert can == [0,2,4,6,1,3,8,10,5,7,12,14,9,11,16,18,13,15,20,22,17,19,24,26,21,23,28,30,25,27,32,34,29,31,36,38,33,35,37,39,40,41] + + +@XFAIL +def test_riemann_invariants1(): + skip('takes too much time') + baser, gensr = riemann_bsgs + g = Permutation([17, 44, 11, 3, 0, 19, 23, 15, 38, 4, 25, 27, 43, 36, 22, 14, 8, 30, 41, 20, 2, 10, 12, 28, 18, 1, 29, 13, 37, 42, 33, 7, 9, 31, 24, 26, 39, 5, 34, 47, 32, 6, 21, 40, 35, 46, 45, 16, 48, 49]) + can = canonicalize(g, list(range(48)), 0, (baser, gensr, 12, 0)) + assert can == [0, 2, 4, 6, 1, 3, 8, 10, 5, 7, 12, 14, 9, 11, 16, 18, 13, 15, 20, 22, 17, 19, 24, 26, 21, 23, 28, 30, 25, 27, 32, 34, 29, 31, 36, 38, 33, 35, 40, 42, 37, 39, 44, 46, 41, 43, 45, 47, 48, 49] + + g = Permutation([0,2,4,6, 7,8,10,12, 14,16,18,20, 19,22,24,26, 5,21,28,30, 32,34,36,38, 40,42,44,46, 13,48,50,52, 15,49,54,56, 17,33,41,58, 9,23,60,62, 29,35,63,64, 3,45,66,68, 25,37,47,57, 11,31,69,70, 27,39,53,72, 1,59,73,74, 55,61,67,76, 43,65,75,78, 51,71,77,79, 80,81]) + can = canonicalize(g, list(range(80)), 0, (baser, gensr, 20, 0)) + assert can == [0,2,4,6, 1,8,10,12, 3,14,16,18, 5,20,22,24, 7,26,28,30, 9,15,32,34, 11,36,23,38, 13,40,42,44, 17,39,29,46, 19,48,43,50, 21,45,52,54, 25,56,33,58, 27,60,53,62, 31,51,64,66, 35,65,47,68, 37,70,49,72, 41,74,57,76, 55,67,59,78, 61,69,71,75, 63,79,73,77, 80,81] + + +def test_riemann_products(): + baser, gensr = riemann_bsgs + base1, gens1 = get_symmetric_group_sgs(1) + base2, gens2 = get_symmetric_group_sgs(2) + base2a, gens2a = get_symmetric_group_sgs(2, 1) + + # R^{a b d0}_d0 = 0 + g = Permutation([0,1,2,3,4,5]) + can = canonicalize(g, list(range(2,4)), 0, (baser, gensr, 1, 0)) + assert can == 0 + + # R^{d0 b a}_d0 ; ord = [a,b,d0,-d0}; g = [2,1,0,3,4,5] + # T_c = -R^{a d0 b}_d0; can = [0,2,1,3,5,4] + g = Permutation([2,1,0,3,4,5]) + can = canonicalize(g, list(range(2, 4)), 0, (baser, gensr, 1, 0)) + assert can == [0,2,1,3,5,4] + + # R^d1_d2^b_d0 * R^{d0 a}_d1^d2; ord=[a,b,d0,-d0,d1,-d1,d2,-d2] + # g = [4,7,1,3,2,0,5,6,8,9] + # T_c = -R^{a d0 d1 d2}* R^b_{d0 d1 d2} + # can = [0,2,4,6,1,3,5,7,9,8] + g = Permutation([4,7,1,3,2,0,5,6,8,9]) + can = canonicalize(g, list(range(2,8)), 0, (baser, gensr, 2, 0)) + assert can == [0,2,4,6,1,3,5,7,9,8] + can1 = canonicalize_naive(g, list(range(2,8)), 0, (baser, gensr, 2, 0)) + assert can == can1 + + # A symmetric commuting + # R^{d6 d5}_d2^d1 * R^{d4 d0 d2 d3} * A_{d6 d0} A_{d3 d1} * A_{d4 d5} + # g = [12,10,5,2, 8,0,4,6, 13,1, 7,3, 9,11,14,15] + # T_c = -R^{d0 d1 d2 d3} * R_d0^{d4 d5 d6} * A_{d1 d4}*A_{d2 d5}*A_{d3 d6} + + g = Permutation([12,10,5,2,8,0,4,6,13,1,7,3,9,11,14,15]) + can = canonicalize(g, list(range(14)), 0, ((baser,gensr,2,0)), (base2,gens2,3,0)) + assert can == [0, 2, 4, 6, 1, 8, 10, 12, 3, 9, 5, 11, 7, 13, 15, 14] + + # R^{d2 a0 a2 d0} * R^d1_d2^{a1 a3} * R^{a4 a5}_{d0 d1} + # ord = [a0,a1,a2,a3,a4,a5,d0,-d0,d1,-d1,d2,-d2] + # 0 1 2 3 4 5 6 7 8 9 10 11 + # can = [0, 6, 2, 8, 1, 3, 7, 10, 4, 5, 9, 11, 12, 13] + # T_c = R^{a0 d0 a2 d1}*R^{a1 a3}_d0^d2*R^{a4 a5}_{d1 d2} + g = Permutation([10,0,2,6,8,11,1,3,4,5,7,9,12,13]) + can = canonicalize(g, list(range(6,12)), 0, (baser, gensr, 3, 0)) + assert can == [0, 6, 2, 8, 1, 3, 7, 10, 4, 5, 9, 11, 12, 13] + #can1 = canonicalize_naive(g, list(range(6,12)), 0, (baser, gensr, 3, 0)) + #assert can == can1 + + # A^n_{i, j} antisymmetric in i,j + # A_m0^d0_a1 * A_m1^a0_d0; ord = [m0,m1,a0,a1,d0,-d0] + # g = [0,4,3,1,2,5,6,7] + # T_c = -A_{m a1}^d0 * A_m1^a0_d0 + # can = [0,3,4,1,2,5,7,6] + base, gens = bsgs_direct_product(base1, gens1, base2a, gens2a) + dummies = list(range(4, 6)) + g = Permutation([0,4,3,1,2,5,6,7]) + can = canonicalize(g, dummies, 0, (base, gens, 2, 0)) + assert can == [0, 3, 4, 1, 2, 5, 7, 6] + + + # A^n_{i, j} symmetric in i,j + # A^m0_a0^d2 * A^n0_d2^d1 * A^n1_d1^d0 * A_{m0 d0}^a1 + # ordering: first the free indices; then first n, then d + # ord=[n0,n1,a0,a1, m0,-m0,d0,-d0,d1,-d1,d2,-d2] + # 0 1 2 3 4 5 6 7 8 9 10 11] + # g = [4,2,10, 0,11,8, 1,9,6, 5,7,3, 12,13] + # if the dummy indices m_i and d_i were separated, + # one gets + # T_c = A^{n0 d0 d1} * A^n1_d0^d2 * A^m0^a0_d1 * A_m0^a1_d2 + # can = [0, 6, 8, 1, 7, 10, 4, 2, 9, 5, 3, 11, 12, 13] + # If they are not, so can is + # T_c = A^{n0 m0 d0} A^n1_m0^d1 A^{d2 a0}_d0 A_d2^a1_d1 + # can = [0, 4, 6, 1, 5, 8, 10, 2, 7, 11, 3, 9, 12, 13] + # case with single type of indices + + base, gens = bsgs_direct_product(base1, gens1, base2, gens2) + dummies = list(range(4, 12)) + g = Permutation([4,2,10, 0,11,8, 1,9,6, 5,7,3, 12,13]) + can = canonicalize(g, dummies, 0, (base, gens, 4, 0)) + assert can == [0, 4, 6, 1, 5, 8, 10, 2, 7, 11, 3, 9, 12, 13] + # case with separated indices + dummies = [list(range(4, 6)), list(range(6,12))] + sym = [0, 0] + can = canonicalize(g, dummies, sym, (base, gens, 4, 0)) + assert can == [0, 6, 8, 1, 7, 10, 4, 2, 9, 5, 3, 11, 12, 13] + # case with separated indices with the second type of index + # with antisymmetric metric: there is a sign change + sym = [0, 1] + can = canonicalize(g, dummies, sym, (base, gens, 4, 0)) + assert can == [0, 6, 8, 1, 7, 10, 4, 2, 9, 5, 3, 11, 13, 12] + +def test_graph_certificate(): + # test tensor invariants constructed from random regular graphs; + # checked graph isomorphism with networkx + import random + def randomize_graph(size, g): + p = list(range(size)) + random.shuffle(p) + g1a = {} + for k, v in g1.items(): + g1a[p[k]] = [p[i] for i in v] + return g1a + + g1 = {0: [2, 3, 7], 1: [4, 5, 7], 2: [0, 4, 6], 3: [0, 6, 7], 4: [1, 2, 5], 5: [1, 4, 6], 6: [2, 3, 5], 7: [0, 1, 3]} + g2 = {0: [2, 3, 7], 1: [2, 4, 5], 2: [0, 1, 5], 3: [0, 6, 7], 4: [1, 5, 6], 5: [1, 2, 4], 6: [3, 4, 7], 7: [0, 3, 6]} + + c1 = graph_certificate(g1) + c2 = graph_certificate(g2) + assert c1 != c2 + g1a = randomize_graph(8, g1) + c1a = graph_certificate(g1a) + assert c1 == c1a + + g1 = {0: [8, 1, 9, 7], 1: [0, 9, 3, 4], 2: [3, 4, 6, 7], 3: [1, 2, 5, 6], 4: [8, 1, 2, 5], 5: [9, 3, 4, 7], 6: [8, 2, 3, 7], 7: [0, 2, 5, 6], 8: [0, 9, 4, 6], 9: [8, 0, 5, 1]} + g2 = {0: [1, 2, 5, 6], 1: [0, 9, 5, 7], 2: [0, 4, 6, 7], 3: [8, 9, 6, 7], 4: [8, 2, 6, 7], 5: [0, 9, 8, 1], 6: [0, 2, 3, 4], 7: [1, 2, 3, 4], 8: [9, 3, 4, 5], 9: [8, 1, 3, 5]} + c1 = graph_certificate(g1) + c2 = graph_certificate(g2) + assert c1 != c2 + g1a = randomize_graph(10, g1) + c1a = graph_certificate(g1a) + assert c1 == c1a diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_testutil.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_testutil.py new file mode 100644 index 0000000000000000000000000000000000000000..736e7a4ff86967e41dca71cf12de6c387a82d26d --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_testutil.py @@ -0,0 +1,55 @@ +from sympy.combinatorics.named_groups import SymmetricGroup, AlternatingGroup,\ + CyclicGroup +from sympy.combinatorics.testutil import _verify_bsgs, _cmp_perm_lists,\ + _naive_list_centralizer, _verify_centralizer,\ + _verify_normal_closure +from sympy.combinatorics.permutations import Permutation +from sympy.combinatorics.perm_groups import PermutationGroup +from sympy.core.random import shuffle + + +def test_cmp_perm_lists(): + S = SymmetricGroup(4) + els = list(S.generate_dimino()) + other = els.copy() + shuffle(other) + assert _cmp_perm_lists(els, other) is True + + +def test_naive_list_centralizer(): + # verified by GAP + S = SymmetricGroup(3) + A = AlternatingGroup(3) + assert _naive_list_centralizer(S, S) == [Permutation([0, 1, 2])] + assert PermutationGroup(_naive_list_centralizer(S, A)).is_subgroup(A) + + +def test_verify_bsgs(): + S = SymmetricGroup(5) + S.schreier_sims() + base = S.base + strong_gens = S.strong_gens + assert _verify_bsgs(S, base, strong_gens) is True + assert _verify_bsgs(S, base[:-1], strong_gens) is False + assert _verify_bsgs(S, base, S.generators) is False + + +def test_verify_centralizer(): + # verified by GAP + S = SymmetricGroup(3) + A = AlternatingGroup(3) + triv = PermutationGroup([Permutation([0, 1, 2])]) + assert _verify_centralizer(S, S, centr=triv) + assert _verify_centralizer(S, A, centr=A) + + +def test_verify_normal_closure(): + # verified by GAP + S = SymmetricGroup(3) + A = AlternatingGroup(3) + assert _verify_normal_closure(S, A, closure=A) + S = SymmetricGroup(5) + A = AlternatingGroup(5) + C = CyclicGroup(5) + assert _verify_normal_closure(S, A, closure=A) + assert _verify_normal_closure(S, C, closure=A) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_util.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_util.py new file mode 100644 index 0000000000000000000000000000000000000000..bca183e81f354e398aee9ae809fe79b20c7f2468 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/tests/test_util.py @@ -0,0 +1,120 @@ +from sympy.combinatorics.named_groups import SymmetricGroup, DihedralGroup,\ + AlternatingGroup +from sympy.combinatorics.permutations import Permutation +from sympy.combinatorics.util import _check_cycles_alt_sym, _strip,\ + _distribute_gens_by_base, _strong_gens_from_distr,\ + _orbits_transversals_from_bsgs, _handle_precomputed_bsgs, _base_ordering,\ + _remove_gens +from sympy.combinatorics.testutil import _verify_bsgs + + +def test_check_cycles_alt_sym(): + perm1 = Permutation([[0, 1, 2, 3, 4, 5, 6], [7], [8], [9]]) + perm2 = Permutation([[0, 1, 2, 3, 4, 5], [6, 7, 8, 9]]) + perm3 = Permutation([[0, 1, 2, 3, 4], [5, 6, 7, 8, 9]]) + assert _check_cycles_alt_sym(perm1) is True + assert _check_cycles_alt_sym(perm2) is False + assert _check_cycles_alt_sym(perm3) is False + + +def test_strip(): + D = DihedralGroup(5) + D.schreier_sims() + member = Permutation([4, 0, 1, 2, 3]) + not_member1 = Permutation([0, 1, 4, 3, 2]) + not_member2 = Permutation([3, 1, 4, 2, 0]) + identity = Permutation([0, 1, 2, 3, 4]) + res1 = _strip(member, D.base, D.basic_orbits, D.basic_transversals) + res2 = _strip(not_member1, D.base, D.basic_orbits, D.basic_transversals) + res3 = _strip(not_member2, D.base, D.basic_orbits, D.basic_transversals) + assert res1[0] == identity + assert res1[1] == len(D.base) + 1 + assert res2[0] == not_member1 + assert res2[1] == len(D.base) + 1 + assert res3[0] != identity + assert res3[1] == 2 + + +def test_distribute_gens_by_base(): + base = [0, 1, 2] + gens = [Permutation([0, 1, 2, 3]), Permutation([0, 1, 3, 2]), + Permutation([0, 2, 3, 1]), Permutation([3, 2, 1, 0])] + assert _distribute_gens_by_base(base, gens) == [gens, + [Permutation([0, 1, 2, 3]), + Permutation([0, 1, 3, 2]), + Permutation([0, 2, 3, 1])], + [Permutation([0, 1, 2, 3]), + Permutation([0, 1, 3, 2])]] + + +def test_strong_gens_from_distr(): + strong_gens_distr = [[Permutation([0, 2, 1]), Permutation([1, 2, 0]), + Permutation([1, 0, 2])], [Permutation([0, 2, 1])]] + assert _strong_gens_from_distr(strong_gens_distr) == \ + [Permutation([0, 2, 1]), + Permutation([1, 2, 0]), + Permutation([1, 0, 2])] + + +def test_orbits_transversals_from_bsgs(): + S = SymmetricGroup(4) + S.schreier_sims() + base = S.base + strong_gens = S.strong_gens + strong_gens_distr = _distribute_gens_by_base(base, strong_gens) + result = _orbits_transversals_from_bsgs(base, strong_gens_distr) + orbits = result[0] + transversals = result[1] + base_len = len(base) + for i in range(base_len): + for el in orbits[i]: + assert transversals[i][el](base[i]) == el + for j in range(i): + assert transversals[i][el](base[j]) == base[j] + order = 1 + for i in range(base_len): + order *= len(orbits[i]) + assert S.order() == order + + +def test_handle_precomputed_bsgs(): + A = AlternatingGroup(5) + A.schreier_sims() + base = A.base + strong_gens = A.strong_gens + result = _handle_precomputed_bsgs(base, strong_gens) + strong_gens_distr = _distribute_gens_by_base(base, strong_gens) + assert strong_gens_distr == result[2] + transversals = result[0] + orbits = result[1] + base_len = len(base) + for i in range(base_len): + for el in orbits[i]: + assert transversals[i][el](base[i]) == el + for j in range(i): + assert transversals[i][el](base[j]) == base[j] + order = 1 + for i in range(base_len): + order *= len(orbits[i]) + assert A.order() == order + + +def test_base_ordering(): + base = [2, 4, 5] + degree = 7 + assert _base_ordering(base, degree) == [3, 4, 0, 5, 1, 2, 6] + + +def test_remove_gens(): + S = SymmetricGroup(10) + base, strong_gens = S.schreier_sims_incremental() + new_gens = _remove_gens(base, strong_gens) + assert _verify_bsgs(S, base, new_gens) is True + A = AlternatingGroup(7) + base, strong_gens = A.schreier_sims_incremental() + new_gens = _remove_gens(base, strong_gens) + assert _verify_bsgs(A, base, new_gens) is True + D = DihedralGroup(2) + base, strong_gens = D.schreier_sims_incremental() + new_gens = _remove_gens(base, strong_gens) + assert _verify_bsgs(D, base, new_gens) is True diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/testutil.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/testutil.py new file mode 100644 index 0000000000000000000000000000000000000000..9fe664ce9e7437b97feec90f2052eb2987c57a4e --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/testutil.py @@ -0,0 +1,357 @@ +from sympy.combinatorics import Permutation +from sympy.combinatorics.util import _distribute_gens_by_base + +rmul = Permutation.rmul + + +def _cmp_perm_lists(first, second): + """ + Compare two lists of permutations as sets. + + Explanation + =========== + + This is used for testing purposes. Since the array form of a + permutation is currently a list, Permutation is not hashable + and cannot be put into a set. + + Examples + ======== + + >>> from sympy.combinatorics.permutations import Permutation + >>> from sympy.combinatorics.testutil import _cmp_perm_lists + >>> a = Permutation([0, 2, 3, 4, 1]) + >>> b = Permutation([1, 2, 0, 4, 3]) + >>> c = Permutation([3, 4, 0, 1, 2]) + >>> ls1 = [a, b, c] + >>> ls2 = [b, c, a] + >>> _cmp_perm_lists(ls1, ls2) + True + + """ + return {tuple(a) for a in first} == \ + {tuple(a) for a in second} + + +def _naive_list_centralizer(self, other, af=False): + from sympy.combinatorics.perm_groups import PermutationGroup + """ + Return a list of elements for the centralizer of a subgroup/set/element. + + Explanation + =========== + + This is a brute force implementation that goes over all elements of the + group and checks for membership in the centralizer. It is used to + test ``.centralizer()`` from ``sympy.combinatorics.perm_groups``. + + Examples + ======== + + >>> from sympy.combinatorics.testutil import _naive_list_centralizer + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> D = DihedralGroup(4) + >>> _naive_list_centralizer(D, D) + [Permutation([0, 1, 2, 3]), Permutation([2, 3, 0, 1])] + + See Also + ======== + + sympy.combinatorics.perm_groups.centralizer + + """ + from sympy.combinatorics.permutations import _af_commutes_with + if hasattr(other, 'generators'): + elements = list(self.generate_dimino(af=True)) + gens = [x._array_form for x in other.generators] + commutes_with_gens = lambda x: all(_af_commutes_with(x, gen) for gen in gens) + centralizer_list = [] + if not af: + for element in elements: + if commutes_with_gens(element): + centralizer_list.append(Permutation._af_new(element)) + else: + for element in elements: + if commutes_with_gens(element): + centralizer_list.append(element) + return centralizer_list + elif hasattr(other, 'getitem'): + return _naive_list_centralizer(self, PermutationGroup(other), af) + elif hasattr(other, 'array_form'): + return _naive_list_centralizer(self, PermutationGroup([other]), af) + + +def _verify_bsgs(group, base, gens): + """ + Verify the correctness of a base and strong generating set. + + Explanation + =========== + + This is a naive implementation using the definition of a base and a strong + generating set relative to it. There are other procedures for + verifying a base and strong generating set, but this one will + serve for more robust testing. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import AlternatingGroup + >>> from sympy.combinatorics.testutil import _verify_bsgs + >>> A = AlternatingGroup(4) + >>> A.schreier_sims() + >>> _verify_bsgs(A, A.base, A.strong_gens) + True + + See Also + ======== + + sympy.combinatorics.perm_groups.PermutationGroup.schreier_sims + + """ + from sympy.combinatorics.perm_groups import PermutationGroup + strong_gens_distr = _distribute_gens_by_base(base, gens) + current_stabilizer = group + for i in range(len(base)): + candidate = PermutationGroup(strong_gens_distr[i]) + if current_stabilizer.order() != candidate.order(): + return False + current_stabilizer = current_stabilizer.stabilizer(base[i]) + if current_stabilizer.order() != 1: + return False + return True + + +def _verify_centralizer(group, arg, centr=None): + """ + Verify the centralizer of a group/set/element inside another group. + + This is used for testing ``.centralizer()`` from + ``sympy.combinatorics.perm_groups`` + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import (SymmetricGroup, + ... AlternatingGroup) + >>> from sympy.combinatorics.perm_groups import PermutationGroup + >>> from sympy.combinatorics.permutations import Permutation + >>> from sympy.combinatorics.testutil import _verify_centralizer + >>> S = SymmetricGroup(5) + >>> A = AlternatingGroup(5) + >>> centr = PermutationGroup([Permutation([0, 1, 2, 3, 4])]) + >>> _verify_centralizer(S, A, centr) + True + + See Also + ======== + + _naive_list_centralizer, + sympy.combinatorics.perm_groups.PermutationGroup.centralizer, + _cmp_perm_lists + + """ + if centr is None: + centr = group.centralizer(arg) + centr_list = list(centr.generate_dimino(af=True)) + centr_list_naive = _naive_list_centralizer(group, arg, af=True) + return _cmp_perm_lists(centr_list, centr_list_naive) + + +def _verify_normal_closure(group, arg, closure=None): + from sympy.combinatorics.perm_groups import PermutationGroup + """ + Verify the normal closure of a subgroup/subset/element in a group. + + This is used to test + sympy.combinatorics.perm_groups.PermutationGroup.normal_closure + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import (SymmetricGroup, + ... AlternatingGroup) + >>> from sympy.combinatorics.testutil import _verify_normal_closure + >>> S = SymmetricGroup(3) + >>> A = AlternatingGroup(3) + >>> _verify_normal_closure(S, A, closure=A) + True + + See Also + ======== + + sympy.combinatorics.perm_groups.PermutationGroup.normal_closure + + """ + if closure is None: + closure = group.normal_closure(arg) + conjugates = set() + if hasattr(arg, 'generators'): + subgr_gens = arg.generators + elif hasattr(arg, '__getitem__'): + subgr_gens = arg + elif hasattr(arg, 'array_form'): + subgr_gens = [arg] + for el in group.generate_dimino(): + conjugates.update(gen ^ el for gen in subgr_gens) + naive_closure = PermutationGroup(list(conjugates)) + return closure.is_subgroup(naive_closure) + + +def canonicalize_naive(g, dummies, sym, *v): + """ + Canonicalize tensor formed by tensors of the different types. + + Explanation + =========== + + sym_i symmetry under exchange of two component tensors of type `i` + None no symmetry + 0 commuting + 1 anticommuting + + Parameters + ========== + + g : Permutation representing the tensor. + dummies : List of dummy indices. + msym : Symmetry of the metric. + v : A list of (base_i, gens_i, n_i, sym_i) for tensors of type `i`. + base_i, gens_i BSGS for tensors of this type + n_i number of tensors of type `i` + + Returns + ======= + + Returns 0 if the tensor is zero, else returns the array form of + the permutation representing the canonical form of the tensor. + + Examples + ======== + + >>> from sympy.combinatorics.testutil import canonicalize_naive + >>> from sympy.combinatorics.tensor_can import get_symmetric_group_sgs + >>> from sympy.combinatorics import Permutation + >>> g = Permutation([1, 3, 2, 0, 4, 5]) + >>> base2, gens2 = get_symmetric_group_sgs(2) + >>> canonicalize_naive(g, [2, 3], 0, (base2, gens2, 2, 0)) + [0, 2, 1, 3, 4, 5] + """ + from sympy.combinatorics.perm_groups import PermutationGroup + from sympy.combinatorics.tensor_can import gens_products, dummy_sgs + from sympy.combinatorics.permutations import _af_rmul + v1 = [] + for i in range(len(v)): + base_i, gens_i, n_i, sym_i = v[i] + v1.append((base_i, gens_i, [[]]*n_i, sym_i)) + size, sbase, sgens = gens_products(*v1) + dgens = dummy_sgs(dummies, sym, size-2) + if isinstance(sym, int): + num_types = 1 + dummies = [dummies] + sym = [sym] + else: + num_types = len(sym) + dgens = [] + for i in range(num_types): + dgens.extend(dummy_sgs(dummies[i], sym[i], size - 2)) + S = PermutationGroup(sgens) + D = PermutationGroup([Permutation(x) for x in dgens]) + dlist = list(D.generate(af=True)) + g = g.array_form + st = set() + for s in S.generate(af=True): + h = _af_rmul(g, s) + for d in dlist: + q = tuple(_af_rmul(d, h)) + st.add(q) + a = list(st) + a.sort() + prev = (0,)*size + for h in a: + if h[:-2] == prev[:-2]: + if h[-1] != prev[-1]: + return 0 + prev = h + return list(a[0]) + + +def graph_certificate(gr): + """ + Return a certificate for the graph + + Parameters + ========== + + gr : adjacency list + + Explanation + =========== + + The graph is assumed to be unoriented and without + external lines. + + Associate to each vertex of the graph a symmetric tensor with + number of indices equal to the degree of the vertex; indices + are contracted when they correspond to the same line of the graph. + The canonical form of the tensor gives a certificate for the graph. + + This is not an efficient algorithm to get the certificate of a graph. + + Examples + ======== + + >>> from sympy.combinatorics.testutil import graph_certificate + >>> gr1 = {0:[1, 2, 3, 5], 1:[0, 2, 4], 2:[0, 1, 3, 4], 3:[0, 2, 4], 4:[1, 2, 3, 5], 5:[0, 4]} + >>> gr2 = {0:[1, 5], 1:[0, 2, 3, 4], 2:[1, 3, 5], 3:[1, 2, 4, 5], 4:[1, 3, 5], 5:[0, 2, 3, 4]} + >>> c1 = graph_certificate(gr1) + >>> c2 = graph_certificate(gr2) + >>> c1 + [0, 2, 4, 6, 1, 8, 10, 12, 3, 14, 16, 18, 5, 9, 15, 7, 11, 17, 13, 19, 20, 21] + >>> c1 == c2 + True + """ + from sympy.combinatorics.permutations import _af_invert + from sympy.combinatorics.tensor_can import get_symmetric_group_sgs, canonicalize + items = list(gr.items()) + items.sort(key=lambda x: len(x[1]), reverse=True) + pvert = [x[0] for x in items] + pvert = _af_invert(pvert) + + # the indices of the tensor are twice the number of lines of the graph + num_indices = 0 + for v, neigh in items: + num_indices += len(neigh) + # associate to each vertex its indices; for each line + # between two vertices assign the + # even index to the vertex which comes first in items, + # the odd index to the other vertex + vertices = [[] for i in items] + i = 0 + for v, neigh in items: + for v2 in neigh: + if pvert[v] < pvert[v2]: + vertices[pvert[v]].append(i) + vertices[pvert[v2]].append(i+1) + i += 2 + g = [] + for v in vertices: + g.extend(v) + assert len(g) == num_indices + g += [num_indices, num_indices + 1] + size = num_indices + 2 + assert sorted(g) == list(range(size)) + g = Permutation(g) + vlen = [0]*(len(vertices[0])+1) + for neigh in vertices: + vlen[len(neigh)] += 1 + v = [] + for i in range(len(vlen)): + n = vlen[i] + if n: + base, gens = get_symmetric_group_sgs(i) + v.append((base, gens, n, 0)) + v.reverse() + dummies = list(range(num_indices)) + can = canonicalize(g, dummies, 0, *v) + return can diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/util.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/util.py new file mode 100644 index 0000000000000000000000000000000000000000..fc73b02f94f4aae6f1b98bb3f0c837fd5a1d1e6d --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/combinatorics/util.py @@ -0,0 +1,532 @@ +from sympy.combinatorics.permutations import Permutation, _af_invert, _af_rmul +from sympy.ntheory import isprime + +rmul = Permutation.rmul +_af_new = Permutation._af_new + +############################################ +# +# Utilities for computational group theory +# +############################################ + + +def _base_ordering(base, degree): + r""" + Order `\{0, 1, \dots, n-1\}` so that base points come first and in order. + + Parameters + ========== + + base : the base + degree : the degree of the associated permutation group + + Returns + ======= + + A list ``base_ordering`` such that ``base_ordering[point]`` is the + number of ``point`` in the ordering. + + Examples + ======== + + >>> from sympy.combinatorics import SymmetricGroup + >>> from sympy.combinatorics.util import _base_ordering + >>> S = SymmetricGroup(4) + >>> S.schreier_sims() + >>> _base_ordering(S.base, S.degree) + [0, 1, 2, 3] + + Notes + ===== + + This is used in backtrack searches, when we define a relation `\ll` on + the underlying set for a permutation group of degree `n`, + `\{0, 1, \dots, n-1\}`, so that if `(b_1, b_2, \dots, b_k)` is a base we + have `b_i \ll b_j` whenever `i>> from sympy.combinatorics.util import _check_cycles_alt_sym + >>> from sympy.combinatorics import Permutation + >>> a = Permutation([[0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10], [11, 12]]) + >>> _check_cycles_alt_sym(a) + False + >>> b = Permutation([[0, 1, 2, 3, 4, 5, 6], [7, 8, 9, 10]]) + >>> _check_cycles_alt_sym(b) + True + + See Also + ======== + + sympy.combinatorics.perm_groups.PermutationGroup.is_alt_sym + + """ + n = perm.size + af = perm.array_form + current_len = 0 + total_len = 0 + used = set() + for i in range(n//2): + if i not in used and i < n//2 - total_len: + current_len = 1 + used.add(i) + j = i + while af[j] != i: + current_len += 1 + j = af[j] + used.add(j) + total_len += current_len + if current_len > n//2 and current_len < n - 2 and isprime(current_len): + return True + return False + + +def _distribute_gens_by_base(base, gens): + r""" + Distribute the group elements ``gens`` by membership in basic stabilizers. + + Explanation + =========== + + Notice that for a base `(b_1, b_2, \dots, b_k)`, the basic stabilizers + are defined as `G^{(i)} = G_{b_1, \dots, b_{i-1}}` for + `i \in\{1, 2, \dots, k\}`. + + Parameters + ========== + + base : a sequence of points in `\{0, 1, \dots, n-1\}` + gens : a list of elements of a permutation group of degree `n`. + + Returns + ======= + list + List of length `k`, where `k` is the length of *base*. The `i`-th entry + contains those elements in *gens* which fix the first `i` elements of + *base* (so that the `0`-th entry is equal to *gens* itself). If no + element fixes the first `i` elements of *base*, the `i`-th element is + set to a list containing the identity element. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> from sympy.combinatorics.util import _distribute_gens_by_base + >>> D = DihedralGroup(3) + >>> D.schreier_sims() + >>> D.strong_gens + [(0 1 2), (0 2), (1 2)] + >>> D.base + [0, 1] + >>> _distribute_gens_by_base(D.base, D.strong_gens) + [[(0 1 2), (0 2), (1 2)], + [(1 2)]] + + See Also + ======== + + _strong_gens_from_distr, _orbits_transversals_from_bsgs, + _handle_precomputed_bsgs + + """ + base_len = len(base) + degree = gens[0].size + stabs = [[] for _ in range(base_len)] + max_stab_index = 0 + for gen in gens: + j = 0 + while j < base_len - 1 and gen._array_form[base[j]] == base[j]: + j += 1 + if j > max_stab_index: + max_stab_index = j + for k in range(j + 1): + stabs[k].append(gen) + for i in range(max_stab_index + 1, base_len): + stabs[i].append(_af_new(list(range(degree)))) + return stabs + + +def _handle_precomputed_bsgs(base, strong_gens, transversals=None, + basic_orbits=None, strong_gens_distr=None): + """ + Calculate BSGS-related structures from those present. + + Explanation + =========== + + The base and strong generating set must be provided; if any of the + transversals, basic orbits or distributed strong generators are not + provided, they will be calculated from the base and strong generating set. + + Parameters + ========== + + base : the base + strong_gens : the strong generators + transversals : basic transversals + basic_orbits : basic orbits + strong_gens_distr : strong generators distributed by membership in basic stabilizers + + Returns + ======= + + (transversals, basic_orbits, strong_gens_distr) + where *transversals* are the basic transversals, *basic_orbits* are the + basic orbits, and *strong_gens_distr* are the strong generators distributed + by membership in basic stabilizers. + + Examples + ======== + + >>> from sympy.combinatorics.named_groups import DihedralGroup + >>> from sympy.combinatorics.util import _handle_precomputed_bsgs + >>> D = DihedralGroup(3) + >>> D.schreier_sims() + >>> _handle_precomputed_bsgs(D.base, D.strong_gens, + ... basic_orbits=D.basic_orbits) + ([{0: (2), 1: (0 1 2), 2: (0 2)}, {1: (2), 2: (1 2)}], [[0, 1, 2], [1, 2]], [[(0 1 2), (0 2), (1 2)], [(1 2)]]) + + See Also + ======== + + _orbits_transversals_from_bsgs, _distribute_gens_by_base + + """ + if strong_gens_distr is None: + strong_gens_distr = _distribute_gens_by_base(base, strong_gens) + if transversals is None: + if basic_orbits is None: + basic_orbits, transversals = \ + _orbits_transversals_from_bsgs(base, strong_gens_distr) + else: + transversals = \ + _orbits_transversals_from_bsgs(base, strong_gens_distr, + transversals_only=True) + else: + if basic_orbits is None: + base_len = len(base) + basic_orbits = [None]*base_len + for i in range(base_len): + basic_orbits[i] = list(transversals[i].keys()) + return transversals, basic_orbits, strong_gens_distr + + +def _orbits_transversals_from_bsgs(base, strong_gens_distr, + transversals_only=False, slp=False): + """ + Compute basic orbits and transversals from a base and strong generating set. + + Explanation + =========== + + The generators are provided as distributed across the basic stabilizers. + If the optional argument ``transversals_only`` is set to True, only the + transversals are returned. + + Parameters + ========== + + base : The base. + strong_gens_distr : Strong generators distributed by membership in basic stabilizers. + transversals_only : bool, default: False + A flag switching between returning only the + transversals and both orbits and transversals. + slp : bool, default: False + If ``True``, return a list of dictionaries containing the + generator presentations of the elements of the transversals, + i.e. the list of indices of generators from ``strong_gens_distr[i]`` + such that their product is the relevant transversal element. + + Examples + ======== + + >>> from sympy.combinatorics import SymmetricGroup + >>> from sympy.combinatorics.util import _distribute_gens_by_base + >>> S = SymmetricGroup(3) + >>> S.schreier_sims() + >>> strong_gens_distr = _distribute_gens_by_base(S.base, S.strong_gens) + >>> (S.base, strong_gens_distr) + ([0, 1], [[(0 1 2), (2)(0 1), (1 2)], [(1 2)]]) + + See Also + ======== + + _distribute_gens_by_base, _handle_precomputed_bsgs + + """ + from sympy.combinatorics.perm_groups import _orbit_transversal + base_len = len(base) + degree = strong_gens_distr[0][0].size + transversals = [None]*base_len + slps = [None]*base_len + if transversals_only is False: + basic_orbits = [None]*base_len + for i in range(base_len): + transversals[i], slps[i] = _orbit_transversal(degree, strong_gens_distr[i], + base[i], pairs=True, slp=True) + transversals[i] = dict(transversals[i]) + if transversals_only is False: + basic_orbits[i] = list(transversals[i].keys()) + if transversals_only: + return transversals + else: + if not slp: + return basic_orbits, transversals + return basic_orbits, transversals, slps + + +def _remove_gens(base, strong_gens, basic_orbits=None, strong_gens_distr=None): + """ + Remove redundant generators from a strong generating set. + + Parameters + ========== + + base : a base + strong_gens : a strong generating set relative to *base* + basic_orbits : basic orbits + strong_gens_distr : strong generators distributed by membership in basic stabilizers + + Returns + ======= + + A strong generating set with respect to ``base`` which is a subset of + ``strong_gens``. + + Examples + ======== + + >>> from sympy.combinatorics import SymmetricGroup + >>> from sympy.combinatorics.util import _remove_gens + >>> from sympy.combinatorics.testutil import _verify_bsgs + >>> S = SymmetricGroup(15) + >>> base, strong_gens = S.schreier_sims_incremental() + >>> new_gens = _remove_gens(base, strong_gens) + >>> len(new_gens) + 14 + >>> _verify_bsgs(S, base, new_gens) + True + + Notes + ===== + + This procedure is outlined in [1],p.95. + + References + ========== + + .. [1] Holt, D., Eick, B., O'Brien, E. + "Handbook of computational group theory" + + """ + from sympy.combinatorics.perm_groups import _orbit + base_len = len(base) + degree = strong_gens[0].size + if strong_gens_distr is None: + strong_gens_distr = _distribute_gens_by_base(base, strong_gens) + if basic_orbits is None: + basic_orbits = [] + for i in range(base_len): + basic_orbit = _orbit(degree, strong_gens_distr[i], base[i]) + basic_orbits.append(basic_orbit) + strong_gens_distr.append([]) + res = strong_gens[:] + for i in range(base_len - 1, -1, -1): + gens_copy = strong_gens_distr[i][:] + for gen in strong_gens_distr[i]: + if gen not in strong_gens_distr[i + 1]: + temp_gens = gens_copy[:] + temp_gens.remove(gen) + if temp_gens == []: + continue + temp_orbit = _orbit(degree, temp_gens, base[i]) + if temp_orbit == basic_orbits[i]: + gens_copy.remove(gen) + res.remove(gen) + return res + + +def _strip(g, base, orbits, transversals): + """ + Attempt to decompose a permutation using a (possibly partial) BSGS + structure. + + Explanation + =========== + + This is done by treating the sequence ``base`` as an actual base, and + the orbits ``orbits`` and transversals ``transversals`` as basic orbits and + transversals relative to it. + + This process is called "sifting". A sift is unsuccessful when a certain + orbit element is not found or when after the sift the decomposition + does not end with the identity element. + + The argument ``transversals`` is a list of dictionaries that provides + transversal elements for the orbits ``orbits``. + + Parameters + ========== + + g : permutation to be decomposed + base : sequence of points + orbits : list + A list in which the ``i``-th entry is an orbit of ``base[i]`` + under some subgroup of the pointwise stabilizer of ` + `base[0], base[1], ..., base[i - 1]``. The groups themselves are implicit + in this function since the only information we need is encoded in the orbits + and transversals + transversals : list + A list of orbit transversals associated with the orbits *orbits*. + + Examples + ======== + + >>> from sympy.combinatorics import Permutation, SymmetricGroup + >>> from sympy.combinatorics.util import _strip + >>> S = SymmetricGroup(5) + >>> S.schreier_sims() + >>> g = Permutation([0, 2, 3, 1, 4]) + >>> _strip(g, S.base, S.basic_orbits, S.basic_transversals) + ((4), 5) + + Notes + ===== + + The algorithm is described in [1],pp.89-90. The reason for returning + both the current state of the element being decomposed and the level + at which the sifting ends is that they provide important information for + the randomized version of the Schreier-Sims algorithm. + + References + ========== + + .. [1] Holt, D., Eick, B., O'Brien, E."Handbook of computational group theory" + + See Also + ======== + + sympy.combinatorics.perm_groups.PermutationGroup.schreier_sims + sympy.combinatorics.perm_groups.PermutationGroup.schreier_sims_random + + """ + h = g._array_form + base_len = len(base) + for i in range(base_len): + beta = h[base[i]] + if beta == base[i]: + continue + if beta not in orbits[i]: + return _af_new(h), i + 1 + u = transversals[i][beta]._array_form + h = _af_rmul(_af_invert(u), h) + return _af_new(h), base_len + 1 + + +def _strip_af(h, base, orbits, transversals, j, slp=[], slps={}): + """ + optimized _strip, with h, transversals and result in array form + if the stripped elements is the identity, it returns False, base_len + 1 + + j h[base[i]] == base[i] for i <= j + + """ + base_len = len(base) + for i in range(j+1, base_len): + beta = h[base[i]] + if beta == base[i]: + continue + if beta not in orbits[i]: + if not slp: + return h, i + 1 + return h, i + 1, slp + u = transversals[i][beta] + if h == u: + if not slp: + return False, base_len + 1 + return False, base_len + 1, slp + h = _af_rmul(_af_invert(u), h) + if slp: + u_slp = slps[i][beta][:] + u_slp.reverse() + u_slp = [(i, (g,)) for g in u_slp] + slp = u_slp + slp + if not slp: + return h, base_len + 1 + return h, base_len + 1, slp + + +def _strong_gens_from_distr(strong_gens_distr): + """ + Retrieve strong generating set from generators of basic stabilizers. + + This is just the union of the generators of the first and second basic + stabilizers. + + Parameters + ========== + + strong_gens_distr : strong generators distributed by membership in basic stabilizers + + Examples + ======== + + >>> from sympy.combinatorics import SymmetricGroup + >>> from sympy.combinatorics.util import (_strong_gens_from_distr, + ... _distribute_gens_by_base) + >>> S = SymmetricGroup(3) + >>> S.schreier_sims() + >>> S.strong_gens + [(0 1 2), (2)(0 1), (1 2)] + >>> strong_gens_distr = _distribute_gens_by_base(S.base, S.strong_gens) + >>> _strong_gens_from_distr(strong_gens_distr) + [(0 1 2), (2)(0 1), (1 2)] + + See Also + ======== + + _distribute_gens_by_base + + """ + if len(strong_gens_distr) == 1: + return strong_gens_distr[0][:] + else: + result = strong_gens_distr[0] + for gen in strong_gens_distr[1]: + if gen not in result: + result.append(gen) + return result diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..7048bd548cca04780479539339dd8cc49a21990f --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/__init__.py @@ -0,0 +1,8 @@ +from .products import product, Product +from .summations import summation, Sum + +__all__ = [ + 'product', 'Product', + + 'summation', 'Sum', +] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/delta.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/delta.py new file mode 100644 index 0000000000000000000000000000000000000000..0471d2b2891a66a1b97b7a3a37bbd31d7b173a81 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/delta.py @@ -0,0 +1,327 @@ +""" +This module implements sums and products containing the Kronecker Delta function. + +References +========== + +.. [1] https://mathworld.wolfram.com/KroneckerDelta.html + +""" +from .products import product +from .summations import Sum, summation +from sympy.core import Add, Mul, S, Dummy +from sympy.core.cache import cacheit +from sympy.core.sorting import default_sort_key +from sympy.functions import KroneckerDelta, Piecewise, piecewise_fold +from sympy.polys.polytools import factor +from sympy.sets.sets import Interval +from sympy.solvers.solvers import solve + + +@cacheit +def _expand_delta(expr, index): + """ + Expand the first Add containing a simple KroneckerDelta. + """ + if not expr.is_Mul: + return expr + delta = None + func = Add + terms = [S.One] + for h in expr.args: + if delta is None and h.is_Add and _has_simple_delta(h, index): + delta = True + func = h.func + terms = [terms[0]*t for t in h.args] + else: + terms = [t*h for t in terms] + return func(*terms) + + +@cacheit +def _extract_delta(expr, index): + """ + Extract a simple KroneckerDelta from the expression. + + Explanation + =========== + + Returns the tuple ``(delta, newexpr)`` where: + + - ``delta`` is a simple KroneckerDelta expression if one was found, + or ``None`` if no simple KroneckerDelta expression was found. + + - ``newexpr`` is a Mul containing the remaining terms; ``expr`` is + returned unchanged if no simple KroneckerDelta expression was found. + + Examples + ======== + + >>> from sympy import KroneckerDelta + >>> from sympy.concrete.delta import _extract_delta + >>> from sympy.abc import x, y, i, j, k + >>> _extract_delta(4*x*y*KroneckerDelta(i, j), i) + (KroneckerDelta(i, j), 4*x*y) + >>> _extract_delta(4*x*y*KroneckerDelta(i, j), k) + (None, 4*x*y*KroneckerDelta(i, j)) + + See Also + ======== + + sympy.functions.special.tensor_functions.KroneckerDelta + deltaproduct + deltasummation + """ + if not _has_simple_delta(expr, index): + return (None, expr) + if isinstance(expr, KroneckerDelta): + return (expr, S.One) + if not expr.is_Mul: + raise ValueError("Incorrect expr") + delta = None + terms = [] + + for arg in expr.args: + if delta is None and _is_simple_delta(arg, index): + delta = arg + else: + terms.append(arg) + return (delta, expr.func(*terms)) + + +@cacheit +def _has_simple_delta(expr, index): + """ + Returns True if ``expr`` is an expression that contains a KroneckerDelta + that is simple in the index ``index``, meaning that this KroneckerDelta + is nonzero for a single value of the index ``index``. + """ + if expr.has(KroneckerDelta): + if _is_simple_delta(expr, index): + return True + if expr.is_Add or expr.is_Mul: + return any(_has_simple_delta(arg, index) for arg in expr.args) + return False + + +@cacheit +def _is_simple_delta(delta, index): + """ + Returns True if ``delta`` is a KroneckerDelta and is nonzero for a single + value of the index ``index``. + """ + if isinstance(delta, KroneckerDelta) and delta.has(index): + p = (delta.args[0] - delta.args[1]).as_poly(index) + if p: + return p.degree() == 1 + return False + + +@cacheit +def _remove_multiple_delta(expr): + """ + Evaluate products of KroneckerDelta's. + """ + if expr.is_Add: + return expr.func(*list(map(_remove_multiple_delta, expr.args))) + if not expr.is_Mul: + return expr + eqs = [] + newargs = [] + for arg in expr.args: + if isinstance(arg, KroneckerDelta): + eqs.append(arg.args[0] - arg.args[1]) + else: + newargs.append(arg) + if not eqs: + return expr + solns = solve(eqs, dict=True) + if len(solns) == 0: + return S.Zero + elif len(solns) == 1: + newargs += [KroneckerDelta(k, v) for k, v in solns[0].items()] + expr2 = expr.func(*newargs) + if expr != expr2: + return _remove_multiple_delta(expr2) + return expr + + +@cacheit +def _simplify_delta(expr): + """ + Rewrite a KroneckerDelta's indices in its simplest form. + """ + if isinstance(expr, KroneckerDelta): + try: + slns = solve(expr.args[0] - expr.args[1], dict=True) + if slns and len(slns) == 1: + return Mul(*[KroneckerDelta(*(key, value)) + for key, value in slns[0].items()]) + except NotImplementedError: + pass + return expr + + +@cacheit +def deltaproduct(f, limit): + """ + Handle products containing a KroneckerDelta. + + See Also + ======== + + deltasummation + sympy.functions.special.tensor_functions.KroneckerDelta + sympy.concrete.products.product + """ + if ((limit[2] - limit[1]) < 0) == True: + return S.One + + if not f.has(KroneckerDelta): + return product(f, limit) + + if f.is_Add: + # Identify the term in the Add that has a simple KroneckerDelta + delta = None + terms = [] + for arg in sorted(f.args, key=default_sort_key): + if delta is None and _has_simple_delta(arg, limit[0]): + delta = arg + else: + terms.append(arg) + newexpr = f.func(*terms) + k = Dummy("kprime", integer=True) + if isinstance(limit[1], int) and isinstance(limit[2], int): + result = deltaproduct(newexpr, limit) + sum(deltaproduct(newexpr, (limit[0], limit[1], ik - 1)) * + delta.subs(limit[0], ik) * + deltaproduct(newexpr, (limit[0], ik + 1, limit[2])) for ik in range(int(limit[1]), int(limit[2] + 1)) + ) + else: + result = deltaproduct(newexpr, limit) + deltasummation( + deltaproduct(newexpr, (limit[0], limit[1], k - 1)) * + delta.subs(limit[0], k) * + deltaproduct(newexpr, (limit[0], k + 1, limit[2])), + (k, limit[1], limit[2]), + no_piecewise=_has_simple_delta(newexpr, limit[0]) + ) + return _remove_multiple_delta(result) + + delta, _ = _extract_delta(f, limit[0]) + + if not delta: + g = _expand_delta(f, limit[0]) + if f != g: + try: + return factor(deltaproduct(g, limit)) + except AssertionError: + return deltaproduct(g, limit) + return product(f, limit) + + return _remove_multiple_delta(f.subs(limit[0], limit[1])*KroneckerDelta(limit[2], limit[1])) + \ + S.One*_simplify_delta(KroneckerDelta(limit[2], limit[1] - 1)) + + +@cacheit +def deltasummation(f, limit, no_piecewise=False): + """ + Handle summations containing a KroneckerDelta. + + Explanation + =========== + + The idea for summation is the following: + + - If we are dealing with a KroneckerDelta expression, i.e. KroneckerDelta(g(x), j), + we try to simplify it. + + If we could simplify it, then we sum the resulting expression. + We already know we can sum a simplified expression, because only + simple KroneckerDelta expressions are involved. + + If we could not simplify it, there are two cases: + + 1) The expression is a simple expression: we return the summation, + taking care if we are dealing with a Derivative or with a proper + KroneckerDelta. + + 2) The expression is not simple (i.e. KroneckerDelta(cos(x))): we can do + nothing at all. + + - If the expr is a multiplication expr having a KroneckerDelta term: + + First we expand it. + + If the expansion did work, then we try to sum the expansion. + + If not, we try to extract a simple KroneckerDelta term, then we have two + cases: + + 1) We have a simple KroneckerDelta term, so we return the summation. + + 2) We did not have a simple term, but we do have an expression with + simplified KroneckerDelta terms, so we sum this expression. + + Examples + ======== + + >>> from sympy import oo, symbols + >>> from sympy.abc import k + >>> i, j = symbols('i, j', integer=True, finite=True) + >>> from sympy.concrete.delta import deltasummation + >>> from sympy import KroneckerDelta + >>> deltasummation(KroneckerDelta(i, k), (k, -oo, oo)) + 1 + >>> deltasummation(KroneckerDelta(i, k), (k, 0, oo)) + Piecewise((1, i >= 0), (0, True)) + >>> deltasummation(KroneckerDelta(i, k), (k, 1, 3)) + Piecewise((1, (i >= 1) & (i <= 3)), (0, True)) + >>> deltasummation(k*KroneckerDelta(i, j)*KroneckerDelta(j, k), (k, -oo, oo)) + j*KroneckerDelta(i, j) + >>> deltasummation(j*KroneckerDelta(i, j), (j, -oo, oo)) + i + >>> deltasummation(i*KroneckerDelta(i, j), (i, -oo, oo)) + j + + See Also + ======== + + deltaproduct + sympy.functions.special.tensor_functions.KroneckerDelta + sympy.concrete.sums.summation + """ + if ((limit[2] - limit[1]) < 0) == True: + return S.Zero + + if not f.has(KroneckerDelta): + return summation(f, limit) + + x = limit[0] + + g = _expand_delta(f, x) + if g.is_Add: + return piecewise_fold( + g.func(*[deltasummation(h, limit, no_piecewise) for h in g.args])) + + # try to extract a simple KroneckerDelta term + delta, expr = _extract_delta(g, x) + + if (delta is not None) and (delta.delta_range is not None): + dinf, dsup = delta.delta_range + if (limit[1] - dinf <= 0) == True and (limit[2] - dsup >= 0) == True: + no_piecewise = True + + if not delta: + return summation(f, limit) + + solns = solve(delta.args[0] - delta.args[1], x) + if len(solns) == 0: + return S.Zero + elif len(solns) != 1: + return Sum(f, limit) + value = solns[0] + if no_piecewise: + return expr.subs(x, value) + return Piecewise( + (expr.subs(x, value), Interval(*limit[1:3]).as_relational(value)), + (S.Zero, True) + ) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/expr_with_intlimits.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/expr_with_intlimits.py new file mode 100644 index 0000000000000000000000000000000000000000..8e109913cdb2f3018096972b14651b990f4b985e --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/expr_with_intlimits.py @@ -0,0 +1,354 @@ +from sympy.concrete.expr_with_limits import ExprWithLimits +from sympy.core.singleton import S +from sympy.core.relational import Eq + +class ReorderError(NotImplementedError): + """ + Exception raised when trying to reorder dependent limits. + """ + def __init__(self, expr, msg): + super().__init__( + "%s could not be reordered: %s." % (expr, msg)) + +class ExprWithIntLimits(ExprWithLimits): + """ + Superclass for Product and Sum. + + See Also + ======== + + sympy.concrete.expr_with_limits.ExprWithLimits + sympy.concrete.products.Product + sympy.concrete.summations.Sum + """ + __slots__ = () + + def change_index(self, var, trafo, newvar=None): + r""" + Change index of a Sum or Product. + + Perform a linear transformation `x \mapsto a x + b` on the index variable + `x`. For `a` the only values allowed are `\pm 1`. A new variable to be used + after the change of index can also be specified. + + Explanation + =========== + + ``change_index(expr, var, trafo, newvar=None)`` where ``var`` specifies the + index variable `x` to transform. The transformation ``trafo`` must be linear + and given in terms of ``var``. If the optional argument ``newvar`` is + provided then ``var`` gets replaced by ``newvar`` in the final expression. + + Examples + ======== + + >>> from sympy import Sum, Product, simplify + >>> from sympy.abc import x, y, a, b, c, d, u, v, i, j, k, l + + >>> S = Sum(x, (x, a, b)) + >>> S.doit() + -a**2/2 + a/2 + b**2/2 + b/2 + + >>> Sn = S.change_index(x, x + 1, y) + >>> Sn + Sum(y - 1, (y, a + 1, b + 1)) + >>> Sn.doit() + -a**2/2 + a/2 + b**2/2 + b/2 + + >>> Sn = S.change_index(x, -x, y) + >>> Sn + Sum(-y, (y, -b, -a)) + >>> Sn.doit() + -a**2/2 + a/2 + b**2/2 + b/2 + + >>> Sn = S.change_index(x, x+u) + >>> Sn + Sum(-u + x, (x, a + u, b + u)) + >>> Sn.doit() + -a**2/2 - a*u + a/2 + b**2/2 + b*u + b/2 - u*(-a + b + 1) + u + >>> simplify(Sn.doit()) + -a**2/2 + a/2 + b**2/2 + b/2 + + >>> Sn = S.change_index(x, -x - u, y) + >>> Sn + Sum(-u - y, (y, -b - u, -a - u)) + >>> Sn.doit() + -a**2/2 - a*u + a/2 + b**2/2 + b*u + b/2 - u*(-a + b + 1) + u + >>> simplify(Sn.doit()) + -a**2/2 + a/2 + b**2/2 + b/2 + + >>> P = Product(i*j**2, (i, a, b), (j, c, d)) + >>> P + Product(i*j**2, (i, a, b), (j, c, d)) + >>> P2 = P.change_index(i, i+3, k) + >>> P2 + Product(j**2*(k - 3), (k, a + 3, b + 3), (j, c, d)) + >>> P3 = P2.change_index(j, -j, l) + >>> P3 + Product(l**2*(k - 3), (k, a + 3, b + 3), (l, -d, -c)) + + When dealing with symbols only, we can make a + general linear transformation: + + >>> Sn = S.change_index(x, u*x+v, y) + >>> Sn + Sum((-v + y)/u, (y, b*u + v, a*u + v)) + >>> Sn.doit() + -v*(a*u - b*u + 1)/u + (a**2*u**2/2 + a*u*v + a*u/2 - b**2*u**2/2 - b*u*v + b*u/2 + v)/u + >>> simplify(Sn.doit()) + a**2*u/2 + a/2 - b**2*u/2 + b/2 + + However, the last result can be inconsistent with usual + summation where the index increment is always 1. This is + obvious as we get back the original value only for ``u`` + equal +1 or -1. + + See Also + ======== + + sympy.concrete.expr_with_intlimits.ExprWithIntLimits.index, + reorder_limit, + sympy.concrete.expr_with_intlimits.ExprWithIntLimits.reorder, + sympy.concrete.summations.Sum.reverse_order, + sympy.concrete.products.Product.reverse_order + """ + if newvar is None: + newvar = var + + limits = [] + for limit in self.limits: + if limit[0] == var: + p = trafo.as_poly(var) + if p.degree() != 1: + raise ValueError("Index transformation is not linear") + alpha = p.coeff_monomial(var) + beta = p.coeff_monomial(S.One) + if alpha.is_number: + if alpha == S.One: + limits.append((newvar, alpha*limit[1] + beta, alpha*limit[2] + beta)) + elif alpha == S.NegativeOne: + limits.append((newvar, alpha*limit[2] + beta, alpha*limit[1] + beta)) + else: + raise ValueError("Linear transformation results in non-linear summation stepsize") + else: + # Note that the case of alpha being symbolic can give issues if alpha < 0. + limits.append((newvar, alpha*limit[2] + beta, alpha*limit[1] + beta)) + else: + limits.append(limit) + + function = self.function.subs(var, (var - beta)/alpha) + function = function.subs(var, newvar) + + return self.func(function, *limits) + + + def index(expr, x): + """ + Return the index of a dummy variable in the list of limits. + + Explanation + =========== + + ``index(expr, x)`` returns the index of the dummy variable ``x`` in the + limits of ``expr``. Note that we start counting with 0 at the inner-most + limits tuple. + + Examples + ======== + + >>> from sympy.abc import x, y, a, b, c, d + >>> from sympy import Sum, Product + >>> Sum(x*y, (x, a, b), (y, c, d)).index(x) + 0 + >>> Sum(x*y, (x, a, b), (y, c, d)).index(y) + 1 + >>> Product(x*y, (x, a, b), (y, c, d)).index(x) + 0 + >>> Product(x*y, (x, a, b), (y, c, d)).index(y) + 1 + + See Also + ======== + + reorder_limit, reorder, sympy.concrete.summations.Sum.reverse_order, + sympy.concrete.products.Product.reverse_order + """ + variables = [limit[0] for limit in expr.limits] + + if variables.count(x) != 1: + raise ValueError(expr, "Number of instances of variable not equal to one") + else: + return variables.index(x) + + def reorder(expr, *arg): + """ + Reorder limits in a expression containing a Sum or a Product. + + Explanation + =========== + + ``expr.reorder(*arg)`` reorders the limits in the expression ``expr`` + according to the list of tuples given by ``arg``. These tuples can + contain numerical indices or index variable names or involve both. + + Examples + ======== + + >>> from sympy import Sum, Product + >>> from sympy.abc import x, y, z, a, b, c, d, e, f + + >>> Sum(x*y, (x, a, b), (y, c, d)).reorder((x, y)) + Sum(x*y, (y, c, d), (x, a, b)) + + >>> Sum(x*y*z, (x, a, b), (y, c, d), (z, e, f)).reorder((x, y), (x, z), (y, z)) + Sum(x*y*z, (z, e, f), (y, c, d), (x, a, b)) + + >>> P = Product(x*y*z, (x, a, b), (y, c, d), (z, e, f)) + >>> P.reorder((x, y), (x, z), (y, z)) + Product(x*y*z, (z, e, f), (y, c, d), (x, a, b)) + + We can also select the index variables by counting them, starting + with the inner-most one: + + >>> Sum(x**2, (x, a, b), (x, c, d)).reorder((0, 1)) + Sum(x**2, (x, c, d), (x, a, b)) + + And of course we can mix both schemes: + + >>> Sum(x*y, (x, a, b), (y, c, d)).reorder((y, x)) + Sum(x*y, (y, c, d), (x, a, b)) + >>> Sum(x*y, (x, a, b), (y, c, d)).reorder((y, 0)) + Sum(x*y, (y, c, d), (x, a, b)) + + See Also + ======== + + reorder_limit, index, sympy.concrete.summations.Sum.reverse_order, + sympy.concrete.products.Product.reverse_order + """ + new_expr = expr + + for r in arg: + if len(r) != 2: + raise ValueError(r, "Invalid number of arguments") + + index1 = r[0] + index2 = r[1] + + if not isinstance(r[0], int): + index1 = expr.index(r[0]) + if not isinstance(r[1], int): + index2 = expr.index(r[1]) + + new_expr = new_expr.reorder_limit(index1, index2) + + return new_expr + + + def reorder_limit(expr, x, y): + """ + Interchange two limit tuples of a Sum or Product expression. + + Explanation + =========== + + ``expr.reorder_limit(x, y)`` interchanges two limit tuples. The + arguments ``x`` and ``y`` are integers corresponding to the index + variables of the two limits which are to be interchanged. The + expression ``expr`` has to be either a Sum or a Product. + + Examples + ======== + + >>> from sympy.abc import x, y, z, a, b, c, d, e, f + >>> from sympy import Sum, Product + + >>> Sum(x*y*z, (x, a, b), (y, c, d), (z, e, f)).reorder_limit(0, 2) + Sum(x*y*z, (z, e, f), (y, c, d), (x, a, b)) + >>> Sum(x**2, (x, a, b), (x, c, d)).reorder_limit(1, 0) + Sum(x**2, (x, c, d), (x, a, b)) + + >>> Product(x*y*z, (x, a, b), (y, c, d), (z, e, f)).reorder_limit(0, 2) + Product(x*y*z, (z, e, f), (y, c, d), (x, a, b)) + + See Also + ======== + + index, reorder, sympy.concrete.summations.Sum.reverse_order, + sympy.concrete.products.Product.reverse_order + """ + var = {limit[0] for limit in expr.limits} + limit_x = expr.limits[x] + limit_y = expr.limits[y] + + if (len(set(limit_x[1].free_symbols).intersection(var)) == 0 and + len(set(limit_x[2].free_symbols).intersection(var)) == 0 and + len(set(limit_y[1].free_symbols).intersection(var)) == 0 and + len(set(limit_y[2].free_symbols).intersection(var)) == 0): + + limits = [] + for i, limit in enumerate(expr.limits): + if i == x: + limits.append(limit_y) + elif i == y: + limits.append(limit_x) + else: + limits.append(limit) + + return type(expr)(expr.function, *limits) + else: + raise ReorderError(expr, "could not interchange the two limits specified") + + @property + def has_empty_sequence(self): + """ + Returns True if the Sum or Product is computed for an empty sequence. + + Examples + ======== + + >>> from sympy import Sum, Product, Symbol + >>> m = Symbol('m') + >>> Sum(m, (m, 1, 0)).has_empty_sequence + True + + >>> Sum(m, (m, 1, 1)).has_empty_sequence + False + + >>> M = Symbol('M', integer=True, positive=True) + >>> Product(m, (m, 1, M)).has_empty_sequence + False + + >>> Product(m, (m, 2, M)).has_empty_sequence + + >>> Product(m, (m, M + 1, M)).has_empty_sequence + True + + >>> N = Symbol('N', integer=True, positive=True) + >>> Sum(m, (m, N, M)).has_empty_sequence + + >>> N = Symbol('N', integer=True, negative=True) + >>> Sum(m, (m, N, M)).has_empty_sequence + False + + See Also + ======== + + has_reversed_limits + has_finite_limits + + """ + ret_None = False + for lim in self.limits: + dif = lim[1] - lim[2] + eq = Eq(dif, 1) + if eq == True: + return True + elif eq == False: + continue + else: + ret_None = True + + if ret_None: + return None + return False diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/expr_with_limits.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/expr_with_limits.py new file mode 100644 index 0000000000000000000000000000000000000000..034e6ab0a7663525632abe0224fbac973c505c08 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/expr_with_limits.py @@ -0,0 +1,603 @@ +from sympy.core.add import Add +from sympy.core.containers import Tuple +from sympy.core.expr import Expr +from sympy.core.function import AppliedUndef, UndefinedFunction +from sympy.core.mul import Mul +from sympy.core.relational import Equality, Relational +from sympy.core.singleton import S +from sympy.core.symbol import Symbol, Dummy +from sympy.core.sympify import sympify +from sympy.functions.elementary.piecewise import (piecewise_fold, + Piecewise) +from sympy.logic.boolalg import BooleanFunction +from sympy.matrices.matrixbase import MatrixBase +from sympy.sets.sets import Interval, Set +from sympy.sets.fancysets import Range +from sympy.tensor.indexed import Idx +from sympy.utilities import flatten +from sympy.utilities.iterables import sift, is_sequence +from sympy.utilities.exceptions import sympy_deprecation_warning + + +def _common_new(cls, function, *symbols, discrete, **assumptions): + """Return either a special return value or the tuple, + (function, limits, orientation). This code is common to + both ExprWithLimits and AddWithLimits.""" + function = sympify(function) + + if isinstance(function, Equality): + # This transforms e.g. Integral(Eq(x, y)) to Eq(Integral(x), Integral(y)) + # but that is only valid for definite integrals. + limits, orientation = _process_limits(*symbols, discrete=discrete) + if not (limits and all(len(limit) == 3 for limit in limits)): + sympy_deprecation_warning( + """ + Creating a indefinite integral with an Eq() argument is + deprecated. + + This is because indefinite integrals do not preserve equality + due to the arbitrary constants. If you want an equality of + indefinite integrals, use Eq(Integral(a, x), Integral(b, x)) + explicitly. + """, + deprecated_since_version="1.6", + active_deprecations_target="deprecated-indefinite-integral-eq", + stacklevel=5, + ) + + lhs = function.lhs + rhs = function.rhs + return Equality(cls(lhs, *symbols, **assumptions), \ + cls(rhs, *symbols, **assumptions)) + + if function is S.NaN: + return S.NaN + + if symbols: + limits, orientation = _process_limits(*symbols, discrete=discrete) + for i, li in enumerate(limits): + if len(li) == 4: + function = function.subs(li[0], li[-1]) + limits[i] = Tuple(*li[:-1]) + else: + # symbol not provided -- we can still try to compute a general form + free = function.free_symbols + if len(free) != 1: + raise ValueError( + "specify dummy variables for %s" % function) + limits, orientation = [Tuple(s) for s in free], 1 + + # denest any nested calls + while cls == type(function): + limits = list(function.limits) + limits + function = function.function + + # Any embedded piecewise functions need to be brought out to the + # top level. We only fold Piecewise that contain the integration + # variable. + reps = {} + symbols_of_integration = {i[0] for i in limits} + for p in function.atoms(Piecewise): + if not p.has(*symbols_of_integration): + reps[p] = Dummy() + # mask off those that don't + function = function.xreplace(reps) + # do the fold + function = piecewise_fold(function) + # remove the masking + function = function.xreplace({v: k for k, v in reps.items()}) + + return function, limits, orientation + + +def _process_limits(*symbols, discrete=None): + """Process the list of symbols and convert them to canonical limits, + storing them as Tuple(symbol, lower, upper). The orientation of + the function is also returned when the upper limit is missing + so (x, 1, None) becomes (x, None, 1) and the orientation is changed. + In the case that a limit is specified as (symbol, Range), a list of + length 4 may be returned if a change of variables is needed; the + expression that should replace the symbol in the expression is + the fourth element in the list. + """ + limits = [] + orientation = 1 + if discrete is None: + err_msg = 'discrete must be True or False' + elif discrete: + err_msg = 'use Range, not Interval or Relational' + else: + err_msg = 'use Interval or Relational, not Range' + for V in symbols: + if isinstance(V, (Relational, BooleanFunction)): + if discrete: + raise TypeError(err_msg) + variable = V.atoms(Symbol).pop() + V = (variable, V.as_set()) + elif isinstance(V, Symbol) or getattr(V, '_diff_wrt', False): + if isinstance(V, Idx): + if V.lower is None or V.upper is None: + limits.append(Tuple(V)) + else: + limits.append(Tuple(V, V.lower, V.upper)) + else: + limits.append(Tuple(V)) + continue + if is_sequence(V) and not isinstance(V, Set): + if len(V) == 2 and isinstance(V[1], Set): + V = list(V) + if isinstance(V[1], Interval): # includes Reals + if discrete: + raise TypeError(err_msg) + V[1:] = V[1].inf, V[1].sup + elif isinstance(V[1], Range): + if not discrete: + raise TypeError(err_msg) + lo = V[1].inf + hi = V[1].sup + dx = abs(V[1].step) # direction doesn't matter + if dx == 1: + V[1:] = [lo, hi] + else: + if lo is not S.NegativeInfinity: + V = [V[0]] + [0, (hi - lo)//dx, dx*V[0] + lo] + else: + V = [V[0]] + [0, S.Infinity, -dx*V[0] + hi] + else: + # more complicated sets would require splitting, e.g. + # Union(Interval(1, 3), interval(6,10)) + raise NotImplementedError( + 'expecting Range' if discrete else + 'Relational or single Interval' ) + V = sympify(flatten(V)) # list of sympified elements/None + if isinstance(V[0], (Symbol, Idx)) or getattr(V[0], '_diff_wrt', False): + newsymbol = V[0] + if len(V) == 3: + # general case + if V[2] is None and V[1] is not None: + orientation *= -1 + V = [newsymbol] + [i for i in V[1:] if i is not None] + + lenV = len(V) + if not isinstance(newsymbol, Idx) or lenV == 3: + if lenV == 4: + limits.append(Tuple(*V)) + continue + if lenV == 3: + if isinstance(newsymbol, Idx): + # Idx represents an integer which may have + # specified values it can take on; if it is + # given such a value, an error is raised here + # if the summation would try to give it a larger + # or smaller value than permitted. None and Symbolic + # values will not raise an error. + lo, hi = newsymbol.lower, newsymbol.upper + try: + if lo is not None and not bool(V[1] >= lo): + raise ValueError("Summation will set Idx value too low.") + except TypeError: + pass + try: + if hi is not None and not bool(V[2] <= hi): + raise ValueError("Summation will set Idx value too high.") + except TypeError: + pass + limits.append(Tuple(*V)) + continue + if lenV == 1 or (lenV == 2 and V[1] is None): + limits.append(Tuple(newsymbol)) + continue + elif lenV == 2: + limits.append(Tuple(newsymbol, V[1])) + continue + + raise ValueError('Invalid limits given: %s' % str(symbols)) + + return limits, orientation + + +class ExprWithLimits(Expr): + __slots__ = ('is_commutative',) + + def __new__(cls, function, *symbols, **assumptions): + from sympy.concrete.products import Product + pre = _common_new(cls, function, *symbols, + discrete=issubclass(cls, Product), **assumptions) + if isinstance(pre, tuple): + function, limits, _ = pre + else: + return pre + + # limits must have upper and lower bounds; the indefinite form + # is not supported. This restriction does not apply to AddWithLimits + if any(len(l) != 3 or None in l for l in limits): + raise ValueError('ExprWithLimits requires values for lower and upper bounds.') + + obj = Expr.__new__(cls, **assumptions) + arglist = [function] + arglist.extend(limits) + obj._args = tuple(arglist) + obj.is_commutative = function.is_commutative # limits already checked + + return obj + + @property + def function(self): + """Return the function applied across limits. + + Examples + ======== + + >>> from sympy import Integral + >>> from sympy.abc import x + >>> Integral(x**2, (x,)).function + x**2 + + See Also + ======== + + limits, variables, free_symbols + """ + return self._args[0] + + @property + def kind(self): + return self.function.kind + + @property + def limits(self): + """Return the limits of expression. + + Examples + ======== + + >>> from sympy import Integral + >>> from sympy.abc import x, i + >>> Integral(x**i, (i, 1, 3)).limits + ((i, 1, 3),) + + See Also + ======== + + function, variables, free_symbols + """ + return self._args[1:] + + @property + def variables(self): + """Return a list of the limit variables. + + >>> from sympy import Sum + >>> from sympy.abc import x, i + >>> Sum(x**i, (i, 1, 3)).variables + [i] + + See Also + ======== + + function, limits, free_symbols + as_dummy : Rename dummy variables + sympy.integrals.integrals.Integral.transform : Perform mapping on the dummy variable + """ + return [l[0] for l in self.limits] + + @property + def bound_symbols(self): + """Return only variables that are dummy variables. + + Examples + ======== + + >>> from sympy import Integral + >>> from sympy.abc import x, i, j, k + >>> Integral(x**i, (i, 1, 3), (j, 2), k).bound_symbols + [i, j] + + See Also + ======== + + function, limits, free_symbols + as_dummy : Rename dummy variables + sympy.integrals.integrals.Integral.transform : Perform mapping on the dummy variable + """ + return [l[0] for l in self.limits if len(l) != 1] + + @property + def free_symbols(self): + """ + This method returns the symbols in the object, excluding those + that take on a specific value (i.e. the dummy symbols). + + Examples + ======== + + >>> from sympy import Sum + >>> from sympy.abc import x, y + >>> Sum(x, (x, y, 1)).free_symbols + {y} + """ + # don't test for any special values -- nominal free symbols + # should be returned, e.g. don't return set() if the + # function is zero -- treat it like an unevaluated expression. + function, limits = self.function, self.limits + # mask off non-symbol integration variables that have + # more than themself as a free symbol + reps = {i[0]: i[0] if i[0].free_symbols == {i[0]} else Dummy() + for i in self.limits} + function = function.xreplace(reps) + isyms = function.free_symbols + for xab in limits: + v = reps[xab[0]] + if len(xab) == 1: + isyms.add(v) + continue + # take out the target symbol + if v in isyms: + isyms.remove(v) + # add in the new symbols + for i in xab[1:]: + isyms.update(i.free_symbols) + reps = {v: k for k, v in reps.items()} + return {reps.get(_, _) for _ in isyms} + + @property + def is_number(self): + """Return True if the Sum has no free symbols, else False.""" + return not self.free_symbols + + def _eval_interval(self, x, a, b): + limits = [(i if i[0] != x else (x, a, b)) for i in self.limits] + integrand = self.function + return self.func(integrand, *limits) + + def _eval_subs(self, old, new): + """ + Perform substitutions over non-dummy variables + of an expression with limits. Also, can be used + to specify point-evaluation of an abstract antiderivative. + + Examples + ======== + + >>> from sympy import Sum, oo + >>> from sympy.abc import s, n + >>> Sum(1/n**s, (n, 1, oo)).subs(s, 2) + Sum(n**(-2), (n, 1, oo)) + + >>> from sympy import Integral + >>> from sympy.abc import x, a + >>> Integral(a*x**2, x).subs(x, 4) + Integral(a*x**2, (x, 4)) + + See Also + ======== + + variables : Lists the integration variables + transform : Perform mapping on the dummy variable for integrals + change_index : Perform mapping on the sum and product dummy variables + + """ + func, limits = self.function, list(self.limits) + + # If one of the expressions we are replacing is used as a func index + # one of two things happens. + # - the old variable first appears as a free variable + # so we perform all free substitutions before it becomes + # a func index. + # - the old variable first appears as a func index, in + # which case we ignore. See change_index. + + # Reorder limits to match standard mathematical practice for scoping + limits.reverse() + + if not isinstance(old, Symbol) or \ + old.free_symbols.intersection(self.free_symbols): + sub_into_func = True + for i, xab in enumerate(limits): + if 1 == len(xab) and old == xab[0]: + if new._diff_wrt: + xab = (new,) + else: + xab = (old, old) + limits[i] = Tuple(xab[0], *[l._subs(old, new) for l in xab[1:]]) + if len(xab[0].free_symbols.intersection(old.free_symbols)) != 0: + sub_into_func = False + break + if isinstance(old, (AppliedUndef, UndefinedFunction)): + sy2 = set(self.variables).intersection(set(new.atoms(Symbol))) + sy1 = set(self.variables).intersection(set(old.args)) + if not sy2.issubset(sy1): + raise ValueError( + "substitution cannot create dummy dependencies") + sub_into_func = True + if sub_into_func: + func = func.subs(old, new) + else: + # old is a Symbol and a dummy variable of some limit + for i, xab in enumerate(limits): + if len(xab) == 3: + limits[i] = Tuple(xab[0], *[l._subs(old, new) for l in xab[1:]]) + if old == xab[0]: + break + # simplify redundant limits (x, x) to (x, ) + for i, xab in enumerate(limits): + if len(xab) == 2 and (xab[0] - xab[1]).is_zero: + limits[i] = Tuple(xab[0], ) + + # Reorder limits back to representation-form + limits.reverse() + + return self.func(func, *limits) + + @property + def has_finite_limits(self): + """ + Returns True if the limits are known to be finite, either by the + explicit bounds, assumptions on the bounds, or assumptions on the + variables. False if known to be infinite, based on the bounds. + None if not enough information is available to determine. + + Examples + ======== + + >>> from sympy import Sum, Integral, Product, oo, Symbol + >>> x = Symbol('x') + >>> Sum(x, (x, 1, 8)).has_finite_limits + True + + >>> Integral(x, (x, 1, oo)).has_finite_limits + False + + >>> M = Symbol('M') + >>> Sum(x, (x, 1, M)).has_finite_limits + + >>> N = Symbol('N', integer=True) + >>> Product(x, (x, 1, N)).has_finite_limits + True + + See Also + ======== + + has_reversed_limits + + """ + + ret_None = False + for lim in self.limits: + if len(lim) == 3: + if any(l.is_infinite for l in lim[1:]): + # Any of the bounds are +/-oo + return False + elif any(l.is_infinite is None for l in lim[1:]): + # Maybe there are assumptions on the variable? + if lim[0].is_infinite is None: + ret_None = True + else: + if lim[0].is_infinite is None: + ret_None = True + + if ret_None: + return None + return True + + @property + def has_reversed_limits(self): + """ + Returns True if the limits are known to be in reversed order, either + by the explicit bounds, assumptions on the bounds, or assumptions on the + variables. False if known to be in normal order, based on the bounds. + None if not enough information is available to determine. + + Examples + ======== + + >>> from sympy import Sum, Integral, Product, oo, Symbol + >>> x = Symbol('x') + >>> Sum(x, (x, 8, 1)).has_reversed_limits + True + + >>> Sum(x, (x, 1, oo)).has_reversed_limits + False + + >>> M = Symbol('M') + >>> Integral(x, (x, 1, M)).has_reversed_limits + + >>> N = Symbol('N', integer=True, positive=True) + >>> Sum(x, (x, 1, N)).has_reversed_limits + False + + >>> Product(x, (x, 2, N)).has_reversed_limits + + >>> Product(x, (x, 2, N)).subs(N, N + 2).has_reversed_limits + False + + See Also + ======== + + sympy.concrete.expr_with_intlimits.ExprWithIntLimits.has_empty_sequence + + """ + ret_None = False + for lim in self.limits: + if len(lim) == 3: + var, a, b = lim + dif = b - a + if dif.is_extended_negative: + return True + elif dif.is_extended_nonnegative: + continue + else: + ret_None = True + else: + return None + if ret_None: + return None + return False + + +class AddWithLimits(ExprWithLimits): + r"""Represents unevaluated oriented additions. + Parent class for Integral and Sum. + """ + + __slots__ = () + + def __new__(cls, function, *symbols, **assumptions): + from sympy.concrete.summations import Sum + pre = _common_new(cls, function, *symbols, + discrete=issubclass(cls, Sum), **assumptions) + if isinstance(pre, tuple): + function, limits, orientation = pre + else: + return pre + + obj = Expr.__new__(cls, **assumptions) + arglist = [orientation*function] # orientation not used in ExprWithLimits + arglist.extend(limits) + obj._args = tuple(arglist) + obj.is_commutative = function.is_commutative # limits already checked + + return obj + + def _eval_adjoint(self): + if all(x.is_real for x in flatten(self.limits)): + return self.func(self.function.adjoint(), *self.limits) + return None + + def _eval_conjugate(self): + if all(x.is_real for x in flatten(self.limits)): + return self.func(self.function.conjugate(), *self.limits) + return None + + def _eval_transpose(self): + if all(x.is_real for x in flatten(self.limits)): + return self.func(self.function.transpose(), *self.limits) + return None + + def _eval_factor(self, **hints): + if 1 == len(self.limits): + summand = self.function.factor(**hints) + if summand.is_Mul: + out = sift(summand.args, lambda w: w.is_commutative \ + and not set(self.variables) & w.free_symbols) + return Mul(*out[True])*self.func(Mul(*out[False]), \ + *self.limits) + else: + summand = self.func(self.function, *self.limits[0:-1]).factor() + if not summand.has(self.variables[-1]): + return self.func(1, [self.limits[-1]]).doit()*summand + elif isinstance(summand, Mul): + return self.func(summand, self.limits[-1]).factor() + return self + + def _eval_expand_basic(self, **hints): + summand = self.function.expand(**hints) + force = hints.get('force', False) + if (summand.is_Add and (force or summand.is_commutative and + self.has_finite_limits is not False)): + return Add(*[self.func(i, *self.limits) for i in summand.args]) + elif isinstance(summand, MatrixBase): + return summand.applyfunc(lambda x: self.func(x, *self.limits)) + elif summand != self.function: + return self.func(summand, *self.limits) + return self diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/gosper.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/gosper.py new file mode 100644 index 0000000000000000000000000000000000000000..76eb20ef4f94bc6bff6324a1dcc09f90e05274b3 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/gosper.py @@ -0,0 +1,222 @@ +"""Gosper's algorithm for hypergeometric summation. """ + +from sympy.core import S, Dummy, symbols +from sympy.polys import Poly, parallel_poly_from_expr, factor +from sympy.utilities.iterables import is_sequence + + +def gosper_normal(f, g, n, polys=True): + r""" + Compute the Gosper's normal form of ``f`` and ``g``. + + Explanation + =========== + + Given relatively prime univariate polynomials ``f`` and ``g``, + rewrite their quotient to a normal form defined as follows: + + .. math:: + \frac{f(n)}{g(n)} = Z \cdot \frac{A(n) C(n+1)}{B(n) C(n)} + + where ``Z`` is an arbitrary constant and ``A``, ``B``, ``C`` are + monic polynomials in ``n`` with the following properties: + + 1. `\gcd(A(n), B(n+h)) = 1 \forall h \in \mathbb{N}` + 2. `\gcd(B(n), C(n+1)) = 1` + 3. `\gcd(A(n), C(n)) = 1` + + This normal form, or rational factorization in other words, is a + crucial step in Gosper's algorithm and in solving of difference + equations. It can be also used to decide if two hypergeometric + terms are similar or not. + + This procedure will return a tuple containing elements of this + factorization in the form ``(Z*A, B, C)``. + + Examples + ======== + + >>> from sympy.concrete.gosper import gosper_normal + >>> from sympy.abc import n + + >>> gosper_normal(4*n+5, 2*(4*n+1)*(2*n+3), n, polys=False) + (1/4, n + 3/2, n + 1/4) + + """ + (p, q), opt = parallel_poly_from_expr( + (f, g), n, field=True, extension=True) + + a, A = p.LC(), p.monic() + b, B = q.LC(), q.monic() + + C, Z = A.one, a/b + h = Dummy('h') + + D = Poly(n + h, n, h, domain=opt.domain) + + R = A.resultant(B.compose(D)) + roots = {r for r in R.ground_roots().keys() if r.is_Integer and r >= 0} + for i in sorted(roots): + d = A.gcd(B.shift(+i)) + + A = A.quo(d) + B = B.quo(d.shift(-i)) + + for j in range(1, i + 1): + C *= d.shift(-j) + + A = A.mul_ground(Z) + + if not polys: + A = A.as_expr() + B = B.as_expr() + C = C.as_expr() + + return A, B, C + + +def gosper_term(f, n): + r""" + Compute Gosper's hypergeometric term for ``f``. + + Explanation + =========== + + Suppose ``f`` is a hypergeometric term such that: + + .. math:: + s_n = \sum_{k=0}^{n-1} f_k + + and `f_k` does not depend on `n`. Returns a hypergeometric + term `g_n` such that `g_{n+1} - g_n = f_n`. + + Examples + ======== + + >>> from sympy.concrete.gosper import gosper_term + >>> from sympy import factorial + >>> from sympy.abc import n + + >>> gosper_term((4*n + 1)*factorial(n)/factorial(2*n + 1), n) + (-n - 1/2)/(n + 1/4) + + """ + from sympy.simplify import hypersimp + r = hypersimp(f, n) + + if r is None: + return None # 'f' is *not* a hypergeometric term + + p, q = r.as_numer_denom() + + A, B, C = gosper_normal(p, q, n) + B = B.shift(-1) + + N = S(A.degree()) + M = S(B.degree()) + K = S(C.degree()) + + if (N != M) or (A.LC() != B.LC()): + D = {K - max(N, M)} + elif not N: + D = {K - N + 1, S.Zero} + else: + D = {K - N + 1, (B.nth(N - 1) - A.nth(N - 1))/A.LC()} + + for d in set(D): + if not d.is_Integer or d < 0: + D.remove(d) + + if not D: + return None # 'f(n)' is *not* Gosper-summable + + d = max(D) + + coeffs = symbols('c:%s' % (d + 1), cls=Dummy) + domain = A.get_domain().inject(*coeffs) + + x = Poly(coeffs, n, domain=domain) + H = A*x.shift(1) - B*x - C + + from sympy.solvers.solvers import solve + solution = solve(H.coeffs(), coeffs) + + if solution is None: + return None # 'f(n)' is *not* Gosper-summable + + x = x.as_expr().subs(solution) + + for coeff in coeffs: + if coeff not in solution: + x = x.subs(coeff, 0) + + if x.is_zero: + return None # 'f(n)' is *not* Gosper-summable + else: + return B.as_expr()*x/C.as_expr() + + +def gosper_sum(f, k): + r""" + Gosper's hypergeometric summation algorithm. + + Explanation + =========== + + Given a hypergeometric term ``f`` such that: + + .. math :: + s_n = \sum_{k=0}^{n-1} f_k + + and `f(n)` does not depend on `n`, returns `g_{n} - g(0)` where + `g_{n+1} - g_n = f_n`, or ``None`` if `s_n` cannot be expressed + in closed form as a sum of hypergeometric terms. + + Examples + ======== + + >>> from sympy.concrete.gosper import gosper_sum + >>> from sympy import factorial + >>> from sympy.abc import n, k + + >>> f = (4*k + 1)*factorial(k)/factorial(2*k + 1) + >>> gosper_sum(f, (k, 0, n)) + (-factorial(n) + 2*factorial(2*n + 1))/factorial(2*n + 1) + >>> _.subs(n, 2) == sum(f.subs(k, i) for i in [0, 1, 2]) + True + >>> gosper_sum(f, (k, 3, n)) + (-60*factorial(n) + factorial(2*n + 1))/(60*factorial(2*n + 1)) + >>> _.subs(n, 5) == sum(f.subs(k, i) for i in [3, 4, 5]) + True + + References + ========== + + .. [1] Marko Petkovsek, Herbert S. Wilf, Doron Zeilberger, A = B, + AK Peters, Ltd., Wellesley, MA, USA, 1997, pp. 73--100 + + """ + indefinite = False + + if is_sequence(k): + k, a, b = k + else: + indefinite = True + + g = gosper_term(f, k) + + if g is None: + return None + + if indefinite: + result = f*g + else: + result = (f*(g + 1)).subs(k, b) - (f*g).subs(k, a) + + if result is S.NaN: + try: + result = (f*(g + 1)).limit(k, b) - (f*g).limit(k, a) + except NotImplementedError: + result = None + + return factor(result) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/guess.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/guess.py new file mode 100644 index 0000000000000000000000000000000000000000..90aac54b442ce67c90cbb262e10d525e5f2ba316 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/guess.py @@ -0,0 +1,473 @@ +"""Various algorithms for helping identifying numbers and sequences.""" + + +from sympy.concrete.products import (Product, product) +from sympy.core import Function, S +from sympy.core.add import Add +from sympy.core.numbers import Integer, Rational +from sympy.core.symbol import Symbol, symbols +from sympy.core.sympify import sympify +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.integers import floor +from sympy.integrals.integrals import integrate +from sympy.polys.polyfuncs import rational_interpolate as rinterp +from sympy.polys.polytools import lcm +from sympy.simplify.radsimp import denom +from sympy.utilities import public + + +@public +def find_simple_recurrence_vector(l): + """ + This function is used internally by other functions from the + sympy.concrete.guess module. While most users may want to rather use the + function find_simple_recurrence when looking for recurrence relations + among rational numbers, the current function may still be useful when + some post-processing has to be done. + + Explanation + =========== + + The function returns a vector of length n when a recurrence relation of + order n is detected in the sequence of rational numbers v. + + If the returned vector has a length 1, then the returned value is always + the list [0], which means that no relation has been found. + + While the functions is intended to be used with rational numbers, it should + work for other kinds of real numbers except for some cases involving + quadratic numbers; for that reason it should be used with some caution when + the argument is not a list of rational numbers. + + Examples + ======== + + >>> from sympy.concrete.guess import find_simple_recurrence_vector + >>> from sympy import fibonacci + >>> find_simple_recurrence_vector([fibonacci(k) for k in range(12)]) + [1, -1, -1] + + See Also + ======== + + See the function sympy.concrete.guess.find_simple_recurrence which is more + user-friendly. + + """ + q1 = [0] + q2 = [1] + b, z = 0, len(l) >> 1 + while len(q2) <= z: + while l[b]==0: + b += 1 + if b == len(l): + c = 1 + for x in q2: + c = lcm(c, denom(x)) + if q2[0]*c < 0: c = -c + for k in range(len(q2)): + q2[k] = int(q2[k]*c) + return q2 + a = S.One/l[b] + m = [a] + for k in range(b+1, len(l)): + m.append(-sum(l[j+1]*m[b-j-1] for j in range(b, k))*a) + l, m = m, [0] * max(len(q2), b+len(q1)) + for k, q in enumerate(q2): + m[k] = a*q + for k, q in enumerate(q1): + m[k+b] += q + while m[-1]==0: m.pop() # because trailing zeros can occur + q1, q2, b = q2, m, 1 + return [0] + +@public +def find_simple_recurrence(v, A=Function('a'), N=Symbol('n')): + """ + Detects and returns a recurrence relation from a sequence of several integer + (or rational) terms. The name of the function in the returned expression is + 'a' by default; the main variable is 'n' by default. The smallest index in + the returned expression is always n (and never n-1, n-2, etc.). + + Examples + ======== + + >>> from sympy.concrete.guess import find_simple_recurrence + >>> from sympy import fibonacci + >>> find_simple_recurrence([fibonacci(k) for k in range(12)]) + -a(n) - a(n + 1) + a(n + 2) + + >>> from sympy import Function, Symbol + >>> a = [1, 1, 1] + >>> for k in range(15): a.append(5*a[-1]-3*a[-2]+8*a[-3]) + >>> find_simple_recurrence(a, A=Function('f'), N=Symbol('i')) + -8*f(i) + 3*f(i + 1) - 5*f(i + 2) + f(i + 3) + + """ + p = find_simple_recurrence_vector(v) + n = len(p) + if n <= 1: return S.Zero + + return Add(*[A(N+n-1-k)*p[k] for k in range(n)]) + + +@public +def rationalize(x, maxcoeff=10000): + """ + Helps identifying a rational number from a float (or mpmath.mpf) value by + using a continued fraction. The algorithm stops as soon as a large partial + quotient is detected (greater than 10000 by default). + + Examples + ======== + + >>> from sympy.concrete.guess import rationalize + >>> from mpmath import cos, pi + >>> rationalize(cos(pi/3)) + 1/2 + + >>> from mpmath import mpf + >>> rationalize(mpf("0.333333333333333")) + 1/3 + + While the function is rather intended to help 'identifying' rational + values, it may be used in some cases for approximating real numbers. + (Though other functions may be more relevant in that case.) + + >>> rationalize(pi, maxcoeff = 250) + 355/113 + + See Also + ======== + + Several other methods can approximate a real number as a rational, like: + + * fractions.Fraction.from_decimal + * fractions.Fraction.from_float + * mpmath.identify + * mpmath.pslq by using the following syntax: mpmath.pslq([x, 1]) + * mpmath.findpoly by using the following syntax: mpmath.findpoly(x, 1) + * sympy.simplify.nsimplify (which is a more general function) + + The main difference between the current function and all these variants is + that control focuses on magnitude of partial quotients here rather than on + global precision of the approximation. If the real is "known to be" a + rational number, the current function should be able to detect it correctly + with the default settings even when denominator is great (unless its + expansion contains unusually big partial quotients) which may occur + when studying sequences of increasing numbers. If the user cares more + on getting simple fractions, other methods may be more convenient. + + """ + p0, p1 = 0, 1 + q0, q1 = 1, 0 + a = floor(x) + while a < maxcoeff or q1==0: + p = a*p1 + p0 + q = a*q1 + q0 + p0, p1 = p1, p + q0, q1 = q1, q + if x==a: break + x = 1/(x-a) + a = floor(x) + return sympify(p) / q + + +@public +def guess_generating_function_rational(v, X=Symbol('x')): + """ + Tries to "guess" a rational generating function for a sequence of rational + numbers v. + + Examples + ======== + + >>> from sympy.concrete.guess import guess_generating_function_rational + >>> from sympy import fibonacci + >>> l = [fibonacci(k) for k in range(5,15)] + >>> guess_generating_function_rational(l) + (3*x + 5)/(-x**2 - x + 1) + + See Also + ======== + + sympy.series.approximants + mpmath.pade + + """ + # a) compute the denominator as q + q = find_simple_recurrence_vector(v) + n = len(q) + if n <= 1: return None + # b) compute the numerator as p + p = [sum(v[i-k]*q[k] for k in range(min(i+1, n))) + for i in range(len(v)>>1)] + return (sum(p[k]*X**k for k in range(len(p))) + / sum(q[k]*X**k for k in range(n))) + + +@public +def guess_generating_function(v, X=Symbol('x'), types=['all'], maxsqrtn=2): + """ + Tries to "guess" a generating function for a sequence of rational numbers v. + Only a few patterns are implemented yet. + + Explanation + =========== + + The function returns a dictionary where keys are the name of a given type of + generating function. Six types are currently implemented: + + type | formal definition + -------+---------------------------------------------------------------- + ogf | f(x) = Sum( a_k * x^k , k: 0..infinity ) + egf | f(x) = Sum( a_k * x^k / k! , k: 0..infinity ) + lgf | f(x) = Sum( (-1)^(k+1) a_k * x^k / k , k: 1..infinity ) + | (with initial index being hold as 1 rather than 0) + hlgf | f(x) = Sum( a_k * x^k / k , k: 1..infinity ) + | (with initial index being hold as 1 rather than 0) + lgdogf | f(x) = derivate( log(Sum( a_k * x^k, k: 0..infinity )), x) + lgdegf | f(x) = derivate( log(Sum( a_k * x^k / k!, k: 0..infinity )), x) + + In order to spare time, the user can select only some types of generating + functions (default being ['all']). While forgetting to use a list in the + case of a single type may seem to work most of the time as in: types='ogf' + this (convenient) syntax may lead to unexpected extra results in some cases. + + Discarding a type when calling the function does not mean that the type will + not be present in the returned dictionary; it only means that no extra + computation will be performed for that type, but the function may still add + it in the result when it can be easily converted from another type. + + Two generating functions (lgdogf and lgdegf) are not even computed if the + initial term of the sequence is 0; it may be useful in that case to try + again after having removed the leading zeros. + + Examples + ======== + + >>> from sympy.concrete.guess import guess_generating_function as ggf + >>> ggf([k+1 for k in range(12)], types=['ogf', 'lgf', 'hlgf']) + {'hlgf': 1/(1 - x), 'lgf': 1/(x + 1), 'ogf': 1/(x**2 - 2*x + 1)} + + >>> from sympy import sympify + >>> l = sympify("[3/2, 11/2, 0, -121/2, -363/2, 121]") + >>> ggf(l) + {'ogf': (x + 3/2)/(11*x**2 - 3*x + 1)} + + >>> from sympy import fibonacci + >>> ggf([fibonacci(k) for k in range(5, 15)], types=['ogf']) + {'ogf': (3*x + 5)/(-x**2 - x + 1)} + + >>> from sympy import factorial + >>> ggf([factorial(k) for k in range(12)], types=['ogf', 'egf', 'lgf']) + {'egf': 1/(1 - x)} + + >>> ggf([k+1 for k in range(12)], types=['egf']) + {'egf': (x + 1)*exp(x), 'lgdegf': (x + 2)/(x + 1)} + + N-th root of a rational function can also be detected (below is an example + coming from the sequence A108626 from https://oeis.org). + The greatest n-th root to be tested is specified as maxsqrtn (default 2). + + >>> ggf([1, 2, 5, 14, 41, 124, 383, 1200, 3799, 12122, 38919])['ogf'] + sqrt(1/(x**4 + 2*x**2 - 4*x + 1)) + + References + ========== + + .. [1] "Concrete Mathematics", R.L. Graham, D.E. Knuth, O. Patashnik + .. [2] https://oeis.org/wiki/Generating_functions + + """ + # List of all types of all g.f. known by the algorithm + if 'all' in types: + types = ('ogf', 'egf', 'lgf', 'hlgf', 'lgdogf', 'lgdegf') + + result = {} + + # Ordinary Generating Function (ogf) + if 'ogf' in types: + # Perform some convolutions of the sequence with itself + t = [1] + [0]*(len(v) - 1) + for d in range(max(1, maxsqrtn)): + t = [sum(t[n-i]*v[i] for i in range(n+1)) for n in range(len(v))] + g = guess_generating_function_rational(t, X=X) + if g: + result['ogf'] = g**Rational(1, d+1) + break + + # Exponential Generating Function (egf) + if 'egf' in types: + # Transform sequence (division by factorial) + w, f = [], S.One + for i, k in enumerate(v): + f *= i if i else 1 + w.append(k/f) + # Perform some convolutions of the sequence with itself + t = [1] + [0]*(len(w) - 1) + for d in range(max(1, maxsqrtn)): + t = [sum(t[n-i]*w[i] for i in range(n+1)) for n in range(len(w))] + g = guess_generating_function_rational(t, X=X) + if g: + result['egf'] = g**Rational(1, d+1) + break + + # Logarithmic Generating Function (lgf) + if 'lgf' in types: + # Transform sequence (multiplication by (-1)^(n+1) / n) + w, f = [], S.NegativeOne + for i, k in enumerate(v): + f = -f + w.append(f*k/Integer(i+1)) + # Perform some convolutions of the sequence with itself + t = [1] + [0]*(len(w) - 1) + for d in range(max(1, maxsqrtn)): + t = [sum(t[n-i]*w[i] for i in range(n+1)) for n in range(len(w))] + g = guess_generating_function_rational(t, X=X) + if g: + result['lgf'] = g**Rational(1, d+1) + break + + # Hyperbolic logarithmic Generating Function (hlgf) + if 'hlgf' in types: + # Transform sequence (division by n+1) + w = [] + for i, k in enumerate(v): + w.append(k/Integer(i+1)) + # Perform some convolutions of the sequence with itself + t = [1] + [0]*(len(w) - 1) + for d in range(max(1, maxsqrtn)): + t = [sum(t[n-i]*w[i] for i in range(n+1)) for n in range(len(w))] + g = guess_generating_function_rational(t, X=X) + if g: + result['hlgf'] = g**Rational(1, d+1) + break + + # Logarithmic derivative of ordinary generating Function (lgdogf) + if v[0] != 0 and ('lgdogf' in types + or ('ogf' in types and 'ogf' not in result)): + # Transform sequence by computing f'(x)/f(x) + # because log(f(x)) = integrate( f'(x)/f(x) ) + a, w = sympify(v[0]), [] + for n in range(len(v)-1): + w.append( + (v[n+1]*(n+1) - sum(w[-i-1]*v[i+1] for i in range(n)))/a) + # Perform some convolutions of the sequence with itself + t = [1] + [0]*(len(w) - 1) + for d in range(max(1, maxsqrtn)): + t = [sum(t[n-i]*w[i] for i in range(n+1)) for n in range(len(w))] + g = guess_generating_function_rational(t, X=X) + if g: + result['lgdogf'] = g**Rational(1, d+1) + if 'ogf' not in result: + result['ogf'] = exp(integrate(result['lgdogf'], X)) + break + + # Logarithmic derivative of exponential generating Function (lgdegf) + if v[0] != 0 and ('lgdegf' in types + or ('egf' in types and 'egf' not in result)): + # Transform sequence / step 1 (division by factorial) + z, f = [], S.One + for i, k in enumerate(v): + f *= i if i else 1 + z.append(k/f) + # Transform sequence / step 2 by computing f'(x)/f(x) + # because log(f(x)) = integrate( f'(x)/f(x) ) + a, w = z[0], [] + for n in range(len(z)-1): + w.append( + (z[n+1]*(n+1) - sum(w[-i-1]*z[i+1] for i in range(n)))/a) + # Perform some convolutions of the sequence with itself + t = [1] + [0]*(len(w) - 1) + for d in range(max(1, maxsqrtn)): + t = [sum(t[n-i]*w[i] for i in range(n+1)) for n in range(len(w))] + g = guess_generating_function_rational(t, X=X) + if g: + result['lgdegf'] = g**Rational(1, d+1) + if 'egf' not in result: + result['egf'] = exp(integrate(result['lgdegf'], X)) + break + + return result + + +@public +def guess(l, all=False, evaluate=True, niter=2, variables=None): + """ + This function is adapted from the Rate.m package for Mathematica + written by Christian Krattenthaler. + It tries to guess a formula from a given sequence of rational numbers. + + Explanation + =========== + + In order to speed up the process, the 'all' variable is set to False by + default, stopping the computation as some results are returned during an + iteration; the variable can be set to True if more iterations are needed + (other formulas may be found; however they may be equivalent to the first + ones). + + Another option is the 'evaluate' variable (default is True); setting it + to False will leave the involved products unevaluated. + + By default, the number of iterations is set to 2 but a greater value (up + to len(l)-1) can be specified with the optional 'niter' variable. + More and more convoluted results are found when the order of the + iteration gets higher: + + * first iteration returns polynomial or rational functions; + * second iteration returns products of rising factorials and their + inverses; + * third iteration returns products of products of rising factorials + and their inverses; + * etc. + + The returned formulas contain symbols i0, i1, i2, ... where the main + variables is i0 (and auxiliary variables are i1, i2, ...). A list of + other symbols can be provided in the 'variables' option; the length of + the least should be the value of 'niter' (more is acceptable but only + the first symbols will be used); in this case, the main variable will be + the first symbol in the list. + + Examples + ======== + + >>> from sympy.concrete.guess import guess + >>> guess([1,2,6,24,120], evaluate=False) + [Product(i1 + 1, (i1, 1, i0 - 1))] + + >>> from sympy import symbols + >>> r = guess([1,2,7,42,429,7436,218348,10850216], niter=4) + >>> i0 = symbols("i0") + >>> [r[0].subs(i0,n).doit() for n in range(1,10)] + [1, 2, 7, 42, 429, 7436, 218348, 10850216, 911835460] + """ + if any(a==0 for a in l[:-1]): + return [] + N = len(l) + niter = min(N-1, niter) + myprod = product if evaluate else Product + g = [] + res = [] + if variables is None: + symb = symbols('i:'+str(niter)) + else: + symb = variables + for k, s in enumerate(symb): + g.append(l) + n, r = len(l), [] + for i in range(n-2-1, -1, -1): + ri = rinterp(enumerate(g[k][:-1], start=1), i, X=s) + if ((denom(ri).subs({s:n}) != 0) + and (ri.subs({s:n}) - g[k][-1] == 0) + and ri not in r): + r.append(ri) + if r: + for i in range(k-1, -1, -1): + r = [g[i][0] + * myprod(v, (symb[i+1], 1, symb[i]-1)) for v in r] + if not all: return r + res += r + l = [Rational(l[i+1], l[i]) for i in range(N-k-1)] + return res diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/products.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/products.py new file mode 100644 index 0000000000000000000000000000000000000000..dd035551683531f80b0e4467fe1cdfbb6ebbe9ad --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/products.py @@ -0,0 +1,605 @@ +from __future__ import annotations + +from .expr_with_intlimits import ExprWithIntLimits +from .summations import Sum, summation, _dummy_with_inherited_properties_concrete +from sympy.core.expr import Expr +from sympy.core.exprtools import factor_terms +from sympy.core.function import Derivative +from sympy.core.mul import Mul +from sympy.core.singleton import S +from sympy.core.symbol import Dummy, Symbol +from sympy.functions.combinatorial.factorials import RisingFactorial +from sympy.functions.elementary.exponential import exp, log +from sympy.functions.special.tensor_functions import KroneckerDelta +from sympy.polys import quo, roots + + +class Product(ExprWithIntLimits): + r""" + Represents unevaluated products. + + Explanation + =========== + + ``Product`` represents a finite or infinite product, with the first + argument being the general form of terms in the series, and the second + argument being ``(dummy_variable, start, end)``, with ``dummy_variable`` + taking all integer values from ``start`` through ``end``. In accordance + with long-standing mathematical convention, the end term is included in + the product. + + Finite products + =============== + + For finite products (and products with symbolic limits assumed to be finite) + we follow the analogue of the summation convention described by Karr [1], + especially definition 3 of section 1.4. The product: + + .. math:: + + \prod_{m \leq i < n} f(i) + + has *the obvious meaning* for `m < n`, namely: + + .. math:: + + \prod_{m \leq i < n} f(i) = f(m) f(m+1) \cdot \ldots \cdot f(n-2) f(n-1) + + with the upper limit value `f(n)` excluded. The product over an empty set is + one if and only if `m = n`: + + .. math:: + + \prod_{m \leq i < n} f(i) = 1 \quad \mathrm{for} \quad m = n + + Finally, for all other products over empty sets we assume the following + definition: + + .. math:: + + \prod_{m \leq i < n} f(i) = \frac{1}{\prod_{n \leq i < m} f(i)} \quad \mathrm{for} \quad m > n + + It is important to note that above we define all products with the upper + limit being exclusive. This is in contrast to the usual mathematical notation, + but does not affect the product convention. Indeed we have: + + .. math:: + + \prod_{m \leq i < n} f(i) = \prod_{i = m}^{n - 1} f(i) + + where the difference in notation is intentional to emphasize the meaning, + with limits typeset on the top being inclusive. + + Examples + ======== + + >>> from sympy.abc import a, b, i, k, m, n, x + >>> from sympy import Product, oo + >>> Product(k, (k, 1, m)) + Product(k, (k, 1, m)) + >>> Product(k, (k, 1, m)).doit() + factorial(m) + >>> Product(k**2,(k, 1, m)) + Product(k**2, (k, 1, m)) + >>> Product(k**2,(k, 1, m)).doit() + factorial(m)**2 + + Wallis' product for pi: + + >>> W = Product(2*i/(2*i-1) * 2*i/(2*i+1), (i, 1, oo)) + >>> W + Product(4*i**2/((2*i - 1)*(2*i + 1)), (i, 1, oo)) + + Direct computation currently fails: + + >>> W.doit() + Product(4*i**2/((2*i - 1)*(2*i + 1)), (i, 1, oo)) + + But we can approach the infinite product by a limit of finite products: + + >>> from sympy import limit + >>> W2 = Product(2*i/(2*i-1)*2*i/(2*i+1), (i, 1, n)) + >>> W2 + Product(4*i**2/((2*i - 1)*(2*i + 1)), (i, 1, n)) + >>> W2e = W2.doit() + >>> W2e + 4**n*factorial(n)**2/(2**(2*n)*RisingFactorial(1/2, n)*RisingFactorial(3/2, n)) + >>> limit(W2e, n, oo) + pi/2 + + By the same formula we can compute sin(pi/2): + + >>> from sympy import combsimp, pi, gamma, simplify + >>> P = pi * x * Product(1 - x**2/k**2, (k, 1, n)) + >>> P = P.subs(x, pi/2) + >>> P + pi**2*Product(1 - pi**2/(4*k**2), (k, 1, n))/2 + >>> Pe = P.doit() + >>> Pe + pi**2*RisingFactorial(1 - pi/2, n)*RisingFactorial(1 + pi/2, n)/(2*factorial(n)**2) + >>> limit(Pe, n, oo).gammasimp() + sin(pi**2/2) + >>> Pe.rewrite(gamma) + (-1)**n*pi**2*gamma(pi/2)*gamma(n + 1 + pi/2)/(2*gamma(1 + pi/2)*gamma(-n + pi/2)*gamma(n + 1)**2) + + Products with the lower limit being larger than the upper one: + + >>> Product(1/i, (i, 6, 1)).doit() + 120 + >>> Product(i, (i, 2, 5)).doit() + 120 + + The empty product: + + >>> Product(i, (i, n, n-1)).doit() + 1 + + An example showing that the symbolic result of a product is still + valid for seemingly nonsensical values of the limits. Then the Karr + convention allows us to give a perfectly valid interpretation to + those products by interchanging the limits according to the above rules: + + >>> P = Product(2, (i, 10, n)).doit() + >>> P + 2**(n - 9) + >>> P.subs(n, 5) + 1/16 + >>> Product(2, (i, 10, 5)).doit() + 1/16 + >>> 1/Product(2, (i, 6, 9)).doit() + 1/16 + + An explicit example of the Karr summation convention applied to products: + + >>> P1 = Product(x, (i, a, b)).doit() + >>> P1 + x**(-a + b + 1) + >>> P2 = Product(x, (i, b+1, a-1)).doit() + >>> P2 + x**(a - b - 1) + >>> simplify(P1 * P2) + 1 + + And another one: + + >>> P1 = Product(i, (i, b, a)).doit() + >>> P1 + RisingFactorial(b, a - b + 1) + >>> P2 = Product(i, (i, a+1, b-1)).doit() + >>> P2 + RisingFactorial(a + 1, -a + b - 1) + >>> P1 * P2 + RisingFactorial(b, a - b + 1)*RisingFactorial(a + 1, -a + b - 1) + >>> combsimp(P1 * P2) + 1 + + See Also + ======== + + Sum, summation + product + + References + ========== + + .. [1] Michael Karr, "Summation in Finite Terms", Journal of the ACM, + Volume 28 Issue 2, April 1981, Pages 305-350 + https://dl.acm.org/doi/10.1145/322248.322255 + .. [2] https://en.wikipedia.org/wiki/Multiplication#Capital_Pi_notation + .. [3] https://en.wikipedia.org/wiki/Empty_product + """ + + __slots__ = () + + limits: tuple[tuple[Symbol, Expr, Expr]] + + def __new__(cls, function, *symbols, **assumptions): + obj = ExprWithIntLimits.__new__(cls, function, *symbols, **assumptions) + return obj + + def _eval_rewrite_as_Sum(self, *args, **kwargs): + return exp(Sum(log(self.function), *self.limits)) + + @property + def term(self): + return self._args[0] + function = term + + def _eval_is_zero(self): + if self.has_empty_sequence: + return False + + z = self.term.is_zero + if z is True: + return True + if self.has_finite_limits: + # A Product is zero only if its term is zero assuming finite limits. + return z + + def _eval_is_extended_real(self): + if self.has_empty_sequence: + return True + + return self.function.is_extended_real + + def _eval_is_positive(self): + if self.has_empty_sequence: + return True + if self.function.is_positive and self.has_finite_limits: + return True + + def _eval_is_nonnegative(self): + if self.has_empty_sequence: + return True + if self.function.is_nonnegative and self.has_finite_limits: + return True + + def _eval_is_extended_nonnegative(self): + if self.has_empty_sequence: + return True + if self.function.is_extended_nonnegative: + return True + + def _eval_is_extended_nonpositive(self): + if self.has_empty_sequence: + return True + + def _eval_is_finite(self): + if self.has_finite_limits and self.function.is_finite: + return True + + def doit(self, **hints): + # first make sure any definite limits have product + # variables with matching assumptions + reps = {} + for xab in self.limits: + d = _dummy_with_inherited_properties_concrete(xab) + if d: + reps[xab[0]] = d + if reps: + undo = {v: k for k, v in reps.items()} + did = self.xreplace(reps).doit(**hints) + if isinstance(did, tuple): # when separate=True + did = tuple([i.xreplace(undo) for i in did]) + else: + did = did.xreplace(undo) + return did + + from sympy.simplify.powsimp import powsimp + f = self.function + for index, limit in enumerate(self.limits): + i, a, b = limit + dif = b - a + if dif.is_integer and dif.is_negative: + a, b = b + 1, a - 1 + f = 1 / f + + g = self._eval_product(f, (i, a, b)) + if g in (None, S.NaN): + return self.func(powsimp(f), *self.limits[index:]) + else: + f = g + + if hints.get('deep', True): + return f.doit(**hints) + else: + return powsimp(f) + + def _eval_conjugate(self): + return self.func(self.function.conjugate(), *self.limits) + + def _eval_product(self, term, limits): + + (k, a, n) = limits + + if k not in term.free_symbols: + if (term - 1).is_zero: + return S.One + return term**(n - a + 1) + + if a == n: + return term.subs(k, a) + + from .delta import deltaproduct, _has_simple_delta + if term.has(KroneckerDelta) and _has_simple_delta(term, limits[0]): + return deltaproduct(term, limits) + + dif = n - a + definite = dif.is_Integer + if definite and (dif < 100): + return self._eval_product_direct(term, limits) + + elif term.is_polynomial(k): + poly = term.as_poly(k) + + A = B = Q = S.One + + all_roots = roots(poly) + + M = 0 + for r, m in all_roots.items(): + M += m + A *= RisingFactorial(a - r, n - a + 1)**m + Q *= (n - r)**m + + if M < poly.degree(): + arg = quo(poly, Q.as_poly(k)) + B = self.func(arg, (k, a, n)).doit() + + return poly.LC()**(n - a + 1) * A * B + + elif term.is_Add: + factored = factor_terms(term, fraction=True) + if factored.is_Mul: + return self._eval_product(factored, (k, a, n)) + + elif term.is_Mul: + # Factor in part without the summation variable and part with + without_k, with_k = term.as_coeff_mul(k) + + if len(with_k) >= 2: + # More than one term including k, so still a multiplication + exclude, include = [], [] + for t in with_k: + p = self._eval_product(t, (k, a, n)) + + if p is not None: + exclude.append(p) + else: + include.append(t) + + if not exclude: + return None + else: + arg = term._new_rawargs(*include) + A = Mul(*exclude) + B = self.func(arg, (k, a, n)).doit() + return without_k**(n - a + 1)*A * B + else: + # Just a single term + p = self._eval_product(with_k[0], (k, a, n)) + if p is None: + p = self.func(with_k[0], (k, a, n)).doit() + return without_k**(n - a + 1)*p + + + elif term.is_Pow: + if not term.base.has(k): + s = summation(term.exp, (k, a, n)) + + return term.base**s + elif not term.exp.has(k): + p = self._eval_product(term.base, (k, a, n)) + + if p is not None: + return p**term.exp + + elif isinstance(term, Product): + evaluated = term.doit() + f = self._eval_product(evaluated, limits) + if f is None: + return self.func(evaluated, limits) + else: + return f + + if definite: + return self._eval_product_direct(term, limits) + + def _eval_simplify(self, **kwargs): + from sympy.simplify.simplify import product_simplify + rv = product_simplify(self, **kwargs) + return rv.doit() if kwargs['doit'] else rv + + def _eval_transpose(self): + if self.is_commutative: + return self.func(self.function.transpose(), *self.limits) + return None + + def _eval_product_direct(self, term, limits): + (k, a, n) = limits + return Mul(*[term.subs(k, a + i) for i in range(n - a + 1)]) + + def _eval_derivative(self, x): + if isinstance(x, Symbol) and x not in self.free_symbols: + return S.Zero + f, limits = self.function, list(self.limits) + limit = limits.pop(-1) + if limits: + f = self.func(f, *limits) + i, a, b = limit + if x in a.free_symbols or x in b.free_symbols: + return None + h = Dummy() + rv = Sum( Product(f, (i, a, h - 1)) * Product(f, (i, h + 1, b)) * Derivative(f, x, evaluate=True).subs(i, h), (h, a, b)) + return rv + + def is_convergent(self): + r""" + See docs of :obj:`.Sum.is_convergent()` for explanation of convergence + in SymPy. + + Explanation + =========== + + The infinite product: + + .. math:: + + \prod_{1 \leq i < \infty} f(i) + + is defined by the sequence of partial products: + + .. math:: + + \prod_{i=1}^{n} f(i) = f(1) f(2) \cdots f(n) + + as n increases without bound. The product converges to a non-zero + value if and only if the sum: + + .. math:: + + \sum_{1 \leq i < \infty} \log{f(n)} + + converges. + + Examples + ======== + + >>> from sympy import Product, Symbol, cos, pi, exp, oo + >>> n = Symbol('n', integer=True) + >>> Product(n/(n + 1), (n, 1, oo)).is_convergent() + False + >>> Product(1/n**2, (n, 1, oo)).is_convergent() + False + >>> Product(cos(pi/n), (n, 1, oo)).is_convergent() + True + >>> Product(exp(-n**2), (n, 1, oo)).is_convergent() + False + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Infinite_product + """ + sequence_term = self.function + log_sum = log(sequence_term) + lim = self.limits + try: + is_conv = Sum(log_sum, *lim).is_convergent() + except NotImplementedError: + if Sum(sequence_term - 1, *lim).is_absolutely_convergent() is S.true: + return S.true + raise NotImplementedError("The algorithm to find the product convergence of %s " + "is not yet implemented" % (sequence_term)) + return is_conv + + def reverse_order(expr, *indices): + """ + Reverse the order of a limit in a Product. + + Explanation + =========== + + ``reverse_order(expr, *indices)`` reverses some limits in the expression + ``expr`` which can be either a ``Sum`` or a ``Product``. The selectors in + the argument ``indices`` specify some indices whose limits get reversed. + These selectors are either variable names or numerical indices counted + starting from the inner-most limit tuple. + + Examples + ======== + + >>> from sympy import gamma, Product, simplify, Sum + >>> from sympy.abc import x, y, a, b, c, d + >>> P = Product(x, (x, a, b)) + >>> Pr = P.reverse_order(x) + >>> Pr + Product(1/x, (x, b + 1, a - 1)) + >>> Pr = Pr.doit() + >>> Pr + 1/RisingFactorial(b + 1, a - b - 1) + >>> simplify(Pr.rewrite(gamma)) + Piecewise((gamma(b + 1)/gamma(a), b > -1), ((-1)**(-a + b + 1)*gamma(1 - a)/gamma(-b), True)) + >>> P = P.doit() + >>> P + RisingFactorial(a, -a + b + 1) + >>> simplify(P.rewrite(gamma)) + Piecewise((gamma(b + 1)/gamma(a), a > 0), ((-1)**(-a + b + 1)*gamma(1 - a)/gamma(-b), True)) + + While one should prefer variable names when specifying which limits + to reverse, the index counting notation comes in handy in case there + are several symbols with the same name. + + >>> S = Sum(x*y, (x, a, b), (y, c, d)) + >>> S + Sum(x*y, (x, a, b), (y, c, d)) + >>> S0 = S.reverse_order(0) + >>> S0 + Sum(-x*y, (x, b + 1, a - 1), (y, c, d)) + >>> S1 = S0.reverse_order(1) + >>> S1 + Sum(x*y, (x, b + 1, a - 1), (y, d + 1, c - 1)) + + Of course we can mix both notations: + + >>> Sum(x*y, (x, a, b), (y, 2, 5)).reverse_order(x, 1) + Sum(x*y, (x, b + 1, a - 1), (y, 6, 1)) + >>> Sum(x*y, (x, a, b), (y, 2, 5)).reverse_order(y, x) + Sum(x*y, (x, b + 1, a - 1), (y, 6, 1)) + + See Also + ======== + + sympy.concrete.expr_with_intlimits.ExprWithIntLimits.index, + reorder_limit, + sympy.concrete.expr_with_intlimits.ExprWithIntLimits.reorder + + References + ========== + + .. [1] Michael Karr, "Summation in Finite Terms", Journal of the ACM, + Volume 28 Issue 2, April 1981, Pages 305-350 + https://dl.acm.org/doi/10.1145/322248.322255 + + """ + l_indices = list(indices) + + for i, indx in enumerate(l_indices): + if not isinstance(indx, int): + l_indices[i] = expr.index(indx) + + e = 1 + limits = [] + for i, limit in enumerate(expr.limits): + l = limit + if i in l_indices: + e = -e + l = (limit[0], limit[2] + 1, limit[1] - 1) + limits.append(l) + + return Product(expr.function ** e, *limits) + + +def product(*args, **kwargs): + r""" + Compute the product. + + Explanation + =========== + + The notation for symbols is similar to the notation used in Sum or + Integral. product(f, (i, a, b)) computes the product of f with + respect to i from a to b, i.e., + + :: + + b + _____ + product(f(n), (i, a, b)) = | | f(n) + | | + i = a + + If it cannot compute the product, it returns an unevaluated Product object. + Repeated products can be computed by introducing additional symbols tuples:: + + Examples + ======== + + >>> from sympy import product, symbols + >>> i, n, m, k = symbols('i n m k', integer=True) + + >>> product(i, (i, 1, k)) + factorial(k) + >>> product(m, (i, 1, k)) + m**k + >>> product(i, (i, 1, k), (k, 1, n)) + Product(factorial(k), (k, 1, n)) + + """ + + prod = Product(*args, **kwargs) + + if isinstance(prod, Product): + return prod.doit(deep=False) + else: + return prod diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/summations.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/summations.py new file mode 100644 index 0000000000000000000000000000000000000000..96bdbd69b7820798fade4bc5ec145172b95947ef --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/summations.py @@ -0,0 +1,1659 @@ +from __future__ import annotations + +from sympy.calculus.singularities import is_decreasing +from sympy.calculus.accumulationbounds import AccumulationBounds +from .expr_with_intlimits import ExprWithIntLimits +from .expr_with_limits import AddWithLimits +from .gosper import gosper_sum +from sympy.core.expr import Expr +from sympy.core.add import Add +from sympy.core.containers import Tuple +from sympy.core.function import Derivative, expand +from sympy.core.mul import Mul +from sympy.core.numbers import Float, _illegal +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.sorting import ordered +from sympy.core.symbol import Dummy, Wild, Symbol, symbols +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.combinatorial.numbers import bernoulli, harmonic +from sympy.functions.elementary.complexes import re +from sympy.functions.elementary.exponential import exp, log +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import cot, csc +from sympy.functions.special.hyper import hyper +from sympy.functions.special.tensor_functions import KroneckerDelta +from sympy.functions.special.zeta_functions import zeta +from sympy.integrals.integrals import Integral +from sympy.logic.boolalg import And, Not +from sympy.polys.partfrac import apart +from sympy.polys.polyerrors import PolynomialError, PolificationFailed +from sympy.polys.polytools import parallel_poly_from_expr, Poly, factor +from sympy.polys.rationaltools import together +from sympy.series.limitseq import limit_seq +from sympy.series.order import O +from sympy.series.residues import residue +from sympy.sets.contains import Contains +from sympy.sets.sets import FiniteSet, Interval +from sympy.utilities.iterables import sift +import itertools + + +class Sum(AddWithLimits, ExprWithIntLimits): + r""" + Represents unevaluated summation. + + Explanation + =========== + + ``Sum`` represents a finite or infinite series, with the first argument + being the general form of terms in the series, and the second argument + being ``(dummy_variable, start, end)``, with ``dummy_variable`` taking + all integer values from ``start`` through ``end``. In accordance with + long-standing mathematical convention, the end term is included in the + summation. + + Finite sums + =========== + + For finite sums (and sums with symbolic limits assumed to be finite) we + follow the summation convention described by Karr [1], especially + definition 3 of section 1.4. The sum: + + .. math:: + + \sum_{m \leq i < n} f(i) + + has *the obvious meaning* for `m < n`, namely: + + .. math:: + + \sum_{m \leq i < n} f(i) = f(m) + f(m+1) + \ldots + f(n-2) + f(n-1) + + with the upper limit value `f(n)` excluded. The sum over an empty set is + zero if and only if `m = n`: + + .. math:: + + \sum_{m \leq i < n} f(i) = 0 \quad \mathrm{for} \quad m = n + + Finally, for all other sums over empty sets we assume the following + definition: + + .. math:: + + \sum_{m \leq i < n} f(i) = - \sum_{n \leq i < m} f(i) \quad \mathrm{for} \quad m > n + + It is important to note that Karr defines all sums with the upper + limit being exclusive. This is in contrast to the usual mathematical notation, + but does not affect the summation convention. Indeed we have: + + .. math:: + + \sum_{m \leq i < n} f(i) = \sum_{i = m}^{n - 1} f(i) + + where the difference in notation is intentional to emphasize the meaning, + with limits typeset on the top being inclusive. + + Examples + ======== + + >>> from sympy.abc import i, k, m, n, x + >>> from sympy import Sum, factorial, oo, IndexedBase, Function + >>> Sum(k, (k, 1, m)) + Sum(k, (k, 1, m)) + >>> Sum(k, (k, 1, m)).doit() + m**2/2 + m/2 + >>> Sum(k**2, (k, 1, m)) + Sum(k**2, (k, 1, m)) + >>> Sum(k**2, (k, 1, m)).doit() + m**3/3 + m**2/2 + m/6 + >>> Sum(x**k, (k, 0, oo)) + Sum(x**k, (k, 0, oo)) + >>> Sum(x**k, (k, 0, oo)).doit() + Piecewise((1/(1 - x), Abs(x) < 1), (Sum(x**k, (k, 0, oo)), True)) + >>> Sum(x**k/factorial(k), (k, 0, oo)).doit() + exp(x) + + Here are examples to do summation with symbolic indices. You + can use either Function of IndexedBase classes: + + >>> f = Function('f') + >>> Sum(f(n), (n, 0, 3)).doit() + f(0) + f(1) + f(2) + f(3) + >>> Sum(f(n), (n, 0, oo)).doit() + Sum(f(n), (n, 0, oo)) + >>> f = IndexedBase('f') + >>> Sum(f[n]**2, (n, 0, 3)).doit() + f[0]**2 + f[1]**2 + f[2]**2 + f[3]**2 + + An example showing that the symbolic result of a summation is still + valid for seemingly nonsensical values of the limits. Then the Karr + convention allows us to give a perfectly valid interpretation to + those sums by interchanging the limits according to the above rules: + + >>> S = Sum(i, (i, 1, n)).doit() + >>> S + n**2/2 + n/2 + >>> S.subs(n, -4) + 6 + >>> Sum(i, (i, 1, -4)).doit() + 6 + >>> Sum(-i, (i, -3, 0)).doit() + 6 + + An explicit example of the Karr summation convention: + + >>> S1 = Sum(i**2, (i, m, m+n-1)).doit() + >>> S1 + m**2*n + m*n**2 - m*n + n**3/3 - n**2/2 + n/6 + >>> S2 = Sum(i**2, (i, m+n, m-1)).doit() + >>> S2 + -m**2*n - m*n**2 + m*n - n**3/3 + n**2/2 - n/6 + >>> S1 + S2 + 0 + >>> S3 = Sum(i, (i, m, m-1)).doit() + >>> S3 + 0 + + See Also + ======== + + summation + Product, sympy.concrete.products.product + + References + ========== + + .. [1] Michael Karr, "Summation in Finite Terms", Journal of the ACM, + Volume 28 Issue 2, April 1981, Pages 305-350 + https://dl.acm.org/doi/10.1145/322248.322255 + .. [2] https://en.wikipedia.org/wiki/Summation#Capital-sigma_notation + .. [3] https://en.wikipedia.org/wiki/Empty_sum + """ + + __slots__ = () + + limits: tuple[tuple[Symbol, Expr, Expr]] + + def __new__(cls, function, *symbols, **assumptions): + obj = AddWithLimits.__new__(cls, function, *symbols, **assumptions) + if not hasattr(obj, 'limits'): + return obj + if any(len(l) != 3 or None in l for l in obj.limits): + raise ValueError('Sum requires values for lower and upper bounds.') + + return obj + + def _eval_is_zero(self): + # a Sum is only zero if its function is zero or if all terms + # cancel out. This only answers whether the summand is zero; if + # not then None is returned since we don't analyze whether all + # terms cancel out. + if self.function.is_zero or self.has_empty_sequence: + return True + + def _eval_is_extended_real(self): + if self.has_empty_sequence: + return True + return self.function.is_extended_real + + def _eval_is_positive(self): + if self.has_finite_limits and self.has_reversed_limits is False: + return self.function.is_positive + + def _eval_is_negative(self): + if self.has_finite_limits and self.has_reversed_limits is False: + return self.function.is_negative + + def _eval_is_finite(self): + if self.has_finite_limits and self.function.is_finite: + return True + + def doit(self, **hints): + if hints.get('deep', True): + f = self.function.doit(**hints) + else: + f = self.function + + # first make sure any definite limits have summation + # variables with matching assumptions + reps = {} + for xab in self.limits: + d = _dummy_with_inherited_properties_concrete(xab) + if d: + reps[xab[0]] = d + if reps: + undo = {v: k for k, v in reps.items()} + did = self.xreplace(reps).doit(**hints) + if isinstance(did, tuple): # when separate=True + did = tuple([i.xreplace(undo) for i in did]) + elif did is not None: + did = did.xreplace(undo) + else: + did = self + return did + + + if self.function.is_Matrix: + expanded = self.expand() + if self != expanded: + return expanded.doit() + return _eval_matrix_sum(self) + + for n, limit in enumerate(self.limits): + i, a, b = limit + dif = b - a + if dif == -1: + # Any summation over an empty set is zero + return S.Zero + if dif.is_integer and dif.is_negative: + a, b = b + 1, a - 1 + f = -f + + newf = eval_sum(f, (i, a, b)) + if newf is None: + if f == self.function: + zeta_function = self.eval_zeta_function(f, (i, a, b)) + if zeta_function is not None: + return zeta_function + return self + else: + return self.func(f, *self.limits[n:]) + f = newf + + if hints.get('deep', True): + # eval_sum could return partially unevaluated + # result with Piecewise. In this case we won't + # doit() recursively. + if not isinstance(f, Piecewise): + return f.doit(**hints) + + return f + + def eval_zeta_function(self, f, limits): + """ + Check whether the function matches with the zeta function. + + If it matches, then return a `Piecewise` expression because + zeta function does not converge unless `s > 1` and `q > 0` + """ + i, a, b = limits + if a.is_comparable and b.is_comparable and a > b: + return self.eval_zeta_function(f, (i, b + S.One, a - S.One)) + if b is not S.Infinity: + return + w, y, z = Wild('w', exclude=[i]), Wild('y', exclude=[i]), Wild('z', exclude=[i]) + if result := f.match((w * i + y) ** (-z)): + coeff = 1 / result[w] ** result[z] + s = result[z] + q = result[y] / result[w] + a + return Piecewise((coeff * zeta(s, q), + And(Not(Contains(-q, S.Naturals0)), re(s) > S.One)), + (self, True)) + + def _eval_derivative(self, x): + """ + Differentiate wrt x as long as x is not in the free symbols of any of + the upper or lower limits. + + Explanation + =========== + + Sum(a*b*x, (x, 1, a)) can be differentiated wrt x or b but not `a` + since the value of the sum is discontinuous in `a`. In a case + involving a limit variable, the unevaluated derivative is returned. + """ + + # diff already confirmed that x is in the free symbols of self, but we + # don't want to differentiate wrt any free symbol in the upper or lower + # limits + # XXX remove this test for free_symbols when the default _eval_derivative is in + if isinstance(x, Symbol) and x not in self.free_symbols: + return S.Zero + + # get limits and the function + f, limits = self.function, list(self.limits) + + limit = limits.pop(-1) + + if limits: # f is the argument to a Sum + f = self.func(f, *limits) + + _, a, b = limit + if x in a.free_symbols or x in b.free_symbols: + return None + df = Derivative(f, x, evaluate=True) + rv = self.func(df, limit) + return rv + + def _eval_difference_delta(self, n, step): + k, _, upper = self.args[-1] + new_upper = upper.subs(n, n + step) + + if len(self.args) == 2: + f = self.args[0] + else: + f = self.func(*self.args[:-1]) + + return Sum(f, (k, upper + 1, new_upper)).doit() + + def _eval_simplify(self, **kwargs): + + function = self.function + + if kwargs.get('deep', True): + function = function.simplify(**kwargs) + + # split the function into adds + terms = Add.make_args(expand(function)) + s_t = [] # Sum Terms + o_t = [] # Other Terms + + for term in terms: + if term.has(Sum): + # if there is an embedded sum here + # it is of the form x * (Sum(whatever)) + # hence we make a Mul out of it, and simplify all interior sum terms + subterms = Mul.make_args(expand(term)) + out_terms = [] + for subterm in subterms: + # go through each term + if isinstance(subterm, Sum): + # if it's a sum, simplify it + out_terms.append(subterm._eval_simplify(**kwargs)) + else: + # otherwise, add it as is + out_terms.append(subterm) + + # turn it back into a Mul + s_t.append(Mul(*out_terms)) + else: + o_t.append(term) + + # next try to combine any interior sums for further simplification + from sympy.simplify.simplify import factor_sum, sum_combine + result = Add(sum_combine(s_t), *o_t) + + return factor_sum(result, limits=self.limits) + + def is_convergent(self): + r""" + Checks for the convergence of a Sum. + + Explanation + =========== + + We divide the study of convergence of infinite sums and products in + two parts. + + First Part: + One part is the question whether all the terms are well defined, i.e., + they are finite in a sum and also non-zero in a product. Zero + is the analogy of (minus) infinity in products as + :math:`e^{-\infty} = 0`. + + Second Part: + The second part is the question of convergence after infinities, + and zeros in products, have been omitted assuming that their number + is finite. This means that we only consider the tail of the sum or + product, starting from some point after which all terms are well + defined. + + For example, in a sum of the form: + + .. math:: + + \sum_{1 \leq i < \infty} \frac{1}{n^2 + an + b} + + where a and b are numbers. The routine will return true, even if there + are infinities in the term sequence (at most two). An analogous + product would be: + + .. math:: + + \prod_{1 \leq i < \infty} e^{\frac{1}{n^2 + an + b}} + + This is how convergence is interpreted. It is concerned with what + happens at the limit. Finding the bad terms is another independent + matter. + + Note: It is responsibility of user to see that the sum or product + is well defined. + + There are various tests employed to check the convergence like + divergence test, root test, integral test, alternating series test, + comparison tests, Dirichlet tests. It returns true if Sum is convergent + and false if divergent and NotImplementedError if it cannot be checked. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Convergence_tests + + Examples + ======== + + >>> from sympy import factorial, S, Sum, Symbol, oo + >>> n = Symbol('n', integer=True) + >>> Sum(n/(n - 1), (n, 4, 7)).is_convergent() + True + >>> Sum(n/(2*n + 1), (n, 1, oo)).is_convergent() + False + >>> Sum(factorial(n)/5**n, (n, 1, oo)).is_convergent() + False + >>> Sum(1/n**(S(6)/5), (n, 1, oo)).is_convergent() + True + + See Also + ======== + + Sum.is_absolutely_convergent + sympy.concrete.products.Product.is_convergent + """ + p, q, r = symbols('p q r', cls=Wild) + + sym = self.limits[0][0] + lower_limit = self.limits[0][1] + upper_limit = self.limits[0][2] + sequence_term = self.function.simplify() + + if len(sequence_term.free_symbols) > 1: + raise NotImplementedError("convergence checking for more than one symbol " + "containing series is not handled") + + if lower_limit.is_finite and upper_limit.is_finite: + return S.true + + # transform sym -> -sym and swap the upper_limit = S.Infinity + # and lower_limit = - upper_limit + if lower_limit is S.NegativeInfinity: + if upper_limit is S.Infinity: + return Sum(sequence_term, (sym, 0, S.Infinity)).is_convergent() and \ + Sum(sequence_term, (sym, S.NegativeInfinity, 0)).is_convergent() + from sympy.simplify.simplify import simplify + sequence_term = simplify(sequence_term.xreplace({sym: -sym})) + lower_limit = -upper_limit + upper_limit = S.Infinity + + sym_ = Dummy(sym.name, integer=True, positive=True) + sequence_term = sequence_term.xreplace({sym: sym_}) + sym = sym_ + + interval = Interval(lower_limit, upper_limit) + + # Piecewise function handle + if sequence_term.is_Piecewise: + for func, cond in sequence_term.args: + # see if it represents something going to oo + if cond == True or cond.as_set().sup is S.Infinity: + s = Sum(func, (sym, lower_limit, upper_limit)) + return s.is_convergent() + return S.true + + ### -------- Divergence test ----------- ### + try: + lim_val = limit_seq(sequence_term, sym) + if lim_val is not None and lim_val.is_zero is False: + return S.false + except NotImplementedError: + pass + + try: + lim_val_abs = limit_seq(abs(sequence_term), sym) + if lim_val_abs is not None and lim_val_abs.is_zero is False: + return S.false + except NotImplementedError: + pass + + order = O(sequence_term, (sym, S.Infinity)) + + ### --------- p-series test (1/n**p) ---------- ### + p_series_test = order.expr.match(sym**p) + if p_series_test is not None: + if p_series_test[p] < -1: + return S.true + if p_series_test[p] >= -1: + return S.false + + ### ------------- comparison test ------------- ### + # 1/(n**p*log(n)**q*log(log(n))**r) comparison + n_log_test = (order.expr.match(1/(sym**p*log(1/sym)**q*log(-log(1/sym))**r)) or + order.expr.match(1/(sym**p*(-log(1/sym))**q*log(-log(1/sym))**r))) + if n_log_test is not None: + if (n_log_test[p] > 1 or + (n_log_test[p] == 1 and n_log_test[q] > 1) or + (n_log_test[p] == n_log_test[q] == 1 and n_log_test[r] > 1)): + return S.true + return S.false + + ### ------------- Limit comparison test -----------### + # (1/n) comparison + try: + lim_comp = limit_seq(sym*sequence_term, sym) + if lim_comp is not None and lim_comp.is_number and lim_comp > 0: + return S.false + except NotImplementedError: + pass + + ### ----------- ratio test ---------------- ### + next_sequence_term = sequence_term.xreplace({sym: sym + 1}) + from sympy.simplify.combsimp import combsimp + from sympy.simplify.powsimp import powsimp + ratio = combsimp(powsimp(next_sequence_term/sequence_term)) + try: + lim_ratio = limit_seq(ratio, sym) + if lim_ratio is not None and lim_ratio.is_number and lim_ratio is not S.NaN: + if abs(lim_ratio) > 1: + return S.false + if abs(lim_ratio) < 1: + return S.true + except NotImplementedError: + lim_ratio = None + + ### ---------- Raabe's test -------------- ### + if lim_ratio == 1: # ratio test inconclusive + test_val = sym*(sequence_term/ + sequence_term.subs(sym, sym + 1) - 1) + test_val = test_val.gammasimp() + try: + lim_val = limit_seq(test_val, sym) + if lim_val is not None and lim_val.is_number: + if lim_val > 1: + return S.true + if lim_val < 1: + return S.false + except NotImplementedError: + pass + + ### ----------- root test ---------------- ### + # lim = Limit(abs(sequence_term)**(1/sym), sym, S.Infinity) + try: + lim_evaluated = limit_seq(abs(sequence_term)**(1/sym), sym) + if lim_evaluated is not None and lim_evaluated.is_number: + if lim_evaluated < 1: + return S.true + if lim_evaluated > 1: + return S.false + except NotImplementedError: + pass + + ### ------------- alternating series test ----------- ### + dict_val = sequence_term.match(S.NegativeOne**(sym + p)*q) + if not dict_val[p].has(sym) and is_decreasing(dict_val[q], interval): + return S.true + + ### ------------- integral test -------------- ### + check_interval = None + from sympy.solvers.solveset import solveset + maxima = solveset(sequence_term.diff(sym), sym, interval) + if not maxima: + check_interval = interval + elif isinstance(maxima, FiniteSet) and maxima.sup.is_number: + check_interval = Interval(maxima.sup, interval.sup) + if (check_interval is not None and + (is_decreasing(sequence_term, check_interval) or + is_decreasing(-sequence_term, check_interval))): + integral_val = Integral( + sequence_term, (sym, lower_limit, upper_limit)) + try: + integral_val_evaluated = integral_val.doit() + if integral_val_evaluated.is_number: + return S(integral_val_evaluated.is_finite) + except NotImplementedError: + pass + + ### ----- Dirichlet and bounded times convergent tests ----- ### + # TODO + # + # Dirichlet_test + # https://en.wikipedia.org/wiki/Dirichlet%27s_test + # + # Bounded times convergent test + # It is based on comparison theorems for series. + # In particular, if the general term of a series can + # be written as a product of two terms a_n and b_n + # and if a_n is bounded and if Sum(b_n) is absolutely + # convergent, then the original series Sum(a_n * b_n) + # is absolutely convergent and so convergent. + # + # The following code can grows like 2**n where n is the + # number of args in order.expr + # Possibly combined with the potentially slow checks + # inside the loop, could make this test extremely slow + # for larger summation expressions. + + if order.expr.is_Mul: + args = order.expr.args + argset = set(args) + + ### -------------- Dirichlet tests -------------- ### + m = Dummy('m', integer=True) + def _dirichlet_test(g_n): + try: + ing_val = limit_seq(Sum(g_n, (sym, interval.inf, m)).doit(), m) + if ing_val is not None and ing_val.is_finite: + return S.true + except NotImplementedError: + pass + + ### -------- bounded times convergent test ---------### + def _bounded_convergent_test(g1_n, g2_n): + try: + lim_val = limit_seq(g1_n, sym) + if lim_val is not None and (lim_val.is_finite or ( + isinstance(lim_val, AccumulationBounds) + and (lim_val.max - lim_val.min).is_finite)): + if Sum(g2_n, (sym, lower_limit, upper_limit)).is_absolutely_convergent(): + return S.true + except NotImplementedError: + pass + + for n in range(1, len(argset)): + for a_tuple in itertools.combinations(args, n): + b_set = argset - set(a_tuple) + a_n = Mul(*a_tuple) + b_n = Mul(*b_set) + + if is_decreasing(a_n, interval): + dirich = _dirichlet_test(b_n) + if dirich is not None: + return dirich + + bc_test = _bounded_convergent_test(a_n, b_n) + if bc_test is not None: + return bc_test + + _sym = self.limits[0][0] + sequence_term = sequence_term.xreplace({sym: _sym}) + raise NotImplementedError("The algorithm to find the Sum convergence of %s " + "is not yet implemented" % (sequence_term)) + + def is_absolutely_convergent(self): + """ + Checks for the absolute convergence of an infinite series. + + Same as checking convergence of absolute value of sequence_term of + an infinite series. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Absolute_convergence + + Examples + ======== + + >>> from sympy import Sum, Symbol, oo + >>> n = Symbol('n', integer=True) + >>> Sum((-1)**n, (n, 1, oo)).is_absolutely_convergent() + False + >>> Sum((-1)**n/n**2, (n, 1, oo)).is_absolutely_convergent() + True + + See Also + ======== + + Sum.is_convergent + """ + return Sum(abs(self.function), self.limits).is_convergent() + + def euler_maclaurin(self, m=0, n=0, eps=0, eval_integral=True): + """ + Return an Euler-Maclaurin approximation of self, where m is the + number of leading terms to sum directly and n is the number of + terms in the tail. + + With m = n = 0, this is simply the corresponding integral + plus a first-order endpoint correction. + + Returns (s, e) where s is the Euler-Maclaurin approximation + and e is the estimated error (taken to be the magnitude of + the first omitted term in the tail): + + >>> from sympy.abc import k, a, b + >>> from sympy import Sum + >>> Sum(1/k, (k, 2, 5)).doit().evalf() + 1.28333333333333 + >>> s, e = Sum(1/k, (k, 2, 5)).euler_maclaurin() + >>> s + -log(2) + 7/20 + log(5) + >>> from sympy import sstr + >>> print(sstr((s.evalf(), e.evalf()), full_prec=True)) + (1.26629073187415, 0.0175000000000000) + + The endpoints may be symbolic: + + >>> s, e = Sum(1/k, (k, a, b)).euler_maclaurin() + >>> s + -log(a) + log(b) + 1/(2*b) + 1/(2*a) + >>> e + Abs(1/(12*b**2) - 1/(12*a**2)) + + If the function is a polynomial of degree at most 2n+1, the + Euler-Maclaurin formula becomes exact (and e = 0 is returned): + + >>> Sum(k, (k, 2, b)).euler_maclaurin() + (b**2/2 + b/2 - 1, 0) + >>> Sum(k, (k, 2, b)).doit() + b**2/2 + b/2 - 1 + + With a nonzero eps specified, the summation is ended + as soon as the remainder term is less than the epsilon. + """ + m = int(m) + n = int(n) + f = self.function + if len(self.limits) != 1: + raise ValueError("More than 1 limit") + i, a, b = self.limits[0] + if (a > b) == True: + if a - b == 1: + return S.Zero, S.Zero + a, b = b + 1, a - 1 + f = -f + s = S.Zero + if m: + if b.is_Integer and a.is_Integer: + m = min(m, b - a + 1) + if not eps or f.is_polynomial(i): + s = Add(*[f.subs(i, a + k) for k in range(m)]) + else: + term = f.subs(i, a) + if term: + test = abs(term.evalf(3)) < eps + if test == True: + return s, abs(term) + elif not (test == False): + # a symbolic Relational class, can't go further + return term, S.Zero + s = term + for k in range(1, m): + term = f.subs(i, a + k) + if abs(term.evalf(3)) < eps and term != 0: + return s, abs(term) + s += term + if b - a + 1 == m: + return s, S.Zero + a += m + x = Dummy('x') + I = Integral(f.subs(i, x), (x, a, b)) + if eval_integral: + I = I.doit() + s += I + + def fpoint(expr): + if b is S.Infinity: + return expr.subs(i, a), 0 + return expr.subs(i, a), expr.subs(i, b) + fa, fb = fpoint(f) + iterm = (fa + fb)/2 + g = f.diff(i) + for k in range(1, n + 2): + ga, gb = fpoint(g) + term = bernoulli(2*k)/factorial(2*k)*(gb - ga) + if k > n: + break + if eps and term: + term_evalf = term.evalf(3) + if term_evalf is S.NaN: + return S.NaN, S.NaN + if abs(term_evalf) < eps: + break + s += term + g = g.diff(i, 2, simplify=False) + return s + iterm, abs(term) + + + def reverse_order(self, *indices): + """ + Reverse the order of a limit in a Sum. + + Explanation + =========== + + ``reverse_order(self, *indices)`` reverses some limits in the expression + ``self`` which can be either a ``Sum`` or a ``Product``. The selectors in + the argument ``indices`` specify some indices whose limits get reversed. + These selectors are either variable names or numerical indices counted + starting from the inner-most limit tuple. + + Examples + ======== + + >>> from sympy import Sum + >>> from sympy.abc import x, y, a, b, c, d + + >>> Sum(x, (x, 0, 3)).reverse_order(x) + Sum(-x, (x, 4, -1)) + >>> Sum(x*y, (x, 1, 5), (y, 0, 6)).reverse_order(x, y) + Sum(x*y, (x, 6, 0), (y, 7, -1)) + >>> Sum(x, (x, a, b)).reverse_order(x) + Sum(-x, (x, b + 1, a - 1)) + >>> Sum(x, (x, a, b)).reverse_order(0) + Sum(-x, (x, b + 1, a - 1)) + + While one should prefer variable names when specifying which limits + to reverse, the index counting notation comes in handy in case there + are several symbols with the same name. + + >>> S = Sum(x**2, (x, a, b), (x, c, d)) + >>> S + Sum(x**2, (x, a, b), (x, c, d)) + >>> S0 = S.reverse_order(0) + >>> S0 + Sum(-x**2, (x, b + 1, a - 1), (x, c, d)) + >>> S1 = S0.reverse_order(1) + >>> S1 + Sum(x**2, (x, b + 1, a - 1), (x, d + 1, c - 1)) + + Of course we can mix both notations: + + >>> Sum(x*y, (x, a, b), (y, 2, 5)).reverse_order(x, 1) + Sum(x*y, (x, b + 1, a - 1), (y, 6, 1)) + >>> Sum(x*y, (x, a, b), (y, 2, 5)).reverse_order(y, x) + Sum(x*y, (x, b + 1, a - 1), (y, 6, 1)) + + See Also + ======== + + sympy.concrete.expr_with_intlimits.ExprWithIntLimits.index, reorder_limit, + sympy.concrete.expr_with_intlimits.ExprWithIntLimits.reorder + + References + ========== + + .. [1] Michael Karr, "Summation in Finite Terms", Journal of the ACM, + Volume 28 Issue 2, April 1981, Pages 305-350 + https://dl.acm.org/doi/10.1145/322248.322255 + """ + l_indices = list(indices) + + for i, indx in enumerate(l_indices): + if not isinstance(indx, int): + l_indices[i] = self.index(indx) + + e = 1 + limits = [] + for i, limit in enumerate(self.limits): + l = limit + if i in l_indices: + e = -e + l = (limit[0], limit[2] + 1, limit[1] - 1) + limits.append(l) + + return Sum(e * self.function, *limits) + + def _eval_rewrite_as_Product(self, *args, **kwargs): + from sympy.concrete.products import Product + if self.function.is_extended_real: + return log(Product(exp(self.function), *self.limits)) + + +def summation(f, *symbols, **kwargs): + r""" + Compute the summation of f with respect to symbols. + + Explanation + =========== + + The notation for symbols is similar to the notation used in Integral. + summation(f, (i, a, b)) computes the sum of f with respect to i from a to b, + i.e., + + :: + + b + ____ + \ ` + summation(f, (i, a, b)) = ) f + /___, + i = a + + If it cannot compute the sum, it returns an unevaluated Sum object. + Repeated sums can be computed by introducing additional symbols tuples:: + + Examples + ======== + + >>> from sympy import summation, oo, symbols, log + >>> i, n, m = symbols('i n m', integer=True) + + >>> summation(2*i - 1, (i, 1, n)) + n**2 + >>> summation(1/2**i, (i, 0, oo)) + 2 + >>> summation(1/log(n)**n, (n, 2, oo)) + Sum(log(n)**(-n), (n, 2, oo)) + >>> summation(i, (i, 0, n), (n, 0, m)) + m**3/6 + m**2/2 + m/3 + + >>> from sympy.abc import x + >>> from sympy import factorial + >>> summation(x**n/factorial(n), (n, 0, oo)) + exp(x) + + See Also + ======== + + Sum + Product, sympy.concrete.products.product + + """ + return Sum(f, *symbols, **kwargs).doit(deep=False) + + +def telescopic_direct(L, R, n, limits): + """ + Returns the direct summation of the terms of a telescopic sum + + Explanation + =========== + + L is the term with lower index + R is the term with higher index + n difference between the indexes of L and R + + Examples + ======== + + >>> from sympy.concrete.summations import telescopic_direct + >>> from sympy.abc import k, a, b + >>> telescopic_direct(1/k, -1/(k+2), 2, (k, a, b)) + -1/(b + 2) - 1/(b + 1) + 1/(a + 1) + 1/a + + """ + (i, a, b) = limits + return Add(*[L.subs(i, a + m) + R.subs(i, b - m) for m in range(n)]) + + +def telescopic(L, R, limits): + ''' + Tries to perform the summation using the telescopic property. + + Return None if not possible. + ''' + (i, a, b) = limits + if L.is_Add or R.is_Add: + return None + + # We want to solve(L.subs(i, i + m) + R, m) + # First we try a simple match since this does things that + # solve doesn't do, e.g. solve(cos(k+m)-cos(k), m) gives + # a more complicated solution than m == 0. + + k = Wild("k") + sol = (-R).match(L.subs(i, i + k)) + s = None + if sol and k in sol: + s = sol[k] + if not (s.is_Integer and L.subs(i, i + s) + R == 0): + # invalid match or match didn't work + s = None + + # But there are things that match doesn't do that solve + # can do, e.g. determine that 1/(x + m) = 1/(1 - x) when m = 1 + + if s is None: + m = Dummy('m') + try: + from sympy.solvers.solvers import solve + sol = solve(L.subs(i, i + m) + R, m) or [] + except NotImplementedError: + return None + sol = [si for si in sol if si.is_Integer and + (L.subs(i, i + si) + R).expand().is_zero] + if len(sol) != 1: + return None + s = sol[0] + + if s < 0: + return telescopic_direct(R, L, abs(s), (i, a, b)) + elif s > 0: + return telescopic_direct(L, R, s, (i, a, b)) + + +def eval_sum(f, limits): + (i, a, b) = limits + if f.is_zero: + return S.Zero + if i not in f.free_symbols: + return f*(b - a + 1) + if a == b: + return f.subs(i, a) + if a.is_comparable and b.is_comparable and a > b: + return eval_sum(f, (i, b + S.One, a - S.One)) + if isinstance(f, Piecewise): + if not any(i in arg.args[1].free_symbols for arg in f.args): + # Piecewise conditions do not depend on the dummy summation variable, + # therefore we can fold: Sum(Piecewise((e, c), ...), limits) + # --> Piecewise((Sum(e, limits), c), ...) + newargs = [] + for arg in f.args: + newexpr = eval_sum(arg.expr, limits) + if newexpr is None: + return None + newargs.append((newexpr, arg.cond)) + return f.func(*newargs) + + if f.has(KroneckerDelta): + from .delta import deltasummation, _has_simple_delta + f = f.replace( + lambda x: isinstance(x, Sum), + lambda x: x.factor() + ) + if _has_simple_delta(f, limits[0]): + return deltasummation(f, limits) + + dif = b - a + definite = dif.is_Integer + # Doing it directly may be faster if there are very few terms. + if definite and (dif < 100): + return eval_sum_direct(f, (i, a, b)) + if isinstance(f, Piecewise): + return None + # Try to do it symbolically. Even when the number of terms is + # known, this can save time when b-a is big. + value = eval_sum_symbolic(f.expand(), (i, a, b)) + if value is not None: + return value + # Do it directly + if definite: + return eval_sum_direct(f, (i, a, b)) + + +def eval_sum_direct(expr, limits): + """ + Evaluate expression directly, but perform some simple checks first + to possibly result in a smaller expression and faster execution. + """ + (i, a, b) = limits + + dif = b - a + # Linearity + if expr.is_Mul: + # Try factor out everything not including i + without_i, with_i = expr.as_independent(i) + if without_i != 1: + s = eval_sum_direct(with_i, (i, a, b)) + if s: + r = without_i*s + if r is not S.NaN: + return r + else: + # Try term by term + L, R = expr.as_two_terms() + + if not L.has(i): + sR = eval_sum_direct(R, (i, a, b)) + if sR: + return L*sR + + if not R.has(i): + sL = eval_sum_direct(L, (i, a, b)) + if sL: + return sL*R + + # do this whether its an Add or Mul + # e.g. apart(1/(25*i**2 + 45*i + 14)) and + # apart(1/((5*i + 2)*(5*i + 7))) -> + # -1/(5*(5*i + 7)) + 1/(5*(5*i + 2)) + try: + expr = apart(expr, i) # see if it becomes an Add + except PolynomialError: + pass + + if expr.is_Add: + # Try factor out everything not including i + without_i, with_i = expr.as_independent(i) + if without_i != 0: + s = eval_sum_direct(with_i, (i, a, b)) + if s: + r = without_i*(dif + 1) + s + if r is not S.NaN: + return r + else: + # Try term by term + L, R = expr.as_two_terms() + lsum = eval_sum_direct(L, (i, a, b)) + rsum = eval_sum_direct(R, (i, a, b)) + + if None not in (lsum, rsum): + r = lsum + rsum + if r is not S.NaN: + return r + + return Add(*[expr.subs(i, a + j) for j in range(dif + 1)]) + + +def eval_sum_symbolic(f, limits): + f_orig = f + (i, a, b) = limits + if not f.has(i): + return f*(b - a + 1) + + # Linearity + if f.is_Mul: + # Try factor out everything not including i + without_i, with_i = f.as_independent(i) + if without_i != 1: + s = eval_sum_symbolic(with_i, (i, a, b)) + if s: + r = without_i*s + if r is not S.NaN: + return r + else: + # Try term by term + L, R = f.as_two_terms() + + if not L.has(i): + sR = eval_sum_symbolic(R, (i, a, b)) + if sR: + return L*sR + + if not R.has(i): + sL = eval_sum_symbolic(L, (i, a, b)) + if sL: + return sL*R + + # do this whether its an Add or Mul + # e.g. apart(1/(25*i**2 + 45*i + 14)) and + # apart(1/((5*i + 2)*(5*i + 7))) -> + # -1/(5*(5*i + 7)) + 1/(5*(5*i + 2)) + try: + f = apart(f, i) + except PolynomialError: + pass + + if f.is_Add: + L, R = f.as_two_terms() + lrsum = telescopic(L, R, (i, a, b)) + + if lrsum: + return lrsum + + # Try factor out everything not including i + without_i, with_i = f.as_independent(i) + if without_i != 0: + s = eval_sum_symbolic(with_i, (i, a, b)) + if s: + r = without_i*(b - a + 1) + s + if r is not S.NaN: + return r + else: + # Try term by term + lsum = eval_sum_symbolic(L, (i, a, b)) + rsum = eval_sum_symbolic(R, (i, a, b)) + + if None not in (lsum, rsum): + r = lsum + rsum + if r is not S.NaN: + return r + + + # Polynomial terms with Faulhaber's formula + n = Wild('n') + result = f.match(i**n) + + if result is not None: + n = result[n] + + if n.is_Integer: + if n >= 0: + if (b is S.Infinity and a is not S.NegativeInfinity) or \ + (a is S.NegativeInfinity and b is not S.Infinity): + return S.Infinity + return ((bernoulli(n + 1, b + 1) - bernoulli(n + 1, a))/(n + 1)).expand() + elif a.is_Integer and a >= 1: + if n == -1: + return harmonic(b) - harmonic(a - 1) + else: + return harmonic(b, abs(n)) - harmonic(a - 1, abs(n)) + + if not (a.has(S.Infinity, S.NegativeInfinity) or + b.has(S.Infinity, S.NegativeInfinity)): + # Geometric terms + c1 = Wild('c1', exclude=[i]) + c2 = Wild('c2', exclude=[i]) + c3 = Wild('c3', exclude=[i]) + wexp = Wild('wexp') + + # Here we first attempt powsimp on f for easier matching with the + # exponential pattern, and attempt expansion on the exponent for easier + # matching with the linear pattern. + e = f.powsimp().match(c1 ** wexp) + if e is not None: + e_exp = e.pop(wexp).expand().match(c2*i + c3) + if e_exp is not None: + e.update(e_exp) + + p = (c1**c3).subs(e) + q = (c1**c2).subs(e) + r = p*(q**a - q**(b + 1))/(1 - q) + l = p*(b - a + 1) + return Piecewise((l, Eq(q, S.One)), (r, True)) + + r = gosper_sum(f, (i, a, b)) + + if isinstance(r, (Mul,Add)): + from sympy.simplify.radsimp import denom + from sympy.solvers.solvers import solve + non_limit = r.free_symbols - Tuple(*limits[1:]).free_symbols + den = denom(together(r)) + den_sym = non_limit & den.free_symbols + args = [] + for v in ordered(den_sym): + try: + s = solve(den, v) + m = Eq(v, s[0]) if s else S.false + if m != False: + args.append((Sum(f_orig.subs(*m.args), limits).doit(), m)) + break + except NotImplementedError: + continue + + args.append((r, True)) + return Piecewise(*args) + + if r not in (None, S.NaN): + return r + + h = eval_sum_hyper(f_orig, (i, a, b)) + if h is not None: + return h + + r = eval_sum_residue(f_orig, (i, a, b)) + if r is not None: + return r + + factored = f_orig.factor() + if factored != f_orig: + return eval_sum_symbolic(factored, (i, a, b)) + + +def _eval_sum_hyper(f, i, a): + """ Returns (res, cond). Sums from a to oo. """ + if a != 0: + return _eval_sum_hyper(f.subs(i, i + a), i, 0) + + if f.subs(i, 0) == 0: + from sympy.simplify.simplify import simplify + if simplify(f.subs(i, Dummy('i', integer=True, positive=True))) == 0: + return S.Zero, True + return _eval_sum_hyper(f.subs(i, i + 1), i, 0) + + from sympy.simplify.simplify import hypersimp + hs = hypersimp(f, i) + if hs is None: + return None + + if isinstance(hs, Float): + from sympy.simplify.simplify import nsimplify + hs = nsimplify(hs) + + from sympy.simplify.combsimp import combsimp + from sympy.simplify.hyperexpand import hyperexpand + from sympy.simplify.radsimp import fraction + numer, denom = fraction(factor(hs)) + top, topl = numer.as_coeff_mul(i) + bot, botl = denom.as_coeff_mul(i) + ab = [top, bot] + factors = [topl, botl] + params = [[], []] + for k in range(2): + for fac in factors[k]: + mul = 1 + if fac.is_Pow: + mul = fac.exp + fac = fac.base + if not mul.is_Integer: + return None + p = Poly(fac, i) + if p.degree() != 1: + return None + m, n = p.all_coeffs() + ab[k] *= m**mul + params[k] += [n/m]*mul + + # Add "1" to numerator parameters, to account for implicit n! in + # hypergeometric series. + ap = params[0] + [1] + bq = params[1] + x = ab[0]/ab[1] + h = hyper(ap, bq, x) + f = combsimp(f) + return f.subs(i, 0)*hyperexpand(h), h.convergence_statement + + +def eval_sum_hyper(f, i_a_b): + i, a, b = i_a_b + + if f.is_hypergeometric(i) is False: + return + + if (b - a).is_Integer: + # We are never going to do better than doing the sum in the obvious way + return None + + old_sum = Sum(f, (i, a, b)) + + if b != S.Infinity: + if a is S.NegativeInfinity: + res = _eval_sum_hyper(f.subs(i, -i), i, -b) + if res is not None: + return Piecewise(res, (old_sum, True)) + else: + n_illegal = lambda x: sum(x.count(_) for _ in _illegal) + had = n_illegal(f) + # check that no extra illegals are introduced + res1 = _eval_sum_hyper(f, i, a) + if res1 is None or n_illegal(res1) > had: + return + res2 = _eval_sum_hyper(f, i, b + 1) + if res2 is None or n_illegal(res2) > had: + return + (res1, cond1), (res2, cond2) = res1, res2 + cond = And(cond1, cond2) + if cond == False: + return None + return Piecewise((res1 - res2, cond), (old_sum, True)) + + if a is S.NegativeInfinity: + res1 = _eval_sum_hyper(f.subs(i, -i), i, 1) + res2 = _eval_sum_hyper(f, i, 0) + if res1 is None or res2 is None: + return None + res1, cond1 = res1 + res2, cond2 = res2 + cond = And(cond1, cond2) + if cond == False or cond.as_set() == S.EmptySet: + return None + return Piecewise((res1 + res2, cond), (old_sum, True)) + + # Now b == oo, a != -oo + res = _eval_sum_hyper(f, i, a) + if res is not None: + r, c = res + if c == False: + if r.is_number: + f = f.subs(i, Dummy('i', integer=True, positive=True) + a) + if f.is_positive or f.is_zero: + return S.Infinity + elif f.is_negative: + return S.NegativeInfinity + return None + return Piecewise(res, (old_sum, True)) + + +def eval_sum_residue(f, i_a_b): + r"""Compute the infinite summation with residues + + Notes + ===== + + If $f(n), g(n)$ are polynomials with $\deg(g(n)) - \deg(f(n)) \ge 2$, + some infinite summations can be computed by the following residue + evaluations. + + .. math:: + \sum_{n=-\infty, g(n) \ne 0}^{\infty} \frac{f(n)}{g(n)} = + -\pi \sum_{\alpha|g(\alpha)=0} + \text{Res}(\cot(\pi x) \frac{f(x)}{g(x)}, \alpha) + + .. math:: + \sum_{n=-\infty, g(n) \ne 0}^{\infty} (-1)^n \frac{f(n)}{g(n)} = + -\pi \sum_{\alpha|g(\alpha)=0} + \text{Res}(\csc(\pi x) \frac{f(x)}{g(x)}, \alpha) + + Examples + ======== + + >>> from sympy import Sum, oo, Symbol + >>> x = Symbol('x') + + Doubly infinite series of rational functions. + + >>> Sum(1 / (x**2 + 1), (x, -oo, oo)).doit() + pi/tanh(pi) + + Doubly infinite alternating series of rational functions. + + >>> Sum((-1)**x / (x**2 + 1), (x, -oo, oo)).doit() + pi/sinh(pi) + + Infinite series of even rational functions. + + >>> Sum(1 / (x**2 + 1), (x, 0, oo)).doit() + 1/2 + pi/(2*tanh(pi)) + + Infinite series of alternating even rational functions. + + >>> Sum((-1)**x / (x**2 + 1), (x, 0, oo)).doit() + pi/(2*sinh(pi)) + 1/2 + + This also have heuristics to transform arbitrarily shifted summand or + arbitrarily shifted summation range to the canonical problem the + formula can handle. + + >>> Sum(1 / (x**2 + 2*x + 2), (x, -1, oo)).doit() + 1/2 + pi/(2*tanh(pi)) + >>> Sum(1 / (x**2 + 4*x + 5), (x, -2, oo)).doit() + 1/2 + pi/(2*tanh(pi)) + >>> Sum(1 / (x**2 + 1), (x, 1, oo)).doit() + -1/2 + pi/(2*tanh(pi)) + >>> Sum(1 / (x**2 + 1), (x, 2, oo)).doit() + -1 + pi/(2*tanh(pi)) + + References + ========== + + .. [#] http://www.supermath.info/InfiniteSeriesandtheResidueTheorem.pdf + + .. [#] Asmar N.H., Grafakos L. (2018) Residue Theory. + In: Complex Analysis with Applications. + Undergraduate Texts in Mathematics. Springer, Cham. + https://doi.org/10.1007/978-3-319-94063-2_5 + """ + i, a, b = i_a_b + + # If lower limit > upper limit: Karr Summation Convention + if a.is_comparable and b.is_comparable and a > b: + return eval_sum_residue(f, (i, b + S.One, a - S.One)) + + def is_even_function(numer, denom): + """Test if the rational function is an even function""" + numer_even = all(i % 2 == 0 for (i,) in numer.monoms()) + denom_even = all(i % 2 == 0 for (i,) in denom.monoms()) + numer_odd = all(i % 2 == 1 for (i,) in numer.monoms()) + denom_odd = all(i % 2 == 1 for (i,) in denom.monoms()) + return (numer_even and denom_even) or (numer_odd and denom_odd) + + def match_rational(f, i): + numer, denom = f.as_numer_denom() + try: + (numer, denom), opt = parallel_poly_from_expr((numer, denom), i) + except (PolificationFailed, PolynomialError): + return None + return numer, denom + + def get_poles(denom): + roots = denom.sqf_part().all_roots() + roots = sift(roots, lambda x: x.is_integer) + if None in roots: + return None + int_roots, nonint_roots = roots[True], roots[False] + return int_roots, nonint_roots + + def get_shift(denom): + n = denom.degree(i) + a = denom.coeff_monomial(i**n) + b = denom.coeff_monomial(i**(n-1)) + shift = - b / a / n + return shift + + #Need a dummy symbol with no assumptions set for get_residue_factor + z = Dummy('z') + + def get_residue_factor(numer, denom, alternating): + residue_factor = (numer.as_expr() / denom.as_expr()).subs(i, z) + if not alternating: + residue_factor *= cot(S.Pi * z) + else: + residue_factor *= csc(S.Pi * z) + return residue_factor + + # We don't know how to deal with symbolic constants in summand + if f.free_symbols - {i}: + return None + + if not (a.is_Integer or a in (S.Infinity, S.NegativeInfinity)): + return None + if not (b.is_Integer or b in (S.Infinity, S.NegativeInfinity)): + return None + + # Quick exit heuristic for the sums which doesn't have infinite range + if a != S.NegativeInfinity and b != S.Infinity: + return None + + match = match_rational(f, i) + if match: + alternating = False + numer, denom = match + else: + match = match_rational(f / S.NegativeOne**i, i) + if match: + alternating = True + numer, denom = match + else: + return None + + if denom.degree(i) - numer.degree(i) < 2: + return None + + if (a, b) == (S.NegativeInfinity, S.Infinity): + poles = get_poles(denom) + if poles is None: + return None + int_roots, nonint_roots = poles + + if int_roots: + return None + + residue_factor = get_residue_factor(numer, denom, alternating) + residues = [residue(residue_factor, z, root) for root in nonint_roots] + return -S.Pi * sum(residues) + + if not (a.is_finite and b is S.Infinity): + return None + + if not is_even_function(numer, denom): + # Try shifting summation and check if the summand can be made + # and even function from the origin. + # Sum(f(n), (n, a, b)) => Sum(f(n + s), (n, a - s, b - s)) + shift = get_shift(denom) + + if not shift.is_Integer: + return None + if shift == 0: + return None + + numer = numer.shift(shift) + denom = denom.shift(shift) + + if not is_even_function(numer, denom): + return None + + if alternating: + f = S.NegativeOne**i * (S.NegativeOne**shift * numer.as_expr() / denom.as_expr()) + else: + f = numer.as_expr() / denom.as_expr() + return eval_sum_residue(f, (i, a-shift, b-shift)) + + poles = get_poles(denom) + if poles is None: + return None + int_roots, nonint_roots = poles + + if int_roots: + int_roots = [int(root) for root in int_roots] + int_roots_max = max(int_roots) + int_roots_min = min(int_roots) + # Integer valued poles must be next to each other + # and also symmetric from origin (Because the function is even) + if not len(int_roots) == int_roots_max - int_roots_min + 1: + return None + + # Check whether the summation indices contain poles + if a <= max(int_roots): + return None + + residue_factor = get_residue_factor(numer, denom, alternating) + residues = [residue(residue_factor, z, root) for root in int_roots + nonint_roots] + full_sum = -S.Pi * sum(residues) + + if not int_roots: + # Compute Sum(f, (i, 0, oo)) by adding a extraneous evaluation + # at the origin. + half_sum = (full_sum + f.xreplace({i: 0})) / 2 + + # Add and subtract extraneous evaluations + extraneous_neg = [f.xreplace({i: i0}) for i0 in range(int(a), 0)] + extraneous_pos = [f.xreplace({i: i0}) for i0 in range(0, int(a))] + result = half_sum + sum(extraneous_neg) - sum(extraneous_pos) + + return result + + # Compute Sum(f, (i, min(poles) + 1, oo)) + half_sum = full_sum / 2 + + # Subtract extraneous evaluations + extraneous = [f.xreplace({i: i0}) for i0 in range(max(int_roots) + 1, int(a))] + result = half_sum - sum(extraneous) + + return result + + +def _eval_matrix_sum(expression): + f = expression.function + for limit in expression.limits: + i, a, b = limit + dif = b - a + if dif.is_Integer: + if (dif < 0) == True: + a, b = b + 1, a - 1 + f = -f + + newf = eval_sum_direct(f, (i, a, b)) + if newf is not None: + return newf.doit() + + +def _dummy_with_inherited_properties_concrete(limits): + """ + Return a Dummy symbol that inherits as many assumptions as possible + from the provided symbol and limits. + + If the symbol already has all True assumption shared by the limits + then return None. + """ + x, a, b = limits + l = [a, b] + + assumptions_to_consider = ['extended_nonnegative', 'nonnegative', + 'extended_nonpositive', 'nonpositive', + 'extended_positive', 'positive', + 'extended_negative', 'negative', + 'integer', 'rational', 'finite', + 'zero', 'real', 'extended_real'] + + assumptions_to_keep = {} + assumptions_to_add = {} + for assum in assumptions_to_consider: + assum_true = x._assumptions.get(assum, None) + if assum_true: + assumptions_to_keep[assum] = True + elif all(getattr(i, 'is_' + assum) for i in l): + assumptions_to_add[assum] = True + if assumptions_to_add: + assumptions_to_keep.update(assumptions_to_add) + return Dummy('d', **assumptions_to_keep) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/tests/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/tests/test_delta.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/tests/test_delta.py new file mode 100644 index 0000000000000000000000000000000000000000..9dc6e88d16346acc7dc775446d7de3f3696d0e03 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/tests/test_delta.py @@ -0,0 +1,499 @@ +from sympy.concrete import Sum +from sympy.concrete.delta import deltaproduct as dp, deltasummation as ds, _extract_delta +from sympy.core import Eq, S, symbols, oo +from sympy.functions import KroneckerDelta as KD, Piecewise, piecewise_fold +from sympy.logic import And +from sympy.testing.pytest import raises + +i, j, k, l, m = symbols("i j k l m", integer=True, finite=True) +x, y = symbols("x y", commutative=False) + + +def test_deltaproduct_trivial(): + assert dp(x, (j, 1, 0)) == 1 + assert dp(x, (j, 1, 3)) == x**3 + assert dp(x + y, (j, 1, 3)) == (x + y)**3 + assert dp(x*y, (j, 1, 3)) == (x*y)**3 + assert dp(KD(i, j), (k, 1, 3)) == KD(i, j) + assert dp(x*KD(i, j), (k, 1, 3)) == x**3*KD(i, j) + assert dp(x*y*KD(i, j), (k, 1, 3)) == (x*y)**3*KD(i, j) + + +def test_deltaproduct_basic(): + assert dp(KD(i, j), (j, 1, 3)) == 0 + assert dp(KD(i, j), (j, 1, 1)) == KD(i, 1) + assert dp(KD(i, j), (j, 2, 2)) == KD(i, 2) + assert dp(KD(i, j), (j, 3, 3)) == KD(i, 3) + assert dp(KD(i, j), (j, 1, k)) == KD(i, 1)*KD(k, 1) + KD(k, 0) + assert dp(KD(i, j), (j, k, 3)) == KD(i, 3)*KD(k, 3) + KD(k, 4) + assert dp(KD(i, j), (j, k, l)) == KD(i, l)*KD(k, l) + KD(k, l + 1) + + +def test_deltaproduct_mul_x_kd(): + assert dp(x*KD(i, j), (j, 1, 3)) == 0 + assert dp(x*KD(i, j), (j, 1, 1)) == x*KD(i, 1) + assert dp(x*KD(i, j), (j, 2, 2)) == x*KD(i, 2) + assert dp(x*KD(i, j), (j, 3, 3)) == x*KD(i, 3) + assert dp(x*KD(i, j), (j, 1, k)) == x*KD(i, 1)*KD(k, 1) + KD(k, 0) + assert dp(x*KD(i, j), (j, k, 3)) == x*KD(i, 3)*KD(k, 3) + KD(k, 4) + assert dp(x*KD(i, j), (j, k, l)) == x*KD(i, l)*KD(k, l) + KD(k, l + 1) + + +def test_deltaproduct_mul_add_x_y_kd(): + assert dp((x + y)*KD(i, j), (j, 1, 3)) == 0 + assert dp((x + y)*KD(i, j), (j, 1, 1)) == (x + y)*KD(i, 1) + assert dp((x + y)*KD(i, j), (j, 2, 2)) == (x + y)*KD(i, 2) + assert dp((x + y)*KD(i, j), (j, 3, 3)) == (x + y)*KD(i, 3) + assert dp((x + y)*KD(i, j), (j, 1, k)) == \ + (x + y)*KD(i, 1)*KD(k, 1) + KD(k, 0) + assert dp((x + y)*KD(i, j), (j, k, 3)) == \ + (x + y)*KD(i, 3)*KD(k, 3) + KD(k, 4) + assert dp((x + y)*KD(i, j), (j, k, l)) == \ + (x + y)*KD(i, l)*KD(k, l) + KD(k, l + 1) + + +def test_deltaproduct_add_kd_kd(): + assert dp(KD(i, k) + KD(j, k), (k, 1, 3)) == 0 + assert dp(KD(i, k) + KD(j, k), (k, 1, 1)) == KD(i, 1) + KD(j, 1) + assert dp(KD(i, k) + KD(j, k), (k, 2, 2)) == KD(i, 2) + KD(j, 2) + assert dp(KD(i, k) + KD(j, k), (k, 3, 3)) == KD(i, 3) + KD(j, 3) + assert dp(KD(i, k) + KD(j, k), (k, 1, l)) == KD(l, 0) + \ + KD(i, 1)*KD(l, 1) + KD(j, 1)*KD(l, 1) + \ + KD(i, 1)*KD(j, 2)*KD(l, 2) + KD(j, 1)*KD(i, 2)*KD(l, 2) + assert dp(KD(i, k) + KD(j, k), (k, l, 3)) == KD(l, 4) + \ + KD(i, 3)*KD(l, 3) + KD(j, 3)*KD(l, 3) + \ + KD(i, 2)*KD(j, 3)*KD(l, 2) + KD(i, 3)*KD(j, 2)*KD(l, 2) + assert dp(KD(i, k) + KD(j, k), (k, l, m)) == KD(l, m + 1) + \ + KD(i, m)*KD(l, m) + KD(j, m)*KD(l, m) + \ + KD(i, m)*KD(j, m - 1)*KD(l, m - 1) + KD(i, m - 1)*KD(j, m)*KD(l, m - 1) + + +def test_deltaproduct_mul_x_add_kd_kd(): + assert dp(x*(KD(i, k) + KD(j, k)), (k, 1, 3)) == 0 + assert dp(x*(KD(i, k) + KD(j, k)), (k, 1, 1)) == x*(KD(i, 1) + KD(j, 1)) + assert dp(x*(KD(i, k) + KD(j, k)), (k, 2, 2)) == x*(KD(i, 2) + KD(j, 2)) + assert dp(x*(KD(i, k) + KD(j, k)), (k, 3, 3)) == x*(KD(i, 3) + KD(j, 3)) + assert dp(x*(KD(i, k) + KD(j, k)), (k, 1, l)) == KD(l, 0) + \ + x*KD(i, 1)*KD(l, 1) + x*KD(j, 1)*KD(l, 1) + \ + x**2*KD(i, 1)*KD(j, 2)*KD(l, 2) + x**2*KD(j, 1)*KD(i, 2)*KD(l, 2) + assert dp(x*(KD(i, k) + KD(j, k)), (k, l, 3)) == KD(l, 4) + \ + x*KD(i, 3)*KD(l, 3) + x*KD(j, 3)*KD(l, 3) + \ + x**2*KD(i, 2)*KD(j, 3)*KD(l, 2) + x**2*KD(i, 3)*KD(j, 2)*KD(l, 2) + assert dp(x*(KD(i, k) + KD(j, k)), (k, l, m)) == KD(l, m + 1) + \ + x*KD(i, m)*KD(l, m) + x*KD(j, m)*KD(l, m) + \ + x**2*KD(i, m - 1)*KD(j, m)*KD(l, m - 1) + \ + x**2*KD(i, m)*KD(j, m - 1)*KD(l, m - 1) + + +def test_deltaproduct_mul_add_x_y_add_kd_kd(): + assert dp((x + y)*(KD(i, k) + KD(j, k)), (k, 1, 3)) == 0 + assert dp((x + y)*(KD(i, k) + KD(j, k)), (k, 1, 1)) == \ + (x + y)*(KD(i, 1) + KD(j, 1)) + assert dp((x + y)*(KD(i, k) + KD(j, k)), (k, 2, 2)) == \ + (x + y)*(KD(i, 2) + KD(j, 2)) + assert dp((x + y)*(KD(i, k) + KD(j, k)), (k, 3, 3)) == \ + (x + y)*(KD(i, 3) + KD(j, 3)) + assert dp((x + y)*(KD(i, k) + KD(j, k)), (k, 1, l)) == KD(l, 0) + \ + (x + y)*KD(i, 1)*KD(l, 1) + (x + y)*KD(j, 1)*KD(l, 1) + \ + (x + y)**2*KD(i, 1)*KD(j, 2)*KD(l, 2) + \ + (x + y)**2*KD(j, 1)*KD(i, 2)*KD(l, 2) + assert dp((x + y)*(KD(i, k) + KD(j, k)), (k, l, 3)) == KD(l, 4) + \ + (x + y)*KD(i, 3)*KD(l, 3) + (x + y)*KD(j, 3)*KD(l, 3) + \ + (x + y)**2*KD(i, 2)*KD(j, 3)*KD(l, 2) + \ + (x + y)**2*KD(i, 3)*KD(j, 2)*KD(l, 2) + assert dp((x + y)*(KD(i, k) + KD(j, k)), (k, l, m)) == KD(l, m + 1) + \ + (x + y)*KD(i, m)*KD(l, m) + (x + y)*KD(j, m)*KD(l, m) + \ + (x + y)**2*KD(i, m - 1)*KD(j, m)*KD(l, m - 1) + \ + (x + y)**2*KD(i, m)*KD(j, m - 1)*KD(l, m - 1) + + +def test_deltaproduct_add_mul_x_y_mul_x_kd(): + assert dp(x*y + x*KD(i, j), (j, 1, 3)) == (x*y)**3 + \ + x*(x*y)**2*KD(i, 1) + (x*y)*x*(x*y)*KD(i, 2) + (x*y)**2*x*KD(i, 3) + assert dp(x*y + x*KD(i, j), (j, 1, 1)) == x*y + x*KD(i, 1) + assert dp(x*y + x*KD(i, j), (j, 2, 2)) == x*y + x*KD(i, 2) + assert dp(x*y + x*KD(i, j), (j, 3, 3)) == x*y + x*KD(i, 3) + assert dp(x*y + x*KD(i, j), (j, 1, k)) == \ + (x*y)**k + Piecewise( + ((x*y)**(i - 1)*x*(x*y)**(k - i), And(1 <= i, i <= k)), + (0, True) + ) + assert dp(x*y + x*KD(i, j), (j, k, 3)) == \ + (x*y)**(-k + 4) + Piecewise( + ((x*y)**(i - k)*x*(x*y)**(3 - i), And(k <= i, i <= 3)), + (0, True) + ) + assert dp(x*y + x*KD(i, j), (j, k, l)) == \ + (x*y)**(-k + l + 1) + Piecewise( + ((x*y)**(i - k)*x*(x*y)**(l - i), And(k <= i, i <= l)), + (0, True) + ) + + +def test_deltaproduct_mul_x_add_y_kd(): + assert dp(x*(y + KD(i, j)), (j, 1, 3)) == (x*y)**3 + \ + x*(x*y)**2*KD(i, 1) + (x*y)*x*(x*y)*KD(i, 2) + (x*y)**2*x*KD(i, 3) + assert dp(x*(y + KD(i, j)), (j, 1, 1)) == x*(y + KD(i, 1)) + assert dp(x*(y + KD(i, j)), (j, 2, 2)) == x*(y + KD(i, 2)) + assert dp(x*(y + KD(i, j)), (j, 3, 3)) == x*(y + KD(i, 3)) + assert dp(x*(y + KD(i, j)), (j, 1, k)) == \ + (x*y)**k + Piecewise( + ((x*y)**(i - 1)*x*(x*y)**(k - i), And(1 <= i, i <= k)), + (0, True) + ).expand() + assert dp(x*(y + KD(i, j)), (j, k, 3)) == \ + ((x*y)**(-k + 4) + Piecewise( + ((x*y)**(i - k)*x*(x*y)**(3 - i), And(k <= i, i <= 3)), + (0, True) + )).expand() + assert dp(x*(y + KD(i, j)), (j, k, l)) == \ + ((x*y)**(-k + l + 1) + Piecewise( + ((x*y)**(i - k)*x*(x*y)**(l - i), And(k <= i, i <= l)), + (0, True) + )).expand() + + +def test_deltaproduct_mul_x_add_y_twokd(): + assert dp(x*(y + 2*KD(i, j)), (j, 1, 3)) == (x*y)**3 + \ + 2*x*(x*y)**2*KD(i, 1) + 2*x*y*x*x*y*KD(i, 2) + 2*(x*y)**2*x*KD(i, 3) + assert dp(x*(y + 2*KD(i, j)), (j, 1, 1)) == x*(y + 2*KD(i, 1)) + assert dp(x*(y + 2*KD(i, j)), (j, 2, 2)) == x*(y + 2*KD(i, 2)) + assert dp(x*(y + 2*KD(i, j)), (j, 3, 3)) == x*(y + 2*KD(i, 3)) + assert dp(x*(y + 2*KD(i, j)), (j, 1, k)) == \ + (x*y)**k + Piecewise( + (2*(x*y)**(i - 1)*x*(x*y)**(k - i), And(1 <= i, i <= k)), + (0, True) + ).expand() + assert dp(x*(y + 2*KD(i, j)), (j, k, 3)) == \ + ((x*y)**(-k + 4) + Piecewise( + (2*(x*y)**(i - k)*x*(x*y)**(3 - i), And(k <= i, i <= 3)), + (0, True) + )).expand() + assert dp(x*(y + 2*KD(i, j)), (j, k, l)) == \ + ((x*y)**(-k + l + 1) + Piecewise( + (2*(x*y)**(i - k)*x*(x*y)**(l - i), And(k <= i, i <= l)), + (0, True) + )).expand() + + +def test_deltaproduct_mul_add_x_y_add_y_kd(): + assert dp((x + y)*(y + KD(i, j)), (j, 1, 3)) == ((x + y)*y)**3 + \ + (x + y)*((x + y)*y)**2*KD(i, 1) + \ + (x + y)*y*(x + y)**2*y*KD(i, 2) + \ + ((x + y)*y)**2*(x + y)*KD(i, 3) + assert dp((x + y)*(y + KD(i, j)), (j, 1, 1)) == (x + y)*(y + KD(i, 1)) + assert dp((x + y)*(y + KD(i, j)), (j, 2, 2)) == (x + y)*(y + KD(i, 2)) + assert dp((x + y)*(y + KD(i, j)), (j, 3, 3)) == (x + y)*(y + KD(i, 3)) + assert dp((x + y)*(y + KD(i, j)), (j, 1, k)) == \ + ((x + y)*y)**k + Piecewise( + (((x + y)*y)**(-1)*((x + y)*y)**i*(x + y)*((x + y)*y + )**k*((x + y)*y)**(-i), (i >= 1) & (i <= k)), (0, True)) + assert dp((x + y)*(y + KD(i, j)), (j, k, 3)) == ( + (x + y)*y)**4*((x + y)*y)**(-k) + Piecewise((((x + y)*y)**i*( + (x + y)*y)**(-k)*(x + y)*((x + y)*y)**3*((x + y)*y)**(-i), + (i >= k) & (i <= 3)), (0, True)) + assert dp((x + y)*(y + KD(i, j)), (j, k, l)) == \ + (x + y)*y*((x + y)*y)**l*((x + y)*y)**(-k) + Piecewise( + (((x + y)*y)**i*((x + y)*y)**(-k)*(x + y)*((x + y)*y + )**l*((x + y)*y)**(-i), (i >= k) & (i <= l)), (0, True)) + + +def test_deltaproduct_mul_add_x_kd_add_y_kd(): + assert dp((x + KD(i, k))*(y + KD(i, j)), (j, 1, 3)) == \ + KD(i, 1)*(KD(i, k) + x)*((KD(i, k) + x)*y)**2 + \ + KD(i, 2)*(KD(i, k) + x)*y*(KD(i, k) + x)**2*y + \ + KD(i, 3)*((KD(i, k) + x)*y)**2*(KD(i, k) + x) + \ + ((KD(i, k) + x)*y)**3 + assert dp((x + KD(i, k))*(y + KD(i, j)), (j, 1, 1)) == \ + (x + KD(i, k))*(y + KD(i, 1)) + assert dp((x + KD(i, k))*(y + KD(i, j)), (j, 2, 2)) == \ + (x + KD(i, k))*(y + KD(i, 2)) + assert dp((x + KD(i, k))*(y + KD(i, j)), (j, 3, 3)) == \ + (x + KD(i, k))*(y + KD(i, 3)) + assert dp((x + KD(i, k))*(y + KD(i, j)), (j, 1, k)) == \ + ((KD(i, k) + x)*y)**k + Piecewise( + (((KD(i, k) + x)*y)**(-1)*((KD(i, k) + x)*y)**i*(KD(i, k) + x + )*((KD(i, k) + x)*y)**k*((KD(i, k) + x)*y)**(-i), (i >= 1 + ) & (i <= k)), (0, True)) + assert dp((x + KD(i, k))*(y + KD(i, j)), (j, k, 3)) == ( + (KD(i, k) + x)*y)**4*((KD(i, k) + x)*y)**(-k) + Piecewise( + (((KD(i, k) + x)*y)**i*((KD(i, k) + x)*y)**(-k)*(KD(i, k) + + x)*((KD(i, k) + x)*y)**3*((KD(i, k) + x)*y)**(-i), + (i >= k) & (i <= 3)), (0, True)) + assert dp((x + KD(i, k))*(y + KD(i, j)), (j, k, l)) == ( + KD(i, k) + x)*y*((KD(i, k) + x)*y)**l*((KD(i, k) + x)*y + )**(-k) + Piecewise((((KD(i, k) + x)*y)**i*((KD(i, k) + x + )*y)**(-k)*(KD(i, k) + x)*((KD(i, k) + x)*y)**l*((KD(i, k) + x + )*y)**(-i), (i >= k) & (i <= l)), (0, True)) + + +def test_deltasummation_trivial(): + assert ds(x, (j, 1, 0)) == 0 + assert ds(x, (j, 1, 3)) == 3*x + assert ds(x + y, (j, 1, 3)) == 3*(x + y) + assert ds(x*y, (j, 1, 3)) == 3*x*y + assert ds(KD(i, j), (k, 1, 3)) == 3*KD(i, j) + assert ds(x*KD(i, j), (k, 1, 3)) == 3*x*KD(i, j) + assert ds(x*y*KD(i, j), (k, 1, 3)) == 3*x*y*KD(i, j) + + +def test_deltasummation_basic_numerical(): + n = symbols('n', integer=True, nonzero=True) + assert ds(KD(n, 0), (n, 1, 3)) == 0 + + # return unevaluated, until it gets implemented + assert ds(KD(i**2, j**2), (j, -oo, oo)) == \ + Sum(KD(i**2, j**2), (j, -oo, oo)) + + assert Piecewise((KD(i, k), And(1 <= i, i <= 3)), (0, True)) == \ + ds(KD(i, j)*KD(j, k), (j, 1, 3)) == \ + ds(KD(j, k)*KD(i, j), (j, 1, 3)) + + assert ds(KD(i, k), (k, -oo, oo)) == 1 + assert ds(KD(i, k), (k, 0, oo)) == Piecewise((1, S.Zero <= i), (0, True)) + assert ds(KD(i, k), (k, 1, 3)) == \ + Piecewise((1, And(1 <= i, i <= 3)), (0, True)) + assert ds(k*KD(i, j)*KD(j, k), (k, -oo, oo)) == j*KD(i, j) + assert ds(j*KD(i, j), (j, -oo, oo)) == i + assert ds(i*KD(i, j), (i, -oo, oo)) == j + assert ds(x, (i, 1, 3)) == 3*x + assert ds((i + j)*KD(i, j), (j, -oo, oo)) == 2*i + + +def test_deltasummation_basic_symbolic(): + assert ds(KD(i, j), (j, 1, 3)) == \ + Piecewise((1, And(1 <= i, i <= 3)), (0, True)) + assert ds(KD(i, j), (j, 1, 1)) == Piecewise((1, Eq(i, 1)), (0, True)) + assert ds(KD(i, j), (j, 2, 2)) == Piecewise((1, Eq(i, 2)), (0, True)) + assert ds(KD(i, j), (j, 3, 3)) == Piecewise((1, Eq(i, 3)), (0, True)) + assert ds(KD(i, j), (j, 1, k)) == \ + Piecewise((1, And(1 <= i, i <= k)), (0, True)) + assert ds(KD(i, j), (j, k, 3)) == \ + Piecewise((1, And(k <= i, i <= 3)), (0, True)) + assert ds(KD(i, j), (j, k, l)) == \ + Piecewise((1, And(k <= i, i <= l)), (0, True)) + + +def test_deltasummation_mul_x_kd(): + assert ds(x*KD(i, j), (j, 1, 3)) == \ + Piecewise((x, And(1 <= i, i <= 3)), (0, True)) + assert ds(x*KD(i, j), (j, 1, 1)) == Piecewise((x, Eq(i, 1)), (0, True)) + assert ds(x*KD(i, j), (j, 2, 2)) == Piecewise((x, Eq(i, 2)), (0, True)) + assert ds(x*KD(i, j), (j, 3, 3)) == Piecewise((x, Eq(i, 3)), (0, True)) + assert ds(x*KD(i, j), (j, 1, k)) == \ + Piecewise((x, And(1 <= i, i <= k)), (0, True)) + assert ds(x*KD(i, j), (j, k, 3)) == \ + Piecewise((x, And(k <= i, i <= 3)), (0, True)) + assert ds(x*KD(i, j), (j, k, l)) == \ + Piecewise((x, And(k <= i, i <= l)), (0, True)) + + +def test_deltasummation_mul_add_x_y_kd(): + assert ds((x + y)*KD(i, j), (j, 1, 3)) == \ + Piecewise((x + y, And(1 <= i, i <= 3)), (0, True)) + assert ds((x + y)*KD(i, j), (j, 1, 1)) == \ + Piecewise((x + y, Eq(i, 1)), (0, True)) + assert ds((x + y)*KD(i, j), (j, 2, 2)) == \ + Piecewise((x + y, Eq(i, 2)), (0, True)) + assert ds((x + y)*KD(i, j), (j, 3, 3)) == \ + Piecewise((x + y, Eq(i, 3)), (0, True)) + assert ds((x + y)*KD(i, j), (j, 1, k)) == \ + Piecewise((x + y, And(1 <= i, i <= k)), (0, True)) + assert ds((x + y)*KD(i, j), (j, k, 3)) == \ + Piecewise((x + y, And(k <= i, i <= 3)), (0, True)) + assert ds((x + y)*KD(i, j), (j, k, l)) == \ + Piecewise((x + y, And(k <= i, i <= l)), (0, True)) + + +def test_deltasummation_add_kd_kd(): + assert ds(KD(i, k) + KD(j, k), (k, 1, 3)) == piecewise_fold( + Piecewise((1, And(1 <= i, i <= 3)), (0, True)) + + Piecewise((1, And(1 <= j, j <= 3)), (0, True))) + assert ds(KD(i, k) + KD(j, k), (k, 1, 1)) == piecewise_fold( + Piecewise((1, Eq(i, 1)), (0, True)) + + Piecewise((1, Eq(j, 1)), (0, True))) + assert ds(KD(i, k) + KD(j, k), (k, 2, 2)) == piecewise_fold( + Piecewise((1, Eq(i, 2)), (0, True)) + + Piecewise((1, Eq(j, 2)), (0, True))) + assert ds(KD(i, k) + KD(j, k), (k, 3, 3)) == piecewise_fold( + Piecewise((1, Eq(i, 3)), (0, True)) + + Piecewise((1, Eq(j, 3)), (0, True))) + assert ds(KD(i, k) + KD(j, k), (k, 1, l)) == piecewise_fold( + Piecewise((1, And(1 <= i, i <= l)), (0, True)) + + Piecewise((1, And(1 <= j, j <= l)), (0, True))) + assert ds(KD(i, k) + KD(j, k), (k, l, 3)) == piecewise_fold( + Piecewise((1, And(l <= i, i <= 3)), (0, True)) + + Piecewise((1, And(l <= j, j <= 3)), (0, True))) + assert ds(KD(i, k) + KD(j, k), (k, l, m)) == piecewise_fold( + Piecewise((1, And(l <= i, i <= m)), (0, True)) + + Piecewise((1, And(l <= j, j <= m)), (0, True))) + + +def test_deltasummation_add_mul_x_kd_kd(): + assert ds(x*KD(i, k) + KD(j, k), (k, 1, 3)) == piecewise_fold( + Piecewise((x, And(1 <= i, i <= 3)), (0, True)) + + Piecewise((1, And(1 <= j, j <= 3)), (0, True))) + assert ds(x*KD(i, k) + KD(j, k), (k, 1, 1)) == piecewise_fold( + Piecewise((x, Eq(i, 1)), (0, True)) + + Piecewise((1, Eq(j, 1)), (0, True))) + assert ds(x*KD(i, k) + KD(j, k), (k, 2, 2)) == piecewise_fold( + Piecewise((x, Eq(i, 2)), (0, True)) + + Piecewise((1, Eq(j, 2)), (0, True))) + assert ds(x*KD(i, k) + KD(j, k), (k, 3, 3)) == piecewise_fold( + Piecewise((x, Eq(i, 3)), (0, True)) + + Piecewise((1, Eq(j, 3)), (0, True))) + assert ds(x*KD(i, k) + KD(j, k), (k, 1, l)) == piecewise_fold( + Piecewise((x, And(1 <= i, i <= l)), (0, True)) + + Piecewise((1, And(1 <= j, j <= l)), (0, True))) + assert ds(x*KD(i, k) + KD(j, k), (k, l, 3)) == piecewise_fold( + Piecewise((x, And(l <= i, i <= 3)), (0, True)) + + Piecewise((1, And(l <= j, j <= 3)), (0, True))) + assert ds(x*KD(i, k) + KD(j, k), (k, l, m)) == piecewise_fold( + Piecewise((x, And(l <= i, i <= m)), (0, True)) + + Piecewise((1, And(l <= j, j <= m)), (0, True))) + + +def test_deltasummation_mul_x_add_kd_kd(): + assert ds(x*(KD(i, k) + KD(j, k)), (k, 1, 3)) == piecewise_fold( + Piecewise((x, And(1 <= i, i <= 3)), (0, True)) + + Piecewise((x, And(1 <= j, j <= 3)), (0, True))) + assert ds(x*(KD(i, k) + KD(j, k)), (k, 1, 1)) == piecewise_fold( + Piecewise((x, Eq(i, 1)), (0, True)) + + Piecewise((x, Eq(j, 1)), (0, True))) + assert ds(x*(KD(i, k) + KD(j, k)), (k, 2, 2)) == piecewise_fold( + Piecewise((x, Eq(i, 2)), (0, True)) + + Piecewise((x, Eq(j, 2)), (0, True))) + assert ds(x*(KD(i, k) + KD(j, k)), (k, 3, 3)) == piecewise_fold( + Piecewise((x, Eq(i, 3)), (0, True)) + + Piecewise((x, Eq(j, 3)), (0, True))) + assert ds(x*(KD(i, k) + KD(j, k)), (k, 1, l)) == piecewise_fold( + Piecewise((x, And(1 <= i, i <= l)), (0, True)) + + Piecewise((x, And(1 <= j, j <= l)), (0, True))) + assert ds(x*(KD(i, k) + KD(j, k)), (k, l, 3)) == piecewise_fold( + Piecewise((x, And(l <= i, i <= 3)), (0, True)) + + Piecewise((x, And(l <= j, j <= 3)), (0, True))) + assert ds(x*(KD(i, k) + KD(j, k)), (k, l, m)) == piecewise_fold( + Piecewise((x, And(l <= i, i <= m)), (0, True)) + + Piecewise((x, And(l <= j, j <= m)), (0, True))) + + +def test_deltasummation_mul_add_x_y_add_kd_kd(): + assert ds((x + y)*(KD(i, k) + KD(j, k)), (k, 1, 3)) == piecewise_fold( + Piecewise((x + y, And(1 <= i, i <= 3)), (0, True)) + + Piecewise((x + y, And(1 <= j, j <= 3)), (0, True))) + assert ds((x + y)*(KD(i, k) + KD(j, k)), (k, 1, 1)) == piecewise_fold( + Piecewise((x + y, Eq(i, 1)), (0, True)) + + Piecewise((x + y, Eq(j, 1)), (0, True))) + assert ds((x + y)*(KD(i, k) + KD(j, k)), (k, 2, 2)) == piecewise_fold( + Piecewise((x + y, Eq(i, 2)), (0, True)) + + Piecewise((x + y, Eq(j, 2)), (0, True))) + assert ds((x + y)*(KD(i, k) + KD(j, k)), (k, 3, 3)) == piecewise_fold( + Piecewise((x + y, Eq(i, 3)), (0, True)) + + Piecewise((x + y, Eq(j, 3)), (0, True))) + assert ds((x + y)*(KD(i, k) + KD(j, k)), (k, 1, l)) == piecewise_fold( + Piecewise((x + y, And(1 <= i, i <= l)), (0, True)) + + Piecewise((x + y, And(1 <= j, j <= l)), (0, True))) + assert ds((x + y)*(KD(i, k) + KD(j, k)), (k, l, 3)) == piecewise_fold( + Piecewise((x + y, And(l <= i, i <= 3)), (0, True)) + + Piecewise((x + y, And(l <= j, j <= 3)), (0, True))) + assert ds((x + y)*(KD(i, k) + KD(j, k)), (k, l, m)) == piecewise_fold( + Piecewise((x + y, And(l <= i, i <= m)), (0, True)) + + Piecewise((x + y, And(l <= j, j <= m)), (0, True))) + + +def test_deltasummation_add_mul_x_y_mul_x_kd(): + assert ds(x*y + x*KD(i, j), (j, 1, 3)) == \ + Piecewise((3*x*y + x, And(1 <= i, i <= 3)), (3*x*y, True)) + assert ds(x*y + x*KD(i, j), (j, 1, 1)) == \ + Piecewise((x*y + x, Eq(i, 1)), (x*y, True)) + assert ds(x*y + x*KD(i, j), (j, 2, 2)) == \ + Piecewise((x*y + x, Eq(i, 2)), (x*y, True)) + assert ds(x*y + x*KD(i, j), (j, 3, 3)) == \ + Piecewise((x*y + x, Eq(i, 3)), (x*y, True)) + assert ds(x*y + x*KD(i, j), (j, 1, k)) == \ + Piecewise((k*x*y + x, And(1 <= i, i <= k)), (k*x*y, True)) + assert ds(x*y + x*KD(i, j), (j, k, 3)) == \ + Piecewise(((4 - k)*x*y + x, And(k <= i, i <= 3)), ((4 - k)*x*y, True)) + assert ds(x*y + x*KD(i, j), (j, k, l)) == Piecewise( + ((l - k + 1)*x*y + x, And(k <= i, i <= l)), ((l - k + 1)*x*y, True)) + + +def test_deltasummation_mul_x_add_y_kd(): + assert ds(x*(y + KD(i, j)), (j, 1, 3)) == \ + Piecewise((3*x*y + x, And(1 <= i, i <= 3)), (3*x*y, True)) + assert ds(x*(y + KD(i, j)), (j, 1, 1)) == \ + Piecewise((x*y + x, Eq(i, 1)), (x*y, True)) + assert ds(x*(y + KD(i, j)), (j, 2, 2)) == \ + Piecewise((x*y + x, Eq(i, 2)), (x*y, True)) + assert ds(x*(y + KD(i, j)), (j, 3, 3)) == \ + Piecewise((x*y + x, Eq(i, 3)), (x*y, True)) + assert ds(x*(y + KD(i, j)), (j, 1, k)) == \ + Piecewise((k*x*y + x, And(1 <= i, i <= k)), (k*x*y, True)) + assert ds(x*(y + KD(i, j)), (j, k, 3)) == \ + Piecewise(((4 - k)*x*y + x, And(k <= i, i <= 3)), ((4 - k)*x*y, True)) + assert ds(x*(y + KD(i, j)), (j, k, l)) == Piecewise( + ((l - k + 1)*x*y + x, And(k <= i, i <= l)), ((l - k + 1)*x*y, True)) + + +def test_deltasummation_mul_x_add_y_twokd(): + assert ds(x*(y + 2*KD(i, j)), (j, 1, 3)) == \ + Piecewise((3*x*y + 2*x, And(1 <= i, i <= 3)), (3*x*y, True)) + assert ds(x*(y + 2*KD(i, j)), (j, 1, 1)) == \ + Piecewise((x*y + 2*x, Eq(i, 1)), (x*y, True)) + assert ds(x*(y + 2*KD(i, j)), (j, 2, 2)) == \ + Piecewise((x*y + 2*x, Eq(i, 2)), (x*y, True)) + assert ds(x*(y + 2*KD(i, j)), (j, 3, 3)) == \ + Piecewise((x*y + 2*x, Eq(i, 3)), (x*y, True)) + assert ds(x*(y + 2*KD(i, j)), (j, 1, k)) == \ + Piecewise((k*x*y + 2*x, And(1 <= i, i <= k)), (k*x*y, True)) + assert ds(x*(y + 2*KD(i, j)), (j, k, 3)) == Piecewise( + ((4 - k)*x*y + 2*x, And(k <= i, i <= 3)), ((4 - k)*x*y, True)) + assert ds(x*(y + 2*KD(i, j)), (j, k, l)) == Piecewise( + ((l - k + 1)*x*y + 2*x, And(k <= i, i <= l)), ((l - k + 1)*x*y, True)) + + +def test_deltasummation_mul_add_x_y_add_y_kd(): + assert ds((x + y)*(y + KD(i, j)), (j, 1, 3)) == Piecewise( + (3*(x + y)*y + x + y, And(1 <= i, i <= 3)), (3*(x + y)*y, True)) + assert ds((x + y)*(y + KD(i, j)), (j, 1, 1)) == \ + Piecewise(((x + y)*y + x + y, Eq(i, 1)), ((x + y)*y, True)) + assert ds((x + y)*(y + KD(i, j)), (j, 2, 2)) == \ + Piecewise(((x + y)*y + x + y, Eq(i, 2)), ((x + y)*y, True)) + assert ds((x + y)*(y + KD(i, j)), (j, 3, 3)) == \ + Piecewise(((x + y)*y + x + y, Eq(i, 3)), ((x + y)*y, True)) + assert ds((x + y)*(y + KD(i, j)), (j, 1, k)) == Piecewise( + (k*(x + y)*y + x + y, And(1 <= i, i <= k)), (k*(x + y)*y, True)) + assert ds((x + y)*(y + KD(i, j)), (j, k, 3)) == Piecewise( + ((4 - k)*(x + y)*y + x + y, And(k <= i, i <= 3)), + ((4 - k)*(x + y)*y, True)) + assert ds((x + y)*(y + KD(i, j)), (j, k, l)) == Piecewise( + ((l - k + 1)*(x + y)*y + x + y, And(k <= i, i <= l)), + ((l - k + 1)*(x + y)*y, True)) + + +def test_deltasummation_mul_add_x_kd_add_y_kd(): + assert ds((x + KD(i, k))*(y + KD(i, j)), (j, 1, 3)) == piecewise_fold( + Piecewise((KD(i, k) + x, And(1 <= i, i <= 3)), (0, True)) + + 3*(KD(i, k) + x)*y) + assert ds((x + KD(i, k))*(y + KD(i, j)), (j, 1, 1)) == piecewise_fold( + Piecewise((KD(i, k) + x, Eq(i, 1)), (0, True)) + + (KD(i, k) + x)*y) + assert ds((x + KD(i, k))*(y + KD(i, j)), (j, 2, 2)) == piecewise_fold( + Piecewise((KD(i, k) + x, Eq(i, 2)), (0, True)) + + (KD(i, k) + x)*y) + assert ds((x + KD(i, k))*(y + KD(i, j)), (j, 3, 3)) == piecewise_fold( + Piecewise((KD(i, k) + x, Eq(i, 3)), (0, True)) + + (KD(i, k) + x)*y) + assert ds((x + KD(i, k))*(y + KD(i, j)), (j, 1, k)) == piecewise_fold( + Piecewise((KD(i, k) + x, And(1 <= i, i <= k)), (0, True)) + + k*(KD(i, k) + x)*y) + assert ds((x + KD(i, k))*(y + KD(i, j)), (j, k, 3)) == piecewise_fold( + Piecewise((KD(i, k) + x, And(k <= i, i <= 3)), (0, True)) + + (4 - k)*(KD(i, k) + x)*y) + assert ds((x + KD(i, k))*(y + KD(i, j)), (j, k, l)) == piecewise_fold( + Piecewise((KD(i, k) + x, And(k <= i, i <= l)), (0, True)) + + (l - k + 1)*(KD(i, k) + x)*y) + + +def test_extract_delta(): + raises(ValueError, lambda: _extract_delta(KD(i, j) + KD(k, l), i)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/tests/test_gosper.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/tests/test_gosper.py new file mode 100644 index 0000000000000000000000000000000000000000..77b642a9b7cd55f96840a8e20e517206b6a6f8f0 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/tests/test_gosper.py @@ -0,0 +1,204 @@ +"""Tests for Gosper's algorithm for hypergeometric summation. """ + +from sympy.core.numbers import (Rational, pi) +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.combinatorial.factorials import (binomial, factorial) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.special.gamma_functions import gamma +from sympy.polys.polytools import Poly +from sympy.simplify.simplify import simplify +from sympy.concrete.gosper import gosper_normal, gosper_sum, gosper_term +from sympy.abc import a, b, j, k, m, n, r, x + + +def test_gosper_normal(): + eq = 4*n + 5, 2*(4*n + 1)*(2*n + 3), n + assert gosper_normal(*eq) == \ + (Poly(Rational(1, 4), n), Poly(n + Rational(3, 2)), Poly(n + Rational(1, 4))) + assert gosper_normal(*eq, polys=False) == \ + (Rational(1, 4), n + Rational(3, 2), n + Rational(1, 4)) + + +def test_gosper_term(): + assert gosper_term((4*k + 1)*factorial( + k)/factorial(2*k + 1), k) == (-k - S.Half)/(k + Rational(1, 4)) + + +def test_gosper_sum(): + assert gosper_sum(1, (k, 0, n)) == 1 + n + assert gosper_sum(k, (k, 0, n)) == n*(1 + n)/2 + assert gosper_sum(k**2, (k, 0, n)) == n*(1 + n)*(1 + 2*n)/6 + assert gosper_sum(k**3, (k, 0, n)) == n**2*(1 + n)**2/4 + + assert gosper_sum(2**k, (k, 0, n)) == 2*2**n - 1 + + assert gosper_sum(factorial(k), (k, 0, n)) is None + assert gosper_sum(binomial(n, k), (k, 0, n)) is None + + assert gosper_sum(factorial(k)/k**2, (k, 0, n)) is None + assert gosper_sum((k - 3)*factorial(k), (k, 0, n)) is None + + assert gosper_sum(k*factorial(k), k) == factorial(k) + assert gosper_sum( + k*factorial(k), (k, 0, n)) == n*factorial(n) + factorial(n) - 1 + + assert gosper_sum((-1)**k*binomial(n, k), (k, 0, n)) == 0 + assert gosper_sum(( + -1)**k*binomial(n, k), (k, 0, m)) == -(-1)**m*(m - n)*binomial(n, m)/n + + assert gosper_sum((4*k + 1)*factorial(k)/factorial(2*k + 1), (k, 0, n)) == \ + (2*factorial(2*n + 1) - factorial(n))/factorial(2*n + 1) + + # issue 6033: + assert gosper_sum( + n*(n + a + b)*a**n*b**n/(factorial(n + a)*factorial(n + b)), \ + (n, 0, m)).simplify() == -exp(m*log(a) + m*log(b))*gamma(a + 1) \ + *gamma(b + 1)/(gamma(a)*gamma(b)*gamma(a + m + 1)*gamma(b + m + 1)) \ + + 1/(gamma(a)*gamma(b)) + + +def test_gosper_sum_indefinite(): + assert gosper_sum(k, k) == k*(k - 1)/2 + assert gosper_sum(k**2, k) == k*(k - 1)*(2*k - 1)/6 + + assert gosper_sum(1/(k*(k + 1)), k) == -1/k + assert gosper_sum(-(27*k**4 + 158*k**3 + 430*k**2 + 678*k + 445)*gamma(2*k + + 4)/(3*(3*k + 7)*gamma(3*k + 6)), k) == \ + (3*k + 5)*(k**2 + 2*k + 5)*gamma(2*k + 4)/gamma(3*k + 6) + + +def test_gosper_sum_parametric(): + assert gosper_sum(binomial(S.Half, m - j + 1)*binomial(S.Half, m + j), (j, 1, n)) == \ + n*(1 + m - n)*(-1 + 2*m + 2*n)*binomial(S.Half, 1 + m - n)* \ + binomial(S.Half, m + n)/(m*(1 + 2*m)) + + +def test_gosper_sum_algebraic(): + assert gosper_sum( + n**2 + sqrt(2), (n, 0, m)) == (m + 1)*(2*m**2 + m + 6*sqrt(2))/6 + + +def test_gosper_sum_iterated(): + f1 = binomial(2*k, k)/4**k + f2 = (1 + 2*n)*binomial(2*n, n)/4**n + f3 = (1 + 2*n)*(3 + 2*n)*binomial(2*n, n)/(3*4**n) + f4 = (1 + 2*n)*(3 + 2*n)*(5 + 2*n)*binomial(2*n, n)/(15*4**n) + f5 = (1 + 2*n)*(3 + 2*n)*(5 + 2*n)*(7 + 2*n)*binomial(2*n, n)/(105*4**n) + + assert gosper_sum(f1, (k, 0, n)) == f2 + assert gosper_sum(f2, (n, 0, n)) == f3 + assert gosper_sum(f3, (n, 0, n)) == f4 + assert gosper_sum(f4, (n, 0, n)) == f5 + +# the AeqB tests test expressions given in +# www.math.upenn.edu/~wilf/AeqB.pdf + + +def test_gosper_sum_AeqB_part1(): + f1a = n**4 + f1b = n**3*2**n + f1c = 1/(n**2 + sqrt(5)*n - 1) + f1d = n**4*4**n/binomial(2*n, n) + f1e = factorial(3*n)/(factorial(n)*factorial(n + 1)*factorial(n + 2)*27**n) + f1f = binomial(2*n, n)**2/((n + 1)*4**(2*n)) + f1g = (4*n - 1)*binomial(2*n, n)**2/((2*n - 1)**2*4**(2*n)) + f1h = n*factorial(n - S.Half)**2/factorial(n + 1)**2 + + g1a = m*(m + 1)*(2*m + 1)*(3*m**2 + 3*m - 1)/30 + g1b = 26 + 2**(m + 1)*(m**3 - 3*m**2 + 9*m - 13) + g1c = (m + 1)*(m*(m**2 - 7*m + 3)*sqrt(5) - ( + 3*m**3 - 7*m**2 + 19*m - 6))/(2*m**3*sqrt(5) + m**4 + 5*m**2 - 1)/6 + g1d = Rational(-2, 231) + 2*4**m*(m + 1)*(63*m**4 + 112*m**3 + 18*m**2 - + 22*m + 3)/(693*binomial(2*m, m)) + g1e = Rational(-9, 2) + (81*m**2 + 261*m + 200)*factorial( + 3*m + 2)/(40*27**m*factorial(m)*factorial(m + 1)*factorial(m + 2)) + g1f = (2*m + 1)**2*binomial(2*m, m)**2/(4**(2*m)*(m + 1)) + g1g = -binomial(2*m, m)**2/4**(2*m) + g1h = 4*pi -(2*m + 1)**2*(3*m + 4)*factorial(m - S.Half)**2/factorial(m + 1)**2 + + g = gosper_sum(f1a, (n, 0, m)) + assert g is not None and simplify(g - g1a) == 0 + g = gosper_sum(f1b, (n, 0, m)) + assert g is not None and simplify(g - g1b) == 0 + g = gosper_sum(f1c, (n, 0, m)) + assert g is not None and simplify(g - g1c) == 0 + g = gosper_sum(f1d, (n, 0, m)) + assert g is not None and simplify(g - g1d) == 0 + g = gosper_sum(f1e, (n, 0, m)) + assert g is not None and simplify(g - g1e) == 0 + g = gosper_sum(f1f, (n, 0, m)) + assert g is not None and simplify(g - g1f) == 0 + g = gosper_sum(f1g, (n, 0, m)) + assert g is not None and simplify(g - g1g) == 0 + g = gosper_sum(f1h, (n, 0, m)) + # need to call rewrite(gamma) here because we have terms involving + # factorial(1/2) + assert g is not None and simplify(g - g1h).rewrite(gamma) == 0 + + +def test_gosper_sum_AeqB_part2(): + f2a = n**2*a**n + f2b = (n - r/2)*binomial(r, n) + f2c = factorial(n - 1)**2/(factorial(n - x)*factorial(n + x)) + + g2a = -a*(a + 1)/(a - 1)**3 + a**( + m + 1)*(a**2*m**2 - 2*a*m**2 + m**2 - 2*a*m + 2*m + a + 1)/(a - 1)**3 + g2b = (m - r)*binomial(r, m)/2 + ff = factorial(1 - x)*factorial(1 + x) + g2c = 1/ff*( + 1 - 1/x**2) + factorial(m)**2/(x**2*factorial(m - x)*factorial(m + x)) + + g = gosper_sum(f2a, (n, 0, m)) + assert g is not None and simplify(g - g2a) == 0 + g = gosper_sum(f2b, (n, 0, m)) + assert g is not None and simplify(g - g2b) == 0 + g = gosper_sum(f2c, (n, 1, m)) + assert g is not None and simplify(g - g2c) == 0 + + +def test_gosper_nan(): + a = Symbol('a', positive=True) + b = Symbol('b', positive=True) + n = Symbol('n', integer=True) + m = Symbol('m', integer=True) + f2d = n*(n + a + b)*a**n*b**n/(factorial(n + a)*factorial(n + b)) + g2d = 1/(factorial(a - 1)*factorial( + b - 1)) - a**(m + 1)*b**(m + 1)/(factorial(a + m)*factorial(b + m)) + g = gosper_sum(f2d, (n, 0, m)) + assert simplify(g - g2d) == 0 + + +def test_gosper_sum_AeqB_part3(): + f3a = 1/n**4 + f3b = (6*n + 3)/(4*n**4 + 8*n**3 + 8*n**2 + 4*n + 3) + f3c = 2**n*(n**2 - 2*n - 1)/(n**2*(n + 1)**2) + f3d = n**2*4**n/((n + 1)*(n + 2)) + f3e = 2**n/(n + 1) + f3f = 4*(n - 1)*(n**2 - 2*n - 1)/(n**2*(n + 1)**2*(n - 2)**2*(n - 3)**2) + f3g = (n**4 - 14*n**2 - 24*n - 9)*2**n/(n**2*(n + 1)**2*(n + 2)**2* + (n + 3)**2) + + # g3a -> no closed form + g3b = m*(m + 2)/(2*m**2 + 4*m + 3) + g3c = 2**m/m**2 - 2 + g3d = Rational(2, 3) + 4**(m + 1)*(m - 1)/(m + 2)/3 + # g3e -> no closed form + g3f = -(Rational(-1, 16) + 1/((m - 2)**2*(m + 1)**2)) # the AeqB key is wrong + g3g = Rational(-2, 9) + 2**(m + 1)/((m + 1)**2*(m + 3)**2) + + g = gosper_sum(f3a, (n, 1, m)) + assert g is None + g = gosper_sum(f3b, (n, 1, m)) + assert g is not None and simplify(g - g3b) == 0 + g = gosper_sum(f3c, (n, 1, m - 1)) + assert g is not None and simplify(g - g3c) == 0 + g = gosper_sum(f3d, (n, 1, m)) + assert g is not None and simplify(g - g3d) == 0 + g = gosper_sum(f3e, (n, 0, m - 1)) + assert g is None + g = gosper_sum(f3f, (n, 4, m)) + assert g is not None and simplify(g - g3f) == 0 + g = gosper_sum(f3g, (n, 1, m)) + assert g is not None and simplify(g - g3g) == 0 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/tests/test_guess.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/tests/test_guess.py new file mode 100644 index 0000000000000000000000000000000000000000..5ac5d02b89ad62a70a29bd450b71b284b6aea76d --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/tests/test_guess.py @@ -0,0 +1,82 @@ +from sympy.concrete.guess import ( + find_simple_recurrence_vector, + find_simple_recurrence, + rationalize, + guess_generating_function_rational, + guess_generating_function, + guess + ) +from sympy.concrete.products import Product +from sympy.core.function import Function +from sympy.core.numbers import Rational +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.factorials import (RisingFactorial, factorial) +from sympy.functions.combinatorial.numbers import fibonacci +from sympy.functions.elementary.exponential import exp + + +def test_find_simple_recurrence_vector(): + assert find_simple_recurrence_vector( + [fibonacci(k) for k in range(12)]) == [1, -1, -1] + + +def test_find_simple_recurrence(): + a = Function('a') + n = Symbol('n') + assert find_simple_recurrence([fibonacci(k) for k in range(12)]) == ( + -a(n) - a(n + 1) + a(n + 2)) + + f = Function('a') + i = Symbol('n') + a = [1, 1, 1] + for k in range(15): a.append(5*a[-1]-3*a[-2]+8*a[-3]) + assert find_simple_recurrence(a, A=f, N=i) == ( + -8*f(i) + 3*f(i + 1) - 5*f(i + 2) + f(i + 3)) + assert find_simple_recurrence([0, 2, 15, 74, 12, 3, 0, + 1, 2, 85, 4, 5, 63]) == 0 + + +def test_rationalize(): + from mpmath import cos, pi, mpf + assert rationalize(cos(pi/3)) == S.Half + assert rationalize(mpf("0.333333333333333")) == Rational(1, 3) + assert rationalize(mpf("-0.333333333333333")) == Rational(-1, 3) + assert rationalize(pi, maxcoeff = 250) == Rational(355, 113) + + +def test_guess_generating_function_rational(): + x = Symbol('x') + assert guess_generating_function_rational([fibonacci(k) + for k in range(5, 15)]) == ((3*x + 5)/(-x**2 - x + 1)) + + +def test_guess_generating_function(): + x = Symbol('x') + assert guess_generating_function([fibonacci(k) + for k in range(5, 15)])['ogf'] == ((3*x + 5)/(-x**2 - x + 1)) + assert guess_generating_function( + [1, 2, 5, 14, 41, 124, 383, 1200, 3799, 12122, 38919])['ogf'] == ( + (1/(x**4 + 2*x**2 - 4*x + 1))**S.Half) + assert guess_generating_function(sympify( + "[3/2, 11/2, 0, -121/2, -363/2, 121, 4719/2, 11495/2, -8712, -178717/2]") + )['ogf'] == (x + Rational(3, 2))/(11*x**2 - 3*x + 1) + assert guess_generating_function([factorial(k) for k in range(12)], + types=['egf'])['egf'] == 1/(-x + 1) + assert guess_generating_function([k+1 for k in range(12)], + types=['egf']) == {'egf': (x + 1)*exp(x), 'lgdegf': (x + 2)/(x + 1)} + + +def test_guess(): + i0, i1 = symbols('i0 i1') + assert guess([1, 2, 6, 24, 120], evaluate=False) == [Product(i1 + 1, (i1, 1, i0 - 1))] + assert guess([1, 2, 6, 24, 120]) == [RisingFactorial(2, i0 - 1)] + assert guess([1, 2, 7, 42, 429, 7436, 218348, 10850216], niter=4) == [ + 2**(i0 - 1)*(Rational(27, 16))**(i0**2/2 - 3*i0/2 + + 1)*Product(RisingFactorial(Rational(5, 3), i1 - 1)*RisingFactorial(Rational(7, 3), i1 + - 1)/(RisingFactorial(Rational(3, 2), i1 - 1)*RisingFactorial(Rational(5, 2), i1 - + 1)), (i1, 1, i0 - 1))] + assert guess([1, 0, 2]) == [] + x, y = symbols('x y') + assert guess([1, 2, 6, 24, 120], variables=[x, y]) == [RisingFactorial(2, x - 1)] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/tests/test_products.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/tests/test_products.py new file mode 100644 index 0000000000000000000000000000000000000000..9be053a7040014c6ed38c1279a609fcb2426258e --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/tests/test_products.py @@ -0,0 +1,410 @@ +from sympy.concrete.products import (Product, product) +from sympy.concrete.summations import Sum +from sympy.core.function import (Derivative, Function, diff) +from sympy.core.numbers import (Rational, oo, pi) +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol, symbols) +from sympy.functions.combinatorial.factorials import (rf, factorial) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.functions.special.tensor_functions import KroneckerDelta +from sympy.simplify.combsimp import combsimp +from sympy.simplify.simplify import simplify +from sympy.testing.pytest import raises + +a, k, n, m, x = symbols('a,k,n,m,x', integer=True) +f = Function('f') + + +def test_karr_convention(): + # Test the Karr product convention that we want to hold. + # See his paper "Summation in Finite Terms" for a detailed + # reasoning why we really want exactly this definition. + # The convention is described for sums on page 309 and + # essentially in section 1.4, definition 3. For products + # we can find in analogy: + # + # \prod_{m <= i < n} f(i) 'has the obvious meaning' for m < n + # \prod_{m <= i < n} f(i) = 0 for m = n + # \prod_{m <= i < n} f(i) = 1 / \prod_{n <= i < m} f(i) for m > n + # + # It is important to note that he defines all products with + # the upper limit being *exclusive*. + # In contrast, SymPy and the usual mathematical notation has: + # + # prod_{i = a}^b f(i) = f(a) * f(a+1) * ... * f(b-1) * f(b) + # + # with the upper limit *inclusive*. So translating between + # the two we find that: + # + # \prod_{m <= i < n} f(i) = \prod_{i = m}^{n-1} f(i) + # + # where we intentionally used two different ways to typeset the + # products and its limits. + + i = Symbol("i", integer=True) + k = Symbol("k", integer=True) + j = Symbol("j", integer=True, positive=True) + + # A simple example with a concrete factors and symbolic limits. + + # The normal product: m = k and n = k + j and therefore m < n: + m = k + n = k + j + + a = m + b = n - 1 + S1 = Product(i**2, (i, a, b)).doit() + + # The reversed product: m = k + j and n = k and therefore m > n: + m = k + j + n = k + + a = m + b = n - 1 + S2 = Product(i**2, (i, a, b)).doit() + + assert S1 * S2 == 1 + + # Test the empty product: m = k and n = k and therefore m = n: + m = k + n = k + + a = m + b = n - 1 + Sz = Product(i**2, (i, a, b)).doit() + + assert Sz == 1 + + # Another example this time with an unspecified factor and + # numeric limits. (We can not do both tests in the same example.) + f = Function("f") + + # The normal product with m < n: + m = 2 + n = 11 + + a = m + b = n - 1 + S1 = Product(f(i), (i, a, b)).doit() + + # The reversed product with m > n: + m = 11 + n = 2 + + a = m + b = n - 1 + S2 = Product(f(i), (i, a, b)).doit() + + assert simplify(S1 * S2) == 1 + + # Test the empty product with m = n: + m = 5 + n = 5 + + a = m + b = n - 1 + Sz = Product(f(i), (i, a, b)).doit() + + assert Sz == 1 + + +def test_karr_proposition_2a(): + # Test Karr, page 309, proposition 2, part a + i, u, v = symbols('i u v', integer=True) + + def test_the_product(m, n): + # g + g = i**3 + 2*i**2 - 3*i + # f = Delta g + f = simplify(g.subs(i, i+1) / g) + # The product + a = m + b = n - 1 + P = Product(f, (i, a, b)).doit() + # Test if Product_{m <= i < n} f(i) = g(n) / g(m) + assert combsimp(P / (g.subs(i, n) / g.subs(i, m))) == 1 + + # m < n + test_the_product(u, u + v) + # m = n + test_the_product(u, u) + # m > n + test_the_product(u + v, u) + + +def test_karr_proposition_2b(): + # Test Karr, page 309, proposition 2, part b + i, u, v, w = symbols('i u v w', integer=True) + + def test_the_product(l, n, m): + # Productmand + s = i**3 + # First product + a = l + b = n - 1 + S1 = Product(s, (i, a, b)).doit() + # Second product + a = l + b = m - 1 + S2 = Product(s, (i, a, b)).doit() + # Third product + a = m + b = n - 1 + S3 = Product(s, (i, a, b)).doit() + # Test if S1 = S2 * S3 as required + assert combsimp(S1 / (S2 * S3)) == 1 + + # l < m < n + test_the_product(u, u + v, u + v + w) + # l < m = n + test_the_product(u, u + v, u + v) + # l < m > n + test_the_product(u, u + v + w, v) + # l = m < n + test_the_product(u, u, u + v) + # l = m = n + test_the_product(u, u, u) + # l = m > n + test_the_product(u + v, u + v, u) + # l > m < n + test_the_product(u + v, u, u + w) + # l > m = n + test_the_product(u + v, u, u) + # l > m > n + test_the_product(u + v + w, u + v, u) + + +def test_simple_products(): + assert product(2, (k, a, n)) == 2**(n - a + 1) + assert product(k, (k, 1, n)) == factorial(n) + assert product(k**3, (k, 1, n)) == factorial(n)**3 + + assert product(k + 1, (k, 0, n - 1)) == factorial(n) + assert product(k + 1, (k, a, n - 1)) == rf(1 + a, n - a) + + assert product(cos(k), (k, 0, 5)) == cos(1)*cos(2)*cos(3)*cos(4)*cos(5) + assert product(cos(k), (k, 3, 5)) == cos(3)*cos(4)*cos(5) + assert product(cos(k), (k, 1, Rational(5, 2))) != cos(1)*cos(2) + + assert isinstance(product(k**k, (k, 1, n)), Product) + + assert Product(x**k, (k, 1, n)).variables == [k] + + raises(ValueError, lambda: Product(n)) + raises(ValueError, lambda: Product(n, k)) + raises(ValueError, lambda: Product(n, k, 1)) + raises(ValueError, lambda: Product(n, k, 1, 10)) + raises(ValueError, lambda: Product(n, (k, 1))) + + assert product(1, (n, 1, oo)) == 1 # issue 8301 + assert product(2, (n, 1, oo)) is oo + assert product(-1, (n, 1, oo)).func is Product + + +def test_multiple_products(): + assert product(x, (n, 1, k), (k, 1, m)) == x**(m**2/2 + m/2) + assert product(f(n), ( + n, 1, m), (m, 1, k)) == Product(f(n), (n, 1, m), (m, 1, k)).doit() + assert Product(f(n), (m, 1, k), (n, 1, k)).doit() == \ + Product(Product(f(n), (m, 1, k)), (n, 1, k)).doit() == \ + product(f(n), (m, 1, k), (n, 1, k)) == \ + product(product(f(n), (m, 1, k)), (n, 1, k)) == \ + Product(f(n)**k, (n, 1, k)) + assert Product( + x, (x, 1, k), (k, 1, n)).doit() == Product(factorial(k), (k, 1, n)) + + assert Product(x**k, (n, 1, k), (k, 1, m)).variables == [n, k] + + +def test_rational_products(): + assert product(1 + 1/k, (k, 1, n)) == rf(2, n)/factorial(n) + + +def test_special_products(): + # Wallis product + assert product((4*k)**2 / (4*k**2 - 1), (k, 1, n)) == \ + 4**n*factorial(n)**2/rf(S.Half, n)/rf(Rational(3, 2), n) + + # Euler's product formula for sin + assert product(1 + a/k**2, (k, 1, n)) == \ + rf(1 - sqrt(-a), n)*rf(1 + sqrt(-a), n)/factorial(n)**2 + + +def test__eval_product(): + from sympy.abc import i, n + # issue 4809 + a = Function('a') + assert product(2*a(i), (i, 1, n)) == 2**n * Product(a(i), (i, 1, n)) + # issue 4810 + assert product(2**i, (i, 1, n)) == 2**(n*(n + 1)/2) + k, m = symbols('k m', integer=True) + assert product(2**i, (i, k, m)) == 2**(-k**2/2 + k/2 + m**2/2 + m/2) + n = Symbol('n', negative=True, integer=True) + p = Symbol('p', positive=True, integer=True) + assert product(2**i, (i, n, p)) == 2**(-n**2/2 + n/2 + p**2/2 + p/2) + assert product(2**i, (i, p, n)) == 2**(n**2/2 + n/2 - p**2/2 + p/2) + + +def test_product_pow(): + # issue 4817 + assert product(2**f(k), (k, 1, n)) == 2**Sum(f(k), (k, 1, n)) + assert product(2**(2*f(k)), (k, 1, n)) == 2**Sum(2*f(k), (k, 1, n)) + + +def test_infinite_product(): + # issue 5737 + assert isinstance(Product(2**(1/factorial(n)), (n, 0, oo)), Product) + + +def test_conjugate_transpose(): + p = Product(x**k, (k, 1, 3)) + assert p.adjoint().doit() == p.doit().adjoint() + assert p.conjugate().doit() == p.doit().conjugate() + assert p.transpose().doit() == p.doit().transpose() + + A, B = symbols("A B", commutative=False) + p = Product(A*B**k, (k, 1, 3)) + assert p.adjoint().doit() == p.doit().adjoint() + assert p.conjugate().doit() == p.doit().conjugate() + assert p.transpose().doit() == p.doit().transpose() + + p = Product(B**k*A, (k, 1, 3)) + assert p.adjoint().doit() == p.doit().adjoint() + assert p.conjugate().doit() == p.doit().conjugate() + assert p.transpose().doit() == p.doit().transpose() + + +def test_simplify_prod(): + y, t, b, c, v, d = symbols('y, t, b, c, v, d', integer = True) + + _simplify = lambda e: simplify(e, doit=False) + assert _simplify(Product(x*y, (x, n, m), (y, a, k)) * \ + Product(y, (x, n, m), (y, a, k))) == \ + Product(x*y**2, (x, n, m), (y, a, k)) + assert _simplify(3 * y* Product(x, (x, n, m)) * Product(x, (x, m + 1, a))) \ + == 3 * y * Product(x, (x, n, a)) + assert _simplify(Product(x, (x, k + 1, a)) * Product(x, (x, n, k))) == \ + Product(x, (x, n, a)) + assert _simplify(Product(x, (x, k + 1, a)) * Product(x + 1, (x, n, k))) == \ + Product(x, (x, k + 1, a)) * Product(x + 1, (x, n, k)) + assert _simplify(Product(x, (t, a, b)) * Product(y, (t, a, b)) * \ + Product(x, (t, b+1, c))) == Product(x*y, (t, a, b)) * \ + Product(x, (t, b+1, c)) + assert _simplify(Product(x, (t, a, b)) * Product(x, (t, b+1, c)) * \ + Product(y, (t, a, b))) == Product(x*y, (t, a, b)) * \ + Product(x, (t, b+1, c)) + assert _simplify(Product(sin(t)**2 + cos(t)**2 + 1, (t, a, b))) == \ + Product(2, (t, a, b)) + assert _simplify(Product(sin(t)**2 + cos(t)**2 - 1, (t, a, b))) == \ + Product(0, (t, a, b)) + assert _simplify(Product(v*Product(sin(t)**2 + cos(t)**2, (t, a, b)), + (v, c, d))) == Product(v*Product(1, (t, a, b)), (v, c, d)) + + +def test_change_index(): + b, y, c, d, z = symbols('b, y, c, d, z', integer = True) + + assert Product(x, (x, a, b)).change_index(x, x + 1, y) == \ + Product(y - 1, (y, a + 1, b + 1)) + assert Product(x**2, (x, a, b)).change_index(x, x - 1) == \ + Product((x + 1)**2, (x, a - 1, b - 1)) + assert Product(x**2, (x, a, b)).change_index(x, -x, y) == \ + Product((-y)**2, (y, -b, -a)) + assert Product(x, (x, a, b)).change_index(x, -x - 1) == \ + Product(-x - 1, (x, - b - 1, -a - 1)) + assert Product(x*y, (x, a, b), (y, c, d)).change_index(x, x - 1, z) == \ + Product((z + 1)*y, (z, a - 1, b - 1), (y, c, d)) + + +def test_reorder(): + b, y, c, d, z = symbols('b, y, c, d, z', integer = True) + + assert Product(x*y, (x, a, b), (y, c, d)).reorder((0, 1)) == \ + Product(x*y, (y, c, d), (x, a, b)) + assert Product(x, (x, a, b), (x, c, d)).reorder((0, 1)) == \ + Product(x, (x, c, d), (x, a, b)) + assert Product(x*y + z, (x, a, b), (z, m, n), (y, c, d)).reorder(\ + (2, 0), (0, 1)) == Product(x*y + z, (z, m, n), (y, c, d), (x, a, b)) + assert Product(x*y*z, (x, a, b), (y, c, d), (z, m, n)).reorder(\ + (0, 1), (1, 2), (0, 2)) == \ + Product(x*y*z, (x, a, b), (z, m, n), (y, c, d)) + assert Product(x*y*z, (x, a, b), (y, c, d), (z, m, n)).reorder(\ + (x, y), (y, z), (x, z)) == \ + Product(x*y*z, (x, a, b), (z, m, n), (y, c, d)) + assert Product(x*y, (x, a, b), (y, c, d)).reorder((x, 1)) == \ + Product(x*y, (y, c, d), (x, a, b)) + assert Product(x*y, (x, a, b), (y, c, d)).reorder((y, x)) == \ + Product(x*y, (y, c, d), (x, a, b)) + + +def test_Product_is_convergent(): + assert Product(1/n**2, (n, 1, oo)).is_convergent() is S.false + assert Product(exp(1/n**2), (n, 1, oo)).is_convergent() is S.true + assert Product(1/n, (n, 1, oo)).is_convergent() is S.false + assert Product(1 + 1/n, (n, 1, oo)).is_convergent() is S.false + assert Product(1 + 1/n**2, (n, 1, oo)).is_convergent() is S.true + + +def test_reverse_order(): + x, y, a, b, c, d= symbols('x, y, a, b, c, d', integer = True) + + assert Product(x, (x, 0, 3)).reverse_order(0) == Product(1/x, (x, 4, -1)) + assert Product(x*y, (x, 1, 5), (y, 0, 6)).reverse_order(0, 1) == \ + Product(x*y, (x, 6, 0), (y, 7, -1)) + assert Product(x, (x, 1, 2)).reverse_order(0) == Product(1/x, (x, 3, 0)) + assert Product(x, (x, 1, 3)).reverse_order(0) == Product(1/x, (x, 4, 0)) + assert Product(x, (x, 1, a)).reverse_order(0) == Product(1/x, (x, a + 1, 0)) + assert Product(x, (x, a, 5)).reverse_order(0) == Product(1/x, (x, 6, a - 1)) + assert Product(x, (x, a + 1, a + 5)).reverse_order(0) == \ + Product(1/x, (x, a + 6, a)) + assert Product(x, (x, a + 1, a + 2)).reverse_order(0) == \ + Product(1/x, (x, a + 3, a)) + assert Product(x, (x, a + 1, a + 1)).reverse_order(0) == \ + Product(1/x, (x, a + 2, a)) + assert Product(x, (x, a, b)).reverse_order(0) == Product(1/x, (x, b + 1, a - 1)) + assert Product(x, (x, a, b)).reverse_order(x) == Product(1/x, (x, b + 1, a - 1)) + assert Product(x*y, (x, a, b), (y, 2, 5)).reverse_order(x, 1) == \ + Product(x*y, (x, b + 1, a - 1), (y, 6, 1)) + assert Product(x*y, (x, a, b), (y, 2, 5)).reverse_order(y, x) == \ + Product(x*y, (x, b + 1, a - 1), (y, 6, 1)) + + +def test_issue_9983(): + n = Symbol('n', integer=True, positive=True) + p = Product(1 + 1/n**Rational(2, 3), (n, 1, oo)) + assert p.is_convergent() is S.false + assert product(1 + 1/n**Rational(2, 3), (n, 1, oo)) == p.doit() + + +def test_issue_13546(): + n = Symbol('n') + k = Symbol('k') + p = Product(n + 1 / 2**k, (k, 0, n-1)).doit() + assert p.subs(n, 2).doit() == Rational(15, 2) + + +def test_issue_14036(): + a, n = symbols('a n') + assert product(1 - a**2 / (n*pi)**2, [n, 1, oo]) != 0 + + +def test_rewrite_Sum(): + assert Product(1 - S.Half**2/k**2, (k, 1, oo)).rewrite(Sum) == \ + exp(Sum(log(1 - 1/(4*k**2)), (k, 1, oo))) + + +def test_KroneckerDelta_Product(): + y = Symbol('y') + assert Product(x*KroneckerDelta(x, y), (x, 0, 1)).doit() == 0 + + +def test_issue_20848(): + _i = Dummy('i') + t, y, z = symbols('t y z') + assert diff(Product(x, (y, 1, z)), x).as_dummy() == Sum(Product(x, (y, 1, _i - 1))*Product(x, (y, _i + 1, z)), (_i, 1, z)).as_dummy() + assert diff(Product(x, (y, 1, z)), x).doit() == x**(z - 1)*z + assert diff(Product(x, (y, x, z)), x) == Derivative(Product(x, (y, x, z)), x) + assert diff(Product(t, (x, 1, z)), x) == S(0) + assert Product(sin(n*x), (n, -1, 1)).diff(x).doit() == S(0) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/tests/test_sums_products.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/tests/test_sums_products.py new file mode 100644 index 0000000000000000000000000000000000000000..b190afe0bd403819d3525453879d7d5d39e20a56 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/concrete/tests/test_sums_products.py @@ -0,0 +1,1676 @@ +from math import prod + +from sympy.concrete.expr_with_intlimits import ReorderError +from sympy.concrete.products import (Product, product) +from sympy.concrete.summations import (Sum, summation, telescopic, + eval_sum_residue, _dummy_with_inherited_properties_concrete) +from sympy.core.function import (Derivative, Function) +from sympy.core import (Catalan, EulerGamma) +from sympy.core.facts import InconsistentAssumptions +from sympy.core.mod import Mod +from sympy.core.numbers import (E, I, Rational, nan, oo, pi) +from sympy.core.relational import Eq, Ne +from sympy.core.numbers import Float +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol, symbols) +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.factorials import (rf, binomial, factorial) +from sympy.functions.combinatorial.numbers import harmonic +from sympy.functions.elementary.complexes import Abs, re +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.hyperbolic import (sinh, tanh) +from sympy.functions.elementary.integers import floor +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import (cos, sin, atan) +from sympy.functions.special.gamma_functions import (gamma, lowergamma) +from sympy.functions.special.tensor_functions import KroneckerDelta +from sympy.functions.special.zeta_functions import zeta +from sympy.integrals.integrals import Integral +from sympy.logic.boolalg import And, Or +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.matrices.expressions.special import Identity +from sympy.matrices import (Matrix, SparseMatrix, + ImmutableDenseMatrix, ImmutableSparseMatrix, diag) +from sympy.sets.contains import Contains +from sympy.sets.fancysets import Range +from sympy.sets.sets import Interval +from sympy.simplify.combsimp import combsimp +from sympy.simplify.simplify import simplify +from sympy.tensor.indexed import (Idx, Indexed, IndexedBase) +from sympy.testing.pytest import XFAIL, raises, slow +from sympy.abc import a, b, c, d, k, m, x, y, z + +n = Symbol('n', integer=True) +f, g = symbols('f g', cls=Function) + +def test_karr_convention(): + # Test the Karr summation convention that we want to hold. + # See his paper "Summation in Finite Terms" for a detailed + # reasoning why we really want exactly this definition. + # The convention is described on page 309 and essentially + # in section 1.4, definition 3: + # + # \sum_{m <= i < n} f(i) 'has the obvious meaning' for m < n + # \sum_{m <= i < n} f(i) = 0 for m = n + # \sum_{m <= i < n} f(i) = - \sum_{n <= i < m} f(i) for m > n + # + # It is important to note that he defines all sums with + # the upper limit being *exclusive*. + # In contrast, SymPy and the usual mathematical notation has: + # + # sum_{i = a}^b f(i) = f(a) + f(a+1) + ... + f(b-1) + f(b) + # + # with the upper limit *inclusive*. So translating between + # the two we find that: + # + # \sum_{m <= i < n} f(i) = \sum_{i = m}^{n-1} f(i) + # + # where we intentionally used two different ways to typeset the + # sum and its limits. + + i = Symbol("i", integer=True) + k = Symbol("k", integer=True) + j = Symbol("j", integer=True) + + # A simple example with a concrete summand and symbolic limits. + + # The normal sum: m = k and n = k + j and therefore m < n: + m = k + n = k + j + + a = m + b = n - 1 + S1 = Sum(i**2, (i, a, b)).doit() + + # The reversed sum: m = k + j and n = k and therefore m > n: + m = k + j + n = k + + a = m + b = n - 1 + S2 = Sum(i**2, (i, a, b)).doit() + + assert simplify(S1 + S2) == 0 + + # Test the empty sum: m = k and n = k and therefore m = n: + m = k + n = k + + a = m + b = n - 1 + Sz = Sum(i**2, (i, a, b)).doit() + + assert Sz == 0 + + # Another example this time with an unspecified summand and + # numeric limits. (We can not do both tests in the same example.) + + # The normal sum with m < n: + m = 2 + n = 11 + + a = m + b = n - 1 + S1 = Sum(f(i), (i, a, b)).doit() + + # The reversed sum with m > n: + m = 11 + n = 2 + + a = m + b = n - 1 + S2 = Sum(f(i), (i, a, b)).doit() + + assert simplify(S1 + S2) == 0 + + # Test the empty sum with m = n: + m = 5 + n = 5 + + a = m + b = n - 1 + Sz = Sum(f(i), (i, a, b)).doit() + + assert Sz == 0 + + e = Piecewise((exp(-i), Mod(i, 2) > 0), (0, True)) + s = Sum(e, (i, 0, 11)) + assert s.n(3) == s.doit().n(3) + + # issue #27893 + n = Symbol('n', integer=True) + assert Sum(1/(x**2 + 1), (x, oo, 0)).doit(deep=False) == Rational(-1, 2) + pi / (2 * tanh(pi)) + assert Sum(c**x/factorial(x), (x, oo, 0)).doit(deep=False).simplify() == exp(c) - 1 # exponential series + assert Sum((-1)**x/x, (x, oo,0)).doit() == -log(2) # alternating harmnic series + assert Sum((1/2)**x,(x, oo, -1)).doit() == S(2) # geometric series + assert Sum(1/x, (x, oo, 0)).doit() == oo # harmonic series, divergent + assert Sum((-1)**x/(2*x+1), (x, oo, -1)).doit() == pi/4 # leibniz series + assert Sum((((-1)**x) * c**(2*x+1)) / factorial(2*x+1), (x, oo, -1)).doit() == sin(c) # sinusoidal series + assert Sum((((-1)**x) * c**(2*x+1)) / (2*x+1), (x, 0, oo)).doit() \ + == Piecewise((atan(c), Ne(c**2, -1) & (Abs(c**2) <= 1)), \ + (Sum((-1)**x*c**(2*x + 1)/(2*x + 1), (x, 0, oo)), True)) # arctangent series + assert Sum(binomial(n, x) * c**x, (x, 0, oo)).doit() \ + == Piecewise(((c + 1)**n, \ + ((n <= -1) & (Abs(c) < 1)) \ + | ((n > 0) & (Abs(c) <= 1)) \ + | ((n <= 0) & (n > -1) & Ne(c, -1) & (Abs(c) <= 1))), \ + (Sum(c**x*binomial(n, x), (x, 0, oo)), True)) # binomial series + assert Sum(1/x**n, (x, oo, 0)).doit() \ + == Piecewise((zeta(n), n > 1), (Sum(x**(-n), (x, oo, 0)), True)) # Euler's zeta function + +def test_karr_proposition_2a(): + # Test Karr, page 309, proposition 2, part a + i = Symbol("i", integer=True) + u = Symbol("u", integer=True) + v = Symbol("v", integer=True) + + def test_the_sum(m, n): + # g + g = i**3 + 2*i**2 - 3*i + # f = Delta g + f = simplify(g.subs(i, i+1) - g) + # The sum + a = m + b = n - 1 + S = Sum(f, (i, a, b)).doit() + # Test if Sum_{m <= i < n} f(i) = g(n) - g(m) + assert simplify(S - (g.subs(i, n) - g.subs(i, m))) == 0 + + # m < n + test_the_sum(u, u+v) + # m = n + test_the_sum(u, u ) + # m > n + test_the_sum(u+v, u ) + + +def test_karr_proposition_2b(): + # Test Karr, page 309, proposition 2, part b + i = Symbol("i", integer=True) + u = Symbol("u", integer=True) + v = Symbol("v", integer=True) + w = Symbol("w", integer=True) + + def test_the_sum(l, n, m): + # Summand + s = i**3 + # First sum + a = l + b = n - 1 + S1 = Sum(s, (i, a, b)).doit() + # Second sum + a = l + b = m - 1 + S2 = Sum(s, (i, a, b)).doit() + # Third sum + a = m + b = n - 1 + S3 = Sum(s, (i, a, b)).doit() + # Test if S1 = S2 + S3 as required + assert S1 - (S2 + S3) == 0 + + # l < m < n + test_the_sum(u, u+v, u+v+w) + # l < m = n + test_the_sum(u, u+v, u+v ) + # l < m > n + test_the_sum(u, u+v+w, v ) + # l = m < n + test_the_sum(u, u, u+v ) + # l = m = n + test_the_sum(u, u, u ) + # l = m > n + test_the_sum(u+v, u+v, u ) + # l > m < n + test_the_sum(u+v, u, u+w ) + # l > m = n + test_the_sum(u+v, u, u ) + # l > m > n + test_the_sum(u+v+w, u+v, u ) + + +def test_arithmetic_sums(): + assert summation(1, (n, a, b)) == b - a + 1 + assert Sum(S.NaN, (n, a, b)) is S.NaN + assert Sum(x, (n, a, a)).doit() == x + assert Sum(x, (x, a, a)).doit() == a + assert Sum(x, (n, 1, a)).doit() == a*x + assert Sum(x, (x, Range(1, 11))).doit() == 55 + assert Sum(x, (x, Range(1, 11, 2))).doit() == 25 + assert Sum(x, (x, Range(1, 10, 2))) == Sum(x, (x, Range(9, 0, -2))) + lo, hi = 1, 2 + s1 = Sum(n, (n, lo, hi)) + s2 = Sum(n, (n, hi, lo)) + assert s1 != s2 + assert s1.doit() == 3 and s2.doit() == 0 + lo, hi = x, x + 1 + s1 = Sum(n, (n, lo, hi)) + s2 = Sum(n, (n, hi, lo)) + assert s1 != s2 + assert s1.doit() == 2*x + 1 and s2.doit() == 0 + assert Sum(Integral(x, (x, 1, y)) + x, (x, 1, 2)).doit() == \ + y**2 + 2 + assert summation(1, (n, 1, 10)) == 10 + assert summation(2*n, (n, 0, 10**10)) == 100000000010000000000 + assert summation(4*n*m, (n, a, 1), (m, 1, d)).expand() == \ + 2*d + 2*d**2 + a*d + a*d**2 - d*a**2 - a**2*d**2 + assert summation(cos(n), (n, -2, 1)) == cos(-2) + cos(-1) + cos(0) + cos(1) + assert summation(cos(n), (n, x, x + 2)) == cos(x) + cos(x + 1) + cos(x + 2) + assert isinstance(summation(cos(n), (n, x, x + S.Half)), Sum) + assert summation(k, (k, 0, oo)) is oo + assert summation(k, (k, Range(1, 11))) == 55 + + +def test_polynomial_sums(): + assert summation(n**2, (n, 3, 8)) == 199 + assert summation(n, (n, a, b)) == \ + ((a + b)*(b - a + 1)/2).expand() + assert summation(n**2, (n, 1, b)) == \ + ((2*b**3 + 3*b**2 + b)/6).expand() + assert summation(n**3, (n, 1, b)) == \ + ((b**4 + 2*b**3 + b**2)/4).expand() + assert summation(n**6, (n, 1, b)) == \ + ((6*b**7 + 21*b**6 + 21*b**5 - 7*b**3 + b)/42).expand() + + +def test_geometric_sums(): + assert summation(pi**n, (n, 0, b)) == (1 - pi**(b + 1)) / (1 - pi) + assert summation(2 * 3**n, (n, 0, b)) == 3**(b + 1) - 1 + assert summation(S.Half**n, (n, 1, oo)) == 1 + assert summation(2**n, (n, 0, b)) == 2**(b + 1) - 1 + assert summation(2**n, (n, 1, oo)) is oo + assert summation(2**(-n), (n, 1, oo)) == 1 + assert summation(3**(-n), (n, 4, oo)) == Rational(1, 54) + assert summation(2**(-4*n + 3), (n, 1, oo)) == Rational(8, 15) + assert summation(2**(n + 1), (n, 1, b)).expand() == 4*(2**b - 1) + + # issue 6664: + assert summation(x**n, (n, 0, oo)) == \ + Piecewise((1/(-x + 1), Abs(x) < 1), (Sum(x**n, (n, 0, oo)), True)) + + assert summation(-2**n, (n, 0, oo)) is -oo + assert summation(I**n, (n, 0, oo)) == Sum(I**n, (n, 0, oo)) + + # issue 6802: + assert summation((-1)**(2*x + 2), (x, 0, n)) == n + 1 + assert summation((-2)**(2*x + 2), (x, 0, n)) == 4*4**(n + 1)/S(3) - Rational(4, 3) + assert summation((-1)**x, (x, 0, n)) == -(-1)**(n + 1)/S(2) + S.Half + assert summation(y**x, (x, a, b)) == \ + Piecewise((-a + b + 1, Eq(y, 1)), ((y**a - y**(b + 1))/(-y + 1), True)) + assert summation((-2)**(y*x + 2), (x, 0, n)) == \ + 4*Piecewise((n + 1, Eq((-2)**y, 1)), + ((-(-2)**(y*(n + 1)) + 1)/(-(-2)**y + 1), True)) + + # issue 8251: + assert summation((1/(n + 1)**2)*n**2, (n, 0, oo)) is oo + + #issue 9908: + assert Sum(1/(n**3 - 1), (n, -oo, -2)).doit() == summation(1/(n**3 - 1), (n, -oo, -2)) + + #issue 11642: + result = Sum(0.5**n, (n, 1, oo)).doit() + assert result == 1.0 + assert result.is_Float + + result = Sum(0.25**n, (n, 1, oo)).doit() + assert result == 1/3. + assert result.is_Float + + result = Sum(0.99999**n, (n, 1, oo)).doit() + assert result == 99999.0 + assert result.is_Float + + result = Sum(S.Half**n, (n, 1, oo)).doit() + assert result == 1 + assert not result.is_Float + + result = Sum(Rational(3, 5)**n, (n, 1, oo)).doit() + assert result == Rational(3, 2) + assert not result.is_Float + + assert Sum(1.0**n, (n, 1, oo)).doit() is oo + assert Sum(2.43**n, (n, 1, oo)).doit() is oo + + # Issue 13979 + i, k, q = symbols('i k q', integer=True) + result = summation( + exp(-2*I*pi*k*i/n) * exp(2*I*pi*q*i/n) / n, (i, 0, n - 1) + ) + assert result.simplify() == Piecewise( + (1, Eq(exp(-2*I*pi*(k - q)/n), 1)), (0, True) + ) + + #Issue 23491 + assert Sum(1/(n**2 + 1), (n, 1, oo)).doit() == S(-1)/2 + pi/(2*tanh(pi)) + +def test_harmonic_sums(): + assert summation(1/k, (k, 0, n)) == Sum(1/k, (k, 0, n)) + assert summation(1/k, (k, 1, n)) == harmonic(n) + assert summation(n/k, (k, 1, n)) == n*harmonic(n) + assert summation(1/k, (k, 5, n)) == harmonic(n) - harmonic(4) + + +def test_composite_sums(): + f = S.Half*(7 - 6*n + Rational(1, 7)*n**3) + s = summation(f, (n, a, b)) + assert not isinstance(s, Sum) + A = 0 + for i in range(-3, 5): + A += f.subs(n, i) + B = s.subs(a, -3).subs(b, 4) + assert A == B + + +def test_hypergeometric_sums(): + assert summation( + binomial(2*k, k)/4**k, (k, 0, n)) == (1 + 2*n)*binomial(2*n, n)/4**n + assert summation(binomial(2*k, k)/5**k, (k, -oo, oo)) == sqrt(5) + + +def test_other_sums(): + f = m**2 + m*exp(m) + g = 3*exp(Rational(3, 2))/2 + exp(S.Half)/2 - exp(Rational(-1, 2))/2 - 3*exp(Rational(-3, 2))/2 + 5 + + assert summation(f, (m, Rational(-3, 2), Rational(3, 2))) == g + assert summation(f, (m, -1.5, 1.5)).evalf().epsilon_eq(g.evalf(), 1e-10) + +fac = factorial + + +def NS(e, n=15, **options): + return str(sympify(e).evalf(n, **options)) + + +def test_evalf_fast_series(): + # Euler transformed series for sqrt(1+x) + assert NS(Sum( + fac(2*n + 1)/fac(n)**2/2**(3*n + 1), (n, 0, oo)), 100) == NS(sqrt(2), 100) + + # Some series for exp(1) + estr = NS(E, 100) + assert NS(Sum(1/fac(n), (n, 0, oo)), 100) == estr + assert NS(1/Sum((1 - 2*n)/fac(2*n), (n, 0, oo)), 100) == estr + assert NS(Sum((2*n + 1)/fac(2*n), (n, 0, oo)), 100) == estr + assert NS(Sum((4*n + 3)/2**(2*n + 1)/fac(2*n + 1), (n, 0, oo))**2, 100) == estr + + pistr = NS(pi, 100) + # Ramanujan series for pi + assert NS(9801/sqrt(8)/Sum(fac( + 4*n)*(1103 + 26390*n)/fac(n)**4/396**(4*n), (n, 0, oo)), 100) == pistr + assert NS(1/Sum( + binomial(2*n, n)**3 * (42*n + 5)/2**(12*n + 4), (n, 0, oo)), 100) == pistr + # Machin's formula for pi + assert NS(16*Sum((-1)**n/(2*n + 1)/5**(2*n + 1), (n, 0, oo)) - + 4*Sum((-1)**n/(2*n + 1)/239**(2*n + 1), (n, 0, oo)), 100) == pistr + + # Apery's constant + astr = NS(zeta(3), 100) + P = 126392*n**5 + 412708*n**4 + 531578*n**3 + 336367*n**2 + 104000* \ + n + 12463 + assert NS(Sum((-1)**n * P / 24 * (fac(2*n + 1)*fac(2*n)*fac( + n))**3 / fac(3*n + 2) / fac(4*n + 3)**3, (n, 0, oo)), 100) == astr + assert NS(Sum((-1)**n * (205*n**2 + 250*n + 77)/64 * fac(n)**10 / + fac(2*n + 1)**5, (n, 0, oo)), 100) == astr + + +def test_evalf_fast_series_issue_4021(): + # Catalan's constant + assert NS(Sum((-1)**(n - 1)*2**(8*n)*(40*n**2 - 24*n + 3)*fac(2*n)**3* + fac(n)**2/n**3/(2*n - 1)/fac(4*n)**2, (n, 1, oo))/64, 100) == \ + NS(Catalan, 100) + astr = NS(zeta(3), 100) + assert NS(5*Sum( + (-1)**(n - 1)*fac(n)**2 / n**3 / fac(2*n), (n, 1, oo))/2, 100) == astr + assert NS(Sum((-1)**(n - 1)*(56*n**2 - 32*n + 5) / (2*n - 1)**2 * fac(n - 1) + **3 / fac(3*n), (n, 1, oo))/4, 100) == astr + + +def test_evalf_slow_series(): + assert NS(Sum((-1)**n / n, (n, 1, oo)), 15) == NS(-log(2), 15) + assert NS(Sum((-1)**n / n, (n, 1, oo)), 50) == NS(-log(2), 50) + assert NS(Sum(1/n**2, (n, 1, oo)), 15) == NS(pi**2/6, 15) + assert NS(Sum(1/n**2, (n, 1, oo)), 100) == NS(pi**2/6, 100) + assert NS(Sum(1/n**2, (n, 1, oo)), 500) == NS(pi**2/6, 500) + assert NS(Sum((-1)**n / (2*n + 1)**3, (n, 0, oo)), 15) == NS(pi**3/32, 15) + assert NS(Sum((-1)**n / (2*n + 1)**3, (n, 0, oo)), 50) == NS(pi**3/32, 50) + + +def test_evalf_oo_to_oo(): + # There used to be an error in certain cases + # Does not evaluate, but at least do not throw an error + # Evaluates symbolically to 0, which is not correct + assert Sum(1/(n**2+1), (n, -oo, oo)).evalf() == Sum(1/(n**2+1), (n, -oo, oo)) + # This evaluates if from 1 to oo and symbolically + assert Sum(1/(factorial(abs(n))), (n, -oo, -1)).evalf() == Sum(1/(factorial(abs(n))), (n, -oo, -1)) + + +def test_euler_maclaurin(): + # Exact polynomial sums with E-M + def check_exact(f, a, b, m, n): + A = Sum(f, (k, a, b)) + s, e = A.euler_maclaurin(m, n) + assert (e == 0) and (s.expand() == A.doit()) + check_exact(k**4, a, b, 0, 2) + check_exact(k**4 + 2*k, a, b, 1, 2) + check_exact(k**4 + k**2, a, b, 1, 5) + check_exact(k**5, 2, 6, 1, 2) + check_exact(k**5, 2, 6, 1, 3) + assert Sum(x-1, (x, 0, 2)).euler_maclaurin(m=30, n=30, eps=2**-15) == (0, 0) + # Not exact + assert Sum(k**6, (k, a, b)).euler_maclaurin(0, 2)[1] != 0 + # Numerical test + for mi, ni in [(2, 4), (2, 20), (10, 20), (18, 20)]: + A = Sum(1/k**3, (k, 1, oo)) + s, e = A.euler_maclaurin(mi, ni) + assert abs((s - zeta(3)).evalf()) < e.evalf() + + raises(ValueError, lambda: Sum(1, (x, 0, 1), (k, 0, 1)).euler_maclaurin()) + + +@slow +def test_evalf_euler_maclaurin(): + assert NS(Sum(1/k**k, (k, 1, oo)), 15) == '1.29128599706266' + assert NS(Sum(1/k**k, (k, 1, oo)), + 50) == '1.2912859970626635404072825905956005414986193682745' + assert NS(Sum(1/k - log(1 + 1/k), (k, 1, oo)), 15) == NS(EulerGamma, 15) + assert NS(Sum(1/k - log(1 + 1/k), (k, 1, oo)), 50) == NS(EulerGamma, 50) + assert NS(Sum(log(k)/k**2, (k, 1, oo)), 15) == '0.937548254315844' + assert NS(Sum(log(k)/k**2, (k, 1, oo)), + 50) == '0.93754825431584375370257409456786497789786028861483' + assert NS(Sum(1/k, (k, 1000000, 2000000)), 15) == '0.693147930560008' + assert NS(Sum(1/k, (k, 1000000, 2000000)), + 50) == '0.69314793056000780941723211364567656807940638436025' + + +def test_evalf_symbolic(): + # issue 6328 + expr = Sum(f(x), (x, 1, 3)) + Sum(g(x), (x, 1, 3)) + assert expr.evalf() == expr + + +def test_evalf_issue_3273(): + assert Sum(0, (k, 1, oo)).evalf() == 0 + + +def test_simple_products(): + assert Product(S.NaN, (x, 1, 3)) is S.NaN + assert product(S.NaN, (x, 1, 3)) is S.NaN + assert Product(x, (n, a, a)).doit() == x + assert Product(x, (x, a, a)).doit() == a + assert Product(x, (y, 1, a)).doit() == x**a + + lo, hi = 1, 2 + s1 = Product(n, (n, lo, hi)) + s2 = Product(n, (n, hi, lo)) + assert s1 != s2 + # This IS correct according to Karr product convention + assert s1.doit() == 2 + assert s2.doit() == 1 + + lo, hi = x, x + 1 + s1 = Product(n, (n, lo, hi)) + s2 = Product(n, (n, hi, lo)) + s3 = 1 / Product(n, (n, hi + 1, lo - 1)) + assert s1 != s2 + # This IS correct according to Karr product convention + assert s1.doit() == x*(x + 1) + assert s2.doit() == 1 + assert s3.doit() == x*(x + 1) + + assert Product(Integral(2*x, (x, 1, y)) + 2*x, (x, 1, 2)).doit() == \ + (y**2 + 1)*(y**2 + 3) + assert product(2, (n, a, b)) == 2**(b - a + 1) + assert product(n, (n, 1, b)) == factorial(b) + assert product(n**3, (n, 1, b)) == factorial(b)**3 + assert product(3**(2 + n), (n, a, b)) \ + == 3**(2*(1 - a + b) + b/2 + (b**2)/2 + a/2 - (a**2)/2) + assert product(cos(n), (n, 3, 5)) == cos(3)*cos(4)*cos(5) + assert product(cos(n), (n, x, x + 2)) == cos(x)*cos(x + 1)*cos(x + 2) + assert isinstance(product(cos(n), (n, x, x + S.Half)), Product) + # If Product managed to evaluate this one, it most likely got it wrong! + assert isinstance(Product(n**n, (n, 1, b)), Product) + + +def test_rational_products(): + assert combsimp(product(1 + 1/n, (n, a, b))) == (1 + b)/a + assert combsimp(product(n + 1, (n, a, b))) == gamma(2 + b)/gamma(1 + a) + assert combsimp(product((n + 1)/(n - 1), (n, a, b))) == b*(1 + b)/(a*(a - 1)) + assert combsimp(product(n/(n + 1)/(n + 2), (n, a, b))) == \ + a*gamma(a + 2)/(b + 1)/gamma(b + 3) + assert combsimp(product(n*(n + 1)/(n - 1)/(n - 2), (n, a, b))) == \ + b**2*(b - 1)*(1 + b)/(a - 1)**2/(a*(a - 2)) + + +def test_wallis_product(): + # Wallis product, given in two different forms to ensure that Product + # can factor simple rational expressions + A = Product(4*n**2 / (4*n**2 - 1), (n, 1, b)) + B = Product((2*n)*(2*n)/(2*n - 1)/(2*n + 1), (n, 1, b)) + R = pi*gamma(b + 1)**2/(2*gamma(b + S.Half)*gamma(b + Rational(3, 2))) + assert simplify(A.doit()) == R + assert simplify(B.doit()) == R + # This one should eventually also be doable (Euler's product formula for sin) + # assert Product(1+x/n**2, (n, 1, b)) == ... + + +def test_telescopic_sums(): + #checks also input 2 of comment 1 issue 4127 + assert Sum(1/k - 1/(k + 1), (k, 1, n)).doit() == 1 - 1/(1 + n) + assert Sum( + f(k) - f(k + 2), (k, m, n)).doit() == -f(1 + n) - f(2 + n) + f(m) + f(1 + m) + assert Sum(cos(k) - cos(k + 3), (k, 1, n)).doit() == -cos(1 + n) - \ + cos(2 + n) - cos(3 + n) + cos(1) + cos(2) + cos(3) + + # dummy variable shouldn't matter + assert telescopic(1/m, -m/(1 + m), (m, n - 1, n)) == \ + telescopic(1/k, -k/(1 + k), (k, n - 1, n)) + + assert Sum(1/x/(x - 1), (x, a, b)).doit() == 1/(a - 1) - 1/b + eq = 1/((5*n + 2)*(5*(n + 1) + 2)) + assert Sum(eq, (n, 0, oo)).doit() == S(1)/10 + nz = symbols('nz', nonzero=True) + v = Sum(eq.subs(5, nz), (n, 0, oo)).doit() + assert v.subs(nz, 5).simplify() == S(1)/10 + # check that apart is being used in non-symbolic case + s = Sum(eq, (n, 0, k)).doit() + v = Sum(eq, (n, 0, 10**100)).doit() + assert v == s.subs(k, 10**100) + + +def test_sum_reconstruct(): + s = Sum(n**2, (n, -1, 1)) + assert s == Sum(*s.args) + raises(ValueError, lambda: Sum(x, x)) + raises(ValueError, lambda: Sum(x, (x, 1))) + + +def test_limit_subs(): + for F in (Sum, Product, Integral): + assert F(a*exp(a), (a, -2, 2)) == F(a*exp(a), (a, -b, b)).subs(b, 2) + assert F(a, (a, F(b, (b, 1, 2)), 4)).subs(F(b, (b, 1, 2)), c) == \ + F(a, (a, c, 4)) + assert F(x, (x, 1, x + y)).subs(x, 1) == F(x, (x, 1, y + 1)) + + +def test_function_subs(): + S = Sum(x*f(y),(x,0,oo),(y,0,oo)) + assert S.subs(f(y),y) == Sum(x*y,(x,0,oo),(y,0,oo)) + assert S.subs(f(x),x) == S + raises(ValueError, lambda: S.subs(f(y),x+y) ) + S = Sum(x*log(y),(x,0,oo),(y,0,oo)) + assert S.subs(log(y),y) == S + S = Sum(x*f(y),(x,0,oo),(y,0,oo)) + assert S.subs(f(y),y) == Sum(x*y,(x,0,oo),(y,0,oo)) + + +def test_equality(): + # if this fails remove special handling below + raises(ValueError, lambda: Sum(x, x)) + r = symbols('x', real=True) + for F in (Sum, Product, Integral): + try: + assert F(x, x) != F(y, y) + assert F(x, (x, 1, 2)) != F(x, x) + assert F(x, (x, x)) != F(x, x) # or else they print the same + assert F(1, x) != F(1, y) + except ValueError: + pass + assert F(a, (x, 1, 2)) != F(a, (x, 1, 3)) # diff limit + assert F(a, (x, 1, x)) != F(a, (y, 1, y)) + assert F(a, (x, 1, 2)) != F(b, (x, 1, 2)) # diff expression + assert F(x, (x, 1, 2)) != F(r, (r, 1, 2)) # diff assumptions + assert F(1, (x, 1, x)) != F(1, (y, 1, x)) # only dummy is diff + assert F(1, (x, 1, x)).dummy_eq(F(1, (y, 1, x))) + + # issue 5265 + assert Sum(x, (x, 1, x)).subs(x, a) == Sum(x, (x, 1, a)) + + +def test_Sum_doit(): + assert Sum(n*Integral(a**2), (n, 0, 2)).doit() == a**3 + assert Sum(n*Integral(a**2), (n, 0, 2)).doit(deep=False) == \ + 3*Integral(a**2) + assert summation(n*Integral(a**2), (n, 0, 2)) == 3*Integral(a**2) + + # test nested sum evaluation + s = Sum( Sum( Sum(2,(z,1,n+1)), (y,x+1,n)), (x,1,n)) + assert 0 == (s.doit() - n*(n+1)*(n-1)).factor() + + # Integer assumes finite + assert Sum(KroneckerDelta(x, y), (x, -oo, oo)).doit() == Piecewise((1, And(-oo < y, y < oo)), (0, True)) + assert Sum(KroneckerDelta(m, n), (m, -oo, oo)).doit() == 1 + assert Sum(m*KroneckerDelta(x, y), (x, -oo, oo)).doit() == Piecewise((m, And(-oo < y, y < oo)), (0, True)) + assert Sum(x*KroneckerDelta(m, n), (m, -oo, oo)).doit() == x + assert Sum(Sum(KroneckerDelta(m, n), (m, 1, 3)), (n, 1, 3)).doit() == 3 + assert Sum(Sum(KroneckerDelta(k, m), (m, 1, 3)), (n, 1, 3)).doit() == \ + 3 * Piecewise((1, And(1 <= k, k <= 3)), (0, True)) + assert Sum(f(n) * Sum(KroneckerDelta(m, n), (m, 0, oo)), (n, 1, 3)).doit() == \ + f(1) + f(2) + f(3) + assert Sum(f(n) * Sum(KroneckerDelta(m, n), (m, 0, oo)), (n, 1, oo)).doit() == \ + Sum(f(n), (n, 1, oo)) + + # issue 2597 + nmax = symbols('N', integer=True, positive=True) + pw = Piecewise((1, And(1 <= n, n <= nmax)), (0, True)) + assert Sum(pw, (n, 1, nmax)).doit() == Sum(Piecewise((1, nmax >= n), + (0, True)), (n, 1, nmax)) + + q, s = symbols('q, s') + assert summation(1/n**(2*s), (n, 1, oo)) == Piecewise((zeta(2*s), 2*re(s) > 1), + (Sum(n**(-2*s), (n, 1, oo)), True)) + assert summation(1/(n+1)**s, (n, 0, oo)) == Piecewise((zeta(s), re(s) > 1), + (Sum((n + 1)**(-s), (n, 0, oo)), True)) + assert summation(1/(n+q)**s, (n, 0, oo)) == Piecewise( + (zeta(s, q), And(~Contains(-q, S.Naturals0), re(s) > 1)), + (Sum((n + q)**(-s), (n, 0, oo)), True)) + assert summation(1/(n+q)**s, (n, q, oo)) == Piecewise( + (zeta(s, 2*q), And(~Contains(-2*q, S.Naturals0), re(s) > 1)), + (Sum((n + q)**(-s), (n, q, oo)), True)) + assert summation(1/n**2, (n, 1, oo)) == zeta(2) + assert summation(1/n**s, (n, 0, oo)) == Sum(n**(-s), (n, 0, oo)) + assert summation(1/(n+1)**(2+I), (n, 0, oo)) == zeta(2+I) + t = symbols('t', real=True, positive=True) + assert summation(1/(n+I)**(t+1), (n, 0, oo)) == zeta(t+1, I) + + +def test_Product_doit(): + assert Product(n*Integral(a**2), (n, 1, 3)).doit() == 2 * a**9 / 9 + assert Product(n*Integral(a**2), (n, 1, 3)).doit(deep=False) == \ + 6*Integral(a**2)**3 + assert product(n*Integral(a**2), (n, 1, 3)) == 6*Integral(a**2)**3 + + +def test_Sum_interface(): + assert isinstance(Sum(0, (n, 0, 2)), Sum) + assert Sum(nan, (n, 0, 2)) is nan + assert Sum(nan, (n, 0, oo)) is nan + assert Sum(0, (n, 0, 2)).doit() == 0 + assert isinstance(Sum(0, (n, 0, oo)), Sum) + assert Sum(0, (n, 0, oo)).doit() == 0 + raises(ValueError, lambda: Sum(1)) + raises(ValueError, lambda: summation(1)) + + +def test_diff(): + assert Sum(x, (x, 1, 2)).diff(x) == 0 + assert Sum(x*y, (x, 1, 2)).diff(x) == 0 + assert Sum(x*y, (y, 1, 2)).diff(x) == Sum(y, (y, 1, 2)) + e = Sum(x*y, (x, 1, a)) + assert e.diff(a) == Derivative(e, a) + assert Sum(x*y, (x, 1, 3), (a, 2, 5)).diff(y).doit() == \ + Sum(x*y, (x, 1, 3), (a, 2, 5)).doit().diff(y) == 24 + assert Sum(x, (x, 1, 2)).diff(y) == 0 + + +def test_hypersum(): + assert simplify(summation(x**n/fac(n), (n, 1, oo))) == -1 + exp(x) + assert summation((-1)**n * x**(2*n) / fac(2*n), (n, 0, oo)) == cos(x) + assert simplify(summation((-1)**n*x**(2*n + 1) / + factorial(2*n + 1), (n, 3, oo))) == -x + sin(x) + x**3/6 - x**5/120 + + assert summation(1/(n + 2)**3, (n, 1, oo)) == Rational(-9, 8) + zeta(3) + assert summation(1/n**4, (n, 1, oo)) == pi**4/90 + + s = summation(x**n*n, (n, -oo, 0)) + assert s.is_Piecewise + assert s.args[0].args[0] == -1/(x*(1 - 1/x)**2) + assert s.args[0].args[1] == (abs(1/x) < 1) + + m = Symbol('n', integer=True, positive=True) + assert summation(binomial(m, k), (k, 0, m)) == 2**m + + +def test_issue_4170(): + assert summation(1/factorial(k), (k, 0, oo)) == E + + +def test_is_commutative(): + from sympy.physics.secondquant import NO, F, Fd + m = Symbol('m', commutative=False) + for f in (Sum, Product, Integral): + assert f(z, (z, 1, 1)).is_commutative is True + assert f(z*y, (z, 1, 6)).is_commutative is True + assert f(m*x, (x, 1, 2)).is_commutative is False + + assert f(NO(Fd(x)*F(y))*z, (z, 1, 2)).is_commutative is False + + +def test_is_zero(): + for func in [Sum, Product]: + assert func(0, (x, 1, 1)).is_zero is True + assert func(x, (x, 1, 1)).is_zero is None + + assert Sum(0, (x, 1, 0)).is_zero is True + assert Product(0, (x, 1, 0)).is_zero is False + + +def test_is_number(): + # is number should not rely on evaluation or assumptions, + # it should be equivalent to `not foo.free_symbols` + assert Sum(1, (x, 1, 1)).is_number is True + assert Sum(1, (x, 1, x)).is_number is False + assert Sum(0, (x, y, z)).is_number is False + assert Sum(x, (y, 1, 2)).is_number is False + assert Sum(x, (y, 1, 1)).is_number is False + assert Sum(x, (x, 1, 2)).is_number is True + assert Sum(x*y, (x, 1, 2), (y, 1, 3)).is_number is True + + assert Product(2, (x, 1, 1)).is_number is True + assert Product(2, (x, 1, y)).is_number is False + assert Product(0, (x, y, z)).is_number is False + assert Product(1, (x, y, z)).is_number is False + assert Product(x, (y, 1, x)).is_number is False + assert Product(x, (y, 1, 2)).is_number is False + assert Product(x, (y, 1, 1)).is_number is False + assert Product(x, (x, 1, 2)).is_number is True + + +def test_free_symbols(): + for func in [Sum, Product]: + assert func(1, (x, 1, 2)).free_symbols == set() + assert func(0, (x, 1, y)).free_symbols == {y} + assert func(2, (x, 1, y)).free_symbols == {y} + assert func(x, (x, 1, 2)).free_symbols == set() + assert func(x, (x, 1, y)).free_symbols == {y} + assert func(x, (y, 1, y)).free_symbols == {x, y} + assert func(x, (y, 1, 2)).free_symbols == {x} + assert func(x, (y, 1, 1)).free_symbols == {x} + assert func(x, (y, 1, z)).free_symbols == {x, z} + assert func(x, (x, 1, y), (y, 1, 2)).free_symbols == set() + assert func(x, (x, 1, y), (y, 1, z)).free_symbols == {z} + assert func(x, (x, 1, y), (y, 1, y)).free_symbols == {y} + assert func(x, (y, 1, y), (y, 1, z)).free_symbols == {x, z} + assert Sum(1, (x, 1, y)).free_symbols == {y} + # free_symbols answers whether the object *as written* has free symbols, + # not whether the evaluated expression has free symbols + assert Product(1, (x, 1, y)).free_symbols == {y} + # don't count free symbols that are not independent of integration + # variable(s) + assert func(f(x), (f(x), 1, 2)).free_symbols == set() + assert func(f(x), (f(x), 1, x)).free_symbols == {x} + assert func(f(x), (f(x), 1, y)).free_symbols == {y} + assert func(f(x), (z, 1, y)).free_symbols == {x, y} + + +def test_conjugate_transpose(): + A, B = symbols("A B", commutative=False) + p = Sum(A*B**n, (n, 1, 3)) + assert p.adjoint().doit() == p.doit().adjoint() + assert p.conjugate().doit() == p.doit().conjugate() + assert p.transpose().doit() == p.doit().transpose() + + p = Sum(B**n*A, (n, 1, 3)) + assert p.adjoint().doit() == p.doit().adjoint() + assert p.conjugate().doit() == p.doit().conjugate() + assert p.transpose().doit() == p.doit().transpose() + + +def test_noncommutativity_honoured(): + A, B = symbols("A B", commutative=False) + M = symbols('M', integer=True, positive=True) + p = Sum(A*B**n, (n, 1, M)) + assert p.doit() == A*Piecewise((M, Eq(B, 1)), + ((B - B**(M + 1))*(1 - B)**(-1), True)) + + p = Sum(B**n*A, (n, 1, M)) + assert p.doit() == Piecewise((M, Eq(B, 1)), + ((B - B**(M + 1))*(1 - B)**(-1), True))*A + + p = Sum(B**n*A*B**n, (n, 1, M)) + assert p.doit() == p + + +def test_issue_4171(): + assert summation(factorial(2*k + 1)/factorial(2*k), (k, 0, oo)) is oo + assert summation(2*k + 1, (k, 0, oo)) is oo + + +def test_issue_6273(): + assert Sum(x, (x, 1, n)).n(2, subs={n: 1}) == Float(1, 2) + + +def test_issue_6274(): + assert Sum(x, (x, 1, 0)).doit() == 0 + assert NS(Sum(x, (x, 1, 0))) == '0' + assert Sum(n, (n, 10, 5)).doit() == -30 + assert NS(Sum(n, (n, 10, 5))) == '-30.0000000000000' + + +def test_simplify_sum(): + y, t, v = symbols('y, t, v') + + _simplify = lambda e: simplify(e, doit=False) + assert _simplify(Sum(x*y, (x, n, m), (y, a, k)) + \ + Sum(y, (x, n, m), (y, a, k))) == Sum(y * (x + 1), (x, n, m), (y, a, k)) + assert _simplify(Sum(x, (x, n, m)) + Sum(x, (x, m + 1, a))) == \ + Sum(x, (x, n, a)) + assert _simplify(Sum(x, (x, k + 1, a)) + Sum(x, (x, n, k))) == \ + Sum(x, (x, n, a)) + assert _simplify(Sum(x, (x, k + 1, a)) + Sum(x + 1, (x, n, k))) == \ + Sum(x, (x, n, a)) + Sum(1, (x, n, k)) + assert _simplify(Sum(x, (x, 0, 3)) * 3 + 3 * Sum(x, (x, 4, 6)) + \ + 4 * Sum(z, (z, 0, 1))) == 4*Sum(z, (z, 0, 1)) + 3*Sum(x, (x, 0, 6)) + assert _simplify(3*Sum(x**2, (x, a, b)) + Sum(x, (x, a, b))) == \ + Sum(x*(3*x + 1), (x, a, b)) + assert _simplify(Sum(x**3, (x, n, k)) * 3 + 3 * Sum(x, (x, n, k)) + \ + 4 * y * Sum(z, (z, n, k))) + 1 == \ + 4*y*Sum(z, (z, n, k)) + 3*Sum(x**3 + x, (x, n, k)) + 1 + assert _simplify(Sum(x, (x, a, b)) + 1 + Sum(x, (x, b + 1, c))) == \ + 1 + Sum(x, (x, a, c)) + assert _simplify(Sum(x, (t, a, b)) + Sum(y, (t, a, b)) + \ + Sum(x, (t, b+1, c))) == x * Sum(1, (t, a, c)) + y * Sum(1, (t, a, b)) + assert _simplify(Sum(x, (t, a, b)) + Sum(x, (t, b+1, c)) + \ + Sum(y, (t, a, b))) == x * Sum(1, (t, a, c)) + y * Sum(1, (t, a, b)) + assert _simplify(Sum(x, (t, a, b)) + 2 * Sum(x, (t, b+1, c))) == \ + _simplify(Sum(x, (t, a, b)) + Sum(x, (t, b+1, c)) + Sum(x, (t, b+1, c))) + assert _simplify(Sum(x, (x, a, b))*Sum(x**2, (x, a, b))) == \ + Sum(x, (x, a, b)) * Sum(x**2, (x, a, b)) + assert _simplify(Sum(x, (t, a, b)) + Sum(y, (t, a, b)) + Sum(z, (t, a, b))) \ + == (x + y + z) * Sum(1, (t, a, b)) # issue 8596 + assert _simplify(Sum(x, (t, a, b)) + Sum(y, (t, a, b)) + Sum(z, (t, a, b)) + \ + Sum(v, (t, a, b))) == (x + y + z + v) * Sum(1, (t, a, b)) # issue 8596 + assert _simplify(Sum(x * y, (x, a, b)) / (3 * y)) == \ + (Sum(x, (x, a, b)) / 3) + assert _simplify(Sum(f(x) * y * z, (x, a, b)) / (y * z)) \ + == Sum(f(x), (x, a, b)) + assert _simplify(Sum(c * x, (x, a, b)) - c * Sum(x, (x, a, b))) == 0 + assert _simplify(c * (Sum(x, (x, a, b)) + y)) == c * (y + Sum(x, (x, a, b))) + assert _simplify(c * (Sum(x, (x, a, b)) + y * Sum(x, (x, a, b)))) == \ + c * (y + 1) * Sum(x, (x, a, b)) + assert _simplify(Sum(Sum(c * x, (x, a, b)), (y, a, b))) == \ + c * Sum(x, (x, a, b), (y, a, b)) + assert _simplify(Sum((3 + y) * Sum(c * x, (x, a, b)), (y, a, b))) == \ + c * Sum((3 + y), (y, a, b)) * Sum(x, (x, a, b)) + assert _simplify(Sum((3 + t) * Sum(c * t, (x, a, b)), (y, a, b))) == \ + c*t*(t + 3)*Sum(1, (x, a, b))*Sum(1, (y, a, b)) + assert _simplify(Sum(Sum(d * t, (x, a, b - 1)) + \ + Sum(d * t, (x, b, c)), (t, a, b))) == \ + d * Sum(1, (x, a, c)) * Sum(t, (t, a, b)) + assert _simplify(Sum(sin(t)**2 + cos(t)**2 + 1, (t, a, b))) == \ + 2 * Sum(1, (t, a, b)) + + +def test_change_index(): + b, v, w = symbols('b, v, w', integer = True) + + assert Sum(x, (x, a, b)).change_index(x, x + 1, y) == \ + Sum(y - 1, (y, a + 1, b + 1)) + assert Sum(x**2, (x, a, b)).change_index( x, x - 1) == \ + Sum((x+1)**2, (x, a - 1, b - 1)) + assert Sum(x**2, (x, a, b)).change_index( x, -x, y) == \ + Sum((-y)**2, (y, -b, -a)) + assert Sum(x, (x, a, b)).change_index( x, -x - 1) == \ + Sum(-x - 1, (x, -b - 1, -a - 1)) + assert Sum(x*y, (x, a, b), (y, c, d)).change_index( x, x - 1, z) == \ + Sum((z + 1)*y, (z, a - 1, b - 1), (y, c, d)) + assert Sum(x, (x, a, b)).change_index( x, x + v) == \ + Sum(-v + x, (x, a + v, b + v)) + assert Sum(x, (x, a, b)).change_index( x, -x - v) == \ + Sum(-v - x, (x, -b - v, -a - v)) + assert Sum(x, (x, a, b)).change_index(x, w*x, v) == \ + Sum(v/w, (v, b*w, a*w)) + raises(ValueError, lambda: Sum(x, (x, a, b)).change_index(x, 2*x)) + + +def test_reorder(): + b, y, c, d, z = symbols('b, y, c, d, z', integer = True) + + assert Sum(x*y, (x, a, b), (y, c, d)).reorder((0, 1)) == \ + Sum(x*y, (y, c, d), (x, a, b)) + assert Sum(x, (x, a, b), (x, c, d)).reorder((0, 1)) == \ + Sum(x, (x, c, d), (x, a, b)) + assert Sum(x*y + z, (x, a, b), (z, m, n), (y, c, d)).reorder(\ + (2, 0), (0, 1)) == Sum(x*y + z, (z, m, n), (y, c, d), (x, a, b)) + assert Sum(x*y*z, (x, a, b), (y, c, d), (z, m, n)).reorder(\ + (0, 1), (1, 2), (0, 2)) == Sum(x*y*z, (x, a, b), (z, m, n), (y, c, d)) + assert Sum(x*y*z, (x, a, b), (y, c, d), (z, m, n)).reorder(\ + (x, y), (y, z), (x, z)) == Sum(x*y*z, (x, a, b), (z, m, n), (y, c, d)) + assert Sum(x*y, (x, a, b), (y, c, d)).reorder((x, 1)) == \ + Sum(x*y, (y, c, d), (x, a, b)) + assert Sum(x*y, (x, a, b), (y, c, d)).reorder((y, x)) == \ + Sum(x*y, (y, c, d), (x, a, b)) + + +def test_reverse_order(): + assert Sum(x, (x, 0, 3)).reverse_order(0) == Sum(-x, (x, 4, -1)) + assert Sum(x*y, (x, 1, 5), (y, 0, 6)).reverse_order(0, 1) == \ + Sum(x*y, (x, 6, 0), (y, 7, -1)) + assert Sum(x, (x, 1, 2)).reverse_order(0) == Sum(-x, (x, 3, 0)) + assert Sum(x, (x, 1, 3)).reverse_order(0) == Sum(-x, (x, 4, 0)) + assert Sum(x, (x, 1, a)).reverse_order(0) == Sum(-x, (x, a + 1, 0)) + assert Sum(x, (x, a, 5)).reverse_order(0) == Sum(-x, (x, 6, a - 1)) + assert Sum(x, (x, a + 1, a + 5)).reverse_order(0) == \ + Sum(-x, (x, a + 6, a)) + assert Sum(x, (x, a + 1, a + 2)).reverse_order(0) == \ + Sum(-x, (x, a + 3, a)) + assert Sum(x, (x, a + 1, a + 1)).reverse_order(0) == \ + Sum(-x, (x, a + 2, a)) + assert Sum(x, (x, a, b)).reverse_order(0) == Sum(-x, (x, b + 1, a - 1)) + assert Sum(x, (x, a, b)).reverse_order(x) == Sum(-x, (x, b + 1, a - 1)) + assert Sum(x*y, (x, a, b), (y, 2, 5)).reverse_order(x, 1) == \ + Sum(x*y, (x, b + 1, a - 1), (y, 6, 1)) + assert Sum(x*y, (x, a, b), (y, 2, 5)).reverse_order(y, x) == \ + Sum(x*y, (x, b + 1, a - 1), (y, 6, 1)) + + +def test_issue_7097(): + assert sum(x**n/n for n in range(1, 401)) == summation(x**n/n, (n, 1, 400)) + + +def test_factor_expand_subs(): + # test factoring + assert Sum(4 * x, (x, 1, y)).factor() == 4 * Sum(x, (x, 1, y)) + assert Sum(x * a, (x, 1, y)).factor() == a * Sum(x, (x, 1, y)) + assert Sum(4 * x * a, (x, 1, y)).factor() == 4 * a * Sum(x, (x, 1, y)) + assert Sum(4 * x * y, (x, 1, y)).factor() == 4 * y * Sum(x, (x, 1, y)) + + # test expand + _x = Symbol('x', zero=False) + assert Sum(x+1,(x,1,y)).expand() == Sum(x,(x,1,y)) + Sum(1,(x,1,y)) + assert Sum(x+a*x**2,(x,1,y)).expand() == Sum(x,(x,1,y)) + Sum(a*x**2,(x,1,y)) + assert Sum(_x**(n + 1)*(n + 1), (n, -1, oo)).expand() \ + == Sum(n*_x*_x**n + _x*_x**n, (n, -1, oo)) + assert Sum(x**(n + 1)*(n + 1), (n, -1, oo)).expand(power_exp=False) \ + == Sum(n*x**(n + 1) + x**(n + 1), (n, -1, oo)) + assert Sum(x**(n + 1)*(n + 1), (n, -1, oo)).expand(force=True) \ + == Sum(x*x**n, (n, -1, oo)) + Sum(n*x*x**n, (n, -1, oo)) + assert Sum(a*n+a*n**2,(n,0,4)).expand() \ + == Sum(a*n,(n,0,4)) + Sum(a*n**2,(n,0,4)) + assert Sum(_x**a*_x**n,(x,0,3)) \ + == Sum(_x**(a+n),(x,0,3)).expand(power_exp=True) + _a, _n = symbols('a n', positive=True) + assert Sum(x**(_a+_n),(x,0,3)).expand(power_exp=True) \ + == Sum(x**_a*x**_n, (x, 0, 3)) + assert Sum(x**(_a-_n),(x,0,3)).expand(power_exp=True) \ + == Sum(x**(_a-_n),(x,0,3)).expand(power_exp=False) + + # test subs + assert Sum(1/(1+a*x**2),(x,0,3)).subs([(a,3)]) == Sum(1/(1+3*x**2),(x,0,3)) + assert Sum(x*y,(x,0,y),(y,0,x)).subs([(x,3)]) == Sum(x*y,(x,0,y),(y,0,3)) + assert Sum(x,(x,1,10)).subs([(x,y-2)]) == Sum(x,(x,1,10)) + assert Sum(1/x,(x,1,10)).subs([(x,(3+n)**3)]) == Sum(1/x,(x,1,10)) + assert Sum(1/x,(x,1,10)).subs([(x,3*x-2)]) == Sum(1/x,(x,1,10)) + + +def test_distribution_over_equality(): + assert Product(Eq(x*2, f(x)), (x, 1, 3)).doit() == Eq(48, f(1)*f(2)*f(3)) + assert Sum(Eq(f(x), x**2), (x, 0, y)) == \ + Eq(Sum(f(x), (x, 0, y)), Sum(x**2, (x, 0, y))) + + +def test_issue_2787(): + n, k = symbols('n k', positive=True, integer=True) + p = symbols('p', positive=True) + binomial_dist = binomial(n, k)*p**k*(1 - p)**(n - k) + s = Sum(binomial_dist*k, (k, 0, n)) + res = s.doit().simplify() + ans = Piecewise( + (n*p, x), + (Sum(k*p**k*binomial(n, k)*(1 - p)**(n - k), (k, 0, n)), + True)).subs(x, (Eq(n, 1) | (n > 1)) & (p/Abs(p - 1) <= 1)) + ans2 = Piecewise( + (n*p, x), + (factorial(n)*Sum(p**k*(1 - p)**(-k + n)/ + (factorial(-k + n)*factorial(k - 1)), (k, 0, n)), + True)).subs(x, (Eq(n, 1) | (n > 1)) & (p/Abs(p - 1) <= 1)) + assert res in [ans, ans2] # XXX system dependent + # Issue #17165: make sure that another simplify does not complicate + # the result by much. Why didn't first simplify replace + # Eq(n, 1) | (n > 1) with True? + assert res.simplify().count_ops() <= res.count_ops() + 2 + + +def test_issue_4668(): + assert summation(1/n, (n, 2, oo)) is oo + + +def test_matrix_sum(): + A = Matrix([[0, 1], [n, 0]]) + + result = Sum(A, (n, 0, 3)).doit() + assert result == Matrix([[0, 4], [6, 0]]) + assert result.__class__ == ImmutableDenseMatrix + + A = SparseMatrix([[0, 1], [n, 0]]) + + result = Sum(A, (n, 0, 3)).doit() + assert result.__class__ == ImmutableSparseMatrix + + +def test_failing_matrix_sum(): + n = Symbol('n') + # TODO Implement matrix geometric series summation. + A = Matrix([[0, 1, 0], [-1, 0, 0], [0, 0, 0]]) + assert Sum(A ** n, (n, 1, 4)).doit() == \ + Matrix([[0, 0, 0], [0, 0, 0], [0, 0, 0]]) + # issue sympy/sympy#16989 + assert summation(A**n, (n, 1, 1)) == A + + +def test_indexed_idx_sum(): + i = symbols('i', cls=Idx) + r = Indexed('r', i) + assert Sum(r, (i, 0, 3)).doit() == sum(r.xreplace({i: j}) for j in range(4)) + assert Product(r, (i, 0, 3)).doit() == prod([r.xreplace({i: j}) for j in range(4)]) + + j = symbols('j', integer=True) + assert Sum(r, (i, j, j+2)).doit() == sum(r.xreplace({i: j+k}) for k in range(3)) + assert Product(r, (i, j, j+2)).doit() == prod([r.xreplace({i: j+k}) for k in range(3)]) + + k = Idx('k', range=(1, 3)) + A = IndexedBase('A') + assert Sum(A[k], k).doit() == sum(A[Idx(j, (1, 3))] for j in range(1, 4)) + assert Product(A[k], k).doit() == prod([A[Idx(j, (1, 3))] for j in range(1, 4)]) + + raises(ValueError, lambda: Sum(A[k], (k, 1, 4))) + raises(ValueError, lambda: Sum(A[k], (k, 0, 3))) + raises(ValueError, lambda: Sum(A[k], (k, 2, oo))) + + raises(ValueError, lambda: Product(A[k], (k, 1, 4))) + raises(ValueError, lambda: Product(A[k], (k, 0, 3))) + raises(ValueError, lambda: Product(A[k], (k, 2, oo))) + + +@slow +def test_is_convergent(): + # divergence tests -- + assert Sum(n/(2*n + 1), (n, 1, oo)).is_convergent() is S.false + assert Sum(factorial(n)/5**n, (n, 1, oo)).is_convergent() is S.false + assert Sum(3**(-2*n - 1)*n**n, (n, 1, oo)).is_convergent() is S.false + assert Sum((-1)**n*n, (n, 3, oo)).is_convergent() is S.false + assert Sum((-1)**n, (n, 1, oo)).is_convergent() is S.false + assert Sum(log(1/n), (n, 2, oo)).is_convergent() is S.false + assert Sum(sin(n), (n, 1, oo)).is_convergent() is S.false + + # Raabe's test -- + assert Sum(Product((3*m),(m,1,n))/Product((3*m+4),(m,1,n)),(n,1,oo)).is_convergent() is S.true + + # root test -- + assert Sum((-12)**n/n, (n, 1, oo)).is_convergent() is S.false + + # integral test -- + + # p-series test -- + assert Sum(1/(n**2 + 1), (n, 1, oo)).is_convergent() is S.true + assert Sum(1/n**Rational(6, 5), (n, 1, oo)).is_convergent() is S.true + assert Sum(2/(n*sqrt(n - 1)), (n, 2, oo)).is_convergent() is S.true + assert Sum(1/(sqrt(n)*sqrt(n)), (n, 2, oo)).is_convergent() is S.false + assert Sum(factorial(n) / factorial(n+2), (n, 1, oo)).is_convergent() is S.true + assert Sum(rf(5,n)/rf(7,n),(n,1,oo)).is_convergent() is S.true + assert Sum((rf(1, n)*rf(2, n))/(rf(3, n)*factorial(n)),(n,1,oo)).is_convergent() is S.false + + # comparison test -- + assert Sum(1/(n + log(n)), (n, 1, oo)).is_convergent() is S.false + assert Sum(1/(n**2*log(n)), (n, 2, oo)).is_convergent() is S.true + assert Sum(1/(n*log(n)), (n, 2, oo)).is_convergent() is S.false + assert Sum(2/(n*log(n)*log(log(n))**2), (n, 5, oo)).is_convergent() is S.true + assert Sum(2/(n*log(n)**2), (n, 2, oo)).is_convergent() is S.true + assert Sum((n - 1)/(n**2*log(n)**3), (n, 2, oo)).is_convergent() is S.true + assert Sum(1/(n*log(n)*log(log(n))), (n, 5, oo)).is_convergent() is S.false + assert Sum((n - 1)/(n*log(n)**3), (n, 3, oo)).is_convergent() is S.false + assert Sum(2/(n**2*log(n)), (n, 2, oo)).is_convergent() is S.true + assert Sum(1/(n*sqrt(log(n))*log(log(n))), (n, 100, oo)).is_convergent() is S.false + assert Sum(log(log(n))/(n*log(n)**2), (n, 100, oo)).is_convergent() is S.true + assert Sum(log(n)/n**2, (n, 5, oo)).is_convergent() is S.true + + # alternating series tests -- + assert Sum((-1)**(n - 1)/(n**2 - 1), (n, 3, oo)).is_convergent() is S.true + + # with -negativeInfinite Limits + assert Sum(1/(n**2 + 1), (n, -oo, 1)).is_convergent() is S.true + assert Sum(1/(n - 1), (n, -oo, -1)).is_convergent() is S.false + assert Sum(1/(n**2 - 1), (n, -oo, -5)).is_convergent() is S.true + assert Sum(1/(n**2 - 1), (n, -oo, 2)).is_convergent() is S.true + assert Sum(1/(n**2 - 1), (n, -oo, oo)).is_convergent() is S.true + + # piecewise functions + f = Piecewise((n**(-2), n <= 1), (n**2, n > 1)) + assert Sum(f, (n, 1, oo)).is_convergent() is S.false + assert Sum(f, (n, -oo, oo)).is_convergent() is S.false + assert Sum(f, (n, 1, 100)).is_convergent() is S.true + #assert Sum(f, (n, -oo, 1)).is_convergent() is S.true + + # integral test + + assert Sum(log(n)/n**3, (n, 1, oo)).is_convergent() is S.true + assert Sum(-log(n)/n**3, (n, 1, oo)).is_convergent() is S.true + # the following function has maxima located at (x, y) = + # (1.2, 0.43), (3.0, -0.25) and (6.8, 0.050) + eq = (x - 2)*(x**2 - 6*x + 4)*exp(-x) + assert Sum(eq, (x, 1, oo)).is_convergent() is S.true + assert Sum(eq, (x, 1, 2)).is_convergent() is S.true + assert Sum(1/(x**3), (x, 1, oo)).is_convergent() is S.true + assert Sum(1/(x**S.Half), (x, 1, oo)).is_convergent() is S.false + + # issue 19545 + assert Sum(1/n - 3/(3*n +2), (n, 1, oo)).is_convergent() is S.true + + # issue 19836 + assert Sum(4/(n + 2) - 5/(n + 1) + 1/n,(n, 7, oo)).is_convergent() is S.true + + +def test_is_absolutely_convergent(): + assert Sum((-1)**n, (n, 1, oo)).is_absolutely_convergent() is S.false + assert Sum((-1)**n/n**2, (n, 1, oo)).is_absolutely_convergent() is S.true + + +@XFAIL +def test_convergent_failing(): + # dirichlet tests + assert Sum(sin(n)/n, (n, 1, oo)).is_convergent() is S.true + assert Sum(sin(2*n)/n, (n, 1, oo)).is_convergent() is S.true + + +def test_issue_6966(): + i, k, m = symbols('i k m', integer=True) + z_i, q_i = symbols('z_i q_i') + a_k = Sum(-q_i*z_i/k,(i,1,m)) + b_k = a_k.diff(z_i) + assert isinstance(b_k, Sum) + assert b_k == Sum(-q_i/k,(i,1,m)) + + +def test_issue_10156(): + cx = Sum(2*y**2*x, (x, 1,3)) + e = 2*y*Sum(2*cx*x**2, (x, 1, 9)) + assert e.factor() == \ + 8*y**3*Sum(x, (x, 1, 3))*Sum(x**2, (x, 1, 9)) + + +def test_issue_10973(): + assert Sum((-n + (n**3 + 1)**(S(1)/3))/log(n), (n, 1, oo)).is_convergent() is S.true + + +def test_issue_14103(): + assert Sum(sin(n)**2 + cos(n)**2 - 1, (n, 1, oo)).is_convergent() is S.true + assert Sum(sin(pi*n), (n, 1, oo)).is_convergent() is S.true + + +def test_issue_14129(): + x = Symbol('x', zero=False) + assert Sum( k*x**k, (k, 0, n-1)).doit() == \ + Piecewise((n**2/2 - n/2, Eq(x, 1)), ((n*x*x**n - + n*x**n - x*x**n + x)/(x - 1)**2, True)) + assert Sum( x**k, (k, 0, n-1)).doit() == \ + Piecewise((n, Eq(x, 1)), ((-x**n + 1)/(-x + 1), True)) + assert Sum( k*(x/y+x)**k, (k, 0, n-1)).doit() == \ + Piecewise((n*(n - 1)/2, Eq(x, y/(y + 1))), + (x*(y + 1)*(n*x*y*(x + x/y)**(n - 1) + + n*x*(x + x/y)**(n - 1) - n*y*(x + x/y)**(n - 1) - + x*y*(x + x/y)**(n - 1) - x*(x + x/y)**(n - 1) + y)/ + (x*y + x - y)**2, True)) + + +def test_issue_14112(): + assert Sum((-1)**n/sqrt(n), (n, 1, oo)).is_absolutely_convergent() is S.false + assert Sum((-1)**(2*n)/n, (n, 1, oo)).is_convergent() is S.false + assert Sum((-2)**n + (-3)**n, (n, 1, oo)).is_convergent() is S.false + + +def test_issue_14219(): + A = diag(0, 2, -3) + res = diag(1, 15, -20) + assert Sum(A**n, (n, 0, 3)).doit() == res + + +def test_sin_times_absolutely_convergent(): + assert Sum(sin(n) / n**3, (n, 1, oo)).is_convergent() is S.true + assert Sum(sin(n) * log(n) / n**3, (n, 1, oo)).is_convergent() is S.true + + +def test_issue_14111(): + assert Sum(1/log(log(n)), (n, 22, oo)).is_convergent() is S.false + + +def test_issue_14484(): + assert Sum(sin(n)/log(log(n)), (n, 22, oo)).is_convergent() is S.false + + +def test_issue_14640(): + i, n = symbols("i n", integer=True) + a, b, c = symbols("a b c", zero=False) + + assert Sum(a**-i/(a - b), (i, 0, n)).doit() == Sum( + 1/(a*a**i - a**i*b), (i, 0, n)).doit() == Piecewise( + (n + 1, Eq(1/a, 1)), + ((-a**(-n - 1) + 1)/(1 - 1/a), True))/(a - b) + + assert Sum((b*a**i - c*a**i)**-2, (i, 0, n)).doit() == Piecewise( + (n + 1, Eq(a**(-2), 1)), + ((-a**(-2*n - 2) + 1)/(1 - 1/a**2), True))/(b - c)**2 + + s = Sum(i*(a**(n - i) - b**(n - i))/(a - b), (i, 0, n)).doit() + assert not s.has(Sum) + assert s.subs({a: 2, b: 3, n: 5}) == 122 + + +def test_issue_15943(): + s = Sum(binomial(n, k)*factorial(n - k), (k, 0, n)).doit().rewrite(gamma) + assert s == -E*(n + 1)*gamma(n + 1)*lowergamma(n + 1, 1)/gamma(n + 2 + ) + E*gamma(n + 1) + assert s.simplify() == E*(factorial(n) - lowergamma(n + 1, 1)) + + +def test_Sum_dummy_eq(): + assert not Sum(x, (x, a, b)).dummy_eq(1) + assert not Sum(x, (x, a, b)).dummy_eq(Sum(x, (x, a, b), (a, 1, 2))) + assert not Sum(x, (x, a, b)).dummy_eq(Sum(x, (x, a, c))) + assert Sum(x, (x, a, b)).dummy_eq(Sum(x, (x, a, b))) + d = Dummy() + assert Sum(x, (x, a, d)).dummy_eq(Sum(x, (x, a, c)), c) + assert not Sum(x, (x, a, d)).dummy_eq(Sum(x, (x, a, c))) + assert Sum(x, (x, a, c)).dummy_eq(Sum(y, (y, a, c))) + assert Sum(x, (x, a, d)).dummy_eq(Sum(y, (y, a, c)), c) + assert not Sum(x, (x, a, d)).dummy_eq(Sum(y, (y, a, c))) + + +def test_issue_15852(): + assert summation(x**y*y, (y, -oo, oo)).doit() == Sum(x**y*y, (y, -oo, oo)) + + +def test_exceptions(): + S = Sum(x, (x, a, b)) + raises(ValueError, lambda: S.change_index(x, x**2, y)) + S = Sum(x, (x, a, b), (x, 1, 4)) + raises(ValueError, lambda: S.index(x)) + S = Sum(x, (x, a, b), (y, 1, 4)) + raises(ValueError, lambda: S.reorder([x])) + S = Sum(x, (x, y, b), (y, 1, 4)) + raises(ReorderError, lambda: S.reorder_limit(0, 1)) + S = Sum(x*y, (x, a, b), (y, 1, 4)) + raises(NotImplementedError, lambda: S.is_convergent()) + + +def test_sumproducts_assumptions(): + M = Symbol('M', integer=True, positive=True) + + m = Symbol('m', integer=True) + for func in [Sum, Product]: + assert func(m, (m, -M, M)).is_positive is None + assert func(m, (m, -M, M)).is_nonpositive is None + assert func(m, (m, -M, M)).is_negative is None + assert func(m, (m, -M, M)).is_nonnegative is None + assert func(m, (m, -M, M)).is_finite is True + + m = Symbol('m', integer=True, nonnegative=True) + for func in [Sum, Product]: + assert func(m, (m, 0, M)).is_positive is None + assert func(m, (m, 0, M)).is_nonpositive is None + assert func(m, (m, 0, M)).is_negative is False + assert func(m, (m, 0, M)).is_nonnegative is True + assert func(m, (m, 0, M)).is_finite is True + + m = Symbol('m', integer=True, positive=True) + for func in [Sum, Product]: + assert func(m, (m, 1, M)).is_positive is True + assert func(m, (m, 1, M)).is_nonpositive is False + assert func(m, (m, 1, M)).is_negative is False + assert func(m, (m, 1, M)).is_nonnegative is True + assert func(m, (m, 1, M)).is_finite is True + + m = Symbol('m', integer=True, negative=True) + assert Sum(m, (m, -M, -1)).is_positive is False + assert Sum(m, (m, -M, -1)).is_nonpositive is True + assert Sum(m, (m, -M, -1)).is_negative is True + assert Sum(m, (m, -M, -1)).is_nonnegative is False + assert Sum(m, (m, -M, -1)).is_finite is True + assert Product(m, (m, -M, -1)).is_positive is None + assert Product(m, (m, -M, -1)).is_nonpositive is None + assert Product(m, (m, -M, -1)).is_negative is None + assert Product(m, (m, -M, -1)).is_nonnegative is None + assert Product(m, (m, -M, -1)).is_finite is True + + m = Symbol('m', integer=True, nonpositive=True) + assert Sum(m, (m, -M, 0)).is_positive is False + assert Sum(m, (m, -M, 0)).is_nonpositive is True + assert Sum(m, (m, -M, 0)).is_negative is None + assert Sum(m, (m, -M, 0)).is_nonnegative is None + assert Sum(m, (m, -M, 0)).is_finite is True + assert Product(m, (m, -M, 0)).is_positive is None + assert Product(m, (m, -M, 0)).is_nonpositive is None + assert Product(m, (m, -M, 0)).is_negative is None + assert Product(m, (m, -M, 0)).is_nonnegative is None + assert Product(m, (m, -M, 0)).is_finite is True + + m = Symbol('m', integer=True) + assert Sum(2, (m, 0, oo)).is_positive is None + assert Sum(2, (m, 0, oo)).is_nonpositive is None + assert Sum(2, (m, 0, oo)).is_negative is None + assert Sum(2, (m, 0, oo)).is_nonnegative is None + assert Sum(2, (m, 0, oo)).is_finite is None + + assert Product(2, (m, 0, oo)).is_positive is None + assert Product(2, (m, 0, oo)).is_nonpositive is None + assert Product(2, (m, 0, oo)).is_negative is False + assert Product(2, (m, 0, oo)).is_nonnegative is None + assert Product(2, (m, 0, oo)).is_finite is None + + assert Product(0, (x, M, M-1)).is_positive is True + assert Product(0, (x, M, M-1)).is_finite is True + + +def test_expand_with_assumptions(): + M = Symbol('M', integer=True, positive=True) + x = Symbol('x', positive=True) + m = Symbol('m', nonnegative=True) + assert log(Product(x**m, (m, 0, M))).expand() == Sum(m*log(x), (m, 0, M)) + assert log(Product(exp(x**m), (m, 0, M))).expand() == Sum(x**m, (m, 0, M)) + assert log(Product(x**m, (m, 0, M))).rewrite(Sum).expand() == Sum(m*log(x), (m, 0, M)) + assert log(Product(exp(x**m), (m, 0, M))).rewrite(Sum).expand() == Sum(x**m, (m, 0, M)) + + n = Symbol('n', nonnegative=True) + i, j = symbols('i,j', positive=True, integer=True) + x, y = symbols('x,y', positive=True) + assert log(Product(x**i*y**j, (i, 1, n), (j, 1, m))).expand() \ + == Sum(i*log(x) + j*log(y), (i, 1, n), (j, 1, m)) + + m = Symbol('m', nonnegative=True, integer=True) + s = Sum(x**m, (m, 0, M)) + s_as_product = s.rewrite(Product) + assert s_as_product.has(Product) + assert s_as_product == log(Product(exp(x**m), (m, 0, M))) + assert s_as_product.expand() == s + s5 = s.subs(M, 5) + s5_as_product = s5.rewrite(Product) + assert s5_as_product.has(Product) + assert s5_as_product.doit().expand() == s5.doit() + + +def test_has_finite_limits(): + x = Symbol('x') + assert Sum(1, (x, 1, 9)).has_finite_limits is True + assert Sum(1, (x, 1, oo)).has_finite_limits is False + M = Symbol('M') + assert Sum(1, (x, 1, M)).has_finite_limits is None + M = Symbol('M', positive=True) + assert Sum(1, (x, 1, M)).has_finite_limits is True + x = Symbol('x', positive=True) + M = Symbol('M') + assert Sum(1, (x, 1, M)).has_finite_limits is True + + assert Sum(1, (x, 1, M), (y, -oo, oo)).has_finite_limits is False + +def test_has_reversed_limits(): + assert Sum(1, (x, 1, 1)).has_reversed_limits is False + assert Sum(1, (x, 1, 9)).has_reversed_limits is False + assert Sum(1, (x, 1, -9)).has_reversed_limits is True + assert Sum(1, (x, 1, 0)).has_reversed_limits is True + assert Sum(1, (x, 1, oo)).has_reversed_limits is False + M = Symbol('M') + assert Sum(1, (x, 1, M)).has_reversed_limits is None + M = Symbol('M', positive=True, integer=True) + assert Sum(1, (x, 1, M)).has_reversed_limits is False + assert Sum(1, (x, 1, M), (y, -oo, oo)).has_reversed_limits is False + M = Symbol('M', negative=True) + assert Sum(1, (x, 1, M)).has_reversed_limits is True + + assert Sum(1, (x, 1, M), (y, -oo, oo)).has_reversed_limits is True + assert Sum(1, (x, oo, oo)).has_reversed_limits is None + + +def test_has_empty_sequence(): + assert Sum(1, (x, 1, 1)).has_empty_sequence is False + assert Sum(1, (x, 1, 9)).has_empty_sequence is False + assert Sum(1, (x, 1, -9)).has_empty_sequence is False + assert Sum(1, (x, 1, 0)).has_empty_sequence is True + assert Sum(1, (x, y, y - 1)).has_empty_sequence is True + assert Sum(1, (x, 3, 2), (y, -oo, oo)).has_empty_sequence is True + assert Sum(1, (y, -oo, oo), (x, 3, 2)).has_empty_sequence is True + assert Sum(1, (x, oo, oo)).has_empty_sequence is False + + +def test_empty_sequence(): + assert Product(x*y, (x, -oo, oo), (y, 1, 0)).doit() == 1 + assert Product(x*y, (y, 1, 0), (x, -oo, oo)).doit() == 1 + assert Sum(x, (x, -oo, oo), (y, 1, 0)).doit() == 0 + assert Sum(x, (y, 1, 0), (x, -oo, oo)).doit() == 0 + + +def test_issue_8016(): + k = Symbol('k', integer=True) + n, m = symbols('n, m', integer=True, positive=True) + s = Sum(binomial(m, k)*binomial(m, n - k)*(-1)**k, (k, 0, n)) + assert s.doit().simplify() == \ + cos(pi*n/2)*gamma(m + 1)/gamma(n/2 + 1)/gamma(m - n/2 + 1) + + +def test_issue_14313(): + assert Sum(S.Half**floor(n/2), (n, 1, oo)).is_convergent() + + +def test_issue_14563(): + # The assertion was failing due to no assumptions methods in Sums and Product + assert 1 % Sum(1, (x, 0, 1)) == 1 + + +def test_issue_16735(): + assert Sum(5**n/gamma(n+1), (n, 1, oo)).is_convergent() is S.true + + +def test_issue_14871(): + assert Sum((Rational(1, 10))**n*rf(0, n)/factorial(n), (n, 0, oo)).rewrite(factorial).doit() == 1 + + +def test_issue_17165(): + n = symbols("n", integer=True) + x = symbols('x') + s = (x*Sum(x**n, (n, -1, oo))) + ssimp = s.doit().simplify() + + assert ssimp == Piecewise((-1/(x - 1), (x > -1) & (x < 1)), + (x*Sum(x**n, (n, -1, oo)), True)), ssimp + assert ssimp.simplify() == ssimp + + +def test_issue_19379(): + assert Sum(factorial(n)/factorial(n + 2), (n, 1, oo)).is_convergent() is S.true + + +def test_issue_20777(): + assert Sum(exp(x*sin(n/m)), (n, 1, m)).doit() == Sum(exp(x*sin(n/m)), (n, 1, m)) + + +def test__dummy_with_inherited_properties_concrete(): + x = Symbol('x') + + from sympy.core.containers import Tuple + d = _dummy_with_inherited_properties_concrete(Tuple(x, 0, 5)) + assert d.is_real + assert d.is_integer + assert d.is_nonnegative + assert d.is_extended_nonnegative + + d = _dummy_with_inherited_properties_concrete(Tuple(x, 1, 9)) + assert d.is_real + assert d.is_integer + assert d.is_positive + assert d.is_odd is None + + d = _dummy_with_inherited_properties_concrete(Tuple(x, -5, 5)) + assert d.is_real + assert d.is_integer + assert d.is_positive is None + assert d.is_extended_nonnegative is None + assert d.is_odd is None + + d = _dummy_with_inherited_properties_concrete(Tuple(x, -1.5, 1.5)) + assert d.is_real + assert d.is_integer is None + assert d.is_positive is None + assert d.is_extended_nonnegative is None + + N = Symbol('N', integer=True, positive=True) + d = _dummy_with_inherited_properties_concrete(Tuple(x, 2, N)) + assert d.is_real + assert d.is_positive + assert d.is_integer + + # Return None if no assumptions are added + N = Symbol('N', integer=True, positive=True) + d = _dummy_with_inherited_properties_concrete(Tuple(N, 2, 4)) + assert d is None + + x = Symbol('x', negative=True) + raises(InconsistentAssumptions, + lambda: _dummy_with_inherited_properties_concrete(Tuple(x, 1, 5))) + + +def test_matrixsymbol_summation_numerical_limits(): + A = MatrixSymbol('A', 3, 3) + n = Symbol('n', integer=True) + + assert Sum(A**n, (n, 0, 2)).doit() == Identity(3) + A + A**2 + assert Sum(A, (n, 0, 2)).doit() == 3*A + assert Sum(n*A, (n, 0, 2)).doit() == 3*A + + B = Matrix([[0, n, 0], [-1, 0, 0], [0, 0, 2]]) + ans = Matrix([[0, 6, 0], [-4, 0, 0], [0, 0, 8]]) + 4*A + assert Sum(A+B, (n, 0, 3)).doit() == ans + ans = A*Matrix([[0, 6, 0], [-4, 0, 0], [0, 0, 8]]) + assert Sum(A*B, (n, 0, 3)).doit() == ans + + ans = (A**2*Matrix([[-2, 0, 0], [0,-2, 0], [0, 0, 4]]) + + A**3*Matrix([[0, -9, 0], [3, 0, 0], [0, 0, 8]]) + + A*Matrix([[0, 1, 0], [-1, 0, 0], [0, 0, 2]])) + assert Sum(A**n*B**n, (n, 1, 3)).doit() == ans + + +def test_issue_21651(): + i = Symbol('i') + a = Sum(floor(2*2**(-i)), (i, S.One, 2)) + assert a.doit() == S.One + + +@XFAIL +def test_matrixsymbol_summation_symbolic_limits(): + N = Symbol('N', integer=True, positive=True) + + A = MatrixSymbol('A', 3, 3) + n = Symbol('n', integer=True) + assert Sum(A, (n, 0, N)).doit() == (N+1)*A + assert Sum(n*A, (n, 0, N)).doit() == (N**2/2+N/2)*A + + +def test_summation_by_residues(): + x = Symbol('x') + + # Examples from Nakhle H. Asmar, Loukas Grafakos, + # Complex Analysis with Applications + assert eval_sum_residue(1 / (x**2 + 1), (x, -oo, oo)) == pi/tanh(pi) + assert eval_sum_residue(1 / x**6, (x, S(1), oo)) == pi**6/945 + assert eval_sum_residue(1 / (x**2 + 9), (x, -oo, oo)) == pi/(3*tanh(3*pi)) + assert eval_sum_residue(1 / (x**2 + 1)**2, (x, -oo, oo)).cancel() == \ + (-pi**2*tanh(pi)**2 + pi*tanh(pi) + pi**2)/(2*tanh(pi)**2) + assert eval_sum_residue(x**2 / (x**2 + 1)**2, (x, -oo, oo)).cancel() == \ + (-pi**2 + pi*tanh(pi) + pi**2*tanh(pi)**2)/(2*tanh(pi)**2) + assert eval_sum_residue(1 / (4*x**2 - 1), (x, -oo, oo)) == 0 + assert eval_sum_residue(x**2 / (x**2 - S(1)/4)**2, (x, -oo, oo)) == pi**2/2 + assert eval_sum_residue(1 / (4*x**2 - 1)**2, (x, -oo, oo)) == pi**2/8 + assert eval_sum_residue(1 / ((x - S(1)/2)**2 + 1), (x, -oo, oo)) == pi*tanh(pi) + assert eval_sum_residue(1 / x**2, (x, S(1), oo)) == pi**2/6 + assert eval_sum_residue(1 / x**4, (x, S(1), oo)) == pi**4/90 + assert eval_sum_residue(1 / x**2 / (x**2 + 4), (x, S(1), oo)) == \ + -pi*(-pi/12 - 1/(16*pi) + 1/(8*tanh(2*pi)))/2 + + # Some examples made from 1 / (x**2 + 1) + assert eval_sum_residue(1 / (x**2 + 1), (x, S(0), oo)) == \ + S(1)/2 + pi/(2*tanh(pi)) + assert eval_sum_residue(1 / (x**2 + 1), (x, S(1), oo)) == \ + -S(1)/2 + pi/(2*tanh(pi)) + assert eval_sum_residue(1 / (x**2 + 1), (x, S(-1), oo)) == \ + 1 + pi/(2*tanh(pi)) + assert eval_sum_residue((-1)**x / (x**2 + 1), (x, -oo, oo)) == \ + pi/sinh(pi) + assert eval_sum_residue((-1)**x / (x**2 + 1), (x, S(0), oo)) == \ + pi/(2*sinh(pi)) + S(1)/2 + assert eval_sum_residue((-1)**x / (x**2 + 1), (x, S(1), oo)) == \ + -S(1)/2 + pi/(2*sinh(pi)) + assert eval_sum_residue((-1)**x / (x**2 + 1), (x, S(-1), oo)) == \ + pi/(2*sinh(pi)) + + # Some examples made from shifting of 1 / (x**2 + 1) + assert eval_sum_residue(1 / (x**2 + 2*x + 2), (x, S(-1), oo)) == S(1)/2 + pi/(2*tanh(pi)) + assert eval_sum_residue(1 / (x**2 + 4*x + 5), (x, S(-2), oo)) == S(1)/2 + pi/(2*tanh(pi)) + assert eval_sum_residue(1 / (x**2 - 2*x + 2), (x, S(1), oo)) == S(1)/2 + pi/(2*tanh(pi)) + assert eval_sum_residue(1 / (x**2 - 4*x + 5), (x, S(2), oo)) == S(1)/2 + pi/(2*tanh(pi)) + assert eval_sum_residue((-1)**x * -1 / (x**2 + 2*x + 2), (x, S(-1), oo)) == S(1)/2 + pi/(2*sinh(pi)) + assert eval_sum_residue((-1)**x * -1 / (x**2 -2*x + 2), (x, S(1), oo)) == S(1)/2 + pi/(2*sinh(pi)) + + # Some examples made from 1 / x**2 + assert eval_sum_residue(1 / x**2, (x, S(2), oo)) == -1 + pi**2/6 + assert eval_sum_residue(1 / x**2, (x, S(3), oo)) == -S(5)/4 + pi**2/6 + assert eval_sum_residue((-1)**x / x**2, (x, S(1), oo)) == -pi**2/12 + assert eval_sum_residue((-1)**x / x**2, (x, S(2), oo)) == 1 - pi**2/12 + + +@slow +def test_summation_by_residues_failing(): + x = Symbol('x') + + # Failing because of the bug in residue computation + assert eval_sum_residue(x**2 / (x**4 + 1), (x, S(1), oo)) + assert eval_sum_residue(1 / ((x - 1)*(x - 2) + 1), (x, -oo, oo)) != 0 + + +def test_process_limits(): + from sympy.concrete.expr_with_limits import _process_limits + + # these should be (x, Range(3)) not Range(3) + raises(ValueError, lambda: _process_limits( + Range(3), discrete=True)) + raises(ValueError, lambda: _process_limits( + Range(3), discrete=False)) + # these should be (x, union) not union + # (but then we would get a TypeError because we don't + # handle non-contiguous sets: see below use of `union`) + union = Or(x < 1, x > 3).as_set() + raises(ValueError, lambda: _process_limits( + union, discrete=True)) + raises(ValueError, lambda: _process_limits( + union, discrete=False)) + + # error not triggered if not needed + assert _process_limits((x, 1, 2)) == ([(x, 1, 2)], 1) + + # this equivalence is used to detect Reals in _process_limits + assert isinstance(S.Reals, Interval) + + C = Integral # continuous limits + assert C(x, x >= 5) == C(x, (x, 5, oo)) + assert C(x, x < 3) == C(x, (x, -oo, 3)) + ans = C(x, (x, 0, 3)) + assert C(x, And(x >= 0, x < 3)) == ans + assert C(x, (x, Interval.Ropen(0, 3))) == ans + raises(TypeError, lambda: C(x, (x, Range(3)))) + + # discrete limits + for D in (Sum, Product): + r, ans = Range(3, 10, 2), D(2*x + 3, (x, 0, 3)) + assert D(x, (x, r)) == ans + assert D(x, (x, r.reversed)) == ans + r, ans = Range(3, oo, 2), D(2*x + 3, (x, 0, oo)) + assert D(x, (x, r)) == ans + assert D(x, (x, r.reversed)) == ans + r, ans = Range(-oo, 5, 2), D(3 - 2*x, (x, 0, oo)) + assert D(x, (x, r)) == ans + assert D(x, (x, r.reversed)) == ans + raises(TypeError, lambda: D(x, x > 0)) + raises(ValueError, lambda: D(x, Interval(1, 3))) + raises(NotImplementedError, lambda: D(x, (x, union))) + + +def test_pr_22677(): + b = Symbol('b', integer=True, positive=True) + assert Sum(1/x**2,(x, 0, b)).doit() == Sum(x**(-2), (x, 0, b)) + assert Sum(1/(x - b)**2,(x, 0, b-1)).doit() == Sum( + (-b + x)**(-2), (x, 0, b - 1)) + + +def test_issue_23952(): + p, q = symbols("p q", real=True, nonnegative=True) + k1, k2 = symbols("k1 k2", integer=True, nonnegative=True) + n = Symbol("n", integer=True, positive=True) + expr = Sum(abs(k1 - k2)*p**k1 *(1 - q)**(n - k2), + (k1, 0, n), (k2, 0, n)) + assert expr.subs(p,0).subs(q,1).subs(n, 3).doit() == 3 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..4c03c9fc11479bb6d93a3bff3dfd0992ef994a19 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/__init__.py @@ -0,0 +1,103 @@ +"""Core module. Provides the basic operations needed in sympy. +""" + +from .sympify import sympify, SympifyError +from .cache import cacheit +from .assumptions import assumptions, check_assumptions, failing_assumptions, common_assumptions +from .basic import Basic, Atom +from .singleton import S +from .expr import Expr, AtomicExpr, UnevaluatedExpr +from .symbol import Symbol, Wild, Dummy, symbols, var +from .numbers import Number, Float, Rational, Integer, NumberSymbol, \ + RealNumber, igcd, ilcm, seterr, E, I, nan, oo, pi, zoo, \ + AlgebraicNumber, comp, mod_inverse +from .power import Pow +from .intfunc import integer_nthroot, integer_log, num_digits, trailing +from .mul import Mul, prod +from .add import Add +from .mod import Mod +from .relational import ( Rel, Eq, Ne, Lt, Le, Gt, Ge, + Equality, GreaterThan, LessThan, Unequality, StrictGreaterThan, + StrictLessThan ) +from .multidimensional import vectorize +from .function import Lambda, WildFunction, Derivative, diff, FunctionClass, \ + Function, Subs, expand, PoleError, count_ops, \ + expand_mul, expand_log, expand_func, \ + expand_trig, expand_complex, expand_multinomial, nfloat, \ + expand_power_base, expand_power_exp, arity +from .evalf import PrecisionExhausted, N +from .containers import Tuple, Dict +from .exprtools import gcd_terms, factor_terms, factor_nc +from .parameters import evaluate +from .kind import UndefinedKind, NumberKind, BooleanKind +from .traversal import preorder_traversal, bottom_up, use, postorder_traversal +from .sorting import default_sort_key, ordered + +# expose singletons +Catalan = S.Catalan +EulerGamma = S.EulerGamma +GoldenRatio = S.GoldenRatio +TribonacciConstant = S.TribonacciConstant + +__all__ = [ + 'sympify', 'SympifyError', + + 'cacheit', + + 'assumptions', 'check_assumptions', 'failing_assumptions', + 'common_assumptions', + + 'Basic', 'Atom', + + 'S', + + 'Expr', 'AtomicExpr', 'UnevaluatedExpr', + + 'Symbol', 'Wild', 'Dummy', 'symbols', 'var', + + 'Number', 'Float', 'Rational', 'Integer', 'NumberSymbol', 'RealNumber', + 'igcd', 'ilcm', 'seterr', 'E', 'I', 'nan', 'oo', 'pi', 'zoo', + 'AlgebraicNumber', 'comp', 'mod_inverse', + + 'Pow', + + 'integer_nthroot', 'integer_log', 'num_digits', 'trailing', + + 'Mul', 'prod', + + 'Add', + + 'Mod', + + 'Rel', 'Eq', 'Ne', 'Lt', 'Le', 'Gt', 'Ge', 'Equality', 'GreaterThan', + 'LessThan', 'Unequality', 'StrictGreaterThan', 'StrictLessThan', + + 'vectorize', + + 'Lambda', 'WildFunction', 'Derivative', 'diff', 'FunctionClass', + 'Function', 'Subs', 'expand', 'PoleError', 'count_ops', 'expand_mul', + 'expand_log', 'expand_func', 'expand_trig', 'expand_complex', + 'expand_multinomial', 'nfloat', 'expand_power_base', 'expand_power_exp', + 'arity', + + 'PrecisionExhausted', 'N', + + 'evalf', # The module? + + 'Tuple', 'Dict', + + 'gcd_terms', 'factor_terms', 'factor_nc', + + 'evaluate', + + 'Catalan', + 'EulerGamma', + 'GoldenRatio', + 'TribonacciConstant', + + 'UndefinedKind', 'NumberKind', 'BooleanKind', + + 'preorder_traversal', 'bottom_up', 'use', 'postorder_traversal', + + 'default_sort_key', 'ordered', +] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/_print_helpers.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/_print_helpers.py new file mode 100644 index 0000000000000000000000000000000000000000..d704ed220d444e2d8510b280dca85c8ae6149d4c --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/_print_helpers.py @@ -0,0 +1,65 @@ +""" +Base class to provide str and repr hooks that `init_printing` can overwrite. + +This is exposed publicly in the `printing.defaults` module, +but cannot be defined there without causing circular imports. +""" + +class Printable: + """ + The default implementation of printing for SymPy classes. + + This implements a hack that allows us to print elements of built-in + Python containers in a readable way. Natively Python uses ``repr()`` + even if ``str()`` was explicitly requested. Mix in this trait into + a class to get proper default printing. + + This also adds support for LaTeX printing in jupyter notebooks. + """ + + # Since this class is used as a mixin we set empty slots. That means that + # instances of any subclasses that use slots will not need to have a + # __dict__. + __slots__ = () + + # Note, we always use the default ordering (lex) in __str__ and __repr__, + # regardless of the global setting. See issue 5487. + def __str__(self): + from sympy.printing.str import sstr + return sstr(self, order=None) + + __repr__ = __str__ + + def _repr_disabled(self): + """ + No-op repr function used to disable jupyter display hooks. + + When :func:`sympy.init_printing` is used to disable certain display + formats, this function is copied into the appropriate ``_repr_*_`` + attributes. + + While we could just set the attributes to `None``, doing it this way + allows derived classes to call `super()`. + """ + return None + + # We don't implement _repr_png_ here because it would add a large amount of + # data to any notebook containing SymPy expressions, without adding + # anything useful to the notebook. It can still enabled manually, e.g., + # for the qtconsole, with init_printing(). + _repr_png_ = _repr_disabled + + _repr_svg_ = _repr_disabled + + def _repr_latex_(self): + """ + IPython/Jupyter LaTeX printing + + To change the behavior of this (e.g., pass in some settings to LaTeX), + use init_printing(). init_printing() will also enable LaTeX printing + for built in numeric types like ints and container types that contain + SymPy objects, like lists and dictionaries of expressions. + """ + from sympy.printing.latex import latex + s = latex(self, mode='plain') + return "$\\displaystyle %s$" % s diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/add.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/add.py new file mode 100644 index 0000000000000000000000000000000000000000..2d280f3286c34cd0dea14bf61194ed03ee6bf6ae --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/add.py @@ -0,0 +1,1280 @@ +from __future__ import annotations + +from typing import TYPE_CHECKING, ClassVar +from collections import defaultdict +from functools import reduce +from operator import attrgetter +from .basic import _args_sortkey +from .parameters import global_parameters +from .logic import _fuzzy_group, fuzzy_or, fuzzy_not +from .singleton import S +from .operations import AssocOp, AssocOpDispatcher +from .cache import cacheit +from .intfunc import ilcm, igcd +from .expr import Expr +from .kind import UndefinedKind +from sympy.utilities.iterables import is_sequence, sift + + +if TYPE_CHECKING: + from sympy.core.numbers import Number + from sympy.series.order import Order + + +def _could_extract_minus_sign(expr): + # assume expr is Add-like + # We choose the one with less arguments with minus signs + negative_args = sum(1 for i in expr.args + if i.could_extract_minus_sign()) + positive_args = len(expr.args) - negative_args + if positive_args > negative_args: + return False + elif positive_args < negative_args: + return True + # choose based on .sort_key() to prefer + # x - 1 instead of 1 - x and + # 3 - sqrt(2) instead of -3 + sqrt(2) + return bool(expr.sort_key() < (-expr).sort_key()) + + +def _addsort(args): + # in-place sorting of args + args.sort(key=_args_sortkey) + + +def _unevaluated_Add(*args): + """Return a well-formed unevaluated Add: Numbers are collected and + put in slot 0 and args are sorted. Use this when args have changed + but you still want to return an unevaluated Add. + + Examples + ======== + + >>> from sympy.core.add import _unevaluated_Add as uAdd + >>> from sympy import S, Add + >>> from sympy.abc import x, y + >>> a = uAdd(*[S(1.0), x, S(2)]) + >>> a.args[0] + 3.00000000000000 + >>> a.args[1] + x + + Beyond the Number being in slot 0, there is no other assurance of + order for the arguments since they are hash sorted. So, for testing + purposes, output produced by this in some other function can only + be tested against the output of this function or as one of several + options: + + >>> opts = (Add(x, y, evaluate=False), Add(y, x, evaluate=False)) + >>> a = uAdd(x, y) + >>> assert a in opts and a == uAdd(x, y) + >>> uAdd(x + 1, x + 2) + x + x + 3 + """ + args = list(args) + newargs = [] + co = S.Zero + while args: + a = args.pop() + if a.is_Add: + # this will keep nesting from building up + # so that x + (x + 1) -> x + x + 1 (3 args) + args.extend(a.args) + elif a.is_Number: + co += a + else: + newargs.append(a) + _addsort(newargs) + if co: + newargs.insert(0, co) + return Add._from_args(newargs) + + +class Add(Expr, AssocOp): + """ + Expression representing addition operation for algebraic group. + + .. deprecated:: 1.7 + + Using arguments that aren't subclasses of :class:`~.Expr` in core + operators (:class:`~.Mul`, :class:`~.Add`, and :class:`~.Pow`) is + deprecated. See :ref:`non-expr-args-deprecated` for details. + + Every argument of ``Add()`` must be ``Expr``. Infix operator ``+`` + on most scalar objects in SymPy calls this class. + + Another use of ``Add()`` is to represent the structure of abstract + addition so that its arguments can be substituted to return different + class. Refer to examples section for this. + + ``Add()`` evaluates the argument unless ``evaluate=False`` is passed. + The evaluation logic includes: + + 1. Flattening + ``Add(x, Add(y, z))`` -> ``Add(x, y, z)`` + + 2. Identity removing + ``Add(x, 0, y)`` -> ``Add(x, y)`` + + 3. Coefficient collecting by ``.as_coeff_Mul()`` + ``Add(x, 2*x)`` -> ``Mul(3, x)`` + + 4. Term sorting + ``Add(y, x, 2)`` -> ``Add(2, x, y)`` + + If no argument is passed, identity element 0 is returned. If single + element is passed, that element is returned. + + Note that ``Add(*args)`` is more efficient than ``sum(args)`` because + it flattens the arguments. ``sum(a, b, c, ...)`` recursively adds the + arguments as ``a + (b + (c + ...))``, which has quadratic complexity. + On the other hand, ``Add(a, b, c, d)`` does not assume nested + structure, making the complexity linear. + + Since addition is group operation, every argument should have the + same :obj:`sympy.core.kind.Kind()`. + + Examples + ======== + + >>> from sympy import Add, I + >>> from sympy.abc import x, y + >>> Add(x, 1) + x + 1 + >>> Add(x, x) + 2*x + >>> 2*x**2 + 3*x + I*y + 2*y + 2*x/5 + 1.0*y + 1 + 2*x**2 + 17*x/5 + 3.0*y + I*y + 1 + + If ``evaluate=False`` is passed, result is not evaluated. + + >>> Add(1, 2, evaluate=False) + 1 + 2 + >>> Add(x, x, evaluate=False) + x + x + + ``Add()`` also represents the general structure of addition operation. + + >>> from sympy import MatrixSymbol + >>> A,B = MatrixSymbol('A', 2,2), MatrixSymbol('B', 2,2) + >>> expr = Add(x,y).subs({x:A, y:B}) + >>> expr + A + B + >>> type(expr) + + + Note that the printers do not display in args order. + + >>> Add(x, 1) + x + 1 + >>> Add(x, 1).args + (1, x) + + See Also + ======== + + MatAdd + + """ + + __slots__ = () + + is_Add = True + + _args_type = Expr + + identity: ClassVar[Expr] + + if TYPE_CHECKING: + + def __new__(cls, *args: Expr | complex, evaluate: bool=True) -> Expr: # type: ignore + ... + + @property + def args(self) -> tuple[Expr, ...]: + ... + + @classmethod + def flatten(cls, seq: list[Expr]) -> tuple[list[Expr], list[Expr], None]: + """ + Takes the sequence "seq" of nested Adds and returns a flatten list. + + Returns: (commutative_part, noncommutative_part, order_symbols) + + Applies associativity, all terms are commutable with respect to + addition. + + NB: the removal of 0 is already handled by AssocOp.__new__ + + See Also + ======== + + sympy.core.mul.Mul.flatten + + """ + from sympy.calculus.accumulationbounds import AccumBounds + from sympy.matrices.expressions import MatrixExpr + from sympy.tensor.tensor import TensExpr, TensAdd + rv = None + if len(seq) == 2: + a, b = seq + if b.is_Rational: + a, b = b, a + if a.is_Rational: + if b.is_Mul: + rv = [a, b], [], None + if rv: + if all(s.is_commutative for s in rv[0]): + return rv + return [], rv[0], None + + # term -> coeff + # e.g. x**2 -> 5 for ... + 5*x**2 + ... + terms: dict[Expr, Number] = {} + + # coefficient (Number or zoo) to always be in slot 0 + # e.g. 3 + ... + coeff: Expr = S.Zero + + order_factors: list[Order] = [] + + extra: list[MatrixExpr] = [] + + for o in seq: + + # O(x) + if o.is_Order: + if o.expr.is_zero: # type: ignore + continue + if any(o1.contains(o) for o1 in order_factors): + continue + order_factors = [o1 for o1 in order_factors if not o.contains(o1)] # type: ignore + order_factors = [o] + order_factors # type: ignore + continue + + # 3 or NaN + elif o.is_Number: + if (o is S.NaN or coeff is S.ComplexInfinity and + o.is_finite is False) and not extra: + # we know for sure the result will be nan + return [S.NaN], [], None + if coeff.is_Number or isinstance(coeff, AccumBounds): + coeff += o + if coeff is S.NaN and not extra: + # we know for sure the result will be nan + return [S.NaN], [], None + continue + + elif isinstance(o, AccumBounds): + coeff = o.__add__(coeff) + continue + + elif isinstance(o, MatrixExpr): + # can't add 0 to Matrix so make sure coeff is not 0 + extra.append(o) + continue + + elif isinstance(o, TensExpr): + coeff = TensAdd(o, coeff).doit(deep=False) + continue + + elif o is S.ComplexInfinity: + if coeff.is_finite is False and not extra: + # we know for sure the result will be nan + return [S.NaN], [], None + coeff = S.ComplexInfinity + continue + + # Add([...]) + elif o.is_Add: + # NB: here we assume Add is always commutative + o_args: tuple[Expr, ...] = o.args # type: ignore + seq.extend(o_args) # TODO zerocopy? + continue + + # Mul([...]) + elif o.is_Mul: + c, s = o.as_coeff_Mul() + + # check for unevaluated Pow, e.g. 2**3 or 2**(-1/2) + elif o.is_Pow: + b, e = o.as_base_exp() + if b.is_Number and (e.is_Integer or + (e.is_Rational and e.is_negative)): + seq.append(b**e) + continue + c, s = S.One, o + + else: + # everything else + c = S.One + s = o + + # now we have: + # o = c*s, where + # + # c is a Number + # s is an expression with number factor extracted + # let's collect terms with the same s, so e.g. + # 2*x**2 + 3*x**2 -> 5*x**2 + if s in terms: + terms[s] += c + if terms[s] is S.NaN and not extra: + # we know for sure the result will be nan + return [S.NaN], [], None + else: + terms[s] = c + + # now let's construct new args: + # [2*x**2, x**3, 7*x**4, pi, ...] + newseq = [] + noncommutative = False + for s, c in terms.items(): + # 0*s + if c.is_zero: + continue + # 1*s + elif c is S.One: + newseq.append(s) + # c*s + else: + if s.is_Mul: + # Mul, already keeps its arguments in perfect order. + # so we can simply put c in slot0 and go the fast way. + # + # XXX: This breaks VectorMul unless it overrides + # _new_rawargs + cs = s._new_rawargs(*((c,) + s.args)) # type: ignore + newseq.append(cs) + elif s.is_Add: + # we just re-create the unevaluated Mul + newseq.append(Mul(c, s, evaluate=False)) + else: + # alternatively we have to call all Mul's machinery (slow) + newseq.append(Mul(c, s)) + + noncommutative = noncommutative or not s.is_commutative + + # oo, -oo + if coeff is S.Infinity: + newseq = [f for f in newseq if not (f.is_extended_nonnegative or f.is_real)] + + elif coeff is S.NegativeInfinity: + newseq = [f for f in newseq if not (f.is_extended_nonpositive or f.is_real)] + + if coeff is S.ComplexInfinity: + # zoo might be + # infinite_real + finite_im + # finite_real + infinite_im + # infinite_real + infinite_im + # addition of a finite real or imaginary number won't be able to + # change the zoo nature; adding an infinite qualtity would result + # in a NaN condition if it had sign opposite of the infinite + # portion of zoo, e.g., infinite_real - infinite_real. + newseq = [c for c in newseq if not (c.is_finite and + c.is_extended_real is not None)] + + # process O(x) + if order_factors: + newseq2 = [] + for t in newseq: + # x + O(x) -> O(x) + if not any(o.contains(t) for o in order_factors): + newseq2.append(t) + newseq = newseq2 + order_factors # type: ignore + # 1 + O(1) -> O(1) + for o in order_factors: + if o.contains(coeff): + coeff = S.Zero + break + + # order args canonically + _addsort(newseq) + + # current code expects coeff to be first + if coeff is not S.Zero: + newseq.insert(0, coeff) + + if extra: + newseq += extra + noncommutative = True + + # we are done + if noncommutative: + return [], newseq, None + else: + return newseq, [], None + + @classmethod + def class_key(cls): + return 3, 1, cls.__name__ + + @property + def kind(self): + k = attrgetter('kind') + kinds = map(k, self.args) + kinds = frozenset(kinds) + if len(kinds) != 1: + # Since addition is group operator, kind must be same. + # We know that this is unexpected signature, so return this. + result = UndefinedKind + else: + result, = kinds + return result + + def could_extract_minus_sign(self): + return _could_extract_minus_sign(self) + + @cacheit + def as_coeff_add(self, *deps): + """ + Returns a tuple (coeff, args) where self is treated as an Add and coeff + is the Number term and args is a tuple of all other terms. + + Examples + ======== + + >>> from sympy.abc import x + >>> (7 + 3*x).as_coeff_add() + (7, (3*x,)) + >>> (7*x).as_coeff_add() + (0, (7*x,)) + """ + if deps: + l1, l2 = sift(self.args, lambda x: x.has_free(*deps), binary=True) + return self._new_rawargs(*l2), tuple(l1) + coeff, notrat = self.args[0].as_coeff_add() + if coeff is not S.Zero: + return coeff, notrat + self.args[1:] + return S.Zero, self.args + + def as_coeff_Add(self, rational=False, deps=None) -> tuple[Number, Expr]: + """ + Efficiently extract the coefficient of a summation. + """ + coeff, args = self.args[0], self.args[1:] + + if coeff.is_Number and not rational or coeff.is_Rational: + return coeff, self._new_rawargs(*args) # type: ignore + return S.Zero, self + + # Note, we intentionally do not implement Add.as_coeff_mul(). Rather, we + # let Expr.as_coeff_mul() just always return (S.One, self) for an Add. See + # issue 5524. + + def _eval_power(self, expt): + from .evalf import pure_complex + from .relational import is_eq + if len(self.args) == 2 and any(_.is_infinite for _ in self.args): + if expt.is_zero is False and is_eq(expt, S.One) is False: + # looking for literal a + I*b + a, b = self.args + if a.coeff(S.ImaginaryUnit): + a, b = b, a + ico = b.coeff(S.ImaginaryUnit) + if ico and ico.is_extended_real and a.is_extended_real: + if expt.is_extended_negative: + return S.Zero + if expt.is_extended_positive: + return S.ComplexInfinity + return + if expt.is_Rational and self.is_number: + ri = pure_complex(self) + if ri: + r, i = ri + if expt.q == 2: + from sympy.functions.elementary.miscellaneous import sqrt + D = sqrt(r**2 + i**2) + if D.is_Rational: + from .exprtools import factor_terms + from sympy.functions.elementary.complexes import sign + from .function import expand_multinomial + # (r, i, D) is a Pythagorean triple + root = sqrt(factor_terms((D - r)/2))**expt.p + return root*expand_multinomial(( + # principle value + (D + r)/abs(i) + sign(i)*S.ImaginaryUnit)**expt.p) + elif expt == -1: + return _unevaluated_Mul( + r - i*S.ImaginaryUnit, + 1/(r**2 + i**2)) + + @cacheit + def _eval_derivative(self, s): + return self.func(*[a.diff(s) for a in self.args]) + + def _eval_nseries(self, x, n, logx, cdir=0): + terms = [t.nseries(x, n=n, logx=logx, cdir=cdir) for t in self.args] + return self.func(*terms) + + def _matches_simple(self, expr, repl_dict): + # handle (w+3).matches('x+5') -> {w: x+2} + coeff, terms = self.as_coeff_add() + if len(terms) == 1: + return terms[0].matches(expr - coeff, repl_dict) + return + + def matches(self, expr, repl_dict=None, old=False): + return self._matches_commutative(expr, repl_dict, old) + + @staticmethod + def _combine_inverse(lhs, rhs): + """ + Returns lhs - rhs, but treats oo like a symbol so oo - oo + returns 0, instead of a nan. + """ + from sympy.simplify.simplify import signsimp + inf = (S.Infinity, S.NegativeInfinity) + if lhs.has(*inf) or rhs.has(*inf): + from .symbol import Dummy + oo = Dummy('oo') + reps = { + S.Infinity: oo, + S.NegativeInfinity: -oo} + ireps = {v: k for k, v in reps.items()} + eq = lhs.xreplace(reps) - rhs.xreplace(reps) + if eq.has(oo): + eq = eq.replace( + lambda x: x.is_Pow and x.base is oo, + lambda x: x.base) + rv = eq.xreplace(ireps) + else: + rv = lhs - rhs + srv = signsimp(rv) + return srv if srv.is_Number else rv + + @cacheit + def as_two_terms(self): + """Return head and tail of self. + + This is the most efficient way to get the head and tail of an + expression. + + - if you want only the head, use self.args[0]; + - if you want to process the arguments of the tail then use + self.as_coef_add() which gives the head and a tuple containing + the arguments of the tail when treated as an Add. + - if you want the coefficient when self is treated as a Mul + then use self.as_coeff_mul()[0] + + >>> from sympy.abc import x, y + >>> (3*x - 2*y + 5).as_two_terms() + (5, 3*x - 2*y) + """ + return self.args[0], self._new_rawargs(*self.args[1:]) + + def as_numer_denom(self) -> tuple[Expr, Expr]: + """ + Decomposes an expression to its numerator part and its + denominator part. + + Examples + ======== + + >>> from sympy.abc import x, y, z + >>> (x*y/z).as_numer_denom() + (x*y, z) + >>> (x*(y + 1)/y**7).as_numer_denom() + (x*(y + 1), y**7) + + See Also + ======== + + sympy.core.expr.Expr.as_numer_denom + """ + # clear rational denominator + content, expr = self.primitive() + if not isinstance(expr, Add): + return Mul(content, expr, evaluate=False).as_numer_denom() + ncon, dcon = content.as_numer_denom() + + # collect numerators and denominators of the terms + nd = defaultdict(list) + for f in expr.args: + ni, di = f.as_numer_denom() + nd[di].append(ni) + + # check for quick exit + if len(nd) == 1: + d, n = nd.popitem() + return self.func( + *[_keep_coeff(ncon, ni) for ni in n]), _keep_coeff(dcon, d) + + # sum up the terms having a common denominator + nd2 = {d: self.func(*n) if len(n) > 1 else n[0] for d, n in nd.items()} + + # assemble single numerator and denominator + denoms, numers = [list(i) for i in zip(*iter(nd2.items()))] + n, d = self.func(*[Mul(*(denoms[:i] + [numers[i]] + denoms[i + 1:])) + for i in range(len(numers))]), Mul(*denoms) + + return _keep_coeff(ncon, n), _keep_coeff(dcon, d) + + def _eval_is_polynomial(self, syms): + return all(term._eval_is_polynomial(syms) for term in self.args) + + def _eval_is_rational_function(self, syms): + return all(term._eval_is_rational_function(syms) for term in self.args) + + def _eval_is_meromorphic(self, x, a): + return _fuzzy_group((arg.is_meromorphic(x, a) for arg in self.args), + quick_exit=True) + + def _eval_is_algebraic_expr(self, syms): + return all(term._eval_is_algebraic_expr(syms) for term in self.args) + + # assumption methods + _eval_is_real = lambda self: _fuzzy_group( + (a.is_real for a in self.args), quick_exit=True) + _eval_is_extended_real = lambda self: _fuzzy_group( + (a.is_extended_real for a in self.args), quick_exit=True) + _eval_is_complex = lambda self: _fuzzy_group( + (a.is_complex for a in self.args), quick_exit=True) + _eval_is_antihermitian = lambda self: _fuzzy_group( + (a.is_antihermitian for a in self.args), quick_exit=True) + _eval_is_finite = lambda self: _fuzzy_group( + (a.is_finite for a in self.args), quick_exit=True) + _eval_is_hermitian = lambda self: _fuzzy_group( + (a.is_hermitian for a in self.args), quick_exit=True) + _eval_is_integer = lambda self: _fuzzy_group( + (a.is_integer for a in self.args), quick_exit=True) + _eval_is_rational = lambda self: _fuzzy_group( + (a.is_rational for a in self.args), quick_exit=True) + _eval_is_algebraic = lambda self: _fuzzy_group( + (a.is_algebraic for a in self.args), quick_exit=True) + _eval_is_commutative = lambda self: _fuzzy_group( + a.is_commutative for a in self.args) + + def _eval_is_infinite(self): + sawinf = False + for a in self.args: + ainf = a.is_infinite + if ainf is None: + return None + elif ainf is True: + # infinite+infinite might not be infinite + if sawinf is True: + return None + sawinf = True + return sawinf + + def _eval_is_imaginary(self): + nz = [] + im_I = [] + for a in self.args: + if a.is_extended_real: + if a.is_zero: + pass + elif a.is_zero is False: + nz.append(a) + else: + return + elif a.is_imaginary: + im_I.append(a*S.ImaginaryUnit) + elif a.is_Mul and S.ImaginaryUnit in a.args: + coeff, ai = a.as_coeff_mul(S.ImaginaryUnit) + if ai == (S.ImaginaryUnit,) and coeff.is_extended_real: + im_I.append(-coeff) + else: + return + else: + return + b = self.func(*nz) + if b != self: + if b.is_zero: + return fuzzy_not(self.func(*im_I).is_zero) + elif b.is_zero is False: + return False + + def _eval_is_zero(self): + if self.is_commutative is False: + # issue 10528: there is no way to know if a nc symbol + # is zero or not + return + nz = [] + z = 0 + im_or_z = False + im = 0 + for a in self.args: + if a.is_extended_real: + if a.is_zero: + z += 1 + elif a.is_zero is False: + nz.append(a) + else: + return + elif a.is_imaginary: + im += 1 + elif a.is_Mul and S.ImaginaryUnit in a.args: + coeff, ai = a.as_coeff_mul(S.ImaginaryUnit) + if ai == (S.ImaginaryUnit,) and coeff.is_extended_real: + im_or_z = True + else: + return + else: + return + if z == len(self.args): + return True + if len(nz) in [0, len(self.args)]: + return None + b = self.func(*nz) + if b.is_zero: + if not im_or_z: + if im == 0: + return True + elif im == 1: + return False + if b.is_zero is False: + return False + + def _eval_is_odd(self): + l = [f for f in self.args if not (f.is_even is True)] + if not l: + return False + if l[0].is_odd: + return self._new_rawargs(*l[1:]).is_even + + def _eval_is_irrational(self): + for t in self.args: + a = t.is_irrational + if a: + others = list(self.args) + others.remove(t) + if all(x.is_rational is True for x in others): + return True + return None + if a is None: + return + return False + + def _all_nonneg_or_nonppos(self): + nn = np = 0 + for a in self.args: + if a.is_nonnegative: + if np: + return False + nn = 1 + elif a.is_nonpositive: + if nn: + return False + np = 1 + else: + break + else: + return True + + def _eval_is_extended_positive(self): + if self.is_number: + return super()._eval_is_extended_positive() + c, a = self.as_coeff_Add() + if not c.is_zero: + from .exprtools import _monotonic_sign + v = _monotonic_sign(a) + if v is not None: + s = v + c + if s != self and s.is_extended_positive and a.is_extended_nonnegative: + return True + if len(self.free_symbols) == 1: + v = _monotonic_sign(self) + if v is not None and v != self and v.is_extended_positive: + return True + pos = nonneg = nonpos = unknown_sign = False + saw_INF = set() + args = [a for a in self.args if not a.is_zero] + if not args: + return False + for a in args: + ispos = a.is_extended_positive + infinite = a.is_infinite + if infinite: + saw_INF.add(fuzzy_or((ispos, a.is_extended_nonnegative))) + if True in saw_INF and False in saw_INF: + return + if ispos: + pos = True + continue + elif a.is_extended_nonnegative: + nonneg = True + continue + elif a.is_extended_nonpositive: + nonpos = True + continue + + if infinite is None: + return + unknown_sign = True + + if saw_INF: + if len(saw_INF) > 1: + return + return saw_INF.pop() + elif unknown_sign: + return + elif not nonpos and not nonneg and pos: + return True + elif not nonpos and pos: + return True + elif not pos and not nonneg: + return False + + def _eval_is_extended_nonnegative(self): + if not self.is_number: + c, a = self.as_coeff_Add() + if not c.is_zero and a.is_extended_nonnegative: + from .exprtools import _monotonic_sign + v = _monotonic_sign(a) + if v is not None: + s = v + c + if s != self and s.is_extended_nonnegative: + return True + if len(self.free_symbols) == 1: + v = _monotonic_sign(self) + if v is not None and v != self and v.is_extended_nonnegative: + return True + + def _eval_is_extended_nonpositive(self): + if not self.is_number: + c, a = self.as_coeff_Add() + if not c.is_zero and a.is_extended_nonpositive: + from .exprtools import _monotonic_sign + v = _monotonic_sign(a) + if v is not None: + s = v + c + if s != self and s.is_extended_nonpositive: + return True + if len(self.free_symbols) == 1: + v = _monotonic_sign(self) + if v is not None and v != self and v.is_extended_nonpositive: + return True + + def _eval_is_extended_negative(self): + if self.is_number: + return super()._eval_is_extended_negative() + c, a = self.as_coeff_Add() + if not c.is_zero: + from .exprtools import _monotonic_sign + v = _monotonic_sign(a) + if v is not None: + s = v + c + if s != self and s.is_extended_negative and a.is_extended_nonpositive: + return True + if len(self.free_symbols) == 1: + v = _monotonic_sign(self) + if v is not None and v != self and v.is_extended_negative: + return True + neg = nonpos = nonneg = unknown_sign = False + saw_INF = set() + args = [a for a in self.args if not a.is_zero] + if not args: + return False + for a in args: + isneg = a.is_extended_negative + infinite = a.is_infinite + if infinite: + saw_INF.add(fuzzy_or((isneg, a.is_extended_nonpositive))) + if True in saw_INF and False in saw_INF: + return + if isneg: + neg = True + continue + elif a.is_extended_nonpositive: + nonpos = True + continue + elif a.is_extended_nonnegative: + nonneg = True + continue + + if infinite is None: + return + unknown_sign = True + + if saw_INF: + if len(saw_INF) > 1: + return + return saw_INF.pop() + elif unknown_sign: + return + elif not nonneg and not nonpos and neg: + return True + elif not nonneg and neg: + return True + elif not neg and not nonpos: + return False + + def _eval_subs(self, old, new): + if not old.is_Add: + if old is S.Infinity and -old in self.args: + # foo - oo is foo + (-oo) internally + return self.xreplace({-old: -new}) + return None + + coeff_self, terms_self = self.as_coeff_Add() + coeff_old, terms_old = old.as_coeff_Add() + + if coeff_self.is_Rational and coeff_old.is_Rational: + if terms_self == terms_old: # (2 + a).subs( 3 + a, y) -> -1 + y + return self.func(new, coeff_self, -coeff_old) + if terms_self == -terms_old: # (2 + a).subs(-3 - a, y) -> -1 - y + return self.func(-new, coeff_self, coeff_old) + + if coeff_self.is_Rational and coeff_old.is_Rational \ + or coeff_self == coeff_old: + args_old, args_self = self.func.make_args( + terms_old), self.func.make_args(terms_self) + if len(args_old) < len(args_self): # (a+b+c).subs(b+c,x) -> a+x + self_set = set(args_self) + old_set = set(args_old) + + if old_set < self_set: + ret_set = self_set - old_set + return self.func(new, coeff_self, -coeff_old, + *[s._subs(old, new) for s in ret_set]) + + args_old = self.func.make_args( + -terms_old) # (a+b+c+d).subs(-b-c,x) -> a-x+d + old_set = set(args_old) + if old_set < self_set: + ret_set = self_set - old_set + return self.func(-new, coeff_self, coeff_old, + *[s._subs(old, new) for s in ret_set]) + + def removeO(self): + args = [a for a in self.args if not a.is_Order] + return self._new_rawargs(*args) + + def getO(self): + args = [a for a in self.args if a.is_Order] + if args: + return self._new_rawargs(*args) + + @cacheit + def extract_leading_order(self, symbols, point=None): + """ + Returns the leading term and its order. + + Examples + ======== + + >>> from sympy.abc import x + >>> (x + 1 + 1/x**5).extract_leading_order(x) + ((x**(-5), O(x**(-5))),) + >>> (1 + x).extract_leading_order(x) + ((1, O(1)),) + >>> (x + x**2).extract_leading_order(x) + ((x, O(x)),) + + """ + from sympy.series.order import Order + lst = [] + symbols = list(symbols if is_sequence(symbols) else [symbols]) + if not point: + point = [0]*len(symbols) + seq = [(f, Order(f, *zip(symbols, point))) for f in self.args] + for ef, of in seq: + for e, o in lst: + if o.contains(of) and o != of: + of = None + break + if of is None: + continue + new_lst = [(ef, of)] + for e, o in lst: + if of.contains(o) and o != of: + continue + new_lst.append((e, o)) + lst = new_lst + return tuple(lst) + + def as_real_imag(self, deep=True, **hints): + """ + Return a tuple representing a complex number. + + Examples + ======== + + >>> from sympy import I + >>> (7 + 9*I).as_real_imag() + (7, 9) + >>> ((1 + I)/(1 - I)).as_real_imag() + (0, 1) + >>> ((1 + 2*I)*(1 + 3*I)).as_real_imag() + (-5, 5) + """ + sargs = self.args + re_part, im_part = [], [] + for term in sargs: + re, im = term.as_real_imag(deep=deep) + re_part.append(re) + im_part.append(im) + return (self.func(*re_part), self.func(*im_part)) + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.core.symbol import Dummy, Symbol + from sympy.series.order import Order + from sympy.functions.elementary.exponential import log + from sympy.functions.elementary.piecewise import Piecewise, piecewise_fold + from .function import expand_mul + + o = self.getO() + if o is None: + o = Order(0) + old = self.removeO() + + if old.has(Piecewise): + old = piecewise_fold(old) + + # This expansion is the last part of expand_log. expand_log also calls + # expand_mul with factor=True, which would be more expensive + if any(isinstance(a, log) for a in self.args): + logflags = {"deep": True, "log": True, "mul": False, "power_exp": False, + "power_base": False, "multinomial": False, "basic": False, "force": False, + "factor": False} + old = old.expand(**logflags) + expr = expand_mul(old) + + if not expr.is_Add: + return expr.as_leading_term(x, logx=logx, cdir=cdir) + + infinite = [t for t in expr.args if t.is_infinite] + + _logx = Dummy('logx') if logx is None else logx + leading_terms = [t.as_leading_term(x, logx=_logx, cdir=cdir) for t in expr.args] + + min, new_expr = Order(0), S.Zero + + try: + for term in leading_terms: + order = Order(term, x) + if not min or order not in min: + min = order + new_expr = term + elif min in order: + new_expr += term + + except TypeError: + return expr + + if logx is None: + new_expr = new_expr.subs(_logx, log(x)) + + is_zero = new_expr.is_zero + if is_zero is None: + new_expr = new_expr.trigsimp().cancel() + is_zero = new_expr.is_zero + if is_zero is True: + # simple leading term analysis gave us cancelled terms but we have to send + # back a term, so compute the leading term (via series) + try: + n0 = min.getn() + except NotImplementedError: + n0 = S.One + if n0.has(Symbol): + n0 = S.One + res = Order(1) + incr = S.One + while res.is_Order: + res = old._eval_nseries(x, n=n0+incr, logx=logx, cdir=cdir).cancel().powsimp().trigsimp() + incr *= 2 + return res.as_leading_term(x, logx=logx, cdir=cdir) + + elif new_expr is S.NaN: + return old.func._from_args(infinite) + o + + else: + return new_expr + + def _eval_adjoint(self): + return self.func(*[t.adjoint() for t in self.args]) + + def _eval_conjugate(self): + return self.func(*[t.conjugate() for t in self.args]) + + def _eval_transpose(self): + return self.func(*[t.transpose() for t in self.args]) + + def primitive(self): + """ + Return ``(R, self/R)`` where ``R``` is the Rational GCD of ``self```. + + ``R`` is collected only from the leading coefficient of each term. + + Examples + ======== + + >>> from sympy.abc import x, y + + >>> (2*x + 4*y).primitive() + (2, x + 2*y) + + >>> (2*x/3 + 4*y/9).primitive() + (2/9, 3*x + 2*y) + + >>> (2*x/3 + 4.2*y).primitive() + (1/3, 2*x + 12.6*y) + + No subprocessing of term factors is performed: + + >>> ((2 + 2*x)*x + 2).primitive() + (1, x*(2*x + 2) + 2) + + Recursive processing can be done with the ``as_content_primitive()`` + method: + + >>> ((2 + 2*x)*x + 2).as_content_primitive() + (2, x*(x + 1) + 1) + + See also: primitive() function in polytools.py + + """ + + terms = [] + inf = False + for a in self.args: + c, m = a.as_coeff_Mul() + if not c.is_Rational: + c = S.One + m = a + inf = inf or m is S.ComplexInfinity + terms.append((c.p, c.q, m)) + + if not inf: + ngcd = reduce(igcd, [t[0] for t in terms], 0) + dlcm = reduce(ilcm, [t[1] for t in terms], 1) + else: + ngcd = reduce(igcd, [t[0] for t in terms if t[1]], 0) + dlcm = reduce(ilcm, [t[1] for t in terms if t[1]], 1) + + if ngcd == dlcm == 1: + return S.One, self + if not inf: + for i, (p, q, term) in enumerate(terms): + terms[i] = _keep_coeff(Rational((p//ngcd)*(dlcm//q)), term) + else: + for i, (p, q, term) in enumerate(terms): + if q: + terms[i] = _keep_coeff(Rational((p//ngcd)*(dlcm//q)), term) + else: + terms[i] = _keep_coeff(Rational(p, q), term) + + # we don't need a complete re-flattening since no new terms will join + # so we just use the same sort as is used in Add.flatten. When the + # coefficient changes, the ordering of terms may change, e.g. + # (3*x, 6*y) -> (2*y, x) + # + # We do need to make sure that term[0] stays in position 0, however. + # + if terms[0].is_Number or terms[0] is S.ComplexInfinity: + c = terms.pop(0) + else: + c = None + _addsort(terms) + if c: + terms.insert(0, c) + return Rational(ngcd, dlcm), self._new_rawargs(*terms) + + def as_content_primitive(self, radical=False, clear=True): + """Return the tuple (R, self/R) where R is the positive Rational + extracted from self. If radical is True (default is False) then + common radicals will be removed and included as a factor of the + primitive expression. + + Examples + ======== + + >>> from sympy import sqrt + >>> (3 + 3*sqrt(2)).as_content_primitive() + (3, 1 + sqrt(2)) + + Radical content can also be factored out of the primitive: + + >>> (2*sqrt(2) + 4*sqrt(10)).as_content_primitive(radical=True) + (2, sqrt(2)*(1 + 2*sqrt(5))) + + See docstring of Expr.as_content_primitive for more examples. + """ + con, prim = self.func(*[_keep_coeff(*a.as_content_primitive( + radical=radical, clear=clear)) for a in self.args]).primitive() + if not clear and not con.is_Integer and prim.is_Add: + con, d = con.as_numer_denom() + _p = prim/d + if any(a.as_coeff_Mul()[0].is_Integer for a in _p.args): + prim = _p + else: + con /= d + if radical and prim.is_Add: + # look for common radicals that can be removed + args = prim.args + rads = [] + common_q = None + for m in args: + term_rads = defaultdict(list) + for ai in Mul.make_args(m): + if ai.is_Pow: + b, e = ai.as_base_exp() + if e.is_Rational and b.is_Integer: + term_rads[e.q].append(abs(int(b))**e.p) + if not term_rads: + break + if common_q is None: + common_q = set(term_rads.keys()) + else: + common_q = common_q & set(term_rads.keys()) + if not common_q: + break + rads.append(term_rads) + else: + # process rads + # keep only those in common_q + for r in rads: + for q in list(r.keys()): + if q not in common_q: + r.pop(q) + for q in r: + r[q] = Mul(*r[q]) + # find the gcd of bases for each q + G = [] + for q in common_q: + g = reduce(igcd, [r[q] for r in rads], 0) + if g != 1: + G.append(g**Rational(1, q)) + if G: + G = Mul(*G) + args = [ai/G for ai in args] + prim = G*prim.func(*args) + + return con, prim + + @property + def _sorted_args(self): + from .sorting import default_sort_key + return tuple(sorted(self.args, key=default_sort_key)) + + def _eval_difference_delta(self, n, step): + from sympy.series.limitseq import difference_delta as dd + return self.func(*[dd(a, n, step) for a in self.args]) + + @property + def _mpc_(self): + """ + Convert self to an mpmath mpc if possible + """ + from .numbers import Float + re_part, rest = self.as_coeff_Add() + im_part, imag_unit = rest.as_coeff_Mul() + if not imag_unit == S.ImaginaryUnit: + # ValueError may seem more reasonable but since it's a @property, + # we need to use AttributeError to keep from confusing things like + # hasattr. + raise AttributeError("Cannot convert Add to mpc. Must be of the form Number + Number*I") + + return (Float(re_part)._mpf_, Float(im_part)._mpf_) + + def __neg__(self): + if not global_parameters.distribute: + return super().__neg__() + return Mul(S.NegativeOne, self) + +add = AssocOpDispatcher('add') + +from .mul import Mul, _keep_coeff, _unevaluated_Mul +from .numbers import Rational diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/alphabets.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/alphabets.py new file mode 100644 index 0000000000000000000000000000000000000000..1ea2ae1c410ccd30e7ec9551f4cd8b19a36cdba1 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/alphabets.py @@ -0,0 +1,4 @@ +greeks = ('alpha', 'beta', 'gamma', 'delta', 'epsilon', 'zeta', + 'eta', 'theta', 'iota', 'kappa', 'lambda', 'mu', 'nu', + 'xi', 'omicron', 'pi', 'rho', 'sigma', 'tau', 'upsilon', + 'phi', 'chi', 'psi', 'omega') diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/assumptions.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/assumptions.py new file mode 100644 index 0000000000000000000000000000000000000000..677e86c5e39390b0b188a5158dd2fabfbac4c760 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/assumptions.py @@ -0,0 +1,692 @@ +""" +This module contains the machinery handling assumptions. +Do also consider the guide :ref:`assumptions-guide`. + +All symbolic objects have assumption attributes that can be accessed via +``.is_`` attribute. + +Assumptions determine certain properties of symbolic objects and can +have 3 possible values: ``True``, ``False``, ``None``. ``True`` is returned if the +object has the property and ``False`` is returned if it does not or cannot +(i.e. does not make sense): + + >>> from sympy import I + >>> I.is_algebraic + True + >>> I.is_real + False + >>> I.is_prime + False + +When the property cannot be determined (or when a method is not +implemented) ``None`` will be returned. For example, a generic symbol, ``x``, +may or may not be positive so a value of ``None`` is returned for ``x.is_positive``. + +By default, all symbolic values are in the largest set in the given context +without specifying the property. For example, a symbol that has a property +being integer, is also real, complex, etc. + +Here follows a list of possible assumption names: + +.. glossary:: + + commutative + object commutes with any other object with + respect to multiplication operation. See [12]_. + + complex + object can have only values from the set + of complex numbers. See [13]_. + + imaginary + object value is a number that can be written as a real + number multiplied by the imaginary unit ``I``. See + [3]_. Please note that ``0`` is not considered to be an + imaginary number, see + `issue #7649 `_. + + real + object can have only values from the set + of real numbers. + + extended_real + object can have only values from the set + of real numbers, ``oo`` and ``-oo``. + + integer + object can have only values from the set + of integers. + + odd + even + object can have only values from the set of + odd (even) integers [2]_. + + prime + object is a natural number greater than 1 that has + no positive divisors other than 1 and itself. See [6]_. + + composite + object is a positive integer that has at least one positive + divisor other than 1 or the number itself. See [4]_. + + zero + object has the value of 0. + + nonzero + object is a real number that is not zero. + + rational + object can have only values from the set + of rationals. + + algebraic + object can have only values from the set + of algebraic numbers [11]_. + + transcendental + object can have only values from the set + of transcendental numbers [10]_. + + irrational + object value cannot be represented exactly by :class:`~.Rational`, see [5]_. + + finite + infinite + object absolute value is bounded (arbitrarily large). + See [7]_, [8]_, [9]_. + + negative + nonnegative + object can have only negative (nonnegative) + values [1]_. + + positive + nonpositive + object can have only positive (nonpositive) values. + + extended_negative + extended_nonnegative + extended_positive + extended_nonpositive + extended_nonzero + as without the extended part, but also including infinity with + corresponding sign, e.g., extended_positive includes ``oo`` + + hermitian + antihermitian + object belongs to the field of Hermitian + (antihermitian) operators. + +Examples +======== + + >>> from sympy import Symbol + >>> x = Symbol('x', real=True); x + x + >>> x.is_real + True + >>> x.is_complex + True + +See Also +======== + +.. seealso:: + + :py:class:`sympy.core.numbers.ImaginaryUnit` + :py:class:`sympy.core.numbers.Zero` + :py:class:`sympy.core.numbers.One` + :py:class:`sympy.core.numbers.Infinity` + :py:class:`sympy.core.numbers.NegativeInfinity` + :py:class:`sympy.core.numbers.ComplexInfinity` + +Notes +===== + +The fully-resolved assumptions for any SymPy expression +can be obtained as follows: + + >>> from sympy.core.assumptions import assumptions + >>> x = Symbol('x',positive=True) + >>> assumptions(x + I) + {'commutative': True, 'complex': True, 'composite': False, 'even': + False, 'extended_negative': False, 'extended_nonnegative': False, + 'extended_nonpositive': False, 'extended_nonzero': False, + 'extended_positive': False, 'extended_real': False, 'finite': True, + 'imaginary': False, 'infinite': False, 'integer': False, 'irrational': + False, 'negative': False, 'noninteger': False, 'nonnegative': False, + 'nonpositive': False, 'nonzero': False, 'odd': False, 'positive': + False, 'prime': False, 'rational': False, 'real': False, 'zero': + False} + +Developers Notes +================ + +The current (and possibly incomplete) values are stored +in the ``obj._assumptions dictionary``; queries to getter methods +(with property decorators) or attributes of objects/classes +will return values and update the dictionary. + + >>> eq = x**2 + I + >>> eq._assumptions + {} + >>> eq.is_finite + True + >>> eq._assumptions + {'finite': True, 'infinite': False} + +For a :class:`~.Symbol`, there are two locations for assumptions that may +be of interest. The ``assumptions0`` attribute gives the full set of +assumptions derived from a given set of initial assumptions. The +latter assumptions are stored as ``Symbol._assumptions_orig`` + + >>> Symbol('x', prime=True, even=True)._assumptions_orig + {'even': True, 'prime': True} + +The ``_assumptions_orig`` are not necessarily canonical nor are they filtered +in any way: they records the assumptions used to instantiate a Symbol and (for +storage purposes) represent a more compact representation of the assumptions +needed to recreate the full set in ``Symbol.assumptions0``. + + +References +========== + +.. [1] https://en.wikipedia.org/wiki/Negative_number +.. [2] https://en.wikipedia.org/wiki/Parity_%28mathematics%29 +.. [3] https://en.wikipedia.org/wiki/Imaginary_number +.. [4] https://en.wikipedia.org/wiki/Composite_number +.. [5] https://en.wikipedia.org/wiki/Irrational_number +.. [6] https://en.wikipedia.org/wiki/Prime_number +.. [7] https://en.wikipedia.org/wiki/Finite +.. [8] https://docs.python.org/3/library/math.html#math.isfinite +.. [9] https://numpy.org/doc/stable/reference/generated/numpy.isfinite.html +.. [10] https://en.wikipedia.org/wiki/Transcendental_number +.. [11] https://en.wikipedia.org/wiki/Algebraic_number +.. [12] https://en.wikipedia.org/wiki/Commutative_property +.. [13] https://en.wikipedia.org/wiki/Complex_number + +""" + +from sympy.utilities.exceptions import sympy_deprecation_warning + +from .facts import FactRules, FactKB +from .sympify import sympify + +from sympy.core.random import _assumptions_shuffle as shuffle +from sympy.core.assumptions_generated import generated_assumptions as _assumptions + +def _load_pre_generated_assumption_rules() -> FactRules: + """ Load the assumption rules from pre-generated data + + To update the pre-generated data, see :method::`_generate_assumption_rules` + """ + _assume_rules=FactRules._from_python(_assumptions) + return _assume_rules + +def _generate_assumption_rules(): + """ Generate the default assumption rules + + This method should only be called to update the pre-generated + assumption rules. + + To update the pre-generated assumptions run: bin/ask_update.py + + """ + _assume_rules = FactRules([ + + 'integer -> rational', + 'rational -> real', + 'rational -> algebraic', + 'algebraic -> complex', + 'transcendental == complex & !algebraic', + 'real -> hermitian', + 'imaginary -> complex', + 'imaginary -> antihermitian', + 'extended_real -> commutative', + 'complex -> commutative', + 'complex -> finite', + + 'odd == integer & !even', + 'even == integer & !odd', + + 'real -> complex', + 'extended_real -> real | infinite', + 'real == extended_real & finite', + + 'extended_real == extended_negative | zero | extended_positive', + 'extended_negative == extended_nonpositive & extended_nonzero', + 'extended_positive == extended_nonnegative & extended_nonzero', + + 'extended_nonpositive == extended_real & !extended_positive', + 'extended_nonnegative == extended_real & !extended_negative', + + 'real == negative | zero | positive', + 'negative == nonpositive & nonzero', + 'positive == nonnegative & nonzero', + + 'nonpositive == real & !positive', + 'nonnegative == real & !negative', + + 'positive == extended_positive & finite', + 'negative == extended_negative & finite', + 'nonpositive == extended_nonpositive & finite', + 'nonnegative == extended_nonnegative & finite', + 'nonzero == extended_nonzero & finite', + + 'zero -> even & finite', + 'zero == extended_nonnegative & extended_nonpositive', + 'zero == nonnegative & nonpositive', + 'nonzero -> real', + + 'prime -> integer & positive', + 'composite -> integer & positive & !prime', + '!composite -> !positive | !even | prime', + + 'irrational == real & !rational', + + 'imaginary -> !extended_real', + + 'infinite == !finite', + 'noninteger == extended_real & !integer', + 'extended_nonzero == extended_real & !zero', + ]) + return _assume_rules + + +_assume_rules = _load_pre_generated_assumption_rules() +_assume_defined = _assume_rules.defined_facts.copy() +_assume_defined.add('polar') +_assume_defined = frozenset(_assume_defined) + + +def assumptions(expr, _check=None): + """return the T/F assumptions of ``expr``""" + n = sympify(expr) + if n.is_Symbol: + rv = n.assumptions0 # are any important ones missing? + if _check is not None: + rv = {k: rv[k] for k in set(rv) & set(_check)} + return rv + rv = {} + for k in _assume_defined if _check is None else _check: + v = getattr(n, 'is_{}'.format(k)) + if v is not None: + rv[k] = v + return rv + + +def common_assumptions(exprs, check=None): + """return those assumptions which have the same True or False + value for all the given expressions. + + Examples + ======== + + >>> from sympy.core import common_assumptions + >>> from sympy import oo, pi, sqrt + >>> common_assumptions([-4, 0, sqrt(2), 2, pi, oo]) + {'commutative': True, 'composite': False, + 'extended_real': True, 'imaginary': False, 'odd': False} + + By default, all assumptions are tested; pass an iterable of the + assumptions to limit those that are reported: + + >>> common_assumptions([0, 1, 2], ['positive', 'integer']) + {'integer': True} + """ + check = _assume_defined if check is None else set(check) + if not check or not exprs: + return {} + + # get all assumptions for each + assume = [assumptions(i, _check=check) for i in sympify(exprs)] + # focus on those of interest that are True + for i, e in enumerate(assume): + assume[i] = {k: e[k] for k in set(e) & check} + # what assumptions are in common? + common = set.intersection(*[set(i) for i in assume]) + # which ones hold the same value + a = assume[0] + return {k: a[k] for k in common if all(a[k] == b[k] + for b in assume)} + + +def failing_assumptions(expr, **assumptions): + """ + Return a dictionary containing assumptions with values not + matching those of the passed assumptions. + + Examples + ======== + + >>> from sympy import failing_assumptions, Symbol + + >>> x = Symbol('x', positive=True) + >>> y = Symbol('y') + >>> failing_assumptions(6*x + y, positive=True) + {'positive': None} + + >>> failing_assumptions(x**2 - 1, positive=True) + {'positive': None} + + If *expr* satisfies all of the assumptions, an empty dictionary is returned. + + >>> failing_assumptions(x**2, positive=True) + {} + + """ + expr = sympify(expr) + failed = {} + for k in assumptions: + test = getattr(expr, 'is_%s' % k, None) + if test is not assumptions[k]: + failed[k] = test + return failed # {} or {assumption: value != desired} + + +def check_assumptions(expr, against=None, **assume): + """ + Checks whether assumptions of ``expr`` match the T/F assumptions + given (or possessed by ``against``). True is returned if all + assumptions match; False is returned if there is a mismatch and + the assumption in ``expr`` is not None; else None is returned. + + Explanation + =========== + + *assume* is a dict of assumptions with True or False values + + Examples + ======== + + >>> from sympy import Symbol, pi, I, exp, check_assumptions + >>> check_assumptions(-5, integer=True) + True + >>> check_assumptions(pi, real=True, integer=False) + True + >>> check_assumptions(pi, negative=True) + False + >>> check_assumptions(exp(I*pi/7), real=False) + True + >>> x = Symbol('x', positive=True) + >>> check_assumptions(2*x + 1, positive=True) + True + >>> check_assumptions(-2*x - 5, positive=True) + False + + To check assumptions of *expr* against another variable or expression, + pass the expression or variable as ``against``. + + >>> check_assumptions(2*x + 1, x) + True + + To see if a number matches the assumptions of an expression, pass + the number as the first argument, else its specific assumptions + may not have a non-None value in the expression: + + >>> check_assumptions(x, 3) + >>> check_assumptions(3, x) + True + + ``None`` is returned if ``check_assumptions()`` could not conclude. + + >>> check_assumptions(2*x - 1, x) + + >>> z = Symbol('z') + >>> check_assumptions(z, real=True) + + See Also + ======== + + failing_assumptions + + """ + expr = sympify(expr) + if against is not None: + if assume: + raise ValueError( + 'Expecting `against` or `assume`, not both.') + assume = assumptions(against) + known = True + for k, v in assume.items(): + if v is None: + continue + e = getattr(expr, 'is_' + k, None) + if e is None: + known = None + elif v != e: + return False + return known + + +class StdFactKB(FactKB): + """A FactKB specialized for the built-in rules + + This is the only kind of FactKB that Basic objects should use. + """ + def __init__(self, facts=None): + super().__init__(_assume_rules) + # save a copy of the facts dict + if not facts: + self._generator = {} + elif not isinstance(facts, FactKB): + self._generator = facts.copy() + else: + self._generator = facts.generator + if facts: + self.deduce_all_facts(facts) + + def copy(self): + return self.__class__(self) + + @property + def generator(self): + return self._generator.copy() + + +def as_property(fact): + """Convert a fact name to the name of the corresponding property""" + return 'is_%s' % fact + + +def make_property(fact): + """Create the automagic property corresponding to a fact.""" + + def getit(self): + try: + return self._assumptions[fact] + except KeyError: + if self._assumptions is self.default_assumptions: + self._assumptions = self.default_assumptions.copy() + return _ask(fact, self) + + getit.func_name = as_property(fact) + return property(getit) + + +def _ask(fact, obj): + """ + Find the truth value for a property of an object. + + This function is called when a request is made to see what a fact + value is. + + For this we use several techniques: + + First, the fact-evaluation function is tried, if it exists (for + example _eval_is_integer). Then we try related facts. For example + + rational --> integer + + another example is joined rule: + + integer & !odd --> even + + so in the latter case if we are looking at what 'even' value is, + 'integer' and 'odd' facts will be asked. + + In all cases, when we settle on some fact value, its implications are + deduced, and the result is cached in ._assumptions. + """ + # FactKB which is dict-like and maps facts to their known values: + assumptions = obj._assumptions + + # A dict that maps facts to their handlers: + handler_map = obj._prop_handler + + # This is our queue of facts to check: + facts_to_check = [fact] + facts_queued = {fact} + + # Loop over the queue as it extends + for fact_i in facts_to_check: + + # If fact_i has already been determined then we don't need to rerun the + # handler. There is a potential race condition for multithreaded code + # though because it's possible that fact_i was checked in another + # thread. The main logic of the loop below would potentially skip + # checking assumptions[fact] in this case so we check it once after the + # loop to be sure. + if fact_i in assumptions: + continue + + # Now we call the associated handler for fact_i if it exists. + fact_i_value = None + handler_i = handler_map.get(fact_i) + if handler_i is not None: + fact_i_value = handler_i(obj) + + # If we get a new value for fact_i then we should update our knowledge + # of fact_i as well as any related facts that can be inferred using the + # inference rules connecting the fact_i and any other fact values that + # are already known. + if fact_i_value is not None: + assumptions.deduce_all_facts(((fact_i, fact_i_value),)) + + # Usually if assumptions[fact] is now not None then that is because of + # the call to deduce_all_facts above. The handler for fact_i returned + # True or False and knowing fact_i (which is equal to fact in the first + # iteration) implies knowing a value for fact. It is also possible + # though that independent code e.g. called indirectly by the handler or + # called in another thread in a multithreaded context might have + # resulted in assumptions[fact] being set. Either way we return it. + fact_value = assumptions.get(fact) + if fact_value is not None: + return fact_value + + # Extend the queue with other facts that might determine fact_i. Here + # we randomise the order of the facts that are checked. This should not + # lead to any non-determinism if all handlers are logically consistent + # with the inference rules for the facts. Non-deterministic assumptions + # queries can result from bugs in the handlers that are exposed by this + # call to shuffle. These are pushed to the back of the queue meaning + # that the inference graph is traversed in breadth-first order. + new_facts_to_check = list(_assume_rules.prereq[fact_i] - facts_queued) + shuffle(new_facts_to_check) + facts_to_check.extend(new_facts_to_check) + facts_queued.update(new_facts_to_check) + + # The above loop should be able to handle everything fine in a + # single-threaded context but in multithreaded code it is possible that + # this thread skipped computing a particular fact that was computed in + # another thread (due to the continue). In that case it is possible that + # fact was inferred and is now stored in the assumptions dict but it wasn't + # checked for in the body of the loop. This is an obscure case but to make + # sure we catch it we check once here at the end of the loop. + if fact in assumptions: + return assumptions[fact] + + # This query can not be answered. It's possible that e.g. another thread + # has already stored None for fact but assumptions._tell does not mind if + # we call _tell twice setting the same value. If this raises + # InconsistentAssumptions then it probably means that another thread + # attempted to compute this and got a value of True or False rather than + # None. In that case there must be a bug in at least one of the handlers. + # If the handlers are all deterministic and are consistent with the + # inference rules then the same value should be computed for fact in all + # threads. + assumptions._tell(fact, None) + return None + + +def _prepare_class_assumptions(cls): + """Precompute class level assumptions and generate handlers. + + This is called by Basic.__init_subclass__ each time a Basic subclass is + defined. + """ + + local_defs = {} + for k in _assume_defined: + attrname = as_property(k) + v = cls.__dict__.get(attrname, '') + if isinstance(v, (bool, int, type(None))): + if v is not None: + v = bool(v) + local_defs[k] = v + + defs = {} + for base in reversed(cls.__bases__): + assumptions = getattr(base, '_explicit_class_assumptions', None) + if assumptions is not None: + defs.update(assumptions) + defs.update(local_defs) + + cls._explicit_class_assumptions = defs + cls.default_assumptions = StdFactKB(defs) + + cls._prop_handler = {} + for k in _assume_defined: + eval_is_meth = getattr(cls, '_eval_is_%s' % k, None) + if eval_is_meth is not None: + cls._prop_handler[k] = eval_is_meth + + # Put definite results directly into the class dict, for speed + for k, v in cls.default_assumptions.items(): + setattr(cls, as_property(k), v) + + # protection e.g. for Integer.is_even=F <- (Rational.is_integer=F) + derived_from_bases = set() + for base in cls.__bases__: + default_assumptions = getattr(base, 'default_assumptions', None) + # is an assumption-aware class + if default_assumptions is not None: + derived_from_bases.update(default_assumptions) + + for fact in derived_from_bases - set(cls.default_assumptions): + pname = as_property(fact) + if pname not in cls.__dict__: + setattr(cls, pname, make_property(fact)) + + # Finally, add any missing automagic property (e.g. for Basic) + for fact in _assume_defined: + pname = as_property(fact) + if not hasattr(cls, pname): + setattr(cls, pname, make_property(fact)) + + +# XXX: ManagedProperties used to be the metaclass for Basic but now Basic does +# not use a metaclass. We leave this here for backwards compatibility for now +# in case someone has been using the ManagedProperties class in downstream +# code. The reason that it might have been used is that when subclassing a +# class and wanting to use a metaclass the metaclass must be a subclass of the +# metaclass for the class that is being subclassed. Anyone wanting to subclass +# Basic and use a metaclass in their subclass would have needed to subclass +# ManagedProperties. Here ManagedProperties is not the metaclass for Basic any +# more but it should still be usable as a metaclass for Basic subclasses since +# it is a subclass of type which is now the metaclass for Basic. +class ManagedProperties(type): + def __init__(cls, *args, **kwargs): + msg = ("The ManagedProperties metaclass. " + "Basic does not use metaclasses any more") + sympy_deprecation_warning(msg, + deprecated_since_version="1.12", + active_deprecations_target='managedproperties') + + # Here we still call this function in case someone is using + # ManagedProperties for something that is not a Basic subclass. For + # Basic subclasses this function is now called by __init_subclass__ and + # so this metaclass is not needed any more. + _prepare_class_assumptions(cls) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/assumptions_generated.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/assumptions_generated.py new file mode 100644 index 0000000000000000000000000000000000000000..b4b2597a72b500155370db385b58e61f0f951984 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/assumptions_generated.py @@ -0,0 +1,1615 @@ +""" +Do NOT manually edit this file. +Instead, run ./bin/ask_update.py. +""" + +defined_facts = [ + 'algebraic', + 'antihermitian', + 'commutative', + 'complex', + 'composite', + 'even', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'negative', + 'noninteger', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'transcendental', + 'zero', +] # defined_facts + + +full_implications = dict( [ + # Implications of algebraic = True: + (('algebraic', True), set( ( + ('commutative', True), + ('complex', True), + ('finite', True), + ('infinite', False), + ('transcendental', False), + ) ), + ), + # Implications of algebraic = False: + (('algebraic', False), set( ( + ('composite', False), + ('even', False), + ('integer', False), + ('odd', False), + ('prime', False), + ('rational', False), + ('zero', False), + ) ), + ), + # Implications of antihermitian = True: + (('antihermitian', True), set( ( + ) ), + ), + # Implications of antihermitian = False: + (('antihermitian', False), set( ( + ('imaginary', False), + ) ), + ), + # Implications of commutative = True: + (('commutative', True), set( ( + ) ), + ), + # Implications of commutative = False: + (('commutative', False), set( ( + ('algebraic', False), + ('complex', False), + ('composite', False), + ('even', False), + ('extended_negative', False), + ('extended_nonnegative', False), + ('extended_nonpositive', False), + ('extended_nonzero', False), + ('extended_positive', False), + ('extended_real', False), + ('imaginary', False), + ('integer', False), + ('irrational', False), + ('negative', False), + ('noninteger', False), + ('nonnegative', False), + ('nonpositive', False), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', False), + ('real', False), + ('transcendental', False), + ('zero', False), + ) ), + ), + # Implications of complex = True: + (('complex', True), set( ( + ('commutative', True), + ('finite', True), + ('infinite', False), + ) ), + ), + # Implications of complex = False: + (('complex', False), set( ( + ('algebraic', False), + ('composite', False), + ('even', False), + ('imaginary', False), + ('integer', False), + ('irrational', False), + ('negative', False), + ('nonnegative', False), + ('nonpositive', False), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', False), + ('real', False), + ('transcendental', False), + ('zero', False), + ) ), + ), + # Implications of composite = True: + (('composite', True), set( ( + ('algebraic', True), + ('commutative', True), + ('complex', True), + ('extended_negative', False), + ('extended_nonnegative', True), + ('extended_nonpositive', False), + ('extended_nonzero', True), + ('extended_positive', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('integer', True), + ('irrational', False), + ('negative', False), + ('noninteger', False), + ('nonnegative', True), + ('nonpositive', False), + ('nonzero', True), + ('positive', True), + ('prime', False), + ('rational', True), + ('real', True), + ('transcendental', False), + ('zero', False), + ) ), + ), + # Implications of composite = False: + (('composite', False), set( ( + ) ), + ), + # Implications of even = True: + (('even', True), set( ( + ('algebraic', True), + ('commutative', True), + ('complex', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('integer', True), + ('irrational', False), + ('noninteger', False), + ('odd', False), + ('rational', True), + ('real', True), + ('transcendental', False), + ) ), + ), + # Implications of even = False: + (('even', False), set( ( + ('zero', False), + ) ), + ), + # Implications of extended_negative = True: + (('extended_negative', True), set( ( + ('commutative', True), + ('composite', False), + ('extended_nonnegative', False), + ('extended_nonpositive', True), + ('extended_nonzero', True), + ('extended_positive', False), + ('extended_real', True), + ('imaginary', False), + ('nonnegative', False), + ('positive', False), + ('prime', False), + ('zero', False), + ) ), + ), + # Implications of extended_negative = False: + (('extended_negative', False), set( ( + ('negative', False), + ) ), + ), + # Implications of extended_nonnegative = True: + (('extended_nonnegative', True), set( ( + ('commutative', True), + ('extended_negative', False), + ('extended_real', True), + ('imaginary', False), + ('negative', False), + ) ), + ), + # Implications of extended_nonnegative = False: + (('extended_nonnegative', False), set( ( + ('composite', False), + ('extended_positive', False), + ('nonnegative', False), + ('positive', False), + ('prime', False), + ('zero', False), + ) ), + ), + # Implications of extended_nonpositive = True: + (('extended_nonpositive', True), set( ( + ('commutative', True), + ('composite', False), + ('extended_positive', False), + ('extended_real', True), + ('imaginary', False), + ('positive', False), + ('prime', False), + ) ), + ), + # Implications of extended_nonpositive = False: + (('extended_nonpositive', False), set( ( + ('extended_negative', False), + ('negative', False), + ('nonpositive', False), + ('zero', False), + ) ), + ), + # Implications of extended_nonzero = True: + (('extended_nonzero', True), set( ( + ('commutative', True), + ('extended_real', True), + ('imaginary', False), + ('zero', False), + ) ), + ), + # Implications of extended_nonzero = False: + (('extended_nonzero', False), set( ( + ('composite', False), + ('extended_negative', False), + ('extended_positive', False), + ('negative', False), + ('nonzero', False), + ('positive', False), + ('prime', False), + ) ), + ), + # Implications of extended_positive = True: + (('extended_positive', True), set( ( + ('commutative', True), + ('extended_negative', False), + ('extended_nonnegative', True), + ('extended_nonpositive', False), + ('extended_nonzero', True), + ('extended_real', True), + ('imaginary', False), + ('negative', False), + ('nonpositive', False), + ('zero', False), + ) ), + ), + # Implications of extended_positive = False: + (('extended_positive', False), set( ( + ('composite', False), + ('positive', False), + ('prime', False), + ) ), + ), + # Implications of extended_real = True: + (('extended_real', True), set( ( + ('commutative', True), + ('imaginary', False), + ) ), + ), + # Implications of extended_real = False: + (('extended_real', False), set( ( + ('composite', False), + ('even', False), + ('extended_negative', False), + ('extended_nonnegative', False), + ('extended_nonpositive', False), + ('extended_nonzero', False), + ('extended_positive', False), + ('integer', False), + ('irrational', False), + ('negative', False), + ('noninteger', False), + ('nonnegative', False), + ('nonpositive', False), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', False), + ('real', False), + ('zero', False), + ) ), + ), + # Implications of finite = True: + (('finite', True), set( ( + ('infinite', False), + ) ), + ), + # Implications of finite = False: + (('finite', False), set( ( + ('algebraic', False), + ('complex', False), + ('composite', False), + ('even', False), + ('imaginary', False), + ('infinite', True), + ('integer', False), + ('irrational', False), + ('negative', False), + ('nonnegative', False), + ('nonpositive', False), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', False), + ('real', False), + ('transcendental', False), + ('zero', False), + ) ), + ), + # Implications of hermitian = True: + (('hermitian', True), set( ( + ) ), + ), + # Implications of hermitian = False: + (('hermitian', False), set( ( + ('composite', False), + ('even', False), + ('integer', False), + ('irrational', False), + ('negative', False), + ('nonnegative', False), + ('nonpositive', False), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', False), + ('real', False), + ('zero', False), + ) ), + ), + # Implications of imaginary = True: + (('imaginary', True), set( ( + ('antihermitian', True), + ('commutative', True), + ('complex', True), + ('composite', False), + ('even', False), + ('extended_negative', False), + ('extended_nonnegative', False), + ('extended_nonpositive', False), + ('extended_nonzero', False), + ('extended_positive', False), + ('extended_real', False), + ('finite', True), + ('infinite', False), + ('integer', False), + ('irrational', False), + ('negative', False), + ('noninteger', False), + ('nonnegative', False), + ('nonpositive', False), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', False), + ('real', False), + ('zero', False), + ) ), + ), + # Implications of imaginary = False: + (('imaginary', False), set( ( + ) ), + ), + # Implications of infinite = True: + (('infinite', True), set( ( + ('algebraic', False), + ('complex', False), + ('composite', False), + ('even', False), + ('finite', False), + ('imaginary', False), + ('integer', False), + ('irrational', False), + ('negative', False), + ('nonnegative', False), + ('nonpositive', False), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', False), + ('real', False), + ('transcendental', False), + ('zero', False), + ) ), + ), + # Implications of infinite = False: + (('infinite', False), set( ( + ('finite', True), + ) ), + ), + # Implications of integer = True: + (('integer', True), set( ( + ('algebraic', True), + ('commutative', True), + ('complex', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('irrational', False), + ('noninteger', False), + ('rational', True), + ('real', True), + ('transcendental', False), + ) ), + ), + # Implications of integer = False: + (('integer', False), set( ( + ('composite', False), + ('even', False), + ('odd', False), + ('prime', False), + ('zero', False), + ) ), + ), + # Implications of irrational = True: + (('irrational', True), set( ( + ('commutative', True), + ('complex', True), + ('composite', False), + ('even', False), + ('extended_nonzero', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('integer', False), + ('noninteger', True), + ('nonzero', True), + ('odd', False), + ('prime', False), + ('rational', False), + ('real', True), + ('zero', False), + ) ), + ), + # Implications of irrational = False: + (('irrational', False), set( ( + ) ), + ), + # Implications of negative = True: + (('negative', True), set( ( + ('commutative', True), + ('complex', True), + ('composite', False), + ('extended_negative', True), + ('extended_nonnegative', False), + ('extended_nonpositive', True), + ('extended_nonzero', True), + ('extended_positive', False), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('nonnegative', False), + ('nonpositive', True), + ('nonzero', True), + ('positive', False), + ('prime', False), + ('real', True), + ('zero', False), + ) ), + ), + # Implications of negative = False: + (('negative', False), set( ( + ) ), + ), + # Implications of noninteger = True: + (('noninteger', True), set( ( + ('commutative', True), + ('composite', False), + ('even', False), + ('extended_nonzero', True), + ('extended_real', True), + ('imaginary', False), + ('integer', False), + ('odd', False), + ('prime', False), + ('zero', False), + ) ), + ), + # Implications of noninteger = False: + (('noninteger', False), set( ( + ) ), + ), + # Implications of nonnegative = True: + (('nonnegative', True), set( ( + ('commutative', True), + ('complex', True), + ('extended_negative', False), + ('extended_nonnegative', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('negative', False), + ('real', True), + ) ), + ), + # Implications of nonnegative = False: + (('nonnegative', False), set( ( + ('composite', False), + ('positive', False), + ('prime', False), + ('zero', False), + ) ), + ), + # Implications of nonpositive = True: + (('nonpositive', True), set( ( + ('commutative', True), + ('complex', True), + ('composite', False), + ('extended_nonpositive', True), + ('extended_positive', False), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('positive', False), + ('prime', False), + ('real', True), + ) ), + ), + # Implications of nonpositive = False: + (('nonpositive', False), set( ( + ('negative', False), + ('zero', False), + ) ), + ), + # Implications of nonzero = True: + (('nonzero', True), set( ( + ('commutative', True), + ('complex', True), + ('extended_nonzero', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('real', True), + ('zero', False), + ) ), + ), + # Implications of nonzero = False: + (('nonzero', False), set( ( + ('composite', False), + ('negative', False), + ('positive', False), + ('prime', False), + ) ), + ), + # Implications of odd = True: + (('odd', True), set( ( + ('algebraic', True), + ('commutative', True), + ('complex', True), + ('even', False), + ('extended_nonzero', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('integer', True), + ('irrational', False), + ('noninteger', False), + ('nonzero', True), + ('rational', True), + ('real', True), + ('transcendental', False), + ('zero', False), + ) ), + ), + # Implications of odd = False: + (('odd', False), set( ( + ) ), + ), + # Implications of positive = True: + (('positive', True), set( ( + ('commutative', True), + ('complex', True), + ('extended_negative', False), + ('extended_nonnegative', True), + ('extended_nonpositive', False), + ('extended_nonzero', True), + ('extended_positive', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('negative', False), + ('nonnegative', True), + ('nonpositive', False), + ('nonzero', True), + ('real', True), + ('zero', False), + ) ), + ), + # Implications of positive = False: + (('positive', False), set( ( + ('composite', False), + ('prime', False), + ) ), + ), + # Implications of prime = True: + (('prime', True), set( ( + ('algebraic', True), + ('commutative', True), + ('complex', True), + ('composite', False), + ('extended_negative', False), + ('extended_nonnegative', True), + ('extended_nonpositive', False), + ('extended_nonzero', True), + ('extended_positive', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('integer', True), + ('irrational', False), + ('negative', False), + ('noninteger', False), + ('nonnegative', True), + ('nonpositive', False), + ('nonzero', True), + ('positive', True), + ('rational', True), + ('real', True), + ('transcendental', False), + ('zero', False), + ) ), + ), + # Implications of prime = False: + (('prime', False), set( ( + ) ), + ), + # Implications of rational = True: + (('rational', True), set( ( + ('algebraic', True), + ('commutative', True), + ('complex', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('irrational', False), + ('real', True), + ('transcendental', False), + ) ), + ), + # Implications of rational = False: + (('rational', False), set( ( + ('composite', False), + ('even', False), + ('integer', False), + ('odd', False), + ('prime', False), + ('zero', False), + ) ), + ), + # Implications of real = True: + (('real', True), set( ( + ('commutative', True), + ('complex', True), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ) ), + ), + # Implications of real = False: + (('real', False), set( ( + ('composite', False), + ('even', False), + ('integer', False), + ('irrational', False), + ('negative', False), + ('nonnegative', False), + ('nonpositive', False), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', False), + ('zero', False), + ) ), + ), + # Implications of transcendental = True: + (('transcendental', True), set( ( + ('algebraic', False), + ('commutative', True), + ('complex', True), + ('composite', False), + ('even', False), + ('finite', True), + ('infinite', False), + ('integer', False), + ('odd', False), + ('prime', False), + ('rational', False), + ('zero', False), + ) ), + ), + # Implications of transcendental = False: + (('transcendental', False), set( ( + ) ), + ), + # Implications of zero = True: + (('zero', True), set( ( + ('algebraic', True), + ('commutative', True), + ('complex', True), + ('composite', False), + ('even', True), + ('extended_negative', False), + ('extended_nonnegative', True), + ('extended_nonpositive', True), + ('extended_nonzero', False), + ('extended_positive', False), + ('extended_real', True), + ('finite', True), + ('hermitian', True), + ('imaginary', False), + ('infinite', False), + ('integer', True), + ('irrational', False), + ('negative', False), + ('noninteger', False), + ('nonnegative', True), + ('nonpositive', True), + ('nonzero', False), + ('odd', False), + ('positive', False), + ('prime', False), + ('rational', True), + ('real', True), + ('transcendental', False), + ) ), + ), + # Implications of zero = False: + (('zero', False), set( ( + ) ), + ), + ] ) # full_implications + + +prereq = { + + # facts that could determine the value of algebraic + 'algebraic': { + 'commutative', + 'complex', + 'composite', + 'even', + 'finite', + 'infinite', + 'integer', + 'odd', + 'prime', + 'rational', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of antihermitian + 'antihermitian': { + 'imaginary', + }, + + # facts that could determine the value of commutative + 'commutative': { + 'algebraic', + 'complex', + 'composite', + 'even', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'imaginary', + 'integer', + 'irrational', + 'negative', + 'noninteger', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of complex + 'complex': { + 'algebraic', + 'commutative', + 'composite', + 'even', + 'finite', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'negative', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of composite + 'composite': { + 'algebraic', + 'commutative', + 'complex', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'negative', + 'noninteger', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'positive', + 'prime', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of even + 'even': { + 'algebraic', + 'commutative', + 'complex', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'noninteger', + 'odd', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of extended_negative + 'extended_negative': { + 'commutative', + 'composite', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'imaginary', + 'negative', + 'nonnegative', + 'positive', + 'prime', + 'zero', + }, + + # facts that could determine the value of extended_nonnegative + 'extended_nonnegative': { + 'commutative', + 'composite', + 'extended_negative', + 'extended_positive', + 'extended_real', + 'imaginary', + 'negative', + 'nonnegative', + 'positive', + 'prime', + 'zero', + }, + + # facts that could determine the value of extended_nonpositive + 'extended_nonpositive': { + 'commutative', + 'composite', + 'extended_negative', + 'extended_positive', + 'extended_real', + 'imaginary', + 'negative', + 'nonpositive', + 'positive', + 'prime', + 'zero', + }, + + # facts that could determine the value of extended_nonzero + 'extended_nonzero': { + 'commutative', + 'composite', + 'extended_negative', + 'extended_positive', + 'extended_real', + 'imaginary', + 'irrational', + 'negative', + 'noninteger', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'zero', + }, + + # facts that could determine the value of extended_positive + 'extended_positive': { + 'commutative', + 'composite', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_real', + 'imaginary', + 'negative', + 'nonpositive', + 'positive', + 'prime', + 'zero', + }, + + # facts that could determine the value of extended_real + 'extended_real': { + 'commutative', + 'composite', + 'even', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'imaginary', + 'integer', + 'irrational', + 'negative', + 'noninteger', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'zero', + }, + + # facts that could determine the value of finite + 'finite': { + 'algebraic', + 'complex', + 'composite', + 'even', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'negative', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of hermitian + 'hermitian': { + 'composite', + 'even', + 'integer', + 'irrational', + 'negative', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'zero', + }, + + # facts that could determine the value of imaginary + 'imaginary': { + 'antihermitian', + 'commutative', + 'complex', + 'composite', + 'even', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'finite', + 'infinite', + 'integer', + 'irrational', + 'negative', + 'noninteger', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'zero', + }, + + # facts that could determine the value of infinite + 'infinite': { + 'algebraic', + 'complex', + 'composite', + 'even', + 'finite', + 'imaginary', + 'integer', + 'irrational', + 'negative', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of integer + 'integer': { + 'algebraic', + 'commutative', + 'complex', + 'composite', + 'even', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'irrational', + 'noninteger', + 'odd', + 'prime', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of irrational + 'irrational': { + 'commutative', + 'complex', + 'composite', + 'even', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'odd', + 'prime', + 'rational', + 'real', + 'zero', + }, + + # facts that could determine the value of negative + 'negative': { + 'commutative', + 'complex', + 'composite', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'positive', + 'prime', + 'real', + 'zero', + }, + + # facts that could determine the value of noninteger + 'noninteger': { + 'commutative', + 'composite', + 'even', + 'extended_real', + 'imaginary', + 'integer', + 'irrational', + 'odd', + 'prime', + 'zero', + }, + + # facts that could determine the value of nonnegative + 'nonnegative': { + 'commutative', + 'complex', + 'composite', + 'extended_negative', + 'extended_nonnegative', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'negative', + 'positive', + 'prime', + 'real', + 'zero', + }, + + # facts that could determine the value of nonpositive + 'nonpositive': { + 'commutative', + 'complex', + 'composite', + 'extended_nonpositive', + 'extended_positive', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'negative', + 'positive', + 'prime', + 'real', + 'zero', + }, + + # facts that could determine the value of nonzero + 'nonzero': { + 'commutative', + 'complex', + 'composite', + 'extended_nonzero', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'irrational', + 'negative', + 'odd', + 'positive', + 'prime', + 'real', + 'zero', + }, + + # facts that could determine the value of odd + 'odd': { + 'algebraic', + 'commutative', + 'complex', + 'even', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'noninteger', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of positive + 'positive': { + 'commutative', + 'complex', + 'composite', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'negative', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'prime', + 'real', + 'zero', + }, + + # facts that could determine the value of prime + 'prime': { + 'algebraic', + 'commutative', + 'complex', + 'composite', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'negative', + 'noninteger', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'positive', + 'rational', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of rational + 'rational': { + 'algebraic', + 'commutative', + 'complex', + 'composite', + 'even', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'odd', + 'prime', + 'real', + 'transcendental', + 'zero', + }, + + # facts that could determine the value of real + 'real': { + 'commutative', + 'complex', + 'composite', + 'even', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'negative', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'zero', + }, + + # facts that could determine the value of transcendental + 'transcendental': { + 'algebraic', + 'commutative', + 'complex', + 'composite', + 'even', + 'finite', + 'infinite', + 'integer', + 'odd', + 'prime', + 'rational', + 'zero', + }, + + # facts that could determine the value of zero + 'zero': { + 'algebraic', + 'commutative', + 'complex', + 'composite', + 'even', + 'extended_negative', + 'extended_nonnegative', + 'extended_nonpositive', + 'extended_nonzero', + 'extended_positive', + 'extended_real', + 'finite', + 'hermitian', + 'imaginary', + 'infinite', + 'integer', + 'irrational', + 'negative', + 'noninteger', + 'nonnegative', + 'nonpositive', + 'nonzero', + 'odd', + 'positive', + 'prime', + 'rational', + 'real', + 'transcendental', + }, + +} # prereq + + +# Note: the order of the beta rules is used in the beta_triggers +beta_rules = [ + + # Rules implying composite = True + ({('even', True), ('positive', True), ('prime', False)}, + ('composite', True)), + + # Rules implying even = False + ({('composite', False), ('positive', True), ('prime', False)}, + ('even', False)), + + # Rules implying even = True + ({('integer', True), ('odd', False)}, + ('even', True)), + + # Rules implying extended_negative = True + ({('extended_positive', False), ('extended_real', True), ('zero', False)}, + ('extended_negative', True)), + ({('extended_nonpositive', True), ('extended_nonzero', True)}, + ('extended_negative', True)), + + # Rules implying extended_nonnegative = True + ({('extended_negative', False), ('extended_real', True)}, + ('extended_nonnegative', True)), + + # Rules implying extended_nonpositive = True + ({('extended_positive', False), ('extended_real', True)}, + ('extended_nonpositive', True)), + + # Rules implying extended_nonzero = True + ({('extended_real', True), ('zero', False)}, + ('extended_nonzero', True)), + + # Rules implying extended_positive = True + ({('extended_negative', False), ('extended_real', True), ('zero', False)}, + ('extended_positive', True)), + ({('extended_nonnegative', True), ('extended_nonzero', True)}, + ('extended_positive', True)), + + # Rules implying extended_real = False + ({('infinite', False), ('real', False)}, + ('extended_real', False)), + ({('extended_negative', False), ('extended_positive', False), ('zero', False)}, + ('extended_real', False)), + + # Rules implying infinite = True + ({('extended_real', True), ('real', False)}, + ('infinite', True)), + + # Rules implying irrational = True + ({('rational', False), ('real', True)}, + ('irrational', True)), + + # Rules implying negative = True + ({('positive', False), ('real', True), ('zero', False)}, + ('negative', True)), + ({('nonpositive', True), ('nonzero', True)}, + ('negative', True)), + ({('extended_negative', True), ('finite', True)}, + ('negative', True)), + + # Rules implying noninteger = True + ({('extended_real', True), ('integer', False)}, + ('noninteger', True)), + + # Rules implying nonnegative = True + ({('negative', False), ('real', True)}, + ('nonnegative', True)), + ({('extended_nonnegative', True), ('finite', True)}, + ('nonnegative', True)), + + # Rules implying nonpositive = True + ({('positive', False), ('real', True)}, + ('nonpositive', True)), + ({('extended_nonpositive', True), ('finite', True)}, + ('nonpositive', True)), + + # Rules implying nonzero = True + ({('extended_nonzero', True), ('finite', True)}, + ('nonzero', True)), + + # Rules implying odd = True + ({('even', False), ('integer', True)}, + ('odd', True)), + + # Rules implying positive = False + ({('composite', False), ('even', True), ('prime', False)}, + ('positive', False)), + + # Rules implying positive = True + ({('negative', False), ('real', True), ('zero', False)}, + ('positive', True)), + ({('nonnegative', True), ('nonzero', True)}, + ('positive', True)), + ({('extended_positive', True), ('finite', True)}, + ('positive', True)), + + # Rules implying prime = True + ({('composite', False), ('even', True), ('positive', True)}, + ('prime', True)), + + # Rules implying real = False + ({('negative', False), ('positive', False), ('zero', False)}, + ('real', False)), + + # Rules implying real = True + ({('extended_real', True), ('infinite', False)}, + ('real', True)), + ({('extended_real', True), ('finite', True)}, + ('real', True)), + + # Rules implying transcendental = True + ({('algebraic', False), ('complex', True)}, + ('transcendental', True)), + + # Rules implying zero = True + ({('extended_negative', False), ('extended_positive', False), ('extended_real', True)}, + ('zero', True)), + ({('negative', False), ('positive', False), ('real', True)}, + ('zero', True)), + ({('extended_nonnegative', True), ('extended_nonpositive', True)}, + ('zero', True)), + ({('nonnegative', True), ('nonpositive', True)}, + ('zero', True)), + +] # beta_rules +beta_triggers = { + ('algebraic', False): [32, 11, 3, 8, 29, 14, 25, 13, 17, 7], + ('algebraic', True): [10, 30, 31, 27, 16, 21, 19, 22], + ('antihermitian', False): [], + ('commutative', False): [], + ('complex', False): [10, 12, 11, 3, 8, 17, 7], + ('complex', True): [32, 10, 30, 31, 27, 16, 21, 19, 22], + ('composite', False): [1, 28, 24], + ('composite', True): [23, 2], + ('even', False): [23, 11, 3, 8, 29, 14, 25, 7], + ('even', True): [3, 33, 8, 6, 5, 14, 34, 25, 20, 18, 27, 16, 21, 19, 22, 0, 28, 24, 7], + ('extended_negative', False): [11, 33, 8, 5, 29, 34, 25, 18], + ('extended_negative', True): [30, 12, 31, 29, 14, 20, 16, 21, 22, 17], + ('extended_nonnegative', False): [11, 3, 6, 29, 14, 20, 7], + ('extended_nonnegative', True): [30, 12, 31, 33, 8, 9, 6, 29, 34, 25, 18, 19, 35, 17, 7], + ('extended_nonpositive', False): [11, 8, 5, 29, 25, 18, 7], + ('extended_nonpositive', True): [30, 12, 31, 3, 33, 4, 5, 29, 14, 34, 20, 21, 35, 17, 7], + ('extended_nonzero', False): [11, 33, 6, 5, 29, 34, 20, 18], + ('extended_nonzero', True): [30, 12, 31, 3, 8, 4, 9, 6, 5, 29, 14, 25, 22, 17], + ('extended_positive', False): [11, 3, 33, 6, 29, 14, 34, 20], + ('extended_positive', True): [30, 12, 31, 29, 25, 18, 27, 19, 22, 17], + ('extended_real', False): [], + ('extended_real', True): [30, 12, 31, 3, 33, 8, 6, 5, 17, 7], + ('finite', False): [11, 3, 8, 17, 7], + ('finite', True): [10, 30, 31, 27, 16, 21, 19, 22], + ('hermitian', False): [10, 12, 11, 3, 8, 17, 7], + ('imaginary', True): [32], + ('infinite', False): [10, 30, 31, 27, 16, 21, 19, 22], + ('infinite', True): [11, 3, 8, 17, 7], + ('integer', False): [11, 3, 8, 29, 14, 25, 17, 7], + ('integer', True): [23, 2, 3, 33, 8, 6, 5, 14, 34, 25, 20, 18, 27, 16, 21, 19, 22, 7], + ('irrational', True): [32, 3, 8, 4, 9, 6, 5, 14, 25, 15, 26, 20, 18, 27, 16, 21, 19], + ('negative', False): [29, 34, 25, 18], + ('negative', True): [32, 13, 17], + ('noninteger', True): [30, 12, 31, 3, 8, 4, 9, 6, 5, 29, 14, 25, 22], + ('nonnegative', False): [11, 3, 8, 29, 14, 20, 7], + ('nonnegative', True): [32, 33, 8, 9, 6, 34, 25, 26, 20, 27, 21, 22, 35, 36, 13, 17, 7], + ('nonpositive', False): [11, 3, 8, 29, 25, 18, 7], + ('nonpositive', True): [32, 3, 33, 4, 5, 14, 34, 15, 18, 16, 19, 22, 35, 36, 13, 17, 7], + ('nonzero', False): [29, 34, 20, 18], + ('nonzero', True): [32, 3, 8, 4, 9, 6, 5, 14, 25, 15, 26, 20, 18, 27, 16, 21, 19, 13, 17], + ('odd', False): [2], + ('odd', True): [3, 8, 4, 9, 6, 5, 14, 25, 15, 26, 20, 18, 27, 16, 21, 19], + ('positive', False): [29, 14, 34, 20], + ('positive', True): [32, 0, 1, 28, 13, 17], + ('prime', False): [0, 1, 24], + ('prime', True): [23, 2], + ('rational', False): [11, 3, 8, 29, 14, 25, 13, 17, 7], + ('rational', True): [3, 33, 8, 6, 5, 14, 34, 25, 20, 18, 27, 16, 21, 19, 22, 17, 7], + ('real', False): [10, 12, 11, 3, 8, 17, 7], + ('real', True): [32, 3, 33, 8, 6, 5, 14, 34, 25, 20, 18, 27, 16, 21, 19, 22, 13, 17, 7], + ('transcendental', True): [10, 30, 31, 11, 3, 8, 29, 14, 25, 27, 16, 21, 19, 22, 13, 17, 7], + ('zero', False): [11, 3, 8, 29, 14, 25, 7], + ('zero', True): [], +} # beta_triggers + + +generated_assumptions = {'defined_facts': defined_facts, 'full_implications': full_implications, + 'prereq': prereq, 'beta_rules': beta_rules, 'beta_triggers': beta_triggers} diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/backend.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/backend.py new file mode 100644 index 0000000000000000000000000000000000000000..34a4e05a4a4ac50d0830960cb324871a20e9a12d --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/backend.py @@ -0,0 +1,120 @@ +import os +USE_SYMENGINE = os.getenv('USE_SYMENGINE', '0') +USE_SYMENGINE = USE_SYMENGINE.lower() in ('1', 't', 'true') # type: ignore + +if USE_SYMENGINE: + from symengine import (Symbol, Integer, sympify as sympify_symengine, S, + SympifyError, exp, log, gamma, sqrt, I, E, pi, Matrix, + sin, cos, tan, cot, csc, sec, asin, acos, atan, acot, acsc, asec, + sinh, cosh, tanh, coth, asinh, acosh, atanh, acoth, + lambdify, symarray, diff, zeros, eye, diag, ones, + expand, Function, symbols, var, Add, Mul, Derivative, + ImmutableMatrix, MatrixBase, Rational, Basic) + from symengine.lib.symengine_wrapper import gcd as igcd + from symengine import AppliedUndef + + def sympify(a, *, strict=False): + """ + Notes + ===== + + SymEngine's ``sympify`` does not accept keyword arguments and is + therefore not compatible with SymPy's ``sympify`` with ``strict=True`` + (which ensures that only the types for which an explicit conversion has + been defined are converted). This wrapper adds an additional parameter + ``strict`` (with default ``False``) that will raise a ``SympifyError`` + if ``strict=True`` and the argument passed to the parameter ``a`` is a + string. + + See Also + ======== + + sympify: Converts an arbitrary expression to a type that can be used + inside SymPy. + + """ + # The parameter ``a`` is used for this function to keep compatibility + # with the SymEngine docstring. + if strict and isinstance(a, str): + raise SympifyError(a) + return sympify_symengine(a) + + # Keep the SymEngine docstring and append the additional "Notes" and "See + # Also" sections. Replacement of spaces is required to correctly format the + # indentation of the combined docstring. + sympify.__doc__ = ( + sympify_symengine.__doc__ + + sympify.__doc__.replace(' ', ' ') # type: ignore + ) +else: + from sympy.core.add import Add + from sympy.core.basic import Basic + from sympy.core.function import (diff, Function, AppliedUndef, + expand, Derivative) + from sympy.core.mul import Mul + from sympy.core.intfunc import igcd + from sympy.core.numbers import pi, I, Integer, Rational, E + from sympy.core.singleton import S + from sympy.core.symbol import Symbol, var, symbols + from sympy.core.sympify import SympifyError, sympify + from sympy.functions.elementary.exponential import log, exp + from sympy.functions.elementary.hyperbolic import (coth, sinh, + acosh, acoth, tanh, asinh, atanh, cosh) + from sympy.functions.elementary.miscellaneous import sqrt + from sympy.functions.elementary.trigonometric import (csc, + asec, cos, atan, sec, acot, asin, tan, sin, cot, acsc, acos) + from sympy.functions.special.gamma_functions import gamma + from sympy.matrices.dense import (eye, zeros, diag, Matrix, + ones, symarray) + from sympy.matrices.immutable import ImmutableMatrix + from sympy.matrices.matrixbase import MatrixBase + from sympy.utilities.lambdify import lambdify + + +# +# XXX: Handling of immutable and mutable matrices in SymEngine is inconsistent +# with SymPy's matrix classes in at least SymEngine version 0.7.0. Until that +# is fixed the function below is needed for consistent behaviour when +# attempting to simplify a matrix. +# +# Expected behaviour of a SymPy mutable/immutable matrix .simplify() method: +# +# Matrix.simplify() : works in place, returns None +# ImmutableMatrix.simplify() : returns a simplified copy +# +# In SymEngine both mutable and immutable matrices simplify in place and return +# None. This is inconsistent with the matrix being "immutable" and also the +# returned None leads to problems in the mechanics module. +# +# The simplify function should not be used because simplify(M) sympifies the +# matrix M and the SymEngine matrices all sympify to SymPy matrices. If we want +# to work with SymEngine matrices then we need to use their .simplify() method +# but that method does not work correctly with immutable matrices. +# +# The _simplify_matrix function can be removed when the SymEngine bug is fixed. +# Since this should be a temporary problem we do not make this function part of +# the public API. +# +# SymEngine issue: https://github.com/symengine/symengine.py/issues/363 +# + +def _simplify_matrix(M): + """Return a simplified copy of the matrix M""" + if not isinstance(M, (Matrix, ImmutableMatrix)): + raise TypeError("The matrix M must be an instance of Matrix or ImmutableMatrix") + Mnew = M.as_mutable() # makes a copy if mutable + Mnew.simplify() + if isinstance(M, ImmutableMatrix): + Mnew = Mnew.as_immutable() + return Mnew + + +__all__ = [ + 'Symbol', 'Integer', 'sympify', 'S', 'SympifyError', 'exp', 'log', + 'gamma', 'sqrt', 'I', 'E', 'pi', 'Matrix', 'sin', 'cos', 'tan', 'cot', + 'csc', 'sec', 'asin', 'acos', 'atan', 'acot', 'acsc', 'asec', 'sinh', + 'cosh', 'tanh', 'coth', 'asinh', 'acosh', 'atanh', 'acoth', 'lambdify', + 'symarray', 'diff', 'zeros', 'eye', 'diag', 'ones', 'expand', 'Function', + 'symbols', 'var', 'Add', 'Mul', 'Derivative', 'ImmutableMatrix', + 'MatrixBase', 'Rational', 'Basic', 'igcd', 'AppliedUndef', +] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/basic.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/basic.py new file mode 100644 index 0000000000000000000000000000000000000000..92f6e710113ce0523ad15100abb0acd00f03f741 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/basic.py @@ -0,0 +1,2355 @@ +"""Base class for all the objects in SymPy""" +from __future__ import annotations + +from collections import Counter +from collections.abc import Mapping, Iterable +from itertools import zip_longest +from functools import cmp_to_key +from typing import TYPE_CHECKING, overload + +from .assumptions import _prepare_class_assumptions +from .cache import cacheit +from .sympify import _sympify, sympify, SympifyError, _external_converter +from .sorting import ordered +from .kind import Kind, UndefinedKind +from ._print_helpers import Printable + +from sympy.utilities.decorator import deprecated +from sympy.utilities.exceptions import sympy_deprecation_warning +from sympy.utilities.iterables import iterable, numbered_symbols +from sympy.utilities.misc import filldedent, func_name + + +if TYPE_CHECKING: + from typing import ClassVar, TypeVar, Any + from typing_extensions import Self + from .assumptions import StdFactKB + from .symbol import Symbol + + Tbasic = TypeVar("Tbasic", bound='Basic') + + +def as_Basic(expr): + """Return expr as a Basic instance using strict sympify + or raise a TypeError; this is just a wrapper to _sympify, + raising a TypeError instead of a SympifyError.""" + try: + return _sympify(expr) + except SympifyError: + raise TypeError( + 'Argument must be a Basic object, not `%s`' % func_name( + expr)) + + +# Key for sorting commutative args in canonical order +# by name. This is used for canonical ordering of the +# args for Add and Mul *if* the names of both classes +# being compared appear here. Some things in this list +# are not spelled the same as their name so they do not, +# in effect, appear here. See Basic.compare. +ordering_of_classes = [ + # singleton numbers + 'Zero', 'One', 'Half', 'Infinity', 'NaN', 'NegativeOne', 'NegativeInfinity', + # numbers + 'Integer', 'Rational', 'Float', + # singleton symbols + 'Exp1', 'Pi', 'ImaginaryUnit', + # symbols + 'Symbol', 'Wild', + # arithmetic operations + 'Pow', 'Mul', 'Add', + # function values + 'Derivative', 'Integral', + # defined singleton functions + 'Abs', 'Sign', 'Sqrt', + 'Floor', 'Ceiling', + 'Re', 'Im', 'Arg', + 'Conjugate', + 'Exp', 'Log', + 'Sin', 'Cos', 'Tan', 'Cot', 'ASin', 'ACos', 'ATan', 'ACot', + 'Sinh', 'Cosh', 'Tanh', 'Coth', 'ASinh', 'ACosh', 'ATanh', 'ACoth', + 'RisingFactorial', 'FallingFactorial', + 'factorial', 'binomial', + 'Gamma', 'LowerGamma', 'UpperGamma', 'PolyGamma', + 'Erf', + # special polynomials + 'Chebyshev', 'Chebyshev2', + # undefined functions + 'Function', 'WildFunction', + # anonymous functions + 'Lambda', + # Landau O symbol + 'Order', + # relational operations + 'Equality', 'Unequality', 'StrictGreaterThan', 'StrictLessThan', + 'GreaterThan', 'LessThan', +] + +def _cmp_name(x: type, y: type) -> int: + """return -1, 0, 1 if the name of x is before that of y. + A string comparison is done if either name does not appear + in `ordering_of_classes`. This is the helper for + ``Basic.compare`` + + Examples + ======== + + >>> from sympy import cos, tan, sin + >>> from sympy.core import basic + >>> save = basic.ordering_of_classes + >>> basic.ordering_of_classes = () + >>> basic._cmp_name(cos, tan) + -1 + >>> basic.ordering_of_classes = ["tan", "sin", "cos"] + >>> basic._cmp_name(cos, tan) + 1 + >>> basic._cmp_name(sin, cos) + -1 + >>> basic.ordering_of_classes = save + + """ + n1 = x.__name__ + n2 = y.__name__ + if n1 == n2: + return 0 + + # If the other object is not a Basic subclass, then we are not equal to it. + if not issubclass(y, Basic): + return -1 + + UNKNOWN = len(ordering_of_classes) + 1 + try: + i1 = ordering_of_classes.index(n1) + except ValueError: + i1 = UNKNOWN + try: + i2 = ordering_of_classes.index(n2) + except ValueError: + i2 = UNKNOWN + if i1 == UNKNOWN and i2 == UNKNOWN: + return (n1 > n2) - (n1 < n2) + return (i1 > i2) - (i1 < i2) + + + +@cacheit +def _get_postprocessors(clsname, arg_type): + # Since only Add, Mul, Pow can be clsname, this cache + # is not quadratic. + postprocessors = set() + mappings = _get_postprocessors_for_type(arg_type) + for mapping in mappings: + f = mapping.get(clsname, None) + if f is not None: + postprocessors.update(f) + return postprocessors + +@cacheit +def _get_postprocessors_for_type(arg_type): + return tuple( + Basic._constructor_postprocessor_mapping[cls] + for cls in arg_type.mro() + if cls in Basic._constructor_postprocessor_mapping + ) + + +class Basic(Printable): + """ + Base class for all SymPy objects. + + Notes and conventions + ===================== + + 1) Always use ``.args``, when accessing parameters of some instance: + + >>> from sympy import cot + >>> from sympy.abc import x, y + + >>> cot(x).args + (x,) + + >>> cot(x).args[0] + x + + >>> (x*y).args + (x, y) + + >>> (x*y).args[1] + y + + + 2) Never use internal methods or variables (the ones prefixed with ``_``): + + >>> cot(x)._args # do not use this, use cot(x).args instead + (x,) + + + 3) By "SymPy object" we mean something that can be returned by + ``sympify``. But not all objects one encounters using SymPy are + subclasses of Basic. For example, mutable objects are not: + + >>> from sympy import Basic, Matrix, sympify + >>> A = Matrix([[1, 2], [3, 4]]).as_mutable() + >>> isinstance(A, Basic) + False + + >>> B = sympify(A) + >>> isinstance(B, Basic) + True + """ + __slots__ = ('_mhash', # hash value + '_args', # arguments + '_assumptions' + ) + + _args: tuple[Basic, ...] + _mhash: int | None + + @property + def __sympy__(self): + return True + + def __init_subclass__(cls): + # Initialize the default_assumptions FactKB and also any assumptions + # property methods. This method will only be called for subclasses of + # Basic but not for Basic itself so we call + # _prepare_class_assumptions(Basic) below the class definition. + super().__init_subclass__() + _prepare_class_assumptions(cls) + + # To be overridden with True in the appropriate subclasses + is_number = False + is_Atom = False + is_Symbol = False + is_symbol = False + is_Indexed = False + is_Dummy = False + is_Wild = False + is_Function = False + is_Add = False + is_Mul = False + is_Pow = False + is_Number = False + is_Float = False + is_Rational = False + is_Integer = False + is_NumberSymbol = False + is_Order = False + is_Derivative = False + is_Piecewise = False + is_Poly = False + is_AlgebraicNumber = False + is_Relational = False + is_Equality = False + is_Boolean = False + is_Not = False + is_Matrix = False + is_Vector = False + is_Point = False + is_MatAdd = False + is_MatMul = False + + default_assumptions: ClassVar[StdFactKB] + + is_composite: bool | None + is_noninteger: bool | None + is_extended_positive: bool | None + is_negative: bool | None + is_complex: bool | None + is_extended_nonpositive: bool | None + is_integer: bool | None + is_positive: bool | None + is_rational: bool | None + is_extended_nonnegative: bool | None + is_infinite: bool | None + is_antihermitian: bool | None + is_extended_negative: bool | None + is_extended_real: bool | None + is_finite: bool | None + is_polar: bool | None + is_imaginary: bool | None + is_transcendental: bool | None + is_extended_nonzero: bool | None + is_nonzero: bool | None + is_odd: bool | None + is_algebraic: bool | None + is_prime: bool | None + is_commutative: bool | None + is_nonnegative: bool | None + is_nonpositive: bool | None + is_hermitian: bool | None + is_irrational: bool | None + is_real: bool | None + is_zero: bool | None + is_even: bool | None + + kind: Kind = UndefinedKind + + def __new__(cls, *args): + obj = object.__new__(cls) + obj._assumptions = cls.default_assumptions + obj._mhash = None # will be set by __hash__ method. + + obj._args = args # all items in args must be Basic objects + return obj + + def copy(self): + return self.func(*self.args) + + def __getnewargs__(self): + return self.args + + def __getstate__(self): + return None + + def __setstate__(self, state): + for name, value in state.items(): + setattr(self, name, value) + + def __reduce_ex__(self, protocol): + if protocol < 2: + msg = "Only pickle protocol 2 or higher is supported by SymPy" + raise NotImplementedError(msg) + return super().__reduce_ex__(protocol) + + def __hash__(self) -> int: + # hash cannot be cached using cache_it because infinite recurrence + # occurs as hash is needed for setting cache dictionary keys + h = self._mhash + if h is None: + h = hash((type(self).__name__,) + self._hashable_content()) + self._mhash = h + return h + + def _hashable_content(self): + """Return a tuple of information about self that can be used to + compute the hash. If a class defines additional attributes, + like ``name`` in Symbol, then this method should be updated + accordingly to return such relevant attributes. + + Defining more than _hashable_content is necessary if __eq__ has + been defined by a class. See note about this in Basic.__eq__.""" + return self._args + + @property + def assumptions0(self): + """ + Return object `type` assumptions. + + For example: + + Symbol('x', real=True) + Symbol('x', integer=True) + + are different objects. In other words, besides Python type (Symbol in + this case), the initial assumptions are also forming their typeinfo. + + Examples + ======== + + >>> from sympy import Symbol + >>> from sympy.abc import x + >>> x.assumptions0 + {'commutative': True} + >>> x = Symbol("x", positive=True) + >>> x.assumptions0 + {'commutative': True, 'complex': True, 'extended_negative': False, + 'extended_nonnegative': True, 'extended_nonpositive': False, + 'extended_nonzero': True, 'extended_positive': True, 'extended_real': + True, 'finite': True, 'hermitian': True, 'imaginary': False, + 'infinite': False, 'negative': False, 'nonnegative': True, + 'nonpositive': False, 'nonzero': True, 'positive': True, 'real': + True, 'zero': False} + """ + return {} + + def compare(self, other): + """ + Return -1, 0, 1 if the object is less than, equal, + or greater than other in a canonical sense. + Non-Basic are always greater than Basic. + If both names of the classes being compared appear + in the `ordering_of_classes` then the ordering will + depend on the appearance of the names there. + If either does not appear in that list, then the + comparison is based on the class name. + If the names are the same then a comparison is made + on the length of the hashable content. + Items of the equal-lengthed contents are then + successively compared using the same rules. If there + is never a difference then 0 is returned. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> x.compare(y) + -1 + >>> x.compare(x) + 0 + >>> y.compare(x) + 1 + + """ + # all redefinitions of __cmp__ method should start with the + # following lines: + if self is other: + return 0 + n1 = self.__class__ + n2 = other.__class__ + c = _cmp_name(n1, n2) + if c: + return c + # + st = self._hashable_content() + ot = other._hashable_content() + len_st = len(st) + len_ot = len(ot) + c = (len_st > len_ot) - (len_st < len_ot) + if c: + return c + for l, r in zip(st, ot): + if isinstance(l, Basic): + c = l.compare(r) + elif isinstance(l, frozenset): + l = Basic(*l) if isinstance(l, frozenset) else l + r = Basic(*r) if isinstance(r, frozenset) else r + c = l.compare(r) + else: + c = (l > r) - (l < r) + if c: + return c + return 0 + + @classmethod + def fromiter(cls, args, **assumptions): + """ + Create a new object from an iterable. + + This is a convenience function that allows one to create objects from + any iterable, without having to convert to a list or tuple first. + + Examples + ======== + + >>> from sympy import Tuple + >>> Tuple.fromiter(i for i in range(5)) + (0, 1, 2, 3, 4) + + """ + return cls(*tuple(args), **assumptions) + + @classmethod + def class_key(cls) -> tuple[int, int, str]: + """Nice order of classes.""" + return 5, 0, cls.__name__ + + @cacheit + def sort_key(self, order=None): + """ + Return a sort key. + + Examples + ======== + + >>> from sympy import S, I + + >>> sorted([S(1)/2, I, -I], key=lambda x: x.sort_key()) + [1/2, -I, I] + + >>> S("[x, 1/x, 1/x**2, x**2, x**(1/2), x**(1/4), x**(3/2)]") + [x, 1/x, x**(-2), x**2, sqrt(x), x**(1/4), x**(3/2)] + >>> sorted(_, key=lambda x: x.sort_key()) + [x**(-2), 1/x, x**(1/4), sqrt(x), x, x**(3/2), x**2] + + """ + + # XXX: remove this when issue 5169 is fixed + def inner_key(arg): + if isinstance(arg, Basic): + return arg.sort_key(order) + else: + return arg + + args = self._sorted_args + args = len(args), tuple([inner_key(arg) for arg in args]) + return self.class_key(), args, S.One.sort_key(), S.One + + def _do_eq_sympify(self, other): + """Returns a boolean indicating whether a == b when either a + or b is not a Basic. This is only done for types that were either + added to `converter` by a 3rd party or when the object has `_sympy_` + defined. This essentially reuses the code in `_sympify` that is + specific for this use case. Non-user defined types that are meant + to work with SymPy should be handled directly in the __eq__ methods + of the `Basic` classes it could equate to and not be converted. Note + that after conversion, `==` is used again since it is not + necessarily clear whether `self` or `other`'s __eq__ method needs + to be used.""" + for superclass in type(other).__mro__: + conv = _external_converter.get(superclass) + if conv is not None: + return self == conv(other) + if hasattr(other, '_sympy_'): + return self == other._sympy_() + return NotImplemented + + def __eq__(self, other): + """Return a boolean indicating whether a == b on the basis of + their symbolic trees. + + This is the same as a.compare(b) == 0 but faster. + + Notes + ===== + + If a class that overrides __eq__() needs to retain the + implementation of __hash__() from a parent class, the + interpreter must be told this explicitly by setting + __hash__ : Callable[[object], int] = .__hash__. + Otherwise the inheritance of __hash__() will be blocked, + just as if __hash__ had been explicitly set to None. + + References + ========== + + from https://docs.python.org/dev/reference/datamodel.html#object.__hash__ + """ + if self is other: + return True + + if not isinstance(other, Basic): + return self._do_eq_sympify(other) + + # check for pure number expr + if not (self.is_Number and other.is_Number) and ( + type(self) != type(other)): + return False + a, b = self._hashable_content(), other._hashable_content() + if a != b: + return False + # check number *in* an expression + for a, b in zip(a, b): + if not isinstance(a, Basic): + continue + if a.is_Number and type(a) != type(b): + return False + return True + + def __ne__(self, other): + """``a != b`` -> Compare two symbolic trees and see whether they are different + + this is the same as: + + ``a.compare(b) != 0`` + + but faster + """ + return not self == other + + def dummy_eq(self, other, symbol=None): + """ + Compare two expressions and handle dummy symbols. + + Examples + ======== + + >>> from sympy import Dummy + >>> from sympy.abc import x, y + + >>> u = Dummy('u') + + >>> (u**2 + 1).dummy_eq(x**2 + 1) + True + >>> (u**2 + 1) == (x**2 + 1) + False + + >>> (u**2 + y).dummy_eq(x**2 + y, x) + True + >>> (u**2 + y).dummy_eq(x**2 + y, y) + False + + """ + s = self.as_dummy() + o = _sympify(other) + o = o.as_dummy() + + dummy_symbols = [i for i in s.free_symbols if i.is_Dummy] + + if len(dummy_symbols) == 1: + dummy = dummy_symbols.pop() + else: + return s == o + + if symbol is None: + symbols = o.free_symbols + + if len(symbols) == 1: + symbol = symbols.pop() + else: + return s == o + + tmp = dummy.__class__() + + return s.xreplace({dummy: tmp}) == o.xreplace({symbol: tmp}) + + @overload + def atoms(self) -> set[Basic]: ... + @overload + def atoms(self, *types: Tbasic | type[Tbasic]) -> set[Tbasic]: ... + + def atoms(self, *types: Tbasic | type[Tbasic]) -> set[Basic] | set[Tbasic]: + """Returns the atoms that form the current object. + + By default, only objects that are truly atomic and cannot + be divided into smaller pieces are returned: symbols, numbers, + and number symbols like I and pi. It is possible to request + atoms of any type, however, as demonstrated below. + + Examples + ======== + + >>> from sympy import I, pi, sin + >>> from sympy.abc import x, y + >>> (1 + x + 2*sin(y + I*pi)).atoms() + {1, 2, I, pi, x, y} + + If one or more types are given, the results will contain only + those types of atoms. + + >>> from sympy import Number, NumberSymbol, Symbol + >>> (1 + x + 2*sin(y + I*pi)).atoms(Symbol) + {x, y} + + >>> (1 + x + 2*sin(y + I*pi)).atoms(Number) + {1, 2} + + >>> (1 + x + 2*sin(y + I*pi)).atoms(Number, NumberSymbol) + {1, 2, pi} + + >>> (1 + x + 2*sin(y + I*pi)).atoms(Number, NumberSymbol, I) + {1, 2, I, pi} + + Note that I (imaginary unit) and zoo (complex infinity) are special + types of number symbols and are not part of the NumberSymbol class. + + The type can be given implicitly, too: + + >>> (1 + x + 2*sin(y + I*pi)).atoms(x) # x is a Symbol + {x, y} + + Be careful to check your assumptions when using the implicit option + since ``S(1).is_Integer = True`` but ``type(S(1))`` is ``One``, a special type + of SymPy atom, while ``type(S(2))`` is type ``Integer`` and will find all + integers in an expression: + + >>> from sympy import S + >>> (1 + x + 2*sin(y + I*pi)).atoms(S(1)) + {1} + + >>> (1 + x + 2*sin(y + I*pi)).atoms(S(2)) + {1, 2} + + Finally, arguments to atoms() can select more than atomic atoms: any + SymPy type (loaded in core/__init__.py) can be listed as an argument + and those types of "atoms" as found in scanning the arguments of the + expression recursively: + + >>> from sympy import Function, Mul + >>> from sympy.core.function import AppliedUndef + >>> f = Function('f') + >>> (1 + f(x) + 2*sin(y + I*pi)).atoms(Function) + {f(x), sin(y + I*pi)} + >>> (1 + f(x) + 2*sin(y + I*pi)).atoms(AppliedUndef) + {f(x)} + + >>> (1 + x + 2*sin(y + I*pi)).atoms(Mul) + {I*pi, 2*sin(y + I*pi)} + + """ + nodes = _preorder_traversal(self) + if types: + types2 = tuple([t if isinstance(t, type) else type(t) for t in types]) + return {node for node in nodes if isinstance(node, types2)} + else: + return {node for node in nodes if not node.args} + + @property + def free_symbols(self) -> set[Basic]: + """Return from the atoms of self those which are free symbols. + + Not all free symbols are ``Symbol`` (see examples) + + For most expressions, all symbols are free symbols. For some classes + this is not true. e.g. Integrals use Symbols for the dummy variables + which are bound variables, so Integral has a method to return all + symbols except those. Derivative keeps track of symbols with respect + to which it will perform a derivative; those are + bound variables, too, so it has its own free_symbols method. + + Any other method that uses bound variables should implement a + free_symbols method. + + Examples + ======== + + >>> from sympy import Derivative, Integral, IndexedBase + >>> from sympy.abc import x, y, n + >>> (x + 1).free_symbols + {x} + >>> Integral(x, y).free_symbols + {x, y} + + Not all free symbols are actually symbols: + + >>> IndexedBase('F')[0].free_symbols + {F, F[0]} + + The symbols of differentiation are not included unless they + appear in the expression being differentiated. + + >>> Derivative(x + y, y).free_symbols + {x, y} + >>> Derivative(x, y).free_symbols + {x} + >>> Derivative(x, (y, n)).free_symbols + {n, x} + + If you want to know if a symbol is in the variables of the + Derivative you can do so as follows: + + >>> Derivative(x, y).has_free(y) + True + """ + empty: set[Basic] = set() + return empty.union(*(a.free_symbols for a in self.args)) + + @property + def expr_free_symbols(self): + sympy_deprecation_warning(""" + The expr_free_symbols property is deprecated. Use free_symbols to get + the free symbols of an expression. + """, + deprecated_since_version="1.9", + active_deprecations_target="deprecated-expr-free-symbols") + return set() + + def as_dummy(self) -> "Self": + """Return the expression with any objects having structurally + bound symbols replaced with unique, canonical symbols within + the object in which they appear and having only the default + assumption for commutativity being True. When applied to a + symbol a new symbol having only the same commutativity will be + returned. + + Examples + ======== + + >>> from sympy import Integral, Symbol + >>> from sympy.abc import x + >>> r = Symbol('r', real=True) + >>> Integral(r, (r, x)).as_dummy() + Integral(_0, (_0, x)) + >>> _.variables[0].is_real is None + True + >>> r.as_dummy() + _r + + Notes + ===== + + Any object that has structurally bound variables should have + a property, ``bound_symbols`` that returns those symbols + appearing in the object. + """ + from .symbol import Dummy, Symbol + def can(x): + # mask free that shadow bound + free = x.free_symbols + bound = set(x.bound_symbols) + d = {i: Dummy() for i in bound & free} + x = x.subs(d) + # replace bound with canonical names + x = x.xreplace(x.canonical_variables) + # return after undoing masking + return x.xreplace({v: k for k, v in d.items()}) + if not self.has(Symbol): + return self + return self.replace( + lambda x: hasattr(x, 'bound_symbols'), + can, + simultaneous=False) # type:ignore + + @property + def canonical_variables(self) -> dict[Basic, Symbol]: + """Return a dictionary mapping any variable defined in + ``self.bound_symbols`` to Symbols that do not clash + with any free symbols in the expression. + + Examples + ======== + + >>> from sympy import Lambda + >>> from sympy.abc import x + >>> Lambda(x, 2*x).canonical_variables + {x: _0} + """ + bound: list[Basic] | None = getattr(self, 'bound_symbols', None) + if bound is None: + return {} + dums = numbered_symbols('_') + reps = {} + # watch out for free symbol that are not in bound symbols; + # those that are in bound symbols are about to get changed + + # XXX: free_symbols only returns particular kinds of expressions that + # generally have a .name attribute. There is not a proper class/type + # that represents this. + names = {i.name for i in self.free_symbols - set(bound)} # type: ignore + for b in bound: + d = next(dums) + if b.is_Symbol: + while d.name in names: + d = next(dums) + reps[b] = d + return reps + + def rcall(self, *args): + """Apply on the argument recursively through the expression tree. + + This method is used to simulate a common abuse of notation for + operators. For instance, in SymPy the following will not work: + + ``(x+Lambda(y, 2*y))(z) == x+2*z``, + + however, you can use: + + >>> from sympy import Lambda + >>> from sympy.abc import x, y, z + >>> (x + Lambda(y, 2*y)).rcall(z) + x + 2*z + """ + if callable(self): + return self(*args) + elif self.args: + newargs = [sub.rcall(*args) for sub in self.args] + return self.func(*newargs) + else: + return self + + def is_hypergeometric(self, k): + from sympy.simplify.simplify import hypersimp + from sympy.functions.elementary.piecewise import Piecewise + if self.has(Piecewise): + return None + return hypersimp(self, k) is not None + + @property + def is_comparable(self): + """Return True if self can be computed to a real number + (or already is a real number) with precision, else False. + + Examples + ======== + + >>> from sympy import exp_polar, pi, I + >>> (I*exp_polar(I*pi/2)).is_comparable + True + >>> (I*exp_polar(I*pi*2)).is_comparable + False + + A False result does not mean that `self` cannot be rewritten + into a form that would be comparable. For example, the + difference computed below is zero but without simplification + it does not evaluate to a zero with precision: + + >>> e = 2**pi*(1 + 2**pi) + >>> dif = e - e.expand() + >>> dif.is_comparable + False + >>> dif.n(2)._prec + 1 + + """ + return self._eval_is_comparable() + + def _eval_is_comparable(self) -> bool: + # Expr.is_comparable overrides this + return False + + @property + def func(self): + """ + The top-level function in an expression. + + The following should hold for all objects:: + + >> x == x.func(*x.args) + + Examples + ======== + + >>> from sympy.abc import x + >>> a = 2*x + >>> a.func + + >>> a.args + (2, x) + >>> a.func(*a.args) + 2*x + >>> a == a.func(*a.args) + True + + """ + return self.__class__ + + @property + def args(self) -> tuple[Basic, ...]: + """Returns a tuple of arguments of 'self'. + + Examples + ======== + + >>> from sympy import cot + >>> from sympy.abc import x, y + + >>> cot(x).args + (x,) + + >>> cot(x).args[0] + x + + >>> (x*y).args + (x, y) + + >>> (x*y).args[1] + y + + Notes + ===== + + Never use self._args, always use self.args. + Only use _args in __new__ when creating a new function. + Do not override .args() from Basic (so that it is easy to + change the interface in the future if needed). + """ + return self._args + + @property + def _sorted_args(self): + """ + The same as ``args``. Derived classes which do not fix an + order on their arguments should override this method to + produce the sorted representation. + """ + return self.args + + def as_content_primitive(self, radical=False, clear=True): + """A stub to allow Basic args (like Tuple) to be skipped when computing + the content and primitive components of an expression. + + See Also + ======== + + sympy.core.expr.Expr.as_content_primitive + """ + return S.One, self + + @overload + def subs(self, arg1: Mapping[Basic | complex, Basic | complex], arg2: None=None, **kwargs: Any) -> Basic: ... + @overload + def subs(self, arg1: Iterable[tuple[Basic | complex, Basic | complex]], arg2: None=None, **kwargs: Any) -> Basic: ... + @overload + def subs(self, arg1: Basic | complex, arg2: Basic | complex, **kwargs: Any) -> Basic: ... + + def subs(self, arg1: Mapping[Basic | complex, Basic | complex] + | Iterable[tuple[Basic | complex, Basic | complex]] | Basic | complex, + arg2: Basic | complex | None = None, **kwargs: Any) -> Basic: + """ + Substitutes old for new in an expression after sympifying args. + + `args` is either: + - two arguments, e.g. foo.subs(old, new) + - one iterable argument, e.g. foo.subs(iterable). The iterable may be + o an iterable container with (old, new) pairs. In this case the + replacements are processed in the order given with successive + patterns possibly affecting replacements already made. + o a dict or set whose key/value items correspond to old/new pairs. + In this case the old/new pairs will be sorted by op count and in + case of a tie, by number of args and the default_sort_key. The + resulting sorted list is then processed as an iterable container + (see previous). + + If the keyword ``simultaneous`` is True, the subexpressions will not be + evaluated until all the substitutions have been made. + + Examples + ======== + + >>> from sympy import pi, exp, limit, oo + >>> from sympy.abc import x, y + >>> (1 + x*y).subs(x, pi) + pi*y + 1 + >>> (1 + x*y).subs({x:pi, y:2}) + 1 + 2*pi + >>> (1 + x*y).subs([(x, pi), (y, 2)]) + 1 + 2*pi + >>> reps = [(y, x**2), (x, 2)] + >>> (x + y).subs(reps) + 6 + >>> (x + y).subs(reversed(reps)) + x**2 + 2 + + >>> (x**2 + x**4).subs(x**2, y) + y**2 + y + + To replace only the x**2 but not the x**4, use xreplace: + + >>> (x**2 + x**4).xreplace({x**2: y}) + x**4 + y + + To delay evaluation until all substitutions have been made, + set the keyword ``simultaneous`` to True: + + >>> (x/y).subs([(x, 0), (y, 0)]) + 0 + >>> (x/y).subs([(x, 0), (y, 0)], simultaneous=True) + nan + + This has the added feature of not allowing subsequent substitutions + to affect those already made: + + >>> ((x + y)/y).subs({x + y: y, y: x + y}) + 1 + >>> ((x + y)/y).subs({x + y: y, y: x + y}, simultaneous=True) + y/(x + y) + + In order to obtain a canonical result, unordered iterables are + sorted by count_op length, number of arguments and by the + default_sort_key to break any ties. All other iterables are left + unsorted. + + >>> from sympy import sqrt, sin, cos + >>> from sympy.abc import a, b, c, d, e + + >>> A = (sqrt(sin(2*x)), a) + >>> B = (sin(2*x), b) + >>> C = (cos(2*x), c) + >>> D = (x, d) + >>> E = (exp(x), e) + + >>> expr = sqrt(sin(2*x))*sin(exp(x)*x)*cos(2*x) + sin(2*x) + + >>> expr.subs(dict([A, B, C, D, E])) + a*c*sin(d*e) + b + + The resulting expression represents a literal replacement of the + old arguments with the new arguments. This may not reflect the + limiting behavior of the expression: + + >>> (x**3 - 3*x).subs({x: oo}) + nan + + >>> limit(x**3 - 3*x, x, oo) + oo + + If the substitution will be followed by numerical + evaluation, it is better to pass the substitution to + evalf as + + >>> (1/x).evalf(subs={x: 3.0}, n=21) + 0.333333333333333333333 + + rather than + + >>> (1/x).subs({x: 3.0}).evalf(21) + 0.333333333333333314830 + + as the former will ensure that the desired level of precision is + obtained. + + See Also + ======== + replace: replacement capable of doing wildcard-like matching, + parsing of match, and conditional replacements + xreplace: exact node replacement in expr tree; also capable of + using matching rules + sympy.core.evalf.EvalfMixin.evalf: calculates the given formula to a desired level of precision + + """ + from .containers import Dict + from .symbol import Dummy, Symbol + from .numbers import _illegal + + items: Iterable[tuple[Basic | complex, Basic | complex]] + + unordered = False + if arg2 is None: + + if isinstance(arg1, set): + items = arg1 + unordered = True + elif isinstance(arg1, (Dict, Mapping)): + unordered = True + items = arg1.items() # type: ignore + elif not iterable(arg1): + raise ValueError(filldedent(""" + When a single argument is passed to subs + it should be a dictionary of old: new pairs or an iterable + of (old, new) tuples.""")) + else: + items = arg1 # type: ignore + else: + items = [(arg1, arg2)] # type: ignore + + def sympify_old(old) -> Basic: + if isinstance(old, str): + # Use Symbol rather than parse_expr for old + return Symbol(old) + elif isinstance(old, type): + # Allow a type e.g. Function('f') or sin + return sympify(old, strict=False) + else: + return sympify(old, strict=True) + + def sympify_new(new) -> Basic: + if isinstance(new, (str, type)): + # Allow a type or parse a string input + return sympify(new, strict=False) + else: + return sympify(new, strict=True) + + sequence = [(sympify_old(s1), sympify_new(s2)) for s1, s2 in items] + + # skip if there is no change + sequence = [(s1, s2) for s1, s2 in sequence if not _aresame(s1, s2)] + + simultaneous = kwargs.pop('simultaneous', False) + + if unordered: + from .sorting import _nodes, default_sort_key + sequence_dict = dict(sequence) + # order so more complex items are first and items + # of identical complexity are ordered so + # f(x) < f(y) < x < y + # \___ 2 __/ \_1_/ <- number of nodes + # + # For more complex ordering use an unordered sequence. + k = list(ordered(sequence_dict, default=False, keys=( + lambda x: -_nodes(x), + default_sort_key, + ))) + sequence = [(k, sequence_dict[k]) for k in k] + # do infinities first + if not simultaneous: + redo = [i for i, seq in enumerate(sequence) if seq[1] in _illegal] + for i in reversed(redo): + sequence.insert(0, sequence.pop(i)) + + if simultaneous: # XXX should this be the default for dict subs? + reps = {} + rv = self + kwargs['hack2'] = True + m = Dummy('subs_m') + for old, new in sequence: + com = new.is_commutative + if com is None: + com = True + d = Dummy('subs_d', commutative=com) + # using d*m so Subs will be used on dummy variables + # in things like Derivative(f(x, y), x) in which x + # is both free and bound + rv = rv._subs(old, d*m, **kwargs) + if not isinstance(rv, Basic): + break + reps[d] = new + reps[m] = S.One # get rid of m + return rv.xreplace(reps) + else: + rv = self + for old, new in sequence: + rv = rv._subs(old, new, **kwargs) + if not isinstance(rv, Basic): + break + return rv + + @cacheit + def _subs(self, old, new, **hints): + """Substitutes an expression old -> new. + + If self is not equal to old then _eval_subs is called. + If _eval_subs does not want to make any special replacement + then a None is received which indicates that the fallback + should be applied wherein a search for replacements is made + amongst the arguments of self. + + >>> from sympy import Add + >>> from sympy.abc import x, y, z + + Examples + ======== + + Add's _eval_subs knows how to target x + y in the following + so it makes the change: + + >>> (x + y + z).subs(x + y, 1) + z + 1 + + Add's _eval_subs does not need to know how to find x + y in + the following: + + >>> Add._eval_subs(z*(x + y) + 3, x + y, 1) is None + True + + The returned None will cause the fallback routine to traverse the args and + pass the z*(x + y) arg to Mul where the change will take place and the + substitution will succeed: + + >>> (z*(x + y) + 3).subs(x + y, 1) + z + 3 + + ** Developers Notes ** + + An _eval_subs routine for a class should be written if: + + 1) any arguments are not instances of Basic (e.g. bool, tuple); + + 2) some arguments should not be targeted (as in integration + variables); + + 3) if there is something other than a literal replacement + that should be attempted (as in Piecewise where the condition + may be updated without doing a replacement). + + If it is overridden, here are some special cases that might arise: + + 1) If it turns out that no special change was made and all + the original sub-arguments should be checked for + replacements then None should be returned. + + 2) If it is necessary to do substitutions on a portion of + the expression then _subs should be called. _subs will + handle the case of any sub-expression being equal to old + (which usually would not be the case) while its fallback + will handle the recursion into the sub-arguments. For + example, after Add's _eval_subs removes some matching terms + it must process the remaining terms so it calls _subs + on each of the un-matched terms and then adds them + onto the terms previously obtained. + + 3) If the initial expression should remain unchanged then + the original expression should be returned. (Whenever an + expression is returned, modified or not, no further + substitution of old -> new is attempted.) Sum's _eval_subs + routine uses this strategy when a substitution is attempted + on any of its summation variables. + """ + + def fallback(self, old, new): + """ + Try to replace old with new in any of self's arguments. + """ + hit = False + args = list(self.args) + for i, arg in enumerate(args): + if not hasattr(arg, '_eval_subs'): + continue + arg = arg._subs(old, new, **hints) + if not _aresame(arg, args[i]): + hit = True + args[i] = arg + if hit: + rv = self.func(*args) + hack2 = hints.get('hack2', False) + if hack2 and self.is_Mul and not rv.is_Mul: # 2-arg hack + coeff = S.One + nonnumber = [] + for i in args: + if i.is_Number: + coeff *= i + else: + nonnumber.append(i) + nonnumber = self.func(*nonnumber) + if coeff is S.One: + return nonnumber + else: + return self.func(coeff, nonnumber, evaluate=False) + return rv + return self + + if _aresame(self, old): + return new + + rv = self._eval_subs(old, new) + if rv is None: + rv = fallback(self, old, new) + return rv + + def _eval_subs(self, old, new) -> Basic | None: + """Override this stub if you want to do anything more than + attempt a replacement of old with new in the arguments of self. + + See also + ======== + + _subs + """ + return None + + def xreplace(self, rule): + """ + Replace occurrences of objects within the expression. + + Parameters + ========== + + rule : dict-like + Expresses a replacement rule + + Returns + ======= + + xreplace : the result of the replacement + + Examples + ======== + + >>> from sympy import symbols, pi, exp + >>> x, y, z = symbols('x y z') + >>> (1 + x*y).xreplace({x: pi}) + pi*y + 1 + >>> (1 + x*y).xreplace({x: pi, y: 2}) + 1 + 2*pi + + Replacements occur only if an entire node in the expression tree is + matched: + + >>> (x*y + z).xreplace({x*y: pi}) + z + pi + >>> (x*y*z).xreplace({x*y: pi}) + x*y*z + >>> (2*x).xreplace({2*x: y, x: z}) + y + >>> (2*2*x).xreplace({2*x: y, x: z}) + 4*z + >>> (x + y + 2).xreplace({x + y: 2}) + x + y + 2 + >>> (x + 2 + exp(x + 2)).xreplace({x + 2: y}) + x + exp(y) + 2 + + xreplace does not differentiate between free and bound symbols. In the + following, subs(x, y) would not change x since it is a bound symbol, + but xreplace does: + + >>> from sympy import Integral + >>> Integral(x, (x, 1, 2*x)).xreplace({x: y}) + Integral(y, (y, 1, 2*y)) + + Trying to replace x with an expression raises an error: + + >>> Integral(x, (x, 1, 2*x)).xreplace({x: 2*y}) # doctest: +SKIP + ValueError: Invalid limits given: ((2*y, 1, 4*y),) + + See Also + ======== + replace: replacement capable of doing wildcard-like matching, + parsing of match, and conditional replacements + subs: substitution of subexpressions as defined by the objects + themselves. + + """ + value, _ = self._xreplace(rule) + return value + + def _xreplace(self, rule): + """ + Helper for xreplace. Tracks whether a replacement actually occurred. + """ + if self in rule: + return rule[self], True + elif rule: + args = [] + changed = False + for a in self.args: + _xreplace = getattr(a, '_xreplace', None) + if _xreplace is not None: + a_xr = _xreplace(rule) + args.append(a_xr[0]) + changed |= a_xr[1] + else: + args.append(a) + args = tuple(args) + if changed: + return self.func(*args), True + return self, False + + @cacheit + def has(self, *patterns): + """ + Test whether any subexpression matches any of the patterns. + + Examples + ======== + + >>> from sympy import sin + >>> from sympy.abc import x, y, z + >>> (x**2 + sin(x*y)).has(z) + False + >>> (x**2 + sin(x*y)).has(x, y, z) + True + >>> x.has(x) + True + + Note ``has`` is a structural algorithm with no knowledge of + mathematics. Consider the following half-open interval: + + >>> from sympy import Interval + >>> i = Interval.Lopen(0, 5); i + Interval.Lopen(0, 5) + >>> i.args + (0, 5, True, False) + >>> i.has(4) # there is no "4" in the arguments + False + >>> i.has(0) # there *is* a "0" in the arguments + True + + Instead, use ``contains`` to determine whether a number is in the + interval or not: + + >>> i.contains(4) + True + >>> i.contains(0) + False + + + Note that ``expr.has(*patterns)`` is exactly equivalent to + ``any(expr.has(p) for p in patterns)``. In particular, ``False`` is + returned when the list of patterns is empty. + + >>> x.has() + False + + """ + return self._has(iterargs, *patterns) + + def has_xfree(self, s: set[Basic]): + """Return True if self has any of the patterns in s as a + free argument, else False. This is like `Basic.has_free` + but this will only report exact argument matches. + + Examples + ======== + + >>> from sympy import Function + >>> from sympy.abc import x, y + >>> f = Function('f') + >>> f(x).has_xfree({f}) + False + >>> f(x).has_xfree({f(x)}) + True + >>> f(x + 1).has_xfree({x}) + True + >>> f(x + 1).has_xfree({x + 1}) + True + >>> f(x + y + 1).has_xfree({x + 1}) + False + """ + # protect O(1) containment check by requiring: + if type(s) is not set: + raise TypeError('expecting set argument') + return any(a in s for a in iterfreeargs(self)) + + @cacheit + def has_free(self, *patterns): + """Return True if self has object(s) ``x`` as a free expression + else False. + + Examples + ======== + + >>> from sympy import Integral, Function + >>> from sympy.abc import x, y + >>> f = Function('f') + >>> g = Function('g') + >>> expr = Integral(f(x), (f(x), 1, g(y))) + >>> expr.free_symbols + {y} + >>> expr.has_free(g(y)) + True + >>> expr.has_free(*(x, f(x))) + False + + This works for subexpressions and types, too: + + >>> expr.has_free(g) + True + >>> (x + y + 1).has_free(y + 1) + True + """ + if not patterns: + return False + p0 = patterns[0] + if len(patterns) == 1 and iterable(p0) and not isinstance(p0, Basic): + # Basic can contain iterables (though not non-Basic, ideally) + # but don't encourage mixed passing patterns + raise TypeError(filldedent(''' + Expecting 1 or more Basic args, not a single + non-Basic iterable. Don't forget to unpack + iterables: `eq.has_free(*patterns)`''')) + # try quick test first + s = set(patterns) + rv = self.has_xfree(s) + if rv: + return rv + # now try matching through slower _has + return self._has(iterfreeargs, *patterns) + + def _has(self, iterargs, *patterns): + # separate out types and unhashable objects + type_set = set() # only types + p_set = set() # hashable non-types + for p in patterns: + if isinstance(p, type) and issubclass(p, Basic): + type_set.add(p) + continue + if not isinstance(p, Basic): + try: + p = _sympify(p) + except SympifyError: + continue # Basic won't have this in it + p_set.add(p) # fails if object defines __eq__ but + # doesn't define __hash__ + types = tuple(type_set) # + for i in iterargs(self): # + if i in p_set: # <--- here, too + return True + if isinstance(i, types): + return True + + # use matcher if defined, e.g. operations defines + # matcher that checks for exact subset containment, + # (x + y + 1).has(x + 1) -> True + for i in p_set - type_set: # types don't have matchers + if not hasattr(i, '_has_matcher'): + continue + match = i._has_matcher() + if any(match(arg) for arg in iterargs(self)): + return True + + # no success + return False + + def replace(self, query, value, map=False, simultaneous=True, exact=None) -> Basic: + """ + Replace matching subexpressions of ``self`` with ``value``. + + If ``map = True`` then also return the mapping {old: new} where ``old`` + was a sub-expression found with query and ``new`` is the replacement + value for it. If the expression itself does not match the query, then + the returned value will be ``self.xreplace(map)`` otherwise it should + be ``self.subs(ordered(map.items()))``. + + Traverses an expression tree and performs replacement of matching + subexpressions from the bottom to the top of the tree. The default + approach is to do the replacement in a simultaneous fashion so + changes made are targeted only once. If this is not desired or causes + problems, ``simultaneous`` can be set to False. + + In addition, if an expression containing more than one Wild symbol + is being used to match subexpressions and the ``exact`` flag is None + it will be set to True so the match will only succeed if all non-zero + values are received for each Wild that appears in the match pattern. + Setting this to False accepts a match of 0; while setting it True + accepts all matches that have a 0 in them. See example below for + cautions. + + The list of possible combinations of queries and replacement values + is listed below: + + Examples + ======== + + Initial setup + + >>> from sympy import log, sin, cos, tan, Wild, Mul, Add + >>> from sympy.abc import x, y + >>> f = log(sin(x)) + tan(sin(x**2)) + + 1.1. type -> type + obj.replace(type, newtype) + + When object of type ``type`` is found, replace it with the + result of passing its argument(s) to ``newtype``. + + >>> f.replace(sin, cos) + log(cos(x)) + tan(cos(x**2)) + >>> sin(x).replace(sin, cos, map=True) + (cos(x), {sin(x): cos(x)}) + >>> (x*y).replace(Mul, Add) + x + y + + 1.2. type -> func + obj.replace(type, func) + + When object of type ``type`` is found, apply ``func`` to its + argument(s). ``func`` must be written to handle the number + of arguments of ``type``. + + >>> f.replace(sin, lambda arg: sin(2*arg)) + log(sin(2*x)) + tan(sin(2*x**2)) + >>> (x*y).replace(Mul, lambda *args: sin(2*Mul(*args))) + sin(2*x*y) + + 2.1. pattern -> expr + obj.replace(pattern(wild), expr(wild)) + + Replace subexpressions matching ``pattern`` with the expression + written in terms of the Wild symbols in ``pattern``. + + >>> a, b = map(Wild, 'ab') + >>> f.replace(sin(a), tan(a)) + log(tan(x)) + tan(tan(x**2)) + >>> f.replace(sin(a), tan(a/2)) + log(tan(x/2)) + tan(tan(x**2/2)) + >>> f.replace(sin(a), a) + log(x) + tan(x**2) + >>> (x*y).replace(a*x, a) + y + + Matching is exact by default when more than one Wild symbol + is used: matching fails unless the match gives non-zero + values for all Wild symbols: + + >>> (2*x + y).replace(a*x + b, b - a) + y - 2 + >>> (2*x).replace(a*x + b, b - a) + 2*x + + When set to False, the results may be non-intuitive: + + >>> (2*x).replace(a*x + b, b - a, exact=False) + 2/x + + 2.2. pattern -> func + obj.replace(pattern(wild), lambda wild: expr(wild)) + + All behavior is the same as in 2.1 but now a function in terms of + pattern variables is used rather than an expression: + + >>> f.replace(sin(a), lambda a: sin(2*a)) + log(sin(2*x)) + tan(sin(2*x**2)) + + 3.1. func -> func + obj.replace(filter, func) + + Replace subexpression ``e`` with ``func(e)`` if ``filter(e)`` + is True. + + >>> g = 2*sin(x**3) + >>> g.replace(lambda expr: expr.is_Number, lambda expr: expr**2) + 4*sin(x**9) + + The expression itself is also targeted by the query but is done in + such a fashion that changes are not made twice. + + >>> e = x*(x*y + 1) + >>> e.replace(lambda x: x.is_Mul, lambda x: 2*x) + 2*x*(2*x*y + 1) + + When matching a single symbol, `exact` will default to True, but + this may or may not be the behavior that is desired: + + Here, we want `exact=False`: + + >>> from sympy import Function + >>> f = Function('f') + >>> e = f(1) + f(0) + >>> q = f(a), lambda a: f(a + 1) + >>> e.replace(*q, exact=False) + f(1) + f(2) + >>> e.replace(*q, exact=True) + f(0) + f(2) + + But here, the nature of matching makes selecting + the right setting tricky: + + >>> e = x**(1 + y) + >>> (x**(1 + y)).replace(x**(1 + a), lambda a: x**-a, exact=False) + x + >>> (x**(1 + y)).replace(x**(1 + a), lambda a: x**-a, exact=True) + x**(-x - y + 1) + >>> (x**y).replace(x**(1 + a), lambda a: x**-a, exact=False) + x + >>> (x**y).replace(x**(1 + a), lambda a: x**-a, exact=True) + x**(1 - y) + + It is probably better to use a different form of the query + that describes the target expression more precisely: + + >>> (1 + x**(1 + y)).replace( + ... lambda x: x.is_Pow and x.exp.is_Add and x.exp.args[0] == 1, + ... lambda x: x.base**(1 - (x.exp - 1))) + ... + x**(1 - y) + 1 + + See Also + ======== + + subs: substitution of subexpressions as defined by the objects + themselves. + xreplace: exact node replacement in expr tree; also capable of + using matching rules + + """ + + try: + query = _sympify(query) + except SympifyError: + pass + try: + value = _sympify(value) + except SympifyError: + pass + if isinstance(query, type): + _query = lambda expr: isinstance(expr, query) + + if isinstance(value, type): + _value = lambda expr, result: value(*expr.args) + elif callable(value): + _value = lambda expr, result: value(*expr.args) + else: + raise TypeError( + "given a type, replace() expects another " + "type or a callable") + elif isinstance(query, Basic): + _query = lambda expr: expr.match(query) + if exact is None: + from .symbol import Wild + exact = (len(query.atoms(Wild)) > 1) + + if isinstance(value, Basic): + if exact: + _value = lambda expr, result: (value.subs(result) + if all(result.values()) else expr) + else: + _value = lambda expr, result: value.subs(result) + elif callable(value): + # match dictionary keys get the trailing underscore stripped + # from them and are then passed as keywords to the callable; + # if ``exact`` is True, only accept match if there are no null + # values amongst those matched. + if exact: + _value = lambda expr, result: (value(** + {str(k)[:-1]: v for k, v in result.items()}) + if all(val for val in result.values()) else expr) + else: + _value = lambda expr, result: value(** + {str(k)[:-1]: v for k, v in result.items()}) + else: + raise TypeError( + "given an expression, replace() expects " + "another expression or a callable") + elif callable(query): + _query = query + + if callable(value): + _value = lambda expr, result: value(expr) + else: + raise TypeError( + "given a callable, replace() expects " + "another callable") + else: + raise TypeError( + "first argument to replace() must be a " + "type, an expression or a callable") + + def walk(rv, F): + """Apply ``F`` to args and then to result. + """ + args = getattr(rv, 'args', None) + if args is not None: + if args: + newargs = tuple([walk(a, F) for a in args]) + if args != newargs: + rv = rv.func(*newargs) + if simultaneous: + # if rv is something that was already + # matched (that was changed) then skip + # applying F again + for i, e in enumerate(args): + if rv == e and e != newargs[i]: + return rv + rv = F(rv) + return rv + + mapping = {} # changes that took place + + def rec_replace(expr): + result = _query(expr) + if result or result == {}: + v = _value(expr, result) + if v is not None and v != expr: + if map: + mapping[expr] = v + expr = v + return expr + + rv = walk(self, rec_replace) + return (rv, mapping) if map else rv # type: ignore + + def find(self, query, group=False): + """Find all subexpressions matching a query.""" + query = _make_find_query(query) + results = list(filter(query, _preorder_traversal(self))) + + if not group: + return set(results) + return dict(Counter(results)) + + def count(self, query): + """Count the number of matching subexpressions.""" + query = _make_find_query(query) + return sum(bool(query(sub)) for sub in _preorder_traversal(self)) + + def matches(self, expr, repl_dict=None, old=False): + """ + Helper method for match() that looks for a match between Wild symbols + in self and expressions in expr. + + Examples + ======== + + >>> from sympy import symbols, Wild, Basic + >>> a, b, c = symbols('a b c') + >>> x = Wild('x') + >>> Basic(a + x, x).matches(Basic(a + b, c)) is None + True + >>> Basic(a + x, x).matches(Basic(a + b + c, b + c)) + {x_: b + c} + """ + expr = sympify(expr) + if not isinstance(expr, self.__class__): + return None + + if repl_dict is None: + repl_dict = {} + else: + repl_dict = repl_dict.copy() + + if self == expr: + return repl_dict + + if len(self.args) != len(expr.args): + return None + + d = repl_dict # already a copy + for arg, other_arg in zip(self.args, expr.args): + if arg == other_arg: + continue + if arg.is_Relational: + try: + d = arg.xreplace(d).matches(other_arg, d, old=old) + except TypeError: # Should be InvalidComparisonError when introduced + d = None + else: + d = arg.xreplace(d).matches(other_arg, d, old=old) + if d is None: + return None + return d + + def match(self, pattern, old=False): + """ + Pattern matching. + + Wild symbols match all. + + Return ``None`` when expression (self) does not match with pattern. + Otherwise return a dictionary such that:: + + pattern.xreplace(self.match(pattern)) == self + + Examples + ======== + + >>> from sympy import Wild, Sum + >>> from sympy.abc import x, y + >>> p = Wild("p") + >>> q = Wild("q") + >>> r = Wild("r") + >>> e = (x+y)**(x+y) + >>> e.match(p**p) + {p_: x + y} + >>> e.match(p**q) + {p_: x + y, q_: x + y} + >>> e = (2*x)**2 + >>> e.match(p*q**r) + {p_: 4, q_: x, r_: 2} + >>> (p*q**r).xreplace(e.match(p*q**r)) + 4*x**2 + + Since match is purely structural expressions that are equivalent up to + bound symbols will not match: + + >>> print(Sum(x, (x, 1, 2)).match(Sum(y, (y, 1, p)))) + None + + An expression with bound symbols can be matched if the pattern uses + a distinct ``Wild`` for each bound symbol: + + >>> Sum(x, (x, 1, 2)).match(Sum(q, (q, 1, p))) + {p_: 2, q_: x} + + The ``old`` flag will give the old-style pattern matching where + expressions and patterns are essentially solved to give the match. Both + of the following give None unless ``old=True``: + + >>> (x - 2).match(p - x, old=True) + {p_: 2*x - 2} + >>> (2/x).match(p*x, old=True) + {p_: 2/x**2} + + See Also + ======== + + matches: pattern.matches(expr) is the same as expr.match(pattern) + xreplace: exact structural replacement + replace: structural replacement with pattern matching + Wild: symbolic placeholders for expressions in pattern matching + """ + pattern = sympify(pattern) + return pattern.matches(self, old=old) + + def count_ops(self, visual=False): + """Wrapper for count_ops that returns the operation count.""" + from .function import count_ops + return count_ops(self, visual) + + def doit(self, **hints): + """Evaluate objects that are not evaluated by default like limits, + integrals, sums and products. All objects of this kind will be + evaluated recursively, unless some species were excluded via 'hints' + or unless the 'deep' hint was set to 'False'. + + >>> from sympy import Integral + >>> from sympy.abc import x + + >>> 2*Integral(x, x) + 2*Integral(x, x) + + >>> (2*Integral(x, x)).doit() + x**2 + + >>> (2*Integral(x, x)).doit(deep=False) + 2*Integral(x, x) + + """ + if hints.get('deep', True): + terms = [term.doit(**hints) if isinstance(term, Basic) else term + for term in self.args] + return self.func(*terms) + else: + return self + + def simplify(self, **kwargs) -> Basic: + """See the simplify function in sympy.simplify""" + from sympy.simplify.simplify import simplify + return simplify(self, **kwargs) + + def refine(self, assumption=True): + """See the refine function in sympy.assumptions""" + from sympy.assumptions.refine import refine + return refine(self, assumption) + + def _eval_derivative_n_times(self, s, n): + # This is the default evaluator for derivatives (as called by `diff` + # and `Derivative`), it will attempt a loop to derive the expression + # `n` times by calling the corresponding `_eval_derivative` method, + # while leaving the derivative unevaluated if `n` is symbolic. This + # method should be overridden if the object has a closed form for its + # symbolic n-th derivative. + from .numbers import Integer + if isinstance(n, (int, Integer)): + obj = self + for i in range(n): + prev = obj + obj = obj._eval_derivative(s) + if obj is None: + return None + elif obj == prev: + break + return obj + else: + return None + + def rewrite(self, *args, deep=True, **hints): + """ + Rewrite *self* using a defined rule. + + Rewriting transforms an expression to another, which is mathematically + equivalent but structurally different. For example you can rewrite + trigonometric functions as complex exponentials or combinatorial + functions as gamma function. + + This method takes a *pattern* and a *rule* as positional arguments. + *pattern* is optional parameter which defines the types of expressions + that will be transformed. If it is not passed, all possible expressions + will be rewritten. *rule* defines how the expression will be rewritten. + + Parameters + ========== + + args : Expr + A *rule*, or *pattern* and *rule*. + - *pattern* is a type or an iterable of types. + - *rule* can be any object. + + deep : bool, optional + If ``True``, subexpressions are recursively transformed. Default is + ``True``. + + Examples + ======== + + If *pattern* is unspecified, all possible expressions are transformed. + + >>> from sympy import cos, sin, exp, I + >>> from sympy.abc import x + >>> expr = cos(x) + I*sin(x) + >>> expr.rewrite(exp) + exp(I*x) + + Pattern can be a type or an iterable of types. + + >>> expr.rewrite(sin, exp) + exp(I*x)/2 + cos(x) - exp(-I*x)/2 + >>> expr.rewrite([cos,], exp) + exp(I*x)/2 + I*sin(x) + exp(-I*x)/2 + >>> expr.rewrite([cos, sin], exp) + exp(I*x) + + Rewriting behavior can be implemented by defining ``_eval_rewrite()`` + method. + + >>> from sympy import Expr, sqrt, pi + >>> class MySin(Expr): + ... def _eval_rewrite(self, rule, args, **hints): + ... x, = args + ... if rule == cos: + ... return cos(pi/2 - x, evaluate=False) + ... if rule == sqrt: + ... return sqrt(1 - cos(x)**2) + >>> MySin(MySin(x)).rewrite(cos) + cos(-cos(-x + pi/2) + pi/2) + >>> MySin(x).rewrite(sqrt) + sqrt(1 - cos(x)**2) + + Defining ``_eval_rewrite_as_[...]()`` method is supported for backwards + compatibility reason. This may be removed in the future and using it is + discouraged. + + >>> class MySin(Expr): + ... def _eval_rewrite_as_cos(self, *args, **hints): + ... x, = args + ... return cos(pi/2 - x, evaluate=False) + >>> MySin(x).rewrite(cos) + cos(-x + pi/2) + + """ + if not args: + return self + + hints.update(deep=deep) + + pattern = args[:-1] + rule = args[-1] + + # Special case: map `abs` to `Abs` + if rule is abs: + from sympy.functions.elementary.complexes import Abs + rule = Abs + + # support old design by _eval_rewrite_as_[...] method + if isinstance(rule, str): + method = "_eval_rewrite_as_%s" % rule + elif hasattr(rule, "__name__"): + # rule is class or function + clsname = rule.__name__ + method = "_eval_rewrite_as_%s" % clsname + else: + # rule is instance + clsname = rule.__class__.__name__ + method = "_eval_rewrite_as_%s" % clsname + + if pattern: + if iterable(pattern[0]): + pattern = pattern[0] + pattern = tuple(p for p in pattern if self.has(p)) + if not pattern: + return self + # hereafter, empty pattern is interpreted as all pattern. + + return self._rewrite(pattern, rule, method, **hints) + + def _rewrite(self, pattern, rule, method, **hints): + deep = hints.pop('deep', True) + if deep: + args = [a._rewrite(pattern, rule, method, **hints) + for a in self.args] + else: + args = self.args + if not pattern or any(isinstance(self, p) for p in pattern): + meth = getattr(self, method, None) + if meth is not None: + rewritten = meth(*args, **hints) + else: + rewritten = self._eval_rewrite(rule, args, **hints) + if rewritten is not None: + return rewritten + if not args: + return self + return self.func(*args) + + def _eval_rewrite(self, rule, args, **hints): + return None + + _constructor_postprocessor_mapping = {} # type: ignore + + @classmethod + def _exec_constructor_postprocessors(cls, obj): + # WARNING: This API is experimental. + + # This is an experimental API that introduces constructor + # postprosessors for SymPy Core elements. If an argument of a SymPy + # expression has a `_constructor_postprocessor_mapping` attribute, it will + # be interpreted as a dictionary containing lists of postprocessing + # functions for matching expression node names. + + clsname = obj.__class__.__name__ + postprocessors = {f for i in obj.args + for f in _get_postprocessors(clsname, type(i))} + for f in postprocessors: + obj = f(obj) + + return obj + + def _sage_(self): + """ + Convert *self* to a symbolic expression of SageMath. + + This version of the method is merely a placeholder. + """ + old_method = self._sage_ + from sage.interfaces.sympy import sympy_init # type: ignore + sympy_init() # may monkey-patch _sage_ method into self's class or superclasses + if old_method == self._sage_: + raise NotImplementedError('conversion to SageMath is not implemented') + else: + # call the freshly monkey-patched method + return self._sage_() + + def could_extract_minus_sign(self) -> bool: + return False # see Expr.could_extract_minus_sign + + def is_same(a, b, approx=None): + """Return True if a and b are structurally the same, else False. + If `approx` is supplied, it will be used to test whether two + numbers are the same or not. By default, only numbers of the + same type will compare equal, so S.Half != Float(0.5). + + Examples + ======== + + In SymPy (unlike Python) two numbers do not compare the same if they are + not of the same type: + + >>> from sympy import S + >>> 2.0 == S(2) + False + >>> 0.5 == S.Half + False + + By supplying a function with which to compare two numbers, such + differences can be ignored. e.g. `equal_valued` will return True + for decimal numbers having a denominator that is a power of 2, + regardless of precision. + + >>> from sympy import Float + >>> from sympy.core.numbers import equal_valued + >>> (S.Half/4).is_same(Float(0.125, 1), equal_valued) + True + >>> Float(1, 2).is_same(Float(1, 10), equal_valued) + True + + But decimals without a power of 2 denominator will compare + as not being the same. + + >>> Float(0.1, 9).is_same(Float(0.1, 10), equal_valued) + False + + But arbitrary differences can be ignored by supplying a function + to test the equivalence of two numbers: + + >>> import math + >>> Float(0.1, 9).is_same(Float(0.1, 10), math.isclose) + True + + Other objects might compare the same even though types are not the + same. This routine will only return True if two expressions are + identical in terms of class types. + + >>> from sympy import eye, Basic + >>> eye(1) == S(eye(1)) # mutable vs immutable + True + >>> Basic.is_same(eye(1), S(eye(1))) + False + + """ + from .numbers import Number + from .traversal import postorder_traversal as pot + for t in zip_longest(pot(a), pot(b)): + if None in t: + return False + a, b = t + if isinstance(a, Number): + if not isinstance(b, Number): + return False + if approx: + return approx(a, b) + if not (a == b and a.__class__ == b.__class__): + return False + return True + +_aresame = Basic.is_same # for sake of others importing this + +# key used by Mul and Add to make canonical args +_args_sortkey = cmp_to_key(Basic.compare) + +# For all Basic subclasses _prepare_class_assumptions is called by +# Basic.__init_subclass__ but that method is not called for Basic itself so we +# call the function here instead. +_prepare_class_assumptions(Basic) + + +class Atom(Basic): + """ + A parent class for atomic things. An atom is an expression with no subexpressions. + + Examples + ======== + + Symbol, Number, Rational, Integer, ... + But not: Add, Mul, Pow, ... + """ + + is_Atom = True + + __slots__ = () + + def matches(self, expr, repl_dict=None, old=False): + if self == expr: + if repl_dict is None: + return {} + return repl_dict.copy() + + def xreplace(self, rule, hack2=False): + return rule.get(self, self) + + def doit(self, **hints): + return self + + @classmethod + def class_key(cls): + return 2, 0, cls.__name__ + + @cacheit + def sort_key(self, order=None): + return self.class_key(), (1, (str(self),)), S.One.sort_key(), S.One + + def _eval_simplify(self, **kwargs): + return self + + @property + def _sorted_args(self): + # this is here as a safeguard against accidentally using _sorted_args + # on Atoms -- they cannot be rebuilt as atom.func(*atom._sorted_args) + # since there are no args. So the calling routine should be checking + # to see that this property is not called for Atoms. + raise AttributeError('Atoms have no args. It might be necessary' + ' to make a check for Atoms in the calling code.') + + +def _atomic(e, recursive=False): + """Return atom-like quantities as far as substitution is + concerned: Derivatives, Functions and Symbols. Do not + return any 'atoms' that are inside such quantities unless + they also appear outside, too, unless `recursive` is True. + + Examples + ======== + + >>> from sympy import Derivative, Function, cos + >>> from sympy.abc import x, y + >>> from sympy.core.basic import _atomic + >>> f = Function('f') + >>> _atomic(x + y) + {x, y} + >>> _atomic(x + f(y)) + {x, f(y)} + >>> _atomic(Derivative(f(x), x) + cos(x) + y) + {y, cos(x), Derivative(f(x), x)} + + """ + pot = _preorder_traversal(e) + seen = set() + if isinstance(e, Basic): + free = getattr(e, "free_symbols", None) + if free is None: + return {e} + else: + return set() + from .symbol import Symbol + from .function import Derivative, Function + atoms = set() + for p in pot: + if p in seen: + pot.skip() + continue + seen.add(p) + if isinstance(p, Symbol) and p in free: + atoms.add(p) + elif isinstance(p, (Derivative, Function)): + if not recursive: + pot.skip() + atoms.add(p) + return atoms + + +def _make_find_query(query): + """Convert the argument of Basic.find() into a callable""" + try: + query = _sympify(query) + except SympifyError: + pass + if isinstance(query, type): + return lambda expr: isinstance(expr, query) + elif isinstance(query, Basic): + return lambda expr: expr.match(query) is not None + return query + +# Delayed to avoid cyclic import +from .singleton import S +from .traversal import (preorder_traversal as _preorder_traversal, + iterargs, iterfreeargs) + +preorder_traversal = deprecated( + """ + Using preorder_traversal from the sympy.core.basic submodule is + deprecated. + + Instead, use preorder_traversal from the top-level sympy namespace, like + + sympy.preorder_traversal + """, + deprecated_since_version="1.10", + active_deprecations_target="deprecated-traversal-functions-moved", +)(_preorder_traversal) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_arit.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_arit.py new file mode 100644 index 0000000000000000000000000000000000000000..39860943b763a30cf4f91578dbac37dc7e6e444e --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_arit.py @@ -0,0 +1,43 @@ +from sympy.core import Add, Mul, symbols + +x, y, z = symbols('x,y,z') + + +def timeit_neg(): + -x + + +def timeit_Add_x1(): + x + 1 + + +def timeit_Add_1x(): + 1 + x + + +def timeit_Add_x05(): + x + 0.5 + + +def timeit_Add_xy(): + x + y + + +def timeit_Add_xyz(): + Add(*[x, y, z]) + + +def timeit_Mul_xy(): + x*y + + +def timeit_Mul_xyz(): + Mul(*[x, y, z]) + + +def timeit_Div_xy(): + x/y + + +def timeit_Div_2y(): + 2/y diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_assumptions.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_assumptions.py new file mode 100644 index 0000000000000000000000000000000000000000..1a8e47928b76034dd1d7ba8b8f87bd527bb1cdeb --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_assumptions.py @@ -0,0 +1,12 @@ +from sympy.core import Symbol, Integer + +x = Symbol('x') +i3 = Integer(3) + + +def timeit_x_is_integer(): + x.is_integer + + +def timeit_Integer_is_irrational(): + i3.is_irrational diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_basic.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_basic.py new file mode 100644 index 0000000000000000000000000000000000000000..df2a382ecbd3cf6eb1f8555577dabb5e07c6643b --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_basic.py @@ -0,0 +1,15 @@ +from sympy.core import symbols, S + +x, y = symbols('x,y') + + +def timeit_Symbol_meth_lookup(): + x.diff # no call, just method lookup + + +def timeit_S_lookup(): + S.Exp1 + + +def timeit_Symbol_eq_xy(): + x == y diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_expand.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_expand.py new file mode 100644 index 0000000000000000000000000000000000000000..4f5ac513e368cb7e9b542926bc25a5695de6d914 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_expand.py @@ -0,0 +1,23 @@ +from sympy.core import symbols, I + +x, y, z = symbols('x,y,z') + +p = 3*x**2*y*z**7 + 7*x*y*z**2 + 4*x + x*y**4 +e = (x + y + z + 1)**32 + + +def timeit_expand_nothing_todo(): + p.expand() + + +def bench_expand_32(): + """(x+y+z+1)**32 -> expand""" + e.expand() + + +def timeit_expand_complex_number_1(): + ((2 + 3*I)**1000).expand(complex=True) + + +def timeit_expand_complex_number_2(): + ((2 + 3*I/4)**1000).expand(complex=True) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_numbers.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_numbers.py new file mode 100644 index 0000000000000000000000000000000000000000..5c7484c389232b3622fb4b6724e4ab8534dde382 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_numbers.py @@ -0,0 +1,92 @@ +from sympy.core.numbers import Integer, Rational, pi, oo +from sympy.core.intfunc import integer_nthroot, igcd +from sympy.core.singleton import S + +i3 = Integer(3) +i4 = Integer(4) +r34 = Rational(3, 4) +q45 = Rational(4, 5) + + +def timeit_Integer_create(): + Integer(2) + + +def timeit_Integer_int(): + int(i3) + + +def timeit_neg_one(): + -S.One + + +def timeit_Integer_neg(): + -i3 + + +def timeit_Integer_abs(): + abs(i3) + + +def timeit_Integer_sub(): + i3 - i3 + + +def timeit_abs_pi(): + abs(pi) + + +def timeit_neg_oo(): + -oo + + +def timeit_Integer_add_i1(): + i3 + 1 + + +def timeit_Integer_add_ij(): + i3 + i4 + + +def timeit_Integer_add_Rational(): + i3 + r34 + + +def timeit_Integer_mul_i4(): + i3*4 + + +def timeit_Integer_mul_ij(): + i3*i4 + + +def timeit_Integer_mul_Rational(): + i3*r34 + + +def timeit_Integer_eq_i3(): + i3 == 3 + + +def timeit_Integer_ed_Rational(): + i3 == r34 + + +def timeit_integer_nthroot(): + integer_nthroot(100, 2) + + +def timeit_number_igcd_23_17(): + igcd(23, 17) + + +def timeit_number_igcd_60_3600(): + igcd(60, 3600) + + +def timeit_Rational_add_r1(): + r34 + 1 + + +def timeit_Rational_add_rq(): + r34 + q45 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_sympify.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_sympify.py new file mode 100644 index 0000000000000000000000000000000000000000..d8cc0abc1e35439a1a495454abf87769d5b40d04 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/benchmarks/bench_sympify.py @@ -0,0 +1,11 @@ +from sympy.core import sympify, Symbol + +x = Symbol('x') + + +def timeit_sympify_1(): + sympify(1) + + +def timeit_sympify_x(): + sympify(x) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/cache.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/cache.py new file mode 100644 index 0000000000000000000000000000000000000000..ec11600a5e40ad446a6e5dde8820d46ea915b06a --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/cache.py @@ -0,0 +1,210 @@ +""" Caching facility for SymPy """ +from importlib import import_module +from typing import Callable + +class _cache(list): + """ List of cached functions """ + + def print_cache(self): + """print cache info""" + + for item in self: + name = item.__name__ + myfunc = item + while hasattr(myfunc, '__wrapped__'): + if hasattr(myfunc, 'cache_info'): + info = myfunc.cache_info() + break + else: + myfunc = myfunc.__wrapped__ + else: + info = None + + print(name, info) + + def clear_cache(self): + """clear cache content""" + for item in self: + myfunc = item + while hasattr(myfunc, '__wrapped__'): + if hasattr(myfunc, 'cache_clear'): + myfunc.cache_clear() + break + else: + myfunc = myfunc.__wrapped__ + + +# global cache registry: +CACHE = _cache() +# make clear and print methods available +print_cache = CACHE.print_cache +clear_cache = CACHE.clear_cache + +from functools import lru_cache, wraps + +def __cacheit(maxsize): + """caching decorator. + + important: the result of cached function must be *immutable* + + + Examples + ======== + + >>> from sympy import cacheit + >>> @cacheit + ... def f(a, b): + ... return a+b + + >>> @cacheit + ... def f(a, b): # noqa: F811 + ... return [a, b] # <-- WRONG, returns mutable object + + to force cacheit to check returned results mutability and consistency, + set environment variable SYMPY_USE_CACHE to 'debug' + """ + def func_wrapper(func): + cfunc = lru_cache(maxsize, typed=True)(func) + + @wraps(func) + def wrapper(*args, **kwargs): + try: + retval = cfunc(*args, **kwargs) + except TypeError as e: + if not e.args or not e.args[0].startswith('unhashable type:'): + raise + retval = func(*args, **kwargs) + return retval + + wrapper.cache_info = cfunc.cache_info + wrapper.cache_clear = cfunc.cache_clear + + CACHE.append(wrapper) + return wrapper + + return func_wrapper +######################################## + + +def __cacheit_nocache(func): + return func + + +def __cacheit_debug(maxsize): + """cacheit + code to check cache consistency""" + def func_wrapper(func): + cfunc = __cacheit(maxsize)(func) + + @wraps(func) + def wrapper(*args, **kw_args): + # always call function itself and compare it with cached version + r1 = func(*args, **kw_args) + r2 = cfunc(*args, **kw_args) + + # try to see if the result is immutable + # + # this works because: + # + # hash([1,2,3]) -> raise TypeError + # hash({'a':1, 'b':2}) -> raise TypeError + # hash((1,[2,3])) -> raise TypeError + # + # hash((1,2,3)) -> just computes the hash + hash(r1), hash(r2) + + # also see if returned values are the same + if r1 != r2: + raise RuntimeError("Returned values are not the same") + return r1 + return wrapper + return func_wrapper + + +def _getenv(key, default=None): + from os import getenv + return getenv(key, default) + +# SYMPY_USE_CACHE=yes/no/debug +USE_CACHE = _getenv('SYMPY_USE_CACHE', 'yes').lower() +# SYMPY_CACHE_SIZE=some_integer/None +# special cases : +# SYMPY_CACHE_SIZE=0 -> No caching +# SYMPY_CACHE_SIZE=None -> Unbounded caching +scs = _getenv('SYMPY_CACHE_SIZE', '1000') +if scs.lower() == 'none': + SYMPY_CACHE_SIZE = None +else: + try: + SYMPY_CACHE_SIZE = int(scs) + except ValueError: + raise RuntimeError( + 'SYMPY_CACHE_SIZE must be a valid integer or None. ' + \ + 'Got: %s' % SYMPY_CACHE_SIZE) + +if USE_CACHE == 'no': + cacheit = __cacheit_nocache +elif USE_CACHE == 'yes': + cacheit = __cacheit(SYMPY_CACHE_SIZE) +elif USE_CACHE == 'debug': + cacheit = __cacheit_debug(SYMPY_CACHE_SIZE) # a lot slower +else: + raise RuntimeError( + 'unrecognized value for SYMPY_USE_CACHE: %s' % USE_CACHE) + + +def cached_property(func): + '''Decorator to cache property method''' + attrname = '__' + func.__name__ + _cached_property_sentinel = object() + def propfunc(self): + val = getattr(self, attrname, _cached_property_sentinel) + if val is _cached_property_sentinel: + val = func(self) + setattr(self, attrname, val) + return val + return property(propfunc) + + +def lazy_function(module : str, name : str) -> Callable: + """Create a lazy proxy for a function in a module. + + The module containing the function is not imported until the function is used. + + """ + func = None + + def _get_function(): + nonlocal func + if func is None: + func = getattr(import_module(module), name) + return func + + # The metaclass is needed so that help() shows the docstring + class LazyFunctionMeta(type): + @property + def __doc__(self): + docstring = _get_function().__doc__ + docstring += f"\n\nNote: this is a {self.__class__.__name__} wrapper of '{module}.{name}'" + return docstring + + class LazyFunction(metaclass=LazyFunctionMeta): + def __call__(self, *args, **kwargs): + # inline get of function for performance gh-23832 + nonlocal func + if func is None: + func = getattr(import_module(module), name) + return func(*args, **kwargs) + + @property + def __doc__(self): + docstring = _get_function().__doc__ + docstring += f"\n\nNote: this is a {self.__class__.__name__} wrapper of '{module}.{name}'" + return docstring + + def __str__(self): + return _get_function().__str__() + + def __repr__(self): + return f"<{__class__.__name__} object at 0x{id(self):x}>: wrapping '{module}.{name}'" + + return LazyFunction() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/compatibility.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/compatibility.py new file mode 100644 index 0000000000000000000000000000000000000000..637a2698dbb39a042d3d664404bb0a4cba7fd004 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/compatibility.py @@ -0,0 +1,35 @@ +""" +.. deprecated:: 1.10 + + ``sympy.core.compatibility`` is deprecated. See + :ref:`sympy-core-compatibility`. + +Reimplementations of constructs introduced in later versions of Python than +we support. Also some functions that are needed SymPy-wide and are located +here for easy import. + +""" + + +from sympy.utilities.exceptions import sympy_deprecation_warning + +sympy_deprecation_warning(""" +The sympy.core.compatibility submodule is deprecated. + +This module was only ever intended for internal use. Some of the functions +that were in this module are available from the top-level SymPy namespace, +i.e., + + from sympy import ordered, default_sort_key + +The remaining were only intended for internal SymPy use and should not be used +by user code. +""", + deprecated_since_version="1.10", + active_deprecations_target="deprecated-sympy-core-compatibility", + ) + + +from .sorting import ordered, _nodes, default_sort_key # noqa:F401 +from sympy.utilities.misc import as_int as _as_int # noqa:F401 +from sympy.utilities.iterables import iterable, is_sequence, NotIterable # noqa:F401 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/containers.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/containers.py new file mode 100644 index 0000000000000000000000000000000000000000..35352009e87f3a7809a53031080cefdadb6528be --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/containers.py @@ -0,0 +1,415 @@ +"""Module for SymPy containers + + (SymPy objects that store other SymPy objects) + + The containers implemented in this module are subclassed to Basic. + They are supposed to work seamlessly within the SymPy framework. +""" + +from __future__ import annotations + +from collections import OrderedDict +from collections.abc import MutableSet +from typing import Any, Callable + +from .basic import Basic +from .sorting import default_sort_key, ordered +from .sympify import _sympify, sympify, _sympy_converter, SympifyError +from sympy.core.kind import Kind +from sympy.utilities.iterables import iterable +from sympy.utilities.misc import as_int + + +class Tuple(Basic): + """ + Wrapper around the builtin tuple object. + + Explanation + =========== + + The Tuple is a subclass of Basic, so that it works well in the + SymPy framework. The wrapped tuple is available as self.args, but + you can also access elements or slices with [:] syntax. + + Parameters + ========== + + sympify : bool + If ``False``, ``sympify`` is not called on ``args``. This + can be used for speedups for very large tuples where the + elements are known to already be SymPy objects. + + Examples + ======== + + >>> from sympy import Tuple, symbols + >>> a, b, c, d = symbols('a b c d') + >>> Tuple(a, b, c)[1:] + (b, c) + >>> Tuple(a, b, c).subs(a, d) + (d, b, c) + + """ + + def __new__(cls, *args, **kwargs): + if kwargs.get('sympify', True): + args = (sympify(arg) for arg in args) + obj = Basic.__new__(cls, *args) + return obj + + def __getitem__(self, i): + if isinstance(i, slice): + indices = i.indices(len(self)) + return Tuple(*(self.args[j] for j in range(*indices))) + return self.args[i] + + def __len__(self): + return len(self.args) + + def __contains__(self, item): + return item in self.args + + def __iter__(self): + return iter(self.args) + + def __add__(self, other): + if isinstance(other, Tuple): + return Tuple(*(self.args + other.args)) + elif isinstance(other, tuple): + return Tuple(*(self.args + other)) + else: + return NotImplemented + + def __radd__(self, other): + if isinstance(other, Tuple): + return Tuple(*(other.args + self.args)) + elif isinstance(other, tuple): + return Tuple(*(other + self.args)) + else: + return NotImplemented + + def __mul__(self, other): + try: + n = as_int(other) + except ValueError: + raise TypeError("Can't multiply sequence by non-integer of type '%s'" % type(other)) + return self.func(*(self.args*n)) + + __rmul__ = __mul__ + + def __eq__(self, other): + if isinstance(other, Basic): + return super().__eq__(other) + return self.args == other + + def __ne__(self, other): + if isinstance(other, Basic): + return super().__ne__(other) + return self.args != other + + def __hash__(self): + return hash(self.args) + + def _to_mpmath(self, prec): + return tuple(a._to_mpmath(prec) for a in self.args) + + def __lt__(self, other): + return _sympify(self.args < other.args) + + def __le__(self, other): + return _sympify(self.args <= other.args) + + # XXX: Basic defines count() as something different, so we can't + # redefine it here. Originally this lead to cse() test failure. + def tuple_count(self, value) -> int: + """Return number of occurrences of value.""" + return self.args.count(value) + + def index(self, value, start=None, stop=None): + """Searches and returns the first index of the value.""" + # XXX: One would expect: + # + # return self.args.index(value, start, stop) + # + # here. Any trouble with that? Yes: + # + # >>> (1,).index(1, None, None) + # Traceback (most recent call last): + # File "", line 1, in + # TypeError: slice indices must be integers or None or have an __index__ method + # + # See: http://bugs.python.org/issue13340 + + if start is None and stop is None: + return self.args.index(value) + elif stop is None: + return self.args.index(value, start) + else: + return self.args.index(value, start, stop) + + @property + def kind(self): + """ + The kind of a Tuple instance. + + The kind of a Tuple is always of :class:`TupleKind` but + parametrised by the number of elements and the kind of each element. + + Examples + ======== + + >>> from sympy import Tuple, Matrix + >>> Tuple(1, 2).kind + TupleKind(NumberKind, NumberKind) + >>> Tuple(Matrix([1, 2]), 1).kind + TupleKind(MatrixKind(NumberKind), NumberKind) + >>> Tuple(1, 2).kind.element_kind + (NumberKind, NumberKind) + + See Also + ======== + + sympy.matrices.kind.MatrixKind + sympy.core.kind.NumberKind + """ + return TupleKind(*(i.kind for i in self.args)) + +_sympy_converter[tuple] = lambda tup: Tuple(*tup) + + + + + +def tuple_wrapper(method): + """ + Decorator that converts any tuple in the function arguments into a Tuple. + + Explanation + =========== + + The motivation for this is to provide simple user interfaces. The user can + call a function with regular tuples in the argument, and the wrapper will + convert them to Tuples before handing them to the function. + + Explanation + =========== + + >>> from sympy.core.containers import tuple_wrapper + >>> def f(*args): + ... return args + >>> g = tuple_wrapper(f) + + The decorated function g sees only the Tuple argument: + + >>> g(0, (1, 2), 3) + (0, (1, 2), 3) + + """ + def wrap_tuples(*args, **kw_args): + newargs = [] + for arg in args: + if isinstance(arg, tuple): + newargs.append(Tuple(*arg)) + else: + newargs.append(arg) + return method(*newargs, **kw_args) + return wrap_tuples + + +class Dict(Basic): + """ + Wrapper around the builtin dict object. + + Explanation + =========== + + The Dict is a subclass of Basic, so that it works well in the + SymPy framework. Because it is immutable, it may be included + in sets, but its values must all be given at instantiation and + cannot be changed afterwards. Otherwise it behaves identically + to the Python dict. + + Examples + ======== + + >>> from sympy import Dict, Symbol + + >>> D = Dict({1: 'one', 2: 'two'}) + >>> for key in D: + ... if key == 1: + ... print('%s %s' % (key, D[key])) + 1 one + + The args are sympified so the 1 and 2 are Integers and the values + are Symbols. Queries automatically sympify args so the following work: + + >>> 1 in D + True + >>> D.has(Symbol('one')) # searches keys and values + True + >>> 'one' in D # not in the keys + False + >>> D[1] + one + + """ + + elements: frozenset[Tuple] + _dict: dict[Basic, Basic] + + def __new__(cls, *args): + if len(args) == 1 and isinstance(args[0], (dict, Dict)): + items = [Tuple(k, v) for k, v in args[0].items()] + elif iterable(args) and all(len(arg) == 2 for arg in args): + items = [Tuple(k, v) for k, v in args] + else: + raise TypeError('Pass Dict args as Dict((k1, v1), ...) or Dict({k1: v1, ...})') + elements = frozenset(items) + obj = Basic.__new__(cls, *ordered(items)) + obj.elements = elements + obj._dict = dict(items) # In case Tuple decides it wants to sympify + return obj + + def __getitem__(self, key): + """x.__getitem__(y) <==> x[y]""" + try: + key = _sympify(key) + except SympifyError: + raise KeyError(key) + + return self._dict[key] + + def __setitem__(self, key, value): + raise NotImplementedError("SymPy Dicts are Immutable") + + def items(self): + '''Returns a set-like object providing a view on dict's items. + ''' + return self._dict.items() + + def keys(self): + '''Returns the list of the dict's keys.''' + return self._dict.keys() + + def values(self): + '''Returns the list of the dict's values.''' + return self._dict.values() + + def __iter__(self): + '''x.__iter__() <==> iter(x)''' + return iter(self._dict) + + def __len__(self): + '''x.__len__() <==> len(x)''' + return self._dict.__len__() + + def get(self, key, default=None): + '''Returns the value for key if the key is in the dictionary.''' + try: + key = _sympify(key) + except SympifyError: + return default + return self._dict.get(key, default) + + def __contains__(self, key): + '''D.__contains__(k) -> True if D has a key k, else False''' + try: + key = _sympify(key) + except SympifyError: + return False + return key in self._dict + + def __lt__(self, other): + return _sympify(self.args < other.args) + + @property + def _sorted_args(self): + return tuple(sorted(self.args, key=default_sort_key)) + + def __eq__(self, other): + if isinstance(other, dict): + return self == Dict(other) + return super().__eq__(other) + + __hash__ : Callable[[Basic], Any] = Basic.__hash__ + +# this handles dict, defaultdict, OrderedDict +_sympy_converter[dict] = lambda d: Dict(*d.items()) + +class OrderedSet(MutableSet): + def __init__(self, iterable=None): + if iterable: + self.map = OrderedDict((item, None) for item in iterable) + else: + self.map = OrderedDict() + + def __len__(self): + return len(self.map) + + def __contains__(self, key): + return key in self.map + + def add(self, key): + self.map[key] = None + + def discard(self, key): + self.map.pop(key) + + def pop(self, last=True): + return self.map.popitem(last=last)[0] + + def __iter__(self): + yield from self.map.keys() + + def __repr__(self): + if not self.map: + return '%s()' % (self.__class__.__name__,) + return '%s(%r)' % (self.__class__.__name__, list(self.map.keys())) + + def intersection(self, other): + return self.__class__([val for val in self if val in other]) + + def difference(self, other): + return self.__class__([val for val in self if val not in other]) + + def update(self, iterable): + for val in iterable: + self.add(val) + +class TupleKind(Kind): + """ + TupleKind is a subclass of Kind, which is used to define Kind of ``Tuple``. + + Parameters of TupleKind will be kinds of all the arguments in Tuples, for + example + + Parameters + ========== + + args : tuple(element_kind) + element_kind is kind of element. + args is tuple of kinds of element + + Examples + ======== + + >>> from sympy import Tuple + >>> Tuple(1, 2).kind + TupleKind(NumberKind, NumberKind) + >>> Tuple(1, 2).kind.element_kind + (NumberKind, NumberKind) + + See Also + ======== + + sympy.core.kind.NumberKind + MatrixKind + sympy.sets.sets.SetKind + """ + def __new__(cls, *args): + obj = super().__new__(cls, *args) + obj.element_kind = args + return obj + + def __repr__(self): + return "TupleKind{}".format(self.element_kind) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/core.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/core.py new file mode 100644 index 0000000000000000000000000000000000000000..8a45bb06919d7a8ef88e2c9958decac705c0b8ee --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/core.py @@ -0,0 +1,21 @@ +""" The core's core. """ +from __future__ import annotations + + +class Registry: + """ + Base class for registry objects. + + Registries map a name to an object using attribute notation. Registry + classes behave singletonically: all their instances share the same state, + which is stored in the class object. + + All subclasses should set `__slots__ = ()`. + """ + __slots__ = () + + def __setattr__(self, name, obj): + setattr(self.__class__, name, obj) + + def __delattr__(self, name): + delattr(self.__class__, name) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/coreerrors.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/coreerrors.py new file mode 100644 index 0000000000000000000000000000000000000000..d2dbdd5227d7b0495145072d31bd993f13f31f0d --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/coreerrors.py @@ -0,0 +1,23 @@ +"""Definitions of common exceptions for :mod:`sympy.core` module. """ + +from typing import Callable + + +class BaseCoreError(Exception): + """Base class for core related exceptions. """ + + +class NonCommutativeExpression(BaseCoreError): + """Raised when expression didn't have commutative property. """ + + +class LazyExceptionMessage: + """Wrapper class that lets you specify an expensive to compute + error message that is only evaluated if the error is rendered.""" + callback: Callable[[], str] + + def __init__(self, callback: Callable[[], str]): + self.callback = callback + + def __str__(self): + return self.callback() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/decorators.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/decorators.py new file mode 100644 index 0000000000000000000000000000000000000000..afd6ae0c72dc32d260586c6411507e4859a9f8ff --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/decorators.py @@ -0,0 +1,250 @@ +""" +SymPy core decorators. + +The purpose of this module is to expose decorators without any other +dependencies, so that they can be easily imported anywhere in sympy/core. +""" + +from __future__ import annotations + +from typing import TYPE_CHECKING + +from functools import wraps +from .sympify import SympifyError, sympify + + +if TYPE_CHECKING: + from typing import Callable, TypeVar, Union + T1 = TypeVar('T1') + T2 = TypeVar('T2') + T3 = TypeVar('T3') + + +def _sympifyit(arg, retval=None) -> Callable[[Callable[[T1, T2], T3]], Callable[[T1, T2], T3]]: + """ + decorator to smartly _sympify function arguments + + Explanation + =========== + + @_sympifyit('other', NotImplemented) + def add(self, other): + ... + + In add, other can be thought of as already being a SymPy object. + + If it is not, the code is likely to catch an exception, then other will + be explicitly _sympified, and the whole code restarted. + + if _sympify(arg) fails, NotImplemented will be returned + + See also + ======== + + __sympifyit + """ + def deco(func): + return __sympifyit(func, arg, retval) + + return deco + + +def __sympifyit(func, arg, retval=None): + """Decorator to _sympify `arg` argument for function `func`. + + Do not use directly -- use _sympifyit instead. + """ + + # we support f(a,b) only + if not func.__code__.co_argcount: + raise LookupError("func not found") + # only b is _sympified + assert func.__code__.co_varnames[1] == arg + if retval is None: + @wraps(func) + def __sympifyit_wrapper(a, b): + return func(a, sympify(b, strict=True)) + + else: + @wraps(func) + def __sympifyit_wrapper(a, b): + try: + # If an external class has _op_priority, it knows how to deal + # with SymPy objects. Otherwise, it must be converted. + if not hasattr(b, '_op_priority'): + b = sympify(b, strict=True) + return func(a, b) + except SympifyError: + return retval + + return __sympifyit_wrapper + + +def call_highest_priority(method_name: str + ) -> Callable[[Callable[[T1, T2], T3]], Callable[[T1, T2], T3]]: + """A decorator for binary special methods to handle _op_priority. + + Explanation + =========== + + Binary special methods in Expr and its subclasses use a special attribute + '_op_priority' to determine whose special method will be called to + handle the operation. In general, the object having the highest value of + '_op_priority' will handle the operation. Expr and subclasses that define + custom binary special methods (__mul__, etc.) should decorate those + methods with this decorator to add the priority logic. + + The ``method_name`` argument is the name of the method of the other class + that will be called. Use this decorator in the following manner:: + + # Call other.__rmul__ if other._op_priority > self._op_priority + @call_highest_priority('__rmul__') + def __mul__(self, other): + ... + + # Call other.__mul__ if other._op_priority > self._op_priority + @call_highest_priority('__mul__') + def __rmul__(self, other): + ... + """ + def priority_decorator(func: Callable[[T1, T2], T3]) -> Callable[[T1, T2], T3]: + @wraps(func) + def binary_op_wrapper(self: T1, other: T2) -> T3: + if hasattr(other, '_op_priority'): + if other._op_priority > self._op_priority: # type: ignore + f: Union[Callable[[T1], T3], None] = getattr(other, method_name, None) + if f is not None: + return f(self) + return func(self, other) + return binary_op_wrapper + return priority_decorator + + +def sympify_method_args(cls: type[T1]) -> type[T1]: + '''Decorator for a class with methods that sympify arguments. + + Explanation + =========== + + The sympify_method_args decorator is to be used with the sympify_return + decorator for automatic sympification of method arguments. This is + intended for the common idiom of writing a class like : + + Examples + ======== + + >>> from sympy import Basic, SympifyError, S + >>> from sympy.core.sympify import _sympify + + >>> class MyTuple(Basic): + ... def __add__(self, other): + ... try: + ... other = _sympify(other) + ... except SympifyError: + ... return NotImplemented + ... if not isinstance(other, MyTuple): + ... return NotImplemented + ... return MyTuple(*(self.args + other.args)) + + >>> MyTuple(S(1), S(2)) + MyTuple(S(3), S(4)) + MyTuple(1, 2, 3, 4) + + In the above it is important that we return NotImplemented when other is + not sympifiable and also when the sympified result is not of the expected + type. This allows the MyTuple class to be used cooperatively with other + classes that overload __add__ and want to do something else in combination + with instance of Tuple. + + Using this decorator the above can be written as + + >>> from sympy.core.decorators import sympify_method_args, sympify_return + + >>> @sympify_method_args + ... class MyTuple(Basic): + ... @sympify_return([('other', 'MyTuple')], NotImplemented) + ... def __add__(self, other): + ... return MyTuple(*(self.args + other.args)) + + >>> MyTuple(S(1), S(2)) + MyTuple(S(3), S(4)) + MyTuple(1, 2, 3, 4) + + The idea here is that the decorators take care of the boiler-plate code + for making this happen in each method that potentially needs to accept + unsympified arguments. Then the body of e.g. the __add__ method can be + written without needing to worry about calling _sympify or checking the + type of the resulting object. + + The parameters for sympify_return are a list of tuples of the form + (parameter_name, expected_type) and the value to return (e.g. + NotImplemented). The expected_type parameter can be a type e.g. Tuple or a + string 'Tuple'. Using a string is useful for specifying a Type within its + class body (as in the above example). + + Notes: Currently sympify_return only works for methods that take a single + argument (not including self). Specifying an expected_type as a string + only works for the class in which the method is defined. + ''' + # Extract the wrapped methods from each of the wrapper objects created by + # the sympify_return decorator. Doing this here allows us to provide the + # cls argument which is used for forward string referencing. + for attrname, obj in cls.__dict__.items(): + if isinstance(obj, _SympifyWrapper): + setattr(cls, attrname, obj.make_wrapped(cls)) + return cls + + +def sympify_return(*args): + '''Function/method decorator to sympify arguments automatically + + See the docstring of sympify_method_args for explanation. + ''' + # Store a wrapper object for the decorated method + def wrapper(func: Callable[[T1, T2], T3]) -> Callable[[T1, T2], T3]: + return _SympifyWrapper(func, args) # type: ignore + return wrapper + + +class _SympifyWrapper: + '''Internal class used by sympify_return and sympify_method_args''' + + def __init__(self, func, args): + self.func = func + self.args = args + + def make_wrapped(self, cls): + func = self.func + parameters, retval = self.args + + # XXX: Handle more than one parameter? + [(parameter, expectedcls)] = parameters + + # Handle forward references to the current class using strings + if expectedcls == cls.__name__: + expectedcls = cls + + # Raise RuntimeError since this is a failure at import time and should + # not be recoverable. + nargs = func.__code__.co_argcount + # we support f(a, b) only + if nargs != 2: + raise RuntimeError('sympify_return can only be used with 2 argument functions') + # only b is _sympified + if func.__code__.co_varnames[1] != parameter: + raise RuntimeError('parameter name mismatch "%s" in %s' % + (parameter, func.__name__)) + + @wraps(func) + def _func(self, other): + # XXX: The check for _op_priority here should be removed. It is + # needed to stop mutable matrices from being sympified to + # immutable matrices which breaks things in quantum... + if not hasattr(other, '_op_priority'): + try: + other = sympify(other, strict=True) + except SympifyError: + return retval + if not isinstance(other, expectedcls): + return retval + return func(self, other) + + return _func diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/evalf.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/evalf.py new file mode 100644 index 0000000000000000000000000000000000000000..55a981090360556b357ec1cade5576e226633be8 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/evalf.py @@ -0,0 +1,1808 @@ +""" +Adaptive numerical evaluation of SymPy expressions, using mpmath +for mathematical functions. +""" +from __future__ import annotations +from typing import Callable, TYPE_CHECKING, Any, overload, Type + +import math + +import mpmath.libmp as libmp +from mpmath import ( + make_mpc, make_mpf, mp, mpc, mpf, nsum, quadts, quadosc, workprec) +from mpmath import inf as mpmath_inf +from mpmath.libmp import (from_int, from_man_exp, from_rational, fhalf, + fnan, finf, fninf, fnone, fone, fzero, mpf_abs, mpf_add, + mpf_atan, mpf_atan2, mpf_cmp, mpf_cos, mpf_e, mpf_exp, mpf_log, mpf_lt, + mpf_mul, mpf_neg, mpf_pi, mpf_pow, mpf_pow_int, mpf_shift, mpf_sin, + mpf_sqrt, normalize, round_nearest, to_int, to_str, mpf_tan) +from mpmath.libmp import bitcount as mpmath_bitcount +from mpmath.libmp.backend import MPZ +from mpmath.libmp.libmpc import _infs_nan +from mpmath.libmp.libmpf import dps_to_prec, prec_to_dps + +from .sympify import sympify +from .singleton import S +from sympy.external.gmpy import SYMPY_INTS +from sympy.utilities.iterables import is_sequence +from sympy.utilities.lambdify import lambdify +from sympy.utilities.misc import as_int + +if TYPE_CHECKING: + from sympy.core.expr import Expr + from sympy.core.add import Add + from sympy.core.mul import Mul + from sympy.core.power import Pow + from sympy.core.symbol import Symbol + from sympy.integrals.integrals import Integral + from sympy.concrete.summations import Sum + from sympy.concrete.products import Product + from sympy.functions.elementary.exponential import exp, log + from sympy.functions.elementary.complexes import Abs, re, im + from sympy.functions.elementary.integers import ceiling, floor + from sympy.functions.elementary.trigonometric import atan + from .numbers import Float, Rational, Integer, AlgebraicNumber, Number + +LG10 = math.log2(10) +rnd = round_nearest + + +def bitcount(n): + """Return smallest integer, b, such that |n|/2**b < 1. + """ + return mpmath_bitcount(abs(int(n))) + +# Used in a few places as placeholder values to denote exponents and +# precision levels, e.g. of exact numbers. Must be careful to avoid +# passing these to mpmath functions or returning them in final results. +INF = float(mpmath_inf) +MINUS_INF = float(-mpmath_inf) + +# ~= 100 digits. Real men set this to INF. +DEFAULT_MAXPREC = 333 + + +class PrecisionExhausted(ArithmeticError): + pass + +#----------------------------------------------------------------------------# +# # +# Helper functions for arithmetic and complex parts # +# # +#----------------------------------------------------------------------------# + +""" +An mpf value tuple is a tuple of integers (sign, man, exp, bc) +representing a floating-point number: [1, -1][sign]*man*2**exp where +sign is 0 or 1 and bc should correspond to the number of bits used to +represent the mantissa (man) in binary notation, e.g. +""" + +MPF_TUP = tuple[int, int, int, int] # mpf value tuple + +""" +Explanation +=========== + +>>> from sympy.core.evalf import bitcount +>>> sign, man, exp, bc = 0, 5, 1, 3 +>>> n = [1, -1][sign]*man*2**exp +>>> n, bitcount(man) +(10, 3) + +A temporary result is a tuple (re, im, re_acc, im_acc) where +re and im are nonzero mpf value tuples representing approximate +numbers, or None to denote exact zeros. + +re_acc, im_acc are integers denoting log2(e) where e is the estimated +relative accuracy of the respective complex part, but may be anything +if the corresponding complex part is None. + +""" +TMP_RES = Any # temporary result, should be some variant of +# tUnion[tTuple[Optional[MPF_TUP], Optional[MPF_TUP], +# Optional[int], Optional[int]], +# 'ComplexInfinity'] +# but mypy reports error because it doesn't know as we know +# 1. re and re_acc are either both None or both MPF_TUP +# 2. sometimes the result can't be zoo + +# type of the "options" parameter in internal evalf functions +OPT_DICT = dict[str, Any] + + +def fastlog(x: MPF_TUP | None) -> int | Any: + """Fast approximation of log2(x) for an mpf value tuple x. + + Explanation + =========== + + Calculated as exponent + width of mantissa. This is an + approximation for two reasons: 1) it gives the ceil(log2(abs(x))) + value and 2) it is too high by 1 in the case that x is an exact + power of 2. Although this is easy to remedy by testing to see if + the odd mpf mantissa is 1 (indicating that one was dealing with + an exact power of 2) that would decrease the speed and is not + necessary as this is only being used as an approximation for the + number of bits in x. The correct return value could be written as + "x[2] + (x[3] if x[1] != 1 else 0)". + Since mpf tuples always have an odd mantissa, no check is done + to see if the mantissa is a multiple of 2 (in which case the + result would be too large by 1). + + Examples + ======== + + >>> from sympy import log + >>> from sympy.core.evalf import fastlog, bitcount + >>> s, m, e = 0, 5, 1 + >>> bc = bitcount(m) + >>> n = [1, -1][s]*m*2**e + >>> n, (log(n)/log(2)).evalf(2), fastlog((s, m, e, bc)) + (10, 3.3, 4) + """ + + if not x or x == fzero: + return MINUS_INF + return x[2] + x[3] + + +def pure_complex(v: Expr, or_real=False) -> tuple[Number, Number] | None: + """Return a and b if v matches a + I*b where b is not zero and + a and b are Numbers, else None. If `or_real` is True then 0 will + be returned for `b` if `v` is a real number. + + Examples + ======== + + >>> from sympy.core.evalf import pure_complex + >>> from sympy import sqrt, I, S + >>> a, b, surd = S(2), S(3), sqrt(2) + >>> pure_complex(a) + >>> pure_complex(a, or_real=True) + (2, 0) + >>> pure_complex(surd) + >>> pure_complex(a + b*I) + (2, 3) + >>> pure_complex(I) + (0, 1) + """ + h, t = v.as_coeff_Add() + if t: + c, i = t.as_coeff_Mul() + if i is S.ImaginaryUnit: + return h, c + elif or_real: + return h, S.Zero + return None + + +# I don't know what this is, see function scaled_zero below +SCALED_ZERO_TUP = tuple[list[int], int, int, int] + + + +@overload +def scaled_zero(mag: SCALED_ZERO_TUP, sign=1) -> MPF_TUP: + ... +@overload +def scaled_zero(mag: int, sign=1) -> tuple[SCALED_ZERO_TUP, int]: + ... +def scaled_zero(mag: SCALED_ZERO_TUP | int, sign=1) -> \ + MPF_TUP | tuple[SCALED_ZERO_TUP, int]: + """Return an mpf representing a power of two with magnitude ``mag`` + and -1 for precision. Or, if ``mag`` is a scaled_zero tuple, then just + remove the sign from within the list that it was initially wrapped + in. + + Examples + ======== + + >>> from sympy.core.evalf import scaled_zero + >>> from sympy import Float + >>> z, p = scaled_zero(100) + >>> z, p + (([0], 1, 100, 1), -1) + >>> ok = scaled_zero(z) + >>> ok + (0, 1, 100, 1) + >>> Float(ok) + 1.26765060022823e+30 + >>> Float(ok, p) + 0.e+30 + >>> ok, p = scaled_zero(100, -1) + >>> Float(scaled_zero(ok), p) + -0.e+30 + """ + if isinstance(mag, tuple) and len(mag) == 4 and iszero(mag, scaled=True): + return (mag[0][0],) + mag[1:] + elif isinstance(mag, SYMPY_INTS): + if sign not in [-1, 1]: + raise ValueError('sign must be +/-1') + rv, p = mpf_shift(fone, mag), -1 + s = 0 if sign == 1 else 1 + rv = ([s],) + rv[1:] + return rv, p + else: + raise ValueError('scaled zero expects int or scaled_zero tuple.') + + +def iszero(mpf: MPF_TUP | SCALED_ZERO_TUP | None, scaled=False) -> bool | None: + if not scaled: + return not mpf or not mpf[1] and not mpf[-1] + return mpf and isinstance(mpf[0], list) and mpf[1] == mpf[-1] == 1 + + +def complex_accuracy(result: TMP_RES) -> int | Any: + """ + Returns relative accuracy of a complex number with given accuracies + for the real and imaginary parts. The relative accuracy is defined + in the complex norm sense as ||z|+|error|| / |z| where error + is equal to (real absolute error) + (imag absolute error)*i. + + The full expression for the (logarithmic) error can be approximated + easily by using the max norm to approximate the complex norm. + + In the worst case (re and im equal), this is wrong by a factor + sqrt(2), or by log2(sqrt(2)) = 0.5 bit. + """ + if result is S.ComplexInfinity: + return INF + re, im, re_acc, im_acc = result + if not im: + if not re: + return INF + return re_acc + if not re: + return im_acc + re_size = fastlog(re) + im_size = fastlog(im) + absolute_error = max(re_size - re_acc, im_size - im_acc) + relative_error = absolute_error - max(re_size, im_size) + return -relative_error + + +def get_abs(expr: Expr, prec: int, options: OPT_DICT) -> TMP_RES: + result = evalf(expr, prec + 2, options) + if result is S.ComplexInfinity: + return finf, None, prec, None + re, im, re_acc, im_acc = result + if not re: + re, re_acc, im, im_acc = im, im_acc, re, re_acc + if im: + if expr.is_number: + abs_expr, _, acc, _ = evalf(abs(N(expr, prec + 2)), + prec + 2, options) + return abs_expr, None, acc, None + else: + if 'subs' in options: + return libmp.mpc_abs((re, im), prec), None, re_acc, None + return abs(expr), None, prec, None + elif re: + return mpf_abs(re), None, re_acc, None + else: + return None, None, None, None + + +def get_complex_part(expr: Expr, no: int, prec: int, options: OPT_DICT) -> TMP_RES: + """no = 0 for real part, no = 1 for imaginary part""" + workprec = prec + i = 0 + while 1: + res = evalf(expr, workprec, options) + if res is S.ComplexInfinity: + return fnan, None, prec, None + value, accuracy = res[no::2] + # XXX is the last one correct? Consider re((1+I)**2).n() + if (not value) or accuracy >= prec or -value[2] > prec: + return value, None, accuracy, None + workprec += max(30, 2**i) + i += 1 + + +def evalf_abs(expr: 'Abs', prec: int, options: OPT_DICT) -> TMP_RES: + return get_abs(expr.args[0], prec, options) + + +def evalf_re(expr: 're', prec: int, options: OPT_DICT) -> TMP_RES: + return get_complex_part(expr.args[0], 0, prec, options) + + +def evalf_im(expr: 'im', prec: int, options: OPT_DICT) -> TMP_RES: + return get_complex_part(expr.args[0], 1, prec, options) + + +def finalize_complex(re: MPF_TUP, im: MPF_TUP, prec: int) -> TMP_RES: + if re == fzero and im == fzero: + raise ValueError("got complex zero with unknown accuracy") + elif re == fzero: + return None, im, None, prec + elif im == fzero: + return re, None, prec, None + + size_re = fastlog(re) + size_im = fastlog(im) + if size_re > size_im: + re_acc = prec + im_acc = prec + min(-(size_re - size_im), 0) + else: + im_acc = prec + re_acc = prec + min(-(size_im - size_re), 0) + return re, im, re_acc, im_acc + + +def chop_parts(value: TMP_RES, prec: int) -> TMP_RES: + """ + Chop off tiny real or complex parts. + """ + if value is S.ComplexInfinity: + return value + re, im, re_acc, im_acc = value + # Method 1: chop based on absolute value + if re and re not in _infs_nan and (fastlog(re) < -prec + 4): + re, re_acc = None, None + if im and im not in _infs_nan and (fastlog(im) < -prec + 4): + im, im_acc = None, None + # Method 2: chop if inaccurate and relatively small + if re and im: + delta = fastlog(re) - fastlog(im) + if re_acc < 2 and (delta - re_acc <= -prec + 4): + re, re_acc = None, None + if im_acc < 2 and (delta - im_acc >= prec - 4): + im, im_acc = None, None + return re, im, re_acc, im_acc + + +def check_target(expr: Expr, result: TMP_RES, prec: int): + a = complex_accuracy(result) + if a < prec: + raise PrecisionExhausted("Failed to distinguish the expression: \n\n%s\n\n" + "from zero. Try simplifying the input, using chop=True, or providing " + "a higher maxn for evalf" % (expr)) + + +def get_integer_part(expr: Expr, no: int, options: OPT_DICT, return_ints=False) -> \ + TMP_RES | tuple[int, int]: + """ + With no = 1, computes ceiling(expr) + With no = -1, computes floor(expr) + + Note: this function either gives the exact result or signals failure. + """ + from sympy.functions.elementary.complexes import re, im + # The expression is likely less than 2^30 or so + assumed_size = 30 + result = evalf(expr, assumed_size, options) + if result is S.ComplexInfinity: + raise ValueError("Cannot get integer part of Complex Infinity") + ire, iim, ire_acc, iim_acc = result + + # We now know the size, so we can calculate how much extra precision + # (if any) is needed to get within the nearest integer + if ire and iim: + gap = max(fastlog(ire) - ire_acc, fastlog(iim) - iim_acc) + elif ire: + gap = fastlog(ire) - ire_acc + elif iim: + gap = fastlog(iim) - iim_acc + else: + # ... or maybe the expression was exactly zero + if return_ints: + return 0, 0 + else: + return None, None, None, None + + margin = 10 + + if gap >= -margin: + prec = margin + assumed_size + gap + ire, iim, ire_acc, iim_acc = evalf( + expr, prec, options) + else: + prec = assumed_size + + # We can now easily find the nearest integer, but to find floor/ceil, we + # must also calculate whether the difference to the nearest integer is + # positive or negative (which may fail if very close). + def calc_part(re_im: Expr, nexpr: MPF_TUP): + from .add import Add + _, _, exponent, _ = nexpr + is_int = exponent == 0 + nint = int(to_int(nexpr, rnd)) + if is_int: + # make sure that we had enough precision to distinguish + # between nint and the re or im part (re_im) of expr that + # was passed to calc_part + ire, iim, ire_acc, iim_acc = evalf( + re_im - nint, 10, options) # don't need much precision + assert not iim + size = -fastlog(ire) + 2 # -ve b/c ire is less than 1 + if size > prec: + ire, iim, ire_acc, iim_acc = evalf( + re_im, size, options) + assert not iim + nexpr = ire + nint = int(to_int(nexpr, rnd)) + _, _, new_exp, _ = ire + is_int = new_exp == 0 + if not is_int: + # if there are subs and they all contain integer re/im parts + # then we can (hopefully) safely substitute them into the + # expression + s = options.get('subs', False) + if s: + # use strict=False with as_int because we take + # 2.0 == 2 + def is_int_reim(x): + """Check for integer or integer + I*integer.""" + try: + as_int(x, strict=False) + return True + except ValueError: + try: + [as_int(i, strict=False) for i in x.as_real_imag()] + return True + except ValueError: + return False + + if all(is_int_reim(v) for v in s.values()): + re_im = re_im.subs(s) + + re_im = Add(re_im, -nint, evaluate=False) + x, _, x_acc, _ = evalf(re_im, 10, options) + try: + check_target(re_im, (x, None, x_acc, None), 3) + except PrecisionExhausted: + if not re_im.equals(0): + raise PrecisionExhausted + x = fzero + nint += int(no*(mpf_cmp(x or fzero, fzero) == no)) + nint = from_int(nint) + return nint, INF + + re_, im_, re_acc, im_acc = None, None, None, None + + if ire is not None and ire != fzero: + re_, re_acc = calc_part(re(expr, evaluate=False), ire) + if iim is not None and iim != fzero: + im_, im_acc = calc_part(im(expr, evaluate=False), iim) + + if return_ints: + return int(to_int(re_ or fzero)), int(to_int(im_ or fzero)) + return re_, im_, re_acc, im_acc + + +def evalf_ceiling(expr: 'ceiling', prec: int, options: OPT_DICT) -> TMP_RES: + return get_integer_part(expr.args[0], 1, options) + + +def evalf_floor(expr: 'floor', prec: int, options: OPT_DICT) -> TMP_RES: + return get_integer_part(expr.args[0], -1, options) + + +def evalf_float(expr: 'Float', prec: int, options: OPT_DICT) -> TMP_RES: + return expr._mpf_, None, prec, None + + +def evalf_rational(expr: 'Rational', prec: int, options: OPT_DICT) -> TMP_RES: + return from_rational(expr.p, expr.q, prec), None, prec, None + + +def evalf_integer(expr: 'Integer', prec: int, options: OPT_DICT) -> TMP_RES: + return from_int(expr.p, prec), None, prec, None + +#----------------------------------------------------------------------------# +# # +# Arithmetic operations # +# # +#----------------------------------------------------------------------------# + + +def add_terms(terms: list, prec: int, target_prec: int) -> \ + tuple[MPF_TUP | SCALED_ZERO_TUP | None, int | None]: + """ + Helper for evalf_add. Adds a list of (mpfval, accuracy) terms. + + Returns + ======= + + - None, None if there are no non-zero terms; + - terms[0] if there is only 1 term; + - scaled_zero if the sum of the terms produces a zero by cancellation + e.g. mpfs representing 1 and -1 would produce a scaled zero which need + special handling since they are not actually zero and they are purposely + malformed to ensure that they cannot be used in anything but accuracy + calculations; + - a tuple that is scaled to target_prec that corresponds to the + sum of the terms. + + The returned mpf tuple will be normalized to target_prec; the input + prec is used to define the working precision. + + XXX explain why this is needed and why one cannot just loop using mpf_add + """ + + terms = [t for t in terms if not iszero(t[0])] + if not terms: + return None, None + elif len(terms) == 1: + return terms[0] + + # see if any argument is NaN or oo and thus warrants a special return + special = [] + from .numbers import Float + for t in terms: + arg = Float._new(t[0], 1) + if arg is S.NaN or arg.is_infinite: + special.append(arg) + if special: + from .add import Add + rv = evalf(Add(*special), prec + 4, {}) + return rv[0], rv[2] + + working_prec = 2*prec + sum_man, sum_exp = 0, 0 + absolute_err: list[int] = [] + + for x, accuracy in terms: + sign, man, exp, bc = x + if sign: + man = -man + absolute_err.append(bc + exp - accuracy) + delta = exp - sum_exp + if exp >= sum_exp: + # x much larger than existing sum? + # first: quick test + if ((delta > working_prec) and + ((not sum_man) or + delta - bitcount(abs(sum_man)) > working_prec)): + sum_man = man + sum_exp = exp + else: + sum_man += (man << delta) + else: + delta = -delta + # x much smaller than existing sum? + if delta - bc > working_prec: + if not sum_man: + sum_man, sum_exp = man, exp + else: + sum_man = (sum_man << delta) + man + sum_exp = exp + absolute_error = max(absolute_err) + if not sum_man: + return scaled_zero(absolute_error) + if sum_man < 0: + sum_sign = 1 + sum_man = -sum_man + else: + sum_sign = 0 + sum_bc = bitcount(sum_man) + sum_accuracy = sum_exp + sum_bc - absolute_error + r = normalize(sum_sign, sum_man, sum_exp, sum_bc, target_prec, + rnd), sum_accuracy + return r + + +def evalf_add(v: 'Add', prec: int, options: OPT_DICT) -> TMP_RES: + res = pure_complex(v) + if res: + h, c = res + re, _, re_acc, _ = evalf(h, prec, options) + im, _, im_acc, _ = evalf(c, prec, options) + return re, im, re_acc, im_acc + + oldmaxprec = options.get('maxprec', DEFAULT_MAXPREC) + + i = 0 + target_prec = prec + while 1: + options['maxprec'] = min(oldmaxprec, 2*prec) + + terms = [evalf(arg, prec + 10, options) for arg in v.args] + n = terms.count(S.ComplexInfinity) + if n >= 2: + return fnan, None, prec, None + re, re_acc = add_terms( + [a[0::2] for a in terms if isinstance(a, tuple) and a[0]], prec, target_prec) + im, im_acc = add_terms( + [a[1::2] for a in terms if isinstance(a, tuple) and a[1]], prec, target_prec) + if n == 1: + if re in (finf, fninf, fnan) or im in (finf, fninf, fnan): + return fnan, None, prec, None + return S.ComplexInfinity + acc = complex_accuracy((re, im, re_acc, im_acc)) + if acc >= target_prec: + if options.get('verbose'): + print("ADD: wanted", target_prec, "accurate bits, got", re_acc, im_acc) + break + else: + if (prec - target_prec) > options['maxprec']: + break + + prec = prec + max(10 + 2**i, target_prec - acc) + i += 1 + if options.get('verbose'): + print("ADD: restarting with prec", prec) + + options['maxprec'] = oldmaxprec + if iszero(re, scaled=True): + re = scaled_zero(re) + if iszero(im, scaled=True): + im = scaled_zero(im) + return re, im, re_acc, im_acc + + +def evalf_mul(v: 'Mul', prec: int, options: OPT_DICT) -> TMP_RES: + res = pure_complex(v) + if res: + # the only pure complex that is a mul is h*I + _, h = res + im, _, im_acc, _ = evalf(h, prec, options) + return None, im, None, im_acc + args = list(v.args) + + # see if any argument is NaN or oo and thus warrants a special return + has_zero = False + special = [] + from .numbers import Float + for arg in args: + result = evalf(arg, prec, options) + if result is S.ComplexInfinity: + special.append(result) + continue + if result[0] is None: + if result[1] is None: + has_zero = True + continue + num = Float._new(result[0], 1) + if num is S.NaN: + return fnan, None, prec, None + if num.is_infinite: + special.append(num) + if special: + if has_zero: + return fnan, None, prec, None + from .mul import Mul + return evalf(Mul(*special), prec + 4, {}) + if has_zero: + return None, None, None, None + + # With guard digits, multiplication in the real case does not destroy + # accuracy. This is also true in the complex case when considering the + # total accuracy; however accuracy for the real or imaginary parts + # separately may be lower. + acc = prec + + # XXX: big overestimate + working_prec = prec + len(args) + 5 + + # Empty product is 1 + start = man, exp, bc = MPZ(1), 0, 1 + + # First, we multiply all pure real or pure imaginary numbers. + # direction tells us that the result should be multiplied by + # I**direction; all other numbers get put into complex_factors + # to be multiplied out after the first phase. + last = len(args) + direction = 0 + args.append(S.One) + complex_factors = [] + + for i, arg in enumerate(args): + if i != last and pure_complex(arg): + args[-1] = (args[-1]*arg).expand() + continue + elif i == last and arg is S.One: + continue + re, im, re_acc, im_acc = evalf(arg, working_prec, options) + if re and im: + complex_factors.append((re, im, re_acc, im_acc)) + continue + elif re: + (s, m, e, b), w_acc = re, re_acc + elif im: + (s, m, e, b), w_acc = im, im_acc + direction += 1 + else: + return None, None, None, None + direction += 2*s + man *= m + exp += e + bc += b + while bc > 3*working_prec: + man >>= working_prec + exp += working_prec + bc -= working_prec + acc = min(acc, w_acc) + sign = (direction & 2) >> 1 + if not complex_factors: + v = normalize(sign, man, exp, bitcount(man), prec, rnd) + # multiply by i + if direction & 1: + return None, v, None, acc + else: + return v, None, acc, None + else: + # initialize with the first term + if (man, exp, bc) != start: + # there was a real part; give it an imaginary part + re, im = (sign, man, exp, bitcount(man)), (0, MPZ(0), 0, 0) + i0 = 0 + else: + # there is no real part to start (other than the starting 1) + wre, wim, wre_acc, wim_acc = complex_factors[0] + acc = min(acc, + complex_accuracy((wre, wim, wre_acc, wim_acc))) + re = wre + im = wim + i0 = 1 + + for wre, wim, wre_acc, wim_acc in complex_factors[i0:]: + # acc is the overall accuracy of the product; we aren't + # computing exact accuracies of the product. + acc = min(acc, + complex_accuracy((wre, wim, wre_acc, wim_acc))) + + use_prec = working_prec + A = mpf_mul(re, wre, use_prec) + B = mpf_mul(mpf_neg(im), wim, use_prec) + C = mpf_mul(re, wim, use_prec) + D = mpf_mul(im, wre, use_prec) + re = mpf_add(A, B, use_prec) + im = mpf_add(C, D, use_prec) + if options.get('verbose'): + print("MUL: wanted", prec, "accurate bits, got", acc) + # multiply by I + if direction & 1: + re, im = mpf_neg(im), re + return re, im, acc, acc + + +def evalf_pow(v: 'Pow', prec: int, options) -> TMP_RES: + + target_prec = prec + base, exp = v.args + + # We handle x**n separately. This has two purposes: 1) it is much + # faster, because we avoid calling evalf on the exponent, and 2) it + # allows better handling of real/imaginary parts that are exactly zero + if exp.is_Integer: + p: int = exp.p # type: ignore + # Exact + if not p: + return fone, None, prec, None + # Exponentiation by p magnifies relative error by |p|, so the + # base must be evaluated with increased precision if p is large + prec += int(math.log2(abs(p))) + result = evalf(base, prec + 5, options) + if result is S.ComplexInfinity: + if p < 0: + return None, None, None, None + return result + re, im, re_acc, im_acc = result + # Real to integer power + if re and not im: + return mpf_pow_int(re, p, target_prec), None, target_prec, None + # (x*I)**n = I**n * x**n + if im and not re: + z = mpf_pow_int(im, p, target_prec) + case = p % 4 + if case == 0: + return z, None, target_prec, None + if case == 1: + return None, z, None, target_prec + if case == 2: + return mpf_neg(z), None, target_prec, None + if case == 3: + return None, mpf_neg(z), None, target_prec + # Zero raised to an integer power + if not re: + if p < 0: + return S.ComplexInfinity + return None, None, None, None + # General complex number to arbitrary integer power + re, im = libmp.mpc_pow_int((re, im), p, prec) + # Assumes full accuracy in input + return finalize_complex(re, im, target_prec) + + result = evalf(base, prec + 5, options) + if result is S.ComplexInfinity: + if exp.is_Rational: + if exp < 0: + return None, None, None, None + return result + raise NotImplementedError + + # Pure square root + if exp is S.Half: + xre, xim, _, _ = result + # General complex square root + if xim: + re, im = libmp.mpc_sqrt((xre or fzero, xim), prec) + return finalize_complex(re, im, prec) + if not xre: + return None, None, None, None + # Square root of a negative real number + if mpf_lt(xre, fzero): + return None, mpf_sqrt(mpf_neg(xre), prec), None, prec + # Positive square root + return mpf_sqrt(xre, prec), None, prec, None + + # We first evaluate the exponent to find its magnitude + # This determines the working precision that must be used + prec += 10 + result = evalf(exp, prec, options) + if result is S.ComplexInfinity: + return fnan, None, prec, None + yre, yim, _, _ = result + # Special cases: x**0 + if not (yre or yim): + return fone, None, prec, None + + ysize = fastlog(yre) + # Restart if too big + # XXX: prec + ysize might exceed maxprec + if ysize > 5: + prec += ysize + yre, yim, _, _ = evalf(exp, prec, options) + + # Pure exponential function; no need to evalf the base + if base is S.Exp1: + if yim: + re, im = libmp.mpc_exp((yre or fzero, yim), prec) + return finalize_complex(re, im, target_prec) + return mpf_exp(yre, target_prec), None, target_prec, None + + xre, xim, _, _ = evalf(base, prec + 5, options) + # 0**y + if not (xre or xim): + if yim: + return fnan, None, prec, None + if yre[0] == 1: # y < 0 + return S.ComplexInfinity + return None, None, None, None + + # (real ** complex) or (complex ** complex) + if yim: + re, im = libmp.mpc_pow( + (xre or fzero, xim or fzero), (yre or fzero, yim), + target_prec) + return finalize_complex(re, im, target_prec) + # complex ** real + if xim: + re, im = libmp.mpc_pow_mpf((xre or fzero, xim), yre, target_prec) + return finalize_complex(re, im, target_prec) + # negative ** real + elif mpf_lt(xre, fzero): + re, im = libmp.mpc_pow_mpf((xre, fzero), yre, target_prec) + return finalize_complex(re, im, target_prec) + # positive ** real + else: + return mpf_pow(xre, yre, target_prec), None, target_prec, None + + +#----------------------------------------------------------------------------# +# # +# Special functions # +# # +#----------------------------------------------------------------------------# + + +def evalf_exp(expr: 'exp', prec: int, options: OPT_DICT) -> TMP_RES: + from .power import Pow + return evalf_pow(Pow(S.Exp1, expr.exp, evaluate=False), prec, options) + + +def evalf_trig(v: Expr, prec: int, options: OPT_DICT) -> TMP_RES: + """ + This function handles sin , cos and tan of complex arguments. + + """ + from sympy.functions.elementary.trigonometric import cos, sin, tan + if isinstance(v, cos): + func = mpf_cos + elif isinstance(v, sin): + func = mpf_sin + elif isinstance(v,tan): + func = mpf_tan + else: + raise NotImplementedError + arg = v.args[0] + # 20 extra bits is possibly overkill. It does make the need + # to restart very unlikely + xprec = prec + 20 + re, im, re_acc, im_acc = evalf(arg, xprec, options) + if im: + if 'subs' in options: + v = v.subs(options['subs']) + return evalf(v._eval_evalf(prec), prec, options) + if not re: + if isinstance(v, cos): + return fone, None, prec, None + elif isinstance(v, sin): + return None, None, None, None + elif isinstance(v,tan): + return None, None, None, None + else: + raise NotImplementedError + # For trigonometric functions, we are interested in the + # fixed-point (absolute) accuracy of the argument. + xsize = fastlog(re) + # Magnitude <= 1.0. OK to compute directly, because there is no + # danger of hitting the first root of cos (with sin, magnitude + # <= 2.0 would actually be ok) + if xsize < 1: + return func(re, prec, rnd), None, prec, None + # Very large + if xsize >= 10: + xprec = prec + xsize + re, im, re_acc, im_acc = evalf(arg, xprec, options) + # Need to repeat in case the argument is very close to a + # multiple of pi (or pi/2), hitting close to a root + while 1: + y = func(re, prec, rnd) + ysize = fastlog(y) + gap = -ysize + accuracy = (xprec - xsize) - gap + if accuracy < prec: + if options.get('verbose'): + print("SIN/COS/TAN", accuracy, "wanted", prec, "gap", gap) + print(to_str(y, 10)) + if xprec > options.get('maxprec', DEFAULT_MAXPREC): + return y, None, accuracy, None + xprec += gap + re, im, re_acc, im_acc = evalf(arg, xprec, options) + continue + else: + return y, None, prec, None + + +def evalf_log(expr: 'log', prec: int, options: OPT_DICT) -> TMP_RES: + if len(expr.args)>1: + expr = expr.doit() + return evalf(expr, prec, options) + arg = expr.args[0] + workprec = prec + 10 + result = evalf(arg, workprec, options) + if result is S.ComplexInfinity: + return result + xre, xim, xacc, _ = result + + # evalf can return NoneTypes if chop=True + # issue 18516, 19623 + if xre is xim is None: + # Dear reviewer, I do not know what -inf is; + # it looks to be (1, 0, -789, -3) + # but I'm not sure in general, + # so we just let mpmath figure + # it out by taking log of 0 directly. + # It would be better to return -inf instead. + xre = fzero + + if xim: + from sympy.functions.elementary.complexes import Abs + from sympy.functions.elementary.exponential import log + + # XXX: use get_abs etc instead + re = evalf_log( + log(Abs(arg, evaluate=False), evaluate=False), prec, options) + im = mpf_atan2(xim, xre or fzero, prec) + return re[0], im, re[2], prec + + imaginary_term = (mpf_cmp(xre, fzero) < 0) + + re = mpf_log(mpf_abs(xre), prec, rnd) + size = fastlog(re) + if prec - size > workprec and re != fzero: + from .add import Add + # We actually need to compute 1+x accurately, not x + add = Add(S.NegativeOne, arg, evaluate=False) + xre, xim, _, _ = evalf_add(add, prec, options) + prec2 = workprec - fastlog(xre) + # xre is now x - 1 so we add 1 back here to calculate x + re = mpf_log(mpf_abs(mpf_add(xre, fone, prec2)), prec, rnd) + + re_acc = prec + + if imaginary_term: + return re, mpf_pi(prec), re_acc, prec + else: + return re, None, re_acc, None + + +def evalf_atan(v: 'atan', prec: int, options: OPT_DICT) -> TMP_RES: + arg = v.args[0] + xre, xim, reacc, imacc = evalf(arg, prec + 5, options) + if xre is xim is None: + return (None,)*4 + if xim: + raise NotImplementedError + return mpf_atan(xre, prec, rnd), None, prec, None + + +def evalf_subs(prec: int, subs: dict) -> dict: + """ Change all Float entries in `subs` to have precision prec. """ + newsubs = {} + for a, b in subs.items(): + b = S(b) + if b.is_Float: + b = b._eval_evalf(prec) + newsubs[a] = b + return newsubs + + +def evalf_piecewise(expr: Expr, prec: int, options: OPT_DICT) -> TMP_RES: + from .numbers import Float, Integer + if 'subs' in options: + expr = expr.subs(evalf_subs(prec, options['subs'])) + newopts = options.copy() + del newopts['subs'] + if hasattr(expr, 'func'): + return evalf(expr, prec, newopts) + if isinstance(expr, float): + return evalf(Float(expr), prec, newopts) + if isinstance(expr, int): + return evalf(Integer(expr), prec, newopts) + + # We still have undefined symbols + raise NotImplementedError + + +def evalf_alg_num(a: 'AlgebraicNumber', prec: int, options: OPT_DICT) -> TMP_RES: + return evalf(a.to_root(), prec, options) + +#----------------------------------------------------------------------------# +# # +# High-level operations # +# # +#----------------------------------------------------------------------------# + + +def as_mpmath(x: Any, prec: int, options: OPT_DICT) -> mpc | mpf: + from .numbers import Infinity, NegativeInfinity, Zero + x = sympify(x) + if isinstance(x, Zero) or x == 0.0: + return mpf(0) + if isinstance(x, Infinity): + return mpf('inf') + if isinstance(x, NegativeInfinity): + return mpf('-inf') + # XXX + result = evalf(x, prec, options) + return quad_to_mpmath(result) + + +def do_integral(expr: 'Integral', prec: int, options: OPT_DICT) -> TMP_RES: + func = expr.args[0] + x, xlow, xhigh = expr.args[1] + if xlow == xhigh: + xlow = xhigh = 0 + elif x not in func.free_symbols: + # only the difference in limits matters in this case + # so if there is a symbol in common that will cancel + # out when taking the difference, then use that + # difference + if xhigh.free_symbols & xlow.free_symbols: + diff = xhigh - xlow + if diff.is_number: + xlow, xhigh = 0, diff + + oldmaxprec = options.get('maxprec', DEFAULT_MAXPREC) + options['maxprec'] = min(oldmaxprec, 2*prec) + + with workprec(prec + 5): + xlow = as_mpmath(xlow, prec + 15, options) + xhigh = as_mpmath(xhigh, prec + 15, options) + + # Integration is like summation, and we can phone home from + # the integrand function to update accuracy summation style + # Note that this accuracy is inaccurate, since it fails + # to account for the variable quadrature weights, + # but it is better than nothing + + from sympy.functions.elementary.trigonometric import cos, sin + from .symbol import Wild + + have_part = [False, False] + max_real_term: float | int = MINUS_INF + max_imag_term: float | int = MINUS_INF + + def f(t: Expr) -> mpc | mpf: + nonlocal max_real_term, max_imag_term + re, im, re_acc, im_acc = evalf(func, mp.prec, {'subs': {x: t}}) + + have_part[0] = re or have_part[0] + have_part[1] = im or have_part[1] + + max_real_term = max(max_real_term, fastlog(re)) + max_imag_term = max(max_imag_term, fastlog(im)) + + if im: + return mpc(re or fzero, im) + return mpf(re or fzero) + + if options.get('quad') == 'osc': + A = Wild('A', exclude=[x]) + B = Wild('B', exclude=[x]) + D = Wild('D') + m = func.match(cos(A*x + B)*D) + if not m: + m = func.match(sin(A*x + B)*D) + if not m: + raise ValueError("An integrand of the form sin(A*x+B)*f(x) " + "or cos(A*x+B)*f(x) is required for oscillatory quadrature") + period = as_mpmath(2*S.Pi/m[A], prec + 15, options) + result = quadosc(f, [xlow, xhigh], period=period) + # XXX: quadosc does not do error detection yet + quadrature_error = MINUS_INF + else: + result, quadrature_err = quadts(f, [xlow, xhigh], error=1) + quadrature_error = fastlog(quadrature_err._mpf_) + + options['maxprec'] = oldmaxprec + + if have_part[0]: + re: MPF_TUP | None = result.real._mpf_ + re_acc: int | None + if re == fzero: + re_s, re_acc = scaled_zero(int(-max(prec, max_real_term, quadrature_error))) + re = scaled_zero(re_s) # handled ok in evalf_integral + else: + re_acc = int(-max(max_real_term - fastlog(re) - prec, quadrature_error)) + else: + re, re_acc = None, None + + if have_part[1]: + im: MPF_TUP | None = result.imag._mpf_ + im_acc: int | None + if im == fzero: + im_s, im_acc = scaled_zero(int(-max(prec, max_imag_term, quadrature_error))) + im = scaled_zero(im_s) # handled ok in evalf_integral + else: + im_acc = int(-max(max_imag_term - fastlog(im) - prec, quadrature_error)) + else: + im, im_acc = None, None + + result = re, im, re_acc, im_acc + return result + + +def evalf_integral(expr: 'Integral', prec: int, options: OPT_DICT) -> TMP_RES: + limits = expr.limits + if len(limits) != 1 or len(limits[0]) != 3: + raise NotImplementedError + workprec = prec + i = 0 + maxprec = options.get('maxprec', INF) + while 1: + result = do_integral(expr, workprec, options) + accuracy = complex_accuracy(result) + if accuracy >= prec: # achieved desired precision + break + if workprec >= maxprec: # can't increase accuracy any more + break + if accuracy == -1: + # maybe the answer really is zero and maybe we just haven't increased + # the precision enough. So increase by doubling to not take too long + # to get to maxprec. + workprec *= 2 + else: + workprec += max(prec, 2**i) + workprec = min(workprec, maxprec) + i += 1 + return result + + +def check_convergence(numer: Expr, denom: Expr, n: Symbol) -> tuple[int, Any, Any]: + """ + Returns + ======= + + (h, g, p) where + -- h is: + > 0 for convergence of rate 1/factorial(n)**h + < 0 for divergence of rate factorial(n)**(-h) + = 0 for geometric or polynomial convergence or divergence + + -- abs(g) is: + > 1 for geometric convergence of rate 1/h**n + < 1 for geometric divergence of rate h**n + = 1 for polynomial convergence or divergence + + (g < 0 indicates an alternating series) + + -- p is: + > 1 for polynomial convergence of rate 1/n**h + <= 1 for polynomial divergence of rate n**(-h) + + """ + from sympy.polys.polytools import Poly + npol = Poly(numer, n) + dpol = Poly(denom, n) + p = npol.degree() + q = dpol.degree() + rate = q - p + if rate: + return rate, None, None + constant = dpol.LC() / npol.LC() + from .numbers import equal_valued + if not equal_valued(abs(constant), 1): + return rate, constant, None + if npol.degree() == dpol.degree() == 0: + return rate, constant, 0 + pc = npol.all_coeffs()[1] + qc = dpol.all_coeffs()[1] + return rate, constant, (qc - pc)/dpol.LC() + + +def hypsum(expr: Expr, n: Symbol, start: int, prec: int) -> mpf: + """ + Sum a rapidly convergent infinite hypergeometric series with + given general term, e.g. e = hypsum(1/factorial(n), n). The + quotient between successive terms must be a quotient of integer + polynomials. + """ + from .numbers import Float, equal_valued + from sympy.simplify.simplify import hypersimp + + if prec == float('inf'): + raise NotImplementedError('does not support inf prec') + + if start: + expr = expr.subs(n, n + start) + hs = hypersimp(expr, n) + if hs is None: + raise NotImplementedError("a hypergeometric series is required") + num, den = hs.as_numer_denom() + + func1 = lambdify(n, num) + func2 = lambdify(n, den) + + h, g, p = check_convergence(num, den, n) + + if h < 0: + raise ValueError("Sum diverges like (n!)^%i" % (-h)) + + eterm = expr.subs(n, 0) + if not eterm.is_Rational: + raise NotImplementedError("Non rational term functionality is not implemented.") + + term: Rational = eterm # type: ignore + + # Direct summation if geometric or faster + if h > 0 or (h == 0 and abs(g) > 1): + term = (MPZ(term.p) << prec) // term.q + s = term + k = 1 + while abs(term) > 5: + term *= MPZ(func1(k - 1)) + term //= MPZ(func2(k - 1)) + s += term + k += 1 + return from_man_exp(s, -prec) + else: + alt = g < 0 + if abs(g) < 1: + raise ValueError("Sum diverges like (%i)^n" % abs(1/g)) + if p < 1 or (equal_valued(p, 1) and not alt): + raise ValueError("Sum diverges like n^%i" % (-p)) + # We have polynomial convergence: use Richardson extrapolation + vold = None + ndig = prec_to_dps(prec) + while True: + # Need to use at least quad precision because a lot of cancellation + # might occur in the extrapolation process; we check the answer to + # make sure that the desired precision has been reached, too. + prec2 = 4*prec + term0 = (MPZ(term.p) << prec2) // term.q + + def summand(k, _term=[term0]): + if k: + k = int(k) + _term[0] *= MPZ(func1(k - 1)) + _term[0] //= MPZ(func2(k - 1)) + return make_mpf(from_man_exp(_term[0], -prec2)) + + with workprec(prec): + v = nsum(summand, [0, mpmath_inf], method='richardson') + vf = Float(v, ndig) + if vold is not None and vold == vf: + break + prec += prec # double precision each time + vold = vf + + return v._mpf_ + + +def evalf_prod(expr: 'Product', prec: int, options: OPT_DICT) -> TMP_RES: + if all((l[1] - l[2]).is_Integer for l in expr.limits): + result = evalf(expr.doit(), prec=prec, options=options) + else: + from sympy.concrete.summations import Sum + result = evalf(expr.rewrite(Sum), prec=prec, options=options) + return result + + +def evalf_sum(expr: 'Sum', prec: int, options: OPT_DICT) -> TMP_RES: + from .numbers import Float + if 'subs' in options: + expr = expr.subs(options['subs']) # type: ignore + func = expr.function + limits = expr.limits + if len(limits) != 1 or len(limits[0]) != 3: + raise NotImplementedError + if func.is_zero: + return None, None, prec, None + prec2 = prec + 10 + try: + n, a, b = limits[0] + if b is not S.Infinity or a is S.NegativeInfinity or a != int(a): + raise NotImplementedError + # Use fast hypergeometric summation if possible + v = hypsum(func, n, int(a), prec2) + delta = prec - fastlog(v) + if fastlog(v) < -10: + v = hypsum(func, n, int(a), delta) + return v, None, min(prec, delta), None + except NotImplementedError: + # Euler-Maclaurin summation for general series + eps = Float(2.0)**(-prec) + for i in range(1, 5): + m = n = 2**i * prec + s, err = expr.euler_maclaurin(m=m, n=n, eps=eps, + eval_integral=False) + err = err.evalf() + if err is S.NaN: + raise NotImplementedError + if err <= eps: + break + err = fastlog(evalf(abs(err), 20, options)[0]) + re, im, re_acc, im_acc = evalf(s, prec2, options) + if re_acc is None: + re_acc = -err + if im_acc is None: + im_acc = -err + return re, im, re_acc, im_acc + + +#----------------------------------------------------------------------------# +# # +# Symbolic interface # +# # +#----------------------------------------------------------------------------# + +def evalf_symbol(x: Expr, prec: int, options: OPT_DICT) -> TMP_RES: + val = options['subs'][x] + if isinstance(val, mpf): + if not val: + return None, None, None, None + return val._mpf_, None, prec, None + else: + if '_cache' not in options: + options['_cache'] = {} + cache = options['_cache'] + cached, cached_prec = cache.get(x, (None, MINUS_INF)) + if cached_prec >= prec: + return cached + v = evalf(sympify(val), prec, options) + cache[x] = (v, prec) + return v + +evalf_table: dict[Type[Expr], Callable[[Expr, int, OPT_DICT], TMP_RES]] = {} + + +def _create_evalf_table(): + global evalf_table + from sympy.concrete.products import Product + from sympy.concrete.summations import Sum + from .add import Add + from .mul import Mul + from .numbers import Exp1, Float, Half, ImaginaryUnit, Integer, NaN, NegativeOne, One, Pi, Rational, \ + Zero, ComplexInfinity, AlgebraicNumber + from .power import Pow + from .symbol import Dummy, Symbol + from sympy.functions.elementary.complexes import Abs, im, re + from sympy.functions.elementary.exponential import exp, log + from sympy.functions.elementary.integers import ceiling, floor + from sympy.functions.elementary.piecewise import Piecewise + from sympy.functions.elementary.trigonometric import atan, cos, sin, tan + from sympy.integrals.integrals import Integral + evalf_table = { + Symbol: evalf_symbol, + Dummy: evalf_symbol, + Float: evalf_float, + Rational: evalf_rational, + Integer: evalf_integer, + Zero: lambda x, prec, options: (None, None, prec, None), + One: lambda x, prec, options: (fone, None, prec, None), + Half: lambda x, prec, options: (fhalf, None, prec, None), + Pi: lambda x, prec, options: (mpf_pi(prec), None, prec, None), + Exp1: lambda x, prec, options: (mpf_e(prec), None, prec, None), + ImaginaryUnit: lambda x, prec, options: (None, fone, None, prec), + NegativeOne: lambda x, prec, options: (fnone, None, prec, None), + ComplexInfinity: lambda x, prec, options: S.ComplexInfinity, + NaN: lambda x, prec, options: (fnan, None, prec, None), + + exp: evalf_exp, + + cos: evalf_trig, + sin: evalf_trig, + tan: evalf_trig, + + Add: evalf_add, + Mul: evalf_mul, + Pow: evalf_pow, + + log: evalf_log, + atan: evalf_atan, + Abs: evalf_abs, + + re: evalf_re, + im: evalf_im, + floor: evalf_floor, + ceiling: evalf_ceiling, + + Integral: evalf_integral, + Sum: evalf_sum, + Product: evalf_prod, + Piecewise: evalf_piecewise, + + AlgebraicNumber: evalf_alg_num, + } + + +def evalf(x: Expr, prec: int, options: OPT_DICT) -> TMP_RES: + """ + Evaluate the ``Expr`` instance, ``x`` + to a binary precision of ``prec``. This + function is supposed to be used internally. + + Parameters + ========== + + x : Expr + The formula to evaluate to a float. + prec : int + The binary precision that the output should have. + options : dict + A dictionary with the same entries as + ``EvalfMixin.evalf`` and in addition, + ``maxprec`` which is the maximum working precision. + + Returns + ======= + + An optional tuple, ``(re, im, re_acc, im_acc)`` + which are the real, imaginary, real accuracy + and imaginary accuracy respectively. ``re`` is + an mpf value tuple and so is ``im``. ``re_acc`` + and ``im_acc`` are ints. + + NB: all these return values can be ``None``. + If all values are ``None``, then that represents 0. + Note that 0 is also represented as ``fzero = (0, 0, 0, 0)``. + """ + from sympy.functions.elementary.complexes import re as re_, im as im_ + try: + rf = evalf_table[type(x)] + r = rf(x, prec, options) + except KeyError: + # Fall back to ordinary evalf if possible + if 'subs' in options: + x = x.subs(evalf_subs(prec, options['subs'])) + xe = x._eval_evalf(prec) + if xe is None: + raise NotImplementedError + as_real_imag = getattr(xe, "as_real_imag", None) + if as_real_imag is None: + raise NotImplementedError # e.g. FiniteSet(-1.0, 1.0).evalf() + re, im = as_real_imag() + if re.has(re_) or im.has(im_): + raise NotImplementedError + if not re: + re = None + reprec = None + elif re.is_number: + re = re._to_mpmath(prec, allow_ints=False)._mpf_ + reprec = prec + else: + raise NotImplementedError + if not im: + im = None + imprec = None + elif im.is_number: + im = im._to_mpmath(prec, allow_ints=False)._mpf_ + imprec = prec + else: + raise NotImplementedError + r = re, im, reprec, imprec + + if options.get("verbose"): + print("### input", x) + print("### output", to_str(r[0] or fzero, 50) if isinstance(r, tuple) else r) + print("### raw", r) # r[0], r[2] + print() + chop = options.get('chop', False) + if chop: + if chop is True: + chop_prec = prec + else: + # convert (approximately) from given tolerance; + # the formula here will will make 1e-i rounds to 0 for + # i in the range +/-27 while 2e-i will not be chopped + chop_prec = int(round(-3.321*math.log10(chop) + 2.5)) + if chop_prec == 3: + chop_prec -= 1 + r = chop_parts(r, chop_prec) + if options.get("strict"): + check_target(x, r, prec) + return r + + +def quad_to_mpmath(q, ctx=None): + """Turn the quad returned by ``evalf`` into an ``mpf`` or ``mpc``. """ + mpc = make_mpc if ctx is None else ctx.make_mpc + mpf = make_mpf if ctx is None else ctx.make_mpf + if q is S.ComplexInfinity: + raise NotImplementedError + re, im, _, _ = q + if im: + if not re: + re = fzero + return mpc((re, im)) + elif re: + return mpf(re) + else: + return mpf(fzero) + + +class EvalfMixin: + """Mixin class adding evalf capability.""" + + __slots__: tuple[str, ...] = () + + def evalf(self, n=15, subs=None, maxn=100, chop=False, strict=False, quad=None, verbose=False): + """ + Evaluate the given formula to an accuracy of *n* digits. + + Parameters + ========== + + subs : dict, optional + Substitute numerical values for symbols, e.g. + ``subs={x:3, y:1+pi}``. The substitutions must be given as a + dictionary. + + maxn : int, optional + Allow a maximum temporary working precision of maxn digits. + + chop : bool or number, optional + Specifies how to replace tiny real or imaginary parts in + subresults by exact zeros. + + When ``True`` the chop value defaults to standard precision. + + Otherwise the chop value is used to determine the + magnitude of "small" for purposes of chopping. + + >>> from sympy import N + >>> x = 1e-4 + >>> N(x, chop=True) + 0.000100000000000000 + >>> N(x, chop=1e-5) + 0.000100000000000000 + >>> N(x, chop=1e-4) + 0 + + strict : bool, optional + Raise ``PrecisionExhausted`` if any subresult fails to + evaluate to full accuracy, given the available maxprec. + + quad : str, optional + Choose algorithm for numerical quadrature. By default, + tanh-sinh quadrature is used. For oscillatory + integrals on an infinite interval, try ``quad='osc'``. + + verbose : bool, optional + Print debug information. + + Notes + ===== + + When Floats are naively substituted into an expression, + precision errors may adversely affect the result. For example, + adding 1e16 (a Float) to 1 will truncate to 1e16; if 1e16 is + then subtracted, the result will be 0. + That is exactly what happens in the following: + + >>> from sympy.abc import x, y, z + >>> values = {x: 1e16, y: 1, z: 1e16} + >>> (x + y - z).subs(values) + 0 + + Using the subs argument for evalf is the accurate way to + evaluate such an expression: + + >>> (x + y - z).evalf(subs=values) + 1.00000000000000 + """ + from .numbers import Float, Number + n = n if n is not None else 15 + + if subs and is_sequence(subs): + raise TypeError('subs must be given as a dictionary') + + # for sake of sage that doesn't like evalf(1) + if n == 1 and isinstance(self, Number): + from .expr import _mag + rv = self.evalf(2, subs, maxn, chop, strict, quad, verbose) + m = _mag(rv) + rv = rv.round(1 - m) + return rv + + if not evalf_table: + _create_evalf_table() + prec = dps_to_prec(n) + options = {'maxprec': max(prec, int(maxn*LG10)), 'chop': chop, + 'strict': strict, 'verbose': verbose} + if subs is not None: + options['subs'] = subs + if quad is not None: + options['quad'] = quad + try: + result = evalf(self, prec + 4, options) + except NotImplementedError: + # Fall back to the ordinary evalf + if hasattr(self, 'subs') and subs is not None: # issue 20291 + v = self.subs(subs)._eval_evalf(prec) + else: + v = self._eval_evalf(prec) + if v is None: + return self + elif not v.is_number: + return v + try: + # If the result is numerical, normalize it + result = evalf(v, prec, options) + except NotImplementedError: + # Probably contains symbols or unknown functions + return v + if result is S.ComplexInfinity: + return result + re, im, re_acc, im_acc = result + if re is S.NaN or im is S.NaN: + return S.NaN + if re: + p = max(min(prec, re_acc), 1) + re = Float._new(re, p) + else: + re = S.Zero + if im: + p = max(min(prec, im_acc), 1) + im = Float._new(im, p) + return re + im*S.ImaginaryUnit + else: + return re + + n = evalf + + def _evalf(self, prec: int) -> Expr: + """Helper for evalf. Does the same thing but takes binary precision""" + r = self._eval_evalf(prec) + if r is None: + r = self # type: ignore + return r # type: ignore + + def _eval_evalf(self, prec: int) -> Expr | None: + return None + + def _to_mpmath(self, prec, allow_ints=True): + # mpmath functions accept ints as input + errmsg = "cannot convert to mpmath number" + if allow_ints and self.is_Integer: + return self.p + if hasattr(self, '_as_mpf_val'): + return make_mpf(self._as_mpf_val(prec)) + try: + result = evalf(self, prec, {}) + return quad_to_mpmath(result) + except NotImplementedError: + v = self._eval_evalf(prec) + if v is None: + raise ValueError(errmsg) + if v.is_Float: + return make_mpf(v._mpf_) + # Number + Number*I is also fine + re, im = v.as_real_imag() + if allow_ints and re.is_Integer: + re = from_int(re.p) + elif re.is_Float: + re = re._mpf_ + else: + raise ValueError(errmsg) + if allow_ints and im.is_Integer: + im = from_int(im.p) + elif im.is_Float: + im = im._mpf_ + else: + raise ValueError(errmsg) + return make_mpc((re, im)) + + +def N(x, n=15, **options): + r""" + Calls x.evalf(n, \*\*options). + + Explanations + ============ + + Both .n() and N() are equivalent to .evalf(); use the one that you like better. + See also the docstring of .evalf() for information on the options. + + Examples + ======== + + >>> from sympy import Sum, oo, N + >>> from sympy.abc import k + >>> Sum(1/k**k, (k, 1, oo)) + Sum(k**(-k), (k, 1, oo)) + >>> N(_, 4) + 1.291 + + """ + # by using rational=True, any evaluation of a string + # will be done using exact values for the Floats + return sympify(x, rational=True).evalf(n, **options) + + +def _evalf_with_bounded_error(x: Expr, eps: Expr | None = None, + m: int = 0, + options: OPT_DICT | None = None) -> TMP_RES: + """ + Evaluate *x* to within a bounded absolute error. + + Parameters + ========== + + x : Expr + The quantity to be evaluated. + eps : Expr, None, optional (default=None) + Positive real upper bound on the acceptable error. + m : int, optional (default=0) + If *eps* is None, then use 2**(-m) as the upper bound on the error. + options: OPT_DICT + As in the ``evalf`` function. + + Returns + ======= + + A tuple ``(re, im, re_acc, im_acc)``, as returned by ``evalf``. + + See Also + ======== + + evalf + + """ + if eps is not None: + if not (eps.is_Rational or eps.is_Float) or not eps > 0: + raise ValueError("eps must be positive") + r, _, _, _ = evalf(1/eps, 1, {}) + m = fastlog(r) + + c, d, _, _ = evalf(x, 1, {}) + # Note: If x = a + b*I, then |a| <= 2|c| and |b| <= 2|d|, with equality + # only in the zero case. + # If a is non-zero, then |c| = 2**nc for some integer nc, and c has + # bitcount 1. Therefore 2**fastlog(c) = 2**(nc+1) = 2|c| is an upper bound + # on |a|. Likewise for b and d. + nr, ni = fastlog(c), fastlog(d) + n = max(nr, ni) + 1 + # If x is 0, then n is MINUS_INF, and p will be 1. Otherwise, + # n - 1 bits get us past the integer parts of a and b, and +1 accounts for + # the factor of <= sqrt(2) that is |x|/max(|a|, |b|). + p = max(1, m + n + 1) + + options = options or {} + return evalf(x, p, options) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/expr.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/expr.py new file mode 100644 index 0000000000000000000000000000000000000000..e66ff239a679942f2cc95c3f66af1fc13f7229d9 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/expr.py @@ -0,0 +1,4194 @@ +from __future__ import annotations + +from typing import TYPE_CHECKING, overload +from collections.abc import Iterable, Mapping +from functools import reduce +import re + +from .sympify import sympify, _sympify +from .basic import Basic, Atom +from .singleton import S +from .evalf import EvalfMixin, pure_complex, DEFAULT_MAXPREC +from .decorators import call_highest_priority, sympify_method_args, sympify_return +from .cache import cacheit +from .logic import fuzzy_or, fuzzy_not +from .intfunc import mod_inverse +from .sorting import default_sort_key +from .kind import NumberKind +from sympy.utilities.exceptions import sympy_deprecation_warning +from sympy.utilities.misc import as_int, func_name, filldedent +from sympy.utilities.iterables import has_variety, sift +from mpmath.libmp import mpf_log, prec_to_dps +from mpmath.libmp.libintmath import giant_steps + + +if TYPE_CHECKING: + from typing import Any + from typing_extensions import Self + from .numbers import Number + +from collections import defaultdict + + +def _corem(eq, c): # helper for extract_additively + # return co, diff from co*c + diff + co = [] + non = [] + for i in Add.make_args(eq): + ci = i.coeff(c) + if not ci: + non.append(i) + else: + co.append(ci) + return Add(*co), Add(*non) + + +@sympify_method_args +class Expr(Basic, EvalfMixin): + """ + Base class for algebraic expressions. + + Explanation + =========== + + Everything that requires arithmetic operations to be defined + should subclass this class, instead of Basic (which should be + used only for argument storage and expression manipulation, i.e. + pattern matching, substitutions, etc). + + If you want to override the comparisons of expressions: + Should use _eval_is_ge for inequality, or _eval_is_eq, with multiple dispatch. + _eval_is_ge return true if x >= y, false if x < y, and None if the two types + are not comparable or the comparison is indeterminate + + See Also + ======== + + sympy.core.basic.Basic + """ + + __slots__: tuple[str, ...] = () + + if TYPE_CHECKING: + + def __new__(cls, *args: Basic) -> Self: + ... + + @overload # type: ignore + def subs(self, arg1: Mapping[Basic | complex, Expr | complex], arg2: None=None) -> Expr: ... + @overload + def subs(self, arg1: Iterable[tuple[Basic | complex, Expr | complex]], arg2: None=None, **kwargs: Any) -> Expr: ... + @overload + def subs(self, arg1: Expr | complex, arg2: Expr | complex) -> Expr: ... + @overload + def subs(self, arg1: Mapping[Basic | complex, Basic | complex], arg2: None=None, **kwargs: Any) -> Basic: ... + @overload + def subs(self, arg1: Iterable[tuple[Basic | complex, Basic | complex]], arg2: None=None, **kwargs: Any) -> Basic: ... + @overload + def subs(self, arg1: Basic | complex, arg2: Basic | complex, **kwargs: Any) -> Basic: ... + + def subs(self, arg1: Mapping[Basic | complex, Basic | complex] | Basic | complex, # type: ignore + arg2: Basic | complex | None = None, **kwargs: Any) -> Basic: + ... + + def simplify(self, **kwargs) -> Expr: + ... + + def evalf(self, n: int = 15, subs: dict[Basic, Basic | float] | None = None, + maxn: int = 100, chop: bool = False, strict: bool = False, + quad: str | None = None, verbose: bool = False) -> Expr: + ... + + n = evalf + + is_scalar = True # self derivative is 1 + + @property + def _diff_wrt(self): + """Return True if one can differentiate with respect to this + object, else False. + + Explanation + =========== + + Subclasses such as Symbol, Function and Derivative return True + to enable derivatives wrt them. The implementation in Derivative + separates the Symbol and non-Symbol (_diff_wrt=True) variables and + temporarily converts the non-Symbols into Symbols when performing + the differentiation. By default, any object deriving from Expr + will behave like a scalar with self.diff(self) == 1. If this is + not desired then the object must also set `is_scalar = False` or + else define an _eval_derivative routine. + + Note, see the docstring of Derivative for how this should work + mathematically. In particular, note that expr.subs(yourclass, Symbol) + should be well-defined on a structural level, or this will lead to + inconsistent results. + + Examples + ======== + + >>> from sympy import Expr + >>> e = Expr() + >>> e._diff_wrt + False + >>> class MyScalar(Expr): + ... _diff_wrt = True + ... + >>> MyScalar().diff(MyScalar()) + 1 + >>> class MySymbol(Expr): + ... _diff_wrt = True + ... is_scalar = False + ... + >>> MySymbol().diff(MySymbol()) + Derivative(MySymbol(), MySymbol()) + """ + return False + + @cacheit + def sort_key(self, order=None): + + coeff, expr = self.as_coeff_Mul() + + if expr.is_Pow: + base, exp = expr.as_base_exp() + if base is S.Exp1: + # If we remove this, many doctests will go crazy: + # (keeps E**x sorted like the exp(x) function, + # part of exp(x) to E**x transition) + base, exp = Function("exp")(exp), S.One + expr = base + else: + exp = S.One + + if expr.is_Dummy: + args = (expr.sort_key(),) + elif expr.is_Atom: + args = (str(expr),) + else: + if expr.is_Add: + args = expr.as_ordered_terms(order=order) + elif expr.is_Mul: + args = expr.as_ordered_factors(order=order) + else: + args = expr.args + + args = tuple( + [ default_sort_key(arg, order=order) for arg in args ]) + + args = (len(args), tuple(args)) + exp = exp.sort_key(order=order) + + return expr.class_key(), args, exp, coeff + + def _hashable_content(self): + """Return a tuple of information about self that can be used to + compute the hash. If a class defines additional attributes, + like ``name`` in Symbol, then this method should be updated + accordingly to return such relevant attributes. + Defining more than _hashable_content is necessary if __eq__ has + been defined by a class. See note about this in Basic.__eq__.""" + return self._args + + # *************** + # * Arithmetics * + # *************** + # Expr and its subclasses use _op_priority to determine which object + # passed to a binary special method (__mul__, etc.) will handle the + # operation. In general, the 'call_highest_priority' decorator will choose + # the object with the highest _op_priority to handle the call. + # Custom subclasses that want to define their own binary special methods + # should set an _op_priority value that is higher than the default. + # + # **NOTE**: + # This is a temporary fix, and will eventually be replaced with + # something better and more powerful. See issue 5510. + _op_priority = 10.0 + + @property + def _add_handler(self): + return Add + + @property + def _mul_handler(self): + return Mul + + def __pos__(self) -> Expr: + return self + + def __neg__(self) -> Expr: + # Mul has its own __neg__ routine, so we just + # create a 2-args Mul with the -1 in the canonical + # slot 0. + c = self.is_commutative + return Mul._from_args((S.NegativeOne, self), c) + + def __abs__(self) -> Expr: + from sympy.functions.elementary.complexes import Abs + return Abs(self) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__radd__') + def __add__(self, other) -> Expr: + return Add(self, other) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__add__') + def __radd__(self, other) -> Expr: + return Add(other, self) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__rsub__') + def __sub__(self, other) -> Expr: + return Add(self, -other) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__sub__') + def __rsub__(self, other) -> Expr: + return Add(other, -self) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__rmul__') + def __mul__(self, other) -> Expr: + return Mul(self, other) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__mul__') + def __rmul__(self, other) -> Expr: + return Mul(other, self) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__rpow__') + def _pow(self, other): + return Pow(self, other) + + def __pow__(self, other, mod=None) -> Expr: + if mod is None: + return self._pow(other) + try: + _self, other, mod = as_int(self), as_int(other), as_int(mod) + if other >= 0: + return _sympify(pow(_self, other, mod)) + else: + return _sympify(mod_inverse(pow(_self, -other, mod), mod)) + except ValueError: + power = self._pow(other) + try: + return power%mod + except TypeError: + return NotImplemented + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__pow__') + def __rpow__(self, other) -> Expr: + return Pow(other, self) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__rtruediv__') + def __truediv__(self, other) -> Expr: + denom = Pow(other, S.NegativeOne) + if self is S.One: + return denom + else: + return Mul(self, denom) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__truediv__') + def __rtruediv__(self, other) -> Expr: + denom = Pow(self, S.NegativeOne) + if other is S.One: + return denom + else: + return Mul(other, denom) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__rmod__') + def __mod__(self, other) -> Expr: + return Mod(self, other) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__mod__') + def __rmod__(self, other) -> Expr: + return Mod(other, self) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__rfloordiv__') + def __floordiv__(self, other) -> Expr: + from sympy.functions.elementary.integers import floor + return floor(self / other) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__floordiv__') + def __rfloordiv__(self, other) -> Expr: + from sympy.functions.elementary.integers import floor + return floor(other / self) + + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__rdivmod__') + def __divmod__(self, other) -> tuple[Expr, Expr]: + from sympy.functions.elementary.integers import floor + return floor(self / other), Mod(self, other) + + @sympify_return([('other', 'Expr')], NotImplemented) + @call_highest_priority('__divmod__') + def __rdivmod__(self, other) -> tuple[Expr, Expr]: + from sympy.functions.elementary.integers import floor + return floor(other / self), Mod(other, self) + + def __int__(self) -> int: + if not self.is_number: + raise TypeError("Cannot convert symbols to int") + r = self.round(2) + if not r.is_Number: + raise TypeError("Cannot convert complex to int") + if r in (S.NaN, S.Infinity, S.NegativeInfinity): + raise TypeError("Cannot convert %s to int" % r) + i = int(r) + if not i: + return i + if int_valued(r): + # non-integer self should pass one of these tests + if (self > i) is S.true: + return i + if (self < i) is S.true: + return i - 1 + ok = self.equals(i) + if ok is None: + raise TypeError('cannot compute int value accurately') + if ok: + return i + # off by one + return i - (1 if i > 0 else -1) + return i + + def __float__(self) -> float: + # Don't bother testing if it's a number; if it's not this is going + # to fail, and if it is we still need to check that it evalf'ed to + # a number. + result = self.evalf() + if result.is_Number: + return float(result) + if result.is_number and result.as_real_imag()[1]: + raise TypeError("Cannot convert complex to float") + raise TypeError("Cannot convert expression to float") + + def __complex__(self) -> complex: + result = self.evalf() + re, im = result.as_real_imag() + return complex(float(re), float(im)) + + @sympify_return([('other', 'Expr')], NotImplemented) + def __ge__(self, other): + from .relational import GreaterThan + return GreaterThan(self, other) + + @sympify_return([('other', 'Expr')], NotImplemented) + def __le__(self, other): + from .relational import LessThan + return LessThan(self, other) + + @sympify_return([('other', 'Expr')], NotImplemented) + def __gt__(self, other): + from .relational import StrictGreaterThan + return StrictGreaterThan(self, other) + + @sympify_return([('other', 'Expr')], NotImplemented) + def __lt__(self, other): + from .relational import StrictLessThan + return StrictLessThan(self, other) + + def __trunc__(self): + if not self.is_number: + raise TypeError("Cannot truncate symbols and expressions") + else: + return Integer(self) + + def __format__(self, format_spec: str): + if self.is_number: + mt = re.match(r'\+?\d*\.(\d+)f', format_spec) + if mt: + prec = int(mt.group(1)) + rounded = self.round(prec) + if rounded.is_Integer: + return format(int(rounded), format_spec) + if rounded.is_Float: + return format(rounded, format_spec) + return super().__format__(format_spec) + + @staticmethod + def _from_mpmath(x, prec): + if hasattr(x, "_mpf_"): + return Float._new(x._mpf_, prec) + elif hasattr(x, "_mpc_"): + re, im = x._mpc_ + re = Float._new(re, prec) + im = Float._new(im, prec)*S.ImaginaryUnit + return re + im + else: + raise TypeError("expected mpmath number (mpf or mpc)") + + @property + def is_number(self): + """Returns True if ``self`` has no free symbols and no + undefined functions (AppliedUndef, to be precise). It will be + faster than ``if not self.free_symbols``, however, since + ``is_number`` will fail as soon as it hits a free symbol + or undefined function. + + Examples + ======== + + >>> from sympy import Function, Integral, cos, sin, pi + >>> from sympy.abc import x + >>> f = Function('f') + + >>> x.is_number + False + >>> f(1).is_number + False + >>> (2*x).is_number + False + >>> (2 + Integral(2, x)).is_number + False + >>> (2 + Integral(2, (x, 1, 2))).is_number + True + + Not all numbers are Numbers in the SymPy sense: + + >>> pi.is_number, pi.is_Number + (True, False) + + If something is a number it should evaluate to a number with + real and imaginary parts that are Numbers; the result may not + be comparable, however, since the real and/or imaginary part + of the result may not have precision. + + >>> cos(1).is_number and cos(1).is_comparable + True + + >>> z = cos(1)**2 + sin(1)**2 - 1 + >>> z.is_number + True + >>> z.is_comparable + False + + See Also + ======== + + sympy.core.basic.Basic.is_comparable + """ + return all(obj.is_number for obj in self.args) + + def _eval_is_comparable(self): + # Basic._eval_is_comparable always returns False, so we override it + # here + is_extended_real = self.is_extended_real + if is_extended_real is False: + return False + if not self.is_number: + return False + + # XXX: as_real_imag() can be a very expensive operation. It should not + # be used here because is_comparable is used implicitly in many places. + # Probably this method should just return self.evalf(2).is_Number. + + n, i = self.as_real_imag() + + if not n.is_Number: + n = n.evalf(2) + if not n.is_Number: + return False + + if not i.is_Number: + i = i.evalf(2) + if not i.is_Number: + return False + + if i: + # if _prec = 1 we can't decide and if not, + # the answer is False because numbers with + # imaginary parts can't be compared + # so return False + return False + else: + return n._prec != 1 + + def _random(self, n=None, re_min=-1, im_min=-1, re_max=1, im_max=1): + """Return self evaluated, if possible, replacing free symbols with + random complex values, if necessary. + + Explanation + =========== + + The random complex value for each free symbol is generated + by the random_complex_number routine giving real and imaginary + parts in the range given by the re_min, re_max, im_min, and im_max + values. The returned value is evaluated to a precision of n + (if given) else the maximum of 15 and the precision needed + to get more than 1 digit of precision. If the expression + could not be evaluated to a number, or could not be evaluated + to more than 1 digit of precision, then None is returned. + + Examples + ======== + + >>> from sympy import sqrt + >>> from sympy.abc import x, y + >>> x._random() # doctest: +SKIP + 0.0392918155679172 + 0.916050214307199*I + >>> x._random(2) # doctest: +SKIP + -0.77 - 0.87*I + >>> (x + y/2)._random(2) # doctest: +SKIP + -0.57 + 0.16*I + >>> sqrt(2)._random(2) + 1.4 + + See Also + ======== + + sympy.core.random.random_complex_number + """ + + free = self.free_symbols + prec = 1 + if free: + from sympy.core.random import random_complex_number + a, c, b, d = re_min, re_max, im_min, im_max + reps = dict(list(zip(free, [random_complex_number(a, b, c, d, rational=True) + for zi in free]))) + try: + nmag = abs(self.evalf(2, subs=reps)) + except (ValueError, TypeError): + # if an out of range value resulted in evalf problems + # then return None -- XXX is there a way to know how to + # select a good random number for a given expression? + # e.g. when calculating n! negative values for n should not + # be used + return None + else: + reps = {} + nmag = abs(self.evalf(2)) + + if not hasattr(nmag, '_prec'): + # e.g. exp_polar(2*I*pi) doesn't evaluate but is_number is True + return None + + if nmag._prec == 1: + # increase the precision up to the default maximum + # precision to see if we can get any significance + + # evaluate + for prec in giant_steps(2, DEFAULT_MAXPREC): + nmag = abs(self.evalf(prec, subs=reps)) + if nmag._prec != 1: + break + + if nmag._prec != 1: + if n is None: + n = max(prec, 15) + return self.evalf(n, subs=reps) + + # never got any significance + return None + + def is_constant(self, *wrt, **flags): + """Return True if self is constant, False if not, or None if + the constancy could not be determined conclusively. + + Explanation + =========== + + If an expression has no free symbols then it is a constant. If + there are free symbols it is possible that the expression is a + constant, perhaps (but not necessarily) zero. To test such + expressions, a few strategies are tried: + + 1) numerical evaluation at two random points. If two such evaluations + give two different values and the values have a precision greater than + 1 then self is not constant. If the evaluations agree or could not be + obtained with any precision, no decision is made. The numerical testing + is done only if ``wrt`` is different than the free symbols. + + 2) differentiation with respect to variables in 'wrt' (or all free + symbols if omitted) to see if the expression is constant or not. This + will not always lead to an expression that is zero even though an + expression is constant (see added test in test_expr.py). If + all derivatives are zero then self is constant with respect to the + given symbols. + + 3) finding out zeros of denominator expression with free_symbols. + It will not be constant if there are zeros. It gives more negative + answers for expression that are not constant. + + If neither evaluation nor differentiation can prove the expression is + constant, None is returned unless two numerical values happened to be + the same and the flag ``failing_number`` is True -- in that case the + numerical value will be returned. + + If flag simplify=False is passed, self will not be simplified; + the default is True since self should be simplified before testing. + + Examples + ======== + + >>> from sympy import cos, sin, Sum, S, pi + >>> from sympy.abc import a, n, x, y + >>> x.is_constant() + False + >>> S(2).is_constant() + True + >>> Sum(x, (x, 1, 10)).is_constant() + True + >>> Sum(x, (x, 1, n)).is_constant() + False + >>> Sum(x, (x, 1, n)).is_constant(y) + True + >>> Sum(x, (x, 1, n)).is_constant(n) + False + >>> Sum(x, (x, 1, n)).is_constant(x) + True + >>> eq = a*cos(x)**2 + a*sin(x)**2 - a + >>> eq.is_constant() + True + >>> eq.subs({x: pi, a: 2}) == eq.subs({x: pi, a: 3}) == 0 + True + + >>> (0**x).is_constant() + False + >>> x.is_constant() + False + >>> (x**x).is_constant() + False + >>> one = cos(x)**2 + sin(x)**2 + >>> one.is_constant() + True + >>> ((one - 1)**(x + 1)).is_constant() in (True, False) # could be 0 or 1 + True + """ + + simplify = flags.get('simplify', True) + + if self.is_number: + return True + free = self.free_symbols + if not free: + return True # assume f(1) is some constant + + # if we are only interested in some symbols and they are not in the + # free symbols then this expression is constant wrt those symbols + wrt = set(wrt) + if wrt and not wrt & free: + return True + wrt = wrt or free + + # simplify unless this has already been done + expr = self + if simplify: + expr = expr.simplify() + + # is_zero should be a quick assumptions check; it can be wrong for + # numbers (see test_is_not_constant test), giving False when it + # shouldn't, but hopefully it will never give True unless it is sure. + if expr.is_zero: + return True + + # Don't attempt substitution or differentiation with non-number symbols + wrt_number = {sym for sym in wrt if sym.kind is NumberKind} + + # try numerical evaluation to see if we get two different values + failing_number = None + if wrt_number == free: + # try 0 (for a) and 1 (for b) + try: + a = expr.subs(list(zip(free, [0]*len(free))), + simultaneous=True) + if a is S.NaN: + # evaluation may succeed when substitution fails + a = expr._random(None, 0, 0, 0, 0) + except ZeroDivisionError: + a = None + if a is not None and a is not S.NaN: + try: + b = expr.subs(list(zip(free, [1]*len(free))), + simultaneous=True) + if b is S.NaN: + # evaluation may succeed when substitution fails + b = expr._random(None, 1, 0, 1, 0) + except ZeroDivisionError: + b = None + if b is not None and b is not S.NaN and b.equals(a) is False: + return False + # try random real + b = expr._random(None, -1, 0, 1, 0) + if b is not None and b is not S.NaN and b.equals(a) is False: + return False + # try random complex + b = expr._random() + if b is not None and b is not S.NaN: + if b.equals(a) is False: + return False + failing_number = a if a.is_number else b + + # now we will test each wrt symbol (or all free symbols) to see if the + # expression depends on them or not using differentiation. This is + # not sufficient for all expressions, however, so we don't return + # False if we get a derivative other than 0 with free symbols. + for w in wrt_number: + deriv = expr.diff(w) + if simplify: + deriv = deriv.simplify() + if deriv != 0: + if not (pure_complex(deriv, or_real=True)): + if flags.get('failing_number', False): + return failing_number + return False + from sympy.solvers.solvers import denoms + return fuzzy_not(fuzzy_or(den.is_zero for den in denoms(self))) + + def equals(self, other, failing_expression=False): + """Return True if self == other, False if it does not, or None. If + failing_expression is True then the expression which did not simplify + to a 0 will be returned instead of None. + + Explanation + =========== + + If ``self`` is a Number (or complex number) that is not zero, then + the result is False. + + If ``self`` is a number and has not evaluated to zero, evalf will be + used to test whether the expression evaluates to zero. If it does so + and the result has significance (i.e. the precision is either -1, for + a Rational result, or is greater than 1) then the evalf value will be + used to return True or False. + + """ + from sympy.simplify.simplify import nsimplify, simplify + from sympy.solvers.solvers import solve + from sympy.polys.polyerrors import NotAlgebraic + from sympy.polys.numberfields import minimal_polynomial + + other = sympify(other) + + if not isinstance(other, Expr): + return False + + if self == other: + return True + + # they aren't the same so see if we can make the difference 0; + # don't worry about doing simplification steps one at a time + # because if the expression ever goes to 0 then the subsequent + # simplification steps that are done will be very fast. + diff = factor_terms(simplify(self - other), radical=True) + + if not diff: + return True + + if not diff.has(Add, Mod): + # if there is no expanding to be done after simplifying + # then this can't be a zero + return False + + factors = diff.as_coeff_mul()[1] + if len(factors) > 1: # avoid infinity recursion + fac_zero = [fac.equals(0) for fac in factors] + if None not in fac_zero: # every part can be decided + return any(fac_zero) + + constant = diff.is_constant(simplify=False, failing_number=True) + + if constant is False: + return False + + if not diff.is_number: + if constant is None: + # e.g. unless the right simplification is done, a symbolic + # zero is possible (see expression of issue 6829: without + # simplification constant will be None). + return + + if constant is True: + # this gives a number whether there are free symbols or not + ndiff = diff._random() + # is_comparable will work whether the result is real + # or complex; it could be None, however. + if ndiff and ndiff.is_comparable: + return False + + # sometimes we can use a simplified result to give a clue as to + # what the expression should be; if the expression is *not* zero + # then we should have been able to compute that and so now + # we can just consider the cases where the approximation appears + # to be zero -- we try to prove it via minimal_polynomial. + # + # removed + # ns = nsimplify(diff) + # if diff.is_number and (not ns or ns == diff): + # + # The thought was that if it nsimplifies to 0 that's a sure sign + # to try the following to prove it; or if it changed but wasn't + # zero that might be a sign that it's not going to be easy to + # prove. But tests seem to be working without that logic. + # + if diff.is_number: + # try to prove via self-consistency + surds = [s for s in diff.atoms(Pow) if s.args[0].is_Integer] + # it seems to work better to try big ones first + surds.sort(key=lambda x: -x.args[0]) + for s in surds: + try: + # simplify is False here -- this expression has already + # been identified as being hard to identify as zero; + # we will handle the checking ourselves using nsimplify + # to see if we are in the right ballpark or not and if so + # *then* the simplification will be attempted. + sol = solve(diff, s, simplify=False) + if sol: + if s in sol: + # the self-consistent result is present + return True + if all(si.is_Integer for si in sol): + # perfect powers are removed at instantiation + # so surd s cannot be an integer + return False + if all(i.is_algebraic is False for i in sol): + # a surd is algebraic + return False + if any(si in surds for si in sol): + # it wasn't equal to s but it is in surds + # and different surds are not equal + return False + if any(nsimplify(s - si) == 0 and + simplify(s - si) == 0 for si in sol): + return True + if s.is_real: + if any(nsimplify(si, [s]) == s and simplify(si) == s + for si in sol): + return True + except NotImplementedError: + pass + + # try to prove with minimal_polynomial but know when + # *not* to use this or else it can take a long time. e.g. issue 8354 + if True: # change True to condition that assures non-hang + try: + mp = minimal_polynomial(diff) + if mp.is_Symbol: + return True + return False + except (NotAlgebraic, NotImplementedError): + pass + + # diff has not simplified to zero; constant is either None, True + # or the number with significance (is_comparable) that was randomly + # calculated twice as the same value. + if constant not in (True, None) and constant != 0: + return False + + if failing_expression: + return diff + return None + + def _eval_is_extended_positive_negative(self, positive): + from sympy.polys.numberfields import minimal_polynomial + from sympy.polys.polyerrors import NotAlgebraic + if self.is_number: + # check to see that we can get a value + try: + n2 = self._eval_evalf(2) + # XXX: This shouldn't be caught here + # Catches ValueError: hypsum() failed to converge to the requested + # 34 bits of accuracy + except ValueError: + return None + if n2 is None: + return None + if getattr(n2, '_prec', 1) == 1: # no significance + return None + if n2 is S.NaN: + return None + + f = self.evalf(2) + if f.is_Float: + match = f, S.Zero + else: + match = pure_complex(f) + if match is None: + return False + r, i = match + if not (i.is_Number and r.is_Number): + return False + if r._prec != 1 and i._prec != 1: + return bool(not i and ((r > 0) if positive else (r < 0))) + elif r._prec == 1 and (not i or i._prec == 1) and \ + self._eval_is_algebraic() and not self.has(Function): + try: + if minimal_polynomial(self).is_Symbol: + return False + except (NotAlgebraic, NotImplementedError): + pass + + def _eval_is_extended_positive(self): + return self._eval_is_extended_positive_negative(positive=True) + + def _eval_is_extended_negative(self): + return self._eval_is_extended_positive_negative(positive=False) + + def _eval_interval(self, x, a, b): + """ + Returns evaluation over an interval. For most functions this is: + + self.subs(x, b) - self.subs(x, a), + + possibly using limit() if NaN is returned from subs, or if + singularities are found between a and b. + + If b or a is None, it only evaluates -self.subs(x, a) or self.subs(b, x), + respectively. + + """ + from sympy.calculus.accumulationbounds import AccumBounds + from sympy.functions.elementary.exponential import log + from sympy.series.limits import limit, Limit + from sympy.sets.sets import Interval + from sympy.solvers.solveset import solveset + + if (a is None and b is None): + raise ValueError('Both interval ends cannot be None.') + + def _eval_endpoint(left): + c = a if left else b + if c is None: + return S.Zero + else: + C = self.subs(x, c) + if C.has(S.NaN, S.Infinity, S.NegativeInfinity, + S.ComplexInfinity, AccumBounds): + if (a < b) != False: + C = limit(self, x, c, "+" if left else "-") + else: + C = limit(self, x, c, "-" if left else "+") + + if isinstance(C, Limit): + raise NotImplementedError("Could not compute limit") + return C + + if a == b: + return S.Zero + + A = _eval_endpoint(left=True) + if A is S.NaN: + return A + + B = _eval_endpoint(left=False) + + if (a and b) is None: + return B - A + + value = B - A + + if a.is_comparable and b.is_comparable: + if a < b: + domain = Interval(a, b) + else: + domain = Interval(b, a) + # check the singularities of self within the interval + # if singularities is a ConditionSet (not iterable), catch the exception and pass + singularities = solveset(self.cancel().as_numer_denom()[1], x, + domain=domain) + for logterm in self.atoms(log): + singularities = singularities | solveset(logterm.args[0], x, + domain=domain) + try: + for s in singularities: + if value is S.NaN: + # no need to keep adding, it will stay NaN + break + if not s.is_comparable: + continue + if (a < s) == (s < b) == True: + value += -limit(self, x, s, "+") + limit(self, x, s, "-") + elif (b < s) == (s < a) == True: + value += limit(self, x, s, "+") - limit(self, x, s, "-") + except TypeError: + pass + + return value + + def _eval_power(self, expt) -> Expr | None: + # subclass to compute self**other for cases when + # other is not NaN, 0, or 1 + return None + + def _eval_conjugate(self): + if self.is_extended_real: + return self + elif self.is_imaginary: + return -self + + def conjugate(self): + """Returns the complex conjugate of 'self'.""" + from sympy.functions.elementary.complexes import conjugate as c + return c(self) + + def dir(self, x, cdir): + if self.is_zero: + return S.Zero + from sympy.functions.elementary.exponential import log + minexp = S.Zero + arg = self + while arg: + minexp += S.One + arg = arg.diff(x) + coeff = arg.subs(x, 0) + if coeff is S.NaN: + coeff = arg.limit(x, 0) + if coeff is S.ComplexInfinity: + try: + coeff, _ = arg.leadterm(x) + if coeff.has(log(x)): + raise ValueError() + except ValueError: + coeff = arg.limit(x, 0) + if coeff != S.Zero: + break + return coeff*cdir**minexp + + def _eval_transpose(self): + from sympy.functions.elementary.complexes import conjugate + if self.is_commutative: + return self + elif self.is_hermitian: + return conjugate(self) + elif self.is_antihermitian: + return -conjugate(self) + + def transpose(self): + from sympy.functions.elementary.complexes import transpose + return transpose(self) + + def _eval_adjoint(self): + from sympy.functions.elementary.complexes import conjugate, transpose + if self.is_hermitian: + return self + elif self.is_antihermitian: + return -self + obj = self._eval_conjugate() + if obj is not None: + return transpose(obj) + obj = self._eval_transpose() + if obj is not None: + return conjugate(obj) + + def adjoint(self): + from sympy.functions.elementary.complexes import adjoint + return adjoint(self) + + @classmethod + def _parse_order(cls, order): + """Parse and configure the ordering of terms. """ + from sympy.polys.orderings import monomial_key + + startswith = getattr(order, "startswith", None) + if startswith is None: + reverse = False + else: + reverse = startswith('rev-') + if reverse: + order = order[4:] + + monom_key = monomial_key(order) + + def neg(monom): + return tuple([neg(m) if isinstance(m, tuple) else -m for m in monom]) + + def key(term): + _, ((re, im), monom, ncpart) = term + + monom = neg(monom_key(monom)) + ncpart = tuple([e.sort_key(order=order) for e in ncpart]) + coeff = ((bool(im), im), (re, im)) + + return monom, ncpart, coeff + + return key, reverse + + def as_ordered_factors(self, order=None): + """Return list of ordered factors (if Mul) else [self].""" + return [self] + + def as_poly(self, *gens, **args): + """Converts ``self`` to a polynomial or returns ``None``. + + Explanation + =========== + + >>> from sympy import sin + >>> from sympy.abc import x, y + + >>> print((x**2 + x*y).as_poly()) + Poly(x**2 + x*y, x, y, domain='ZZ') + + >>> print((x**2 + x*y).as_poly(x, y)) + Poly(x**2 + x*y, x, y, domain='ZZ') + + >>> print((x**2 + sin(y)).as_poly(x, y)) + None + + """ + from sympy.polys.polyerrors import PolynomialError, GeneratorsNeeded + from sympy.polys.polytools import Poly + + try: + poly = Poly(self, *gens, **args) + + if not poly.is_Poly: + return None + else: + return poly + except (PolynomialError, GeneratorsNeeded): + # PolynomialError is caught for e.g. exp(x).as_poly(x) + # GeneratorsNeeded is caught for e.g. S(2).as_poly() + return None + + def as_ordered_terms(self, order=None, data=False): + """ + Transform an expression to an ordered list of terms. + + Examples + ======== + + >>> from sympy import sin, cos + >>> from sympy.abc import x + + >>> (sin(x)**2*cos(x) + sin(x)**2 + 1).as_ordered_terms() + [sin(x)**2*cos(x), sin(x)**2, 1] + + """ + + from .numbers import Number, NumberSymbol + + if order is None and self.is_Add: + # Spot the special case of Add(Number, Mul(Number, expr)) with the + # first number positive and the second number negative + key = lambda x:not isinstance(x, (Number, NumberSymbol)) + add_args = sorted(Add.make_args(self), key=key) + if (len(add_args) == 2 + and isinstance(add_args[0], (Number, NumberSymbol)) + and isinstance(add_args[1], Mul)): + mul_args = sorted(Mul.make_args(add_args[1]), key=key) + if (len(mul_args) == 2 + and isinstance(mul_args[0], Number) + and add_args[0].is_positive + and mul_args[0].is_negative): + return add_args + + key, reverse = self._parse_order(order) + terms, gens = self.as_terms() + + if not any(term.is_Order for term, _ in terms): + ordered = sorted(terms, key=key, reverse=reverse) + else: + _terms, _order = [], [] + + for term, repr in terms: + if not term.is_Order: + _terms.append((term, repr)) + else: + _order.append((term, repr)) + + ordered = sorted(_terms, key=key, reverse=True) \ + + sorted(_order, key=key, reverse=True) + + if data: + return ordered, gens + else: + return [term for term, _ in ordered] + + def as_terms(self): + """Transform an expression to a list of terms. """ + from .exprtools import decompose_power + + gens, terms = set(), [] + + for term in Add.make_args(self): + coeff, _term = term.as_coeff_Mul() + + coeff = complex(coeff) + cpart, ncpart = {}, [] + + if _term is not S.One: + for factor in Mul.make_args(_term): + if factor.is_number: + try: + coeff *= complex(factor) + except (TypeError, ValueError): + pass + else: + continue + + if factor.is_commutative: + base, exp = decompose_power(factor) + + cpart[base] = exp + gens.add(base) + else: + ncpart.append(factor) + + coeff = coeff.real, coeff.imag + ncpart = tuple(ncpart) + + terms.append((term, (coeff, cpart, ncpart))) + + gens = sorted(gens, key=default_sort_key) + + k, indices = len(gens), {} + + for i, g in enumerate(gens): + indices[g] = i + + result = [] + + for term, (coeff, cpart, ncpart) in terms: + monom = [0]*k + + for base, exp in cpart.items(): + monom[indices[base]] = exp + + result.append((term, (coeff, tuple(monom), ncpart))) + + return result, gens + + def removeO(self) -> Expr: + """Removes the additive O(..) symbol if there is one""" + return self + + def getO(self) -> Expr | None: + """Returns the additive O(..) symbol if there is one, else None.""" + return None + + def getn(self): + """ + Returns the order of the expression. + + Explanation + =========== + + The order is determined either from the O(...) term. If there + is no O(...) term, it returns None. + + Examples + ======== + + >>> from sympy import O + >>> from sympy.abc import x + >>> (1 + x + O(x**2)).getn() + 2 + >>> (1 + x).getn() + + """ + o = self.getO() + if o is None: + return None + elif o.is_Order: + o = o.expr + if o is S.One: + return S.Zero + if o.is_Symbol: + return S.One + if o.is_Pow: + return o.args[1] + if o.is_Mul: # x**n*log(x)**n or x**n/log(x)**n + for oi in o.args: + if oi.is_Symbol: + return S.One + if oi.is_Pow: + from .symbol import Dummy, Symbol + syms = oi.atoms(Symbol) + if len(syms) == 1: + x = syms.pop() + oi = oi.subs(x, Dummy('x', positive=True)) + if oi.base.is_Symbol and oi.exp.is_Rational: + return abs(oi.exp) + + raise NotImplementedError('not sure of order of %s' % o) + + def count_ops(self, visual=False): + from .function import count_ops + return count_ops(self, visual) + + def args_cnc(self, cset=False, warn=True, split_1=True): + """Return [commutative factors, non-commutative factors] of self. + + Explanation + =========== + + self is treated as a Mul and the ordering of the factors is maintained. + If ``cset`` is True the commutative factors will be returned in a set. + If there were repeated factors (as may happen with an unevaluated Mul) + then an error will be raised unless it is explicitly suppressed by + setting ``warn`` to False. + + Note: -1 is always separated from a Number unless split_1 is False. + + Examples + ======== + + >>> from sympy import symbols, oo + >>> A, B = symbols('A B', commutative=0) + >>> x, y = symbols('x y') + >>> (-2*x*y).args_cnc() + [[-1, 2, x, y], []] + >>> (-2.5*x).args_cnc() + [[-1, 2.5, x], []] + >>> (-2*x*A*B*y).args_cnc() + [[-1, 2, x, y], [A, B]] + >>> (-2*x*A*B*y).args_cnc(split_1=False) + [[-2, x, y], [A, B]] + >>> (-2*x*y).args_cnc(cset=True) + [{-1, 2, x, y}, []] + + The arg is always treated as a Mul: + + >>> (-2 + x + A).args_cnc() + [[], [x - 2 + A]] + >>> (-oo).args_cnc() # -oo is a singleton + [[-1, oo], []] + """ + args = list(Mul.make_args(self)) + + for i, mi in enumerate(args): + if not mi.is_commutative: + c = args[:i] + nc = args[i:] + break + else: + c = args + nc = [] + + if c and split_1 and ( + c[0].is_Number and + c[0].is_extended_negative and + c[0] is not S.NegativeOne): + c[:1] = [S.NegativeOne, -c[0]] + + if cset: + clen = len(c) + c = set(c) + if clen and warn and len(c) != clen: + raise ValueError('repeated commutative arguments: %s' % + [ci for ci in c if list(self.args).count(ci) > 1]) + return [c, nc] + + def coeff(self, x: Expr, n=1, right=False, _first=True): + """ + Returns the coefficient from the term(s) containing ``x**n``. If ``n`` + is zero then all terms independent of ``x`` will be returned. + + Explanation + =========== + + When ``x`` is noncommutative, the coefficient to the left (default) or + right of ``x`` can be returned. The keyword 'right' is ignored when + ``x`` is commutative. + + Examples + ======== + + >>> from sympy import symbols + >>> from sympy.abc import x, y, z + + You can select terms that have an explicit negative in front of them: + + >>> (-x + 2*y).coeff(-1) + x + >>> (x - 2*y).coeff(-1) + 2*y + + You can select terms with no Rational coefficient: + + >>> (x + 2*y).coeff(1) + x + >>> (3 + 2*x + 4*x**2).coeff(1) + 0 + + You can select terms independent of x by making n=0; in this case + expr.as_independent(x)[0] is returned (and 0 will be returned instead + of None): + + >>> (3 + 2*x + 4*x**2).coeff(x, 0) + 3 + >>> eq = ((x + 1)**3).expand() + 1 + >>> eq + x**3 + 3*x**2 + 3*x + 2 + >>> [eq.coeff(x, i) for i in reversed(range(4))] + [1, 3, 3, 2] + >>> eq -= 2 + >>> [eq.coeff(x, i) for i in reversed(range(4))] + [1, 3, 3, 0] + + You can select terms that have a numerical term in front of them: + + >>> (-x - 2*y).coeff(2) + -y + >>> from sympy import sqrt + >>> (x + sqrt(2)*x).coeff(sqrt(2)) + x + + The matching is exact: + + >>> (3 + 2*x + 4*x**2).coeff(x) + 2 + >>> (3 + 2*x + 4*x**2).coeff(x**2) + 4 + >>> (3 + 2*x + 4*x**2).coeff(x**3) + 0 + >>> (z*(x + y)**2).coeff((x + y)**2) + z + >>> (z*(x + y)**2).coeff(x + y) + 0 + + In addition, no factoring is done, so 1 + z*(1 + y) is not obtained + from the following: + + >>> (x + z*(x + x*y)).coeff(x) + 1 + + If such factoring is desired, factor_terms can be used first: + + >>> from sympy import factor_terms + >>> factor_terms(x + z*(x + x*y)).coeff(x) + z*(y + 1) + 1 + + >>> n, m, o = symbols('n m o', commutative=False) + >>> n.coeff(n) + 1 + >>> (3*n).coeff(n) + 3 + >>> (n*m + m*n*m).coeff(n) # = (1 + m)*n*m + 1 + m + >>> (n*m + m*n*m).coeff(n, right=True) # = (1 + m)*n*m + m + + If there is more than one possible coefficient 0 is returned: + + >>> (n*m + m*n).coeff(n) + 0 + + If there is only one possible coefficient, it is returned: + + >>> (n*m + x*m*n).coeff(m*n) + x + >>> (n*m + x*m*n).coeff(m*n, right=1) + 1 + + See Also + ======== + + as_coefficient: separate the expression into a coefficient and factor + as_coeff_Add: separate the additive constant from an expression + as_coeff_Mul: separate the multiplicative constant from an expression + as_independent: separate x-dependent terms/factors from others + sympy.polys.polytools.Poly.coeff_monomial: efficiently find the single coefficient of a monomial in Poly + sympy.polys.polytools.Poly.nth: like coeff_monomial but powers of monomial terms are used + """ + x = sympify(x) + if not isinstance(x, Basic): + return S.Zero + + n = as_int(n) + + if not x: + return S.Zero + + if x == self: + if n == 1: + return S.One + return S.Zero + + co2: list[Expr] + + if x is S.One: + co2 = [a for a in Add.make_args(self) if a.as_coeff_Mul()[0] is S.One] + if not co2: + return S.Zero + return Add(*co2) + + if n == 0: + if x.is_Add and self.is_Add: + c = self.coeff(x, right=right) + if not c: + return S.Zero + if not right: + return self - Add(*[a*x for a in Add.make_args(c)]) + return self - Add(*[x*a for a in Add.make_args(c)]) + return self.as_independent(x, as_Add=True)[0] + + # continue with the full method, looking for this power of x: + x = x**n + + def incommon(l1, l2): + if not l1 or not l2: + return [] + n = min(len(l1), len(l2)) + for i in range(n): + if l1[i] != l2[i]: + return l1[:i] + return l1[:] + + def find(l, sub, first=True): + """ Find where list sub appears in list l. When ``first`` is True + the first occurrence from the left is returned, else the last + occurrence is returned. Return None if sub is not in l. + + Examples + ======== + + >> l = range(5)*2 + >> find(l, [2, 3]) + 2 + >> find(l, [2, 3], first=0) + 7 + >> find(l, [2, 4]) + None + + """ + if not sub or not l or len(sub) > len(l): + return None + n = len(sub) + if not first: + l.reverse() + sub.reverse() + for i in range(len(l) - n + 1): + if all(l[i + j] == sub[j] for j in range(n)): + break + else: + i = None + if not first: + l.reverse() + sub.reverse() + if i is not None and not first: + i = len(l) - (i + n) + return i + + co2 = [] + co: list[tuple[set[Expr], list[Expr]]] = [] + args = Add.make_args(self) + self_c = self.is_commutative + x_c = x.is_commutative + if self_c and not x_c: + return S.Zero + if _first and self.is_Add and not self_c and not x_c: + # get the part that depends on x exactly + xargs = Mul.make_args(x) + d = Add(*[i for i in Add.make_args(self.as_independent(x)[1]) + if all(xi in Mul.make_args(i) for xi in xargs)]) + rv = d.coeff(x, right=right, _first=False) + if not rv.is_Add or not right: + return rv + c_part, nc_part = zip(*[i.args_cnc() for i in rv.args]) + if has_variety(c_part): + return rv + return Add(*[Mul._from_args(i) for i in nc_part]) + + one_c = self_c or x_c + xargs, nx = x.args_cnc(cset=True, warn=bool(not x_c)) + # find the parts that pass the commutative terms + for a in args: + margs, nc = a.args_cnc(cset=True, warn=bool(not self_c)) + if nc is None: + nc = [] + if len(xargs) > len(margs): + continue + resid = margs.difference(xargs) + if len(resid) + len(xargs) == len(margs): + if one_c: + co2.append(Mul(*(list(resid) + nc))) + else: + co.append((resid, nc)) + if one_c: + if co2 == []: + return S.Zero + elif co2: + return Add(*co2) + else: # both nc + # now check the non-comm parts + if not co: + return S.Zero + if all(n == co[0][1] for r, n in co): + ii = find(co[0][1], nx, right) + if ii is not None: + if not right: + return Mul(Add(*[Mul(*r) for r, c in co]), Mul(*co[0][1][:ii])) + else: + return Mul(*co[0][1][ii + len(nx):]) + beg = reduce(incommon, (n[1] for n in co)) + if beg: + ii = find(beg, nx, right) + if ii is not None: + if not right: + gcdc = co[0][0] + for i in range(1, len(co)): + gcdc = gcdc.intersection(co[i][0]) + if not gcdc: + break + return Mul(*(list(gcdc) + beg[:ii])) + else: + m = ii + len(nx) + return Add(*[Mul(*(list(r) + n[m:])) for r, n in co]) + end = list(reversed( + reduce(incommon, (list(reversed(n[1])) for n in co)))) + if end: + ii = find(end, nx, right) + if ii is not None: + if not right: + return Add(*[Mul(*(list(r) + n[:-len(end) + ii])) for r, n in co]) + else: + return Mul(*end[ii + len(nx):]) + # look for single match + hit = None + for i, (r, n) in enumerate(co): + ii = find(n, nx, right) + if ii is not None: + if not hit: + hit = ii, r, n + else: + break + else: + if hit: + ii, r, n = hit + if not right: + return Mul(*(list(r) + n[:ii])) + else: + return Mul(*n[ii + len(nx):]) + + return S.Zero + + def as_expr(self, *gens): + """ + Convert a polynomial to a SymPy expression. + + Examples + ======== + + >>> from sympy import sin + >>> from sympy.abc import x, y + + >>> f = (x**2 + x*y).as_poly(x, y) + >>> f.as_expr() + x**2 + x*y + + >>> sin(x).as_expr() + sin(x) + + """ + return self + + def as_coefficient(self, expr: Expr) -> Expr | None: + """ + Extracts symbolic coefficient at the given expression. In + other words, this functions separates 'self' into the product + of 'expr' and 'expr'-free coefficient. If such separation + is not possible it will return None. + + Examples + ======== + + >>> from sympy import E, pi, sin, I, Poly + >>> from sympy.abc import x + + >>> E.as_coefficient(E) + 1 + >>> (2*E).as_coefficient(E) + 2 + >>> (2*sin(E)*E).as_coefficient(E) + + Two terms have E in them so a sum is returned. (If one were + desiring the coefficient of the term exactly matching E then + the constant from the returned expression could be selected. + Or, for greater precision, a method of Poly can be used to + indicate the desired term from which the coefficient is + desired.) + + >>> (2*E + x*E).as_coefficient(E) + x + 2 + >>> _.args[0] # just want the exact match + 2 + >>> p = Poly(2*E + x*E); p + Poly(x*E + 2*E, x, E, domain='ZZ') + >>> p.coeff_monomial(E) + 2 + >>> p.nth(0, 1) + 2 + + Since the following cannot be written as a product containing + E as a factor, None is returned. (If the coefficient ``2*x`` is + desired then the ``coeff`` method should be used.) + + >>> (2*E*x + x).as_coefficient(E) + >>> (2*E*x + x).coeff(E) + 2*x + + >>> (E*(x + 1) + x).as_coefficient(E) + + >>> (2*pi*I).as_coefficient(pi*I) + 2 + >>> (2*I).as_coefficient(pi*I) + + See Also + ======== + + coeff: return sum of terms have a given factor + as_coeff_Add: separate the additive constant from an expression + as_coeff_Mul: separate the multiplicative constant from an expression + as_independent: separate x-dependent terms/factors from others + sympy.polys.polytools.Poly.coeff_monomial: efficiently find the single coefficient of a monomial in Poly + sympy.polys.polytools.Poly.nth: like coeff_monomial but powers of monomial terms are used + + + """ + + r = self.extract_multiplicatively(expr) + if r and not r.has(expr): + return r + else: + return None + + def as_independent(self, *deps, **hint) -> tuple[Expr, Expr]: + """ + A mostly naive separation of a Mul or Add into arguments that are not + are dependent on deps. To obtain as complete a separation of variables + as possible, use a separation method first, e.g.: + + * separatevars() to change Mul, Add and Pow (including exp) into Mul + * .expand(mul=True) to change Add or Mul into Add + * .expand(log=True) to change log expr into an Add + + The only non-naive thing that is done here is to respect noncommutative + ordering of variables and to always return (0, 0) for `self` of zero + regardless of hints. + + For nonzero `self`, the returned tuple (i, d) has the + following interpretation: + + * i will has no variable that appears in deps + * d will either have terms that contain variables that are in deps, or + be equal to 0 (when self is an Add) or 1 (when self is a Mul) + * if self is an Add then self = i + d + * if self is a Mul then self = i*d + * otherwise (self, S.One) or (S.One, self) is returned. + + To force the expression to be treated as an Add, use the hint as_Add=True + + Examples + ======== + + -- self is an Add + + >>> from sympy import sin, cos, exp + >>> from sympy.abc import x, y, z + + >>> (x + x*y).as_independent(x) + (0, x*y + x) + >>> (x + x*y).as_independent(y) + (x, x*y) + >>> (2*x*sin(x) + y + x + z).as_independent(x) + (y + z, 2*x*sin(x) + x) + >>> (2*x*sin(x) + y + x + z).as_independent(x, y) + (z, 2*x*sin(x) + x + y) + + -- self is a Mul + + >>> (x*sin(x)*cos(y)).as_independent(x) + (cos(y), x*sin(x)) + + non-commutative terms cannot always be separated out when self is a Mul + + >>> from sympy import symbols + >>> n1, n2, n3 = symbols('n1 n2 n3', commutative=False) + >>> (n1 + n1*n2).as_independent(n2) + (n1, n1*n2) + >>> (n2*n1 + n1*n2).as_independent(n2) + (0, n1*n2 + n2*n1) + >>> (n1*n2*n3).as_independent(n1) + (1, n1*n2*n3) + >>> (n1*n2*n3).as_independent(n2) + (n1, n2*n3) + >>> ((x-n1)*(x-y)).as_independent(x) + (1, (x - y)*(x - n1)) + + -- self is anything else: + + >>> (sin(x)).as_independent(x) + (1, sin(x)) + >>> (sin(x)).as_independent(y) + (sin(x), 1) + >>> exp(x+y).as_independent(x) + (1, exp(x + y)) + + -- force self to be treated as an Add: + + >>> (3*x).as_independent(x, as_Add=True) + (0, 3*x) + + -- force self to be treated as a Mul: + + >>> (3+x).as_independent(x, as_Add=False) + (1, x + 3) + >>> (-3+x).as_independent(x, as_Add=False) + (1, x - 3) + + Note how the below differs from the above in making the + constant on the dep term positive. + + >>> (y*(-3+x)).as_independent(x) + (y, x - 3) + + -- use .as_independent() for true independence testing instead + of .has(). The former considers only symbols in the free + symbols while the latter considers all symbols + + >>> from sympy import Integral + >>> I = Integral(x, (x, 1, 2)) + >>> I.has(x) + True + >>> x in I.free_symbols + False + >>> I.as_independent(x) == (I, 1) + True + >>> (I + x).as_independent(x) == (I, x) + True + + Note: when trying to get independent terms, a separation method + might need to be used first. In this case, it is important to keep + track of what you send to this routine so you know how to interpret + the returned values + + >>> from sympy import separatevars, log + >>> separatevars(exp(x+y)).as_independent(x) + (exp(y), exp(x)) + >>> (x + x*y).as_independent(y) + (x, x*y) + >>> separatevars(x + x*y).as_independent(y) + (x, y + 1) + >>> (x*(1 + y)).as_independent(y) + (x, y + 1) + >>> (x*(1 + y)).expand(mul=True).as_independent(y) + (x, x*y) + >>> a, b=symbols('a b', positive=True) + >>> (log(a*b).expand(log=True)).as_independent(b) + (log(a), log(b)) + + See Also + ======== + + separatevars + expand_log + sympy.core.add.Add.as_two_terms + sympy.core.mul.Mul.as_two_terms + as_coeff_mul + """ + from .symbol import Symbol + from .add import _unevaluated_Add + from .mul import _unevaluated_Mul + + if self is S.Zero: + return (self, self) + + func = self.func + want: type[Add] | type[Mul] + if hint.get('as_Add', isinstance(self, Add) ): + want = Add + else: + want = Mul + + # sift out deps into symbolic and other and ignore + # all symbols but those that are in the free symbols + sym = set() + other = [] + for d in deps: + if isinstance(d, Symbol): # Symbol.is_Symbol is True + sym.add(d) + else: + other.append(d) + + def has(e): + """return the standard has() if there are no literal symbols, else + check to see that symbol-deps are in the free symbols.""" + has_other = e.has(*other) + if not sym: + return has_other + return has_other or e.has(*(e.free_symbols & sym)) + + if (want is not func or + func is not Add and func is not Mul): + if has(self): + return (want.identity, self) + else: + return (self, want.identity) + else: + if func is Add: + args = list(self.args) + else: + args, nc = self.args_cnc() + + d = sift(args, has) + depend = d[True] + indep = d[False] + if func is Add: # all terms were treated as commutative + return (Add(*indep), _unevaluated_Add(*depend)) + else: # handle noncommutative by stopping at first dependent term + for i, n in enumerate(nc): + if has(n): + depend.extend(nc[i:]) + break + indep.append(n) + return Mul(*indep), _unevaluated_Mul(*depend) + + def as_real_imag(self, deep=True, **hints) -> tuple[Expr, Expr]: + """Performs complex expansion on 'self' and returns a tuple + containing collected both real and imaginary parts. This + method cannot be confused with re() and im() functions, + which does not perform complex expansion at evaluation. + + However it is possible to expand both re() and im() + functions and get exactly the same results as with + a single call to this function. + + >>> from sympy import symbols, I + + >>> x, y = symbols('x,y', real=True) + + >>> (x + y*I).as_real_imag() + (x, y) + + >>> from sympy.abc import z, w + + >>> (z + w*I).as_real_imag() + (re(z) - im(w), re(w) + im(z)) + + """ + if hints.get('ignore') == self: + return None # type: ignore + else: + from sympy.functions.elementary.complexes import im, re + return (re(self), im(self)) + + def as_powers_dict(self): + """Return self as a dictionary of factors with each factor being + treated as a power. The keys are the bases of the factors and the + values, the corresponding exponents. The resulting dictionary should + be used with caution if the expression is a Mul and contains non- + commutative factors since the order that they appeared will be lost in + the dictionary. + + See Also + ======== + as_ordered_factors: An alternative for noncommutative applications, + returning an ordered list of factors. + args_cnc: Similar to as_ordered_factors, but guarantees separation + of commutative and noncommutative factors. + """ + d = defaultdict(int) + d.update([self.as_base_exp()]) + return d + + def as_coefficients_dict(self, *syms): + """Return a dictionary mapping terms to their Rational coefficient. + Since the dictionary is a defaultdict, inquiries about terms which + were not present will return a coefficient of 0. + + If symbols ``syms`` are provided, any multiplicative terms + independent of them will be considered a coefficient and a + regular dictionary of syms-dependent generators as keys and + their corresponding coefficients as values will be returned. + + Examples + ======== + + >>> from sympy.abc import a, x, y + >>> (3*x + a*x + 4).as_coefficients_dict() + {1: 4, x: 3, a*x: 1} + >>> _[a] + 0 + >>> (3*a*x).as_coefficients_dict() + {a*x: 3} + >>> (3*a*x).as_coefficients_dict(x) + {x: 3*a} + >>> (3*a*x).as_coefficients_dict(y) + {1: 3*a*x} + + """ + d = defaultdict(list) + if not syms: + for ai in Add.make_args(self): + c, m = ai.as_coeff_Mul() + d[m].append(c) + for k, v in d.items(): + if len(v) == 1: + d[k] = v[0] + else: + d[k] = Add(*v) + else: + ind, dep = self.as_independent(*syms, as_Add=True) + for i in Add.make_args(dep): + if i.is_Mul: + c, x = i.as_coeff_mul(*syms) + if c is S.One: + d[i].append(c) + else: + d[i._new_rawargs(*x)].append(c) + elif i: + d[i].append(S.One) + d = {k: Add(*d[k]) for k in d} + if ind is not S.Zero: + d.update({S.One: ind}) + di = defaultdict(int) + di.update(d) + return di + + def as_base_exp(self) -> tuple[Expr, Expr]: + # a -> b ** e + return self, S.One + + def as_coeff_mul(self, *deps, **kwargs) -> tuple[Expr, tuple[Expr, ...]]: + """Return the tuple (c, args) where self is written as a Mul, ``m``. + + c should be a Rational multiplied by any factors of the Mul that are + independent of deps. + + args should be a tuple of all other factors of m; args is empty + if self is a Number or if self is independent of deps (when given). + + This should be used when you do not know if self is a Mul or not but + you want to treat self as a Mul or if you want to process the + individual arguments of the tail of self as a Mul. + + - if you know self is a Mul and want only the head, use self.args[0]; + - if you do not want to process the arguments of the tail but need the + tail then use self.as_two_terms() which gives the head and tail; + - if you want to split self into an independent and dependent parts + use ``self.as_independent(*deps)`` + + >>> from sympy import S + >>> from sympy.abc import x, y + >>> (S(3)).as_coeff_mul() + (3, ()) + >>> (3*x*y).as_coeff_mul() + (3, (x, y)) + >>> (3*x*y).as_coeff_mul(x) + (3*y, (x,)) + >>> (3*y).as_coeff_mul(x) + (3*y, ()) + """ + if deps: + if not self.has(*deps): + return self, () + return S.One, (self,) + + def as_coeff_add(self, *deps) -> tuple[Expr, tuple[Expr, ...]]: + """Return the tuple (c, args) where self is written as an Add, ``a``. + + c should be a Rational added to any terms of the Add that are + independent of deps. + + args should be a tuple of all other terms of ``a``; args is empty + if self is a Number or if self is independent of deps (when given). + + This should be used when you do not know if self is an Add or not but + you want to treat self as an Add or if you want to process the + individual arguments of the tail of self as an Add. + + - if you know self is an Add and want only the head, use self.args[0]; + - if you do not want to process the arguments of the tail but need the + tail then use self.as_two_terms() which gives the head and tail. + - if you want to split self into an independent and dependent parts + use ``self.as_independent(*deps)`` + + >>> from sympy import S + >>> from sympy.abc import x, y + >>> (S(3)).as_coeff_add() + (3, ()) + >>> (3 + x).as_coeff_add() + (3, (x,)) + >>> (3 + x + y).as_coeff_add(x) + (y + 3, (x,)) + >>> (3 + y).as_coeff_add(x) + (y + 3, ()) + + """ + if deps: + if not self.has_free(*deps): + return self, () + return S.Zero, (self,) + + def primitive(self) -> tuple[Number, Expr]: + """Return the positive Rational that can be extracted non-recursively + from every term of self (i.e., self is treated like an Add). This is + like the as_coeff_Mul() method but primitive always extracts a positive + Rational (never a negative or a Float). + + Examples + ======== + + >>> from sympy.abc import x + >>> (3*(x + 1)**2).primitive() + (3, (x + 1)**2) + >>> a = (6*x + 2); a.primitive() + (2, 3*x + 1) + >>> b = (x/2 + 3); b.primitive() + (1/2, x + 6) + >>> (a*b).primitive() == (1, a*b) + True + """ + if not self: + return S.One, S.Zero + c, r = self.as_coeff_Mul(rational=True) + if c.is_negative: + c, r = -c, -r + return c, r + + def as_content_primitive(self, radical=False, clear=True): + """This method should recursively remove a Rational from all arguments + and return that (content) and the new self (primitive). The content + should always be positive and ``Mul(*foo.as_content_primitive()) == foo``. + The primitive need not be in canonical form and should try to preserve + the underlying structure if possible (i.e. expand_mul should not be + applied to self). + + Examples + ======== + + >>> from sympy import sqrt + >>> from sympy.abc import x, y, z + + >>> eq = 2 + 2*x + 2*y*(3 + 3*y) + + The as_content_primitive function is recursive and retains structure: + + >>> eq.as_content_primitive() + (2, x + 3*y*(y + 1) + 1) + + Integer powers will have Rationals extracted from the base: + + >>> ((2 + 6*x)**2).as_content_primitive() + (4, (3*x + 1)**2) + >>> ((2 + 6*x)**(2*y)).as_content_primitive() + (1, (2*(3*x + 1))**(2*y)) + + Terms may end up joining once their as_content_primitives are added: + + >>> ((5*(x*(1 + y)) + 2*x*(3 + 3*y))).as_content_primitive() + (11, x*(y + 1)) + >>> ((3*(x*(1 + y)) + 2*x*(3 + 3*y))).as_content_primitive() + (9, x*(y + 1)) + >>> ((3*(z*(1 + y)) + 2.0*x*(3 + 3*y))).as_content_primitive() + (1, 6.0*x*(y + 1) + 3*z*(y + 1)) + >>> ((5*(x*(1 + y)) + 2*x*(3 + 3*y))**2).as_content_primitive() + (121, x**2*(y + 1)**2) + >>> ((x*(1 + y) + 0.4*x*(3 + 3*y))**2).as_content_primitive() + (1, 4.84*x**2*(y + 1)**2) + + Radical content can also be factored out of the primitive: + + >>> (2*sqrt(2) + 4*sqrt(10)).as_content_primitive(radical=True) + (2, sqrt(2)*(1 + 2*sqrt(5))) + + If clear=False (default is True) then content will not be removed + from an Add if it can be distributed to leave one or more + terms with integer coefficients. + + >>> (x/2 + y).as_content_primitive() + (1/2, x + 2*y) + >>> (x/2 + y).as_content_primitive(clear=False) + (1, x/2 + y) + """ + return S.One, self + + def as_numer_denom(self) -> tuple[Expr, Expr]: + """Return the numerator and the denominator of an expression. + + expression -> a/b -> a, b + + This is just a stub that should be defined by + an object's class methods to get anything else. + + See Also + ======== + + normal: return ``a/b`` instead of ``(a, b)`` + + """ + return self, S.One + + def normal(self): + """Return the expression as a fraction. + + expression -> a/b + + See Also + ======== + + as_numer_denom: return ``(a, b)`` instead of ``a/b`` + + """ + from .mul import _unevaluated_Mul + n, d = self.as_numer_denom() + if d is S.One: + return n + if d.is_Number: + return _unevaluated_Mul(n, 1/d) + else: + return n/d + + def extract_multiplicatively(self, c: Expr) -> Expr | None: + """Return None if it's not possible to make self in the form + c * something in a nice way, i.e. preserving the properties + of arguments of self. + + Examples + ======== + + >>> from sympy import symbols, Rational + + >>> x, y = symbols('x,y', real=True) + + >>> ((x*y)**3).extract_multiplicatively(x**2 * y) + x*y**2 + + >>> ((x*y)**3).extract_multiplicatively(x**4 * y) + + >>> (2*x).extract_multiplicatively(2) + x + + >>> (2*x).extract_multiplicatively(3) + + >>> (Rational(1, 2)*x).extract_multiplicatively(3) + x/6 + + """ + from sympy.functions.elementary.exponential import exp + from .add import _unevaluated_Add + c = sympify(c) + if self is S.NaN: + return None + if c is S.One: + return self + elif c == self: + return S.One + + if c.is_Add: + cc, pc = c.primitive() + if cc is not S.One: + c = Mul(cc, pc, evaluate=False) + + if c.is_Mul: + a, b = c.as_two_terms() # type: ignore + x = self.extract_multiplicatively(a) + if x is not None: + return x.extract_multiplicatively(b) + else: + return x + + quotient = self / c + if self.is_Number: + if self is S.Infinity: + if c.is_positive: + return S.Infinity + elif self is S.NegativeInfinity: + if c.is_negative: + return S.Infinity + elif c.is_positive: + return S.NegativeInfinity + elif self is S.ComplexInfinity: + if not c.is_zero: + return S.ComplexInfinity + elif self.is_Integer: + if not quotient.is_Integer: + return None + elif self.is_positive and quotient.is_negative: + return None + else: + return quotient + elif self.is_Rational: + if not quotient.is_Rational: + return None + elif self.is_positive and quotient.is_negative: + return None + else: + return quotient + elif self.is_Float: + if not quotient.is_Float: + return None + elif self.is_positive and quotient.is_negative: + return None + else: + return quotient + elif self.is_NumberSymbol or self.is_Symbol or self is S.ImaginaryUnit: + if quotient.is_Mul and len(quotient.args) == 2: + if quotient.args[0].is_Integer and quotient.args[0].is_positive and quotient.args[1] == self: + return quotient + elif quotient.is_Integer and c.is_Number: + return quotient + elif self.is_Add: + cs, ps = self.primitive() + # assert cs >= 1 + if c.is_Number and c is not S.NegativeOne: + # assert c != 1 (handled at top) + if cs is not S.One: + if c.is_negative: + xc = cs.extract_multiplicatively(-c) + if xc is not None: + xc = -xc + else: + xc = cs.extract_multiplicatively(c) + if xc is not None: + return xc*ps # rely on 2-arg Mul to restore Add + return None # |c| != 1 can only be extracted from cs + if c == ps: + return cs + # check args of ps + newargs = [] + arg: Expr + for arg in ps.args: # type: ignore + newarg = arg.extract_multiplicatively(c) + if newarg is None: + return None # all or nothing + newargs.append(newarg) + if cs is not S.One: + args = [cs*t for t in newargs] + # args may be in different order + return _unevaluated_Add(*args) + else: + return Add._from_args(newargs) + elif self.is_Mul: + args: list[Expr] = list(self.args) # type: ignore + for i, arg in enumerate(args): + newarg = arg.extract_multiplicatively(c) + if newarg is not None: + args[i] = newarg + return Mul(*args) + elif self.is_Pow or isinstance(self, exp): + sb, se = self.as_base_exp() + cb, ce = c.as_base_exp() + if cb == sb: + new_exp = se.extract_additively(ce) + if new_exp is not None: + return Pow(sb, new_exp) + elif c == sb: + new_exp = se.extract_additively(1) + if new_exp is not None: + return Pow(sb, new_exp) + + return None + + def extract_additively(self, c): + """Return self - c if it's possible to subtract c from self and + make all matching coefficients move towards zero, else return None. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> e = 2*x + 3 + >>> e.extract_additively(x + 1) + x + 2 + >>> e.extract_additively(3*x) + >>> e.extract_additively(4) + >>> (y*(x + 1)).extract_additively(x + 1) + >>> ((x + 1)*(x + 2*y + 1) + 3).extract_additively(x + 1) + (x + 1)*(x + 2*y) + 3 + + See Also + ======== + extract_multiplicatively + coeff + as_coefficient + + """ + + c = sympify(c) + if self is S.NaN: + return None + if c.is_zero: + return self + elif c == self: + return S.Zero + elif self == S.Zero: + return None + + if self.is_Number: + if not c.is_Number: + return None + co = self + diff = co - c + # XXX should we match types? i.e should 3 - .1 succeed? + if (co > 0 and diff >= 0 and diff < co or + co < 0 and diff <= 0 and diff > co): + return diff + return None + + if c.is_Number: + co, t = self.as_coeff_Add() + xa = co.extract_additively(c) + if xa is None: + return None + return xa + t + + # handle the args[0].is_Number case separately + # since we will have trouble looking for the coeff of + # a number. + if c.is_Add and c.args[0].is_Number: + # whole term as a term factor + co = self.coeff(c) + xa0 = (co.extract_additively(1) or 0)*c + if xa0: + diff = self - co*c + return (xa0 + (diff.extract_additively(c) or diff)) or None + # term-wise + h, t = c.as_coeff_Add() + sh, st = self.as_coeff_Add() + xa = sh.extract_additively(h) + if xa is None: + return None + xa2 = st.extract_additively(t) + if xa2 is None: + return None + return xa + xa2 + + # whole term as a term factor + co, diff = _corem(self, c) + xa0 = (co.extract_additively(1) or 0)*c + if xa0: + return (xa0 + (diff.extract_additively(c) or diff)) or None + # term-wise + coeffs = [] + for a in Add.make_args(c): + ac, at = a.as_coeff_Mul() + co = self.coeff(at) + if not co: + return None + coc, cot = co.as_coeff_Add() + xa = coc.extract_additively(ac) + if xa is None: + return None + self -= co*at + coeffs.append((cot + xa)*at) + coeffs.append(self) + return Add(*coeffs) + + @property + def expr_free_symbols(self): + """ + Like ``free_symbols``, but returns the free symbols only if + they are contained in an expression node. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> (x + y).expr_free_symbols # doctest: +SKIP + {x, y} + + If the expression is contained in a non-expression object, do not return + the free symbols. Compare: + + >>> from sympy import Tuple + >>> t = Tuple(x + y) + >>> t.expr_free_symbols # doctest: +SKIP + set() + >>> t.free_symbols + {x, y} + """ + sympy_deprecation_warning(""" + The expr_free_symbols property is deprecated. Use free_symbols to get + the free symbols of an expression. + """, + deprecated_since_version="1.9", + active_deprecations_target="deprecated-expr-free-symbols") + return {j for i in self.args for j in i.expr_free_symbols} + + def could_extract_minus_sign(self) -> bool: + """Return True if self has -1 as a leading factor or has + more literal negative signs than positive signs in a sum, + otherwise False. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> e = x - y + >>> {i.could_extract_minus_sign() for i in (e, -e)} + {False, True} + + Though the ``y - x`` is considered like ``-(x - y)``, since it + is in a product without a leading factor of -1, the result is + false below: + + >>> (x*(y - x)).could_extract_minus_sign() + False + + To put something in canonical form wrt to sign, use `signsimp`: + + >>> from sympy import signsimp + >>> signsimp(x*(y - x)) + -x*(x - y) + >>> _.could_extract_minus_sign() + True + """ + return False + + def extract_branch_factor(self, allow_half=False): + """ + Try to write self as ``exp_polar(2*pi*I*n)*z`` in a nice way. + Return (z, n). + + >>> from sympy import exp_polar, I, pi + >>> from sympy.abc import x, y + >>> exp_polar(I*pi).extract_branch_factor() + (exp_polar(I*pi), 0) + >>> exp_polar(2*I*pi).extract_branch_factor() + (1, 1) + >>> exp_polar(-pi*I).extract_branch_factor() + (exp_polar(I*pi), -1) + >>> exp_polar(3*pi*I + x).extract_branch_factor() + (exp_polar(x + I*pi), 1) + >>> (y*exp_polar(-5*pi*I)*exp_polar(3*pi*I + 2*pi*x)).extract_branch_factor() + (y*exp_polar(2*pi*x), -1) + >>> exp_polar(-I*pi/2).extract_branch_factor() + (exp_polar(-I*pi/2), 0) + + If allow_half is True, also extract exp_polar(I*pi): + + >>> exp_polar(I*pi).extract_branch_factor(allow_half=True) + (1, 1/2) + >>> exp_polar(2*I*pi).extract_branch_factor(allow_half=True) + (1, 1) + >>> exp_polar(3*I*pi).extract_branch_factor(allow_half=True) + (1, 3/2) + >>> exp_polar(-I*pi).extract_branch_factor(allow_half=True) + (1, -1/2) + """ + from sympy.functions.elementary.exponential import exp_polar + from sympy.functions.elementary.integers import ceiling + + n = S.Zero + res = S.One + args = Mul.make_args(self) + exps = [] + for arg in args: + if isinstance(arg, exp_polar): + exps += [arg.exp] + else: + res *= arg + piimult = S.Zero + extras = [] + + ipi = S.Pi*S.ImaginaryUnit + while exps: + exp = exps.pop() + if exp.is_Add: + exps += exp.args + continue + if exp.is_Mul: + coeff = exp.as_coefficient(ipi) + if coeff is not None: + piimult += coeff + continue + extras += [exp] + if piimult.is_number: + coeff = piimult + tail = () + else: + coeff, tail = piimult.as_coeff_add(*piimult.free_symbols) + # round down to nearest multiple of 2 + branchfact = ceiling(coeff/2 - S.Half)*2 + n += branchfact/2 + c = coeff - branchfact + if allow_half: + nc = c.extract_additively(1) + if nc is not None: + n += S.Half + c = nc + newexp = ipi*Add(*((c, ) + tail)) + Add(*extras) + if newexp != 0: + res *= exp_polar(newexp) + return res, n + + def is_polynomial(self, *syms): + r""" + Return True if self is a polynomial in syms and False otherwise. + + This checks if self is an exact polynomial in syms. This function + returns False for expressions that are "polynomials" with symbolic + exponents. Thus, you should be able to apply polynomial algorithms to + expressions for which this returns True, and Poly(expr, \*syms) should + work if and only if expr.is_polynomial(\*syms) returns True. The + polynomial does not have to be in expanded form. If no symbols are + given, all free symbols in the expression will be used. + + This is not part of the assumptions system. You cannot do + Symbol('z', polynomial=True). + + Examples + ======== + + >>> from sympy import Symbol, Function + >>> x = Symbol('x') + >>> ((x**2 + 1)**4).is_polynomial(x) + True + >>> ((x**2 + 1)**4).is_polynomial() + True + >>> (2**x + 1).is_polynomial(x) + False + >>> (2**x + 1).is_polynomial(2**x) + True + >>> f = Function('f') + >>> (f(x) + 1).is_polynomial(x) + False + >>> (f(x) + 1).is_polynomial(f(x)) + True + >>> (1/f(x) + 1).is_polynomial(f(x)) + False + + >>> n = Symbol('n', nonnegative=True, integer=True) + >>> (x**n + 1).is_polynomial(x) + False + + This function does not attempt any nontrivial simplifications that may + result in an expression that does not appear to be a polynomial to + become one. + + >>> from sympy import sqrt, factor, cancel + >>> y = Symbol('y', positive=True) + >>> a = sqrt(y**2 + 2*y + 1) + >>> a.is_polynomial(y) + False + >>> factor(a) + y + 1 + >>> factor(a).is_polynomial(y) + True + + >>> b = (y**2 + 2*y + 1)/(y + 1) + >>> b.is_polynomial(y) + False + >>> cancel(b) + y + 1 + >>> cancel(b).is_polynomial(y) + True + + See also .is_rational_function() + + """ + if syms: + syms = set(map(sympify, syms)) + else: + syms = self.free_symbols + if not syms: + return True + + return self._eval_is_polynomial(syms) + + def _eval_is_polynomial(self, syms) -> bool | None: + if self in syms: + return True + if not self.has_free(*syms): + # constant polynomial + return True + # subclasses should return True or False + return None + + def is_rational_function(self, *syms): + """ + Test whether function is a ratio of two polynomials in the given + symbols, syms. When syms is not given, all free symbols will be used. + The rational function does not have to be in expanded or in any kind of + canonical form. + + This function returns False for expressions that are "rational + functions" with symbolic exponents. Thus, you should be able to call + .as_numer_denom() and apply polynomial algorithms to the result for + expressions for which this returns True. + + This is not part of the assumptions system. You cannot do + Symbol('z', rational_function=True). + + Examples + ======== + + >>> from sympy import Symbol, sin + >>> from sympy.abc import x, y + + >>> (x/y).is_rational_function() + True + + >>> (x**2).is_rational_function() + True + + >>> (x/sin(y)).is_rational_function(y) + False + + >>> n = Symbol('n', integer=True) + >>> (x**n + 1).is_rational_function(x) + False + + This function does not attempt any nontrivial simplifications that may + result in an expression that does not appear to be a rational function + to become one. + + >>> from sympy import sqrt, factor + >>> y = Symbol('y', positive=True) + >>> a = sqrt(y**2 + 2*y + 1)/y + >>> a.is_rational_function(y) + False + >>> factor(a) + (y + 1)/y + >>> factor(a).is_rational_function(y) + True + + See also is_algebraic_expr(). + + """ + if syms: + syms = set(map(sympify, syms)) + else: + syms = self.free_symbols + if not syms: + return self not in _illegal + + return self._eval_is_rational_function(syms) + + def _eval_is_rational_function(self, syms) -> bool | None: + if self in syms: + return True + if not self.has_xfree(syms): + return True + # subclasses should return True or False + return None + + def is_meromorphic(self, x, a): + """ + This tests whether an expression is meromorphic as + a function of the given symbol ``x`` at the point ``a``. + + This method is intended as a quick test that will return + None if no decision can be made without simplification or + more detailed analysis. + + Examples + ======== + + >>> from sympy import zoo, log, sin, sqrt + >>> from sympy.abc import x + + >>> f = 1/x**2 + 1 - 2*x**3 + >>> f.is_meromorphic(x, 0) + True + >>> f.is_meromorphic(x, 1) + True + >>> f.is_meromorphic(x, zoo) + True + + >>> g = x**log(3) + >>> g.is_meromorphic(x, 0) + False + >>> g.is_meromorphic(x, 1) + True + >>> g.is_meromorphic(x, zoo) + False + + >>> h = sin(1/x)*x**2 + >>> h.is_meromorphic(x, 0) + False + >>> h.is_meromorphic(x, 1) + True + >>> h.is_meromorphic(x, zoo) + True + + Multivalued functions are considered meromorphic when their + branches are meromorphic. Thus most functions are meromorphic + everywhere except at essential singularities and branch points. + In particular, they will be meromorphic also on branch cuts + except at their endpoints. + + >>> log(x).is_meromorphic(x, -1) + True + >>> log(x).is_meromorphic(x, 0) + False + >>> sqrt(x).is_meromorphic(x, -1) + True + >>> sqrt(x).is_meromorphic(x, 0) + False + + """ + if not x.is_symbol: + raise TypeError("{} should be of symbol type".format(x)) + a = sympify(a) + + return self._eval_is_meromorphic(x, a) + + def _eval_is_meromorphic(self, x, a) -> bool | None: + if self == x: + return True + if not self.has_free(x): + return True + # subclasses should return True or False + return None + + def is_algebraic_expr(self, *syms): + """ + This tests whether a given expression is algebraic or not, in the + given symbols, syms. When syms is not given, all free symbols + will be used. The rational function does not have to be in expanded + or in any kind of canonical form. + + This function returns False for expressions that are "algebraic + expressions" with symbolic exponents. This is a simple extension to the + is_rational_function, including rational exponentiation. + + Examples + ======== + + >>> from sympy import Symbol, sqrt + >>> x = Symbol('x', real=True) + >>> sqrt(1 + x).is_rational_function() + False + >>> sqrt(1 + x).is_algebraic_expr() + True + + This function does not attempt any nontrivial simplifications that may + result in an expression that does not appear to be an algebraic + expression to become one. + + >>> from sympy import exp, factor + >>> a = sqrt(exp(x)**2 + 2*exp(x) + 1)/(exp(x) + 1) + >>> a.is_algebraic_expr(x) + False + >>> factor(a).is_algebraic_expr() + True + + See Also + ======== + + is_rational_function + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Algebraic_expression + + """ + if syms: + syms = set(map(sympify, syms)) + else: + syms = self.free_symbols + if not syms: + return True + + return self._eval_is_algebraic_expr(syms) + + def _eval_is_algebraic_expr(self, syms) -> bool | None: + if self in syms: + return True + if not self.has_free(*syms): + return True + # subclasses should return True or False + return None + + ################################################################################### + ##################### SERIES, LEADING TERM, LIMIT, ORDER METHODS ################## + ################################################################################### + + def series(self, x=None, x0=0, n=6, dir="+", logx=None, cdir=0): + """ + Series expansion of "self" around ``x = x0`` yielding either terms of + the series one by one (the lazy series given when n=None), else + all the terms at once when n != None. + + Returns the series expansion of "self" around the point ``x = x0`` + with respect to ``x`` up to ``O((x - x0)**n, x, x0)`` (default n is 6). + + If ``x=None`` and ``self`` is univariate, the univariate symbol will + be supplied, otherwise an error will be raised. + + Parameters + ========== + + expr : Expression + The expression whose series is to be expanded. + + x : Symbol + It is the variable of the expression to be calculated. + + x0 : Value + The value around which ``x`` is calculated. Can be any value + from ``-oo`` to ``oo``. + + n : Value + The value used to represent the order in terms of ``x**n``, + up to which the series is to be expanded. + + dir : String, optional + The series-expansion can be bi-directional. If ``dir="+"``, + then (x->x0+). If ``dir="-", then (x->x0-). For infinite + ``x0`` (``oo`` or ``-oo``), the ``dir`` argument is determined + from the direction of the infinity (i.e., ``dir="-"`` for + ``oo``). + + logx : optional + It is used to replace any log(x) in the returned series with a + symbolic value rather than evaluating the actual value. + + cdir : optional + It stands for complex direction, and indicates the direction + from which the expansion needs to be evaluated. + + Examples + ======== + + >>> from sympy import cos, exp, tan + >>> from sympy.abc import x, y + >>> cos(x).series() + 1 - x**2/2 + x**4/24 + O(x**6) + >>> cos(x).series(n=4) + 1 - x**2/2 + O(x**4) + >>> cos(x).series(x, x0=1, n=2) + cos(1) - (x - 1)*sin(1) + O((x - 1)**2, (x, 1)) + >>> e = cos(x + exp(y)) + >>> e.series(y, n=2) + cos(x + 1) - y*sin(x + 1) + O(y**2) + >>> e.series(x, n=2) + cos(exp(y)) - x*sin(exp(y)) + O(x**2) + + If ``n=None`` then a generator of the series terms will be returned. + + >>> term=cos(x).series(n=None) + >>> [next(term) for i in range(2)] + [1, -x**2/2] + + For ``dir=+`` (default) the series is calculated from the right and + for ``dir=-`` the series from the left. For smooth functions this + flag will not alter the results. + + >>> abs(x).series(dir="+") + x + >>> abs(x).series(dir="-") + -x + >>> f = tan(x) + >>> f.series(x, 2, 6, "+") + tan(2) + (1 + tan(2)**2)*(x - 2) + (x - 2)**2*(tan(2)**3 + tan(2)) + + (x - 2)**3*(1/3 + 4*tan(2)**2/3 + tan(2)**4) + (x - 2)**4*(tan(2)**5 + + 5*tan(2)**3/3 + 2*tan(2)/3) + (x - 2)**5*(2/15 + 17*tan(2)**2/15 + + 2*tan(2)**4 + tan(2)**6) + O((x - 2)**6, (x, 2)) + + >>> f.series(x, 2, 3, "-") + tan(2) + (2 - x)*(-tan(2)**2 - 1) + (2 - x)**2*(tan(2)**3 + tan(2)) + + O((x - 2)**3, (x, 2)) + + For rational expressions this method may return original expression without the Order term. + >>> (1/x).series(x, n=8) + 1/x + + Returns + ======= + + Expr : Expression + Series expansion of the expression about x0 + + Raises + ====== + + TypeError + If "n" and "x0" are infinity objects + + PoleError + If "x0" is an infinity object + + """ + if x is None: + syms = self.free_symbols + if not syms: + return self + elif len(syms) > 1: + raise ValueError('x must be given for multivariate functions.') + x = syms.pop() + + from .symbol import Dummy, Symbol + if isinstance(x, Symbol): + dep = x in self.free_symbols + else: + d = Dummy() + dep = d in self.xreplace({x: d}).free_symbols + if not dep: + if n is None: + return (s for s in [self]) + else: + return self + + if len(dir) != 1 or dir not in '+-': + raise ValueError("Dir must be '+' or '-'") + + if n is not None: + n = int(n) + if n < 0: + raise ValueError("Number of terms should be nonnegative") + + x0 = sympify(x0) + cdir = sympify(cdir) + from sympy.functions.elementary.complexes import im, sign + + if not cdir.is_zero: + if cdir.is_real: + dir = '+' if cdir.is_positive else '-' + else: + dir = '+' if im(cdir).is_positive else '-' + else: + if x0 and x0.is_infinite: + cdir = sign(x0).simplify() + elif str(dir) == "+": + cdir = S.One + elif str(dir) == "-": + cdir = S.NegativeOne + elif cdir == S.Zero: + cdir = S.One + + cdir = cdir/abs(cdir) + + if x0 and x0.is_infinite: + from .function import PoleError + try: + s = self.subs(x, cdir/x).series(x, n=n, dir='+', cdir=1) + if n is None: + return (si.subs(x, cdir/x) for si in s) + return s.subs(x, cdir/x) + except PoleError: + s = self.subs(x, cdir*x).aseries(x, n=n) + return s.subs(x, cdir*x) + + # use rep to shift origin to x0 and change sign (if dir is negative) + # and undo the process with rep2 + if x0 or cdir != 1: + s = self.subs({x: x0 + cdir*x}).series(x, x0=0, n=n, dir='+', logx=logx, cdir=1) + if n is None: # lseries... + return (si.subs({x: x/cdir - x0/cdir}) for si in s) + return s.subs({x: x/cdir - x0/cdir}) + + # from here on it's x0=0 and dir='+' handling + + if x.is_positive is x.is_negative is None or x.is_Symbol is not True: + # replace x with an x that has a positive assumption + xpos = Dummy('x', positive=True) + rv = self.subs(x, xpos).series(xpos, x0, n, dir, logx=logx, cdir=cdir) + if n is None: + return (s.subs(xpos, x) for s in rv) + else: + return rv.subs(xpos, x) + + from sympy.series.order import Order + if n is not None: # nseries handling + s1 = self._eval_nseries(x, n=n, logx=logx, cdir=cdir) + o = s1.getO() or S.Zero + if o: + # make sure the requested order is returned + ngot = o.getn() + if ngot > n: + # leave o in its current form (e.g. with x*log(x)) so + # it eats terms properly, then replace it below + if n != 0: + s1 += o.subs(x, x**Rational(n, ngot)) + else: + s1 += Order(1, x) + elif ngot < n: + # increase the requested number of terms to get the desired + # number keep increasing (up to 9) until the received order + # is different than the original order and then predict how + # many additional terms are needed + from sympy.functions.elementary.integers import ceiling + for more in range(1, 9): + s1 = self._eval_nseries(x, n=n + more, logx=logx, cdir=cdir) + newn = s1.getn() + if newn != ngot: + ndo = n + ceiling((n - ngot)*more/(newn - ngot)) + s1 = self._eval_nseries(x, n=ndo, logx=logx, cdir=cdir) + while s1.getn() < n: + s1 = self._eval_nseries(x, n=ndo, logx=logx, cdir=cdir) + ndo += 1 + break + else: + raise ValueError('Could not calculate %s terms for %s' + % (str(n), self)) + s1 += Order(x**n, x) + o = s1.getO() + s1 = s1.removeO() + elif s1.has(Order): + # asymptotic expansion + return s1 + else: + o = Order(x**n, x) + s1done = s1.doit() + try: + if (s1done + o).removeO() == s1done: + o = S.Zero + except NotImplementedError: + return s1 + + try: + from sympy.simplify.radsimp import collect + return collect(s1, x) + o + except NotImplementedError: + return s1 + o + + else: # lseries handling + def yield_lseries(s): + """Return terms of lseries one at a time.""" + for si in s: + if not si.is_Add: + yield si + continue + # yield terms 1 at a time if possible + # by increasing order until all the + # terms have been returned + yielded = 0 + o = Order(si, x)*x + ndid = 0 + ndo = len(si.args) + while 1: + do = (si - yielded + o).removeO() + o *= x + if not do or do.is_Order: + continue + if do.is_Add: + ndid += len(do.args) + else: + ndid += 1 + yield do + if ndid == ndo: + break + yielded += do + + return yield_lseries(self.removeO()._eval_lseries(x, logx=logx, cdir=cdir)) + + def aseries(self, x=None, n=6, bound=0, hir=False): + """Asymptotic Series expansion of self. + This is equivalent to ``self.series(x, oo, n)``. + + Parameters + ========== + + self : Expression + The expression whose series is to be expanded. + + x : Symbol + It is the variable of the expression to be calculated. + + n : Value + The value used to represent the order in terms of ``x**n``, + up to which the series is to be expanded. + + hir : Boolean + Set this parameter to be True to produce hierarchical series. + It stops the recursion at an early level and may provide nicer + and more useful results. + + bound : Value, Integer + Use the ``bound`` parameter to give limit on rewriting + coefficients in its normalised form. + + Examples + ======== + + >>> from sympy import sin, exp + >>> from sympy.abc import x + + >>> e = sin(1/x + exp(-x)) - sin(1/x) + + >>> e.aseries(x) + (1/(24*x**4) - 1/(2*x**2) + 1 + O(x**(-6), (x, oo)))*exp(-x) + + >>> e.aseries(x, n=3, hir=True) + -exp(-2*x)*sin(1/x)/2 + exp(-x)*cos(1/x) + O(exp(-3*x), (x, oo)) + + >>> e = exp(exp(x)/(1 - 1/x)) + + >>> e.aseries(x) + exp(exp(x)/(1 - 1/x)) + + >>> e.aseries(x, bound=3) # doctest: +SKIP + exp(exp(x)/x**2)*exp(exp(x)/x)*exp(-exp(x) + exp(x)/(1 - 1/x) - exp(x)/x - exp(x)/x**2)*exp(exp(x)) + + For rational expressions this method may return original expression without the Order term. + >>> (1/x).aseries(x, n=8) + 1/x + + Returns + ======= + + Expr + Asymptotic series expansion of the expression. + + Notes + ===== + + This algorithm is directly induced from the limit computational algorithm provided by Gruntz. + It majorly uses the mrv and rewrite sub-routines. The overall idea of this algorithm is first + to look for the most rapidly varying subexpression w of a given expression f and then expands f + in a series in w. Then same thing is recursively done on the leading coefficient + till we get constant coefficients. + + If the most rapidly varying subexpression of a given expression f is f itself, + the algorithm tries to find a normalised representation of the mrv set and rewrites f + using this normalised representation. + + If the expansion contains an order term, it will be either ``O(x ** (-n))`` or ``O(w ** (-n))`` + where ``w`` belongs to the most rapidly varying expression of ``self``. + + References + ========== + + .. [1] Gruntz, Dominik. A new algorithm for computing asymptotic series. + In: Proc. 1993 Int. Symp. Symbolic and Algebraic Computation. 1993. + pp. 239-244. + .. [2] Gruntz thesis - p90 + .. [3] https://en.wikipedia.org/wiki/Asymptotic_expansion + + See Also + ======== + + Expr.aseries: See the docstring of this function for complete details of this wrapper. + """ + + from .symbol import Dummy + + if x.is_positive is x.is_negative is None: + xpos = Dummy('x', positive=True) + return self.subs(x, xpos).aseries(xpos, n, bound, hir).subs(xpos, x) + + from .function import PoleError + from sympy.series.gruntz import mrv, rewrite + + try: + om, exps = mrv(self, x) + except PoleError: + return self + + # We move one level up by replacing `x` by `exp(x)`, and then + # computing the asymptotic series for f(exp(x)). Then asymptotic series + # can be obtained by moving one-step back, by replacing x by ln(x). + + from sympy.functions.elementary.exponential import exp, log + from sympy.series.order import Order + + if x in om: + s = self.subs(x, exp(x)).aseries(x, n, bound, hir).subs(x, log(x)) + if s.getO(): + return s + Order(1/x**n, (x, S.Infinity)) + return s + + k = Dummy('k', positive=True) + # f is rewritten in terms of omega + func, logw = rewrite(exps, om, x, k) + + if self in om: + if bound <= 0: + return self + s = (self.exp).aseries(x, n, bound=bound) + s = s.func(*[t.removeO() for t in s.args]) + try: + res = exp(s.subs(x, 1/x).as_leading_term(x).subs(x, 1/x)) + except PoleError: + res = self + + func = exp(self.args[0] - res.args[0]) / k + logw = log(1/res) + + s = func.series(k, 0, n) + from sympy.core.function import expand_mul + s = expand_mul(s) + # Hierarchical series + if hir: + return s.subs(k, exp(logw)) + + o = s.getO() + terms = sorted(Add.make_args(s.removeO()), key=lambda i: int(i.as_coeff_exponent(k)[1])) + s = S.Zero + has_ord = False + + # Then we recursively expand these coefficients one by one into + # their asymptotic series in terms of their most rapidly varying subexpressions. + for t in terms: + coeff, expo = t.as_coeff_exponent(k) + if coeff.has(x): + # Recursive step + snew = coeff.aseries(x, n, bound=bound-1) + if has_ord and snew.getO(): + break + elif snew.getO(): + has_ord = True + s += (snew * k**expo) + else: + s += t + + if not o or has_ord: + return s.subs(k, exp(logw)) + return (s + o).subs(k, exp(logw)) + + + def taylor_term(self, n, x, *previous_terms): + """General method for the taylor term. + + This method is slow, because it differentiates n-times. Subclasses can + redefine it to make it faster by using the "previous_terms". + """ + from .symbol import Dummy + from sympy.functions.combinatorial.factorials import factorial + + x = sympify(x) + _x = Dummy('x') + return self.subs(x, _x).diff(_x, n).subs(_x, x).subs(x, 0) * x**n / factorial(n) + + def lseries(self, x=None, x0=0, dir='+', logx=None, cdir=0): + """ + Wrapper for series yielding an iterator of the terms of the series. + + Note: an infinite series will yield an infinite iterator. The following, + for exaxmple, will never terminate. It will just keep printing terms + of the sin(x) series:: + + for term in sin(x).lseries(x): + print term + + The advantage of lseries() over nseries() is that many times you are + just interested in the next term in the series (i.e. the first term for + example), but you do not know how many you should ask for in nseries() + using the "n" parameter. + + See also nseries(). + """ + return self.series(x, x0, n=None, dir=dir, logx=logx, cdir=cdir) + + def _eval_lseries(self, x, logx=None, cdir=0): + # default implementation of lseries is using nseries(), and adaptively + # increasing the "n". As you can see, it is not very efficient, because + # we are calculating the series over and over again. Subclasses should + # override this method and implement much more efficient yielding of + # terms. + n = 0 + series = self._eval_nseries(x, n=n, logx=logx, cdir=cdir) + + while series.is_Order: + n += 1 + series = self._eval_nseries(x, n=n, logx=logx, cdir=cdir) + + e = series.removeO() + yield e + if e is S.Zero: + return + + while 1: + while 1: + n += 1 + series = self._eval_nseries(x, n=n, logx=logx, cdir=cdir).removeO() + if e != series: + break + if (series - self).cancel() is S.Zero: + return + yield series - e + e = series + + def nseries(self, x=None, x0=0, n=6, dir='+', logx=None, cdir=0): + """ + Wrapper to _eval_nseries if assumptions allow, else to series. + + If x is given, x0 is 0, dir='+', and self has x, then _eval_nseries is + called. This calculates "n" terms in the innermost expressions and + then builds up the final series just by "cross-multiplying" everything + out. + + The optional ``logx`` parameter can be used to replace any log(x) in the + returned series with a symbolic value to avoid evaluating log(x) at 0. A + symbol to use in place of log(x) should be provided. + + Advantage -- it's fast, because we do not have to determine how many + terms we need to calculate in advance. + + Disadvantage -- you may end up with less terms than you may have + expected, but the O(x**n) term appended will always be correct and + so the result, though perhaps shorter, will also be correct. + + If any of those assumptions is not met, this is treated like a + wrapper to series which will try harder to return the correct + number of terms. + + See also lseries(). + + Examples + ======== + + >>> from sympy import sin, log, Symbol + >>> from sympy.abc import x, y + >>> sin(x).nseries(x, 0, 6) + x - x**3/6 + x**5/120 + O(x**6) + >>> log(x+1).nseries(x, 0, 5) + x - x**2/2 + x**3/3 - x**4/4 + O(x**5) + + Handling of the ``logx`` parameter --- in the following example the + expansion fails since ``sin`` does not have an asymptotic expansion + at -oo (the limit of log(x) as x approaches 0): + + >>> e = sin(log(x)) + >>> e.nseries(x, 0, 6) + Traceback (most recent call last): + ... + PoleError: ... + ... + >>> logx = Symbol('logx') + >>> e.nseries(x, 0, 6, logx=logx) + sin(logx) + + In the following example, the expansion works but only returns self + unless the ``logx`` parameter is used: + + >>> e = x**y + >>> e.nseries(x, 0, 2) + x**y + >>> e.nseries(x, 0, 2, logx=logx) + exp(logx*y) + + """ + if x and x not in self.free_symbols: + return self + if x is None or x0 or dir != '+': # {see XPOS above} or (x.is_positive == x.is_negative == None): + return self.series(x, x0, n, dir, cdir=cdir) + else: + return self._eval_nseries(x, n=n, logx=logx, cdir=cdir) + + def _eval_nseries(self, x, n, logx, cdir): + """ + Return terms of series for self up to O(x**n) at x=0 + from the positive direction. + + This is a method that should be overridden in subclasses. Users should + never call this method directly (use .nseries() instead), so you do not + have to write docstrings for _eval_nseries(). + """ + raise NotImplementedError(filldedent(""" + The _eval_nseries method should be added to + %s to give terms up to O(x**n) at x=0 + from the positive direction so it is available when + nseries calls it.""" % self.func) + ) + + def limit(self, x, xlim, dir='+'): + """ Compute limit x->xlim. + """ + from sympy.series.limits import limit + return limit(self, x, xlim, dir) + + @cacheit + def as_leading_term(self, *symbols, logx=None, cdir=0): + """ + Returns the leading (nonzero) term of the series expansion of self. + + The _eval_as_leading_term routines are used to do this, and they must + always return a non-zero value. + + Examples + ======== + + >>> from sympy.abc import x + >>> (1 + x + x**2).as_leading_term(x) + 1 + >>> (1/x**2 + x + x**2).as_leading_term(x) + x**(-2) + + """ + if len(symbols) > 1: + c = self + for x in symbols: + c = c.as_leading_term(x, logx=logx, cdir=cdir) + return c + elif not symbols: + return self + x = sympify(symbols[0]) + cdir = sympify(cdir) + if not x.is_symbol: + raise ValueError('expecting a Symbol but got %s' % x) + if x not in self.free_symbols: + return self + obj = self._eval_as_leading_term(x, logx=logx, cdir=cdir) + if obj is not None: + from sympy.simplify.powsimp import powsimp + return powsimp(obj, deep=True, combine='exp') + raise NotImplementedError('as_leading_term(%s, %s)' % (self, x)) + + def _eval_as_leading_term(self, x, logx, cdir): + return self + + def as_coeff_exponent(self, x) -> tuple[Expr, Expr]: + """ ``c*x**e -> c,e`` where x can be any symbolic expression. + """ + from sympy.simplify.radsimp import collect + s = collect(self, x) + c, p = s.as_coeff_mul(x) + if len(p) == 1: + b, e = p[0].as_base_exp() + if b == x: + return c, e + return s, S.Zero + + def leadterm(self, x, logx=None, cdir=0): + """ + Returns the leading term a*x**b as a tuple (a, b). + + Examples + ======== + + >>> from sympy.abc import x + >>> (1+x+x**2).leadterm(x) + (1, 0) + >>> (1/x**2+x+x**2).leadterm(x) + (1, -2) + + """ + from .symbol import Dummy + from sympy.functions.elementary.exponential import log + l = self.as_leading_term(x, logx=logx, cdir=cdir) + d = Dummy('logx') + if l.has(log(x)): + l = l.subs(log(x), d) + c, e = l.as_coeff_exponent(x) + if x in c.free_symbols: + raise ValueError(filldedent(""" + cannot compute leadterm(%s, %s). The coefficient + should have been free of %s but got %s""" % (self, x, x, c))) + c = c.subs(d, log(x)) + return c, e + + def as_coeff_Mul(self, rational: bool = False) -> tuple['Number', Expr]: + """Efficiently extract the coefficient of a product.""" + return S.One, self + + def as_coeff_Add(self, rational=False) -> tuple['Number', Expr]: + """Efficiently extract the coefficient of a summation.""" + return S.Zero, self + + def fps(self, x=None, x0=0, dir=1, hyper=True, order=4, rational=True, + full=False): + """ + Compute formal power power series of self. + + See the docstring of the :func:`fps` function in sympy.series.formal for + more information. + """ + from sympy.series.formal import fps + + return fps(self, x, x0, dir, hyper, order, rational, full) + + def fourier_series(self, limits=None): + """Compute fourier sine/cosine series of self. + + See the docstring of the :func:`fourier_series` in sympy.series.fourier + for more information. + """ + from sympy.series.fourier import fourier_series + + return fourier_series(self, limits) + + ################################################################################### + ##################### DERIVATIVE, INTEGRAL, FUNCTIONAL METHODS #################### + ################################################################################### + + def diff(self, *symbols, **assumptions): + assumptions.setdefault("evaluate", True) + return _derivative_dispatch(self, *symbols, **assumptions) + + ########################################################################### + ###################### EXPRESSION EXPANSION METHODS ####################### + ########################################################################### + + # Relevant subclasses should override _eval_expand_hint() methods. See + # the docstring of expand() for more info. + + def _eval_expand_complex(self, **hints): + real, imag = self.as_real_imag(**hints) + return real + S.ImaginaryUnit*imag + + @staticmethod + def _expand_hint(expr, hint, deep=True, **hints): + """ + Helper for ``expand()``. Recursively calls ``expr._eval_expand_hint()``. + + Returns ``(expr, hit)``, where expr is the (possibly) expanded + ``expr`` and ``hit`` is ``True`` if ``expr`` was truly expanded and + ``False`` otherwise. + """ + hit = False + # XXX: Hack to support non-Basic args + # | + # V + if deep and getattr(expr, 'args', ()) and not expr.is_Atom: + sargs = [] + for arg in expr.args: + arg, arghit = Expr._expand_hint(arg, hint, **hints) + hit |= arghit + sargs.append(arg) + + if hit: + expr = expr.func(*sargs) + + if hasattr(expr, hint): + newexpr = getattr(expr, hint)(**hints) + if newexpr != expr: + return (newexpr, True) + + return (expr, hit) + + @cacheit + def expand(self, deep=True, modulus=None, power_base=True, power_exp=True, + mul=True, log=True, multinomial=True, basic=True, **hints): + """ + Expand an expression using hints. + + See the docstring of the expand() function in sympy.core.function for + more information. + + """ + from sympy.simplify.radsimp import fraction + + hints.update(power_base=power_base, power_exp=power_exp, mul=mul, + log=log, multinomial=multinomial, basic=basic) + + expr = self + # default matches fraction's default + _fraction = lambda x: fraction(x, hints.get('exact', False)) + if hints.pop('frac', False): + n, d = [a.expand(deep=deep, modulus=modulus, **hints) + for a in _fraction(self)] + return n/d + elif hints.pop('denom', False): + n, d = _fraction(self) + return n/d.expand(deep=deep, modulus=modulus, **hints) + elif hints.pop('numer', False): + n, d = _fraction(self) + return n.expand(deep=deep, modulus=modulus, **hints)/d + + # Although the hints are sorted here, an earlier hint may get applied + # at a given node in the expression tree before another because of how + # the hints are applied. e.g. expand(log(x*(y + z))) -> log(x*y + + # x*z) because while applying log at the top level, log and mul are + # applied at the deeper level in the tree so that when the log at the + # upper level gets applied, the mul has already been applied at the + # lower level. + + # Additionally, because hints are only applied once, the expression + # may not be expanded all the way. For example, if mul is applied + # before multinomial, x*(x + 1)**2 won't be expanded all the way. For + # now, we just use a special case to make multinomial run before mul, + # so that at least polynomials will be expanded all the way. In the + # future, smarter heuristics should be applied. + # TODO: Smarter heuristics + + def _expand_hint_key(hint): + """Make multinomial come before mul""" + if hint == 'mul': + return 'mulz' + return hint + + for hint in sorted(hints.keys(), key=_expand_hint_key): + use_hint = hints[hint] + if use_hint: + hint = '_eval_expand_' + hint + expr, hit = Expr._expand_hint(expr, hint, deep=deep, **hints) + + while True: + was = expr + if hints.get('multinomial', False): + expr, _ = Expr._expand_hint( + expr, '_eval_expand_multinomial', deep=deep, **hints) + if hints.get('mul', False): + expr, _ = Expr._expand_hint( + expr, '_eval_expand_mul', deep=deep, **hints) + if hints.get('log', False): + expr, _ = Expr._expand_hint( + expr, '_eval_expand_log', deep=deep, **hints) + if expr == was: + break + + if modulus is not None: + modulus = sympify(modulus) + + if not modulus.is_Integer or modulus <= 0: + raise ValueError( + "modulus must be a positive integer, got %s" % modulus) + + terms = [] + + for term in Add.make_args(expr): + coeff, tail = term.as_coeff_Mul(rational=True) + + coeff %= modulus + + if coeff: + terms.append(coeff*tail) + + expr = Add(*terms) + + return expr + + ########################################################################### + ################### GLOBAL ACTION VERB WRAPPER METHODS #################### + ########################################################################### + + def integrate(self, *args, **kwargs): + """See the integrate function in sympy.integrals""" + from sympy.integrals.integrals import integrate + return integrate(self, *args, **kwargs) + + def nsimplify(self, constants=(), tolerance=None, full=False): + """See the nsimplify function in sympy.simplify""" + from sympy.simplify.simplify import nsimplify + return nsimplify(self, constants, tolerance, full) + + def separate(self, deep=False, force=False): + """See the separate function in sympy.simplify""" + from .function import expand_power_base + return expand_power_base(self, deep=deep, force=force) + + def collect(self, syms, func=None, evaluate=True, exact=False, distribute_order_term=True): + """See the collect function in sympy.simplify""" + from sympy.simplify.radsimp import collect + return collect(self, syms, func, evaluate, exact, distribute_order_term) + + def together(self, *args, **kwargs): + """See the together function in sympy.polys""" + from sympy.polys.rationaltools import together + return together(self, *args, **kwargs) + + def apart(self, x=None, **args): + """See the apart function in sympy.polys""" + from sympy.polys.partfrac import apart + return apart(self, x, **args) + + def ratsimp(self): + """See the ratsimp function in sympy.simplify""" + from sympy.simplify.ratsimp import ratsimp + return ratsimp(self) + + def trigsimp(self, **args): + """See the trigsimp function in sympy.simplify""" + from sympy.simplify.trigsimp import trigsimp + return trigsimp(self, **args) + + def radsimp(self, **kwargs): + """See the radsimp function in sympy.simplify""" + from sympy.simplify.radsimp import radsimp + return radsimp(self, **kwargs) + + def powsimp(self, *args, **kwargs): + """See the powsimp function in sympy.simplify""" + from sympy.simplify.powsimp import powsimp + return powsimp(self, *args, **kwargs) + + def combsimp(self): + """See the combsimp function in sympy.simplify""" + from sympy.simplify.combsimp import combsimp + return combsimp(self) + + def gammasimp(self): + """See the gammasimp function in sympy.simplify""" + from sympy.simplify.gammasimp import gammasimp + return gammasimp(self) + + def factor(self, *gens, **args): + """See the factor() function in sympy.polys.polytools""" + from sympy.polys.polytools import factor + return factor(self, *gens, **args) + + def cancel(self, *gens, **args): + """See the cancel function in sympy.polys""" + from sympy.polys.polytools import cancel + return cancel(self, *gens, **args) + + def invert(self, g, *gens, **args): + """Return the multiplicative inverse of ``self`` mod ``g`` + where ``self`` (and ``g``) may be symbolic expressions). + + See Also + ======== + sympy.core.intfunc.mod_inverse, sympy.polys.polytools.invert + """ + if self.is_number and getattr(g, 'is_number', True): + return mod_inverse(self, g) + from sympy.polys.polytools import invert + return invert(self, g, *gens, **args) + + def round(self, n=None): + """Return x rounded to the given decimal place. + + If a complex number would results, apply round to the real + and imaginary components of the number. + + Examples + ======== + + >>> from sympy import pi, E, I, S, Number + >>> pi.round() + 3 + >>> pi.round(2) + 3.14 + >>> (2*pi + E*I).round() + 6 + 3*I + + The round method has a chopping effect: + + >>> (2*pi + I/10).round() + 6 + >>> (pi/10 + 2*I).round() + 2*I + >>> (pi/10 + E*I).round(2) + 0.31 + 2.72*I + + Notes + ===== + + The Python ``round`` function uses the SymPy ``round`` method so it + will always return a SymPy number (not a Python float or int): + + >>> isinstance(round(S(123), -2), Number) + True + """ + x = self + + if not x.is_number: + raise TypeError("Cannot round symbolic expression") + if not x.is_Atom: + if not pure_complex(x.n(2), or_real=True): + raise TypeError( + 'Expected a number but got %s:' % func_name(x)) + elif x in _illegal: + return x + if not (xr := x.is_extended_real): + r, i = x.as_real_imag() + if xr is False: + return r.round(n) + S.ImaginaryUnit*i.round(n) + if i.equals(0): + return r.round(n) + if not x: + return S.Zero if n is None else x + + p = as_int(n or 0) + + if x.is_Integer: + return Integer(round(int(x), p)) + + digits_to_decimal = _mag(x) # _mag(12) = 2, _mag(.012) = -1 + allow = digits_to_decimal + p + precs = [f._prec for f in x.atoms(Float)] + dps = prec_to_dps(max(precs)) if precs else None + if dps is None: + # assume everything is exact so use the Python + # float default or whatever was requested + dps = max(15, allow) + else: + allow = min(allow, dps) + # this will shift all digits to right of decimal + # and give us dps to work with as an int + shift = -digits_to_decimal + dps + extra = 1 # how far we look past known digits + # NOTE + # mpmath will calculate the binary representation to + # an arbitrary number of digits but we must base our + # answer on a finite number of those digits, e.g. + # .575 2589569785738035/2**52 in binary. + # mpmath shows us that the first 18 digits are + # >>> Float(.575).n(18) + # 0.574999999999999956 + # The default precision is 15 digits and if we ask + # for 15 we get + # >>> Float(.575).n(15) + # 0.575000000000000 + # mpmath handles rounding at the 15th digit. But we + # need to be careful since the user might be asking + # for rounding at the last digit and our semantics + # are to round toward the even final digit when there + # is a tie. So the extra digit will be used to make + # that decision. In this case, the value is the same + # to 15 digits: + # >>> Float(.575).n(16) + # 0.5750000000000000 + # Now converting this to the 15 known digits gives + # 575000000000000.0 + # which rounds to integer + # 5750000000000000 + # And now we can round to the desired digt, e.g. at + # the second from the left and we get + # 5800000000000000 + # and rescaling that gives + # 0.58 + # as the final result. + # If the value is made slightly less than 0.575 we might + # still obtain the same value: + # >>> Float(.575-1e-16).n(16)*10**15 + # 574999999999999.8 + # What 15 digits best represents the known digits (which are + # to the left of the decimal? 5750000000000000, the same as + # before. The only way we will round down (in this case) is + # if we declared that we had more than 15 digits of precision. + # For example, if we use 16 digits of precision, the integer + # we deal with is + # >>> Float(.575-1e-16).n(17)*10**16 + # 5749999999999998.4 + # and this now rounds to 5749999999999998 and (if we round to + # the 2nd digit from the left) we get 5700000000000000. + # + xf = x.n(dps + extra)*Pow(10, shift) + if xf.is_Number and xf._prec == 1: # xf.is_Add will raise below + # is x == 0? + if x.equals(0): + return Float(0) + raise ValueError('not computing with precision') + xi = Integer(xf) + # use the last digit to select the value of xi + # nearest to x before rounding at the desired digit + sign = 1 if x > 0 else -1 + dif2 = sign*(xf - xi).n(extra) + if dif2 < 0: + raise NotImplementedError( + 'not expecting int(x) to round away from 0') + if dif2 > .5: + xi += sign # round away from 0 + elif dif2 == .5: + xi += sign if xi%2 else -sign # round toward even + # shift p to the new position + ip = p - shift + # let Python handle the int rounding then rescale + xr = round(xi.p, ip) + # restore scale + rv = Rational(xr, Pow(10, shift)) + # return Float or Integer + if rv.is_Integer: + if n is None: # the single-arg case + return rv + # use str or else it won't be a float + return Float(str(rv), dps) # keep same precision + else: + if not allow and rv > self: + allow += 1 + return Float(rv, allow) + + __round__ = round + + def _eval_derivative_matrix_lines(self, x): + from sympy.matrices.expressions.matexpr import _LeftRightArgs + return [_LeftRightArgs([S.One, S.One], higher=self._eval_derivative(x))] + + +class AtomicExpr(Atom, Expr): + """ + A parent class for object which are both atoms and Exprs. + + For example: Symbol, Number, Rational, Integer, ... + But not: Add, Mul, Pow, ... + """ + is_number = False + is_Atom = True + + __slots__ = () + + def _eval_derivative(self, s): + if self == s: + return S.One + return S.Zero + + def _eval_derivative_n_times(self, s, n): + from .containers import Tuple + from sympy.matrices.expressions.matexpr import MatrixExpr + from sympy.matrices.matrixbase import MatrixBase + if isinstance(s, (MatrixBase, Tuple, Iterable, MatrixExpr)): + return super()._eval_derivative_n_times(s, n) + from .relational import Eq + from sympy.functions.elementary.piecewise import Piecewise + if self == s: + return Piecewise((self, Eq(n, 0)), (1, Eq(n, 1)), (0, True)) + else: + return Piecewise((self, Eq(n, 0)), (0, True)) + + def _eval_is_polynomial(self, syms): + return True + + def _eval_is_rational_function(self, syms): + return self not in _illegal + + def _eval_is_meromorphic(self, x, a): + from sympy.calculus.accumulationbounds import AccumBounds + return (not self.is_Number or self.is_finite) and not isinstance(self, AccumBounds) + + def _eval_is_algebraic_expr(self, syms): + return True + + def _eval_nseries(self, x, n, logx, cdir=0): + return self + + @property + def expr_free_symbols(self): + sympy_deprecation_warning(""" + The expr_free_symbols property is deprecated. Use free_symbols to get + the free symbols of an expression. + """, + deprecated_since_version="1.9", + active_deprecations_target="deprecated-expr-free-symbols") + return {self} + + +def _mag(x): + r"""Return integer $i$ such that $0.1 \le x/10^i < 1$ + + Examples + ======== + + >>> from sympy.core.expr import _mag + >>> from sympy import Float + >>> _mag(Float(.1)) + 0 + >>> _mag(Float(.01)) + -1 + >>> _mag(Float(1234)) + 4 + """ + from math import log10, ceil, log + xpos = abs(x.n()) + if not xpos: + return S.Zero + try: + mag_first_dig = int(ceil(log10(xpos))) + except (ValueError, OverflowError): + mag_first_dig = int(ceil(Float(mpf_log(xpos._mpf_, 53))/log(10))) + # check that we aren't off by 1 + if (xpos/S(10)**mag_first_dig) >= 1: + assert 1 <= (xpos/S(10)**mag_first_dig) < 10 + mag_first_dig += 1 + return mag_first_dig + + +class UnevaluatedExpr(Expr): + """ + Expression that is not evaluated unless released. + + Examples + ======== + + >>> from sympy import UnevaluatedExpr + >>> from sympy.abc import x + >>> x*(1/x) + 1 + >>> x*UnevaluatedExpr(1/x) + x*1/x + + """ + + def __new__(cls, arg, **kwargs): + arg = _sympify(arg) + obj = Expr.__new__(cls, arg, **kwargs) + return obj + + def doit(self, **hints): + if hints.get("deep", True): + return self.args[0].doit(**hints) + else: + return self.args[0] + + + +def unchanged(func, *args): + """Return True if `func` applied to the `args` is unchanged. + Can be used instead of `assert foo == foo`. + + Examples + ======== + + >>> from sympy import Piecewise, cos, pi + >>> from sympy.core.expr import unchanged + >>> from sympy.abc import x + + >>> unchanged(cos, 1) # instead of assert cos(1) == cos(1) + True + + >>> unchanged(cos, pi) + False + + Comparison of args uses the builtin capabilities of the object's + arguments to test for equality so args can be defined loosely. Here, + the ExprCondPair arguments of Piecewise compare as equal to the + tuples that can be used to create the Piecewise: + + >>> unchanged(Piecewise, (x, x > 1), (0, True)) + True + """ + f = func(*args) + return f.func == func and f.args == args + + +class ExprBuilder: + def __init__(self, op, args=None, validator=None, check=True): + if not hasattr(op, "__call__"): + raise TypeError("op {} needs to be callable".format(op)) + self.op = op + if args is None: + self.args = [] + else: + self.args = args + self.validator = validator + if (validator is not None) and check: + self.validate() + + @staticmethod + def _build_args(args): + return [i.build() if isinstance(i, ExprBuilder) else i for i in args] + + def validate(self): + if self.validator is None: + return + args = self._build_args(self.args) + self.validator(*args) + + def build(self, check=True): + args = self._build_args(self.args) + if self.validator and check: + self.validator(*args) + return self.op(*args) + + def append_argument(self, arg, check=True): + self.args.append(arg) + if self.validator and check: + self.validate(*self.args) + + def __getitem__(self, item): + if item == 0: + return self.op + else: + return self.args[item-1] + + def __repr__(self): + return str(self.build()) + + def search_element(self, elem): + for i, arg in enumerate(self.args): + if isinstance(arg, ExprBuilder): + ret = arg.search_index(elem) + if ret is not None: + return (i,) + ret + elif id(arg) == id(elem): + return (i,) + return None + + +from .mul import Mul +from .add import Add +from .power import Pow +from .function import Function, _derivative_dispatch +from .mod import Mod +from .exprtools import factor_terms +from .numbers import Float, Integer, Rational, _illegal, int_valued diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/exprtools.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/exprtools.py new file mode 100644 index 0000000000000000000000000000000000000000..4868e4416a72e91dc12c9113d90b9c31c5e26011 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/exprtools.py @@ -0,0 +1,1573 @@ +"""Tools for manipulating of large commutative expressions. """ + +from __future__ import annotations + +from .add import Add +from .mul import Mul, _keep_coeff +from .power import Pow +from .basic import Basic +from .expr import Expr +from .function import expand_power_exp +from .sympify import sympify +from .numbers import Rational, Integer, Number, I, equal_valued +from .singleton import S +from .sorting import default_sort_key, ordered +from .symbol import Dummy +from .traversal import preorder_traversal +from .coreerrors import NonCommutativeExpression +from .containers import Tuple, Dict +from sympy.external.gmpy import SYMPY_INTS +from sympy.utilities.iterables import (common_prefix, common_suffix, + variations, iterable, is_sequence) + +from collections import defaultdict + + +_eps = Dummy(positive=True) + + +def _isnumber(i): + return isinstance(i, (SYMPY_INTS, float)) or i.is_Number + + +def _monotonic_sign(self): + """Return the value closest to 0 that ``self`` may have if all symbols + are signed and the result is uniformly the same sign for all values of symbols. + If a symbol is only signed but not known to be an + integer or the result is 0 then a symbol representative of the sign of self + will be returned. Otherwise, None is returned if a) the sign could be positive + or negative or b) self is not in one of the following forms: + + - L(x, y, ...) + A: a function linear in all symbols x, y, ... with an + additive constant; if A is zero then the function can be a monomial whose + sign is monotonic over the range of the variables, e.g. (x + 1)**3 if x is + nonnegative. + - A/L(x, y, ...) + B: the inverse of a function linear in all symbols x, y, ... + that does not have a sign change from positive to negative for any set + of values for the variables. + - M(x, y, ...) + A: a monomial M whose factors are all signed and a constant, A. + - A/M(x, y, ...) + B: the inverse of a monomial and constants A and B. + - P(x): a univariate polynomial + + Examples + ======== + + >>> from sympy.core.exprtools import _monotonic_sign as F + >>> from sympy import Dummy + >>> nn = Dummy(integer=True, nonnegative=True) + >>> p = Dummy(integer=True, positive=True) + >>> p2 = Dummy(integer=True, positive=True) + >>> F(nn + 1) + 1 + >>> F(p - 1) + _nneg + >>> F(nn*p + 1) + 1 + >>> F(p2*p + 1) + 2 + >>> F(nn - 1) # could be negative, zero or positive + """ + if not self.is_extended_real: + return + + if (-self).is_Symbol: + rv = _monotonic_sign(-self) + return rv if rv is None else -rv + + if not self.is_Add and self.as_numer_denom()[1].is_number: + s = self + if s.is_prime: + if s.is_odd: + return Integer(3) + else: + return Integer(2) + elif s.is_composite: + if s.is_odd: + return Integer(9) + else: + return Integer(4) + elif s.is_positive: + if s.is_even: + if s.is_prime is False: + return Integer(4) + else: + return Integer(2) + elif s.is_integer: + return S.One + else: + return _eps + elif s.is_extended_negative: + if s.is_even: + return Integer(-2) + elif s.is_integer: + return S.NegativeOne + else: + return -_eps + if s.is_zero or s.is_extended_nonpositive or s.is_extended_nonnegative: + return S.Zero + return None + + # univariate polynomial + free = self.free_symbols + if len(free) == 1: + if self.is_polynomial(): + from sympy.polys.polytools import real_roots + from sympy.polys.polyroots import roots + from sympy.polys.polyerrors import PolynomialError + x = free.pop() + x0 = _monotonic_sign(x) + if x0 in (_eps, -_eps): + x0 = S.Zero + if x0 is not None: + d = self.diff(x) + if d.is_number: + currentroots = [] + else: + try: + currentroots = real_roots(d) + except (PolynomialError, NotImplementedError): + currentroots = [r for r in roots(d, x) if r.is_extended_real] + y = self.subs(x, x0) + if x.is_nonnegative and all( + (r - x0).is_nonpositive for r in currentroots): + if y.is_nonnegative and d.is_positive: + if y: + return y if y.is_positive else Dummy('pos', positive=True) + else: + return Dummy('nneg', nonnegative=True) + if y.is_nonpositive and d.is_negative: + if y: + return y if y.is_negative else Dummy('neg', negative=True) + else: + return Dummy('npos', nonpositive=True) + elif x.is_nonpositive and all( + (r - x0).is_nonnegative for r in currentroots): + if y.is_nonnegative and d.is_negative: + if y: + return Dummy('pos', positive=True) + else: + return Dummy('nneg', nonnegative=True) + if y.is_nonpositive and d.is_positive: + if y: + return Dummy('neg', negative=True) + else: + return Dummy('npos', nonpositive=True) + else: + n, d = self.as_numer_denom() + den = None + if n.is_number: + den = _monotonic_sign(d) + elif not d.is_number: + if _monotonic_sign(n) is not None: + den = _monotonic_sign(d) + if den is not None and (den.is_positive or den.is_negative): + v = n*den + if v.is_positive: + return Dummy('pos', positive=True) + elif v.is_nonnegative: + return Dummy('nneg', nonnegative=True) + elif v.is_negative: + return Dummy('neg', negative=True) + elif v.is_nonpositive: + return Dummy('npos', nonpositive=True) + return None + + # multivariate + c, a = self.as_coeff_Add() + v = None + if not a.is_polynomial(): + # F/A or A/F where A is a number and F is a signed, rational monomial + n, d = a.as_numer_denom() + if not (n.is_number or d.is_number): + return + if ( + a.is_Mul or a.is_Pow) and \ + a.is_rational and \ + all(p.exp.is_Integer for p in a.atoms(Pow) if p.is_Pow) and \ + (a.is_positive or a.is_negative): + v = S.One + for ai in Mul.make_args(a): + if ai.is_number: + v *= ai + continue + reps = {} + for x in ai.free_symbols: + reps[x] = _monotonic_sign(x) + if reps[x] is None: + return + v *= ai.subs(reps) + elif c: + # signed linear expression + if not any(p for p in a.atoms(Pow) if not p.is_number) and (a.is_nonpositive or a.is_nonnegative): + free = list(a.free_symbols) + p = {} + for i in free: + v = _monotonic_sign(i) + if v is None: + return + p[i] = v or (_eps if i.is_nonnegative else -_eps) + v = a.xreplace(p) + if v is not None: + rv = v + c + if v.is_nonnegative and rv.is_positive: + return rv.subs(_eps, 0) + if v.is_nonpositive and rv.is_negative: + return rv.subs(_eps, 0) + + +def decompose_power(expr: Expr) -> tuple[Expr, int]: + """ + Decompose power into symbolic base and integer exponent. + + Examples + ======== + + >>> from sympy.core.exprtools import decompose_power + >>> from sympy.abc import x, y + >>> from sympy import exp + + >>> decompose_power(x) + (x, 1) + >>> decompose_power(x**2) + (x, 2) + >>> decompose_power(exp(2*y/3)) + (exp(y/3), 2) + + """ + base, exp = expr.as_base_exp() + + if exp.is_Number: + if exp.is_Rational: + if not exp.is_Integer: + base = Pow(base, Rational(1, exp.q)) # type: ignore + e = exp.p # type: ignore + else: + base, e = expr, 1 + else: + exp, tail = exp.as_coeff_Mul(rational=True) + + if exp is S.NegativeOne: + base, e = Pow(base, tail), -1 + elif exp is not S.One: + # todo: after dropping python 3.7 support, use overload and Literal + # in as_coeff_Mul to make exp Rational, and remove these 2 ignores + tail = _keep_coeff(Rational(1, exp.q), tail) # type: ignore + base, e = Pow(base, tail), exp.p # type: ignore + else: + base, e = expr, 1 + + return base, e + + +def decompose_power_rat(expr: Expr) -> tuple[Expr, Rational]: + """ + Decompose power into symbolic base and rational exponent; + if the exponent is not a Rational, then separate only the + integer coefficient. + + Examples + ======== + + >>> from sympy.core.exprtools import decompose_power_rat + >>> from sympy.abc import x + >>> from sympy import sqrt, exp + + >>> decompose_power_rat(sqrt(x)) + (x, 1/2) + >>> decompose_power_rat(exp(-3*x/2)) + (exp(x/2), -3) + + """ + base, exp = expr.as_base_exp() + if not exp.is_Rational: + base, exp_i = decompose_power(expr) + exp = Integer(exp_i) + return base, exp # type: ignore + + +class Factors: + """Efficient representation of ``f_1*f_2*...*f_n``.""" + + __slots__ = ('factors', 'gens') + + def __init__(self, factors=None): # Factors + """Initialize Factors from dict or expr. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x + >>> from sympy import I + >>> e = 2*x**3 + >>> Factors(e) + Factors({2: 1, x: 3}) + >>> Factors(e.as_powers_dict()) + Factors({2: 1, x: 3}) + >>> f = _ + >>> f.factors # underlying dictionary + {2: 1, x: 3} + >>> f.gens # base of each factor + frozenset({2, x}) + >>> Factors(0) + Factors({0: 1}) + >>> Factors(I) + Factors({I: 1}) + + Notes + ===== + + Although a dictionary can be passed, only minimal checking is + performed: powers of -1 and I are made canonical. + + """ + if isinstance(factors, (SYMPY_INTS, float)): + factors = S(factors) + if isinstance(factors, Factors): + factors = factors.factors.copy() + elif factors in (None, S.One): + factors = {} + elif factors is S.Zero or factors == 0: + factors = {S.Zero: S.One} + elif isinstance(factors, Number): + n = factors + factors = {} + if n < 0: + factors[S.NegativeOne] = S.One + n = -n + if n is not S.One: + if n.is_Float or n.is_Integer or n is S.Infinity: + factors[n] = S.One + elif n.is_Rational: + # since we're processing Numbers, the denominator is + # stored with a negative exponent; all other factors + # are left . + if n.p != 1: + factors[Integer(n.p)] = S.One + factors[Integer(n.q)] = S.NegativeOne + else: + raise ValueError('Expected Float|Rational|Integer, not %s' % n) + elif isinstance(factors, Basic) and not factors.args: + factors = {factors: S.One} + elif isinstance(factors, Expr): + c, nc = factors.args_cnc() + i = c.count(I) + for _ in range(i): + c.remove(I) + factors = dict(Mul._from_args(c).as_powers_dict()) + # Handle all rational Coefficients + for f in list(factors.keys()): + if isinstance(f, Rational) and not isinstance(f, Integer): + p, q = Integer(f.p), Integer(f.q) + factors[p] = (factors[p] if p in factors else S.Zero) + factors[f] + factors[q] = (factors[q] if q in factors else S.Zero) - factors[f] + factors.pop(f) + if i: + factors[I] = factors.get(I, S.Zero) + i + if nc: + factors[Mul(*nc, evaluate=False)] = S.One + else: + factors = factors.copy() # /!\ should be dict-like + + # tidy up -/+1 and I exponents if Rational + + handle = [k for k in factors if k is I or k in (-1, 1)] + if handle: + i1 = S.One + for k in handle: + if not _isnumber(factors[k]): + continue + i1 *= k**factors.pop(k) + if i1 is not S.One: + for a in i1.args if i1.is_Mul else [i1]: # at worst, -1.0*I*(-1)**e + if a is S.NegativeOne: + factors[a] = S.One + elif a is I: + factors[I] = S.One + elif a.is_Pow: + factors[a.base] = factors.get(a.base, S.Zero) + a.exp + elif equal_valued(a, 1): + factors[a] = S.One + elif equal_valued(a, -1): + factors[-a] = S.One + factors[S.NegativeOne] = S.One + else: + raise ValueError('unexpected factor in i1: %s' % a) + + self.factors = factors + keys = getattr(factors, 'keys', None) + if keys is None: + raise TypeError('expecting Expr or dictionary') + self.gens = frozenset(keys()) + + def __hash__(self): # Factors + keys = tuple(ordered(self.factors.keys())) + values = [self.factors[k] for k in keys] + return hash((keys, values)) + + def __repr__(self): # Factors + return "Factors({%s})" % ', '.join( + ['%s: %s' % (k, v) for k, v in ordered(self.factors.items())]) + + @property + def is_zero(self): # Factors + """ + >>> from sympy.core.exprtools import Factors + >>> Factors(0).is_zero + True + """ + f = self.factors + return len(f) == 1 and S.Zero in f + + @property + def is_one(self): # Factors + """ + >>> from sympy.core.exprtools import Factors + >>> Factors(1).is_one + True + """ + return not self.factors + + def as_expr(self): # Factors + """Return the underlying expression. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x, y + >>> Factors((x*y**2).as_powers_dict()).as_expr() + x*y**2 + + """ + + args = [] + for factor, exp in self.factors.items(): + if exp != 1: + if isinstance(exp, Integer): + b, e = factor.as_base_exp() + e = _keep_coeff(exp, e) + args.append(b**e) + else: + args.append(factor**exp) + else: + args.append(factor) + return Mul(*args) + + def mul(self, other): # Factors + """Return Factors of ``self * other``. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x, y, z + >>> a = Factors((x*y**2).as_powers_dict()) + >>> b = Factors((x*y/z).as_powers_dict()) + >>> a.mul(b) + Factors({x: 2, y: 3, z: -1}) + >>> a*b + Factors({x: 2, y: 3, z: -1}) + """ + if not isinstance(other, Factors): + other = Factors(other) + if any(f.is_zero for f in (self, other)): + return Factors(S.Zero) + factors = dict(self.factors) + + for factor, exp in other.factors.items(): + if factor in factors: + exp = factors[factor] + exp + + if not exp: + del factors[factor] + continue + + factors[factor] = exp + + return Factors(factors) + + def normal(self, other): + """Return ``self`` and ``other`` with ``gcd`` removed from each. + The only differences between this and method ``div`` is that this + is 1) optimized for the case when there are few factors in common and + 2) this does not raise an error if ``other`` is zero. + + See Also + ======== + div + + """ + if not isinstance(other, Factors): + other = Factors(other) + if other.is_zero: + return (Factors(), Factors(S.Zero)) + if self.is_zero: + return (Factors(S.Zero), Factors()) + + self_factors = dict(self.factors) + other_factors = dict(other.factors) + + for factor, self_exp in self.factors.items(): + try: + other_exp = other.factors[factor] + except KeyError: + continue + + exp = self_exp - other_exp + + if not exp: + del self_factors[factor] + del other_factors[factor] + elif _isnumber(exp): + if exp > 0: + self_factors[factor] = exp + del other_factors[factor] + else: + del self_factors[factor] + other_factors[factor] = -exp + else: + r = self_exp.extract_additively(other_exp) + if r is not None: + if r: + self_factors[factor] = r + del other_factors[factor] + else: # should be handled already + del self_factors[factor] + del other_factors[factor] + else: + sc, sa = self_exp.as_coeff_Add() + if sc: + oc, oa = other_exp.as_coeff_Add() + diff = sc - oc + if diff > 0: + self_factors[factor] -= oc + other_exp = oa + elif diff < 0: + self_factors[factor] -= sc + other_factors[factor] -= sc + other_exp = oa - diff + else: + self_factors[factor] = sa + other_exp = oa + if other_exp: + other_factors[factor] = other_exp + else: + del other_factors[factor] + + return Factors(self_factors), Factors(other_factors) + + def div(self, other): # Factors + """Return ``self`` and ``other`` with ``gcd`` removed from each. + This is optimized for the case when there are many factors in common. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x, y, z + >>> from sympy import S + + >>> a = Factors((x*y**2).as_powers_dict()) + >>> a.div(a) + (Factors({}), Factors({})) + >>> a.div(x*z) + (Factors({y: 2}), Factors({z: 1})) + + The ``/`` operator only gives ``quo``: + + >>> a/x + Factors({y: 2}) + + Factors treats its factors as though they are all in the numerator, so + if you violate this assumption the results will be correct but will + not strictly correspond to the numerator and denominator of the ratio: + + >>> a.div(x/z) + (Factors({y: 2}), Factors({z: -1})) + + Factors is also naive about bases: it does not attempt any denesting + of Rational-base terms, for example the following does not become + 2**(2*x)/2. + + >>> Factors(2**(2*x + 2)).div(S(8)) + (Factors({2: 2*x + 2}), Factors({8: 1})) + + factor_terms can clean up such Rational-bases powers: + + >>> from sympy import factor_terms + >>> n, d = Factors(2**(2*x + 2)).div(S(8)) + >>> n.as_expr()/d.as_expr() + 2**(2*x + 2)/8 + >>> factor_terms(_) + 2**(2*x)/2 + + """ + quo, rem = dict(self.factors), {} + + if not isinstance(other, Factors): + other = Factors(other) + if other.is_zero: + raise ZeroDivisionError + if self.is_zero: + return (Factors(S.Zero), Factors()) + + for factor, exp in other.factors.items(): + if factor in quo: + d = quo[factor] - exp + if _isnumber(d): + if d <= 0: + del quo[factor] + + if d >= 0: + if d: + quo[factor] = d + + continue + + exp = -d + + else: + r = quo[factor].extract_additively(exp) + if r is not None: + if r: + quo[factor] = r + else: # should be handled already + del quo[factor] + else: + other_exp = exp + sc, sa = quo[factor].as_coeff_Add() + if sc: + oc, oa = other_exp.as_coeff_Add() + diff = sc - oc + if diff > 0: + quo[factor] -= oc + other_exp = oa + elif diff < 0: + quo[factor] -= sc + other_exp = oa - diff + else: + quo[factor] = sa + other_exp = oa + if other_exp: + rem[factor] = other_exp + else: + assert factor not in rem + continue + + rem[factor] = exp + + return Factors(quo), Factors(rem) + + def quo(self, other): # Factors + """Return numerator Factor of ``self / other``. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x, y, z + >>> a = Factors((x*y**2).as_powers_dict()) + >>> b = Factors((x*y/z).as_powers_dict()) + >>> a.quo(b) # same as a/b + Factors({y: 1}) + """ + return self.div(other)[0] + + def rem(self, other): # Factors + """Return denominator Factors of ``self / other``. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x, y, z + >>> a = Factors((x*y**2).as_powers_dict()) + >>> b = Factors((x*y/z).as_powers_dict()) + >>> a.rem(b) + Factors({z: -1}) + >>> a.rem(a) + Factors({}) + """ + return self.div(other)[1] + + def pow(self, other): # Factors + """Return self raised to a non-negative integer power. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x, y + >>> a = Factors((x*y**2).as_powers_dict()) + >>> a**2 + Factors({x: 2, y: 4}) + + """ + if isinstance(other, Factors): + other = other.as_expr() + if other.is_Integer: + other = int(other) + if isinstance(other, SYMPY_INTS) and other >= 0: + factors = {} + + if other: + for factor, exp in self.factors.items(): + factors[factor] = exp*other + + return Factors(factors) + else: + raise ValueError("expected non-negative integer, got %s" % other) + + def gcd(self, other): # Factors + """Return Factors of ``gcd(self, other)``. The keys are + the intersection of factors with the minimum exponent for + each factor. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x, y, z + >>> a = Factors((x*y**2).as_powers_dict()) + >>> b = Factors((x*y/z).as_powers_dict()) + >>> a.gcd(b) + Factors({x: 1, y: 1}) + """ + if not isinstance(other, Factors): + other = Factors(other) + if other.is_zero: + return Factors(self.factors) + + factors = {} + + for factor, exp in self.factors.items(): + factor, exp = sympify(factor), sympify(exp) + if factor in other.factors: + lt = (exp - other.factors[factor]).is_negative + if lt == True: + factors[factor] = exp + elif lt == False: + factors[factor] = other.factors[factor] + + return Factors(factors) + + def lcm(self, other): # Factors + """Return Factors of ``lcm(self, other)`` which are + the union of factors with the maximum exponent for + each factor. + + Examples + ======== + + >>> from sympy.core.exprtools import Factors + >>> from sympy.abc import x, y, z + >>> a = Factors((x*y**2).as_powers_dict()) + >>> b = Factors((x*y/z).as_powers_dict()) + >>> a.lcm(b) + Factors({x: 1, y: 2, z: -1}) + """ + if not isinstance(other, Factors): + other = Factors(other) + if any(f.is_zero for f in (self, other)): + return Factors(S.Zero) + + factors = dict(self.factors) + + for factor, exp in other.factors.items(): + if factor in factors: + exp = max(exp, factors[factor]) + + factors[factor] = exp + + return Factors(factors) + + def __mul__(self, other): # Factors + return self.mul(other) + + def __divmod__(self, other): # Factors + return self.div(other) + + def __truediv__(self, other): # Factors + return self.quo(other) + + def __mod__(self, other): # Factors + return self.rem(other) + + def __pow__(self, other): # Factors + return self.pow(other) + + def __eq__(self, other): # Factors + if not isinstance(other, Factors): + other = Factors(other) + return self.factors == other.factors + + def __ne__(self, other): # Factors + return not self == other + + +class Term: + """Efficient representation of ``coeff*(numer/denom)``. """ + + __slots__ = ('coeff', 'numer', 'denom') + + def __init__(self, term, numer=None, denom=None): # Term + if numer is None and denom is None: + if not term.is_commutative: + raise NonCommutativeExpression( + 'commutative expression expected') + + coeff, factors = term.as_coeff_mul() + numer, denom = defaultdict(int), defaultdict(int) + + for factor in factors: + base, exp = decompose_power(factor) + + if base.is_Add: + cont, base = base.primitive() + coeff *= cont**exp + + if exp > 0: + numer[base] += exp + else: + denom[base] += -exp + + numer = Factors(numer) + denom = Factors(denom) + else: + coeff = term + + if numer is None: + numer = Factors() + + if denom is None: + denom = Factors() + + self.coeff = coeff + self.numer = numer + self.denom = denom + + def __hash__(self): # Term + return hash((self.coeff, self.numer, self.denom)) + + def __repr__(self): # Term + return "Term(%s, %s, %s)" % (self.coeff, self.numer, self.denom) + + def as_expr(self): # Term + return self.coeff*(self.numer.as_expr()/self.denom.as_expr()) + + def mul(self, other): # Term + coeff = self.coeff*other.coeff + numer = self.numer.mul(other.numer) + denom = self.denom.mul(other.denom) + + numer, denom = numer.normal(denom) + + return Term(coeff, numer, denom) + + def inv(self): # Term + return Term(1/self.coeff, self.denom, self.numer) + + def quo(self, other): # Term + return self.mul(other.inv()) + + def pow(self, other): # Term + if other < 0: + return self.inv().pow(-other) + else: + return Term(self.coeff ** other, + self.numer.pow(other), + self.denom.pow(other)) + + def gcd(self, other): # Term + return Term(self.coeff.gcd(other.coeff), + self.numer.gcd(other.numer), + self.denom.gcd(other.denom)) + + def lcm(self, other): # Term + return Term(self.coeff.lcm(other.coeff), + self.numer.lcm(other.numer), + self.denom.lcm(other.denom)) + + def __mul__(self, other): # Term + if isinstance(other, Term): + return self.mul(other) + else: + return NotImplemented + + def __truediv__(self, other): # Term + if isinstance(other, Term): + return self.quo(other) + else: + return NotImplemented + + def __pow__(self, other): # Term + if isinstance(other, SYMPY_INTS): + return self.pow(other) + else: + return NotImplemented + + def __eq__(self, other): # Term + return (self.coeff == other.coeff and + self.numer == other.numer and + self.denom == other.denom) + + def __ne__(self, other): # Term + return not self == other + + +def _gcd_terms(terms, isprimitive=False, fraction=True): + """Helper function for :func:`gcd_terms`. + + Parameters + ========== + + isprimitive : boolean, optional + If ``isprimitive`` is True then the call to primitive + for an Add will be skipped. This is useful when the + content has already been extracted. + + fraction : boolean, optional + If ``fraction`` is True then the expression will appear over a common + denominator, the lcm of all term denominators. + """ + + if isinstance(terms, Basic) and not isinstance(terms, Tuple): + terms = Add.make_args(terms) + + terms = list(map(Term, [t for t in terms if t])) + + # there is some simplification that may happen if we leave this + # here rather than duplicate it before the mapping of Term onto + # the terms + if len(terms) == 0: + return S.Zero, S.Zero, S.One + + if len(terms) == 1: + cont = terms[0].coeff + numer = terms[0].numer.as_expr() + denom = terms[0].denom.as_expr() + + else: + cont = terms[0] + for term in terms[1:]: + cont = cont.gcd(term) + + for i, term in enumerate(terms): + terms[i] = term.quo(cont) + + if fraction: + denom = terms[0].denom + + for term in terms[1:]: + denom = denom.lcm(term.denom) + + numers = [] + for term in terms: + numer = term.numer.mul(denom.quo(term.denom)) + numers.append(term.coeff*numer.as_expr()) + else: + numers = [t.as_expr() for t in terms] + denom = Term(S.One).numer + + cont = cont.as_expr() + numer = Add(*numers) + denom = denom.as_expr() + + if not isprimitive and numer.is_Add: + _cont, numer = numer.primitive() + cont *= _cont + + return cont, numer, denom + + +def gcd_terms(terms, isprimitive=False, clear=True, fraction=True): + """Compute the GCD of ``terms`` and put them together. + + Parameters + ========== + + terms : Expr + Can be an expression or a non-Basic sequence of expressions + which will be handled as though they are terms from a sum. + + isprimitive : bool, optional + If ``isprimitive`` is True the _gcd_terms will not run the primitive + method on the terms. + + clear : bool, optional + It controls the removal of integers from the denominator of an Add + expression. When True (default), all numerical denominator will be cleared; + when False the denominators will be cleared only if all terms had numerical + denominators other than 1. + + fraction : bool, optional + When True (default), will put the expression over a common + denominator. + + Examples + ======== + + >>> from sympy import gcd_terms + >>> from sympy.abc import x, y + + >>> gcd_terms((x + 1)**2*y + (x + 1)*y**2) + y*(x + 1)*(x + y + 1) + >>> gcd_terms(x/2 + 1) + (x + 2)/2 + >>> gcd_terms(x/2 + 1, clear=False) + x/2 + 1 + >>> gcd_terms(x/2 + y/2, clear=False) + (x + y)/2 + >>> gcd_terms(x/2 + 1/x) + (x**2 + 2)/(2*x) + >>> gcd_terms(x/2 + 1/x, fraction=False) + (x + 2/x)/2 + >>> gcd_terms(x/2 + 1/x, fraction=False, clear=False) + x/2 + 1/x + + >>> gcd_terms(x/2/y + 1/x/y) + (x**2 + 2)/(2*x*y) + >>> gcd_terms(x/2/y + 1/x/y, clear=False) + (x**2/2 + 1)/(x*y) + >>> gcd_terms(x/2/y + 1/x/y, clear=False, fraction=False) + (x/2 + 1/x)/y + + The ``clear`` flag was ignored in this case because the returned + expression was a rational expression, not a simple sum. + + See Also + ======== + + factor_terms, sympy.polys.polytools.terms_gcd + + """ + def mask(terms): + """replace nc portions of each term with a unique Dummy symbols + and return the replacements to restore them""" + args = [(a, []) if a.is_commutative else a.args_cnc() for a in terms] + reps = [] + for i, (c, nc) in enumerate(args): + if nc: + nc = Mul(*nc) + d = Dummy() + reps.append((d, nc)) + c.append(d) + args[i] = Mul(*c) + else: + args[i] = c + return args, dict(reps) + + isadd = isinstance(terms, Add) + addlike = isadd or not isinstance(terms, Basic) and \ + is_sequence(terms, include=set) and \ + not isinstance(terms, Dict) + + if addlike: + if isadd: # i.e. an Add + terms = list(terms.args) + else: + terms = sympify(terms) + terms, reps = mask(terms) + cont, numer, denom = _gcd_terms(terms, isprimitive, fraction) + numer = numer.xreplace(reps) + coeff, factors = cont.as_coeff_Mul() + if not clear: + c, _coeff = coeff.as_coeff_Mul() + if not c.is_Integer and not clear and numer.is_Add: + n, d = c.as_numer_denom() + _numer = numer/d + if any(a.as_coeff_Mul()[0].is_Integer + for a in _numer.args): + numer = _numer + coeff = n*_coeff + return _keep_coeff(coeff, factors*numer/denom, clear=clear) + + if not isinstance(terms, Basic): + return terms + + if terms.is_Atom: + return terms + + if terms.is_Mul: + c, args = terms.as_coeff_mul() + return _keep_coeff(c, Mul(*[gcd_terms(i, isprimitive, clear, fraction) + for i in args]), clear=clear) + + def handle(a): + # don't treat internal args like terms of an Add + if not isinstance(a, Expr): + if isinstance(a, Basic): + if not a.args: + return a + return a.func(*[handle(i) for i in a.args]) + return type(a)([handle(i) for i in a]) + return gcd_terms(a, isprimitive, clear, fraction) + + if isinstance(terms, Dict): + return Dict(*[(k, handle(v)) for k, v in terms.args]) + return terms.func(*[handle(i) for i in terms.args]) + + +def _factor_sum_int(expr, **kwargs): + """Return Sum or Integral object with factors that are not + in the wrt variables removed. In cases where there are additive + terms in the function of the object that are independent, the + object will be separated into two objects. + + Examples + ======== + + >>> from sympy import Sum, factor_terms + >>> from sympy.abc import x, y + >>> factor_terms(Sum(x + y, (x, 1, 3))) + y*Sum(1, (x, 1, 3)) + Sum(x, (x, 1, 3)) + >>> factor_terms(Sum(x*y, (x, 1, 3))) + y*Sum(x, (x, 1, 3)) + + Notes + ===== + + If a function in the summand or integrand is replaced + with a symbol, then this simplification should not be + done or else an incorrect result will be obtained when + the symbol is replaced with an expression that depends + on the variables of summation/integration: + + >>> eq = Sum(y, (x, 1, 3)) + >>> factor_terms(eq).subs(y, x).doit() + 3*x + >>> eq.subs(y, x).doit() + 6 + """ + result = expr.function + if result == 0: + return S.Zero + limits = expr.limits + + # get the wrt variables + wrt = {i.args[0] for i in limits} + + # factor out any common terms that are independent of wrt + f = factor_terms(result, **kwargs) + i, d = f.as_independent(*wrt) + if isinstance(f, Add): + return i * expr.func(1, *limits) + expr.func(d, *limits) + else: + return i * expr.func(d, *limits) + + +def factor_terms(expr: Expr | complex, radical=False, clear=False, fraction=False, sign=True) -> Expr: + """Remove common factors from terms in all arguments without + changing the underlying structure of the expr. No expansion or + simplification (and no processing of non-commutatives) is performed. + + Parameters + ========== + + radical: bool, optional + If radical=True then a radical common to all terms will be factored + out of any Add sub-expressions of the expr. + + clear : bool, optional + If clear=False (default) then coefficients will not be separated + from a single Add if they can be distributed to leave one or more + terms with integer coefficients. + + fraction : bool, optional + If fraction=True (default is False) then a common denominator will be + constructed for the expression. + + sign : bool, optional + If sign=True (default) then even if the only factor in common is a -1, + it will be factored out of the expression. + + Examples + ======== + + >>> from sympy import factor_terms, Symbol + >>> from sympy.abc import x, y + >>> factor_terms(x + x*(2 + 4*y)**3) + x*(8*(2*y + 1)**3 + 1) + >>> A = Symbol('A', commutative=False) + >>> factor_terms(x*A + x*A + x*y*A) + x*(y*A + 2*A) + + When ``clear`` is False, a rational will only be factored out of an + Add expression if all terms of the Add have coefficients that are + fractions: + + >>> factor_terms(x/2 + 1, clear=False) + x/2 + 1 + >>> factor_terms(x/2 + 1, clear=True) + (x + 2)/2 + + If a -1 is all that can be factored out, to *not* factor it out, the + flag ``sign`` must be False: + + >>> factor_terms(-x - y) + -(x + y) + >>> factor_terms(-x - y, sign=False) + -x - y + >>> factor_terms(-2*x - 2*y, sign=False) + -2*(x + y) + + See Also + ======== + + gcd_terms, sympy.polys.polytools.terms_gcd + + """ + def do(expr): + from sympy.concrete.summations import Sum + from sympy.integrals.integrals import Integral + is_iterable = iterable(expr) + + if not isinstance(expr, Basic) or expr.is_Atom: + if is_iterable: + return type(expr)([do(i) for i in expr]) + return expr + + if expr.is_Pow or expr.is_Function or \ + is_iterable or not hasattr(expr, 'args_cnc'): + args = expr.args + newargs = tuple([do(i) for i in args]) + if newargs == args: + return expr + return expr.func(*newargs) + + if isinstance(expr, (Sum, Integral)): + return _factor_sum_int(expr, + radical=radical, clear=clear, + fraction=fraction, sign=sign) + + cont, p = expr.as_content_primitive(radical=radical, clear=clear) + if p.is_Add: + list_args = [do(a) for a in Add.make_args(p)] + # get a common negative (if there) which gcd_terms does not remove + if not any(a.as_coeff_Mul()[0].extract_multiplicatively(-1) is None + for a in list_args): + cont = -cont + list_args = [-a for a in list_args] + # watch out for exp(-(x+2)) which gcd_terms will change to exp(-x-2) + special = {} + for i, a in enumerate(list_args): + b, e = a.as_base_exp() + if e.is_Mul and e != Mul(*e.args): + list_args[i] = Dummy() + special[list_args[i]] = a + # rebuild p not worrying about the order which gcd_terms will fix + p = Add._from_args(list_args) + p = gcd_terms(p, + isprimitive=True, + clear=clear, + fraction=fraction).xreplace(special) + elif p.args: + p = p.func( + *[do(a) for a in p.args]) + rv = _keep_coeff(cont, p, clear=clear, sign=sign) + return rv + expr2 = sympify(expr) + return do(expr2) + + +def _mask_nc(eq, name=None): + """ + Return ``eq`` with non-commutative objects replaced with Dummy + symbols. A dictionary that can be used to restore the original + values is returned: if it is None, the expression is noncommutative + and cannot be made commutative. The third value returned is a list + of any non-commutative symbols that appear in the returned equation. + + Explanation + =========== + + All non-commutative objects other than Symbols are replaced with + a non-commutative Symbol. Identical objects will be identified + by identical symbols. + + If there is only 1 non-commutative object in an expression it will + be replaced with a commutative symbol. Otherwise, the non-commutative + entities are retained and the calling routine should handle + replacements in this case since some care must be taken to keep + track of the ordering of symbols when they occur within Muls. + + Parameters + ========== + + name : str + ``name``, if given, is the name that will be used with numbered Dummy + variables that will replace the non-commutative objects and is mainly + used for doctesting purposes. + + Examples + ======== + + >>> from sympy.physics.secondquant import Commutator, NO, F, Fd + >>> from sympy import symbols + >>> from sympy.core.exprtools import _mask_nc + >>> from sympy.abc import x, y + >>> A, B, C = symbols('A,B,C', commutative=False) + + One nc-symbol: + + >>> _mask_nc(A**2 - x**2, 'd') + (_d0**2 - x**2, {_d0: A}, []) + + Multiple nc-symbols: + + >>> _mask_nc(A**2 - B**2, 'd') + (A**2 - B**2, {}, [A, B]) + + An nc-object with nc-symbols but no others outside of it: + + >>> _mask_nc(1 + x*Commutator(A, B), 'd') + (_d0*x + 1, {_d0: Commutator(A, B)}, []) + >>> _mask_nc(NO(Fd(x)*F(y)), 'd') + (_d0, {_d0: NO(CreateFermion(x)*AnnihilateFermion(y))}, []) + + Multiple nc-objects: + + >>> eq = x*Commutator(A, B) + x*Commutator(A, C)*Commutator(A, B) + >>> _mask_nc(eq, 'd') + (x*_d0 + x*_d1*_d0, {_d0: Commutator(A, B), _d1: Commutator(A, C)}, [_d0, _d1]) + + Multiple nc-objects and nc-symbols: + + >>> eq = A*Commutator(A, B) + B*Commutator(A, C) + >>> _mask_nc(eq, 'd') + (A*_d0 + B*_d1, {_d0: Commutator(A, B), _d1: Commutator(A, C)}, [_d0, _d1, A, B]) + + """ + name = name or 'mask' + # Make Dummy() append sequential numbers to the name + + def numbered_names(): + i = 0 + while True: + yield name + str(i) + i += 1 + + names = numbered_names() + + def Dummy(*args, **kwargs): + from .symbol import Dummy + return Dummy(next(names), *args, **kwargs) + + expr = eq + if expr.is_commutative: + return eq, {}, [] + + # identify nc-objects; symbols and other + rep = [] + nc_obj = set() + nc_syms = set() + pot = preorder_traversal(expr, keys=default_sort_key) + for a in pot: + if any(a == r[0] for r in rep): + pot.skip() + elif not a.is_commutative: + if a.is_symbol: + nc_syms.add(a) + pot.skip() + elif not (a.is_Add or a.is_Mul or a.is_Pow): + nc_obj.add(a) + pot.skip() + + # If there is only one nc symbol or object, it can be factored regularly + # but polys is going to complain, so replace it with a Dummy. + if len(nc_obj) == 1 and not nc_syms: + rep.append((nc_obj.pop(), Dummy())) + elif len(nc_syms) == 1 and not nc_obj: + rep.append((nc_syms.pop(), Dummy())) + + # Any remaining nc-objects will be replaced with an nc-Dummy and + # identified as an nc-Symbol to watch out for + nc_obj = sorted(nc_obj, key=default_sort_key) + for n in nc_obj: + nc = Dummy(commutative=False) + rep.append((n, nc)) + nc_syms.add(nc) + expr = expr.subs(rep) + + nc_syms = list(nc_syms) + nc_syms.sort(key=default_sort_key) + return expr, {v: k for k, v in rep}, nc_syms + + +def factor_nc(expr): + """Return the factored form of ``expr`` while handling non-commutative + expressions. + + Examples + ======== + + >>> from sympy import factor_nc, Symbol + >>> from sympy.abc import x + >>> A = Symbol('A', commutative=False) + >>> B = Symbol('B', commutative=False) + >>> factor_nc((x**2 + 2*A*x + A**2).expand()) + (x + A)**2 + >>> factor_nc(((x + A)*(x + B)).expand()) + (x + A)*(x + B) + """ + expr = sympify(expr) + if not isinstance(expr, Expr) or not expr.args: + return expr + if not expr.is_Add: + return expr.func(*[factor_nc(a) for a in expr.args]) + expr = expr.func(*[expand_power_exp(i) for i in expr.args]) + + from sympy.polys.polytools import gcd, factor + expr, rep, nc_symbols = _mask_nc(expr) + + if rep: + return factor(expr).subs(rep) + else: + args = [a.args_cnc() for a in Add.make_args(expr)] + c = g = l = r = S.One + hit = False + # find any commutative gcd term + for i, a in enumerate(args): + if i == 0: + c = Mul._from_args(a[0]) + elif a[0]: + c = gcd(c, Mul._from_args(a[0])) + else: + c = S.One + if c is not S.One: + hit = True + c, g = c.as_coeff_Mul() + if g is not S.One: + for i, (cc, _) in enumerate(args): + cc = list(Mul.make_args(Mul._from_args(list(cc))/g)) + args[i][0] = cc + for i, (cc, _) in enumerate(args): + if cc: + cc[0] = cc[0]/c + else: + cc = [1/c] + args[i][0] = cc + # find any noncommutative common prefix + for i, a in enumerate(args): + if i == 0: + n = a[1][:] + else: + n = common_prefix(n, a[1]) + if not n: + # is there a power that can be extracted? + if not args[0][1]: + break + b, e = args[0][1][0].as_base_exp() + ok = False + if e.is_Integer: + for t in args: + if not t[1]: + break + bt, et = t[1][0].as_base_exp() + if et.is_Integer and bt == b: + e = min(e, et) + else: + break + else: + ok = hit = True + l = b**e + il = b**-e + for _ in args: + _[1][0] = il*_[1][0] + break + if not ok: + break + else: + hit = True + lenn = len(n) + l = Mul(*n) + for _ in args: + _[1] = _[1][lenn:] + # find any noncommutative common suffix + for i, a in enumerate(args): + if i == 0: + n = a[1][:] + else: + n = common_suffix(n, a[1]) + if not n: + # is there a power that can be extracted? + if not args[0][1]: + break + b, e = args[0][1][-1].as_base_exp() + ok = False + if e.is_Integer: + for t in args: + if not t[1]: + break + bt, et = t[1][-1].as_base_exp() + if et.is_Integer and bt == b: + e = min(e, et) + else: + break + else: + ok = hit = True + r = b**e + il = b**-e + for _ in args: + _[1][-1] = _[1][-1]*il + break + if not ok: + break + else: + hit = True + lenn = len(n) + r = Mul(*n) + for _ in args: + _[1] = _[1][:len(_[1]) - lenn] + if hit: + mid = Add(*[Mul(*cc)*Mul(*nc) for cc, nc in args]) + else: + mid = expr + + from sympy.simplify.powsimp import powsimp + + # sort the symbols so the Dummys would appear in the same + # order as the original symbols, otherwise you may introduce + # a factor of -1, e.g. A**2 - B**2) -- {A:y, B:x} --> y**2 - x**2 + # and the former factors into two terms, (A - B)*(A + B) while the + # latter factors into 3 terms, (-1)*(x - y)*(x + y) + rep1 = [(n, Dummy()) for n in sorted(nc_symbols, key=default_sort_key)] + unrep1 = [(v, k) for k, v in rep1] + unrep1.reverse() + new_mid, r2, _ = _mask_nc(mid.subs(rep1)) + new_mid = powsimp(factor(new_mid)) + + new_mid = new_mid.subs(r2).subs(unrep1) + + if new_mid.is_Pow: + return _keep_coeff(c, g*l*new_mid*r) + + if new_mid.is_Mul: + def _pemexpand(expr): + "Expand with the minimal set of hints necessary to check the result." + return expr.expand(deep=True, mul=True, power_exp=True, + power_base=False, basic=False, multinomial=True, log=False) + # XXX TODO there should be a way to inspect what order the terms + # must be in and just select the plausible ordering without + # checking permutations + cfac = [] + ncfac = [] + for f in new_mid.args: + if f.is_commutative: + cfac.append(f) + else: + b, e = f.as_base_exp() + if e.is_Integer: + ncfac.extend([b]*e) + else: + ncfac.append(f) + pre_mid = g*Mul(*cfac)*l + target = _pemexpand(expr/c) + for s in variations(ncfac, len(ncfac)): + ok = pre_mid*Mul(*s)*r + if _pemexpand(ok) == target: + return _keep_coeff(c, ok) + + # mid was an Add that didn't factor successfully + return _keep_coeff(c, g*l*mid*r) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/facts.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/facts.py new file mode 100644 index 0000000000000000000000000000000000000000..0b98d9b14bbac661d3c0fd1d1fd87977a792fb74 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/facts.py @@ -0,0 +1,634 @@ +r"""This is rule-based deduction system for SymPy + +The whole thing is split into two parts + + - rules compilation and preparation of tables + - runtime inference + +For rule-based inference engines, the classical work is RETE algorithm [1], +[2] Although we are not implementing it in full (or even significantly) +it's still worth a read to understand the underlying ideas. + +In short, every rule in a system of rules is one of two forms: + + - atom -> ... (alpha rule) + - And(atom1, atom2, ...) -> ... (beta rule) + + +The major complexity is in efficient beta-rules processing and usually for an +expert system a lot of effort goes into code that operates on beta-rules. + + +Here we take minimalistic approach to get something usable first. + + - (preparation) of alpha- and beta- networks, everything except + - (runtime) FactRules.deduce_all_facts + + _____________________________________ + ( Kirr: I've never thought that doing ) + ( logic stuff is that difficult... ) + ------------------------------------- + o ^__^ + o (oo)\_______ + (__)\ )\/\ + ||----w | + || || + + +Some references on the topic +---------------------------- + +[1] https://en.wikipedia.org/wiki/Rete_algorithm +[2] http://reports-archive.adm.cs.cmu.edu/anon/1995/CMU-CS-95-113.pdf + +https://en.wikipedia.org/wiki/Propositional_formula +https://en.wikipedia.org/wiki/Inference_rule +https://en.wikipedia.org/wiki/List_of_rules_of_inference +""" + +from collections import defaultdict +from typing import Iterator + +from .logic import Logic, And, Or, Not + + +def _base_fact(atom): + """Return the literal fact of an atom. + + Effectively, this merely strips the Not around a fact. + """ + if isinstance(atom, Not): + return atom.arg + else: + return atom + + +def _as_pair(atom): + if isinstance(atom, Not): + return (atom.arg, False) + else: + return (atom, True) + +# XXX this prepares forward-chaining rules for alpha-network + + +def transitive_closure(implications): + """ + Computes the transitive closure of a list of implications + + Uses Warshall's algorithm, as described at + http://www.cs.hope.edu/~cusack/Notes/Notes/DiscreteMath/Warshall.pdf. + """ + full_implications = set(implications) + literals = set().union(*map(set, full_implications)) + + for k in literals: + for i in literals: + if (i, k) in full_implications: + for j in literals: + if (k, j) in full_implications: + full_implications.add((i, j)) + + return full_implications + + +def deduce_alpha_implications(implications): + """deduce all implications + + Description by example + ---------------------- + + given set of logic rules: + + a -> b + b -> c + + we deduce all possible rules: + + a -> b, c + b -> c + + + implications: [] of (a,b) + return: {} of a -> set([b, c, ...]) + """ + implications = implications + [(Not(j), Not(i)) for (i, j) in implications] + res = defaultdict(set) + full_implications = transitive_closure(implications) + for a, b in full_implications: + if a == b: + continue # skip a->a cyclic input + + res[a].add(b) + + # Clean up tautologies and check consistency + for a, impl in res.items(): + impl.discard(a) + na = Not(a) + if na in impl: + raise ValueError( + 'implications are inconsistent: %s -> %s %s' % (a, na, impl)) + + return res + + +def apply_beta_to_alpha_route(alpha_implications, beta_rules): + """apply additional beta-rules (And conditions) to already-built + alpha implication tables + + TODO: write about + + - static extension of alpha-chains + - attaching refs to beta-nodes to alpha chains + + + e.g. + + alpha_implications: + + a -> [b, !c, d] + b -> [d] + ... + + + beta_rules: + + &(b,d) -> e + + + then we'll extend a's rule to the following + + a -> [b, !c, d, e] + """ + x_impl = {} + for x in alpha_implications.keys(): + x_impl[x] = (set(alpha_implications[x]), []) + for bcond, bimpl in beta_rules: + for bk in bcond.args: + if bk in x_impl: + continue + x_impl[bk] = (set(), []) + + # static extensions to alpha rules: + # A: x -> a,b B: &(a,b) -> c ==> A: x -> a,b,c + seen_static_extension = True + while seen_static_extension: + seen_static_extension = False + + for bcond, bimpl in beta_rules: + if not isinstance(bcond, And): + raise TypeError("Cond is not And") + bargs = set(bcond.args) + for x, (ximpls, bb) in x_impl.items(): + x_all = ximpls | {x} + # A: ... -> a B: &(...) -> a is non-informative + if bimpl not in x_all and bargs.issubset(x_all): + ximpls.add(bimpl) + + # we introduced new implication - now we have to restore + # completeness of the whole set. + bimpl_impl = x_impl.get(bimpl) + if bimpl_impl is not None: + ximpls |= bimpl_impl[0] + seen_static_extension = True + + # attach beta-nodes which can be possibly triggered by an alpha-chain + for bidx, (bcond, bimpl) in enumerate(beta_rules): + bargs = set(bcond.args) + for x, (ximpls, bb) in x_impl.items(): + x_all = ximpls | {x} + # A: ... -> a B: &(...) -> a (non-informative) + if bimpl in x_all: + continue + # A: x -> a... B: &(!a,...) -> ... (will never trigger) + # A: x -> a... B: &(...) -> !a (will never trigger) + if any(Not(xi) in bargs or Not(xi) == bimpl for xi in x_all): + continue + + if bargs & x_all: + bb.append(bidx) + + return x_impl + + +def rules_2prereq(rules): + """build prerequisites table from rules + + Description by example + ---------------------- + + given set of logic rules: + + a -> b, c + b -> c + + we build prerequisites (from what points something can be deduced): + + b <- a + c <- a, b + + rules: {} of a -> [b, c, ...] + return: {} of c <- [a, b, ...] + + Note however, that this prerequisites may be *not* enough to prove a + fact. An example is 'a -> b' rule, where prereq(a) is b, and prereq(b) + is a. That's because a=T -> b=T, and b=F -> a=F, but a=F -> b=? + """ + prereq = defaultdict(set) + for (a, _), impl in rules.items(): + if isinstance(a, Not): + a = a.args[0] + for (i, _) in impl: + if isinstance(i, Not): + i = i.args[0] + prereq[i].add(a) + return prereq + +################ +# RULES PROVER # +################ + + +class TautologyDetected(Exception): + """(internal) Prover uses it for reporting detected tautology""" + pass + + +class Prover: + """ai - prover of logic rules + + given a set of initial rules, Prover tries to prove all possible rules + which follow from given premises. + + As a result proved_rules are always either in one of two forms: alpha or + beta: + + Alpha rules + ----------- + + This are rules of the form:: + + a -> b & c & d & ... + + + Beta rules + ---------- + + This are rules of the form:: + + &(a,b,...) -> c & d & ... + + + i.e. beta rules are join conditions that say that something follows when + *several* facts are true at the same time. + """ + + def __init__(self): + self.proved_rules = [] + self._rules_seen = set() + + def split_alpha_beta(self): + """split proved rules into alpha and beta chains""" + rules_alpha = [] # a -> b + rules_beta = [] # &(...) -> b + for a, b in self.proved_rules: + if isinstance(a, And): + rules_beta.append((a, b)) + else: + rules_alpha.append((a, b)) + return rules_alpha, rules_beta + + @property + def rules_alpha(self): + return self.split_alpha_beta()[0] + + @property + def rules_beta(self): + return self.split_alpha_beta()[1] + + def process_rule(self, a, b): + """process a -> b rule""" # TODO write more? + if (not a) or isinstance(b, bool): + return + if isinstance(a, bool): + return + if (a, b) in self._rules_seen: + return + else: + self._rules_seen.add((a, b)) + + # this is the core of processing + try: + self._process_rule(a, b) + except TautologyDetected: + pass + + def _process_rule(self, a, b): + # right part first + + # a -> b & c --> a -> b ; a -> c + # (?) FIXME this is only correct when b & c != null ! + + if isinstance(b, And): + sorted_bargs = sorted(b.args, key=str) + for barg in sorted_bargs: + self.process_rule(a, barg) + + # a -> b | c --> !b & !c -> !a + # --> a & !b -> c + # --> a & !c -> b + elif isinstance(b, Or): + sorted_bargs = sorted(b.args, key=str) + # detect tautology first + if not isinstance(a, Logic): # Atom + # tautology: a -> a|c|... + if a in sorted_bargs: + raise TautologyDetected(a, b, 'a -> a|c|...') + self.process_rule(And(*[Not(barg) for barg in b.args]), Not(a)) + + for bidx in range(len(sorted_bargs)): + barg = sorted_bargs[bidx] + brest = sorted_bargs[:bidx] + sorted_bargs[bidx + 1:] + self.process_rule(And(a, Not(barg)), Or(*brest)) + + # left part + + # a & b -> c --> IRREDUCIBLE CASE -- WE STORE IT AS IS + # (this will be the basis of beta-network) + elif isinstance(a, And): + sorted_aargs = sorted(a.args, key=str) + if b in sorted_aargs: + raise TautologyDetected(a, b, 'a & b -> a') + self.proved_rules.append((a, b)) + # XXX NOTE at present we ignore !c -> !a | !b + + elif isinstance(a, Or): + sorted_aargs = sorted(a.args, key=str) + if b in sorted_aargs: + raise TautologyDetected(a, b, 'a | b -> a') + for aarg in sorted_aargs: + self.process_rule(aarg, b) + + else: + # both `a` and `b` are atoms + self.proved_rules.append((a, b)) # a -> b + self.proved_rules.append((Not(b), Not(a))) # !b -> !a + +######################################## + + +class FactRules: + """Rules that describe how to deduce facts in logic space + + When defined, these rules allow implications to quickly be determined + for a set of facts. For this precomputed deduction tables are used. + see `deduce_all_facts` (forward-chaining) + + Also it is possible to gather prerequisites for a fact, which is tried + to be proven. (backward-chaining) + + + Definition Syntax + ----------------- + + a -> b -- a=T -> b=T (and automatically b=F -> a=F) + a -> !b -- a=T -> b=F + a == b -- a -> b & b -> a + a -> b & c -- a=T -> b=T & c=T + # TODO b | c + + + Internals + --------- + + .full_implications[k, v]: all the implications of fact k=v + .beta_triggers[k, v]: beta rules that might be triggered when k=v + .prereq -- {} k <- [] of k's prerequisites + + .defined_facts -- set of defined fact names + """ + + def __init__(self, rules): + """Compile rules into internal lookup tables""" + + if isinstance(rules, str): + rules = rules.splitlines() + + # --- parse and process rules --- + P = Prover() + + for rule in rules: + # XXX `a` is hardcoded to be always atom + a, op, b = rule.split(None, 2) + + a = Logic.fromstring(a) + b = Logic.fromstring(b) + + if op == '->': + P.process_rule(a, b) + elif op == '==': + P.process_rule(a, b) + P.process_rule(b, a) + else: + raise ValueError('unknown op %r' % op) + + # --- build deduction networks --- + self.beta_rules = [] + for bcond, bimpl in P.rules_beta: + self.beta_rules.append( + ({_as_pair(a) for a in bcond.args}, _as_pair(bimpl))) + + # deduce alpha implications + impl_a = deduce_alpha_implications(P.rules_alpha) + + # now: + # - apply beta rules to alpha chains (static extension), and + # - further associate beta rules to alpha chain (for inference + # at runtime) + impl_ab = apply_beta_to_alpha_route(impl_a, P.rules_beta) + + # extract defined fact names + self.defined_facts = {_base_fact(k) for k in impl_ab.keys()} + + # build rels (forward chains) + full_implications = defaultdict(set) + beta_triggers = defaultdict(set) + for k, (impl, betaidxs) in impl_ab.items(): + full_implications[_as_pair(k)] = {_as_pair(i) for i in impl} + beta_triggers[_as_pair(k)] = betaidxs + + self.full_implications = full_implications + self.beta_triggers = beta_triggers + + # build prereq (backward chains) + prereq = defaultdict(set) + rel_prereq = rules_2prereq(full_implications) + for k, pitems in rel_prereq.items(): + prereq[k] |= pitems + self.prereq = prereq + + def _to_python(self) -> str: + """ Generate a string with plain python representation of the instance """ + return '\n'.join(self.print_rules()) + + @classmethod + def _from_python(cls, data : dict): + """ Generate an instance from the plain python representation """ + self = cls('') + for key in ['full_implications', 'beta_triggers', 'prereq']: + d=defaultdict(set) + d.update(data[key]) + setattr(self, key, d) + self.beta_rules = data['beta_rules'] + self.defined_facts = set(data['defined_facts']) + + return self + + def _defined_facts_lines(self): + yield 'defined_facts = [' + for fact in sorted(self.defined_facts): + yield f' {fact!r},' + yield '] # defined_facts' + + def _full_implications_lines(self): + yield 'full_implications = dict( [' + for fact in sorted(self.defined_facts): + for value in (True, False): + yield f' # Implications of {fact} = {value}:' + yield f' (({fact!r}, {value!r}), set( (' + implications = self.full_implications[(fact, value)] + for implied in sorted(implications): + yield f' {implied!r},' + yield ' ) ),' + yield ' ),' + yield ' ] ) # full_implications' + + def _prereq_lines(self): + yield 'prereq = {' + yield '' + for fact in sorted(self.prereq): + yield f' # facts that could determine the value of {fact}' + yield f' {fact!r}: {{' + for pfact in sorted(self.prereq[fact]): + yield f' {pfact!r},' + yield ' },' + yield '' + yield '} # prereq' + + def _beta_rules_lines(self): + reverse_implications = defaultdict(list) + for n, (pre, implied) in enumerate(self.beta_rules): + reverse_implications[implied].append((pre, n)) + + yield '# Note: the order of the beta rules is used in the beta_triggers' + yield 'beta_rules = [' + yield '' + m = 0 + indices = {} + for implied in sorted(reverse_implications): + fact, value = implied + yield f' # Rules implying {fact} = {value}' + for pre, n in reverse_implications[implied]: + indices[n] = m + m += 1 + setstr = ", ".join(map(str, sorted(pre))) + yield f' ({{{setstr}}},' + yield f' {implied!r}),' + yield '' + yield '] # beta_rules' + + yield 'beta_triggers = {' + for query in sorted(self.beta_triggers): + fact, value = query + triggers = [indices[n] for n in self.beta_triggers[query]] + yield f' {query!r}: {triggers!r},' + yield '} # beta_triggers' + + def print_rules(self) -> Iterator[str]: + """ Returns a generator with lines to represent the facts and rules """ + yield from self._defined_facts_lines() + yield '' + yield '' + yield from self._full_implications_lines() + yield '' + yield '' + yield from self._prereq_lines() + yield '' + yield '' + yield from self._beta_rules_lines() + yield '' + yield '' + yield "generated_assumptions = {'defined_facts': defined_facts, 'full_implications': full_implications," + yield " 'prereq': prereq, 'beta_rules': beta_rules, 'beta_triggers': beta_triggers}" + + +class InconsistentAssumptions(ValueError): + def __str__(self): + kb, fact, value = self.args + return "%s, %s=%s" % (kb, fact, value) + + +class FactKB(dict): + """ + A simple propositional knowledge base relying on compiled inference rules. + """ + def __str__(self): + return '{\n%s}' % ',\n'.join( + ["\t%s: %s" % i for i in sorted(self.items())]) + + def __init__(self, rules): + self.rules = rules + + def _tell(self, k, v): + """Add fact k=v to the knowledge base. + + Returns True if the KB has actually been updated, False otherwise. + """ + if k in self and self[k] is not None: + if self[k] == v: + return False + else: + raise InconsistentAssumptions(self, k, v) + else: + self[k] = v + return True + + # ********************************************* + # * This is the workhorse, so keep it *fast*. * + # ********************************************* + def deduce_all_facts(self, facts): + """ + Update the KB with all the implications of a list of facts. + + Facts can be specified as a dictionary or as a list of (key, value) + pairs. + """ + # keep frequently used attributes locally, so we'll avoid extra + # attribute access overhead + full_implications = self.rules.full_implications + beta_triggers = self.rules.beta_triggers + beta_rules = self.rules.beta_rules + + if isinstance(facts, dict): + facts = facts.items() + + while facts: + beta_maytrigger = set() + + # --- alpha chains --- + for k, v in facts: + if not self._tell(k, v) or v is None: + continue + + # lookup routing tables + for key, value in full_implications[k, v]: + self._tell(key, value) + + beta_maytrigger.update(beta_triggers[k, v]) + + # --- beta chains --- + facts = [] + for bidx in beta_maytrigger: + bcond, bimpl = beta_rules[bidx] + if all(self.get(k) is v for k, v in bcond): + facts.append(bimpl) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/function.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/function.py new file mode 100644 index 0000000000000000000000000000000000000000..ac850845e0bb2aaf9b535635567d6e2629527ad7 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/function.py @@ -0,0 +1,3423 @@ +""" +There are three types of functions implemented in SymPy: + + 1) defined functions (in the sense that they can be evaluated) like + exp or sin; they have a name and a body: + f = exp + 2) undefined function which have a name but no body. Undefined + functions can be defined using a Function class as follows: + f = Function('f') + (the result will be a Function instance) + 3) anonymous function (or lambda function) which have a body (defined + with dummy variables) but have no name: + f = Lambda(x, exp(x)*x) + f = Lambda((x, y), exp(x)*y) + The fourth type of functions are composites, like (sin + cos)(x); these work in + SymPy core, but are not yet part of SymPy. + + Examples + ======== + + >>> import sympy + >>> f = sympy.Function("f") + >>> from sympy.abc import x + >>> f(x) + f(x) + >>> print(sympy.srepr(f(x).func)) + Function('f') + >>> f(x).args + (x,) + +""" + +from __future__ import annotations + +from typing import Any +from collections.abc import Iterable +import copyreg + +from .add import Add +from .basic import Basic, _atomic +from .cache import cacheit +from .containers import Tuple, Dict +from .decorators import _sympifyit +from .evalf import pure_complex +from .expr import Expr, AtomicExpr +from .logic import fuzzy_and, fuzzy_or, fuzzy_not, FuzzyBool +from .mul import Mul +from .numbers import Rational, Float, Integer +from .operations import LatticeOp +from .parameters import global_parameters +from .rules import Transform +from .singleton import S +from .sympify import sympify, _sympify + +from .sorting import default_sort_key, ordered +from sympy.utilities.exceptions import (sympy_deprecation_warning, + SymPyDeprecationWarning, ignore_warnings) +from sympy.utilities.iterables import (has_dups, sift, iterable, + is_sequence, uniq, topological_sort) +from sympy.utilities.lambdify import MPMATH_TRANSLATIONS +from sympy.utilities.misc import as_int, filldedent, func_name + +import mpmath +from mpmath.libmp.libmpf import prec_to_dps + +import inspect +from collections import Counter + +def _coeff_isneg(a): + """Return True if the leading Number is negative. + + Examples + ======== + + >>> from sympy.core.function import _coeff_isneg + >>> from sympy import S, Symbol, oo, pi + >>> _coeff_isneg(-3*pi) + True + >>> _coeff_isneg(S(3)) + False + >>> _coeff_isneg(-oo) + True + >>> _coeff_isneg(Symbol('n', negative=True)) # coeff is 1 + False + + For matrix expressions: + + >>> from sympy import MatrixSymbol, sqrt + >>> A = MatrixSymbol("A", 3, 3) + >>> _coeff_isneg(-sqrt(2)*A) + True + >>> _coeff_isneg(sqrt(2)*A) + False + """ + + if a.is_MatMul: + a = a.args[0] + if a.is_Mul: + a = a.args[0] + return a.is_Number and a.is_extended_negative + + +class PoleError(Exception): + pass + + +class ArgumentIndexError(ValueError): + def __str__(self): + return ("Invalid operation with argument number %s for Function %s" % + (self.args[1], self.args[0])) + + +class BadSignatureError(TypeError): + '''Raised when a Lambda is created with an invalid signature''' + pass + + +class BadArgumentsError(TypeError): + '''Raised when a Lambda is called with an incorrect number of arguments''' + pass + + +# Python 3 version that does not raise a Deprecation warning +def arity(cls): + """Return the arity of the function if it is known, else None. + + Explanation + =========== + + When default values are specified for some arguments, they are + optional and the arity is reported as a tuple of possible values. + + Examples + ======== + + >>> from sympy import arity, log + >>> arity(lambda x: x) + 1 + >>> arity(log) + (1, 2) + >>> arity(lambda *x: sum(x)) is None + True + """ + eval_ = getattr(cls, 'eval', cls) + + parameters = inspect.signature(eval_).parameters.items() + if [p for _, p in parameters if p.kind == p.VAR_POSITIONAL]: + return + p_or_k = [p for _, p in parameters if p.kind == p.POSITIONAL_OR_KEYWORD] + # how many have no default and how many have a default value + no, yes = map(len, sift(p_or_k, + lambda p:p.default == p.empty, binary=True)) + return no if not yes else tuple(range(no, no + yes + 1)) + +class FunctionClass(type): + """ + Base class for function classes. FunctionClass is a subclass of type. + + Use Function('' [ , signature ]) to create + undefined function classes. + """ + _new = type.__new__ + + def __init__(cls, *args, **kwargs): + # honor kwarg value or class-defined value before using + # the number of arguments in the eval function (if present) + nargs = kwargs.pop('nargs', cls.__dict__.get('nargs', arity(cls))) + if nargs is None and 'nargs' not in cls.__dict__: + for supcls in cls.__mro__: + if hasattr(supcls, '_nargs'): + nargs = supcls._nargs + break + else: + continue + + # Canonicalize nargs here; change to set in nargs. + if is_sequence(nargs): + if not nargs: + raise ValueError(filldedent(''' + Incorrectly specified nargs as %s: + if there are no arguments, it should be + `nargs = 0`; + if there are any number of arguments, + it should be + `nargs = None`''' % str(nargs))) + nargs = tuple(ordered(set(nargs))) + elif nargs is not None: + nargs = (as_int(nargs),) + cls._nargs = nargs + + # When __init__ is called from UndefinedFunction it is called with + # just one arg but when it is called from subclassing Function it is + # called with the usual (name, bases, namespace) type() signature. + if len(args) == 3: + namespace = args[2] + if 'eval' in namespace and not isinstance(namespace['eval'], classmethod): + raise TypeError("eval on Function subclasses should be a class method (defined with @classmethod)") + + @property + def __signature__(self): + """ + Allow Python 3's inspect.signature to give a useful signature for + Function subclasses. + """ + # Python 3 only, but backports (like the one in IPython) still might + # call this. + try: + from inspect import signature + except ImportError: + return None + + # TODO: Look at nargs + return signature(self.eval) + + @property + def free_symbols(self): + return set() + + @property + def xreplace(self): + # Function needs args so we define a property that returns + # a function that takes args...and then use that function + # to return the right value + return lambda rule, **_: rule.get(self, self) + + @property + def nargs(self): + """Return a set of the allowed number of arguments for the function. + + Examples + ======== + + >>> from sympy import Function + >>> f = Function('f') + + If the function can take any number of arguments, the set of whole + numbers is returned: + + >>> Function('f').nargs + Naturals0 + + If the function was initialized to accept one or more arguments, a + corresponding set will be returned: + + >>> Function('f', nargs=1).nargs + {1} + >>> Function('f', nargs=(2, 1)).nargs + {1, 2} + + The undefined function, after application, also has the nargs + attribute; the actual number of arguments is always available by + checking the ``args`` attribute: + + >>> f = Function('f') + >>> f(1).nargs + Naturals0 + >>> len(f(1).args) + 1 + """ + from sympy.sets.sets import FiniteSet + # XXX it would be nice to handle this in __init__ but there are import + # problems with trying to import FiniteSet there + return FiniteSet(*self._nargs) if self._nargs else S.Naturals0 + + def _valid_nargs(self, n : int) -> bool: + """ Return True if the specified integer is a valid number of arguments + + The number of arguments n is guaranteed to be an integer and positive + + """ + if self._nargs: + return n in self._nargs + + nargs = self.nargs + return nargs is S.Naturals0 or n in nargs + + def __repr__(cls): + return cls.__name__ + + +class Application(Basic, metaclass=FunctionClass): + """ + Base class for applied functions. + + Explanation + =========== + + Instances of Application represent the result of applying an application of + any type to any object. + """ + + is_Function = True + + @cacheit + def __new__(cls, *args, **options): + from sympy.sets.fancysets import Naturals0 + from sympy.sets.sets import FiniteSet + + args = list(map(sympify, args)) + evaluate = options.pop('evaluate', global_parameters.evaluate) + # WildFunction (and anything else like it) may have nargs defined + # and we throw that value away here + options.pop('nargs', None) + + if options: + raise ValueError("Unknown options: %s" % options) + + if evaluate: + evaluated = cls.eval(*args) + if evaluated is not None: + return evaluated + + obj = super().__new__(cls, *args, **options) + + # make nargs uniform here + sentinel = object() + objnargs = getattr(obj, "nargs", sentinel) + if objnargs is not sentinel: + # things passing through here: + # - functions subclassed from Function (e.g. myfunc(1).nargs) + # - functions like cos(1).nargs + # - AppliedUndef with given nargs like Function('f', nargs=1)(1).nargs + # Canonicalize nargs here + if is_sequence(objnargs): + nargs = tuple(ordered(set(objnargs))) + elif objnargs is not None: + nargs = (as_int(objnargs),) + else: + nargs = None + else: + # things passing through here: + # - WildFunction('f').nargs + # - AppliedUndef with no nargs like Function('f')(1).nargs + nargs = obj._nargs # note the underscore here + # convert to FiniteSet + obj.nargs = FiniteSet(*nargs) if nargs else Naturals0() + return obj + + @classmethod + def eval(cls, *args): + """ + Returns a canonical form of cls applied to arguments args. + + Explanation + =========== + + The ``eval()`` method is called when the class ``cls`` is about to be + instantiated and it should return either some simplified instance + (possible of some other class), or if the class ``cls`` should be + unmodified, return None. + + Examples of ``eval()`` for the function "sign" + + .. code-block:: python + + @classmethod + def eval(cls, arg): + if arg is S.NaN: + return S.NaN + if arg.is_zero: return S.Zero + if arg.is_positive: return S.One + if arg.is_negative: return S.NegativeOne + if isinstance(arg, Mul): + coeff, terms = arg.as_coeff_Mul(rational=True) + if coeff is not S.One: + return cls(coeff) * cls(terms) + + """ + return + + @property + def func(self): + return self.__class__ + + def _eval_subs(self, old, new): + if (old.is_Function and new.is_Function and + callable(old) and callable(new) and + old == self.func and len(self.args) in new.nargs): + return new(*[i._subs(old, new) for i in self.args]) + + +class Function(Application, Expr): + r""" + Base class for applied mathematical functions. + + It also serves as a constructor for undefined function classes. + + See the :ref:`custom-functions` guide for details on how to subclass + ``Function`` and what methods can be defined. + + Examples + ======== + + **Undefined Functions** + + To create an undefined function, pass a string of the function name to + ``Function``. + + >>> from sympy import Function, Symbol + >>> x = Symbol('x') + >>> f = Function('f') + >>> g = Function('g')(x) + >>> f + f + >>> f(x) + f(x) + >>> g + g(x) + >>> f(x).diff(x) + Derivative(f(x), x) + >>> g.diff(x) + Derivative(g(x), x) + + Assumptions can be passed to ``Function`` the same as with a + :class:`~.Symbol`. Alternatively, you can use a ``Symbol`` with + assumptions for the function name and the function will inherit the name + and assumptions associated with the ``Symbol``: + + >>> f_real = Function('f', real=True) + >>> f_real(x).is_real + True + >>> f_real_inherit = Function(Symbol('f', real=True)) + >>> f_real_inherit(x).is_real + True + + Note that assumptions on a function are unrelated to the assumptions on + the variables it is called on. If you want to add a relationship, subclass + ``Function`` and define custom assumptions handler methods. See the + :ref:`custom-functions-assumptions` section of the :ref:`custom-functions` + guide for more details. + + **Custom Function Subclasses** + + The :ref:`custom-functions` guide has several + :ref:`custom-functions-complete-examples` of how to subclass ``Function`` + to create a custom function. + + """ + + @property + def _diff_wrt(self): + return False + + @cacheit + def __new__(cls, *args, **options) -> type[AppliedUndef]: # type: ignore + # Handle calls like Function('f') + if cls is Function: + return UndefinedFunction(*args, **options) # type: ignore + else: + return cls._new_(*args, **options) # type: ignore + + @classmethod + def _new_(cls, *args, **options) -> Expr: + n = len(args) + + if not cls._valid_nargs(n): + # XXX: exception message must be in exactly this format to + # make it work with NumPy's functions like vectorize(). See, + # for example, https://github.com/numpy/numpy/issues/1697. + # The ideal solution would be just to attach metadata to + # the exception and change NumPy to take advantage of this. + temp = ('%(name)s takes %(qual)s %(args)s ' + 'argument%(plural)s (%(given)s given)') + raise TypeError(temp % { + 'name': cls, + 'qual': 'exactly' if len(cls.nargs) == 1 else 'at least', + 'args': min(cls.nargs), + 'plural': 's'*(min(cls.nargs) != 1), + 'given': n}) + + evaluate = options.get('evaluate', global_parameters.evaluate) + result = super().__new__(cls, *args, **options) + if evaluate and isinstance(result, cls) and result.args: + _should_evalf = [cls._should_evalf(a) for a in result.args] + pr2 = min(_should_evalf) + if pr2 > 0: + pr = max(_should_evalf) + result = result.evalf(prec_to_dps(pr)) + + return _sympify(result) + + @classmethod + def _should_evalf(cls, arg): + """ + Decide if the function should automatically evalf(). + + Explanation + =========== + + By default (in this implementation), this happens if (and only if) the + ARG is a floating point number (including complex numbers). + This function is used by __new__. + + Returns the precision to evalf to, or -1 if it should not evalf. + """ + if arg.is_Float: + return arg._prec + if not arg.is_Add: + return -1 + m = pure_complex(arg) + if m is None: + return -1 + # the elements of m are of type Number, so have a _prec + return max(m[0]._prec, m[1]._prec) + + @classmethod + def class_key(cls): + from sympy.sets.fancysets import Naturals0 + funcs = { + 'exp': 10, + 'log': 11, + 'sin': 20, + 'cos': 21, + 'tan': 22, + 'cot': 23, + 'sinh': 30, + 'cosh': 31, + 'tanh': 32, + 'coth': 33, + 'conjugate': 40, + 're': 41, + 'im': 42, + 'arg': 43, + } + name = cls.__name__ + + try: + i = funcs[name] + except KeyError: + i = 0 if isinstance(cls.nargs, Naturals0) else 10000 + + return 4, i, name + + def _eval_evalf(self, prec): + + def _get_mpmath_func(fname): + """Lookup mpmath function based on name""" + if isinstance(self, AppliedUndef): + # Shouldn't lookup in mpmath but might have ._imp_ + return None + + if not hasattr(mpmath, fname): + fname = MPMATH_TRANSLATIONS.get(fname, None) + if fname is None: + return None + return getattr(mpmath, fname) + + _eval_mpmath = getattr(self, '_eval_mpmath', None) + if _eval_mpmath is None: + func = _get_mpmath_func(self.func.__name__) + args = self.args + else: + func, args = _eval_mpmath() + + # Fall-back evaluation + if func is None: + imp = getattr(self, '_imp_', None) + if imp is None: + return None + try: + return Float(imp(*[i.evalf(prec) for i in self.args]), prec) + except (TypeError, ValueError): + return None + + # Convert all args to mpf or mpc + # Convert the arguments to *higher* precision than requested for the + # final result. + # XXX + 5 is a guess, it is similar to what is used in evalf.py. Should + # we be more intelligent about it? + try: + args = [arg._to_mpmath(prec + 5) for arg in args] + def bad(m): + from mpmath import mpf, mpc + # the precision of an mpf value is the last element + # if that is 1 (and m[1] is not 1 which would indicate a + # power of 2), then the eval failed; so check that none of + # the arguments failed to compute to a finite precision. + # Note: An mpc value has two parts, the re and imag tuple; + # check each of those parts, too. Anything else is allowed to + # pass + if isinstance(m, mpf): + m = m._mpf_ + return m[1] !=1 and m[-1] == 1 + elif isinstance(m, mpc): + m, n = m._mpc_ + return m[1] !=1 and m[-1] == 1 and \ + n[1] !=1 and n[-1] == 1 + else: + return False + if any(bad(a) for a in args): + raise ValueError # one or more args failed to compute with significance + except ValueError: + return + + with mpmath.workprec(prec): + v = func(*args) + + return Expr._from_mpmath(v, prec) + + def _eval_derivative(self, s): + # f(x).diff(s) -> x.diff(s) * f.fdiff(1)(s) + i = 0 + l = [] + for a in self.args: + i += 1 + da = a.diff(s) + if da.is_zero: + continue + try: + df = self.fdiff(i) + except ArgumentIndexError: + df = Function.fdiff(self, i) + l.append(df * da) + return Add(*l) + + def _eval_is_commutative(self): + return fuzzy_and(a.is_commutative for a in self.args) + + def _eval_is_meromorphic(self, x, a): + if not self.args: + return True + if any(arg.has(x) for arg in self.args[1:]): + return False + + arg = self.args[0] + if not arg._eval_is_meromorphic(x, a): + return None + + return fuzzy_not(type(self).is_singular(arg.subs(x, a))) + + _singularities: FuzzyBool | tuple[Expr, ...] = None + + @classmethod + def is_singular(cls, a): + """ + Tests whether the argument is an essential singularity + or a branch point, or the functions is non-holomorphic. + """ + ss = cls._singularities + if ss in (True, None, False): + return ss + + return fuzzy_or(a.is_infinite if s is S.ComplexInfinity + else (a - s).is_zero for s in ss) + + def _eval_aseries(self, n, args0, x, logx): + """ + Compute an asymptotic expansion around args0, in terms of self.args. + This function is only used internally by _eval_nseries and should not + be called directly; derived classes can overwrite this to implement + asymptotic expansions. + """ + raise PoleError(filldedent(''' + Asymptotic expansion of %s around %s is + not implemented.''' % (type(self), args0))) + + def _eval_nseries(self, x, n, logx, cdir=0): + """ + This function does compute series for multivariate functions, + but the expansion is always in terms of *one* variable. + + Examples + ======== + + >>> from sympy import atan2 + >>> from sympy.abc import x, y + >>> atan2(x, y).series(x, n=2) + atan2(0, y) + x/y + O(x**2) + >>> atan2(x, y).series(y, n=2) + -y/x + atan2(x, 0) + O(y**2) + + This function also computes asymptotic expansions, if necessary + and possible: + + >>> from sympy import loggamma + >>> loggamma(1/x)._eval_nseries(x,0,None) + -1/x - log(x)/x + log(x)/2 + O(1) + + """ + from .symbol import uniquely_named_symbol + from sympy.series.order import Order + from sympy.sets.sets import FiniteSet + args = self.args + args0 = [t.limit(x, 0) for t in args] + if any(t.is_finite is False for t in args0): + from .numbers import oo, zoo, nan + a = [t.as_leading_term(x, logx=logx) for t in args] + a0 = [t.limit(x, 0) for t in a] + if any(t.has(oo, -oo, zoo, nan) for t in a0): + return self._eval_aseries(n, args0, x, logx) + # Careful: the argument goes to oo, but only logarithmically so. We + # are supposed to do a power series expansion "around the + # logarithmic term". e.g. + # f(1+x+log(x)) + # -> f(1+logx) + x*f'(1+logx) + O(x**2) + # where 'logx' is given in the argument + a = [t._eval_nseries(x, n, logx) for t in args] + z = [r - r0 for (r, r0) in zip(a, a0)] + p = [Dummy() for _ in z] + q = [] + v = None + for ai, zi, pi in zip(a0, z, p): + if zi.has(x): + if v is not None: + raise NotImplementedError + q.append(ai + pi) + v = pi + else: + q.append(ai) + e1 = self.func(*q) + if v is None: + return e1 + s = e1._eval_nseries(v, n, logx) + o = s.getO() + s = s.removeO() + s = s.subs(v, zi).expand() + Order(o.expr.subs(v, zi), x) + return s + if (self.func.nargs is S.Naturals0 + or (self.func.nargs == FiniteSet(1) and args0[0]) + or any(c > 1 for c in self.func.nargs)): + e = self + e1 = e.expand() + if e == e1: + #for example when e = sin(x+1) or e = sin(cos(x)) + #let's try the general algorithm + if len(e.args) == 1: + # issue 14411 + e = e.func(e.args[0].cancel()) + term = e.subs(x, S.Zero) + if term.is_finite is False or term is S.NaN: + raise PoleError("Cannot expand %s around 0" % (self)) + series = term + fact = S.One + + _x = uniquely_named_symbol('xi', self) + e = e.subs(x, _x) + for i in range(1, n): + fact *= Rational(i) + e = e.diff(_x) + subs = e.subs(_x, S.Zero) + if subs is S.NaN: + # try to evaluate a limit if we have to + subs = e.limit(_x, S.Zero) + if subs.is_finite is False: + raise PoleError("Cannot expand %s around 0" % (self)) + term = subs*(x**i)/fact + term = term.expand() + series += term + return series + Order(x**n, x) + return e1.nseries(x, n=n, logx=logx) + arg = self.args[0] + l = [] + g = None + # try to predict a number of terms needed + nterms = n + 2 + cf = Order(arg.as_leading_term(x), x).getn() + if cf != 0: + nterms = (n/cf).ceiling() + for i in range(nterms): + g = self.taylor_term(i, arg, g) + g = g.nseries(x, n=n, logx=logx) + l.append(g) + return Add(*l) + Order(x**n, x) + + def fdiff(self, argindex=1): + """ + Returns the first derivative of the function. + """ + if not (1 <= argindex <= len(self.args)): + raise ArgumentIndexError(self, argindex) + ix = argindex - 1 + A = self.args[ix] + if A._diff_wrt: + if len(self.args) == 1 or not A.is_Symbol: + return _derivative_dispatch(self, A) + for i, v in enumerate(self.args): + if i != ix and A in v.free_symbols: + # it can't be in any other argument's free symbols + # issue 8510 + break + else: + return _derivative_dispatch(self, A) + + # See issue 4624 and issue 4719, 5600 and 8510 + D = Dummy('xi_%i' % argindex, dummy_index=hash(A)) + args = self.args[:ix] + (D,) + self.args[ix + 1:] + return Subs(Derivative(self.func(*args), D), D, A) + + def _eval_as_leading_term(self, x, logx, cdir): + """Stub that should be overridden by new Functions to return + the first non-zero term in a series if ever an x-dependent + argument whose leading term vanishes as x -> 0 might be encountered. + See, for example, cos._eval_as_leading_term. + """ + from sympy.series.order import Order + args = [a.as_leading_term(x, logx=logx) for a in self.args] + o = Order(1, x) + if any(x in a.free_symbols and o.contains(a) for a in args): + # Whereas x and any finite number are contained in O(1, x), + # expressions like 1/x are not. If any arg simplified to a + # vanishing expression as x -> 0 (like x or x**2, but not + # 3, 1/x, etc...) then the _eval_as_leading_term is needed + # to supply the first non-zero term of the series, + # + # e.g. expression leading term + # ---------- ------------ + # cos(1/x) cos(1/x) + # cos(cos(x)) cos(1) + # cos(x) 1 <- _eval_as_leading_term needed + # sin(x) x <- _eval_as_leading_term needed + # + raise NotImplementedError( + '%s has no _eval_as_leading_term routine' % self.func) + else: + return self + + +class DefinedFunction(Function): + """Base class for defined functions like ``sin``, ``cos``, ...""" + + @cacheit + def __new__(cls, *args, **options) -> Expr: # type: ignore + return cls._new_(*args, **options) + + +class AppliedUndef(Function): + """ + Base class for expressions resulting from the application of an undefined + function. + """ + + is_number = False + + name: str + + def __new__(cls, *args, **options) -> Expr: # type: ignore + args = tuple(map(sympify, args)) + u = [a.name for a in args if isinstance(a, UndefinedFunction)] + if u: + raise TypeError('Invalid argument: expecting an expression, not UndefinedFunction%s: %s' % ( + 's'*(len(u) > 1), ', '.join(u))) + obj: Expr = super().__new__(cls, *args, **options) # type: ignore + return obj + + def _eval_as_leading_term(self, x, logx, cdir): + return self + + @property + def _diff_wrt(self): + """ + Allow derivatives wrt to undefined functions. + + Examples + ======== + + >>> from sympy import Function, Symbol + >>> f = Function('f') + >>> x = Symbol('x') + >>> f(x)._diff_wrt + True + >>> f(x).diff(x) + Derivative(f(x), x) + """ + return True + + +class UndefSageHelper: + """ + Helper to facilitate Sage conversion. + """ + def __get__(self, ins, typ): + import sage.all as sage + if ins is None: + return lambda: sage.function(typ.__name__) + else: + args = [arg._sage_() for arg in ins.args] + return lambda : sage.function(ins.__class__.__name__)(*args) + +_undef_sage_helper = UndefSageHelper() + + +class UndefinedFunction(FunctionClass): + """ + The (meta)class of undefined functions. + """ + name: str + _sage_: UndefSageHelper + + def __new__(mcl, name, bases=(AppliedUndef,), __dict__=None, **kwargs) -> type[AppliedUndef]: + from .symbol import _filter_assumptions + # Allow Function('f', real=True) + # and/or Function(Symbol('f', real=True)) + assumptions, kwargs = _filter_assumptions(kwargs) + if isinstance(name, Symbol): + assumptions = name._merge(assumptions) + name = name.name + elif not isinstance(name, str): + raise TypeError('expecting string or Symbol for name') + else: + commutative = assumptions.get('commutative', None) + assumptions = Symbol(name, **assumptions).assumptions0 + if commutative is None: + assumptions.pop('commutative') + __dict__ = __dict__ or {} + # put the `is_*` for into __dict__ + __dict__.update({'is_%s' % k: v for k, v in assumptions.items()}) + # You can add other attributes, although they do have to be hashable + # (but seriously, if you want to add anything other than assumptions, + # just subclass Function) + __dict__.update(kwargs) + # add back the sanitized assumptions without the is_ prefix + kwargs.update(assumptions) + # Save these for __eq__ + __dict__.update({'_kwargs': kwargs}) + # do this for pickling + __dict__['__module__'] = None + obj = super().__new__(mcl, name, bases, __dict__) # type: ignore + obj.name = name + obj._sage_ = _undef_sage_helper + return obj # type: ignore + + def __instancecheck__(cls, instance): + return cls in type(instance).__mro__ + + _kwargs: dict[str, bool | None] = {} + + def __hash__(self): + return hash((self.class_key(), frozenset(self._kwargs.items()))) + + def __eq__(self, other): + return (isinstance(other, self.__class__) and + self.class_key() == other.class_key() and + self._kwargs == other._kwargs) + + def __ne__(self, other): + return not self == other + + @property + def _diff_wrt(self): + return False + + +# Using copyreg is the only way to make a dynamically generated instance of a +# metaclass picklable without using a custom pickler. It is not possible to +# define e.g. __reduce__ on the metaclass because obj.__reduce__ will retrieve +# the __reduce__ method for reducing instances of the type rather than for the +# type itself. +def _reduce_undef(f): + return (_rebuild_undef, (f.name, f._kwargs)) + +def _rebuild_undef(name, kwargs): + return Function(name, **kwargs) + +copyreg.pickle(UndefinedFunction, _reduce_undef) + + +# XXX: The type: ignore on WildFunction is because mypy complains: +# +# sympy/core/function.py:939: error: Cannot determine type of 'sort_key' in +# base class 'Expr' +# +# Somehow this is because of the @cacheit decorator but it is not clear how to +# fix it. + + +class WildFunction(Function, AtomicExpr): # type: ignore + """ + A WildFunction function matches any function (with its arguments). + + Examples + ======== + + >>> from sympy import WildFunction, Function, cos + >>> from sympy.abc import x, y + >>> F = WildFunction('F') + >>> f = Function('f') + >>> F.nargs + Naturals0 + >>> x.match(F) + >>> F.match(F) + {F_: F_} + >>> f(x).match(F) + {F_: f(x)} + >>> cos(x).match(F) + {F_: cos(x)} + >>> f(x, y).match(F) + {F_: f(x, y)} + + To match functions with a given number of arguments, set ``nargs`` to the + desired value at instantiation: + + >>> F = WildFunction('F', nargs=2) + >>> F.nargs + {2} + >>> f(x).match(F) + >>> f(x, y).match(F) + {F_: f(x, y)} + + To match functions with a range of arguments, set ``nargs`` to a tuple + containing the desired number of arguments, e.g. if ``nargs = (1, 2)`` + then functions with 1 or 2 arguments will be matched. + + >>> F = WildFunction('F', nargs=(1, 2)) + >>> F.nargs + {1, 2} + >>> f(x).match(F) + {F_: f(x)} + >>> f(x, y).match(F) + {F_: f(x, y)} + >>> f(x, y, 1).match(F) + + """ + + # XXX: What is this class attribute used for? + include: set[Any] = set() + + def __init__(cls, name, **assumptions): + from sympy.sets.sets import Set, FiniteSet + cls.name = name + nargs = assumptions.pop('nargs', S.Naturals0) + if not isinstance(nargs, Set): + # Canonicalize nargs here. See also FunctionClass. + if is_sequence(nargs): + nargs = tuple(ordered(set(nargs))) + elif nargs is not None: + nargs = (as_int(nargs),) + nargs = FiniteSet(*nargs) + cls.nargs = nargs + + def matches(self, expr, repl_dict=None, old=False): + if not isinstance(expr, (AppliedUndef, Function)): + return None + if len(expr.args) not in self.nargs: + return None + + if repl_dict is None: + repl_dict = {} + else: + repl_dict = repl_dict.copy() + + repl_dict[self] = expr + return repl_dict + + +class Derivative(Expr): + """ + Carries out differentiation of the given expression with respect to symbols. + + Examples + ======== + + >>> from sympy import Derivative, Function, symbols, Subs + >>> from sympy.abc import x, y + >>> f, g = symbols('f g', cls=Function) + + >>> Derivative(x**2, x, evaluate=True) + 2*x + + Denesting of derivatives retains the ordering of variables: + + >>> Derivative(Derivative(f(x, y), y), x) + Derivative(f(x, y), y, x) + + Contiguously identical symbols are merged into a tuple giving + the symbol and the count: + + >>> Derivative(f(x), x, x, y, x) + Derivative(f(x), (x, 2), y, x) + + If the derivative cannot be performed, and evaluate is True, the + order of the variables of differentiation will be made canonical: + + >>> Derivative(f(x, y), y, x, evaluate=True) + Derivative(f(x, y), x, y) + + Derivatives with respect to undefined functions can be calculated: + + >>> Derivative(f(x)**2, f(x), evaluate=True) + 2*f(x) + + Such derivatives will show up when the chain rule is used to + evaluate a derivative: + + >>> f(g(x)).diff(x) + Derivative(f(g(x)), g(x))*Derivative(g(x), x) + + Substitution is used to represent derivatives of functions with + arguments that are not symbols or functions: + + >>> f(2*x + 3).diff(x) == 2*Subs(f(y).diff(y), y, 2*x + 3) + True + + Notes + ===== + + Simplification of high-order derivatives: + + Because there can be a significant amount of simplification that can be + done when multiple differentiations are performed, results will be + automatically simplified in a fairly conservative fashion unless the + keyword ``simplify`` is set to False. + + >>> from sympy import sqrt, diff, Function, symbols + >>> from sympy.abc import x, y, z + >>> f, g = symbols('f,g', cls=Function) + + >>> e = sqrt((x + 1)**2 + x) + >>> diff(e, (x, 5), simplify=False).count_ops() + 136 + >>> diff(e, (x, 5)).count_ops() + 30 + + Ordering of variables: + + If evaluate is set to True and the expression cannot be evaluated, the + list of differentiation symbols will be sorted, that is, the expression is + assumed to have continuous derivatives up to the order asked. + + Derivative wrt non-Symbols: + + For the most part, one may not differentiate wrt non-symbols. + For example, we do not allow differentiation wrt `x*y` because + there are multiple ways of structurally defining where x*y appears + in an expression: a very strict definition would make + (x*y*z).diff(x*y) == 0. Derivatives wrt defined functions (like + cos(x)) are not allowed, either: + + >>> (x*y*z).diff(x*y) + Traceback (most recent call last): + ... + ValueError: Can't calculate derivative wrt x*y. + + To make it easier to work with variational calculus, however, + derivatives wrt AppliedUndef and Derivatives are allowed. + For example, in the Euler-Lagrange method one may write + F(t, u, v) where u = f(t) and v = f'(t). These variables can be + written explicitly as functions of time:: + + >>> from sympy.abc import t + >>> F = Function('F') + >>> U = f(t) + >>> V = U.diff(t) + + The derivative wrt f(t) can be obtained directly: + + >>> direct = F(t, U, V).diff(U) + + When differentiation wrt a non-Symbol is attempted, the non-Symbol + is temporarily converted to a Symbol while the differentiation + is performed and the same answer is obtained: + + >>> indirect = F(t, U, V).subs(U, x).diff(x).subs(x, U) + >>> assert direct == indirect + + The implication of this non-symbol replacement is that all + functions are treated as independent of other functions and the + symbols are independent of the functions that contain them:: + + >>> x.diff(f(x)) + 0 + >>> g(x).diff(f(x)) + 0 + + It also means that derivatives are assumed to depend only + on the variables of differentiation, not on anything contained + within the expression being differentiated:: + + >>> F = f(x) + >>> Fx = F.diff(x) + >>> Fx.diff(F) # derivative depends on x, not F + 0 + >>> Fxx = Fx.diff(x) + >>> Fxx.diff(Fx) # derivative depends on x, not Fx + 0 + + The last example can be made explicit by showing the replacement + of Fx in Fxx with y: + + >>> Fxx.subs(Fx, y) + Derivative(y, x) + + Since that in itself will evaluate to zero, differentiating + wrt Fx will also be zero: + + >>> _.doit() + 0 + + Replacing undefined functions with concrete expressions + + One must be careful to replace undefined functions with expressions + that contain variables consistent with the function definition and + the variables of differentiation or else insconsistent result will + be obtained. Consider the following example: + + >>> eq = f(x)*g(y) + >>> eq.subs(f(x), x*y).diff(x, y).doit() + y*Derivative(g(y), y) + g(y) + >>> eq.diff(x, y).subs(f(x), x*y).doit() + y*Derivative(g(y), y) + + The results differ because `f(x)` was replaced with an expression + that involved both variables of differentiation. In the abstract + case, differentiation of `f(x)` by `y` is 0; in the concrete case, + the presence of `y` made that derivative nonvanishing and produced + the extra `g(y)` term. + + Defining differentiation for an object + + An object must define ._eval_derivative(symbol) method that returns + the differentiation result. This function only needs to consider the + non-trivial case where expr contains symbol and it should call the diff() + method internally (not _eval_derivative); Derivative should be the only + one to call _eval_derivative. + + Any class can allow derivatives to be taken with respect to + itself (while indicating its scalar nature). See the + docstring of Expr._diff_wrt. + + See Also + ======== + _sort_variable_count + """ + + is_Derivative = True + + @property + def _diff_wrt(self): + """An expression may be differentiated wrt a Derivative if + it is in elementary form. + + Examples + ======== + + >>> from sympy import Function, Derivative, cos + >>> from sympy.abc import x + >>> f = Function('f') + + >>> Derivative(f(x), x)._diff_wrt + True + >>> Derivative(cos(x), x)._diff_wrt + False + >>> Derivative(x + 1, x)._diff_wrt + False + + A Derivative might be an unevaluated form of what will not be + a valid variable of differentiation if evaluated. For example, + + >>> Derivative(f(f(x)), x).doit() + Derivative(f(x), x)*Derivative(f(f(x)), f(x)) + + Such an expression will present the same ambiguities as arise + when dealing with any other product, like ``2*x``, so ``_diff_wrt`` + is False: + + >>> Derivative(f(f(x)), x)._diff_wrt + False + """ + return self.expr._diff_wrt and isinstance(self.doit(), Derivative) + + def __new__(cls, expr, *variables, **kwargs): + expr = sympify(expr) + if not isinstance(expr, Basic): + raise TypeError(f"Cannot represent derivative of {type(expr)}") + symbols_or_none = getattr(expr, "free_symbols", None) + has_symbol_set = isinstance(symbols_or_none, set) + + if not has_symbol_set: + raise ValueError(filldedent(''' + Since there are no variables in the expression %s, + it cannot be differentiated.''' % expr)) + + # determine value for variables if it wasn't given + if not variables: + variables = expr.free_symbols + if len(variables) != 1: + if expr.is_number: + return S.Zero + if len(variables) == 0: + raise ValueError(filldedent(''' + Since there are no variables in the expression, + the variable(s) of differentiation must be supplied + to differentiate %s''' % expr)) + else: + raise ValueError(filldedent(''' + Since there is more than one variable in the + expression, the variable(s) of differentiation + must be supplied to differentiate %s''' % expr)) + + # Split the list of variables into a list of the variables we are diff + # wrt, where each element of the list has the form (s, count) where + # s is the entity to diff wrt and count is the order of the + # derivative. + variable_count = [] + array_likes = (tuple, list, Tuple) + + from sympy.tensor.array import Array, NDimArray + + for i, v in enumerate(variables): + if isinstance(v, UndefinedFunction): + raise TypeError( + "cannot differentiate wrt " + "UndefinedFunction: %s" % v) + + if isinstance(v, array_likes): + if len(v) == 0: + # Ignore empty tuples: Derivative(expr, ... , (), ... ) + continue + if isinstance(v[0], array_likes): + # Derive by array: Derivative(expr, ... , [[x, y, z]], ... ) + if len(v) == 1: + v = Array(v[0]) + count = 1 + else: + v, count = v + v = Array(v) + else: + v, count = v + if count == 0: + continue + variable_count.append(Tuple(v, count)) + continue + + v = sympify(v) + if isinstance(v, Integer): + if i == 0: + raise ValueError("First variable cannot be a number: %i" % v) + count = v + prev, prevcount = variable_count[-1] + if prevcount != 1: + raise TypeError("tuple {} followed by number {}".format((prev, prevcount), v)) + if count == 0: + variable_count.pop() + else: + variable_count[-1] = Tuple(prev, count) + else: + count = 1 + variable_count.append(Tuple(v, count)) + + # light evaluation of contiguous, identical + # items: (x, 1), (x, 1) -> (x, 2) + merged = [] + for t in variable_count: + v, c = t + if c.is_negative: + raise ValueError( + 'order of differentiation must be nonnegative') + if merged and merged[-1][0] == v: + c += merged[-1][1] + if not c: + merged.pop() + else: + merged[-1] = Tuple(v, c) + else: + merged.append(t) + variable_count = merged + + # sanity check of variables of differentation; we waited + # until the counts were computed since some variables may + # have been removed because the count was 0 + for v, c in variable_count: + # v must have _diff_wrt True + if not v._diff_wrt: + __ = '' # filler to make error message neater + raise ValueError(filldedent(''' + Can't calculate derivative wrt %s.%s''' % (v, + __))) + + # We make a special case for 0th derivative, because there is no + # good way to unambiguously print this. + if len(variable_count) == 0: + return expr + + evaluate = kwargs.get('evaluate', False) + + if evaluate: + if isinstance(expr, Derivative): + expr = expr.canonical + variable_count = [ + (v.canonical if isinstance(v, Derivative) else v, c) + for v, c in variable_count] + + # Look for a quick exit if there are symbols that don't appear in + # expression at all. Note, this cannot check non-symbols like + # Derivatives as those can be created by intermediate + # derivatives. + zero = False + free = expr.free_symbols + from sympy.matrices.expressions.matexpr import MatrixExpr + + for v, c in variable_count: + vfree = v.free_symbols + if c.is_positive and vfree: + if isinstance(v, AppliedUndef): + # these match exactly since + # x.diff(f(x)) == g(x).diff(f(x)) == 0 + # and are not created by differentiation + D = Dummy() + if not expr.xreplace({v: D}).has(D): + zero = True + break + elif isinstance(v, MatrixExpr): + zero = False + break + elif isinstance(v, Symbol) and v not in free: + zero = True + break + else: + if not free & vfree: + # e.g. v is IndexedBase or Matrix + zero = True + break + if zero: + return cls._get_zero_with_shape_like(expr) + + # make the order of symbols canonical + #TODO: check if assumption of discontinuous derivatives exist + variable_count = cls._sort_variable_count(variable_count) + + # denest + if isinstance(expr, Derivative): + variable_count = list(expr.variable_count) + variable_count + expr = expr.expr + return _derivative_dispatch(expr, *variable_count, **kwargs) + + # we return here if evaluate is False or if there is no + # _eval_derivative method + if not evaluate or not hasattr(expr, '_eval_derivative'): + # return an unevaluated Derivative + if evaluate and variable_count == [(expr, 1)] and expr.is_scalar: + # special hack providing evaluation for classes + # that have defined is_scalar=True but have no + # _eval_derivative defined + return S.One + return Expr.__new__(cls, expr, *variable_count) + + # evaluate the derivative by calling _eval_derivative method + # of expr for each variable + # ------------------------------------------------------------- + nderivs = 0 # how many derivatives were performed + unhandled = [] + from sympy.matrices.matrixbase import MatrixBase + for i, (v, count) in enumerate(variable_count): + + old_expr = expr + old_v = None + + is_symbol = v.is_symbol or isinstance(v, + (Iterable, Tuple, MatrixBase, NDimArray)) + + if not is_symbol: + old_v = v + v = Dummy('xi') + expr = expr.xreplace({old_v: v}) + # Derivatives and UndefinedFunctions are independent + # of all others + clashing = not (isinstance(old_v, (Derivative, AppliedUndef))) + if v not in expr.free_symbols and not clashing: + return expr.diff(v) # expr's version of 0 + if not old_v.is_scalar and not hasattr( + old_v, '_eval_derivative'): + # special hack providing evaluation for classes + # that have defined is_scalar=True but have no + # _eval_derivative defined + expr *= old_v.diff(old_v) + + obj = cls._dispatch_eval_derivative_n_times(expr, v, count) + if obj is not None and obj.is_zero: + return obj + + nderivs += count + + if old_v is not None: + if obj is not None: + # remove the dummy that was used + obj = obj.subs(v, old_v) + # restore expr + expr = old_expr + + if obj is None: + # we've already checked for quick-exit conditions + # that give 0 so the remaining variables + # are contained in the expression but the expression + # did not compute a derivative so we stop taking + # derivatives + unhandled = variable_count[i:] + break + + expr = obj + + # what we have so far can be made canonical + expr = expr.replace( + lambda x: isinstance(x, Derivative), + lambda x: x.canonical) + + if unhandled: + if isinstance(expr, Derivative): + unhandled = list(expr.variable_count) + unhandled + expr = expr.expr + expr = Expr.__new__(cls, expr, *unhandled) + + if (nderivs > 1) == True and kwargs.get('simplify', True): + from .exprtools import factor_terms + from sympy.simplify.simplify import signsimp + expr = factor_terms(signsimp(expr)) + return expr + + @property + def canonical(cls): + return cls.func(cls.expr, + *Derivative._sort_variable_count(cls.variable_count)) + + @classmethod + def _sort_variable_count(cls, vc): + """ + Sort (variable, count) pairs into canonical order while + retaining order of variables that do not commute during + differentiation: + + * symbols and functions commute with each other + * derivatives commute with each other + * a derivative does not commute with anything it contains + * any other object is not allowed to commute if it has + free symbols in common with another object + + Examples + ======== + + >>> from sympy import Derivative, Function, symbols + >>> vsort = Derivative._sort_variable_count + >>> x, y, z = symbols('x y z') + >>> f, g, h = symbols('f g h', cls=Function) + + Contiguous items are collapsed into one pair: + + >>> vsort([(x, 1), (x, 1)]) + [(x, 2)] + >>> vsort([(y, 1), (f(x), 1), (y, 1), (f(x), 1)]) + [(y, 2), (f(x), 2)] + + Ordering is canonical. + + >>> def vsort0(*v): + ... # docstring helper to + ... # change vi -> (vi, 0), sort, and return vi vals + ... return [i[0] for i in vsort([(i, 0) for i in v])] + + >>> vsort0(y, x) + [x, y] + >>> vsort0(g(y), g(x), f(y)) + [f(y), g(x), g(y)] + + Symbols are sorted as far to the left as possible but never + move to the left of a derivative having the same symbol in + its variables; the same applies to AppliedUndef which are + always sorted after Symbols: + + >>> dfx = f(x).diff(x) + >>> assert vsort0(dfx, y) == [y, dfx] + >>> assert vsort0(dfx, x) == [dfx, x] + """ + if not vc: + return [] + vc = list(vc) + if len(vc) == 1: + return [Tuple(*vc[0])] + V = list(range(len(vc))) + E = [] + v = lambda i: vc[i][0] + D = Dummy() + def _block(d, v, wrt=False): + # return True if v should not come before d else False + if d == v: + return wrt + if d.is_Symbol: + return False + if isinstance(d, Derivative): + # a derivative blocks if any of it's variables contain + # v; the wrt flag will return True for an exact match + # and will cause an AppliedUndef to block if v is in + # the arguments + if any(_block(k, v, wrt=True) + for k in d._wrt_variables): + return True + return False + if not wrt and isinstance(d, AppliedUndef): + return False + if v.is_Symbol: + return v in d.free_symbols + if isinstance(v, AppliedUndef): + return _block(d.xreplace({v: D}), D) + return d.free_symbols & v.free_symbols + for i in range(len(vc)): + for j in range(i): + if _block(v(j), v(i)): + E.append((j,i)) + # this is the default ordering to use in case of ties + O = dict(zip(ordered(uniq([i for i, c in vc])), range(len(vc)))) + ix = topological_sort((V, E), key=lambda i: O[v(i)]) + # merge counts of contiguously identical items + merged = [] + for v, c in [vc[i] for i in ix]: + if merged and merged[-1][0] == v: + merged[-1][1] += c + else: + merged.append([v, c]) + return [Tuple(*i) for i in merged] + + def _eval_is_commutative(self): + return self.expr.is_commutative + + def _eval_derivative(self, v): + # If v (the variable of differentiation) is not in + # self.variables, we might be able to take the derivative. + if v not in self._wrt_variables: + dedv = self.expr.diff(v) + if isinstance(dedv, Derivative): + return dedv.func(dedv.expr, *(self.variable_count + dedv.variable_count)) + # dedv (d(self.expr)/dv) could have simplified things such that the + # derivative wrt things in self.variables can now be done. Thus, + # we set evaluate=True to see if there are any other derivatives + # that can be done. The most common case is when dedv is a simple + # number so that the derivative wrt anything else will vanish. + return self.func(dedv, *self.variables, evaluate=True) + # In this case v was in self.variables so the derivative wrt v has + # already been attempted and was not computed, either because it + # couldn't be or evaluate=False originally. + variable_count = list(self.variable_count) + variable_count.append((v, 1)) + return self.func(self.expr, *variable_count, evaluate=False) + + def doit(self, **hints): + expr = self.expr + if hints.get('deep', True): + expr = expr.doit(**hints) + hints['evaluate'] = True + rv = self.func(expr, *self.variable_count, **hints) + if rv!= self and rv.has(Derivative): + rv = rv.doit(**hints) + return rv + + @_sympifyit('z0', NotImplementedError) + def doit_numerically(self, z0): + """ + Evaluate the derivative at z numerically. + + When we can represent derivatives at a point, this should be folded + into the normal evalf. For now, we need a special method. + """ + if len(self.free_symbols) != 1 or len(self.variables) != 1: + raise NotImplementedError('partials and higher order derivatives') + z = list(self.free_symbols)[0] + + def eval(x): + f0 = self.expr.subs(z, Expr._from_mpmath(x, prec=mpmath.mp.prec)) + f0 = f0.evalf(prec_to_dps(mpmath.mp.prec)) + return f0._to_mpmath(mpmath.mp.prec) + return Expr._from_mpmath(mpmath.diff(eval, + z0._to_mpmath(mpmath.mp.prec)), + mpmath.mp.prec) + + @property + def expr(self): + return self._args[0] + + @property + def _wrt_variables(self): + # return the variables of differentiation without + # respect to the type of count (int or symbolic) + return [i[0] for i in self.variable_count] + + @property + def variables(self): + # TODO: deprecate? YES, make this 'enumerated_variables' and + # name _wrt_variables as variables + # TODO: support for `d^n`? + rv = [] + for v, count in self.variable_count: + if not count.is_Integer: + raise TypeError(filldedent(''' + Cannot give expansion for symbolic count. If you just + want a list of all variables of differentiation, use + _wrt_variables.''')) + rv.extend([v]*count) + return tuple(rv) + + @property + def variable_count(self): + return self._args[1:] + + @property + def derivative_count(self): + return sum([count for _, count in self.variable_count], 0) + + @property + def free_symbols(self): + ret = self.expr.free_symbols + # Add symbolic counts to free_symbols + for _, count in self.variable_count: + ret.update(count.free_symbols) + return ret + + @property + def kind(self): + return self.args[0].kind + + def _eval_subs(self, old, new): + # The substitution (old, new) cannot be done inside + # Derivative(expr, vars) for a variety of reasons + # as handled below. + if old in self._wrt_variables: + # first handle the counts + expr = self.func(self.expr, *[(v, c.subs(old, new)) + for v, c in self.variable_count]) + if expr != self: + return expr._eval_subs(old, new) + # quick exit case + if not getattr(new, '_diff_wrt', False): + # case (0): new is not a valid variable of + # differentiation + if isinstance(old, Symbol): + # don't introduce a new symbol if the old will do + return Subs(self, old, new) + else: + xi = Dummy('xi') + return Subs(self.xreplace({old: xi}), xi, new) + + # If both are Derivatives with the same expr, check if old is + # equivalent to self or if old is a subderivative of self. + if old.is_Derivative and old.expr == self.expr: + if self.canonical == old.canonical: + return new + + # collections.Counter doesn't have __le__ + def _subset(a, b): + return all((a[i] <= b[i]) == True for i in a) + + old_vars = Counter(dict(reversed(old.variable_count))) + self_vars = Counter(dict(reversed(self.variable_count))) + if _subset(old_vars, self_vars): + return _derivative_dispatch(new, *(self_vars - old_vars).items()).canonical + + args = list(self.args) + newargs = [x._subs(old, new) for x in args] + if args[0] == old: + # complete replacement of self.expr + # we already checked that the new is valid so we know + # it won't be a problem should it appear in variables + return _derivative_dispatch(*newargs) + + if newargs[0] != args[0]: + # case (1) can't change expr by introducing something that is in + # the _wrt_variables if it was already in the expr + # e.g. + # for Derivative(f(x, g(y)), y), x cannot be replaced with + # anything that has y in it; for f(g(x), g(y)).diff(g(y)) + # g(x) cannot be replaced with anything that has g(y) + syms = {vi: Dummy() for vi in self._wrt_variables + if not vi.is_Symbol} + wrt = {syms.get(vi, vi) for vi in self._wrt_variables} + forbidden = args[0].xreplace(syms).free_symbols & wrt + nfree = new.xreplace(syms).free_symbols + ofree = old.xreplace(syms).free_symbols + if (nfree - ofree) & forbidden: + return Subs(self, old, new) + + viter = ((i, j) for ((i, _), (j, _)) in zip(newargs[1:], args[1:])) + if any(i != j for i, j in viter): # a wrt-variable change + # case (2) can't change vars by introducing a variable + # that is contained in expr, e.g. + # for Derivative(f(z, g(h(x), y)), y), y cannot be changed to + # x, h(x), or g(h(x), y) + for a in _atomic(self.expr, recursive=True): + for i in range(1, len(newargs)): + vi, _ = newargs[i] + if a == vi and vi != args[i][0]: + return Subs(self, old, new) + # more arg-wise checks + vc = newargs[1:] + oldv = self._wrt_variables + newe = self.expr + subs = [] + for i, (vi, ci) in enumerate(vc): + if not vi._diff_wrt: + # case (3) invalid differentiation expression so + # create a replacement dummy + xi = Dummy('xi_%i' % i) + # replace the old valid variable with the dummy + # in the expression + newe = newe.xreplace({oldv[i]: xi}) + # and replace the bad variable with the dummy + vc[i] = (xi, ci) + # and record the dummy with the new (invalid) + # differentiation expression + subs.append((xi, vi)) + + if subs: + # handle any residual substitution in the expression + newe = newe._subs(old, new) + # return the Subs-wrapped derivative + return Subs(Derivative(newe, *vc), *zip(*subs)) + + # everything was ok + return _derivative_dispatch(*newargs) + + def _eval_lseries(self, x, logx, cdir=0): + dx = self.variables + for term in self.expr.lseries(x, logx=logx, cdir=cdir): + yield self.func(term, *dx) + + def _eval_nseries(self, x, n, logx, cdir=0): + arg = self.expr.nseries(x, n=n, logx=logx) + o = arg.getO() + dx = self.variables + rv = [self.func(a, *dx) for a in Add.make_args(arg.removeO())] + if o: + rv.append(o/x) + return Add(*rv) + + def _eval_as_leading_term(self, x, logx, cdir): + series_gen = self.expr.lseries(x) + d = S.Zero + for leading_term in series_gen: + d = diff(leading_term, *self.variables) + if d != 0: + break + return d + + def as_finite_difference(self, points=1, x0=None, wrt=None): + """ Expresses a Derivative instance as a finite difference. + + Parameters + ========== + + points : sequence or coefficient, optional + If sequence: discrete values (length >= order+1) of the + independent variable used for generating the finite + difference weights. + If it is a coefficient, it will be used as the step-size + for generating an equidistant sequence of length order+1 + centered around ``x0``. Default: 1 (step-size 1) + + x0 : number or Symbol, optional + the value of the independent variable (``wrt``) at which the + derivative is to be approximated. Default: same as ``wrt``. + + wrt : Symbol, optional + "with respect to" the variable for which the (partial) + derivative is to be approximated for. If not provided it + is required that the derivative is ordinary. Default: ``None``. + + + Examples + ======== + + >>> from sympy import symbols, Function, exp, sqrt, Symbol + >>> x, h = symbols('x h') + >>> f = Function('f') + >>> f(x).diff(x).as_finite_difference() + -f(x - 1/2) + f(x + 1/2) + + The default step size and number of points are 1 and + ``order + 1`` respectively. We can change the step size by + passing a symbol as a parameter: + + >>> f(x).diff(x).as_finite_difference(h) + -f(-h/2 + x)/h + f(h/2 + x)/h + + We can also specify the discretized values to be used in a + sequence: + + >>> f(x).diff(x).as_finite_difference([x, x+h, x+2*h]) + -3*f(x)/(2*h) + 2*f(h + x)/h - f(2*h + x)/(2*h) + + The algorithm is not restricted to use equidistant spacing, nor + do we need to make the approximation around ``x0``, but we can get + an expression estimating the derivative at an offset: + + >>> e, sq2 = exp(1), sqrt(2) + >>> xl = [x-h, x+h, x+e*h] + >>> f(x).diff(x, 1).as_finite_difference(xl, x+h*sq2) # doctest: +ELLIPSIS + 2*h*((h + sqrt(2)*h)/(2*h) - (-sqrt(2)*h + h)/(2*h))*f(E*h + x)/... + + To approximate ``Derivative`` around ``x0`` using a non-equidistant + spacing step, the algorithm supports assignment of undefined + functions to ``points``: + + >>> dx = Function('dx') + >>> f(x).diff(x).as_finite_difference(points=dx(x), x0=x-h) + -f(-h + x - dx(-h + x)/2)/dx(-h + x) + f(-h + x + dx(-h + x)/2)/dx(-h + x) + + Partial derivatives are also supported: + + >>> y = Symbol('y') + >>> d2fdxdy=f(x,y).diff(x,y) + >>> d2fdxdy.as_finite_difference(wrt=x) + -Derivative(f(x - 1/2, y), y) + Derivative(f(x + 1/2, y), y) + + We can apply ``as_finite_difference`` to ``Derivative`` instances in + compound expressions using ``replace``: + + >>> (1 + 42**f(x).diff(x)).replace(lambda arg: arg.is_Derivative, + ... lambda arg: arg.as_finite_difference()) + 42**(-f(x - 1/2) + f(x + 1/2)) + 1 + + + See also + ======== + + sympy.calculus.finite_diff.apply_finite_diff + sympy.calculus.finite_diff.differentiate_finite + sympy.calculus.finite_diff.finite_diff_weights + + """ + from sympy.calculus.finite_diff import _as_finite_diff + return _as_finite_diff(self, points, x0, wrt) + + @classmethod + def _get_zero_with_shape_like(cls, expr): + return S.Zero + + @classmethod + def _dispatch_eval_derivative_n_times(cls, expr, v, count): + # Evaluate the derivative `n` times. If + # `_eval_derivative_n_times` is not overridden by the current + # object, the default in `Basic` will call a loop over + # `_eval_derivative`: + return expr._eval_derivative_n_times(v, count) + + +def _derivative_dispatch(expr, *variables, **kwargs): + from sympy.matrices.matrixbase import MatrixBase + from sympy.matrices.expressions.matexpr import MatrixExpr + from sympy.tensor.array import NDimArray + array_types = (MatrixBase, MatrixExpr, NDimArray, list, tuple, Tuple) + if isinstance(expr, array_types) or any(isinstance(i[0], array_types) if isinstance(i, (tuple, list, Tuple)) else isinstance(i, array_types) for i in variables): + from sympy.tensor.array.array_derivatives import ArrayDerivative + return ArrayDerivative(expr, *variables, **kwargs) + return Derivative(expr, *variables, **kwargs) + + +class Lambda(Expr): + """ + Lambda(x, expr) represents a lambda function similar to Python's + 'lambda x: expr'. A function of several variables is written as + Lambda((x, y, ...), expr). + + Examples + ======== + + A simple example: + + >>> from sympy import Lambda + >>> from sympy.abc import x + >>> f = Lambda(x, x**2) + >>> f(4) + 16 + + For multivariate functions, use: + + >>> from sympy.abc import y, z, t + >>> f2 = Lambda((x, y, z, t), x + y**z + t**z) + >>> f2(1, 2, 3, 4) + 73 + + It is also possible to unpack tuple arguments: + + >>> f = Lambda(((x, y), z), x + y + z) + >>> f((1, 2), 3) + 6 + + A handy shortcut for lots of arguments: + + >>> p = x, y, z + >>> f = Lambda(p, x + y*z) + >>> f(*p) + x + y*z + + """ + is_Function = True + + def __new__(cls, signature, expr) -> Lambda: + if iterable(signature) and not isinstance(signature, (tuple, Tuple)): + sympy_deprecation_warning( + """ + Using a non-tuple iterable as the first argument to Lambda + is deprecated. Use Lambda(tuple(args), expr) instead. + """, + deprecated_since_version="1.5", + active_deprecations_target="deprecated-non-tuple-lambda", + ) + signature = tuple(signature) + _sig = signature if iterable(signature) else (signature,) + sig: Tuple = sympify(_sig) # type: ignore + cls._check_signature(sig) + + if len(sig) == 1 and sig[0] == expr: + return S.IdentityFunction + + return Expr.__new__(cls, sig, sympify(expr)) + + @classmethod + def _check_signature(cls, sig): + syms = set() + + def rcheck(args): + for a in args: + if a.is_symbol: + if a in syms: + raise BadSignatureError("Duplicate symbol %s" % a) + syms.add(a) + elif isinstance(a, Tuple): + rcheck(a) + else: + raise BadSignatureError("Lambda signature should be only tuples" + " and symbols, not %s" % a) + + if not isinstance(sig, Tuple): + raise BadSignatureError("Lambda signature should be a tuple not %s" % sig) + # Recurse through the signature: + rcheck(sig) + + @property + def signature(self): + """The expected form of the arguments to be unpacked into variables""" + return self._args[0] + + @property + def expr(self): + """The return value of the function""" + return self._args[1] + + @property + def variables(self): + """The variables used in the internal representation of the function""" + def _variables(args): + if isinstance(args, Tuple): + for arg in args: + yield from _variables(arg) + else: + yield args + return tuple(_variables(self.signature)) + + @property + def nargs(self): + from sympy.sets.sets import FiniteSet + return FiniteSet(len(self.signature)) + + bound_symbols = variables + + @property + def free_symbols(self): + return self.expr.free_symbols - set(self.variables) + + def __call__(self, *args): + n = len(args) + if n not in self.nargs: # Lambda only ever has 1 value in nargs + # XXX: exception message must be in exactly this format to + # make it work with NumPy's functions like vectorize(). See, + # for example, https://github.com/numpy/numpy/issues/1697. + # The ideal solution would be just to attach metadata to + # the exception and change NumPy to take advantage of this. + ## XXX does this apply to Lambda? If not, remove this comment. + temp = ('%(name)s takes exactly %(args)s ' + 'argument%(plural)s (%(given)s given)') + raise BadArgumentsError(temp % { + 'name': self, + 'args': list(self.nargs)[0], + 'plural': 's'*(list(self.nargs)[0] != 1), + 'given': n}) + + d = self._match_signature(self.signature, args) + + return self.expr.xreplace(d) + + def _match_signature(self, sig, args): + + symargmap = {} + + def rmatch(pars, args): + for par, arg in zip(pars, args): + if par.is_symbol: + symargmap[par] = arg + elif isinstance(par, Tuple): + if not isinstance(arg, (tuple, Tuple)) or len(args) != len(pars): + raise BadArgumentsError("Can't match %s and %s" % (args, pars)) + rmatch(par, arg) + + rmatch(sig, args) + + return symargmap + + @property + def is_identity(self): + """Return ``True`` if this ``Lambda`` is an identity function. """ + return self.signature == self.expr + + def _eval_evalf(self, prec): + return self.func(self.args[0], self.args[1].evalf(n=prec_to_dps(prec))) + + +class Subs(Expr): + """ + Represents unevaluated substitutions of an expression. + + ``Subs(expr, x, x0)`` represents the expression resulting + from substituting x with x0 in expr. + + Parameters + ========== + + expr : Expr + An expression. + + x : tuple, variable + A variable or list of distinct variables. + + x0 : tuple or list of tuples + A point or list of evaluation points + corresponding to those variables. + + Examples + ======== + + >>> from sympy import Subs, Function, sin, cos + >>> from sympy.abc import x, y, z + >>> f = Function('f') + + Subs are created when a particular substitution cannot be made. The + x in the derivative cannot be replaced with 0 because 0 is not a + valid variables of differentiation: + + >>> f(x).diff(x).subs(x, 0) + Subs(Derivative(f(x), x), x, 0) + + Once f is known, the derivative and evaluation at 0 can be done: + + >>> _.subs(f, sin).doit() == sin(x).diff(x).subs(x, 0) == cos(0) + True + + Subs can also be created directly with one or more variables: + + >>> Subs(f(x)*sin(y) + z, (x, y), (0, 1)) + Subs(z + f(x)*sin(y), (x, y), (0, 1)) + >>> _.doit() + z + f(0)*sin(1) + + Notes + ===== + + ``Subs`` objects are generally useful to represent unevaluated derivatives + calculated at a point. + + The variables may be expressions, but they are subjected to the limitations + of subs(), so it is usually a good practice to use only symbols for + variables, since in that case there can be no ambiguity. + + There's no automatic expansion - use the method .doit() to effect all + possible substitutions of the object and also of objects inside the + expression. + + When evaluating derivatives at a point that is not a symbol, a Subs object + is returned. One is also able to calculate derivatives of Subs objects - in + this case the expression is always expanded (for the unevaluated form, use + Derivative()). + + In order to allow expressions to combine before doit is done, a + representation of the Subs expression is used internally to make + expressions that are superficially different compare the same: + + >>> a, b = Subs(x, x, 0), Subs(y, y, 0) + >>> a + b + 2*Subs(x, x, 0) + + This can lead to unexpected consequences when using methods + like `has` that are cached: + + >>> s = Subs(x, x, 0) + >>> s.has(x), s.has(y) + (True, False) + >>> ss = s.subs(x, y) + >>> ss.has(x), ss.has(y) + (True, False) + >>> s, ss + (Subs(x, x, 0), Subs(y, y, 0)) + """ + def __new__(cls, expr, variables, point, **assumptions): + if not is_sequence(variables, Tuple): + variables = [variables] + variables = Tuple(*variables) + + if has_dups(variables): + repeated = [str(v) for v, i in Counter(variables).items() if i > 1] + __ = ', '.join(repeated) + raise ValueError(filldedent(''' + The following expressions appear more than once: %s + ''' % __)) + + point = Tuple(*(point if is_sequence(point, Tuple) else [point])) + + if len(point) != len(variables): + raise ValueError('Number of point values must be the same as ' + 'the number of variables.') + + if not point: + return sympify(expr) + + # denest + if isinstance(expr, Subs): + variables = expr.variables + variables + point = expr.point + point + expr = expr.expr + else: + expr = sympify(expr) + + # use symbols with names equal to the point value (with prepended _) + # to give a variable-independent expression + pre = "_" + pts = sorted(set(point), key=default_sort_key) + from sympy.printing.str import StrPrinter + class CustomStrPrinter(StrPrinter): + def _print_Dummy(self, expr): + return str(expr) + str(expr.dummy_index) + def mystr(expr, **settings): + p = CustomStrPrinter(settings) + return p.doprint(expr) + while 1: + s_pts = {p: Symbol(pre + mystr(p)) for p in pts} + reps = [(v, s_pts[p]) + for v, p in zip(variables, point)] + # if any underscore-prepended symbol is already a free symbol + # and is a variable with a different point value, then there + # is a clash, e.g. _0 clashes in Subs(_0 + _1, (_0, _1), (1, 0)) + # because the new symbol that would be created is _1 but _1 + # is already mapped to 0 so __0 and __1 are used for the new + # symbols + if any(r in expr.free_symbols and + r in variables and + Symbol(pre + mystr(point[variables.index(r)])) != r + for _, r in reps): + pre += "_" + continue + break + + obj = Expr.__new__(cls, expr, Tuple(*variables), point) + obj._expr = expr.xreplace(dict(reps)) + return obj + + def _eval_is_commutative(self): + return self.expr.is_commutative + + def doit(self, **hints): + e, v, p = self.args + + # remove self mappings + for i, (vi, pi) in enumerate(zip(v, p)): + if vi == pi: + v = v[:i] + v[i + 1:] + p = p[:i] + p[i + 1:] + if not v: + return self.expr + + if isinstance(e, Derivative): + # apply functions first, e.g. f -> cos + undone = [] + for i, vi in enumerate(v): + if isinstance(vi, FunctionClass): + e = e.subs(vi, p[i]) + else: + undone.append((vi, p[i])) + if not isinstance(e, Derivative): + e = e.doit() + if isinstance(e, Derivative): + # do Subs that aren't related to differentiation + undone2 = [] + D = Dummy() + arg = e.args[0] + for vi, pi in undone: + if D not in e.xreplace({vi: D}).free_symbols: + if arg.has(vi): + e = e.subs(vi, pi) + else: + undone2.append((vi, pi)) + undone = undone2 + # differentiate wrt variables that are present + wrt = [] + D = Dummy() + expr = e.expr + free = expr.free_symbols + for vi, ci in e.variable_count: + if isinstance(vi, Symbol) and vi in free: + expr = expr.diff((vi, ci)) + elif D in expr.subs(vi, D).free_symbols: + expr = expr.diff((vi, ci)) + else: + wrt.append((vi, ci)) + # inject remaining subs + rv = expr.subs(undone) + # do remaining differentiation *in order given* + for vc in wrt: + rv = rv.diff(vc) + else: + # inject remaining subs + rv = e.subs(undone) + else: + rv = e.doit(**hints).subs(list(zip(v, p))) + + if hints.get('deep', True) and rv != self: + rv = rv.doit(**hints) + return rv + + def evalf(self, prec=None, **options): + return self.doit().evalf(prec, **options) + + n = evalf # type:ignore + + @property + def variables(self): + """The variables to be evaluated""" + return self._args[1] + + bound_symbols = variables + + @property + def expr(self): + """The expression on which the substitution operates""" + return self._args[0] + + @property + def point(self): + """The values for which the variables are to be substituted""" + return self._args[2] + + @property + def free_symbols(self): + return (self.expr.free_symbols - set(self.variables) | + set(self.point.free_symbols)) + + @property + def expr_free_symbols(self): + sympy_deprecation_warning(""" + The expr_free_symbols property is deprecated. Use free_symbols to get + the free symbols of an expression. + """, + deprecated_since_version="1.9", + active_deprecations_target="deprecated-expr-free-symbols") + # Don't show the warning twice from the recursive call + with ignore_warnings(SymPyDeprecationWarning): + return (self.expr.expr_free_symbols - set(self.variables) | + set(self.point.expr_free_symbols)) + + def __eq__(self, other): + if not isinstance(other, Subs): + return False + return self._hashable_content() == other._hashable_content() + + def __ne__(self, other): + return not(self == other) + + def __hash__(self): + return super().__hash__() + + def _hashable_content(self): + return (self._expr.xreplace(self.canonical_variables), + ) + tuple(ordered([(v, p) for v, p in + zip(self.variables, self.point) if not self.expr.has(v)])) + + def _eval_subs(self, old, new): + # Subs doit will do the variables in order; the semantics + # of subs for Subs is have the following invariant for + # Subs object foo: + # foo.doit().subs(reps) == foo.subs(reps).doit() + pt = list(self.point) + if old in self.variables: + if _atomic(new) == {new} and not any( + i.has(new) for i in self.args): + # the substitution is neutral + return self.xreplace({old: new}) + # any occurrence of old before this point will get + # handled by replacements from here on + i = self.variables.index(old) + for j in range(i, len(self.variables)): + pt[j] = pt[j]._subs(old, new) + return self.func(self.expr, self.variables, pt) + v = [i._subs(old, new) for i in self.variables] + if v != list(self.variables): + return self.func(self.expr, self.variables + (old,), pt + [new]) + expr = self.expr._subs(old, new) + pt = [i._subs(old, new) for i in self.point] + return self.func(expr, v, pt) + + def _eval_derivative(self, s): + # Apply the chain rule of the derivative on the substitution variables: + f = self.expr + vp = V, P = self.variables, self.point + val = Add.fromiter(p.diff(s)*Subs(f.diff(v), *vp).doit() + for v, p in zip(V, P)) + + # these are all the free symbols in the expr + efree = f.free_symbols + # some symbols like IndexedBase include themselves and args + # as free symbols + compound = {i for i in efree if len(i.free_symbols) > 1} + # hide them and see what independent free symbols remain + dums = {Dummy() for i in compound} + masked = f.xreplace(dict(zip(compound, dums))) + ifree = masked.free_symbols - dums + # include the compound symbols + free = ifree | compound + # remove the variables already handled + free -= set(V) + # add back any free symbols of remaining compound symbols + free |= {i for j in free & compound for i in j.free_symbols} + # if symbols of s are in free then there is more to do + if free & s.free_symbols: + val += Subs(f.diff(s), self.variables, self.point).doit() + return val + + def _eval_nseries(self, x, n, logx, cdir=0): + if x in self.point: + # x is the variable being substituted into + apos = self.point.index(x) + other = self.variables[apos] + else: + other = x + arg = self.expr.nseries(other, n=n, logx=logx) + o = arg.getO() + terms = Add.make_args(arg.removeO()) + rv = Add(*[self.func(a, *self.args[1:]) for a in terms]) + if o: + rv += o.subs(other, x) + return rv + + def _eval_as_leading_term(self, x, logx, cdir): + if x in self.point: + ipos = self.point.index(x) + xvar = self.variables[ipos] + return self.expr.as_leading_term(xvar) + if x in self.variables: + # if `x` is a dummy variable, it means it won't exist after the + # substitution has been performed: + return self + # The variable is independent of the substitution: + return self.expr.as_leading_term(x) + + +def diff(f, *symbols, **kwargs): + """ + Differentiate f with respect to symbols. + + Explanation + =========== + + This is just a wrapper to unify .diff() and the Derivative class; its + interface is similar to that of integrate(). You can use the same + shortcuts for multiple variables as with Derivative. For example, + diff(f(x), x, x, x) and diff(f(x), x, 3) both return the third derivative + of f(x). + + You can pass evaluate=False to get an unevaluated Derivative class. Note + that if there are 0 symbols (such as diff(f(x), x, 0), then the result will + be the function (the zeroth derivative), even if evaluate=False. + + Examples + ======== + + >>> from sympy import sin, cos, Function, diff + >>> from sympy.abc import x, y + >>> f = Function('f') + + >>> diff(sin(x), x) + cos(x) + >>> diff(f(x), x, x, x) + Derivative(f(x), (x, 3)) + >>> diff(f(x), x, 3) + Derivative(f(x), (x, 3)) + >>> diff(sin(x)*cos(y), x, 2, y, 2) + sin(x)*cos(y) + + >>> type(diff(sin(x), x)) + cos + >>> type(diff(sin(x), x, evaluate=False)) + + >>> type(diff(sin(x), x, 0)) + sin + >>> type(diff(sin(x), x, 0, evaluate=False)) + sin + + >>> diff(sin(x)) + cos(x) + >>> diff(sin(x*y)) + Traceback (most recent call last): + ... + ValueError: specify differentiation variables to differentiate sin(x*y) + + Note that ``diff(sin(x))`` syntax is meant only for convenience + in interactive sessions and should be avoided in library code. + + References + ========== + + .. [1] https://reference.wolfram.com/legacy/v5_2/Built-inFunctions/AlgebraicComputation/Calculus/D.html + + See Also + ======== + + Derivative + idiff: computes the derivative implicitly + + """ + if hasattr(f, 'diff'): + return f.diff(*symbols, **kwargs) + kwargs.setdefault('evaluate', True) + return _derivative_dispatch(f, *symbols, **kwargs) + + +def expand(e, deep=True, modulus=None, power_base=True, power_exp=True, + mul=True, log=True, multinomial=True, basic=True, **hints): + r""" + Expand an expression using methods given as hints. + + Explanation + =========== + + Hints evaluated unless explicitly set to False are: ``basic``, ``log``, + ``multinomial``, ``mul``, ``power_base``, and ``power_exp`` The following + hints are supported but not applied unless set to True: ``complex``, + ``func``, and ``trig``. In addition, the following meta-hints are + supported by some or all of the other hints: ``frac``, ``numer``, + ``denom``, ``modulus``, and ``force``. ``deep`` is supported by all + hints. Additionally, subclasses of Expr may define their own hints or + meta-hints. + + The ``basic`` hint is used for any special rewriting of an object that + should be done automatically (along with the other hints like ``mul``) + when expand is called. This is a catch-all hint to handle any sort of + expansion that may not be described by the existing hint names. To use + this hint an object should override the ``_eval_expand_basic`` method. + Objects may also define their own expand methods, which are not run by + default. See the API section below. + + If ``deep`` is set to ``True`` (the default), things like arguments of + functions are recursively expanded. Use ``deep=False`` to only expand on + the top level. + + If the ``force`` hint is used, assumptions about variables will be ignored + in making the expansion. + + Hints + ===== + + These hints are run by default + + mul + --- + + Distributes multiplication over addition: + + >>> from sympy import cos, exp, sin + >>> from sympy.abc import x, y, z + >>> (y*(x + z)).expand(mul=True) + x*y + y*z + + multinomial + ----------- + + Expand (x + y + ...)**n where n is a positive integer. + + >>> ((x + y + z)**2).expand(multinomial=True) + x**2 + 2*x*y + 2*x*z + y**2 + 2*y*z + z**2 + + power_exp + --------- + + Expand addition in exponents into multiplied bases. + + >>> exp(x + y).expand(power_exp=True) + exp(x)*exp(y) + >>> (2**(x + y)).expand(power_exp=True) + 2**x*2**y + + power_base + ---------- + + Split powers of multiplied bases. + + This only happens by default if assumptions allow, or if the + ``force`` meta-hint is used: + + >>> ((x*y)**z).expand(power_base=True) + (x*y)**z + >>> ((x*y)**z).expand(power_base=True, force=True) + x**z*y**z + >>> ((2*y)**z).expand(power_base=True) + 2**z*y**z + + Note that in some cases where this expansion always holds, SymPy performs + it automatically: + + >>> (x*y)**2 + x**2*y**2 + + log + --- + + Pull out power of an argument as a coefficient and split logs products + into sums of logs. + + Note that these only work if the arguments of the log function have the + proper assumptions--the arguments must be positive and the exponents must + be real--or else the ``force`` hint must be True: + + >>> from sympy import log, symbols + >>> log(x**2*y).expand(log=True) + log(x**2*y) + >>> log(x**2*y).expand(log=True, force=True) + 2*log(x) + log(y) + >>> x, y = symbols('x,y', positive=True) + >>> log(x**2*y).expand(log=True) + 2*log(x) + log(y) + + basic + ----- + + This hint is intended primarily as a way for custom subclasses to enable + expansion by default. + + These hints are not run by default: + + complex + ------- + + Split an expression into real and imaginary parts. + + >>> x, y = symbols('x,y') + >>> (x + y).expand(complex=True) + re(x) + re(y) + I*im(x) + I*im(y) + >>> cos(x).expand(complex=True) + -I*sin(re(x))*sinh(im(x)) + cos(re(x))*cosh(im(x)) + + Note that this is just a wrapper around ``as_real_imag()``. Most objects + that wish to redefine ``_eval_expand_complex()`` should consider + redefining ``as_real_imag()`` instead. + + func + ---- + + Expand other functions. + + >>> from sympy import gamma + >>> gamma(x + 1).expand(func=True) + x*gamma(x) + + trig + ---- + + Do trigonometric expansions. + + >>> cos(x + y).expand(trig=True) + -sin(x)*sin(y) + cos(x)*cos(y) + >>> sin(2*x).expand(trig=True) + 2*sin(x)*cos(x) + + Note that the forms of ``sin(n*x)`` and ``cos(n*x)`` in terms of ``sin(x)`` + and ``cos(x)`` are not unique, due to the identity `\sin^2(x) + \cos^2(x) + = 1`. The current implementation uses the form obtained from Chebyshev + polynomials, but this may change. See `this MathWorld article + `_ for more + information. + + Notes + ===== + + - You can shut off unwanted methods:: + + >>> (exp(x + y)*(x + y)).expand() + x*exp(x)*exp(y) + y*exp(x)*exp(y) + >>> (exp(x + y)*(x + y)).expand(power_exp=False) + x*exp(x + y) + y*exp(x + y) + >>> (exp(x + y)*(x + y)).expand(mul=False) + (x + y)*exp(x)*exp(y) + + - Use deep=False to only expand on the top level:: + + >>> exp(x + exp(x + y)).expand() + exp(x)*exp(exp(x)*exp(y)) + >>> exp(x + exp(x + y)).expand(deep=False) + exp(x)*exp(exp(x + y)) + + - Hints are applied in an arbitrary, but consistent order (in the current + implementation, they are applied in alphabetical order, except + multinomial comes before mul, but this may change). Because of this, + some hints may prevent expansion by other hints if they are applied + first. For example, ``mul`` may distribute multiplications and prevent + ``log`` and ``power_base`` from expanding them. Also, if ``mul`` is + applied before ``multinomial`, the expression might not be fully + distributed. The solution is to use the various ``expand_hint`` helper + functions or to use ``hint=False`` to this function to finely control + which hints are applied. Here are some examples:: + + >>> from sympy import expand, expand_mul, expand_power_base + >>> x, y, z = symbols('x,y,z', positive=True) + + >>> expand(log(x*(y + z))) + log(x) + log(y + z) + + Here, we see that ``log`` was applied before ``mul``. To get the mul + expanded form, either of the following will work:: + + >>> expand_mul(log(x*(y + z))) + log(x*y + x*z) + >>> expand(log(x*(y + z)), log=False) + log(x*y + x*z) + + A similar thing can happen with the ``power_base`` hint:: + + >>> expand((x*(y + z))**x) + (x*y + x*z)**x + + To get the ``power_base`` expanded form, either of the following will + work:: + + >>> expand((x*(y + z))**x, mul=False) + x**x*(y + z)**x + >>> expand_power_base((x*(y + z))**x) + x**x*(y + z)**x + + >>> expand((x + y)*y/x) + y + y**2/x + + The parts of a rational expression can be targeted:: + + >>> expand((x + y)*y/x/(x + 1), frac=True) + (x*y + y**2)/(x**2 + x) + >>> expand((x + y)*y/x/(x + 1), numer=True) + (x*y + y**2)/(x*(x + 1)) + >>> expand((x + y)*y/x/(x + 1), denom=True) + y*(x + y)/(x**2 + x) + + - The ``modulus`` meta-hint can be used to reduce the coefficients of an + expression post-expansion:: + + >>> expand((3*x + 1)**2) + 9*x**2 + 6*x + 1 + >>> expand((3*x + 1)**2, modulus=5) + 4*x**2 + x + 1 + + - Either ``expand()`` the function or ``.expand()`` the method can be + used. Both are equivalent:: + + >>> expand((x + 1)**2) + x**2 + 2*x + 1 + >>> ((x + 1)**2).expand() + x**2 + 2*x + 1 + + API + === + + Objects can define their own expand hints by defining + ``_eval_expand_hint()``. The function should take the form:: + + def _eval_expand_hint(self, **hints): + # Only apply the method to the top-level expression + ... + + See also the example below. Objects should define ``_eval_expand_hint()`` + methods only if ``hint`` applies to that specific object. The generic + ``_eval_expand_hint()`` method defined in Expr will handle the no-op case. + + Each hint should be responsible for expanding that hint only. + Furthermore, the expansion should be applied to the top-level expression + only. ``expand()`` takes care of the recursion that happens when + ``deep=True``. + + You should only call ``_eval_expand_hint()`` methods directly if you are + 100% sure that the object has the method, as otherwise you are liable to + get unexpected ``AttributeError``s. Note, again, that you do not need to + recursively apply the hint to args of your object: this is handled + automatically by ``expand()``. ``_eval_expand_hint()`` should + generally not be used at all outside of an ``_eval_expand_hint()`` method. + If you want to apply a specific expansion from within another method, use + the public ``expand()`` function, method, or ``expand_hint()`` functions. + + In order for expand to work, objects must be rebuildable by their args, + i.e., ``obj.func(*obj.args) == obj`` must hold. + + Expand methods are passed ``**hints`` so that expand hints may use + 'metahints'--hints that control how different expand methods are applied. + For example, the ``force=True`` hint described above that causes + ``expand(log=True)`` to ignore assumptions is such a metahint. The + ``deep`` meta-hint is handled exclusively by ``expand()`` and is not + passed to ``_eval_expand_hint()`` methods. + + Note that expansion hints should generally be methods that perform some + kind of 'expansion'. For hints that simply rewrite an expression, use the + .rewrite() API. + + Examples + ======== + + >>> from sympy import Expr, sympify + >>> class MyClass(Expr): + ... def __new__(cls, *args): + ... args = sympify(args) + ... return Expr.__new__(cls, *args) + ... + ... def _eval_expand_double(self, *, force=False, **hints): + ... ''' + ... Doubles the args of MyClass. + ... + ... If there more than four args, doubling is not performed, + ... unless force=True is also used (False by default). + ... ''' + ... if not force and len(self.args) > 4: + ... return self + ... return self.func(*(self.args + self.args)) + ... + >>> a = MyClass(1, 2, MyClass(3, 4)) + >>> a + MyClass(1, 2, MyClass(3, 4)) + >>> a.expand(double=True) + MyClass(1, 2, MyClass(3, 4, 3, 4), 1, 2, MyClass(3, 4, 3, 4)) + >>> a.expand(double=True, deep=False) + MyClass(1, 2, MyClass(3, 4), 1, 2, MyClass(3, 4)) + + >>> b = MyClass(1, 2, 3, 4, 5) + >>> b.expand(double=True) + MyClass(1, 2, 3, 4, 5) + >>> b.expand(double=True, force=True) + MyClass(1, 2, 3, 4, 5, 1, 2, 3, 4, 5) + + See Also + ======== + + expand_log, expand_mul, expand_multinomial, expand_complex, expand_trig, + expand_power_base, expand_power_exp, expand_func, sympy.simplify.hyperexpand.hyperexpand + + """ + # don't modify this; modify the Expr.expand method + hints['power_base'] = power_base + hints['power_exp'] = power_exp + hints['mul'] = mul + hints['log'] = log + hints['multinomial'] = multinomial + hints['basic'] = basic + return sympify(e).expand(deep=deep, modulus=modulus, **hints) + +# This is a special application of two hints + +def _mexpand(expr, recursive=False): + # expand multinomials and then expand products; this may not always + # be sufficient to give a fully expanded expression (see + # test_issue_8247_8354 in test_arit) + if expr is None: + return + was = None + while was != expr: + was, expr = expr, expand_mul(expand_multinomial(expr)) + if not recursive: + break + return expr + + +# These are simple wrappers around single hints. + + +def expand_mul(expr, deep=True): + """ + Wrapper around expand that only uses the mul hint. See the expand + docstring for more information. + + Examples + ======== + + >>> from sympy import symbols, expand_mul, exp, log + >>> x, y = symbols('x,y', positive=True) + >>> expand_mul(exp(x+y)*(x+y)*log(x*y**2)) + x*exp(x + y)*log(x*y**2) + y*exp(x + y)*log(x*y**2) + + """ + return sympify(expr).expand(deep=deep, mul=True, power_exp=False, + power_base=False, basic=False, multinomial=False, log=False) + + +def expand_multinomial(expr, deep=True): + """ + Wrapper around expand that only uses the multinomial hint. See the expand + docstring for more information. + + Examples + ======== + + >>> from sympy import symbols, expand_multinomial, exp + >>> x, y = symbols('x y', positive=True) + >>> expand_multinomial((x + exp(x + 1))**2) + x**2 + 2*x*exp(x + 1) + exp(2*x + 2) + + """ + return sympify(expr).expand(deep=deep, mul=False, power_exp=False, + power_base=False, basic=False, multinomial=True, log=False) + + +def expand_log(expr, deep=True, force=False, factor=False): + """ + Wrapper around expand that only uses the log hint. See the expand + docstring for more information. + + Examples + ======== + + >>> from sympy import symbols, expand_log, exp, log + >>> x, y = symbols('x,y', positive=True) + >>> expand_log(exp(x+y)*(x+y)*log(x*y**2)) + (x + y)*(log(x) + 2*log(y))*exp(x + y) + + """ + from sympy.functions.elementary.exponential import log + from sympy.simplify.radsimp import fraction + if factor is False: + def _handleMul(x): + # look for the simple case of expanded log(b**a)/log(b) -> a in args + n, d = fraction(x) + n = [i for i in n.atoms(log) if i.args[0].is_Integer] + d = [i for i in d.atoms(log) if i.args[0].is_Integer] + if len(n) == 1 and len(d) == 1: + n = n[0] + d = d[0] + from sympy import multiplicity + m = multiplicity(d.args[0], n.args[0]) + if m: + r = m + log(n.args[0]//d.args[0]**m)/d + x = x.subs(n, d*r) + x1 = expand_mul(expand_log(x, deep=deep, force=force, factor=True)) + if x1.count(log) <= x.count(log): + return x1 + return x + + expr = expr.replace( + lambda x: x.is_Mul and all(any(isinstance(i, log) and i.args[0].is_Rational + for i in Mul.make_args(j)) for j in x.as_numer_denom()), + _handleMul) + + return sympify(expr).expand(deep=deep, log=True, mul=False, + power_exp=False, power_base=False, multinomial=False, + basic=False, force=force, factor=factor) + + +def expand_func(expr, deep=True): + """ + Wrapper around expand that only uses the func hint. See the expand + docstring for more information. + + Examples + ======== + + >>> from sympy import expand_func, gamma + >>> from sympy.abc import x + >>> expand_func(gamma(x + 2)) + x*(x + 1)*gamma(x) + + """ + return sympify(expr).expand(deep=deep, func=True, basic=False, + log=False, mul=False, power_exp=False, power_base=False, multinomial=False) + + +def expand_trig(expr, deep=True): + """ + Wrapper around expand that only uses the trig hint. See the expand + docstring for more information. + + Examples + ======== + + >>> from sympy import expand_trig, sin + >>> from sympy.abc import x, y + >>> expand_trig(sin(x+y)*(x+y)) + (x + y)*(sin(x)*cos(y) + sin(y)*cos(x)) + + """ + return sympify(expr).expand(deep=deep, trig=True, basic=False, + log=False, mul=False, power_exp=False, power_base=False, multinomial=False) + + +def expand_complex(expr, deep=True): + """ + Wrapper around expand that only uses the complex hint. See the expand + docstring for more information. + + Examples + ======== + + >>> from sympy import expand_complex, exp, sqrt, I + >>> from sympy.abc import z + >>> expand_complex(exp(z)) + I*exp(re(z))*sin(im(z)) + exp(re(z))*cos(im(z)) + >>> expand_complex(sqrt(I)) + sqrt(2)/2 + sqrt(2)*I/2 + + See Also + ======== + + sympy.core.expr.Expr.as_real_imag + """ + return sympify(expr).expand(deep=deep, complex=True, basic=False, + log=False, mul=False, power_exp=False, power_base=False, multinomial=False) + + +def expand_power_base(expr, deep=True, force=False): + """ + Wrapper around expand that only uses the power_base hint. + + A wrapper to expand(power_base=True) which separates a power with a base + that is a Mul into a product of powers, without performing any other + expansions, provided that assumptions about the power's base and exponent + allow. + + deep=False (default is True) will only apply to the top-level expression. + + force=True (default is False) will cause the expansion to ignore + assumptions about the base and exponent. When False, the expansion will + only happen if the base is non-negative or the exponent is an integer. + + >>> from sympy.abc import x, y, z + >>> from sympy import expand_power_base, sin, cos, exp, Symbol + + >>> (x*y)**2 + x**2*y**2 + + >>> (2*x)**y + (2*x)**y + >>> expand_power_base(_) + 2**y*x**y + + >>> expand_power_base((x*y)**z) + (x*y)**z + >>> expand_power_base((x*y)**z, force=True) + x**z*y**z + >>> expand_power_base(sin((x*y)**z), deep=False) + sin((x*y)**z) + >>> expand_power_base(sin((x*y)**z), force=True) + sin(x**z*y**z) + + >>> expand_power_base((2*sin(x))**y + (2*cos(x))**y) + 2**y*sin(x)**y + 2**y*cos(x)**y + + >>> expand_power_base((2*exp(y))**x) + 2**x*exp(y)**x + + >>> expand_power_base((2*cos(x))**y) + 2**y*cos(x)**y + + Notice that sums are left untouched. If this is not the desired behavior, + apply full ``expand()`` to the expression: + + >>> expand_power_base(((x+y)*z)**2) + z**2*(x + y)**2 + >>> (((x+y)*z)**2).expand() + x**2*z**2 + 2*x*y*z**2 + y**2*z**2 + + >>> expand_power_base((2*y)**(1+z)) + 2**(z + 1)*y**(z + 1) + >>> ((2*y)**(1+z)).expand() + 2*2**z*y**(z + 1) + + The power that is unexpanded can be expanded safely when + ``y != 0``, otherwise different values might be obtained for the expression: + + >>> prev = _ + + If we indicate that ``y`` is positive but then replace it with + a value of 0 after expansion, the expression becomes 0: + + >>> p = Symbol('p', positive=True) + >>> prev.subs(y, p).expand().subs(p, 0) + 0 + + But if ``z = -1`` the expression would not be zero: + + >>> prev.subs(y, 0).subs(z, -1) + 1 + + See Also + ======== + + expand + + """ + return sympify(expr).expand(deep=deep, log=False, mul=False, + power_exp=False, power_base=True, multinomial=False, + basic=False, force=force) + + +def expand_power_exp(expr, deep=True): + """ + Wrapper around expand that only uses the power_exp hint. + + See the expand docstring for more information. + + Examples + ======== + + >>> from sympy import expand_power_exp, Symbol + >>> from sympy.abc import x, y + >>> expand_power_exp(3**(y + 2)) + 9*3**y + >>> expand_power_exp(x**(y + 2)) + x**(y + 2) + + If ``x = 0`` the value of the expression depends on the + value of ``y``; if the expression were expanded the result + would be 0. So expansion is only done if ``x != 0``: + + >>> expand_power_exp(Symbol('x', zero=False)**(y + 2)) + x**2*x**y + """ + return sympify(expr).expand(deep=deep, complex=False, basic=False, + log=False, mul=False, power_exp=True, power_base=False, multinomial=False) + + +def count_ops(expr, visual=False): + """ + Return a representation (integer or expression) of the operations in expr. + + Parameters + ========== + + expr : Expr + If expr is an iterable, the sum of the op counts of the + items will be returned. + + visual : bool, optional + If ``False`` (default) then the sum of the coefficients of the + visual expression will be returned. + If ``True`` then the number of each type of operation is shown + with the core class types (or their virtual equivalent) multiplied by the + number of times they occur. + + Examples + ======== + + >>> from sympy.abc import a, b, x, y + >>> from sympy import sin, count_ops + + Although there is not a SUB object, minus signs are interpreted as + either negations or subtractions: + + >>> (x - y).count_ops(visual=True) + SUB + >>> (-x).count_ops(visual=True) + NEG + + Here, there are two Adds and a Pow: + + >>> (1 + a + b**2).count_ops(visual=True) + 2*ADD + POW + + In the following, an Add, Mul, Pow and two functions: + + >>> (sin(x)*x + sin(x)**2).count_ops(visual=True) + ADD + MUL + POW + 2*SIN + + for a total of 5: + + >>> (sin(x)*x + sin(x)**2).count_ops(visual=False) + 5 + + Note that "what you type" is not always what you get. The expression + 1/x/y is translated by sympy into 1/(x*y) so it gives a DIV and MUL rather + than two DIVs: + + >>> (1/x/y).count_ops(visual=True) + DIV + MUL + + The visual option can be used to demonstrate the difference in + operations for expressions in different forms. Here, the Horner + representation is compared with the expanded form of a polynomial: + + >>> eq=x*(1 + x*(2 + x*(3 + x))) + >>> count_ops(eq.expand(), visual=True) - count_ops(eq, visual=True) + -MUL + 3*POW + + The count_ops function also handles iterables: + + >>> count_ops([x, sin(x), None, True, x + 2], visual=False) + 2 + >>> count_ops([x, sin(x), None, True, x + 2], visual=True) + ADD + SIN + >>> count_ops({x: sin(x), x + 2: y + 1}, visual=True) + 2*ADD + SIN + + """ + from .relational import Relational + from sympy.concrete.summations import Sum + from sympy.integrals.integrals import Integral + from sympy.logic.boolalg import BooleanFunction + from sympy.simplify.radsimp import fraction + + expr = sympify(expr) + if isinstance(expr, Expr) and not expr.is_Relational: + + ops = [] + args = [expr] + NEG = Symbol('NEG') + DIV = Symbol('DIV') + SUB = Symbol('SUB') + ADD = Symbol('ADD') + EXP = Symbol('EXP') + while args: + a = args.pop() + + # if the following fails because the object is + # not Basic type, then the object should be fixed + # since it is the intention that all args of Basic + # should themselves be Basic + if a.is_Rational: + #-1/3 = NEG + DIV + if a is not S.One: + if a.p < 0: + ops.append(NEG) + if a.q != 1: + ops.append(DIV) + continue + elif a.is_Mul or a.is_MatMul: + if _coeff_isneg(a): + ops.append(NEG) + if a.args[0] is S.NegativeOne: + a = a.as_two_terms()[1] + else: + a = -a + n, d = fraction(a) + if n.is_Integer: + ops.append(DIV) + if n < 0: + ops.append(NEG) + args.append(d) + continue # won't be -Mul but could be Add + elif d is not S.One: + if not d.is_Integer: + args.append(d) + ops.append(DIV) + args.append(n) + continue # could be -Mul + elif a.is_Add or a.is_MatAdd: + aargs = list(a.args) + negs = 0 + for i, ai in enumerate(aargs): + if _coeff_isneg(ai): + negs += 1 + args.append(-ai) + if i > 0: + ops.append(SUB) + else: + args.append(ai) + if i > 0: + ops.append(ADD) + if negs == len(aargs): # -x - y = NEG + SUB + ops.append(NEG) + elif _coeff_isneg(aargs[0]): # -x + y = SUB, but already recorded ADD + ops.append(SUB - ADD) + continue + if a.is_Pow and a.exp is S.NegativeOne: + ops.append(DIV) + args.append(a.base) # won't be -Mul but could be Add + continue + if a == S.Exp1: + ops.append(EXP) + continue + if a.is_Pow and a.base == S.Exp1: + ops.append(EXP) + args.append(a.exp) + continue + if a.is_Mul or isinstance(a, LatticeOp): + o = Symbol(a.func.__name__.upper()) + # count the args + ops.append(o*(len(a.args) - 1)) + elif a.args and ( + a.is_Pow or a.is_Function or isinstance(a, (Derivative, Integral, Sum))): + # if it's not in the list above we don't + # consider a.func something to count, e.g. + # Tuple, MatrixSymbol, etc... + if isinstance(a.func, UndefinedFunction): + o = Symbol("FUNC_" + a.func.__name__.upper()) + else: + o = Symbol(a.func.__name__.upper()) + ops.append(o) + + if not a.is_Symbol: + args.extend(a.args) + + elif isinstance(expr, Dict): + ops = [count_ops(k, visual=visual) + + count_ops(v, visual=visual) for k, v in expr.items()] + elif iterable(expr): + ops = [count_ops(i, visual=visual) for i in expr] + elif isinstance(expr, (Relational, BooleanFunction)): + ops = [] + for arg in expr.args: + ops.append(count_ops(arg, visual=True)) + o = Symbol(func_name(expr, short=True).upper()) + ops.append(o) + elif not isinstance(expr, Basic): + ops = [] + else: # it's Basic not isinstance(expr, Expr): + if not isinstance(expr, Basic): + raise TypeError("Invalid type of expr") + else: + ops = [] + args = [expr] + while args: + a = args.pop() + + if a.args: + o = Symbol(type(a).__name__.upper()) + if a.is_Boolean: + ops.append(o*(len(a.args)-1)) + else: + ops.append(o) + args.extend(a.args) + + if not ops: + if visual: + return S.Zero + return 0 + + ops = Add(*ops) + + if visual: + return ops + + if ops.is_Number: + return int(ops) + + return sum(int((a.args or [1])[0]) for a in Add.make_args(ops)) + + +def nfloat(expr, n=15, exponent=False, dkeys=False): + """Make all Rationals in expr Floats except those in exponents + (unless the exponents flag is set to True) and those in undefined + functions. When processing dictionaries, do not modify the keys + unless ``dkeys=True``. + + Examples + ======== + + >>> from sympy import nfloat, cos, pi, sqrt + >>> from sympy.abc import x, y + >>> nfloat(x**4 + x/2 + cos(pi/3) + 1 + sqrt(y)) + x**4 + 0.5*x + sqrt(y) + 1.5 + >>> nfloat(x**4 + sqrt(y), exponent=True) + x**4.0 + y**0.5 + + Container types are not modified: + + >>> type(nfloat((1, 2))) is tuple + True + """ + from sympy.matrices.matrixbase import MatrixBase + + kw = {"n": n, "exponent": exponent, "dkeys": dkeys} + + if isinstance(expr, MatrixBase): + return expr.applyfunc(lambda e: nfloat(e, **kw)) + + # handling of iterable containers + if iterable(expr, exclude=str): + if isinstance(expr, (dict, Dict)): + if dkeys: + args = [tuple((nfloat(i, **kw) for i in a)) + for a in expr.items()] + else: + args = [(k, nfloat(v, **kw)) for k, v in expr.items()] + if isinstance(expr, dict): + return type(expr)(args) + else: + return expr.func(*args) + elif isinstance(expr, Basic): + return expr.func(*[nfloat(a, **kw) for a in expr.args]) + return type(expr)([nfloat(a, **kw) for a in expr]) + + rv = sympify(expr) + + if rv.is_Number: + return Float(rv, n) + elif rv.is_number: + # evalf doesn't always set the precision + rv = rv.n(n) + if rv.is_Number: + rv = Float(rv.n(n), n) + else: + pass # pure_complex(rv) is likely True + return rv + elif rv.is_Atom: + return rv + elif rv.is_Relational: + args_nfloat = (nfloat(arg, **kw) for arg in rv.args) + return rv.func(*args_nfloat) + + + # watch out for RootOf instances that don't like to have + # their exponents replaced with Dummies and also sometimes have + # problems with evaluating at low precision (issue 6393) + from sympy.polys.rootoftools import RootOf + rv = rv.xreplace({ro: ro.n(n) for ro in rv.atoms(RootOf)}) + + from .power import Pow + if not exponent: + reps = [(p, Pow(p.base, Dummy())) for p in rv.atoms(Pow)] + rv = rv.xreplace(dict(reps)) + rv = rv.n(n) + if not exponent: + rv = rv.xreplace({d.exp: p.exp for p, d in reps}) + else: + # Pow._eval_evalf special cases Integer exponents so if + # exponent is suppose to be handled we have to do so here + rv = rv.xreplace(Transform( + lambda x: Pow(x.base, Float(x.exp, n)), + lambda x: x.is_Pow and x.exp.is_Integer)) + + return rv.xreplace(Transform( + lambda x: x.func(*nfloat(x.args, n, exponent)), + lambda x: isinstance(x, Function) and not isinstance(x, AppliedUndef))) + + +from .symbol import Dummy, Symbol diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/intfunc.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/intfunc.py new file mode 100644 index 0000000000000000000000000000000000000000..50cb625dafcc1e795933311780e26423ddc6015a --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/intfunc.py @@ -0,0 +1,530 @@ +""" +The routines here were removed from numbers.py, power.py, +digits.py and factor_.py so they could be imported into core +without raising circular import errors. + +Although the name 'intfunc' was chosen to represent functions that +work with integers, it can also be thought of as containing +internal/core functions that are needed by the classes of the core. +""" + +import math +import sys +from functools import lru_cache + +from .sympify import sympify +from .singleton import S +from sympy.external.gmpy import (gcd as number_gcd, lcm as number_lcm, sqrt, + iroot, bit_scan1, gcdext) +from sympy.utilities.misc import as_int, filldedent + + +def num_digits(n, base=10): + """Return the number of digits needed to express n in give base. + + Examples + ======== + + >>> from sympy.core.intfunc import num_digits + >>> num_digits(10) + 2 + >>> num_digits(10, 2) # 1010 -> 4 digits + 4 + >>> num_digits(-100, 16) # -64 -> 2 digits + 2 + + + Parameters + ========== + + n: integer + The number whose digits are counted. + + b: integer + The base in which digits are computed. + + See Also + ======== + sympy.ntheory.digits.digits, sympy.ntheory.digits.count_digits + """ + if base < 0: + raise ValueError('base must be int greater than 1') + if not n: + return 1 + e, t = integer_log(abs(n), base) + return 1 + e + + +def integer_log(n, b): + r""" + Returns ``(e, bool)`` where e is the largest nonnegative integer + such that :math:`|n| \geq |b^e|` and ``bool`` is True if $n = b^e$. + + Examples + ======== + + >>> from sympy import integer_log + >>> integer_log(125, 5) + (3, True) + >>> integer_log(17, 9) + (1, False) + + If the base is positive and the number negative the + return value will always be the same except for 2: + + >>> integer_log(-4, 2) + (2, False) + >>> integer_log(-16, 4) + (0, False) + + When the base is negative, the returned value + will only be True if the parity of the exponent is + correct for the sign of the base: + + >>> integer_log(4, -2) + (2, True) + >>> integer_log(8, -2) + (3, False) + >>> integer_log(-8, -2) + (3, True) + >>> integer_log(-4, -2) + (2, False) + + See Also + ======== + integer_nthroot + sympy.ntheory.primetest.is_square + sympy.ntheory.factor_.multiplicity + sympy.ntheory.factor_.perfect_power + """ + n = as_int(n) + b = as_int(b) + + if b < 0: + e, t = integer_log(abs(n), -b) + # (-2)**3 == -8 + # (-2)**2 = 4 + t = t and e % 2 == (n < 0) + return e, t + if b <= 1: + raise ValueError('base must be 2 or more') + if n < 0: + if b != 2: + return 0, False + e, t = integer_log(-n, b) + return e, False + if n == 0: + raise ValueError('n cannot be 0') + + if n < b: + return 0, n == 1 + if b == 2: + e = n.bit_length() - 1 + return e, trailing(n) == e + t = trailing(b) + if 2**t == b: + e = int(n.bit_length() - 1)//t + n_ = 1 << (t*e) + return e, n_ == n + + d = math.floor(math.log10(n) / math.log10(b)) + n_ = b ** d + while n_ <= n: # this will iterate 0, 1 or 2 times + d += 1 + n_ *= b + return d - (n_ > n), (n_ == n or n_//b == n) + + +def trailing(n): + """Count the number of trailing zero digits in the binary + representation of n, i.e. determine the largest power of 2 + that divides n. + + Examples + ======== + + >>> from sympy import trailing + >>> trailing(128) + 7 + >>> trailing(63) + 0 + + See Also + ======== + sympy.ntheory.factor_.multiplicity + + """ + if not n: + return 0 + return bit_scan1(int(n)) + + +@lru_cache(1024) +def igcd(*args): + """Computes nonnegative integer greatest common divisor. + + Explanation + =========== + + The algorithm is based on the well known Euclid's algorithm [1]_. To + improve speed, ``igcd()`` has its own caching mechanism. + If you do not need the cache mechanism, using ``sympy.external.gmpy.gcd``. + + Examples + ======== + + >>> from sympy import igcd + >>> igcd(2, 4) + 2 + >>> igcd(5, 10, 15) + 5 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Euclidean_algorithm + + """ + if len(args) < 2: + raise TypeError("igcd() takes at least 2 arguments (%s given)" % len(args)) + return int(number_gcd(*map(as_int, args))) + + +igcd2 = math.gcd + + +def igcd_lehmer(a, b): + r"""Computes greatest common divisor of two integers. + + Explanation + =========== + + Euclid's algorithm for the computation of the greatest + common divisor ``gcd(a, b)`` of two (positive) integers + $a$ and $b$ is based on the division identity + $$ a = q \times b + r$$, + where the quotient $q$ and the remainder $r$ are integers + and $0 \le r < b$. Then each common divisor of $a$ and $b$ + divides $r$, and it follows that ``gcd(a, b) == gcd(b, r)``. + The algorithm works by constructing the sequence + r0, r1, r2, ..., where r0 = a, r1 = b, and each rn + is the remainder from the division of the two preceding + elements. + + In Python, ``q = a // b`` and ``r = a % b`` are obtained by the + floor division and the remainder operations, respectively. + These are the most expensive arithmetic operations, especially + for large a and b. + + Lehmer's algorithm [1]_ is based on the observation that the quotients + ``qn = r(n-1) // rn`` are in general small integers even + when a and b are very large. Hence the quotients can be + usually determined from a relatively small number of most + significant bits. + + The efficiency of the algorithm is further enhanced by not + computing each long remainder in Euclid's sequence. The remainders + are linear combinations of a and b with integer coefficients + derived from the quotients. The coefficients can be computed + as far as the quotients can be determined from the chosen + most significant parts of a and b. Only then a new pair of + consecutive remainders is computed and the algorithm starts + anew with this pair. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Lehmer%27s_GCD_algorithm + + """ + a, b = abs(as_int(a)), abs(as_int(b)) + if a < b: + a, b = b, a + + # The algorithm works by using one or two digit division + # whenever possible. The outer loop will replace the + # pair (a, b) with a pair of shorter consecutive elements + # of the Euclidean gcd sequence until a and b + # fit into two Python (long) int digits. + nbits = 2 * sys.int_info.bits_per_digit + + while a.bit_length() > nbits and b != 0: + # Quotients are mostly small integers that can + # be determined from most significant bits. + n = a.bit_length() - nbits + x, y = int(a >> n), int(b >> n) # most significant bits + + # Elements of the Euclidean gcd sequence are linear + # combinations of a and b with integer coefficients. + # Compute the coefficients of consecutive pairs + # a' = A*a + B*b, b' = C*a + D*b + # using small integer arithmetic as far as possible. + A, B, C, D = 1, 0, 0, 1 # initial values + + while True: + # The coefficients alternate in sign while looping. + # The inner loop combines two steps to keep track + # of the signs. + + # At this point we have + # A > 0, B <= 0, C <= 0, D > 0, + # x' = x + B <= x < x" = x + A, + # y' = y + C <= y < y" = y + D, + # and + # x'*N <= a' < x"*N, y'*N <= b' < y"*N, + # where N = 2**n. + + # Now, if y' > 0, and x"//y' and x'//y" agree, + # then their common value is equal to q = a'//b'. + # In addition, + # x'%y" = x' - q*y" < x" - q*y' = x"%y', + # and + # (x'%y")*N < a'%b' < (x"%y')*N. + + # On the other hand, we also have x//y == q, + # and therefore + # x'%y" = x + B - q*(y + D) = x%y + B', + # x"%y' = x + A - q*(y + C) = x%y + A', + # where + # B' = B - q*D < 0, A' = A - q*C > 0. + + if y + C <= 0: + break + q = (x + A) // (y + C) + + # Now x'//y" <= q, and equality holds if + # x' - q*y" = (x - q*y) + (B - q*D) >= 0. + # This is a minor optimization to avoid division. + x_qy, B_qD = x - q * y, B - q * D + if x_qy + B_qD < 0: + break + + # Next step in the Euclidean sequence. + x, y = y, x_qy + A, B, C, D = C, D, A - q * C, B_qD + + # At this point the signs of the coefficients + # change and their roles are interchanged. + # A <= 0, B > 0, C > 0, D < 0, + # x' = x + A <= x < x" = x + B, + # y' = y + D < y < y" = y + C. + + if y + D <= 0: + break + q = (x + B) // (y + D) + x_qy, A_qC = x - q * y, A - q * C + if x_qy + A_qC < 0: + break + + x, y = y, x_qy + A, B, C, D = C, D, A_qC, B - q * D + # Now the conditions on top of the loop + # are again satisfied. + # A > 0, B < 0, C < 0, D > 0. + + if B == 0: + # This can only happen when y == 0 in the beginning + # and the inner loop does nothing. + # Long division is forced. + a, b = b, a % b + continue + + # Compute new long arguments using the coefficients. + a, b = A * a + B * b, C * a + D * b + + # Small divisors. Finish with the standard algorithm. + while b: + a, b = b, a % b + + return a + + +def ilcm(*args): + """Computes integer least common multiple. + + Examples + ======== + + >>> from sympy import ilcm + >>> ilcm(5, 10) + 10 + >>> ilcm(7, 3) + 21 + >>> ilcm(5, 10, 15) + 30 + + """ + if len(args) < 2: + raise TypeError("ilcm() takes at least 2 arguments (%s given)" % len(args)) + return int(number_lcm(*map(as_int, args))) + + +def igcdex(a, b): + """Returns x, y, g such that g = x*a + y*b = gcd(a, b). + + Examples + ======== + + >>> from sympy.core.intfunc import igcdex + >>> igcdex(2, 3) + (-1, 1, 1) + >>> igcdex(10, 12) + (-1, 1, 2) + + >>> x, y, g = igcdex(100, 2004) + >>> x, y, g + (-20, 1, 4) + >>> x*100 + y*2004 + 4 + + """ + g, x, y = gcdext(int(a), int(b)) + return x, y, g + + +def mod_inverse(a, m): + r""" + Return the number $c$ such that, $a \times c = 1 \pmod{m}$ + where $c$ has the same sign as $m$. If no such value exists, + a ValueError is raised. + + Examples + ======== + + >>> from sympy import mod_inverse, S + + Suppose we wish to find multiplicative inverse $x$ of + 3 modulo 11. This is the same as finding $x$ such + that $3x = 1 \pmod{11}$. One value of x that satisfies + this congruence is 4. Because $3 \times 4 = 12$ and $12 = 1 \pmod{11}$. + This is the value returned by ``mod_inverse``: + + >>> mod_inverse(3, 11) + 4 + >>> mod_inverse(-3, 11) + 7 + + When there is a common factor between the numerators of + `a` and `m` the inverse does not exist: + + >>> mod_inverse(2, 4) + Traceback (most recent call last): + ... + ValueError: inverse of 2 mod 4 does not exist + + >>> mod_inverse(S(2)/7, S(5)/2) + 7/2 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Modular_multiplicative_inverse + .. [2] https://en.wikipedia.org/wiki/Extended_Euclidean_algorithm + """ + c = None + try: + a, m = as_int(a), as_int(m) + if m != 1 and m != -1: + x, _, g = igcdex(a, m) + if g == 1: + c = x % m + except ValueError: + a, m = sympify(a), sympify(m) + if not (a.is_number and m.is_number): + raise TypeError( + filldedent( + """ + Expected numbers for arguments; symbolic `mod_inverse` + is not implemented + but symbolic expressions can be handled with the + similar function, + sympy.polys.polytools.invert""" + ) + ) + big = m > 1 + if big not in (S.true, S.false): + raise ValueError("m > 1 did not evaluate; try to simplify %s" % m) + elif big: + c = 1 / a + if c is None: + raise ValueError("inverse of %s (mod %s) does not exist" % (a, m)) + return c + + +def isqrt(n): + r""" Return the largest integer less than or equal to `\sqrt{n}`. + + Parameters + ========== + + n : non-negative integer + + Returns + ======= + + int : `\left\lfloor\sqrt{n}\right\rfloor` + + Raises + ====== + + ValueError + If n is negative. + TypeError + If n is of a type that cannot be compared to ``int``. + Therefore, a TypeError is raised for ``str``, but not for ``float``. + + Examples + ======== + + >>> from sympy.core.intfunc import isqrt + >>> isqrt(0) + 0 + >>> isqrt(9) + 3 + >>> isqrt(10) + 3 + >>> isqrt("30") + Traceback (most recent call last): + ... + TypeError: '<' not supported between instances of 'str' and 'int' + >>> from sympy.core.numbers import Rational + >>> isqrt(Rational(-1, 2)) + Traceback (most recent call last): + ... + ValueError: n must be nonnegative + + """ + if n < 0: + raise ValueError("n must be nonnegative") + return int(sqrt(int(n))) + + +def integer_nthroot(y, n): + """ + Return a tuple containing x = floor(y**(1/n)) + and a boolean indicating whether the result is exact (that is, + whether x**n == y). + + Examples + ======== + + >>> from sympy import integer_nthroot + >>> integer_nthroot(16, 2) + (4, True) + >>> integer_nthroot(26, 2) + (5, False) + + To simply determine if a number is a perfect square, the is_square + function should be used: + + >>> from sympy.ntheory.primetest import is_square + >>> is_square(26) + False + + See Also + ======== + sympy.ntheory.primetest.is_square + integer_log + """ + x, b = iroot(as_int(y), as_int(n)) + return int(x), b diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/kind.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/kind.py new file mode 100644 index 0000000000000000000000000000000000000000..83c5929eda14114659f2a5a72eb2d8b91a560f0e --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/kind.py @@ -0,0 +1,388 @@ +""" +Module to efficiently partition SymPy objects. + +This system is introduced because class of SymPy object does not always +represent the mathematical classification of the entity. For example, +``Integral(1, x)`` and ``Integral(Matrix([1,2]), x)`` are both instance +of ``Integral`` class. However the former is number and the latter is +matrix. + +One way to resolve this is defining subclass for each mathematical type, +such as ``MatAdd`` for the addition between matrices. Basic algebraic +operation such as addition or multiplication take this approach, but +defining every class for every mathematical object is not scalable. + +Therefore, we define the "kind" of the object and let the expression +infer the kind of itself from its arguments. Function and class can +filter the arguments by their kind, and behave differently according to +the type of itself. + +This module defines basic kinds for core objects. Other kinds such as +``ArrayKind`` or ``MatrixKind`` can be found in corresponding modules. + +.. notes:: + This approach is experimental, and can be replaced or deleted in the future. + See https://github.com/sympy/sympy/pull/20549. +""" + +from collections import defaultdict + +from .cache import cacheit +from sympy.multipledispatch.dispatcher import (Dispatcher, + ambiguity_warn, ambiguity_register_error_ignore_dup, + str_signature, RaiseNotImplementedError) + + +class KindMeta(type): + """ + Metaclass for ``Kind``. + + Assigns empty ``dict`` as class attribute ``_inst`` for every class, + in order to endow singleton-like behavior. + """ + def __new__(cls, clsname, bases, dct): + dct['_inst'] = {} + return super().__new__(cls, clsname, bases, dct) + + +class Kind(object, metaclass=KindMeta): + """ + Base class for kinds. + + Kind of the object represents the mathematical classification that + the entity falls into. It is expected that functions and classes + recognize and filter the argument by its kind. + + Kind of every object must be carefully selected so that it shows the + intention of design. Expressions may have different kind according + to the kind of its arguments. For example, arguments of ``Add`` + must have common kind since addition is group operator, and the + resulting ``Add()`` has the same kind. + + For the performance, each kind is as broad as possible and is not + based on set theory. For example, ``NumberKind`` includes not only + complex number but expression containing ``S.Infinity`` or ``S.NaN`` + which are not strictly number. + + Kind may have arguments as parameter. For example, ``MatrixKind()`` + may be constructed with one element which represents the kind of its + elements. + + ``Kind`` behaves in singleton-like fashion. Same signature will + return the same object. + + """ + def __new__(cls, *args): + if args in cls._inst: + inst = cls._inst[args] + else: + inst = super().__new__(cls) + cls._inst[args] = inst + return inst + + +class _UndefinedKind(Kind): + """ + Default kind for all SymPy object. If the kind is not defined for + the object, or if the object cannot infer the kind from its + arguments, this will be returned. + + Examples + ======== + + >>> from sympy import Expr + >>> Expr().kind + UndefinedKind + """ + def __new__(cls): + return super().__new__(cls) + + def __repr__(self): + return "UndefinedKind" + +UndefinedKind = _UndefinedKind() + + +class _NumberKind(Kind): + """ + Kind for all numeric object. + + This kind represents every number, including complex numbers, + infinity and ``S.NaN``. Other objects such as quaternions do not + have this kind. + + Most ``Expr`` are initially designed to represent the number, so + this will be the most common kind in SymPy core. For example + ``Symbol()``, which represents a scalar, has this kind as long as it + is commutative. + + Numbers form a field. Any operation between number-kind objects will + result this kind as well. + + Examples + ======== + + >>> from sympy import S, oo, Symbol + >>> S.One.kind + NumberKind + >>> (-oo).kind + NumberKind + >>> S.NaN.kind + NumberKind + + Commutative symbol are treated as number. + + >>> x = Symbol('x') + >>> x.kind + NumberKind + >>> Symbol('y', commutative=False).kind + UndefinedKind + + Operation between numbers results number. + + >>> (x+1).kind + NumberKind + + See Also + ======== + + sympy.core.expr.Expr.is_Number : check if the object is strictly + subclass of ``Number`` class. + + sympy.core.expr.Expr.is_number : check if the object is number + without any free symbol. + + """ + def __new__(cls): + return super().__new__(cls) + + def __repr__(self): + return "NumberKind" + +NumberKind = _NumberKind() + + +class _BooleanKind(Kind): + """ + Kind for boolean objects. + + SymPy's ``S.true``, ``S.false``, and built-in ``True`` and ``False`` + have this kind. Boolean number ``1`` and ``0`` are not relevant. + + Examples + ======== + + >>> from sympy import S, Q + >>> S.true.kind + BooleanKind + >>> Q.even(3).kind + BooleanKind + """ + def __new__(cls): + return super().__new__(cls) + + def __repr__(self): + return "BooleanKind" + +BooleanKind = _BooleanKind() + + +class KindDispatcher: + """ + Dispatcher to select a kind from multiple kinds by binary dispatching. + + .. notes:: + This approach is experimental, and can be replaced or deleted in + the future. + + Explanation + =========== + + SymPy object's :obj:`sympy.core.kind.Kind()` vaguely represents the + algebraic structure where the object belongs to. Therefore, with + given operation, we can always find a dominating kind among the + different kinds. This class selects the kind by recursive binary + dispatching. If the result cannot be determined, ``UndefinedKind`` + is returned. + + Examples + ======== + + Multiplication between numbers return number. + + >>> from sympy import NumberKind, Mul + >>> Mul._kind_dispatcher(NumberKind, NumberKind) + NumberKind + + Multiplication between number and unknown-kind object returns unknown kind. + + >>> from sympy import UndefinedKind + >>> Mul._kind_dispatcher(NumberKind, UndefinedKind) + UndefinedKind + + Any number and order of kinds is allowed. + + >>> Mul._kind_dispatcher(UndefinedKind, NumberKind) + UndefinedKind + >>> Mul._kind_dispatcher(NumberKind, UndefinedKind, NumberKind) + UndefinedKind + + Since matrix forms a vector space over scalar field, multiplication + between matrix with numeric element and number returns matrix with + numeric element. + + >>> from sympy.matrices import MatrixKind + >>> Mul._kind_dispatcher(MatrixKind(NumberKind), NumberKind) + MatrixKind(NumberKind) + + If a matrix with number element and another matrix with unknown-kind + element are multiplied, we know that the result is matrix but the + kind of its elements is unknown. + + >>> Mul._kind_dispatcher(MatrixKind(NumberKind), MatrixKind(UndefinedKind)) + MatrixKind(UndefinedKind) + + Parameters + ========== + + name : str + + commutative : bool, optional + If True, binary dispatch will be automatically registered in + reversed order as well. + + doc : str, optional + + """ + def __init__(self, name, commutative=False, doc=None): + self.name = name + self.doc = doc + self.commutative = commutative + self._dispatcher = Dispatcher(name) + + def __repr__(self): + return "" % self.name + + def register(self, *types, **kwargs): + """ + Register the binary dispatcher for two kind classes. + + If *self.commutative* is ``True``, signature in reversed order is + automatically registered as well. + """ + on_ambiguity = kwargs.pop("on_ambiguity", None) + if not on_ambiguity: + if self.commutative: + on_ambiguity = ambiguity_register_error_ignore_dup + else: + on_ambiguity = ambiguity_warn + kwargs.update(on_ambiguity=on_ambiguity) + + if not len(types) == 2: + raise RuntimeError( + "Only binary dispatch is supported, but got %s types: <%s>." % ( + len(types), str_signature(types) + )) + + def _(func): + self._dispatcher.add(types, func, **kwargs) + if self.commutative: + self._dispatcher.add(tuple(reversed(types)), func, **kwargs) + return _ + + def __call__(self, *args, **kwargs): + if self.commutative: + kinds = frozenset(args) + else: + kinds = [] + prev = None + for a in args: + if prev is not a: + kinds.append(a) + prev = a + return self.dispatch_kinds(kinds, **kwargs) + + @cacheit + def dispatch_kinds(self, kinds, **kwargs): + # Quick exit for the case where all kinds are same + if len(kinds) == 1: + result, = kinds + if not isinstance(result, Kind): + raise RuntimeError("%s is not a kind." % result) + return result + + for i,kind in enumerate(kinds): + if not isinstance(kind, Kind): + raise RuntimeError("%s is not a kind." % kind) + + if i == 0: + result = kind + else: + prev_kind = result + + t1, t2 = type(prev_kind), type(kind) + k1, k2 = prev_kind, kind + func = self._dispatcher.dispatch(t1, t2) + if func is None and self.commutative: + # try reversed order + func = self._dispatcher.dispatch(t2, t1) + k1, k2 = k2, k1 + if func is None: + # unregistered kind relation + result = UndefinedKind + else: + result = func(k1, k2) + if not isinstance(result, Kind): + raise RuntimeError( + "Dispatcher for {!r} and {!r} must return a Kind, but got {!r}".format( + prev_kind, kind, result + )) + + return result + + @property + def __doc__(self): + docs = [ + "Kind dispatcher : %s" % self.name, + "Note that support for this is experimental. See the docs for :class:`KindDispatcher` for details" + ] + + if self.doc: + docs.append(self.doc) + + s = "Registered kind classes\n" + s += '=' * len(s) + docs.append(s) + + amb_sigs = [] + + typ_sigs = defaultdict(list) + for sigs in self._dispatcher.ordering[::-1]: + key = self._dispatcher.funcs[sigs] + typ_sigs[key].append(sigs) + + for func, sigs in typ_sigs.items(): + + sigs_str = ', '.join('<%s>' % str_signature(sig) for sig in sigs) + + if isinstance(func, RaiseNotImplementedError): + amb_sigs.append(sigs_str) + continue + + s = 'Inputs: %s\n' % sigs_str + s += '-' * len(s) + '\n' + if func.__doc__: + s += func.__doc__.strip() + else: + s += func.__name__ + docs.append(s) + + if amb_sigs: + s = "Ambiguous kind classes\n" + s += '=' * len(s) + docs.append(s) + + s = '\n'.join(amb_sigs) + docs.append(s) + + return '\n\n'.join(docs) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/logic.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/logic.py new file mode 100644 index 0000000000000000000000000000000000000000..1c318063049a4657952c8ca84e0f0fdeef62a207 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/logic.py @@ -0,0 +1,425 @@ +"""Logic expressions handling + +NOTE +---- + +at present this is mainly needed for facts.py, feel free however to improve +this stuff for general purpose. +""" + +from __future__ import annotations +from typing import Optional + +# Type of a fuzzy bool +FuzzyBool = Optional[bool] + + +def _torf(args): + """Return True if all args are True, False if they + are all False, else None. + + >>> from sympy.core.logic import _torf + >>> _torf((True, True)) + True + >>> _torf((False, False)) + False + >>> _torf((True, False)) + """ + sawT = sawF = False + for a in args: + if a is True: + if sawF: + return + sawT = True + elif a is False: + if sawT: + return + sawF = True + else: + return + return sawT + + +def _fuzzy_group(args, quick_exit=False): + """Return True if all args are True, None if there is any None else False + unless ``quick_exit`` is True (then return None as soon as a second False + is seen. + + ``_fuzzy_group`` is like ``fuzzy_and`` except that it is more + conservative in returning a False, waiting to make sure that all + arguments are True or False and returning None if any arguments are + None. It also has the capability of permiting only a single False and + returning None if more than one is seen. For example, the presence of a + single transcendental amongst rationals would indicate that the group is + no longer rational; but a second transcendental in the group would make the + determination impossible. + + + Examples + ======== + + >>> from sympy.core.logic import _fuzzy_group + + By default, multiple Falses mean the group is broken: + + >>> _fuzzy_group([False, False, True]) + False + + If multiple Falses mean the group status is unknown then set + `quick_exit` to True so None can be returned when the 2nd False is seen: + + >>> _fuzzy_group([False, False, True], quick_exit=True) + + But if only a single False is seen then the group is known to + be broken: + + >>> _fuzzy_group([False, True, True], quick_exit=True) + False + + """ + saw_other = False + for a in args: + if a is True: + continue + if a is None: + return + if quick_exit and saw_other: + return + saw_other = True + return not saw_other + + +def fuzzy_bool(x): + """Return True, False or None according to x. + + Whereas bool(x) returns True or False, fuzzy_bool allows + for the None value and non-false values (which become None), too. + + Examples + ======== + + >>> from sympy.core.logic import fuzzy_bool + >>> from sympy.abc import x + >>> fuzzy_bool(x), fuzzy_bool(None) + (None, None) + >>> bool(x), bool(None) + (True, False) + + """ + if x is None: + return None + if x in (True, False): + return bool(x) + + +def fuzzy_and(args): + """Return True (all True), False (any False) or None. + + Examples + ======== + + >>> from sympy.core.logic import fuzzy_and + >>> from sympy import Dummy + + If you had a list of objects to test the commutivity of + and you want the fuzzy_and logic applied, passing an + iterator will allow the commutativity to only be computed + as many times as necessary. With this list, False can be + returned after analyzing the first symbol: + + >>> syms = [Dummy(commutative=False), Dummy()] + >>> fuzzy_and(s.is_commutative for s in syms) + False + + That False would require less work than if a list of pre-computed + items was sent: + + >>> fuzzy_and([s.is_commutative for s in syms]) + False + """ + + rv = True + for ai in args: + ai = fuzzy_bool(ai) + if ai is False: + return False + if rv: # this will stop updating if a None is ever trapped + rv = ai + return rv + + +def fuzzy_not(v): + """ + Not in fuzzy logic + + Return None if `v` is None else `not v`. + + Examples + ======== + + >>> from sympy.core.logic import fuzzy_not + >>> fuzzy_not(True) + False + >>> fuzzy_not(None) + >>> fuzzy_not(False) + True + + """ + if v is None: + return v + else: + return not v + + +def fuzzy_or(args): + """ + Or in fuzzy logic. Returns True (any True), False (all False), or None + + See the docstrings of fuzzy_and and fuzzy_not for more info. fuzzy_or is + related to the two by the standard De Morgan's law. + + >>> from sympy.core.logic import fuzzy_or + >>> fuzzy_or([True, False]) + True + >>> fuzzy_or([True, None]) + True + >>> fuzzy_or([False, False]) + False + >>> print(fuzzy_or([False, None])) + None + + """ + rv = False + for ai in args: + ai = fuzzy_bool(ai) + if ai is True: + return True + if rv is False: # this will stop updating if a None is ever trapped + rv = ai + return rv + + +def fuzzy_xor(args): + """Return None if any element of args is not True or False, else + True (if there are an odd number of True elements), else False.""" + t = 0 + for a in args: + ai = fuzzy_bool(a) + if ai: + t += 1 + elif ai is None: + return + return t % 2 == 1 + + +def fuzzy_nand(args): + """Return False if all args are True, True if they are all False, + else None.""" + return fuzzy_not(fuzzy_and(args)) + + +class Logic: + """Logical expression""" + # {} 'op' -> LogicClass + op_2class: dict[str, type[Logic]] = {} + + def __new__(cls, *args): + obj = object.__new__(cls) + obj.args = args + return obj + + def __getnewargs__(self): + return self.args + + def __hash__(self): + return hash((type(self).__name__,) + tuple(self.args)) + + def __eq__(a, b): + if not isinstance(b, type(a)): + return False + else: + return a.args == b.args + + def __ne__(a, b): + if not isinstance(b, type(a)): + return True + else: + return a.args != b.args + + def __lt__(self, other): + if self.__cmp__(other) == -1: + return True + return False + + def __cmp__(self, other): + if type(self) is not type(other): + a = str(type(self)) + b = str(type(other)) + else: + a = self.args + b = other.args + return (a > b) - (a < b) + + def __str__(self): + return '%s(%s)' % (self.__class__.__name__, + ', '.join(str(a) for a in self.args)) + + __repr__ = __str__ + + @staticmethod + def fromstring(text): + """Logic from string with space around & and | but none after !. + + e.g. + + !a & b | c + """ + lexpr = None # current logical expression + schedop = None # scheduled operation + for term in text.split(): + # operation symbol + if term in '&|': + if schedop is not None: + raise ValueError( + 'double op forbidden: "%s %s"' % (term, schedop)) + if lexpr is None: + raise ValueError( + '%s cannot be in the beginning of expression' % term) + schedop = term + continue + if '&' in term or '|' in term: + raise ValueError('& and | must have space around them') + if term[0] == '!': + if len(term) == 1: + raise ValueError('do not include space after "!"') + term = Not(term[1:]) + + # already scheduled operation, e.g. '&' + if schedop: + lexpr = Logic.op_2class[schedop](lexpr, term) + schedop = None + continue + + # this should be atom + if lexpr is not None: + raise ValueError( + 'missing op between "%s" and "%s"' % (lexpr, term)) + + lexpr = term + + # let's check that we ended up in correct state + if schedop is not None: + raise ValueError('premature end-of-expression in "%s"' % text) + if lexpr is None: + raise ValueError('"%s" is empty' % text) + + # everything looks good now + return lexpr + + +class AndOr_Base(Logic): + + def __new__(cls, *args): + bargs = [] + for a in args: + if a == cls.op_x_notx: + return a + elif a == (not cls.op_x_notx): + continue # skip this argument + bargs.append(a) + + args = sorted(set(cls.flatten(bargs)), key=hash) + + for a in args: + if Not(a) in args: + return cls.op_x_notx + + if len(args) == 1: + return args.pop() + elif len(args) == 0: + return not cls.op_x_notx + + return Logic.__new__(cls, *args) + + @classmethod + def flatten(cls, args): + # quick-n-dirty flattening for And and Or + args_queue = list(args) + res = [] + + while True: + try: + arg = args_queue.pop(0) + except IndexError: + break + if isinstance(arg, Logic): + if isinstance(arg, cls): + args_queue.extend(arg.args) + continue + res.append(arg) + + args = tuple(res) + return args + + +class And(AndOr_Base): + op_x_notx = False + + def _eval_propagate_not(self): + # !(a&b&c ...) == !a | !b | !c ... + return Or(*[Not(a) for a in self.args]) + + # (a|b|...) & c == (a&c) | (b&c) | ... + def expand(self): + + # first locate Or + for i, arg in enumerate(self.args): + if isinstance(arg, Or): + arest = self.args[:i] + self.args[i + 1:] + + orterms = [And(*(arest + (a,))) for a in arg.args] + for j in range(len(orterms)): + if isinstance(orterms[j], Logic): + orterms[j] = orterms[j].expand() + + res = Or(*orterms) + return res + + return self + + +class Or(AndOr_Base): + op_x_notx = True + + def _eval_propagate_not(self): + # !(a|b|c ...) == !a & !b & !c ... + return And(*[Not(a) for a in self.args]) + + +class Not(Logic): + + def __new__(cls, arg): + if isinstance(arg, str): + return Logic.__new__(cls, arg) + + elif isinstance(arg, bool): + return not arg + elif isinstance(arg, Not): + return arg.args[0] + + elif isinstance(arg, Logic): + # XXX this is a hack to expand right from the beginning + arg = arg._eval_propagate_not() + return arg + + else: + raise ValueError('Not: unknown argument %r' % (arg,)) + + @property + def arg(self): + return self.args[0] + + +Logic.op_2class['&'] = And +Logic.op_2class['|'] = Or +Logic.op_2class['!'] = Not diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/mod.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/mod.py new file mode 100644 index 0000000000000000000000000000000000000000..8be0c56e497eb5ed0041801488044b50f907962c --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/mod.py @@ -0,0 +1,260 @@ +from .add import Add +from .exprtools import gcd_terms +from .function import DefinedFunction +from .kind import NumberKind +from .logic import fuzzy_and, fuzzy_not +from .mul import Mul +from .numbers import equal_valued +from .relational import is_le, is_lt, is_ge, is_gt +from .singleton import S + + +class Mod(DefinedFunction): + """Represents a modulo operation on symbolic expressions. + + Parameters + ========== + + p : Expr + Dividend. + + q : Expr + Divisor. + + Notes + ===== + + The convention used is the same as Python's: the remainder always has the + same sign as the divisor. + + Many objects can be evaluated modulo ``n`` much faster than they can be + evaluated directly (or at all). For this, ``evaluate=False`` is + necessary to prevent eager evaluation: + + >>> from sympy import binomial, factorial, Mod, Pow + >>> Mod(Pow(2, 10**16, evaluate=False), 97) + 61 + >>> Mod(factorial(10**9, evaluate=False), 10**9 + 9) + 712524808 + >>> Mod(binomial(10**18, 10**12, evaluate=False), (10**5 + 3)**2) + 3744312326 + + Examples + ======== + + >>> from sympy.abc import x, y + >>> x**2 % y + Mod(x**2, y) + >>> _.subs({x: 5, y: 6}) + 1 + + """ + + kind = NumberKind + + @classmethod + def eval(cls, p, q): + def number_eval(p, q): + """Try to return p % q if both are numbers or +/-p is known + to be less than or equal q. + """ + + if q.is_zero: + raise ZeroDivisionError("Modulo by zero") + if p is S.NaN or q is S.NaN or p.is_finite is False or q.is_finite is False: + return S.NaN + if p is S.Zero or p in (q, -q) or (p.is_integer and q == 1): + return S.Zero + + if q.is_Number: + if p.is_Number: + return p%q + if q == 2: + if p.is_even: + return S.Zero + elif p.is_odd: + return S.One + + if hasattr(p, '_eval_Mod'): + rv = getattr(p, '_eval_Mod')(q) + if rv is not None: + return rv + + # by ratio + r = p/q + if r.is_integer: + return S.Zero + try: + d = int(r) + except TypeError: + pass + else: + if isinstance(d, int): + rv = p - d*q + if (rv*q < 0) == True: + rv += q + return rv + + # by difference + # -2|q| < p < 2|q| + if q.is_positive: + comp1, comp2 = is_le, is_lt + elif q.is_negative: + comp1, comp2 = is_ge, is_gt + else: + return + ls = -2*q + r = p - q + for _ in range(4): + if not comp1(ls, p): + return + if comp2(r, ls): + return p - ls + ls += q + + rv = number_eval(p, q) + if rv is not None: + return rv + + # denest + if isinstance(p, cls): + qinner = p.args[1] + if qinner % q == 0: + return cls(p.args[0], q) + elif (qinner*(q - qinner)).is_nonnegative: + # |qinner| < |q| and have same sign + return p + elif isinstance(-p, cls): + qinner = (-p).args[1] + if qinner % q == 0: + return cls(-(-p).args[0], q) + elif (qinner*(q + qinner)).is_nonpositive: + # |qinner| < |q| and have different sign + return p + elif isinstance(p, Add): + # separating into modulus and non modulus + both_l = non_mod_l, mod_l = [], [] + for arg in p.args: + both_l[isinstance(arg, cls)].append(arg) + # if q same for all + if mod_l and all(inner.args[1] == q for inner in mod_l): + net = Add(*non_mod_l) + Add(*[i.args[0] for i in mod_l]) + return cls(net, q) + + elif isinstance(p, Mul): + # separating into modulus and non modulus + both_l = non_mod_l, mod_l = [], [] + for arg in p.args: + both_l[isinstance(arg, cls)].append(arg) + + if mod_l and all(inner.args[1] == q for inner in mod_l) and all(t.is_integer for t in p.args) and q.is_integer: + # finding distributive term + non_mod_l = [cls(x, q) for x in non_mod_l] + mod = [] + non_mod = [] + for j in non_mod_l: + if isinstance(j, cls): + mod.append(j.args[0]) + else: + non_mod.append(j) + prod_mod = Mul(*mod) + prod_non_mod = Mul(*non_mod) + prod_mod1 = Mul(*[i.args[0] for i in mod_l]) + net = prod_mod1*prod_mod + return prod_non_mod*cls(net, q) + + if q.is_Integer and q is not S.One: + if all(t.is_integer for t in p.args): + non_mod_l = [i % q if i.is_Integer else i for i in p.args] + if any(iq is S.Zero for iq in non_mod_l): + return S.Zero + + p = Mul(*(non_mod_l + mod_l)) + + # XXX other possibilities? + + from sympy.polys.polyerrors import PolynomialError + from sympy.polys.polytools import gcd + + # extract gcd; any further simplification should be done by the user + try: + G = gcd(p, q) + if not equal_valued(G, 1): + p, q = [gcd_terms(i/G, clear=False, fraction=False) + for i in (p, q)] + except PolynomialError: # issue 21373 + G = S.One + pwas, qwas = p, q + + # simplify terms + # (x + y + 2) % x -> Mod(y + 2, x) + if p.is_Add: + args = [] + for i in p.args: + a = cls(i, q) + if a.count(cls) > i.count(cls): + args.append(i) + else: + args.append(a) + if args != list(p.args): + p = Add(*args) + + else: + # handle coefficients if they are not Rational + # since those are not handled by factor_terms + # e.g. Mod(.6*x, .3*y) -> 0.3*Mod(2*x, y) + cp, p = p.as_coeff_Mul() + cq, q = q.as_coeff_Mul() + ok = False + if not cp.is_Rational or not cq.is_Rational: + r = cp % cq + if equal_valued(r, 0): + G *= cq + p *= int(cp/cq) + ok = True + if not ok: + p = cp*p + q = cq*q + + # simple -1 extraction + if p.could_extract_minus_sign() and q.could_extract_minus_sign(): + G, p, q = [-i for i in (G, p, q)] + + # check again to see if p and q can now be handled as numbers + rv = number_eval(p, q) + if rv is not None: + return rv*G + + # put 1.0 from G on inside + if G.is_Float and equal_valued(G, 1): + p *= G + return cls(p, q, evaluate=False) + elif G.is_Mul and G.args[0].is_Float and equal_valued(G.args[0], 1): + p = G.args[0]*p + G = Mul._from_args(G.args[1:]) + return G*cls(p, q, evaluate=(p, q) != (pwas, qwas)) + + def _eval_is_integer(self): + p, q = self.args + if fuzzy_and([p.is_integer, q.is_integer, fuzzy_not(q.is_zero)]): + return True + + def _eval_is_nonnegative(self): + if self.args[1].is_positive: + return True + + def _eval_is_nonpositive(self): + if self.args[1].is_negative: + return True + + def _eval_rewrite_as_floor(self, a, b, **kwargs): + from sympy.functions.elementary.integers import floor + return a - b*floor(a/b) + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.functions.elementary.integers import floor + return self.rewrite(floor)._eval_as_leading_term(x, logx=logx, cdir=cdir) + + def _eval_nseries(self, x, n, logx, cdir=0): + from sympy.functions.elementary.integers import floor + return self.rewrite(floor)._eval_nseries(x, n, logx=logx, cdir=cdir) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/mul.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/mul.py new file mode 100644 index 0000000000000000000000000000000000000000..fd83c8610a76db4e7bc7a2a71b98e437bd00a28e --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/mul.py @@ -0,0 +1,2214 @@ +from __future__ import annotations +from typing import TYPE_CHECKING, ClassVar + +from collections import defaultdict +from functools import reduce +from itertools import product +import operator + +from .sympify import sympify +from .basic import Basic, _args_sortkey +from .singleton import S +from .operations import AssocOp, AssocOpDispatcher +from .cache import cacheit +from .intfunc import integer_nthroot, trailing +from .logic import fuzzy_not, _fuzzy_group +from .expr import Expr +from .parameters import global_parameters +from .kind import KindDispatcher +from .traversal import bottom_up +from sympy.utilities.iterables import sift + + +# internal marker to indicate: +# "there are still non-commutative objects -- don't forget to process them" +class NC_Marker: + is_Order = False + is_Mul = False + is_Number = False + is_Poly = False + + is_commutative = False + + +def _mulsort(args): + # in-place sorting of args + args.sort(key=_args_sortkey) + + +def _unevaluated_Mul(*args): + """Return a well-formed unevaluated Mul: Numbers are collected and + put in slot 0, any arguments that are Muls will be flattened, and args + are sorted. Use this when args have changed but you still want to return + an unevaluated Mul. + + Examples + ======== + + >>> from sympy.core.mul import _unevaluated_Mul as uMul + >>> from sympy import S, sqrt, Mul + >>> from sympy.abc import x + >>> a = uMul(*[S(3.0), x, S(2)]) + >>> a.args[0] + 6.00000000000000 + >>> a.args[1] + x + + Two unevaluated Muls with the same arguments will + always compare as equal during testing: + + >>> m = uMul(sqrt(2), sqrt(3)) + >>> m == uMul(sqrt(3), sqrt(2)) + True + >>> u = Mul(sqrt(3), sqrt(2), evaluate=False) + >>> m == uMul(u) + True + >>> m == Mul(*m.args) + False + + """ + cargs = [] + ncargs = [] + args = list(args) + co = S.One + for a in args: + if a.is_Mul: + a_c, a_nc = a.args_cnc() + args.extend(a_c) # grow args + ncargs.extend(a_nc) + elif a.is_Number: + co *= a + elif a.is_commutative: + cargs.append(a) + else: + ncargs.append(a) + _mulsort(cargs) + if co is not S.One: + cargs.insert(0, co) + return Mul._from_args(cargs+ncargs) + + +class Mul(Expr, AssocOp): + """ + Expression representing multiplication operation for algebraic field. + + .. deprecated:: 1.7 + + Using arguments that aren't subclasses of :class:`~.Expr` in core + operators (:class:`~.Mul`, :class:`~.Add`, and :class:`~.Pow`) is + deprecated. See :ref:`non-expr-args-deprecated` for details. + + Every argument of ``Mul()`` must be ``Expr``. Infix operator ``*`` + on most scalar objects in SymPy calls this class. + + Another use of ``Mul()`` is to represent the structure of abstract + multiplication so that its arguments can be substituted to return + different class. Refer to examples section for this. + + ``Mul()`` evaluates the argument unless ``evaluate=False`` is passed. + The evaluation logic includes: + + 1. Flattening + ``Mul(x, Mul(y, z))`` -> ``Mul(x, y, z)`` + + 2. Identity removing + ``Mul(x, 1, y)`` -> ``Mul(x, y)`` + + 3. Exponent collecting by ``.as_base_exp()`` + ``Mul(x, x**2)`` -> ``Pow(x, 3)`` + + 4. Term sorting + ``Mul(y, x, 2)`` -> ``Mul(2, x, y)`` + + Since multiplication can be vector space operation, arguments may + have the different :obj:`sympy.core.kind.Kind()`. Kind of the + resulting object is automatically inferred. + + Examples + ======== + + >>> from sympy import Mul + >>> from sympy.abc import x, y + >>> Mul(x, 1) + x + >>> Mul(x, x) + x**2 + + If ``evaluate=False`` is passed, result is not evaluated. + + >>> Mul(1, 2, evaluate=False) + 1*2 + >>> Mul(x, x, evaluate=False) + x*x + + ``Mul()`` also represents the general structure of multiplication + operation. + + >>> from sympy import MatrixSymbol + >>> A = MatrixSymbol('A', 2,2) + >>> expr = Mul(x,y).subs({y:A}) + >>> expr + x*A + >>> type(expr) + + + See Also + ======== + + MatMul + + """ + __slots__ = () + + is_Mul = True + + _args_type = Expr + _kind_dispatcher = KindDispatcher("Mul_kind_dispatcher", commutative=True) + + identity: ClassVar[Expr] + + @property + def kind(self): + arg_kinds = (a.kind for a in self.args) + return self._kind_dispatcher(*arg_kinds) + + if TYPE_CHECKING: + + def __new__(cls, *args: Expr | complex, evaluate: bool=True) -> Expr: # type: ignore + ... + + @property + def args(self) -> tuple[Expr, ...]: + ... + + def could_extract_minus_sign(self): + if self == (-self): + return False # e.g. zoo*x == -zoo*x + c = self.args[0] + return c.is_Number and c.is_extended_negative + + def __neg__(self): + c, args = self.as_coeff_mul() + if args[0] is not S.ComplexInfinity: + c = -c + if c is not S.One: + if args[0].is_Number: + args = list(args) + if c is S.NegativeOne: + args[0] = -args[0] + else: + args[0] *= c + else: + args = (c,) + args + return self._from_args(args, self.is_commutative) + + @classmethod + def flatten(cls, seq): + """Return commutative, noncommutative and order arguments by + combining related terms. + + Notes + ===== + * In an expression like ``a*b*c``, Python process this through SymPy + as ``Mul(Mul(a, b), c)``. This can have undesirable consequences. + + - Sometimes terms are not combined as one would like: + {c.f. https://github.com/sympy/sympy/issues/4596} + + >>> from sympy import Mul, sqrt + >>> from sympy.abc import x, y, z + >>> 2*(x + 1) # this is the 2-arg Mul behavior + 2*x + 2 + >>> y*(x + 1)*2 + 2*y*(x + 1) + >>> 2*(x + 1)*y # 2-arg result will be obtained first + y*(2*x + 2) + >>> Mul(2, x + 1, y) # all 3 args simultaneously processed + 2*y*(x + 1) + >>> 2*((x + 1)*y) # parentheses can control this behavior + 2*y*(x + 1) + + Powers with compound bases may not find a single base to + combine with unless all arguments are processed at once. + Post-processing may be necessary in such cases. + {c.f. https://github.com/sympy/sympy/issues/5728} + + >>> a = sqrt(x*sqrt(y)) + >>> a**3 + (x*sqrt(y))**(3/2) + >>> Mul(a,a,a) + (x*sqrt(y))**(3/2) + >>> a*a*a + x*sqrt(y)*sqrt(x*sqrt(y)) + >>> _.subs(a.base, z).subs(z, a.base) + (x*sqrt(y))**(3/2) + + - If more than two terms are being multiplied then all the + previous terms will be re-processed for each new argument. + So if each of ``a``, ``b`` and ``c`` were :class:`Mul` + expression, then ``a*b*c`` (or building up the product + with ``*=``) will process all the arguments of ``a`` and + ``b`` twice: once when ``a*b`` is computed and again when + ``c`` is multiplied. + + Using ``Mul(a, b, c)`` will process all arguments once. + + * The results of Mul are cached according to arguments, so flatten + will only be called once for ``Mul(a, b, c)``. If you can + structure a calculation so the arguments are most likely to be + repeats then this can save time in computing the answer. For + example, say you had a Mul, M, that you wished to divide by ``d[i]`` + and multiply by ``n[i]`` and you suspect there are many repeats + in ``n``. It would be better to compute ``M*n[i]/d[i]`` rather + than ``M/d[i]*n[i]`` since every time n[i] is a repeat, the + product, ``M*n[i]`` will be returned without flattening -- the + cached value will be returned. If you divide by the ``d[i]`` + first (and those are more unique than the ``n[i]``) then that will + create a new Mul, ``M/d[i]`` the args of which will be traversed + again when it is multiplied by ``n[i]``. + + {c.f. https://github.com/sympy/sympy/issues/5706} + + This consideration is moot if the cache is turned off. + + NB + -- + The validity of the above notes depends on the implementation + details of Mul and flatten which may change at any time. Therefore, + you should only consider them when your code is highly performance + sensitive. + + Removal of 1 from the sequence is already handled by AssocOp.__new__. + """ + + from sympy.calculus.accumulationbounds import AccumBounds + from sympy.matrices.expressions import MatrixExpr + rv = None + if len(seq) == 2: + a, b = seq + if b.is_Rational: + a, b = b, a + seq = [a, b] + assert a is not S.One + if a.is_Rational and not a.is_zero: + r, b = b.as_coeff_Mul() + if b.is_Add: + if r is not S.One: # 2-arg hack + # leave the Mul as a Mul? + ar = a*r + if ar is S.One: + arb = b + else: + arb = cls(a*r, b, evaluate=False) + rv = [arb], [], None + elif global_parameters.distribute and b.is_commutative: + newb = Add(*[_keep_coeff(a, bi) for bi in b.args]) + rv = [newb], [], None + if rv: + return rv + + # apply associativity, separate commutative part of seq + c_part = [] # out: commutative factors + nc_part = [] # out: non-commutative factors + + nc_seq = [] + + coeff = S.One # standalone term + # e.g. 3 * ... + + c_powers = [] # (base,exp) n + # e.g. (x,n) for x + + num_exp = [] # (num-base, exp) y + # e.g. (3, y) for ... * 3 * ... + + neg1e = S.Zero # exponent on -1 extracted from Number-based Pow and I + + pnum_rat = {} # (num-base, Rat-exp) 1/2 + # e.g. (3, 1/2) for ... * 3 * ... + + order_symbols = None + + # --- PART 1 --- + # + # "collect powers and coeff": + # + # o coeff + # o c_powers + # o num_exp + # o neg1e + # o pnum_rat + # + # NOTE: this is optimized for all-objects-are-commutative case + for o in seq: + # O(x) + if o.is_Order: + o, order_symbols = o.as_expr_variables(order_symbols) + + # Mul([...]) + if o.is_Mul: + if o.is_commutative: + seq.extend(o.args) # XXX zerocopy? + + else: + # NCMul can have commutative parts as well + for q in o.args: + if q.is_commutative: + seq.append(q) + else: + nc_seq.append(q) + + # append non-commutative marker, so we don't forget to + # process scheduled non-commutative objects + seq.append(NC_Marker) + + continue + + # 3 + elif o.is_Number: + if o is S.NaN or coeff is S.ComplexInfinity and o.is_zero: + # we know for sure the result will be nan + return [S.NaN], [], None + elif coeff.is_Number or isinstance(coeff, AccumBounds): # it could be zoo + coeff *= o + if coeff is S.NaN: + # we know for sure the result will be nan + return [S.NaN], [], None + continue + + elif isinstance(o, AccumBounds): + coeff = o.__mul__(coeff) + continue + + elif o is S.ComplexInfinity: + if not coeff: + # 0 * zoo = NaN + return [S.NaN], [], None + coeff = S.ComplexInfinity + continue + + elif not coeff and isinstance(o, Add) and any( + _ in (S.NegativeInfinity, S.ComplexInfinity, S.Infinity) + for __ in o.args for _ in Mul.make_args(__)): + # e.g 0 * (x + oo) = NaN but not + # 0 * (1 + Integral(x, (x, 0, oo))) which is + # treated like 0 * x -> 0 + return [S.NaN], [], None + + elif o is S.ImaginaryUnit: + neg1e += S.Half + continue + + elif o.is_commutative: + # e + # o = b + b, e = o.as_base_exp() + + # y + # 3 + if o.is_Pow: + if b.is_Number: + + # get all the factors with numeric base so they can be + # combined below, but don't combine negatives unless + # the exponent is an integer + if e.is_Rational: + if e.is_Integer: + coeff *= Pow(b, e) # it is an unevaluated power + continue + elif e.is_negative: # also a sign of an unevaluated power + seq.append(Pow(b, e)) + continue + elif b.is_negative: + neg1e += e + b = -b + if b is not S.One: + pnum_rat.setdefault(b, []).append(e) + continue + elif b.is_positive or e.is_integer: + num_exp.append((b, e)) + continue + + c_powers.append((b, e)) + + # NON-COMMUTATIVE + # TODO: Make non-commutative exponents not combine automatically + else: + if o is not NC_Marker: + nc_seq.append(o) + + # process nc_seq (if any) + while nc_seq: + o = nc_seq.pop(0) + if not nc_part: + nc_part.append(o) + continue + + # b c b+c + # try to combine last terms: a * a -> a + o1 = nc_part.pop() + b1, e1 = o1.as_base_exp() + b2, e2 = o.as_base_exp() + new_exp = e1 + e2 + # Only allow powers to combine if the new exponent is + # not an Add. This allow things like a**2*b**3 == a**5 + # if a.is_commutative == False, but prohibits + # a**x*a**y and x**a*x**b from combining (x,y commute). + if b1 == b2 and (not new_exp.is_Add): + o12 = b1 ** new_exp + + # now o12 could be a commutative object + if o12.is_commutative: + seq.append(o12) + continue + else: + nc_seq.insert(0, o12) + + else: + nc_part.extend([o1, o]) + + # We do want a combined exponent if it would not be an Add, such as + # y 2y 3y + # x * x -> x + # We determine if two exponents have the same term by using + # as_coeff_Mul. + # + # Unfortunately, this isn't smart enough to consider combining into + # exponents that might already be adds, so things like: + # z - y y + # x * x will be left alone. This is because checking every possible + # combination can slow things down. + + # gather exponents of common bases... + def _gather(c_powers): + common_b = {} # b:e + for b, e in c_powers: + co = e.as_coeff_Mul() + common_b.setdefault(b, {}).setdefault( + co[1], []).append(co[0]) + for b, d in common_b.items(): + for di, li in d.items(): + d[di] = Add(*li) + new_c_powers = [] + for b, e in common_b.items(): + new_c_powers.extend([(b, c*t) for t, c in e.items()]) + return new_c_powers + + # in c_powers + c_powers = _gather(c_powers) + + # and in num_exp + num_exp = _gather(num_exp) + + # --- PART 2 --- + # + # o process collected powers (x**0 -> 1; x**1 -> x; otherwise Pow) + # o combine collected powers (2**x * 3**x -> 6**x) + # with numeric base + + # ................................ + # now we have: + # - coeff: + # - c_powers: (b, e) + # - num_exp: (2, e) + # - pnum_rat: {(1/3, [1/3, 2/3, 1/4])} + + # 0 1 + # x -> 1 x -> x + + # this should only need to run twice; if it fails because + # it needs to be run more times, perhaps this should be + # changed to a "while True" loop -- the only reason it + # isn't such now is to allow a less-than-perfect result to + # be obtained rather than raising an error or entering an + # infinite loop + for i in range(2): + new_c_powers = [] + changed = False + for b, e in c_powers: + if e.is_zero: + # canceling out infinities yields NaN + if (b.is_Add or b.is_Mul) and any(infty in b.args + for infty in (S.ComplexInfinity, S.Infinity, + S.NegativeInfinity)): + return [S.NaN], [], None + continue + if e is S.One: + if b.is_Number: + coeff *= b + continue + p = b + if e is not S.One: + p = Pow(b, e) + # check to make sure that the base doesn't change + # after exponentiation; to allow for unevaluated + # Pow, we only do so if b is not already a Pow + if p.is_Pow and not b.is_Pow: + bi = b + b, e = p.as_base_exp() + if b != bi: + changed = True + c_part.append(p) + new_c_powers.append((b, e)) + # there might have been a change, but unless the base + # matches some other base, there is nothing to do + if changed and len({ + b for b, e in new_c_powers}) != len(new_c_powers): + # start over again + c_part = [] + c_powers = _gather(new_c_powers) + else: + break + + # x x x + # 2 * 3 -> 6 + inv_exp_dict = {} # exp:Mul(num-bases) x x + # e.g. x:6 for ... * 2 * 3 * ... + for b, e in num_exp: + inv_exp_dict.setdefault(e, []).append(b) + for e, b in inv_exp_dict.items(): + inv_exp_dict[e] = cls(*b) + c_part.extend([Pow(b, e) for e, b in inv_exp_dict.items() if e]) + + # b, e -> e' = sum(e), b + # {(1/5, [1/3]), (1/2, [1/12, 1/4]} -> {(1/3, [1/5, 1/2])} + comb_e = {} + for b, e in pnum_rat.items(): + comb_e.setdefault(Add(*e), []).append(b) + del pnum_rat + # process them, reducing exponents to values less than 1 + # and updating coeff if necessary else adding them to + # num_rat for further processing + num_rat = [] + for e, b in comb_e.items(): + b = cls(*b) + if e.q == 1: + coeff *= Pow(b, e) + continue + if e.p > e.q: + e_i, ep = divmod(e.p, e.q) + coeff *= Pow(b, e_i) + e = Rational(ep, e.q) + num_rat.append((b, e)) + del comb_e + + # extract gcd of bases in num_rat + # 2**(1/3)*6**(1/4) -> 2**(1/3+1/4)*3**(1/4) + pnew = defaultdict(list) + i = 0 # steps through num_rat which may grow + while i < len(num_rat): + bi, ei = num_rat[i] + if bi == 1: + i += 1 + continue + grow = [] + for j in range(i + 1, len(num_rat)): + bj, ej = num_rat[j] + g = bi.gcd(bj) + if g is not S.One: + # 4**r1*6**r2 -> 2**(r1+r2) * 2**r1 * 3**r2 + # this might have a gcd with something else + e = ei + ej + if e.q == 1: + coeff *= Pow(g, e) + else: + if e.p > e.q: + e_i, ep = divmod(e.p, e.q) # change e in place + coeff *= Pow(g, e_i) + e = Rational(ep, e.q) + grow.append((g, e)) + # update the jth item + num_rat[j] = (bj/g, ej) + # update bi that we are checking with + bi = bi/g + if bi is S.One: + break + if bi is not S.One: + obj = Pow(bi, ei) + if obj.is_Number: + coeff *= obj + else: + # changes like sqrt(12) -> 2*sqrt(3) + for obj in Mul.make_args(obj): + if obj.is_Number: + coeff *= obj + else: + assert obj.is_Pow + bi, ei = obj.args + pnew[ei].append(bi) + + num_rat.extend(grow) + i += 1 + + # combine bases of the new powers + for e, b in pnew.items(): + pnew[e] = cls(*b) + + # handle -1 and I + if neg1e: + # treat I as (-1)**(1/2) and compute -1's total exponent + p, q = neg1e.as_numer_denom() + # if the integer part is odd, extract -1 + n, p = divmod(p, q) + if n % 2: + coeff = -coeff + # if it's a multiple of 1/2 extract I + if q == 2: + c_part.append(S.ImaginaryUnit) + elif p: + # see if there is any positive base this power of + # -1 can join + neg1e = Rational(p, q) + for e, b in pnew.items(): + if e == neg1e and b.is_positive: + pnew[e] = -b + break + else: + # keep it separate; we've already evaluated it as + # much as possible so evaluate=False + c_part.append(Pow(S.NegativeOne, neg1e, evaluate=False)) + + # add all the pnew powers + c_part.extend([Pow(b, e) for e, b in pnew.items()]) + + # oo, -oo + if coeff in (S.Infinity, S.NegativeInfinity): + def _handle_for_oo(c_part, coeff_sign): + new_c_part = [] + for t in c_part: + if t.is_extended_positive: + continue + if t.is_extended_negative: + coeff_sign *= -1 + continue + new_c_part.append(t) + return new_c_part, coeff_sign + c_part, coeff_sign = _handle_for_oo(c_part, 1) + nc_part, coeff_sign = _handle_for_oo(nc_part, coeff_sign) + coeff *= coeff_sign + + # zoo + if coeff is S.ComplexInfinity: + # zoo might be + # infinite_real + bounded_im + # bounded_real + infinite_im + # infinite_real + infinite_im + # and non-zero real or imaginary will not change that status. + c_part = [c for c in c_part if not (fuzzy_not(c.is_zero) and + c.is_extended_real is not None)] + nc_part = [c for c in nc_part if not (fuzzy_not(c.is_zero) and + c.is_extended_real is not None)] + + # 0 + elif coeff.is_zero: + # we know for sure the result will be 0 except the multiplicand + # is infinity or a matrix + if any(isinstance(c, MatrixExpr) for c in nc_part): + return [coeff], nc_part, order_symbols + if any(c.is_finite == False for c in c_part): + return [S.NaN], [], order_symbols + return [coeff], [], order_symbols + + # check for straggling Numbers that were produced + _new = [] + for i in c_part: + if i.is_Number: + coeff *= i + else: + _new.append(i) + c_part = _new + + # order commutative part canonically + _mulsort(c_part) + + # current code expects coeff to be always in slot-0 + if coeff is not S.One: + c_part.insert(0, coeff) + + # we are done + if (global_parameters.distribute and not nc_part and len(c_part) == 2 and + c_part[0].is_Number and c_part[0].is_finite and c_part[1].is_Add): + # 2*(1+a) -> 2 + 2 * a + coeff = c_part[0] + c_part = [Add(*[coeff*f for f in c_part[1].args])] + + return c_part, nc_part, order_symbols + + def _eval_power(self, expt): + + # don't break up NC terms: (A*B)**3 != A**3*B**3, it is A*B*A*B*A*B + cargs, nc = self.args_cnc(split_1=False) + + if expt.is_Integer: + return Mul(*[Pow(b, expt, evaluate=False) for b in cargs]) * \ + Pow(Mul._from_args(nc), expt, evaluate=False) + if expt.is_Rational and expt.q == 2: + if self.is_imaginary: + a = self.as_real_imag()[1] + if a.is_Rational: + n, d = abs(a/2).as_numer_denom() + n, t = integer_nthroot(n, 2) + if t: + d, t = integer_nthroot(d, 2) + if t: + from sympy.functions.elementary.complexes import sign + r = sympify(n)/d + return _unevaluated_Mul(r**expt.p, (1 + sign(a)*S.ImaginaryUnit)**expt.p) + + p = Pow(self, expt, evaluate=False) + + if expt.is_Rational or expt.is_Float: + return p._eval_expand_power_base() + + return p + + @classmethod + def class_key(cls): + return 3, 0, cls.__name__ + + def _eval_evalf(self, prec): + c, m = self.as_coeff_Mul() + if c is S.NegativeOne: + if m.is_Mul: + rv = -AssocOp._eval_evalf(m, prec) + else: + mnew = m._eval_evalf(prec) + if mnew is not None: + m = mnew + rv = -m + else: + rv = AssocOp._eval_evalf(self, prec) + if rv.is_number: + return rv.expand() + return rv + + @property + def _mpc_(self): + """ + Convert self to an mpmath mpc if possible + """ + from .numbers import Float + im_part, imag_unit = self.as_coeff_Mul() + if imag_unit is not S.ImaginaryUnit: + # ValueError may seem more reasonable but since it's a @property, + # we need to use AttributeError to keep from confusing things like + # hasattr. + raise AttributeError("Cannot convert Mul to mpc. Must be of the form Number*I") + + return (Float(0)._mpf_, Float(im_part)._mpf_) + + @cacheit + def as_two_terms(self): + """Return head and tail of self. + + This is the most efficient way to get the head and tail of an + expression. + + - if you want only the head, use self.args[0]; + - if you want to process the arguments of the tail then use + self.as_coef_mul() which gives the head and a tuple containing + the arguments of the tail when treated as a Mul. + - if you want the coefficient when self is treated as an Add + then use self.as_coeff_add()[0] + + Examples + ======== + + >>> from sympy.abc import x, y + >>> (3*x*y).as_two_terms() + (3, x*y) + """ + args = self.args + + if len(args) == 1: + return S.One, self + elif len(args) == 2: + return args + + else: + return args[0], self._new_rawargs(*args[1:]) + + @cacheit + def as_coeff_mul(self, *deps, rational=True, **kwargs): + if deps: + l1, l2 = sift(self.args, lambda x: x.has(*deps), binary=True) + return self._new_rawargs(*l2), tuple(l1) + args = self.args + if args[0].is_Number: + if not rational or args[0].is_Rational: + return args[0], args[1:] + elif args[0].is_extended_negative: + return S.NegativeOne, (-args[0],) + args[1:] + return S.One, args + + def as_coeff_Mul(self, rational=False): + """ + Efficiently extract the coefficient of a product. + """ + coeff, args = self.args[0], self.args[1:] + + if coeff.is_Number: + if not rational or coeff.is_Rational: + if len(args) == 1: + return coeff, args[0] + else: + return coeff, self._new_rawargs(*args) + elif coeff.is_extended_negative: + return S.NegativeOne, self._new_rawargs(*((-coeff,) + args)) + return S.One, self + + def as_real_imag(self, deep=True, **hints): + from sympy.functions.elementary.complexes import Abs, im, re + other = [] + coeffr = [] + coeffi = [] + addterms = S.One + for a in self.args: + r, i = a.as_real_imag() + if i.is_zero: + coeffr.append(r) + elif r.is_zero: + coeffi.append(i*S.ImaginaryUnit) + elif a.is_commutative: + aconj = a.conjugate() if other else None + # search for complex conjugate pairs: + for i, x in enumerate(other): + if x == aconj: + coeffr.append(Abs(x)**2) + del other[i] + break + else: + if a.is_Add: + addterms *= a + else: + other.append(a) + else: + other.append(a) + m = self.func(*other) + if hints.get('ignore') == m: + return + if len(coeffi) % 2: + imco = im(coeffi.pop(0)) + # all other pairs make a real factor; they will be + # put into reco below + else: + imco = S.Zero + reco = self.func(*(coeffr + coeffi)) + r, i = (reco*re(m), reco*im(m)) + if addterms == 1: + if m == 1: + if imco.is_zero: + return (reco, S.Zero) + else: + return (S.Zero, reco*imco) + if imco is S.Zero: + return (r, i) + return (-imco*i, imco*r) + from .function import expand_mul + addre, addim = expand_mul(addterms, deep=False).as_real_imag() + if imco is S.Zero: + return (r*addre - i*addim, i*addre + r*addim) + else: + r, i = -imco*i, imco*r + return (r*addre - i*addim, r*addim + i*addre) + + @staticmethod + def _expandsums(sums): + """ + Helper function for _eval_expand_mul. + + sums must be a list of instances of Basic. + """ + + L = len(sums) + if L == 1: + return sums[0].args + terms = [] + left = Mul._expandsums(sums[:L//2]) + right = Mul._expandsums(sums[L//2:]) + + terms = [Mul(a, b) for a in left for b in right] + added = Add(*terms) + return Add.make_args(added) # it may have collapsed down to one term + + def _eval_expand_mul(self, **hints): + from sympy.simplify.radsimp import fraction + + # Handle things like 1/(x*(x + 1)), which are automatically converted + # to 1/x*1/(x + 1) + expr = self + # default matches fraction's default + n, d = fraction(expr, hints.get('exact', False)) + if d.is_Mul: + n, d = [i._eval_expand_mul(**hints) if i.is_Mul else i + for i in (n, d)] + expr = n/d + if not expr.is_Mul: + return expr + + plain, sums, rewrite = [], [], False + for factor in expr.args: + if factor.is_Add: + sums.append(factor) + rewrite = True + else: + if factor.is_commutative: + plain.append(factor) + else: + sums.append(Basic(factor)) # Wrapper + + if not rewrite: + return expr + else: + plain = self.func(*plain) + if sums: + deep = hints.get("deep", False) + terms = self.func._expandsums(sums) + args = [] + for term in terms: + t = self.func(plain, term) + if t.is_Mul and any(a.is_Add for a in t.args) and deep: + t = t._eval_expand_mul() + args.append(t) + return Add(*args) + else: + return plain + + @cacheit + def _eval_derivative(self, s): + args = list(self.args) + terms = [] + for i in range(len(args)): + d = args[i].diff(s) + if d: + # Note: reduce is used in step of Mul as Mul is unable to + # handle subtypes and operation priority: + terms.append(reduce(lambda x, y: x*y, (args[:i] + [d] + args[i + 1:]), S.One)) + return Add.fromiter(terms) + + @cacheit + def _eval_derivative_n_times(self, s, n): + from .function import AppliedUndef + from .symbol import Symbol, symbols, Dummy + if not isinstance(s, (AppliedUndef, Symbol)): + # other types of s may not be well behaved, e.g. + # (cos(x)*sin(y)).diff([[x, y, z]]) + return super()._eval_derivative_n_times(s, n) + from .numbers import Integer + args = self.args + m = len(args) + if isinstance(n, (int, Integer)): + # https://en.wikipedia.org/wiki/General_Leibniz_rule#More_than_two_factors + terms = [] + from sympy.ntheory.multinomial import multinomial_coefficients_iterator + for kvals, c in multinomial_coefficients_iterator(m, n): + p = Mul(*[arg.diff((s, k)) for k, arg in zip(kvals, args)]) + terms.append(c * p) + return Add(*terms) + from sympy.concrete.summations import Sum + from sympy.functions.combinatorial.factorials import factorial + from sympy.functions.elementary.miscellaneous import Max + kvals = symbols("k1:%i" % m, cls=Dummy) + klast = n - sum(kvals) + nfact = factorial(n) + e, l = (# better to use the multinomial? + nfact/prod(map(factorial, kvals))/factorial(klast)*\ + Mul(*[args[t].diff((s, kvals[t])) for t in range(m-1)])*\ + args[-1].diff((s, Max(0, klast))), + [(k, 0, n) for k in kvals]) + return Sum(e, *l) + + def _eval_difference_delta(self, n, step): + from sympy.series.limitseq import difference_delta as dd + arg0 = self.args[0] + rest = Mul(*self.args[1:]) + return (arg0.subs(n, n + step) * dd(rest, n, step) + dd(arg0, n, step) * + rest) + + def _matches_simple(self, expr, repl_dict): + # handle (w*3).matches('x*5') -> {w: x*5/3} + coeff, terms = self.as_coeff_Mul() + terms = Mul.make_args(terms) + if len(terms) == 1: + newexpr = self.__class__._combine_inverse(expr, coeff) + return terms[0].matches(newexpr, repl_dict) + return + + def matches(self, expr, repl_dict=None, old=False): + expr = sympify(expr) + if self.is_commutative and expr.is_commutative: + return self._matches_commutative(expr, repl_dict, old) + elif self.is_commutative is not expr.is_commutative: + return None + + # Proceed only if both both expressions are non-commutative + c1, nc1 = self.args_cnc() + c2, nc2 = expr.args_cnc() + c1, c2 = [c or [1] for c in [c1, c2]] + + # TODO: Should these be self.func? + comm_mul_self = Mul(*c1) + comm_mul_expr = Mul(*c2) + + repl_dict = comm_mul_self.matches(comm_mul_expr, repl_dict, old) + + # If the commutative arguments didn't match and aren't equal, then + # then the expression as a whole doesn't match + if not repl_dict and c1 != c2: + return None + + # Now match the non-commutative arguments, expanding powers to + # multiplications + nc1 = Mul._matches_expand_pows(nc1) + nc2 = Mul._matches_expand_pows(nc2) + + repl_dict = Mul._matches_noncomm(nc1, nc2, repl_dict) + + return repl_dict or None + + @staticmethod + def _matches_expand_pows(arg_list): + new_args = [] + for arg in arg_list: + if arg.is_Pow and arg.exp > 0: + new_args.extend([arg.base] * arg.exp) + else: + new_args.append(arg) + return new_args + + @staticmethod + def _matches_noncomm(nodes, targets, repl_dict=None): + """Non-commutative multiplication matcher. + + `nodes` is a list of symbols within the matcher multiplication + expression, while `targets` is a list of arguments in the + multiplication expression being matched against. + """ + if repl_dict is None: + repl_dict = {} + else: + repl_dict = repl_dict.copy() + + # List of possible future states to be considered + agenda = [] + # The current matching state, storing index in nodes and targets + state = (0, 0) + node_ind, target_ind = state + # Mapping between wildcard indices and the index ranges they match + wildcard_dict = {} + + while target_ind < len(targets) and node_ind < len(nodes): + node = nodes[node_ind] + + if node.is_Wild: + Mul._matches_add_wildcard(wildcard_dict, state) + + states_matches = Mul._matches_new_states(wildcard_dict, state, + nodes, targets) + if states_matches: + new_states, new_matches = states_matches + agenda.extend(new_states) + if new_matches: + for match in new_matches: + repl_dict[match] = new_matches[match] + if not agenda: + return None + else: + state = agenda.pop() + node_ind, target_ind = state + + return repl_dict + + @staticmethod + def _matches_add_wildcard(dictionary, state): + node_ind, target_ind = state + if node_ind in dictionary: + begin, end = dictionary[node_ind] + dictionary[node_ind] = (begin, target_ind) + else: + dictionary[node_ind] = (target_ind, target_ind) + + @staticmethod + def _matches_new_states(dictionary, state, nodes, targets): + node_ind, target_ind = state + node = nodes[node_ind] + target = targets[target_ind] + + # Don't advance at all if we've exhausted the targets but not the nodes + if target_ind >= len(targets) - 1 and node_ind < len(nodes) - 1: + return None + + if node.is_Wild: + match_attempt = Mul._matches_match_wilds(dictionary, node_ind, + nodes, targets) + if match_attempt: + # If the same node has been matched before, don't return + # anything if the current match is diverging from the previous + # match + other_node_inds = Mul._matches_get_other_nodes(dictionary, + nodes, node_ind) + for ind in other_node_inds: + other_begin, other_end = dictionary[ind] + curr_begin, curr_end = dictionary[node_ind] + + other_targets = targets[other_begin:other_end + 1] + current_targets = targets[curr_begin:curr_end + 1] + + for curr, other in zip(current_targets, other_targets): + if curr != other: + return None + + # A wildcard node can match more than one target, so only the + # target index is advanced + new_state = [(node_ind, target_ind + 1)] + # Only move on to the next node if there is one + if node_ind < len(nodes) - 1: + new_state.append((node_ind + 1, target_ind + 1)) + return new_state, match_attempt + else: + # If we're not at a wildcard, then make sure we haven't exhausted + # nodes but not targets, since in this case one node can only match + # one target + if node_ind >= len(nodes) - 1 and target_ind < len(targets) - 1: + return None + + match_attempt = node.matches(target) + + if match_attempt: + return [(node_ind + 1, target_ind + 1)], match_attempt + elif node == target: + return [(node_ind + 1, target_ind + 1)], None + else: + return None + + @staticmethod + def _matches_match_wilds(dictionary, wildcard_ind, nodes, targets): + """Determine matches of a wildcard with sub-expression in `target`.""" + wildcard = nodes[wildcard_ind] + begin, end = dictionary[wildcard_ind] + terms = targets[begin:end + 1] + # TODO: Should this be self.func? + mult = Mul(*terms) if len(terms) > 1 else terms[0] + return wildcard.matches(mult) + + @staticmethod + def _matches_get_other_nodes(dictionary, nodes, node_ind): + """Find other wildcards that may have already been matched.""" + ind_node = nodes[node_ind] + return [ind for ind in dictionary if nodes[ind] == ind_node] + + @staticmethod + def _combine_inverse(lhs, rhs): + """ + Returns lhs/rhs, but treats arguments like symbols, so things + like oo/oo return 1 (instead of a nan) and ``I`` behaves like + a symbol instead of sqrt(-1). + """ + from sympy.simplify.simplify import signsimp + from .symbol import Dummy + if lhs == rhs: + return S.One + + def check(l, r): + if l.is_Float and r.is_comparable: + # if both objects are added to 0 they will share the same "normalization" + # and are more likely to compare the same. Since Add(foo, 0) will not allow + # the 0 to pass, we use __add__ directly. + return l.__add__(0) == r.evalf().__add__(0) + return False + if check(lhs, rhs) or check(rhs, lhs): + return S.One + if any(i.is_Pow or i.is_Mul for i in (lhs, rhs)): + # gruntz and limit wants a literal I to not combine + # with a power of -1 + d = Dummy('I') + _i = {S.ImaginaryUnit: d} + i_ = {d: S.ImaginaryUnit} + a = lhs.xreplace(_i).as_powers_dict() + b = rhs.xreplace(_i).as_powers_dict() + blen = len(b) + for bi in tuple(b.keys()): + if bi in a: + a[bi] -= b.pop(bi) + if not a[bi]: + a.pop(bi) + if len(b) != blen: + lhs = Mul(*[k**v for k, v in a.items()]).xreplace(i_) + rhs = Mul(*[k**v for k, v in b.items()]).xreplace(i_) + rv = lhs/rhs + srv = signsimp(rv) + return srv if srv.is_Number else rv + + def as_powers_dict(self): + d = defaultdict(int) + for term in self.args: + for b, e in term.as_powers_dict().items(): + d[b] += e + return d + + def as_numer_denom(self): + # don't use _from_args to rebuild the numerators and denominators + # as the order is not guaranteed to be the same once they have + # been separated from each other + numers, denoms = list(zip(*[f.as_numer_denom() for f in self.args])) + return self.func(*numers), self.func(*denoms) + + def as_base_exp(self): + e1 = None + bases = [] + nc = 0 + for m in self.args: + b, e = m.as_base_exp() + if not b.is_commutative: + nc += 1 + if e1 is None: + e1 = e + elif e != e1 or nc > 1 or not e.is_Integer: + return self, S.One + bases.append(b) + return self.func(*bases), e1 + + def _eval_is_polynomial(self, syms): + return all(term._eval_is_polynomial(syms) for term in self.args) + + def _eval_is_rational_function(self, syms): + return all(term._eval_is_rational_function(syms) for term in self.args) + + def _eval_is_meromorphic(self, x, a): + return _fuzzy_group((arg.is_meromorphic(x, a) for arg in self.args), + quick_exit=True) + + def _eval_is_algebraic_expr(self, syms): + return all(term._eval_is_algebraic_expr(syms) for term in self.args) + + _eval_is_commutative = lambda self: _fuzzy_group( + a.is_commutative for a in self.args) + + def _eval_is_complex(self): + comp = _fuzzy_group(a.is_complex for a in self.args) + if comp is False: + if any(a.is_infinite for a in self.args): + if any(a.is_zero is not False for a in self.args): + return None + return False + return comp + + def _eval_is_zero_infinite_helper(self): + # + # Helper used by _eval_is_zero and _eval_is_infinite. + # + # Three-valued logic is tricky so let us reason this carefully. It + # would be nice to say that we just check is_zero/is_infinite in all + # args but we need to be careful about the case that one arg is zero + # and another is infinite like Mul(0, oo) or more importantly a case + # where it is not known if the arguments are zero or infinite like + # Mul(y, 1/x). If either y or x could be zero then there is a + # *possibility* that we have Mul(0, oo) which should give None for both + # is_zero and is_infinite. + # + # We keep track of whether we have seen a zero or infinity but we also + # need to keep track of whether we have *possibly* seen one which + # would be indicated by None. + # + # For each argument there is the possibility that is_zero might give + # True, False or None and likewise that is_infinite might give True, + # False or None, giving 9 combinations. The True cases for is_zero and + # is_infinite are mutually exclusive though so there are 3 main cases: + # + # - is_zero = True + # - is_infinite = True + # - is_zero and is_infinite are both either False or None + # + # At the end seen_zero and seen_infinite can be any of 9 combinations + # of True/False/None. Unless one is False though we cannot return + # anything except None: + # + # - is_zero=True needs seen_zero=True and seen_infinite=False + # - is_zero=False needs seen_zero=False + # - is_infinite=True needs seen_infinite=True and seen_zero=False + # - is_infinite=False needs seen_infinite=False + # - anything else gives both is_zero=None and is_infinite=None + # + # The loop only sets the flags to True or None and never back to False. + # Hence as soon as neither flag is False we exit early returning None. + # In particular as soon as we encounter a single arg that has + # is_zero=is_infinite=None we exit. This is a common case since it is + # the default assumptions for a Symbol and also the case for most + # expressions containing such a symbol. The early exit gives a big + # speedup for something like Mul(*symbols('x:1000')).is_zero. + # + seen_zero = seen_infinite = False + + for a in self.args: + if a.is_zero: + if seen_infinite is not False: + return None, None + seen_zero = True + elif a.is_infinite: + if seen_zero is not False: + return None, None + seen_infinite = True + else: + if seen_zero is False and a.is_zero is None: + if seen_infinite is not False: + return None, None + seen_zero = None + if seen_infinite is False and a.is_infinite is None: + if seen_zero is not False: + return None, None + seen_infinite = None + + return seen_zero, seen_infinite + + def _eval_is_zero(self): + # True iff any arg is zero and no arg is infinite but need to handle + # three valued logic carefully. + seen_zero, seen_infinite = self._eval_is_zero_infinite_helper() + + if seen_zero is False: + return False + elif seen_zero is True and seen_infinite is False: + return True + else: + return None + + def _eval_is_infinite(self): + # True iff any arg is infinite and no arg is zero but need to handle + # three valued logic carefully. + seen_zero, seen_infinite = self._eval_is_zero_infinite_helper() + + if seen_infinite is True and seen_zero is False: + return True + elif seen_infinite is False: + return False + else: + return None + + # We do not need to implement _eval_is_finite because the assumptions + # system can infer it from finite = not infinite. + + def _eval_is_rational(self): + r = _fuzzy_group((a.is_rational for a in self.args), quick_exit=True) + if r: + return r + elif r is False: + # All args except one are rational + if all(a.is_zero is False for a in self.args): + return False + + def _eval_is_algebraic(self): + r = _fuzzy_group((a.is_algebraic for a in self.args), quick_exit=True) + if r: + return r + elif r is False: + # All args except one are algebraic + if all(a.is_zero is False for a in self.args): + return False + + # without involving odd/even checks this code would suffice: + #_eval_is_integer = lambda self: _fuzzy_group( + # (a.is_integer for a in self.args), quick_exit=True) + def _eval_is_integer(self): + is_rational = self._eval_is_rational() + if is_rational is False: + return False + + numerators = [] + denominators = [] + unknown = False + for a in self.args: + hit = False + if a.is_integer: + if abs(a) is not S.One: + numerators.append(a) + elif a.is_Rational: + n, d = a.as_numer_denom() + if abs(n) is not S.One: + numerators.append(n) + if d is not S.One: + denominators.append(d) + elif a.is_Pow: + b, e = a.as_base_exp() + if not b.is_integer or not e.is_integer: + hit = unknown = True + if e.is_negative: + denominators.append(2 if a is S.Half else + Pow(a, S.NegativeOne)) + elif not hit: + # int b and pos int e: a = b**e is integer + assert not e.is_positive + # for rational self and e equal to zero: a = b**e is 1 + assert not e.is_zero + return # sign of e unknown -> self.is_integer unknown + else: + # x**2, 2**x, or x**y with x and y int-unknown -> unknown + return + else: + return + + if not denominators and not unknown: + return True + + allodd = lambda x: all(i.is_odd for i in x) + alleven = lambda x: all(i.is_even for i in x) + anyeven = lambda x: any(i.is_even for i in x) + + from .relational import is_gt + if not numerators and denominators and all( + is_gt(_, S.One) for _ in denominators): + return False + elif unknown: + return + elif allodd(numerators) and anyeven(denominators): + return False + elif anyeven(numerators) and denominators == [2]: + return True + elif alleven(numerators) and allodd(denominators + ) and (Mul(*denominators, evaluate=False) - 1 + ).is_positive: + return False + if len(denominators) == 1: + d = denominators[0] + if d.is_Integer and d.is_even: + # if minimal power of 2 in num vs den is not + # negative then we have an integer + if (Add(*[i.as_base_exp()[1] for i in + numerators if i.is_even]) - trailing(d.p) + ).is_nonnegative: + return True + if len(numerators) == 1: + n = numerators[0] + if n.is_Integer and n.is_even: + # if minimal power of 2 in den vs num is positive + # then we have have a non-integer + if (Add(*[i.as_base_exp()[1] for i in + denominators if i.is_even]) - trailing(n.p) + ).is_positive: + return False + + def _eval_is_polar(self): + has_polar = any(arg.is_polar for arg in self.args) + return has_polar and \ + all(arg.is_polar or arg.is_positive for arg in self.args) + + def _eval_is_extended_real(self): + return self._eval_real_imag(True) + + def _eval_real_imag(self, real): + zero = False + t_not_re_im = None + + for t in self.args: + if (t.is_complex or t.is_infinite) is False and t.is_extended_real is False: + return False + elif t.is_imaginary: # I + real = not real + elif t.is_extended_real: # 2 + if not zero: + z = t.is_zero + if not z and zero is False: + zero = z + elif z: + if all(a.is_finite for a in self.args): + return True + return + elif t.is_extended_real is False: + # symbolic or literal like `2 + I` or symbolic imaginary + if t_not_re_im: + return # complex terms might cancel + t_not_re_im = t + elif t.is_imaginary is False: # symbolic like `2` or `2 + I` + if t_not_re_im: + return # complex terms might cancel + t_not_re_im = t + else: + return + + if t_not_re_im: + if t_not_re_im.is_extended_real is False: + if real: # like 3 + return zero # 3*(smthng like 2 + I or i) is not real + if t_not_re_im.is_imaginary is False: # symbolic 2 or 2 + I + if not real: # like I + return zero # I*(smthng like 2 or 2 + I) is not real + elif zero is False: + return real # can't be trumped by 0 + elif real: + return real # doesn't matter what zero is + + def _eval_is_imaginary(self): + if all(a.is_zero is False and a.is_finite for a in self.args): + return self._eval_real_imag(False) + + def _eval_is_hermitian(self): + return self._eval_herm_antiherm(True) + + def _eval_is_antihermitian(self): + return self._eval_herm_antiherm(False) + + def _eval_herm_antiherm(self, herm): + for t in self.args: + if t.is_hermitian is None or t.is_antihermitian is None: + return + if t.is_hermitian: + continue + elif t.is_antihermitian: + herm = not herm + else: + return + + if herm is not False: + return herm + + is_zero = self._eval_is_zero() + if is_zero: + return True + elif is_zero is False: + return herm + + def _eval_is_irrational(self): + for t in self.args: + a = t.is_irrational + if a: + others = list(self.args) + others.remove(t) + if all((x.is_rational and fuzzy_not(x.is_zero)) is True for x in others): + return True + return + if a is None: + return + if all(x.is_real for x in self.args): + return False + + def _eval_is_extended_positive(self): + """Return True if self is positive, False if not, and None if it + cannot be determined. + + Explanation + =========== + + This algorithm is non-recursive and works by keeping track of the + sign which changes when a negative or nonpositive is encountered. + Whether a nonpositive or nonnegative is seen is also tracked since + the presence of these makes it impossible to return True, but + possible to return False if the end result is nonpositive. e.g. + + pos * neg * nonpositive -> pos or zero -> None is returned + pos * neg * nonnegative -> neg or zero -> False is returned + """ + return self._eval_pos_neg(1) + + def _eval_pos_neg(self, sign): + saw_NON = saw_NOT = False + for t in self.args: + if t.is_extended_positive: + continue + elif t.is_extended_negative: + sign = -sign + elif t.is_zero: + if all(a.is_finite for a in self.args): + return False + return + elif t.is_extended_nonpositive: + sign = -sign + saw_NON = True + elif t.is_extended_nonnegative: + saw_NON = True + # FIXME: is_positive/is_negative is False doesn't take account of + # Symbol('x', infinite=True, extended_real=True) which has + # e.g. is_positive is False but has uncertain sign. + elif t.is_positive is False: + sign = -sign + if saw_NOT: + return + saw_NOT = True + elif t.is_negative is False: + if saw_NOT: + return + saw_NOT = True + else: + return + if sign == 1 and saw_NON is False and saw_NOT is False: + return True + if sign < 0: + return False + + def _eval_is_extended_negative(self): + return self._eval_pos_neg(-1) + + def _eval_is_odd(self): + is_integer = self._eval_is_integer() + if is_integer is not True: + return is_integer + + from sympy.simplify.radsimp import fraction + n, d = fraction(self) + if d.is_Integer and d.is_even: + # if minimal power of 2 in num vs den is + # positive then we have an even number + if (Add(*[i.as_base_exp()[1] for i in + Mul.make_args(n) if i.is_even]) - trailing(d.p) + ).is_positive: + return False + return + r, acc = True, 1 + for t in self.args: + if abs(t) is S.One: + continue + if t.is_even: + return False + if r is False: + pass + elif acc != 1 and (acc + t).is_odd: + r = False + elif t.is_even is None: + r = None + acc = t + return r + + def _eval_is_even(self): + from sympy.simplify.radsimp import fraction + n, d = fraction(self) + if n.is_Integer and n.is_even: + # if minimal power of 2 in den vs num is not + # negative then this is not an integer and + # can't be even + if (Add(*[i.as_base_exp()[1] for i in + Mul.make_args(d) if i.is_even]) - trailing(n.p) + ).is_nonnegative: + return False + + def _eval_is_composite(self): + """ + Here we count the number of arguments that have a minimum value + greater than two. + If there are more than one of such a symbol then the result is composite. + Else, the result cannot be determined. + """ + number_of_args = 0 # count of symbols with minimum value greater than one + for arg in self.args: + if not (arg.is_integer and arg.is_positive): + return None + if (arg-1).is_positive: + number_of_args += 1 + + if number_of_args > 1: + return True + + def _eval_subs(self, old, new): + from sympy.functions.elementary.complexes import sign + from sympy.ntheory.factor_ import multiplicity + from sympy.simplify.powsimp import powdenest + from sympy.simplify.radsimp import fraction + + if not old.is_Mul: + return None + + # try keep replacement literal so -2*x doesn't replace 4*x + if old.args[0].is_Number and old.args[0] < 0: + if self.args[0].is_Number: + if self.args[0] < 0: + return self._subs(-old, -new) + return None + + def base_exp(a): + # if I and -1 are in a Mul, they get both end up with + # a -1 base (see issue 6421); all we want here are the + # true Pow or exp separated into base and exponent + from sympy.functions.elementary.exponential import exp + if a.is_Pow or isinstance(a, exp): + return a.as_base_exp() + return a, S.One + + def breakup(eq): + """break up powers of eq when treated as a Mul: + b**(Rational*e) -> b**e, Rational + commutatives come back as a dictionary {b**e: Rational} + noncommutatives come back as a list [(b**e, Rational)] + """ + + (c, nc) = (defaultdict(int), []) + for a in Mul.make_args(eq): + a = powdenest(a) + (b, e) = base_exp(a) + if e is not S.One: + (co, _) = e.as_coeff_mul() + b = Pow(b, e/co) + e = co + if a.is_commutative: + c[b] += e + else: + nc.append([b, e]) + return (c, nc) + + def rejoin(b, co): + """ + Put rational back with exponent; in general this is not ok, but + since we took it from the exponent for analysis, it's ok to put + it back. + """ + + (b, e) = base_exp(b) + return Pow(b, e*co) + + def ndiv(a, b): + """if b divides a in an extractive way (like 1/4 divides 1/2 + but not vice versa, and 2/5 does not divide 1/3) then return + the integer number of times it divides, else return 0. + """ + if not b.q % a.q or not a.q % b.q: + return int(a/b) + return 0 + + # give Muls in the denominator a chance to be changed (see issue 5651) + # rv will be the default return value + rv = None + n, d = fraction(self) + self2 = self + if d is not S.One: + self2 = n._subs(old, new)/d._subs(old, new) + if not self2.is_Mul: + return self2._subs(old, new) + if self2 != self: + rv = self2 + + # Now continue with regular substitution. + + # handle the leading coefficient and use it to decide if anything + # should even be started; we always know where to find the Rational + # so it's a quick test + + co_self = self2.args[0] + co_old = old.args[0] + co_xmul = None + if co_old.is_Rational and co_self.is_Rational: + # if coeffs are the same there will be no updating to do + # below after breakup() step; so skip (and keep co_xmul=None) + if co_old != co_self: + co_xmul = co_self.extract_multiplicatively(co_old) + elif co_old.is_Rational: + return rv + + # break self and old into factors + + (c, nc) = breakup(self2) + (old_c, old_nc) = breakup(old) + + # update the coefficients if we had an extraction + # e.g. if co_self were 2*(3/35*x)**2 and co_old = 3/5 + # then co_self in c is replaced by (3/5)**2 and co_residual + # is 2*(1/7)**2 + + if co_xmul and co_xmul.is_Rational and abs(co_old) != 1: + mult = S(multiplicity(abs(co_old), co_self)) + c.pop(co_self) + if co_old in c: + c[co_old] += mult + else: + c[co_old] = mult + co_residual = co_self/co_old**mult + else: + co_residual = 1 + + # do quick tests to see if we can't succeed + + ok = True + if len(old_nc) > len(nc): + # more non-commutative terms + ok = False + elif len(old_c) > len(c): + # more commutative terms + ok = False + elif {i[0] for i in old_nc}.difference({i[0] for i in nc}): + # unmatched non-commutative bases + ok = False + elif set(old_c).difference(set(c)): + # unmatched commutative terms + ok = False + elif any(sign(c[b]) != sign(old_c[b]) for b in old_c): + # differences in sign + ok = False + if not ok: + return rv + + if not old_c: + cdid = None + else: + rat = [] + for (b, old_e) in old_c.items(): + c_e = c[b] + rat.append(ndiv(c_e, old_e)) + if not rat[-1]: + return rv + cdid = min(rat) + + if not old_nc: + ncdid = None + for i in range(len(nc)): + nc[i] = rejoin(*nc[i]) + else: + ncdid = 0 # number of nc replacements we did + take = len(old_nc) # how much to look at each time + limit = cdid or S.Infinity # max number that we can take + failed = [] # failed terms will need subs if other terms pass + i = 0 + while limit and i + take <= len(nc): + hit = False + + # the bases must be equivalent in succession, and + # the powers must be extractively compatible on the + # first and last factor but equal in between. + + rat = [] + for j in range(take): + if nc[i + j][0] != old_nc[j][0]: + break + elif j == 0: + rat.append(ndiv(nc[i + j][1], old_nc[j][1])) + elif j == take - 1: + rat.append(ndiv(nc[i + j][1], old_nc[j][1])) + elif nc[i + j][1] != old_nc[j][1]: + break + else: + rat.append(1) + j += 1 + else: + ndo = min(rat) + if ndo: + if take == 1: + if cdid: + ndo = min(cdid, ndo) + nc[i] = Pow(new, ndo)*rejoin(nc[i][0], + nc[i][1] - ndo*old_nc[0][1]) + else: + ndo = 1 + + # the left residual + + l = rejoin(nc[i][0], nc[i][1] - ndo* + old_nc[0][1]) + + # eliminate all middle terms + + mid = new + + # the right residual (which may be the same as the middle if take == 2) + + ir = i + take - 1 + r = (nc[ir][0], nc[ir][1] - ndo* + old_nc[-1][1]) + if r[1]: + if i + take < len(nc): + nc[i:i + take] = [l*mid, r] + else: + r = rejoin(*r) + nc[i:i + take] = [l*mid*r] + else: + + # there was nothing left on the right + + nc[i:i + take] = [l*mid] + + limit -= ndo + ncdid += ndo + hit = True + if not hit: + + # do the subs on this failing factor + + failed.append(i) + i += 1 + else: + + if not ncdid: + return rv + + # although we didn't fail, certain nc terms may have + # failed so we rebuild them after attempting a partial + # subs on them + + failed.extend(range(i, len(nc))) + for i in failed: + nc[i] = rejoin(*nc[i]).subs(old, new) + + # rebuild the expression + + if cdid is None: + do = ncdid + elif ncdid is None: + do = cdid + else: + do = min(ncdid, cdid) + + margs = [] + for b in c: + if b in old_c: + + # calculate the new exponent + + e = c[b] - old_c[b]*do + margs.append(rejoin(b, e)) + else: + margs.append(rejoin(b.subs(old, new), c[b])) + if cdid and not ncdid: + + # in case we are replacing commutative with non-commutative, + # we want the new term to come at the front just like the + # rest of this routine + + margs = [Pow(new, cdid)] + margs + return co_residual*self2.func(*margs)*self2.func(*nc) + + def _eval_nseries(self, x, n, logx, cdir=0): + from .function import PoleError + from sympy.functions.elementary.integers import ceiling + from sympy.series.order import Order + + def coeff_exp(term, x): + lt = term.as_coeff_exponent(x) + if lt[0].has(x): + try: + lt = term.leadterm(x) + except ValueError: + return term, S.Zero + return lt + + ords = [] + + try: + for t in self.args: + coeff, exp = t.leadterm(x) + if not coeff.has(x): + ords.append((t, exp)) + else: + raise ValueError + + n0 = sum(t[1] for t in ords if t[1].is_number) + facs = [] + for t, m in ords: + n1 = ceiling(n - n0 + (m if m.is_number else 0)) + s = t.nseries(x, n=n1, logx=logx, cdir=cdir) + ns = s.getn() + if ns is not None: + if ns < n1: # less than expected + n -= n1 - ns # reduce n + facs.append(s) + + except (ValueError, NotImplementedError, TypeError, PoleError): + # XXX: Catching so many generic exceptions around a large block of + # code will mask bugs. Whatever purpose catching these exceptions + # serves should be handled in a different way. + n0 = sympify(sum(t[1] for t in ords if t[1].is_number)) + if n0.is_nonnegative: + n0 = S.Zero + facs = [t.nseries(x, n=ceiling(n-n0), logx=logx, cdir=cdir) for t in self.args] + from sympy.simplify.powsimp import powsimp + res = powsimp(self.func(*facs).expand(), combine='exp', deep=True) + if res.has(Order): + res += Order(x**n, x) + return res + + res = S.Zero + ords2 = [Add.make_args(factor) for factor in facs] + + for fac in product(*ords2): + ords3 = [coeff_exp(term, x) for term in fac] + coeffs, powers = zip(*ords3) + power = sum(powers) + if (power - n).is_negative: + res += Mul(*coeffs)*(x**power) + + def max_degree(e, x): + if e is x: + return S.One + if e.is_Atom: + return S.Zero + if e.is_Add: + return max(max_degree(a, x) for a in e.args) + if e.is_Mul: + return Add(*[max_degree(a, x) for a in e.args]) + if e.is_Pow: + return max_degree(e.base, x)*e.exp + return S.Zero + + if self.is_polynomial(x): + from sympy.polys.polyerrors import PolynomialError + from sympy.polys.polytools import degree + try: + if max_degree(self, x) >= n or degree(self, x) != degree(res, x): + res += Order(x**n, x) + except PolynomialError: + pass + else: + return res + + if res != self: + if (self - res).subs(x, 0) == S.Zero and n > 0: + lt = self._eval_as_leading_term(x, logx=logx, cdir=cdir) + if lt == S.Zero: + return res + res += Order(x**n, x) + return res + + def _eval_as_leading_term(self, x, logx, cdir): + return self.func(*[t.as_leading_term(x, logx=logx, cdir=cdir) for t in self.args]) + + def _eval_conjugate(self): + return self.func(*[t.conjugate() for t in self.args]) + + def _eval_transpose(self): + return self.func(*[t.transpose() for t in self.args[::-1]]) + + def _eval_adjoint(self): + return self.func(*[t.adjoint() for t in self.args[::-1]]) + + def as_content_primitive(self, radical=False, clear=True): + """Return the tuple (R, self/R) where R is the positive Rational + extracted from self. + + Examples + ======== + + >>> from sympy import sqrt + >>> (-3*sqrt(2)*(2 - 2*sqrt(2))).as_content_primitive() + (6, -sqrt(2)*(1 - sqrt(2))) + + See docstring of Expr.as_content_primitive for more examples. + """ + + coef = S.One + args = [] + for a in self.args: + c, p = a.as_content_primitive(radical=radical, clear=clear) + coef *= c + if p is not S.One: + args.append(p) + # don't use self._from_args here to reconstruct args + # since there may be identical args now that should be combined + # e.g. (2+2*x)*(3+3*x) should be (6, (1 + x)**2) not (6, (1+x)*(1+x)) + return coef, self.func(*args) + + def as_ordered_factors(self, order=None): + """Transform an expression into an ordered list of factors. + + Examples + ======== + + >>> from sympy import sin, cos + >>> from sympy.abc import x, y + + >>> (2*x*y*sin(x)*cos(x)).as_ordered_factors() + [2, x, y, sin(x), cos(x)] + + """ + cpart, ncpart = self.args_cnc() + cpart.sort(key=lambda expr: expr.sort_key(order=order)) + return cpart + ncpart + + @property + def _sorted_args(self): + return tuple(self.as_ordered_factors()) + +mul = AssocOpDispatcher('mul') + + +def prod(a, start=1): + """Return product of elements of a. Start with int 1 so if only + ints are included then an int result is returned. + + Examples + ======== + + >>> from sympy import prod, S + >>> prod(range(3)) + 0 + >>> type(_) is int + True + >>> prod([S(2), 3]) + 6 + >>> _.is_Integer + True + + You can start the product at something other than 1: + + >>> prod([1, 2], 3) + 6 + + """ + return reduce(operator.mul, a, start) + + +def _keep_coeff(coeff, factors, clear=True, sign=False): + """Return ``coeff*factors`` unevaluated if necessary. + + If ``clear`` is False, do not keep the coefficient as a factor + if it can be distributed on a single factor such that one or + more terms will still have integer coefficients. + + If ``sign`` is True, allow a coefficient of -1 to remain factored out. + + Examples + ======== + + >>> from sympy.core.mul import _keep_coeff + >>> from sympy.abc import x, y + >>> from sympy import S + + >>> _keep_coeff(S.Half, x + 2) + (x + 2)/2 + >>> _keep_coeff(S.Half, x + 2, clear=False) + x/2 + 1 + >>> _keep_coeff(S.Half, (x + 2)*y, clear=False) + y*(x + 2)/2 + >>> _keep_coeff(S(-1), x + y) + -x - y + >>> _keep_coeff(S(-1), x + y, sign=True) + -(x + y) + """ + if not coeff.is_Number: + if factors.is_Number: + factors, coeff = coeff, factors + else: + return coeff*factors + if factors is S.One: + return coeff + if coeff is S.One: + return factors + elif coeff is S.NegativeOne and not sign: + return -factors + elif factors.is_Add: + if not clear and coeff.is_Rational and coeff.q != 1: + args = [i.as_coeff_Mul() for i in factors.args] + args = [(_keep_coeff(c, coeff), m) for c, m in args] + if any(c.is_Integer for c, _ in args): + return Add._from_args([Mul._from_args( + i[1:] if i[0] == 1 else i) for i in args]) + return Mul(coeff, factors, evaluate=False) + elif factors.is_Mul: + margs = list(factors.args) + if margs[0].is_Number: + margs[0] *= coeff + if margs[0] == 1: + margs.pop(0) + else: + margs.insert(0, coeff) + return Mul._from_args(margs) + else: + m = coeff*factors + if m.is_Number and not factors.is_Number: + m = Mul._from_args((coeff, factors)) + return m + +def expand_2arg(e): + def do(e): + if e.is_Mul: + c, r = e.as_coeff_Mul() + if c.is_Number and r.is_Add: + return _unevaluated_Add(*[c*ri for ri in r.args]) + return e + return bottom_up(e, do) + + +from .numbers import Rational +from .power import Pow +from .add import Add, _unevaluated_Add diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/multidimensional.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/multidimensional.py new file mode 100644 index 0000000000000000000000000000000000000000..133e0ab6cba6a87c627feb6f6034a6daed1128c5 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/multidimensional.py @@ -0,0 +1,131 @@ +""" +Provides functionality for multidimensional usage of scalar-functions. + +Read the vectorize docstring for more details. +""" + +from functools import wraps + + +def apply_on_element(f, args, kwargs, n): + """ + Returns a structure with the same dimension as the specified argument, + where each basic element is replaced by the function f applied on it. All + other arguments stay the same. + """ + # Get the specified argument. + if isinstance(n, int): + structure = args[n] + is_arg = True + elif isinstance(n, str): + structure = kwargs[n] + is_arg = False + + # Define reduced function that is only dependent on the specified argument. + def f_reduced(x): + if hasattr(x, "__iter__"): + return list(map(f_reduced, x)) + else: + if is_arg: + args[n] = x + else: + kwargs[n] = x + return f(*args, **kwargs) + + # f_reduced will call itself recursively so that in the end f is applied to + # all basic elements. + return list(map(f_reduced, structure)) + + +def iter_copy(structure): + """ + Returns a copy of an iterable object (also copying all embedded iterables). + """ + return [iter_copy(i) if hasattr(i, "__iter__") else i for i in structure] + + +def structure_copy(structure): + """ + Returns a copy of the given structure (numpy-array, list, iterable, ..). + """ + if hasattr(structure, "copy"): + return structure.copy() + return iter_copy(structure) + + +class vectorize: + """ + Generalizes a function taking scalars to accept multidimensional arguments. + + Examples + ======== + + >>> from sympy import vectorize, diff, sin, symbols, Function + >>> x, y, z = symbols('x y z') + >>> f, g, h = list(map(Function, 'fgh')) + + >>> @vectorize(0) + ... def vsin(x): + ... return sin(x) + + >>> vsin([1, x, y]) + [sin(1), sin(x), sin(y)] + + >>> @vectorize(0, 1) + ... def vdiff(f, y): + ... return diff(f, y) + + >>> vdiff([f(x, y, z), g(x, y, z), h(x, y, z)], [x, y, z]) + [[Derivative(f(x, y, z), x), Derivative(f(x, y, z), y), Derivative(f(x, y, z), z)], [Derivative(g(x, y, z), x), Derivative(g(x, y, z), y), Derivative(g(x, y, z), z)], [Derivative(h(x, y, z), x), Derivative(h(x, y, z), y), Derivative(h(x, y, z), z)]] + """ + def __init__(self, *mdargs): + """ + The given numbers and strings characterize the arguments that will be + treated as data structures, where the decorated function will be applied + to every single element. + If no argument is given, everything is treated multidimensional. + """ + for a in mdargs: + if not isinstance(a, (int, str)): + raise TypeError("a is of invalid type") + self.mdargs = mdargs + + def __call__(self, f): + """ + Returns a wrapper for the one-dimensional function that can handle + multidimensional arguments. + """ + @wraps(f) + def wrapper(*args, **kwargs): + # Get arguments that should be treated multidimensional + if self.mdargs: + mdargs = self.mdargs + else: + mdargs = range(len(args)) + kwargs.keys() + + arglength = len(args) + + for n in mdargs: + if isinstance(n, int): + if n >= arglength: + continue + entry = args[n] + is_arg = True + elif isinstance(n, str): + try: + entry = kwargs[n] + except KeyError: + continue + is_arg = False + if hasattr(entry, "__iter__"): + # Create now a copy of the given array and manipulate then + # the entries directly. + if is_arg: + args = list(args) + args[n] = structure_copy(entry) + else: + kwargs[n] = structure_copy(entry) + result = apply_on_element(wrapper, args, kwargs, n) + return result + return f(*args, **kwargs) + return wrapper diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/numbers.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/numbers.py new file mode 100644 index 0000000000000000000000000000000000000000..9fa13fbb96aa25a8e60e048c0147a5e660804ccc --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/numbers.py @@ -0,0 +1,4482 @@ +from __future__ import annotations + +from typing import overload + +import numbers +import decimal +import fractions +import math + +from .containers import Tuple +from .sympify import (SympifyError, _sympy_converter, sympify, _convert_numpy_types, + _sympify, _is_numpy_instance) +from .singleton import S, Singleton +from .basic import Basic +from .expr import Expr, AtomicExpr +from .evalf import pure_complex +from .cache import cacheit, clear_cache +from .decorators import _sympifyit +from .intfunc import num_digits, igcd, ilcm, mod_inverse, integer_nthroot +from .logic import fuzzy_not +from .kind import NumberKind +from .sorting import ordered +from sympy.external.gmpy import SYMPY_INTS, gmpy, flint +from sympy.multipledispatch import dispatch +import mpmath +import mpmath.libmp as mlib +from mpmath.libmp import bitcount, round_nearest as rnd +from mpmath.libmp.backend import MPZ +from mpmath.libmp import mpf_pow, mpf_pi, mpf_e, phi_fixed +from mpmath.ctx_mp_python import mpnumeric +from mpmath.libmp.libmpf import ( + finf as _mpf_inf, fninf as _mpf_ninf, + fnan as _mpf_nan, fzero, _normalize as mpf_normalize, + prec_to_dps, dps_to_prec) +from sympy.utilities.misc import debug +from sympy.utilities.exceptions import sympy_deprecation_warning +from .parameters import global_parameters + +_LOG2 = math.log(2) + + +def comp(z1, z2, tol=None): + r"""Return a bool indicating whether the error between z1 and z2 + is $\le$ ``tol``. + + Examples + ======== + + If ``tol`` is ``None`` then ``True`` will be returned if + :math:`|z1 - z2|\times 10^p \le 5` where $p$ is minimum value of the + decimal precision of each value. + + >>> from sympy import comp, pi + >>> pi4 = pi.n(4); pi4 + 3.142 + >>> comp(_, 3.142) + True + >>> comp(pi4, 3.141) + False + >>> comp(pi4, 3.143) + False + + A comparison of strings will be made + if ``z1`` is a Number and ``z2`` is a string or ``tol`` is ''. + + >>> comp(pi4, 3.1415) + True + >>> comp(pi4, 3.1415, '') + False + + When ``tol`` is provided and $z2$ is non-zero and + :math:`|z1| > 1` the error is normalized by :math:`|z1|`: + + >>> abs(pi4 - 3.14)/pi4 + 0.000509791731426756 + >>> comp(pi4, 3.14, .001) # difference less than 0.1% + True + >>> comp(pi4, 3.14, .0005) # difference less than 0.1% + False + + When :math:`|z1| \le 1` the absolute error is used: + + >>> 1/pi4 + 0.3183 + >>> abs(1/pi4 - 0.3183)/(1/pi4) + 3.07371499106316e-5 + >>> abs(1/pi4 - 0.3183) + 9.78393554684764e-6 + >>> comp(1/pi4, 0.3183, 1e-5) + True + + To see if the absolute error between ``z1`` and ``z2`` is less + than or equal to ``tol``, call this as ``comp(z1 - z2, 0, tol)`` + or ``comp(z1 - z2, tol=tol)``: + + >>> abs(pi4 - 3.14) + 0.00160156249999988 + >>> comp(pi4 - 3.14, 0, .002) + True + >>> comp(pi4 - 3.14, 0, .001) + False + """ + if isinstance(z2, str): + if not pure_complex(z1, or_real=True): + raise ValueError('when z2 is a str z1 must be a Number') + return str(z1) == z2 + if not z1: + z1, z2 = z2, z1 + if not z1: + return True + if not tol: + a, b = z1, z2 + if tol == '': + return str(a) == str(b) + if tol is None: + a, b = sympify(a), sympify(b) + if not all(i.is_number for i in (a, b)): + raise ValueError('expecting 2 numbers') + fa = a.atoms(Float) + fb = b.atoms(Float) + if not fa and not fb: + # no floats -- compare exactly + return a == b + # get a to be pure_complex + for _ in range(2): + ca = pure_complex(a, or_real=True) + if not ca: + if fa: + a = a.n(prec_to_dps(min(i._prec for i in fa))) + ca = pure_complex(a, or_real=True) + break + else: + fa, fb = fb, fa + a, b = b, a + cb = pure_complex(b) + if not cb and fb: + b = b.n(prec_to_dps(min(i._prec for i in fb))) + cb = pure_complex(b, or_real=True) + if ca and cb and (ca[1] or cb[1]): + return all(comp(i, j) for i, j in zip(ca, cb)) + tol = 10**prec_to_dps(min(a._prec, getattr(b, '_prec', a._prec))) + return int(abs(a - b)*tol) <= 5 + diff = abs(z1 - z2) + az1 = abs(z1) + if z2 and az1 > 1: + return diff/az1 <= tol + else: + return diff <= tol + + +def mpf_norm(mpf, prec): + """Return the mpf tuple normalized appropriately for the indicated + precision after doing a check to see if zero should be returned or + not when the mantissa is 0. ``mpf_normlize`` always assumes that this + is zero, but it may not be since the mantissa for mpf's values "+inf", + "-inf" and "nan" have a mantissa of zero, too. + + Note: this is not intended to validate a given mpf tuple, so sending + mpf tuples that were not created by mpmath may produce bad results. This + is only a wrapper to ``mpf_normalize`` which provides the check for non- + zero mpfs that have a 0 for the mantissa. + """ + sign, man, expt, bc = mpf + if not man: + # hack for mpf_normalize which does not do this; + # it assumes that if man is zero the result is 0 + # (see issue 6639) + if not bc: + return fzero + else: + # don't change anything; this should already + # be a well formed mpf tuple + return mpf + + # Necessary if mpmath is using the gmpy backend + from mpmath.libmp.backend import MPZ + rv = mpf_normalize(sign, MPZ(man), expt, bc, prec, rnd) + return rv + +# TODO: we should use the warnings module +_errdict = {"divide": False} + + +def seterr(divide=False): + """ + Should SymPy raise an exception on 0/0 or return a nan? + + divide == True .... raise an exception + divide == False ... return nan + """ + if _errdict["divide"] != divide: + clear_cache() + _errdict["divide"] = divide + + +def _as_integer_ratio(p): + neg_pow, man, expt, _ = getattr(p, '_mpf_', mpmath.mpf(p)._mpf_) + p = [1, -1][neg_pow % 2]*man + if expt < 0: + q = 2**-expt + else: + q = 1 + p *= 2**expt + return int(p), int(q) + + +def _decimal_to_Rational_prec(dec): + """Convert an ordinary decimal instance to a Rational.""" + if not dec.is_finite(): + raise TypeError("dec must be finite, got %s." % dec) + s, d, e = dec.as_tuple() + prec = len(d) + if e >= 0: # it's an integer + rv = Integer(int(dec)) + else: + s = (-1)**s + d = sum(di*10**i for i, di in enumerate(reversed(d))) + rv = Rational(s*d, 10**-e) + return rv, prec + +_dig = str.maketrans(dict.fromkeys('1234567890')) + +def _literal_float(s): + """return True if s is space-trimmed number literal else False + + Python allows underscore as digit separators: there must be a + digit on each side. So neither a leading underscore nor a + double underscore are valid as part of a number. A number does + not have to precede the decimal point, but there must be a + digit before the optional "e" or "E" that begins the signs + exponent of the number which must be an integer, perhaps with + underscore separators. + + SymPy allows space as a separator; if the calling routine replaces + them with underscores then the same semantics will be enforced + for them as for underscores: there can only be 1 *between* digits. + + We don't check for error from float(s) because we don't know + whether s is malicious or not. A regex for this could maybe + be written but will it be understood by most who read it? + """ + # mantissa and exponent + parts = s.split('e') + if len(parts) > 2: + return False + if len(parts) == 2: + m, e = parts + if e.startswith(tuple('+-')): + e = e[1:] + if not e: + return False + else: + m, e = s, '1' + # integer and fraction of mantissa + parts = m.split('.') + if len(parts) > 2: + return False + elif len(parts) == 2: + i, f = parts + else: + i, f = m, '1' + if not i and not f: + return False + if i and i[0] in '+-': + i = i[1:] + if not i: # -.3e4 -> -0.3e4 + i = '1' + f = f or '1' + # check that all groups contain only digits and are not null + for n in (i, f, e): + for g in n.split('_'): + if not g or g.translate(_dig): + return False + return True + +# (a,b) -> gcd(a,b) + +# TODO caching with decorator, but not to degrade performance + + +class Number(AtomicExpr): + """Represents atomic numbers in SymPy. + + Explanation + =========== + + Floating point numbers are represented by the Float class. + Rational numbers (of any size) are represented by the Rational class. + Integer numbers (of any size) are represented by the Integer class. + Float and Rational are subclasses of Number; Integer is a subclass + of Rational. + + For example, ``2/3`` is represented as ``Rational(2, 3)`` which is + a different object from the floating point number obtained with + Python division ``2/3``. Even for numbers that are exactly + represented in binary, there is a difference between how two forms, + such as ``Rational(1, 2)`` and ``Float(0.5)``, are used in SymPy. + The rational form is to be preferred in symbolic computations. + + Other kinds of numbers, such as algebraic numbers ``sqrt(2)`` or + complex numbers ``3 + 4*I``, are not instances of Number class as + they are not atomic. + + See Also + ======== + + Float, Integer, Rational + """ + is_commutative = True + is_number = True + is_Number = True + + __slots__ = () + + # Used to make max(x._prec, y._prec) return x._prec when only x is a float + _prec = -1 + + kind = NumberKind + + def __new__(cls, *obj): + if len(obj) == 1: + obj = obj[0] + + if isinstance(obj, Number): + return obj + if isinstance(obj, SYMPY_INTS): + return Integer(obj) + if isinstance(obj, tuple) and len(obj) == 2: + return Rational(*obj) + if isinstance(obj, (float, mpmath.mpf, decimal.Decimal)): + return Float(obj) + if isinstance(obj, str): + _obj = obj.lower() # float('INF') == float('inf') + if _obj == 'nan': + return S.NaN + elif _obj == 'inf': + return S.Infinity + elif _obj == '+inf': + return S.Infinity + elif _obj == '-inf': + return S.NegativeInfinity + val = sympify(obj) + if isinstance(val, Number): + return val + else: + raise ValueError('String "%s" does not denote a Number' % obj) + msg = "expected str|int|long|float|Decimal|Number object but got %r" + raise TypeError(msg % type(obj).__name__) + + def could_extract_minus_sign(self): + return bool(self.is_extended_negative) + + def invert(self, other, *gens, **args): + from sympy.polys.polytools import invert + if getattr(other, 'is_number', True): + return mod_inverse(self, other) + return invert(self, other, *gens, **args) + + def __divmod__(self, other): + from sympy.functions.elementary.complexes import sign + + try: + other = Number(other) + if self.is_infinite or S.NaN in (self, other): + return (S.NaN, S.NaN) + except TypeError: + return NotImplemented + if not other: + raise ZeroDivisionError('modulo by zero') + if self.is_Integer and other.is_Integer: + return Tuple(*divmod(self.p, other.p)) + elif isinstance(other, Float): + rat = self/Rational(other) + else: + rat = self/other + if other.is_finite: + w = int(rat) if rat >= 0 else int(rat) - 1 + r = self - other*w + if r == Float(other): + w += 1 + r = 0 + if isinstance(self, Float) or isinstance(other, Float): + r = Float(r) # in case w or r is 0 + else: + w = 0 if not self or (sign(self) == sign(other)) else -1 + r = other if w else self + return Tuple(w, r) + + def __rdivmod__(self, other): + try: + other = Number(other) + except TypeError: + return NotImplemented + return divmod(other, self) + + def _as_mpf_val(self, prec): + """Evaluation of mpf tuple accurate to at least prec bits.""" + raise NotImplementedError('%s needs ._as_mpf_val() method' % + (self.__class__.__name__)) + + def _eval_evalf(self, prec): + return Float._new(self._as_mpf_val(prec), prec) + + def _as_mpf_op(self, prec): + prec = max(prec, self._prec) + return self._as_mpf_val(prec), prec + + def __float__(self): + return mlib.to_float(self._as_mpf_val(53)) + + def floor(self): + raise NotImplementedError('%s needs .floor() method' % + (self.__class__.__name__)) + + def ceiling(self): + raise NotImplementedError('%s needs .ceiling() method' % + (self.__class__.__name__)) + + def __floor__(self): + return self.floor() + + def __ceil__(self): + return self.ceiling() + + def _eval_conjugate(self): + return self + + def _eval_order(self, *symbols): + from sympy.series.order import Order + # Order(5, x, y) -> Order(1,x,y) + return Order(S.One, *symbols) + + def _eval_subs(self, old, new): + if old == -self: + return -new + return self # there is no other possibility + + @classmethod + def class_key(cls): + return 1, 0, 'Number' + + @cacheit + def sort_key(self, order=None): + return self.class_key(), (0, ()), (), self + + def __neg__(self) -> Number: + raise NotImplementedError + + @overload + def __add__(self, other: Number | int | float) -> Number: ... + @overload + def __add__(self, other: Expr) -> Expr: ... + + @_sympifyit('other', NotImplemented) + def __add__(self, other) -> Expr: + if isinstance(other, Number) and global_parameters.evaluate: + if other is S.NaN: + return S.NaN + elif other is S.Infinity: + return S.Infinity + elif other is S.NegativeInfinity: + return S.NegativeInfinity + return AtomicExpr.__add__(self, other) + + @_sympifyit('other', NotImplemented) + def __sub__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other is S.NaN: + return S.NaN + elif other is S.Infinity: + return S.NegativeInfinity + elif other is S.NegativeInfinity: + return S.Infinity + return AtomicExpr.__sub__(self, other) + + @_sympifyit('other', NotImplemented) + def __mul__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other is S.NaN: + return S.NaN + elif other is S.Infinity: + if self.is_zero: + return S.NaN + elif self.is_positive: + return S.Infinity + else: + return S.NegativeInfinity + elif other is S.NegativeInfinity: + if self.is_zero: + return S.NaN + elif self.is_positive: + return S.NegativeInfinity + else: + return S.Infinity + elif isinstance(other, Tuple): + return NotImplemented + return AtomicExpr.__mul__(self, other) + + @_sympifyit('other', NotImplemented) + def __truediv__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other is S.NaN: + return S.NaN + elif other in (S.Infinity, S.NegativeInfinity): + return S.Zero + return AtomicExpr.__truediv__(self, other) + + def __eq__(self, other): + raise NotImplementedError('%s needs .__eq__() method' % + (self.__class__.__name__)) + + def __ne__(self, other): + raise NotImplementedError('%s needs .__ne__() method' % + (self.__class__.__name__)) + + def __lt__(self, other): + try: + other = _sympify(other) + except SympifyError: + raise TypeError("Invalid comparison %s < %s" % (self, other)) + raise NotImplementedError('%s needs .__lt__() method' % + (self.__class__.__name__)) + + def __le__(self, other): + try: + other = _sympify(other) + except SympifyError: + raise TypeError("Invalid comparison %s <= %s" % (self, other)) + raise NotImplementedError('%s needs .__le__() method' % + (self.__class__.__name__)) + + def __gt__(self, other): + try: + other = _sympify(other) + except SympifyError: + raise TypeError("Invalid comparison %s > %s" % (self, other)) + return _sympify(other).__lt__(self) + + def __ge__(self, other): + try: + other = _sympify(other) + except SympifyError: + raise TypeError("Invalid comparison %s >= %s" % (self, other)) + return _sympify(other).__le__(self) + + def __hash__(self): + return super().__hash__() + + def is_constant(self, *wrt, **flags): + return True + + def as_coeff_mul(self, *deps, rational=True, **kwargs): + # a -> c*t + if self.is_Rational or not rational: + return self, () + elif self.is_negative: + return S.NegativeOne, (-self,) + return S.One, (self,) + + def as_coeff_add(self, *deps): + # a -> c + t + if self.is_Rational: + return self, () + return S.Zero, (self,) + + def as_coeff_Mul(self, rational=False): + """Efficiently extract the coefficient of a product.""" + if not rational: + return self, S.One + return S.One, self + + def as_coeff_Add(self, rational=False): + """Efficiently extract the coefficient of a summation.""" + if not rational: + return self, S.Zero + return S.Zero, self + + def gcd(self, other): + """Compute GCD of `self` and `other`. """ + from sympy.polys.polytools import gcd + return gcd(self, other) + + def lcm(self, other): + """Compute LCM of `self` and `other`. """ + from sympy.polys.polytools import lcm + return lcm(self, other) + + def cofactors(self, other): + """Compute GCD and cofactors of `self` and `other`. """ + from sympy.polys.polytools import cofactors + return cofactors(self, other) + + +class Float(Number): + """Represent a floating-point number of arbitrary precision. + + Examples + ======== + + >>> from sympy import Float + >>> Float(3.5) + 3.50000000000000 + >>> Float(3) + 3.00000000000000 + + Creating Floats from strings (and Python ``int`` and ``long`` + types) will give a minimum precision of 15 digits, but the + precision will automatically increase to capture all digits + entered. + + >>> Float(1) + 1.00000000000000 + >>> Float(10**20) + 100000000000000000000. + >>> Float('1e20') + 100000000000000000000. + + However, *floating-point* numbers (Python ``float`` types) retain + only 15 digits of precision: + + >>> Float(1e20) + 1.00000000000000e+20 + >>> Float(1.23456789123456789) + 1.23456789123457 + + It may be preferable to enter high-precision decimal numbers + as strings: + + >>> Float('1.23456789123456789') + 1.23456789123456789 + + The desired number of digits can also be specified: + + >>> Float('1e-3', 3) + 0.00100 + >>> Float(100, 4) + 100.0 + + Float can automatically count significant figures if a null string + is sent for the precision; spaces or underscores are also allowed. (Auto- + counting is only allowed for strings, ints and longs). + + >>> Float('123 456 789.123_456', '') + 123456789.123456 + >>> Float('12e-3', '') + 0.012 + >>> Float(3, '') + 3. + + If a number is written in scientific notation, only the digits before the + exponent are considered significant if a decimal appears, otherwise the + "e" signifies only how to move the decimal: + + >>> Float('60.e2', '') # 2 digits significant + 6.0e+3 + >>> Float('60e2', '') # 4 digits significant + 6000. + >>> Float('600e-2', '') # 3 digits significant + 6.00 + + Notes + ===== + + Floats are inexact by their nature unless their value is a binary-exact + value. + + >>> approx, exact = Float(.1, 1), Float(.125, 1) + + For calculation purposes, evalf needs to be able to change the precision + but this will not increase the accuracy of the inexact value. The + following is the most accurate 5-digit approximation of a value of 0.1 + that had only 1 digit of precision: + + >>> approx.evalf(5) + 0.099609 + + By contrast, 0.125 is exact in binary (as it is in base 10) and so it + can be passed to Float or evalf to obtain an arbitrary precision with + matching accuracy: + + >>> Float(exact, 5) + 0.12500 + >>> exact.evalf(20) + 0.12500000000000000000 + + Trying to make a high-precision Float from a float is not disallowed, + but one must keep in mind that the *underlying float* (not the apparent + decimal value) is being obtained with high precision. For example, 0.3 + does not have a finite binary representation. The closest rational is + the fraction 5404319552844595/2**54. So if you try to obtain a Float of + 0.3 to 20 digits of precision you will not see the same thing as 0.3 + followed by 19 zeros: + + >>> Float(0.3, 20) + 0.29999999999999998890 + + If you want a 20-digit value of the decimal 0.3 (not the floating point + approximation of 0.3) you should send the 0.3 as a string. The underlying + representation is still binary but a higher precision than Python's float + is used: + + >>> Float('0.3', 20) + 0.30000000000000000000 + + Although you can increase the precision of an existing Float using Float + it will not increase the accuracy -- the underlying value is not changed: + + >>> def show(f): # binary rep of Float + ... from sympy import Mul, Pow + ... s, m, e, b = f._mpf_ + ... v = Mul(int(m), Pow(2, int(e), evaluate=False), evaluate=False) + ... print('%s at prec=%s' % (v, f._prec)) + ... + >>> t = Float('0.3', 3) + >>> show(t) + 4915/2**14 at prec=13 + >>> show(Float(t, 20)) # higher prec, not higher accuracy + 4915/2**14 at prec=70 + >>> show(Float(t, 2)) # lower prec + 307/2**10 at prec=10 + + The same thing happens when evalf is used on a Float: + + >>> show(t.evalf(20)) + 4915/2**14 at prec=70 + >>> show(t.evalf(2)) + 307/2**10 at prec=10 + + Finally, Floats can be instantiated with an mpf tuple (n, c, p) to + produce the number (-1)**n*c*2**p: + + >>> n, c, p = 1, 5, 0 + >>> (-1)**n*c*2**p + -5 + >>> Float((1, 5, 0)) + -5.00000000000000 + + An actual mpf tuple also contains the number of bits in c as the last + element of the tuple: + + >>> _._mpf_ + (1, 5, 0, 3) + + This is not needed for instantiation and is not the same thing as the + precision. The mpf tuple and the precision are two separate quantities + that Float tracks. + + In SymPy, a Float is a number that can be computed with arbitrary + precision. Although floating point 'inf' and 'nan' are not such + numbers, Float can create these numbers: + + >>> Float('-inf') + -oo + >>> _.is_Float + False + + Zero in Float only has a single value. Values are not separate for + positive and negative zeroes. + """ + __slots__ = ('_mpf_', '_prec') + + _mpf_: tuple[int, int, int, int] + + # A Float, though rational in form, does not behave like + # a rational in all Python expressions so we deal with + # exceptions (where we want to deal with the rational + # form of the Float as a rational) at the source rather + # than assigning a mathematically loaded category of 'rational' + is_rational = None + is_irrational = None + is_number = True + + is_real = True + is_extended_real = True + + is_Float = True + + _remove_non_digits = str.maketrans(dict.fromkeys("-+_.")) + + def __new__(cls, num, dps=None, precision=None): + if dps is not None and precision is not None: + raise ValueError('Both decimal and binary precision supplied. ' + 'Supply only one. ') + + if isinstance(num, str): + _num = num = num.strip() # Python ignores leading and trailing space + num = num.replace(' ', '_').lower() # Float treats spaces as digit sep; E -> e + if num.startswith('.') and len(num) > 1: + num = '0' + num + elif num.startswith('-.') and len(num) > 2: + num = '-0.' + num[2:] + elif num in ('inf', '+inf'): + return S.Infinity + elif num == '-inf': + return S.NegativeInfinity + elif num == 'nan': + return S.NaN + elif not _literal_float(num): + raise ValueError('string-float not recognized: %s' % _num) + elif isinstance(num, float) and num == 0: + num = '0' + elif isinstance(num, float) and num == float('inf'): + return S.Infinity + elif isinstance(num, float) and num == float('-inf'): + return S.NegativeInfinity + elif isinstance(num, float) and math.isnan(num): + return S.NaN + elif isinstance(num, (SYMPY_INTS, Integer)): + num = str(num) + elif num is S.Infinity: + return num + elif num is S.NegativeInfinity: + return num + elif num is S.NaN: + return num + elif _is_numpy_instance(num): # support for numpy datatypes + num = _convert_numpy_types(num) + elif isinstance(num, mpmath.mpf): + if precision is None: + if dps is None: + precision = num.context.prec + num = num._mpf_ + + if dps is None and precision is None: + dps = 15 + if isinstance(num, Float): + return num + if isinstance(num, str): + try: + Num = decimal.Decimal(num) + except decimal.InvalidOperation: + pass + else: + isint = '.' not in num + num, dps = _decimal_to_Rational_prec(Num) + if num.is_Integer and isint: + # 12e3 is shorthand for int, not float; + # 12.e3 would be the float version + dps = max(dps, num_digits(num)) + dps = max(15, dps) + precision = dps_to_prec(dps) + elif precision == '' and dps is None or precision is None and dps == '': + if not isinstance(num, str): + raise ValueError('The null string can only be used when ' + 'the number to Float is passed as a string or an integer.') + try: + Num = decimal.Decimal(num) + except decimal.InvalidOperation: + raise ValueError('string-float not recognized by Decimal: %s' % num) + else: + isint = '.' not in num + num, dps = _decimal_to_Rational_prec(Num) + if num.is_Integer and isint: + # without dec, e-notation is short for int + dps = max(dps, num_digits(num)) + precision = dps_to_prec(dps) + + # decimal precision(dps) is set and maybe binary precision(precision) + # as well.From here on binary precision is used to compute the Float. + # Hence, if supplied use binary precision else translate from decimal + # precision. + + if precision is None or precision == '': + precision = dps_to_prec(dps) + + precision = int(precision) + + if isinstance(num, float): + _mpf_ = mlib.from_float(num, precision, rnd) + elif isinstance(num, str): + _mpf_ = mlib.from_str(num, precision, rnd) + elif isinstance(num, decimal.Decimal): + if num.is_finite(): + _mpf_ = mlib.from_str(str(num), precision, rnd) + elif num.is_nan(): + return S.NaN + elif num.is_infinite(): + if num > 0: + return S.Infinity + return S.NegativeInfinity + else: + raise ValueError("unexpected decimal value %s" % str(num)) + elif isinstance(num, tuple) and len(num) in (3, 4): + if isinstance(num[1], str): + # it's a hexadecimal (coming from a pickled object) + num = list(num) + # If we're loading an object pickled in Python 2 into + # Python 3, we may need to strip a tailing 'L' because + # of a shim for int on Python 3, see issue #13470. + # Strip leading '0x' - gmpy2 only documents such inputs + # with base prefix as valid when the 2nd argument (base) is 0. + # When mpmath uses Sage as the backend, however, it + # ends up including '0x' when preparing the picklable tuple. + # See issue #19690. + num[1] = num[1].removeprefix('0x').removesuffix('L') + # Now we can assume that it is in standard form + num[1] = MPZ(num[1], 16) + _mpf_ = tuple(num) + else: + if len(num) == 4: + # handle normalization hack + return Float._new(num, precision) + else: + if not all(( + num[0] in (0, 1), + num[1] >= 0, + all(type(i) in (int, int) for i in num) + )): + raise ValueError('malformed mpf: %s' % (num,)) + # don't compute number or else it may + # over/underflow + return Float._new( + (num[0], num[1], num[2], bitcount(num[1])), + precision) + elif isinstance(num, (Number, NumberSymbol)): + _mpf_ = num._as_mpf_val(precision) + else: + _mpf_ = mpmath.mpf(num, prec=precision)._mpf_ + + return cls._new(_mpf_, precision, zero=False) + + @classmethod + def _new(cls, _mpf_, _prec, zero=True): + # special cases + if zero and _mpf_ == fzero: + return S.Zero # Float(0) -> 0.0; Float._new((0,0,0,0)) -> 0 + elif _mpf_ == _mpf_nan: + return S.NaN + elif _mpf_ == _mpf_inf: + return S.Infinity + elif _mpf_ == _mpf_ninf: + return S.NegativeInfinity + + obj = Expr.__new__(cls) + obj._mpf_ = mpf_norm(_mpf_, _prec) + obj._prec = _prec + return obj + + def __getnewargs_ex__(self): + sign, man, exp, bc = self._mpf_ + arg = (sign, hex(man)[2:], exp, bc) + kwargs = {'precision': self._prec} + return ((arg,), kwargs) + + def _hashable_content(self): + return (self._mpf_, self._prec) + + def floor(self): + return Integer(int(mlib.to_int( + mlib.mpf_floor(self._mpf_, self._prec)))) + + def ceiling(self): + return Integer(int(mlib.to_int( + mlib.mpf_ceil(self._mpf_, self._prec)))) + + def __floor__(self): + return self.floor() + + def __ceil__(self): + return self.ceiling() + + @property + def num(self): + return mpmath.mpf(self._mpf_) + + def _as_mpf_val(self, prec): + rv = mpf_norm(self._mpf_, prec) + if rv != self._mpf_ and self._prec == prec: + debug(self._mpf_, rv) + return rv + + def _as_mpf_op(self, prec): + return self._mpf_, max(prec, self._prec) + + def _eval_is_finite(self): + if self._mpf_ in (_mpf_inf, _mpf_ninf): + return False + return True + + def _eval_is_infinite(self): + if self._mpf_ in (_mpf_inf, _mpf_ninf): + return True + return False + + def _eval_is_integer(self): + if self._mpf_ == fzero: + return True + if not int_valued(self): + return False + + def _eval_is_negative(self): + if self._mpf_ in (_mpf_ninf, _mpf_inf): + return False + return self.num < 0 + + def _eval_is_positive(self): + if self._mpf_ in (_mpf_ninf, _mpf_inf): + return False + return self.num > 0 + + def _eval_is_extended_negative(self): + if self._mpf_ == _mpf_ninf: + return True + if self._mpf_ == _mpf_inf: + return False + return self.num < 0 + + def _eval_is_extended_positive(self): + if self._mpf_ == _mpf_inf: + return True + if self._mpf_ == _mpf_ninf: + return False + return self.num > 0 + + def _eval_is_zero(self): + return self._mpf_ == fzero + + def __bool__(self): + return self._mpf_ != fzero + + def __neg__(self): + if not self: + return self + return Float._new(mlib.mpf_neg(self._mpf_), self._prec) + + @_sympifyit('other', NotImplemented) + def __add__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + rhs, prec = other._as_mpf_op(self._prec) + return Float._new(mlib.mpf_add(self._mpf_, rhs, prec, rnd), prec) + return Number.__add__(self, other) + + @_sympifyit('other', NotImplemented) + def __sub__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + rhs, prec = other._as_mpf_op(self._prec) + return Float._new(mlib.mpf_sub(self._mpf_, rhs, prec, rnd), prec) + return Number.__sub__(self, other) + + @_sympifyit('other', NotImplemented) + def __mul__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + rhs, prec = other._as_mpf_op(self._prec) + return Float._new(mlib.mpf_mul(self._mpf_, rhs, prec, rnd), prec) + return Number.__mul__(self, other) + + @_sympifyit('other', NotImplemented) + def __truediv__(self, other): + if isinstance(other, Number) and other != 0 and global_parameters.evaluate: + rhs, prec = other._as_mpf_op(self._prec) + return Float._new(mlib.mpf_div(self._mpf_, rhs, prec, rnd), prec) + return Number.__truediv__(self, other) + + @_sympifyit('other', NotImplemented) + def __mod__(self, other): + if isinstance(other, Rational) and other.q != 1 and global_parameters.evaluate: + # calculate mod with Rationals, *then* round the result + return Float(Rational.__mod__(Rational(self), other), + precision=self._prec) + if isinstance(other, Float) and global_parameters.evaluate: + r = self/other + if int_valued(r): + return Float(0, precision=max(self._prec, other._prec)) + if isinstance(other, Number) and global_parameters.evaluate: + rhs, prec = other._as_mpf_op(self._prec) + return Float._new(mlib.mpf_mod(self._mpf_, rhs, prec, rnd), prec) + return Number.__mod__(self, other) + + @_sympifyit('other', NotImplemented) + def __rmod__(self, other): + if isinstance(other, Float) and global_parameters.evaluate: + return other.__mod__(self) + if isinstance(other, Number) and global_parameters.evaluate: + rhs, prec = other._as_mpf_op(self._prec) + return Float._new(mlib.mpf_mod(rhs, self._mpf_, prec, rnd), prec) + return Number.__rmod__(self, other) + + def _eval_power(self, expt): + """ + expt is symbolic object but not equal to 0, 1 + + (-p)**r -> exp(r*log(-p)) -> exp(r*(log(p) + I*Pi)) -> + -> p**r*(sin(Pi*r) + cos(Pi*r)*I) + """ + if equal_valued(self, 0): + if expt.is_extended_positive: + return self + if expt.is_extended_negative: + return S.ComplexInfinity + if isinstance(expt, Number): + if isinstance(expt, Integer): + prec = self._prec + return Float._new( + mlib.mpf_pow_int(self._mpf_, expt.p, prec, rnd), prec) + elif isinstance(expt, Rational) and \ + expt.p == 1 and expt.q % 2 and self.is_negative: + return Pow(S.NegativeOne, expt, evaluate=False)*( + -self)._eval_power(expt) + expt, prec = expt._as_mpf_op(self._prec) + mpfself = self._mpf_ + try: + y = mpf_pow(mpfself, expt, prec, rnd) + return Float._new(y, prec) + except mlib.ComplexResult: + re, im = mlib.mpc_pow( + (mpfself, fzero), (expt, fzero), prec, rnd) + return Float._new(re, prec) + \ + Float._new(im, prec)*S.ImaginaryUnit + + def __abs__(self): + return Float._new(mlib.mpf_abs(self._mpf_), self._prec) + + def __int__(self): + if self._mpf_ == fzero: + return 0 + return int(mlib.to_int(self._mpf_)) # uses round_fast = round_down + + def __eq__(self, other): + if isinstance(other, float): + other = Float(other) + return Basic.__eq__(self, other) + + def __ne__(self, other): + eq = self.__eq__(other) + if eq is NotImplemented: + return eq + else: + return not eq + + def __hash__(self): + float_val = float(self) + if not math.isinf(float_val): + return hash(float_val) + return Basic.__hash__(self) + + def _Frel(self, other, op): + try: + other = _sympify(other) + except SympifyError: + return NotImplemented + if other.is_Rational: + # test self*other.q other.p without losing precision + ''' + >>> f = Float(.1,2) + >>> i = 1234567890 + >>> (f*i)._mpf_ + (0, 471, 18, 9) + >>> mlib.mpf_mul(f._mpf_, mlib.from_int(i)) + (0, 505555550955, -12, 39) + ''' + smpf = mlib.mpf_mul(self._mpf_, mlib.from_int(other.q)) + ompf = mlib.from_int(other.p) + return _sympify(bool(op(smpf, ompf))) + elif other.is_Float: + return _sympify(bool( + op(self._mpf_, other._mpf_))) + elif other.is_comparable and other not in ( + S.Infinity, S.NegativeInfinity): + other = other.evalf(prec_to_dps(self._prec)) + if other._prec > 1: + if other.is_Number: + return _sympify(bool( + op(self._mpf_, other._as_mpf_val(self._prec)))) + + def __gt__(self, other): + if isinstance(other, NumberSymbol): + return other.__lt__(self) + rv = self._Frel(other, mlib.mpf_gt) + if rv is None: + return Expr.__gt__(self, other) + return rv + + def __ge__(self, other): + if isinstance(other, NumberSymbol): + return other.__le__(self) + rv = self._Frel(other, mlib.mpf_ge) + if rv is None: + return Expr.__ge__(self, other) + return rv + + def __lt__(self, other): + if isinstance(other, NumberSymbol): + return other.__gt__(self) + rv = self._Frel(other, mlib.mpf_lt) + if rv is None: + return Expr.__lt__(self, other) + return rv + + def __le__(self, other): + if isinstance(other, NumberSymbol): + return other.__ge__(self) + rv = self._Frel(other, mlib.mpf_le) + if rv is None: + return Expr.__le__(self, other) + return rv + + def epsilon_eq(self, other, epsilon="1e-15"): + return abs(self - other) < Float(epsilon) + + def __format__(self, format_spec): + return format(decimal.Decimal(str(self)), format_spec) + + +# Add sympify converters +_sympy_converter[float] = _sympy_converter[decimal.Decimal] = Float + +# this is here to work nicely in Sage +RealNumber = Float + + +class Rational(Number): + """Represents rational numbers (p/q) of any size. + + Examples + ======== + + >>> from sympy import Rational, nsimplify, S, pi + >>> Rational(1, 2) + 1/2 + + Rational is unprejudiced in accepting input. If a float is passed, the + underlying value of the binary representation will be returned: + + >>> Rational(.5) + 1/2 + >>> Rational(.2) + 3602879701896397/18014398509481984 + + If the simpler representation of the float is desired then consider + limiting the denominator to the desired value or convert the float to + a string (which is roughly equivalent to limiting the denominator to + 10**12): + + >>> Rational(str(.2)) + 1/5 + >>> Rational(.2).limit_denominator(10**12) + 1/5 + + An arbitrarily precise Rational is obtained when a string literal is + passed: + + >>> Rational("1.23") + 123/100 + >>> Rational('1e-2') + 1/100 + >>> Rational(".1") + 1/10 + >>> Rational('1e-2/3.2') + 1/320 + + The conversion of other types of strings can be handled by + the sympify() function, and conversion of floats to expressions + or simple fractions can be handled with nsimplify: + + >>> S('.[3]') # repeating digits in brackets + 1/3 + >>> S('3**2/10') # general expressions + 9/10 + >>> nsimplify(.3) # numbers that have a simple form + 3/10 + + But if the input does not reduce to a literal Rational, an error will + be raised: + + >>> Rational(pi) + Traceback (most recent call last): + ... + TypeError: invalid input: pi + + + Low-level + --------- + + Access numerator and denominator as .p and .q: + + >>> r = Rational(3, 4) + >>> r + 3/4 + >>> r.p + 3 + >>> r.q + 4 + + Note that p and q return integers (not SymPy Integers) so some care + is needed when using them in expressions: + + >>> r.p/r.q + 0.75 + + See Also + ======== + sympy.core.sympify.sympify, sympy.simplify.simplify.nsimplify + """ + is_real = True + is_integer = False + is_rational = True + is_number = True + + __slots__ = ('p', 'q') + + p: int + q: int + + is_Rational = True + + @cacheit + def __new__(cls, p, q=None, gcd=None): + if q is None: + if isinstance(p, Rational): + return p + + if isinstance(p, SYMPY_INTS): + pass + else: + if isinstance(p, (float, Float)): + return Rational(*_as_integer_ratio(p)) + + if not isinstance(p, str): + try: + p = sympify(p) + except (SympifyError, SyntaxError): + pass # error will raise below + else: + if p.count('/') > 1: + raise TypeError('invalid input: %s' % p) + p = p.replace(' ', '') + pq = p.rsplit('/', 1) + if len(pq) == 2: + p, q = pq + fp = fractions.Fraction(p) + fq = fractions.Fraction(q) + p = fp/fq + try: + p = fractions.Fraction(p) + except ValueError: + pass # error will raise below + else: + return cls._new(p.numerator, p.denominator, 1) + + if not isinstance(p, Rational): + raise TypeError('invalid input: %s' % p) + + q = 1 + + Q = 1 + + if not isinstance(p, SYMPY_INTS): + p = Rational(p) + Q *= p.q + p = p.p + else: + p = int(p) + + if not isinstance(q, SYMPY_INTS): + q = Rational(q) + p *= q.q + Q *= q.p + else: + Q *= int(q) + q = Q + + if gcd is not None: + sympy_deprecation_warning( + "gcd is deprecated in Rational, use nsimplify instead", + deprecated_since_version="1.11", + active_deprecations_target="deprecated-rational-gcd", + stacklevel=4, + ) + return cls._new(p, q, gcd) + + # p and q are now ints + return cls._new(p, q) + + @classmethod + def _new(cls, p, q, gcd=None): + if q == 0: + if p == 0: + if _errdict["divide"]: + raise ValueError("Indeterminate 0/0") + else: + return S.NaN + return S.ComplexInfinity + + if q < 0: + q = -q + p = -p + + if gcd is None: + gcd = igcd(abs(p), q) + + if gcd > 1: + p //= gcd + q //= gcd + + return cls.from_coprime_ints(p, q) + + @classmethod + def from_coprime_ints(cls, p: int, q: int) -> Rational: + """Create a Rational from a pair of coprime integers. + + Both ``p`` and ``q`` should be strictly of type ``int``. + + The caller should ensure that ``gcd(p,q) == 1`` and ``q > 0``. + + This may be more efficient than ``Rational(p, q)``. The validity of the + arguments may or may not be checked so it should not be relied upon to + pass unvalidated or invalid arguments to this function. + """ + if q == 1: + return Integer(p) + if p == 1 and q == 2: + return S.Half + + obj = Expr.__new__(cls) + obj.p = p + obj.q = q + return obj + + def limit_denominator(self, max_denominator=1000000): + """Closest Rational to self with denominator at most max_denominator. + + Examples + ======== + + >>> from sympy import Rational + >>> Rational('3.141592653589793').limit_denominator(10) + 22/7 + >>> Rational('3.141592653589793').limit_denominator(100) + 311/99 + + """ + f = fractions.Fraction(self.p, self.q) + return Rational(f.limit_denominator(fractions.Fraction(int(max_denominator)))) + + def __getnewargs__(self): + return (self.p, self.q) + + def _hashable_content(self): + return (self.p, self.q) + + def _eval_is_positive(self): + return self.p > 0 + + def _eval_is_zero(self): + return self.p == 0 + + def __neg__(self): + return Rational(-self.p, self.q) + + @_sympifyit('other', NotImplemented) + def __add__(self, other): + if global_parameters.evaluate: + if isinstance(other, Integer): + return Rational._new(self.p + self.q*other.p, self.q, 1) + elif isinstance(other, Rational): + #TODO: this can probably be optimized more + return Rational(self.p*other.q + self.q*other.p, self.q*other.q) + elif isinstance(other, Float): + return other + self + else: + return Number.__add__(self, other) + return Number.__add__(self, other) + __radd__ = __add__ + + @_sympifyit('other', NotImplemented) + def __sub__(self, other): + if global_parameters.evaluate: + if isinstance(other, Integer): + return Rational._new(self.p - self.q*other.p, self.q, 1) + elif isinstance(other, Rational): + return Rational(self.p*other.q - self.q*other.p, self.q*other.q) + elif isinstance(other, Float): + return -other + self + else: + return Number.__sub__(self, other) + return Number.__sub__(self, other) + @_sympifyit('other', NotImplemented) + def __rsub__(self, other): + if global_parameters.evaluate: + if isinstance(other, Integer): + return Rational._new(self.q*other.p - self.p, self.q, 1) + elif isinstance(other, Rational): + return Rational(self.q*other.p - self.p*other.q, self.q*other.q) + elif isinstance(other, Float): + return -self + other + else: + return Number.__rsub__(self, other) + return Number.__rsub__(self, other) + @_sympifyit('other', NotImplemented) + def __mul__(self, other): + if global_parameters.evaluate: + if isinstance(other, Integer): + return Rational._new(self.p*other.p, self.q, igcd(other.p, self.q)) + elif isinstance(other, Rational): + return Rational._new(self.p*other.p, self.q*other.q, igcd(self.p, other.q)*igcd(self.q, other.p)) + elif isinstance(other, Float): + return other*self + else: + return Number.__mul__(self, other) + return Number.__mul__(self, other) + __rmul__ = __mul__ + + @_sympifyit('other', NotImplemented) + def __truediv__(self, other): + if global_parameters.evaluate: + if isinstance(other, Integer): + if self.p and other.p == S.Zero: + return S.ComplexInfinity + else: + return Rational._new(self.p, self.q*other.p, igcd(self.p, other.p)) + elif isinstance(other, Rational): + return Rational._new(self.p*other.q, self.q*other.p, igcd(self.p, other.p)*igcd(self.q, other.q)) + elif isinstance(other, Float): + return self*(1/other) + else: + return Number.__truediv__(self, other) + return Number.__truediv__(self, other) + @_sympifyit('other', NotImplemented) + def __rtruediv__(self, other): + if global_parameters.evaluate: + if isinstance(other, Integer): + return Rational._new(other.p*self.q, self.p, igcd(self.p, other.p)) + elif isinstance(other, Rational): + return Rational._new(other.p*self.q, other.q*self.p, igcd(self.p, other.p)*igcd(self.q, other.q)) + elif isinstance(other, Float): + return other*(1/self) + else: + return Number.__rtruediv__(self, other) + return Number.__rtruediv__(self, other) + + @_sympifyit('other', NotImplemented) + def __mod__(self, other): + if global_parameters.evaluate: + if isinstance(other, Rational): + n = (self.p*other.q) // (other.p*self.q) + return Rational(self.p*other.q - n*other.p*self.q, self.q*other.q) + if isinstance(other, Float): + # calculate mod with Rationals, *then* round the answer + return Float(self.__mod__(Rational(other)), + precision=other._prec) + return Number.__mod__(self, other) + return Number.__mod__(self, other) + + @_sympifyit('other', NotImplemented) + def __rmod__(self, other): + if isinstance(other, Rational): + return Rational.__mod__(other, self) + return Number.__rmod__(self, other) + + def _eval_power(self, expt): + if isinstance(expt, Number): + if isinstance(expt, Float): + return self._eval_evalf(expt._prec)**expt + if expt.is_extended_negative: + # (3/4)**-2 -> (4/3)**2 + ne = -expt + if (ne is S.One): + return Rational(self.q, self.p) + if self.is_negative: + return S.NegativeOne**expt*Rational(self.q, -self.p)**ne + else: + return Rational(self.q, self.p)**ne + if expt is S.Infinity: # -oo already caught by test for negative + if self.p > self.q: + # (3/2)**oo -> oo + return S.Infinity + if self.p < -self.q: + # (-3/2)**oo -> oo + I*oo + return S.Infinity + S.Infinity*S.ImaginaryUnit + return S.Zero + if isinstance(expt, Integer): + # (4/3)**2 -> 4**2 / 3**2 + return Rational._new(self.p**expt.p, self.q**expt.p, 1) + if isinstance(expt, Rational): + intpart = expt.p // expt.q + if intpart: + intpart += 1 + remfracpart = intpart*expt.q - expt.p + ratfracpart = Rational(remfracpart, expt.q) + if self.p != 1: + return Integer(self.p)**expt*Integer(self.q)**ratfracpart*Rational._new(1, self.q**intpart, 1) + return Integer(self.q)**ratfracpart*Rational._new(1, self.q**intpart, 1) + else: + remfracpart = expt.q - expt.p + ratfracpart = Rational(remfracpart, expt.q) + if self.p != 1: + return Integer(self.p)**expt*Integer(self.q)**ratfracpart*Rational._new(1, self.q, 1) + return Integer(self.q)**ratfracpart*Rational._new(1, self.q, 1) + + if self.is_extended_negative and expt.is_even: + return (-self)**expt + + return + + def _as_mpf_val(self, prec): + return mlib.from_rational(self.p, self.q, prec, rnd) + + def _mpmath_(self, prec, rnd): + return mpmath.make_mpf(mlib.from_rational(self.p, self.q, prec, rnd)) + + def __abs__(self): + return Rational(abs(self.p), self.q) + + def __int__(self): + p, q = self.p, self.q + if p < 0: + return -int(-p//q) + return int(p//q) + + def floor(self): + return Integer(self.p // self.q) + + def ceiling(self): + return -Integer(-self.p // self.q) + + def __floor__(self): + return self.floor() + + def __ceil__(self): + return self.ceiling() + + def __eq__(self, other): + try: + other = _sympify(other) + except SympifyError: + return NotImplemented + if not isinstance(other, Number): + # S(0) == S.false is False + # S(0) == False is True + return False + if other.is_NumberSymbol: + if other.is_irrational: + return False + return other.__eq__(self) + if other.is_Rational: + # a Rational is always in reduced form so will never be 2/4 + # so we can just check equivalence of args + return self.p == other.p and self.q == other.q + return False + + def __ne__(self, other): + return not self == other + + def _Rrel(self, other, attr): + # if you want self < other, pass self, other, __gt__ + try: + other = _sympify(other) + except SympifyError: + return NotImplemented + if other.is_Number: + op = None + s, o = self, other + if other.is_NumberSymbol: + op = getattr(o, attr) + elif other.is_Float: + op = getattr(o, attr) + elif other.is_Rational: + s, o = Integer(s.p*o.q), Integer(s.q*o.p) + op = getattr(o, attr) + if op: + return op(s) + if o.is_number and o.is_extended_real: + return Integer(s.p), s.q*o + + def __gt__(self, other): + rv = self._Rrel(other, '__lt__') + if rv is None: + rv = self, other + elif not isinstance(rv, tuple): + return rv + return Expr.__gt__(*rv) + + def __ge__(self, other): + rv = self._Rrel(other, '__le__') + if rv is None: + rv = self, other + elif not isinstance(rv, tuple): + return rv + return Expr.__ge__(*rv) + + def __lt__(self, other): + rv = self._Rrel(other, '__gt__') + if rv is None: + rv = self, other + elif not isinstance(rv, tuple): + return rv + return Expr.__lt__(*rv) + + def __le__(self, other): + rv = self._Rrel(other, '__ge__') + if rv is None: + rv = self, other + elif not isinstance(rv, tuple): + return rv + return Expr.__le__(*rv) + + def __hash__(self): + return super().__hash__() + + def factors(self, limit=None, use_trial=True, use_rho=False, + use_pm1=False, verbose=False, visual=False): + """A wrapper to factorint which return factors of self that are + smaller than limit (or cheap to compute). Special methods of + factoring are disabled by default so that only trial division is used. + """ + from sympy.ntheory.factor_ import factorrat + + return factorrat(self, limit=limit, use_trial=use_trial, + use_rho=use_rho, use_pm1=use_pm1, + verbose=verbose).copy() + + @property + def numerator(self): + return self.p + + @property + def denominator(self): + return self.q + + @_sympifyit('other', NotImplemented) + def gcd(self, other): + if isinstance(other, Rational): + if other == S.Zero: + return other + return Rational( + igcd(self.p, other.p), + ilcm(self.q, other.q)) + return Number.gcd(self, other) + + @_sympifyit('other', NotImplemented) + def lcm(self, other): + if isinstance(other, Rational): + return Rational( + self.p // igcd(self.p, other.p) * other.p, + igcd(self.q, other.q)) + return Number.lcm(self, other) + + def as_numer_denom(self): + return Integer(self.p), Integer(self.q) + + def as_content_primitive(self, radical=False, clear=True): + """Return the tuple (R, self/R) where R is the positive Rational + extracted from self. + + Examples + ======== + + >>> from sympy import S + >>> (S(-3)/2).as_content_primitive() + (3/2, -1) + + See docstring of Expr.as_content_primitive for more examples. + """ + + if self: + if self.is_positive: + return self, S.One + return -self, S.NegativeOne + return S.One, self + + def as_coeff_Mul(self, rational=False): + """Efficiently extract the coefficient of a product.""" + return self, S.One + + def as_coeff_Add(self, rational=False): + """Efficiently extract the coefficient of a summation.""" + return self, S.Zero + + +class Integer(Rational): + """Represents integer numbers of any size. + + Examples + ======== + + >>> from sympy import Integer + >>> Integer(3) + 3 + + If a float or a rational is passed to Integer, the fractional part + will be discarded; the effect is of rounding toward zero. + + >>> Integer(3.8) + 3 + >>> Integer(-3.8) + -3 + + A string is acceptable input if it can be parsed as an integer: + + >>> Integer("9" * 20) + 99999999999999999999 + + It is rarely needed to explicitly instantiate an Integer, because + Python integers are automatically converted to Integer when they + are used in SymPy expressions. + """ + q = 1 + is_integer = True + is_number = True + + is_Integer = True + + __slots__ = () + + def _as_mpf_val(self, prec): + return mlib.from_int(self.p, prec, rnd) + + def _mpmath_(self, prec, rnd): + return mpmath.make_mpf(self._as_mpf_val(prec)) + + @cacheit + def __new__(cls, i): + if isinstance(i, str): + i = i.replace(' ', '') + # whereas we cannot, in general, make a Rational from an + # arbitrary expression, we can make an Integer unambiguously + # (except when a non-integer expression happens to round to + # an integer). So we proceed by taking int() of the input and + # let the int routines determine whether the expression can + # be made into an int or whether an error should be raised. + try: + ival = int(i) + except TypeError: + raise TypeError( + "Argument of Integer should be of numeric type, got %s." % i) + # We only work with well-behaved integer types. This converts, for + # example, numpy.int32 instances. + if ival == 1: + return S.One + if ival == -1: + return S.NegativeOne + if ival == 0: + return S.Zero + obj = Expr.__new__(cls) + obj.p = ival + return obj + + def __getnewargs__(self): + return (self.p,) + + # Arithmetic operations are here for efficiency + def __int__(self): + return self.p + + def floor(self): + return Integer(self.p) + + def ceiling(self): + return Integer(self.p) + + def __floor__(self): + return self.floor() + + def __ceil__(self): + return self.ceiling() + + def __neg__(self): + return Integer(-self.p) + + def __abs__(self): + if self.p >= 0: + return self + else: + return Integer(-self.p) + + def __divmod__(self, other): + if isinstance(other, Integer) and global_parameters.evaluate: + return Tuple(*(divmod(self.p, other.p))) + else: + return Number.__divmod__(self, other) + + def __rdivmod__(self, other): + if isinstance(other, int) and global_parameters.evaluate: + return Tuple(*(divmod(other, self.p))) + else: + try: + other = Number(other) + except TypeError: + msg = "unsupported operand type(s) for divmod(): '%s' and '%s'" + oname = type(other).__name__ + sname = type(self).__name__ + raise TypeError(msg % (oname, sname)) + return Number.__divmod__(other, self) + + # TODO make it decorator + bytecodehacks? + def __add__(self, other): + if global_parameters.evaluate: + if isinstance(other, int): + return Integer(self.p + other) + elif isinstance(other, Integer): + return Integer(self.p + other.p) + elif isinstance(other, Rational): + return Rational._new(self.p*other.q + other.p, other.q, 1) + return Rational.__add__(self, other) + else: + return Add(self, other) + + def __radd__(self, other): + if global_parameters.evaluate: + if isinstance(other, int): + return Integer(other + self.p) + elif isinstance(other, Rational): + return Rational._new(other.p + self.p*other.q, other.q, 1) + return Rational.__radd__(self, other) + return Rational.__radd__(self, other) + + def __sub__(self, other): + if global_parameters.evaluate: + if isinstance(other, int): + return Integer(self.p - other) + elif isinstance(other, Integer): + return Integer(self.p - other.p) + elif isinstance(other, Rational): + return Rational._new(self.p*other.q - other.p, other.q, 1) + return Rational.__sub__(self, other) + return Rational.__sub__(self, other) + + def __rsub__(self, other): + if global_parameters.evaluate: + if isinstance(other, int): + return Integer(other - self.p) + elif isinstance(other, Rational): + return Rational._new(other.p - self.p*other.q, other.q, 1) + return Rational.__rsub__(self, other) + return Rational.__rsub__(self, other) + + def __mul__(self, other): + if global_parameters.evaluate: + if isinstance(other, int): + return Integer(self.p*other) + elif isinstance(other, Integer): + return Integer(self.p*other.p) + elif isinstance(other, Rational): + return Rational._new(self.p*other.p, other.q, igcd(self.p, other.q)) + return Rational.__mul__(self, other) + return Rational.__mul__(self, other) + + def __rmul__(self, other): + if global_parameters.evaluate: + if isinstance(other, int): + return Integer(other*self.p) + elif isinstance(other, Rational): + return Rational._new(other.p*self.p, other.q, igcd(self.p, other.q)) + return Rational.__rmul__(self, other) + return Rational.__rmul__(self, other) + + def __mod__(self, other): + if global_parameters.evaluate: + if isinstance(other, int): + return Integer(self.p % other) + elif isinstance(other, Integer): + return Integer(self.p % other.p) + return Rational.__mod__(self, other) + return Rational.__mod__(self, other) + + def __rmod__(self, other): + if global_parameters.evaluate: + if isinstance(other, int): + return Integer(other % self.p) + elif isinstance(other, Integer): + return Integer(other.p % self.p) + return Rational.__rmod__(self, other) + return Rational.__rmod__(self, other) + + def __eq__(self, other): + if isinstance(other, int): + return (self.p == other) + elif isinstance(other, Integer): + return (self.p == other.p) + return Rational.__eq__(self, other) + + def __ne__(self, other): + return not self == other + + def __gt__(self, other): + try: + other = _sympify(other) + except SympifyError: + return NotImplemented + if other.is_Integer: + return _sympify(self.p > other.p) + return Rational.__gt__(self, other) + + def __lt__(self, other): + try: + other = _sympify(other) + except SympifyError: + return NotImplemented + if other.is_Integer: + return _sympify(self.p < other.p) + return Rational.__lt__(self, other) + + def __ge__(self, other): + try: + other = _sympify(other) + except SympifyError: + return NotImplemented + if other.is_Integer: + return _sympify(self.p >= other.p) + return Rational.__ge__(self, other) + + def __le__(self, other): + try: + other = _sympify(other) + except SympifyError: + return NotImplemented + if other.is_Integer: + return _sympify(self.p <= other.p) + return Rational.__le__(self, other) + + def __hash__(self): + return hash(self.p) + + def __index__(self): + return self.p + + ######################################## + + def _eval_is_odd(self): + return bool(self.p % 2) + + def _eval_power(self, expt): + """ + Tries to do some simplifications on self**expt + + Returns None if no further simplifications can be done. + + Explanation + =========== + + When exponent is a fraction (so we have for example a square root), + we try to find a simpler representation by factoring the argument + up to factors of 2**15, e.g. + + - sqrt(4) becomes 2 + - sqrt(-4) becomes 2*I + - (2**(3+7)*3**(6+7))**Rational(1,7) becomes 6*18**(3/7) + + Further simplification would require a special call to factorint on + the argument which is not done here for sake of speed. + + """ + from sympy.ntheory.factor_ import perfect_power + + if expt is S.Infinity: + if self.p > S.One: + return S.Infinity + # cases -1, 0, 1 are done in their respective classes + return S.Infinity + S.ImaginaryUnit*S.Infinity + if expt is S.NegativeInfinity: + return Rational._new(1, self, 1)**S.Infinity + if not isinstance(expt, Number): + # simplify when expt is even + # (-2)**k --> 2**k + if self.is_negative and expt.is_even: + return (-self)**expt + if isinstance(expt, Float): + # Rational knows how to exponentiate by a Float + return super()._eval_power(expt) + if not isinstance(expt, Rational): + return + if expt is S.Half and self.is_negative: + # we extract I for this special case since everyone is doing so + return S.ImaginaryUnit*Pow(-self, expt) + if expt.is_negative: + # invert base and change sign on exponent + ne = -expt + if self.is_negative: + return S.NegativeOne**expt*Rational._new(1, -self.p, 1)**ne + else: + return Rational._new(1, self.p, 1)**ne + # see if base is a perfect root, sqrt(4) --> 2 + x, xexact = integer_nthroot(abs(self.p), expt.q) + if xexact: + # if it's a perfect root we've finished + result = Integer(x**abs(expt.p)) + if self.is_negative: + result *= S.NegativeOne**expt + return result + + # The following is an algorithm where we collect perfect roots + # from the factors of base. + + # if it's not an nth root, it still might be a perfect power + b_pos = int(abs(self.p)) + p = perfect_power(b_pos) + if p is not False: + # XXX: Convert to int because perfect_power may return fmpz + # Ideally that should be fixed in perfect_power though... + dict = {int(p[0]): int(p[1])} + else: + dict = Integer(b_pos).factors(limit=2**15) + + # now process the dict of factors + out_int = 1 # integer part + out_rad = 1 # extracted radicals + sqr_int = 1 + sqr_gcd = 0 + sqr_dict = {} + for prime, exponent in dict.items(): + exponent *= expt.p + # remove multiples of expt.q: (2**12)**(1/10) -> 2*(2**2)**(1/10) + div_e, div_m = divmod(exponent, expt.q) + if div_e > 0: + out_int *= prime**div_e + if div_m > 0: + # see if the reduced exponent shares a gcd with e.q + # (2**2)**(1/10) -> 2**(1/5) + g = igcd(div_m, expt.q) + if g != 1: + out_rad *= Pow(prime, Rational._new(div_m//g, expt.q//g, 1)) + else: + sqr_dict[prime] = div_m + # identify gcd of remaining powers + for p, ex in sqr_dict.items(): + if sqr_gcd == 0: + sqr_gcd = ex + else: + sqr_gcd = igcd(sqr_gcd, ex) + if sqr_gcd == 1: + break + for k, v in sqr_dict.items(): + sqr_int *= k**(v//sqr_gcd) + if sqr_int == b_pos and out_int == 1 and out_rad == 1: + result = None + else: + result = out_int*out_rad*Pow(sqr_int, Rational(sqr_gcd, expt.q)) + if self.is_negative: + result *= Pow(S.NegativeOne, expt) + return result + + def _eval_is_prime(self): + from sympy.ntheory.primetest import isprime + + return isprime(self) + + def _eval_is_composite(self): + if self > 1: + return fuzzy_not(self.is_prime) + else: + return False + + def as_numer_denom(self): + return self, S.One + + @_sympifyit('other', NotImplemented) + def __floordiv__(self, other): + if not isinstance(other, Expr): + return NotImplemented + if isinstance(other, Integer): + return Integer(self.p // other) + return divmod(self, other)[0] + + def __rfloordiv__(self, other): + return Integer(Integer(other).p // self.p) + + # These bitwise operations (__lshift__, __rlshift__, ..., __invert__) are defined + # for Integer only and not for general SymPy expressions. This is to achieve + # compatibility with the numbers.Integral ABC which only defines these operations + # among instances of numbers.Integral. Therefore, these methods check explicitly for + # integer types rather than using sympify because they should not accept arbitrary + # symbolic expressions and there is no symbolic analogue of numbers.Integral's + # bitwise operations. + def __lshift__(self, other): + if isinstance(other, (int, Integer, numbers.Integral)): + return Integer(self.p << int(other)) + else: + return NotImplemented + + def __rlshift__(self, other): + if isinstance(other, (int, numbers.Integral)): + return Integer(int(other) << self.p) + else: + return NotImplemented + + def __rshift__(self, other): + if isinstance(other, (int, Integer, numbers.Integral)): + return Integer(self.p >> int(other)) + else: + return NotImplemented + + def __rrshift__(self, other): + if isinstance(other, (int, numbers.Integral)): + return Integer(int(other) >> self.p) + else: + return NotImplemented + + def __and__(self, other): + if isinstance(other, (int, Integer, numbers.Integral)): + return Integer(self.p & int(other)) + else: + return NotImplemented + + def __rand__(self, other): + if isinstance(other, (int, numbers.Integral)): + return Integer(int(other) & self.p) + else: + return NotImplemented + + def __xor__(self, other): + if isinstance(other, (int, Integer, numbers.Integral)): + return Integer(self.p ^ int(other)) + else: + return NotImplemented + + def __rxor__(self, other): + if isinstance(other, (int, numbers.Integral)): + return Integer(int(other) ^ self.p) + else: + return NotImplemented + + def __or__(self, other): + if isinstance(other, (int, Integer, numbers.Integral)): + return Integer(self.p | int(other)) + else: + return NotImplemented + + def __ror__(self, other): + if isinstance(other, (int, numbers.Integral)): + return Integer(int(other) | self.p) + else: + return NotImplemented + + def __invert__(self): + return Integer(~self.p) + +# Add sympify converters +_sympy_converter[int] = Integer + + +class AlgebraicNumber(Expr): + r""" + Class for representing algebraic numbers in SymPy. + + Symbolically, an instance of this class represents an element + $\alpha \in \mathbb{Q}(\theta) \hookrightarrow \mathbb{C}$. That is, the + algebraic number $\alpha$ is represented as an element of a particular + number field $\mathbb{Q}(\theta)$, with a particular embedding of this + field into the complex numbers. + + Formally, the primitive element $\theta$ is given by two data points: (1) + its minimal polynomial (which defines $\mathbb{Q}(\theta)$), and (2) a + particular complex number that is a root of this polynomial (which defines + the embedding $\mathbb{Q}(\theta) \hookrightarrow \mathbb{C}$). Finally, + the algebraic number $\alpha$ which we represent is then given by the + coefficients of a polynomial in $\theta$. + """ + + __slots__ = ('rep', 'root', 'alias', 'minpoly', '_own_minpoly') + + is_AlgebraicNumber = True + is_algebraic = True + is_number = True + + + kind = NumberKind + + # Optional alias symbol is not free. + # Actually, alias should be a Str, but some methods + # expect that it be an instance of Expr. + free_symbols: set[Basic] = set() + + def __new__(cls, expr, coeffs=None, alias=None, **args): + r""" + Construct a new algebraic number $\alpha$ belonging to a number field + $k = \mathbb{Q}(\theta)$. + + There are four instance attributes to be determined: + + =========== ============================================================================ + Attribute Type/Meaning + =========== ============================================================================ + ``root`` :py:class:`~.Expr` for $\theta$ as a complex number + ``minpoly`` :py:class:`~.Poly`, the minimal polynomial of $\theta$ + ``rep`` :py:class:`~sympy.polys.polyclasses.DMP` giving $\alpha$ as poly in $\theta$ + ``alias`` :py:class:`~.Symbol` for $\theta$, or ``None`` + =========== ============================================================================ + + See Parameters section for how they are determined. + + Parameters + ========== + + expr : :py:class:`~.Expr`, or pair $(m, r)$ + There are three distinct modes of construction, depending on what + is passed as *expr*. + + **(1)** *expr* is an :py:class:`~.AlgebraicNumber`: + In this case we begin by copying all four instance attributes from + *expr*. If *coeffs* were also given, we compose the two coeff + polynomials (see below). If an *alias* was given, it overrides. + + **(2)** *expr* is any other type of :py:class:`~.Expr`: + Then ``root`` will equal *expr*. Therefore it + must express an algebraic quantity, and we will compute its + ``minpoly``. + + **(3)** *expr* is an ordered pair $(m, r)$ giving the + ``minpoly`` $m$, and a ``root`` $r$ thereof, which together + define $\theta$. In this case $m$ may be either a univariate + :py:class:`~.Poly` or any :py:class:`~.Expr` which represents the + same, while $r$ must be some :py:class:`~.Expr` representing a + complex number that is a root of $m$, including both explicit + expressions in radicals, and instances of + :py:class:`~.ComplexRootOf` or :py:class:`~.AlgebraicNumber`. + + coeffs : list, :py:class:`~.ANP`, None, optional (default=None) + This defines ``rep``, giving the algebraic number $\alpha$ as a + polynomial in $\theta$. + + If a list, the elements should be integers or rational numbers. + If an :py:class:`~.ANP`, we take its coefficients (using its + :py:meth:`~.ANP.to_list()` method). If ``None``, then the list of + coefficients defaults to ``[1, 0]``, meaning that $\alpha = \theta$ + is the primitive element of the field. + + If *expr* was an :py:class:`~.AlgebraicNumber`, let $g(x)$ be its + ``rep`` polynomial, and let $f(x)$ be the polynomial defined by + *coeffs*. Then ``self.rep`` will represent the composition + $(f \circ g)(x)$. + + alias : str, :py:class:`~.Symbol`, None, optional (default=None) + This is a way to provide a name for the primitive element. We + described several ways in which the *expr* argument can define the + value of the primitive element, but none of these methods gave it + a name. Here, for example, *alias* could be set as + ``Symbol('theta')``, in order to make this symbol appear when + $\alpha$ is printed, or rendered as a polynomial, using the + :py:meth:`~.as_poly()` method. + + Examples + ======== + + Recall that we are constructing an algebraic number as a field element + $\alpha \in \mathbb{Q}(\theta)$. + + >>> from sympy import AlgebraicNumber, sqrt, CRootOf, S + >>> from sympy.abc import x + + Example (1): $\alpha = \theta = \sqrt{2}$ + + >>> a1 = AlgebraicNumber(sqrt(2)) + >>> a1.minpoly_of_element().as_expr(x) + x**2 - 2 + >>> a1.evalf(10) + 1.414213562 + + Example (2): $\alpha = 3 \sqrt{2} - 5$, $\theta = \sqrt{2}$. We can + either build on the last example: + + >>> a2 = AlgebraicNumber(a1, [3, -5]) + >>> a2.as_expr() + -5 + 3*sqrt(2) + + or start from scratch: + + >>> a2 = AlgebraicNumber(sqrt(2), [3, -5]) + >>> a2.as_expr() + -5 + 3*sqrt(2) + + Example (3): $\alpha = 6 \sqrt{2} - 11$, $\theta = \sqrt{2}$. Again we + can build on the previous example, and we see that the coeff polys are + composed: + + >>> a3 = AlgebraicNumber(a2, [2, -1]) + >>> a3.as_expr() + -11 + 6*sqrt(2) + + reflecting the fact that $(2x - 1) \circ (3x - 5) = 6x - 11$. + + Example (4): $\alpha = \sqrt{2}$, $\theta = \sqrt{2} + \sqrt{3}$. The + easiest way is to use the :py:func:`~.to_number_field()` function: + + >>> from sympy import to_number_field + >>> a4 = to_number_field(sqrt(2), sqrt(2) + sqrt(3)) + >>> a4.minpoly_of_element().as_expr(x) + x**2 - 2 + >>> a4.to_root() + sqrt(2) + >>> a4.primitive_element() + sqrt(2) + sqrt(3) + >>> a4.coeffs() + [1/2, 0, -9/2, 0] + + but if you already knew the right coefficients, you could construct it + directly: + + >>> a4 = AlgebraicNumber(sqrt(2) + sqrt(3), [S(1)/2, 0, S(-9)/2, 0]) + >>> a4.to_root() + sqrt(2) + >>> a4.primitive_element() + sqrt(2) + sqrt(3) + + Example (5): Construct the Golden Ratio as an element of the 5th + cyclotomic field, supposing we already know its coefficients. This time + we introduce the alias $\zeta$ for the primitive element of the field: + + >>> from sympy import cyclotomic_poly + >>> from sympy.abc import zeta + >>> a5 = AlgebraicNumber(CRootOf(cyclotomic_poly(5), -1), + ... [-1, -1, 0, 0], alias=zeta) + >>> a5.as_poly().as_expr() + -zeta**3 - zeta**2 + >>> a5.evalf() + 1.61803398874989 + + (The index ``-1`` to ``CRootOf`` selects the complex root with the + largest real and imaginary parts, which in this case is + $\mathrm{e}^{2i\pi/5}$. See :py:class:`~.ComplexRootOf`.) + + Example (6): Building on the last example, construct the number + $2 \phi \in \mathbb{Q}(\phi)$, where $\phi$ is the Golden Ratio: + + >>> from sympy.abc import phi + >>> a6 = AlgebraicNumber(a5.to_root(), coeffs=[2, 0], alias=phi) + >>> a6.as_poly().as_expr() + 2*phi + >>> a6.primitive_element().evalf() + 1.61803398874989 + + Note that we needed to use ``a5.to_root()``, since passing ``a5`` as + the first argument would have constructed the number $2 \phi$ as an + element of the field $\mathbb{Q}(\zeta)$: + + >>> a6_wrong = AlgebraicNumber(a5, coeffs=[2, 0]) + >>> a6_wrong.as_poly().as_expr() + -2*zeta**3 - 2*zeta**2 + >>> a6_wrong.primitive_element().evalf() + 0.309016994374947 + 0.951056516295154*I + + """ + from sympy.polys.polyclasses import ANP, DMP + from sympy.polys.numberfields import minimal_polynomial + + expr = sympify(expr) + rep0 = None + alias0 = None + + if isinstance(expr, (tuple, Tuple)): + minpoly, root = expr + + if not minpoly.is_Poly: + from sympy.polys.polytools import Poly + minpoly = Poly(minpoly) + elif expr.is_AlgebraicNumber: + minpoly, root, rep0, alias0 = (expr.minpoly, expr.root, + expr.rep, expr.alias) + else: + minpoly, root = minimal_polynomial( + expr, args.get('gen'), polys=True), expr + + dom = minpoly.get_domain() + + if coeffs is not None: + if not isinstance(coeffs, ANP): + rep = DMP.from_sympy_list(sympify(coeffs), 0, dom) + scoeffs = Tuple(*coeffs) + else: + rep = DMP.from_list(coeffs.to_list(), 0, dom) + scoeffs = Tuple(*coeffs.to_list()) + + else: + rep = DMP.from_list([1, 0], 0, dom) + scoeffs = Tuple(1, 0) + + if rep0 is not None: + from sympy.polys.densetools import dup_compose + c = dup_compose(rep.to_list(), rep0.to_list(), dom) + rep = DMP.from_list(c, 0, dom) + scoeffs = Tuple(*c) + + if rep.degree() >= minpoly.degree(): + rep = rep.rem(minpoly.rep) + + sargs = (root, scoeffs) + + alias = alias or alias0 + if alias is not None: + from .symbol import Symbol + if not isinstance(alias, Symbol): + alias = Symbol(alias) + sargs = sargs + (alias,) + + obj = Expr.__new__(cls, *sargs) + + obj.rep = rep + obj.root = root + obj.alias = alias + obj.minpoly = minpoly + + obj._own_minpoly = None + + return obj + + def __hash__(self): + return super().__hash__() + + def _eval_evalf(self, prec): + return self.as_expr()._evalf(prec) + + @property + def is_aliased(self): + """Returns ``True`` if ``alias`` was set. """ + return self.alias is not None + + def as_poly(self, x=None): + """Create a Poly instance from ``self``. """ + from sympy.polys.polytools import Poly, PurePoly + if x is not None: + return Poly.new(self.rep, x) + else: + if self.alias is not None: + return Poly.new(self.rep, self.alias) + else: + from .symbol import Dummy + return PurePoly.new(self.rep, Dummy('x')) + + def as_expr(self, x=None): + """Create a Basic expression from ``self``. """ + return self.as_poly(x or self.root).as_expr().expand() + + def coeffs(self): + """Returns all SymPy coefficients of an algebraic number. """ + return [ self.rep.dom.to_sympy(c) for c in self.rep.all_coeffs() ] + + def native_coeffs(self): + """Returns all native coefficients of an algebraic number. """ + return self.rep.all_coeffs() + + def to_algebraic_integer(self): + """Convert ``self`` to an algebraic integer. """ + from sympy.polys.polytools import Poly + + f = self.minpoly + + if f.LC() == 1: + return self + + coeff = f.LC()**(f.degree() - 1) + poly = f.compose(Poly(f.gen/f.LC())) + + minpoly = poly*coeff + root = f.LC()*self.root + + return AlgebraicNumber((minpoly, root), self.coeffs()) + + def _eval_simplify(self, **kwargs): + from sympy.polys.rootoftools import CRootOf + from sympy.polys import minpoly + measure, ratio = kwargs['measure'], kwargs['ratio'] + for r in [r for r in self.minpoly.all_roots() if r.func != CRootOf]: + if minpoly(self.root - r).is_Symbol: + # use the matching root if it's simpler + if measure(r) < ratio*measure(self.root): + return AlgebraicNumber(r) + return self + + def field_element(self, coeffs): + r""" + Form another element of the same number field. + + Explanation + =========== + + If we represent $\alpha \in \mathbb{Q}(\theta)$, form another element + $\beta \in \mathbb{Q}(\theta)$ of the same number field. + + Parameters + ========== + + coeffs : list, :py:class:`~.ANP` + Like the *coeffs* arg to the class + :py:meth:`constructor<.AlgebraicNumber.__new__>`, defines the + new element as a polynomial in the primitive element. + + If a list, the elements should be integers or rational numbers. + If an :py:class:`~.ANP`, we take its coefficients (using its + :py:meth:`~.ANP.to_list()` method). + + Examples + ======== + + >>> from sympy import AlgebraicNumber, sqrt + >>> a = AlgebraicNumber(sqrt(5), [-1, 1]) + >>> b = a.field_element([3, 2]) + >>> print(a) + 1 - sqrt(5) + >>> print(b) + 2 + 3*sqrt(5) + >>> print(b.primitive_element() == a.primitive_element()) + True + + See Also + ======== + + AlgebraicNumber + """ + return AlgebraicNumber( + (self.minpoly, self.root), coeffs=coeffs, alias=self.alias) + + @property + def is_primitive_element(self): + r""" + Say whether this algebraic number $\alpha \in \mathbb{Q}(\theta)$ is + equal to the primitive element $\theta$ for its field. + """ + c = self.coeffs() + # Second case occurs if self.minpoly is linear: + return c == [1, 0] or c == [self.root] + + def primitive_element(self): + r""" + Get the primitive element $\theta$ for the number field + $\mathbb{Q}(\theta)$ to which this algebraic number $\alpha$ belongs. + + Returns + ======= + + AlgebraicNumber + + """ + if self.is_primitive_element: + return self + return self.field_element([1, 0]) + + def to_primitive_element(self, radicals=True): + r""" + Convert ``self`` to an :py:class:`~.AlgebraicNumber` instance that is + equal to its own primitive element. + + Explanation + =========== + + If we represent $\alpha \in \mathbb{Q}(\theta)$, $\alpha \neq \theta$, + construct a new :py:class:`~.AlgebraicNumber` that represents + $\alpha \in \mathbb{Q}(\alpha)$. + + Examples + ======== + + >>> from sympy import sqrt, to_number_field + >>> from sympy.abc import x + >>> a = to_number_field(sqrt(2), sqrt(2) + sqrt(3)) + + The :py:class:`~.AlgebraicNumber` ``a`` represents the number + $\sqrt{2}$ in the field $\mathbb{Q}(\sqrt{2} + \sqrt{3})$. Rendering + ``a`` as a polynomial, + + >>> a.as_poly().as_expr(x) + x**3/2 - 9*x/2 + + reflects the fact that $\sqrt{2} = \theta^3/2 - 9 \theta/2$, where + $\theta = \sqrt{2} + \sqrt{3}$. + + ``a`` is not equal to its own primitive element. Its minpoly + + >>> a.minpoly.as_poly().as_expr(x) + x**4 - 10*x**2 + 1 + + is that of $\theta$. + + Converting to a primitive element, + + >>> a_prim = a.to_primitive_element() + >>> a_prim.minpoly.as_poly().as_expr(x) + x**2 - 2 + + we obtain an :py:class:`~.AlgebraicNumber` whose ``minpoly`` is that of + the number itself. + + Parameters + ========== + + radicals : boolean, optional (default=True) + If ``True``, then we will try to return an + :py:class:`~.AlgebraicNumber` whose ``root`` is an expression + in radicals. If that is not possible (or if *radicals* is + ``False``), ``root`` will be a :py:class:`~.ComplexRootOf`. + + Returns + ======= + + AlgebraicNumber + + See Also + ======== + + is_primitive_element + + """ + if self.is_primitive_element: + return self + m = self.minpoly_of_element() + r = self.to_root(radicals=radicals) + return AlgebraicNumber((m, r)) + + def minpoly_of_element(self): + r""" + Compute the minimal polynomial for this algebraic number. + + Explanation + =========== + + Recall that we represent an element $\alpha \in \mathbb{Q}(\theta)$. + Our instance attribute ``self.minpoly`` is the minimal polynomial for + our primitive element $\theta$. This method computes the minimal + polynomial for $\alpha$. + + """ + if self._own_minpoly is None: + if self.is_primitive_element: + self._own_minpoly = self.minpoly + else: + from sympy.polys.numberfields.minpoly import minpoly + theta = self.primitive_element() + self._own_minpoly = minpoly(self.as_expr(theta), polys=True) + return self._own_minpoly + + def to_root(self, radicals=True, minpoly=None): + """ + Convert to an :py:class:`~.Expr` that is not an + :py:class:`~.AlgebraicNumber`, specifically, either a + :py:class:`~.ComplexRootOf`, or, optionally and where possible, an + expression in radicals. + + Parameters + ========== + + radicals : boolean, optional (default=True) + If ``True``, then we will try to return the root as an expression + in radicals. If that is not possible, we will return a + :py:class:`~.ComplexRootOf`. + + minpoly : :py:class:`~.Poly` + If the minimal polynomial for `self` has been pre-computed, it can + be passed in order to save time. + + """ + if self.is_primitive_element and not isinstance(self.root, AlgebraicNumber): + return self.root + m = minpoly or self.minpoly_of_element() + roots = m.all_roots(radicals=radicals) + if len(roots) == 1: + return roots[0] + ex = self.as_expr() + for b in roots: + if m.same_root(b, ex): + return b + + +class RationalConstant(Rational): + """ + Abstract base class for rationals with specific behaviors + + Derived classes must define class attributes p and q and should probably all + be singletons. + """ + __slots__ = () + + def __new__(cls): + return AtomicExpr.__new__(cls) + + +class IntegerConstant(Integer): + __slots__ = () + + def __new__(cls): + return AtomicExpr.__new__(cls) + + +class Zero(IntegerConstant, metaclass=Singleton): + """The number zero. + + Zero is a singleton, and can be accessed by ``S.Zero`` + + Examples + ======== + + >>> from sympy import S, Integer + >>> Integer(0) is S.Zero + True + >>> 1/S.Zero + zoo + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Zero + """ + + p = 0 + q = 1 + is_positive = False + is_negative = False + is_zero = True + is_number = True + is_comparable = True + + __slots__ = () + + def __getnewargs__(self): + return () + + @staticmethod + def __abs__(): + return S.Zero + + @staticmethod + def __neg__(): + return S.Zero + + def _eval_power(self, expt): + if expt.is_extended_positive: + return self + if expt.is_extended_negative: + return S.ComplexInfinity + if expt.is_extended_real is False: + return S.NaN + if expt.is_zero: + return S.One + + # infinities are already handled with pos and neg + # tests above; now throw away leading numbers on Mul + # exponent since 0**-x = zoo**x even when x == 0 + coeff, terms = expt.as_coeff_Mul() + if coeff.is_negative: + return S.ComplexInfinity**terms + if coeff is not S.One: # there is a Number to discard + return self**terms + + def _eval_order(self, *symbols): + # Order(0,x) -> 0 + return self + + def __bool__(self): + return False + + +class One(IntegerConstant, metaclass=Singleton): + """The number one. + + One is a singleton, and can be accessed by ``S.One``. + + Examples + ======== + + >>> from sympy import S, Integer + >>> Integer(1) is S.One + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/1_%28number%29 + """ + is_number = True + is_positive = True + + p = 1 + q = 1 + + __slots__ = () + + def __getnewargs__(self): + return () + + @staticmethod + def __abs__(): + return S.One + + @staticmethod + def __neg__(): + return S.NegativeOne + + def _eval_power(self, expt): + return self + + def _eval_order(self, *symbols): + return + + @staticmethod + def factors(limit=None, use_trial=True, use_rho=False, use_pm1=False, + verbose=False, visual=False): + if visual: + return S.One + else: + return {} + + +class NegativeOne(IntegerConstant, metaclass=Singleton): + """The number negative one. + + NegativeOne is a singleton, and can be accessed by ``S.NegativeOne``. + + Examples + ======== + + >>> from sympy import S, Integer + >>> Integer(-1) is S.NegativeOne + True + + See Also + ======== + + One + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/%E2%88%921_%28number%29 + + """ + is_number = True + + p = -1 + q = 1 + + __slots__ = () + + def __getnewargs__(self): + return () + + @staticmethod + def __abs__(): + return S.One + + @staticmethod + def __neg__(): + return S.One + + def _eval_power(self, expt): + if expt.is_odd: + return S.NegativeOne + if expt.is_even: + return S.One + if isinstance(expt, Number): + if isinstance(expt, Float): + return Float(-1.0)**expt + if expt is S.NaN: + return S.NaN + if expt in (S.Infinity, S.NegativeInfinity): + return S.NaN + if expt is S.Half: + return S.ImaginaryUnit + if isinstance(expt, Rational): + if expt.q == 2: + return S.ImaginaryUnit**Integer(expt.p) + i, r = divmod(expt.p, expt.q) + if i: + return self**i*self**Rational(r, expt.q) + return + + +class Half(RationalConstant, metaclass=Singleton): + """The rational number 1/2. + + Half is a singleton, and can be accessed by ``S.Half``. + + Examples + ======== + + >>> from sympy import S, Rational + >>> Rational(1, 2) is S.Half + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/One_half + """ + is_number = True + + p = 1 + q = 2 + + __slots__ = () + + def __getnewargs__(self): + return () + + @staticmethod + def __abs__(): + return S.Half + + +class Infinity(Number, metaclass=Singleton): + r"""Positive infinite quantity. + + Explanation + =========== + + In real analysis the symbol `\infty` denotes an unbounded + limit: `x\to\infty` means that `x` grows without bound. + + Infinity is often used not only to define a limit but as a value + in the affinely extended real number system. Points labeled `+\infty` + and `-\infty` can be added to the topological space of the real numbers, + producing the two-point compactification of the real numbers. Adding + algebraic properties to this gives us the extended real numbers. + + Infinity is a singleton, and can be accessed by ``S.Infinity``, + or can be imported as ``oo``. + + Examples + ======== + + >>> from sympy import oo, exp, limit, Symbol + >>> 1 + oo + oo + >>> 42/oo + 0 + >>> x = Symbol('x') + >>> limit(exp(x), x, oo) + oo + + See Also + ======== + + NegativeInfinity, NaN + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Infinity + """ + + is_commutative = True + is_number = True + is_complex = False + is_extended_real = True + is_infinite = True + is_comparable = True + is_extended_positive = True + is_prime = False + + __slots__ = () + + def __new__(cls): + return AtomicExpr.__new__(cls) + + def _latex(self, printer): + return r"\infty" + + def _eval_subs(self, old, new): + if self == old: + return new + + def _eval_evalf(self, prec=None): + return Float('inf') + + def evalf(self, prec=None, **options): + return self._eval_evalf(prec) + + @_sympifyit('other', NotImplemented) + def __add__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other in (S.NegativeInfinity, S.NaN): + return S.NaN + return self + return Number.__add__(self, other) + __radd__ = __add__ + + @_sympifyit('other', NotImplemented) + def __sub__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other in (S.Infinity, S.NaN): + return S.NaN + return self + return Number.__sub__(self, other) + + @_sympifyit('other', NotImplemented) + def __rsub__(self, other): + return (-self).__add__(other) + + @_sympifyit('other', NotImplemented) + def __mul__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other.is_zero or other is S.NaN: + return S.NaN + if other.is_extended_positive: + return self + return S.NegativeInfinity + return Number.__mul__(self, other) + __rmul__ = __mul__ + + @_sympifyit('other', NotImplemented) + def __truediv__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other is S.Infinity or \ + other is S.NegativeInfinity or \ + other is S.NaN: + return S.NaN + if other.is_extended_nonnegative: + return self + return S.NegativeInfinity + return Number.__truediv__(self, other) + + def __abs__(self): + return S.Infinity + + def __neg__(self): + return S.NegativeInfinity + + def _eval_power(self, expt): + """ + ``expt`` is symbolic object but not equal to 0 or 1. + + ================ ======= ============================== + Expression Result Notes + ================ ======= ============================== + ``oo ** nan`` ``nan`` + ``oo ** -p`` ``0`` ``p`` is number, ``oo`` + ================ ======= ============================== + + See Also + ======== + Pow + NaN + NegativeInfinity + + """ + if expt.is_extended_positive: + return S.Infinity + if expt.is_extended_negative: + return S.Zero + if expt is S.NaN: + return S.NaN + if expt is S.ComplexInfinity: + return S.NaN + if expt.is_extended_real is False and expt.is_number: + from sympy.functions.elementary.complexes import re + expt_real = re(expt) + if expt_real.is_positive: + return S.ComplexInfinity + if expt_real.is_negative: + return S.Zero + if expt_real.is_zero: + return S.NaN + + return self**expt.evalf() + + def _as_mpf_val(self, prec): + return mlib.finf + + def __hash__(self): + return super().__hash__() + + def __eq__(self, other): + return other is S.Infinity or other == float('inf') + + def __ne__(self, other): + return other is not S.Infinity and other != float('inf') + + __gt__ = Expr.__gt__ + __ge__ = Expr.__ge__ + __lt__ = Expr.__lt__ + __le__ = Expr.__le__ + + @_sympifyit('other', NotImplemented) + def __mod__(self, other): + if not isinstance(other, Expr): + return NotImplemented + return S.NaN + + __rmod__ = __mod__ + + def floor(self): + return self + + def ceiling(self): + return self + +oo = S.Infinity + + +class NegativeInfinity(Number, metaclass=Singleton): + """Negative infinite quantity. + + NegativeInfinity is a singleton, and can be accessed + by ``S.NegativeInfinity``. + + See Also + ======== + + Infinity + """ + + is_extended_real = True + is_complex = False + is_commutative = True + is_infinite = True + is_comparable = True + is_extended_negative = True + is_number = True + is_prime = False + + __slots__ = () + + def __new__(cls): + return AtomicExpr.__new__(cls) + + def _latex(self, printer): + return r"-\infty" + + def _eval_subs(self, old, new): + if self == old: + return new + + def _eval_evalf(self, prec=None): + return Float('-inf') + + def evalf(self, prec=None, **options): + return self._eval_evalf(prec) + + @_sympifyit('other', NotImplemented) + def __add__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other in (S.Infinity, S.NaN): + return S.NaN + return self + return Number.__add__(self, other) + __radd__ = __add__ + + @_sympifyit('other', NotImplemented) + def __sub__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other in (S.NegativeInfinity, S.NaN): + return S.NaN + return self + return Number.__sub__(self, other) + + @_sympifyit('other', NotImplemented) + def __rsub__(self, other): + return (-self).__add__(other) + + @_sympifyit('other', NotImplemented) + def __mul__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other.is_zero or other is S.NaN: + return S.NaN + if other.is_extended_positive: + return self + return S.Infinity + return Number.__mul__(self, other) + __rmul__ = __mul__ + + @_sympifyit('other', NotImplemented) + def __truediv__(self, other): + if isinstance(other, Number) and global_parameters.evaluate: + if other is S.Infinity or \ + other is S.NegativeInfinity or \ + other is S.NaN: + return S.NaN + if other.is_extended_nonnegative: + return self + return S.Infinity + return Number.__truediv__(self, other) + + def __abs__(self): + return S.Infinity + + def __neg__(self): + return S.Infinity + + def _eval_power(self, expt): + """ + ``expt`` is symbolic object but not equal to 0 or 1. + + ================ ======= ============================== + Expression Result Notes + ================ ======= ============================== + ``(-oo) ** nan`` ``nan`` + ``(-oo) ** oo`` ``nan`` + ``(-oo) ** -oo`` ``nan`` + ``(-oo) ** e`` ``oo`` ``e`` is positive even integer + ``(-oo) ** o`` ``-oo`` ``o`` is positive odd integer + ================ ======= ============================== + + See Also + ======== + + Infinity + Pow + NaN + + """ + if expt.is_number: + if expt is S.NaN or \ + expt is S.Infinity or \ + expt is S.NegativeInfinity: + return S.NaN + + if isinstance(expt, Integer) and expt.is_extended_positive: + if expt.is_odd: + return S.NegativeInfinity + else: + return S.Infinity + + inf_part = S.Infinity**expt + s_part = S.NegativeOne**expt + if inf_part == 0 and s_part.is_finite: + return inf_part + if (inf_part is S.ComplexInfinity and + s_part.is_finite and not s_part.is_zero): + return S.ComplexInfinity + return s_part*inf_part + + def _as_mpf_val(self, prec): + return mlib.fninf + + def __hash__(self): + return super().__hash__() + + def __eq__(self, other): + return other is S.NegativeInfinity or other == float('-inf') + + def __ne__(self, other): + return other is not S.NegativeInfinity and other != float('-inf') + + __gt__ = Expr.__gt__ + __ge__ = Expr.__ge__ + __lt__ = Expr.__lt__ + __le__ = Expr.__le__ + + @_sympifyit('other', NotImplemented) + def __mod__(self, other): + if not isinstance(other, Expr): + return NotImplemented + return S.NaN + + __rmod__ = __mod__ + + def floor(self): + return self + + def ceiling(self): + return self + + def as_powers_dict(self): + return {S.NegativeOne: 1, S.Infinity: 1} + + +class NaN(Number, metaclass=Singleton): + """ + Not a Number. + + Explanation + =========== + + This serves as a place holder for numeric values that are indeterminate. + Most operations on NaN, produce another NaN. Most indeterminate forms, + such as ``0/0`` or ``oo - oo` produce NaN. Two exceptions are ``0**0`` + and ``oo**0``, which all produce ``1`` (this is consistent with Python's + float). + + NaN is loosely related to floating point nan, which is defined in the + IEEE 754 floating point standard, and corresponds to the Python + ``float('nan')``. Differences are noted below. + + NaN is mathematically not equal to anything else, even NaN itself. This + explains the initially counter-intuitive results with ``Eq`` and ``==`` in + the examples below. + + NaN is not comparable so inequalities raise a TypeError. This is in + contrast with floating point nan where all inequalities are false. + + NaN is a singleton, and can be accessed by ``S.NaN``, or can be imported + as ``nan``. + + Examples + ======== + + >>> from sympy import nan, S, oo, Eq + >>> nan is S.NaN + True + >>> oo - oo + nan + >>> nan + 1 + nan + >>> Eq(nan, nan) # mathematical equality + False + >>> nan == nan # structural equality + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/NaN + + """ + is_commutative = True + is_extended_real = None + is_real = None + is_rational = None + is_algebraic = None + is_transcendental = None + is_integer = None + is_comparable = False + is_finite = None + is_zero = None + is_prime = None + is_positive = None + is_negative = None + is_number = True + + __slots__ = () + + def __new__(cls): + return AtomicExpr.__new__(cls) + + def _latex(self, printer): + return r"\text{NaN}" + + def __neg__(self): + return self + + @_sympifyit('other', NotImplemented) + def __add__(self, other): + return self + + @_sympifyit('other', NotImplemented) + def __sub__(self, other): + return self + + @_sympifyit('other', NotImplemented) + def __mul__(self, other): + return self + + @_sympifyit('other', NotImplemented) + def __truediv__(self, other): + return self + + def floor(self): + return self + + def ceiling(self): + return self + + def _as_mpf_val(self, prec): + return _mpf_nan + + def __hash__(self): + return super().__hash__() + + def __eq__(self, other): + # NaN is structurally equal to another NaN + return other is S.NaN + + def __ne__(self, other): + return other is not S.NaN + + # Expr will _sympify and raise TypeError + __gt__ = Expr.__gt__ + __ge__ = Expr.__ge__ + __lt__ = Expr.__lt__ + __le__ = Expr.__le__ + +nan = S.NaN + +@dispatch(NaN, Expr) # type:ignore +def _eval_is_eq(a, b): # noqa:F811 + return False + + +class ComplexInfinity(AtomicExpr, metaclass=Singleton): + r"""Complex infinity. + + Explanation + =========== + + In complex analysis the symbol `\tilde\infty`, called "complex + infinity", represents a quantity with infinite magnitude, but + undetermined complex phase. + + ComplexInfinity is a singleton, and can be accessed by + ``S.ComplexInfinity``, or can be imported as ``zoo``. + + Examples + ======== + + >>> from sympy import zoo + >>> zoo + 42 + zoo + >>> 42/zoo + 0 + >>> zoo + zoo + nan + >>> zoo*zoo + zoo + + See Also + ======== + + Infinity + """ + + is_commutative = True + is_infinite = True + is_number = True + is_prime = False + is_complex = False + is_extended_real = False + + kind = NumberKind + + __slots__ = () + + def __new__(cls): + return AtomicExpr.__new__(cls) + + def _latex(self, printer): + return r"\tilde{\infty}" + + @staticmethod + def __abs__(): + return S.Infinity + + def floor(self): + return self + + def ceiling(self): + return self + + @staticmethod + def __neg__(): + return S.ComplexInfinity + + def _eval_power(self, expt): + if expt is S.ComplexInfinity: + return S.NaN + + if isinstance(expt, Number): + if expt.is_zero: + return S.NaN + else: + if expt.is_positive: + return S.ComplexInfinity + else: + return S.Zero + + +zoo = S.ComplexInfinity + + +class NumberSymbol(AtomicExpr): + + is_commutative = True + is_finite = True + is_number = True + + __slots__ = () + + is_NumberSymbol = True + + kind = NumberKind + + def __new__(cls): + return AtomicExpr.__new__(cls) + + def approximation(self, number_cls): + """ Return an interval with number_cls endpoints + that contains the value of NumberSymbol. + If not implemented, then return None. + """ + + def _eval_evalf(self, prec): + return Float._new(self._as_mpf_val(prec), prec) + + def __eq__(self, other): + try: + other = _sympify(other) + except SympifyError: + return NotImplemented + if self is other: + return True + if other.is_Number and self.is_irrational: + return False + + return False # NumberSymbol != non-(Number|self) + + def __ne__(self, other): + return not self == other + + def __le__(self, other): + if self is other: + return S.true + return Expr.__le__(self, other) + + def __ge__(self, other): + if self is other: + return S.true + return Expr.__ge__(self, other) + + def __int__(self): + # subclass with appropriate return value + raise NotImplementedError + + def __hash__(self): + return super().__hash__() + + +class Exp1(NumberSymbol, metaclass=Singleton): + r"""The `e` constant. + + Explanation + =========== + + The transcendental number `e = 2.718281828\ldots` is the base of the + natural logarithm and of the exponential function, `e = \exp(1)`. + Sometimes called Euler's number or Napier's constant. + + Exp1 is a singleton, and can be accessed by ``S.Exp1``, + or can be imported as ``E``. + + Examples + ======== + + >>> from sympy import exp, log, E + >>> E is exp(1) + True + >>> log(E) + 1 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/E_%28mathematical_constant%29 + """ + + is_real = True + is_positive = True + is_negative = False # XXX Forces is_negative/is_nonnegative + is_irrational = True + is_number = True + is_algebraic = False + is_transcendental = True + + __slots__ = () + + def _latex(self, printer): + return r"e" + + @staticmethod + def __abs__(): + return S.Exp1 + + def __int__(self): + return 2 + + def _as_mpf_val(self, prec): + return mpf_e(prec) + + def approximation_interval(self, number_cls): + if issubclass(number_cls, Integer): + return (Integer(2), Integer(3)) + elif issubclass(number_cls, Rational): + pass + + def _eval_power(self, expt): + if global_parameters.exp_is_pow: + return self._eval_power_exp_is_pow(expt) + else: + from sympy.functions.elementary.exponential import exp + return exp(expt) + + def _eval_power_exp_is_pow(self, arg): + if arg.is_Number: + if arg is oo: + return oo + elif arg == -oo: + return S.Zero + from sympy.functions.elementary.exponential import log + if isinstance(arg, log): + return arg.args[0] + + # don't autoexpand Pow or Mul (see the issue 3351): + elif not arg.is_Add: + Ioo = I*oo + if arg in [Ioo, -Ioo]: + return nan + + coeff = arg.coeff(pi*I) + if coeff: + if (2*coeff).is_integer: + if coeff.is_even: + return S.One + elif coeff.is_odd: + return S.NegativeOne + elif (coeff + S.Half).is_even: + return -I + elif (coeff + S.Half).is_odd: + return I + elif coeff.is_Rational: + ncoeff = coeff % 2 # restrict to [0, 2pi) + if ncoeff > 1: # restrict to (-pi, pi] + ncoeff -= 2 + if ncoeff != coeff: + return S.Exp1**(ncoeff*S.Pi*S.ImaginaryUnit) + + # Warning: code in risch.py will be very sensitive to changes + # in this (see DifferentialExtension). + + # look for a single log factor + + coeff, terms = arg.as_coeff_Mul() + + # but it can't be multiplied by oo + if coeff in (oo, -oo): + return + + coeffs, log_term = [coeff], None + for term in Mul.make_args(terms): + if isinstance(term, log): + if log_term is None: + log_term = term.args[0] + else: + return + elif term.is_comparable: + coeffs.append(term) + else: + return + + return log_term**Mul(*coeffs) if log_term else None + elif arg.is_Add: + out = [] + add = [] + argchanged = False + for a in arg.args: + if a is S.One: + add.append(a) + continue + newa = self**a + if isinstance(newa, Pow) and newa.base is self: + if newa.exp != a: + add.append(newa.exp) + argchanged = True + else: + add.append(a) + else: + out.append(newa) + if out or argchanged: + return Mul(*out)*Pow(self, Add(*add), evaluate=False) + elif arg.is_Matrix: + return arg.exp() + + def _eval_rewrite_as_sin(self, **kwargs): + from sympy.functions.elementary.trigonometric import sin + return sin(I + S.Pi/2) - I*sin(I) + + def _eval_rewrite_as_cos(self, **kwargs): + from sympy.functions.elementary.trigonometric import cos + return cos(I) + I*cos(I + S.Pi/2) + +E = S.Exp1 + + +class Pi(NumberSymbol, metaclass=Singleton): + r"""The `\pi` constant. + + Explanation + =========== + + The transcendental number `\pi = 3.141592654\ldots` represents the ratio + of a circle's circumference to its diameter, the area of the unit circle, + the half-period of trigonometric functions, and many other things + in mathematics. + + Pi is a singleton, and can be accessed by ``S.Pi``, or can + be imported as ``pi``. + + Examples + ======== + + >>> from sympy import S, pi, oo, sin, exp, integrate, Symbol + >>> S.Pi + pi + >>> pi > 3 + True + >>> pi.is_irrational + True + >>> x = Symbol('x') + >>> sin(x + 2*pi) + sin(x) + >>> integrate(exp(-x**2), (x, -oo, oo)) + sqrt(pi) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Pi + """ + + is_real = True + is_positive = True + is_negative = False + is_irrational = True + is_number = True + is_algebraic = False + is_transcendental = True + + __slots__ = () + + def _latex(self, printer): + return r"\pi" + + @staticmethod + def __abs__(): + return S.Pi + + def __int__(self): + return 3 + + def _as_mpf_val(self, prec): + return mpf_pi(prec) + + def approximation_interval(self, number_cls): + if issubclass(number_cls, Integer): + return (Integer(3), Integer(4)) + elif issubclass(number_cls, Rational): + return (Rational(223, 71, 1), Rational(22, 7, 1)) + +pi = S.Pi + + +class GoldenRatio(NumberSymbol, metaclass=Singleton): + r"""The golden ratio, `\phi`. + + Explanation + =========== + + `\phi = \frac{1 + \sqrt{5}}{2}` is an algebraic number. Two quantities + are in the golden ratio if their ratio is the same as the ratio of + their sum to the larger of the two quantities, i.e. their maximum. + + GoldenRatio is a singleton, and can be accessed by ``S.GoldenRatio``. + + Examples + ======== + + >>> from sympy import S + >>> S.GoldenRatio > 1 + True + >>> S.GoldenRatio.expand(func=True) + 1/2 + sqrt(5)/2 + >>> S.GoldenRatio.is_irrational + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Golden_ratio + """ + + is_real = True + is_positive = True + is_negative = False + is_irrational = True + is_number = True + is_algebraic = True + is_transcendental = False + + __slots__ = () + + def _latex(self, printer): + return r"\phi" + + def __int__(self): + return 1 + + def _as_mpf_val(self, prec): + # XXX track down why this has to be increased + rv = mlib.from_man_exp(phi_fixed(prec + 10), -prec - 10) + return mpf_norm(rv, prec) + + def _eval_expand_func(self, **hints): + from sympy.functions.elementary.miscellaneous import sqrt + return S.Half + S.Half*sqrt(5) + + def approximation_interval(self, number_cls): + if issubclass(number_cls, Integer): + return (S.One, Rational(2)) + elif issubclass(number_cls, Rational): + pass + + _eval_rewrite_as_sqrt = _eval_expand_func + + +class TribonacciConstant(NumberSymbol, metaclass=Singleton): + r"""The tribonacci constant. + + Explanation + =========== + + The tribonacci numbers are like the Fibonacci numbers, but instead + of starting with two predetermined terms, the sequence starts with + three predetermined terms and each term afterwards is the sum of the + preceding three terms. + + The tribonacci constant is the ratio toward which adjacent tribonacci + numbers tend. It is a root of the polynomial `x^3 - x^2 - x - 1 = 0`, + and also satisfies the equation `x + x^{-3} = 2`. + + TribonacciConstant is a singleton, and can be accessed + by ``S.TribonacciConstant``. + + Examples + ======== + + >>> from sympy import S + >>> S.TribonacciConstant > 1 + True + >>> S.TribonacciConstant.expand(func=True) + 1/3 + (19 - 3*sqrt(33))**(1/3)/3 + (3*sqrt(33) + 19)**(1/3)/3 + >>> S.TribonacciConstant.is_irrational + True + >>> S.TribonacciConstant.n(20) + 1.8392867552141611326 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Generalizations_of_Fibonacci_numbers#Tribonacci_numbers + """ + + is_real = True + is_positive = True + is_negative = False + is_irrational = True + is_number = True + is_algebraic = True + is_transcendental = False + + __slots__ = () + + def _latex(self, printer): + return r"\text{TribonacciConstant}" + + def __int__(self): + return 1 + + def _as_mpf_val(self, prec): + return self._eval_evalf(prec)._mpf_ + + def _eval_evalf(self, prec): + rv = self._eval_expand_func(function=True)._eval_evalf(prec + 4) + return Float(rv, precision=prec) + + def _eval_expand_func(self, **hints): + from sympy.functions.elementary.miscellaneous import cbrt, sqrt + return (1 + cbrt(19 - 3*sqrt(33)) + cbrt(19 + 3*sqrt(33))) / 3 + + def approximation_interval(self, number_cls): + if issubclass(number_cls, Integer): + return (S.One, Rational(2)) + elif issubclass(number_cls, Rational): + pass + + _eval_rewrite_as_sqrt = _eval_expand_func + + +class EulerGamma(NumberSymbol, metaclass=Singleton): + r"""The Euler-Mascheroni constant. + + Explanation + =========== + + `\gamma = 0.5772157\ldots` (also called Euler's constant) is a mathematical + constant recurring in analysis and number theory. It is defined as the + limiting difference between the harmonic series and the + natural logarithm: + + .. math:: \gamma = \lim\limits_{n\to\infty} + \left(\sum\limits_{k=1}^n\frac{1}{k} - \ln n\right) + + EulerGamma is a singleton, and can be accessed by ``S.EulerGamma``. + + Examples + ======== + + >>> from sympy import S + >>> S.EulerGamma.is_irrational + >>> S.EulerGamma > 0 + True + >>> S.EulerGamma > 1 + False + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Euler%E2%80%93Mascheroni_constant + """ + + is_real = True + is_positive = True + is_negative = False + is_irrational = None + is_number = True + + __slots__ = () + + def _latex(self, printer): + return r"\gamma" + + def __int__(self): + return 0 + + def _as_mpf_val(self, prec): + # XXX track down why this has to be increased + v = mlib.libhyper.euler_fixed(prec + 10) + rv = mlib.from_man_exp(v, -prec - 10) + return mpf_norm(rv, prec) + + def approximation_interval(self, number_cls): + if issubclass(number_cls, Integer): + return (S.Zero, S.One) + elif issubclass(number_cls, Rational): + return (S.Half, Rational(3, 5, 1)) + + +class Catalan(NumberSymbol, metaclass=Singleton): + r"""Catalan's constant. + + Explanation + =========== + + $G = 0.91596559\ldots$ is given by the infinite series + + .. math:: G = \sum_{k=0}^{\infty} \frac{(-1)^k}{(2k+1)^2} + + Catalan is a singleton, and can be accessed by ``S.Catalan``. + + Examples + ======== + + >>> from sympy import S + >>> S.Catalan.is_irrational + >>> S.Catalan > 0 + True + >>> S.Catalan > 1 + False + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Catalan%27s_constant + """ + + is_real = True + is_positive = True + is_negative = False + is_irrational = None + is_number = True + + __slots__ = () + + def __int__(self): + return 0 + + def _as_mpf_val(self, prec): + # XXX track down why this has to be increased + v = mlib.catalan_fixed(prec + 10) + rv = mlib.from_man_exp(v, -prec - 10) + return mpf_norm(rv, prec) + + def approximation_interval(self, number_cls): + if issubclass(number_cls, Integer): + return (S.Zero, S.One) + elif issubclass(number_cls, Rational): + return (Rational(9, 10, 1), S.One) + + def _eval_rewrite_as_Sum(self, k_sym=None, symbols=None, **hints): + if (k_sym is not None) or (symbols is not None): + return self + from .symbol import Dummy + from sympy.concrete.summations import Sum + k = Dummy('k', integer=True, nonnegative=True) + return Sum(S.NegativeOne**k / (2*k+1)**2, (k, 0, S.Infinity)) + + def _latex(self, printer): + return "G" + + +class ImaginaryUnit(AtomicExpr, metaclass=Singleton): + r"""The imaginary unit, `i = \sqrt{-1}`. + + I is a singleton, and can be accessed by ``S.I``, or can be + imported as ``I``. + + Examples + ======== + + >>> from sympy import I, sqrt + >>> sqrt(-1) + I + >>> I*I + -1 + >>> 1/I + -I + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Imaginary_unit + """ + + is_commutative = True + is_imaginary = True + is_finite = True + is_number = True + is_algebraic = True + is_transcendental = False + + kind = NumberKind + + __slots__ = () + + def _latex(self, printer): + return printer._settings['imaginary_unit_latex'] + + @staticmethod + def __abs__(): + return S.One + + def _eval_evalf(self, prec): + return self + + def _eval_conjugate(self): + return -S.ImaginaryUnit + + def _eval_power(self, expt): + """ + b is I = sqrt(-1) + e is symbolic object but not equal to 0, 1 + + I**r -> (-1)**(r/2) -> exp(r/2*Pi*I) -> sin(Pi*r/2) + cos(Pi*r/2)*I, r is decimal + I**0 mod 4 -> 1 + I**1 mod 4 -> I + I**2 mod 4 -> -1 + I**3 mod 4 -> -I + """ + + if isinstance(expt, Integer): + expt = expt % 4 + if expt == 0: + return S.One + elif expt == 1: + return S.ImaginaryUnit + elif expt == 2: + return S.NegativeOne + elif expt == 3: + return -S.ImaginaryUnit + if isinstance(expt, Rational): + i, r = divmod(expt, 2) + rv = Pow(S.ImaginaryUnit, r, evaluate=False) + if i % 2: + return Mul(S.NegativeOne, rv, evaluate=False) + return rv + + def as_base_exp(self): + return S.NegativeOne, S.Half + + @property + def _mpc_(self): + return (Float(0)._mpf_, Float(1)._mpf_) + + +I = S.ImaginaryUnit + + +def int_valued(x): + """return True only for a literal Number whose internal + representation as a fraction has a denominator of 1, + else False, i.e. integer, with no fractional part. + """ + if isinstance(x, (SYMPY_INTS, int)): + return True + if type(x) is float: + return x.is_integer() + if isinstance(x, Integer): + return True + if isinstance(x, Float): + # x = s*m*2**p; _mpf_ = s,m,e,p + return x._mpf_[2] >= 0 + return False # or add new types to recognize + + +def equal_valued(x, y): + """Compare expressions treating plain floats as rationals. + + Examples + ======== + + >>> from sympy import S, symbols, Rational, Float + >>> from sympy.core.numbers import equal_valued + >>> equal_valued(1, 2) + False + >>> equal_valued(1, 1) + True + + In SymPy expressions with Floats compare unequal to corresponding + expressions with rationals: + + >>> x = symbols('x') + >>> x**2 == x**2.0 + False + + However an individual Float compares equal to a Rational: + + >>> Rational(1, 2) == Float(0.5) + False + + In a future version of SymPy this might change so that Rational and Float + compare unequal. This function provides the behavior currently expected of + ``==`` so that it could still be used if the behavior of ``==`` were to + change in future. + + >>> equal_valued(1, 1.0) # Float vs Rational + True + >>> equal_valued(S(1).n(3), S(1).n(5)) # Floats of different precision + True + + Explanation + =========== + + In future SymPy versions Float and Rational might compare unequal and floats + with different precisions might compare unequal. In that context a function + is needed that can check if a number is equal to 1 or 0 etc. The idea is + that instead of testing ``if x == 1:`` if we want to accept floats like + ``1.0`` as well then the test can be written as ``if equal_valued(x, 1):`` + or ``if equal_valued(x, 2):``. Since this function is intended to be used + in situations where one or both operands are expected to be concrete + numbers like 1 or 0 the function does not recurse through the args of any + compound expression to compare any nested floats. + + References + ========== + + .. [1] https://github.com/sympy/sympy/pull/20033 + """ + x = _sympify(x) + y = _sympify(y) + + # Handle everything except Float/Rational first + if not x.is_Float and not y.is_Float: + return x == y + elif x.is_Float and y.is_Float: + # Compare values without regard for precision + return x._mpf_ == y._mpf_ + elif x.is_Float: + x, y = y, x + if not x.is_Rational: + return False + + # Now y is Float and x is Rational. A simple approach at this point would + # just be x == Rational(y) but if y has a large exponent creating a + # Rational could be prohibitively expensive. + + sign, man, exp, _ = y._mpf_ + p, q = x.p, x.q + + if sign: + man = -man + + if exp == 0: + # y odd integer + return q == 1 and man == p + elif exp > 0: + # y even integer + if q != 1: + return False + if p.bit_length() != man.bit_length() + exp: + return False + return man << exp == p + else: + # y non-integer. Need p == man and q == 2**-exp + if p != man: + return False + neg_exp = -exp + if q.bit_length() - 1 != neg_exp: + return False + return (1 << neg_exp) == q + + +def all_close(expr1, expr2, rtol=1e-5, atol=1e-8): + """Return True if expr1 and expr2 are numerically close. + + The expressions must have the same structure, but any Rational, Integer, or + Float numbers they contain are compared approximately using rtol and atol. + Any other parts of expressions are compared exactly. However, allowance is + made to allow for the additive and multiplicative identities. + + Relative tolerance is measured with respect to expr2 so when used in + testing expr2 should be the expected correct answer. + + Examples + ======== + + >>> from sympy import exp + >>> from sympy.abc import x, y + >>> from sympy.core.numbers import all_close + >>> expr1 = 0.1*exp(x - y) + >>> expr2 = exp(x - y)/10 + >>> expr1 + 0.1*exp(x - y) + >>> expr2 + exp(x - y)/10 + >>> expr1 == expr2 + False + >>> all_close(expr1, expr2) + True + + Identities are automatically supplied: + + >>> all_close(x, x + 1e-10) + True + >>> all_close(x, 1.0*x) + True + >>> all_close(x, 1.0*x + 1e-10) + True + + """ + NUM_TYPES = (Rational, Float) + + def _all_close(obj1, obj2): + if type(obj1) == type(obj2) and isinstance(obj1, (list, tuple)): + if len(obj1) != len(obj2): + return False + return all(_all_close(e1, e2) for e1, e2 in zip(obj1, obj2)) + else: + return _all_close_expr(_sympify(obj1), _sympify(obj2)) + + def _all_close_expr(expr1, expr2): + num1 = isinstance(expr1, NUM_TYPES) + num2 = isinstance(expr2, NUM_TYPES) + if num1 != num2: + return False + elif num1: + return _close_num(expr1, expr2) + if expr1.is_Add or expr1.is_Mul or expr2.is_Add or expr2.is_Mul: + return _all_close_ac(expr1, expr2) + if expr1.func != expr2.func or len(expr1.args) != len(expr2.args): + return False + args = zip(expr1.args, expr2.args) + return all(_all_close_expr(a1, a2) for a1, a2 in args) + + def _close_num(num1, num2): + return bool(abs(num1 - num2) <= atol + rtol*abs(num2)) + + def _all_close_ac(expr1, expr2): + # compare expressions with associative commutative operators for + # approximate equality by seeing that all terms have equivalent + # coefficients (which are always Rational or Float) + if expr1.is_Mul or expr2.is_Mul: + # as_coeff_mul automatically will supply coeff of 1 + c1, e1 = expr1.as_coeff_mul(rational=False) + c2, e2 = expr2.as_coeff_mul(rational=False) + if not _close_num(c1, c2): + return False + s1 = set(e1) + s2 = set(e2) + common = s1 & s2 + s1 -= common + s2 -= common + if not s1: + return True + if not any(i.has(Float) for j in (s1, s2) for i in j): + return False + # factors might not be matching, e.g. + # x != x**1.0, exp(x) != exp(1.0*x), etc... + s1 = [i.as_base_exp() for i in ordered(s1)] + s2 = [i.as_base_exp() for i in ordered(s2)] + unmatched = list(range(len(s1))) + for be1 in s1: + for i in unmatched: + be2 = s2[i] + if _all_close(be1, be2): + unmatched.remove(i) + break + else: + return False + return not(unmatched) + assert expr1.is_Add or expr2.is_Add + cd1 = expr1.as_coefficients_dict() + cd2 = expr2.as_coefficients_dict() + # this test will assure that the key of 1 is in + # each dict and that they have equal values + if not _close_num(cd1[1], cd2[1]): + return False + if len(cd1) != len(cd2): + return False + for k in list(cd1): + if k in cd2: + if not _close_num(cd1.pop(k), cd2.pop(k)): + return False + # k (or a close version in cd2) might have + # Floats in a factor of the term which will + # be handled below + else: + if not cd1: + return True + for k1 in cd1: + for k2 in cd2: + if _all_close_expr(k1, k2): + # found a matching key + # XXX there could be a corner case where + # more than 1 might match and the numbers are + # such that one is better than the other + # that is not being considered here + if not _close_num(cd1[k1], cd2[k2]): + return False + break + else: + # no key matched + return False + return True + + return _all_close(expr1, expr2) + + +@dispatch(Tuple, Number) # type:ignore +def _eval_is_eq(self, other): # noqa: F811 + return False + + +def sympify_fractions(f): + return Rational._new(f.numerator, f.denominator, 1) + +_sympy_converter[fractions.Fraction] = sympify_fractions + + +if gmpy is not None: + + def sympify_mpz(x): + return Integer(int(x)) + + def sympify_mpq(x): + return Rational(int(x.numerator), int(x.denominator)) + + _sympy_converter[type(gmpy.mpz(1))] = sympify_mpz + _sympy_converter[type(gmpy.mpq(1, 2))] = sympify_mpq + + +if flint is not None: + + def sympify_fmpz(x): + return Integer(int(x)) + + def sympify_fmpq(x): + return Rational(int(x.numerator), int(x.denominator)) + + _sympy_converter[type(flint.fmpz(1))] = sympify_fmpz + _sympy_converter[type(flint.fmpq(1, 2))] = sympify_fmpq + + +def sympify_mpmath(x): + return Expr._from_mpmath(x, x.context.prec) + +_sympy_converter[mpnumeric] = sympify_mpmath + + +def sympify_complex(a): + real, imag = list(map(sympify, (a.real, a.imag))) + return real + S.ImaginaryUnit*imag + +_sympy_converter[complex] = sympify_complex + +from .power import Pow +from .mul import Mul +Mul.identity = One() +from .add import Add +Add.identity = Zero() + + +def _register_classes(): + numbers.Number.register(Number) + numbers.Real.register(Float) + numbers.Rational.register(Rational) + numbers.Integral.register(Integer) + +_register_classes() + +_illegal = (S.NaN, S.Infinity, S.NegativeInfinity, S.ComplexInfinity) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/operations.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/operations.py new file mode 100644 index 0000000000000000000000000000000000000000..70d22127eb4d3f69fc5e304ab38f5cce9c4bb551 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/operations.py @@ -0,0 +1,741 @@ +from __future__ import annotations + +from typing import overload, TYPE_CHECKING + +from operator import attrgetter +from collections import defaultdict + +from sympy.utilities.exceptions import sympy_deprecation_warning + +from .sympify import _sympify as _sympify_, sympify +from .basic import Basic +from .cache import cacheit +from .sorting import ordered +from .logic import fuzzy_and +from .parameters import global_parameters +from sympy.utilities.iterables import sift +from sympy.multipledispatch.dispatcher import (Dispatcher, + ambiguity_register_error_ignore_dup, + str_signature, RaiseNotImplementedError) + + +if TYPE_CHECKING: + from sympy.core.expr import Expr + from sympy.core.add import Add + from sympy.core.mul import Mul + from sympy.logic.boolalg import Boolean, And, Or + + +class AssocOp(Basic): + """ Associative operations, can separate noncommutative and + commutative parts. + + (a op b) op c == a op (b op c) == a op b op c. + + Base class for Add and Mul. + + This is an abstract base class, concrete derived classes must define + the attribute `identity`. + + .. deprecated:: 1.7 + + Using arguments that aren't subclasses of :class:`~.Expr` in core + operators (:class:`~.Mul`, :class:`~.Add`, and :class:`~.Pow`) is + deprecated. See :ref:`non-expr-args-deprecated` for details. + + Parameters + ========== + + *args : + Arguments which are operated + + evaluate : bool, optional + Evaluate the operation. If not passed, refer to ``global_parameters.evaluate``. + """ + + # for performance reason, we don't let is_commutative go to assumptions, + # and keep it right here + __slots__: tuple[str, ...] = ('is_commutative',) + + _args_type: type[Basic] | None = None + + @cacheit + def __new__(cls, *args, evaluate=None, _sympify=True): + # Allow faster processing by passing ``_sympify=False``, if all arguments + # are already sympified. + if _sympify: + args = list(map(_sympify_, args)) + + # Disallow non-Expr args in Add/Mul + typ = cls._args_type + if typ is not None: + from .relational import Relational + if any(isinstance(arg, Relational) for arg in args): + raise TypeError("Relational cannot be used in %s" % cls.__name__) + + # This should raise TypeError once deprecation period is over: + for arg in args: + if not isinstance(arg, typ): + sympy_deprecation_warning( + f""" + +Using non-Expr arguments in {cls.__name__} is deprecated (in this case, one of +the arguments has type {type(arg).__name__!r}). + +If you really did intend to use a multiplication or addition operation with +this object, use the * or + operator instead. + + """, + deprecated_since_version="1.7", + active_deprecations_target="non-expr-args-deprecated", + stacklevel=4, + ) + + if evaluate is None: + evaluate = global_parameters.evaluate + if not evaluate: + obj = cls._from_args(args) + obj = cls._exec_constructor_postprocessors(obj) + return obj + + args = [a for a in args if a is not cls.identity] + + if len(args) == 0: + return cls.identity + if len(args) == 1: + return args[0] + + c_part, nc_part, order_symbols = cls.flatten(args) + is_commutative = not nc_part + obj = cls._from_args(c_part + nc_part, is_commutative) + obj = cls._exec_constructor_postprocessors(obj) + + if order_symbols is not None: + from sympy.series.order import Order + return Order(obj, *order_symbols) + return obj + + @classmethod + def _from_args(cls, args, is_commutative=None): + """Create new instance with already-processed args. + If the args are not in canonical order, then a non-canonical + result will be returned, so use with caution. The order of + args may change if the sign of the args is changed.""" + if len(args) == 0: + return cls.identity + elif len(args) == 1: + return args[0] + + obj = super().__new__(cls, *args) + if is_commutative is None: + is_commutative = fuzzy_and(a.is_commutative for a in args) + obj.is_commutative = is_commutative + return obj + + def _new_rawargs(self, *args, reeval=True, **kwargs): + """Create new instance of own class with args exactly as provided by + caller but returning the self class identity if args is empty. + + Examples + ======== + + This is handy when we want to optimize things, e.g. + + >>> from sympy import Mul, S + >>> from sympy.abc import x, y + >>> e = Mul(3, x, y) + >>> e.args + (3, x, y) + >>> Mul(*e.args[1:]) + x*y + >>> e._new_rawargs(*e.args[1:]) # the same as above, but faster + x*y + + Note: use this with caution. There is no checking of arguments at + all. This is best used when you are rebuilding an Add or Mul after + simply removing one or more args. If, for example, modifications, + result in extra 1s being inserted they will show up in the result: + + >>> m = (x*y)._new_rawargs(S.One, x); m + 1*x + >>> m == x + False + >>> m.is_Mul + True + + Another issue to be aware of is that the commutativity of the result + is based on the commutativity of self. If you are rebuilding the + terms that came from a commutative object then there will be no + problem, but if self was non-commutative then what you are + rebuilding may now be commutative. + + Although this routine tries to do as little as possible with the + input, getting the commutativity right is important, so this level + of safety is enforced: commutativity will always be recomputed if + self is non-commutative and kwarg `reeval=False` has not been + passed. + """ + if reeval and self.is_commutative is False: + is_commutative = None + else: + is_commutative = self.is_commutative + return self._from_args(args, is_commutative) + + @classmethod + def flatten(cls, seq): + """Return seq so that none of the elements are of type `cls`. This is + the vanilla routine that will be used if a class derived from AssocOp + does not define its own flatten routine.""" + # apply associativity, no commutativity property is used + new_seq = [] + while seq: + o = seq.pop() + if o.__class__ is cls: # classes must match exactly + seq.extend(o.args) + else: + new_seq.append(o) + new_seq.reverse() + + # c_part, nc_part, order_symbols + return [], new_seq, None + + def _matches_commutative(self, expr, repl_dict=None, old=False): + """ + Matches Add/Mul "pattern" to an expression "expr". + + repl_dict ... a dictionary of (wild: expression) pairs, that get + returned with the results + + This function is the main workhorse for Add/Mul. + + Examples + ======== + + >>> from sympy import symbols, Wild, sin + >>> a = Wild("a") + >>> b = Wild("b") + >>> c = Wild("c") + >>> x, y, z = symbols("x y z") + >>> (a+sin(b)*c)._matches_commutative(x+sin(y)*z) + {a_: x, b_: y, c_: z} + + In the example above, "a+sin(b)*c" is the pattern, and "x+sin(y)*z" is + the expression. + + The repl_dict contains parts that were already matched. For example + here: + + >>> (x+sin(b)*c)._matches_commutative(x+sin(y)*z, repl_dict={a: x}) + {a_: x, b_: y, c_: z} + + the only function of the repl_dict is to return it in the + result, e.g. if you omit it: + + >>> (x+sin(b)*c)._matches_commutative(x+sin(y)*z) + {b_: y, c_: z} + + the "a: x" is not returned in the result, but otherwise it is + equivalent. + + """ + from .function import _coeff_isneg + # make sure expr is Expr if pattern is Expr + from .expr import Expr + if isinstance(self, Expr) and not isinstance(expr, Expr): + return None + + if repl_dict is None: + repl_dict = {} + + # handle simple patterns + if self == expr: + return repl_dict + + d = self._matches_simple(expr, repl_dict) + if d is not None: + return d + + # eliminate exact part from pattern: (2+a+w1+w2).matches(expr) -> (w1+w2).matches(expr-a-2) + from .function import WildFunction + from .symbol import Wild + wild_part, exact_part = sift(self.args, lambda p: + p.has(Wild, WildFunction) and not expr.has(p), + binary=True) + if not exact_part: + wild_part = list(ordered(wild_part)) + if self.is_Add: + # in addition to normal ordered keys, impose + # sorting on Muls with leading Number to put + # them in order + wild_part = sorted(wild_part, key=lambda x: + x.args[0] if x.is_Mul and x.args[0].is_Number else + 0) + else: + exact = self._new_rawargs(*exact_part) + free = expr.free_symbols + if free and (exact.free_symbols - free): + # there are symbols in the exact part that are not + # in the expr; but if there are no free symbols, let + # the matching continue + return None + newexpr = self._combine_inverse(expr, exact) + if not old and (expr.is_Add or expr.is_Mul): + check = newexpr + if _coeff_isneg(check): + check = -check + if check.count_ops() > expr.count_ops(): + return None + newpattern = self._new_rawargs(*wild_part) + return newpattern.matches(newexpr, repl_dict) + + # now to real work ;) + i = 0 + saw = set() + while expr not in saw: + saw.add(expr) + args = tuple(ordered(self.make_args(expr))) + if self.is_Add and expr.is_Add: + # in addition to normal ordered keys, impose + # sorting on Muls with leading Number to put + # them in order + args = tuple(sorted(args, key=lambda x: + x.args[0] if x.is_Mul and x.args[0].is_Number else + 0)) + expr_list = (self.identity,) + args + for last_op in reversed(expr_list): + for w in reversed(wild_part): + d1 = w.matches(last_op, repl_dict) + if d1 is not None: + d2 = self.xreplace(d1).matches(expr, d1) + if d2 is not None: + return d2 + + if i == 0: + if self.is_Mul: + # make e**i look like Mul + if expr.is_Pow and expr.exp.is_Integer: + from .mul import Mul + if expr.exp > 0: + expr = Mul(*[expr.base, expr.base**(expr.exp - 1)], evaluate=False) + else: + expr = Mul(*[1/expr.base, expr.base**(expr.exp + 1)], evaluate=False) + i += 1 + continue + + elif self.is_Add: + # make i*e look like Add + c, e = expr.as_coeff_Mul() + if abs(c) > 1: + from .add import Add + if c > 0: + expr = Add(*[e, (c - 1)*e], evaluate=False) + else: + expr = Add(*[-e, (c + 1)*e], evaluate=False) + i += 1 + continue + + # try collection on non-Wild symbols + from sympy.simplify.radsimp import collect + was = expr + did = set() + for w in reversed(wild_part): + c, w = w.as_coeff_mul(Wild) + free = c.free_symbols - did + if free: + did.update(free) + expr = collect(expr, free) + if expr != was: + i += 0 + continue + + break # if we didn't continue, there is nothing more to do + + return + + def _has_matcher(self): + """Helper for .has() that checks for containment of + subexpressions within an expr by using sets of args + of similar nodes, e.g. x + 1 in x + y + 1 checks + to see that {x, 1} & {x, y, 1} == {x, 1} + """ + def _ncsplit(expr): + # this is not the same as args_cnc because here + # we don't assume expr is a Mul -- hence deal with args -- + # and always return a set. + cpart, ncpart = sift(expr.args, + lambda arg: arg.is_commutative is True, binary=True) + return set(cpart), ncpart + + c, nc = _ncsplit(self) + cls = self.__class__ + + def is_in(expr): + if isinstance(expr, cls): + if expr == self: + return True + _c, _nc = _ncsplit(expr) + if (c & _c) == c: + if not nc: + return True + elif len(nc) <= len(_nc): + for i in range(len(_nc) - len(nc) + 1): + if _nc[i:i + len(nc)] == nc: + return True + return False + return is_in + + def _eval_evalf(self, prec): + """ + Evaluate the parts of self that are numbers; if the whole thing + was a number with no functions it would have been evaluated, but + it wasn't so we must judiciously extract the numbers and reconstruct + the object. This is *not* simply replacing numbers with evaluated + numbers. Numbers should be handled in the largest pure-number + expression as possible. So the code below separates ``self`` into + number and non-number parts and evaluates the number parts and + walks the args of the non-number part recursively (doing the same + thing). + """ + from .add import Add + from .mul import Mul + from .symbol import Symbol + from .function import AppliedUndef + if isinstance(self, (Mul, Add)): + x, tail = self.as_independent(Symbol, AppliedUndef) + # if x is an AssocOp Function then the _evalf below will + # call _eval_evalf (here) so we must break the recursion + if not (tail is self.identity or + isinstance(x, AssocOp) and x.is_Function or + x is self.identity and isinstance(tail, AssocOp)): + # here, we have a number so we just call to _evalf with prec; + # prec is not the same as n, it is the binary precision so + # that's why we don't call to evalf. + x = x._evalf(prec) if x is not self.identity else self.identity + args = [] + tail_args = tuple(self.func.make_args(tail)) + for a in tail_args: + # here we call to _eval_evalf since we don't know what we + # are dealing with and all other _eval_evalf routines should + # be doing the same thing (i.e. taking binary prec and + # finding the evalf-able args) + newa = a._eval_evalf(prec) + if newa is None: + args.append(a) + else: + args.append(newa) + return self.func(x, *args) + + # this is the same as above, but there were no pure-number args to + # deal with + args = [] + for a in self.args: + newa = a._eval_evalf(prec) + if newa is None: + args.append(a) + else: + args.append(newa) + return self.func(*args) + + @overload + @classmethod + def make_args(cls: type[Add], expr: Expr) -> tuple[Expr, ...]: ... # type: ignore + @overload + @classmethod + def make_args(cls: type[Mul], expr: Expr) -> tuple[Expr, ...]: ... # type: ignore + @overload + @classmethod + def make_args(cls: type[And], expr: Boolean) -> tuple[Boolean, ...]: ... # type: ignore + @overload + @classmethod + def make_args(cls: type[Or], expr: Boolean) -> tuple[Boolean, ...]: ... # type: ignore + + @classmethod + def make_args(cls: type[Basic], expr: Basic) -> tuple[Basic, ...]: + """ + Return a sequence of elements `args` such that cls(*args) == expr + + Examples + ======== + + >>> from sympy import Symbol, Mul, Add + >>> x, y = map(Symbol, 'xy') + + >>> Mul.make_args(x*y) + (x, y) + >>> Add.make_args(x*y) + (x*y,) + >>> set(Add.make_args(x*y + y)) == set([y, x*y]) + True + + """ + if isinstance(expr, cls): + return expr.args + else: + return (sympify(expr),) + + def doit(self, **hints): + if hints.get('deep', True): + terms = [term.doit(**hints) for term in self.args] + else: + terms = self.args + return self.func(*terms, evaluate=True) + +class ShortCircuit(Exception): + pass + + +class LatticeOp(AssocOp): + """ + Join/meet operations of an algebraic lattice[1]. + + Explanation + =========== + + These binary operations are associative (op(op(a, b), c) = op(a, op(b, c))), + commutative (op(a, b) = op(b, a)) and idempotent (op(a, a) = op(a) = a). + Common examples are AND, OR, Union, Intersection, max or min. They have an + identity element (op(identity, a) = a) and an absorbing element + conventionally called zero (op(zero, a) = zero). + + This is an abstract base class, concrete derived classes must declare + attributes zero and identity. All defining properties are then respected. + + Examples + ======== + + >>> from sympy import Integer + >>> from sympy.core.operations import LatticeOp + >>> class my_join(LatticeOp): + ... zero = Integer(0) + ... identity = Integer(1) + >>> my_join(2, 3) == my_join(3, 2) + True + >>> my_join(2, my_join(3, 4)) == my_join(2, 3, 4) + True + >>> my_join(0, 1, 4, 2, 3, 4) + 0 + >>> my_join(1, 2) + 2 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Lattice_%28order%29 + """ + + is_commutative = True + + def __new__(cls, *args, **options): + args = (_sympify_(arg) for arg in args) + + try: + # /!\ args is a generator and _new_args_filter + # must be careful to handle as such; this + # is done so short-circuiting can be done + # without having to sympify all values + _args = frozenset(cls._new_args_filter(args)) + except ShortCircuit: + return sympify(cls.zero) + if not _args: + return sympify(cls.identity) + elif len(_args) == 1: + return set(_args).pop() + else: + # XXX in almost every other case for __new__, *_args is + # passed along, but the expectation here is for _args + obj = super(AssocOp, cls).__new__(cls, *ordered(_args)) + obj._argset = _args + return obj + + @classmethod + def _new_args_filter(cls, arg_sequence, call_cls=None): + """Generator filtering args""" + ncls = call_cls or cls + for arg in arg_sequence: + if arg == ncls.zero: + raise ShortCircuit(arg) + elif arg == ncls.identity: + continue + elif arg.func == ncls: + yield from arg.args + else: + yield arg + + @classmethod + def make_args(cls, expr): + """ + Return a set of args such that cls(*arg_set) == expr. + """ + if isinstance(expr, cls): + return expr._argset + else: + return frozenset([sympify(expr)]) + + +class AssocOpDispatcher: + """ + Handler dispatcher for associative operators + + .. notes:: + This approach is experimental, and can be replaced or deleted in the future. + See https://github.com/sympy/sympy/pull/19463. + + Explanation + =========== + + If arguments of different types are passed, the classes which handle the operation for each type + are collected. Then, a class which performs the operation is selected by recursive binary dispatching. + Dispatching relation can be registered by ``register_handlerclass`` method. + + Priority registration is unordered. You cannot make ``A*B`` and ``B*A`` refer to + different handler classes. All logic dealing with the order of arguments must be implemented + in the handler class. + + Examples + ======== + + >>> from sympy import Add, Expr, Symbol + >>> from sympy.core.add import add + + >>> class NewExpr(Expr): + ... @property + ... def _add_handler(self): + ... return NewAdd + >>> class NewAdd(NewExpr, Add): + ... pass + >>> add.register_handlerclass((Add, NewAdd), NewAdd) + + >>> a, b = Symbol('a'), NewExpr() + >>> add(a, b) == NewAdd(a, b) + True + + """ + def __init__(self, name, doc=None): + self.name = name + self.doc = doc + self.handlerattr = "_%s_handler" % name + self._handlergetter = attrgetter(self.handlerattr) + self._dispatcher = Dispatcher(name) + + def __repr__(self): + return "" % self.name + + def register_handlerclass(self, classes, typ, on_ambiguity=ambiguity_register_error_ignore_dup): + """ + Register the handler class for two classes, in both straight and reversed order. + + Paramteters + =========== + + classes : tuple of two types + Classes who are compared with each other. + + typ: + Class which is registered to represent *cls1* and *cls2*. + Handler method of *self* must be implemented in this class. + """ + if not len(classes) == 2: + raise RuntimeError( + "Only binary dispatch is supported, but got %s types: <%s>." % ( + len(classes), str_signature(classes) + )) + if len(set(classes)) == 1: + raise RuntimeError( + "Duplicate types <%s> cannot be dispatched." % str_signature(classes) + ) + self._dispatcher.add(tuple(classes), typ, on_ambiguity=on_ambiguity) + self._dispatcher.add(tuple(reversed(classes)), typ, on_ambiguity=on_ambiguity) + + @cacheit + def __call__(self, *args, _sympify=True, **kwargs): + """ + Parameters + ========== + + *args : + Arguments which are operated + """ + if _sympify: + args = tuple(map(_sympify_, args)) + handlers = frozenset(map(self._handlergetter, args)) + + # no need to sympify again + return self.dispatch(handlers)(*args, _sympify=False, **kwargs) + + @cacheit + def dispatch(self, handlers): + """ + Select the handler class, and return its handler method. + """ + + # Quick exit for the case where all handlers are same + if len(handlers) == 1: + h, = handlers + if not isinstance(h, type): + raise RuntimeError("Handler {!r} is not a type.".format(h)) + return h + + # Recursively select with registered binary priority + for i, typ in enumerate(handlers): + + if not isinstance(typ, type): + raise RuntimeError("Handler {!r} is not a type.".format(typ)) + + if i == 0: + handler = typ + else: + prev_handler = handler + handler = self._dispatcher.dispatch(prev_handler, typ) + + if not isinstance(handler, type): + raise RuntimeError( + "Dispatcher for {!r} and {!r} must return a type, but got {!r}".format( + prev_handler, typ, handler + )) + + # return handler class + return handler + + @property + def __doc__(self): + docs = [ + "Multiply dispatched associative operator: %s" % self.name, + "Note that support for this is experimental, see the docs for :class:`AssocOpDispatcher` for details" + ] + + if self.doc: + docs.append(self.doc) + + s = "Registered handler classes\n" + s += '=' * len(s) + docs.append(s) + + amb_sigs = [] + + typ_sigs = defaultdict(list) + for sigs in self._dispatcher.ordering[::-1]: + key = self._dispatcher.funcs[sigs] + typ_sigs[key].append(sigs) + + for typ, sigs in typ_sigs.items(): + + sigs_str = ', '.join('<%s>' % str_signature(sig) for sig in sigs) + + if isinstance(typ, RaiseNotImplementedError): + amb_sigs.append(sigs_str) + continue + + s = 'Inputs: %s\n' % sigs_str + s += '-' * len(s) + '\n' + s += typ.__name__ + docs.append(s) + + if amb_sigs: + s = "Ambiguous handler classes\n" + s += '=' * len(s) + docs.append(s) + + s = '\n'.join(amb_sigs) + docs.append(s) + + return '\n\n'.join(docs) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/parameters.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/parameters.py new file mode 100644 index 0000000000000000000000000000000000000000..d911a3652bf02fa5b24c43b138035a57be687228 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/parameters.py @@ -0,0 +1,161 @@ +"""Thread-safe global parameters""" + +from .cache import clear_cache +from contextlib import contextmanager +from threading import local + +class _global_parameters(local): + """ + Thread-local global parameters. + + Explanation + =========== + + This class generates thread-local container for SymPy's global parameters. + Every global parameters must be passed as keyword argument when generating + its instance. + A variable, `global_parameters` is provided as default instance for this class. + + WARNING! Although the global parameters are thread-local, SymPy's cache is not + by now. + This may lead to undesired result in multi-threading operations. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy.core.cache import clear_cache + >>> from sympy.core.parameters import global_parameters as gp + + >>> gp.evaluate + True + >>> x+x + 2*x + + >>> log = [] + >>> def f(): + ... clear_cache() + ... gp.evaluate = False + ... log.append(x+x) + ... clear_cache() + >>> import threading + >>> thread = threading.Thread(target=f) + >>> thread.start() + >>> thread.join() + + >>> print(log) + [x + x] + + >>> gp.evaluate + True + >>> x+x + 2*x + + References + ========== + + .. [1] https://docs.python.org/3/library/threading.html + + """ + def __init__(self, **kwargs): + self.__dict__.update(kwargs) + + def __setattr__(self, name, value): + if getattr(self, name) != value: + clear_cache() + return super().__setattr__(name, value) + +global_parameters = _global_parameters(evaluate=True, distribute=True, exp_is_pow=False) + +class evaluate: + """ Control automatic evaluation + + Explanation + =========== + + This context manager controls whether or not all SymPy functions evaluate + by default. + + Note that much of SymPy expects evaluated expressions. This functionality + is experimental and is unlikely to function as intended on large + expressions. + + Examples + ======== + + >>> from sympy import evaluate + >>> from sympy.abc import x + >>> print(x + x) + 2*x + >>> with evaluate(False): + ... print(x + x) + x + x + """ + def __init__(self, x): + self.x = x + self.old = [] + + def __enter__(self): + self.old.append(global_parameters.evaluate) + global_parameters.evaluate = self.x + + def __exit__(self, exc_type, exc_val, exc_tb): + global_parameters.evaluate = self.old.pop() + +@contextmanager +def distribute(x): + """ Control automatic distribution of Number over Add + + Explanation + =========== + + This context manager controls whether or not Mul distribute Number over + Add. Plan is to avoid distributing Number over Add in all of sympy. Once + that is done, this contextmanager will be removed. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy.core.parameters import distribute + >>> print(2*(x + 1)) + 2*x + 2 + >>> with distribute(False): + ... print(2*(x + 1)) + 2*(x + 1) + """ + + old = global_parameters.distribute + + try: + global_parameters.distribute = x + yield + finally: + global_parameters.distribute = old + + +@contextmanager +def _exp_is_pow(x): + """ + Control whether `e^x` should be represented as ``exp(x)`` or a ``Pow(E, x)``. + + Examples + ======== + + >>> from sympy import exp + >>> from sympy.abc import x + >>> from sympy.core.parameters import _exp_is_pow + >>> with _exp_is_pow(True): print(type(exp(x))) + + >>> with _exp_is_pow(False): print(type(exp(x))) + exp + """ + old = global_parameters.exp_is_pow + + clear_cache() + try: + global_parameters.exp_is_pow = x + yield + finally: + clear_cache() + global_parameters.exp_is_pow = old diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/power.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/power.py new file mode 100644 index 0000000000000000000000000000000000000000..0f257d030553ecc7b887ca9d1199ccc19b9a642f --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/power.py @@ -0,0 +1,1847 @@ +from __future__ import annotations +from typing import Callable, TYPE_CHECKING +from itertools import product + +from .sympify import _sympify +from .cache import cacheit +from .singleton import S +from .expr import Expr +from .evalf import PrecisionExhausted +from .function import (expand_complex, expand_multinomial, + expand_mul, _mexpand, PoleError) +from .logic import fuzzy_bool, fuzzy_not, fuzzy_and, fuzzy_or +from .parameters import global_parameters +from .relational import is_gt, is_lt +from .kind import NumberKind, UndefinedKind +from sympy.utilities.iterables import sift +from sympy.utilities.exceptions import sympy_deprecation_warning +from sympy.utilities.misc import as_int +from sympy.multipledispatch import Dispatcher + + +class Pow(Expr): + """ + Defines the expression x**y as "x raised to a power y" + + .. deprecated:: 1.7 + + Using arguments that aren't subclasses of :class:`~.Expr` in core + operators (:class:`~.Mul`, :class:`~.Add`, and :class:`~.Pow`) is + deprecated. See :ref:`non-expr-args-deprecated` for details. + + Singleton definitions involving (0, 1, -1, oo, -oo, I, -I): + + +--------------+---------+-----------------------------------------------+ + | expr | value | reason | + +==============+=========+===============================================+ + | z**0 | 1 | Although arguments over 0**0 exist, see [2]. | + +--------------+---------+-----------------------------------------------+ + | z**1 | z | | + +--------------+---------+-----------------------------------------------+ + | (-oo)**(-1) | 0 | | + +--------------+---------+-----------------------------------------------+ + | (-1)**-1 | -1 | | + +--------------+---------+-----------------------------------------------+ + | S.Zero**-1 | zoo | This is not strictly true, as 0**-1 may be | + | | | undefined, but is convenient in some contexts | + | | | where the base is assumed to be positive. | + +--------------+---------+-----------------------------------------------+ + | 1**-1 | 1 | | + +--------------+---------+-----------------------------------------------+ + | oo**-1 | 0 | | + +--------------+---------+-----------------------------------------------+ + | 0**oo | 0 | Because for all complex numbers z near | + | | | 0, z**oo -> 0. | + +--------------+---------+-----------------------------------------------+ + | 0**-oo | zoo | This is not strictly true, as 0**oo may be | + | | | oscillating between positive and negative | + | | | values or rotating in the complex plane. | + | | | It is convenient, however, when the base | + | | | is positive. | + +--------------+---------+-----------------------------------------------+ + | 1**oo | nan | Because there are various cases where | + | 1**-oo | | lim(x(t),t)=1, lim(y(t),t)=oo (or -oo), | + | | | but lim( x(t)**y(t), t) != 1. See [3]. | + +--------------+---------+-----------------------------------------------+ + | b**zoo | nan | Because b**z has no limit as z -> zoo | + +--------------+---------+-----------------------------------------------+ + | (-1)**oo | nan | Because of oscillations in the limit. | + | (-1)**(-oo) | | | + +--------------+---------+-----------------------------------------------+ + | oo**oo | oo | | + +--------------+---------+-----------------------------------------------+ + | oo**-oo | 0 | | + +--------------+---------+-----------------------------------------------+ + | (-oo)**oo | nan | | + | (-oo)**-oo | | | + +--------------+---------+-----------------------------------------------+ + | oo**I | nan | oo**e could probably be best thought of as | + | (-oo)**I | | the limit of x**e for real x as x tends to | + | | | oo. If e is I, then the limit does not exist | + | | | and nan is used to indicate that. | + +--------------+---------+-----------------------------------------------+ + | oo**(1+I) | zoo | If the real part of e is positive, then the | + | (-oo)**(1+I) | | limit of abs(x**e) is oo. So the limit value | + | | | is zoo. | + +--------------+---------+-----------------------------------------------+ + | oo**(-1+I) | 0 | If the real part of e is negative, then the | + | -oo**(-1+I) | | limit is 0. | + +--------------+---------+-----------------------------------------------+ + + Because symbolic computations are more flexible than floating point + calculations and we prefer to never return an incorrect answer, + we choose not to conform to all IEEE 754 conventions. This helps + us avoid extra test-case code in the calculation of limits. + + See Also + ======== + + sympy.core.numbers.Infinity + sympy.core.numbers.NegativeInfinity + sympy.core.numbers.NaN + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Exponentiation + .. [2] https://en.wikipedia.org/wiki/Zero_to_the_power_of_zero + .. [3] https://en.wikipedia.org/wiki/Indeterminate_forms + + """ + is_Pow = True + + __slots__ = ('is_commutative',) + + if TYPE_CHECKING: + + @property + def args(self) -> tuple[Expr, Expr]: + ... + + @property + def base(self) -> Expr: + return self.args[0] + + @property + def exp(self) -> Expr: + return self.args[1] + + @property + def kind(self): + if self.exp.kind is NumberKind: + return self.base.kind + else: + return UndefinedKind + + @cacheit + def __new__(cls, b: Expr | complex, e: Expr | complex, evaluate=None) -> Expr: # type: ignore + if evaluate is None: + evaluate = global_parameters.evaluate + + base = _sympify(b) + exp = _sympify(e) + + # XXX: This can be removed when non-Expr args are disallowed rather + # than deprecated. + from .relational import Relational + if isinstance(base, Relational) or isinstance(exp, Relational): + raise TypeError('Relational cannot be used in Pow') + + # XXX: This should raise TypeError once deprecation period is over: + for arg in [base, exp]: + if not isinstance(arg, Expr): + sympy_deprecation_warning( + f""" + Using non-Expr arguments in Pow is deprecated (in this case, one of the + arguments is of type {type(arg).__name__!r}). + + If you really did intend to construct a power with this base, use the ** + operator instead.""", + deprecated_since_version="1.7", + active_deprecations_target="non-expr-args-deprecated", + stacklevel=4, + ) + + if evaluate: + if exp is S.ComplexInfinity: + return S.NaN + if exp is S.Infinity: + if is_gt(base, S.One): + return S.Infinity + if is_gt(base, S.NegativeOne) and is_lt(base, S.One): + return S.Zero + if is_lt(base, S.NegativeOne): + if base.is_finite: + return S.ComplexInfinity + if base.is_finite is False: + return S.NaN + if exp is S.Zero: + return S.One + elif exp is S.One: + return base + elif exp == -1 and not base: + return S.ComplexInfinity + elif exp.__class__.__name__ == "AccumulationBounds": + if base == S.Exp1: + from sympy.calculus.accumulationbounds import AccumBounds + return AccumBounds(Pow(base, exp.min), Pow(base, exp.max)) + # autosimplification if base is a number and exp odd/even + # if base is Number then the base will end up positive; we + # do not do this with arbitrary expressions since symbolic + # cancellation might occur as in (x - 1)/(1 - x) -> -1. If + # we returned Piecewise((-1, Ne(x, 1))) for such cases then + # we could do this...but we don't + elif (exp.is_Symbol and exp.is_integer or exp.is_Integer + ) and (base.is_number and base.is_Mul or base.is_Number + ) and base.could_extract_minus_sign(): + if exp.is_even: + base = -base + elif exp.is_odd: + return -Pow(-base, exp) + if S.NaN in (base, exp): # XXX S.NaN**x -> S.NaN under assumption that x != 0 + return S.NaN + elif base is S.One: + if abs(exp).is_infinite: + return S.NaN + return S.One + else: + # recognize base as E + from sympy.functions.elementary.exponential import exp_polar + if not exp.is_Atom and base is not S.Exp1 and not isinstance(base, exp_polar): + from .exprtools import factor_terms + from sympy.functions.elementary.exponential import log + from sympy.simplify.radsimp import fraction + c, ex = factor_terms(exp, sign=False).as_coeff_Mul() + num, den = fraction(ex) + if isinstance(den, log) and den.args[0] == base: + return S.Exp1**(c*num) + elif den.is_Add: + from sympy.functions.elementary.complexes import sign, im + s = sign(im(base)) + if s.is_Number and s and den == \ + log(-factor_terms(base, sign=False)) + s*S.ImaginaryUnit*S.Pi: + return S.Exp1**(c*num) + + obj = base._eval_power(exp) + if obj is not None: + return obj + obj = Expr.__new__(cls, base, exp) + obj = cls._exec_constructor_postprocessors(obj) + if not isinstance(obj, Pow): + return obj + obj.is_commutative = (base.is_commutative and exp.is_commutative) + return obj + + def inverse(self, argindex=1): + if self.base == S.Exp1: + from sympy.functions.elementary.exponential import log + return log + return None + + @classmethod + def class_key(cls): + return 3, 2, cls.__name__ + + def _eval_refine(self, assumptions): + from sympy.assumptions.ask import ask, Q + b, e = self.as_base_exp() + if ask(Q.integer(e), assumptions) and b.could_extract_minus_sign(): + if ask(Q.even(e), assumptions): + return Pow(-b, e) + elif ask(Q.odd(e), assumptions): + return -Pow(-b, e) + + def _eval_power(self, expt): + b, e = self.as_base_exp() + if b is S.NaN: + return (b**e)**expt # let __new__ handle it + + s = None + if expt.is_integer: + s = 1 + elif b.is_polar: # e.g. exp_polar, besselj, var('p', polar=True)... + s = 1 + elif e.is_extended_real is not None: + from sympy.functions.elementary.complexes import arg, im, re, sign + from sympy.functions.elementary.exponential import exp, log + from sympy.functions.elementary.integers import floor + # helper functions =========================== + def _half(e): + """Return True if the exponent has a literal 2 as the + denominator, else None.""" + if getattr(e, 'q', None) == 2: + return True + n, d = e.as_numer_denom() + if n.is_integer and d == 2: + return True + def _n2(e): + """Return ``e`` evaluated to a Number with 2 significant + digits, else None.""" + try: + rv = e.evalf(2, strict=True) + if rv.is_Number: + return rv + except PrecisionExhausted: + pass + # =================================================== + if e.is_extended_real: + # we need _half(expt) with constant floor or + # floor(S.Half - e*arg(b)/2/pi) == 0 + + + # handle -1 as special case + if e == -1: + # floor arg. is 1/2 + arg(b)/2/pi + if _half(expt): + if b.is_negative is True: + return S.NegativeOne**expt*Pow(-b, e*expt) + elif b.is_negative is False: # XXX ok if im(b) != 0? + return Pow(b, -expt) + elif e.is_even: + if b.is_extended_real: + b = abs(b) + if b.is_imaginary: + b = abs(im(b))*S.ImaginaryUnit + + if (abs(e) < 1) == True or e == 1: + s = 1 # floor = 0 + elif b.is_extended_nonnegative: + s = 1 # floor = 0 + elif re(b).is_extended_nonnegative and (abs(e) < 2) == True: + s = 1 # floor = 0 + elif _half(expt): + s = exp(2*S.Pi*S.ImaginaryUnit*expt*floor( + S.Half - e*arg(b)/(2*S.Pi))) + if s.is_extended_real and _n2(sign(s) - s) == 0: + s = sign(s) + else: + s = None + else: + # e.is_extended_real is False requires: + # _half(expt) with constant floor or + # floor(S.Half - im(e*log(b))/2/pi) == 0 + try: + s = exp(2*S.ImaginaryUnit*S.Pi*expt* + floor(S.Half - im(e*log(b))/2/S.Pi)) + # be careful to test that s is -1 or 1 b/c sign(I) == I: + # so check that s is real + if s.is_extended_real and _n2(sign(s) - s) == 0: + s = sign(s) + else: + s = None + except PrecisionExhausted: + s = None + + if s is not None: + return s*Pow(b, e*expt) + + def _eval_Mod(self, q): + r"""A dispatched function to compute `b^e \bmod q`, dispatched + by ``Mod``. + + Notes + ===== + + Algorithms: + + 1. For unevaluated integer power, use built-in ``pow`` function + with 3 arguments, if powers are not too large wrt base. + + 2. For very large powers, use totient reduction if $e \ge \log(m)$. + Bound on m, is for safe factorization memory wise i.e. $m^{1/4}$. + For pollard-rho to be faster than built-in pow $\log(e) > m^{1/4}$ + check is added. + + 3. For any unevaluated power found in `b` or `e`, the step 2 + will be recursed down to the base and the exponent + such that the $b \bmod q$ becomes the new base and + $\phi(q) + e \bmod \phi(q)$ becomes the new exponent, and then + the computation for the reduced expression can be done. + """ + + base, exp = self.base, self.exp + + if exp.is_integer and exp.is_positive: + if q.is_integer and base % q == 0: + return S.Zero + + from sympy.functions.combinatorial.numbers import totient + + if base.is_Integer and exp.is_Integer and q.is_Integer: + b, e, m = int(base), int(exp), int(q) + mb = m.bit_length() + if mb <= 80 and e >= mb and e.bit_length()**4 >= m: + phi = int(totient(m)) + return Integer(pow(b, phi + e%phi, m)) + return Integer(pow(b, e, m)) + + from .mod import Mod + + if isinstance(base, Pow) and base.is_integer and base.is_number: + base = Mod(base, q) + return Mod(Pow(base, exp, evaluate=False), q) + + if isinstance(exp, Pow) and exp.is_integer and exp.is_number: + bit_length = int(q).bit_length() + # XXX Mod-Pow actually attempts to do a hanging evaluation + # if this dispatched function returns None. + # May need some fixes in the dispatcher itself. + if bit_length <= 80: + phi = totient(q) + exp = phi + Mod(exp, phi) + return Mod(Pow(base, exp, evaluate=False), q) + + def _eval_is_even(self): + if self.exp.is_integer and self.exp.is_positive: + return self.base.is_even + + def _eval_is_negative(self): + ext_neg = Pow._eval_is_extended_negative(self) + if ext_neg is True: + return self.is_finite + return ext_neg + + def _eval_is_extended_positive(self): + if self.base == self.exp: + if self.base.is_extended_nonnegative: + return True + elif self.base.is_positive: + if self.exp.is_real: + return True + elif self.base.is_extended_negative: + if self.exp.is_even: + return True + if self.exp.is_odd: + return False + elif self.base.is_zero: + if self.exp.is_extended_real: + return self.exp.is_zero + elif self.base.is_extended_nonpositive: + if self.exp.is_odd: + return False + elif self.base.is_imaginary: + if self.exp.is_integer: + m = self.exp % 4 + if m.is_zero: + return True + if m.is_integer and m.is_zero is False: + return False + if self.exp.is_imaginary: + from sympy.functions.elementary.exponential import log + return log(self.base).is_imaginary + + def _eval_is_extended_negative(self): + if self.exp is S.Half: + if self.base.is_complex or self.base.is_extended_real: + return False + if self.base.is_extended_negative: + if self.exp.is_odd and self.base.is_finite: + return True + if self.exp.is_even: + return False + elif self.base.is_extended_positive: + if self.exp.is_extended_real: + return False + elif self.base.is_zero: + if self.exp.is_extended_real: + return False + elif self.base.is_extended_nonnegative: + if self.exp.is_extended_nonnegative: + return False + elif self.base.is_extended_nonpositive: + if self.exp.is_even: + return False + elif self.base.is_extended_real: + if self.exp.is_even: + return False + + def _eval_is_zero(self): + if self.base.is_zero: + if self.exp.is_extended_positive: + return True + elif self.exp.is_extended_nonpositive: + return False + elif self.base == S.Exp1: + return self.exp is S.NegativeInfinity + elif self.base.is_zero is False: + if self.base.is_finite and self.exp.is_finite: + return False + elif self.exp.is_negative: + return self.base.is_infinite + elif self.exp.is_nonnegative: + return False + elif self.exp.is_infinite and self.exp.is_extended_real: + if (1 - abs(self.base)).is_extended_positive: + return self.exp.is_extended_positive + elif (1 - abs(self.base)).is_extended_negative: + return self.exp.is_extended_negative + elif self.base.is_finite and self.exp.is_negative: + # when self.base.is_zero is None + return False + + def _eval_is_integer(self): + b, e = self.args + if b.is_rational: + if b.is_integer is False and e.is_positive: + return False # rat**nonneg + if b.is_integer and e.is_integer: + if b is S.NegativeOne: + return True + if e.is_nonnegative or e.is_positive: + return True + if b.is_integer and e.is_negative and (e.is_finite or e.is_integer): + if fuzzy_not((b - 1).is_zero) and fuzzy_not((b + 1).is_zero): + return False + if b.is_Number and e.is_Number: + check = self.func(*self.args) + return check.is_Integer + if e.is_negative and b.is_positive and (b - 1).is_positive: + return False + if e.is_negative and b.is_negative and (b + 1).is_negative: + return False + + def _eval_is_extended_real(self): + if self.base is S.Exp1: + if self.exp.is_extended_real: + return True + elif self.exp.is_imaginary: + return (2*S.ImaginaryUnit*self.exp/S.Pi).is_even + + from sympy.functions.elementary.exponential import log, exp + real_b = self.base.is_extended_real + if real_b is None: + if self.base.func == exp and self.base.exp.is_imaginary: + return self.exp.is_imaginary + if self.base.func == Pow and self.base.base is S.Exp1 and self.base.exp.is_imaginary: + return self.exp.is_imaginary + return + real_e = self.exp.is_extended_real + if real_e is None: + return + if real_b and real_e: + if self.base.is_extended_positive: + return True + elif self.base.is_extended_nonnegative and self.exp.is_extended_nonnegative: + return True + elif self.exp.is_integer and self.base.is_extended_nonzero: + return True + elif self.exp.is_integer and self.exp.is_nonnegative: + return True + elif self.base.is_extended_negative: + if self.exp.is_Rational: + return False + if real_e and self.exp.is_extended_negative and self.base.is_zero is False: + return Pow(self.base, -self.exp).is_extended_real + im_b = self.base.is_imaginary + im_e = self.exp.is_imaginary + if im_b: + if self.exp.is_integer: + if self.exp.is_even: + return True + elif self.exp.is_odd: + return False + elif im_e and log(self.base).is_imaginary: + return True + elif self.exp.is_Add: + c, a = self.exp.as_coeff_Add() + if c and c.is_Integer: + return Mul( + self.base**c, self.base**a, evaluate=False).is_extended_real + elif self.base in (-S.ImaginaryUnit, S.ImaginaryUnit): + if (self.exp/2).is_integer is False: + return False + if real_b and im_e: + if self.base is S.NegativeOne: + return True + c = self.exp.coeff(S.ImaginaryUnit) + if c: + if self.base.is_rational and c.is_rational: + if self.base.is_nonzero and (self.base - 1).is_nonzero and c.is_nonzero: + return False + ok = (c*log(self.base)/S.Pi).is_integer + if ok is not None: + return ok + + if real_b is False and real_e: # we already know it's not imag + if isinstance(self.exp, Rational) and self.exp.p == 1: + return False + from sympy.functions.elementary.complexes import arg + i = arg(self.base)*self.exp/S.Pi + if i.is_complex: # finite + return i.is_integer + + def _eval_is_complex(self): + + if self.base == S.Exp1: + return fuzzy_or([self.exp.is_complex, self.exp.is_extended_negative]) + + if all(a.is_complex for a in self.args) and self._eval_is_finite(): + return True + + def _eval_is_imaginary(self): + if self.base.is_commutative is False: + return False + + if self.base.is_imaginary: + if self.exp.is_integer: + odd = self.exp.is_odd + if odd is not None: + return odd + return + + if self.base == S.Exp1: + f = 2 * self.exp / (S.Pi*S.ImaginaryUnit) + # exp(pi*integer) = 1 or -1, so not imaginary + if f.is_even: + return False + # exp(pi*integer + pi/2) = I or -I, so it is imaginary + if f.is_odd: + return True + return None + + if self.exp.is_imaginary: + from sympy.functions.elementary.exponential import log + imlog = log(self.base).is_imaginary + if imlog is not None: + return False # I**i -> real; (2*I)**i -> complex ==> not imaginary + + if self.base.is_extended_real and self.exp.is_extended_real: + if self.base.is_positive: + return False + else: + rat = self.exp.is_rational + if not rat: + return rat + if self.exp.is_integer: + return False + else: + half = (2*self.exp).is_integer + if half: + return self.base.is_negative + return half + + if self.base.is_extended_real is False: # we already know it's not imag + from sympy.functions.elementary.complexes import arg + i = arg(self.base)*self.exp/S.Pi + isodd = (2*i).is_odd + if isodd is not None: + return isodd + + def _eval_is_odd(self): + if self.exp.is_integer: + if self.exp.is_positive: + return self.base.is_odd + elif self.exp.is_nonnegative and self.base.is_odd: + return True + elif self.base is S.NegativeOne: + return True + + def _eval_is_finite(self): + if self.exp.is_negative: + if self.base.is_zero: + return False + if self.base.is_infinite or self.base.is_nonzero: + return True + c1 = self.base.is_finite + if c1 is None: + return + c2 = self.exp.is_finite + if c2 is None: + return + if c1 and c2: + if self.exp.is_nonnegative or fuzzy_not(self.base.is_zero): + return True + + def _eval_is_prime(self): + ''' + An integer raised to the n(>=2)-th power cannot be a prime. + ''' + if self.base.is_integer and self.exp.is_integer and (self.exp - 1).is_positive: + return False + + def _eval_is_composite(self): + """ + A power is composite if both base and exponent are greater than 1 + """ + if (self.base.is_integer and self.exp.is_integer and + ((self.base - 1).is_positive and (self.exp - 1).is_positive or + (self.base + 1).is_negative and self.exp.is_positive and self.exp.is_even)): + return True + + def _eval_is_polar(self): + return self.base.is_polar + + def _eval_subs(self, old, new): + from sympy.calculus.accumulationbounds import AccumBounds + + if isinstance(self.exp, AccumBounds): + b = self.base.subs(old, new) + e = self.exp.subs(old, new) + if isinstance(e, AccumBounds): + return e.__rpow__(b) + return self.func(b, e) + + from sympy.functions.elementary.exponential import exp, log + + def _check(ct1, ct2, old): + """Return (bool, pow, remainder_pow) where, if bool is True, then the + exponent of Pow `old` will combine with `pow` so the substitution + is valid, otherwise bool will be False. + + For noncommutative objects, `pow` will be an integer, and a factor + `Pow(old.base, remainder_pow)` needs to be included. If there is + no such factor, None is returned. For commutative objects, + remainder_pow is always None. + + cti are the coefficient and terms of an exponent of self or old + In this _eval_subs routine a change like (b**(2*x)).subs(b**x, y) + will give y**2 since (b**x)**2 == b**(2*x); if that equality does + not hold then the substitution should not occur so `bool` will be + False. + + """ + coeff1, terms1 = ct1 + coeff2, terms2 = ct2 + if terms1 == terms2: + if old.is_commutative: + # Allow fractional powers for commutative objects + pow = coeff1/coeff2 + try: + as_int(pow, strict=False) + combines = True + except ValueError: + b, e = old.as_base_exp() + # These conditions ensure that (b**e)**f == b**(e*f) for any f + combines = b.is_positive and e.is_real or b.is_nonnegative and e.is_nonnegative + + return combines, pow, None + else: + # With noncommutative symbols, substitute only integer powers + if not isinstance(terms1, tuple): + terms1 = (terms1,) + if not all(term.is_integer for term in terms1): + return False, None, None + + try: + # Round pow toward zero + pow, remainder = divmod(as_int(coeff1), as_int(coeff2)) + if pow < 0 and remainder != 0: + pow += 1 + remainder -= as_int(coeff2) + + if remainder == 0: + remainder_pow = None + else: + remainder_pow = Mul(remainder, *terms1) + + return True, pow, remainder_pow + except ValueError: + # Can't substitute + pass + + return False, None, None + + if old == self.base or (old == exp and self.base == S.Exp1): + if new.is_Function and isinstance(new, Callable): + return new(self.exp._subs(old, new)) + else: + return new**self.exp._subs(old, new) + + # issue 10829: (4**x - 3*y + 2).subs(2**x, y) -> y**2 - 3*y + 2 + if isinstance(old, self.func) and self.exp == old.exp: + l = log(self.base, old.base) + if l.is_Number: + return Pow(new, l) + + if isinstance(old, self.func) and self.base == old.base: + if self.exp.is_Add is False: + ct1 = self.exp.as_independent(Symbol, as_Add=False) + ct2 = old.exp.as_independent(Symbol, as_Add=False) + ok, pow, remainder_pow = _check(ct1, ct2, old) + if ok: + # issue 5180: (x**(6*y)).subs(x**(3*y),z)->z**2 + result = self.func(new, pow) + if remainder_pow is not None: + result = Mul(result, Pow(old.base, remainder_pow)) + return result + else: # b**(6*x + a).subs(b**(3*x), y) -> y**2 * b**a + # exp(exp(x) + exp(x**2)).subs(exp(exp(x)), w) -> w * exp(exp(x**2)) + oarg = old.exp + new_l = [] + o_al = [] + ct2 = oarg.as_coeff_mul() + for a in self.exp.args: + newa = a._subs(old, new) + ct1 = newa.as_coeff_mul() + ok, pow, remainder_pow = _check(ct1, ct2, old) + if ok: + new_l.append(new**pow) + if remainder_pow is not None: + o_al.append(remainder_pow) + continue + elif not old.is_commutative and not newa.is_integer: + # If any term in the exponent is non-integer, + # we do not do any substitutions in the noncommutative case + return + o_al.append(newa) + if new_l: + expo = Add(*o_al) + new_l.append(Pow(self.base, expo, evaluate=False) if expo != 1 else self.base) + return Mul(*new_l) + + if (isinstance(old, exp) or (old.is_Pow and old.base is S.Exp1)) and self.exp.is_extended_real and self.base.is_positive: + ct1 = old.exp.as_independent(Symbol, as_Add=False) + ct2 = (self.exp*log(self.base)).as_independent( + Symbol, as_Add=False) + ok, pow, remainder_pow = _check(ct1, ct2, old) + if ok: + result = self.func(new, pow) # (2**x).subs(exp(x*log(2)), z) -> z + if remainder_pow is not None: + result = Mul(result, Pow(old.base, remainder_pow)) + return result + + def as_base_exp(self): + """Return base and exp of self. + + Explanation + =========== + + If base a Rational less than 1, then return 1/Rational, -exp. + If this extra processing is not needed, the base and exp + properties will give the raw arguments. + + Examples + ======== + + >>> from sympy import Pow, S + >>> p = Pow(S.Half, 2, evaluate=False) + >>> p.as_base_exp() + (2, -2) + >>> p.args + (1/2, 2) + >>> p.base, p.exp + (1/2, 2) + + """ + b, e = self.args + if b.is_Rational and b.p == 1 and b.q != 1: + return Integer(b.q), -e + return b, e + + def _eval_adjoint(self): + from sympy.functions.elementary.complexes import adjoint + i, p = self.exp.is_integer, self.base.is_positive + if i: + return adjoint(self.base)**self.exp + if p: + return self.base**adjoint(self.exp) + if i is False and p is False: + expanded = expand_complex(self) + if expanded != self: + return adjoint(expanded) + + def _eval_conjugate(self): + from sympy.functions.elementary.complexes import conjugate as c + i, p = self.exp.is_integer, self.base.is_positive + if i: + return c(self.base)**self.exp + if p: + return self.base**c(self.exp) + if i is False and p is False: + expanded = expand_complex(self) + if expanded != self: + return c(expanded) + if self.is_extended_real: + return self + + def _eval_transpose(self): + from sympy.functions.elementary.complexes import transpose + if self.base == S.Exp1: + return self.func(S.Exp1, self.exp.transpose()) + i, p = self.exp.is_integer, (self.base.is_complex or self.base.is_infinite) + if p: + return self.base**self.exp + if i: + return transpose(self.base)**self.exp + if i is False and p is False: + expanded = expand_complex(self) + if expanded != self: + return transpose(expanded) + + def _eval_expand_power_exp(self, **hints): + """a**(n + m) -> a**n*a**m""" + b = self.base + e = self.exp + if b == S.Exp1: + from sympy.concrete.summations import Sum + if isinstance(e, Sum) and e.is_commutative: + from sympy.concrete.products import Product + return Product(self.func(b, e.function), *e.limits) + if e.is_Add and (hints.get('force', False) or + b.is_zero is False or e._all_nonneg_or_nonppos()): + if e.is_commutative: + return Mul(*[self.func(b, x) for x in e.args]) + if b.is_commutative: + c, nc = sift(e.args, lambda x: x.is_commutative, binary=True) + if c: + return Mul(*[self.func(b, x) for x in c] + )*b**Add._from_args(nc) + return self + + def _eval_expand_power_base(self, **hints): + """(a*b)**n -> a**n * b**n""" + force = hints.get('force', False) + + b = self.base + e = self.exp + if not b.is_Mul: + return self + + cargs, nc = b.args_cnc(split_1=False) + + # expand each term - this is top-level-only + # expansion but we have to watch out for things + # that don't have an _eval_expand method + if nc: + nc = [i._eval_expand_power_base(**hints) + if hasattr(i, '_eval_expand_power_base') else i + for i in nc] + + if e.is_Integer: + if e.is_positive: + rv = Mul(*nc*e) + else: + rv = Mul(*[i**-1 for i in nc[::-1]]*-e) + if cargs: + rv *= Mul(*cargs)**e + return rv + + if not cargs: + return self.func(Mul(*nc), e, evaluate=False) + + nc = [Mul(*nc)] + + # sift the commutative bases + other, maybe_real = sift(cargs, lambda x: x.is_extended_real is False, + binary=True) + def pred(x): + if x is S.ImaginaryUnit: + return S.ImaginaryUnit + polar = x.is_polar + if polar: + return True + if polar is None: + return fuzzy_bool(x.is_extended_nonnegative) + sifted = sift(maybe_real, pred) + nonneg = sifted[True] + other += sifted[None] + neg = sifted[False] + imag = sifted[S.ImaginaryUnit] + if imag: + I = S.ImaginaryUnit + i = len(imag) % 4 + if i == 0: + pass + elif i == 1: + other.append(I) + elif i == 2: + if neg: + nonn = -neg.pop() + if nonn is not S.One: + nonneg.append(nonn) + else: + neg.append(S.NegativeOne) + else: + if neg: + nonn = -neg.pop() + if nonn is not S.One: + nonneg.append(nonn) + else: + neg.append(S.NegativeOne) + other.append(I) + del imag + + # bring out the bases that can be separated from the base + + if force or e.is_integer: + # treat all commutatives the same and put nc in other + cargs = nonneg + neg + other + other = nc + else: + # this is just like what is happening automatically, except + # that now we are doing it for an arbitrary exponent for which + # no automatic expansion is done + + assert not e.is_Integer + + # handle negatives by making them all positive and putting + # the residual -1 in other + if len(neg) > 1: + o = S.One + if not other and neg[0].is_Number: + o *= neg.pop(0) + if len(neg) % 2: + o = -o + for n in neg: + nonneg.append(-n) + if o is not S.One: + other.append(o) + elif neg and other: + if neg[0].is_Number and neg[0] is not S.NegativeOne: + other.append(S.NegativeOne) + nonneg.append(-neg[0]) + else: + other.extend(neg) + else: + other.extend(neg) + del neg + + cargs = nonneg + other += nc + + rv = S.One + if cargs: + if e.is_Rational: + npow, cargs = sift(cargs, lambda x: x.is_Pow and + x.exp.is_Rational and x.base.is_number, + binary=True) + rv = Mul(*[self.func(b.func(*b.args), e) for b in npow]) + rv *= Mul(*[self.func(b, e, evaluate=False) for b in cargs]) + if other: + rv *= self.func(Mul(*other), e, evaluate=False) + return rv + + def _eval_expand_multinomial(self, **hints): + """(a + b + ..)**n -> a**n + n*a**(n-1)*b + .., n is nonzero integer""" + + base, exp = self.args + result = self + + if exp.is_Rational and exp.p > 0 and base.is_Add: + if not exp.is_Integer: + n = Integer(exp.p // exp.q) + + if not n: + return result + else: + radical, result = self.func(base, exp - n), [] + + expanded_base_n = self.func(base, n) + if expanded_base_n.is_Pow: + expanded_base_n = \ + expanded_base_n._eval_expand_multinomial() + for term in Add.make_args(expanded_base_n): + result.append(term*radical) + + return Add(*result) + + n = int(exp) + + if base.is_commutative: + order_terms, other_terms = [], [] + + for b in base.args: + if b.is_Order: + order_terms.append(b) + else: + other_terms.append(b) + + if order_terms: + # (f(x) + O(x^n))^m -> f(x)^m + m*f(x)^{m-1} *O(x^n) + f = Add(*other_terms) + o = Add(*order_terms) + + if n == 2: + return expand_multinomial(f**n, deep=False) + n*f*o + else: + g = expand_multinomial(f**(n - 1), deep=False) + return expand_mul(f*g, deep=False) + n*g*o + + if base.is_number: + # Efficiently expand expressions of the form (a + b*I)**n + # where 'a' and 'b' are real numbers and 'n' is integer. + a, b = base.as_real_imag() + + if a.is_Rational and b.is_Rational: + if not a.is_Integer: + if not b.is_Integer: + k = self.func(a.q * b.q, n) + a, b = a.p*b.q, a.q*b.p + else: + k = self.func(a.q, n) + a, b = a.p, a.q*b + elif not b.is_Integer: + k = self.func(b.q, n) + a, b = a*b.q, b.p + else: + k = 1 + + a, b, c, d = int(a), int(b), 1, 0 + + while n: + if n & 1: + c, d = a*c - b*d, b*c + a*d + n -= 1 + a, b = a*a - b*b, 2*a*b + n //= 2 + + I = S.ImaginaryUnit + + if k == 1: + return c + I*d + else: + return Integer(c)/k + I*d/k + + p = other_terms + # (x + y)**3 -> x**3 + 3*x**2*y + 3*x*y**2 + y**3 + # in this particular example: + # p = [x,y]; n = 3 + # so now it's easy to get the correct result -- we get the + # coefficients first: + from sympy.ntheory.multinomial import multinomial_coefficients + from sympy.polys.polyutils import basic_from_dict + expansion_dict = multinomial_coefficients(len(p), n) + # in our example: {(3, 0): 1, (1, 2): 3, (0, 3): 1, (2, 1): 3} + # and now construct the expression. + return basic_from_dict(expansion_dict, *p) + else: + if n == 2: + return Add(*[f*g for f in base.args for g in base.args]) + else: + multi = (base**(n - 1))._eval_expand_multinomial() + if multi.is_Add: + return Add(*[f*g for f in base.args + for g in multi.args]) + else: + # XXX can this ever happen if base was an Add? + return Add(*[f*multi for f in base.args]) + elif (exp.is_Rational and exp.p < 0 and base.is_Add and + abs(exp.p) > exp.q): + return 1 / self.func(base, -exp)._eval_expand_multinomial() + elif exp.is_Add and base.is_Number and (hints.get('force', False) or + base.is_zero is False or exp._all_nonneg_or_nonppos()): + # a + b a b + # n --> n n, where n, a, b are Numbers + # XXX should be in expand_power_exp? + coeff, tail = [], [] + for term in exp.args: + if term.is_Number: + coeff.append(self.func(base, term)) + else: + tail.append(term) + return Mul(*(coeff + [self.func(base, Add._from_args(tail))])) + else: + return result + + def as_real_imag(self, deep=True, **hints): + if self.exp.is_Integer: + from sympy.polys.polytools import poly + + exp = self.exp + re_e, im_e = self.base.as_real_imag(deep=deep) + if not im_e: + return self, S.Zero + a, b = symbols('a b', cls=Dummy) + if exp >= 0: + if re_e.is_Number and im_e.is_Number: + # We can be more efficient in this case + expr = expand_multinomial(self.base**exp) + if expr != self: + return expr.as_real_imag() + + expr = poly( + (a + b)**exp) # a = re, b = im; expr = (a + b*I)**exp + else: + mag = re_e**2 + im_e**2 + re_e, im_e = re_e/mag, -im_e/mag + if re_e.is_Number and im_e.is_Number: + # We can be more efficient in this case + expr = expand_multinomial((re_e + im_e*S.ImaginaryUnit)**-exp) + if expr != self: + return expr.as_real_imag() + + expr = poly((a + b)**-exp) + + # Terms with even b powers will be real + r = [i for i in expr.terms() if not i[0][1] % 2] + re_part = Add(*[cc*a**aa*b**bb for (aa, bb), cc in r]) + # Terms with odd b powers will be imaginary + r = [i for i in expr.terms() if i[0][1] % 4 == 1] + im_part1 = Add(*[cc*a**aa*b**bb for (aa, bb), cc in r]) + r = [i for i in expr.terms() if i[0][1] % 4 == 3] + im_part3 = Add(*[cc*a**aa*b**bb for (aa, bb), cc in r]) + + return (re_part.subs({a: re_e, b: S.ImaginaryUnit*im_e}), + im_part1.subs({a: re_e, b: im_e}) + im_part3.subs({a: re_e, b: -im_e})) + + from sympy.functions.elementary.trigonometric import atan2, cos, sin + + if self.exp.is_Rational: + re_e, im_e = self.base.as_real_imag(deep=deep) + + if im_e.is_zero and self.exp is S.Half: + if re_e.is_extended_nonnegative: + return self, S.Zero + if re_e.is_extended_nonpositive: + return S.Zero, (-self.base)**self.exp + + # XXX: This is not totally correct since for x**(p/q) with + # x being imaginary there are actually q roots, but + # only a single one is returned from here. + r = self.func(self.func(re_e, 2) + self.func(im_e, 2), S.Half) + + t = atan2(im_e, re_e) + + rp, tp = self.func(r, self.exp), t*self.exp + + return rp*cos(tp), rp*sin(tp) + elif self.base is S.Exp1: + from sympy.functions.elementary.exponential import exp + re_e, im_e = self.exp.as_real_imag() + if deep: + re_e = re_e.expand(deep, **hints) + im_e = im_e.expand(deep, **hints) + c, s = cos(im_e), sin(im_e) + return exp(re_e)*c, exp(re_e)*s + else: + from sympy.functions.elementary.complexes import im, re + if deep: + hints['complex'] = False + + expanded = self.expand(deep, **hints) + if hints.get('ignore') == expanded: + return None + else: + return (re(expanded), im(expanded)) + else: + return re(self), im(self) + + def _eval_derivative(self, s): + from sympy.functions.elementary.exponential import log + dbase = self.base.diff(s) + dexp = self.exp.diff(s) + return self * (dexp * log(self.base) + dbase * self.exp/self.base) + + def _eval_evalf(self, prec): + base, exp = self.as_base_exp() + if base == S.Exp1: + # Use mpmath function associated to class "exp": + from sympy.functions.elementary.exponential import exp as exp_function + return exp_function(self.exp, evaluate=False)._eval_evalf(prec) + base = base._evalf(prec) + if not exp.is_Integer: + exp = exp._evalf(prec) + if exp.is_negative and base.is_number and base.is_extended_real is False: + base = base.conjugate() / (base * base.conjugate())._evalf(prec) + exp = -exp + return self.func(base, exp).expand() + return self.func(base, exp) + + def _eval_is_polynomial(self, syms): + if self.exp.has(*syms): + return False + + if self.base.has(*syms): + return bool(self.base._eval_is_polynomial(syms) and + self.exp.is_Integer and (self.exp >= 0)) + else: + return True + + def _eval_is_rational(self): + # The evaluation of self.func below can be very expensive in the case + # of integer**integer if the exponent is large. We should try to exit + # before that if possible: + if (self.exp.is_integer and self.base.is_rational + and fuzzy_not(fuzzy_and([self.exp.is_negative, self.base.is_zero]))): + return True + p = self.func(*self.as_base_exp()) # in case it's unevaluated + if not p.is_Pow: + return p.is_rational + b, e = p.as_base_exp() + if e.is_Rational and b.is_Rational: + # we didn't check that e is not an Integer + # because Rational**Integer autosimplifies + return False + if e.is_integer: + if b.is_rational: + if fuzzy_not(b.is_zero) or e.is_nonnegative: + return True + if b == e: # always rational, even for 0**0 + return True + elif b.is_irrational: + return e.is_zero + if b is S.Exp1: + if e.is_rational and e.is_nonzero: + return False + + def _eval_is_algebraic(self): + def _is_one(expr): + try: + return (expr - 1).is_zero + except ValueError: + # when the operation is not allowed + return False + + if self.base.is_zero or _is_one(self.base): + return True + elif self.base is S.Exp1: + s = self.func(*self.args) + if s.func == self.func: + if self.exp.is_nonzero: + if self.exp.is_algebraic: + return False + elif (self.exp/S.Pi).is_rational: + return False + elif (self.exp/(S.ImaginaryUnit*S.Pi)).is_rational: + return True + else: + return s.is_algebraic + elif self.exp.is_rational: + if self.base.is_algebraic is False: + return self.exp.is_zero + if self.base.is_zero is False: + if self.exp.is_nonzero: + return self.base.is_algebraic + elif self.base.is_algebraic: + return True + if self.exp.is_positive: + return self.base.is_algebraic + elif self.base.is_algebraic and self.exp.is_algebraic: + if ((fuzzy_not(self.base.is_zero) + and fuzzy_not(_is_one(self.base))) + or self.base.is_integer is False + or self.base.is_irrational): + return self.exp.is_rational + + def _eval_is_rational_function(self, syms): + if self.exp.has(*syms): + return False + + if self.base.has(*syms): + return self.base._eval_is_rational_function(syms) and \ + self.exp.is_Integer + else: + return True + + def _eval_is_meromorphic(self, x, a): + # f**g is meromorphic if g is an integer and f is meromorphic. + # E**(log(f)*g) is meromorphic if log(f)*g is meromorphic + # and finite. + base_merom = self.base._eval_is_meromorphic(x, a) + exp_integer = self.exp.is_Integer + if exp_integer: + return base_merom + + exp_merom = self.exp._eval_is_meromorphic(x, a) + if base_merom is False: + # f**g = E**(log(f)*g) may be meromorphic if the + # singularities of log(f) and g cancel each other, + # for example, if g = 1/log(f). Hence, + return False if exp_merom else None + elif base_merom is None: + return None + + b = self.base.subs(x, a) + # b is extended complex as base is meromorphic. + # log(base) is finite and meromorphic when b != 0, zoo. + b_zero = b.is_zero + if b_zero: + log_defined = False + else: + log_defined = fuzzy_and((b.is_finite, fuzzy_not(b_zero))) + + if log_defined is False: # zero or pole of base + return exp_integer # False or None + elif log_defined is None: + return None + + if not exp_merom: + return exp_merom # False or None + + return self.exp.subs(x, a).is_finite + + def _eval_is_algebraic_expr(self, syms): + if self.exp.has(*syms): + return False + + if self.base.has(*syms): + return self.base._eval_is_algebraic_expr(syms) and \ + self.exp.is_Rational + else: + return True + + def _eval_rewrite_as_exp(self, base, expo, **kwargs): + from sympy.functions.elementary.exponential import exp, log + + if base.is_zero or base.has(exp) or expo.has(exp): + return base**expo + + evaluate = expo.has(Symbol) + + if base.has(Symbol): + # delay evaluation if expo is non symbolic + # (as exp(x*log(5)) automatically reduces to x**5) + if global_parameters.exp_is_pow: + return Pow(S.Exp1, log(base)*expo, evaluate=evaluate) + else: + return exp(log(base)*expo, evaluate=evaluate) + + else: + from sympy.functions.elementary.complexes import arg, Abs + return exp((log(Abs(base)) + S.ImaginaryUnit*arg(base))*expo) + + def as_numer_denom(self): + if not self.is_commutative: + return self, S.One + base, exp = self.as_base_exp() + n, d = base.as_numer_denom() + # this should be the same as ExpBase.as_numer_denom wrt + # exponent handling + neg_exp = exp.is_negative + if exp.is_Mul and not neg_exp and not exp.is_positive: + neg_exp = exp.could_extract_minus_sign() + int_exp = exp.is_integer + # the denominator cannot be separated from the numerator if + # its sign is unknown unless the exponent is an integer, e.g. + # sqrt(a/b) != sqrt(a)/sqrt(b) when a=1 and b=-1. But if the + # denominator is negative the numerator and denominator can + # be negated and the denominator (now positive) separated. + if not (d.is_extended_real or int_exp): + n = base + d = S.One + dnonpos = d.is_nonpositive + if dnonpos: + n, d = -n, -d + elif dnonpos is None and not int_exp: + n = base + d = S.One + if neg_exp: + n, d = d, n + exp = -exp + if exp.is_infinite: + if n is S.One and d is not S.One: + return n, self.func(d, exp) + if n is not S.One and d is S.One: + return self.func(n, exp), d + return self.func(n, exp), self.func(d, exp) + + def matches(self, expr, repl_dict=None, old=False): + expr = _sympify(expr) + if repl_dict is None: + repl_dict = {} + + # special case, pattern = 1 and expr.exp can match to 0 + if expr is S.One: + d = self.exp.matches(S.Zero, repl_dict) + if d is not None: + return d + + # make sure the expression to be matched is an Expr + if not isinstance(expr, Expr): + return None + + b, e = expr.as_base_exp() + + # special case number + sb, se = self.as_base_exp() + if sb.is_Symbol and se.is_Integer and expr: + if e.is_rational: + return sb.matches(b**(e/se), repl_dict) + return sb.matches(expr**(1/se), repl_dict) + + d = repl_dict.copy() + d = self.base.matches(b, d) + if d is None: + return None + + d = self.exp.xreplace(d).matches(e, d) + if d is None: + return Expr.matches(self, expr, repl_dict) + return d + + def _eval_nseries(self, x, n, logx, cdir=0): + # NOTE! This function is an important part of the gruntz algorithm + # for computing limits. It has to return a generalized power + # series with coefficients in C(log, log(x)). In more detail: + # It has to return an expression + # c_0*x**e_0 + c_1*x**e_1 + ... (finitely many terms) + # where e_i are numbers (not necessarily integers) and c_i are + # expressions involving only numbers, the log function, and log(x). + # The series expansion of b**e is computed as follows: + # 1) We express b as f*(1 + g) where f is the leading term of b. + # g has order O(x**d) where d is strictly positive. + # 2) Then b**e = (f**e)*((1 + g)**e). + # (1 + g)**e is computed using binomial series. + from sympy.functions.elementary.exponential import exp, log + from sympy.series.limits import limit + from sympy.series.order import Order + from sympy.core.sympify import sympify + if self.base is S.Exp1: + e_series = self.exp.nseries(x, n=n, logx=logx) + if e_series.is_Order: + return 1 + e_series + e0 = limit(e_series.removeO(), x, 0) + if e0 is S.NegativeInfinity: + return Order(x**n, x) + if e0 is S.Infinity: + return self + t = e_series - e0 + exp_series = term = exp(e0) + # series of exp(e0 + t) in t + for i in range(1, n): + term *= t/i + term = term.nseries(x, n=n, logx=logx) + exp_series += term + exp_series += Order(t**n, x) + from sympy.simplify.powsimp import powsimp + return powsimp(exp_series, deep=True, combine='exp') + from sympy.simplify.powsimp import powdenest + from .numbers import _illegal + self = powdenest(self, force=True).trigsimp() + b, e = self.as_base_exp() + + if e.has(*_illegal): + raise PoleError() + + if e.has(x): + return exp(e*log(b))._eval_nseries(x, n=n, logx=logx, cdir=cdir) + + if logx is not None and b.has(log): + from .symbol import Wild + c, ex = symbols('c, ex', cls=Wild, exclude=[x]) + b = b.replace(log(c*x**ex), log(c) + ex*logx) + self = b**e + + b = b.removeO() + try: + from sympy.functions.special.gamma_functions import polygamma + if b.has(polygamma, S.EulerGamma) and logx is not None: + raise ValueError() + _, m = b.leadterm(x) + except (ValueError, NotImplementedError, PoleError): + b = b._eval_nseries(x, n=max(2, n), logx=logx, cdir=cdir).removeO() + if b.has(S.NaN, S.ComplexInfinity): + raise NotImplementedError() + _, m = b.leadterm(x) + + if e.has(log): + from sympy.simplify.simplify import logcombine + e = logcombine(e).cancel() + + if not (m.is_zero or e.is_number and e.is_real): + if self == self._eval_as_leading_term(x, logx=logx, cdir=cdir): + res = exp(e*log(b))._eval_nseries(x, n=n, logx=logx, cdir=cdir) + if res == exp(e*log(b)): + return self + return res + + f = b.as_leading_term(x, logx=logx) + g = (_mexpand(b) - f).cancel() + g = g/f + if not m.is_number: + raise NotImplementedError() + maxpow = n - m*e + if maxpow.has(Symbol): + maxpow = sympify(n) + + if maxpow.is_negative: + return Order(x**(m*e), x) + + if g.is_zero: + r = f**e + if r != self: + r += Order(x**n, x) + return r + + def coeff_exp(term, x): + coeff, exp = S.One, S.Zero + for factor in Mul.make_args(term): + if factor.has(x): + base, exp = factor.as_base_exp() + if base != x: + try: + return term.leadterm(x) + except ValueError: + return term, S.Zero + else: + coeff *= factor + return coeff, exp + + def mul(d1, d2): + res = {} + for e1, e2 in product(d1, d2): + ex = e1 + e2 + if ex < maxpow: + res[ex] = res.get(ex, S.Zero) + d1[e1]*d2[e2] + return res + + try: + c, d = g.leadterm(x, logx=logx) + except (ValueError, NotImplementedError): + if limit(g/x**maxpow, x, 0) == 0: + # g has higher order zero + return f**e + e*f**e*g # first term of binomial series + else: + raise NotImplementedError() + if c.is_Float and d == S.Zero: + # Convert floats like 0.5 to exact SymPy numbers like S.Half, to + # prevent rounding errors which can induce wrong values of d leading + # to a NotImplementedError being returned from the block below. + g = g.replace(lambda x: x.is_Float, lambda x: Rational(x)) + _, d = g.leadterm(x, logx=logx) + if not d.is_positive: + g = g.simplify() + if g.is_zero: + return f**e + _, d = g.leadterm(x, logx=logx) + if not d.is_positive: + g = ((b - f)/f).expand() + _, d = g.leadterm(x, logx=logx) + if not d.is_positive: + raise NotImplementedError() + + from sympy.functions.elementary.integers import ceiling + gpoly = g._eval_nseries(x, n=ceiling(maxpow), logx=logx, cdir=cdir).removeO() + gterms = {} + + for term in Add.make_args(gpoly): + co1, e1 = coeff_exp(term, x) + gterms[e1] = gterms.get(e1, S.Zero) + co1 + + k = S.One + terms = {S.Zero: S.One} + tk = gterms + + from sympy.functions.combinatorial.factorials import factorial, ff + + while (k*d - maxpow).is_negative: + coeff = ff(e, k)/factorial(k) + for ex in tk: + terms[ex] = terms.get(ex, S.Zero) + coeff*tk[ex] + tk = mul(tk, gterms) + k += S.One + + from sympy.functions.elementary.complexes import im + + if not e.is_integer and m.is_zero and f.is_negative: + ndir = (b - f).dir(x, cdir) + if im(ndir).is_negative: + inco, inex = coeff_exp(f**e*(-1)**(-2*e), x) + elif im(ndir).is_zero: + inco, inex = coeff_exp(exp(e*log(b)).as_leading_term(x, logx=logx, cdir=cdir), x) + else: + inco, inex = coeff_exp(f**e, x) + else: + inco, inex = coeff_exp(f**e, x) + res = S.Zero + + for e1 in terms: + ex = e1 + inex + res += terms[e1]*inco*x**(ex) + + if not (e.is_integer and e.is_positive and (e*d - n).is_nonpositive and + res == _mexpand(self)): + try: + res += Order(x**n, x) + except NotImplementedError: + return exp(e*log(b))._eval_nseries(x, n=n, logx=logx, cdir=cdir) + return res + + def _eval_as_leading_term(self, x, logx, cdir): + from sympy.functions.elementary.exponential import exp, log + e = self.exp + b = self.base + if self.base is S.Exp1: + arg = e.as_leading_term(x, logx=logx) + arg0 = arg.subs(x, 0) + if arg0 is S.NaN: + arg0 = arg.limit(x, 0) + if arg0.is_infinite is False: + return S.Exp1**arg0 + raise PoleError("Cannot expand %s around 0" % (self)) + elif e.has(x): + lt = exp(e * log(b)) + return lt.as_leading_term(x, logx=logx, cdir=cdir) + else: + from sympy.functions.elementary.complexes import im + try: + f = b.as_leading_term(x, logx=logx, cdir=cdir) + except PoleError: + return self + if not e.is_integer and f.is_negative and not f.has(x): + ndir = (b - f).dir(x, cdir) + if im(ndir).is_negative: + # Normally, f**e would evaluate to exp(e*log(f)) but on branch cuts + # an other value is expected through the following computation + # exp(e*(log(f) - 2*pi*I)) == f**e*exp(-2*e*pi*I) == f**e*(-1)**(-2*e). + return self.func(f, e) * (-1)**(-2*e) + elif im(ndir).is_zero: + log_leadterm = log(b)._eval_as_leading_term(x, logx=logx, cdir=cdir) + if log_leadterm.is_infinite is False: + return exp(e*log_leadterm) + return self.func(f, e) + + @cacheit + def _taylor_term(self, n, x, *previous_terms): # of (1 + x)**e + from sympy.functions.combinatorial.factorials import binomial + return binomial(self.exp, n) * self.func(x, n) + + def taylor_term(self, n, x, *previous_terms): + if self.base is not S.Exp1: + return super().taylor_term(n, x, *previous_terms) + if n < 0: + return S.Zero + if n == 0: + return S.One + from .sympify import sympify + x = sympify(x) + if previous_terms: + p = previous_terms[-1] + if p is not None: + return p * x / n + from sympy.functions.combinatorial.factorials import factorial + return x**n/factorial(n) + + def _eval_rewrite_as_sin(self, base, exp, **hints): + if self.base is S.Exp1: + from sympy.functions.elementary.trigonometric import sin + return sin(S.ImaginaryUnit*self.exp + S.Pi/2) - S.ImaginaryUnit*sin(S.ImaginaryUnit*self.exp) + + def _eval_rewrite_as_cos(self, base, exp, **hints): + if self.base is S.Exp1: + from sympy.functions.elementary.trigonometric import cos + return cos(S.ImaginaryUnit*self.exp) + S.ImaginaryUnit*cos(S.ImaginaryUnit*self.exp + S.Pi/2) + + def _eval_rewrite_as_tanh(self, base, exp, **hints): + if self.base is S.Exp1: + from sympy.functions.elementary.hyperbolic import tanh + return (1 + tanh(self.exp/2))/(1 - tanh(self.exp/2)) + + def _eval_rewrite_as_sqrt(self, base, exp, **kwargs): + from sympy.functions.elementary.trigonometric import sin, cos + if base is not S.Exp1: + return None + if exp.is_Mul: + coeff = exp.coeff(S.Pi * S.ImaginaryUnit) + if coeff and coeff.is_number: + cosine, sine = cos(S.Pi*coeff), sin(S.Pi*coeff) + if not isinstance(cosine, cos) and not isinstance (sine, sin): + return cosine + S.ImaginaryUnit*sine + + def as_content_primitive(self, radical=False, clear=True): + """Return the tuple (R, self/R) where R is the positive Rational + extracted from self. + + Examples + ======== + + >>> from sympy import sqrt + >>> sqrt(4 + 4*sqrt(2)).as_content_primitive() + (2, sqrt(1 + sqrt(2))) + >>> sqrt(3 + 3*sqrt(2)).as_content_primitive() + (1, sqrt(3)*sqrt(1 + sqrt(2))) + + >>> from sympy import expand_power_base, powsimp, Mul + >>> from sympy.abc import x, y + + >>> ((2*x + 2)**2).as_content_primitive() + (4, (x + 1)**2) + >>> (4**((1 + y)/2)).as_content_primitive() + (2, 4**(y/2)) + >>> (3**((1 + y)/2)).as_content_primitive() + (1, 3**((y + 1)/2)) + >>> (3**((5 + y)/2)).as_content_primitive() + (9, 3**((y + 1)/2)) + >>> eq = 3**(2 + 2*x) + >>> powsimp(eq) == eq + True + >>> eq.as_content_primitive() + (9, 3**(2*x)) + >>> powsimp(Mul(*_)) + 3**(2*x + 2) + + >>> eq = (2 + 2*x)**y + >>> s = expand_power_base(eq); s.is_Mul, s + (False, (2*x + 2)**y) + >>> eq.as_content_primitive() + (1, (2*(x + 1))**y) + >>> s = expand_power_base(_[1]); s.is_Mul, s + (True, 2**y*(x + 1)**y) + + See docstring of Expr.as_content_primitive for more examples. + """ + + b, e = self.as_base_exp() + b = _keep_coeff(*b.as_content_primitive(radical=radical, clear=clear)) + ce, pe = e.as_content_primitive(radical=radical, clear=clear) + if b.is_Rational: + #e + #= ce*pe + #= ce*(h + t) + #= ce*h + ce*t + #=> self + #= b**(ce*h)*b**(ce*t) + #= b**(cehp/cehq)*b**(ce*t) + #= b**(iceh + r/cehq)*b**(ce*t) + #= b**(iceh)*b**(r/cehq)*b**(ce*t) + #= b**(iceh)*b**(ce*t + r/cehq) + h, t = pe.as_coeff_Add() + if h.is_Rational and b != S.Zero: + ceh = ce*h + c = self.func(b, ceh) + r = S.Zero + if not c.is_Rational: + iceh, r = divmod(ceh.p, ceh.q) + c = self.func(b, iceh) + return c, self.func(b, _keep_coeff(ce, t + r/ce/ceh.q)) + e = _keep_coeff(ce, pe) + # b**e = (h*t)**e = h**e*t**e = c*m*t**e + if e.is_Rational and b.is_Mul: + h, t = b.as_content_primitive(radical=radical, clear=clear) # h is positive + c, m = self.func(h, e).as_coeff_Mul() # so c is positive + m, me = m.as_base_exp() + if m is S.One or me == e: # probably always true + # return the following, not return c, m*Pow(t, e) + # which would change Pow into Mul; we let SymPy + # decide what to do by using the unevaluated Mul, e.g + # should it stay as sqrt(2 + 2*sqrt(5)) or become + # sqrt(2)*sqrt(1 + sqrt(5)) + return c, self.func(_keep_coeff(m, t), e) + return S.One, self.func(b, e) + + def is_constant(self, *wrt, **flags): + expr = self + if flags.get('simplify', True): + expr = expr.simplify() + b, e = expr.as_base_exp() + bz = b.equals(0) + if bz: # recalculate with assumptions in case it's unevaluated + new = b**e + if new != expr: + return new.is_constant() + econ = e.is_constant(*wrt) + bcon = b.is_constant(*wrt) + if bcon: + if econ: + return True + bz = b.equals(0) + if bz is False: + return False + elif bcon is None: + return None + + return e.equals(0) + + def _eval_difference_delta(self, n, step): + b, e = self.args + if e.has(n) and not b.has(n): + new_e = e.subs(n, n + step) + return (b**(new_e - e) - 1) * self + +power = Dispatcher('power') +power.add((object, object), Pow) + +from .add import Add +from .numbers import Integer, Rational +from .mul import Mul, _keep_coeff +from .symbol import Symbol, Dummy, symbols diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/random.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/random.py new file mode 100644 index 0000000000000000000000000000000000000000..c02986283523b39462a1e2c0b97e3fb230cff100 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/random.py @@ -0,0 +1,227 @@ +""" +When you need to use random numbers in SymPy library code, import from here +so there is only one generator working for SymPy. Imports from here should +behave the same as if they were being imported from Python's random module. +But only the routines currently used in SymPy are included here. To use others +import ``rng`` and access the method directly. For example, to capture the +current state of the generator use ``rng.getstate()``. + +There is intentionally no Random to import from here. If you want +to control the state of the generator, import ``seed`` and call it +with or without an argument to set the state. + +Examples +======== + +>>> from sympy.core.random import random, seed +>>> assert random() < 1 +>>> seed(1); a = random() +>>> b = random() +>>> seed(1); c = random() +>>> assert a == c +>>> assert a != b # remote possibility this will fail + +""" +from sympy.utilities.iterables import is_sequence +from sympy.utilities.misc import as_int + +import random as _random +rng = _random.Random() + +choice = rng.choice +random = rng.random +randint = rng.randint +randrange = rng.randrange +sample = rng.sample +# seed = rng.seed +shuffle = rng.shuffle +uniform = rng.uniform + +_assumptions_rng = _random.Random() +_assumptions_shuffle = _assumptions_rng.shuffle + + +def seed(a=None, version=2): + rng.seed(a=a, version=version) + _assumptions_rng.seed(a=a, version=version) + + +def random_complex_number(a=2, b=-1, c=3, d=1, rational=False, tolerance=None): + """ + Return a random complex number. + + To reduce chance of hitting branch cuts or anything, we guarantee + b <= Im z <= d, a <= Re z <= c + + When rational is True, a rational approximation to a random number + is obtained within specified tolerance, if any. + """ + from sympy.core.numbers import I + from sympy.simplify.simplify import nsimplify + A, B = uniform(a, c), uniform(b, d) + if not rational: + return A + I*B + return (nsimplify(A, rational=True, tolerance=tolerance) + + I*nsimplify(B, rational=True, tolerance=tolerance)) + + +def verify_numerically(f, g, z=None, tol=1.0e-6, a=2, b=-1, c=3, d=1): + """ + Test numerically that f and g agree when evaluated in the argument z. + + If z is None, all symbols will be tested. This routine does not test + whether there are Floats present with precision higher than 15 digits + so if there are, your results may not be what you expect due to round- + off errors. + + Examples + ======== + + >>> from sympy import sin, cos + >>> from sympy.abc import x + >>> from sympy.core.random import verify_numerically as tn + >>> tn(sin(x)**2 + cos(x)**2, 1, x) + True + """ + from sympy.core.symbol import Symbol + from sympy.core.sympify import sympify + from sympy.core.numbers import comp + f, g = (sympify(i) for i in (f, g)) + if z is None: + z = f.free_symbols | g.free_symbols + elif isinstance(z, Symbol): + z = [z] + reps = list(zip(z, [random_complex_number(a, b, c, d) for _ in z])) + z1 = f.subs(reps).n() + z2 = g.subs(reps).n() + return comp(z1, z2, tol) + + +def test_derivative_numerically(f, z, tol=1.0e-6, a=2, b=-1, c=3, d=1): + """ + Test numerically that the symbolically computed derivative of f + with respect to z is correct. + + This routine does not test whether there are Floats present with + precision higher than 15 digits so if there are, your results may + not be what you expect due to round-off errors. + + Examples + ======== + + >>> from sympy import sin + >>> from sympy.abc import x + >>> from sympy.core.random import test_derivative_numerically as td + >>> td(sin(x), x) + True + """ + from sympy.core.numbers import comp + from sympy.core.function import Derivative + z0 = random_complex_number(a, b, c, d) + f1 = f.diff(z).subs(z, z0) + f2 = Derivative(f, z).doit_numerically(z0) + return comp(f1.n(), f2.n(), tol) + + +def _randrange(seed=None): + """Return a randrange generator. + + ``seed`` can be + + * None - return randomly seeded generator + * int - return a generator seeded with the int + * list - the values to be returned will be taken from the list + in the order given; the provided list is not modified. + + Examples + ======== + + >>> from sympy.core.random import _randrange + >>> rr = _randrange() + >>> rr(1000) # doctest: +SKIP + 999 + >>> rr = _randrange(3) + >>> rr(1000) # doctest: +SKIP + 238 + >>> rr = _randrange([0, 5, 1, 3, 4]) + >>> rr(3), rr(3) + (0, 1) + """ + if seed is None: + return randrange + elif isinstance(seed, int): + rng.seed(seed) + return randrange + elif is_sequence(seed): + seed = list(seed) # make a copy + seed.reverse() + + def give(a, b=None, seq=seed): + if b is None: + a, b = 0, a + a, b = as_int(a), as_int(b) + w = b - a + if w < 1: + raise ValueError('_randrange got empty range') + try: + x = seq.pop() + except IndexError: + raise ValueError('_randrange sequence was too short') + if a <= x < b: + return x + else: + return give(a, b, seq) + return give + else: + raise ValueError('_randrange got an unexpected seed') + + +def _randint(seed=None): + """Return a randint generator. + + ``seed`` can be + + * None - return randomly seeded generator + * int - return a generator seeded with the int + * list - the values to be returned will be taken from the list + in the order given; the provided list is not modified. + + Examples + ======== + + >>> from sympy.core.random import _randint + >>> ri = _randint() + >>> ri(1, 1000) # doctest: +SKIP + 999 + >>> ri = _randint(3) + >>> ri(1, 1000) # doctest: +SKIP + 238 + >>> ri = _randint([0, 5, 1, 2, 4]) + >>> ri(1, 3), ri(1, 3) + (1, 2) + """ + if seed is None: + return randint + elif isinstance(seed, int): + rng.seed(seed) + return randint + elif is_sequence(seed): + seed = list(seed) # make a copy + seed.reverse() + + def give(a, b, seq=seed): + a, b = as_int(a), as_int(b) + w = b - a + if w < 0: + raise ValueError('_randint got empty range') + try: + x = seq.pop() + except IndexError: + raise ValueError('_randint sequence was too short') + if a <= x <= b: + return x + else: + return give(a, b, seq) + return give + else: + raise ValueError('_randint got an unexpected seed') diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/relational.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/relational.py new file mode 100644 index 0000000000000000000000000000000000000000..28bf039c9be67a6f5cd6f11df1968961c0760373 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/relational.py @@ -0,0 +1,1622 @@ +from __future__ import annotations + +from .basic import Atom, Basic +from .coreerrors import LazyExceptionMessage +from .sorting import ordered +from .evalf import EvalfMixin +from .function import AppliedUndef +from .numbers import int_valued +from .singleton import S +from .sympify import _sympify, SympifyError +from .parameters import global_parameters +from .logic import fuzzy_bool, fuzzy_xor, fuzzy_and, fuzzy_not +from sympy.logic.boolalg import Boolean, BooleanAtom +from sympy.utilities.iterables import sift +from sympy.utilities.misc import filldedent +from sympy.utilities.exceptions import sympy_deprecation_warning + + +__all__ = ( + 'Rel', 'Eq', 'Ne', 'Lt', 'Le', 'Gt', 'Ge', + 'Relational', 'Equality', 'Unequality', 'StrictLessThan', 'LessThan', + 'StrictGreaterThan', 'GreaterThan', +) + +from .expr import Expr +from sympy.multipledispatch import dispatch +from .containers import Tuple +from .symbol import Symbol + + +def _nontrivBool(side): + return isinstance(side, Boolean) and \ + not isinstance(side, Atom) + + +# Note, see issue 4986. Ideally, we wouldn't want to subclass both Boolean +# and Expr. +# from .. import Expr + + +def _canonical(cond): + # return a condition in which all relationals are canonical + reps = {r: r.canonical for r in cond.atoms(Relational)} + return cond.xreplace(reps) + # XXX: AttributeError was being caught here but it wasn't triggered by any of + # the tests so I've removed it... + + +def _canonical_coeff(rel): + # return -2*x + 1 < 0 as x > 1/2 + # XXX make this part of Relational.canonical? + rel = rel.canonical + if not rel.is_Relational or rel.rhs.is_Boolean: + return rel # Eq(x, True) + if not isinstance(rel.lhs, Expr): + return rel.reversed # e.g.: Eq(True, x) -> Eq(x, True) + b, l = rel.lhs.as_coeff_Add(rational=True) + m, lhs = l.as_coeff_Mul(rational=True) + rhs = (rel.rhs - b)/m + if m < 0: + return rel.reversed.func(lhs, rhs) + return rel.func(lhs, rhs) + + +class Relational(Boolean, EvalfMixin): + """Base class for all relation types. + + Explanation + =========== + + Subclasses of Relational should generally be instantiated directly, but + Relational can be instantiated with a valid ``rop`` value to dispatch to + the appropriate subclass. + + Parameters + ========== + + rop : str or None + Indicates what subclass to instantiate. Valid values can be found + in the keys of Relational.ValidRelationOperator. + + Examples + ======== + + >>> from sympy import Rel + >>> from sympy.abc import x, y + >>> Rel(y, x + x**2, '==') + Eq(y, x**2 + x) + + A relation's type can be defined upon creation using ``rop``. + The relation type of an existing expression can be obtained + using its ``rel_op`` property. + Here is a table of all the relation types, along with their + ``rop`` and ``rel_op`` values: + + +---------------------+----------------------------+------------+ + |Relation |``rop`` |``rel_op`` | + +=====================+============================+============+ + |``Equality`` |``==`` or ``eq`` or ``None``|``==`` | + +---------------------+----------------------------+------------+ + |``Unequality`` |``!=`` or ``ne`` |``!=`` | + +---------------------+----------------------------+------------+ + |``GreaterThan`` |``>=`` or ``ge`` |``>=`` | + +---------------------+----------------------------+------------+ + |``LessThan`` |``<=`` or ``le`` |``<=`` | + +---------------------+----------------------------+------------+ + |``StrictGreaterThan``|``>`` or ``gt`` |``>`` | + +---------------------+----------------------------+------------+ + |``StrictLessThan`` |``<`` or ``lt`` |``<`` | + +---------------------+----------------------------+------------+ + + For example, setting ``rop`` to ``==`` produces an + ``Equality`` relation, ``Eq()``. + So does setting ``rop`` to ``eq``, or leaving ``rop`` unspecified. + That is, the first three ``Rel()`` below all produce the same result. + Using a ``rop`` from a different row in the table produces a + different relation type. + For example, the fourth ``Rel()`` below using ``lt`` for ``rop`` + produces a ``StrictLessThan`` inequality: + + >>> from sympy import Rel + >>> from sympy.abc import x, y + >>> Rel(y, x + x**2, '==') + Eq(y, x**2 + x) + >>> Rel(y, x + x**2, 'eq') + Eq(y, x**2 + x) + >>> Rel(y, x + x**2) + Eq(y, x**2 + x) + >>> Rel(y, x + x**2, 'lt') + y < x**2 + x + + To obtain the relation type of an existing expression, + get its ``rel_op`` property. + For example, ``rel_op`` is ``==`` for the ``Equality`` relation above, + and ``<`` for the strict less than inequality above: + + >>> from sympy import Rel + >>> from sympy.abc import x, y + >>> my_equality = Rel(y, x + x**2, '==') + >>> my_equality.rel_op + '==' + >>> my_inequality = Rel(y, x + x**2, 'lt') + >>> my_inequality.rel_op + '<' + + """ + __slots__ = () + + ValidRelationOperator: dict[str | None, type[Relational]] = {} + + is_Relational = True + + # ValidRelationOperator - Defined below, because the necessary classes + # have not yet been defined + + def __new__(cls, lhs, rhs, rop=None, **assumptions): + # If called by a subclass, do nothing special and pass on to Basic. + if cls is not Relational: + return Basic.__new__(cls, lhs, rhs, **assumptions) + + # XXX: Why do this? There should be a separate function to make a + # particular subclass of Relational from a string. + # + # If called directly with an operator, look up the subclass + # corresponding to that operator and delegate to it + cls = cls.ValidRelationOperator.get(rop, None) + if cls is None: + raise ValueError("Invalid relational operator symbol: %r" % rop) + + if not issubclass(cls, (Eq, Ne)): + # validate that Booleans are not being used in a relational + # other than Eq/Ne; + # Note: Symbol is a subclass of Boolean but is considered + # acceptable here. + if any(map(_nontrivBool, (lhs, rhs))): + raise TypeError(filldedent(''' + A Boolean argument can only be used in + Eq and Ne; all other relationals expect + real expressions. + ''')) + + return cls(lhs, rhs, **assumptions) + + @property + def lhs(self): + """The left-hand side of the relation.""" + return self._args[0] + + @property + def rhs(self): + """The right-hand side of the relation.""" + return self._args[1] + + @property + def reversed(self): + """Return the relationship with sides reversed. + + Examples + ======== + + >>> from sympy import Eq + >>> from sympy.abc import x + >>> Eq(x, 1) + Eq(x, 1) + >>> _.reversed + Eq(1, x) + >>> x < 1 + x < 1 + >>> _.reversed + 1 > x + """ + ops = {Eq: Eq, Gt: Lt, Ge: Le, Lt: Gt, Le: Ge, Ne: Ne} + a, b = self.args + return Relational.__new__(ops.get(self.func, self.func), b, a) + + @property + def reversedsign(self): + """Return the relationship with signs reversed. + + Examples + ======== + + >>> from sympy import Eq + >>> from sympy.abc import x + >>> Eq(x, 1) + Eq(x, 1) + >>> _.reversedsign + Eq(-x, -1) + >>> x < 1 + x < 1 + >>> _.reversedsign + -x > -1 + """ + a, b = self.args + if not (isinstance(a, BooleanAtom) or isinstance(b, BooleanAtom)): + ops = {Eq: Eq, Gt: Lt, Ge: Le, Lt: Gt, Le: Ge, Ne: Ne} + return Relational.__new__(ops.get(self.func, self.func), -a, -b) + else: + return self + + @property + def negated(self): + """Return the negated relationship. + + Examples + ======== + + >>> from sympy import Eq + >>> from sympy.abc import x + >>> Eq(x, 1) + Eq(x, 1) + >>> _.negated + Ne(x, 1) + >>> x < 1 + x < 1 + >>> _.negated + x >= 1 + + Notes + ===== + + This works more or less identical to ``~``/``Not``. The difference is + that ``negated`` returns the relationship even if ``evaluate=False``. + Hence, this is useful in code when checking for e.g. negated relations + to existing ones as it will not be affected by the `evaluate` flag. + + """ + ops = {Eq: Ne, Ge: Lt, Gt: Le, Le: Gt, Lt: Ge, Ne: Eq} + # If there ever will be new Relational subclasses, the following line + # will work until it is properly sorted out + # return ops.get(self.func, lambda a, b, evaluate=False: ~(self.func(a, + # b, evaluate=evaluate)))(*self.args, evaluate=False) + return Relational.__new__(ops.get(self.func), *self.args) + + @property + def weak(self): + """return the non-strict version of the inequality or self + + EXAMPLES + ======== + + >>> from sympy.abc import x + >>> (x < 1).weak + x <= 1 + >>> _.weak + x <= 1 + """ + return self + + @property + def strict(self): + """return the strict version of the inequality or self + + EXAMPLES + ======== + + >>> from sympy.abc import x + >>> (x <= 1).strict + x < 1 + >>> _.strict + x < 1 + """ + return self + + def _eval_evalf(self, prec): + return self.func(*[s._evalf(prec) for s in self.args]) + + @property + def canonical(self): + """Return a canonical form of the relational by putting a + number on the rhs, canonically removing a sign or else + ordering the args canonically. No other simplification is + attempted. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> x < 2 + x < 2 + >>> _.reversed.canonical + x < 2 + >>> (-y < x).canonical + x > -y + >>> (-y > x).canonical + x < -y + >>> (-y < -x).canonical + x < y + + The canonicalization is recursively applied: + + >>> from sympy import Eq + >>> Eq(x < y, y > x).canonical + True + """ + args = tuple([i.canonical if isinstance(i, Relational) else i for i in self.args]) + if args != self.args: + r = self.func(*args) + if not isinstance(r, Relational): + return r + else: + r = self + if r.rhs.is_number: + if r.rhs.is_Number and r.lhs.is_Number and r.lhs > r.rhs: + r = r.reversed + elif r.lhs.is_number: + r = r.reversed + elif tuple(ordered(args)) != args: + r = r.reversed + + LHS_CEMS = getattr(r.lhs, 'could_extract_minus_sign', None) + RHS_CEMS = getattr(r.rhs, 'could_extract_minus_sign', None) + + if isinstance(r.lhs, BooleanAtom) or isinstance(r.rhs, BooleanAtom): + return r + + # Check if first value has negative sign + if LHS_CEMS and LHS_CEMS(): + return r.reversedsign + elif not r.rhs.is_number and RHS_CEMS and RHS_CEMS(): + # Right hand side has a minus, but not lhs. + # How does the expression with reversed signs behave? + # This is so that expressions of the type + # Eq(x, -y) and Eq(-x, y) + # have the same canonical representation + expr1, _ = ordered([r.lhs, -r.rhs]) + if expr1 != r.lhs: + return r.reversed.reversedsign + + return r + + def equals(self, other, failing_expression=False): + """Return True if the sides of the relationship are mathematically + identical and the type of relationship is the same. + If failing_expression is True, return the expression whose truth value + was unknown.""" + if isinstance(other, Relational): + if other in (self, self.reversed): + return True + a, b = self, other + if a.func in (Eq, Ne) or b.func in (Eq, Ne): + if a.func != b.func: + return False + left, right = [i.equals(j, + failing_expression=failing_expression) + for i, j in zip(a.args, b.args)] + if left is True: + return right + if right is True: + return left + lr, rl = [i.equals(j, failing_expression=failing_expression) + for i, j in zip(a.args, b.reversed.args)] + if lr is True: + return rl + if rl is True: + return lr + e = (left, right, lr, rl) + if all(i is False for i in e): + return False + for i in e: + if i not in (True, False): + return i + else: + if b.func != a.func: + b = b.reversed + if a.func != b.func: + return False + left = a.lhs.equals(b.lhs, + failing_expression=failing_expression) + if left is False: + return False + right = a.rhs.equals(b.rhs, + failing_expression=failing_expression) + if right is False: + return False + if left is True: + return right + return left + + def _eval_simplify(self, **kwargs): + from .add import Add + from .expr import Expr + r = self + r = r.func(*[i.simplify(**kwargs) for i in r.args]) + if r.is_Relational: + if not isinstance(r.lhs, Expr) or not isinstance(r.rhs, Expr): + return r + dif = r.lhs - r.rhs + # replace dif with a valid Number that will + # allow a definitive comparison with 0 + v = None + if dif.is_comparable: + v = dif.n(2) + if any(i._prec == 1 for i in v.as_real_imag()): + rv, iv = [i.n(2) for i in dif.as_real_imag()] + v = rv + S.ImaginaryUnit*iv + elif dif.equals(0): # XXX this is expensive + v = S.Zero + if v is not None: + r = r.func._eval_relation(v, S.Zero) + r = r.canonical + # If there is only one symbol in the expression, + # try to write it on a simplified form + free = list(filter(lambda x: x.is_real is not False, r.free_symbols)) + if len(free) == 1: + try: + from sympy.solvers.solveset import linear_coeffs + x = free.pop() + dif = r.lhs - r.rhs + m, b = linear_coeffs(dif, x) + if m.is_zero is False: + if m.is_negative: + # Dividing with a negative number, so change order of arguments + # canonical will put the symbol back on the lhs later + r = r.func(-b / m, x) + else: + r = r.func(x, -b / m) + else: + r = r.func(b, S.Zero) + except ValueError: + # maybe not a linear function, try polynomial + from sympy.polys.polyerrors import PolynomialError + from sympy.polys.polytools import gcd, Poly, poly + try: + p = poly(dif, x) + c = p.all_coeffs() + constant = c[-1] + c[-1] = 0 + scale = gcd(c) + c = [ctmp / scale for ctmp in c] + r = r.func(Poly.from_list(c, x).as_expr(), -constant / scale) + except PolynomialError: + pass + elif len(free) >= 2: + try: + from sympy.solvers.solveset import linear_coeffs + from sympy.polys.polytools import gcd + free = list(ordered(free)) + dif = r.lhs - r.rhs + m = linear_coeffs(dif, *free) + constant = m[-1] + del m[-1] + scale = gcd(m) + m = [mtmp / scale for mtmp in m] + nzm = list(filter(lambda f: f[0] != 0, list(zip(m, free)))) + if scale.is_zero is False: + if constant != 0: + # lhs: expression, rhs: constant + newexpr = Add(*[i * j for i, j in nzm]) + r = r.func(newexpr, -constant / scale) + else: + # keep first term on lhs + lhsterm = nzm[0][0] * nzm[0][1] + del nzm[0] + newexpr = Add(*[i * j for i, j in nzm]) + r = r.func(lhsterm, -newexpr) + + else: + r = r.func(constant, S.Zero) + except ValueError: + pass + # Did we get a simplified result? + r = r.canonical + measure = kwargs['measure'] + if measure(r) < kwargs['ratio'] * measure(self): + return r + else: + return self + + def _eval_trigsimp(self, **opts): + from sympy.simplify.trigsimp import trigsimp + return self.func(trigsimp(self.lhs, **opts), trigsimp(self.rhs, **opts)) + + def expand(self, **kwargs): + args = (arg.expand(**kwargs) for arg in self.args) + return self.func(*args) + + def __bool__(self) -> bool: + raise TypeError( + LazyExceptionMessage( + lambda: f"cannot determine truth value of Relational: {self}" + ) + ) + + def _eval_as_set(self): + # self is univariate and periodicity(self, x) in (0, None) + from sympy.solvers.inequalities import solve_univariate_inequality + from sympy.sets.conditionset import ConditionSet + syms = self.free_symbols + assert len(syms) == 1 + x = syms.pop() + try: + xset = solve_univariate_inequality(self, x, relational=False) + except NotImplementedError: + # solve_univariate_inequality raises NotImplementedError for + # unsolvable equations/inequalities. + xset = ConditionSet(x, self, S.Reals) + return xset + + @property + def binary_symbols(self): + # override where necessary + return set() + + +Rel = Relational + + +class Equality(Relational): + """ + An equal relation between two objects. + + Explanation + =========== + + Represents that two objects are equal. If they can be easily shown + to be definitively equal (or unequal), this will reduce to True (or + False). Otherwise, the relation is maintained as an unevaluated + Equality object. Use the ``simplify`` function on this object for + more nontrivial evaluation of the equality relation. + + As usual, the keyword argument ``evaluate=False`` can be used to + prevent any evaluation. + + Examples + ======== + + >>> from sympy import Eq, simplify, exp, cos + >>> from sympy.abc import x, y + >>> Eq(y, x + x**2) + Eq(y, x**2 + x) + >>> Eq(2, 5) + False + >>> Eq(2, 5, evaluate=False) + Eq(2, 5) + >>> _.doit() + False + >>> Eq(exp(x), exp(x).rewrite(cos)) + Eq(exp(x), sinh(x) + cosh(x)) + >>> simplify(_) + True + + See Also + ======== + + sympy.logic.boolalg.Equivalent : for representing equality between two + boolean expressions + + Notes + ===== + + Python treats 1 and True (and 0 and False) as being equal; SymPy + does not. And integer will always compare as unequal to a Boolean: + + >>> Eq(True, 1), True == 1 + (False, True) + + This class is not the same as the == operator. The == operator tests + for exact structural equality between two expressions; this class + compares expressions mathematically. + + If either object defines an ``_eval_Eq`` method, it can be used in place of + the default algorithm. If ``lhs._eval_Eq(rhs)`` or ``rhs._eval_Eq(lhs)`` + returns anything other than None, that return value will be substituted for + the Equality. If None is returned by ``_eval_Eq``, an Equality object will + be created as usual. + + Since this object is already an expression, it does not respond to + the method ``as_expr`` if one tries to create `x - y` from ``Eq(x, y)``. + If ``eq = Eq(x, y)`` then write `eq.lhs - eq.rhs` to get ``x - y``. + + .. deprecated:: 1.5 + + ``Eq(expr)`` with a single argument is a shorthand for ``Eq(expr, 0)``, + but this behavior is deprecated and will be removed in a future version + of SymPy. + + """ + rel_op = '==' + + __slots__ = () + + is_Equality = True + + def __new__(cls, lhs, rhs, **options): + evaluate = options.pop('evaluate', global_parameters.evaluate) + lhs = _sympify(lhs) + rhs = _sympify(rhs) + if evaluate: + val = is_eq(lhs, rhs) + if val is None: + return cls(lhs, rhs, evaluate=False) + else: + return _sympify(val) + + return Relational.__new__(cls, lhs, rhs) + + @classmethod + def _eval_relation(cls, lhs, rhs): + return _sympify(lhs == rhs) + + def _eval_rewrite_as_Add(self, L, R, evaluate=True, **kwargs): + """ + return Eq(L, R) as L - R. To control the evaluation of + the result set pass `evaluate=True` to give L - R; + if `evaluate=None` then terms in L and R will not cancel + but they will be listed in canonical order; otherwise + non-canonical args will be returned. If one side is 0, the + non-zero side will be returned. + + .. deprecated:: 1.13 + + The method ``Eq.rewrite(Add)`` is deprecated. + See :ref:`eq-rewrite-Add` for details. + + Examples + ======== + + >>> from sympy import Eq, Add + >>> from sympy.abc import b, x + >>> eq = Eq(x + b, x - b) + >>> eq.rewrite(Add) #doctest: +SKIP + 2*b + >>> eq.rewrite(Add, evaluate=None).args #doctest: +SKIP + (b, b, x, -x) + >>> eq.rewrite(Add, evaluate=False).args #doctest: +SKIP + (b, x, b, -x) + """ + sympy_deprecation_warning(""" + Eq.rewrite(Add) is deprecated. + + For ``eq = Eq(a, b)`` use ``eq.lhs - eq.rhs`` to obtain + ``a - b``. + """, + deprecated_since_version="1.13", + active_deprecations_target="eq-rewrite-Add", + stacklevel=5, + ) + from .add import _unevaluated_Add, Add + if L == 0: + return R + if R == 0: + return L + if evaluate: + # allow cancellation of args + return L - R + args = Add.make_args(L) + Add.make_args(-R) + if evaluate is None: + # no cancellation, but canonical + return _unevaluated_Add(*args) + # no cancellation, not canonical + return Add._from_args(args) + + @property + def binary_symbols(self): + if S.true in self.args or S.false in self.args: + if self.lhs.is_Symbol: + return {self.lhs} + elif self.rhs.is_Symbol: + return {self.rhs} + return set() + + def _eval_simplify(self, **kwargs): + # standard simplify + e = super()._eval_simplify(**kwargs) + if not isinstance(e, Equality): + return e + from .expr import Expr + if not isinstance(e.lhs, Expr) or not isinstance(e.rhs, Expr): + return e + free = self.free_symbols + if len(free) == 1: + try: + from .add import Add + from sympy.solvers.solveset import linear_coeffs + x = free.pop() + m, b = linear_coeffs( + Add(e.lhs, -e.rhs, evaluate=False), x) + if m.is_zero is False: + enew = e.func(x, -b / m) + else: + enew = e.func(m * x, -b) + measure = kwargs['measure'] + if measure(enew) <= kwargs['ratio'] * measure(e): + e = enew + except ValueError: + pass + return e.canonical + + def integrate(self, *args, **kwargs): + """See the integrate function in sympy.integrals""" + from sympy.integrals.integrals import integrate + return integrate(self, *args, **kwargs) + + def as_poly(self, *gens, **kwargs): + '''Returns lhs-rhs as a Poly + + Examples + ======== + + >>> from sympy import Eq + >>> from sympy.abc import x + >>> Eq(x**2, 1).as_poly(x) + Poly(x**2 - 1, x, domain='ZZ') + ''' + return (self.lhs - self.rhs).as_poly(*gens, **kwargs) + + +Eq = Equality + + +class Unequality(Relational): + """An unequal relation between two objects. + + Explanation + =========== + + Represents that two objects are not equal. If they can be shown to be + definitively equal, this will reduce to False; if definitively unequal, + this will reduce to True. Otherwise, the relation is maintained as an + Unequality object. + + Examples + ======== + + >>> from sympy import Ne + >>> from sympy.abc import x, y + >>> Ne(y, x+x**2) + Ne(y, x**2 + x) + + See Also + ======== + Equality + + Notes + ===== + This class is not the same as the != operator. The != operator tests + for exact structural equality between two expressions; this class + compares expressions mathematically. + + This class is effectively the inverse of Equality. As such, it uses the + same algorithms, including any available `_eval_Eq` methods. + + """ + rel_op = '!=' + + __slots__ = () + + def __new__(cls, lhs, rhs, **options): + lhs = _sympify(lhs) + rhs = _sympify(rhs) + evaluate = options.pop('evaluate', global_parameters.evaluate) + if evaluate: + val = is_neq(lhs, rhs) + if val is None: + return cls(lhs, rhs, evaluate=False) + else: + return _sympify(val) + + return Relational.__new__(cls, lhs, rhs, **options) + + @classmethod + def _eval_relation(cls, lhs, rhs): + return _sympify(lhs != rhs) + + @property + def binary_symbols(self): + if S.true in self.args or S.false in self.args: + if self.lhs.is_Symbol: + return {self.lhs} + elif self.rhs.is_Symbol: + return {self.rhs} + return set() + + def _eval_simplify(self, **kwargs): + # simplify as an equality + eq = Equality(*self.args)._eval_simplify(**kwargs) + if isinstance(eq, Equality): + # send back Ne with the new args + return self.func(*eq.args) + return eq.negated # result of Ne is the negated Eq + + +Ne = Unequality + + +class _Inequality(Relational): + """Internal base class for all *Than types. + + Each subclass must implement _eval_relation to provide the method for + comparing two real numbers. + + """ + __slots__ = () + + def __new__(cls, lhs, rhs, **options): + + try: + lhs = _sympify(lhs) + rhs = _sympify(rhs) + except SympifyError: + return NotImplemented + + evaluate = options.pop('evaluate', global_parameters.evaluate) + if evaluate: + for me in (lhs, rhs): + if me.is_extended_real is False: + raise TypeError("Invalid comparison of non-real %s" % me) + if me is S.NaN: + raise TypeError("Invalid NaN comparison") + # First we invoke the appropriate inequality method of `lhs` + # (e.g., `lhs.__lt__`). That method will try to reduce to + # boolean or raise an exception. It may keep calling + # superclasses until it reaches `Expr` (e.g., `Expr.__lt__`). + # In some cases, `Expr` will just invoke us again (if neither it + # nor a subclass was able to reduce to boolean or raise an + # exception). In that case, it must call us with + # `evaluate=False` to prevent infinite recursion. + return cls._eval_relation(lhs, rhs, **options) + + # make a "non-evaluated" Expr for the inequality + return Relational.__new__(cls, lhs, rhs, **options) + + @classmethod + def _eval_relation(cls, lhs, rhs, **options): + val = cls._eval_fuzzy_relation(lhs, rhs) + if val is None: + return cls(lhs, rhs, evaluate=False) + else: + return _sympify(val) + + +class _Greater(_Inequality): + """Not intended for general use + + _Greater is only used so that GreaterThan and StrictGreaterThan may + subclass it for the .gts and .lts properties. + + """ + __slots__ = () + + @property + def gts(self): + return self._args[0] + + @property + def lts(self): + return self._args[1] + + +class _Less(_Inequality): + """Not intended for general use. + + _Less is only used so that LessThan and StrictLessThan may subclass it for + the .gts and .lts properties. + + """ + __slots__ = () + + @property + def gts(self): + return self._args[1] + + @property + def lts(self): + return self._args[0] + + +class GreaterThan(_Greater): + r"""Class representations of inequalities. + + Explanation + =========== + + The ``*Than`` classes represent inequal relationships, where the left-hand + side is generally bigger or smaller than the right-hand side. For example, + the GreaterThan class represents an inequal relationship where the + left-hand side is at least as big as the right side, if not bigger. In + mathematical notation: + + lhs $\ge$ rhs + + In total, there are four ``*Than`` classes, to represent the four + inequalities: + + +-----------------+--------+ + |Class Name | Symbol | + +=================+========+ + |GreaterThan | ``>=`` | + +-----------------+--------+ + |LessThan | ``<=`` | + +-----------------+--------+ + |StrictGreaterThan| ``>`` | + +-----------------+--------+ + |StrictLessThan | ``<`` | + +-----------------+--------+ + + All classes take two arguments, lhs and rhs. + + +----------------------------+-----------------+ + |Signature Example | Math Equivalent | + +============================+=================+ + |GreaterThan(lhs, rhs) | lhs $\ge$ rhs | + +----------------------------+-----------------+ + |LessThan(lhs, rhs) | lhs $\le$ rhs | + +----------------------------+-----------------+ + |StrictGreaterThan(lhs, rhs) | lhs $>$ rhs | + +----------------------------+-----------------+ + |StrictLessThan(lhs, rhs) | lhs $<$ rhs | + +----------------------------+-----------------+ + + In addition to the normal .lhs and .rhs of Relations, ``*Than`` inequality + objects also have the .lts and .gts properties, which represent the "less + than side" and "greater than side" of the operator. Use of .lts and .gts + in an algorithm rather than .lhs and .rhs as an assumption of inequality + direction will make more explicit the intent of a certain section of code, + and will make it similarly more robust to client code changes: + + >>> from sympy import GreaterThan, StrictGreaterThan + >>> from sympy import LessThan, StrictLessThan + >>> from sympy import And, Ge, Gt, Le, Lt, Rel, S + >>> from sympy.abc import x, y, z + >>> from sympy.core.relational import Relational + + >>> e = GreaterThan(x, 1) + >>> e + x >= 1 + >>> '%s >= %s is the same as %s <= %s' % (e.gts, e.lts, e.lts, e.gts) + 'x >= 1 is the same as 1 <= x' + + Examples + ======== + + One generally does not instantiate these classes directly, but uses various + convenience methods: + + >>> for f in [Ge, Gt, Le, Lt]: # convenience wrappers + ... print(f(x, 2)) + x >= 2 + x > 2 + x <= 2 + x < 2 + + Another option is to use the Python inequality operators (``>=``, ``>``, + ``<=``, ``<``) directly. Their main advantage over the ``Ge``, ``Gt``, + ``Le``, and ``Lt`` counterparts, is that one can write a more + "mathematical looking" statement rather than littering the math with + oddball function calls. However there are certain (minor) caveats of + which to be aware (search for 'gotcha', below). + + >>> x >= 2 + x >= 2 + >>> _ == Ge(x, 2) + True + + However, it is also perfectly valid to instantiate a ``*Than`` class less + succinctly and less conveniently: + + >>> Rel(x, 1, ">") + x > 1 + >>> Relational(x, 1, ">") + x > 1 + + >>> StrictGreaterThan(x, 1) + x > 1 + >>> GreaterThan(x, 1) + x >= 1 + >>> LessThan(x, 1) + x <= 1 + >>> StrictLessThan(x, 1) + x < 1 + + Notes + ===== + + There are a couple of "gotchas" to be aware of when using Python's + operators. + + The first is that what your write is not always what you get: + + >>> 1 < x + x > 1 + + Due to the order that Python parses a statement, it may + not immediately find two objects comparable. When ``1 < x`` + is evaluated, Python recognizes that the number 1 is a native + number and that x is *not*. Because a native Python number does + not know how to compare itself with a SymPy object + Python will try the reflective operation, ``x > 1`` and that is the + form that gets evaluated, hence returned. + + If the order of the statement is important (for visual output to + the console, perhaps), one can work around this annoyance in a + couple ways: + + (1) "sympify" the literal before comparison + + >>> S(1) < x + 1 < x + + (2) use one of the wrappers or less succinct methods described + above + + >>> Lt(1, x) + 1 < x + >>> Relational(1, x, "<") + 1 < x + + The second gotcha involves writing equality tests between relationals + when one or both sides of the test involve a literal relational: + + >>> e = x < 1; e + x < 1 + >>> e == e # neither side is a literal + True + >>> e == x < 1 # expecting True, too + False + >>> e != x < 1 # expecting False + x < 1 + >>> x < 1 != x < 1 # expecting False or the same thing as before + Traceback (most recent call last): + ... + TypeError: cannot determine truth value of Relational + + The solution for this case is to wrap literal relationals in + parentheses: + + >>> e == (x < 1) + True + >>> e != (x < 1) + False + >>> (x < 1) != (x < 1) + False + + The third gotcha involves chained inequalities not involving + ``==`` or ``!=``. Occasionally, one may be tempted to write: + + >>> e = x < y < z + Traceback (most recent call last): + ... + TypeError: symbolic boolean expression has no truth value. + + Due to an implementation detail or decision of Python [1]_, + there is no way for SymPy to create a chained inequality with + that syntax so one must use And: + + >>> e = And(x < y, y < z) + >>> type( e ) + And + >>> e + (x < y) & (y < z) + + Although this can also be done with the '&' operator, it cannot + be done with the 'and' operarator: + + >>> (x < y) & (y < z) + (x < y) & (y < z) + >>> (x < y) and (y < z) + Traceback (most recent call last): + ... + TypeError: cannot determine truth value of Relational + + .. [1] This implementation detail is that Python provides no reliable + method to determine that a chained inequality is being built. + Chained comparison operators are evaluated pairwise, using "and" + logic (see + https://docs.python.org/3/reference/expressions.html#not-in). This + is done in an efficient way, so that each object being compared + is only evaluated once and the comparison can short-circuit. For + example, ``1 > 2 > 3`` is evaluated by Python as ``(1 > 2) and (2 + > 3)``. The ``and`` operator coerces each side into a bool, + returning the object itself when it short-circuits. The bool of + the --Than operators will raise TypeError on purpose, because + SymPy cannot determine the mathematical ordering of symbolic + expressions. Thus, if we were to compute ``x > y > z``, with + ``x``, ``y``, and ``z`` being Symbols, Python converts the + statement (roughly) into these steps: + + (1) x > y > z + (2) (x > y) and (y > z) + (3) (GreaterThanObject) and (y > z) + (4) (GreaterThanObject.__bool__()) and (y > z) + (5) TypeError + + Because of the ``and`` added at step 2, the statement gets turned into a + weak ternary statement, and the first object's ``__bool__`` method will + raise TypeError. Thus, creating a chained inequality is not possible. + + In Python, there is no way to override the ``and`` operator, or to + control how it short circuits, so it is impossible to make something + like ``x > y > z`` work. There was a PEP to change this, + :pep:`335`, but it was officially closed in March, 2012. + + """ + __slots__ = () + + rel_op = '>=' + + @classmethod + def _eval_fuzzy_relation(cls, lhs, rhs): + return is_ge(lhs, rhs) + + @property + def strict(self): + return Gt(*self.args) + +Ge = GreaterThan + + +class LessThan(_Less): + __doc__ = GreaterThan.__doc__ + __slots__ = () + + rel_op = '<=' + + @classmethod + def _eval_fuzzy_relation(cls, lhs, rhs): + return is_le(lhs, rhs) + + @property + def strict(self): + return Lt(*self.args) + +Le = LessThan + + +class StrictGreaterThan(_Greater): + __doc__ = GreaterThan.__doc__ + __slots__ = () + + rel_op = '>' + + @classmethod + def _eval_fuzzy_relation(cls, lhs, rhs): + return is_gt(lhs, rhs) + + @property + def weak(self): + return Ge(*self.args) + + +Gt = StrictGreaterThan + + +class StrictLessThan(_Less): + __doc__ = GreaterThan.__doc__ + __slots__ = () + + rel_op = '<' + + @classmethod + def _eval_fuzzy_relation(cls, lhs, rhs): + return is_lt(lhs, rhs) + + @property + def weak(self): + return Le(*self.args) + +Lt = StrictLessThan + +# A class-specific (not object-specific) data item used for a minor speedup. +# It is defined here, rather than directly in the class, because the classes +# that it references have not been defined until now (e.g. StrictLessThan). +Relational.ValidRelationOperator = { + None: Equality, + '==': Equality, + 'eq': Equality, + '!=': Unequality, + '<>': Unequality, + 'ne': Unequality, + '>=': GreaterThan, + 'ge': GreaterThan, + '<=': LessThan, + 'le': LessThan, + '>': StrictGreaterThan, + 'gt': StrictGreaterThan, + '<': StrictLessThan, + 'lt': StrictLessThan, +} + + +def _n2(a, b): + """Return (a - b).evalf(2) if a and b are comparable, else None. + This should only be used when a and b are already sympified. + """ + # /!\ it is very important (see issue 8245) not to + # use a re-evaluated number in the calculation of dif + if a.is_comparable and b.is_comparable: + dif = (a - b).evalf(2) + if dif.is_comparable: + return dif + + +@dispatch(Expr, Expr) +def _eval_is_ge(lhs, rhs): + return None + + +@dispatch(Basic, Basic) +def _eval_is_eq(lhs, rhs): + return None + + +@dispatch(Tuple, Expr) # type: ignore +def _eval_is_eq(lhs, rhs): # noqa:F811 + return False + + +@dispatch(Tuple, AppliedUndef) # type: ignore +def _eval_is_eq(lhs, rhs): # noqa:F811 + return None + + +@dispatch(Tuple, Symbol) # type: ignore +def _eval_is_eq(lhs, rhs): # noqa:F811 + return None + + +@dispatch(Tuple, Tuple) # type: ignore +def _eval_is_eq(lhs, rhs): # noqa:F811 + if len(lhs) != len(rhs): + return False + + return fuzzy_and(fuzzy_bool(is_eq(s, o)) for s, o in zip(lhs, rhs)) + + +def is_lt(lhs, rhs, assumptions=None): + """Fuzzy bool for lhs is strictly less than rhs. + + See the docstring for :func:`~.is_ge` for more. + """ + return fuzzy_not(is_ge(lhs, rhs, assumptions)) + + +def is_gt(lhs, rhs, assumptions=None): + """Fuzzy bool for lhs is strictly greater than rhs. + + See the docstring for :func:`~.is_ge` for more. + """ + return fuzzy_not(is_le(lhs, rhs, assumptions)) + + +def is_le(lhs, rhs, assumptions=None): + """Fuzzy bool for lhs is less than or equal to rhs. + + See the docstring for :func:`~.is_ge` for more. + """ + return is_ge(rhs, lhs, assumptions) + + +def is_ge(lhs, rhs, assumptions=None): + """ + Fuzzy bool for *lhs* is greater than or equal to *rhs*. + + Parameters + ========== + + lhs : Expr + The left-hand side of the expression, must be sympified, + and an instance of expression. Throws an exception if + lhs is not an instance of expression. + + rhs : Expr + The right-hand side of the expression, must be sympified + and an instance of expression. Throws an exception if + lhs is not an instance of expression. + + assumptions: Boolean, optional + Assumptions taken to evaluate the inequality. + + Returns + ======= + + ``True`` if *lhs* is greater than or equal to *rhs*, ``False`` if *lhs* + is less than *rhs*, and ``None`` if the comparison between *lhs* and + *rhs* is indeterminate. + + Explanation + =========== + + This function is intended to give a relatively fast determination and + deliberately does not attempt slow calculations that might help in + obtaining a determination of True or False in more difficult cases. + + The four comparison functions ``is_le``, ``is_lt``, ``is_ge``, and ``is_gt`` are + each implemented in terms of ``is_ge`` in the following way: + + is_ge(x, y) := is_ge(x, y) + is_le(x, y) := is_ge(y, x) + is_lt(x, y) := fuzzy_not(is_ge(x, y)) + is_gt(x, y) := fuzzy_not(is_ge(y, x)) + + Therefore, supporting new type with this function will ensure behavior for + other three functions as well. + + To maintain these equivalences in fuzzy logic it is important that in cases where + either x or y is non-real all comparisons will give None. + + Examples + ======== + + >>> from sympy import S, Q + >>> from sympy.core.relational import is_ge, is_le, is_gt, is_lt + >>> from sympy.abc import x + >>> is_ge(S(2), S(0)) + True + >>> is_ge(S(0), S(2)) + False + >>> is_le(S(0), S(2)) + True + >>> is_gt(S(0), S(2)) + False + >>> is_lt(S(2), S(0)) + False + + Assumptions can be passed to evaluate the quality which is otherwise + indeterminate. + + >>> print(is_ge(x, S(0))) + None + >>> is_ge(x, S(0), assumptions=Q.positive(x)) + True + + New types can be supported by dispatching to ``_eval_is_ge``. + + >>> from sympy import Expr, sympify + >>> from sympy.multipledispatch import dispatch + >>> class MyExpr(Expr): + ... def __new__(cls, arg): + ... return super().__new__(cls, sympify(arg)) + ... @property + ... def value(self): + ... return self.args[0] + >>> @dispatch(MyExpr, MyExpr) + ... def _eval_is_ge(a, b): + ... return is_ge(a.value, b.value) + >>> a = MyExpr(1) + >>> b = MyExpr(2) + >>> is_ge(b, a) + True + >>> is_le(a, b) + True + """ + from sympy.assumptions.wrapper import AssumptionsWrapper, is_extended_nonnegative + + if not (isinstance(lhs, Expr) and isinstance(rhs, Expr)): + raise TypeError("Can only compare inequalities with Expr") + + retval = _eval_is_ge(lhs, rhs) + + if retval is not None: + return retval + else: + n2 = _n2(lhs, rhs) + if n2 is not None: + # use float comparison for infinity. + # otherwise get stuck in infinite recursion + if n2 in (S.Infinity, S.NegativeInfinity): + n2 = float(n2) + return n2 >= 0 + + _lhs = AssumptionsWrapper(lhs, assumptions) + _rhs = AssumptionsWrapper(rhs, assumptions) + if _lhs.is_extended_real and _rhs.is_extended_real: + if (_lhs.is_infinite and _lhs.is_extended_positive) or (_rhs.is_infinite and _rhs.is_extended_negative): + return True + diff = lhs - rhs + if diff is not S.NaN: + rv = is_extended_nonnegative(diff, assumptions) + if rv is not None: + return rv + + +def is_neq(lhs, rhs, assumptions=None): + """Fuzzy bool for lhs does not equal rhs. + + See the docstring for :func:`~.is_eq` for more. + """ + return fuzzy_not(is_eq(lhs, rhs, assumptions)) + + +def is_eq(lhs, rhs, assumptions=None): + """ + Fuzzy bool representing mathematical equality between *lhs* and *rhs*. + + Parameters + ========== + + lhs : Expr + The left-hand side of the expression, must be sympified. + + rhs : Expr + The right-hand side of the expression, must be sympified. + + assumptions: Boolean, optional + Assumptions taken to evaluate the equality. + + Returns + ======= + + ``True`` if *lhs* is equal to *rhs*, ``False`` is *lhs* is not equal to *rhs*, + and ``None`` if the comparison between *lhs* and *rhs* is indeterminate. + + Explanation + =========== + + This function is intended to give a relatively fast determination and + deliberately does not attempt slow calculations that might help in + obtaining a determination of True or False in more difficult cases. + + :func:`~.is_neq` calls this function to return its value, so supporting + new type with this function will ensure correct behavior for ``is_neq`` + as well. + + Examples + ======== + + >>> from sympy import Q, S + >>> from sympy.core.relational import is_eq, is_neq + >>> from sympy.abc import x + >>> is_eq(S(0), S(0)) + True + >>> is_neq(S(0), S(0)) + False + >>> is_eq(S(0), S(2)) + False + >>> is_neq(S(0), S(2)) + True + + Assumptions can be passed to evaluate the equality which is otherwise + indeterminate. + + >>> print(is_eq(x, S(0))) + None + >>> is_eq(x, S(0), assumptions=Q.zero(x)) + True + + New types can be supported by dispatching to ``_eval_is_eq``. + + >>> from sympy import Basic, sympify + >>> from sympy.multipledispatch import dispatch + >>> class MyBasic(Basic): + ... def __new__(cls, arg): + ... return Basic.__new__(cls, sympify(arg)) + ... @property + ... def value(self): + ... return self.args[0] + ... + >>> @dispatch(MyBasic, MyBasic) + ... def _eval_is_eq(a, b): + ... return is_eq(a.value, b.value) + ... + >>> a = MyBasic(1) + >>> b = MyBasic(1) + >>> is_eq(a, b) + True + >>> is_neq(a, b) + False + + """ + # here, _eval_Eq is only called for backwards compatibility + # new code should use is_eq with multiple dispatch as + # outlined in the docstring + for side1, side2 in (lhs, rhs), (rhs, lhs): + eval_func = getattr(side1, '_eval_Eq', None) + if eval_func is not None: + retval = eval_func(side2) + if retval is not None: + return retval + + retval = _eval_is_eq(lhs, rhs) + if retval is not None: + return retval + + if dispatch(type(lhs), type(rhs)) != dispatch(type(rhs), type(lhs)): + retval = _eval_is_eq(rhs, lhs) + if retval is not None: + return retval + + # retval is still None, so go through the equality logic + # If expressions have the same structure, they must be equal. + if lhs == rhs: + return True # e.g. True == True + elif all(isinstance(i, BooleanAtom) for i in (rhs, lhs)): + return False # True != False + elif not (lhs.is_Symbol or rhs.is_Symbol) and ( + isinstance(lhs, Boolean) != + isinstance(rhs, Boolean)): + return False # only Booleans can equal Booleans + + from sympy.assumptions.wrapper import (AssumptionsWrapper, + is_infinite, is_extended_real) + from .add import Add + + _lhs = AssumptionsWrapper(lhs, assumptions) + _rhs = AssumptionsWrapper(rhs, assumptions) + + if _lhs.is_infinite or _rhs.is_infinite: + if fuzzy_xor([_lhs.is_infinite, _rhs.is_infinite]): + return False + if fuzzy_xor([_lhs.is_extended_real, _rhs.is_extended_real]): + return False + if fuzzy_and([_lhs.is_extended_real, _rhs.is_extended_real]): + return fuzzy_xor([_lhs.is_extended_positive, fuzzy_not(_rhs.is_extended_positive)]) + + # Try to split real/imaginary parts and equate them + I = S.ImaginaryUnit + + def split_real_imag(expr): + real_imag = lambda t: ( + 'real' if is_extended_real(t, assumptions) else + 'imag' if is_extended_real(I*t, assumptions) else None) + return sift(Add.make_args(expr), real_imag) + + lhs_ri = split_real_imag(lhs) + if not lhs_ri[None]: + rhs_ri = split_real_imag(rhs) + if not rhs_ri[None]: + eq_real = is_eq(Add(*lhs_ri['real']), Add(*rhs_ri['real']), assumptions) + eq_imag = is_eq(I * Add(*lhs_ri['imag']), I * Add(*rhs_ri['imag']), assumptions) + return fuzzy_and(map(fuzzy_bool, [eq_real, eq_imag])) + + from sympy.functions.elementary.complexes import arg + # Compare e.g. zoo with 1+I*oo by comparing args + arglhs = arg(lhs) + argrhs = arg(rhs) + # Guard against Eq(nan, nan) -> False + if not (arglhs == S.NaN and argrhs == S.NaN): + return fuzzy_bool(is_eq(arglhs, argrhs, assumptions)) + + if all(isinstance(i, Expr) for i in (lhs, rhs)): + # see if the difference evaluates + dif = lhs - rhs + _dif = AssumptionsWrapper(dif, assumptions) + z = _dif.is_zero + if z is not None: + if z is False and _dif.is_commutative: # issue 10728 + return False + if z: + return True + + # is_zero cannot help decide integer/rational with Float + c, t = dif.as_coeff_Add() + if c.is_Float: + if int_valued(c): + if t.is_integer is False: + return False + elif t.is_rational is False: + return False + + n2 = _n2(lhs, rhs) + if n2 is not None: + return _sympify(n2 == 0) + + # see if the ratio evaluates + n, d = dif.as_numer_denom() + rv = None + _n = AssumptionsWrapper(n, assumptions) + _d = AssumptionsWrapper(d, assumptions) + if _n.is_zero: + rv = _d.is_nonzero + elif _n.is_finite: + if _d.is_infinite: + rv = True + elif _n.is_zero is False: + rv = _d.is_infinite + if rv is None: + # if the condition that makes the denominator + # infinite does not make the original expression + # True then False can be returned + from sympy.simplify.simplify import clear_coefficients + l, r = clear_coefficients(d, S.Infinity) + args = [_.subs(l, r) for _ in (lhs, rhs)] + if args != [lhs, rhs]: + rv = fuzzy_bool(is_eq(*args, assumptions)) + if rv is True: + rv = None + elif any(is_infinite(a, assumptions) for a in Add.make_args(n)): + # (inf or nan)/x != 0 + rv = False + if rv is not None: + return rv diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/rules.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/rules.py new file mode 100644 index 0000000000000000000000000000000000000000..5ae331f71b21c8a6ef35f499c5c5c89239349e9c --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/rules.py @@ -0,0 +1,66 @@ +""" +Replacement rules. +""" + +class Transform: + """ + Immutable mapping that can be used as a generic transformation rule. + + Parameters + ========== + + transform : callable + Computes the value corresponding to any key. + + filter : callable, optional + If supplied, specifies which objects are in the mapping. + + Examples + ======== + + >>> from sympy.core.rules import Transform + >>> from sympy.abc import x + + This Transform will return, as a value, one more than the key: + + >>> add1 = Transform(lambda x: x + 1) + >>> add1[1] + 2 + >>> add1[x] + x + 1 + + By default, all values are considered to be in the dictionary. If a filter + is supplied, only the objects for which it returns True are considered as + being in the dictionary: + + >>> add1_odd = Transform(lambda x: x + 1, lambda x: x%2 == 1) + >>> 2 in add1_odd + False + >>> add1_odd.get(2, 0) + 0 + >>> 3 in add1_odd + True + >>> add1_odd[3] + 4 + >>> add1_odd.get(3, 0) + 4 + """ + + def __init__(self, transform, filter=lambda x: True): + self._transform = transform + self._filter = filter + + def __contains__(self, item): + return self._filter(item) + + def __getitem__(self, key): + if self._filter(key): + return self._transform(key) + else: + raise KeyError(key) + + def get(self, item, default=None): + if item in self: + return self[item] + else: + return default diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/singleton.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/singleton.py new file mode 100644 index 0000000000000000000000000000000000000000..e8b9df959393270140bc3ef11b3d9a4e948c5e80 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/singleton.py @@ -0,0 +1,199 @@ +"""Singleton mechanism""" + +from __future__ import annotations + +from typing import TYPE_CHECKING + +from .core import Registry +from .sympify import sympify + + +if TYPE_CHECKING: + from sympy.core.numbers import ( + Zero as _Zero, + One as _One, + NegativeOne as _NegativeOne, + Half as _Half, + Infinity as _Infinity, + NegativeInfinity as _NegativeInfinity, + ComplexInfinity as _ComplexInfinity, + NaN as _NaN, + ) + + +class SingletonRegistry(Registry): + """ + The registry for the singleton classes (accessible as ``S``). + + Explanation + =========== + + This class serves as two separate things. + + The first thing it is is the ``SingletonRegistry``. Several classes in + SymPy appear so often that they are singletonized, that is, using some + metaprogramming they are made so that they can only be instantiated once + (see the :class:`sympy.core.singleton.Singleton` class for details). For + instance, every time you create ``Integer(0)``, this will return the same + instance, :class:`sympy.core.numbers.Zero`. All singleton instances are + attributes of the ``S`` object, so ``Integer(0)`` can also be accessed as + ``S.Zero``. + + Singletonization offers two advantages: it saves memory, and it allows + fast comparison. It saves memory because no matter how many times the + singletonized objects appear in expressions in memory, they all point to + the same single instance in memory. The fast comparison comes from the + fact that you can use ``is`` to compare exact instances in Python + (usually, you need to use ``==`` to compare things). ``is`` compares + objects by memory address, and is very fast. + + Examples + ======== + + >>> from sympy import S, Integer + >>> a = Integer(0) + >>> a is S.Zero + True + + For the most part, the fact that certain objects are singletonized is an + implementation detail that users should not need to worry about. In SymPy + library code, ``is`` comparison is often used for performance purposes + The primary advantage of ``S`` for end users is the convenient access to + certain instances that are otherwise difficult to type, like ``S.Half`` + (instead of ``Rational(1, 2)``). + + When using ``is`` comparison, make sure the argument is sympified. For + instance, + + >>> x = 0 + >>> x is S.Zero + False + + This problem is not an issue when using ``==``, which is recommended for + most use-cases: + + >>> 0 == S.Zero + True + + The second thing ``S`` is is a shortcut for + :func:`sympy.core.sympify.sympify`. :func:`sympy.core.sympify.sympify` is + the function that converts Python objects such as ``int(1)`` into SymPy + objects such as ``Integer(1)``. It also converts the string form of an + expression into a SymPy expression, like ``sympify("x**2")`` -> + ``Symbol("x")**2``. ``S(1)`` is the same thing as ``sympify(1)`` + (basically, ``S.__call__`` has been defined to call ``sympify``). + + This is for convenience, since ``S`` is a single letter. It's mostly + useful for defining rational numbers. Consider an expression like ``x + + 1/2``. If you enter this directly in Python, it will evaluate the ``1/2`` + and give ``0.5``, because both arguments are ints (see also + :ref:`tutorial-gotchas-final-notes`). However, in SymPy, you usually want + the quotient of two integers to give an exact rational number. The way + Python's evaluation works, at least one side of an operator needs to be a + SymPy object for the SymPy evaluation to take over. You could write this + as ``x + Rational(1, 2)``, but this is a lot more typing. A shorter + version is ``x + S(1)/2``. Since ``S(1)`` returns ``Integer(1)``, the + division will return a ``Rational`` type, since it will call + ``Integer.__truediv__``, which knows how to return a ``Rational``. + + """ + __slots__ = () + + Zero: _Zero + One: _One + NegativeOne: _NegativeOne + Half: _Half + Infinity: _Infinity + NegativeInfinity: _NegativeInfinity + ComplexInfinity: _ComplexInfinity + NaN: _NaN + + # Also allow things like S(5) + __call__ = staticmethod(sympify) + + def __init__(self): + self._classes_to_install = {} + # Dict of classes that have been registered, but that have not have been + # installed as an attribute of this SingletonRegistry. + # Installation automatically happens at the first attempt to access the + # attribute. + # The purpose of this is to allow registration during class + # initialization during import, but not trigger object creation until + # actual use (which should not happen until after all imports are + # finished). + + def register(self, cls): + # Make sure a duplicate class overwrites the old one + if hasattr(self, cls.__name__): + delattr(self, cls.__name__) + self._classes_to_install[cls.__name__] = cls + + def __getattr__(self, name): + """Python calls __getattr__ if no attribute of that name was installed + yet. + + Explanation + =========== + + This __getattr__ checks whether a class with the requested name was + already registered but not installed; if no, raises an AttributeError. + Otherwise, retrieves the class, calculates its singleton value, installs + it as an attribute of the given name, and unregisters the class.""" + if name not in self._classes_to_install: + raise AttributeError( + "Attribute '%s' was not installed on SymPy registry %s" % ( + name, self)) + class_to_install = self._classes_to_install[name] + value_to_install = class_to_install() + self.__setattr__(name, value_to_install) + del self._classes_to_install[name] + return value_to_install + + def __repr__(self): + return "S" + +S = SingletonRegistry() + + +class Singleton(type): + """ + Metaclass for singleton classes. + + Explanation + =========== + + A singleton class has only one instance which is returned every time the + class is instantiated. Additionally, this instance can be accessed through + the global registry object ``S`` as ``S.``. + + Examples + ======== + + >>> from sympy import S, Basic + >>> from sympy.core.singleton import Singleton + >>> class MySingleton(Basic, metaclass=Singleton): + ... pass + >>> Basic() is Basic() + False + >>> MySingleton() is MySingleton() + True + >>> S.MySingleton is MySingleton() + True + + Notes + ===== + + Instance creation is delayed until the first time the value is accessed. + (SymPy versions before 1.0 would create the instance during class + creation time, which would be prone to import cycles.) + """ + def __init__(cls, *args, **kwargs): + cls._instance = obj = Basic.__new__(cls) + cls.__new__ = lambda cls: obj + cls.__getnewargs__ = lambda obj: () + cls.__getstate__ = lambda obj: None + S.register(cls) + + +# Delayed to avoid cyclic import +from .basic import Basic diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/sorting.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/sorting.py new file mode 100644 index 0000000000000000000000000000000000000000..399a7efa1f6cbe1ebdf6307c14b411df36fc7de0 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/sorting.py @@ -0,0 +1,312 @@ +from collections import defaultdict + +from .sympify import sympify, SympifyError +from sympy.utilities.iterables import iterable, uniq + + +__all__ = ['default_sort_key', 'ordered'] + + +def default_sort_key(item, order=None): + """Return a key that can be used for sorting. + + The key has the structure: + + (class_key, (len(args), args), exponent.sort_key(), coefficient) + + This key is supplied by the sort_key routine of Basic objects when + ``item`` is a Basic object or an object (other than a string) that + sympifies to a Basic object. Otherwise, this function produces the + key. + + The ``order`` argument is passed along to the sort_key routine and is + used to determine how the terms *within* an expression are ordered. + (See examples below) ``order`` options are: 'lex', 'grlex', 'grevlex', + and reversed values of the same (e.g. 'rev-lex'). The default order + value is None (which translates to 'lex'). + + Examples + ======== + + >>> from sympy import S, I, default_sort_key, sin, cos, sqrt + >>> from sympy.core.function import UndefinedFunction + >>> from sympy.abc import x + + The following are equivalent ways of getting the key for an object: + + >>> x.sort_key() == default_sort_key(x) + True + + Here are some examples of the key that is produced: + + >>> default_sort_key(UndefinedFunction('f')) + ((0, 0, 'UndefinedFunction'), (1, ('f',)), ((1, 0, 'Number'), + (0, ()), (), 1), 1) + >>> default_sort_key('1') + ((0, 0, 'str'), (1, ('1',)), ((1, 0, 'Number'), (0, ()), (), 1), 1) + >>> default_sort_key(S.One) + ((1, 0, 'Number'), (0, ()), (), 1) + >>> default_sort_key(2) + ((1, 0, 'Number'), (0, ()), (), 2) + + While sort_key is a method only defined for SymPy objects, + default_sort_key will accept anything as an argument so it is + more robust as a sorting key. For the following, using key= + lambda i: i.sort_key() would fail because 2 does not have a sort_key + method; that's why default_sort_key is used. Note, that it also + handles sympification of non-string items likes ints: + + >>> a = [2, I, -I] + >>> sorted(a, key=default_sort_key) + [2, -I, I] + + The returned key can be used anywhere that a key can be specified for + a function, e.g. sort, min, max, etc...: + + >>> a.sort(key=default_sort_key); a[0] + 2 + >>> min(a, key=default_sort_key) + 2 + + Notes + ===== + + The key returned is useful for getting items into a canonical order + that will be the same across platforms. It is not directly useful for + sorting lists of expressions: + + >>> a, b = x, 1/x + + Since ``a`` has only 1 term, its value of sort_key is unaffected by + ``order``: + + >>> a.sort_key() == a.sort_key('rev-lex') + True + + If ``a`` and ``b`` are combined then the key will differ because there + are terms that can be ordered: + + >>> eq = a + b + >>> eq.sort_key() == eq.sort_key('rev-lex') + False + >>> eq.as_ordered_terms() + [x, 1/x] + >>> eq.as_ordered_terms('rev-lex') + [1/x, x] + + But since the keys for each of these terms are independent of ``order``'s + value, they do not sort differently when they appear separately in a list: + + >>> sorted(eq.args, key=default_sort_key) + [1/x, x] + >>> sorted(eq.args, key=lambda i: default_sort_key(i, order='rev-lex')) + [1/x, x] + + The order of terms obtained when using these keys is the order that would + be obtained if those terms were *factors* in a product. + + Although it is useful for quickly putting expressions in canonical order, + it does not sort expressions based on their complexity defined by the + number of operations, power of variables and others: + + >>> sorted([sin(x)*cos(x), sin(x)], key=default_sort_key) + [sin(x)*cos(x), sin(x)] + >>> sorted([x, x**2, sqrt(x), x**3], key=default_sort_key) + [sqrt(x), x, x**2, x**3] + + See Also + ======== + + ordered, sympy.core.expr.Expr.as_ordered_factors, sympy.core.expr.Expr.as_ordered_terms + + """ + from .basic import Basic + from .singleton import S + + if isinstance(item, Basic): + return item.sort_key(order=order) + + if iterable(item, exclude=str): + if isinstance(item, dict): + args = item.items() + unordered = True + elif isinstance(item, set): + args = item + unordered = True + else: + # e.g. tuple, list + args = list(item) + unordered = False + + args = [default_sort_key(arg, order=order) for arg in args] + + if unordered: + # e.g. dict, set + args = sorted(args) + + cls_index, args = 10, (len(args), tuple(args)) + else: + if not isinstance(item, str): + try: + item = sympify(item, strict=True) + except SympifyError: + # e.g. lambda x: x + pass + else: + if isinstance(item, Basic): + # e.g int -> Integer + return default_sort_key(item) + # e.g. UndefinedFunction + + # e.g. str + cls_index, args = 0, (1, (str(item),)) + + return (cls_index, 0, item.__class__.__name__ + ), args, S.One.sort_key(), S.One + + +def _node_count(e): + # this not only counts nodes, it affirms that the + # args are Basic (i.e. have an args property). If + # some object has a non-Basic arg, it needs to be + # fixed since it is intended that all Basic args + # are of Basic type (though this is not easy to enforce). + if e.is_Float: + return 0.5 + return 1 + sum(map(_node_count, e.args)) + + +def _nodes(e): + """ + A helper for ordered() which returns the node count of ``e`` which + for Basic objects is the number of Basic nodes in the expression tree + but for other objects is 1 (unless the object is an iterable or dict + for which the sum of nodes is returned). + """ + from .basic import Basic + from .function import Derivative + + if isinstance(e, Basic): + if isinstance(e, Derivative): + return _nodes(e.expr) + sum(i[1] if i[1].is_Number else + _nodes(i[1]) for i in e.variable_count) + return _node_count(e) + elif iterable(e): + return 1 + sum(_nodes(ei) for ei in e) + elif isinstance(e, dict): + return 1 + sum(_nodes(k) + _nodes(v) for k, v in e.items()) + else: + return 1 + + +def ordered(seq, keys=None, default=True, warn=False): + """Return an iterator of the seq where keys are used to break ties + in a conservative fashion: if, after applying a key, there are no + ties then no other keys will be computed. + + Two default keys will be applied if 1) keys are not provided or + 2) the given keys do not resolve all ties (but only if ``default`` + is True). The two keys are ``_nodes`` (which places smaller + expressions before large) and ``default_sort_key`` which (if the + ``sort_key`` for an object is defined properly) should resolve + any ties. This strategy is similar to sorting done by + ``Basic.compare``, but differs in that ``ordered`` never makes a + decision based on an objects name. + + If ``warn`` is True then an error will be raised if there were no + keys remaining to break ties. This can be used if it was expected that + there should be no ties between items that are not identical. + + Examples + ======== + + >>> from sympy import ordered, count_ops + >>> from sympy.abc import x, y + + The count_ops is not sufficient to break ties in this list and the first + two items appear in their original order (i.e. the sorting is stable): + + >>> list(ordered([y + 2, x + 2, x**2 + y + 3], + ... count_ops, default=False, warn=False)) + ... + [y + 2, x + 2, x**2 + y + 3] + + The default_sort_key allows the tie to be broken: + + >>> list(ordered([y + 2, x + 2, x**2 + y + 3])) + ... + [x + 2, y + 2, x**2 + y + 3] + + Here, sequences are sorted by length, then sum: + + >>> seq, keys = [[[1, 2, 1], [0, 3, 1], [1, 1, 3], [2], [1]], [ + ... lambda x: len(x), + ... lambda x: sum(x)]] + ... + >>> list(ordered(seq, keys, default=False, warn=False)) + [[1], [2], [1, 2, 1], [0, 3, 1], [1, 1, 3]] + + If ``warn`` is True, an error will be raised if there were not + enough keys to break ties: + + >>> list(ordered(seq, keys, default=False, warn=True)) + Traceback (most recent call last): + ... + ValueError: not enough keys to break ties + + + Notes + ===== + + The decorated sort is one of the fastest ways to sort a sequence for + which special item comparison is desired: the sequence is decorated, + sorted on the basis of the decoration (e.g. making all letters lower + case) and then undecorated. If one wants to break ties for items that + have the same decorated value, a second key can be used. But if the + second key is expensive to compute then it is inefficient to decorate + all items with both keys: only those items having identical first key + values need to be decorated. This function applies keys successively + only when needed to break ties. By yielding an iterator, use of the + tie-breaker is delayed as long as possible. + + This function is best used in cases when use of the first key is + expected to be a good hashing function; if there are no unique hashes + from application of a key, then that key should not have been used. The + exception, however, is that even if there are many collisions, if the + first group is small and one does not need to process all items in the + list then time will not be wasted sorting what one was not interested + in. For example, if one were looking for the minimum in a list and + there were several criteria used to define the sort order, then this + function would be good at returning that quickly if the first group + of candidates is small relative to the number of items being processed. + + """ + + d = defaultdict(list) + if keys: + if isinstance(keys, (list, tuple)): + keys = list(keys) + f = keys.pop(0) + else: + f = keys + keys = [] + for a in seq: + d[f(a)].append(a) + else: + if not default: + raise ValueError('if default=False then keys must be provided') + d[None].extend(seq) + + for k, value in sorted(d.items()): + if len(value) > 1: + if keys: + value = ordered(value, keys, default, warn) + elif default: + value = ordered(value, (_nodes, default_sort_key,), + default=False, warn=warn) + elif warn: + u = list(uniq(value)) + if len(u) > 1: + raise ValueError( + 'not enough keys to break ties: %s' % u) + yield from value diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/symbol.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/symbol.py new file mode 100644 index 0000000000000000000000000000000000000000..2e03ff0c84c1668b70ec5b3d7f8bc854a2e5e4ac --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/symbol.py @@ -0,0 +1,993 @@ +from __future__ import annotations + + +from .assumptions import StdFactKB, _assume_defined +from .basic import Basic, Atom +from .cache import cacheit +from .containers import Tuple +from .expr import Expr, AtomicExpr +from .function import AppliedUndef, FunctionClass +from .kind import NumberKind, UndefinedKind +from .logic import fuzzy_bool +from .singleton import S +from .sorting import ordered +from .sympify import sympify +from sympy.logic.boolalg import Boolean +from sympy.utilities.iterables import sift, is_sequence +from sympy.utilities.misc import filldedent + +import string +import re as _re +import random +from itertools import product +from typing import Any + + +class Str(Atom): + """ + Represents string in SymPy. + + Explanation + =========== + + Previously, ``Symbol`` was used where string is needed in ``args`` of SymPy + objects, e.g. denoting the name of the instance. However, since ``Symbol`` + represents mathematical scalar, this class should be used instead. + + """ + __slots__ = ('name',) + + def __new__(cls, name, **kwargs): + if not isinstance(name, str): + raise TypeError("name should be a string, not %s" % repr(type(name))) + obj = Expr.__new__(cls, **kwargs) + obj.name = name + return obj + + def __getnewargs__(self): + return (self.name,) + + def _hashable_content(self): + return (self.name,) + + +def _filter_assumptions(kwargs): + """Split the given dict into assumptions and non-assumptions. + Keys are taken as assumptions if they correspond to an + entry in ``_assume_defined``. + """ + assumptions, nonassumptions = map(dict, sift(kwargs.items(), + lambda i: i[0] in _assume_defined, + binary=True)) + Symbol._sanitize(assumptions) + return assumptions, nonassumptions + +def _symbol(s, matching_symbol=None, **assumptions): + """Return s if s is a Symbol, else if s is a string, return either + the matching_symbol if the names are the same or else a new symbol + with the same assumptions as the matching symbol (or the + assumptions as provided). + + Examples + ======== + + >>> from sympy import Symbol + >>> from sympy.core.symbol import _symbol + >>> _symbol('y') + y + >>> _.is_real is None + True + >>> _symbol('y', real=True).is_real + True + + >>> x = Symbol('x') + >>> _symbol(x, real=True) + x + >>> _.is_real is None # ignore attribute if s is a Symbol + True + + Below, the variable sym has the name 'foo': + + >>> sym = Symbol('foo', real=True) + + Since 'x' is not the same as sym's name, a new symbol is created: + + >>> _symbol('x', sym).name + 'x' + + It will acquire any assumptions give: + + >>> _symbol('x', sym, real=False).is_real + False + + Since 'foo' is the same as sym's name, sym is returned + + >>> _symbol('foo', sym) + foo + + Any assumptions given are ignored: + + >>> _symbol('foo', sym, real=False).is_real + True + + NB: the symbol here may not be the same as a symbol with the same + name defined elsewhere as a result of different assumptions. + + See Also + ======== + + sympy.core.symbol.Symbol + + """ + if isinstance(s, str): + if matching_symbol and matching_symbol.name == s: + return matching_symbol + return Symbol(s, **assumptions) + elif isinstance(s, Symbol): + return s + else: + raise ValueError('symbol must be string for symbol name or Symbol') + +def uniquely_named_symbol(xname, exprs=(), compare=str, modify=None, **assumptions): + """ + Return a symbol whose name is derivated from *xname* but is unique + from any other symbols in *exprs*. + + *xname* and symbol names in *exprs* are passed to *compare* to be + converted to comparable forms. If ``compare(xname)`` is not unique, + it is recursively passed to *modify* until unique name is acquired. + + Parameters + ========== + + xname : str or Symbol + Base name for the new symbol. + + exprs : Expr or iterable of Expr + Expressions whose symbols are compared to *xname*. + + compare : function + Unary function which transforms *xname* and symbol names from + *exprs* to comparable form. + + modify : function + Unary function which modifies the string. Default is appending + the number, or increasing the number if exists. + + Examples + ======== + + By default, a number is appended to *xname* to generate unique name. + If the number already exists, it is recursively increased. + + >>> from sympy.core.symbol import uniquely_named_symbol, Symbol + >>> uniquely_named_symbol('x', Symbol('x')) + x0 + >>> uniquely_named_symbol('x', (Symbol('x'), Symbol('x0'))) + x1 + >>> uniquely_named_symbol('x0', (Symbol('x1'), Symbol('x0'))) + x2 + + Name generation can be controlled by passing *modify* parameter. + + >>> from sympy.abc import x + >>> uniquely_named_symbol('x', x, modify=lambda s: 2*s) + xx + + """ + def numbered_string_incr(s, start=0): + if not s: + return str(start) + i = len(s) - 1 + while i != -1: + if not s[i].isdigit(): + break + i -= 1 + n = str(int(s[i + 1:] or start - 1) + 1) + return s[:i + 1] + n + + default = None + if is_sequence(xname): + xname, default = xname + x = compare(xname) + if not exprs: + return _symbol(x, default, **assumptions) + if not is_sequence(exprs): + exprs = [exprs] + names = set().union( + [i.name for e in exprs for i in e.atoms(Symbol)] + + [i.func.name for e in exprs for i in e.atoms(AppliedUndef)]) + if modify is None: + modify = numbered_string_incr + while any(x == compare(s) for s in names): + x = modify(x) + return _symbol(x, default, **assumptions) +_uniquely_named_symbol = uniquely_named_symbol + + +# XXX: We need type: ignore below because Expr and Boolean are incompatible as +# superclasses. Really Symbol should not be a subclass of Boolean. + + +class Symbol(AtomicExpr, Boolean): # type: ignore + """ + Symbol class is used to create symbolic variables. + + Explanation + =========== + + Symbolic variables are placeholders for mathematical symbols that can represent numbers, constants, or any other mathematical entities and can be used in mathematical expressions and to perform symbolic computations. + + Assumptions: + + commutative = True + positive = True + real = True + imaginary = True + complex = True + complete list of more assumptions- :ref:`predicates` + + You can override the default assumptions in the constructor. + + Examples + ======== + + >>> from sympy import Symbol + >>> x = Symbol("x", positive=True) + >>> x.is_positive + True + >>> x.is_negative + False + + passing in greek letters: + + >>> from sympy import Symbol + >>> alpha = Symbol('alpha') + >>> alpha #doctest: +SKIP + α + + Trailing digits are automatically treated like subscripts of what precedes them in the name. + General format to add subscript to a symbol : + `` = Symbol('_')`` + + >>> from sympy import Symbol + >>> alpha_i = Symbol('alpha_i') + >>> alpha_i #doctest: +SKIP + αᵢ + + Parameters + ========== + + AtomicExpr: variable name + Boolean: Assumption with a boolean value(True or False) + """ + + is_comparable = False + + __slots__ = ('name', '_assumptions_orig', '_assumptions0') + + name: str + + is_Symbol = True + is_symbol = True + + @property + def kind(self): + if self.is_commutative: + return NumberKind + return UndefinedKind + + @property + def _diff_wrt(self): + """Allow derivatives wrt Symbols. + + Examples + ======== + + >>> from sympy import Symbol + >>> x = Symbol('x') + >>> x._diff_wrt + True + """ + return True + + @staticmethod + def _sanitize(assumptions, obj=None): + """Remove None, convert values to bool, check commutativity *in place*. + """ + + # be strict about commutativity: cannot be None + is_commutative = fuzzy_bool(assumptions.get('commutative', True)) + if is_commutative is None: + whose = '%s ' % obj.__name__ if obj else '' + raise ValueError( + '%scommutativity must be True or False.' % whose) + + # sanitize other assumptions so 1 -> True and 0 -> False + for key in list(assumptions.keys()): + v = assumptions[key] + if v is None: + assumptions.pop(key) + continue + assumptions[key] = bool(v) + + def _merge(self, assumptions): + base = self.assumptions0 + for k in set(assumptions) & set(base): + if assumptions[k] != base[k]: + raise ValueError(filldedent(''' + non-matching assumptions for %s: existing value + is %s and new value is %s''' % ( + k, base[k], assumptions[k]))) + base.update(assumptions) + return base + + def __new__(cls, name, **assumptions): + """Symbols are identified by name and assumptions:: + + >>> from sympy import Symbol + >>> Symbol("x") == Symbol("x") + True + >>> Symbol("x", real=True) == Symbol("x", real=False) + False + + """ + cls._sanitize(assumptions, cls) + return Symbol.__xnew_cached_(cls, name, **assumptions) + + + @staticmethod + @cacheit + def _canonical_assumptions(**assumptions): + # This is retained purely so that srepr can include commutative=True if + # that was explicitly specified but not if it was not. Ideally srepr + # should not distinguish these cases because the symbols otherwise + # compare equal and are considered equivalent. + # + # See https://github.com/sympy/sympy/issues/8873 + # + assumptions_orig = assumptions.copy() + + # The only assumption that is assumed by default is commutative=True: + assumptions.setdefault('commutative', True) + + assumptions_kb = StdFactKB(assumptions) + assumptions0 = dict(assumptions_kb) + + return assumptions_kb, assumptions_orig, assumptions0 + + @staticmethod + def __xnew__(cls, name, **assumptions): # never cached (e.g. dummy) + if not isinstance(name, str): + raise TypeError("name should be a string, not %s" % repr(type(name))) + + + obj = Expr.__new__(cls) + obj.name = name + + assumptions_kb, assumptions_orig, assumptions0 = Symbol._canonical_assumptions(**assumptions) + + obj._assumptions = assumptions_kb + obj._assumptions_orig = assumptions_orig + obj._assumptions0 = tuple(sorted(assumptions0.items())) + + # The three assumptions dicts are all a little different: + # + # >>> from sympy import Symbol + # >>> x = Symbol('x', finite=True) + # >>> x.is_positive # query an assumption + # >>> x._assumptions + # {'finite': True, 'infinite': False, 'commutative': True, 'positive': None} + # >>> x._assumptions0 + # {'finite': True, 'infinite': False, 'commutative': True} + # >>> x._assumptions_orig + # {'finite': True} + # + # Two symbols with the same name are equal if their _assumptions0 are + # the same. Arguably it should be _assumptions_orig that is being + # compared because that is more transparent to the user (it is + # what was passed to the constructor modulo changes made by _sanitize). + + return obj + + @staticmethod + @cacheit + def __xnew_cached_(cls, name, **assumptions): # symbols are always cached + return Symbol.__xnew__(cls, name, **assumptions) + + def __getnewargs_ex__(self): + return ((self.name,), self._assumptions_orig) + + # NOTE: __setstate__ is not needed for pickles created by __getnewargs_ex__ + # but was used before Symbol was changed to use __getnewargs_ex__ in v1.9. + # Pickles created in previous SymPy versions will still need __setstate__ + # so that they can be unpickled in SymPy > v1.9. + + def __setstate__(self, state): + for name, value in state.items(): + setattr(self, name, value) + + def _hashable_content(self): + return (self.name,) + self._assumptions0 + + def _eval_subs(self, old, new): + if old.is_Pow: + from sympy.core.power import Pow + return Pow(self, S.One, evaluate=False)._eval_subs(old, new) + + def _eval_refine(self, assumptions): + return self + + @property + def assumptions0(self): + return dict(self._assumptions0) + + @cacheit + def sort_key(self, order=None): + return self.class_key(), (1, (self.name,)), S.One.sort_key(), S.One + + def as_dummy(self): + # only put commutativity in explicitly if it is False + return Dummy(self.name) if self.is_commutative is not False \ + else Dummy(self.name, commutative=self.is_commutative) + + def as_real_imag(self, deep=True, **hints): + if hints.get('ignore') == self: + return None + else: + from sympy.functions.elementary.complexes import im, re + return (re(self), im(self)) + + def is_constant(self, *wrt, **flags): + if not wrt: + return False + return self not in wrt + + @property + def free_symbols(self): + return {self} + + binary_symbols = free_symbols # in this case, not always + + def as_set(self): + return S.UniversalSet + + +class Dummy(Symbol): + """Dummy symbols are each unique, even if they have the same name: + + Examples + ======== + + >>> from sympy import Dummy + >>> Dummy("x") == Dummy("x") + False + + If a name is not supplied then a string value of an internal count will be + used. This is useful when a temporary variable is needed and the name + of the variable used in the expression is not important. + + >>> Dummy() #doctest: +SKIP + _Dummy_10 + + """ + + # In the rare event that a Dummy object needs to be recreated, both the + # `name` and `dummy_index` should be passed. This is used by `srepr` for + # example: + # >>> d1 = Dummy() + # >>> d2 = eval(srepr(d1)) + # >>> d2 == d1 + # True + # + # If a new session is started between `srepr` and `eval`, there is a very + # small chance that `d2` will be equal to a previously-created Dummy. + + _count = 0 + _prng = random.Random() + _base_dummy_index = _prng.randint(10**6, 9*10**6) + + __slots__ = ('dummy_index',) + + is_Dummy = True + + def __new__(cls, name=None, dummy_index=None, **assumptions): + if dummy_index is not None: + assert name is not None, "If you specify a dummy_index, you must also provide a name" + + if name is None: + name = "Dummy_" + str(Dummy._count) + + if dummy_index is None: + dummy_index = Dummy._base_dummy_index + Dummy._count + Dummy._count += 1 + + cls._sanitize(assumptions, cls) + obj = Symbol.__xnew__(cls, name, **assumptions) + + obj.dummy_index = dummy_index + + return obj + + def __getnewargs_ex__(self): + return ((self.name, self.dummy_index), self._assumptions_orig) + + @cacheit + def sort_key(self, order=None): + return self.class_key(), ( + 2, (self.name, self.dummy_index)), S.One.sort_key(), S.One + + def _hashable_content(self): + return Symbol._hashable_content(self) + (self.dummy_index,) + + +class Wild(Symbol): + """ + A Wild symbol matches anything, or anything + without whatever is explicitly excluded. + + Parameters + ========== + + name : str + Name of the Wild instance. + + exclude : iterable, optional + Instances in ``exclude`` will not be matched. + + properties : iterable of functions, optional + Functions, each taking an expressions as input + and returns a ``bool``. All functions in ``properties`` + need to return ``True`` in order for the Wild instance + to match the expression. + + Examples + ======== + + >>> from sympy import Wild, WildFunction, cos, pi + >>> from sympy.abc import x, y, z + >>> a = Wild('a') + >>> x.match(a) + {a_: x} + >>> pi.match(a) + {a_: pi} + >>> (3*x**2).match(a*x) + {a_: 3*x} + >>> cos(x).match(a) + {a_: cos(x)} + >>> b = Wild('b', exclude=[x]) + >>> (3*x**2).match(b*x) + >>> b.match(a) + {a_: b_} + >>> A = WildFunction('A') + >>> A.match(a) + {a_: A_} + + Tips + ==== + + When using Wild, be sure to use the exclude + keyword to make the pattern more precise. + Without the exclude pattern, you may get matches + that are technically correct, but not what you + wanted. For example, using the above without + exclude: + + >>> from sympy import symbols + >>> a, b = symbols('a b', cls=Wild) + >>> (2 + 3*y).match(a*x + b*y) + {a_: 2/x, b_: 3} + + This is technically correct, because + (2/x)*x + 3*y == 2 + 3*y, but you probably + wanted it to not match at all. The issue is that + you really did not want a and b to include x and y, + and the exclude parameter lets you specify exactly + this. With the exclude parameter, the pattern will + not match. + + >>> a = Wild('a', exclude=[x, y]) + >>> b = Wild('b', exclude=[x, y]) + >>> (2 + 3*y).match(a*x + b*y) + + Exclude also helps remove ambiguity from matches. + + >>> E = 2*x**3*y*z + >>> a, b = symbols('a b', cls=Wild) + >>> E.match(a*b) + {a_: 2*y*z, b_: x**3} + >>> a = Wild('a', exclude=[x, y]) + >>> E.match(a*b) + {a_: z, b_: 2*x**3*y} + >>> a = Wild('a', exclude=[x, y, z]) + >>> E.match(a*b) + {a_: 2, b_: x**3*y*z} + + Wild also accepts a ``properties`` parameter: + + >>> a = Wild('a', properties=[lambda k: k.is_Integer]) + >>> E.match(a*b) + {a_: 2, b_: x**3*y*z} + + """ + is_Wild = True + + __slots__ = ('exclude', 'properties') + + def __new__(cls, name, exclude=(), properties=(), **assumptions): + exclude = tuple([sympify(x) for x in exclude]) + properties = tuple(properties) + cls._sanitize(assumptions, cls) + return Wild.__xnew__(cls, name, exclude, properties, **assumptions) + + def __getnewargs__(self): + return (self.name, self.exclude, self.properties) + + @staticmethod + @cacheit + def __xnew__(cls, name, exclude, properties, **assumptions): + obj = Symbol.__xnew__(cls, name, **assumptions) + obj.exclude = exclude + obj.properties = properties + return obj + + def _hashable_content(self): + return super()._hashable_content() + (self.exclude, self.properties) + + # TODO add check against another Wild + def matches(self, expr, repl_dict=None, old=False): + if any(expr.has(x) for x in self.exclude): + return None + if not all(f(expr) for f in self.properties): + return None + if repl_dict is None: + repl_dict = {} + else: + repl_dict = repl_dict.copy() + repl_dict[self] = expr + return repl_dict + + +_range = _re.compile('([0-9]*:[0-9]+|[a-zA-Z]?:[a-zA-Z])') + + +def symbols(names, *, cls=Symbol, **args) -> Any: + r""" + Transform strings into instances of :class:`Symbol` class. + + :func:`symbols` function returns a sequence of symbols with names taken + from ``names`` argument, which can be a comma or whitespace delimited + string, or a sequence of strings:: + + >>> from sympy import symbols, Function + + >>> x, y, z = symbols('x,y,z') + >>> a, b, c = symbols('a b c') + + The type of output is dependent on the properties of input arguments:: + + >>> symbols('x') + x + >>> symbols('x,') + (x,) + >>> symbols('x,y') + (x, y) + >>> symbols(('a', 'b', 'c')) + (a, b, c) + >>> symbols(['a', 'b', 'c']) + [a, b, c] + >>> symbols({'a', 'b', 'c'}) + {a, b, c} + + If an iterable container is needed for a single symbol, set the ``seq`` + argument to ``True`` or terminate the symbol name with a comma:: + + >>> symbols('x', seq=True) + (x,) + + To reduce typing, range syntax is supported to create indexed symbols. + Ranges are indicated by a colon and the type of range is determined by + the character to the right of the colon. If the character is a digit + then all contiguous digits to the left are taken as the nonnegative + starting value (or 0 if there is no digit left of the colon) and all + contiguous digits to the right are taken as 1 greater than the ending + value:: + + >>> symbols('x:10') + (x0, x1, x2, x3, x4, x5, x6, x7, x8, x9) + + >>> symbols('x5:10') + (x5, x6, x7, x8, x9) + >>> symbols('x5(:2)') + (x50, x51) + + >>> symbols('x5:10,y:5') + (x5, x6, x7, x8, x9, y0, y1, y2, y3, y4) + + >>> symbols(('x5:10', 'y:5')) + ((x5, x6, x7, x8, x9), (y0, y1, y2, y3, y4)) + + If the character to the right of the colon is a letter, then the single + letter to the left (or 'a' if there is none) is taken as the start + and all characters in the lexicographic range *through* the letter to + the right are used as the range:: + + >>> symbols('x:z') + (x, y, z) + >>> symbols('x:c') # null range + () + >>> symbols('x(:c)') + (xa, xb, xc) + + >>> symbols(':c') + (a, b, c) + + >>> symbols('a:d, x:z') + (a, b, c, d, x, y, z) + + >>> symbols(('a:d', 'x:z')) + ((a, b, c, d), (x, y, z)) + + Multiple ranges are supported; contiguous numerical ranges should be + separated by parentheses to disambiguate the ending number of one + range from the starting number of the next:: + + >>> symbols('x:2(1:3)') + (x01, x02, x11, x12) + >>> symbols(':3:2') # parsing is from left to right + (00, 01, 10, 11, 20, 21) + + Only one pair of parentheses surrounding ranges are removed, so to + include parentheses around ranges, double them. And to include spaces, + commas, or colons, escape them with a backslash:: + + >>> symbols('x((a:b))') + (x(a), x(b)) + >>> symbols(r'x(:1\,:2)') # or r'x((:1)\,(:2))' + (x(0,0), x(0,1)) + + All newly created symbols have assumptions set according to ``args``:: + + >>> a = symbols('a', integer=True) + >>> a.is_integer + True + + >>> x, y, z = symbols('x,y,z', real=True) + >>> x.is_real and y.is_real and z.is_real + True + + Despite its name, :func:`symbols` can create symbol-like objects like + instances of Function or Wild classes. To achieve this, set ``cls`` + keyword argument to the desired type:: + + >>> symbols('f,g,h', cls=Function) + (f, g, h) + + >>> type(_[0]) + + + """ + result = [] + + if isinstance(names, str): + marker = 0 + splitters = r'\,', r'\:', r'\ ' + literals: list[tuple[str, str]] = [] + for splitter in splitters: + if splitter in names: + while chr(marker) in names: + marker += 1 + lit_char = chr(marker) + marker += 1 + names = names.replace(splitter, lit_char) + literals.append((lit_char, splitter[1:])) + def literal(s): + if literals: + for c, l in literals: + s = s.replace(c, l) + return s + + names = names.strip() + as_seq = names.endswith(',') + if as_seq: + names = names[:-1].rstrip() + if not names: + raise ValueError('no symbols given') + + # split on commas + names = [n.strip() for n in names.split(',')] + if not all(n for n in names): + raise ValueError('missing symbol between commas') + # split on spaces + for i in range(len(names) - 1, -1, -1): + names[i: i + 1] = names[i].split() + + seq = args.pop('seq', as_seq) + + for name in names: + if not name: + raise ValueError('missing symbol') + + if ':' not in name: + symbol = cls(literal(name), **args) + result.append(symbol) + continue + + split: list[str] = _range.split(name) + split_list: list[list[str]] = [] + # remove 1 layer of bounding parentheses around ranges + for i in range(len(split) - 1): + if i and ':' in split[i] and split[i] != ':' and \ + split[i - 1].endswith('(') and \ + split[i + 1].startswith(')'): + split[i - 1] = split[i - 1][:-1] + split[i + 1] = split[i + 1][1:] + for s in split: + if ':' in s: + if s.endswith(':'): + raise ValueError('missing end range') + a, b = s.split(':') + if b[-1] in string.digits: + a_i = 0 if not a else int(a) + b_i = int(b) + split_list.append([str(c) for c in range(a_i, b_i)]) + else: + a = a or 'a' + split_list.append([string.ascii_letters[c] for c in range( + string.ascii_letters.index(a), + string.ascii_letters.index(b) + 1)]) # inclusive + if not split_list[-1]: + break + else: + split_list.append([s]) + else: + seq = True + if len(split_list) == 1: + names = split_list[0] + else: + names = [''.join(s) for s in product(*split_list)] + if literals: + result.extend([cls(literal(s), **args) for s in names]) + else: + result.extend([cls(s, **args) for s in names]) + + if not seq and len(result) <= 1: + if not result: + return () + return result[0] + + return tuple(result) + else: + for name in names: + result.append(symbols(name, cls=cls, **args)) + + return type(names)(result) + + +def var(names, **args): + """ + Create symbols and inject them into the global namespace. + + Explanation + =========== + + This calls :func:`symbols` with the same arguments and puts the results + into the *global* namespace. It's recommended not to use :func:`var` in + library code, where :func:`symbols` has to be used:: + + Examples + ======== + + >>> from sympy import var + + >>> var('x') + x + >>> x # noqa: F821 + x + + >>> var('a,ab,abc') + (a, ab, abc) + >>> abc # noqa: F821 + abc + + >>> var('x,y', real=True) + (x, y) + >>> x.is_real and y.is_real # noqa: F821 + True + + See :func:`symbols` documentation for more details on what kinds of + arguments can be passed to :func:`var`. + + """ + def traverse(symbols, frame): + """Recursively inject symbols to the global namespace. """ + for symbol in symbols: + if isinstance(symbol, Basic): + frame.f_globals[symbol.name] = symbol + elif isinstance(symbol, FunctionClass): + frame.f_globals[symbol.__name__] = symbol + else: + traverse(symbol, frame) + + from inspect import currentframe + frame = currentframe().f_back + + try: + syms = symbols(names, **args) + + if syms is not None: + if isinstance(syms, Basic): + frame.f_globals[syms.name] = syms + elif isinstance(syms, FunctionClass): + frame.f_globals[syms.__name__] = syms + else: + traverse(syms, frame) + finally: + del frame # break cyclic dependencies as stated in inspect docs + + return syms + +def disambiguate(*iter): + """ + Return a Tuple containing the passed expressions with symbols + that appear the same when printed replaced with numerically + subscripted symbols, and all Dummy symbols replaced with Symbols. + + Parameters + ========== + + iter: list of symbols or expressions. + + Examples + ======== + + >>> from sympy.core.symbol import disambiguate + >>> from sympy import Dummy, Symbol, Tuple + >>> from sympy.abc import y + + >>> tup = Symbol('_x'), Dummy('x'), Dummy('x') + >>> disambiguate(*tup) + (x_2, x, x_1) + + >>> eqs = Tuple(Symbol('x')/y, Dummy('x')/y) + >>> disambiguate(*eqs) + (x_1/y, x/y) + + >>> ix = Symbol('x', integer=True) + >>> vx = Symbol('x') + >>> disambiguate(vx + ix) + (x + x_1,) + + To make your own mapping of symbols to use, pass only the free symbols + of the expressions and create a dictionary: + + >>> free = eqs.free_symbols + >>> mapping = dict(zip(free, disambiguate(*free))) + >>> eqs.xreplace(mapping) + (x_1/y, x/y) + + """ + new_iter = Tuple(*iter) + key = lambda x:tuple(sorted(x.assumptions0.items())) + syms = ordered(new_iter.free_symbols, keys=key) + mapping = {} + for s in syms: + mapping.setdefault(str(s).lstrip('_'), []).append(s) + reps = {} + for k in mapping: + # the first or only symbol doesn't get subscripted but make + # sure that it's a Symbol, not a Dummy + mapk0 = Symbol("%s" % (k), **mapping[k][0].assumptions0) + if mapping[k][0] != mapk0: + reps[mapping[k][0]] = mapk0 + # the others get subscripts (and are made into Symbols) + skip = 0 + for i in range(1, len(mapping[k])): + while True: + name = "%s_%i" % (k, i + skip) + if name not in mapping: + break + skip += 1 + ki = mapping[k][i] + reps[ki] = Symbol(name, **ki.assumptions0) + return new_iter.xreplace(reps) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/sympify.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/sympify.py new file mode 100644 index 0000000000000000000000000000000000000000..df30fbb85d5f160540312de4eef1d0e6702fc974 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/sympify.py @@ -0,0 +1,646 @@ +"""sympify -- convert objects SymPy internal format""" + +from __future__ import annotations + +from typing import Any, Callable, overload, TYPE_CHECKING, TypeVar + +import mpmath.libmp as mlib + +from inspect import getmro +import string +from sympy.core.random import choice + +from .parameters import global_parameters + +from sympy.utilities.iterables import iterable + + +if TYPE_CHECKING: + + from sympy.core.basic import Basic + from sympy.core.expr import Expr + from sympy.core.numbers import Integer, Float + + Tbasic = TypeVar('Tbasic', bound=Basic) + + +class SympifyError(ValueError): + def __init__(self, expr, base_exc=None): + self.expr = expr + self.base_exc = base_exc + + def __str__(self): + if self.base_exc is None: + return "SympifyError: %r" % (self.expr,) + + return ("Sympify of expression '%s' failed, because of exception being " + "raised:\n%s: %s" % (self.expr, self.base_exc.__class__.__name__, + str(self.base_exc))) + + +converter: dict[type[Any], Callable[[Any], Basic]] = {} + +#holds the conversions defined in SymPy itself, i.e. non-user defined conversions +_sympy_converter: dict[type[Any], Callable[[Any], Basic]] = {} + +#alias for clearer use in the library +_external_converter = converter + +class CantSympify: + """ + Mix in this trait to a class to disallow sympification of its instances. + + Examples + ======== + + >>> from sympy import sympify + >>> from sympy.core.sympify import CantSympify + + >>> class Something(dict): + ... pass + ... + >>> sympify(Something()) + {} + + >>> class Something(dict, CantSympify): + ... pass + ... + >>> sympify(Something()) + Traceback (most recent call last): + ... + SympifyError: SympifyError: {} + + """ + + __slots__ = () + + +def _is_numpy_instance(a): + """ + Checks if an object is an instance of a type from the numpy module. + """ + # This check avoids unnecessarily importing NumPy. We check the whole + # __mro__ in case any base type is a numpy type. + return any(type_.__module__ == 'numpy' + for type_ in type(a).__mro__) + + +def _convert_numpy_types(a, **sympify_args): + """ + Converts a numpy datatype input to an appropriate SymPy type. + """ + import numpy as np + if not isinstance(a, np.floating): + if np.iscomplex(a): + return _sympy_converter[complex](a.item()) + else: + return sympify(a.item(), **sympify_args) + else: + from .numbers import Float + prec = np.finfo(a).nmant + 1 + # E.g. double precision means prec=53 but nmant=52 + # Leading bit of mantissa is always 1, so is not stored + if np.isposinf(a): + return Float('inf') + elif np.isneginf(a): + return Float('-inf') + else: + p, q = a.as_integer_ratio() + a = mlib.from_rational(p, q, prec) + return Float(a, precision=prec) + + +@overload +def sympify(a: int, *, strict: bool = False) -> Integer: ... # type: ignore +@overload +def sympify(a: float, *, strict: bool = False) -> Float: ... +@overload +def sympify(a: Expr | complex, *, strict: bool = False) -> Expr: ... +@overload +def sympify(a: Tbasic, *, strict: bool = False) -> Tbasic: ... +@overload +def sympify(a: Any, *, strict: bool = False) -> Basic: ... + +def sympify(a, locals=None, convert_xor=True, strict=False, rational=False, + evaluate=None): + """ + Converts an arbitrary expression to a type that can be used inside SymPy. + + Explanation + =========== + + It will convert Python ints into instances of :class:`~.Integer`, floats + into instances of :class:`~.Float`, etc. It is also able to coerce + symbolic expressions which inherit from :class:`~.Basic`. This can be + useful in cooperation with SAGE. + + .. warning:: + Note that this function uses ``eval``, and thus shouldn't be used on + unsanitized input. + + If the argument is already a type that SymPy understands, it will do + nothing but return that value. This can be used at the beginning of a + function to ensure you are working with the correct type. + + Examples + ======== + + >>> from sympy import sympify + + >>> sympify(2).is_integer + True + >>> sympify(2).is_real + True + + >>> sympify(2.0).is_real + True + >>> sympify("2.0").is_real + True + >>> sympify("2e-45").is_real + True + + If the expression could not be converted, a SympifyError is raised. + + >>> sympify("x***2") + Traceback (most recent call last): + ... + SympifyError: SympifyError: "could not parse 'x***2'" + + When attempting to parse non-Python syntax using ``sympify``, it raises a + ``SympifyError``: + + >>> sympify("2x+1") + Traceback (most recent call last): + ... + SympifyError: Sympify of expression 'could not parse '2x+1'' failed + + To parse non-Python syntax, use ``parse_expr`` from ``sympy.parsing.sympy_parser``. + + >>> from sympy.parsing.sympy_parser import parse_expr + >>> parse_expr("2x+1", transformations="all") + 2*x + 1 + + For more details about ``transformations``: see :func:`~sympy.parsing.sympy_parser.parse_expr` + + Locals + ------ + + The sympification happens with access to everything that is loaded + by ``from sympy import *``; anything used in a string that is not + defined by that import will be converted to a symbol. In the following, + the ``bitcount`` function is treated as a symbol and the ``O`` is + interpreted as the :class:`~.Order` object (used with series) and it raises + an error when used improperly: + + >>> s = 'bitcount(42)' + >>> sympify(s) + bitcount(42) + >>> sympify("O(x)") + O(x) + >>> sympify("O + 1") + Traceback (most recent call last): + ... + TypeError: unbound method... + + In order to have ``bitcount`` be recognized it can be imported into a + namespace dictionary and passed as locals: + + >>> ns = {} + >>> exec('from sympy.core.evalf import bitcount', ns) + >>> sympify(s, locals=ns) + 6 + + In order to have the ``O`` interpreted as a Symbol, identify it as such + in the namespace dictionary. This can be done in a variety of ways; all + three of the following are possibilities: + + >>> from sympy import Symbol + >>> ns["O"] = Symbol("O") # method 1 + >>> exec('from sympy.abc import O', ns) # method 2 + >>> ns.update(dict(O=Symbol("O"))) # method 3 + >>> sympify("O + 1", locals=ns) + O + 1 + + If you want *all* single-letter and Greek-letter variables to be symbols + then you can use the clashing-symbols dictionaries that have been defined + there as private variables: ``_clash1`` (single-letter variables), + ``_clash2`` (the multi-letter Greek names) or ``_clash`` (both single and + multi-letter names that are defined in ``abc``). + + >>> from sympy.abc import _clash1 + >>> set(_clash1) # if this fails, see issue #23903 + {'E', 'I', 'N', 'O', 'Q', 'S'} + >>> sympify('I & Q', _clash1) + I & Q + + Strict + ------ + + If the option ``strict`` is set to ``True``, only the types for which an + explicit conversion has been defined are converted. In the other + cases, a SympifyError is raised. + + >>> print(sympify(None)) + None + >>> sympify(None, strict=True) + Traceback (most recent call last): + ... + SympifyError: SympifyError: None + + .. deprecated:: 1.6 + + ``sympify(obj)`` automatically falls back to ``str(obj)`` when all + other conversion methods fail, but this is deprecated. ``strict=True`` + will disable this deprecated behavior. See + :ref:`deprecated-sympify-string-fallback`. + + Evaluation + ---------- + + If the option ``evaluate`` is set to ``False``, then arithmetic and + operators will be converted into their SymPy equivalents and the + ``evaluate=False`` option will be added. Nested ``Add`` or ``Mul`` will + be denested first. This is done via an AST transformation that replaces + operators with their SymPy equivalents, so if an operand redefines any + of those operations, the redefined operators will not be used. If + argument a is not a string, the mathematical expression is evaluated + before being passed to sympify, so adding ``evaluate=False`` will still + return the evaluated result of expression. + + >>> sympify('2**2 / 3 + 5') + 19/3 + >>> sympify('2**2 / 3 + 5', evaluate=False) + 2**2/3 + 5 + >>> sympify('4/2+7', evaluate=True) + 9 + >>> sympify('4/2+7', evaluate=False) + 4/2 + 7 + >>> sympify(4/2+7, evaluate=False) + 9.00000000000000 + + Extending + --------- + + To extend ``sympify`` to convert custom objects (not derived from ``Basic``), + just define a ``_sympy_`` method to your class. You can do that even to + classes that you do not own by subclassing or adding the method at runtime. + + >>> from sympy import Matrix + >>> class MyList1(object): + ... def __iter__(self): + ... yield 1 + ... yield 2 + ... return + ... def __getitem__(self, i): return list(self)[i] + ... def _sympy_(self): return Matrix(self) + >>> sympify(MyList1()) + Matrix([ + [1], + [2]]) + + If you do not have control over the class definition you could also use the + ``converter`` global dictionary. The key is the class and the value is a + function that takes a single argument and returns the desired SymPy + object, e.g. ``converter[MyList] = lambda x: Matrix(x)``. + + >>> class MyList2(object): # XXX Do not do this if you control the class! + ... def __iter__(self): # Use _sympy_! + ... yield 1 + ... yield 2 + ... return + ... def __getitem__(self, i): return list(self)[i] + >>> from sympy.core.sympify import converter + >>> converter[MyList2] = lambda x: Matrix(x) + >>> sympify(MyList2()) + Matrix([ + [1], + [2]]) + + Notes + ===== + + The keywords ``rational`` and ``convert_xor`` are only used + when the input is a string. + + convert_xor + ----------- + + >>> sympify('x^y',convert_xor=True) + x**y + >>> sympify('x^y',convert_xor=False) + x ^ y + + rational + -------- + + >>> sympify('0.1',rational=False) + 0.1 + >>> sympify('0.1',rational=True) + 1/10 + + Sometimes autosimplification during sympification results in expressions + that are very different in structure than what was entered. Until such + autosimplification is no longer done, the ``kernS`` function might be of + some use. In the example below you can see how an expression reduces to + $-1$ by autosimplification, but does not do so when ``kernS`` is used. + + >>> from sympy.core.sympify import kernS + >>> from sympy.abc import x + >>> -2*(-(-x + 1/x)/(x*(x - 1/x)**2) - 1/(x*(x - 1/x))) - 1 + -1 + >>> s = '-2*(-(-x + 1/x)/(x*(x - 1/x)**2) - 1/(x*(x - 1/x))) - 1' + >>> sympify(s) + -1 + >>> kernS(s) + -2*(-(-x + 1/x)/(x*(x - 1/x)**2) - 1/(x*(x - 1/x))) - 1 + + Parameters + ========== + + a : + - any object defined in SymPy + - standard numeric Python types: ``int``, ``long``, ``float``, ``Decimal`` + - strings (like ``"0.09"``, ``"2e-19"`` or ``'sin(x)'``) + - booleans, including ``None`` (will leave ``None`` unchanged) + - dicts, lists, sets or tuples containing any of the above + + convert_xor : bool, optional + If true, treats ``^`` as exponentiation. + If False, treats ``^`` as XOR itself. + Used only when input is a string. + + locals : any object defined in SymPy, optional + In order to have strings be recognized it can be imported + into a namespace dictionary and passed as locals. + + strict : bool, optional + If the option strict is set to ``True``, only the types for which + an explicit conversion has been defined are converted. In the + other cases, a SympifyError is raised. + + rational : bool, optional + If ``True``, converts floats into :class:`~.Rational`. + If ``False``, it lets floats remain as it is. + Used only when input is a string. + + evaluate : bool, optional + If False, then arithmetic and operators will be converted into + their SymPy equivalents. If True the expression will be evaluated + and the result will be returned. + + """ + # XXX: If a is a Basic subclass rather than instance (e.g. sin rather than + # sin(x)) then a.__sympy__ will be the property. Only on the instance will + # a.__sympy__ give the *value* of the property (True). Since sympify(sin) + # was used for a long time we allow it to pass. However if strict=True as + # is the case in internal calls to _sympify then we only allow + # is_sympy=True. + # + # https://github.com/sympy/sympy/issues/20124 + is_sympy = getattr(a, '__sympy__', None) + if is_sympy is True: + return a + elif is_sympy is not None: + if not strict: + return a + else: + raise SympifyError(a) + + if isinstance(a, CantSympify): + raise SympifyError(a) + + cls = getattr(a, "__class__", None) + + #Check if there exists a converter for any of the types in the mro + for superclass in getmro(cls): + #First check for user defined converters + conv = _external_converter.get(superclass) + if conv is None: + #if none exists, check for SymPy defined converters + conv = _sympy_converter.get(superclass) + if conv is not None: + return conv(a) + + if cls is type(None): + if strict: + raise SympifyError(a) + else: + return a + + if evaluate is None: + evaluate = global_parameters.evaluate + + # Support for basic numpy datatypes + if _is_numpy_instance(a): + import numpy as np + if np.isscalar(a): + return _convert_numpy_types(a, locals=locals, + convert_xor=convert_xor, strict=strict, rational=rational, + evaluate=evaluate) + + _sympy_ = getattr(a, "_sympy_", None) + if _sympy_ is not None: + return a._sympy_() + + if not strict: + # Put numpy array conversion _before_ float/int, see + # . + flat = getattr(a, "flat", None) + if flat is not None: + shape = getattr(a, "shape", None) + if shape is not None: + from sympy.tensor.array import Array + return Array(a.flat, a.shape) # works with e.g. NumPy arrays + + if not isinstance(a, str): + if _is_numpy_instance(a): + import numpy as np + assert not isinstance(a, np.number) + if isinstance(a, np.ndarray): + # Scalar arrays (those with zero dimensions) have sympify + # called on the scalar element. + if a.ndim == 0: + try: + return sympify(a.item(), + locals=locals, + convert_xor=convert_xor, + strict=strict, + rational=rational, + evaluate=evaluate) + except SympifyError: + pass + elif hasattr(a, '__float__'): + # float and int can coerce size-one numpy arrays to their lone + # element. See issue https://github.com/numpy/numpy/issues/10404. + return sympify(float(a)) + elif hasattr(a, '__int__'): + return sympify(int(a)) + + if strict: + raise SympifyError(a) + + if iterable(a): + try: + return type(a)([sympify(x, locals=locals, convert_xor=convert_xor, + rational=rational, evaluate=evaluate) for x in a]) + except TypeError: + # Not all iterables are rebuildable with their type. + pass + + if not isinstance(a, str): + raise SympifyError('cannot sympify object of type %r' % type(a)) + + from sympy.parsing.sympy_parser import (parse_expr, TokenError, + standard_transformations) + from sympy.parsing.sympy_parser import convert_xor as t_convert_xor + from sympy.parsing.sympy_parser import rationalize as t_rationalize + + transformations = standard_transformations + + if rational: + transformations += (t_rationalize,) + if convert_xor: + transformations += (t_convert_xor,) + + try: + a = a.replace('\n', '') + expr = parse_expr(a, local_dict=locals, transformations=transformations, evaluate=evaluate) + except (TokenError, SyntaxError) as exc: + raise SympifyError('could not parse %r' % a, exc) + + return expr + + +def _sympify(a): + """ + Short version of :func:`~.sympify` for internal usage for ``__add__`` and + ``__eq__`` methods where it is ok to allow some things (like Python + integers and floats) in the expression. This excludes things (like strings) + that are unwise to allow into such an expression. + + >>> from sympy import Integer + >>> Integer(1) == 1 + True + + >>> Integer(1) == '1' + False + + >>> from sympy.abc import x + >>> x + 1 + x + 1 + + >>> x + '1' + Traceback (most recent call last): + ... + TypeError: unsupported operand type(s) for +: 'Symbol' and 'str' + + see: sympify + + """ + return sympify(a, strict=True) + + +def kernS(s): + """Use a hack to try keep autosimplification from distributing a + a number into an Add; this modification does not + prevent the 2-arg Mul from becoming an Add, however. + + Examples + ======== + + >>> from sympy.core.sympify import kernS + >>> from sympy.abc import x, y + + The 2-arg Mul distributes a number (or minus sign) across the terms + of an expression, but kernS will prevent that: + + >>> 2*(x + y), -(x + 1) + (2*x + 2*y, -x - 1) + >>> kernS('2*(x + y)') + 2*(x + y) + >>> kernS('-(x + 1)') + -(x + 1) + + If use of the hack fails, the un-hacked string will be passed to sympify... + and you get what you get. + + XXX This hack should not be necessary once issue 4596 has been resolved. + """ + hit = False + quoted = '"' in s or "'" in s + if '(' in s and not quoted: + if s.count('(') != s.count(")"): + raise SympifyError('unmatched left parenthesis') + + # strip all space from s + s = ''.join(s.split()) + olds = s + # now use space to represent a symbol that + # will + # step 1. turn potential 2-arg Muls into 3-arg versions + # 1a. *( -> * *( + s = s.replace('*(', '* *(') + # 1b. close up exponentials + s = s.replace('** *', '**') + # 2. handle the implied multiplication of a negated + # parenthesized expression in two steps + # 2a: -(...) --> -( *(...) + target = '-( *(' + s = s.replace('-(', target) + # 2b: double the matching closing parenthesis + # -( *(...) --> -( *(...)) + i = nest = 0 + assert target.endswith('(') # assumption below + while True: + j = s.find(target, i) + if j == -1: + break + j += len(target) - 1 + for j in range(j, len(s)): + if s[j] == "(": + nest += 1 + elif s[j] == ")": + nest -= 1 + if nest == 0: + break + s = s[:j] + ")" + s[j:] + i = j + 2 # the first char after 2nd ) + if ' ' in s: + # get a unique kern + kern = '_' + while kern in s: + kern += choice(string.ascii_letters + string.digits) + s = s.replace(' ', kern) + hit = kern in s + else: + hit = False + + for i in range(2): + try: + expr = sympify(s) + break + except TypeError: # the kern might cause unknown errors... + if hit: + s = olds # maybe it didn't like the kern; use un-kerned s + hit = False + continue + expr = sympify(s) # let original error raise + + if not hit: + return expr + + from .symbol import Symbol + rep = {Symbol(kern): 1} + def _clear(expr): + if isinstance(expr, (list, tuple, set)): + return type(expr)([_clear(e) for e in expr]) + if hasattr(expr, 'subs'): + return expr.subs(rep, hack2=True) + return expr + expr = _clear(expr) + # hope that kern is not there anymore + return expr + + +# Avoid circular import +from .basic import Basic diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_args.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_args.py new file mode 100644 index 0000000000000000000000000000000000000000..75b326146e1cc645a27e26ba13d44c92d56d5efb --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_args.py @@ -0,0 +1,5517 @@ +"""Test whether all elements of cls.args are instances of Basic. """ + +# NOTE: keep tests sorted by (module, class name) key. If a class can't +# be instantiated, add it here anyway with @SKIP("abstract class) (see +# e.g. Function). + +import os +import re +from pathlib import Path + +from sympy.assumptions.ask import Q +from sympy.core.basic import Basic +from sympy.core.function import (Function, Lambda) +from sympy.core.numbers import (Rational, oo, pi) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import sin + +from sympy.testing.pytest import SKIP, warns_deprecated_sympy + +a, b, c, x, y, z, s = symbols('a,b,c,x,y,z,s') + + +whitelist = [ + "sympy.assumptions.predicates", # tested by test_predicates() + "sympy.assumptions.relation.equality", # tested by test_predicates() +] + +def test_all_classes_are_tested(): + this = os.path.split(__file__)[0] + path = os.path.join(this, os.pardir, os.pardir) + sympy_path = os.path.abspath(path) + prefix = os.path.split(sympy_path)[0] + os.sep + + re_cls = re.compile(r"^class ([A-Za-z][A-Za-z0-9_]*)\s*\(", re.MULTILINE) + + modules = {} + + for root, dirs, files in os.walk(sympy_path): + module = root.replace(prefix, "").replace(os.sep, ".") + + for file in files: + if file.startswith(("_", "test_", "bench_")): + continue + if not file.endswith(".py"): + continue + + text = Path(os.path.join(root, file)).read_text(encoding='utf-8') + + submodule = module + '.' + file[:-3] + + if any(submodule.startswith(wpath) for wpath in whitelist): + continue + + names = re_cls.findall(text) + + if not names: + continue + + try: + mod = __import__(submodule, fromlist=names) + except ImportError: + continue + + def is_Basic(name): + cls = getattr(mod, name) + if hasattr(cls, '_sympy_deprecated_func'): + cls = cls._sympy_deprecated_func + if not isinstance(cls, type): + # check instance of singleton class with same name + cls = type(cls) + return issubclass(cls, Basic) + + names = list(filter(is_Basic, names)) + + if names: + modules[submodule] = names + + ns = globals() + failed = [] + + for module, names in modules.items(): + mod = module.replace('.', '__') + + for name in names: + test = 'test_' + mod + '__' + name + + if test not in ns: + failed.append(module + '.' + name) + + assert not failed, "Missing classes: %s. Please add tests for these to sympy/core/tests/test_args.py." % ", ".join(failed) + + +def _test_args(obj): + all_basic = all(isinstance(arg, Basic) for arg in obj.args) + # Ideally obj.func(*obj.args) would always recreate the object, but for + # now, we only require it for objects with non-empty .args + recreatable = not obj.args or obj.func(*obj.args) == obj + return all_basic and recreatable + + +def test_sympy__algebras__quaternion__Quaternion(): + from sympy.algebras.quaternion import Quaternion + assert _test_args(Quaternion(x, 1, 2, 3)) + + +def test_sympy__assumptions__assume__AppliedPredicate(): + from sympy.assumptions.assume import AppliedPredicate, Predicate + assert _test_args(AppliedPredicate(Predicate("test"), 2)) + assert _test_args(Q.is_true(True)) + +@SKIP("abstract class") +def test_sympy__assumptions__assume__Predicate(): + pass + +def test_predicates(): + predicates = [ + getattr(Q, attr) + for attr in Q.__class__.__dict__ + if not attr.startswith('__')] + for p in predicates: + assert _test_args(p) + +def test_sympy__assumptions__assume__UndefinedPredicate(): + from sympy.assumptions.assume import Predicate + assert _test_args(Predicate("test")) + +@SKIP('abstract class') +def test_sympy__assumptions__relation__binrel__BinaryRelation(): + pass + +def test_sympy__assumptions__relation__binrel__AppliedBinaryRelation(): + assert _test_args(Q.eq(1, 2)) + +def test_sympy__assumptions__wrapper__AssumptionsWrapper(): + from sympy.assumptions.wrapper import AssumptionsWrapper + assert _test_args(AssumptionsWrapper(x, Q.positive(x))) + +@SKIP("abstract Class") +def test_sympy__codegen__ast__CodegenAST(): + from sympy.codegen.ast import CodegenAST + assert _test_args(CodegenAST()) + +@SKIP("abstract Class") +def test_sympy__codegen__ast__AssignmentBase(): + from sympy.codegen.ast import AssignmentBase + assert _test_args(AssignmentBase(x, 1)) + +@SKIP("abstract Class") +def test_sympy__codegen__ast__AugmentedAssignment(): + from sympy.codegen.ast import AugmentedAssignment + assert _test_args(AugmentedAssignment(x, 1)) + +def test_sympy__codegen__ast__AddAugmentedAssignment(): + from sympy.codegen.ast import AddAugmentedAssignment + assert _test_args(AddAugmentedAssignment(x, 1)) + +def test_sympy__codegen__ast__SubAugmentedAssignment(): + from sympy.codegen.ast import SubAugmentedAssignment + assert _test_args(SubAugmentedAssignment(x, 1)) + +def test_sympy__codegen__ast__MulAugmentedAssignment(): + from sympy.codegen.ast import MulAugmentedAssignment + assert _test_args(MulAugmentedAssignment(x, 1)) + +def test_sympy__codegen__ast__DivAugmentedAssignment(): + from sympy.codegen.ast import DivAugmentedAssignment + assert _test_args(DivAugmentedAssignment(x, 1)) + +def test_sympy__codegen__ast__ModAugmentedAssignment(): + from sympy.codegen.ast import ModAugmentedAssignment + assert _test_args(ModAugmentedAssignment(x, 1)) + +def test_sympy__codegen__ast__CodeBlock(): + from sympy.codegen.ast import CodeBlock, Assignment + assert _test_args(CodeBlock(Assignment(x, 1), Assignment(y, 2))) + +def test_sympy__codegen__ast__For(): + from sympy.codegen.ast import For, CodeBlock, AddAugmentedAssignment + from sympy.sets import Range + assert _test_args(For(x, Range(10), CodeBlock(AddAugmentedAssignment(y, 1)))) + + +def test_sympy__codegen__ast__Token(): + from sympy.codegen.ast import Token + assert _test_args(Token()) + + +def test_sympy__codegen__ast__ContinueToken(): + from sympy.codegen.ast import ContinueToken + assert _test_args(ContinueToken()) + +def test_sympy__codegen__ast__BreakToken(): + from sympy.codegen.ast import BreakToken + assert _test_args(BreakToken()) + +def test_sympy__codegen__ast__NoneToken(): + from sympy.codegen.ast import NoneToken + assert _test_args(NoneToken()) + +def test_sympy__codegen__ast__String(): + from sympy.codegen.ast import String + assert _test_args(String('foobar')) + +def test_sympy__codegen__ast__QuotedString(): + from sympy.codegen.ast import QuotedString + assert _test_args(QuotedString('foobar')) + +def test_sympy__codegen__ast__Comment(): + from sympy.codegen.ast import Comment + assert _test_args(Comment('this is a comment')) + +def test_sympy__codegen__ast__Node(): + from sympy.codegen.ast import Node + assert _test_args(Node()) + assert _test_args(Node(attrs={1, 2, 3})) + + +def test_sympy__codegen__ast__Type(): + from sympy.codegen.ast import Type + assert _test_args(Type('float128')) + + +def test_sympy__codegen__ast__IntBaseType(): + from sympy.codegen.ast import IntBaseType + assert _test_args(IntBaseType('bigint')) + + +def test_sympy__codegen__ast___SizedIntType(): + from sympy.codegen.ast import _SizedIntType + assert _test_args(_SizedIntType('int128', 128)) + + +def test_sympy__codegen__ast__SignedIntType(): + from sympy.codegen.ast import SignedIntType + assert _test_args(SignedIntType('int128_with_sign', 128)) + + +def test_sympy__codegen__ast__UnsignedIntType(): + from sympy.codegen.ast import UnsignedIntType + assert _test_args(UnsignedIntType('unt128', 128)) + + +def test_sympy__codegen__ast__FloatBaseType(): + from sympy.codegen.ast import FloatBaseType + assert _test_args(FloatBaseType('positive_real')) + + +def test_sympy__codegen__ast__FloatType(): + from sympy.codegen.ast import FloatType + assert _test_args(FloatType('float242', 242, nmant=142, nexp=99)) + + +def test_sympy__codegen__ast__ComplexBaseType(): + from sympy.codegen.ast import ComplexBaseType + assert _test_args(ComplexBaseType('positive_cmplx')) + +def test_sympy__codegen__ast__ComplexType(): + from sympy.codegen.ast import ComplexType + assert _test_args(ComplexType('complex42', 42, nmant=15, nexp=5)) + + +def test_sympy__codegen__ast__Attribute(): + from sympy.codegen.ast import Attribute + assert _test_args(Attribute('noexcept')) + + +def test_sympy__codegen__ast__Variable(): + from sympy.codegen.ast import Variable, Type, value_const + assert _test_args(Variable(x)) + assert _test_args(Variable(y, Type('float32'), {value_const})) + assert _test_args(Variable(z, type=Type('float64'))) + + +def test_sympy__codegen__ast__Pointer(): + from sympy.codegen.ast import Pointer, Type, pointer_const + assert _test_args(Pointer(x)) + assert _test_args(Pointer(y, type=Type('float32'))) + assert _test_args(Pointer(z, Type('float64'), {pointer_const})) + + +def test_sympy__codegen__ast__Declaration(): + from sympy.codegen.ast import Declaration, Variable, Type + vx = Variable(x, type=Type('float')) + assert _test_args(Declaration(vx)) + + +def test_sympy__codegen__ast__While(): + from sympy.codegen.ast import While, AddAugmentedAssignment + assert _test_args(While(abs(x) < 1, [AddAugmentedAssignment(x, -1)])) + + +def test_sympy__codegen__ast__Scope(): + from sympy.codegen.ast import Scope, AddAugmentedAssignment + assert _test_args(Scope([AddAugmentedAssignment(x, -1)])) + + +def test_sympy__codegen__ast__Stream(): + from sympy.codegen.ast import Stream + assert _test_args(Stream('stdin')) + +def test_sympy__codegen__ast__Print(): + from sympy.codegen.ast import Print + assert _test_args(Print([x, y])) + assert _test_args(Print([x, y], "%d %d")) + + +def test_sympy__codegen__ast__FunctionPrototype(): + from sympy.codegen.ast import FunctionPrototype, real, Declaration, Variable + inp_x = Declaration(Variable(x, type=real)) + assert _test_args(FunctionPrototype(real, 'pwer', [inp_x])) + + +def test_sympy__codegen__ast__FunctionDefinition(): + from sympy.codegen.ast import FunctionDefinition, real, Declaration, Variable, Assignment + inp_x = Declaration(Variable(x, type=real)) + assert _test_args(FunctionDefinition(real, 'pwer', [inp_x], [Assignment(x, x**2)])) + + +def test_sympy__codegen__ast__Raise(): + from sympy.codegen.ast import Raise + assert _test_args(Raise(x)) + + +def test_sympy__codegen__ast__Return(): + from sympy.codegen.ast import Return + assert _test_args(Return(x)) + + +def test_sympy__codegen__ast__RuntimeError_(): + from sympy.codegen.ast import RuntimeError_ + assert _test_args(RuntimeError_('"message"')) + + +def test_sympy__codegen__ast__FunctionCall(): + from sympy.codegen.ast import FunctionCall + assert _test_args(FunctionCall('pwer', [x])) + + +def test_sympy__codegen__ast__Element(): + from sympy.codegen.ast import Element + assert _test_args(Element('x', range(3))) + + +def test_sympy__codegen__cnodes__CommaOperator(): + from sympy.codegen.cnodes import CommaOperator + assert _test_args(CommaOperator(1, 2)) + + +def test_sympy__codegen__cnodes__goto(): + from sympy.codegen.cnodes import goto + assert _test_args(goto('early_exit')) + + +def test_sympy__codegen__cnodes__Label(): + from sympy.codegen.cnodes import Label + assert _test_args(Label('early_exit')) + + +def test_sympy__codegen__cnodes__PreDecrement(): + from sympy.codegen.cnodes import PreDecrement + assert _test_args(PreDecrement(x)) + + +def test_sympy__codegen__cnodes__PostDecrement(): + from sympy.codegen.cnodes import PostDecrement + assert _test_args(PostDecrement(x)) + + +def test_sympy__codegen__cnodes__PreIncrement(): + from sympy.codegen.cnodes import PreIncrement + assert _test_args(PreIncrement(x)) + + +def test_sympy__codegen__cnodes__PostIncrement(): + from sympy.codegen.cnodes import PostIncrement + assert _test_args(PostIncrement(x)) + + +def test_sympy__codegen__cnodes__struct(): + from sympy.codegen.ast import real, Variable + from sympy.codegen.cnodes import struct + assert _test_args(struct(declarations=[ + Variable(x, type=real), + Variable(y, type=real) + ])) + + +def test_sympy__codegen__cnodes__union(): + from sympy.codegen.ast import float32, int32, Variable + from sympy.codegen.cnodes import union + assert _test_args(union(declarations=[ + Variable(x, type=float32), + Variable(y, type=int32) + ])) + + +def test_sympy__codegen__cxxnodes__using(): + from sympy.codegen.cxxnodes import using + assert _test_args(using('std::vector')) + assert _test_args(using('std::vector', 'vec')) + + +def test_sympy__codegen__fnodes__Program(): + from sympy.codegen.fnodes import Program + assert _test_args(Program('foobar', [])) + +def test_sympy__codegen__fnodes__Module(): + from sympy.codegen.fnodes import Module + assert _test_args(Module('foobar', [], [])) + + +def test_sympy__codegen__fnodes__Subroutine(): + from sympy.codegen.fnodes import Subroutine + x = symbols('x', real=True) + assert _test_args(Subroutine('foo', [x], [])) + + +def test_sympy__codegen__fnodes__GoTo(): + from sympy.codegen.fnodes import GoTo + assert _test_args(GoTo([10])) + assert _test_args(GoTo([10, 20], x > 1)) + + +def test_sympy__codegen__fnodes__FortranReturn(): + from sympy.codegen.fnodes import FortranReturn + assert _test_args(FortranReturn(10)) + + +def test_sympy__codegen__fnodes__Extent(): + from sympy.codegen.fnodes import Extent + assert _test_args(Extent()) + assert _test_args(Extent(None)) + assert _test_args(Extent(':')) + assert _test_args(Extent(-3, 4)) + assert _test_args(Extent(x, y)) + + +def test_sympy__codegen__fnodes__use_rename(): + from sympy.codegen.fnodes import use_rename + assert _test_args(use_rename('loc', 'glob')) + + +def test_sympy__codegen__fnodes__use(): + from sympy.codegen.fnodes import use + assert _test_args(use('modfoo', only='bar')) + + +def test_sympy__codegen__fnodes__SubroutineCall(): + from sympy.codegen.fnodes import SubroutineCall + assert _test_args(SubroutineCall('foo', ['bar', 'baz'])) + + +def test_sympy__codegen__fnodes__Do(): + from sympy.codegen.fnodes import Do + assert _test_args(Do([], 'i', 1, 42)) + + +def test_sympy__codegen__fnodes__ImpliedDoLoop(): + from sympy.codegen.fnodes import ImpliedDoLoop + assert _test_args(ImpliedDoLoop('i', 'i', 1, 42)) + + +def test_sympy__codegen__fnodes__ArrayConstructor(): + from sympy.codegen.fnodes import ArrayConstructor + assert _test_args(ArrayConstructor([1, 2, 3])) + from sympy.codegen.fnodes import ImpliedDoLoop + idl = ImpliedDoLoop('i', 'i', 1, 42) + assert _test_args(ArrayConstructor([1, idl, 3])) + + +def test_sympy__codegen__fnodes__sum_(): + from sympy.codegen.fnodes import sum_ + assert _test_args(sum_('arr')) + + +def test_sympy__codegen__fnodes__product_(): + from sympy.codegen.fnodes import product_ + assert _test_args(product_('arr')) + + +def test_sympy__codegen__numpy_nodes__logaddexp(): + from sympy.codegen.numpy_nodes import logaddexp + assert _test_args(logaddexp(x, y)) + + +def test_sympy__codegen__numpy_nodes__logaddexp2(): + from sympy.codegen.numpy_nodes import logaddexp2 + assert _test_args(logaddexp2(x, y)) + + +def test_sympy__codegen__numpy_nodes__amin(): + from sympy.codegen.numpy_nodes import amin + assert _test_args(amin(x)) + + +def test_sympy__codegen__numpy_nodes__amax(): + from sympy.codegen.numpy_nodes import amax + assert _test_args(amax(x)) + + +def test_sympy__codegen__numpy_nodes__minimum(): + from sympy.codegen.numpy_nodes import minimum + assert _test_args(minimum(x, y, z)) + + +def test_sympy__codegen__numpy_nodes__maximum(): + from sympy.codegen.numpy_nodes import maximum + assert _test_args(maximum(x, y, z)) + + +def test_sympy__codegen__pynodes__List(): + from sympy.codegen.pynodes import List + assert _test_args(List(1, 2, 3)) + + +def test_sympy__codegen__pynodes__NumExprEvaluate(): + from sympy.codegen.pynodes import NumExprEvaluate + assert _test_args(NumExprEvaluate(x)) + + +def test_sympy__codegen__scipy_nodes__cosm1(): + from sympy.codegen.scipy_nodes import cosm1 + assert _test_args(cosm1(x)) + + +def test_sympy__codegen__scipy_nodes__powm1(): + from sympy.codegen.scipy_nodes import powm1 + assert _test_args(powm1(x, y)) + + +def test_sympy__codegen__abstract_nodes__List(): + from sympy.codegen.abstract_nodes import List + assert _test_args(List(1, 2, 3)) + +def test_sympy__combinatorics__graycode__GrayCode(): + from sympy.combinatorics.graycode import GrayCode + # an integer is given and returned from GrayCode as the arg + assert _test_args(GrayCode(3, start='100')) + assert _test_args(GrayCode(3, rank=1)) + + +def test_sympy__combinatorics__permutations__Permutation(): + from sympy.combinatorics.permutations import Permutation + assert _test_args(Permutation([0, 1, 2, 3])) + +def test_sympy__combinatorics__permutations__AppliedPermutation(): + from sympy.combinatorics.permutations import Permutation + from sympy.combinatorics.permutations import AppliedPermutation + p = Permutation([0, 1, 2, 3]) + assert _test_args(AppliedPermutation(p, x)) + +def test_sympy__combinatorics__perm_groups__PermutationGroup(): + from sympy.combinatorics.permutations import Permutation + from sympy.combinatorics.perm_groups import PermutationGroup + assert _test_args(PermutationGroup([Permutation([0, 1])])) + + +def test_sympy__combinatorics__polyhedron__Polyhedron(): + from sympy.combinatorics.permutations import Permutation + from sympy.combinatorics.polyhedron import Polyhedron + from sympy.abc import w, x, y, z + pgroup = [Permutation([[0, 1, 2], [3]]), + Permutation([[0, 1, 3], [2]]), + Permutation([[0, 2, 3], [1]]), + Permutation([[1, 2, 3], [0]]), + Permutation([[0, 1], [2, 3]]), + Permutation([[0, 2], [1, 3]]), + Permutation([[0, 3], [1, 2]]), + Permutation([[0, 1, 2, 3]])] + corners = [w, x, y, z] + faces = [(w, x, y), (w, y, z), (w, z, x), (x, y, z)] + assert _test_args(Polyhedron(corners, faces, pgroup)) + + +def test_sympy__combinatorics__prufer__Prufer(): + from sympy.combinatorics.prufer import Prufer + assert _test_args(Prufer([[0, 1], [0, 2], [0, 3]], 4)) + + +def test_sympy__combinatorics__partitions__Partition(): + from sympy.combinatorics.partitions import Partition + assert _test_args(Partition([1])) + + +def test_sympy__combinatorics__partitions__IntegerPartition(): + from sympy.combinatorics.partitions import IntegerPartition + assert _test_args(IntegerPartition([1])) + + +def test_sympy__concrete__products__Product(): + from sympy.concrete.products import Product + assert _test_args(Product(x, (x, 0, 10))) + assert _test_args(Product(x, (x, 0, y), (y, 0, 10))) + + +@SKIP("abstract Class") +def test_sympy__concrete__expr_with_limits__ExprWithLimits(): + from sympy.concrete.expr_with_limits import ExprWithLimits + assert _test_args(ExprWithLimits(x, (x, 0, 10))) + assert _test_args(ExprWithLimits(x*y, (x, 0, 10.),(y,1.,3))) + + +@SKIP("abstract Class") +def test_sympy__concrete__expr_with_limits__AddWithLimits(): + from sympy.concrete.expr_with_limits import AddWithLimits + assert _test_args(AddWithLimits(x, (x, 0, 10))) + assert _test_args(AddWithLimits(x*y, (x, 0, 10),(y,1,3))) + + +@SKIP("abstract Class") +def test_sympy__concrete__expr_with_intlimits__ExprWithIntLimits(): + from sympy.concrete.expr_with_intlimits import ExprWithIntLimits + assert _test_args(ExprWithIntLimits(x, (x, 0, 10))) + assert _test_args(ExprWithIntLimits(x*y, (x, 0, 10),(y,1,3))) + + +def test_sympy__concrete__summations__Sum(): + from sympy.concrete.summations import Sum + assert _test_args(Sum(x, (x, 0, 10))) + assert _test_args(Sum(x, (x, 0, y), (y, 0, 10))) + + +def test_sympy__core__add__Add(): + from sympy.core.add import Add + assert _test_args(Add(x, y, z, 2)) + + +def test_sympy__core__basic__Atom(): + from sympy.core.basic import Atom + assert _test_args(Atom()) + + +def test_sympy__core__basic__Basic(): + from sympy.core.basic import Basic + assert _test_args(Basic()) + + +def test_sympy__core__containers__Dict(): + from sympy.core.containers import Dict + assert _test_args(Dict({x: y, y: z})) + + +def test_sympy__core__containers__Tuple(): + from sympy.core.containers import Tuple + assert _test_args(Tuple(x, y, z, 2)) + + +def test_sympy__core__expr__AtomicExpr(): + from sympy.core.expr import AtomicExpr + assert _test_args(AtomicExpr()) + + +def test_sympy__core__expr__Expr(): + from sympy.core.expr import Expr + assert _test_args(Expr()) + + +def test_sympy__core__expr__UnevaluatedExpr(): + from sympy.core.expr import UnevaluatedExpr + from sympy.abc import x + assert _test_args(UnevaluatedExpr(x)) + + +def test_sympy__core__function__Application(): + from sympy.core.function import Application + assert _test_args(Application(1, 2, 3)) + + +def test_sympy__core__function__AppliedUndef(): + from sympy.core.function import AppliedUndef + assert _test_args(AppliedUndef(1, 2, 3)) + + +def test_sympy__core__function__DefinedFunction(): + from sympy.core.function import DefinedFunction + assert _test_args(DefinedFunction(1, 2, 3)) + + +def test_sympy__core__function__Derivative(): + from sympy.core.function import Derivative + assert _test_args(Derivative(2, x, y, 3)) + + +@SKIP("abstract class") +def test_sympy__core__function__Function(): + pass + + +def test_sympy__core__function__Lambda(): + assert _test_args(Lambda((x, y), x + y + z)) + + +def test_sympy__core__function__Subs(): + from sympy.core.function import Subs + assert _test_args(Subs(x + y, x, 2)) + + +def test_sympy__core__function__WildFunction(): + from sympy.core.function import WildFunction + assert _test_args(WildFunction('f')) + + +def test_sympy__core__mod__Mod(): + from sympy.core.mod import Mod + assert _test_args(Mod(x, 2)) + + +def test_sympy__core__mul__Mul(): + from sympy.core.mul import Mul + assert _test_args(Mul(2, x, y, z)) + + +def test_sympy__core__numbers__Catalan(): + from sympy.core.numbers import Catalan + assert _test_args(Catalan()) + + +def test_sympy__core__numbers__ComplexInfinity(): + from sympy.core.numbers import ComplexInfinity + assert _test_args(ComplexInfinity()) + + +def test_sympy__core__numbers__EulerGamma(): + from sympy.core.numbers import EulerGamma + assert _test_args(EulerGamma()) + + +def test_sympy__core__numbers__Exp1(): + from sympy.core.numbers import Exp1 + assert _test_args(Exp1()) + + +def test_sympy__core__numbers__Float(): + from sympy.core.numbers import Float + assert _test_args(Float(1.23)) + + +def test_sympy__core__numbers__GoldenRatio(): + from sympy.core.numbers import GoldenRatio + assert _test_args(GoldenRatio()) + + +def test_sympy__core__numbers__TribonacciConstant(): + from sympy.core.numbers import TribonacciConstant + assert _test_args(TribonacciConstant()) + + +def test_sympy__core__numbers__Half(): + from sympy.core.numbers import Half + assert _test_args(Half()) + + +def test_sympy__core__numbers__ImaginaryUnit(): + from sympy.core.numbers import ImaginaryUnit + assert _test_args(ImaginaryUnit()) + + +def test_sympy__core__numbers__Infinity(): + from sympy.core.numbers import Infinity + assert _test_args(Infinity()) + + +def test_sympy__core__numbers__Integer(): + from sympy.core.numbers import Integer + assert _test_args(Integer(7)) + + +@SKIP("abstract class") +def test_sympy__core__numbers__IntegerConstant(): + pass + + +def test_sympy__core__numbers__NaN(): + from sympy.core.numbers import NaN + assert _test_args(NaN()) + + +def test_sympy__core__numbers__NegativeInfinity(): + from sympy.core.numbers import NegativeInfinity + assert _test_args(NegativeInfinity()) + + +def test_sympy__core__numbers__NegativeOne(): + from sympy.core.numbers import NegativeOne + assert _test_args(NegativeOne()) + + +def test_sympy__core__numbers__Number(): + from sympy.core.numbers import Number + assert _test_args(Number(1, 7)) + + +def test_sympy__core__numbers__NumberSymbol(): + from sympy.core.numbers import NumberSymbol + assert _test_args(NumberSymbol()) + + +def test_sympy__core__numbers__One(): + from sympy.core.numbers import One + assert _test_args(One()) + + +def test_sympy__core__numbers__Pi(): + from sympy.core.numbers import Pi + assert _test_args(Pi()) + + +def test_sympy__core__numbers__Rational(): + from sympy.core.numbers import Rational + assert _test_args(Rational(1, 7)) + + +@SKIP("abstract class") +def test_sympy__core__numbers__RationalConstant(): + pass + + +def test_sympy__core__numbers__Zero(): + from sympy.core.numbers import Zero + assert _test_args(Zero()) + + +@SKIP("abstract class") +def test_sympy__core__operations__AssocOp(): + pass + + +@SKIP("abstract class") +def test_sympy__core__operations__LatticeOp(): + pass + + +def test_sympy__core__power__Pow(): + from sympy.core.power import Pow + assert _test_args(Pow(x, 2)) + + +def test_sympy__core__relational__Equality(): + from sympy.core.relational import Equality + assert _test_args(Equality(x, 2)) + + +def test_sympy__core__relational__GreaterThan(): + from sympy.core.relational import GreaterThan + assert _test_args(GreaterThan(x, 2)) + + +def test_sympy__core__relational__LessThan(): + from sympy.core.relational import LessThan + assert _test_args(LessThan(x, 2)) + + +@SKIP("abstract class") +def test_sympy__core__relational__Relational(): + pass + + +def test_sympy__core__relational__StrictGreaterThan(): + from sympy.core.relational import StrictGreaterThan + assert _test_args(StrictGreaterThan(x, 2)) + + +def test_sympy__core__relational__StrictLessThan(): + from sympy.core.relational import StrictLessThan + assert _test_args(StrictLessThan(x, 2)) + + +def test_sympy__core__relational__Unequality(): + from sympy.core.relational import Unequality + assert _test_args(Unequality(x, 2)) + + +def test_sympy__sandbox__indexed_integrals__IndexedIntegral(): + from sympy.tensor import IndexedBase, Idx + from sympy.sandbox.indexed_integrals import IndexedIntegral + A = IndexedBase('A') + i, j = symbols('i j', integer=True) + a1, a2 = symbols('a1:3', cls=Idx) + assert _test_args(IndexedIntegral(A[a1], A[a2])) + assert _test_args(IndexedIntegral(A[i], A[j])) + + +def test_sympy__calculus__accumulationbounds__AccumulationBounds(): + from sympy.calculus.accumulationbounds import AccumulationBounds + assert _test_args(AccumulationBounds(0, 1)) + + +def test_sympy__sets__ordinals__OmegaPower(): + from sympy.sets.ordinals import OmegaPower + assert _test_args(OmegaPower(1, 1)) + +def test_sympy__sets__ordinals__Ordinal(): + from sympy.sets.ordinals import Ordinal, OmegaPower + assert _test_args(Ordinal(OmegaPower(2, 1))) + +def test_sympy__sets__ordinals__OrdinalOmega(): + from sympy.sets.ordinals import OrdinalOmega + assert _test_args(OrdinalOmega()) + +def test_sympy__sets__ordinals__OrdinalZero(): + from sympy.sets.ordinals import OrdinalZero + assert _test_args(OrdinalZero()) + + +def test_sympy__sets__powerset__PowerSet(): + from sympy.sets.powerset import PowerSet + from sympy.core.singleton import S + assert _test_args(PowerSet(S.EmptySet)) + + +def test_sympy__sets__sets__EmptySet(): + from sympy.sets.sets import EmptySet + assert _test_args(EmptySet()) + + +def test_sympy__sets__sets__UniversalSet(): + from sympy.sets.sets import UniversalSet + assert _test_args(UniversalSet()) + + +def test_sympy__sets__sets__FiniteSet(): + from sympy.sets.sets import FiniteSet + assert _test_args(FiniteSet(x, y, z)) + + +def test_sympy__sets__sets__Interval(): + from sympy.sets.sets import Interval + assert _test_args(Interval(0, 1)) + + +def test_sympy__sets__sets__ProductSet(): + from sympy.sets.sets import ProductSet, Interval + assert _test_args(ProductSet(Interval(0, 1), Interval(0, 1))) + + +@SKIP("does it make sense to test this?") +def test_sympy__sets__sets__Set(): + from sympy.sets.sets import Set + assert _test_args(Set()) + + +def test_sympy__sets__sets__Intersection(): + from sympy.sets.sets import Intersection, Interval + from sympy.core.symbol import Symbol + x = Symbol('x') + y = Symbol('y') + S = Intersection(Interval(0, x), Interval(y, 1)) + assert isinstance(S, Intersection) + assert _test_args(S) + + +def test_sympy__sets__sets__Union(): + from sympy.sets.sets import Union, Interval + assert _test_args(Union(Interval(0, 1), Interval(2, 3))) + + +def test_sympy__sets__sets__Complement(): + from sympy.sets.sets import Complement, Interval + assert _test_args(Complement(Interval(0, 2), Interval(0, 1))) + + +def test_sympy__sets__sets__SymmetricDifference(): + from sympy.sets.sets import FiniteSet, SymmetricDifference + assert _test_args(SymmetricDifference(FiniteSet(1, 2, 3), \ + FiniteSet(2, 3, 4))) + +def test_sympy__sets__sets__DisjointUnion(): + from sympy.sets.sets import FiniteSet, DisjointUnion + assert _test_args(DisjointUnion(FiniteSet(1, 2, 3), \ + FiniteSet(2, 3, 4))) + + +def test_sympy__physics__quantum__trace__Tr(): + from sympy.physics.quantum.trace import Tr + a, b = symbols('a b', commutative=False) + assert _test_args(Tr(a + b)) + + +def test_sympy__sets__setexpr__SetExpr(): + from sympy.sets.setexpr import SetExpr + from sympy.sets.sets import Interval + assert _test_args(SetExpr(Interval(0, 1))) + + +def test_sympy__sets__fancysets__Rationals(): + from sympy.sets.fancysets import Rationals + assert _test_args(Rationals()) + + +def test_sympy__sets__fancysets__Naturals(): + from sympy.sets.fancysets import Naturals + assert _test_args(Naturals()) + + +def test_sympy__sets__fancysets__Naturals0(): + from sympy.sets.fancysets import Naturals0 + assert _test_args(Naturals0()) + + +def test_sympy__sets__fancysets__Integers(): + from sympy.sets.fancysets import Integers + assert _test_args(Integers()) + + +def test_sympy__sets__fancysets__Reals(): + from sympy.sets.fancysets import Reals + assert _test_args(Reals()) + + +def test_sympy__sets__fancysets__Complexes(): + from sympy.sets.fancysets import Complexes + assert _test_args(Complexes()) + + +def test_sympy__sets__fancysets__ComplexRegion(): + from sympy.sets.fancysets import ComplexRegion + from sympy.core.singleton import S + from sympy.sets import Interval + a = Interval(0, 1) + b = Interval(2, 3) + theta = Interval(0, 2*S.Pi) + assert _test_args(ComplexRegion(a*b)) + assert _test_args(ComplexRegion(a*theta, polar=True)) + + +def test_sympy__sets__fancysets__CartesianComplexRegion(): + from sympy.sets.fancysets import CartesianComplexRegion + from sympy.sets import Interval + a = Interval(0, 1) + b = Interval(2, 3) + assert _test_args(CartesianComplexRegion(a*b)) + + +def test_sympy__sets__fancysets__PolarComplexRegion(): + from sympy.sets.fancysets import PolarComplexRegion + from sympy.core.singleton import S + from sympy.sets import Interval + a = Interval(0, 1) + theta = Interval(0, 2*S.Pi) + assert _test_args(PolarComplexRegion(a*theta)) + + +def test_sympy__sets__fancysets__ImageSet(): + from sympy.sets.fancysets import ImageSet + from sympy.core.singleton import S + from sympy.core.symbol import Symbol + x = Symbol('x') + assert _test_args(ImageSet(Lambda(x, x**2), S.Naturals)) + + +def test_sympy__sets__fancysets__Range(): + from sympy.sets.fancysets import Range + assert _test_args(Range(1, 5, 1)) + + +def test_sympy__sets__conditionset__ConditionSet(): + from sympy.sets.conditionset import ConditionSet + from sympy.core.singleton import S + from sympy.core.symbol import Symbol + x = Symbol('x') + assert _test_args(ConditionSet(x, Eq(x**2, 1), S.Reals)) + + +def test_sympy__sets__contains__Contains(): + from sympy.sets.fancysets import Range + from sympy.sets.contains import Contains + assert _test_args(Contains(x, Range(0, 10, 2))) + + +# STATS + + +from sympy.stats.crv_types import NormalDistribution +nd = NormalDistribution(0, 1) +from sympy.stats.frv_types import DieDistribution +die = DieDistribution(6) + + +def test_sympy__stats__crv__ContinuousDomain(): + from sympy.sets.sets import Interval + from sympy.stats.crv import ContinuousDomain + assert _test_args(ContinuousDomain({x}, Interval(-oo, oo))) + + +def test_sympy__stats__crv__SingleContinuousDomain(): + from sympy.sets.sets import Interval + from sympy.stats.crv import SingleContinuousDomain + assert _test_args(SingleContinuousDomain(x, Interval(-oo, oo))) + + +def test_sympy__stats__crv__ProductContinuousDomain(): + from sympy.sets.sets import Interval + from sympy.stats.crv import SingleContinuousDomain, ProductContinuousDomain + D = SingleContinuousDomain(x, Interval(-oo, oo)) + E = SingleContinuousDomain(y, Interval(0, oo)) + assert _test_args(ProductContinuousDomain(D, E)) + + +def test_sympy__stats__crv__ConditionalContinuousDomain(): + from sympy.sets.sets import Interval + from sympy.stats.crv import (SingleContinuousDomain, + ConditionalContinuousDomain) + D = SingleContinuousDomain(x, Interval(-oo, oo)) + assert _test_args(ConditionalContinuousDomain(D, x > 0)) + + +def test_sympy__stats__crv__ContinuousPSpace(): + from sympy.sets.sets import Interval + from sympy.stats.crv import ContinuousPSpace, SingleContinuousDomain + D = SingleContinuousDomain(x, Interval(-oo, oo)) + assert _test_args(ContinuousPSpace(D, nd)) + + +def test_sympy__stats__crv__SingleContinuousPSpace(): + from sympy.stats.crv import SingleContinuousPSpace + assert _test_args(SingleContinuousPSpace(x, nd)) + +@SKIP("abstract class") +def test_sympy__stats__rv__Distribution(): + pass + +@SKIP("abstract class") +def test_sympy__stats__crv__SingleContinuousDistribution(): + pass + + +def test_sympy__stats__drv__SingleDiscreteDomain(): + from sympy.stats.drv import SingleDiscreteDomain + assert _test_args(SingleDiscreteDomain(x, S.Naturals)) + + +def test_sympy__stats__drv__ProductDiscreteDomain(): + from sympy.stats.drv import SingleDiscreteDomain, ProductDiscreteDomain + X = SingleDiscreteDomain(x, S.Naturals) + Y = SingleDiscreteDomain(y, S.Integers) + assert _test_args(ProductDiscreteDomain(X, Y)) + + +def test_sympy__stats__drv__SingleDiscretePSpace(): + from sympy.stats.drv import SingleDiscretePSpace + from sympy.stats.drv_types import PoissonDistribution + assert _test_args(SingleDiscretePSpace(x, PoissonDistribution(1))) + +def test_sympy__stats__drv__DiscretePSpace(): + from sympy.stats.drv import DiscretePSpace, SingleDiscreteDomain + density = Lambda(x, 2**(-x)) + domain = SingleDiscreteDomain(x, S.Naturals) + assert _test_args(DiscretePSpace(domain, density)) + +def test_sympy__stats__drv__ConditionalDiscreteDomain(): + from sympy.stats.drv import ConditionalDiscreteDomain, SingleDiscreteDomain + X = SingleDiscreteDomain(x, S.Naturals0) + assert _test_args(ConditionalDiscreteDomain(X, x > 2)) + +def test_sympy__stats__joint_rv__JointPSpace(): + from sympy.stats.joint_rv import JointPSpace, JointDistribution + assert _test_args(JointPSpace('X', JointDistribution(1))) + +def test_sympy__stats__joint_rv__JointRandomSymbol(): + from sympy.stats.joint_rv import JointRandomSymbol + assert _test_args(JointRandomSymbol(x)) + +def test_sympy__stats__joint_rv_types__JointDistributionHandmade(): + from sympy.tensor.indexed import Indexed + from sympy.stats.joint_rv_types import JointDistributionHandmade + x1, x2 = (Indexed('x', i) for i in (1, 2)) + assert _test_args(JointDistributionHandmade(x1 + x2, S.Reals**2)) + + +def test_sympy__stats__joint_rv__MarginalDistribution(): + from sympy.stats.rv import RandomSymbol + from sympy.stats.joint_rv import MarginalDistribution + r = RandomSymbol(S('r')) + assert _test_args(MarginalDistribution(r, (r,))) + + +def test_sympy__stats__compound_rv__CompoundDistribution(): + from sympy.stats.compound_rv import CompoundDistribution + from sympy.stats.drv_types import PoissonDistribution, Poisson + r = Poisson('r', 10) + assert _test_args(CompoundDistribution(PoissonDistribution(r))) + + +def test_sympy__stats__compound_rv__CompoundPSpace(): + from sympy.stats.compound_rv import CompoundPSpace, CompoundDistribution + from sympy.stats.drv_types import PoissonDistribution, Poisson + r = Poisson('r', 5) + C = CompoundDistribution(PoissonDistribution(r)) + assert _test_args(CompoundPSpace('C', C)) + + +@SKIP("abstract class") +def test_sympy__stats__drv__SingleDiscreteDistribution(): + pass + +@SKIP("abstract class") +def test_sympy__stats__drv__DiscreteDistribution(): + pass + +@SKIP("abstract class") +def test_sympy__stats__drv__DiscreteDomain(): + pass + + +def test_sympy__stats__rv__RandomDomain(): + from sympy.stats.rv import RandomDomain + from sympy.sets.sets import FiniteSet + assert _test_args(RandomDomain(FiniteSet(x), FiniteSet(1, 2, 3))) + + +def test_sympy__stats__rv__SingleDomain(): + from sympy.stats.rv import SingleDomain + from sympy.sets.sets import FiniteSet + assert _test_args(SingleDomain(x, FiniteSet(1, 2, 3))) + + +def test_sympy__stats__rv__ConditionalDomain(): + from sympy.stats.rv import ConditionalDomain, RandomDomain + from sympy.sets.sets import FiniteSet + D = RandomDomain(FiniteSet(x), FiniteSet(1, 2)) + assert _test_args(ConditionalDomain(D, x > 1)) + +def test_sympy__stats__rv__MatrixDomain(): + from sympy.stats.rv import MatrixDomain + from sympy.matrices import MatrixSet + from sympy.core.singleton import S + assert _test_args(MatrixDomain(x, MatrixSet(2, 2, S.Reals))) + +def test_sympy__stats__rv__PSpace(): + from sympy.stats.rv import PSpace, RandomDomain + from sympy.sets.sets import FiniteSet + D = RandomDomain(FiniteSet(x), FiniteSet(1, 2, 3, 4, 5, 6)) + assert _test_args(PSpace(D, die)) + + +@SKIP("abstract Class") +def test_sympy__stats__rv__SinglePSpace(): + pass + + +def test_sympy__stats__rv__RandomSymbol(): + from sympy.stats.rv import RandomSymbol + from sympy.stats.crv import SingleContinuousPSpace + A = SingleContinuousPSpace(x, nd) + assert _test_args(RandomSymbol(x, A)) + + +@SKIP("abstract Class") +def test_sympy__stats__rv__ProductPSpace(): + pass + + +def test_sympy__stats__rv__IndependentProductPSpace(): + from sympy.stats.rv import IndependentProductPSpace + from sympy.stats.crv import SingleContinuousPSpace + A = SingleContinuousPSpace(x, nd) + B = SingleContinuousPSpace(y, nd) + assert _test_args(IndependentProductPSpace(A, B)) + + +def test_sympy__stats__rv__ProductDomain(): + from sympy.sets.sets import Interval + from sympy.stats.rv import ProductDomain, SingleDomain + D = SingleDomain(x, Interval(-oo, oo)) + E = SingleDomain(y, Interval(0, oo)) + assert _test_args(ProductDomain(D, E)) + + +def test_sympy__stats__symbolic_probability__Probability(): + from sympy.stats.symbolic_probability import Probability + from sympy.stats import Normal + X = Normal('X', 0, 1) + assert _test_args(Probability(X > 0)) + + +def test_sympy__stats__symbolic_probability__Expectation(): + from sympy.stats.symbolic_probability import Expectation + from sympy.stats import Normal + X = Normal('X', 0, 1) + assert _test_args(Expectation(X > 0)) + + +def test_sympy__stats__symbolic_probability__Covariance(): + from sympy.stats.symbolic_probability import Covariance + from sympy.stats import Normal + X = Normal('X', 0, 1) + Y = Normal('Y', 0, 3) + assert _test_args(Covariance(X, Y)) + + +def test_sympy__stats__symbolic_probability__Variance(): + from sympy.stats.symbolic_probability import Variance + from sympy.stats import Normal + X = Normal('X', 0, 1) + assert _test_args(Variance(X)) + + +def test_sympy__stats__symbolic_probability__Moment(): + from sympy.stats.symbolic_probability import Moment + from sympy.stats import Normal + X = Normal('X', 0, 1) + assert _test_args(Moment(X, 3, 2, X > 3)) + + +def test_sympy__stats__symbolic_probability__CentralMoment(): + from sympy.stats.symbolic_probability import CentralMoment + from sympy.stats import Normal + X = Normal('X', 0, 1) + assert _test_args(CentralMoment(X, 2, X > 1)) + + +def test_sympy__stats__frv_types__DiscreteUniformDistribution(): + from sympy.stats.frv_types import DiscreteUniformDistribution + from sympy.core.containers import Tuple + assert _test_args(DiscreteUniformDistribution(Tuple(*list(range(6))))) + + +def test_sympy__stats__frv_types__DieDistribution(): + assert _test_args(die) + + +def test_sympy__stats__frv_types__BernoulliDistribution(): + from sympy.stats.frv_types import BernoulliDistribution + assert _test_args(BernoulliDistribution(S.Half, 0, 1)) + + +def test_sympy__stats__frv_types__BinomialDistribution(): + from sympy.stats.frv_types import BinomialDistribution + assert _test_args(BinomialDistribution(5, S.Half, 1, 0)) + +def test_sympy__stats__frv_types__BetaBinomialDistribution(): + from sympy.stats.frv_types import BetaBinomialDistribution + assert _test_args(BetaBinomialDistribution(5, 1, 1)) + + +def test_sympy__stats__frv_types__HypergeometricDistribution(): + from sympy.stats.frv_types import HypergeometricDistribution + assert _test_args(HypergeometricDistribution(10, 5, 3)) + + +def test_sympy__stats__frv_types__RademacherDistribution(): + from sympy.stats.frv_types import RademacherDistribution + assert _test_args(RademacherDistribution()) + +def test_sympy__stats__frv_types__IdealSolitonDistribution(): + from sympy.stats.frv_types import IdealSolitonDistribution + assert _test_args(IdealSolitonDistribution(10)) + +def test_sympy__stats__frv_types__RobustSolitonDistribution(): + from sympy.stats.frv_types import RobustSolitonDistribution + assert _test_args(RobustSolitonDistribution(1000, 0.5, 0.1)) + +def test_sympy__stats__frv__FiniteDomain(): + from sympy.stats.frv import FiniteDomain + assert _test_args(FiniteDomain({(x, 1), (x, 2)})) # x can be 1 or 2 + + +def test_sympy__stats__frv__SingleFiniteDomain(): + from sympy.stats.frv import SingleFiniteDomain + assert _test_args(SingleFiniteDomain(x, {1, 2})) # x can be 1 or 2 + + +def test_sympy__stats__frv__ProductFiniteDomain(): + from sympy.stats.frv import SingleFiniteDomain, ProductFiniteDomain + xd = SingleFiniteDomain(x, {1, 2}) + yd = SingleFiniteDomain(y, {1, 2}) + assert _test_args(ProductFiniteDomain(xd, yd)) + + +def test_sympy__stats__frv__ConditionalFiniteDomain(): + from sympy.stats.frv import SingleFiniteDomain, ConditionalFiniteDomain + xd = SingleFiniteDomain(x, {1, 2}) + assert _test_args(ConditionalFiniteDomain(xd, x > 1)) + + +def test_sympy__stats__frv__FinitePSpace(): + from sympy.stats.frv import FinitePSpace, SingleFiniteDomain + xd = SingleFiniteDomain(x, {1, 2, 3, 4, 5, 6}) + assert _test_args(FinitePSpace(xd, {(x, 1): S.Half, (x, 2): S.Half})) + + xd = SingleFiniteDomain(x, {1, 2}) + assert _test_args(FinitePSpace(xd, {(x, 1): S.Half, (x, 2): S.Half})) + + +def test_sympy__stats__frv__SingleFinitePSpace(): + from sympy.stats.frv import SingleFinitePSpace + from sympy.core.symbol import Symbol + + assert _test_args(SingleFinitePSpace(Symbol('x'), die)) + + +def test_sympy__stats__frv__ProductFinitePSpace(): + from sympy.stats.frv import SingleFinitePSpace, ProductFinitePSpace + from sympy.core.symbol import Symbol + xp = SingleFinitePSpace(Symbol('x'), die) + yp = SingleFinitePSpace(Symbol('y'), die) + assert _test_args(ProductFinitePSpace(xp, yp)) + +@SKIP("abstract class") +def test_sympy__stats__frv__SingleFiniteDistribution(): + pass + +@SKIP("abstract class") +def test_sympy__stats__crv__ContinuousDistribution(): + pass + + +def test_sympy__stats__frv_types__FiniteDistributionHandmade(): + from sympy.stats.frv_types import FiniteDistributionHandmade + from sympy.core.containers import Dict + assert _test_args(FiniteDistributionHandmade(Dict({1: 1}))) + + +def test_sympy__stats__crv_types__ContinuousDistributionHandmade(): + from sympy.stats.crv_types import ContinuousDistributionHandmade + from sympy.core.function import Lambda + from sympy.sets.sets import Interval + from sympy.abc import x + assert _test_args(ContinuousDistributionHandmade(Lambda(x, 2*x), + Interval(0, 1))) + + +def test_sympy__stats__drv_types__DiscreteDistributionHandmade(): + from sympy.stats.drv_types import DiscreteDistributionHandmade + from sympy.core.function import Lambda + from sympy.sets.sets import FiniteSet + from sympy.abc import x + assert _test_args(DiscreteDistributionHandmade(Lambda(x, Rational(1, 10)), + FiniteSet(*range(10)))) + + +def test_sympy__stats__rv__Density(): + from sympy.stats.rv import Density + from sympy.stats.crv_types import Normal + assert _test_args(Density(Normal('x', 0, 1))) + + +def test_sympy__stats__crv_types__ArcsinDistribution(): + from sympy.stats.crv_types import ArcsinDistribution + assert _test_args(ArcsinDistribution(0, 1)) + + +def test_sympy__stats__crv_types__BeniniDistribution(): + from sympy.stats.crv_types import BeniniDistribution + assert _test_args(BeniniDistribution(1, 1, 1)) + + +def test_sympy__stats__crv_types__BetaDistribution(): + from sympy.stats.crv_types import BetaDistribution + assert _test_args(BetaDistribution(1, 1)) + +def test_sympy__stats__crv_types__BetaNoncentralDistribution(): + from sympy.stats.crv_types import BetaNoncentralDistribution + assert _test_args(BetaNoncentralDistribution(1, 1, 1)) + + +def test_sympy__stats__crv_types__BetaPrimeDistribution(): + from sympy.stats.crv_types import BetaPrimeDistribution + assert _test_args(BetaPrimeDistribution(1, 1)) + +def test_sympy__stats__crv_types__BoundedParetoDistribution(): + from sympy.stats.crv_types import BoundedParetoDistribution + assert _test_args(BoundedParetoDistribution(1, 1, 2)) + +def test_sympy__stats__crv_types__CauchyDistribution(): + from sympy.stats.crv_types import CauchyDistribution + assert _test_args(CauchyDistribution(0, 1)) + + +def test_sympy__stats__crv_types__ChiDistribution(): + from sympy.stats.crv_types import ChiDistribution + assert _test_args(ChiDistribution(1)) + + +def test_sympy__stats__crv_types__ChiNoncentralDistribution(): + from sympy.stats.crv_types import ChiNoncentralDistribution + assert _test_args(ChiNoncentralDistribution(1,1)) + + +def test_sympy__stats__crv_types__ChiSquaredDistribution(): + from sympy.stats.crv_types import ChiSquaredDistribution + assert _test_args(ChiSquaredDistribution(1)) + + +def test_sympy__stats__crv_types__DagumDistribution(): + from sympy.stats.crv_types import DagumDistribution + assert _test_args(DagumDistribution(1, 1, 1)) + + +def test_sympy__stats__crv_types__DavisDistribution(): + from sympy.stats.crv_types import DavisDistribution + assert _test_args(DavisDistribution(1, 1, 1)) + + +def test_sympy__stats__crv_types__ExGaussianDistribution(): + from sympy.stats.crv_types import ExGaussianDistribution + assert _test_args(ExGaussianDistribution(1, 1, 1)) + + +def test_sympy__stats__crv_types__ExponentialDistribution(): + from sympy.stats.crv_types import ExponentialDistribution + assert _test_args(ExponentialDistribution(1)) + + +def test_sympy__stats__crv_types__ExponentialPowerDistribution(): + from sympy.stats.crv_types import ExponentialPowerDistribution + assert _test_args(ExponentialPowerDistribution(0, 1, 1)) + + +def test_sympy__stats__crv_types__FDistributionDistribution(): + from sympy.stats.crv_types import FDistributionDistribution + assert _test_args(FDistributionDistribution(1, 1)) + + +def test_sympy__stats__crv_types__FisherZDistribution(): + from sympy.stats.crv_types import FisherZDistribution + assert _test_args(FisherZDistribution(1, 1)) + + +def test_sympy__stats__crv_types__FrechetDistribution(): + from sympy.stats.crv_types import FrechetDistribution + assert _test_args(FrechetDistribution(1, 1, 1)) + + +def test_sympy__stats__crv_types__GammaInverseDistribution(): + from sympy.stats.crv_types import GammaInverseDistribution + assert _test_args(GammaInverseDistribution(1, 1)) + + +def test_sympy__stats__crv_types__GammaDistribution(): + from sympy.stats.crv_types import GammaDistribution + assert _test_args(GammaDistribution(1, 1)) + +def test_sympy__stats__crv_types__GumbelDistribution(): + from sympy.stats.crv_types import GumbelDistribution + assert _test_args(GumbelDistribution(1, 1, False)) + +def test_sympy__stats__crv_types__GompertzDistribution(): + from sympy.stats.crv_types import GompertzDistribution + assert _test_args(GompertzDistribution(1, 1)) + +def test_sympy__stats__crv_types__KumaraswamyDistribution(): + from sympy.stats.crv_types import KumaraswamyDistribution + assert _test_args(KumaraswamyDistribution(1, 1)) + +def test_sympy__stats__crv_types__LaplaceDistribution(): + from sympy.stats.crv_types import LaplaceDistribution + assert _test_args(LaplaceDistribution(0, 1)) + +def test_sympy__stats__crv_types__LevyDistribution(): + from sympy.stats.crv_types import LevyDistribution + assert _test_args(LevyDistribution(0, 1)) + +def test_sympy__stats__crv_types__LogCauchyDistribution(): + from sympy.stats.crv_types import LogCauchyDistribution + assert _test_args(LogCauchyDistribution(0, 1)) + +def test_sympy__stats__crv_types__LogisticDistribution(): + from sympy.stats.crv_types import LogisticDistribution + assert _test_args(LogisticDistribution(0, 1)) + +def test_sympy__stats__crv_types__LogLogisticDistribution(): + from sympy.stats.crv_types import LogLogisticDistribution + assert _test_args(LogLogisticDistribution(1, 1)) + +def test_sympy__stats__crv_types__LogitNormalDistribution(): + from sympy.stats.crv_types import LogitNormalDistribution + assert _test_args(LogitNormalDistribution(0, 1)) + +def test_sympy__stats__crv_types__LogNormalDistribution(): + from sympy.stats.crv_types import LogNormalDistribution + assert _test_args(LogNormalDistribution(0, 1)) + +def test_sympy__stats__crv_types__LomaxDistribution(): + from sympy.stats.crv_types import LomaxDistribution + assert _test_args(LomaxDistribution(1, 2)) + +def test_sympy__stats__crv_types__MaxwellDistribution(): + from sympy.stats.crv_types import MaxwellDistribution + assert _test_args(MaxwellDistribution(1)) + +def test_sympy__stats__crv_types__MoyalDistribution(): + from sympy.stats.crv_types import MoyalDistribution + assert _test_args(MoyalDistribution(1,2)) + +def test_sympy__stats__crv_types__NakagamiDistribution(): + from sympy.stats.crv_types import NakagamiDistribution + assert _test_args(NakagamiDistribution(1, 1)) + + +def test_sympy__stats__crv_types__NormalDistribution(): + from sympy.stats.crv_types import NormalDistribution + assert _test_args(NormalDistribution(0, 1)) + +def test_sympy__stats__crv_types__GaussianInverseDistribution(): + from sympy.stats.crv_types import GaussianInverseDistribution + assert _test_args(GaussianInverseDistribution(1, 1)) + + +def test_sympy__stats__crv_types__ParetoDistribution(): + from sympy.stats.crv_types import ParetoDistribution + assert _test_args(ParetoDistribution(1, 1)) + +def test_sympy__stats__crv_types__PowerFunctionDistribution(): + from sympy.stats.crv_types import PowerFunctionDistribution + assert _test_args(PowerFunctionDistribution(2,0,1)) + +def test_sympy__stats__crv_types__QuadraticUDistribution(): + from sympy.stats.crv_types import QuadraticUDistribution + assert _test_args(QuadraticUDistribution(1, 2)) + +def test_sympy__stats__crv_types__RaisedCosineDistribution(): + from sympy.stats.crv_types import RaisedCosineDistribution + assert _test_args(RaisedCosineDistribution(1, 1)) + +def test_sympy__stats__crv_types__RayleighDistribution(): + from sympy.stats.crv_types import RayleighDistribution + assert _test_args(RayleighDistribution(1)) + +def test_sympy__stats__crv_types__ReciprocalDistribution(): + from sympy.stats.crv_types import ReciprocalDistribution + assert _test_args(ReciprocalDistribution(5, 30)) + +def test_sympy__stats__crv_types__ShiftedGompertzDistribution(): + from sympy.stats.crv_types import ShiftedGompertzDistribution + assert _test_args(ShiftedGompertzDistribution(1, 1)) + +def test_sympy__stats__crv_types__StudentTDistribution(): + from sympy.stats.crv_types import StudentTDistribution + assert _test_args(StudentTDistribution(1)) + +def test_sympy__stats__crv_types__TrapezoidalDistribution(): + from sympy.stats.crv_types import TrapezoidalDistribution + assert _test_args(TrapezoidalDistribution(1, 2, 3, 4)) + +def test_sympy__stats__crv_types__TriangularDistribution(): + from sympy.stats.crv_types import TriangularDistribution + assert _test_args(TriangularDistribution(-1, 0, 1)) + + +def test_sympy__stats__crv_types__UniformDistribution(): + from sympy.stats.crv_types import UniformDistribution + assert _test_args(UniformDistribution(0, 1)) + + +def test_sympy__stats__crv_types__UniformSumDistribution(): + from sympy.stats.crv_types import UniformSumDistribution + assert _test_args(UniformSumDistribution(1)) + + +def test_sympy__stats__crv_types__VonMisesDistribution(): + from sympy.stats.crv_types import VonMisesDistribution + assert _test_args(VonMisesDistribution(1, 1)) + + +def test_sympy__stats__crv_types__WeibullDistribution(): + from sympy.stats.crv_types import WeibullDistribution + assert _test_args(WeibullDistribution(1, 1)) + + +def test_sympy__stats__crv_types__WignerSemicircleDistribution(): + from sympy.stats.crv_types import WignerSemicircleDistribution + assert _test_args(WignerSemicircleDistribution(1)) + + +def test_sympy__stats__drv_types__GeometricDistribution(): + from sympy.stats.drv_types import GeometricDistribution + assert _test_args(GeometricDistribution(.5)) + +def test_sympy__stats__drv_types__HermiteDistribution(): + from sympy.stats.drv_types import HermiteDistribution + assert _test_args(HermiteDistribution(1, 2)) + +def test_sympy__stats__drv_types__LogarithmicDistribution(): + from sympy.stats.drv_types import LogarithmicDistribution + assert _test_args(LogarithmicDistribution(.5)) + + +def test_sympy__stats__drv_types__NegativeBinomialDistribution(): + from sympy.stats.drv_types import NegativeBinomialDistribution + assert _test_args(NegativeBinomialDistribution(.5, .5)) + +def test_sympy__stats__drv_types__FlorySchulzDistribution(): + from sympy.stats.drv_types import FlorySchulzDistribution + assert _test_args(FlorySchulzDistribution(.5)) + +def test_sympy__stats__drv_types__PoissonDistribution(): + from sympy.stats.drv_types import PoissonDistribution + assert _test_args(PoissonDistribution(1)) + + +def test_sympy__stats__drv_types__SkellamDistribution(): + from sympy.stats.drv_types import SkellamDistribution + assert _test_args(SkellamDistribution(1, 1)) + + +def test_sympy__stats__drv_types__YuleSimonDistribution(): + from sympy.stats.drv_types import YuleSimonDistribution + assert _test_args(YuleSimonDistribution(.5)) + + +def test_sympy__stats__drv_types__ZetaDistribution(): + from sympy.stats.drv_types import ZetaDistribution + assert _test_args(ZetaDistribution(1.5)) + + +def test_sympy__stats__joint_rv__JointDistribution(): + from sympy.stats.joint_rv import JointDistribution + assert _test_args(JointDistribution(1, 2, 3, 4)) + + +def test_sympy__stats__joint_rv_types__MultivariateNormalDistribution(): + from sympy.stats.joint_rv_types import MultivariateNormalDistribution + assert _test_args( + MultivariateNormalDistribution([0, 1], [[1, 0],[0, 1]])) + +def test_sympy__stats__joint_rv_types__MultivariateLaplaceDistribution(): + from sympy.stats.joint_rv_types import MultivariateLaplaceDistribution + assert _test_args(MultivariateLaplaceDistribution([0, 1], [[1, 0],[0, 1]])) + + +def test_sympy__stats__joint_rv_types__MultivariateTDistribution(): + from sympy.stats.joint_rv_types import MultivariateTDistribution + assert _test_args(MultivariateTDistribution([0, 1], [[1, 0],[0, 1]], 1)) + + +def test_sympy__stats__joint_rv_types__NormalGammaDistribution(): + from sympy.stats.joint_rv_types import NormalGammaDistribution + assert _test_args(NormalGammaDistribution(1, 2, 3, 4)) + +def test_sympy__stats__joint_rv_types__GeneralizedMultivariateLogGammaDistribution(): + from sympy.stats.joint_rv_types import GeneralizedMultivariateLogGammaDistribution + v, l, mu = (4, [1, 2, 3, 4], [1, 2, 3, 4]) + assert _test_args(GeneralizedMultivariateLogGammaDistribution(S.Half, v, l, mu)) + +def test_sympy__stats__joint_rv_types__MultivariateBetaDistribution(): + from sympy.stats.joint_rv_types import MultivariateBetaDistribution + assert _test_args(MultivariateBetaDistribution([1, 2, 3])) + +def test_sympy__stats__joint_rv_types__MultivariateEwensDistribution(): + from sympy.stats.joint_rv_types import MultivariateEwensDistribution + assert _test_args(MultivariateEwensDistribution(5, 1)) + +def test_sympy__stats__joint_rv_types__MultinomialDistribution(): + from sympy.stats.joint_rv_types import MultinomialDistribution + assert _test_args(MultinomialDistribution(5, [0.5, 0.1, 0.3])) + +def test_sympy__stats__joint_rv_types__NegativeMultinomialDistribution(): + from sympy.stats.joint_rv_types import NegativeMultinomialDistribution + assert _test_args(NegativeMultinomialDistribution(5, [0.5, 0.1, 0.3])) + +def test_sympy__stats__rv__RandomIndexedSymbol(): + from sympy.stats.rv import RandomIndexedSymbol, pspace + from sympy.stats.stochastic_process_types import DiscreteMarkovChain + X = DiscreteMarkovChain("X") + assert _test_args(RandomIndexedSymbol(X[0].symbol, pspace(X[0]))) + +def test_sympy__stats__rv__RandomMatrixSymbol(): + from sympy.stats.rv import RandomMatrixSymbol + from sympy.stats.random_matrix import RandomMatrixPSpace + pspace = RandomMatrixPSpace('P') + assert _test_args(RandomMatrixSymbol('M', 3, 3, pspace)) + +def test_sympy__stats__stochastic_process__StochasticPSpace(): + from sympy.stats.stochastic_process import StochasticPSpace + from sympy.stats.stochastic_process_types import StochasticProcess + from sympy.stats.frv_types import BernoulliDistribution + assert _test_args(StochasticPSpace("Y", StochasticProcess("Y", [1, 2, 3]), BernoulliDistribution(S.Half, 1, 0))) + +def test_sympy__stats__stochastic_process_types__StochasticProcess(): + from sympy.stats.stochastic_process_types import StochasticProcess + assert _test_args(StochasticProcess("Y", [1, 2, 3])) + +def test_sympy__stats__stochastic_process_types__MarkovProcess(): + from sympy.stats.stochastic_process_types import MarkovProcess + assert _test_args(MarkovProcess("Y", [1, 2, 3])) + +def test_sympy__stats__stochastic_process_types__DiscreteTimeStochasticProcess(): + from sympy.stats.stochastic_process_types import DiscreteTimeStochasticProcess + assert _test_args(DiscreteTimeStochasticProcess("Y", [1, 2, 3])) + +def test_sympy__stats__stochastic_process_types__ContinuousTimeStochasticProcess(): + from sympy.stats.stochastic_process_types import ContinuousTimeStochasticProcess + assert _test_args(ContinuousTimeStochasticProcess("Y", [1, 2, 3])) + +def test_sympy__stats__stochastic_process_types__TransitionMatrixOf(): + from sympy.stats.stochastic_process_types import TransitionMatrixOf, DiscreteMarkovChain + from sympy.matrices.expressions.matexpr import MatrixSymbol + DMC = DiscreteMarkovChain("Y") + assert _test_args(TransitionMatrixOf(DMC, MatrixSymbol('T', 3, 3))) + +def test_sympy__stats__stochastic_process_types__GeneratorMatrixOf(): + from sympy.stats.stochastic_process_types import GeneratorMatrixOf, ContinuousMarkovChain + from sympy.matrices.expressions.matexpr import MatrixSymbol + DMC = ContinuousMarkovChain("Y") + assert _test_args(GeneratorMatrixOf(DMC, MatrixSymbol('T', 3, 3))) + +def test_sympy__stats__stochastic_process_types__StochasticStateSpaceOf(): + from sympy.stats.stochastic_process_types import StochasticStateSpaceOf, DiscreteMarkovChain + DMC = DiscreteMarkovChain("Y") + assert _test_args(StochasticStateSpaceOf(DMC, [0, 1, 2])) + +def test_sympy__stats__stochastic_process_types__DiscreteMarkovChain(): + from sympy.stats.stochastic_process_types import DiscreteMarkovChain + from sympy.matrices.expressions.matexpr import MatrixSymbol + assert _test_args(DiscreteMarkovChain("Y", [0, 1, 2], MatrixSymbol('T', 3, 3))) + +def test_sympy__stats__stochastic_process_types__ContinuousMarkovChain(): + from sympy.stats.stochastic_process_types import ContinuousMarkovChain + from sympy.matrices.expressions.matexpr import MatrixSymbol + assert _test_args(ContinuousMarkovChain("Y", [0, 1, 2], MatrixSymbol('T', 3, 3))) + +def test_sympy__stats__stochastic_process_types__BernoulliProcess(): + from sympy.stats.stochastic_process_types import BernoulliProcess + assert _test_args(BernoulliProcess("B", 0.5, 1, 0)) + +def test_sympy__stats__stochastic_process_types__CountingProcess(): + from sympy.stats.stochastic_process_types import CountingProcess + assert _test_args(CountingProcess("C")) + +def test_sympy__stats__stochastic_process_types__PoissonProcess(): + from sympy.stats.stochastic_process_types import PoissonProcess + assert _test_args(PoissonProcess("X", 2)) + +def test_sympy__stats__stochastic_process_types__WienerProcess(): + from sympy.stats.stochastic_process_types import WienerProcess + assert _test_args(WienerProcess("X")) + +def test_sympy__stats__stochastic_process_types__GammaProcess(): + from sympy.stats.stochastic_process_types import GammaProcess + assert _test_args(GammaProcess("X", 1, 2)) + +def test_sympy__stats__random_matrix__RandomMatrixPSpace(): + from sympy.stats.random_matrix import RandomMatrixPSpace + from sympy.stats.random_matrix_models import RandomMatrixEnsembleModel + model = RandomMatrixEnsembleModel('R', 3) + assert _test_args(RandomMatrixPSpace('P', model=model)) + +def test_sympy__stats__random_matrix_models__RandomMatrixEnsembleModel(): + from sympy.stats.random_matrix_models import RandomMatrixEnsembleModel + assert _test_args(RandomMatrixEnsembleModel('R', 3)) + +def test_sympy__stats__random_matrix_models__GaussianEnsembleModel(): + from sympy.stats.random_matrix_models import GaussianEnsembleModel + assert _test_args(GaussianEnsembleModel('G', 3)) + +def test_sympy__stats__random_matrix_models__GaussianUnitaryEnsembleModel(): + from sympy.stats.random_matrix_models import GaussianUnitaryEnsembleModel + assert _test_args(GaussianUnitaryEnsembleModel('U', 3)) + +def test_sympy__stats__random_matrix_models__GaussianOrthogonalEnsembleModel(): + from sympy.stats.random_matrix_models import GaussianOrthogonalEnsembleModel + assert _test_args(GaussianOrthogonalEnsembleModel('U', 3)) + +def test_sympy__stats__random_matrix_models__GaussianSymplecticEnsembleModel(): + from sympy.stats.random_matrix_models import GaussianSymplecticEnsembleModel + assert _test_args(GaussianSymplecticEnsembleModel('U', 3)) + +def test_sympy__stats__random_matrix_models__CircularEnsembleModel(): + from sympy.stats.random_matrix_models import CircularEnsembleModel + assert _test_args(CircularEnsembleModel('C', 3)) + +def test_sympy__stats__random_matrix_models__CircularUnitaryEnsembleModel(): + from sympy.stats.random_matrix_models import CircularUnitaryEnsembleModel + assert _test_args(CircularUnitaryEnsembleModel('U', 3)) + +def test_sympy__stats__random_matrix_models__CircularOrthogonalEnsembleModel(): + from sympy.stats.random_matrix_models import CircularOrthogonalEnsembleModel + assert _test_args(CircularOrthogonalEnsembleModel('O', 3)) + +def test_sympy__stats__random_matrix_models__CircularSymplecticEnsembleModel(): + from sympy.stats.random_matrix_models import CircularSymplecticEnsembleModel + assert _test_args(CircularSymplecticEnsembleModel('S', 3)) + +def test_sympy__stats__symbolic_multivariate_probability__ExpectationMatrix(): + from sympy.stats import ExpectationMatrix + from sympy.stats.rv import RandomMatrixSymbol + assert _test_args(ExpectationMatrix(RandomMatrixSymbol('R', 2, 1))) + +def test_sympy__stats__symbolic_multivariate_probability__VarianceMatrix(): + from sympy.stats import VarianceMatrix + from sympy.stats.rv import RandomMatrixSymbol + assert _test_args(VarianceMatrix(RandomMatrixSymbol('R', 3, 1))) + +def test_sympy__stats__symbolic_multivariate_probability__CrossCovarianceMatrix(): + from sympy.stats import CrossCovarianceMatrix + from sympy.stats.rv import RandomMatrixSymbol + assert _test_args(CrossCovarianceMatrix(RandomMatrixSymbol('R', 3, 1), + RandomMatrixSymbol('X', 3, 1))) + +def test_sympy__stats__matrix_distributions__MatrixPSpace(): + from sympy.stats.matrix_distributions import MatrixDistribution, MatrixPSpace + from sympy.matrices.dense import Matrix + M = MatrixDistribution(1, Matrix([[1, 0], [0, 1]])) + assert _test_args(MatrixPSpace('M', M, 2, 2)) + +def test_sympy__stats__matrix_distributions__MatrixDistribution(): + from sympy.stats.matrix_distributions import MatrixDistribution + from sympy.matrices.dense import Matrix + assert _test_args(MatrixDistribution(1, Matrix([[1, 0], [0, 1]]))) + +def test_sympy__stats__matrix_distributions__MatrixGammaDistribution(): + from sympy.stats.matrix_distributions import MatrixGammaDistribution + from sympy.matrices.dense import Matrix + assert _test_args(MatrixGammaDistribution(3, 4, Matrix([[1, 0], [0, 1]]))) + +def test_sympy__stats__matrix_distributions__WishartDistribution(): + from sympy.stats.matrix_distributions import WishartDistribution + from sympy.matrices.dense import Matrix + assert _test_args(WishartDistribution(3, Matrix([[1, 0], [0, 1]]))) + +def test_sympy__stats__matrix_distributions__MatrixNormalDistribution(): + from sympy.stats.matrix_distributions import MatrixNormalDistribution + from sympy.matrices.expressions.matexpr import MatrixSymbol + L = MatrixSymbol('L', 1, 2) + S1 = MatrixSymbol('S1', 1, 1) + S2 = MatrixSymbol('S2', 2, 2) + assert _test_args(MatrixNormalDistribution(L, S1, S2)) + +def test_sympy__stats__matrix_distributions__MatrixStudentTDistribution(): + from sympy.stats.matrix_distributions import MatrixStudentTDistribution + from sympy.matrices.expressions.matexpr import MatrixSymbol + v = symbols('v', positive=True) + Omega = MatrixSymbol('Omega', 3, 3) + Sigma = MatrixSymbol('Sigma', 1, 1) + Location = MatrixSymbol('Location', 1, 3) + assert _test_args(MatrixStudentTDistribution(v, Location, Omega, Sigma)) + +def test_sympy__utilities__matchpy_connector__WildDot(): + from sympy.utilities.matchpy_connector import WildDot + assert _test_args(WildDot("w_")) + + +def test_sympy__utilities__matchpy_connector__WildPlus(): + from sympy.utilities.matchpy_connector import WildPlus + assert _test_args(WildPlus("w__")) + + +def test_sympy__utilities__matchpy_connector__WildStar(): + from sympy.utilities.matchpy_connector import WildStar + assert _test_args(WildStar("w___")) + + +def test_sympy__core__symbol__Str(): + from sympy.core.symbol import Str + assert _test_args(Str('t')) + +def test_sympy__core__symbol__Dummy(): + from sympy.core.symbol import Dummy + assert _test_args(Dummy('t')) + + +def test_sympy__core__symbol__Symbol(): + from sympy.core.symbol import Symbol + assert _test_args(Symbol('t')) + + +def test_sympy__core__symbol__Wild(): + from sympy.core.symbol import Wild + assert _test_args(Wild('x', exclude=[x])) + + +@SKIP("abstract class") +def test_sympy__functions__combinatorial__factorials__CombinatorialFunction(): + pass + + +def test_sympy__functions__combinatorial__factorials__FallingFactorial(): + from sympy.functions.combinatorial.factorials import FallingFactorial + assert _test_args(FallingFactorial(2, x)) + + +def test_sympy__functions__combinatorial__factorials__MultiFactorial(): + from sympy.functions.combinatorial.factorials import MultiFactorial + assert _test_args(MultiFactorial(x)) + + +def test_sympy__functions__combinatorial__factorials__RisingFactorial(): + from sympy.functions.combinatorial.factorials import RisingFactorial + assert _test_args(RisingFactorial(2, x)) + + +def test_sympy__functions__combinatorial__factorials__binomial(): + from sympy.functions.combinatorial.factorials import binomial + assert _test_args(binomial(2, x)) + + +def test_sympy__functions__combinatorial__factorials__subfactorial(): + from sympy.functions.combinatorial.factorials import subfactorial + assert _test_args(subfactorial(x)) + + +def test_sympy__functions__combinatorial__factorials__factorial(): + from sympy.functions.combinatorial.factorials import factorial + assert _test_args(factorial(x)) + + +def test_sympy__functions__combinatorial__factorials__factorial2(): + from sympy.functions.combinatorial.factorials import factorial2 + assert _test_args(factorial2(x)) + + +def test_sympy__functions__combinatorial__numbers__bell(): + from sympy.functions.combinatorial.numbers import bell + assert _test_args(bell(x, y)) + + +def test_sympy__functions__combinatorial__numbers__bernoulli(): + from sympy.functions.combinatorial.numbers import bernoulli + assert _test_args(bernoulli(x)) + + +def test_sympy__functions__combinatorial__numbers__catalan(): + from sympy.functions.combinatorial.numbers import catalan + assert _test_args(catalan(x)) + + +def test_sympy__functions__combinatorial__numbers__genocchi(): + from sympy.functions.combinatorial.numbers import genocchi + assert _test_args(genocchi(x)) + + +def test_sympy__functions__combinatorial__numbers__euler(): + from sympy.functions.combinatorial.numbers import euler + assert _test_args(euler(x)) + + +def test_sympy__functions__combinatorial__numbers__andre(): + from sympy.functions.combinatorial.numbers import andre + assert _test_args(andre(x)) + + +def test_sympy__functions__combinatorial__numbers__carmichael(): + from sympy.functions.combinatorial.numbers import carmichael + assert _test_args(carmichael(x)) + + +def test_sympy__functions__combinatorial__numbers__divisor_sigma(): + from sympy.functions.combinatorial.numbers import divisor_sigma + k = symbols('k', integer=True) + n = symbols('n', integer=True) + t = divisor_sigma(n, k) + assert _test_args(t) + + +def test_sympy__functions__combinatorial__numbers__fibonacci(): + from sympy.functions.combinatorial.numbers import fibonacci + assert _test_args(fibonacci(x)) + + +def test_sympy__functions__combinatorial__numbers__jacobi_symbol(): + from sympy.functions.combinatorial.numbers import jacobi_symbol + assert _test_args(jacobi_symbol(2, 3)) + + +def test_sympy__functions__combinatorial__numbers__kronecker_symbol(): + from sympy.functions.combinatorial.numbers import kronecker_symbol + assert _test_args(kronecker_symbol(2, 3)) + + +def test_sympy__functions__combinatorial__numbers__legendre_symbol(): + from sympy.functions.combinatorial.numbers import legendre_symbol + assert _test_args(legendre_symbol(2, 3)) + + +def test_sympy__functions__combinatorial__numbers__mobius(): + from sympy.functions.combinatorial.numbers import mobius + assert _test_args(mobius(2)) + + +def test_sympy__functions__combinatorial__numbers__motzkin(): + from sympy.functions.combinatorial.numbers import motzkin + assert _test_args(motzkin(5)) + + +def test_sympy__functions__combinatorial__numbers__partition(): + from sympy.core.symbol import Symbol + from sympy.functions.combinatorial.numbers import partition + assert _test_args(partition(Symbol('a', integer=True))) + + +def test_sympy__functions__combinatorial__numbers__primenu(): + from sympy.functions.combinatorial.numbers import primenu + n = symbols('n', integer=True) + t = primenu(n) + assert _test_args(t) + + +def test_sympy__functions__combinatorial__numbers__primeomega(): + from sympy.functions.combinatorial.numbers import primeomega + n = symbols('n', integer=True) + t = primeomega(n) + assert _test_args(t) + + +def test_sympy__functions__combinatorial__numbers__primepi(): + from sympy.functions.combinatorial.numbers import primepi + n = symbols('n') + t = primepi(n) + assert _test_args(t) + + +def test_sympy__functions__combinatorial__numbers__reduced_totient(): + from sympy.functions.combinatorial.numbers import reduced_totient + k = symbols('k', integer=True) + t = reduced_totient(k) + assert _test_args(t) + + +def test_sympy__functions__combinatorial__numbers__totient(): + from sympy.functions.combinatorial.numbers import totient + k = symbols('k', integer=True) + t = totient(k) + assert _test_args(t) + + +def test_sympy__functions__combinatorial__numbers__tribonacci(): + from sympy.functions.combinatorial.numbers import tribonacci + assert _test_args(tribonacci(x)) + + +def test_sympy__functions__combinatorial__numbers__udivisor_sigma(): + from sympy.functions.combinatorial.numbers import udivisor_sigma + k = symbols('k', integer=True) + n = symbols('n', integer=True) + t = udivisor_sigma(n, k) + assert _test_args(t) + + +def test_sympy__functions__combinatorial__numbers__harmonic(): + from sympy.functions.combinatorial.numbers import harmonic + assert _test_args(harmonic(x, 2)) + + +def test_sympy__functions__combinatorial__numbers__lucas(): + from sympy.functions.combinatorial.numbers import lucas + assert _test_args(lucas(x)) + + +def test_sympy__functions__elementary__complexes__Abs(): + from sympy.functions.elementary.complexes import Abs + assert _test_args(Abs(x)) + + +def test_sympy__functions__elementary__complexes__adjoint(): + from sympy.functions.elementary.complexes import adjoint + assert _test_args(adjoint(x)) + + +def test_sympy__functions__elementary__complexes__arg(): + from sympy.functions.elementary.complexes import arg + assert _test_args(arg(x)) + + +def test_sympy__functions__elementary__complexes__conjugate(): + from sympy.functions.elementary.complexes import conjugate + assert _test_args(conjugate(x)) + + +def test_sympy__functions__elementary__complexes__im(): + from sympy.functions.elementary.complexes import im + assert _test_args(im(x)) + + +def test_sympy__functions__elementary__complexes__re(): + from sympy.functions.elementary.complexes import re + assert _test_args(re(x)) + + +def test_sympy__functions__elementary__complexes__sign(): + from sympy.functions.elementary.complexes import sign + assert _test_args(sign(x)) + + +def test_sympy__functions__elementary__complexes__polar_lift(): + from sympy.functions.elementary.complexes import polar_lift + assert _test_args(polar_lift(x)) + + +def test_sympy__functions__elementary__complexes__periodic_argument(): + from sympy.functions.elementary.complexes import periodic_argument + assert _test_args(periodic_argument(x, y)) + + +def test_sympy__functions__elementary__complexes__principal_branch(): + from sympy.functions.elementary.complexes import principal_branch + assert _test_args(principal_branch(x, y)) + + +def test_sympy__functions__elementary__complexes__transpose(): + from sympy.functions.elementary.complexes import transpose + assert _test_args(transpose(x)) + + +def test_sympy__functions__elementary__exponential__LambertW(): + from sympy.functions.elementary.exponential import LambertW + assert _test_args(LambertW(2)) + + +@SKIP("abstract class") +def test_sympy__functions__elementary__exponential__ExpBase(): + pass + + +def test_sympy__functions__elementary__exponential__exp(): + from sympy.functions.elementary.exponential import exp + assert _test_args(exp(2)) + + +def test_sympy__functions__elementary__exponential__exp_polar(): + from sympy.functions.elementary.exponential import exp_polar + assert _test_args(exp_polar(2)) + + +def test_sympy__functions__elementary__exponential__log(): + from sympy.functions.elementary.exponential import log + assert _test_args(log(2)) + + +@SKIP("abstract class") +def test_sympy__functions__elementary__hyperbolic__HyperbolicFunction(): + pass + + +@SKIP("abstract class") +def test_sympy__functions__elementary__hyperbolic__ReciprocalHyperbolicFunction(): + pass + + +@SKIP("abstract class") +def test_sympy__functions__elementary__hyperbolic__InverseHyperbolicFunction(): + pass + + +def test_sympy__functions__elementary__hyperbolic__acosh(): + from sympy.functions.elementary.hyperbolic import acosh + assert _test_args(acosh(2)) + + +def test_sympy__functions__elementary__hyperbolic__acoth(): + from sympy.functions.elementary.hyperbolic import acoth + assert _test_args(acoth(2)) + + +def test_sympy__functions__elementary__hyperbolic__asinh(): + from sympy.functions.elementary.hyperbolic import asinh + assert _test_args(asinh(2)) + + +def test_sympy__functions__elementary__hyperbolic__atanh(): + from sympy.functions.elementary.hyperbolic import atanh + assert _test_args(atanh(2)) + + +def test_sympy__functions__elementary__hyperbolic__asech(): + from sympy.functions.elementary.hyperbolic import asech + assert _test_args(asech(x)) + +def test_sympy__functions__elementary__hyperbolic__acsch(): + from sympy.functions.elementary.hyperbolic import acsch + assert _test_args(acsch(x)) + +def test_sympy__functions__elementary__hyperbolic__cosh(): + from sympy.functions.elementary.hyperbolic import cosh + assert _test_args(cosh(2)) + + +def test_sympy__functions__elementary__hyperbolic__coth(): + from sympy.functions.elementary.hyperbolic import coth + assert _test_args(coth(2)) + + +def test_sympy__functions__elementary__hyperbolic__csch(): + from sympy.functions.elementary.hyperbolic import csch + assert _test_args(csch(2)) + + +def test_sympy__functions__elementary__hyperbolic__sech(): + from sympy.functions.elementary.hyperbolic import sech + assert _test_args(sech(2)) + + +def test_sympy__functions__elementary__hyperbolic__sinh(): + from sympy.functions.elementary.hyperbolic import sinh + assert _test_args(sinh(2)) + + +def test_sympy__functions__elementary__hyperbolic__tanh(): + from sympy.functions.elementary.hyperbolic import tanh + assert _test_args(tanh(2)) + + +@SKIP("abstract class") +def test_sympy__functions__elementary__integers__RoundFunction(): + pass + + +def test_sympy__functions__elementary__integers__ceiling(): + from sympy.functions.elementary.integers import ceiling + assert _test_args(ceiling(x)) + + +def test_sympy__functions__elementary__integers__floor(): + from sympy.functions.elementary.integers import floor + assert _test_args(floor(x)) + + +def test_sympy__functions__elementary__integers__frac(): + from sympy.functions.elementary.integers import frac + assert _test_args(frac(x)) + + +def test_sympy__functions__elementary__miscellaneous__IdentityFunction(): + from sympy.functions.elementary.miscellaneous import IdentityFunction + assert _test_args(IdentityFunction()) + + +def test_sympy__functions__elementary__miscellaneous__Max(): + from sympy.functions.elementary.miscellaneous import Max + assert _test_args(Max(x, 2)) + + +def test_sympy__functions__elementary__miscellaneous__Min(): + from sympy.functions.elementary.miscellaneous import Min + assert _test_args(Min(x, 2)) + + +@SKIP("abstract class") +def test_sympy__functions__elementary__miscellaneous__MinMaxBase(): + pass + + +def test_sympy__functions__elementary__miscellaneous__Rem(): + from sympy.functions.elementary.miscellaneous import Rem + assert _test_args(Rem(x, 2)) + + +def test_sympy__functions__elementary__piecewise__ExprCondPair(): + from sympy.functions.elementary.piecewise import ExprCondPair + assert _test_args(ExprCondPair(1, True)) + + +def test_sympy__functions__elementary__piecewise__Piecewise(): + from sympy.functions.elementary.piecewise import Piecewise + assert _test_args(Piecewise((1, x >= 0), (0, True))) + + +@SKIP("abstract class") +def test_sympy__functions__elementary__trigonometric__TrigonometricFunction(): + pass + +@SKIP("abstract class") +def test_sympy__functions__elementary__trigonometric__ReciprocalTrigonometricFunction(): + pass + +@SKIP("abstract class") +def test_sympy__functions__elementary__trigonometric__InverseTrigonometricFunction(): + pass + +def test_sympy__functions__elementary__trigonometric__acos(): + from sympy.functions.elementary.trigonometric import acos + assert _test_args(acos(2)) + + +def test_sympy__functions__elementary__trigonometric__acot(): + from sympy.functions.elementary.trigonometric import acot + assert _test_args(acot(2)) + + +def test_sympy__functions__elementary__trigonometric__asin(): + from sympy.functions.elementary.trigonometric import asin + assert _test_args(asin(2)) + + +def test_sympy__functions__elementary__trigonometric__asec(): + from sympy.functions.elementary.trigonometric import asec + assert _test_args(asec(x)) + + +def test_sympy__functions__elementary__trigonometric__acsc(): + from sympy.functions.elementary.trigonometric import acsc + assert _test_args(acsc(x)) + + +def test_sympy__functions__elementary__trigonometric__atan(): + from sympy.functions.elementary.trigonometric import atan + assert _test_args(atan(2)) + + +def test_sympy__functions__elementary__trigonometric__atan2(): + from sympy.functions.elementary.trigonometric import atan2 + assert _test_args(atan2(2, 3)) + + +def test_sympy__functions__elementary__trigonometric__cos(): + from sympy.functions.elementary.trigonometric import cos + assert _test_args(cos(2)) + + +def test_sympy__functions__elementary__trigonometric__csc(): + from sympy.functions.elementary.trigonometric import csc + assert _test_args(csc(2)) + + +def test_sympy__functions__elementary__trigonometric__cot(): + from sympy.functions.elementary.trigonometric import cot + assert _test_args(cot(2)) + + +def test_sympy__functions__elementary__trigonometric__sin(): + assert _test_args(sin(2)) + + +def test_sympy__functions__elementary__trigonometric__sinc(): + from sympy.functions.elementary.trigonometric import sinc + assert _test_args(sinc(2)) + + +def test_sympy__functions__elementary__trigonometric__sec(): + from sympy.functions.elementary.trigonometric import sec + assert _test_args(sec(2)) + + +def test_sympy__functions__elementary__trigonometric__tan(): + from sympy.functions.elementary.trigonometric import tan + assert _test_args(tan(2)) + + +@SKIP("abstract class") +def test_sympy__functions__special__bessel__BesselBase(): + pass + + +@SKIP("abstract class") +def test_sympy__functions__special__bessel__SphericalBesselBase(): + pass + + +@SKIP("abstract class") +def test_sympy__functions__special__bessel__SphericalHankelBase(): + pass + + +def test_sympy__functions__special__bessel__besseli(): + from sympy.functions.special.bessel import besseli + assert _test_args(besseli(x, 1)) + + +def test_sympy__functions__special__bessel__besselj(): + from sympy.functions.special.bessel import besselj + assert _test_args(besselj(x, 1)) + + +def test_sympy__functions__special__bessel__besselk(): + from sympy.functions.special.bessel import besselk + assert _test_args(besselk(x, 1)) + + +def test_sympy__functions__special__bessel__bessely(): + from sympy.functions.special.bessel import bessely + assert _test_args(bessely(x, 1)) + + +def test_sympy__functions__special__bessel__hankel1(): + from sympy.functions.special.bessel import hankel1 + assert _test_args(hankel1(x, 1)) + + +def test_sympy__functions__special__bessel__hankel2(): + from sympy.functions.special.bessel import hankel2 + assert _test_args(hankel2(x, 1)) + + +def test_sympy__functions__special__bessel__jn(): + from sympy.functions.special.bessel import jn + assert _test_args(jn(0, x)) + + +def test_sympy__functions__special__bessel__yn(): + from sympy.functions.special.bessel import yn + assert _test_args(yn(0, x)) + + +def test_sympy__functions__special__bessel__hn1(): + from sympy.functions.special.bessel import hn1 + assert _test_args(hn1(0, x)) + + +def test_sympy__functions__special__bessel__hn2(): + from sympy.functions.special.bessel import hn2 + assert _test_args(hn2(0, x)) + + +def test_sympy__functions__special__bessel__AiryBase(): + pass + + +def test_sympy__functions__special__bessel__airyai(): + from sympy.functions.special.bessel import airyai + assert _test_args(airyai(2)) + + +def test_sympy__functions__special__bessel__airybi(): + from sympy.functions.special.bessel import airybi + assert _test_args(airybi(2)) + + +def test_sympy__functions__special__bessel__airyaiprime(): + from sympy.functions.special.bessel import airyaiprime + assert _test_args(airyaiprime(2)) + + +def test_sympy__functions__special__bessel__airybiprime(): + from sympy.functions.special.bessel import airybiprime + assert _test_args(airybiprime(2)) + + +def test_sympy__functions__special__bessel__marcumq(): + from sympy.functions.special.bessel import marcumq + assert _test_args(marcumq(x, y, z)) + + +def test_sympy__functions__special__elliptic_integrals__elliptic_k(): + from sympy.functions.special.elliptic_integrals import elliptic_k as K + assert _test_args(K(x)) + + +def test_sympy__functions__special__elliptic_integrals__elliptic_f(): + from sympy.functions.special.elliptic_integrals import elliptic_f as F + assert _test_args(F(x, y)) + + +def test_sympy__functions__special__elliptic_integrals__elliptic_e(): + from sympy.functions.special.elliptic_integrals import elliptic_e as E + assert _test_args(E(x)) + assert _test_args(E(x, y)) + + +def test_sympy__functions__special__elliptic_integrals__elliptic_pi(): + from sympy.functions.special.elliptic_integrals import elliptic_pi as P + assert _test_args(P(x, y)) + assert _test_args(P(x, y, z)) + + +def test_sympy__functions__special__delta_functions__DiracDelta(): + from sympy.functions.special.delta_functions import DiracDelta + assert _test_args(DiracDelta(x, 1)) + + +def test_sympy__functions__special__singularity_functions__SingularityFunction(): + from sympy.functions.special.singularity_functions import SingularityFunction + assert _test_args(SingularityFunction(x, y, z)) + + +def test_sympy__functions__special__delta_functions__Heaviside(): + from sympy.functions.special.delta_functions import Heaviside + assert _test_args(Heaviside(x)) + + +def test_sympy__functions__special__error_functions__erf(): + from sympy.functions.special.error_functions import erf + assert _test_args(erf(2)) + +def test_sympy__functions__special__error_functions__erfc(): + from sympy.functions.special.error_functions import erfc + assert _test_args(erfc(2)) + +def test_sympy__functions__special__error_functions__erfi(): + from sympy.functions.special.error_functions import erfi + assert _test_args(erfi(2)) + +def test_sympy__functions__special__error_functions__erf2(): + from sympy.functions.special.error_functions import erf2 + assert _test_args(erf2(2, 3)) + +def test_sympy__functions__special__error_functions__erfinv(): + from sympy.functions.special.error_functions import erfinv + assert _test_args(erfinv(2)) + +def test_sympy__functions__special__error_functions__erfcinv(): + from sympy.functions.special.error_functions import erfcinv + assert _test_args(erfcinv(2)) + +def test_sympy__functions__special__error_functions__erf2inv(): + from sympy.functions.special.error_functions import erf2inv + assert _test_args(erf2inv(2, 3)) + +@SKIP("abstract class") +def test_sympy__functions__special__error_functions__FresnelIntegral(): + pass + + +def test_sympy__functions__special__error_functions__fresnels(): + from sympy.functions.special.error_functions import fresnels + assert _test_args(fresnels(2)) + + +def test_sympy__functions__special__error_functions__fresnelc(): + from sympy.functions.special.error_functions import fresnelc + assert _test_args(fresnelc(2)) + + +def test_sympy__functions__special__error_functions__erfs(): + from sympy.functions.special.error_functions import _erfs + assert _test_args(_erfs(2)) + + +def test_sympy__functions__special__error_functions__Ei(): + from sympy.functions.special.error_functions import Ei + assert _test_args(Ei(2)) + + +def test_sympy__functions__special__error_functions__li(): + from sympy.functions.special.error_functions import li + assert _test_args(li(2)) + + +def test_sympy__functions__special__error_functions__Li(): + from sympy.functions.special.error_functions import Li + assert _test_args(Li(5)) + + +@SKIP("abstract class") +def test_sympy__functions__special__error_functions__TrigonometricIntegral(): + pass + + +def test_sympy__functions__special__error_functions__Si(): + from sympy.functions.special.error_functions import Si + assert _test_args(Si(2)) + + +def test_sympy__functions__special__error_functions__Ci(): + from sympy.functions.special.error_functions import Ci + assert _test_args(Ci(2)) + + +def test_sympy__functions__special__error_functions__Shi(): + from sympy.functions.special.error_functions import Shi + assert _test_args(Shi(2)) + + +def test_sympy__functions__special__error_functions__Chi(): + from sympy.functions.special.error_functions import Chi + assert _test_args(Chi(2)) + + +def test_sympy__functions__special__error_functions__expint(): + from sympy.functions.special.error_functions import expint + assert _test_args(expint(y, x)) + + +def test_sympy__functions__special__gamma_functions__gamma(): + from sympy.functions.special.gamma_functions import gamma + assert _test_args(gamma(x)) + + +def test_sympy__functions__special__gamma_functions__loggamma(): + from sympy.functions.special.gamma_functions import loggamma + assert _test_args(loggamma(x)) + + +def test_sympy__functions__special__gamma_functions__lowergamma(): + from sympy.functions.special.gamma_functions import lowergamma + assert _test_args(lowergamma(x, 2)) + + +def test_sympy__functions__special__gamma_functions__polygamma(): + from sympy.functions.special.gamma_functions import polygamma + assert _test_args(polygamma(x, 2)) + +def test_sympy__functions__special__gamma_functions__digamma(): + from sympy.functions.special.gamma_functions import digamma + assert _test_args(digamma(x)) + +def test_sympy__functions__special__gamma_functions__trigamma(): + from sympy.functions.special.gamma_functions import trigamma + assert _test_args(trigamma(x)) + +def test_sympy__functions__special__gamma_functions__uppergamma(): + from sympy.functions.special.gamma_functions import uppergamma + assert _test_args(uppergamma(x, 2)) + +def test_sympy__functions__special__gamma_functions__multigamma(): + from sympy.functions.special.gamma_functions import multigamma + assert _test_args(multigamma(x, 1)) + + +def test_sympy__functions__special__beta_functions__beta(): + from sympy.functions.special.beta_functions import beta + assert _test_args(beta(x)) + assert _test_args(beta(x, x)) + +def test_sympy__functions__special__beta_functions__betainc(): + from sympy.functions.special.beta_functions import betainc + assert _test_args(betainc(a, b, x, y)) + +def test_sympy__functions__special__beta_functions__betainc_regularized(): + from sympy.functions.special.beta_functions import betainc_regularized + assert _test_args(betainc_regularized(a, b, x, y)) + + +def test_sympy__functions__special__mathieu_functions__MathieuBase(): + pass + + +def test_sympy__functions__special__mathieu_functions__mathieus(): + from sympy.functions.special.mathieu_functions import mathieus + assert _test_args(mathieus(1, 1, 1)) + + +def test_sympy__functions__special__mathieu_functions__mathieuc(): + from sympy.functions.special.mathieu_functions import mathieuc + assert _test_args(mathieuc(1, 1, 1)) + + +def test_sympy__functions__special__mathieu_functions__mathieusprime(): + from sympy.functions.special.mathieu_functions import mathieusprime + assert _test_args(mathieusprime(1, 1, 1)) + + +def test_sympy__functions__special__mathieu_functions__mathieucprime(): + from sympy.functions.special.mathieu_functions import mathieucprime + assert _test_args(mathieucprime(1, 1, 1)) + + +@SKIP("abstract class") +def test_sympy__functions__special__hyper__TupleParametersBase(): + pass + + +@SKIP("abstract class") +def test_sympy__functions__special__hyper__TupleArg(): + pass + + +def test_sympy__functions__special__hyper__hyper(): + from sympy.functions.special.hyper import hyper + assert _test_args(hyper([1, 2, 3], [4, 5], x)) + + +def test_sympy__functions__special__hyper__meijerg(): + from sympy.functions.special.hyper import meijerg + assert _test_args(meijerg([1, 2, 3], [4, 5], [6], [], x)) + + +@SKIP("abstract class") +def test_sympy__functions__special__hyper__HyperRep(): + pass + + +def test_sympy__functions__special__hyper__HyperRep_power1(): + from sympy.functions.special.hyper import HyperRep_power1 + assert _test_args(HyperRep_power1(x, y)) + + +def test_sympy__functions__special__hyper__HyperRep_power2(): + from sympy.functions.special.hyper import HyperRep_power2 + assert _test_args(HyperRep_power2(x, y)) + + +def test_sympy__functions__special__hyper__HyperRep_log1(): + from sympy.functions.special.hyper import HyperRep_log1 + assert _test_args(HyperRep_log1(x)) + + +def test_sympy__functions__special__hyper__HyperRep_atanh(): + from sympy.functions.special.hyper import HyperRep_atanh + assert _test_args(HyperRep_atanh(x)) + + +def test_sympy__functions__special__hyper__HyperRep_asin1(): + from sympy.functions.special.hyper import HyperRep_asin1 + assert _test_args(HyperRep_asin1(x)) + + +def test_sympy__functions__special__hyper__HyperRep_asin2(): + from sympy.functions.special.hyper import HyperRep_asin2 + assert _test_args(HyperRep_asin2(x)) + + +def test_sympy__functions__special__hyper__HyperRep_sqrts1(): + from sympy.functions.special.hyper import HyperRep_sqrts1 + assert _test_args(HyperRep_sqrts1(x, y)) + + +def test_sympy__functions__special__hyper__HyperRep_sqrts2(): + from sympy.functions.special.hyper import HyperRep_sqrts2 + assert _test_args(HyperRep_sqrts2(x, y)) + + +def test_sympy__functions__special__hyper__HyperRep_log2(): + from sympy.functions.special.hyper import HyperRep_log2 + assert _test_args(HyperRep_log2(x)) + + +def test_sympy__functions__special__hyper__HyperRep_cosasin(): + from sympy.functions.special.hyper import HyperRep_cosasin + assert _test_args(HyperRep_cosasin(x, y)) + + +def test_sympy__functions__special__hyper__HyperRep_sinasin(): + from sympy.functions.special.hyper import HyperRep_sinasin + assert _test_args(HyperRep_sinasin(x, y)) + +def test_sympy__functions__special__hyper__appellf1(): + from sympy.functions.special.hyper import appellf1 + a, b1, b2, c, x, y = symbols('a b1 b2 c x y') + assert _test_args(appellf1(a, b1, b2, c, x, y)) + +@SKIP("abstract class") +def test_sympy__functions__special__polynomials__OrthogonalPolynomial(): + pass + + +def test_sympy__functions__special__polynomials__jacobi(): + from sympy.functions.special.polynomials import jacobi + assert _test_args(jacobi(x, y, 2, 2)) + + +def test_sympy__functions__special__polynomials__gegenbauer(): + from sympy.functions.special.polynomials import gegenbauer + assert _test_args(gegenbauer(x, 2, 2)) + + +def test_sympy__functions__special__polynomials__chebyshevt(): + from sympy.functions.special.polynomials import chebyshevt + assert _test_args(chebyshevt(x, 2)) + + +def test_sympy__functions__special__polynomials__chebyshevt_root(): + from sympy.functions.special.polynomials import chebyshevt_root + assert _test_args(chebyshevt_root(3, 2)) + + +def test_sympy__functions__special__polynomials__chebyshevu(): + from sympy.functions.special.polynomials import chebyshevu + assert _test_args(chebyshevu(x, 2)) + + +def test_sympy__functions__special__polynomials__chebyshevu_root(): + from sympy.functions.special.polynomials import chebyshevu_root + assert _test_args(chebyshevu_root(3, 2)) + + +def test_sympy__functions__special__polynomials__hermite(): + from sympy.functions.special.polynomials import hermite + assert _test_args(hermite(x, 2)) + + +def test_sympy__functions__special__polynomials__hermite_prob(): + from sympy.functions.special.polynomials import hermite_prob + assert _test_args(hermite_prob(x, 2)) + + +def test_sympy__functions__special__polynomials__legendre(): + from sympy.functions.special.polynomials import legendre + assert _test_args(legendre(x, 2)) + + +def test_sympy__functions__special__polynomials__assoc_legendre(): + from sympy.functions.special.polynomials import assoc_legendre + assert _test_args(assoc_legendre(x, 0, y)) + + +def test_sympy__functions__special__polynomials__laguerre(): + from sympy.functions.special.polynomials import laguerre + assert _test_args(laguerre(x, 2)) + + +def test_sympy__functions__special__polynomials__assoc_laguerre(): + from sympy.functions.special.polynomials import assoc_laguerre + assert _test_args(assoc_laguerre(x, 0, y)) + + +def test_sympy__functions__special__spherical_harmonics__Ynm(): + from sympy.functions.special.spherical_harmonics import Ynm + assert _test_args(Ynm(1, 1, x, y)) + + +def test_sympy__functions__special__spherical_harmonics__Znm(): + from sympy.functions.special.spherical_harmonics import Znm + assert _test_args(Znm(x, y, 1, 1)) + + +def test_sympy__functions__special__tensor_functions__LeviCivita(): + from sympy.functions.special.tensor_functions import LeviCivita + assert _test_args(LeviCivita(x, y, 2)) + + +def test_sympy__functions__special__tensor_functions__KroneckerDelta(): + from sympy.functions.special.tensor_functions import KroneckerDelta + assert _test_args(KroneckerDelta(x, y)) + + +def test_sympy__functions__special__zeta_functions__dirichlet_eta(): + from sympy.functions.special.zeta_functions import dirichlet_eta + assert _test_args(dirichlet_eta(x)) + + +def test_sympy__functions__special__zeta_functions__riemann_xi(): + from sympy.functions.special.zeta_functions import riemann_xi + assert _test_args(riemann_xi(x)) + + +def test_sympy__functions__special__zeta_functions__zeta(): + from sympy.functions.special.zeta_functions import zeta + assert _test_args(zeta(101)) + + +def test_sympy__functions__special__zeta_functions__lerchphi(): + from sympy.functions.special.zeta_functions import lerchphi + assert _test_args(lerchphi(x, y, z)) + + +def test_sympy__functions__special__zeta_functions__polylog(): + from sympy.functions.special.zeta_functions import polylog + assert _test_args(polylog(x, y)) + + +def test_sympy__functions__special__zeta_functions__stieltjes(): + from sympy.functions.special.zeta_functions import stieltjes + assert _test_args(stieltjes(x, y)) + + +def test_sympy__integrals__integrals__Integral(): + from sympy.integrals.integrals import Integral + assert _test_args(Integral(2, (x, 0, 1))) + + +def test_sympy__integrals__risch__NonElementaryIntegral(): + from sympy.integrals.risch import NonElementaryIntegral + assert _test_args(NonElementaryIntegral(exp(-x**2), x)) + + +@SKIP("abstract class") +def test_sympy__integrals__transforms__IntegralTransform(): + pass + + +def test_sympy__integrals__transforms__MellinTransform(): + from sympy.integrals.transforms import MellinTransform + assert _test_args(MellinTransform(2, x, y)) + + +def test_sympy__integrals__transforms__InverseMellinTransform(): + from sympy.integrals.transforms import InverseMellinTransform + assert _test_args(InverseMellinTransform(2, x, y, 0, 1)) + + +def test_sympy__integrals__laplace__LaplaceTransform(): + from sympy.integrals.laplace import LaplaceTransform + assert _test_args(LaplaceTransform(2, x, y)) + + +def test_sympy__integrals__laplace__InverseLaplaceTransform(): + from sympy.integrals.laplace import InverseLaplaceTransform + assert _test_args(InverseLaplaceTransform(2, x, y, 0)) + + +@SKIP("abstract class") +def test_sympy__integrals__transforms__FourierTypeTransform(): + pass + + +def test_sympy__integrals__transforms__InverseFourierTransform(): + from sympy.integrals.transforms import InverseFourierTransform + assert _test_args(InverseFourierTransform(2, x, y)) + + +def test_sympy__integrals__transforms__FourierTransform(): + from sympy.integrals.transforms import FourierTransform + assert _test_args(FourierTransform(2, x, y)) + + +@SKIP("abstract class") +def test_sympy__integrals__transforms__SineCosineTypeTransform(): + pass + + +def test_sympy__integrals__transforms__InverseSineTransform(): + from sympy.integrals.transforms import InverseSineTransform + assert _test_args(InverseSineTransform(2, x, y)) + + +def test_sympy__integrals__transforms__SineTransform(): + from sympy.integrals.transforms import SineTransform + assert _test_args(SineTransform(2, x, y)) + + +def test_sympy__integrals__transforms__InverseCosineTransform(): + from sympy.integrals.transforms import InverseCosineTransform + assert _test_args(InverseCosineTransform(2, x, y)) + + +def test_sympy__integrals__transforms__CosineTransform(): + from sympy.integrals.transforms import CosineTransform + assert _test_args(CosineTransform(2, x, y)) + + +@SKIP("abstract class") +def test_sympy__integrals__transforms__HankelTypeTransform(): + pass + + +def test_sympy__integrals__transforms__InverseHankelTransform(): + from sympy.integrals.transforms import InverseHankelTransform + assert _test_args(InverseHankelTransform(2, x, y, 0)) + + +def test_sympy__integrals__transforms__HankelTransform(): + from sympy.integrals.transforms import HankelTransform + assert _test_args(HankelTransform(2, x, y, 0)) + + +def test_sympy__liealgebras__cartan_type__Standard_Cartan(): + from sympy.liealgebras.cartan_type import Standard_Cartan + assert _test_args(Standard_Cartan("A", 2)) + +def test_sympy__liealgebras__weyl_group__WeylGroup(): + from sympy.liealgebras.weyl_group import WeylGroup + assert _test_args(WeylGroup("B4")) + +def test_sympy__liealgebras__root_system__RootSystem(): + from sympy.liealgebras.root_system import RootSystem + assert _test_args(RootSystem("A2")) + +def test_sympy__liealgebras__type_a__TypeA(): + from sympy.liealgebras.type_a import TypeA + assert _test_args(TypeA(2)) + +def test_sympy__liealgebras__type_b__TypeB(): + from sympy.liealgebras.type_b import TypeB + assert _test_args(TypeB(4)) + +def test_sympy__liealgebras__type_c__TypeC(): + from sympy.liealgebras.type_c import TypeC + assert _test_args(TypeC(4)) + +def test_sympy__liealgebras__type_d__TypeD(): + from sympy.liealgebras.type_d import TypeD + assert _test_args(TypeD(4)) + +def test_sympy__liealgebras__type_e__TypeE(): + from sympy.liealgebras.type_e import TypeE + assert _test_args(TypeE(6)) + +def test_sympy__liealgebras__type_f__TypeF(): + from sympy.liealgebras.type_f import TypeF + assert _test_args(TypeF(4)) + +def test_sympy__liealgebras__type_g__TypeG(): + from sympy.liealgebras.type_g import TypeG + assert _test_args(TypeG(2)) + + +def test_sympy__logic__boolalg__And(): + from sympy.logic.boolalg import And + assert _test_args(And(x, y, 1)) + + +@SKIP("abstract class") +def test_sympy__logic__boolalg__Boolean(): + pass + + +def test_sympy__logic__boolalg__BooleanFunction(): + from sympy.logic.boolalg import BooleanFunction + assert _test_args(BooleanFunction(1, 2, 3)) + +@SKIP("abstract class") +def test_sympy__logic__boolalg__BooleanAtom(): + pass + +def test_sympy__logic__boolalg__BooleanTrue(): + from sympy.logic.boolalg import true + assert _test_args(true) + +def test_sympy__logic__boolalg__BooleanFalse(): + from sympy.logic.boolalg import false + assert _test_args(false) + +def test_sympy__logic__boolalg__Equivalent(): + from sympy.logic.boolalg import Equivalent + assert _test_args(Equivalent(x, 2)) + + +def test_sympy__logic__boolalg__ITE(): + from sympy.logic.boolalg import ITE + assert _test_args(ITE(x, y, 1)) + + +def test_sympy__logic__boolalg__Implies(): + from sympy.logic.boolalg import Implies + assert _test_args(Implies(x, y)) + + +def test_sympy__logic__boolalg__Nand(): + from sympy.logic.boolalg import Nand + assert _test_args(Nand(x, y, 1)) + + +def test_sympy__logic__boolalg__Nor(): + from sympy.logic.boolalg import Nor + assert _test_args(Nor(x, y)) + + +def test_sympy__logic__boolalg__Not(): + from sympy.logic.boolalg import Not + assert _test_args(Not(x)) + + +def test_sympy__logic__boolalg__Or(): + from sympy.logic.boolalg import Or + assert _test_args(Or(x, y)) + + +def test_sympy__logic__boolalg__Xor(): + from sympy.logic.boolalg import Xor + assert _test_args(Xor(x, y, 2)) + +def test_sympy__logic__boolalg__Xnor(): + from sympy.logic.boolalg import Xnor + assert _test_args(Xnor(x, y, 2)) + +def test_sympy__logic__boolalg__Exclusive(): + from sympy.logic.boolalg import Exclusive + assert _test_args(Exclusive(x, y, z)) + + +def test_sympy__matrices__matrixbase__DeferredVector(): + from sympy.matrices.matrixbase import DeferredVector + assert _test_args(DeferredVector("X")) + + +@SKIP("abstract class") +def test_sympy__matrices__expressions__matexpr__MatrixBase(): + pass + + +@SKIP("abstract class") +def test_sympy__matrices__immutable__ImmutableRepMatrix(): + pass + + +def test_sympy__matrices__immutable__ImmutableDenseMatrix(): + from sympy.matrices.immutable import ImmutableDenseMatrix + m = ImmutableDenseMatrix([[1, 2], [3, 4]]) + assert _test_args(m) + assert _test_args(Basic(*list(m))) + m = ImmutableDenseMatrix(1, 1, [1]) + assert _test_args(m) + assert _test_args(Basic(*list(m))) + m = ImmutableDenseMatrix(2, 2, lambda i, j: 1) + assert m[0, 0] is S.One + m = ImmutableDenseMatrix(2, 2, lambda i, j: 1/(1 + i) + 1/(1 + j)) + assert m[1, 1] is S.One # true div. will give 1.0 if i,j not sympified + assert _test_args(m) + assert _test_args(Basic(*list(m))) + + +def test_sympy__matrices__immutable__ImmutableSparseMatrix(): + from sympy.matrices.immutable import ImmutableSparseMatrix + m = ImmutableSparseMatrix([[1, 2], [3, 4]]) + assert _test_args(m) + assert _test_args(Basic(*list(m))) + m = ImmutableSparseMatrix(1, 1, {(0, 0): 1}) + assert _test_args(m) + assert _test_args(Basic(*list(m))) + m = ImmutableSparseMatrix(1, 1, [1]) + assert _test_args(m) + assert _test_args(Basic(*list(m))) + m = ImmutableSparseMatrix(2, 2, lambda i, j: 1) + assert m[0, 0] is S.One + m = ImmutableSparseMatrix(2, 2, lambda i, j: 1/(1 + i) + 1/(1 + j)) + assert m[1, 1] is S.One # true div. will give 1.0 if i,j not sympified + assert _test_args(m) + assert _test_args(Basic(*list(m))) + + +def test_sympy__matrices__expressions__slice__MatrixSlice(): + from sympy.matrices.expressions.slice import MatrixSlice + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('X', 4, 4) + assert _test_args(MatrixSlice(X, (0, 2), (0, 2))) + + +def test_sympy__matrices__expressions__applyfunc__ElementwiseApplyFunction(): + from sympy.matrices.expressions.applyfunc import ElementwiseApplyFunction + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol("X", x, x) + func = Lambda(x, x**2) + assert _test_args(ElementwiseApplyFunction(func, X)) + + +def test_sympy__matrices__expressions__blockmatrix__BlockDiagMatrix(): + from sympy.matrices.expressions.blockmatrix import BlockDiagMatrix + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('X', x, x) + Y = MatrixSymbol('Y', y, y) + assert _test_args(BlockDiagMatrix(X, Y)) + + +def test_sympy__matrices__expressions__blockmatrix__BlockMatrix(): + from sympy.matrices.expressions.blockmatrix import BlockMatrix + from sympy.matrices.expressions import MatrixSymbol, ZeroMatrix + X = MatrixSymbol('X', x, x) + Y = MatrixSymbol('Y', y, y) + Z = MatrixSymbol('Z', x, y) + O = ZeroMatrix(y, x) + assert _test_args(BlockMatrix([[X, Z], [O, Y]])) + + +def test_sympy__matrices__expressions__inverse__Inverse(): + from sympy.matrices.expressions.inverse import Inverse + from sympy.matrices.expressions import MatrixSymbol + assert _test_args(Inverse(MatrixSymbol('A', 3, 3))) + + +def test_sympy__matrices__expressions__matadd__MatAdd(): + from sympy.matrices.expressions.matadd import MatAdd + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('X', x, y) + Y = MatrixSymbol('Y', x, y) + assert _test_args(MatAdd(X, Y)) + + +@SKIP("abstract class") +def test_sympy__matrices__expressions__matexpr__MatrixExpr(): + pass + +def test_sympy__matrices__expressions__matexpr__MatrixElement(): + from sympy.matrices.expressions.matexpr import MatrixSymbol, MatrixElement + from sympy.core.singleton import S + assert _test_args(MatrixElement(MatrixSymbol('A', 3, 5), S(2), S(3))) + +def test_sympy__matrices__expressions__matexpr__MatrixSymbol(): + from sympy.matrices.expressions.matexpr import MatrixSymbol + assert _test_args(MatrixSymbol('A', 3, 5)) + + +def test_sympy__matrices__expressions__special__OneMatrix(): + from sympy.matrices.expressions.special import OneMatrix + assert _test_args(OneMatrix(3, 5)) + + +def test_sympy__matrices__expressions__special__ZeroMatrix(): + from sympy.matrices.expressions.special import ZeroMatrix + assert _test_args(ZeroMatrix(3, 5)) + + +def test_sympy__matrices__expressions__special__GenericZeroMatrix(): + from sympy.matrices.expressions.special import GenericZeroMatrix + assert _test_args(GenericZeroMatrix()) + + +def test_sympy__matrices__expressions__special__Identity(): + from sympy.matrices.expressions.special import Identity + assert _test_args(Identity(3)) + + +def test_sympy__matrices__expressions__special__GenericIdentity(): + from sympy.matrices.expressions.special import GenericIdentity + assert _test_args(GenericIdentity()) + + +def test_sympy__matrices__expressions__sets__MatrixSet(): + from sympy.matrices.expressions.sets import MatrixSet + from sympy.core.singleton import S + assert _test_args(MatrixSet(2, 2, S.Reals)) + +def test_sympy__matrices__expressions__matmul__MatMul(): + from sympy.matrices.expressions.matmul import MatMul + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('X', x, y) + Y = MatrixSymbol('Y', y, x) + assert _test_args(MatMul(X, Y)) + + +def test_sympy__matrices__expressions__dotproduct__DotProduct(): + from sympy.matrices.expressions.dotproduct import DotProduct + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('X', x, 1) + Y = MatrixSymbol('Y', x, 1) + assert _test_args(DotProduct(X, Y)) + +def test_sympy__matrices__expressions__diagonal__DiagonalMatrix(): + from sympy.matrices.expressions.diagonal import DiagonalMatrix + from sympy.matrices.expressions import MatrixSymbol + x = MatrixSymbol('x', 10, 1) + assert _test_args(DiagonalMatrix(x)) + +def test_sympy__matrices__expressions__diagonal__DiagonalOf(): + from sympy.matrices.expressions.diagonal import DiagonalOf + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('x', 10, 10) + assert _test_args(DiagonalOf(X)) + +def test_sympy__matrices__expressions__diagonal__DiagMatrix(): + from sympy.matrices.expressions.diagonal import DiagMatrix + from sympy.matrices.expressions import MatrixSymbol + x = MatrixSymbol('x', 10, 1) + assert _test_args(DiagMatrix(x)) + +def test_sympy__matrices__expressions__hadamard__HadamardProduct(): + from sympy.matrices.expressions.hadamard import HadamardProduct + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('X', x, y) + Y = MatrixSymbol('Y', x, y) + assert _test_args(HadamardProduct(X, Y)) + +def test_sympy__matrices__expressions__hadamard__HadamardPower(): + from sympy.matrices.expressions.hadamard import HadamardPower + from sympy.matrices.expressions import MatrixSymbol + from sympy.core.symbol import Symbol + X = MatrixSymbol('X', x, y) + n = Symbol("n") + assert _test_args(HadamardPower(X, n)) + +def test_sympy__matrices__expressions__kronecker__KroneckerProduct(): + from sympy.matrices.expressions.kronecker import KroneckerProduct + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('X', x, y) + Y = MatrixSymbol('Y', x, y) + assert _test_args(KroneckerProduct(X, Y)) + + +def test_sympy__matrices__expressions__matpow__MatPow(): + from sympy.matrices.expressions.matpow import MatPow + from sympy.matrices.expressions import MatrixSymbol + X = MatrixSymbol('X', x, x) + assert _test_args(MatPow(X, 2)) + + +def test_sympy__matrices__expressions__transpose__Transpose(): + from sympy.matrices.expressions.transpose import Transpose + from sympy.matrices.expressions import MatrixSymbol + assert _test_args(Transpose(MatrixSymbol('A', 3, 5))) + + +def test_sympy__matrices__expressions__adjoint__Adjoint(): + from sympy.matrices.expressions.adjoint import Adjoint + from sympy.matrices.expressions import MatrixSymbol + assert _test_args(Adjoint(MatrixSymbol('A', 3, 5))) + + +def test_sympy__matrices__expressions__trace__Trace(): + from sympy.matrices.expressions.trace import Trace + from sympy.matrices.expressions import MatrixSymbol + assert _test_args(Trace(MatrixSymbol('A', 3, 3))) + +def test_sympy__matrices__expressions__determinant__Determinant(): + from sympy.matrices.expressions.determinant import Determinant + from sympy.matrices.expressions import MatrixSymbol + assert _test_args(Determinant(MatrixSymbol('A', 3, 3))) + +def test_sympy__matrices__expressions__determinant__Permanent(): + from sympy.matrices.expressions.determinant import Permanent + from sympy.matrices.expressions import MatrixSymbol + assert _test_args(Permanent(MatrixSymbol('A', 3, 4))) + +def test_sympy__matrices__expressions__funcmatrix__FunctionMatrix(): + from sympy.matrices.expressions.funcmatrix import FunctionMatrix + from sympy.core.symbol import symbols + i, j = symbols('i,j') + assert _test_args(FunctionMatrix(3, 3, Lambda((i, j), i - j) )) + +def test_sympy__matrices__expressions__fourier__DFT(): + from sympy.matrices.expressions.fourier import DFT + from sympy.core.singleton import S + assert _test_args(DFT(S(2))) + +def test_sympy__matrices__expressions__fourier__IDFT(): + from sympy.matrices.expressions.fourier import IDFT + from sympy.core.singleton import S + assert _test_args(IDFT(S(2))) + +from sympy.matrices.expressions import MatrixSymbol +X = MatrixSymbol('X', 10, 10) + +def test_sympy__matrices__expressions__factorizations__LofLU(): + from sympy.matrices.expressions.factorizations import LofLU + assert _test_args(LofLU(X)) + +def test_sympy__matrices__expressions__factorizations__UofLU(): + from sympy.matrices.expressions.factorizations import UofLU + assert _test_args(UofLU(X)) + +def test_sympy__matrices__expressions__factorizations__QofQR(): + from sympy.matrices.expressions.factorizations import QofQR + assert _test_args(QofQR(X)) + +def test_sympy__matrices__expressions__factorizations__RofQR(): + from sympy.matrices.expressions.factorizations import RofQR + assert _test_args(RofQR(X)) + +def test_sympy__matrices__expressions__factorizations__LofCholesky(): + from sympy.matrices.expressions.factorizations import LofCholesky + assert _test_args(LofCholesky(X)) + +def test_sympy__matrices__expressions__factorizations__UofCholesky(): + from sympy.matrices.expressions.factorizations import UofCholesky + assert _test_args(UofCholesky(X)) + +def test_sympy__matrices__expressions__factorizations__EigenVectors(): + from sympy.matrices.expressions.factorizations import EigenVectors + assert _test_args(EigenVectors(X)) + +def test_sympy__matrices__expressions__factorizations__EigenValues(): + from sympy.matrices.expressions.factorizations import EigenValues + assert _test_args(EigenValues(X)) + +def test_sympy__matrices__expressions__factorizations__UofSVD(): + from sympy.matrices.expressions.factorizations import UofSVD + assert _test_args(UofSVD(X)) + +def test_sympy__matrices__expressions__factorizations__VofSVD(): + from sympy.matrices.expressions.factorizations import VofSVD + assert _test_args(VofSVD(X)) + +def test_sympy__matrices__expressions__factorizations__SofSVD(): + from sympy.matrices.expressions.factorizations import SofSVD + assert _test_args(SofSVD(X)) + +@SKIP("abstract class") +def test_sympy__matrices__expressions__factorizations__Factorization(): + pass + +def test_sympy__matrices__expressions__permutation__PermutationMatrix(): + from sympy.combinatorics import Permutation + from sympy.matrices.expressions.permutation import PermutationMatrix + assert _test_args(PermutationMatrix(Permutation([2, 0, 1]))) + +def test_sympy__matrices__expressions__permutation__MatrixPermute(): + from sympy.combinatorics import Permutation + from sympy.matrices.expressions.matexpr import MatrixSymbol + from sympy.matrices.expressions.permutation import MatrixPermute + A = MatrixSymbol('A', 3, 3) + assert _test_args(MatrixPermute(A, Permutation([2, 0, 1]))) + +def test_sympy__matrices__expressions__companion__CompanionMatrix(): + from sympy.core.symbol import Symbol + from sympy.matrices.expressions.companion import CompanionMatrix + from sympy.polys.polytools import Poly + + x = Symbol('x') + p = Poly([1, 2, 3], x) + assert _test_args(CompanionMatrix(p)) + +def test_sympy__physics__vector__frame__CoordinateSym(): + from sympy.physics.vector import CoordinateSym + from sympy.physics.vector import ReferenceFrame + assert _test_args(CoordinateSym('R_x', ReferenceFrame('R'), 0)) + + +@SKIP("abstract class") +def test_sympy__physics__biomechanics__curve__CharacteristicCurveFunction(): + pass + + +def test_sympy__physics__biomechanics__curve__TendonForceLengthDeGroote2016(): + from sympy.physics.biomechanics import TendonForceLengthDeGroote2016 + l_T_tilde, c0, c1, c2, c3 = symbols('l_T_tilde, c0, c1, c2, c3') + assert _test_args(TendonForceLengthDeGroote2016(l_T_tilde, c0, c1, c2, c3)) + + +def test_sympy__physics__biomechanics__curve__TendonForceLengthInverseDeGroote2016(): + from sympy.physics.biomechanics import TendonForceLengthInverseDeGroote2016 + fl_T, c0, c1, c2, c3 = symbols('fl_T, c0, c1, c2, c3') + assert _test_args(TendonForceLengthInverseDeGroote2016(fl_T, c0, c1, c2, c3)) + + +def test_sympy__physics__biomechanics__curve__FiberForceLengthPassiveDeGroote2016(): + from sympy.physics.biomechanics import FiberForceLengthPassiveDeGroote2016 + l_M_tilde, c0, c1 = symbols('l_M_tilde, c0, c1') + assert _test_args(FiberForceLengthPassiveDeGroote2016(l_M_tilde, c0, c1)) + + +def test_sympy__physics__biomechanics__curve__FiberForceLengthPassiveInverseDeGroote2016(): + from sympy.physics.biomechanics import FiberForceLengthPassiveInverseDeGroote2016 + fl_M_pas, c0, c1 = symbols('fl_M_pas, c0, c1') + assert _test_args(FiberForceLengthPassiveInverseDeGroote2016(fl_M_pas, c0, c1)) + + +def test_sympy__physics__biomechanics__curve__FiberForceLengthActiveDeGroote2016(): + from sympy.physics.biomechanics import FiberForceLengthActiveDeGroote2016 + l_M_tilde, c0, c1, c2, c3, c4, c5, c6, c7, c8, c9, c10, c11 = symbols('l_M_tilde, c0:12') + assert _test_args(FiberForceLengthActiveDeGroote2016(l_M_tilde, c0, c1, c2, c3, c4, c5, c6, c7, c8, c9, c10, c11)) + + +def test_sympy__physics__biomechanics__curve__FiberForceVelocityDeGroote2016(): + from sympy.physics.biomechanics import FiberForceVelocityDeGroote2016 + v_M_tilde, c0, c1, c2, c3 = symbols('v_M_tilde, c0, c1, c2, c3') + assert _test_args(FiberForceVelocityDeGroote2016(v_M_tilde, c0, c1, c2, c3)) + + +def test_sympy__physics__biomechanics__curve__FiberForceVelocityInverseDeGroote2016(): + from sympy.physics.biomechanics import FiberForceVelocityInverseDeGroote2016 + fv_M, c0, c1, c2, c3 = symbols('fv_M, c0, c1, c2, c3') + assert _test_args(FiberForceVelocityInverseDeGroote2016(fv_M, c0, c1, c2, c3)) + + +def test_sympy__physics__paulialgebra__Pauli(): + from sympy.physics.paulialgebra import Pauli + assert _test_args(Pauli(1)) + + +def test_sympy__physics__quantum__anticommutator__AntiCommutator(): + from sympy.physics.quantum.anticommutator import AntiCommutator + assert _test_args(AntiCommutator(x, y)) + + +def test_sympy__physics__quantum__cartesian__PositionBra3D(): + from sympy.physics.quantum.cartesian import PositionBra3D + assert _test_args(PositionBra3D(x, y, z)) + + +def test_sympy__physics__quantum__cartesian__PositionKet3D(): + from sympy.physics.quantum.cartesian import PositionKet3D + assert _test_args(PositionKet3D(x, y, z)) + + +def test_sympy__physics__quantum__cartesian__PositionState3D(): + from sympy.physics.quantum.cartesian import PositionState3D + assert _test_args(PositionState3D(x, y, z)) + + +def test_sympy__physics__quantum__cartesian__PxBra(): + from sympy.physics.quantum.cartesian import PxBra + assert _test_args(PxBra(x, y, z)) + + +def test_sympy__physics__quantum__cartesian__PxKet(): + from sympy.physics.quantum.cartesian import PxKet + assert _test_args(PxKet(x, y, z)) + + +def test_sympy__physics__quantum__cartesian__PxOp(): + from sympy.physics.quantum.cartesian import PxOp + assert _test_args(PxOp(x, y, z)) + + +def test_sympy__physics__quantum__cartesian__XBra(): + from sympy.physics.quantum.cartesian import XBra + assert _test_args(XBra(x)) + + +def test_sympy__physics__quantum__cartesian__XKet(): + from sympy.physics.quantum.cartesian import XKet + assert _test_args(XKet(x)) + + +def test_sympy__physics__quantum__cartesian__XOp(): + from sympy.physics.quantum.cartesian import XOp + assert _test_args(XOp(x)) + + +def test_sympy__physics__quantum__cartesian__YOp(): + from sympy.physics.quantum.cartesian import YOp + assert _test_args(YOp(x)) + + +def test_sympy__physics__quantum__cartesian__ZOp(): + from sympy.physics.quantum.cartesian import ZOp + assert _test_args(ZOp(x)) + + +def test_sympy__physics__quantum__cg__CG(): + from sympy.physics.quantum.cg import CG + from sympy.core.singleton import S + assert _test_args(CG(Rational(3, 2), Rational(3, 2), S.Half, Rational(-1, 2), 1, 1)) + + +def test_sympy__physics__quantum__cg__Wigner3j(): + from sympy.physics.quantum.cg import Wigner3j + assert _test_args(Wigner3j(6, 0, 4, 0, 2, 0)) + + +def test_sympy__physics__quantum__cg__Wigner6j(): + from sympy.physics.quantum.cg import Wigner6j + assert _test_args(Wigner6j(1, 2, 3, 2, 1, 2)) + + +def test_sympy__physics__quantum__cg__Wigner9j(): + from sympy.physics.quantum.cg import Wigner9j + assert _test_args(Wigner9j(2, 1, 1, Rational(3, 2), S.Half, 1, S.Half, S.Half, 0)) + +def test_sympy__physics__quantum__circuitplot__Mz(): + from sympy.physics.quantum.circuitplot import Mz + assert _test_args(Mz(0)) + +def test_sympy__physics__quantum__circuitplot__Mx(): + from sympy.physics.quantum.circuitplot import Mx + assert _test_args(Mx(0)) + +def test_sympy__physics__quantum__commutator__Commutator(): + from sympy.physics.quantum.commutator import Commutator + A, B = symbols('A,B', commutative=False) + assert _test_args(Commutator(A, B)) + + +def test_sympy__physics__quantum__constants__HBar(): + from sympy.physics.quantum.constants import HBar + assert _test_args(HBar()) + + +def test_sympy__physics__quantum__dagger__Dagger(): + from sympy.physics.quantum.dagger import Dagger + from sympy.physics.quantum.state import Ket + assert _test_args(Dagger(Dagger(Ket('psi')))) + + +def test_sympy__physics__quantum__gate__CGate(): + from sympy.physics.quantum.gate import CGate, Gate + assert _test_args(CGate((0, 1), Gate(2))) + + +def test_sympy__physics__quantum__gate__CGateS(): + from sympy.physics.quantum.gate import CGateS, Gate + assert _test_args(CGateS((0, 1), Gate(2))) + + +def test_sympy__physics__quantum__gate__CNotGate(): + from sympy.physics.quantum.gate import CNotGate + assert _test_args(CNotGate(0, 1)) + + +def test_sympy__physics__quantum__gate__Gate(): + from sympy.physics.quantum.gate import Gate + assert _test_args(Gate(0)) + + +def test_sympy__physics__quantum__gate__HadamardGate(): + from sympy.physics.quantum.gate import HadamardGate + assert _test_args(HadamardGate(0)) + + +def test_sympy__physics__quantum__gate__IdentityGate(): + from sympy.physics.quantum.gate import IdentityGate + assert _test_args(IdentityGate(0)) + + +def test_sympy__physics__quantum__gate__OneQubitGate(): + from sympy.physics.quantum.gate import OneQubitGate + assert _test_args(OneQubitGate(0)) + + +def test_sympy__physics__quantum__gate__PhaseGate(): + from sympy.physics.quantum.gate import PhaseGate + assert _test_args(PhaseGate(0)) + + +def test_sympy__physics__quantum__gate__SwapGate(): + from sympy.physics.quantum.gate import SwapGate + assert _test_args(SwapGate(0, 1)) + + +def test_sympy__physics__quantum__gate__TGate(): + from sympy.physics.quantum.gate import TGate + assert _test_args(TGate(0)) + + +def test_sympy__physics__quantum__gate__TwoQubitGate(): + from sympy.physics.quantum.gate import TwoQubitGate + assert _test_args(TwoQubitGate(0)) + + +def test_sympy__physics__quantum__gate__UGate(): + from sympy.physics.quantum.gate import UGate + from sympy.matrices.immutable import ImmutableDenseMatrix + from sympy.core.containers import Tuple + from sympy.core.numbers import Integer + assert _test_args( + UGate(Tuple(Integer(1)), ImmutableDenseMatrix([[1, 0], [0, 2]]))) + + +def test_sympy__physics__quantum__gate__XGate(): + from sympy.physics.quantum.gate import XGate + assert _test_args(XGate(0)) + + +def test_sympy__physics__quantum__gate__YGate(): + from sympy.physics.quantum.gate import YGate + assert _test_args(YGate(0)) + + +def test_sympy__physics__quantum__gate__ZGate(): + from sympy.physics.quantum.gate import ZGate + assert _test_args(ZGate(0)) + + +def test_sympy__physics__quantum__grover__OracleGateFunction(): + from sympy.physics.quantum.grover import OracleGateFunction + @OracleGateFunction + def f(qubit): + return + assert _test_args(f) + +def test_sympy__physics__quantum__grover__OracleGate(): + from sympy.physics.quantum.grover import OracleGate + def f(qubit): + return + assert _test_args(OracleGate(1,f)) + + +def test_sympy__physics__quantum__grover__WGate(): + from sympy.physics.quantum.grover import WGate + assert _test_args(WGate(1)) + + +def test_sympy__physics__quantum__hilbert__ComplexSpace(): + from sympy.physics.quantum.hilbert import ComplexSpace + assert _test_args(ComplexSpace(x)) + + +def test_sympy__physics__quantum__hilbert__DirectSumHilbertSpace(): + from sympy.physics.quantum.hilbert import DirectSumHilbertSpace, ComplexSpace, FockSpace + c = ComplexSpace(2) + f = FockSpace() + assert _test_args(DirectSumHilbertSpace(c, f)) + + +def test_sympy__physics__quantum__hilbert__FockSpace(): + from sympy.physics.quantum.hilbert import FockSpace + assert _test_args(FockSpace()) + + +def test_sympy__physics__quantum__hilbert__HilbertSpace(): + from sympy.physics.quantum.hilbert import HilbertSpace + assert _test_args(HilbertSpace()) + + +def test_sympy__physics__quantum__hilbert__L2(): + from sympy.physics.quantum.hilbert import L2 + from sympy.core.numbers import oo + from sympy.sets.sets import Interval + assert _test_args(L2(Interval(0, oo))) + + +def test_sympy__physics__quantum__hilbert__TensorPowerHilbertSpace(): + from sympy.physics.quantum.hilbert import TensorPowerHilbertSpace, FockSpace + f = FockSpace() + assert _test_args(TensorPowerHilbertSpace(f, 2)) + + +def test_sympy__physics__quantum__hilbert__TensorProductHilbertSpace(): + from sympy.physics.quantum.hilbert import TensorProductHilbertSpace, FockSpace, ComplexSpace + c = ComplexSpace(2) + f = FockSpace() + assert _test_args(TensorProductHilbertSpace(f, c)) + + +def test_sympy__physics__quantum__innerproduct__InnerProduct(): + from sympy.physics.quantum import Bra, Ket, InnerProduct + b = Bra('b') + k = Ket('k') + assert _test_args(InnerProduct(b, k)) + + +def test_sympy__physics__quantum__operator__DifferentialOperator(): + from sympy.physics.quantum.operator import DifferentialOperator + from sympy.core.function import (Derivative, Function) + f = Function('f') + assert _test_args(DifferentialOperator(1/x*Derivative(f(x), x), f(x))) + + +def test_sympy__physics__quantum__operator__HermitianOperator(): + from sympy.physics.quantum.operator import HermitianOperator + assert _test_args(HermitianOperator('H')) + + +def test_sympy__physics__quantum__operator__IdentityOperator(): + with warns_deprecated_sympy(): + from sympy.physics.quantum.operator import IdentityOperator + assert _test_args(IdentityOperator(5)) + + +def test_sympy__physics__quantum__operator__Operator(): + from sympy.physics.quantum.operator import Operator + assert _test_args(Operator('A')) + + +def test_sympy__physics__quantum__operator__OuterProduct(): + from sympy.physics.quantum.operator import OuterProduct + from sympy.physics.quantum import Ket, Bra + b = Bra('b') + k = Ket('k') + assert _test_args(OuterProduct(k, b)) + + +def test_sympy__physics__quantum__operator__UnitaryOperator(): + from sympy.physics.quantum.operator import UnitaryOperator + assert _test_args(UnitaryOperator('U')) + + +def test_sympy__physics__quantum__piab__PIABBra(): + from sympy.physics.quantum.piab import PIABBra + assert _test_args(PIABBra('B')) + + +def test_sympy__physics__quantum__boson__BosonOp(): + from sympy.physics.quantum.boson import BosonOp + assert _test_args(BosonOp('a')) + assert _test_args(BosonOp('a', False)) + + +def test_sympy__physics__quantum__boson__BosonFockKet(): + from sympy.physics.quantum.boson import BosonFockKet + assert _test_args(BosonFockKet(1)) + + +def test_sympy__physics__quantum__boson__BosonFockBra(): + from sympy.physics.quantum.boson import BosonFockBra + assert _test_args(BosonFockBra(1)) + + +def test_sympy__physics__quantum__boson__BosonCoherentKet(): + from sympy.physics.quantum.boson import BosonCoherentKet + assert _test_args(BosonCoherentKet(1)) + + +def test_sympy__physics__quantum__boson__BosonCoherentBra(): + from sympy.physics.quantum.boson import BosonCoherentBra + assert _test_args(BosonCoherentBra(1)) + + +def test_sympy__physics__quantum__fermion__FermionOp(): + from sympy.physics.quantum.fermion import FermionOp + assert _test_args(FermionOp('c')) + assert _test_args(FermionOp('c', False)) + + +def test_sympy__physics__quantum__fermion__FermionFockKet(): + from sympy.physics.quantum.fermion import FermionFockKet + assert _test_args(FermionFockKet(1)) + + +def test_sympy__physics__quantum__fermion__FermionFockBra(): + from sympy.physics.quantum.fermion import FermionFockBra + assert _test_args(FermionFockBra(1)) + + +def test_sympy__physics__quantum__pauli__SigmaOpBase(): + from sympy.physics.quantum.pauli import SigmaOpBase + assert _test_args(SigmaOpBase()) + + +def test_sympy__physics__quantum__pauli__SigmaX(): + from sympy.physics.quantum.pauli import SigmaX + assert _test_args(SigmaX()) + + +def test_sympy__physics__quantum__pauli__SigmaY(): + from sympy.physics.quantum.pauli import SigmaY + assert _test_args(SigmaY()) + + +def test_sympy__physics__quantum__pauli__SigmaZ(): + from sympy.physics.quantum.pauli import SigmaZ + assert _test_args(SigmaZ()) + + +def test_sympy__physics__quantum__pauli__SigmaMinus(): + from sympy.physics.quantum.pauli import SigmaMinus + assert _test_args(SigmaMinus()) + + +def test_sympy__physics__quantum__pauli__SigmaPlus(): + from sympy.physics.quantum.pauli import SigmaPlus + assert _test_args(SigmaPlus()) + + +def test_sympy__physics__quantum__pauli__SigmaZKet(): + from sympy.physics.quantum.pauli import SigmaZKet + assert _test_args(SigmaZKet(0)) + + +def test_sympy__physics__quantum__pauli__SigmaZBra(): + from sympy.physics.quantum.pauli import SigmaZBra + assert _test_args(SigmaZBra(0)) + + +def test_sympy__physics__quantum__piab__PIABHamiltonian(): + from sympy.physics.quantum.piab import PIABHamiltonian + assert _test_args(PIABHamiltonian('P')) + + +def test_sympy__physics__quantum__piab__PIABKet(): + from sympy.physics.quantum.piab import PIABKet + assert _test_args(PIABKet('K')) + + +def test_sympy__physics__quantum__qexpr__QExpr(): + from sympy.physics.quantum.qexpr import QExpr + assert _test_args(QExpr(0)) + + +def test_sympy__physics__quantum__qft__Fourier(): + from sympy.physics.quantum.qft import Fourier + assert _test_args(Fourier(0, 1)) + + +def test_sympy__physics__quantum__qft__IQFT(): + from sympy.physics.quantum.qft import IQFT + assert _test_args(IQFT(0, 1)) + + +def test_sympy__physics__quantum__qft__QFT(): + from sympy.physics.quantum.qft import QFT + assert _test_args(QFT(0, 1)) + + +def test_sympy__physics__quantum__qft__RkGate(): + from sympy.physics.quantum.qft import RkGate + assert _test_args(RkGate(0, 1)) + + +def test_sympy__physics__quantum__qubit__IntQubit(): + from sympy.physics.quantum.qubit import IntQubit + assert _test_args(IntQubit(0)) + + +def test_sympy__physics__quantum__qubit__IntQubitBra(): + from sympy.physics.quantum.qubit import IntQubitBra + assert _test_args(IntQubitBra(0)) + + +def test_sympy__physics__quantum__qubit__IntQubitState(): + from sympy.physics.quantum.qubit import IntQubitState, QubitState + assert _test_args(IntQubitState(QubitState(0, 1))) + + +def test_sympy__physics__quantum__qubit__Qubit(): + from sympy.physics.quantum.qubit import Qubit + assert _test_args(Qubit(0, 0, 0)) + + +def test_sympy__physics__quantum__qubit__QubitBra(): + from sympy.physics.quantum.qubit import QubitBra + assert _test_args(QubitBra('1', 0)) + + +def test_sympy__physics__quantum__qubit__QubitState(): + from sympy.physics.quantum.qubit import QubitState + assert _test_args(QubitState(0, 1)) + + +def test_sympy__physics__quantum__density__Density(): + from sympy.physics.quantum.density import Density + from sympy.physics.quantum.state import Ket + assert _test_args(Density([Ket(0), 0.5], [Ket(1), 0.5])) + + +@SKIP("TODO: sympy.physics.quantum.shor: Cmod Not Implemented") +def test_sympy__physics__quantum__shor__CMod(): + from sympy.physics.quantum.shor import CMod + assert _test_args(CMod()) + + +def test_sympy__physics__quantum__spin__CoupledSpinState(): + from sympy.physics.quantum.spin import CoupledSpinState + assert _test_args(CoupledSpinState(1, 0, (1, 1))) + assert _test_args(CoupledSpinState(1, 0, (1, S.Half, S.Half))) + assert _test_args(CoupledSpinState( + 1, 0, (1, S.Half, S.Half), ((2, 3, S.Half), (1, 2, 1)) )) + j, m, j1, j2, j3, j12, x = symbols('j m j1:4 j12 x') + assert CoupledSpinState( + j, m, (j1, j2, j3)).subs(j2, x) == CoupledSpinState(j, m, (j1, x, j3)) + assert CoupledSpinState(j, m, (j1, j2, j3), ((1, 3, j12), (1, 2, j)) ).subs(j12, x) == \ + CoupledSpinState(j, m, (j1, j2, j3), ((1, 3, x), (1, 2, j)) ) + + +def test_sympy__physics__quantum__spin__J2Op(): + from sympy.physics.quantum.spin import J2Op + assert _test_args(J2Op('J')) + + +def test_sympy__physics__quantum__spin__JminusOp(): + from sympy.physics.quantum.spin import JminusOp + assert _test_args(JminusOp('J')) + + +def test_sympy__physics__quantum__spin__JplusOp(): + from sympy.physics.quantum.spin import JplusOp + assert _test_args(JplusOp('J')) + + +def test_sympy__physics__quantum__spin__JxBra(): + from sympy.physics.quantum.spin import JxBra + assert _test_args(JxBra(1, 0)) + + +def test_sympy__physics__quantum__spin__JxBraCoupled(): + from sympy.physics.quantum.spin import JxBraCoupled + assert _test_args(JxBraCoupled(1, 0, (1, 1))) + + +def test_sympy__physics__quantum__spin__JxKet(): + from sympy.physics.quantum.spin import JxKet + assert _test_args(JxKet(1, 0)) + + +def test_sympy__physics__quantum__spin__JxKetCoupled(): + from sympy.physics.quantum.spin import JxKetCoupled + assert _test_args(JxKetCoupled(1, 0, (1, 1))) + + +def test_sympy__physics__quantum__spin__JxOp(): + from sympy.physics.quantum.spin import JxOp + assert _test_args(JxOp('J')) + + +def test_sympy__physics__quantum__spin__JyBra(): + from sympy.physics.quantum.spin import JyBra + assert _test_args(JyBra(1, 0)) + + +def test_sympy__physics__quantum__spin__JyBraCoupled(): + from sympy.physics.quantum.spin import JyBraCoupled + assert _test_args(JyBraCoupled(1, 0, (1, 1))) + + +def test_sympy__physics__quantum__spin__JyKet(): + from sympy.physics.quantum.spin import JyKet + assert _test_args(JyKet(1, 0)) + + +def test_sympy__physics__quantum__spin__JyKetCoupled(): + from sympy.physics.quantum.spin import JyKetCoupled + assert _test_args(JyKetCoupled(1, 0, (1, 1))) + + +def test_sympy__physics__quantum__spin__JyOp(): + from sympy.physics.quantum.spin import JyOp + assert _test_args(JyOp('J')) + + +def test_sympy__physics__quantum__spin__JzBra(): + from sympy.physics.quantum.spin import JzBra + assert _test_args(JzBra(1, 0)) + + +def test_sympy__physics__quantum__spin__JzBraCoupled(): + from sympy.physics.quantum.spin import JzBraCoupled + assert _test_args(JzBraCoupled(1, 0, (1, 1))) + + +def test_sympy__physics__quantum__spin__JzKet(): + from sympy.physics.quantum.spin import JzKet + assert _test_args(JzKet(1, 0)) + + +def test_sympy__physics__quantum__spin__JzKetCoupled(): + from sympy.physics.quantum.spin import JzKetCoupled + assert _test_args(JzKetCoupled(1, 0, (1, 1))) + + +def test_sympy__physics__quantum__spin__JzOp(): + from sympy.physics.quantum.spin import JzOp + assert _test_args(JzOp('J')) + + +def test_sympy__physics__quantum__spin__Rotation(): + from sympy.physics.quantum.spin import Rotation + assert _test_args(Rotation(pi, 0, pi/2)) + + +def test_sympy__physics__quantum__spin__SpinState(): + from sympy.physics.quantum.spin import SpinState + assert _test_args(SpinState(1, 0)) + + +def test_sympy__physics__quantum__spin__WignerD(): + from sympy.physics.quantum.spin import WignerD + assert _test_args(WignerD(0, 1, 2, 3, 4, 5)) + + +def test_sympy__physics__quantum__state__Bra(): + from sympy.physics.quantum.state import Bra + assert _test_args(Bra(0)) + + +def test_sympy__physics__quantum__state__BraBase(): + from sympy.physics.quantum.state import BraBase + assert _test_args(BraBase(0)) + + +def test_sympy__physics__quantum__state__Ket(): + from sympy.physics.quantum.state import Ket + assert _test_args(Ket(0)) + + +def test_sympy__physics__quantum__state__KetBase(): + from sympy.physics.quantum.state import KetBase + assert _test_args(KetBase(0)) + + +def test_sympy__physics__quantum__state__State(): + from sympy.physics.quantum.state import State + assert _test_args(State(0)) + + +def test_sympy__physics__quantum__state__StateBase(): + from sympy.physics.quantum.state import StateBase + assert _test_args(StateBase(0)) + + +def test_sympy__physics__quantum__state__OrthogonalBra(): + from sympy.physics.quantum.state import OrthogonalBra + assert _test_args(OrthogonalBra(0)) + + +def test_sympy__physics__quantum__state__OrthogonalKet(): + from sympy.physics.quantum.state import OrthogonalKet + assert _test_args(OrthogonalKet(0)) + + +def test_sympy__physics__quantum__state__OrthogonalState(): + from sympy.physics.quantum.state import OrthogonalState + assert _test_args(OrthogonalState(0)) + + +def test_sympy__physics__quantum__state__TimeDepBra(): + from sympy.physics.quantum.state import TimeDepBra + assert _test_args(TimeDepBra('psi', 't')) + + +def test_sympy__physics__quantum__state__TimeDepKet(): + from sympy.physics.quantum.state import TimeDepKet + assert _test_args(TimeDepKet('psi', 't')) + + +def test_sympy__physics__quantum__state__TimeDepState(): + from sympy.physics.quantum.state import TimeDepState + assert _test_args(TimeDepState('psi', 't')) + + +def test_sympy__physics__quantum__state__Wavefunction(): + from sympy.physics.quantum.state import Wavefunction + from sympy.functions import sin + from sympy.functions.elementary.piecewise import Piecewise + n = 1 + L = 1 + g = Piecewise((0, x < 0), (0, x > L), (sqrt(2//L)*sin(n*pi*x/L), True)) + assert _test_args(Wavefunction(g, x)) + + +def test_sympy__physics__quantum__tensorproduct__TensorProduct(): + from sympy.physics.quantum.tensorproduct import TensorProduct + x, y = symbols("x y", commutative=False) + assert _test_args(TensorProduct(x, y)) + + +def test_sympy__physics__quantum__identitysearch__GateIdentity(): + from sympy.physics.quantum.gate import X + from sympy.physics.quantum.identitysearch import GateIdentity + assert _test_args(GateIdentity(X(0), X(0))) + + +def test_sympy__physics__quantum__sho1d__SHOOp(): + from sympy.physics.quantum.sho1d import SHOOp + assert _test_args(SHOOp('a')) + + +def test_sympy__physics__quantum__sho1d__RaisingOp(): + from sympy.physics.quantum.sho1d import RaisingOp + assert _test_args(RaisingOp('a')) + + +def test_sympy__physics__quantum__sho1d__LoweringOp(): + from sympy.physics.quantum.sho1d import LoweringOp + assert _test_args(LoweringOp('a')) + + +def test_sympy__physics__quantum__sho1d__NumberOp(): + from sympy.physics.quantum.sho1d import NumberOp + assert _test_args(NumberOp('N')) + + +def test_sympy__physics__quantum__sho1d__Hamiltonian(): + from sympy.physics.quantum.sho1d import Hamiltonian + assert _test_args(Hamiltonian('H')) + + +def test_sympy__physics__quantum__sho1d__SHOState(): + from sympy.physics.quantum.sho1d import SHOState + assert _test_args(SHOState(0)) + + +def test_sympy__physics__quantum__sho1d__SHOKet(): + from sympy.physics.quantum.sho1d import SHOKet + assert _test_args(SHOKet(0)) + + +def test_sympy__physics__quantum__sho1d__SHOBra(): + from sympy.physics.quantum.sho1d import SHOBra + assert _test_args(SHOBra(0)) + + +def test_sympy__physics__secondquant__AnnihilateBoson(): + from sympy.physics.secondquant import AnnihilateBoson + assert _test_args(AnnihilateBoson(0)) + + +def test_sympy__physics__secondquant__AnnihilateFermion(): + from sympy.physics.secondquant import AnnihilateFermion + assert _test_args(AnnihilateFermion(0)) + + +@SKIP("abstract class") +def test_sympy__physics__secondquant__Annihilator(): + pass + + +def test_sympy__physics__secondquant__AntiSymmetricTensor(): + from sympy.physics.secondquant import AntiSymmetricTensor + i, j = symbols('i j', below_fermi=True) + a, b = symbols('a b', above_fermi=True) + assert _test_args(AntiSymmetricTensor('v', (a, i), (b, j))) + + +def test_sympy__physics__secondquant__BosonState(): + from sympy.physics.secondquant import BosonState + assert _test_args(BosonState((0, 1))) + + +@SKIP("abstract class") +def test_sympy__physics__secondquant__BosonicOperator(): + pass + + +def test_sympy__physics__secondquant__Commutator(): + from sympy.physics.secondquant import Commutator + x, y = symbols('x y', commutative=False) + assert _test_args(Commutator(x, y)) + + +def test_sympy__physics__secondquant__CreateBoson(): + from sympy.physics.secondquant import CreateBoson + assert _test_args(CreateBoson(0)) + + +def test_sympy__physics__secondquant__CreateFermion(): + from sympy.physics.secondquant import CreateFermion + assert _test_args(CreateFermion(0)) + + +@SKIP("abstract class") +def test_sympy__physics__secondquant__Creator(): + pass + + +def test_sympy__physics__secondquant__Dagger(): + from sympy.physics.secondquant import Dagger + assert _test_args(Dagger(x)) + + +def test_sympy__physics__secondquant__FermionState(): + from sympy.physics.secondquant import FermionState + assert _test_args(FermionState((0, 1))) + + +def test_sympy__physics__secondquant__FermionicOperator(): + from sympy.physics.secondquant import FermionicOperator + assert _test_args(FermionicOperator(0)) + + +def test_sympy__physics__secondquant__FockState(): + from sympy.physics.secondquant import FockState + assert _test_args(FockState((0, 1))) + + +def test_sympy__physics__secondquant__FockStateBosonBra(): + from sympy.physics.secondquant import FockStateBosonBra + assert _test_args(FockStateBosonBra((0, 1))) + + +def test_sympy__physics__secondquant__FockStateBosonKet(): + from sympy.physics.secondquant import FockStateBosonKet + assert _test_args(FockStateBosonKet((0, 1))) + + +def test_sympy__physics__secondquant__FockStateBra(): + from sympy.physics.secondquant import FockStateBra + assert _test_args(FockStateBra((0, 1))) + + +def test_sympy__physics__secondquant__FockStateFermionBra(): + from sympy.physics.secondquant import FockStateFermionBra + assert _test_args(FockStateFermionBra((0, 1))) + + +def test_sympy__physics__secondquant__FockStateFermionKet(): + from sympy.physics.secondquant import FockStateFermionKet + assert _test_args(FockStateFermionKet((0, 1))) + + +def test_sympy__physics__secondquant__FockStateKet(): + from sympy.physics.secondquant import FockStateKet + assert _test_args(FockStateKet((0, 1))) + + +def test_sympy__physics__secondquant__InnerProduct(): + from sympy.physics.secondquant import InnerProduct + from sympy.physics.secondquant import FockStateKet, FockStateBra + assert _test_args(InnerProduct(FockStateBra((0, 1)), FockStateKet((0, 1)))) + + +def test_sympy__physics__secondquant__NO(): + from sympy.physics.secondquant import NO, F, Fd + assert _test_args(NO(Fd(x)*F(y))) + + +def test_sympy__physics__secondquant__PermutationOperator(): + from sympy.physics.secondquant import PermutationOperator + assert _test_args(PermutationOperator(0, 1)) + + +def test_sympy__physics__secondquant__SqOperator(): + from sympy.physics.secondquant import SqOperator + assert _test_args(SqOperator(0)) + + +def test_sympy__physics__secondquant__TensorSymbol(): + from sympy.physics.secondquant import TensorSymbol + assert _test_args(TensorSymbol(x)) + + +def test_sympy__physics__control__lti__LinearTimeInvariant(): + # Direct instances of LinearTimeInvariant class are not allowed. + # func(*args) tests for its derived classes (TransferFunction, + # Series, Parallel and TransferFunctionMatrix) should pass. + pass + + +def test_sympy__physics__control__lti__SISOLinearTimeInvariant(): + # Direct instances of SISOLinearTimeInvariant class are not allowed. + pass + + +def test_sympy__physics__control__lti__MIMOLinearTimeInvariant(): + # Direct instances of MIMOLinearTimeInvariant class are not allowed. + pass + + +def test_sympy__physics__control__lti__TransferFunction(): + from sympy.physics.control.lti import TransferFunction + assert _test_args(TransferFunction(2, 3, x)) + + +def _test_args_PIDController(obj): + from sympy.physics.control.lti import PIDController + if isinstance(obj, PIDController): + kp, ki, kd, tf = obj.kp, obj.ki, obj.kd, obj.tf + recreated_pid = PIDController(kp, ki, kd, tf, s) + return recreated_pid == obj + return False + + +def test_sympy__physics__control__lti__PIDController(): + from sympy.physics.control.lti import PIDController + kp, ki, kd, tf = 1, 0.1, 0.01, 0 + assert _test_args_PIDController(PIDController(kp, ki, kd, tf, s)) + + +def test_sympy__physics__control__lti__Series(): + from sympy.physics.control import Series, TransferFunction + tf1 = TransferFunction(x**2 - y**3, y - z, x) + tf2 = TransferFunction(y - x, z + y, x) + assert _test_args(Series(tf1, tf2)) + + +def test_sympy__physics__control__lti__MIMOSeries(): + from sympy.physics.control import MIMOSeries, TransferFunction, TransferFunctionMatrix + tf1 = TransferFunction(x**2 - y**3, y - z, x) + tf2 = TransferFunction(y - x, z + y, x) + tfm_1 = TransferFunctionMatrix([[tf2, tf1]]) + tfm_2 = TransferFunctionMatrix([[tf1, tf2], [tf2, tf1]]) + tfm_3 = TransferFunctionMatrix([[tf1], [tf2]]) + assert _test_args(MIMOSeries(tfm_3, tfm_2, tfm_1)) + + +def test_sympy__physics__control__lti__Parallel(): + from sympy.physics.control import Parallel, TransferFunction + tf1 = TransferFunction(x**2 - y**3, y - z, x) + tf2 = TransferFunction(y - x, z + y, x) + assert _test_args(Parallel(tf1, tf2)) + + +def test_sympy__physics__control__lti__MIMOParallel(): + from sympy.physics.control import MIMOParallel, TransferFunction, TransferFunctionMatrix + tf1 = TransferFunction(x**2 - y**3, y - z, x) + tf2 = TransferFunction(y - x, z + y, x) + tfm_1 = TransferFunctionMatrix([[tf1, tf2], [tf2, tf1]]) + tfm_2 = TransferFunctionMatrix([[tf2, tf1], [tf1, tf2]]) + assert _test_args(MIMOParallel(tfm_1, tfm_2)) + + +def test_sympy__physics__control__lti__Feedback(): + from sympy.physics.control import TransferFunction, Feedback + tf1 = TransferFunction(x**2 - y**3, y - z, x) + tf2 = TransferFunction(y - x, z + y, x) + assert _test_args(Feedback(tf1, tf2)) + assert _test_args(Feedback(tf1, tf2, 1)) + + +def test_sympy__physics__control__lti__MIMOFeedback(): + from sympy.physics.control import TransferFunction, MIMOFeedback, TransferFunctionMatrix + tf1 = TransferFunction(x**2 - y**3, y - z, x) + tf2 = TransferFunction(y - x, z + y, x) + tfm_1 = TransferFunctionMatrix([[tf2, tf1], [tf1, tf2]]) + tfm_2 = TransferFunctionMatrix([[tf1, tf2], [tf2, tf1]]) + assert _test_args(MIMOFeedback(tfm_1, tfm_2)) + assert _test_args(MIMOFeedback(tfm_1, tfm_2, 1)) + + +def test_sympy__physics__control__lti__TransferFunctionMatrix(): + from sympy.physics.control import TransferFunction, TransferFunctionMatrix + tf1 = TransferFunction(x**2 - y**3, y - z, x) + tf2 = TransferFunction(y - x, z + y, x) + assert _test_args(TransferFunctionMatrix([[tf1, tf2]])) + + +def test_sympy__physics__control__lti__StateSpace(): + from sympy.matrices.dense import Matrix + from sympy.physics.control import StateSpace + A = Matrix([[-5, -1], [3, -1]]) + B = Matrix([2, 5]) + C = Matrix([[1, 2]]) + D = Matrix([0]) + assert _test_args(StateSpace(A, B, C, D)) + + +def test_sympy__physics__units__dimensions__Dimension(): + from sympy.physics.units.dimensions import Dimension + assert _test_args(Dimension("length", "L")) + + +def test_sympy__physics__units__dimensions__DimensionSystem(): + from sympy.physics.units.dimensions import DimensionSystem + from sympy.physics.units.definitions.dimension_definitions import length, time, velocity + assert _test_args(DimensionSystem((length, time), (velocity,))) + + +def test_sympy__physics__units__quantities__Quantity(): + from sympy.physics.units.quantities import Quantity + assert _test_args(Quantity("dam")) + + +def test_sympy__physics__units__quantities__PhysicalConstant(): + from sympy.physics.units.quantities import PhysicalConstant + assert _test_args(PhysicalConstant("foo")) + + +def test_sympy__physics__units__prefixes__Prefix(): + from sympy.physics.units.prefixes import Prefix + assert _test_args(Prefix('kilo', 'k', 3)) + + +def test_sympy__core__numbers__AlgebraicNumber(): + from sympy.core.numbers import AlgebraicNumber + assert _test_args(AlgebraicNumber(sqrt(2), [1, 2, 3])) + + +def test_sympy__polys__polytools__GroebnerBasis(): + from sympy.polys.polytools import GroebnerBasis + assert _test_args(GroebnerBasis([x, y, z], x, y, z)) + + +def test_sympy__polys__polytools__Poly(): + from sympy.polys.polytools import Poly + assert _test_args(Poly(2, x, y)) + + +def test_sympy__polys__polytools__PurePoly(): + from sympy.polys.polytools import PurePoly + assert _test_args(PurePoly(2, x, y)) + + +@SKIP('abstract class') +def test_sympy__polys__rootoftools__RootOf(): + pass + + +def test_sympy__polys__rootoftools__ComplexRootOf(): + from sympy.polys.rootoftools import ComplexRootOf + assert _test_args(ComplexRootOf(x**3 + x + 1, 0)) + + +def test_sympy__polys__rootoftools__RootSum(): + from sympy.polys.rootoftools import RootSum + assert _test_args(RootSum(x**3 + x + 1, sin)) + + +def test_sympy__series__limits__Limit(): + from sympy.series.limits import Limit + assert _test_args(Limit(x, x, 0, dir='-')) + + +def test_sympy__series__order__Order(): + from sympy.series.order import Order + assert _test_args(Order(1, x, y)) + + +@SKIP('Abstract Class') +def test_sympy__series__sequences__SeqBase(): + pass + + +def test_sympy__series__sequences__EmptySequence(): + # Need to import the instance from series not the class from + # series.sequence + from sympy.series import EmptySequence + assert _test_args(EmptySequence) + + +@SKIP('Abstract Class') +def test_sympy__series__sequences__SeqExpr(): + pass + + +def test_sympy__series__sequences__SeqPer(): + from sympy.series.sequences import SeqPer + assert _test_args(SeqPer((1, 2, 3), (0, 10))) + + +def test_sympy__series__sequences__SeqFormula(): + from sympy.series.sequences import SeqFormula + assert _test_args(SeqFormula(x**2, (0, 10))) + + +def test_sympy__series__sequences__RecursiveSeq(): + from sympy.series.sequences import RecursiveSeq + y = Function("y") + n = symbols("n") + assert _test_args(RecursiveSeq(y(n - 1) + y(n - 2), y(n), n, (0, 1))) + assert _test_args(RecursiveSeq(y(n - 1) + y(n - 2), y(n), n)) + + +def test_sympy__series__sequences__SeqExprOp(): + from sympy.series.sequences import SeqExprOp, sequence + s1 = sequence((1, 2, 3)) + s2 = sequence(x**2) + assert _test_args(SeqExprOp(s1, s2)) + + +def test_sympy__series__sequences__SeqAdd(): + from sympy.series.sequences import SeqAdd, sequence + s1 = sequence((1, 2, 3)) + s2 = sequence(x**2) + assert _test_args(SeqAdd(s1, s2)) + + +def test_sympy__series__sequences__SeqMul(): + from sympy.series.sequences import SeqMul, sequence + s1 = sequence((1, 2, 3)) + s2 = sequence(x**2) + assert _test_args(SeqMul(s1, s2)) + + +@SKIP('Abstract Class') +def test_sympy__series__series_class__SeriesBase(): + pass + + +def test_sympy__series__fourier__FourierSeries(): + from sympy.series.fourier import fourier_series + assert _test_args(fourier_series(x, (x, -pi, pi))) + +def test_sympy__series__fourier__FiniteFourierSeries(): + from sympy.series.fourier import fourier_series + assert _test_args(fourier_series(sin(pi*x), (x, -1, 1))) + + +def test_sympy__series__formal__FormalPowerSeries(): + from sympy.series.formal import fps + assert _test_args(fps(log(1 + x), x)) + + +def test_sympy__series__formal__Coeff(): + from sympy.series.formal import fps + assert _test_args(fps(x**2 + x + 1, x)) + + +@SKIP('Abstract Class') +def test_sympy__series__formal__FiniteFormalPowerSeries(): + pass + + +def test_sympy__series__formal__FormalPowerSeriesProduct(): + from sympy.series.formal import fps + f1, f2 = fps(sin(x)), fps(exp(x)) + assert _test_args(f1.product(f2, x)) + + +def test_sympy__series__formal__FormalPowerSeriesCompose(): + from sympy.series.formal import fps + f1, f2 = fps(exp(x)), fps(sin(x)) + assert _test_args(f1.compose(f2, x)) + + +def test_sympy__series__formal__FormalPowerSeriesInverse(): + from sympy.series.formal import fps + f1 = fps(exp(x)) + assert _test_args(f1.inverse(x)) + + +def test_sympy__simplify__hyperexpand__Hyper_Function(): + from sympy.simplify.hyperexpand import Hyper_Function + assert _test_args(Hyper_Function([2], [1])) + + +def test_sympy__simplify__hyperexpand__G_Function(): + from sympy.simplify.hyperexpand import G_Function + assert _test_args(G_Function([2], [1], [], [])) + + +@SKIP("abstract class") +def test_sympy__tensor__array__ndim_array__ImmutableNDimArray(): + pass + + +def test_sympy__tensor__array__dense_ndim_array__ImmutableDenseNDimArray(): + from sympy.tensor.array.dense_ndim_array import ImmutableDenseNDimArray + densarr = ImmutableDenseNDimArray(range(10, 34), (2, 3, 4)) + assert _test_args(densarr) + + +def test_sympy__tensor__array__sparse_ndim_array__ImmutableSparseNDimArray(): + from sympy.tensor.array.sparse_ndim_array import ImmutableSparseNDimArray + sparr = ImmutableSparseNDimArray(range(10, 34), (2, 3, 4)) + assert _test_args(sparr) + + +def test_sympy__tensor__array__array_comprehension__ArrayComprehension(): + from sympy.tensor.array.array_comprehension import ArrayComprehension + arrcom = ArrayComprehension(x, (x, 1, 5)) + assert _test_args(arrcom) + +def test_sympy__tensor__array__array_comprehension__ArrayComprehensionMap(): + from sympy.tensor.array.array_comprehension import ArrayComprehensionMap + arrcomma = ArrayComprehensionMap(lambda: 0, (x, 1, 5)) + assert _test_args(arrcomma) + + +def test_sympy__tensor__array__array_derivatives__ArrayDerivative(): + from sympy.tensor.array.array_derivatives import ArrayDerivative + A = MatrixSymbol("A", 2, 2) + arrder = ArrayDerivative(A, A, evaluate=False) + assert _test_args(arrder) + +def test_sympy__tensor__array__expressions__array_expressions__ArraySymbol(): + from sympy.tensor.array.expressions.array_expressions import ArraySymbol + m, n, k = symbols("m n k") + array = ArraySymbol("A", (m, n, k, 2)) + assert _test_args(array) + +def test_sympy__tensor__array__expressions__array_expressions__ArrayElement(): + from sympy.tensor.array.expressions.array_expressions import ArrayElement + m, n, k = symbols("m n k") + ae = ArrayElement("A", (m, n, k, 2)) + assert _test_args(ae) + +def test_sympy__tensor__array__expressions__array_expressions__ZeroArray(): + from sympy.tensor.array.expressions.array_expressions import ZeroArray + m, n, k = symbols("m n k") + za = ZeroArray(m, n, k, 2) + assert _test_args(za) + +def test_sympy__tensor__array__expressions__array_expressions__OneArray(): + from sympy.tensor.array.expressions.array_expressions import OneArray + m, n, k = symbols("m n k") + za = OneArray(m, n, k, 2) + assert _test_args(za) + +def test_sympy__tensor__functions__TensorProduct(): + from sympy.tensor.functions import TensorProduct + A = MatrixSymbol('A', 3, 3) + B = MatrixSymbol('B', 3, 3) + tp = TensorProduct(A, B) + assert _test_args(tp) + + +def test_sympy__tensor__indexed__Idx(): + from sympy.tensor.indexed import Idx + assert _test_args(Idx('test')) + assert _test_args(Idx('test', (0, 10))) + assert _test_args(Idx('test', 2)) + assert _test_args(Idx('test', x)) + + +def test_sympy__tensor__indexed__Indexed(): + from sympy.tensor.indexed import Indexed, Idx + assert _test_args(Indexed('A', Idx('i'), Idx('j'))) + + +def test_sympy__tensor__indexed__IndexedBase(): + from sympy.tensor.indexed import IndexedBase + assert _test_args(IndexedBase('A', shape=(x, y))) + assert _test_args(IndexedBase('A', 1)) + assert _test_args(IndexedBase('A')[0, 1]) + + +def test_sympy__tensor__tensor__TensorIndexType(): + from sympy.tensor.tensor import TensorIndexType + assert _test_args(TensorIndexType('Lorentz')) + + +@SKIP("deprecated class") +def test_sympy__tensor__tensor__TensorType(): + pass + + +def test_sympy__tensor__tensor__TensorSymmetry(): + from sympy.tensor.tensor import TensorSymmetry, get_symmetric_group_sgs + assert _test_args(TensorSymmetry(get_symmetric_group_sgs(2))) + + +def test_sympy__tensor__tensor__TensorHead(): + from sympy.tensor.tensor import TensorIndexType, TensorSymmetry, get_symmetric_group_sgs, TensorHead + Lorentz = TensorIndexType('Lorentz', dummy_name='L') + sym = TensorSymmetry(get_symmetric_group_sgs(1)) + assert _test_args(TensorHead('p', [Lorentz], sym, 0)) + + +def test_sympy__tensor__tensor__TensorIndex(): + from sympy.tensor.tensor import TensorIndexType, TensorIndex + Lorentz = TensorIndexType('Lorentz', dummy_name='L') + assert _test_args(TensorIndex('i', Lorentz)) + +@SKIP("abstract class") +def test_sympy__tensor__tensor__TensExpr(): + pass + +def test_sympy__tensor__tensor__TensAdd(): + from sympy.tensor.tensor import TensorIndexType, TensorSymmetry, get_symmetric_group_sgs, tensor_indices, TensAdd, tensor_heads + Lorentz = TensorIndexType('Lorentz', dummy_name='L') + a, b = tensor_indices('a,b', Lorentz) + sym = TensorSymmetry(get_symmetric_group_sgs(1)) + p, q = tensor_heads('p,q', [Lorentz], sym) + t1 = p(a) + t2 = q(a) + assert _test_args(TensAdd(t1, t2)) + + +def test_sympy__tensor__tensor__Tensor(): + from sympy.tensor.tensor import TensorIndexType, TensorSymmetry, get_symmetric_group_sgs, tensor_indices, TensorHead + Lorentz = TensorIndexType('Lorentz', dummy_name='L') + a, b = tensor_indices('a,b', Lorentz) + sym = TensorSymmetry(get_symmetric_group_sgs(1)) + p = TensorHead('p', [Lorentz], sym) + assert _test_args(p(a)) + + +def test_sympy__tensor__tensor__TensMul(): + from sympy.tensor.tensor import TensorIndexType, TensorSymmetry, get_symmetric_group_sgs, tensor_indices, tensor_heads + Lorentz = TensorIndexType('Lorentz', dummy_name='L') + a, b = tensor_indices('a,b', Lorentz) + sym = TensorSymmetry(get_symmetric_group_sgs(1)) + p, q = tensor_heads('p, q', [Lorentz], sym) + assert _test_args(3*p(a)*q(b)) + + +def test_sympy__tensor__tensor__TensorElement(): + from sympy.tensor.tensor import TensorIndexType, TensorHead, TensorElement + L = TensorIndexType("L") + A = TensorHead("A", [L, L]) + telem = TensorElement(A(x, y), {x: 1}) + assert _test_args(telem) + +def test_sympy__tensor__tensor__WildTensor(): + from sympy.tensor.tensor import TensorIndexType, WildTensorHead, TensorIndex + Lorentz = TensorIndexType('Lorentz', dummy_name='L') + a = TensorIndex('a', Lorentz) + p = WildTensorHead('p') + assert _test_args(p(a)) + +def test_sympy__tensor__tensor__WildTensorHead(): + from sympy.tensor.tensor import WildTensorHead + assert _test_args(WildTensorHead('p')) + +def test_sympy__tensor__tensor__WildTensorIndex(): + from sympy.tensor.tensor import TensorIndexType, WildTensorIndex + Lorentz = TensorIndexType('Lorentz', dummy_name='L') + assert _test_args(WildTensorIndex('i', Lorentz)) + +def test_sympy__tensor__toperators__PartialDerivative(): + from sympy.tensor.tensor import TensorIndexType, tensor_indices, TensorHead + from sympy.tensor.toperators import PartialDerivative + Lorentz = TensorIndexType('Lorentz', dummy_name='L') + a, b = tensor_indices('a,b', Lorentz) + A = TensorHead("A", [Lorentz]) + assert _test_args(PartialDerivative(A(a), A(b))) + + +def test_as_coeff_add(): + assert (7, (3*x, 4*x**2)) == (7 + 3*x + 4*x**2).as_coeff_add() + + +def test_sympy__geometry__curve__Curve(): + from sympy.geometry.curve import Curve + assert _test_args(Curve((x, 1), (x, 0, 1))) + + +def test_sympy__geometry__point__Point(): + from sympy.geometry.point import Point + assert _test_args(Point(0, 1)) + + +def test_sympy__geometry__point__Point2D(): + from sympy.geometry.point import Point2D + assert _test_args(Point2D(0, 1)) + + +def test_sympy__geometry__point__Point3D(): + from sympy.geometry.point import Point3D + assert _test_args(Point3D(0, 1, 2)) + + +def test_sympy__geometry__ellipse__Ellipse(): + from sympy.geometry.ellipse import Ellipse + assert _test_args(Ellipse((0, 1), 2, 3)) + + +def test_sympy__geometry__ellipse__Circle(): + from sympy.geometry.ellipse import Circle + assert _test_args(Circle((0, 1), 2)) + + +def test_sympy__geometry__parabola__Parabola(): + from sympy.geometry.parabola import Parabola + from sympy.geometry.line import Line + assert _test_args(Parabola((0, 0), Line((2, 3), (4, 3)))) + + +@SKIP("abstract class") +def test_sympy__geometry__line__LinearEntity(): + pass + + +def test_sympy__geometry__line__Line(): + from sympy.geometry.line import Line + assert _test_args(Line((0, 1), (2, 3))) + + +def test_sympy__geometry__line__Ray(): + from sympy.geometry.line import Ray + assert _test_args(Ray((0, 1), (2, 3))) + + +def test_sympy__geometry__line__Segment(): + from sympy.geometry.line import Segment + assert _test_args(Segment((0, 1), (2, 3))) + +@SKIP("abstract class") +def test_sympy__geometry__line__LinearEntity2D(): + pass + + +def test_sympy__geometry__line__Line2D(): + from sympy.geometry.line import Line2D + assert _test_args(Line2D((0, 1), (2, 3))) + + +def test_sympy__geometry__line__Ray2D(): + from sympy.geometry.line import Ray2D + assert _test_args(Ray2D((0, 1), (2, 3))) + + +def test_sympy__geometry__line__Segment2D(): + from sympy.geometry.line import Segment2D + assert _test_args(Segment2D((0, 1), (2, 3))) + + +@SKIP("abstract class") +def test_sympy__geometry__line__LinearEntity3D(): + pass + + +def test_sympy__geometry__line__Line3D(): + from sympy.geometry.line import Line3D + assert _test_args(Line3D((0, 1, 1), (2, 3, 4))) + + +def test_sympy__geometry__line__Segment3D(): + from sympy.geometry.line import Segment3D + assert _test_args(Segment3D((0, 1, 1), (2, 3, 4))) + + +def test_sympy__geometry__line__Ray3D(): + from sympy.geometry.line import Ray3D + assert _test_args(Ray3D((0, 1, 1), (2, 3, 4))) + + +def test_sympy__geometry__plane__Plane(): + from sympy.geometry.plane import Plane + assert _test_args(Plane((1, 1, 1), (-3, 4, -2), (1, 2, 3))) + + +def test_sympy__geometry__polygon__Polygon(): + from sympy.geometry.polygon import Polygon + assert _test_args(Polygon((0, 1), (2, 3), (4, 5), (6, 7))) + + +def test_sympy__geometry__polygon__RegularPolygon(): + from sympy.geometry.polygon import RegularPolygon + assert _test_args(RegularPolygon((0, 1), 2, 3, 4)) + + +def test_sympy__geometry__polygon__Triangle(): + from sympy.geometry.polygon import Triangle + assert _test_args(Triangle((0, 1), (2, 3), (4, 5))) + + +def test_sympy__geometry__entity__GeometryEntity(): + from sympy.geometry.entity import GeometryEntity + from sympy.geometry.point import Point + assert _test_args(GeometryEntity(Point(1, 0), 1, [1, 2])) + +@SKIP("abstract class") +def test_sympy__geometry__entity__GeometrySet(): + pass + +def test_sympy__diffgeom__diffgeom__Manifold(): + from sympy.diffgeom import Manifold + assert _test_args(Manifold('name', 3)) + + +def test_sympy__diffgeom__diffgeom__Patch(): + from sympy.diffgeom import Manifold, Patch + assert _test_args(Patch('name', Manifold('name', 3))) + + +def test_sympy__diffgeom__diffgeom__CoordSystem(): + from sympy.diffgeom import Manifold, Patch, CoordSystem + assert _test_args(CoordSystem('name', Patch('name', Manifold('name', 3)))) + assert _test_args(CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c])) + + +def test_sympy__diffgeom__diffgeom__CoordinateSymbol(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, CoordinateSymbol + assert _test_args(CoordinateSymbol(CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]), 0)) + + +def test_sympy__diffgeom__diffgeom__Point(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, Point + assert _test_args(Point( + CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]), [x, y])) + + +def test_sympy__diffgeom__diffgeom__BaseScalarField(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + assert _test_args(BaseScalarField(cs, 0)) + + +def test_sympy__diffgeom__diffgeom__BaseVectorField(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseVectorField + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + assert _test_args(BaseVectorField(cs, 0)) + + +def test_sympy__diffgeom__diffgeom__Differential(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField, Differential + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + assert _test_args(Differential(BaseScalarField(cs, 0))) + + +def test_sympy__diffgeom__diffgeom__Commutator(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseVectorField, Commutator + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + cs1 = CoordSystem('name1', Patch('name', Manifold('name', 3)), [a, b, c]) + v = BaseVectorField(cs, 0) + v1 = BaseVectorField(cs1, 0) + assert _test_args(Commutator(v, v1)) + + +def test_sympy__diffgeom__diffgeom__TensorProduct(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField, Differential, TensorProduct + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + d = Differential(BaseScalarField(cs, 0)) + assert _test_args(TensorProduct(d, d)) + + +def test_sympy__diffgeom__diffgeom__WedgeProduct(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField, Differential, WedgeProduct + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + d = Differential(BaseScalarField(cs, 0)) + d1 = Differential(BaseScalarField(cs, 1)) + assert _test_args(WedgeProduct(d, d1)) + + +def test_sympy__diffgeom__diffgeom__LieDerivative(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField, Differential, BaseVectorField, LieDerivative + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + d = Differential(BaseScalarField(cs, 0)) + v = BaseVectorField(cs, 0) + assert _test_args(LieDerivative(v, d)) + + +def test_sympy__diffgeom__diffgeom__BaseCovarDerivativeOp(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseCovarDerivativeOp + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + assert _test_args(BaseCovarDerivativeOp(cs, 0, [[[0, ]*3, ]*3, ]*3)) + + +def test_sympy__diffgeom__diffgeom__CovarDerivativeOp(): + from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseVectorField, CovarDerivativeOp + cs = CoordSystem('name', Patch('name', Manifold('name', 3)), [a, b, c]) + v = BaseVectorField(cs, 0) + _test_args(CovarDerivativeOp(v, [[[0, ]*3, ]*3, ]*3)) + + +def test_sympy__categories__baseclasses__Class(): + from sympy.categories.baseclasses import Class + assert _test_args(Class()) + + +def test_sympy__categories__baseclasses__Object(): + from sympy.categories import Object + assert _test_args(Object("A")) + + +@SKIP("abstract class") +def test_sympy__categories__baseclasses__Morphism(): + pass + + +def test_sympy__categories__baseclasses__IdentityMorphism(): + from sympy.categories import Object, IdentityMorphism + assert _test_args(IdentityMorphism(Object("A"))) + + +def test_sympy__categories__baseclasses__NamedMorphism(): + from sympy.categories import Object, NamedMorphism + assert _test_args(NamedMorphism(Object("A"), Object("B"), "f")) + + +def test_sympy__categories__baseclasses__CompositeMorphism(): + from sympy.categories import Object, NamedMorphism, CompositeMorphism + A = Object("A") + B = Object("B") + C = Object("C") + f = NamedMorphism(A, B, "f") + g = NamedMorphism(B, C, "g") + assert _test_args(CompositeMorphism(f, g)) + + +def test_sympy__categories__baseclasses__Diagram(): + from sympy.categories import Object, NamedMorphism, Diagram + A = Object("A") + B = Object("B") + f = NamedMorphism(A, B, "f") + d = Diagram([f]) + assert _test_args(d) + + +def test_sympy__categories__baseclasses__Category(): + from sympy.categories import Object, NamedMorphism, Diagram, Category + A = Object("A") + B = Object("B") + C = Object("C") + f = NamedMorphism(A, B, "f") + g = NamedMorphism(B, C, "g") + d1 = Diagram([f, g]) + d2 = Diagram([f]) + K = Category("K", commutative_diagrams=[d1, d2]) + assert _test_args(K) + + +def test_sympy__physics__optics__waves__TWave(): + from sympy.physics.optics import TWave + A, f, phi = symbols('A, f, phi') + assert _test_args(TWave(A, f, phi)) + + +def test_sympy__physics__optics__gaussopt__BeamParameter(): + from sympy.physics.optics import BeamParameter + assert _test_args(BeamParameter(530e-9, 1, w=1e-3, n=1)) + + +def test_sympy__physics__optics__medium__Medium(): + from sympy.physics.optics import Medium + assert _test_args(Medium('m')) + + +def test_sympy__physics__optics__medium__MediumN(): + from sympy.physics.optics.medium import Medium + assert _test_args(Medium('m', n=2)) + + +def test_sympy__physics__optics__medium__MediumPP(): + from sympy.physics.optics.medium import Medium + assert _test_args(Medium('m', permittivity=2, permeability=2)) + + +def test_sympy__tensor__array__expressions__array_expressions__ArrayContraction(): + from sympy.tensor.array.expressions.array_expressions import ArrayContraction + from sympy.tensor.indexed import IndexedBase + A = symbols("A", cls=IndexedBase) + assert _test_args(ArrayContraction(A, (0, 1))) + + +def test_sympy__tensor__array__expressions__array_expressions__ArrayDiagonal(): + from sympy.tensor.array.expressions.array_expressions import ArrayDiagonal + from sympy.tensor.indexed import IndexedBase + A = symbols("A", cls=IndexedBase) + assert _test_args(ArrayDiagonal(A, (0, 1))) + + +def test_sympy__tensor__array__expressions__array_expressions__ArrayTensorProduct(): + from sympy.tensor.array.expressions.array_expressions import ArrayTensorProduct + from sympy.tensor.indexed import IndexedBase + A, B = symbols("A B", cls=IndexedBase) + assert _test_args(ArrayTensorProduct(A, B)) + + +def test_sympy__tensor__array__expressions__array_expressions__ArrayAdd(): + from sympy.tensor.array.expressions.array_expressions import ArrayAdd + from sympy.tensor.indexed import IndexedBase + A, B = symbols("A B", cls=IndexedBase) + assert _test_args(ArrayAdd(A, B)) + + +def test_sympy__tensor__array__expressions__array_expressions__PermuteDims(): + from sympy.tensor.array.expressions.array_expressions import PermuteDims + A = MatrixSymbol("A", 4, 4) + assert _test_args(PermuteDims(A, (1, 0))) + + +def test_sympy__tensor__array__expressions__array_expressions__ArrayElementwiseApplyFunc(): + from sympy.tensor.array.expressions.array_expressions import ArraySymbol, ArrayElementwiseApplyFunc + A = ArraySymbol("A", (4,)) + assert _test_args(ArrayElementwiseApplyFunc(exp, A)) + + +def test_sympy__tensor__array__expressions__array_expressions__Reshape(): + from sympy.tensor.array.expressions.array_expressions import ArraySymbol, Reshape + A = ArraySymbol("A", (4,)) + assert _test_args(Reshape(A, (2, 2))) + + +def test_sympy__codegen__ast__Assignment(): + from sympy.codegen.ast import Assignment + assert _test_args(Assignment(x, y)) + + +def test_sympy__codegen__cfunctions__expm1(): + from sympy.codegen.cfunctions import expm1 + assert _test_args(expm1(x)) + + +def test_sympy__codegen__cfunctions__log1p(): + from sympy.codegen.cfunctions import log1p + assert _test_args(log1p(x)) + + +def test_sympy__codegen__cfunctions__exp2(): + from sympy.codegen.cfunctions import exp2 + assert _test_args(exp2(x)) + + +def test_sympy__codegen__cfunctions__log2(): + from sympy.codegen.cfunctions import log2 + assert _test_args(log2(x)) + + +def test_sympy__codegen__cfunctions__fma(): + from sympy.codegen.cfunctions import fma + assert _test_args(fma(x, y, z)) + + +def test_sympy__codegen__cfunctions__log10(): + from sympy.codegen.cfunctions import log10 + assert _test_args(log10(x)) + + +def test_sympy__codegen__cfunctions__Sqrt(): + from sympy.codegen.cfunctions import Sqrt + assert _test_args(Sqrt(x)) + +def test_sympy__codegen__cfunctions__Cbrt(): + from sympy.codegen.cfunctions import Cbrt + assert _test_args(Cbrt(x)) + +def test_sympy__codegen__cfunctions__hypot(): + from sympy.codegen.cfunctions import hypot + assert _test_args(hypot(x, y)) + + +def test_sympy__codegen__cfunctions__isnan(): + from sympy.codegen.cfunctions import isnan + assert _test_args(isnan(x)) + + +def test_sympy__codegen__cfunctions__isinf(): + from sympy.codegen.cfunctions import isinf + assert _test_args(isinf(x)) + + +def test_sympy__codegen__fnodes__FFunction(): + from sympy.codegen.fnodes import FFunction + assert _test_args(FFunction('f')) + + +def test_sympy__codegen__fnodes__F95Function(): + from sympy.codegen.fnodes import F95Function + assert _test_args(F95Function('f')) + + +def test_sympy__codegen__fnodes__isign(): + from sympy.codegen.fnodes import isign + assert _test_args(isign(1, x)) + + +def test_sympy__codegen__fnodes__dsign(): + from sympy.codegen.fnodes import dsign + assert _test_args(dsign(1, x)) + + +def test_sympy__codegen__fnodes__cmplx(): + from sympy.codegen.fnodes import cmplx + assert _test_args(cmplx(x, y)) + + +def test_sympy__codegen__fnodes__kind(): + from sympy.codegen.fnodes import kind + assert _test_args(kind(x)) + + +def test_sympy__codegen__fnodes__merge(): + from sympy.codegen.fnodes import merge + assert _test_args(merge(1, 2, Eq(x, 0))) + + +def test_sympy__codegen__fnodes___literal(): + from sympy.codegen.fnodes import _literal + assert _test_args(_literal(1)) + + +def test_sympy__codegen__fnodes__literal_sp(): + from sympy.codegen.fnodes import literal_sp + assert _test_args(literal_sp(1)) + + +def test_sympy__codegen__fnodes__literal_dp(): + from sympy.codegen.fnodes import literal_dp + assert _test_args(literal_dp(1)) + + +def test_sympy__codegen__matrix_nodes__MatrixSolve(): + from sympy.matrices import MatrixSymbol + from sympy.codegen.matrix_nodes import MatrixSolve + A = MatrixSymbol('A', 3, 3) + v = MatrixSymbol('x', 3, 1) + assert _test_args(MatrixSolve(A, v)) + + +def test_sympy__printing__rust__TypeCast(): + from sympy.printing.rust import TypeCast + from sympy.codegen.ast import real + assert _test_args(TypeCast(x, real)) + + +def test_sympy__printing__rust__float_floor(): + from sympy.printing.rust import float_floor + assert _test_args(float_floor(x)) + + +def test_sympy__printing__rust__float_ceiling(): + from sympy.printing.rust import float_ceiling + assert _test_args(float_ceiling(x)) + + +def test_sympy__vector__coordsysrect__CoordSys3D(): + from sympy.vector.coordsysrect import CoordSys3D + assert _test_args(CoordSys3D('C')) + + +def test_sympy__vector__point__Point(): + from sympy.vector.point import Point + assert _test_args(Point('P')) + + +def test_sympy__vector__basisdependent__BasisDependent(): + #from sympy.vector.basisdependent import BasisDependent + #These classes have been created to maintain an OOP hierarchy + #for Vectors and Dyadics. Are NOT meant to be initialized + pass + + +def test_sympy__vector__basisdependent__BasisDependentMul(): + #from sympy.vector.basisdependent import BasisDependentMul + #These classes have been created to maintain an OOP hierarchy + #for Vectors and Dyadics. Are NOT meant to be initialized + pass + + +def test_sympy__vector__basisdependent__BasisDependentAdd(): + #from sympy.vector.basisdependent import BasisDependentAdd + #These classes have been created to maintain an OOP hierarchy + #for Vectors and Dyadics. Are NOT meant to be initialized + pass + + +def test_sympy__vector__basisdependent__BasisDependentZero(): + #from sympy.vector.basisdependent import BasisDependentZero + #These classes have been created to maintain an OOP hierarchy + #for Vectors and Dyadics. Are NOT meant to be initialized + pass + + +def test_sympy__vector__vector__BaseVector(): + from sympy.vector.vector import BaseVector + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(BaseVector(0, C, ' ', ' ')) + + +def test_sympy__vector__vector__VectorAdd(): + from sympy.vector.vector import VectorAdd, VectorMul + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + from sympy.abc import a, b, c, x, y, z + v1 = a*C.i + b*C.j + c*C.k + v2 = x*C.i + y*C.j + z*C.k + assert _test_args(VectorAdd(v1, v2)) + assert _test_args(VectorMul(x, v1)) + + +def test_sympy__vector__vector__VectorMul(): + from sympy.vector.vector import VectorMul + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + from sympy.abc import a + assert _test_args(VectorMul(a, C.i)) + + +def test_sympy__vector__vector__VectorZero(): + from sympy.vector.vector import VectorZero + assert _test_args(VectorZero()) + + +def test_sympy__vector__vector__Vector(): + #from sympy.vector.vector import Vector + #Vector is never to be initialized using args + pass + + +def test_sympy__vector__vector__Cross(): + from sympy.vector.vector import Cross + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + _test_args(Cross(C.i, C.j)) + + +def test_sympy__vector__vector__Dot(): + from sympy.vector.vector import Dot + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + _test_args(Dot(C.i, C.j)) + + +def test_sympy__vector__dyadic__Dyadic(): + #from sympy.vector.dyadic import Dyadic + #Dyadic is never to be initialized using args + pass + + +def test_sympy__vector__dyadic__BaseDyadic(): + from sympy.vector.dyadic import BaseDyadic + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(BaseDyadic(C.i, C.j)) + + +def test_sympy__vector__dyadic__DyadicMul(): + from sympy.vector.dyadic import BaseDyadic, DyadicMul + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(DyadicMul(3, BaseDyadic(C.i, C.j))) + + +def test_sympy__vector__dyadic__DyadicAdd(): + from sympy.vector.dyadic import BaseDyadic, DyadicAdd + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(2 * DyadicAdd(BaseDyadic(C.i, C.i), + BaseDyadic(C.i, C.j))) + + +def test_sympy__vector__dyadic__DyadicZero(): + from sympy.vector.dyadic import DyadicZero + assert _test_args(DyadicZero()) + + +def test_sympy__vector__deloperator__Del(): + from sympy.vector.deloperator import Del + assert _test_args(Del()) + + +def test_sympy__vector__implicitregion__ImplicitRegion(): + from sympy.vector.implicitregion import ImplicitRegion + from sympy.abc import x, y + assert _test_args(ImplicitRegion((x, y), y**3 - 4*x)) + + +def test_sympy__vector__integrals__ParametricIntegral(): + from sympy.vector.integrals import ParametricIntegral + from sympy.vector.parametricregion import ParametricRegion + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(ParametricIntegral(C.y*C.i - 10*C.j,\ + ParametricRegion((x, y), (x, 1, 3), (y, -2, 2)))) + +def test_sympy__vector__operators__Curl(): + from sympy.vector.operators import Curl + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(Curl(C.i)) + + +def test_sympy__vector__operators__Laplacian(): + from sympy.vector.operators import Laplacian + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(Laplacian(C.i)) + + +def test_sympy__vector__operators__Divergence(): + from sympy.vector.operators import Divergence + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(Divergence(C.i)) + + +def test_sympy__vector__operators__Gradient(): + from sympy.vector.operators import Gradient + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(Gradient(C.x)) + + +def test_sympy__vector__orienters__Orienter(): + #from sympy.vector.orienters import Orienter + #Not to be initialized + pass + + +def test_sympy__vector__orienters__ThreeAngleOrienter(): + #from sympy.vector.orienters import ThreeAngleOrienter + #Not to be initialized + pass + + +def test_sympy__vector__orienters__AxisOrienter(): + from sympy.vector.orienters import AxisOrienter + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(AxisOrienter(x, C.i)) + + +def test_sympy__vector__orienters__BodyOrienter(): + from sympy.vector.orienters import BodyOrienter + assert _test_args(BodyOrienter(x, y, z, '123')) + + +def test_sympy__vector__orienters__SpaceOrienter(): + from sympy.vector.orienters import SpaceOrienter + assert _test_args(SpaceOrienter(x, y, z, '123')) + + +def test_sympy__vector__orienters__QuaternionOrienter(): + from sympy.vector.orienters import QuaternionOrienter + a, b, c, d = symbols('a b c d') + assert _test_args(QuaternionOrienter(a, b, c, d)) + + +def test_sympy__vector__parametricregion__ParametricRegion(): + from sympy.abc import t + from sympy.vector.parametricregion import ParametricRegion + assert _test_args(ParametricRegion((t, t**3), (t, 0, 2))) + + +def test_sympy__vector__scalar__BaseScalar(): + from sympy.vector.scalar import BaseScalar + from sympy.vector.coordsysrect import CoordSys3D + C = CoordSys3D('C') + assert _test_args(BaseScalar(0, C, ' ', ' ')) + + +def test_sympy__physics__wigner__Wigner3j(): + from sympy.physics.wigner import Wigner3j + assert _test_args(Wigner3j(0, 0, 0, 0, 0, 0)) + + +def test_sympy__combinatorics__schur_number__SchurNumber(): + from sympy.combinatorics.schur_number import SchurNumber + assert _test_args(SchurNumber(x)) + + +def test_sympy__combinatorics__perm_groups__SymmetricPermutationGroup(): + from sympy.combinatorics.perm_groups import SymmetricPermutationGroup + assert _test_args(SymmetricPermutationGroup(5)) + + +def test_sympy__combinatorics__perm_groups__Coset(): + from sympy.combinatorics.permutations import Permutation + from sympy.combinatorics.perm_groups import PermutationGroup, Coset + a = Permutation(1, 2) + b = Permutation(0, 1) + G = PermutationGroup([a, b]) + assert _test_args(Coset(a, G)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_arit.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_arit.py new file mode 100644 index 0000000000000000000000000000000000000000..251fc4c4234cbd6e82adc9a24ccea536ed6a37b7 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_arit.py @@ -0,0 +1,2489 @@ +from sympy.core.add import Add +from sympy.core.basic import Basic +from sympy.core.mod import Mod +from sympy.core.mul import Mul +from sympy.core.numbers import (Float, I, Integer, Rational, comp, nan, + oo, pi, zoo) +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol, symbols) +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.complexes import (im, re, sign) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.integers import floor +from sympy.functions.elementary.miscellaneous import (Max, sqrt) +from sympy.functions.elementary.trigonometric import (atan, cos, sin) +from sympy.integrals.integrals import Integral +from sympy.polys.polytools import Poly +from sympy.sets.sets import FiniteSet + +from sympy.core.parameters import distribute, evaluate +from sympy.core.expr import unchanged +from sympy.utilities.iterables import permutations +from sympy.testing.pytest import XFAIL, raises, warns +from sympy.utilities.exceptions import SymPyDeprecationWarning +from sympy.core.random import verify_numerically +from sympy.functions.elementary.trigonometric import asin + +from itertools import product + +a, c, x, y, z = symbols('a,c,x,y,z') +b = Symbol("b", positive=True) + + +def same_and_same_prec(a, b): + # stricter matching for Floats + return a == b and a._prec == b._prec + + +def test_bug1(): + assert re(x) != x + x.series(x, 0, 1) + assert re(x) != x + + +def test_Symbol(): + e = a*b + assert e == a*b + assert a*b*b == a*b**2 + assert a*b*b + c == c + a*b**2 + assert a*b*b - c == -c + a*b**2 + + x = Symbol('x', complex=True, real=False) + assert x.is_imaginary is None # could be I or 1 + I + x = Symbol('x', complex=True, imaginary=False) + assert x.is_real is None # could be 1 or 1 + I + x = Symbol('x', real=True) + assert x.is_complex + x = Symbol('x', imaginary=True) + assert x.is_complex + x = Symbol('x', real=False, imaginary=False) + assert x.is_complex is None # might be a non-number + + +def test_arit0(): + p = Rational(5) + e = a*b + assert e == a*b + e = a*b + b*a + assert e == 2*a*b + e = a*b + b*a + a*b + p*b*a + assert e == 8*a*b + e = a*b + b*a + a*b + p*b*a + a + assert e == a + 8*a*b + e = a + a + assert e == 2*a + e = a + b + a + assert e == b + 2*a + e = a + b*b + a + b*b + assert e == 2*a + 2*b**2 + e = a + Rational(2) + b*b + a + b*b + p + assert e == 7 + 2*a + 2*b**2 + e = (a + b*b + a + b*b)*p + assert e == 5*(2*a + 2*b**2) + e = (a*b*c + c*b*a + b*a*c)*p + assert e == 15*a*b*c + e = (a*b*c + c*b*a + b*a*c)*p - Rational(15)*a*b*c + assert e == Rational(0) + e = Rational(50)*(a - a) + assert e == Rational(0) + e = b*a - b - a*b + b + assert e == Rational(0) + e = a*b + c**p + assert e == a*b + c**5 + e = a/b + assert e == a*b**(-1) + e = a*2*2 + assert e == 4*a + e = 2 + a*2/2 + assert e == 2 + a + e = 2 - a - 2 + assert e == -a + e = 2*a*2 + assert e == 4*a + e = 2/a/2 + assert e == a**(-1) + e = 2**a**2 + assert e == 2**(a**2) + e = -(1 + a) + assert e == -1 - a + e = S.Half*(1 + a) + assert e == S.Half + a/2 + + +def test_div(): + e = a/b + assert e == a*b**(-1) + e = a/b + c/2 + assert e == a*b**(-1) + Rational(1)/2*c + e = (1 - b)/(b - 1) + assert e == (1 + -b)*((-1) + b)**(-1) + + +def test_pow_arit(): + n1 = Rational(1) + n2 = Rational(2) + n5 = Rational(5) + e = a*a + assert e == a**2 + e = a*a*a + assert e == a**3 + e = a*a*a*a**Rational(6) + assert e == a**9 + e = a*a*a*a**Rational(6) - a**Rational(9) + assert e == Rational(0) + e = a**(b - b) + assert e == Rational(1) + e = (a + Rational(1) - a)**b + assert e == Rational(1) + + e = (a + b + c)**n2 + assert e == (a + b + c)**2 + assert e.expand() == 2*b*c + 2*a*c + 2*a*b + a**2 + c**2 + b**2 + + e = (a + b)**n2 + assert e == (a + b)**2 + assert e.expand() == 2*a*b + a**2 + b**2 + + e = (a + b)**(n1/n2) + assert e == sqrt(a + b) + assert e.expand() == sqrt(a + b) + + n = n5**(n1/n2) + assert n == sqrt(5) + e = n*a*b - n*b*a + assert e == Rational(0) + e = n*a*b + n*b*a + assert e == 2*a*b*sqrt(5) + assert e.diff(a) == 2*b*sqrt(5) + assert e.diff(a) == 2*b*sqrt(5) + e = a/b**2 + assert e == a*b**(-2) + + assert sqrt(2*(1 + sqrt(2))) == (2*(1 + 2**S.Half))**S.Half + + x = Symbol('x') + y = Symbol('y') + + assert ((x*y)**3).expand() == y**3 * x**3 + assert ((x*y)**-3).expand() == y**-3 * x**-3 + + assert (x**5*(3*x)**(3)).expand() == 27 * x**8 + assert (x**5*(-3*x)**(3)).expand() == -27 * x**8 + assert (x**5*(3*x)**(-3)).expand() == x**2 * Rational(1, 27) + assert (x**5*(-3*x)**(-3)).expand() == x**2 * Rational(-1, 27) + + # expand_power_exp + _x = Symbol('x', zero=False) + _y = Symbol('y', zero=False) + assert (_x**(y**(x + exp(x + y)) + z)).expand(deep=False) == \ + _x**z*_x**(y**(x + exp(x + y))) + assert (_x**(_y**(x + exp(x + y)) + z)).expand() == \ + _x**z*_x**(_y**x*_y**(exp(x)*exp(y))) + + n = Symbol('n', even=False) + k = Symbol('k', even=True) + o = Symbol('o', odd=True) + + assert unchanged(Pow, -1, x) + assert unchanged(Pow, -1, n) + assert (-2)**k == 2**k + assert (-1)**k == 1 + assert (-1)**o == -1 + + +def test_pow2(): + # x**(2*y) is always (x**y)**2 but is only (x**2)**y if + # x.is_positive or y.is_integer + # let x = 1 to see why the following are not true. + assert (-x)**Rational(2, 3) != x**Rational(2, 3) + assert (-x)**Rational(5, 7) != -x**Rational(5, 7) + assert ((-x)**2)**Rational(1, 3) != ((-x)**Rational(1, 3))**2 + assert sqrt(x**2) != x + + +def test_pow3(): + assert sqrt(2)**3 == 2 * sqrt(2) + assert sqrt(2)**3 == sqrt(8) + + +def test_mod_pow(): + for s, t, u, v in [(4, 13, 497, 445), (4, -3, 497, 365), + (3.2, 2.1, 1.9, 0.1031015682350942), (S(3)/2, 5, S(5)/6, S(3)/32)]: + assert pow(S(s), t, u) == v + assert pow(S(s), S(t), u) == v + assert pow(S(s), t, S(u)) == v + assert pow(S(s), S(t), S(u)) == v + assert pow(S(2), S(10000000000), S(3)) == 1 + assert pow(x, y, z) == x**y%z + raises(TypeError, lambda: pow(S(4), "13", 497)) + raises(TypeError, lambda: pow(S(4), 13, "497")) + + +def test_pow_E(): + assert 2**(y/log(2)) == S.Exp1**y + assert 2**(y/log(2)/3) == S.Exp1**(y/3) + assert 3**(1/log(-3)) != S.Exp1 + assert (3 + 2*I)**(1/(log(-3 - 2*I) + I*pi)) == S.Exp1 + assert (4 + 2*I)**(1/(log(-4 - 2*I) + I*pi)) == S.Exp1 + assert (3 + 2*I)**(1/(log(-3 - 2*I, 3)/2 + I*pi/log(3)/2)) == 9 + assert (3 + 2*I)**(1/(log(3 + 2*I, 3)/2)) == 9 + # every time tests are run they will affirm with a different random + # value that this identity holds + while 1: + b = x._random() + r, i = b.as_real_imag() + if i: + break + assert verify_numerically(b**(1/(log(-b) + sign(i)*I*pi).n()), S.Exp1) + + +def test_pow_issue_3516(): + assert 4**Rational(1, 4) == sqrt(2) + + +def test_pow_im(): + for m in (-2, -1, 2): + for d in (3, 4, 5): + b = m*I + for i in range(1, 4*d + 1): + e = Rational(i, d) + assert (b**e - b.n()**e.n()).n(2, chop=1e-10) == 0 + + e = Rational(7, 3) + assert (2*x*I)**e == 4*2**Rational(1, 3)*(I*x)**e # same as Wolfram Alpha + im = symbols('im', imaginary=True) + assert (2*im*I)**e == 4*2**Rational(1, 3)*(I*im)**e + + args = [I, I, I, I, 2] + e = Rational(1, 3) + ans = 2**e + assert Mul(*args, evaluate=False)**e == ans + assert Mul(*args)**e == ans + args = [I, I, I, 2] + e = Rational(1, 3) + ans = 2**e*(-I)**e + assert Mul(*args, evaluate=False)**e == ans + assert Mul(*args)**e == ans + args.append(-3) + ans = (6*I)**e + assert Mul(*args, evaluate=False)**e == ans + assert Mul(*args)**e == ans + args.append(-1) + ans = (-6*I)**e + assert Mul(*args, evaluate=False)**e == ans + assert Mul(*args)**e == ans + + args = [I, I, 2] + e = Rational(1, 3) + ans = (-2)**e + assert Mul(*args, evaluate=False)**e == ans + assert Mul(*args)**e == ans + args.append(-3) + ans = (6)**e + assert Mul(*args, evaluate=False)**e == ans + assert Mul(*args)**e == ans + args.append(-1) + ans = (-6)**e + assert Mul(*args, evaluate=False)**e == ans + assert Mul(*args)**e == ans + assert Mul(Pow(-1, Rational(3, 2), evaluate=False), I, I) == I + assert Mul(I*Pow(I, S.Half, evaluate=False)) == sqrt(I)*I + + +def test_real_mul(): + assert Float(0) * pi * x == 0 + assert set((Float(1) * pi * x).args) == {Float(1), pi, x} + + +def test_ncmul(): + A = Symbol("A", commutative=False) + B = Symbol("B", commutative=False) + C = Symbol("C", commutative=False) + assert A*B != B*A + assert A*B*C != C*B*A + assert A*b*B*3*C == 3*b*A*B*C + assert A*b*B*3*C != 3*b*B*A*C + assert A*b*B*3*C == 3*A*B*C*b + + assert A + B == B + A + assert (A + B)*C != C*(A + B) + + assert C*(A + B)*C != C*C*(A + B) + + assert A*A == A**2 + assert (A + B)*(A + B) == (A + B)**2 + + assert A**-1 * A == 1 + assert A/A == 1 + assert A/(A**2) == 1/A + + assert A/(1 + A) == A/(1 + A) + + assert set((A + B + 2*(A + B)).args) == \ + {A, B, 2*(A + B)} + + +def test_mul_add_identity(): + m = Mul(1, 2) + assert isinstance(m, Rational) and m.p == 2 and m.q == 1 + m = Mul(1, 2, evaluate=False) + assert isinstance(m, Mul) and m.args == (1, 2) + m = Mul(0, 1) + assert m is S.Zero + m = Mul(0, 1, evaluate=False) + assert isinstance(m, Mul) and m.args == (0, 1) + m = Add(0, 1) + assert m is S.One + m = Add(0, 1, evaluate=False) + assert isinstance(m, Add) and m.args == (0, 1) + + +def test_ncpow(): + x = Symbol('x', commutative=False) + y = Symbol('y', commutative=False) + z = Symbol('z', commutative=False) + a = Symbol('a') + b = Symbol('b') + c = Symbol('c') + + assert (x**2)*(y**2) != (y**2)*(x**2) + assert (x**-2)*y != y*(x**2) + assert 2**x*2**y != 2**(x + y) + assert 2**x*2**y*2**z != 2**(x + y + z) + assert 2**x*2**(2*x) == 2**(3*x) + assert 2**x*2**(2*x)*2**x == 2**(4*x) + assert exp(x)*exp(y) != exp(y)*exp(x) + assert exp(x)*exp(y)*exp(z) != exp(y)*exp(x)*exp(z) + assert exp(x)*exp(y)*exp(z) != exp(x + y + z) + assert x**a*x**b != x**(a + b) + assert x**a*x**b*x**c != x**(a + b + c) + assert x**3*x**4 == x**7 + assert x**3*x**4*x**2 == x**9 + assert x**a*x**(4*a) == x**(5*a) + assert x**a*x**(4*a)*x**a == x**(6*a) + + +def test_powerbug(): + x = Symbol("x") + assert x**1 != (-x)**1 + assert x**2 == (-x)**2 + assert x**3 != (-x)**3 + assert x**4 == (-x)**4 + assert x**5 != (-x)**5 + assert x**6 == (-x)**6 + + assert x**128 == (-x)**128 + assert x**129 != (-x)**129 + + assert (2*x)**2 == (-2*x)**2 + + +def test_Mul_doesnt_expand_exp(): + x = Symbol('x') + y = Symbol('y') + assert unchanged(Mul, exp(x), exp(y)) + assert unchanged(Mul, 2**x, 2**y) + assert x**2*x**3 == x**5 + assert 2**x*3**x == 6**x + assert x**(y)*x**(2*y) == x**(3*y) + assert sqrt(2)*sqrt(2) == 2 + assert 2**x*2**(2*x) == 2**(3*x) + assert sqrt(2)*2**Rational(1, 4)*5**Rational(3, 4) == 10**Rational(3, 4) + assert (x**(-log(5)/log(3))*x)/(x*x**( - log(5)/log(3))) == sympify(1) + + +def test_Mul_is_integer(): + k = Symbol('k', integer=True) + n = Symbol('n', integer=True) + nr = Symbol('nr', rational=False) + ir = Symbol('ir', irrational=True) + nz = Symbol('nz', integer=True, zero=False) + e = Symbol('e', even=True) + o = Symbol('o', odd=True) + i2 = Symbol('2', prime=True, even=True) + + assert (k/3).is_integer is None + assert (nz/3).is_integer is None + assert (nr/3).is_integer is False + assert (ir/3).is_integer is False + assert (x*k*n).is_integer is None + assert (e/2).is_integer is True + assert (e**2/2).is_integer is True + assert (2/k).is_integer is None + assert (2/k**2).is_integer is None + assert ((-1)**k*n).is_integer is True + assert (3*k*e/2).is_integer is True + assert (2*k*e/3).is_integer is None + assert (e/o).is_integer is None + assert (o/e).is_integer is False + assert (o/i2).is_integer is False + assert Mul(k, 1/k, evaluate=False).is_integer is None + assert Mul(2., S.Half, evaluate=False).is_integer is None + assert (2*sqrt(k)).is_integer is None + assert (2*k**n).is_integer is None + + s = 2**2**2**Pow(2, 1000, evaluate=False) + m = Mul(s, s, evaluate=False) + assert m.is_integer + + # broken in 1.6 and before, see #20161 + xq = Symbol('xq', rational=True) + yq = Symbol('yq', rational=True) + assert (xq*yq).is_integer is None + e_20161 = Mul(-1,Mul(1,Pow(2,-1,evaluate=False),evaluate=False),evaluate=False) + assert e_20161.is_integer is not True # expand(e_20161) -> -1/2, but no need to see that in the assumption without evaluation + + +def test_Add_Mul_is_integer(): + x = Symbol('x') + + k = Symbol('k', integer=True) + n = Symbol('n', integer=True) + nk = Symbol('nk', integer=False) + nr = Symbol('nr', rational=False) + nz = Symbol('nz', integer=True, zero=False) + + assert (-nk).is_integer is None + assert (-nr).is_integer is False + assert (2*k).is_integer is True + assert (-k).is_integer is True + + assert (k + nk).is_integer is False + assert (k + n).is_integer is True + assert (k + x).is_integer is None + assert (k + n*x).is_integer is None + assert (k + n/3).is_integer is None + assert (k + nz/3).is_integer is None + assert (k + nr/3).is_integer is False + + assert ((1 + sqrt(3))*(-sqrt(3) + 1)).is_integer is not False + assert (1 + (1 + sqrt(3))*(-sqrt(3) + 1)).is_integer is not False + + +def test_Add_Mul_is_finite(): + x = Symbol('x', extended_real=True, finite=False) + + assert sin(x).is_finite is True + assert (x*sin(x)).is_finite is None + assert (x*atan(x)).is_finite is False + assert (1024*sin(x)).is_finite is True + assert (sin(x)*exp(x)).is_finite is None + assert (sin(x)*cos(x)).is_finite is True + assert (x*sin(x)*exp(x)).is_finite is None + + assert (sin(x) - 67).is_finite is True + assert (sin(x) + exp(x)).is_finite is not True + assert (1 + x).is_finite is False + assert (1 + x**2 + (1 + x)*(1 - x)).is_finite is None + assert (sqrt(2)*(1 + x)).is_finite is False + assert (sqrt(2)*(1 + x)*(1 - x)).is_finite is False + + +def test_Mul_is_even_odd(): + x = Symbol('x', integer=True) + y = Symbol('y', integer=True) + + k = Symbol('k', odd=True) + n = Symbol('n', odd=True) + m = Symbol('m', even=True) + + assert (2*x).is_even is True + assert (2*x).is_odd is False + + assert (3*x).is_even is None + assert (3*x).is_odd is None + + assert (k/3).is_integer is None + assert (k/3).is_even is None + assert (k/3).is_odd is None + + assert (2*n).is_even is True + assert (2*n).is_odd is False + + assert (2*m).is_even is True + assert (2*m).is_odd is False + + assert (-n).is_even is False + assert (-n).is_odd is True + + assert (k*n).is_even is False + assert (k*n).is_odd is True + + assert (k*m).is_even is True + assert (k*m).is_odd is False + + assert (k*n*m).is_even is True + assert (k*n*m).is_odd is False + + assert (k*m*x).is_even is True + assert (k*m*x).is_odd is False + + # issue 6791: + assert (x/2).is_integer is None + assert (k/2).is_integer is False + assert (m/2).is_integer is True + + assert (x*y).is_even is None + assert (x*x).is_even is None + assert (x*(x + k)).is_even is True + assert (x*(x + m)).is_even is None + + assert (x*y).is_odd is None + assert (x*x).is_odd is None + assert (x*(x + k)).is_odd is False + assert (x*(x + m)).is_odd is None + + # issue 8648 + assert (m**2/2).is_even + assert (m**2/3).is_even is False + assert (2/m**2).is_odd is False + assert (2/m).is_odd is None + + +@XFAIL +def test_evenness_in_ternary_integer_product_with_odd(): + # Tests that oddness inference is independent of term ordering. + # Term ordering at the point of testing depends on SymPy's symbol order, so + # we try to force a different order by modifying symbol names. + x = Symbol('x', integer=True) + y = Symbol('y', integer=True) + k = Symbol('k', odd=True) + assert (x*y*(y + k)).is_even is True + assert (y*x*(x + k)).is_even is True + + +def test_evenness_in_ternary_integer_product_with_even(): + x = Symbol('x', integer=True) + y = Symbol('y', integer=True) + m = Symbol('m', even=True) + assert (x*y*(y + m)).is_even is None + + +@XFAIL +def test_oddness_in_ternary_integer_product_with_odd(): + # Tests that oddness inference is independent of term ordering. + # Term ordering at the point of testing depends on SymPy's symbol order, so + # we try to force a different order by modifying symbol names. + x = Symbol('x', integer=True) + y = Symbol('y', integer=True) + k = Symbol('k', odd=True) + assert (x*y*(y + k)).is_odd is False + assert (y*x*(x + k)).is_odd is False + + +def test_oddness_in_ternary_integer_product_with_even(): + x = Symbol('x', integer=True) + y = Symbol('y', integer=True) + m = Symbol('m', even=True) + assert (x*y*(y + m)).is_odd is None + + +def test_Mul_is_rational(): + x = Symbol('x') + n = Symbol('n', integer=True) + m = Symbol('m', integer=True, nonzero=True) + + assert (n/m).is_rational is True + assert (x/pi).is_rational is None + assert (x/n).is_rational is None + assert (m/pi).is_rational is False + + r = Symbol('r', rational=True) + assert (pi*r).is_rational is None + + # issue 8008 + z = Symbol('z', zero=True) + i = Symbol('i', imaginary=True) + assert (z*i).is_rational is True + bi = Symbol('i', imaginary=True, finite=True) + assert (z*bi).is_zero is True + + +def test_Add_is_rational(): + x = Symbol('x') + n = Symbol('n', rational=True) + m = Symbol('m', rational=True) + + assert (n + m).is_rational is True + assert (x + pi).is_rational is None + assert (x + n).is_rational is None + assert (n + pi).is_rational is False + + +def test_Add_is_even_odd(): + x = Symbol('x', integer=True) + + k = Symbol('k', odd=True) + n = Symbol('n', odd=True) + m = Symbol('m', even=True) + + assert (k + 7).is_even is True + assert (k + 7).is_odd is False + + assert (-k + 7).is_even is True + assert (-k + 7).is_odd is False + + assert (k - 12).is_even is False + assert (k - 12).is_odd is True + + assert (-k - 12).is_even is False + assert (-k - 12).is_odd is True + + assert (k + n).is_even is True + assert (k + n).is_odd is False + + assert (k + m).is_even is False + assert (k + m).is_odd is True + + assert (k + n + m).is_even is True + assert (k + n + m).is_odd is False + + assert (k + n + x + m).is_even is None + assert (k + n + x + m).is_odd is None + + +def test_Mul_is_negative_positive(): + x = Symbol('x', real=True) + y = Symbol('y', extended_real=False, complex=True) + z = Symbol('z', zero=True) + + e = 2*z + assert e.is_Mul and e.is_positive is False and e.is_negative is False + + neg = Symbol('neg', negative=True) + pos = Symbol('pos', positive=True) + nneg = Symbol('nneg', nonnegative=True) + npos = Symbol('npos', nonpositive=True) + + assert neg.is_negative is True + assert (-neg).is_negative is False + assert (2*neg).is_negative is True + + assert (2*pos)._eval_is_extended_negative() is False + assert (2*pos).is_negative is False + + assert pos.is_negative is False + assert (-pos).is_negative is True + assert (2*pos).is_negative is False + + assert (pos*neg).is_negative is True + assert (2*pos*neg).is_negative is True + assert (-pos*neg).is_negative is False + assert (pos*neg*y).is_negative is False # y.is_real=F; !real -> !neg + + assert nneg.is_negative is False + assert (-nneg).is_negative is None + assert (2*nneg).is_negative is False + + assert npos.is_negative is None + assert (-npos).is_negative is False + assert (2*npos).is_negative is None + + assert (nneg*npos).is_negative is None + + assert (neg*nneg).is_negative is None + assert (neg*npos).is_negative is False + + assert (pos*nneg).is_negative is False + assert (pos*npos).is_negative is None + + assert (npos*neg*nneg).is_negative is False + assert (npos*pos*nneg).is_negative is None + + assert (-npos*neg*nneg).is_negative is None + assert (-npos*pos*nneg).is_negative is False + + assert (17*npos*neg*nneg).is_negative is False + assert (17*npos*pos*nneg).is_negative is None + + assert (neg*npos*pos*nneg).is_negative is False + + assert (x*neg).is_negative is None + assert (nneg*npos*pos*x*neg).is_negative is None + + assert neg.is_positive is False + assert (-neg).is_positive is True + assert (2*neg).is_positive is False + + assert pos.is_positive is True + assert (-pos).is_positive is False + assert (2*pos).is_positive is True + + assert (pos*neg).is_positive is False + assert (2*pos*neg).is_positive is False + assert (-pos*neg).is_positive is True + assert (-pos*neg*y).is_positive is False # y.is_real=F; !real -> !neg + + assert nneg.is_positive is None + assert (-nneg).is_positive is False + assert (2*nneg).is_positive is None + + assert npos.is_positive is False + assert (-npos).is_positive is None + assert (2*npos).is_positive is False + + assert (nneg*npos).is_positive is False + + assert (neg*nneg).is_positive is False + assert (neg*npos).is_positive is None + + assert (pos*nneg).is_positive is None + assert (pos*npos).is_positive is False + + assert (npos*neg*nneg).is_positive is None + assert (npos*pos*nneg).is_positive is False + + assert (-npos*neg*nneg).is_positive is False + assert (-npos*pos*nneg).is_positive is None + + assert (17*npos*neg*nneg).is_positive is None + assert (17*npos*pos*nneg).is_positive is False + + assert (neg*npos*pos*nneg).is_positive is None + + assert (x*neg).is_positive is None + assert (nneg*npos*pos*x*neg).is_positive is None + + +def test_Mul_is_negative_positive_2(): + a = Symbol('a', nonnegative=True) + b = Symbol('b', nonnegative=True) + c = Symbol('c', nonpositive=True) + d = Symbol('d', nonpositive=True) + + assert (a*b).is_nonnegative is True + assert (a*b).is_negative is False + assert (a*b).is_zero is None + assert (a*b).is_positive is None + + assert (c*d).is_nonnegative is True + assert (c*d).is_negative is False + assert (c*d).is_zero is None + assert (c*d).is_positive is None + + assert (a*c).is_nonpositive is True + assert (a*c).is_positive is False + assert (a*c).is_zero is None + assert (a*c).is_negative is None + + +def test_Mul_is_nonpositive_nonnegative(): + x = Symbol('x', real=True) + + k = Symbol('k', negative=True) + n = Symbol('n', positive=True) + u = Symbol('u', nonnegative=True) + v = Symbol('v', nonpositive=True) + + assert k.is_nonpositive is True + assert (-k).is_nonpositive is False + assert (2*k).is_nonpositive is True + + assert n.is_nonpositive is False + assert (-n).is_nonpositive is True + assert (2*n).is_nonpositive is False + + assert (n*k).is_nonpositive is True + assert (2*n*k).is_nonpositive is True + assert (-n*k).is_nonpositive is False + + assert u.is_nonpositive is None + assert (-u).is_nonpositive is True + assert (2*u).is_nonpositive is None + + assert v.is_nonpositive is True + assert (-v).is_nonpositive is None + assert (2*v).is_nonpositive is True + + assert (u*v).is_nonpositive is True + + assert (k*u).is_nonpositive is True + assert (k*v).is_nonpositive is None + + assert (n*u).is_nonpositive is None + assert (n*v).is_nonpositive is True + + assert (v*k*u).is_nonpositive is None + assert (v*n*u).is_nonpositive is True + + assert (-v*k*u).is_nonpositive is True + assert (-v*n*u).is_nonpositive is None + + assert (17*v*k*u).is_nonpositive is None + assert (17*v*n*u).is_nonpositive is True + + assert (k*v*n*u).is_nonpositive is None + + assert (x*k).is_nonpositive is None + assert (u*v*n*x*k).is_nonpositive is None + + assert k.is_nonnegative is False + assert (-k).is_nonnegative is True + assert (2*k).is_nonnegative is False + + assert n.is_nonnegative is True + assert (-n).is_nonnegative is False + assert (2*n).is_nonnegative is True + + assert (n*k).is_nonnegative is False + assert (2*n*k).is_nonnegative is False + assert (-n*k).is_nonnegative is True + + assert u.is_nonnegative is True + assert (-u).is_nonnegative is None + assert (2*u).is_nonnegative is True + + assert v.is_nonnegative is None + assert (-v).is_nonnegative is True + assert (2*v).is_nonnegative is None + + assert (u*v).is_nonnegative is None + + assert (k*u).is_nonnegative is None + assert (k*v).is_nonnegative is True + + assert (n*u).is_nonnegative is True + assert (n*v).is_nonnegative is None + + assert (v*k*u).is_nonnegative is True + assert (v*n*u).is_nonnegative is None + + assert (-v*k*u).is_nonnegative is None + assert (-v*n*u).is_nonnegative is True + + assert (17*v*k*u).is_nonnegative is True + assert (17*v*n*u).is_nonnegative is None + + assert (k*v*n*u).is_nonnegative is True + + assert (x*k).is_nonnegative is None + assert (u*v*n*x*k).is_nonnegative is None + + +def test_Add_is_negative_positive(): + x = Symbol('x', real=True) + + k = Symbol('k', negative=True) + n = Symbol('n', positive=True) + u = Symbol('u', nonnegative=True) + v = Symbol('v', nonpositive=True) + + assert (k - 2).is_negative is True + assert (k + 17).is_negative is None + assert (-k - 5).is_negative is None + assert (-k + 123).is_negative is False + + assert (k - n).is_negative is True + assert (k + n).is_negative is None + assert (-k - n).is_negative is None + assert (-k + n).is_negative is False + + assert (k - n - 2).is_negative is True + assert (k + n + 17).is_negative is None + assert (-k - n - 5).is_negative is None + assert (-k + n + 123).is_negative is False + + assert (-2*k + 123*n + 17).is_negative is False + + assert (k + u).is_negative is None + assert (k + v).is_negative is True + assert (n + u).is_negative is False + assert (n + v).is_negative is None + + assert (u - v).is_negative is False + assert (u + v).is_negative is None + assert (-u - v).is_negative is None + assert (-u + v).is_negative is None + + assert (u - v + n + 2).is_negative is False + assert (u + v + n + 2).is_negative is None + assert (-u - v + n + 2).is_negative is None + assert (-u + v + n + 2).is_negative is None + + assert (k + x).is_negative is None + assert (k + x - n).is_negative is None + + assert (k - 2).is_positive is False + assert (k + 17).is_positive is None + assert (-k - 5).is_positive is None + assert (-k + 123).is_positive is True + + assert (k - n).is_positive is False + assert (k + n).is_positive is None + assert (-k - n).is_positive is None + assert (-k + n).is_positive is True + + assert (k - n - 2).is_positive is False + assert (k + n + 17).is_positive is None + assert (-k - n - 5).is_positive is None + assert (-k + n + 123).is_positive is True + + assert (-2*k + 123*n + 17).is_positive is True + + assert (k + u).is_positive is None + assert (k + v).is_positive is False + assert (n + u).is_positive is True + assert (n + v).is_positive is None + + assert (u - v).is_positive is None + assert (u + v).is_positive is None + assert (-u - v).is_positive is None + assert (-u + v).is_positive is False + + assert (u - v - n - 2).is_positive is None + assert (u + v - n - 2).is_positive is None + assert (-u - v - n - 2).is_positive is None + assert (-u + v - n - 2).is_positive is False + + assert (n + x).is_positive is None + assert (n + x - k).is_positive is None + + z = (-3 - sqrt(5) + (-sqrt(10)/2 - sqrt(2)/2)**2) + assert z.is_zero + z = sqrt(1 + sqrt(3)) + sqrt(3 + 3*sqrt(3)) - sqrt(10 + 6*sqrt(3)) + assert z.is_zero + + +def test_Add_is_nonpositive_nonnegative(): + x = Symbol('x', real=True) + + k = Symbol('k', negative=True) + n = Symbol('n', positive=True) + u = Symbol('u', nonnegative=True) + v = Symbol('v', nonpositive=True) + + assert (u - 2).is_nonpositive is None + assert (u + 17).is_nonpositive is False + assert (-u - 5).is_nonpositive is True + assert (-u + 123).is_nonpositive is None + + assert (u - v).is_nonpositive is None + assert (u + v).is_nonpositive is None + assert (-u - v).is_nonpositive is None + assert (-u + v).is_nonpositive is True + + assert (u - v - 2).is_nonpositive is None + assert (u + v + 17).is_nonpositive is None + assert (-u - v - 5).is_nonpositive is None + assert (-u + v - 123).is_nonpositive is True + + assert (-2*u + 123*v - 17).is_nonpositive is True + + assert (k + u).is_nonpositive is None + assert (k + v).is_nonpositive is True + assert (n + u).is_nonpositive is False + assert (n + v).is_nonpositive is None + + assert (k - n).is_nonpositive is True + assert (k + n).is_nonpositive is None + assert (-k - n).is_nonpositive is None + assert (-k + n).is_nonpositive is False + + assert (k - n + u + 2).is_nonpositive is None + assert (k + n + u + 2).is_nonpositive is None + assert (-k - n + u + 2).is_nonpositive is None + assert (-k + n + u + 2).is_nonpositive is False + + assert (u + x).is_nonpositive is None + assert (v - x - n).is_nonpositive is None + + assert (u - 2).is_nonnegative is None + assert (u + 17).is_nonnegative is True + assert (-u - 5).is_nonnegative is False + assert (-u + 123).is_nonnegative is None + + assert (u - v).is_nonnegative is True + assert (u + v).is_nonnegative is None + assert (-u - v).is_nonnegative is None + assert (-u + v).is_nonnegative is None + + assert (u - v + 2).is_nonnegative is True + assert (u + v + 17).is_nonnegative is None + assert (-u - v - 5).is_nonnegative is None + assert (-u + v - 123).is_nonnegative is False + + assert (2*u - 123*v + 17).is_nonnegative is True + + assert (k + u).is_nonnegative is None + assert (k + v).is_nonnegative is False + assert (n + u).is_nonnegative is True + assert (n + v).is_nonnegative is None + + assert (k - n).is_nonnegative is False + assert (k + n).is_nonnegative is None + assert (-k - n).is_nonnegative is None + assert (-k + n).is_nonnegative is True + + assert (k - n - u - 2).is_nonnegative is False + assert (k + n - u - 2).is_nonnegative is None + assert (-k - n - u - 2).is_nonnegative is None + assert (-k + n - u - 2).is_nonnegative is None + + assert (u - x).is_nonnegative is None + assert (v + x + n).is_nonnegative is None + + +def test_Pow_is_integer(): + x = Symbol('x') + + k = Symbol('k', integer=True) + n = Symbol('n', integer=True, nonnegative=True) + m = Symbol('m', integer=True, positive=True) + + assert (k**2).is_integer is True + assert (k**(-2)).is_integer is None + assert ((m + 1)**(-2)).is_integer is False + assert (m**(-1)).is_integer is None # issue 8580 + + assert (2**k).is_integer is None + assert (2**(-k)).is_integer is None + + assert (2**n).is_integer is True + assert (2**(-n)).is_integer is None + + assert (2**m).is_integer is True + assert (2**(-m)).is_integer is False + + assert (x**2).is_integer is None + assert (2**x).is_integer is None + + assert (k**n).is_integer is True + assert (k**(-n)).is_integer is None + + assert (k**x).is_integer is None + assert (x**k).is_integer is None + + assert (k**(n*m)).is_integer is True + assert (k**(-n*m)).is_integer is None + + assert sqrt(3).is_integer is False + assert sqrt(.3).is_integer is False + assert Pow(3, 2, evaluate=False).is_integer is True + assert Pow(3, 0, evaluate=False).is_integer is True + assert Pow(3, -2, evaluate=False).is_integer is False + assert Pow(S.Half, 3, evaluate=False).is_integer is False + # decided by re-evaluating + assert Pow(3, S.Half, evaluate=False).is_integer is False + assert Pow(3, S.Half, evaluate=False).is_integer is False + assert Pow(4, S.Half, evaluate=False).is_integer is True + assert Pow(S.Half, -2, evaluate=False).is_integer is True + + assert ((-1)**k).is_integer + + # issue 8641 + x = Symbol('x', real=True, integer=False) + assert (x**2).is_integer is None + + # issue 10458 + x = Symbol('x', positive=True) + assert (1/(x + 1)).is_integer is False + assert (1/(-x - 1)).is_integer is False + assert (-1/(x + 1)).is_integer is False + # issue 23287 + assert (x**2/2).is_integer is None + + # issue 8648-like + k = Symbol('k', even=True) + assert (k**3/2).is_integer + assert (k**3/8).is_integer + assert (k**3/16).is_integer is None + assert (2/k).is_integer is None + assert (2/k**2).is_integer is False + o = Symbol('o', odd=True) + assert (k/o).is_integer is None + o = Symbol('o', odd=True, prime=True) + assert (k/o).is_integer is False + + +def test_Pow_is_real(): + x = Symbol('x', real=True) + y = Symbol('y', positive=True) + + assert (x**2).is_real is True + assert (x**3).is_real is True + assert (x**x).is_real is None + assert (y**x).is_real is True + + assert (x**Rational(1, 3)).is_real is None + assert (y**Rational(1, 3)).is_real is True + + assert sqrt(-1 - sqrt(2)).is_real is False + + i = Symbol('i', imaginary=True) + assert (i**i).is_real is None + assert (I**i).is_extended_real is True + assert ((-I)**i).is_extended_real is True + assert (2**i).is_real is None # (2**(pi/log(2) * I)) is real, 2**I is not + assert (2**I).is_real is False + assert (2**-I).is_real is False + assert (i**2).is_extended_real is True + assert (i**3).is_extended_real is False + assert (i**x).is_real is None # could be (-I)**(2/3) + e = Symbol('e', even=True) + o = Symbol('o', odd=True) + k = Symbol('k', integer=True) + assert (i**e).is_extended_real is True + assert (i**o).is_extended_real is False + assert (i**k).is_real is None + assert (i**(4*k)).is_extended_real is True + + x = Symbol("x", nonnegative=True) + y = Symbol("y", nonnegative=True) + assert im(x**y).expand(complex=True) is S.Zero + assert (x**y).is_real is True + i = Symbol('i', imaginary=True) + assert (exp(i)**I).is_extended_real is True + assert log(exp(i)).is_imaginary is None # i could be 2*pi*I + c = Symbol('c', complex=True) + assert log(c).is_real is None # c could be 0 or 2, too + assert log(exp(c)).is_real is None # log(0), log(E), ... + n = Symbol('n', negative=False) + assert log(n).is_real is None + n = Symbol('n', nonnegative=True) + assert log(n).is_real is None + + assert sqrt(-I).is_real is False # issue 7843 + + i = Symbol('i', integer=True) + assert (1/(i-1)).is_real is None + assert (1/(i-1)).is_extended_real is None + + # test issue 20715 + from sympy.core.parameters import evaluate + x = S(-1) + with evaluate(False): + assert x.is_negative is True + + f = Pow(x, -1) + with evaluate(False): + assert f.is_imaginary is False + + +def test_real_Pow(): + k = Symbol('k', integer=True, nonzero=True) + assert (k**(I*pi/log(k))).is_real + + +def test_Pow_is_finite(): + xe = Symbol('xe', extended_real=True) + xr = Symbol('xr', real=True) + p = Symbol('p', positive=True) + n = Symbol('n', negative=True) + i = Symbol('i', integer=True) + + assert (xe**2).is_finite is None # xe could be oo + assert (xr**2).is_finite is True + + assert (xe**xe).is_finite is None + assert (xr**xe).is_finite is None + assert (xe**xr).is_finite is None + # FIXME: The line below should be True rather than None + # assert (xr**xr).is_finite is True + assert (xr**xr).is_finite is None + + assert (p**xe).is_finite is None + assert (p**xr).is_finite is True + + assert (n**xe).is_finite is None + assert (n**xr).is_finite is True + + assert (sin(xe)**2).is_finite is True + assert (sin(xr)**2).is_finite is True + + assert (sin(xe)**xe).is_finite is None # xe, xr could be -pi + assert (sin(xr)**xr).is_finite is None + + # FIXME: Should the line below be True rather than None? + assert (sin(xe)**exp(xe)).is_finite is None + assert (sin(xr)**exp(xr)).is_finite is True + + assert (1/sin(xe)).is_finite is None # if zero, no, otherwise yes + assert (1/sin(xr)).is_finite is None + + assert (1/exp(xe)).is_finite is None # xe could be -oo + assert (1/exp(xr)).is_finite is True + + assert (1/S.Pi).is_finite is True + + assert (1/(i-1)).is_finite is None + + +def test_Pow_is_even_odd(): + x = Symbol('x') + + k = Symbol('k', even=True) + n = Symbol('n', odd=True) + m = Symbol('m', integer=True, nonnegative=True) + p = Symbol('p', integer=True, positive=True) + + assert ((-1)**n).is_odd + assert ((-1)**k).is_odd + assert ((-1)**(m - p)).is_odd + + assert (k**2).is_even is True + assert (n**2).is_even is False + assert (2**k).is_even is None + assert (x**2).is_even is None + + assert (k**m).is_even is None + assert (n**m).is_even is False + + assert (k**p).is_even is True + assert (n**p).is_even is False + + assert (m**k).is_even is None + assert (p**k).is_even is None + + assert (m**n).is_even is None + assert (p**n).is_even is None + + assert (k**x).is_even is None + assert (n**x).is_even is None + + assert (k**2).is_odd is False + assert (n**2).is_odd is True + assert (3**k).is_odd is None + + assert (k**m).is_odd is None + assert (n**m).is_odd is True + + assert (k**p).is_odd is False + assert (n**p).is_odd is True + + assert (m**k).is_odd is None + assert (p**k).is_odd is None + + assert (m**n).is_odd is None + assert (p**n).is_odd is None + + assert (k**x).is_odd is None + assert (n**x).is_odd is None + + +def test_Pow_is_negative_positive(): + r = Symbol('r', real=True) + + k = Symbol('k', integer=True, positive=True) + n = Symbol('n', even=True) + m = Symbol('m', odd=True) + + x = Symbol('x') + + assert (2**r).is_positive is True + assert ((-2)**r).is_positive is None + assert ((-2)**n).is_positive is True + assert ((-2)**m).is_positive is False + + assert (k**2).is_positive is True + assert (k**(-2)).is_positive is True + + assert (k**r).is_positive is True + assert ((-k)**r).is_positive is None + assert ((-k)**n).is_positive is True + assert ((-k)**m).is_positive is False + + assert (2**r).is_negative is False + assert ((-2)**r).is_negative is None + assert ((-2)**n).is_negative is False + assert ((-2)**m).is_negative is True + + assert (k**2).is_negative is False + assert (k**(-2)).is_negative is False + + assert (k**r).is_negative is False + assert ((-k)**r).is_negative is None + assert ((-k)**n).is_negative is False + assert ((-k)**m).is_negative is True + + assert (2**x).is_positive is None + assert (2**x).is_negative is None + + +def test_Pow_is_zero(): + z = Symbol('z', zero=True) + e = z**2 + assert e.is_zero + assert e.is_positive is False + assert e.is_negative is False + + assert Pow(0, 0, evaluate=False).is_zero is False + assert Pow(0, 3, evaluate=False).is_zero + assert Pow(0, oo, evaluate=False).is_zero + assert Pow(0, -3, evaluate=False).is_zero is False + assert Pow(0, -oo, evaluate=False).is_zero is False + assert Pow(2, 2, evaluate=False).is_zero is False + + a = Symbol('a', zero=False) + assert Pow(a, 3).is_zero is False # issue 7965 + + assert Pow(2, oo, evaluate=False).is_zero is False + assert Pow(2, -oo, evaluate=False).is_zero + assert Pow(S.Half, oo, evaluate=False).is_zero + assert Pow(S.Half, -oo, evaluate=False).is_zero is False + + # All combinations of real/complex base/exponent + h = S.Half + T = True + F = False + N = None + + pow_iszero = [ + ['**', 0, h, 1, 2, -h, -1,-2,-2*I,-I/2,I/2,1+I,oo,-oo,zoo], + [ 0, F, T, T, T, F, F, F, F, F, F, N, T, F, N], + [ h, F, F, F, F, F, F, F, F, F, F, F, T, F, N], + [ 1, F, F, F, F, F, F, F, F, F, F, F, F, F, N], + [ 2, F, F, F, F, F, F, F, F, F, F, F, F, T, N], + [ -h, F, F, F, F, F, F, F, F, F, F, F, T, F, N], + [ -1, F, F, F, F, F, F, F, F, F, F, F, F, F, N], + [ -2, F, F, F, F, F, F, F, F, F, F, F, F, T, N], + [-2*I, F, F, F, F, F, F, F, F, F, F, F, F, T, N], + [-I/2, F, F, F, F, F, F, F, F, F, F, F, T, F, N], + [ I/2, F, F, F, F, F, F, F, F, F, F, F, T, F, N], + [ 1+I, F, F, F, F, F, F, F, F, F, F, F, F, T, N], + [ oo, F, F, F, F, T, T, T, F, F, F, F, F, T, N], + [ -oo, F, F, F, F, T, T, T, F, F, F, F, F, T, N], + [ zoo, F, F, F, F, T, T, T, N, N, N, N, F, T, N] + ] + + def test_table(table): + n = len(table[0]) + for row in range(1, n): + base = table[row][0] + for col in range(1, n): + exp = table[0][col] + is_zero = table[row][col] + # The actual test here: + assert Pow(base, exp, evaluate=False).is_zero is is_zero + + test_table(pow_iszero) + + # A zero symbol... + zo, zo2 = symbols('zo, zo2', zero=True) + + # All combinations of finite symbols + zf, zf2 = symbols('zf, zf2', finite=True) + wf, wf2 = symbols('wf, wf2', nonzero=True) + xf, xf2 = symbols('xf, xf2', real=True) + yf, yf2 = symbols('yf, yf2', nonzero=True) + af, af2 = symbols('af, af2', positive=True) + bf, bf2 = symbols('bf, bf2', nonnegative=True) + cf, cf2 = symbols('cf, cf2', negative=True) + df, df2 = symbols('df, df2', nonpositive=True) + + # Without finiteness: + zi, zi2 = symbols('zi, zi2') + wi, wi2 = symbols('wi, wi2', zero=False) + xi, xi2 = symbols('xi, xi2', extended_real=True) + yi, yi2 = symbols('yi, yi2', zero=False, extended_real=True) + ai, ai2 = symbols('ai, ai2', extended_positive=True) + bi, bi2 = symbols('bi, bi2', extended_nonnegative=True) + ci, ci2 = symbols('ci, ci2', extended_negative=True) + di, di2 = symbols('di, di2', extended_nonpositive=True) + + pow_iszero_sym = [ + ['**',zo,wf,yf,af,cf,zf,xf,bf,df,zi,wi,xi,yi,ai,bi,ci,di], + [ zo2, F, N, N, T, F, N, N, N, F, N, N, N, N, T, N, F, F], + [ wf2, F, F, F, F, F, F, F, F, F, N, N, N, N, N, N, N, N], + [ yf2, F, F, F, F, F, F, F, F, F, N, N, N, N, N, N, N, N], + [ af2, F, F, F, F, F, F, F, F, F, N, N, N, N, N, N, N, N], + [ cf2, F, F, F, F, F, F, F, F, F, N, N, N, N, N, N, N, N], + [ zf2, N, N, N, N, F, N, N, N, N, N, N, N, N, N, N, N, N], + [ xf2, N, N, N, N, F, N, N, N, N, N, N, N, N, N, N, N, N], + [ bf2, N, N, N, N, F, N, N, N, N, N, N, N, N, N, N, N, N], + [ df2, N, N, N, N, F, N, N, N, N, N, N, N, N, N, N, N, N], + [ zi2, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N], + [ wi2, F, N, N, F, N, N, N, F, N, N, N, N, N, N, N, N, N], + [ xi2, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N], + [ yi2, F, N, N, F, N, N, N, F, N, N, N, N, N, N, N, N, N], + [ ai2, F, N, N, F, N, N, N, F, N, N, N, N, N, N, N, N, N], + [ bi2, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N], + [ ci2, F, N, N, F, N, N, N, F, N, N, N, N, N, N, N, N, N], + [ di2, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N, N] + ] + + test_table(pow_iszero_sym) + + # In some cases (x**x).is_zero is different from (x**y).is_zero even if y + # has the same assumptions as x. + assert (zo ** zo).is_zero is False + assert (wf ** wf).is_zero is False + assert (yf ** yf).is_zero is False + assert (af ** af).is_zero is False + assert (cf ** cf).is_zero is False + assert (zf ** zf).is_zero is None + assert (xf ** xf).is_zero is None + assert (bf ** bf).is_zero is False # None in table + assert (df ** df).is_zero is None + assert (zi ** zi).is_zero is None + assert (wi ** wi).is_zero is None + assert (xi ** xi).is_zero is None + assert (yi ** yi).is_zero is None + assert (ai ** ai).is_zero is False # None in table + assert (bi ** bi).is_zero is False # None in table + assert (ci ** ci).is_zero is None + assert (di ** di).is_zero is None + + +def test_Pow_is_nonpositive_nonnegative(): + x = Symbol('x', real=True) + + k = Symbol('k', integer=True, nonnegative=True) + l = Symbol('l', integer=True, positive=True) + n = Symbol('n', even=True) + m = Symbol('m', odd=True) + + assert (x**(4*k)).is_nonnegative is True + assert (2**x).is_nonnegative is True + assert ((-2)**x).is_nonnegative is None + assert ((-2)**n).is_nonnegative is True + assert ((-2)**m).is_nonnegative is False + + assert (k**2).is_nonnegative is True + assert (k**(-2)).is_nonnegative is None + assert (k**k).is_nonnegative is True + + assert (k**x).is_nonnegative is None # NOTE (0**x).is_real = U + assert (l**x).is_nonnegative is True + assert (l**x).is_positive is True + assert ((-k)**x).is_nonnegative is None + + assert ((-k)**m).is_nonnegative is None + + assert (2**x).is_nonpositive is False + assert ((-2)**x).is_nonpositive is None + assert ((-2)**n).is_nonpositive is False + assert ((-2)**m).is_nonpositive is True + + assert (k**2).is_nonpositive is None + assert (k**(-2)).is_nonpositive is None + + assert (k**x).is_nonpositive is None + assert ((-k)**x).is_nonpositive is None + assert ((-k)**n).is_nonpositive is None + + + assert (x**2).is_nonnegative is True + i = symbols('i', imaginary=True) + assert (i**2).is_nonpositive is True + assert (i**4).is_nonpositive is False + assert (i**3).is_nonpositive is False + assert (I**i).is_nonnegative is True + assert (exp(I)**i).is_nonnegative is True + + assert ((-l)**n).is_nonnegative is True + assert ((-l)**m).is_nonpositive is True + assert ((-k)**n).is_nonnegative is None + assert ((-k)**m).is_nonpositive is None + + +def test_Mul_is_imaginary_real(): + r = Symbol('r', real=True) + p = Symbol('p', positive=True) + i1 = Symbol('i1', imaginary=True) + i2 = Symbol('i2', imaginary=True) + x = Symbol('x') + + assert I.is_imaginary is True + assert I.is_real is False + assert (-I).is_imaginary is True + assert (-I).is_real is False + assert (3*I).is_imaginary is True + assert (3*I).is_real is False + assert (I*I).is_imaginary is False + assert (I*I).is_real is True + + e = (p + p*I) + j = Symbol('j', integer=True, zero=False) + assert (e**j).is_real is None + assert (e**(2*j)).is_real is None + assert (e**j).is_imaginary is None + assert (e**(2*j)).is_imaginary is None + + assert (e**-1).is_imaginary is False + assert (e**2).is_imaginary + assert (e**3).is_imaginary is False + assert (e**4).is_imaginary is False + assert (e**5).is_imaginary is False + assert (e**-1).is_real is False + assert (e**2).is_real is False + assert (e**3).is_real is False + assert (e**4).is_real is True + assert (e**5).is_real is False + assert (e**3).is_complex + + assert (r*i1).is_imaginary is None + assert (r*i1).is_real is None + + assert (x*i1).is_imaginary is None + assert (x*i1).is_real is None + + assert (i1*i2).is_imaginary is False + assert (i1*i2).is_real is True + + assert (r*i1*i2).is_imaginary is False + assert (r*i1*i2).is_real is True + + # Github's issue 5874: + nr = Symbol('nr', real=False, complex=True) # e.g. I or 1 + I + a = Symbol('a', real=True, nonzero=True) + b = Symbol('b', real=True) + assert (i1*nr).is_real is None + assert (a*nr).is_real is False + assert (b*nr).is_real is None + + ni = Symbol('ni', imaginary=False, complex=True) # e.g. 2 or 1 + I + a = Symbol('a', real=True, nonzero=True) + b = Symbol('b', real=True) + assert (i1*ni).is_real is False + assert (a*ni).is_real is None + assert (b*ni).is_real is None + + +def test_Mul_hermitian_antihermitian(): + xz, yz = symbols('xz, yz', zero=True, antihermitian=True) + xf, yf = symbols('xf, yf', hermitian=False, antihermitian=False, finite=True) + xh, yh = symbols('xh, yh', hermitian=True, antihermitian=False, nonzero=True) + xa, ya = symbols('xa, ya', hermitian=False, antihermitian=True, zero=False, finite=True) + assert (xz*xh).is_hermitian is True + assert (xz*xh).is_antihermitian is True + assert (xz*xa).is_hermitian is True + assert (xz*xa).is_antihermitian is True + assert (xf*yf).is_hermitian is None + assert (xf*yf).is_antihermitian is None + assert (xh*yh).is_hermitian is True + assert (xh*yh).is_antihermitian is False + assert (xh*ya).is_hermitian is False + assert (xh*ya).is_antihermitian is True + assert (xa*ya).is_hermitian is True + assert (xa*ya).is_antihermitian is False + + a = Symbol('a', hermitian=True, zero=False) + b = Symbol('b', hermitian=True) + c = Symbol('c', hermitian=False) + d = Symbol('d', antihermitian=True) + e1 = Mul(a, b, c, evaluate=False) + e2 = Mul(b, a, c, evaluate=False) + e3 = Mul(a, b, c, d, evaluate=False) + e4 = Mul(b, a, c, d, evaluate=False) + e5 = Mul(a, c, evaluate=False) + e6 = Mul(a, c, d, evaluate=False) + assert e1.is_hermitian is None + assert e2.is_hermitian is None + assert e1.is_antihermitian is None + assert e2.is_antihermitian is None + assert e3.is_antihermitian is None + assert e4.is_antihermitian is None + assert e5.is_antihermitian is None + assert e6.is_antihermitian is None + + +def test_Add_is_comparable(): + assert (x + y).is_comparable is False + assert (x + 1).is_comparable is False + assert (Rational(1, 3) - sqrt(8)).is_comparable is True + + +def test_Mul_is_comparable(): + assert (x*y).is_comparable is False + assert (x*2).is_comparable is False + assert (sqrt(2)*Rational(1, 3)).is_comparable is True + + +def test_Pow_is_comparable(): + assert (x**y).is_comparable is False + assert (x**2).is_comparable is False + assert (sqrt(Rational(1, 3))).is_comparable is True + + +def test_Add_is_positive_2(): + e = Rational(1, 3) - sqrt(8) + assert e.is_positive is False + assert e.is_negative is True + + e = pi - 1 + assert e.is_positive is True + assert e.is_negative is False + + +def test_Add_is_irrational(): + i = Symbol('i', irrational=True) + + assert i.is_irrational is True + assert i.is_rational is False + + assert (i + 1).is_irrational is True + assert (i + 1).is_rational is False + + +def test_Mul_is_irrational(): + expr = Mul(1, 2, 3, evaluate=False) + assert expr.is_irrational is False + expr = Mul(1, I, I, evaluate=False) + assert expr.is_rational is None # I * I = -1 but *no evaluation allowed* + # sqrt(2) * I * I = -sqrt(2) is irrational but + # this can't be determined without evaluating the + # expression and the eval_is routines shouldn't do that + expr = Mul(sqrt(2), I, I, evaluate=False) + assert expr.is_irrational is None + + +def test_issue_3531(): + # https://github.com/sympy/sympy/issues/3531 + # https://github.com/sympy/sympy/pull/18116 + class MightyNumeric(tuple): + __slots__ = () + + def __rtruediv__(self, other): + return "something" + + assert sympify(1)/MightyNumeric((1, 2)) == "something" + + +def test_issue_3531b(): + class Foo: + def __init__(self): + self.field = 1.0 + + def __mul__(self, other): + self.field = self.field * other + + def __rmul__(self, other): + self.field = other * self.field + f = Foo() + x = Symbol("x") + assert f*x == x*f + + +def test_bug3(): + a = Symbol("a") + b = Symbol("b", positive=True) + e = 2*a + b + f = b + 2*a + assert e == f + + +def test_suppressed_evaluation(): + a = Add(0, 3, 2, evaluate=False) + b = Mul(1, 3, 2, evaluate=False) + c = Pow(3, 2, evaluate=False) + assert a != 6 + assert a.func is Add + assert a.args == (0, 3, 2) + assert b != 6 + assert b.func is Mul + assert b.args == (1, 3, 2) + assert c != 9 + assert c.func is Pow + assert c.args == (3, 2) + + +def test_AssocOp_doit(): + a = Add(x,x, evaluate=False) + b = Mul(y,y, evaluate=False) + c = Add(b,b, evaluate=False) + d = Mul(a,a, evaluate=False) + assert c.doit(deep=False).func == Mul + assert c.doit(deep=False).args == (2,y,y) + assert c.doit().func == Mul + assert c.doit().args == (2, Pow(y,2)) + assert d.doit(deep=False).func == Pow + assert d.doit(deep=False).args == (a, 2*S.One) + assert d.doit().func == Mul + assert d.doit().args == (4*S.One, Pow(x,2)) + + +def test_Add_Mul_Expr_args(): + nonexpr = [Basic(), Poly(x, x), FiniteSet(x)] + for typ in [Add, Mul]: + for obj in nonexpr: + # The cache can mess with the stacklevel check + with warns(SymPyDeprecationWarning, test_stacklevel=False): + typ(obj, 1) + + +def test_Add_as_coeff_mul(): + # issue 5524. These should all be (1, self) + assert (x + 1).as_coeff_mul() == (1, (x + 1,)) + assert (x + 2).as_coeff_mul() == (1, (x + 2,)) + assert (x + 3).as_coeff_mul() == (1, (x + 3,)) + + assert (x - 1).as_coeff_mul() == (1, (x - 1,)) + assert (x - 2).as_coeff_mul() == (1, (x - 2,)) + assert (x - 3).as_coeff_mul() == (1, (x - 3,)) + + n = Symbol('n', integer=True) + assert (n + 1).as_coeff_mul() == (1, (n + 1,)) + assert (n + 2).as_coeff_mul() == (1, (n + 2,)) + assert (n + 3).as_coeff_mul() == (1, (n + 3,)) + + assert (n - 1).as_coeff_mul() == (1, (n - 1,)) + assert (n - 2).as_coeff_mul() == (1, (n - 2,)) + assert (n - 3).as_coeff_mul() == (1, (n - 3,)) + + +def test_Pow_as_coeff_mul_doesnt_expand(): + assert exp(x + y).as_coeff_mul() == (1, (exp(x + y),)) + assert exp(x + exp(x + y)) != exp(x + exp(x)*exp(y)) + +def test_issue_24751(): + expr = Add(-2, -3, evaluate=False) + expr1 = Add(-1, expr, evaluate=False) + assert int(expr1) == int((-3 - 2) - 1) + + +def test_issue_3514_18626(): + assert sqrt(S.Half) * sqrt(6) == 2 * sqrt(3)/2 + assert S.Half*sqrt(6)*sqrt(2) == sqrt(3) + assert sqrt(6)/2*sqrt(2) == sqrt(3) + assert sqrt(6)*sqrt(2)/2 == sqrt(3) + assert sqrt(8)**Rational(2, 3) == 2 + + +def test_make_args(): + assert Add.make_args(x) == (x,) + assert Mul.make_args(x) == (x,) + + assert Add.make_args(x*y*z) == (x*y*z,) + assert Mul.make_args(x*y*z) == (x*y*z).args + + assert Add.make_args(x + y + z) == (x + y + z).args + assert Mul.make_args(x + y + z) == (x + y + z,) + + assert Add.make_args((x + y)**z) == ((x + y)**z,) + assert Mul.make_args((x + y)**z) == ((x + y)**z,) + + +def test_issue_5126(): + assert (-2)**x*(-3)**x != 6**x + i = Symbol('i', integer=1) + assert (-2)**i*(-3)**i == 6**i + + +def test_Rational_as_content_primitive(): + c, p = S.One, S.Zero + assert (c*p).as_content_primitive() == (c, p) + c, p = S.Half, S.One + assert (c*p).as_content_primitive() == (c, p) + + +def test_Add_as_content_primitive(): + assert (x + 2).as_content_primitive() == (1, x + 2) + + assert (3*x + 2).as_content_primitive() == (1, 3*x + 2) + assert (3*x + 3).as_content_primitive() == (3, x + 1) + assert (3*x + 6).as_content_primitive() == (3, x + 2) + + assert (3*x + 2*y).as_content_primitive() == (1, 3*x + 2*y) + assert (3*x + 3*y).as_content_primitive() == (3, x + y) + assert (3*x + 6*y).as_content_primitive() == (3, x + 2*y) + + assert (3/x + 2*x*y*z**2).as_content_primitive() == (1, 3/x + 2*x*y*z**2) + assert (3/x + 3*x*y*z**2).as_content_primitive() == (3, 1/x + x*y*z**2) + assert (3/x + 6*x*y*z**2).as_content_primitive() == (3, 1/x + 2*x*y*z**2) + + assert (2*x/3 + 4*y/9).as_content_primitive() == \ + (Rational(2, 9), 3*x + 2*y) + assert (2*x/3 + 2.5*y).as_content_primitive() == \ + (Rational(1, 3), 2*x + 7.5*y) + + # the coefficient may sort to a position other than 0 + p = 3 + x + y + assert (2*p).expand().as_content_primitive() == (2, p) + assert (2.0*p).expand().as_content_primitive() == (1, 2.*p) + p *= -1 + assert (2*p).expand().as_content_primitive() == (2, p) + + +def test_Mul_as_content_primitive(): + assert (2*x).as_content_primitive() == (2, x) + assert (x*(2 + 2*x)).as_content_primitive() == (2, x*(1 + x)) + assert (x*(2 + 2*y)*(3*x + 3)**2).as_content_primitive() == \ + (18, x*(1 + y)*(x + 1)**2) + assert ((2 + 2*x)**2*(3 + 6*x) + S.Half).as_content_primitive() == \ + (S.Half, 24*(x + 1)**2*(2*x + 1) + 1) + + +def test_Pow_as_content_primitive(): + assert (x**y).as_content_primitive() == (1, x**y) + assert ((2*x + 2)**y).as_content_primitive() == \ + (1, (Mul(2, (x + 1), evaluate=False))**y) + assert ((2*x + 2)**3).as_content_primitive() == (8, (x + 1)**3) + + +def test_issue_5460(): + u = Mul(2, (1 + x), evaluate=False) + assert (2 + u).args == (2, u) + + +def test_product_irrational(): + assert (I*pi).is_irrational is False + # The following used to be deduced from the above bug: + assert (I*pi).is_positive is False + + +def test_issue_5919(): + assert (x/(y*(1 + y))).expand() == x/(y**2 + y) + + +def test_Mod(): + assert Mod(x, 1).func is Mod + assert pi % pi is S.Zero + assert Mod(5, 3) == 2 + assert Mod(-5, 3) == 1 + assert Mod(5, -3) == -1 + assert Mod(-5, -3) == -2 + assert type(Mod(3.2, 2, evaluate=False)) == Mod + assert 5 % x == Mod(5, x) + assert x % 5 == Mod(x, 5) + assert x % y == Mod(x, y) + assert (x % y).subs({x: 5, y: 3}) == 2 + assert Mod(nan, 1) is nan + assert Mod(1, nan) is nan + assert Mod(nan, nan) is nan + + assert Mod(0, x) == 0 + with raises(ZeroDivisionError): + Mod(x, 0) + + k = Symbol('k', integer=True) + m = Symbol('m', integer=True, positive=True) + assert (x**m % x).func is Mod + assert (k**(-m) % k).func is Mod + assert k**m % k == 0 + assert (-2*k)**m % k == 0 + + # Float handling + point3 = Float(3.3) % 1 + assert (x - 3.3) % 1 == Mod(1.*x + 1 - point3, 1) + assert Mod(-3.3, 1) == 1 - point3 + assert Mod(0.7, 1) == Float(0.7) + e = Mod(1.3, 1) + assert comp(e, .3) and e.is_Float + e = Mod(1.3, .7) + assert comp(e, .6) and e.is_Float + e = Mod(1.3, Rational(7, 10)) + assert comp(e, .6) and e.is_Float + e = Mod(Rational(13, 10), 0.7) + assert comp(e, .6) and e.is_Float + e = Mod(Rational(13, 10), Rational(7, 10)) + assert comp(e, .6) and e.is_Rational + + # check that sign is right + r2 = sqrt(2) + r3 = sqrt(3) + for i in [-r3, -r2, r2, r3]: + for j in [-r3, -r2, r2, r3]: + assert verify_numerically(i % j, i.n() % j.n()) + for _x in range(4): + for _y in range(9): + reps = [(x, _x), (y, _y)] + assert Mod(3*x + y, 9).subs(reps) == (3*_x + _y) % 9 + + # denesting + t = Symbol('t', real=True) + assert Mod(Mod(x, t), t) == Mod(x, t) + assert Mod(-Mod(x, t), t) == Mod(-x, t) + assert Mod(Mod(x, 2*t), t) == Mod(x, t) + assert Mod(-Mod(x, 2*t), t) == Mod(-x, t) + assert Mod(Mod(x, t), 2*t) == Mod(x, t) + assert Mod(-Mod(x, t), -2*t) == -Mod(x, t) + for i in [-4, -2, 2, 4]: + for j in [-4, -2, 2, 4]: + for k in range(4): + assert Mod(Mod(x, i), j).subs({x: k}) == (k % i) % j + assert Mod(-Mod(x, i), j).subs({x: k}) == -(k % i) % j + + # known difference + assert Mod(5*sqrt(2), sqrt(5)) == 5*sqrt(2) - 3*sqrt(5) + p = symbols('p', positive=True) + assert Mod(2, p + 3) == 2 + assert Mod(-2, p + 3) == p + 1 + assert Mod(2, -p - 3) == -p - 1 + assert Mod(-2, -p - 3) == -2 + assert Mod(p + 5, p + 3) == 2 + assert Mod(-p - 5, p + 3) == p + 1 + assert Mod(p + 5, -p - 3) == -p - 1 + assert Mod(-p - 5, -p - 3) == -2 + assert Mod(p + 1, p - 1).func is Mod + + # issue 27749 + n = symbols('n', integer=True, positive=True) + assert unchanged(Mod, 1, n) + n = symbols('n', prime=True) + assert Mod(1, n) == 1 + + # handling sums + assert (x + 3) % 1 == Mod(x, 1) + assert (x + 3.0) % 1 == Mod(1.*x, 1) + assert (x - S(33)/10) % 1 == Mod(x + S(7)/10, 1) + + a = Mod(.6*x + y, .3*y) + b = Mod(0.1*y + 0.6*x, 0.3*y) + # Test that a, b are equal, with 1e-14 accuracy in coefficients + eps = 1e-14 + assert abs((a.args[0] - b.args[0]).subs({x: 1, y: 1})) < eps + assert abs((a.args[1] - b.args[1]).subs({x: 1, y: 1})) < eps + + assert (x + 1) % x == 1 % x + assert (x + y) % x == y % x + assert (x + y + 2) % x == (y + 2) % x + assert (a + 3*x + 1) % (2*x) == Mod(a + x + 1, 2*x) + assert (12*x + 18*y) % (3*x) == 3*Mod(6*y, x) + + # gcd extraction + assert (-3*x) % (-2*y) == -Mod(3*x, 2*y) + assert (.6*pi) % (.3*x*pi) == 0.3*pi*Mod(2, x) + assert (.6*pi) % (.31*x*pi) == pi*Mod(0.6, 0.31*x) + assert (6*pi) % (.3*x*pi) == 0.3*pi*Mod(20, x) + assert (6*pi) % (.31*x*pi) == pi*Mod(6, 0.31*x) + assert (6*pi) % (.42*x*pi) == pi*Mod(6, 0.42*x) + assert (12*x) % (2*y) == 2*Mod(6*x, y) + assert (12*x) % (3*5*y) == 3*Mod(4*x, 5*y) + assert (12*x) % (15*x*y) == 3*x*Mod(4, 5*y) + assert (-2*pi) % (3*pi) == pi + assert (2*x + 2) % (x + 1) == 0 + assert (x*(x + 1)) % (x + 1) == (x + 1)*Mod(x, 1) + assert Mod(5.0*x, 0.1*y) == 0.1*Mod(50*x, y) + i = Symbol('i', integer=True) + assert (3*i*x) % (2*i*y) == i*Mod(3*x, 2*y) + assert Mod(4*i, 4) == 0 + + # issue 8677 + n = Symbol('n', integer=True, positive=True) + assert factorial(n) % n == 0 + assert factorial(n + 2) % n == 0 + assert (factorial(n + 4) % (n + 5)).func is Mod + + # Wilson's theorem + assert factorial(18042, evaluate=False) % 18043 == 18042 + p = Symbol('n', prime=True) + assert factorial(p - 1) % p == p - 1 + assert factorial(p - 1) % -p == -1 + assert (factorial(3, evaluate=False) % 4).doit() == 2 + n = Symbol('n', composite=True, odd=True) + assert factorial(n - 1) % n == 0 + + # symbolic with known parity + n = Symbol('n', even=True) + assert Mod(n, 2) == 0 + n = Symbol('n', odd=True) + assert Mod(n, 2) == 1 + + # issue 10963 + assert (x**6000%400).args[1] == 400 + + #issue 13543 + assert Mod(Mod(x + 1, 2) + 1, 2) == Mod(x, 2) + + x1 = Symbol('x1', integer=True) + assert Mod(Mod(x1 + 2, 4)*(x1 + 4), 4) == Mod(x1*(x1 + 2), 4) + assert Mod(Mod(x1 + 2, 4)*4, 4) == 0 + + # issue 15493 + i, j = symbols('i j', integer=True, positive=True) + assert Mod(3*i, 2) == Mod(i, 2) + assert Mod(8*i/j, 4) == 4*Mod(2*i/j, 1) + assert Mod(8*i, 4) == 0 + + # rewrite + assert Mod(x, y).rewrite(floor) == x - y*floor(x/y) + assert ((x - Mod(x, y))/y).rewrite(floor) == floor(x/y) + + # issue 21373 + from sympy.functions.elementary.hyperbolic import sinh + from sympy.functions.elementary.piecewise import Piecewise + + x_r, y_r = symbols('x_r y_r', real=True) + assert (Piecewise((x_r, y_r > x_r), (y_r, True)) / z) % 1 + expr = exp(sinh(Piecewise((x_r, y_r > x_r), (y_r, True)) / z)) + expr.subs({1: 1.0}) + sinh(Piecewise((x_r, y_r > x_r), (y_r, True)) * z ** -1.0).is_zero + + # issue 24215 + from sympy.abc import phi + assert Mod(4.0*Mod(phi, 1) , 2) == 2.0*(Mod(2*(Mod(phi, 1)), 1)) + + xi = symbols('x', integer=True) + assert unchanged(Mod, xi, 2) + assert Mod(3*xi, 2) == Mod(xi, 2) + assert unchanged(Mod, 3*x, 2) + + +def test_Mod_Pow(): + # modular exponentiation + assert isinstance(Mod(Pow(2, 2, evaluate=False), 3), Integer) + + assert Mod(Pow(4, 13, evaluate=False), 497) == Mod(Pow(4, 13), 497) + assert Mod(Pow(2, 10000000000, evaluate=False), 3) == 1 + assert Mod(Pow(32131231232, 9**10**6, evaluate=False),10**12) == \ + pow(32131231232,9**10**6,10**12) + assert Mod(Pow(33284959323, 123**999, evaluate=False),11**13) == \ + pow(33284959323,123**999,11**13) + assert Mod(Pow(78789849597, 333**555, evaluate=False),12**9) == \ + pow(78789849597,333**555,12**9) + + # modular nested exponentiation + expr = Pow(2, 2, evaluate=False) + expr = Pow(2, expr, evaluate=False) + assert Mod(expr, 3**10) == 16 + expr = Pow(2, expr, evaluate=False) + assert Mod(expr, 3**10) == 6487 + expr = Pow(2, expr, evaluate=False) + assert Mod(expr, 3**10) == 32191 + expr = Pow(2, expr, evaluate=False) + assert Mod(expr, 3**10) == 18016 + expr = Pow(2, expr, evaluate=False) + assert Mod(expr, 3**10) == 5137 + + expr = Pow(2, 2, evaluate=False) + expr = Pow(expr, 2, evaluate=False) + assert Mod(expr, 3**10) == 16 + expr = Pow(expr, 2, evaluate=False) + assert Mod(expr, 3**10) == 256 + expr = Pow(expr, 2, evaluate=False) + assert Mod(expr, 3**10) == 6487 + expr = Pow(expr, 2, evaluate=False) + assert Mod(expr, 3**10) == 38281 + expr = Pow(expr, 2, evaluate=False) + assert Mod(expr, 3**10) == 15928 + + expr = Pow(2, 2, evaluate=False) + expr = Pow(expr, expr, evaluate=False) + assert Mod(expr, 3**10) == 256 + expr = Pow(expr, expr, evaluate=False) + assert Mod(expr, 3**10) == 9229 + expr = Pow(expr, expr, evaluate=False) + assert Mod(expr, 3**10) == 25708 + expr = Pow(expr, expr, evaluate=False) + assert Mod(expr, 3**10) == 26608 + expr = Pow(expr, expr, evaluate=False) + # XXX This used to fail in a nondeterministic way because of overflow + # error. + assert Mod(expr, 3**10) == 1966 + + +def test_Mod_is_integer(): + p = Symbol('p', integer=True) + q1 = Symbol('q1', integer=True) + q2 = Symbol('q2', integer=True, nonzero=True) + assert Mod(x, y).is_integer is None + assert Mod(p, q1).is_integer is None + assert Mod(x, q2).is_integer is None + assert Mod(p, q2).is_integer + + +def test_Mod_is_nonposneg(): + n = Symbol('n', integer=True) + k = Symbol('k', integer=True, positive=True) + assert (n%3).is_nonnegative + assert Mod(n, -3).is_nonpositive + assert Mod(n, k).is_nonnegative + assert Mod(n, -k).is_nonpositive + assert Mod(k, n).is_nonnegative is None + + +def test_issue_6001(): + A = Symbol("A", commutative=False) + eq = A + A**2 + # it doesn't matter whether it's True or False; they should + # just all be the same + assert ( + eq.is_commutative == + (eq + 1).is_commutative == + (A + 1).is_commutative) + + B = Symbol("B", commutative=False) + # Although commutative terms could cancel we return True + # meaning "there are non-commutative symbols; aftersubstitution + # that definition can change, e.g. (A*B).subs(B,A**-1) -> 1 + assert (sqrt(2)*A).is_commutative is False + assert (sqrt(2)*A*B).is_commutative is False + + +def test_polar(): + from sympy.functions.elementary.complexes import polar_lift + p = Symbol('p', polar=True) + x = Symbol('x') + assert p.is_polar + assert x.is_polar is None + assert S.One.is_polar is None + assert (p**x).is_polar is True + assert (x**p).is_polar is None + assert ((2*p)**x).is_polar is True + assert (2*p).is_polar is True + assert (-2*p).is_polar is not True + assert (polar_lift(-2)*p).is_polar is True + + q = Symbol('q', polar=True) + assert (p*q)**2 == p**2 * q**2 + assert (2*q)**2 == 4 * q**2 + assert ((p*q)**x).expand() == p**x * q**x + + +def test_issue_6040(): + a, b = Pow(1, 2, evaluate=False), S.One + assert a != b + assert b != a + assert not (a == b) + assert not (b == a) + + +def test_issue_6082(): + # Comparison is symmetric + assert Basic.compare(Max(x, 1), Max(x, 2)) == \ + - Basic.compare(Max(x, 2), Max(x, 1)) + # Equal expressions compare equal + assert Basic.compare(Max(x, 1), Max(x, 1)) == 0 + # Basic subtypes (such as Max) compare different than standard types + assert Basic.compare(Max(1, x), frozenset((1, x))) != 0 + + +def test_issue_6077(): + assert x**2.0/x == x**1.0 + assert x/x**2.0 == x**-1.0 + assert x*x**2.0 == x**3.0 + assert x**1.5*x**2.5 == x**4.0 + + assert 2**(2.0*x)/2**x == 2**(1.0*x) + assert 2**x/2**(2.0*x) == 2**(-1.0*x) + assert 2**x*2**(2.0*x) == 2**(3.0*x) + assert 2**(1.5*x)*2**(2.5*x) == 2**(4.0*x) + + +def test_mul_flatten_oo(): + p = symbols('p', positive=True) + n, m = symbols('n,m', negative=True) + x_im = symbols('x_im', imaginary=True) + assert n*oo is -oo + assert n*m*oo is oo + assert p*oo is oo + assert x_im*oo != I*oo # i could be +/- 3*I -> +/-oo + + +def test_add_flatten(): + # see https://github.com/sympy/sympy/issues/2633#issuecomment-29545524 + a = oo + I*oo + b = oo - I*oo + assert a + b is nan + assert a - b is nan + # FIXME: This evaluates as: + # >>> 1/a + # 0*(oo + oo*I) + # which should not simplify to 0. Should be fixed in Pow.eval + #assert (1/a).simplify() == (1/b).simplify() == 0 + + a = Pow(2, 3, evaluate=False) + assert a + a == 16 + + +def test_issue_5160_6087_6089_6090(): + # issue 6087 + assert ((-2*x*y**y)**3.2).n(2) == (2**3.2*(-x*y**y)**3.2).n(2) + # issue 6089 + A, B, C = symbols('A,B,C', commutative=False) + assert (2.*B*C)**3 == 8.0*(B*C)**3 + assert (-2.*B*C)**3 == -8.0*(B*C)**3 + assert (-2*B*C)**2 == 4*(B*C)**2 + # issue 5160 + assert sqrt(-1.0*x) == 1.0*sqrt(-x) + assert sqrt(1.0*x) == 1.0*sqrt(x) + # issue 6090 + assert (-2*x*y*A*B)**2 == 4*x**2*y**2*(A*B)**2 + + +def test_float_int_round(): + assert int(float(sqrt(10))) == int(sqrt(10)) + assert int(pi**1000) % 10 == 2 + assert int(Float('1.123456789012345678901234567890e20', '')) == \ + int(112345678901234567890) + assert int(Float('1.123456789012345678901234567890e25', '')) == \ + int(11234567890123456789012345) + # decimal forces float so it's not an exact integer ending in 000000 + assert int(Float('1.123456789012345678901234567890e35', '')) == \ + 112345678901234567890123456789000192 + assert int(Float('123456789012345678901234567890e5', '')) == \ + 12345678901234567890123456789000000 + assert Integer(Float('1.123456789012345678901234567890e20', '')) == \ + 112345678901234567890 + assert Integer(Float('1.123456789012345678901234567890e25', '')) == \ + 11234567890123456789012345 + # decimal forces float so it's not an exact integer ending in 000000 + assert Integer(Float('1.123456789012345678901234567890e35', '')) == \ + 112345678901234567890123456789000192 + assert Integer(Float('123456789012345678901234567890e5', '')) == \ + 12345678901234567890123456789000000 + assert same_and_same_prec(Float('123000e-2',''), Float('1230.00', '')) + assert same_and_same_prec(Float('123000e2',''), Float('12300000', '')) + + assert int(1 + Rational('.9999999999999999999999999')) == 1 + assert int(pi/1e20) == 0 + assert int(1 + pi/1e20) == 1 + assert int(Add(1.2, -2, evaluate=False)) == int(1.2 - 2) + assert int(Add(1.2, +2, evaluate=False)) == int(1.2 + 2) + assert int(Add(1 + Float('.99999999999999999', ''), evaluate=False)) == 1 + raises(TypeError, lambda: float(x)) + raises(TypeError, lambda: float(sqrt(-1))) + + assert int(12345678901234567890 + cos(1)**2 + sin(1)**2) == \ + 12345678901234567891 + + +def test_issue_6611a(): + assert Mul.flatten([3**Rational(1, 3), + Pow(-Rational(1, 9), Rational(2, 3), evaluate=False)]) == \ + ([Rational(1, 3), (-1)**Rational(2, 3)], [], None) + + +def test_denest_add_mul(): + # when working with evaluated expressions make sure they denest + eq = x + 1 + eq = Add(eq, 2, evaluate=False) + eq = Add(eq, 2, evaluate=False) + assert Add(*eq.args) == x + 5 + eq = x*2 + eq = Mul(eq, 2, evaluate=False) + eq = Mul(eq, 2, evaluate=False) + assert Mul(*eq.args) == 8*x + # but don't let them denest unnecessarily + eq = Mul(-2, x - 2, evaluate=False) + assert 2*eq == Mul(-4, x - 2, evaluate=False) + assert -eq == Mul(2, x - 2, evaluate=False) + + +def test_mul_coeff(): + # It is important that all Numbers be removed from the seq; + # This can be tricky when powers combine to produce those numbers + p = exp(I*pi/3) + assert p**2*x*p*y*p*x*p**2 == x**2*y + + +def test_mul_zero_detection(): + nz = Dummy(real=True, zero=False) + r = Dummy(extended_real=True) + c = Dummy(real=False, complex=True) + c2 = Dummy(real=False, complex=True) + i = Dummy(imaginary=True) + e = nz*r*c + assert e.is_imaginary is None + assert e.is_extended_real is None + e = nz*c + assert e.is_imaginary is None + assert e.is_extended_real is False + e = nz*i*c + assert e.is_imaginary is False + assert e.is_extended_real is None + # check for more than one complex; it is important to use + # uniquely named Symbols to ensure that two factors appear + # e.g. if the symbols have the same name they just become + # a single factor, a power. + e = nz*i*c*c2 + assert e.is_imaginary is None + assert e.is_extended_real is None + + # _eval_is_extended_real and _eval_is_zero both employ trapping of the + # zero value so args should be tested in both directions and + # TO AVOID GETTING THE CACHED RESULT, Dummy MUST BE USED + + # real is unknown + def test(z, b, e): + if z.is_zero and b.is_finite: + assert e.is_extended_real and e.is_zero + else: + assert e.is_extended_real is None + if b.is_finite: + if z.is_zero: + assert e.is_zero + else: + assert e.is_zero is None + elif b.is_finite is False: + if z.is_zero is None: + assert e.is_zero is None + else: + assert e.is_zero is False + + + for iz, ib in product(*[[True, False, None]]*2): + z = Dummy('z', nonzero=iz) + b = Dummy('f', finite=ib) + e = Mul(z, b, evaluate=False) + test(z, b, e) + z = Dummy('nz', nonzero=iz) + b = Dummy('f', finite=ib) + e = Mul(b, z, evaluate=False) + test(z, b, e) + + # real is True + def test(z, b, e): + if z.is_zero and not b.is_finite: + assert e.is_extended_real is None + else: + assert e.is_extended_real is True + + for iz, ib in product(*[[True, False, None]]*2): + z = Dummy('z', nonzero=iz, extended_real=True) + b = Dummy('b', finite=ib, extended_real=True) + e = Mul(z, b, evaluate=False) + test(z, b, e) + z = Dummy('z', nonzero=iz, extended_real=True) + b = Dummy('b', finite=ib, extended_real=True) + e = Mul(b, z, evaluate=False) + test(z, b, e) + + +def test_Mul_with_zero_infinite(): + zer = Dummy(zero=True) + inf = Dummy(finite=False) + + e = Mul(zer, inf, evaluate=False) + assert e.is_extended_positive is None + assert e.is_hermitian is None + + e = Mul(inf, zer, evaluate=False) + assert e.is_extended_positive is None + assert e.is_hermitian is None + + +def test_Mul_does_not_cancel_infinities(): + a, b = symbols('a b') + assert ((zoo + 3*a)/(3*a + zoo)) is nan + assert ((b - oo)/(b - oo)) is nan + # issue 13904 + expr = (1/(a+b) + 1/(a-b))/(1/(a+b) - 1/(a-b)) + assert expr.subs(b, a) is nan + + +def test_Mul_does_not_distribute_infinity(): + a, b = symbols('a b') + assert ((1 + I)*oo).is_Mul + assert ((a + b)*(-oo)).is_Mul + assert ((a + 1)*zoo).is_Mul + assert ((1 + I)*oo).is_finite is False + z = (1 + I)*oo + assert ((1 - I)*z).expand() is oo + + +def test_Mul_does_not_let_0_trump_inf(): + assert Mul(*[0, a + zoo]) is S.NaN + assert Mul(*[0, a + oo]) is S.NaN + assert Mul(*[0, a + Integral(1/x**2, (x, 1, oo))]) is S.Zero + # Integral is treated like an unknown like 0*x -> 0 + assert Mul(*[0, a + Integral(x, (x, 1, oo))]) is S.Zero + + +def test_issue_8247_8354(): + from sympy.functions.elementary.trigonometric import tan + z = sqrt(1 + sqrt(3)) + sqrt(3 + 3*sqrt(3)) - sqrt(10 + 6*sqrt(3)) + assert z.is_positive is False # it's 0 + z = S('''-2**(1/3)*(3*sqrt(93) + 29)**2 - 4*(3*sqrt(93) + 29)**(4/3) + + 12*sqrt(93)*(3*sqrt(93) + 29)**(1/3) + 116*(3*sqrt(93) + 29)**(1/3) + + 174*2**(1/3)*sqrt(93) + 1678*2**(1/3)''') + assert z.is_positive is False # it's 0 + z = 2*(-3*tan(19*pi/90) + sqrt(3))*cos(11*pi/90)*cos(19*pi/90) - \ + sqrt(3)*(-3 + 4*cos(19*pi/90)**2) + assert z.is_positive is not True # it's zero and it shouldn't hang + z = S('''9*(3*sqrt(93) + 29)**(2/3)*((3*sqrt(93) + + 29)**(1/3)*(-2**(2/3)*(3*sqrt(93) + 29)**(1/3) - 2) - 2*2**(1/3))**3 + + 72*(3*sqrt(93) + 29)**(2/3)*(81*sqrt(93) + 783) + (162*sqrt(93) + + 1566)*((3*sqrt(93) + 29)**(1/3)*(-2**(2/3)*(3*sqrt(93) + 29)**(1/3) - + 2) - 2*2**(1/3))**2''') + assert z.is_positive is False # it's 0 (and a single _mexpand isn't enough) + + +def test_Add_is_zero(): + x, y = symbols('x y', zero=True) + assert (x + y).is_zero + + # Issue 15873 + e = -2*I + (1 + I)**2 + assert e.is_zero is None + + +def test_issue_14392(): + assert (sin(zoo)**2).as_real_imag() == (nan, nan) + + +def test_divmod(): + assert divmod(x, y) == (x//y, x % y) + assert divmod(x, 3) == (x//3, x % 3) + assert divmod(3, x) == (3//x, 3 % x) + + +def test__neg__(): + assert -(x*y) == -x*y + assert -(-x*y) == x*y + assert -(1.*x) == -1.*x + assert -(-1.*x) == 1.*x + assert -(2.*x) == -2.*x + assert -(-2.*x) == 2.*x + with distribute(False): + eq = -(x + y) + assert eq.is_Mul and eq.args == (-1, x + y) + with evaluate(False): + eq = -(x + y) + assert eq.is_Mul and eq.args == (-1, x + y) + + +def test_issue_18507(): + assert Mul(zoo, zoo, 0) is nan + + +def test_issue_17130(): + e = Add(b, -b, I, -I, evaluate=False) + assert e.is_zero is None # ideally this would be True + + +def test_issue_21034(): + e = -I*log((re(asin(5)) + I*im(asin(5)))/sqrt(re(asin(5))**2 + im(asin(5))**2))/pi + assert e.round(2) + + +def test_issue_22021(): + from sympy.calculus.accumulationbounds import AccumBounds + # these objects are special cases in Mul + from sympy.tensor.tensor import TensorIndexType, tensor_indices, tensor_heads + L = TensorIndexType("L") + i = tensor_indices("i", L) + A, B = tensor_heads("A B", [L]) + e = A(i) + B(i) + assert -e == -1*e + e = zoo + x + assert -e == -1*e + a = AccumBounds(1, 2) + e = a + x + assert -e == -1*e + for args in permutations((zoo, a, x)): + e = Add(*args, evaluate=False) + assert -e == -1*e + assert 2*Add(1, x, x, evaluate=False) == 4*x + 2 + + +def test_issue_22244(): + assert -(zoo*x) == zoo*x + + +def test_issue_22453(): + from sympy.utilities.iterables import cartes + e = Symbol('e', extended_positive=True) + for a, b in cartes(*[[oo, -oo, 3]]*2): + if a == b == 3: + continue + i = a + I*b + assert i**(1 + e) is S.ComplexInfinity + assert i**-e is S.Zero + assert unchanged(Pow, i, e) + assert 1/(oo + I*oo) is S.Zero + r, i = [Dummy(infinite=True, extended_real=True) for _ in range(2)] + assert 1/(r + I*i) is S.Zero + assert 1/(3 + I*i) is S.Zero + assert 1/(r + I*3) is S.Zero + + +def test_issue_22613(): + assert (0**(x - 2)).as_content_primitive() == (1, 0**(x - 2)) + assert (0**(x + 2)).as_content_primitive() == (1, 0**(x + 2)) + + +def test_issue_25176(): + assert sqrt(-4*3**(S(3)/4)*I/3) == 2*3**(S(7)/8)*sqrt(-I)/3 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_assumptions.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_assumptions.py new file mode 100644 index 0000000000000000000000000000000000000000..574e90178fb489fe99c99ea0c72df57ceec4b249 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_assumptions.py @@ -0,0 +1,1335 @@ +from sympy.core.mod import Mod +from sympy.core.numbers import (I, oo, pi) +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (asin, sin) +from sympy.simplify.simplify import simplify +from sympy.core import Symbol, S, Rational, Integer, Dummy, Wild, Pow +from sympy.core.assumptions import (assumptions, check_assumptions, + failing_assumptions, common_assumptions, _generate_assumption_rules, + _load_pre_generated_assumption_rules) +from sympy.core.facts import InconsistentAssumptions +from sympy.core.random import seed +from sympy.combinatorics import Permutation +from sympy.combinatorics.perm_groups import PermutationGroup + +from sympy.testing.pytest import raises, XFAIL + + +def test_symbol_unset(): + x = Symbol('x', real=True, integer=True) + assert x.is_real is True + assert x.is_integer is True + assert x.is_imaginary is False + assert x.is_noninteger is False + assert x.is_number is False + + +def test_zero(): + z = Integer(0) + assert z.is_commutative is True + assert z.is_integer is True + assert z.is_rational is True + assert z.is_algebraic is True + assert z.is_transcendental is False + assert z.is_real is True + assert z.is_complex is True + assert z.is_noninteger is False + assert z.is_irrational is False + assert z.is_imaginary is False + assert z.is_positive is False + assert z.is_negative is False + assert z.is_nonpositive is True + assert z.is_nonnegative is True + assert z.is_even is True + assert z.is_odd is False + assert z.is_finite is True + assert z.is_infinite is False + assert z.is_comparable is True + assert z.is_prime is False + assert z.is_composite is False + assert z.is_number is True + + +def test_one(): + z = Integer(1) + assert z.is_commutative is True + assert z.is_integer is True + assert z.is_rational is True + assert z.is_algebraic is True + assert z.is_transcendental is False + assert z.is_real is True + assert z.is_complex is True + assert z.is_noninteger is False + assert z.is_irrational is False + assert z.is_imaginary is False + assert z.is_positive is True + assert z.is_negative is False + assert z.is_nonpositive is False + assert z.is_nonnegative is True + assert z.is_even is False + assert z.is_odd is True + assert z.is_finite is True + assert z.is_infinite is False + assert z.is_comparable is True + assert z.is_prime is False + assert z.is_number is True + assert z.is_composite is False # issue 8807 + + +def test_negativeone(): + z = Integer(-1) + assert z.is_commutative is True + assert z.is_integer is True + assert z.is_rational is True + assert z.is_algebraic is True + assert z.is_transcendental is False + assert z.is_real is True + assert z.is_complex is True + assert z.is_noninteger is False + assert z.is_irrational is False + assert z.is_imaginary is False + assert z.is_positive is False + assert z.is_negative is True + assert z.is_nonpositive is True + assert z.is_nonnegative is False + assert z.is_even is False + assert z.is_odd is True + assert z.is_finite is True + assert z.is_infinite is False + assert z.is_comparable is True + assert z.is_prime is False + assert z.is_composite is False + assert z.is_number is True + + +def test_infinity(): + oo = S.Infinity + + assert oo.is_commutative is True + assert oo.is_integer is False + assert oo.is_rational is False + assert oo.is_algebraic is False + assert oo.is_transcendental is False + assert oo.is_extended_real is True + assert oo.is_real is False + assert oo.is_complex is False + assert oo.is_noninteger is True + assert oo.is_irrational is False + assert oo.is_imaginary is False + assert oo.is_nonzero is False + assert oo.is_positive is False + assert oo.is_negative is False + assert oo.is_nonpositive is False + assert oo.is_nonnegative is False + assert oo.is_extended_nonzero is True + assert oo.is_extended_positive is True + assert oo.is_extended_negative is False + assert oo.is_extended_nonpositive is False + assert oo.is_extended_nonnegative is True + assert oo.is_even is False + assert oo.is_odd is False + assert oo.is_finite is False + assert oo.is_infinite is True + assert oo.is_comparable is True + assert oo.is_prime is False + assert oo.is_composite is False + assert oo.is_number is True + + +def test_neg_infinity(): + mm = S.NegativeInfinity + + assert mm.is_commutative is True + assert mm.is_integer is False + assert mm.is_rational is False + assert mm.is_algebraic is False + assert mm.is_transcendental is False + assert mm.is_extended_real is True + assert mm.is_real is False + assert mm.is_complex is False + assert mm.is_noninteger is True + assert mm.is_irrational is False + assert mm.is_imaginary is False + assert mm.is_nonzero is False + assert mm.is_positive is False + assert mm.is_negative is False + assert mm.is_nonpositive is False + assert mm.is_nonnegative is False + assert mm.is_extended_nonzero is True + assert mm.is_extended_positive is False + assert mm.is_extended_negative is True + assert mm.is_extended_nonpositive is True + assert mm.is_extended_nonnegative is False + assert mm.is_even is False + assert mm.is_odd is False + assert mm.is_finite is False + assert mm.is_infinite is True + assert mm.is_comparable is True + assert mm.is_prime is False + assert mm.is_composite is False + assert mm.is_number is True + + +def test_zoo(): + zoo = S.ComplexInfinity + assert zoo.is_complex is False + assert zoo.is_real is False + assert zoo.is_prime is False + + +def test_nan(): + nan = S.NaN + + assert nan.is_commutative is True + assert nan.is_integer is None + assert nan.is_rational is None + assert nan.is_algebraic is None + assert nan.is_transcendental is None + assert nan.is_real is None + assert nan.is_complex is None + assert nan.is_noninteger is None + assert nan.is_irrational is None + assert nan.is_imaginary is None + assert nan.is_positive is None + assert nan.is_negative is None + assert nan.is_nonpositive is None + assert nan.is_nonnegative is None + assert nan.is_even is None + assert nan.is_odd is None + assert nan.is_finite is None + assert nan.is_infinite is None + assert nan.is_comparable is False + assert nan.is_prime is None + assert nan.is_composite is None + assert nan.is_number is True + + +def test_pos_rational(): + r = Rational(3, 4) + assert r.is_commutative is True + assert r.is_integer is False + assert r.is_rational is True + assert r.is_algebraic is True + assert r.is_transcendental is False + assert r.is_real is True + assert r.is_complex is True + assert r.is_noninteger is True + assert r.is_irrational is False + assert r.is_imaginary is False + assert r.is_positive is True + assert r.is_negative is False + assert r.is_nonpositive is False + assert r.is_nonnegative is True + assert r.is_even is False + assert r.is_odd is False + assert r.is_finite is True + assert r.is_infinite is False + assert r.is_comparable is True + assert r.is_prime is False + assert r.is_composite is False + + r = Rational(1, 4) + assert r.is_nonpositive is False + assert r.is_positive is True + assert r.is_negative is False + assert r.is_nonnegative is True + r = Rational(5, 4) + assert r.is_negative is False + assert r.is_positive is True + assert r.is_nonpositive is False + assert r.is_nonnegative is True + r = Rational(5, 3) + assert r.is_nonnegative is True + assert r.is_positive is True + assert r.is_negative is False + assert r.is_nonpositive is False + + +def test_neg_rational(): + r = Rational(-3, 4) + assert r.is_positive is False + assert r.is_nonpositive is True + assert r.is_negative is True + assert r.is_nonnegative is False + r = Rational(-1, 4) + assert r.is_nonpositive is True + assert r.is_positive is False + assert r.is_negative is True + assert r.is_nonnegative is False + r = Rational(-5, 4) + assert r.is_negative is True + assert r.is_positive is False + assert r.is_nonpositive is True + assert r.is_nonnegative is False + r = Rational(-5, 3) + assert r.is_nonnegative is False + assert r.is_positive is False + assert r.is_negative is True + assert r.is_nonpositive is True + + +def test_pi(): + z = S.Pi + assert z.is_commutative is True + assert z.is_integer is False + assert z.is_rational is False + assert z.is_algebraic is False + assert z.is_transcendental is True + assert z.is_real is True + assert z.is_complex is True + assert z.is_noninteger is True + assert z.is_irrational is True + assert z.is_imaginary is False + assert z.is_positive is True + assert z.is_negative is False + assert z.is_nonpositive is False + assert z.is_nonnegative is True + assert z.is_even is False + assert z.is_odd is False + assert z.is_finite is True + assert z.is_infinite is False + assert z.is_comparable is True + assert z.is_prime is False + assert z.is_composite is False + + +def test_E(): + z = S.Exp1 + assert z.is_commutative is True + assert z.is_integer is False + assert z.is_rational is False + assert z.is_algebraic is False + assert z.is_transcendental is True + assert z.is_real is True + assert z.is_complex is True + assert z.is_noninteger is True + assert z.is_irrational is True + assert z.is_imaginary is False + assert z.is_positive is True + assert z.is_negative is False + assert z.is_nonpositive is False + assert z.is_nonnegative is True + assert z.is_even is False + assert z.is_odd is False + assert z.is_finite is True + assert z.is_infinite is False + assert z.is_comparable is True + assert z.is_prime is False + assert z.is_composite is False + + +def test_I(): + z = S.ImaginaryUnit + assert z.is_commutative is True + assert z.is_integer is False + assert z.is_rational is False + assert z.is_algebraic is True + assert z.is_transcendental is False + assert z.is_real is False + assert z.is_complex is True + assert z.is_noninteger is False + assert z.is_irrational is False + assert z.is_imaginary is True + assert z.is_positive is False + assert z.is_negative is False + assert z.is_nonpositive is False + assert z.is_nonnegative is False + assert z.is_even is False + assert z.is_odd is False + assert z.is_finite is True + assert z.is_infinite is False + assert z.is_comparable is False + assert z.is_prime is False + assert z.is_composite is False + + +def test_symbol_real_false(): + # issue 3848 + a = Symbol('a', real=False) + + assert a.is_real is False + assert a.is_integer is False + assert a.is_zero is False + + assert a.is_negative is False + assert a.is_positive is False + assert a.is_nonnegative is False + assert a.is_nonpositive is False + assert a.is_nonzero is False + + assert a.is_extended_negative is None + assert a.is_extended_positive is None + assert a.is_extended_nonnegative is None + assert a.is_extended_nonpositive is None + assert a.is_extended_nonzero is None + + +def test_symbol_extended_real_false(): + # issue 3848 + a = Symbol('a', extended_real=False) + + assert a.is_real is False + assert a.is_integer is False + assert a.is_zero is False + + assert a.is_negative is False + assert a.is_positive is False + assert a.is_nonnegative is False + assert a.is_nonpositive is False + assert a.is_nonzero is False + + assert a.is_extended_negative is False + assert a.is_extended_positive is False + assert a.is_extended_nonnegative is False + assert a.is_extended_nonpositive is False + assert a.is_extended_nonzero is False + + +def test_symbol_imaginary(): + a = Symbol('a', imaginary=True) + + assert a.is_real is False + assert a.is_integer is False + assert a.is_negative is False + assert a.is_positive is False + assert a.is_nonnegative is False + assert a.is_nonpositive is False + assert a.is_zero is False + assert a.is_nonzero is False # since nonzero -> real + + +def test_symbol_zero(): + x = Symbol('x', zero=True) + assert x.is_positive is False + assert x.is_nonpositive + assert x.is_negative is False + assert x.is_nonnegative + assert x.is_zero is True + # TODO Change to x.is_nonzero is None + # See https://github.com/sympy/sympy/pull/9583 + assert x.is_nonzero is False + assert x.is_finite is True + + +def test_symbol_positive(): + x = Symbol('x', positive=True) + assert x.is_positive is True + assert x.is_nonpositive is False + assert x.is_negative is False + assert x.is_nonnegative is True + assert x.is_zero is False + assert x.is_nonzero is True + + +def test_neg_symbol_positive(): + x = -Symbol('x', positive=True) + assert x.is_positive is False + assert x.is_nonpositive is True + assert x.is_negative is True + assert x.is_nonnegative is False + assert x.is_zero is False + assert x.is_nonzero is True + + +def test_symbol_nonpositive(): + x = Symbol('x', nonpositive=True) + assert x.is_positive is False + assert x.is_nonpositive is True + assert x.is_negative is None + assert x.is_nonnegative is None + assert x.is_zero is None + assert x.is_nonzero is None + + +def test_neg_symbol_nonpositive(): + x = -Symbol('x', nonpositive=True) + assert x.is_positive is None + assert x.is_nonpositive is None + assert x.is_negative is False + assert x.is_nonnegative is True + assert x.is_zero is None + assert x.is_nonzero is None + + +def test_symbol_falsepositive(): + x = Symbol('x', positive=False) + assert x.is_positive is False + assert x.is_nonpositive is None + assert x.is_negative is None + assert x.is_nonnegative is None + assert x.is_zero is None + assert x.is_nonzero is None + + +def test_symbol_falsepositive_mul(): + # To test pull request 9379 + # Explicit handling of arg.is_positive=False was added to Mul._eval_is_positive + x = 2*Symbol('x', positive=False) + assert x.is_positive is False # This was None before + assert x.is_nonpositive is None + assert x.is_negative is None + assert x.is_nonnegative is None + assert x.is_zero is None + assert x.is_nonzero is None + + +@XFAIL +def test_symbol_infinitereal_mul(): + ix = Symbol('ix', infinite=True, extended_real=True) + assert (-ix).is_extended_positive is None + + +def test_neg_symbol_falsepositive(): + x = -Symbol('x', positive=False) + assert x.is_positive is None + assert x.is_nonpositive is None + assert x.is_negative is False + assert x.is_nonnegative is None + assert x.is_zero is None + assert x.is_nonzero is None + + +def test_neg_symbol_falsenegative(): + # To test pull request 9379 + # Explicit handling of arg.is_negative=False was added to Mul._eval_is_positive + x = -Symbol('x', negative=False) + assert x.is_positive is False # This was None before + assert x.is_nonpositive is None + assert x.is_negative is None + assert x.is_nonnegative is None + assert x.is_zero is None + assert x.is_nonzero is None + + +def test_symbol_falsepositive_real(): + x = Symbol('x', positive=False, real=True) + assert x.is_positive is False + assert x.is_nonpositive is True + assert x.is_negative is None + assert x.is_nonnegative is None + assert x.is_zero is None + assert x.is_nonzero is None + + +def test_neg_symbol_falsepositive_real(): + x = -Symbol('x', positive=False, real=True) + assert x.is_positive is None + assert x.is_nonpositive is None + assert x.is_negative is False + assert x.is_nonnegative is True + assert x.is_zero is None + assert x.is_nonzero is None + + +def test_symbol_falsenonnegative(): + x = Symbol('x', nonnegative=False) + assert x.is_positive is False + assert x.is_nonpositive is None + assert x.is_negative is None + assert x.is_nonnegative is False + assert x.is_zero is False + assert x.is_nonzero is None + + +@XFAIL +def test_neg_symbol_falsenonnegative(): + x = -Symbol('x', nonnegative=False) + assert x.is_positive is None + assert x.is_nonpositive is False # this currently returns None + assert x.is_negative is False # this currently returns None + assert x.is_nonnegative is None + assert x.is_zero is False # this currently returns None + assert x.is_nonzero is True # this currently returns None + + +def test_symbol_falsenonnegative_real(): + x = Symbol('x', nonnegative=False, real=True) + assert x.is_positive is False + assert x.is_nonpositive is True + assert x.is_negative is True + assert x.is_nonnegative is False + assert x.is_zero is False + assert x.is_nonzero is True + + +def test_neg_symbol_falsenonnegative_real(): + x = -Symbol('x', nonnegative=False, real=True) + assert x.is_positive is True + assert x.is_nonpositive is False + assert x.is_negative is False + assert x.is_nonnegative is True + assert x.is_zero is False + assert x.is_nonzero is True + + +def test_prime(): + assert S.NegativeOne.is_prime is False + assert S(-2).is_prime is False + assert S(-4).is_prime is False + assert S.Zero.is_prime is False + assert S.One.is_prime is False + assert S(2).is_prime is True + assert S(17).is_prime is True + assert S(4).is_prime is False + + +def test_composite(): + assert S.NegativeOne.is_composite is False + assert S(-2).is_composite is False + assert S(-4).is_composite is False + assert S.Zero.is_composite is False + assert S(2).is_composite is False + assert S(17).is_composite is False + assert S(4).is_composite is True + x = Dummy(integer=True, positive=True, prime=False) + assert x.is_composite is None # x could be 1 + assert (x + 1).is_composite is None + x = Dummy(positive=True, even=True, prime=False) + assert x.is_integer is True + assert x.is_composite is True + + +def test_prime_symbol(): + x = Symbol('x', prime=True) + assert x.is_prime is True + assert x.is_integer is True + assert x.is_positive is True + assert x.is_negative is False + assert x.is_nonpositive is False + assert x.is_nonnegative is True + + x = Symbol('x', prime=False) + assert x.is_prime is False + assert x.is_integer is None + assert x.is_positive is None + assert x.is_negative is None + assert x.is_nonpositive is None + assert x.is_nonnegative is None + + +def test_symbol_noncommutative(): + x = Symbol('x', commutative=True) + assert x.is_complex is None + + x = Symbol('x', commutative=False) + assert x.is_integer is False + assert x.is_rational is False + assert x.is_algebraic is False + assert x.is_irrational is False + assert x.is_real is False + assert x.is_complex is False + + +def test_other_symbol(): + x = Symbol('x', integer=True) + assert x.is_integer is True + assert x.is_real is True + assert x.is_finite is True + + x = Symbol('x', integer=True, nonnegative=True) + assert x.is_integer is True + assert x.is_nonnegative is True + assert x.is_negative is False + assert x.is_positive is None + assert x.is_finite is True + + x = Symbol('x', integer=True, nonpositive=True) + assert x.is_integer is True + assert x.is_nonpositive is True + assert x.is_positive is False + assert x.is_negative is None + assert x.is_finite is True + + x = Symbol('x', odd=True) + assert x.is_odd is True + assert x.is_even is False + assert x.is_integer is True + assert x.is_finite is True + + x = Symbol('x', odd=False) + assert x.is_odd is False + assert x.is_even is None + assert x.is_integer is None + assert x.is_finite is None + + x = Symbol('x', even=True) + assert x.is_even is True + assert x.is_odd is False + assert x.is_integer is True + assert x.is_finite is True + + x = Symbol('x', even=False) + assert x.is_even is False + assert x.is_odd is None + assert x.is_integer is None + assert x.is_finite is None + + x = Symbol('x', integer=True, nonnegative=True) + assert x.is_integer is True + assert x.is_nonnegative is True + assert x.is_finite is True + + x = Symbol('x', integer=True, nonpositive=True) + assert x.is_integer is True + assert x.is_nonpositive is True + assert x.is_finite is True + + x = Symbol('x', rational=True) + assert x.is_real is True + assert x.is_finite is True + + x = Symbol('x', rational=False) + assert x.is_real is None + assert x.is_finite is None + + x = Symbol('x', irrational=True) + assert x.is_real is True + assert x.is_finite is True + + x = Symbol('x', irrational=False) + assert x.is_real is None + assert x.is_finite is None + + with raises(AttributeError): + x.is_real = False + + x = Symbol('x', algebraic=True) + assert x.is_transcendental is False + x = Symbol('x', transcendental=True) + assert x.is_algebraic is False + assert x.is_rational is False + assert x.is_integer is False + + +def test_evaluate_false(): + # Previously this failed because the assumptions query would make new + # expressions and some of the evaluation logic would fail under + # evaluate(False). + from sympy.core.parameters import evaluate + from sympy.abc import x, h + f = 2**x**7 + with evaluate(False): + fh = f.xreplace({x: x+h}) + assert fh.exp.is_rational is None + + +def test_issue_3825(): + """catch: hash instability""" + x = Symbol("x") + y = Symbol("y") + a1 = x + y + a2 = y + x + a2.is_comparable + + h1 = hash(a1) + h2 = hash(a2) + assert h1 == h2 + + +def test_issue_4822(): + z = (-1)**Rational(1, 3)*(1 - I*sqrt(3)) + assert z.is_real in [True, None] + + +def test_hash_vs_typeinfo(): + """seemingly different typeinfo, but in fact equal""" + + # the following two are semantically equal + x1 = Symbol('x', even=True) + x2 = Symbol('x', integer=True, odd=False) + + assert hash(x1) == hash(x2) + assert x1 == x2 + + +def test_hash_vs_typeinfo_2(): + """different typeinfo should mean !eq""" + # the following two are semantically different + x = Symbol('x') + x1 = Symbol('x', even=True) + + assert x != x1 + assert hash(x) != hash(x1) # This might fail with very low probability + + +def test_hash_vs_eq(): + """catch: different hash for equal objects""" + a = 1 + S.Pi # important: do not fold it into a Number instance + ha = hash(a) # it should be Add/Mul/... to trigger the bug + + a.is_positive # this uses .evalf() and deduces it is positive + assert a.is_positive is True + + # be sure that hash stayed the same + assert ha == hash(a) + + # now b should be the same expression + b = a.expand(trig=True) + hb = hash(b) + + assert a == b + assert ha == hb + + +def test_Add_is_pos_neg(): + # these cover lines not covered by the rest of tests in core + n = Symbol('n', extended_negative=True, infinite=True) + nn = Symbol('n', extended_nonnegative=True, infinite=True) + np = Symbol('n', extended_nonpositive=True, infinite=True) + p = Symbol('p', extended_positive=True, infinite=True) + r = Dummy(extended_real=True, finite=False) + x = Symbol('x') + xf = Symbol('xf', finite=True) + assert (n + p).is_extended_positive is None + assert (n + x).is_extended_positive is None + assert (p + x).is_extended_positive is None + assert (n + p).is_extended_negative is None + assert (n + x).is_extended_negative is None + assert (p + x).is_extended_negative is None + + assert (n + xf).is_extended_positive is False + assert (p + xf).is_extended_positive is True + assert (n + xf).is_extended_negative is True + assert (p + xf).is_extended_negative is False + + assert (x - S.Infinity).is_extended_negative is None # issue 7798 + # issue 8046, 16.2 + assert (p + nn).is_extended_positive + assert (n + np).is_extended_negative + assert (p + r).is_extended_positive is None + + +def test_Add_is_imaginary(): + nn = Dummy(nonnegative=True) + assert (I*nn + I).is_imaginary # issue 8046, 17 + + +def test_Add_is_algebraic(): + a = Symbol('a', algebraic=True) + b = Symbol('a', algebraic=True) + na = Symbol('na', algebraic=False) + nb = Symbol('nb', algebraic=False) + x = Symbol('x') + assert (a + b).is_algebraic + assert (na + nb).is_algebraic is None + assert (a + na).is_algebraic is False + assert (a + x).is_algebraic is None + assert (na + x).is_algebraic is None + + +def test_Mul_is_algebraic(): + a = Symbol('a', algebraic=True) + b = Symbol('b', algebraic=True) + na = Symbol('na', algebraic=False) + an = Symbol('an', algebraic=True, nonzero=True) + nb = Symbol('nb', algebraic=False) + x = Symbol('x') + assert (a*b).is_algebraic is True + assert (na*nb).is_algebraic is None + assert (a*na).is_algebraic is None + assert (an*na).is_algebraic is False + assert (a*x).is_algebraic is None + assert (na*x).is_algebraic is None + + +def test_Pow_is_algebraic(): + e = Symbol('e', algebraic=True) + + assert Pow(1, e, evaluate=False).is_algebraic + assert Pow(0, e, evaluate=False).is_algebraic + + a = Symbol('a', algebraic=True) + azf = Symbol('azf', algebraic=True, zero=False) + na = Symbol('na', algebraic=False) + ia = Symbol('ia', algebraic=True, irrational=True) + ib = Symbol('ib', algebraic=True, irrational=True) + r = Symbol('r', rational=True) + x = Symbol('x') + assert (a**2).is_algebraic is True + assert (a**r).is_algebraic is None + assert (azf**r).is_algebraic is True + assert (a**x).is_algebraic is None + assert (na**r).is_algebraic is None + assert (ia**r).is_algebraic is True + assert (ia**ib).is_algebraic is False + + assert (a**e).is_algebraic is None + + # Gelfond-Schneider constant: + assert Pow(2, sqrt(2), evaluate=False).is_algebraic is False + + assert Pow(S.GoldenRatio, sqrt(3), evaluate=False).is_algebraic is False + + # issue 8649 + t = Symbol('t', real=True, transcendental=True) + n = Symbol('n', integer=True) + assert (t**n).is_algebraic is None + assert (t**n).is_integer is None + + assert (pi**3).is_algebraic is False + r = Symbol('r', zero=True) + assert (pi**r).is_algebraic is True + + +def test_Mul_is_prime_composite(): + x = Symbol('x', positive=True, integer=True) + y = Symbol('y', positive=True, integer=True) + assert (x*y).is_prime is None + assert ( (x+1)*(y+1) ).is_prime is False + assert ( (x+1)*(y+1) ).is_composite is True + + x = Symbol('x', positive=True) + assert ( (x+1)*(y+1) ).is_prime is None + assert ( (x+1)*(y+1) ).is_composite is None + + +def test_Pow_is_pos_neg(): + z = Symbol('z', real=True) + w = Symbol('w', nonpositive=True) + + assert (S.NegativeOne**S(2)).is_positive is True + assert (S.One**z).is_positive is True + assert (S.NegativeOne**S(3)).is_positive is False + assert (S.Zero**S.Zero).is_positive is True # 0**0 is 1 + assert (w**S(3)).is_positive is False + assert (w**S(2)).is_positive is None + assert (I**2).is_positive is False + assert (I**4).is_positive is True + + # tests emerging from #16332 issue + p = Symbol('p', zero=True) + q = Symbol('q', zero=False, real=True) + j = Symbol('j', zero=False, even=True) + x = Symbol('x', zero=True) + y = Symbol('y', zero=True) + assert (p**q).is_positive is False + assert (p**q).is_negative is False + assert (p**j).is_positive is False + assert (x**y).is_positive is True # 0**0 + assert (x**y).is_negative is False + + +def test_Pow_is_prime_composite(): + x = Symbol('x', positive=True, integer=True) + y = Symbol('y', positive=True, integer=True) + assert (x**y).is_prime is None + assert ( x**(y+1) ).is_prime is False + assert ( x**(y+1) ).is_composite is None + assert ( (x+1)**(y+1) ).is_composite is True + assert ( (-x-1)**(2*y) ).is_composite is True + + x = Symbol('x', positive=True) + assert (x**y).is_prime is None + + +def test_Mul_is_infinite(): + x = Symbol('x') + f = Symbol('f', finite=True) + i = Symbol('i', infinite=True) + z = Dummy(zero=True) + nzf = Dummy(finite=True, zero=False) + from sympy.core.mul import Mul + assert (x*f).is_finite is None + assert (x*i).is_finite is None + assert (f*i).is_finite is None + assert (x*f*i).is_finite is None + assert (z*i).is_finite is None + assert (nzf*i).is_finite is False + assert (z*f).is_finite is True + assert Mul(0, f, evaluate=False).is_finite is True + assert Mul(0, i, evaluate=False).is_finite is None + + assert (x*f).is_infinite is None + assert (x*i).is_infinite is None + assert (f*i).is_infinite is None + assert (x*f*i).is_infinite is None + assert (z*i).is_infinite is S.NaN.is_infinite + assert (nzf*i).is_infinite is True + assert (z*f).is_infinite is False + assert Mul(0, f, evaluate=False).is_infinite is False + assert Mul(0, i, evaluate=False).is_infinite is S.NaN.is_infinite + + +def test_Add_is_infinite(): + x = Symbol('x') + f = Symbol('f', finite=True) + i = Symbol('i', infinite=True) + i2 = Symbol('i2', infinite=True) + z = Dummy(zero=True) + nzf = Dummy(finite=True, zero=False) + from sympy.core.add import Add + assert (x+f).is_finite is None + assert (x+i).is_finite is None + assert (f+i).is_finite is False + assert (x+f+i).is_finite is None + assert (z+i).is_finite is False + assert (nzf+i).is_finite is False + assert (z+f).is_finite is True + assert (i+i2).is_finite is None + assert Add(0, f, evaluate=False).is_finite is True + assert Add(0, i, evaluate=False).is_finite is False + + assert (x+f).is_infinite is None + assert (x+i).is_infinite is None + assert (f+i).is_infinite is True + assert (x+f+i).is_infinite is None + assert (z+i).is_infinite is True + assert (nzf+i).is_infinite is True + assert (z+f).is_infinite is False + assert (i+i2).is_infinite is None + assert Add(0, f, evaluate=False).is_infinite is False + assert Add(0, i, evaluate=False).is_infinite is True + + +def test_special_is_rational(): + i = Symbol('i', integer=True) + i2 = Symbol('i2', integer=True) + ni = Symbol('ni', integer=True, nonzero=True) + r = Symbol('r', rational=True) + rn = Symbol('r', rational=True, nonzero=True) + nr = Symbol('nr', irrational=True) + x = Symbol('x') + assert sqrt(3).is_rational is False + assert (3 + sqrt(3)).is_rational is False + assert (3*sqrt(3)).is_rational is False + assert exp(3).is_rational is False + assert exp(ni).is_rational is False + assert exp(rn).is_rational is False + assert exp(x).is_rational is None + assert exp(log(3), evaluate=False).is_rational is True + assert log(exp(3), evaluate=False).is_rational is True + assert log(3).is_rational is False + assert log(ni + 1).is_rational is False + assert log(rn + 1).is_rational is False + assert log(x).is_rational is None + assert (sqrt(3) + sqrt(5)).is_rational is None + assert (sqrt(3) + S.Pi).is_rational is False + assert (x**i).is_rational is None + assert (i**i).is_rational is True + assert (i**i2).is_rational is None + assert (r**i).is_rational is None + assert (r**r).is_rational is None + assert (r**x).is_rational is None + assert (nr**i).is_rational is None # issue 8598 + assert (nr**Symbol('z', zero=True)).is_rational + assert sin(1).is_rational is False + assert sin(ni).is_rational is False + assert sin(rn).is_rational is False + assert sin(x).is_rational is None + assert asin(r).is_rational is False + assert sin(asin(3), evaluate=False).is_rational is True + + +@XFAIL +def test_issue_6275(): + x = Symbol('x') + # both zero or both Muls...but neither "change would be very appreciated. + # This is similar to x/x => 1 even though if x = 0, it is really nan. + assert isinstance(x*0, type(0*S.Infinity)) + if 0*S.Infinity is S.NaN: + b = Symbol('b', finite=None) + assert (b*0).is_zero is None + + +def test_sanitize_assumptions(): + # issue 6666 + for cls in (Symbol, Dummy, Wild): + x = cls('x', real=1, positive=0) + assert x.is_real is True + assert x.is_positive is False + assert cls('', real=True, positive=None).is_positive is None + raises(ValueError, lambda: cls('', commutative=None)) + raises(ValueError, lambda: Symbol._sanitize({"commutative": None})) + + +def test_special_assumptions(): + e = -3 - sqrt(5) + (-sqrt(10)/2 - sqrt(2)/2)**2 + assert simplify(e < 0) is S.false + assert simplify(e > 0) is S.false + assert (e == 0) is False # it's not a literal 0 + assert e.equals(0) is True + + +def test_inconsistent(): + # cf. issues 5795 and 5545 + raises(InconsistentAssumptions, lambda: Symbol('x', real=True, + commutative=False)) + + +def test_issue_6631(): + assert ((-1)**(I)).is_real is True + assert ((-1)**(I*2)).is_real is True + assert ((-1)**(I/2)).is_real is True + assert ((-1)**(I*S.Pi)).is_real is True + assert (I**(I + 2)).is_real is True + + +def test_issue_2730(): + assert (1/(1 + I)).is_real is False + + +def test_issue_4149(): + assert (3 + I).is_complex + assert (3 + I).is_imaginary is False + assert (3*I + S.Pi*I).is_imaginary + # as Zero.is_imaginary is False, see issue 7649 + y = Symbol('y', real=True) + assert (3*I + S.Pi*I + y*I).is_imaginary is None + p = Symbol('p', positive=True) + assert (3*I + S.Pi*I + p*I).is_imaginary + n = Symbol('n', negative=True) + assert (-3*I - S.Pi*I + n*I).is_imaginary + + i = Symbol('i', imaginary=True) + assert ([(i**a).is_imaginary for a in range(4)] == + [False, True, False, True]) + + # tests from the PR #7887: + e = S("-sqrt(3)*I/2 + 0.866025403784439*I") + assert e.is_real is False + assert e.is_imaginary + + +def test_issue_2920(): + n = Symbol('n', negative=True) + assert sqrt(n).is_imaginary + + +def test_issue_7899(): + x = Symbol('x', real=True) + assert (I*x).is_real is None + assert ((x - I)*(x - 1)).is_zero is None + assert ((x - I)*(x - 1)).is_real is None + + +@XFAIL +def test_issue_7993(): + x = Dummy(integer=True) + y = Dummy(noninteger=True) + assert (x - y).is_zero is False + + +def test_issue_8075(): + raises(InconsistentAssumptions, lambda: Dummy(zero=True, finite=False)) + raises(InconsistentAssumptions, lambda: Dummy(zero=True, infinite=True)) + + +def test_issue_8642(): + x = Symbol('x', real=True, integer=False) + assert (x*2).is_integer is None, (x*2).is_integer + + +def test_issues_8632_8633_8638_8675_8992(): + p = Dummy(integer=True, positive=True) + nn = Dummy(integer=True, nonnegative=True) + assert (p - S.Half).is_positive + assert (p - 1).is_nonnegative + assert (nn + 1).is_positive + assert (-p + 1).is_nonpositive + assert (-nn - 1).is_negative + prime = Dummy(prime=True) + assert (prime - 2).is_nonnegative + assert (prime - 3).is_nonnegative is None + even = Dummy(positive=True, even=True) + assert (even - 2).is_nonnegative + + p = Dummy(positive=True) + assert (p/(p + 1) - 1).is_negative + assert ((p + 2)**3 - S.Half).is_positive + n = Dummy(negative=True) + assert (n - 3).is_nonpositive + + +def test_issue_9115_9150(): + n = Dummy('n', integer=True, nonnegative=True) + assert (factorial(n) >= 1) == True + assert (factorial(n) < 1) == False + + assert factorial(n + 1).is_even is None + assert factorial(n + 2).is_even is True + assert factorial(n + 2) >= 2 + + +def test_issue_9165(): + z = Symbol('z', zero=True) + f = Symbol('f', finite=False) + assert 0/z is S.NaN + assert 0*(1/z) is S.NaN + assert 0*f is S.NaN + + +def test_issue_10024(): + x = Dummy('x') + assert Mod(x, 2*pi).is_zero is None + + +def test_issue_10302(): + x = Symbol('x') + r = Symbol('r', real=True) + u = -(3*2**pi)**(1/pi) + 2*3**(1/pi) + i = u + u*I + + assert i.is_real is None # w/o simplification this should fail + assert (u + i).is_zero is None + assert (1 + i).is_zero is False + + a = Dummy('a', zero=True) + assert (a + I).is_zero is False + assert (a + r*I).is_zero is None + assert (a + I).is_imaginary + assert (a + x + I).is_imaginary is None + assert (a + r*I + I).is_imaginary is None + + +def test_complex_reciprocal_imaginary(): + assert (1 / (4 + 3*I)).is_imaginary is False + + +def test_issue_16313(): + x = Symbol('x', extended_real=False) + k = Symbol('k', real=True) + l = Symbol('l', real=True, zero=False) + assert (-x).is_real is False + assert (k*x).is_real is None # k can be zero also + assert (l*x).is_real is False + assert (l*x*x).is_real is None # since x*x can be a real number + assert (-x).is_positive is False + + +def test_issue_16579(): + # extended_real -> finite | infinite + x = Symbol('x', extended_real=True, infinite=False) + y = Symbol('y', extended_real=True, finite=False) + assert x.is_finite is True + assert y.is_infinite is True + + # With PR 16978, complex now implies finite + c = Symbol('c', complex=True) + assert c.is_finite is True + raises(InconsistentAssumptions, lambda: Dummy(complex=True, finite=False)) + + # Now infinite == !finite + nf = Symbol('nf', finite=False) + assert nf.is_infinite is True + + +def test_issue_17556(): + z = I*oo + assert z.is_imaginary is False + assert z.is_finite is False + + +def test_issue_21651(): + k = Symbol('k', positive=True, integer=True) + exp = 2*2**(-k) + assert exp.is_integer is None + + +def test_assumptions_copy(): + assert assumptions(Symbol('x'), {"commutative": True} + ) == {'commutative': True} + assert assumptions(Symbol('x'), ['integer']) == {} + assert assumptions(Symbol('x'), ['commutative'] + ) == {'commutative': True} + assert assumptions(Symbol('x')) == {'commutative': True} + assert assumptions(1)['positive'] + assert assumptions(3 + I) == { + 'algebraic': True, + 'commutative': True, + 'complex': True, + 'composite': False, + 'even': False, + 'extended_negative': False, + 'extended_nonnegative': False, + 'extended_nonpositive': False, + 'extended_nonzero': False, + 'extended_positive': False, + 'extended_real': False, + 'finite': True, + 'imaginary': False, + 'infinite': False, + 'integer': False, + 'irrational': False, + 'negative': False, + 'noninteger': False, + 'nonnegative': False, + 'nonpositive': False, + 'nonzero': False, + 'odd': False, + 'positive': False, + 'prime': False, + 'rational': False, + 'real': False, + 'transcendental': False, + 'zero': False} + + +def test_check_assumptions(): + assert check_assumptions(1, 0) is False + x = Symbol('x', positive=True) + assert check_assumptions(1, x) is True + assert check_assumptions(1, 1) is True + assert check_assumptions(-1, 1) is False + i = Symbol('i', integer=True) + # don't know if i is positive (or prime, etc...) + assert check_assumptions(i, 1) is None + assert check_assumptions(Dummy(integer=None), integer=True) is None + assert check_assumptions(Dummy(integer=None), integer=False) is None + assert check_assumptions(Dummy(integer=False), integer=True) is False + assert check_assumptions(Dummy(integer=True), integer=False) is False + # no T/F assumptions to check + assert check_assumptions(Dummy(integer=False), integer=None) is True + raises(ValueError, lambda: check_assumptions(2*x, x, positive=True)) + + +def test_failing_assumptions(): + x = Symbol('x', positive=True) + y = Symbol('y') + assert failing_assumptions(6*x + y, **x.assumptions0) == \ + {'real': None, 'imaginary': None, 'complex': None, 'hermitian': None, + 'positive': None, 'nonpositive': None, 'nonnegative': None, 'nonzero': None, + 'negative': None, 'zero': None, 'extended_real': None, 'finite': None, + 'infinite': None, 'extended_negative': None, 'extended_nonnegative': None, + 'extended_nonpositive': None, 'extended_nonzero': None, + 'extended_positive': None } + + +def test_common_assumptions(): + assert common_assumptions([0, 1, 2] + ) == {'algebraic': True, 'irrational': False, 'hermitian': + True, 'extended_real': True, 'real': True, 'extended_negative': + False, 'extended_nonnegative': True, 'integer': True, + 'rational': True, 'imaginary': False, 'complex': True, + 'commutative': True,'noninteger': False, 'composite': False, + 'infinite': False, 'nonnegative': True, 'finite': True, + 'transcendental': False,'negative': False} + assert common_assumptions([0, 1, 2], 'positive integer'.split() + ) == {'integer': True} + assert common_assumptions([0, 1, 2], []) == {} + assert common_assumptions([], ['integer']) == {} + assert common_assumptions([0], ['integer']) == {'integer': True} + +def test_pre_generated_assumption_rules_are_valid(): + # check the pre-generated assumptions match freshly generated assumptions + # if this check fails, consider updating the assumptions + # see sympy.core.assumptions._generate_assumption_rules + pre_generated_assumptions =_load_pre_generated_assumption_rules() + generated_assumptions =_generate_assumption_rules() + assert pre_generated_assumptions._to_python() == generated_assumptions._to_python(), "pre-generated assumptions are invalid, see sympy.core.assumptions._generate_assumption_rules" + + +def test_ask_shuffle(): + grp = PermutationGroup(Permutation(1, 0, 2), Permutation(2, 1, 3)) + + seed(123) + first = grp.random() + seed(123) + simplify(I) + second = grp.random() + seed(123) + simplify(-I) + third = grp.random() + + assert first == second == third diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_basic.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_basic.py new file mode 100644 index 0000000000000000000000000000000000000000..3a7adbb5dcf0d70089ff79028afa943b24ee0c42 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_basic.py @@ -0,0 +1,343 @@ +"""This tests sympy/core/basic.py with (ideally) no reference to subclasses +of Basic or Atom.""" +import collections +from typing import TypeVar, Generic + +from sympy.assumptions.ask import Q +from sympy.core.basic import (Basic, Atom, as_Basic, + _atomic, _aresame) +from sympy.core.containers import Tuple +from sympy.core.function import Function, Lambda +from sympy.core.numbers import I, pi, Float +from sympy.core.singleton import S +from sympy.core.symbol import symbols, Symbol, Dummy +from sympy.concrete.summations import Sum +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.functions.special.gamma_functions import gamma +from sympy.integrals.integrals import Integral +from sympy.functions.elementary.exponential import exp +from sympy.testing.pytest import raises, warns_deprecated_sympy +from sympy.functions.elementary.complexes import Abs, sign +from sympy.functions.elementary.piecewise import Piecewise +from sympy.core.relational import Eq + +b1 = Basic() +b2 = Basic(b1) +b3 = Basic(b2) +b21 = Basic(b2, b1) +T = TypeVar('T') + + +def test__aresame(): + assert not _aresame(Basic(Tuple()), Basic()) + for i, j in [(S(2), S(2.)), (1., Float(1))]: + for do in range(2): + assert not _aresame(Basic(i), Basic(j)) + assert not _aresame(i, j) + i, j = j, i + + +def test_structure(): + assert b21.args == (b2, b1) + assert b21.func(*b21.args) == b21 + assert bool(b1) + + +def test_immutable(): + assert not hasattr(b1, '__dict__') + with raises(AttributeError): + b1.x = 1 + + +def test_equality(): + instances = [b1, b2, b3, b21, Basic(b1, b1, b1), Basic] + for i, b_i in enumerate(instances): + for j, b_j in enumerate(instances): + assert (b_i == b_j) == (i == j) + assert (b_i != b_j) == (i != j) + + assert Basic() != [] + assert not(Basic() == []) + assert Basic() != 0 + assert not(Basic() == 0) + + class Foo: + """ + Class that is unaware of Basic, and relies on both classes returning + the NotImplemented singleton for equivalence to evaluate to False. + + """ + + b = Basic() + foo = Foo() + + assert b != foo + assert foo != b + assert not b == foo + assert not foo == b + + class Bar: + """ + Class that considers itself equal to any instance of Basic, and relies + on Basic returning the NotImplemented singleton in order to achieve + a symmetric equivalence relation. + + """ + def __eq__(self, other): + if isinstance(other, Basic): + return True + return NotImplemented + + def __ne__(self, other): + return not self == other + + bar = Bar() + + assert b == bar + assert bar == b + assert not b != bar + assert not bar != b + + +def test_matches_basic(): + instances = [Basic(b1, b1, b2), Basic(b1, b2, b1), Basic(b2, b1, b1), + Basic(b1, b2), Basic(b2, b1), b2, b1] + for i, b_i in enumerate(instances): + for j, b_j in enumerate(instances): + if i == j: + assert b_i.matches(b_j) == {} + else: + assert b_i.matches(b_j) is None + assert b1.match(b1) == {} + + +def test_has(): + assert b21.has(b1) + assert b21.has(b3, b1) + assert b21.has(Basic) + assert not b1.has(b21, b3) + assert not b21.has() + assert not b21.has(str) + assert not Symbol("x").has("x") + + +def test_subs(): + assert b21.subs(b2, b1) == Basic(b1, b1) + assert b21.subs(b2, b21) == Basic(b21, b1) + assert b3.subs(b2, b1) == b2 + + assert b21.subs([(b2, b1), (b1, b2)]) == Basic(b2, b2) + + assert b21.subs({b1: b2, b2: b1}) == Basic(b2, b2) + assert b21.subs(collections.ChainMap({b1: b2}, {b2: b1})) == Basic(b2, b2) + assert b21.subs(collections.OrderedDict([(b2, b1), (b1, b2)])) == Basic(b2, b2) + + raises(ValueError, lambda: b21.subs('bad arg')) + raises(TypeError, lambda: b21.subs(b1, b2, b3)) + # dict(b1=foo) creates a string 'b1' but leaves foo unchanged; subs + # will convert the first to a symbol but will raise an error if foo + # cannot be sympified; sympification is strict if foo is not string + raises(TypeError, lambda: b21.subs(b1='bad arg')) + + assert Symbol("text").subs({"text": b1}) == b1 + assert Symbol("s").subs({"s": 1}) == 1 + + +def test_subs_with_unicode_symbols(): + expr = Symbol('var1') + replaced = expr.subs('var1', 'x') + assert replaced.name == 'x' + + replaced = expr.subs('var1', 'x') + assert replaced.name == 'x' + + +def test_atoms(): + assert b21.atoms() == {Basic()} + + +def test_free_symbols_empty(): + assert b21.free_symbols == set() + + +def test_doit(): + assert b21.doit() == b21 + assert b21.doit(deep=False) == b21 + + +def test_S(): + assert repr(S) == 'S' + + +def test_xreplace(): + assert b21.xreplace({b2: b1}) == Basic(b1, b1) + assert b21.xreplace({b2: b21}) == Basic(b21, b1) + assert b3.xreplace({b2: b1}) == b2 + assert Basic(b1, b2).xreplace({b1: b2, b2: b1}) == Basic(b2, b1) + assert Atom(b1).xreplace({b1: b2}) == Atom(b1) + assert Atom(b1).xreplace({Atom(b1): b2}) == b2 + raises(TypeError, lambda: b1.xreplace()) + raises(TypeError, lambda: b1.xreplace([b1, b2])) + for f in (exp, Function('f')): + assert f.xreplace({}) == f + assert f.xreplace({}, hack2=True) == f + assert f.xreplace({f: b1}) == b1 + assert f.xreplace({f: b1}, hack2=True) == b1 + + +def test_sorted_args(): + x = symbols('x') + assert b21._sorted_args == b21.args + raises(AttributeError, lambda: x._sorted_args) + +def test_call(): + x, y = symbols('x y') + # See the long history of this in issues 5026 and 5105. + + raises(TypeError, lambda: sin(x)({ x : 1, sin(x) : 2})) + raises(TypeError, lambda: sin(x)(1)) + + # No effect as there are no callables + assert sin(x).rcall(1) == sin(x) + assert (1 + sin(x)).rcall(1) == 1 + sin(x) + + # Effect in the presence of callables + l = Lambda(x, 2*x) + assert (l + x).rcall(y) == 2*y + x + assert (x**l).rcall(2) == x**4 + # TODO UndefinedFunction does not subclass Expr + #f = Function('f') + #assert (2*f)(x) == 2*f(x) + + assert (Q.real & Q.positive).rcall(x) == Q.real(x) & Q.positive(x) + + +def test_rewrite(): + x, y, z = symbols('x y z') + a, b = symbols('a b') + f1 = sin(x) + cos(x) + assert f1.rewrite(cos,exp) == exp(I*x)/2 + sin(x) + exp(-I*x)/2 + assert f1.rewrite([cos],sin) == sin(x) + sin(x + pi/2, evaluate=False) + f2 = sin(x) + cos(y)/gamma(z) + assert f2.rewrite(sin,exp) == -I*(exp(I*x) - exp(-I*x))/2 + cos(y)/gamma(z) + + assert f1.rewrite() == f1 + +def test_literal_evalf_is_number_is_zero_is_comparable(): + x = symbols('x') + f = Function('f') + + # issue 5033 + assert f.is_number is False + # issue 6646 + assert f(1).is_number is False + i = Integral(0, (x, x, x)) + # expressions that are symbolically 0 can be difficult to prove + # so in case there is some easy way to know if something is 0 + # it should appear in the is_zero property for that object; + # if is_zero is true evalf should always be able to compute that + # zero + assert i.n() == 0 + assert i.is_zero + assert i.is_number is False + assert i.evalf(2, strict=False) == 0 + + # issue 10268 + n = sin(1)**2 + cos(1)**2 - 1 + assert n.is_comparable is False + assert n.n(2).is_comparable is False + assert n.n(2).n(2).is_comparable + + +def test_as_Basic(): + assert as_Basic(1) is S.One + assert as_Basic(()) == Tuple() + raises(TypeError, lambda: as_Basic([])) + + +def test_atomic(): + g, h = map(Function, 'gh') + x = symbols('x') + assert _atomic(g(x + h(x))) == {g(x + h(x))} + assert _atomic(g(x + h(x)), recursive=True) == {h(x), x, g(x + h(x))} + assert _atomic(1) == set() + assert _atomic(Basic(S(1), S(2))) == set() + + +def test_as_dummy(): + u, v, x, y, z, _0, _1 = symbols('u v x y z _0 _1') + assert Lambda(x, x + 1).as_dummy() == Lambda(_0, _0 + 1) + assert Lambda(x, x + _0).as_dummy() == Lambda(_1, _0 + _1) + eq = (1 + Sum(x, (x, 1, x))) + ans = 1 + Sum(_0, (_0, 1, x)) + once = eq.as_dummy() + assert once == ans + twice = once.as_dummy() + assert twice == ans + assert Integral(x + _0, (x, x + 1), (_0, 1, 2) + ).as_dummy() == Integral(_0 + _1, (_0, x + 1), (_1, 1, 2)) + for T in (Symbol, Dummy): + d = T('x', real=True) + D = d.as_dummy() + assert D != d and D.func == Dummy and D.is_real is None + assert Dummy().as_dummy().is_commutative + assert Dummy(commutative=False).as_dummy().is_commutative is False + + +def test_canonical_variables(): + x, i0, i1 = symbols('x _:2') + assert Integral(x, (x, x + 1)).canonical_variables == {x: i0} + assert Integral(x, (x, x + 1), (i0, 1, 2)).canonical_variables == { + x: i0, i0: i1} + assert Integral(x, (x, x + i0)).canonical_variables == {x: i1} + + +def test_replace_exceptions(): + from sympy.core.symbol import Wild + x, y = symbols('x y') + e = (x**2 + x*y) + raises(TypeError, lambda: e.replace(sin, 2)) + b = Wild('b') + c = Wild('c') + raises(TypeError, lambda: e.replace(b*c, c.is_real)) + raises(TypeError, lambda: e.replace(b.is_real, 1)) + raises(TypeError, lambda: e.replace(lambda d: d.is_Number, 1)) + + +def test_ManagedProperties(): + # ManagedProperties is now deprecated. Here we do our best to check that if + # someone is using it then it does work in the way that it previously did + # but gives a deprecation warning. + from sympy.core.assumptions import ManagedProperties + + myclasses = [] + + class MyMeta(ManagedProperties): + def __init__(cls, *args, **kwargs): + myclasses.append('executed') + super().__init__(*args, **kwargs) + + code = """ +class MySubclass(Basic, metaclass=MyMeta): + pass +""" + with warns_deprecated_sympy(): + exec(code) + + assert myclasses == ['executed'] + + +def test_generic(): + # https://github.com/sympy/sympy/issues/25399 + class A(Symbol, Generic[T]): + pass + + class B(A[T]): + pass + + +def test_rewrite_abs(): + # https://github.com/sympy/sympy/issues/27323 + x = Symbol('x') + assert sign(x).rewrite(abs) == sign(x).rewrite(Abs) + assert sign(x).rewrite(abs) == Piecewise((0, Eq(x, 0)), (x / Abs(x), True)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_cache.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_cache.py new file mode 100644 index 0000000000000000000000000000000000000000..9124fca70718299252929a9923f335dde25256eb --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_cache.py @@ -0,0 +1,91 @@ +import sys +from sympy.core.cache import cacheit, cached_property, lazy_function +from sympy.testing.pytest import raises + +def test_cacheit_doc(): + @cacheit + def testfn(): + "test docstring" + pass + + assert testfn.__doc__ == "test docstring" + assert testfn.__name__ == "testfn" + +def test_cacheit_unhashable(): + @cacheit + def testit(x): + return x + + assert testit(1) == 1 + assert testit(1) == 1 + a = {} + assert testit(a) == {} + a[1] = 2 + assert testit(a) == {1: 2} + +def test_cachit_exception(): + # Make sure the cache doesn't call functions multiple times when they + # raise TypeError + + a = [] + + @cacheit + def testf(x): + a.append(0) + raise TypeError + + raises(TypeError, lambda: testf(1)) + assert len(a) == 1 + + a.clear() + # Unhashable type + raises(TypeError, lambda: testf([])) + assert len(a) == 1 + + @cacheit + def testf2(x): + a.append(0) + raise TypeError("Error") + + a.clear() + raises(TypeError, lambda: testf2(1)) + assert len(a) == 1 + + a.clear() + # Unhashable type + raises(TypeError, lambda: testf2([])) + assert len(a) == 1 + +def test_cached_property(): + class A: + def __init__(self, value): + self.value = value + self.calls = 0 + + @cached_property + def prop(self): + self.calls = self.calls + 1 + return self.value + + a = A(2) + assert a.calls == 0 + assert a.prop == 2 + assert a.calls == 1 + assert a.prop == 2 + assert a.calls == 1 + b = A(None) + assert b.prop == None + + +def test_lazy_function(): + module_name='xmlrpc.client' + function_name = 'gzip_decode' + lazy = lazy_function(module_name, function_name) + assert lazy(b'') == b'' + assert module_name in sys.modules + assert function_name in str(lazy) + repr_lazy = repr(lazy) + assert 'LazyFunction' in repr_lazy + assert function_name in repr_lazy + + lazy = lazy_function('sympy.core.cache', 'cheap') diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_compatibility.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_compatibility.py new file mode 100644 index 0000000000000000000000000000000000000000..31d2bed07b21aa2fa489273dca9edfc9993cfd86 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_compatibility.py @@ -0,0 +1,6 @@ +from sympy.testing.pytest import warns_deprecated_sympy + +def test_compatibility_submodule(): + # Test the sympy.core.compatibility deprecation warning + with warns_deprecated_sympy(): + import sympy.core.compatibility # noqa:F401 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_complex.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_complex.py new file mode 100644 index 0000000000000000000000000000000000000000..a607e0bdb4db859336aa30aa61f43bfb57d5df88 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_complex.py @@ -0,0 +1,226 @@ +from sympy.core.function import expand_complex +from sympy.core.numbers import (I, Integer, Rational, pi) +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import (Abs, conjugate, im, re, sign) +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.hyperbolic import (cosh, coth, sinh, tanh) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, cot, sin, tan) + +def test_complex(): + a = Symbol("a", real=True) + b = Symbol("b", real=True) + e = (a + I*b)*(a - I*b) + assert e.expand() == a**2 + b**2 + assert sqrt(I) == Pow(I, S.Half) + + +def test_conjugate(): + a = Symbol("a", real=True) + b = Symbol("b", real=True) + c = Symbol("c", imaginary=True) + d = Symbol("d", imaginary=True) + x = Symbol('x') + z = a + I*b + c + I*d + zc = a - I*b - c + I*d + assert conjugate(z) == zc + assert conjugate(exp(z)) == exp(zc) + assert conjugate(exp(I*x)) == exp(-I*conjugate(x)) + assert conjugate(z**5) == zc**5 + assert conjugate(abs(x)) == abs(x) + assert conjugate(sign(z)) == sign(zc) + assert conjugate(sin(z)) == sin(zc) + assert conjugate(cos(z)) == cos(zc) + assert conjugate(tan(z)) == tan(zc) + assert conjugate(cot(z)) == cot(zc) + assert conjugate(sinh(z)) == sinh(zc) + assert conjugate(cosh(z)) == cosh(zc) + assert conjugate(tanh(z)) == tanh(zc) + assert conjugate(coth(z)) == coth(zc) + + +def test_abs1(): + a = Symbol("a", real=True) + b = Symbol("b", real=True) + assert abs(a) == Abs(a) + assert abs(-a) == abs(a) + assert abs(a + I*b) == sqrt(a**2 + b**2) + + +def test_abs2(): + a = Symbol("a", real=False) + b = Symbol("b", real=False) + assert abs(a) != a + assert abs(-a) != a + assert abs(a + I*b) != sqrt(a**2 + b**2) + + +def test_evalc(): + x = Symbol("x", real=True) + y = Symbol("y", real=True) + z = Symbol("z") + assert ((x + I*y)**2).expand(complex=True) == x**2 + 2*I*x*y - y**2 + assert expand_complex(z**(2*I)) == (re((re(z) + I*im(z))**(2*I)) + + I*im((re(z) + I*im(z))**(2*I))) + assert expand_complex( + z**(2*I), deep=False) == I*im(z**(2*I)) + re(z**(2*I)) + + assert exp(I*x) != cos(x) + I*sin(x) + assert exp(I*x).expand(complex=True) == cos(x) + I*sin(x) + assert exp(I*x + y).expand(complex=True) == exp(y)*cos(x) + I*sin(x)*exp(y) + + assert sin(I*x).expand(complex=True) == I * sinh(x) + assert sin(x + I*y).expand(complex=True) == sin(x)*cosh(y) + \ + I * sinh(y) * cos(x) + + assert cos(I*x).expand(complex=True) == cosh(x) + assert cos(x + I*y).expand(complex=True) == cos(x)*cosh(y) - \ + I * sinh(y) * sin(x) + + assert tan(I*x).expand(complex=True) == tanh(x) * I + assert tan(x + I*y).expand(complex=True) == ( + sin(2*x)/(cos(2*x) + cosh(2*y)) + + I*sinh(2*y)/(cos(2*x) + cosh(2*y))) + + assert sinh(I*x).expand(complex=True) == I * sin(x) + assert sinh(x + I*y).expand(complex=True) == sinh(x)*cos(y) + \ + I * sin(y) * cosh(x) + + assert cosh(I*x).expand(complex=True) == cos(x) + assert cosh(x + I*y).expand(complex=True) == cosh(x)*cos(y) + \ + I * sin(y) * sinh(x) + + assert tanh(I*x).expand(complex=True) == tan(x) * I + assert tanh(x + I*y).expand(complex=True) == ( + (sinh(x)*cosh(x) + I*cos(y)*sin(y)) / + (sinh(x)**2 + cos(y)**2)).expand() + + +def test_pythoncomplex(): + x = Symbol("x") + assert 4j*x != 4*x*I + assert 4j*x == 4.0*x*I + assert 4.1j*x != 4*x*I + + +def test_rootcomplex(): + R = Rational + assert ((+1 + I)**R(1, 2)).expand( + complex=True) == 2**R(1, 4)*cos( pi/8) + 2**R(1, 4)*sin( pi/8)*I + assert ((-1 - I)**R(1, 2)).expand( + complex=True) == 2**R(1, 4)*cos(3*pi/8) - 2**R(1, 4)*sin(3*pi/8)*I + assert (sqrt(-10)*I).as_real_imag() == (-sqrt(10), 0) + + +def test_expand_inverse(): + assert (1/(1 + I)).expand(complex=True) == (1 - I)/2 + assert ((1 + 2*I)**(-2)).expand(complex=True) == (-3 - 4*I)/25 + assert ((1 + I)**(-8)).expand(complex=True) == Rational(1, 16) + + +def test_expand_complex(): + assert ((2 + 3*I)**10).expand(complex=True) == -341525 - 145668*I + # the following two tests are to ensure the SymPy uses an efficient + # algorithm for calculating powers of complex numbers. They should execute + # in something like 0.01s. + assert ((2 + 3*I)**1000).expand(complex=True) == \ + -81079464736246615951519029367296227340216902563389546989376269312984127074385455204551402940331021387412262494620336565547972162814110386834027871072723273110439771695255662375718498785908345629702081336606863762777939617745464755635193139022811989314881997210583159045854968310911252660312523907616129080027594310008539817935736331124833163907518549408018652090650537035647520296539436440394920287688149200763245475036722326561143851304795139005599209239350981457301460233967137708519975586996623552182807311159141501424576682074392689622074945519232029999 + \ + 46938745946789557590804551905243206242164799136976022474337918748798900569942573265747576032611189047943842446167719177749107138603040963603119861476016947257034472364028585381714774667326478071264878108114128915685688115488744955550920239128462489496563930809677159214598114273887061533057125164518549173898349061972857446844052995037423459472376202251620778517659247970283904820245958198842631651569984310559418135975795868314764489884749573052997832686979294085577689571149679540256349988338406458116270429842222666345146926395233040564229555893248370000*I + assert ((2 + 3*I/4)**1000).expand(complex=True) == \ + Integer(1)*37079892761199059751745775382463070250205990218394308874593455293485167797989691280095867197640410033222367257278387021789651672598831503296531725827158233077451476545928116965316544607115843772405184272449644892857783761260737279675075819921259597776770965829089907990486964515784097181964312256560561065607846661496055417619388874421218472707497847700629822858068783288579581649321248495739224020822198695759609598745114438265083593711851665996586461937988748911532242908776883696631067311443171682974330675406616373422505939887984366289623091300746049101284856530270685577940283077888955692921951247230006346681086274961362500646889925803654263491848309446197554307105991537357310209426736453173441104334496173618419659521888945605315751089087820455852582920963561495787655250624781448951403353654348109893478206364632640344111022531861683064175862889459084900614967785405977231549003280842218501570429860550379522498497412180001/114813069527425452423283320117768198402231770208869520047764273682576626139237031385665948631650626991844596463898746277344711896086305533142593135616665318539129989145312280000688779148240044871428926990063486244781615463646388363947317026040466353970904996558162398808944629605623311649536164221970332681344168908984458505602379484807914058900934776500429002716706625830522008132236281291761267883317206598995396418127021779858404042159853183251540889433902091920554957783589672039160081957216630582755380425583726015528348786419432054508915275783882625175435528800822842770817965453762184851149029376 + \ + I*421638390580169706973991429333213477486930178424989246669892530737775352519112934278994501272111385966211392610029433824534634841747911783746811994443436271013377059560245191441549885048056920190833693041257216263519792201852046825443439142932464031501882145407459174948712992271510309541474392303461939389368955986650538525895866713074543004916049550090364398070215427272240155060576252568700906004691224321432509053286859100920489253598392100207663785243368195857086816912514025693453058403158416856847185079684216151337200057494966741268925263085619240941610301610538225414050394612058339070756009433535451561664522479191267503989904464718368605684297071150902631208673621618217106272361061676184840810762902463998065947687814692402219182668782278472952758690939877465065070481351343206840649517150634973307937551168752642148704904383991876969408056379195860410677814566225456558230131911142229028179902418223009651437985670625/1793954211366022694113801876840128100034871409513586250746316776290259783425578615401030447369541046747571819748417910583511123376348523955353017744010395602173906080395504375010762174191250701116076984219741972574712741619474818186676828531882286780795390571221287481389759837587864244524002565968286448146002639202882164150037179450123657170327105882819203167448541028601906377066191895183769810676831353109303069033234715310287563158747705988305326397404720186258671215368588625611876280581509852855552819149745718992630449787803625851701801184123166018366180137512856918294030710215034138299203584 + assert ((2 + 3*I)**-1000).expand(complex=True) == \ + Integer(1)*-81079464736246615951519029367296227340216902563389546989376269312984127074385455204551402940331021387412262494620336565547972162814110386834027871072723273110439771695255662375718498785908345629702081336606863762777939617745464755635193139022811989314881997210583159045854968310911252660312523907616129080027594310008539817935736331124833163907518549408018652090650537035647520296539436440394920287688149200763245475036722326561143851304795139005599209239350981457301460233967137708519975586996623552182807311159141501424576682074392689622074945519232029999/8777125472973511649630750050295188683351430110097915876250894978429797369155961290321829625004920141758416719066805645579710744290541337680113772670040386863849283653078324415471816788604945889094925784900885812724984087843737442111926413818245854362613018058774368703971604921858023116665586358870612944209398056562604561248859926344335598822815885851096698226775053153403320782439987679978321289537645645163767251396759519805603090332694449553371530571613352311006350058217982509738362083094920649452123351717366337410243853659113315547584871655479914439219520157174729130746351059075207407866012574386726064196992865627149566238044625779078186624347183905913357718850537058578084932880569701242598663149911276357125355850792073635533676541250531086757377369962506979378337216411188347761901006460813413505861461267545723590468627854202034450569581626648934062198718362303420281555886394558137408159453103395918783625713213314350531051312551733021627153081075080140680608080529736975658786227362251632725009435866547613598753584705455955419696609282059191031962604169242974038517575645939316377801594539335940001 - Integer(1)*46938745946789557590804551905243206242164799136976022474337918748798900569942573265747576032611189047943842446167719177749107138603040963603119861476016947257034472364028585381714774667326478071264878108114128915685688115488744955550920239128462489496563930809677159214598114273887061533057125164518549173898349061972857446844052995037423459472376202251620778517659247970283904820245958198842631651569984310559418135975795868314764489884749573052997832686979294085577689571149679540256349988338406458116270429842222666345146926395233040564229555893248370000*I/8777125472973511649630750050295188683351430110097915876250894978429797369155961290321829625004920141758416719066805645579710744290541337680113772670040386863849283653078324415471816788604945889094925784900885812724984087843737442111926413818245854362613018058774368703971604921858023116665586358870612944209398056562604561248859926344335598822815885851096698226775053153403320782439987679978321289537645645163767251396759519805603090332694449553371530571613352311006350058217982509738362083094920649452123351717366337410243853659113315547584871655479914439219520157174729130746351059075207407866012574386726064196992865627149566238044625779078186624347183905913357718850537058578084932880569701242598663149911276357125355850792073635533676541250531086757377369962506979378337216411188347761901006460813413505861461267545723590468627854202034450569581626648934062198718362303420281555886394558137408159453103395918783625713213314350531051312551733021627153081075080140680608080529736975658786227362251632725009435866547613598753584705455955419696609282059191031962604169242974038517575645939316377801594539335940001 + assert ((2 + 3*I/4)**-1000).expand(complex=True) == \ + Integer(1)*4257256305661027385394552848555894604806501409793288342610746813288539790051927148781268212212078237301273165351052934681382567968787279534591114913777456610214738290619922068269909423637926549603264174216950025398244509039145410016404821694746262142525173737175066432954496592560621330313807235750500564940782099283410261748370262433487444897446779072067625787246390824312580440138770014838135245148574339248259670887549732495841810961088930810608893772914812838358159009303794863047635845688453859317690488124382253918725010358589723156019888846606295866740117645571396817375322724096486161308083462637370825829567578309445855481578518239186117686659177284332344643124760453112513611749309168470605289172320376911472635805822082051716625171429727162039621902266619821870482519063133136820085579315127038372190224739238686708451840610064871885616258831386810233957438253532027049148030157164346719204500373766157143311767338973363806106967439378604898250533766359989107510507493549529158818602327525235240510049484816090584478644771183158342479140194633579061295740839490629457435283873180259847394582069479062820225159699506175855369539201399183443253793905149785994830358114153241481884290274629611529758663543080724574566578220908907477622643689220814376054314972190402285121776593824615083669045183404206291739005554569305329760211752815718335731118664756831942466773261465213581616104242113894521054475516019456867271362053692785300826523328020796670205463390909136593859765912483565093461468865534470710132881677639651348709376/2103100954337624833663208713697737151593634525061637972297915388685604042449504336765884978184588688426595940401280828953096857809292320006227881797146858511436638446932833617514351442216409828605662238790280753075176269765767010004889778647709740770757817960711900340755635772183674511158570690702969774966791073165467918123298694584729211212414462628433370481195120564586361368504153395406845170075275051749019600057116719726628746724489572189061061036426955163696859127711110719502594479795200686212257570291758725259007379710596548777812659422174199194837355646482046783616494013289495563083118517507178847555801163089723056310287760875135196081975602765511153122381201303871673391366630940702817360340900568748719988954847590748960761446218262344767250783946365392689256634180417145926390656439421745644011831124277463643383712803287985472471755648426749842410972650924240795946699346613614779460399530274263580007672855851663196114585312432954432654691485867618908420370875753749297487803461900447407917655296784879220450937110470920633595689721819488638484547259978337741496090602390463594556401615298457456112485536498177883358587125449801777718900375736758266215245325999241624148841915093787519330809347240990363802360596034171167818310322276373120180985148650099673289383722502488957717848531612020897298448601714154586319660314294591620415272119454982220034319689607295960162971300417552364254983071768070124456169427638371140064235083443242844616326538396503937972586505546495649094344512270582463639152160238137952390380581401171977159154009407415523525096743009110916334144716516647041176989758534635251844947906038080852185583742296318878233394998111078843229681030277039104786225656992262073797524057992347971177720807155842376332851559276430280477639539393920006008737472164850104411971830120295750221200029811143140323763349636629725073624360001 - Integer(1)*3098214262599218784594285246258841485430681674561917573155883806818465520660668045042109232930382494608383663464454841313154390741655282039877410154577448327874989496074260116195788919037407420625081798124301494353693248757853222257918294662198297114746822817460991242508743651430439120439020484502408313310689912381846149597061657483084652685283853595100434135149479564507015504022249330340259111426799121454516345905101620532787348293877485702600390665276070250119465888154331218827342488849948540687659846652377277250614246402784754153678374932540789808703029043827352976139228402417432199779415751301480406673762521987999573209628597459357964214510139892316208670927074795773830798600837815329291912002136924506221066071242281626618211060464126372574400100990746934953437169840312584285942093951405864225230033279614235191326102697164613004299868695519642598882914862568516635347204441042798206770888274175592401790040170576311989738272102077819127459014286741435419468254146418098278519775722104890854275995510700298782146199325790002255362719776098816136732897323406228294203133323296591166026338391813696715894870956511298793595675308998014158717167429941371979636895553724830981754579086664608880698350866487717403917070872269853194118364230971216854931998642990452908852258008095741042117326241406479532880476938937997238098399302185675832474590293188864060116934035867037219176916416481757918864533515526389079998129329045569609325290897577497835388451456680707076072624629697883854217331728051953671643278797380171857920000*I/2103100954337624833663208713697737151593634525061637972297915388685604042449504336765884978184588688426595940401280828953096857809292320006227881797146858511436638446932833617514351442216409828605662238790280753075176269765767010004889778647709740770757817960711900340755635772183674511158570690702969774966791073165467918123298694584729211212414462628433370481195120564586361368504153395406845170075275051749019600057116719726628746724489572189061061036426955163696859127711110719502594479795200686212257570291758725259007379710596548777812659422174199194837355646482046783616494013289495563083118517507178847555801163089723056310287760875135196081975602765511153122381201303871673391366630940702817360340900568748719988954847590748960761446218262344767250783946365392689256634180417145926390656439421745644011831124277463643383712803287985472471755648426749842410972650924240795946699346613614779460399530274263580007672855851663196114585312432954432654691485867618908420370875753749297487803461900447407917655296784879220450937110470920633595689721819488638484547259978337741496090602390463594556401615298457456112485536498177883358587125449801777718900375736758266215245325999241624148841915093787519330809347240990363802360596034171167818310322276373120180985148650099673289383722502488957717848531612020897298448601714154586319660314294591620415272119454982220034319689607295960162971300417552364254983071768070124456169427638371140064235083443242844616326538396503937972586505546495649094344512270582463639152160238137952390380581401171977159154009407415523525096743009110916334144716516647041176989758534635251844947906038080852185583742296318878233394998111078843229681030277039104786225656992262073797524057992347971177720807155842376332851559276430280477639539393920006008737472164850104411971830120295750221200029811143140323763349636629725073624360001 + + a = Symbol('a', real=True) + b = Symbol('b', real=True) + assert exp(a*(2 + I*b)).expand(complex=True) == \ + I*exp(2*a)*sin(a*b) + exp(2*a)*cos(a*b) + + +def test_expand(): + f = (16 - 2*sqrt(29))**2 + assert f.expand() == 372 - 64*sqrt(29) + f = (Integer(1)/2 + I/2)**10 + assert f.expand() == I/32 + f = (Integer(1)/2 + I)**10 + assert f.expand() == Integer(237)/1024 - 779*I/256 + + +def test_re_im1652(): + x = Symbol('x') + assert re(x) == re(conjugate(x)) + assert im(x) == - im(conjugate(x)) + assert im(x)*re(conjugate(x)) + im(conjugate(x)) * re(x) == 0 + + +def test_issue_5084(): + x = Symbol('x') + assert ((x + x*I)/(1 + I)).as_real_imag() == (re((x + I*x)/(1 + I) + ), im((x + I*x)/(1 + I))) + + +def test_issue_5236(): + assert (cos(1 + I)**3).as_real_imag() == (-3*sin(1)**2*sinh(1)**2*cos(1)*cosh(1) + + cos(1)**3*cosh(1)**3, -3*cos(1)**2*cosh(1)**2*sin(1)*sinh(1) + sin(1)**3*sinh(1)**3) + + +def test_real_imag(): + x, y, z = symbols('x, y, z') + X, Y, Z = symbols('X, Y, Z', commutative=False) + a = Symbol('a', real=True) + assert (2*a*x).as_real_imag() == (2*a*re(x), 2*a*im(x)) + + # issue 5395: + assert (x*x.conjugate()).as_real_imag() == (Abs(x)**2, 0) + assert im(x*x.conjugate()) == 0 + assert im(x*y.conjugate()*z*y) == im(x*z)*Abs(y)**2 + assert im(x*y.conjugate()*x*y) == im(x**2)*Abs(y)**2 + assert im(Z*y.conjugate()*X*y) == im(Z*X)*Abs(y)**2 + assert im(X*X.conjugate()) == im(X*X.conjugate(), evaluate=False) + assert (sin(x)*sin(x).conjugate()).as_real_imag() == \ + (Abs(sin(x))**2, 0) + + # issue 6573: + assert (x**2).as_real_imag() == (re(x)**2 - im(x)**2, 2*re(x)*im(x)) + + # issue 6428: + r = Symbol('r', real=True) + i = Symbol('i', imaginary=True) + assert (i*r*x).as_real_imag() == (I*i*r*im(x), -I*i*r*re(x)) + assert (i*r*x*(y + 2)).as_real_imag() == ( + I*i*r*(re(y) + 2)*im(x) + I*i*r*re(x)*im(y), + -I*i*r*(re(y) + 2)*re(x) + I*i*r*im(x)*im(y)) + + # issue 7106: + assert ((1 + I)/(1 - I)).as_real_imag() == (0, 1) + assert ((1 + 2*I)*(1 + 3*I)).as_real_imag() == (-5, 5) + + +def test_pow_issue_1724(): + e = ((S.NegativeOne)**(S.One/3)) + assert e.conjugate().n() == e.n().conjugate() + e = S('-2/3 - (-29/54 + sqrt(93)/18)**(1/3) - 1/(9*(-29/54 + sqrt(93)/18)**(1/3))') + assert e.conjugate().n() == e.n().conjugate() + e = 2**I + assert e.conjugate().n() == e.n().conjugate() + + +def test_issue_5429(): + assert sqrt(I).conjugate() != sqrt(I) + +def test_issue_4124(): + from sympy.core.numbers import oo + assert expand_complex(I*oo) == oo*I + +def test_issue_11518(): + x = Symbol("x", real=True) + y = Symbol("y", real=True) + r = sqrt(x**2 + y**2) + assert conjugate(r) == r + s = abs(x + I * y) + assert conjugate(s) == r diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_constructor_postprocessor.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_constructor_postprocessor.py new file mode 100644 index 0000000000000000000000000000000000000000..c199e24eddf8ef7c2a14e38d1ad2dc95e4acc0cc --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_constructor_postprocessor.py @@ -0,0 +1,87 @@ +from sympy.core.basic import Basic +from sympy.core.mul import Mul +from sympy.core.symbol import (Symbol, symbols) + +from sympy.testing.pytest import XFAIL + +class SymbolInMulOnce(Symbol): + # Test class for a symbol that can only appear once in a `Mul` expression. + pass + + +Basic._constructor_postprocessor_mapping[SymbolInMulOnce] = { + "Mul": [lambda x: x], + "Pow": [lambda x: x.base if isinstance(x.base, SymbolInMulOnce) else x], + "Add": [lambda x: x], +} + + +def _postprocess_SymbolRemovesOtherSymbols(expr): + args = tuple(i for i in expr.args if not isinstance(i, Symbol) or isinstance(i, SymbolRemovesOtherSymbols)) + if args == expr.args: + return expr + return Mul.fromiter(args) + + +class SymbolRemovesOtherSymbols(Symbol): + # Test class for a symbol that removes other symbols in `Mul`. + pass + +Basic._constructor_postprocessor_mapping[SymbolRemovesOtherSymbols] = { + "Mul": [_postprocess_SymbolRemovesOtherSymbols], +} + +class SubclassSymbolInMulOnce(SymbolInMulOnce): + pass + +class SubclassSymbolRemovesOtherSymbols(SymbolRemovesOtherSymbols): + pass + + +def test_constructor_postprocessors1(): + x = SymbolInMulOnce("x") + y = SymbolInMulOnce("y") + assert isinstance(3*x, Mul) + assert (3*x).args == (3, x) + assert x*x == x + assert 3*x*x == 3*x + assert 2*x*x + x == 3*x + assert x**3*y*y == x*y + assert x**5 + y*x**3 == x + x*y + + w = SymbolRemovesOtherSymbols("w") + assert x*w == w + assert (3*w).args == (3, w) + assert set((w + x).args) == {x, w} + +def test_constructor_postprocessors2(): + x = SubclassSymbolInMulOnce("x") + y = SubclassSymbolInMulOnce("y") + assert isinstance(3*x, Mul) + assert (3*x).args == (3, x) + assert x*x == x + assert 3*x*x == 3*x + assert 2*x*x + x == 3*x + assert x**3*y*y == x*y + assert x**5 + y*x**3 == x + x*y + + w = SubclassSymbolRemovesOtherSymbols("w") + assert x*w == w + assert (3*w).args == (3, w) + assert set((w + x).args) == {x, w} + + +@XFAIL +def test_subexpression_postprocessors(): + # The postprocessors used to work with subexpressions, but the + # functionality was removed. See #15948. + a = symbols("a") + x = SymbolInMulOnce("x") + w = SymbolRemovesOtherSymbols("w") + assert 3*a*w**2 == 3*w**2 + assert 3*a*x**3*w**2 == 3*w**2 + + x = SubclassSymbolInMulOnce("x") + w = SubclassSymbolRemovesOtherSymbols("w") + assert 3*a*w**2 == 3*w**2 + assert 3*a*x**3*w**2 == 3*w**2 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_containers.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_containers.py new file mode 100644 index 0000000000000000000000000000000000000000..23357b9f667fffc82d93b2b1adb42b495114c67e --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_containers.py @@ -0,0 +1,217 @@ +from collections import defaultdict + +from sympy.core.basic import Basic +from sympy.core.containers import (Dict, Tuple) +from sympy.core.numbers import Integer +from sympy.core.kind import NumberKind +from sympy.matrices.kind import MatrixKind +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.core.sympify import sympify +from sympy.matrices.dense import Matrix +from sympy.sets.sets import FiniteSet +from sympy.core.containers import tuple_wrapper, TupleKind +from sympy.core.expr import unchanged +from sympy.core.function import Function, Lambda +from sympy.core.relational import Eq +from sympy.testing.pytest import raises +from sympy.utilities.iterables import is_sequence, iterable + +from sympy.abc import x, y + + +def test_Tuple(): + t = (1, 2, 3, 4) + st = Tuple(*t) + assert set(sympify(t)) == set(st) + assert len(t) == len(st) + assert set(sympify(t[:2])) == set(st[:2]) + assert isinstance(st[:], Tuple) + assert st == Tuple(1, 2, 3, 4) + assert st.func(*st.args) == st + p, q, r, s = symbols('p q r s') + t2 = (p, q, r, s) + st2 = Tuple(*t2) + assert st2.atoms() == set(t2) + assert st == st2.subs({p: 1, q: 2, r: 3, s: 4}) + # issue 5505 + assert all(isinstance(arg, Basic) for arg in st.args) + assert Tuple(p, 1).subs(p, 0) == Tuple(0, 1) + assert Tuple(p, Tuple(p, 1)).subs(p, 0) == Tuple(0, Tuple(0, 1)) + + assert Tuple(t2) == Tuple(Tuple(*t2)) + assert Tuple.fromiter(t2) == Tuple(*t2) + assert Tuple.fromiter(x for x in range(4)) == Tuple(0, 1, 2, 3) + assert st2.fromiter(st2.args) == st2 + + +def test_Tuple_contains(): + t1, t2 = Tuple(1), Tuple(2) + assert t1 in Tuple(1, 2, 3, t1, Tuple(t2)) + assert t2 not in Tuple(1, 2, 3, t1, Tuple(t2)) + + +def test_Tuple_concatenation(): + assert Tuple(1, 2) + Tuple(3, 4) == Tuple(1, 2, 3, 4) + assert (1, 2) + Tuple(3, 4) == Tuple(1, 2, 3, 4) + assert Tuple(1, 2) + (3, 4) == Tuple(1, 2, 3, 4) + raises(TypeError, lambda: Tuple(1, 2) + 3) + raises(TypeError, lambda: 1 + Tuple(2, 3)) + + #the Tuple case in __radd__ is only reached when a subclass is involved + class Tuple2(Tuple): + def __radd__(self, other): + return Tuple.__radd__(self, other + other) + assert Tuple(1, 2) + Tuple2(3, 4) == Tuple(1, 2, 1, 2, 3, 4) + assert Tuple2(1, 2) + Tuple(3, 4) == Tuple(1, 2, 3, 4) + + +def test_Tuple_equality(): + assert not isinstance(Tuple(1, 2), tuple) + assert (Tuple(1, 2) == (1, 2)) is True + assert (Tuple(1, 2) != (1, 2)) is False + assert (Tuple(1, 2) == (1, 3)) is False + assert (Tuple(1, 2) != (1, 3)) is True + assert (Tuple(1, 2) == Tuple(1, 2)) is True + assert (Tuple(1, 2) != Tuple(1, 2)) is False + assert (Tuple(1, 2) == Tuple(1, 3)) is False + assert (Tuple(1, 2) != Tuple(1, 3)) is True + + +def test_Tuple_Eq(): + assert Eq(Tuple(), Tuple()) is S.true + assert Eq(Tuple(1), 1) is S.false + assert Eq(Tuple(1, 2), Tuple(1)) is S.false + assert Eq(Tuple(1), Tuple(1)) is S.true + assert Eq(Tuple(1, 2), Tuple(1, 3)) is S.false + assert Eq(Tuple(1, 2), Tuple(1, 2)) is S.true + assert unchanged(Eq, Tuple(1, x), Tuple(1, 2)) + assert Eq(Tuple(1, x), Tuple(1, 2)).subs(x, 2) is S.true + assert unchanged(Eq, Tuple(1, 2), x) + f = Function('f') + assert unchanged(Eq, Tuple(1), f(x)) + assert Eq(Tuple(1), f(x)).subs(x, 1).subs(f, Lambda(y, (y,))) is S.true + + +def test_Tuple_comparision(): + assert (Tuple(1, 3) >= Tuple(-10, 30)) is S.true + assert (Tuple(1, 3) <= Tuple(-10, 30)) is S.false + assert (Tuple(1, 3) >= Tuple(1, 3)) is S.true + assert (Tuple(1, 3) <= Tuple(1, 3)) is S.true + + +def test_Tuple_tuple_count(): + assert Tuple(0, 1, 2, 3).tuple_count(4) == 0 + assert Tuple(0, 4, 1, 2, 3).tuple_count(4) == 1 + assert Tuple(0, 4, 1, 4, 2, 3).tuple_count(4) == 2 + assert Tuple(0, 4, 1, 4, 2, 4, 3).tuple_count(4) == 3 + + +def test_Tuple_index(): + assert Tuple(4, 0, 1, 2, 3).index(4) == 0 + assert Tuple(0, 4, 1, 2, 3).index(4) == 1 + assert Tuple(0, 1, 4, 2, 3).index(4) == 2 + assert Tuple(0, 1, 2, 4, 3).index(4) == 3 + assert Tuple(0, 1, 2, 3, 4).index(4) == 4 + + raises(ValueError, lambda: Tuple(0, 1, 2, 3).index(4)) + raises(ValueError, lambda: Tuple(4, 0, 1, 2, 3).index(4, 1)) + raises(ValueError, lambda: Tuple(0, 1, 2, 3, 4).index(4, 1, 4)) + + +def test_Tuple_mul(): + assert Tuple(1, 2, 3)*2 == Tuple(1, 2, 3, 1, 2, 3) + assert 2*Tuple(1, 2, 3) == Tuple(1, 2, 3, 1, 2, 3) + assert Tuple(1, 2, 3)*Integer(2) == Tuple(1, 2, 3, 1, 2, 3) + assert Integer(2)*Tuple(1, 2, 3) == Tuple(1, 2, 3, 1, 2, 3) + + raises(TypeError, lambda: Tuple(1, 2, 3)*S.Half) + raises(TypeError, lambda: S.Half*Tuple(1, 2, 3)) + + +def test_tuple_wrapper(): + + @tuple_wrapper + def wrap_tuples_and_return(*t): + return t + + p = symbols('p') + assert wrap_tuples_and_return(p, 1) == (p, 1) + assert wrap_tuples_and_return((p, 1)) == (Tuple(p, 1),) + assert wrap_tuples_and_return(1, (p, 2), 3) == (1, Tuple(p, 2), 3) + + +def test_iterable_is_sequence(): + ordered = [[], (), Tuple(), Matrix([[]])] + unordered = [set()] + not_sympy_iterable = [{}, '', ''] + assert all(is_sequence(i) for i in ordered) + assert all(not is_sequence(i) for i in unordered) + assert all(iterable(i) for i in ordered + unordered) + assert all(not iterable(i) for i in not_sympy_iterable) + assert all(iterable(i, exclude=None) for i in not_sympy_iterable) + + +def test_TupleKind(): + kind = TupleKind(NumberKind, MatrixKind(NumberKind)) + assert Tuple(1, Matrix([1, 2])).kind is kind + assert Tuple(1, 2).kind is TupleKind(NumberKind, NumberKind) + assert Tuple(1, 2).kind.element_kind == (NumberKind, NumberKind) + + +def test_Dict(): + x, y, z = symbols('x y z') + d = Dict({x: 1, y: 2, z: 3}) + assert d[x] == 1 + assert d[y] == 2 + raises(KeyError, lambda: d[2]) + raises(KeyError, lambda: d['2']) + assert len(d) == 3 + assert set(d.keys()) == {x, y, z} + assert set(d.values()) == {S.One, S(2), S(3)} + assert d.get(5, 'default') == 'default' + assert d.get('5', 'default') == 'default' + assert x in d and z in d and 5 not in d and '5' not in d + assert d.has(x) and d.has(1) # SymPy Basic .has method + + # Test input types + # input - a Python dict + # input - items as args - SymPy style + assert (Dict({x: 1, y: 2, z: 3}) == + Dict((x, 1), (y, 2), (z, 3))) + + raises(TypeError, lambda: Dict(((x, 1), (y, 2), (z, 3)))) + with raises(NotImplementedError): + d[5] = 6 # assert immutability + + assert set( + d.items()) == {Tuple(x, S.One), Tuple(y, S(2)), Tuple(z, S(3))} + assert set(d) == {x, y, z} + assert str(d) == '{x: 1, y: 2, z: 3}' + assert d.__repr__() == '{x: 1, y: 2, z: 3}' + + # Test creating a Dict from a Dict. + d = Dict({x: 1, y: 2, z: 3}) + assert d == Dict(d) + + # Test for supporting defaultdict + d = defaultdict(int) + assert d[x] == 0 + assert d[y] == 0 + assert d[z] == 0 + assert Dict(d) + d = Dict(d) + assert len(d) == 3 + assert set(d.keys()) == {x, y, z} + assert set(d.values()) == {S.Zero, S.Zero, S.Zero} + + +def test_issue_5788(): + args = [(1, 2), (2, 1)] + for o in [Dict, Tuple, FiniteSet]: + # __eq__ and arg handling + if o != Tuple: + assert o(*args) == o(*reversed(args)) + pair = [o(*args), o(*reversed(args))] + assert sorted(pair) == sorted(pair) + assert set(o(*args)) # doesn't fail diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_count_ops.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_count_ops.py new file mode 100644 index 0000000000000000000000000000000000000000..bc95004ef5ba4421927289a049a9197d208c30d0 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_count_ops.py @@ -0,0 +1,155 @@ +from sympy.concrete.summations import Sum +from sympy.core.basic import Basic +from sympy.core.function import (Derivative, Function, count_ops) +from sympy.core.numbers import (I, Rational, pi) +from sympy.core.relational import (Eq, Rel) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.integrals.integrals import Integral +from sympy.logic.boolalg import (And, Equivalent, ITE, Implies, Nand, + Nor, Not, Or, Xor) +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.core.containers import Tuple + +x, y, z = symbols('x,y,z') +a, b, c = symbols('a,b,c') + +def test_count_ops_non_visual(): + def count(val): + return count_ops(val, visual=False) + assert count(x) == 0 + assert count(x) is not S.Zero + assert count(x + y) == 1 + assert count(x + y) is not S.One + assert count(x + y*x + 2*y) == 4 + assert count({x + y: x}) == 1 + assert count({x + y: S(2) + x}) is not S.One + assert count(x < y) == 1 + assert count(Or(x,y)) == 1 + assert count(And(x,y)) == 1 + assert count(Not(x)) == 1 + assert count(Nor(x,y)) == 2 + assert count(Nand(x,y)) == 2 + assert count(Xor(x,y)) == 1 + assert count(Implies(x,y)) == 1 + assert count(Equivalent(x,y)) == 1 + assert count(ITE(x,y,z)) == 1 + assert count(ITE(True,x,y)) == 0 + + +def test_count_ops_visual(): + ADD, MUL, POW, SIN, COS, EXP, AND, D, G, M = symbols( + 'Add Mul Pow sin cos exp And Derivative Integral Sum'.upper()) + DIV, SUB, NEG = symbols('DIV SUB NEG') + LT, LE, GT, GE, EQ, NE = symbols('LT LE GT GE EQ NE') + NOT, OR, AND, XOR, IMPLIES, EQUIVALENT, _ITE, BASIC, TUPLE = symbols( + 'Not Or And Xor Implies Equivalent ITE Basic Tuple'.upper()) + + def count(val): + return count_ops(val, visual=True) + + assert count(7) is S.Zero + assert count(S(7)) is S.Zero + assert count(-1) == NEG + assert count(-2) == NEG + assert count(S(2)/3) == DIV + assert count(Rational(2, 3)) == DIV + assert count(pi/3) == DIV + assert count(-pi/3) == DIV + NEG + assert count(I - 1) == SUB + assert count(1 - I) == SUB + assert count(1 - 2*I) == SUB + MUL + + assert count(x) is S.Zero + assert count(-x) == NEG + assert count(-2*x/3) == NEG + DIV + MUL + assert count(Rational(-2, 3)*x) == NEG + DIV + MUL + assert count(1/x) == DIV + assert count(1/(x*y)) == DIV + MUL + assert count(-1/x) == NEG + DIV + assert count(-2/x) == NEG + DIV + assert count(x/y) == DIV + assert count(-x/y) == NEG + DIV + + assert count(x**2) == POW + assert count(-x**2) == POW + NEG + assert count(-2*x**2) == POW + MUL + NEG + + assert count(x + pi/3) == ADD + DIV + assert count(x + S.One/3) == ADD + DIV + assert count(x + Rational(1, 3)) == ADD + DIV + assert count(x + y) == ADD + assert count(x - y) == SUB + assert count(y - x) == SUB + assert count(-1/(x - y)) == DIV + NEG + SUB + assert count(-1/(y - x)) == DIV + NEG + SUB + assert count(1 + x**y) == ADD + POW + assert count(1 + x + y) == 2*ADD + assert count(1 + x + y + z) == 3*ADD + assert count(1 + x**y + 2*x*y + y**2) == 3*ADD + 2*POW + 2*MUL + assert count(2*z + y + x + 1) == 3*ADD + MUL + assert count(2*z + y**17 + x + 1) == 3*ADD + MUL + POW + assert count(2*z + y**17 + x + sin(x)) == 3*ADD + POW + MUL + SIN + assert count(2*z + y**17 + x + sin(x**2)) == 3*ADD + MUL + 2*POW + SIN + assert count(2*z + y**17 + x + sin( + x**2) + exp(cos(x))) == 4*ADD + MUL + 2*POW + EXP + COS + SIN + + assert count(Derivative(x, x)) == D + assert count(Integral(x, x) + 2*x/(1 + x)) == G + DIV + MUL + 2*ADD + assert count(Sum(x, (x, 1, x + 1)) + 2*x/(1 + x)) == M + DIV + MUL + 3*ADD + assert count(Basic()) is S.Zero + + assert count({x + 1: sin(x)}) == ADD + SIN + assert count([x + 1, sin(x) + y, None]) == ADD + SIN + ADD + assert count({x + 1: sin(x), y: cos(x) + 1}) == SIN + COS + 2*ADD + assert count({}) is S.Zero + assert count([x + 1, sin(x)*y, None]) == SIN + ADD + MUL + assert count([]) is S.Zero + + assert count(Basic()) == 0 + assert count(Basic(Basic(),Basic(x,x+y))) == ADD + 2*BASIC + assert count(Basic(x, x + y)) == ADD + BASIC + assert [count(Rel(x, y, op)) for op in '< <= > >= == <> !='.split() + ] == [LT, LE, GT, GE, EQ, NE, NE] + assert count(Or(x, y)) == OR + assert count(And(x, y)) == AND + assert count(Or(x, Or(y, And(z, a)))) == AND + OR + assert count(Nor(x, y)) == NOT + OR + assert count(Nand(x, y)) == NOT + AND + assert count(Xor(x, y)) == XOR + assert count(Implies(x, y)) == IMPLIES + assert count(Equivalent(x, y)) == EQUIVALENT + assert count(ITE(x, y, z)) == _ITE + assert count([Or(x, y), And(x, y), Basic(x + y)] + ) == ADD + AND + BASIC + OR + + assert count(Basic(Tuple(x))) == BASIC + TUPLE + #It checks that TUPLE is counted as an operation. + + assert count(Eq(x + y, S(2))) == ADD + EQ + + +def test_issue_9324(): + def count(val): + return count_ops(val, visual=False) + + M = MatrixSymbol('M', 10, 10) + assert count(M[0, 0]) == 0 + assert count(2 * M[0, 0] + M[5, 7]) == 2 + P = MatrixSymbol('P', 3, 3) + Q = MatrixSymbol('Q', 3, 3) + assert count(P + Q) == 1 + m = Symbol('m', integer=True) + n = Symbol('n', integer=True) + M = MatrixSymbol('M', m + n, m * m) + assert count(M[0, 1]) == 2 + + +def test_issue_21532(): + f = Function('f') + g = Function('g') + FUNC_F, FUNC_G = symbols('FUNC_F, FUNC_G') + assert f(x).count_ops(visual=True) == FUNC_F + assert g(x).count_ops(visual=True) == FUNC_G diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_diff.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_diff.py new file mode 100644 index 0000000000000000000000000000000000000000..effc9cd91d2e7b6f8f8e5fd04bb667ed71c0ffaf --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_diff.py @@ -0,0 +1,160 @@ +from sympy.concrete.summations import Sum +from sympy.core.expr import Expr +from sympy.core.function import (Derivative, Function, diff, Subs) +from sympy.core.numbers import (I, Rational, pi) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.complexes import (im, re) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import Max +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import (cos, cot, sin, tan) +from sympy.tensor.array.ndim_array import NDimArray +from sympy.testing.pytest import raises +from sympy.abc import a, b, c, x, y, z + +def test_diff(): + assert Rational(1, 3).diff(x) is S.Zero + assert I.diff(x) is S.Zero + assert pi.diff(x) is S.Zero + assert x.diff(x, 0) == x + assert (x**2).diff(x, 2, x) == 0 + assert (x**2).diff((x, 2), x) == 0 + assert (x**2).diff((x, 1), x) == 2 + assert (x**2).diff((x, 1), (x, 1)) == 2 + assert (x**2).diff((x, 2)) == 2 + assert (x**2).diff(x, y, 0) == 2*x + assert (x**2).diff(x, (y, 0)) == 2*x + assert (x**2).diff(x, y) == 0 + raises(ValueError, lambda: x.diff(1, x)) + + p = Rational(5) + e = a*b + b**p + assert e.diff(a) == b + assert e.diff(b) == a + 5*b**4 + assert e.diff(b).diff(a) == Rational(1) + e = a*(b + c) + assert e.diff(a) == b + c + assert e.diff(b) == a + assert e.diff(b).diff(a) == Rational(1) + e = c**p + assert e.diff(c, 6) == Rational(0) + assert e.diff(c, 5) == Rational(120) + e = c**Rational(2) + assert e.diff(c) == 2*c + e = a*b*c + assert e.diff(c) == a*b + + +def test_diff2(): + n3 = Rational(3) + n2 = Rational(2) + n6 = Rational(6) + + e = n3*(-n2 + x**n2)*cos(x) + x*(-n6 + x**n2)*sin(x) + assert e == 3*(-2 + x**2)*cos(x) + x*(-6 + x**2)*sin(x) + assert e.diff(x).expand() == x**3*cos(x) + + e = (x + 1)**3 + assert e.diff(x) == 3*(x + 1)**2 + e = x*(x + 1)**3 + assert e.diff(x) == (x + 1)**3 + 3*x*(x + 1)**2 + e = 2*exp(x*x)*x + assert e.diff(x) == 2*exp(x**2) + 4*x**2*exp(x**2) + + +def test_diff3(): + p = Rational(5) + e = a*b + sin(b**p) + assert e == a*b + sin(b**5) + assert e.diff(a) == b + assert e.diff(b) == a + 5*b**4*cos(b**5) + e = tan(c) + assert e == tan(c) + assert e.diff(c) in [cos(c)**(-2), 1 + sin(c)**2/cos(c)**2, 1 + tan(c)**2] + e = c*log(c) - c + assert e == -c + c*log(c) + assert e.diff(c) == log(c) + e = log(sin(c)) + assert e == log(sin(c)) + assert e.diff(c) in [sin(c)**(-1)*cos(c), cot(c)] + e = (Rational(2)**a/log(Rational(2))) + assert e == 2**a*log(Rational(2))**(-1) + assert e.diff(a) == 2**a + + +def test_diff_no_eval_derivative(): + class My(Expr): + def __new__(cls, x): + return Expr.__new__(cls, x) + + # My doesn't have its own _eval_derivative method + assert My(x).diff(x).func is Derivative + assert My(x).diff(x, 3).func is Derivative + assert re(x).diff(x, 2) == Derivative(re(x), (x, 2)) # issue 15518 + assert diff(NDimArray([re(x), im(x)]), (x, 2)) == NDimArray( + [Derivative(re(x), (x, 2)), Derivative(im(x), (x, 2))]) + # it doesn't have y so it shouldn't need a method for this case + assert My(x).diff(y) == 0 + + +def test_speed(): + # this should return in 0.0s. If it takes forever, it's wrong. + assert x.diff(x, 10**8) == 0 + + +def test_deriv_noncommutative(): + A = Symbol("A", commutative=False) + f = Function("f") + assert A*f(x)*A == f(x)*A**2 + assert A*f(x).diff(x)*A == f(x).diff(x) * A**2 + + +def test_diff_nth_derivative(): + f = Function("f") + n = Symbol("n", integer=True) + + expr = diff(sin(x), (x, n)) + expr2 = diff(f(x), (x, 2)) + expr3 = diff(f(x), (x, n)) + + assert expr.subs(sin(x), cos(-x)) == Derivative(cos(-x), (x, n)) + assert expr.subs(n, 1).doit() == cos(x) + assert expr.subs(n, 2).doit() == -sin(x) + + assert expr2.subs(Derivative(f(x), x), y) == Derivative(y, x) + # Currently not supported (cannot determine if `n > 1`): + #assert expr3.subs(Derivative(f(x), x), y) == Derivative(y, (x, n-1)) + assert expr3 == Derivative(f(x), (x, n)) + + assert diff(x, (x, n)) == Piecewise((x, Eq(n, 0)), (1, Eq(n, 1)), (0, True)) + assert diff(2*x, (x, n)).dummy_eq( + Sum(Piecewise((2*x*factorial(n)/(factorial(y)*factorial(-y + n)), + Eq(y, 0) & Eq(Max(0, -y + n), 0)), + (2*factorial(n)/(factorial(y)*factorial(-y + n)), Eq(y, 0) & Eq(Max(0, + -y + n), 1)), (0, True)), (y, 0, n))) + # TODO: assert diff(x**2, (x, n)) == x**(2-n)*ff(2, n) + exprm = x*sin(x) + mul_diff = diff(exprm, (x, n)) + assert isinstance(mul_diff, Sum) + for i in range(5): + assert mul_diff.subs(n, i).doit() == exprm.diff((x, i)).expand() + + exprm2 = 2*y*x*sin(x)*cos(x)*log(x)*exp(x) + dex = exprm2.diff((x, n)) + assert isinstance(dex, Sum) + for i in range(7): + assert dex.subs(n, i).doit().expand() == \ + exprm2.diff((x, i)).expand() + + assert (cos(x)*sin(y)).diff([[x, y, z]]) == NDimArray([ + -sin(x)*sin(y), cos(x)*cos(y), 0]) + + +def test_issue_16160(): + assert Derivative(x**3, (x, x)).subs(x, 2) == Subs( + Derivative(x**3, (x, 2)), x, 2) + assert Derivative(1 + x**3, (x, x)).subs(x, 0 + ) == Derivative(1 + y**3, (y, 0)).subs(y, 0) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_equal.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_equal.py new file mode 100644 index 0000000000000000000000000000000000000000..82213b757cda5fbd80310e387bdf00cc1c9c25fe --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_equal.py @@ -0,0 +1,89 @@ +from sympy.core.numbers import Rational +from sympy.core.symbol import (Dummy, Symbol) +from sympy.functions.elementary.exponential import exp + + +def test_equal(): + b = Symbol("b") + a = Symbol("a") + e1 = a + b + e2 = 2*a*b + e3 = a**3*b**2 + e4 = a*b + b*a + assert not e1 == e2 + assert not e1 == e2 + assert e1 != e2 + assert e2 == e4 + assert e2 != e3 + assert not e2 == e3 + + x = Symbol("x") + e1 = exp(x + 1/x) + y = Symbol("x") + e2 = exp(y + 1/y) + assert e1 == e2 + assert not e1 != e2 + y = Symbol("y") + e2 = exp(y + 1/y) + assert not e1 == e2 + assert e1 != e2 + + e5 = Rational(3) + 2*x - x - x + assert e5 == 3 + assert 3 == e5 + assert e5 != 4 + assert 4 != e5 + assert e5 != 3 + x + assert 3 + x != e5 + + +def test_expevalbug(): + x = Symbol("x") + e1 = exp(1*x) + e3 = exp(x) + assert e1 == e3 + + +def test_cmp_bug1(): + class T: + pass + + t = T() + x = Symbol("x") + + assert not (x == t) + assert (x != t) + + +def test_cmp_bug2(): + class T: + pass + + t = T() + + assert not (Symbol == t) + assert (Symbol != t) + + +def test_cmp_issue_4357(): + """ Check that Basic subclasses can be compared with sympifiable objects. + + https://github.com/sympy/sympy/issues/4357 + """ + assert not (Symbol == 1) + assert (Symbol != 1) + assert not (Symbol == 'x') + assert (Symbol != 'x') + + +def test_dummy_eq(): + x = Symbol('x') + y = Symbol('y') + + u = Dummy('u') + + assert (u**2 + 1).dummy_eq(x**2 + 1) is True + assert ((u**2 + 1) == (x**2 + 1)) is False + + assert (u**2 + y).dummy_eq(x**2 + y, x) is True + assert (u**2 + y).dummy_eq(x**2 + y, y) is False diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_eval.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_eval.py new file mode 100644 index 0000000000000000000000000000000000000000..9c1633f77b50483afee21c6d9fca232b1279d2b9 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_eval.py @@ -0,0 +1,95 @@ +from sympy.core.function import Function +from sympy.core.numbers import (I, Rational) +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, tan) +from sympy.testing.pytest import XFAIL + + +def test_add_eval(): + a = Symbol("a") + b = Symbol("b") + c = Rational(1) + p = Rational(5) + assert a*b + c + p == a*b + 6 + assert c + a + p == a + 6 + assert c + a - p == a + (-4) + assert a + a == 2*a + assert a + p + a == 2*a + 5 + assert c + p == Rational(6) + assert b + a - b == a + + +def test_addmul_eval(): + a = Symbol("a") + b = Symbol("b") + c = Rational(1) + p = Rational(5) + assert c + a + b*c + a - p == 2*a + b + (-4) + assert a*2 + p + a == a*2 + 5 + a + assert a*2 + p + a == 3*a + 5 + assert a*2 + a == 3*a + + +def test_pow_eval(): + # XXX Pow does not fully support conversion of negative numbers + # to their complex equivalent + + assert sqrt(-1) == I + + assert sqrt(-4) == 2*I + assert sqrt( 4) == 2 + assert (8)**Rational(1, 3) == 2 + assert (-8)**Rational(1, 3) == 2*((-1)**Rational(1, 3)) + + assert sqrt(-2) == I*sqrt(2) + assert (-1)**Rational(1, 3) != I + assert (-10)**Rational(1, 3) != I*((10)**Rational(1, 3)) + assert (-2)**Rational(1, 4) != (2)**Rational(1, 4) + + assert 64**Rational(1, 3) == 4 + assert 64**Rational(2, 3) == 16 + assert 24/sqrt(64) == 3 + assert (-27)**Rational(1, 3) == 3*(-1)**Rational(1, 3) + + assert (cos(2) / tan(2))**2 == (cos(2) / tan(2))**2 + + +@XFAIL +def test_pow_eval_X1(): + assert (-1)**Rational(1, 3) == S.Half + S.Half*I*sqrt(3) + + +def test_mulpow_eval(): + x = Symbol('x') + assert sqrt(50)/(sqrt(2)*x) == 5/x + assert sqrt(27)/sqrt(3) == 3 + + +def test_evalpow_bug(): + x = Symbol("x") + assert 1/(1/x) == x + assert 1/(-1/x) == -x + + +def test_symbol_expand(): + x = Symbol('x') + y = Symbol('y') + + f = x**4*y**4 + assert f == x**4*y**4 + assert f == f.expand() + + g = (x*y)**4 + assert g == f + assert g.expand() == f + assert g.expand() == g.expand().expand() + + +def test_function(): + f, l = map(Function, 'fl') + x = Symbol('x') + assert exp(l(x))*l(x)/exp(l(x)) == l(x) + assert exp(f(x))*f(x)/exp(f(x)) == f(x) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_evalf.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_evalf.py new file mode 100644 index 0000000000000000000000000000000000000000..2c3c26a2d265da9ea2daa73a9eea3091b2af1999 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_evalf.py @@ -0,0 +1,738 @@ +import math + +from sympy.concrete.products import (Product, product) +from sympy.concrete.summations import Sum +from sympy.core.add import Add +from sympy.core.evalf import N +from sympy.core.function import (Function, nfloat) +from sympy.core.mul import Mul +from sympy.core import (GoldenRatio) +from sympy.core.numbers import (AlgebraicNumber, E, Float, I, Rational, + oo, zoo, nan, pi) +from sympy.core.power import Pow +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.combinatorial.numbers import fibonacci +from sympy.functions.elementary.complexes import (Abs, re, im) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.hyperbolic import (acosh, cosh) +from sympy.functions.elementary.integers import (ceiling, floor) +from sympy.functions.elementary.miscellaneous import (Max, sqrt) +from sympy.functions.elementary.trigonometric import (acos, atan, cos, sin, tan) +from sympy.integrals.integrals import (Integral, integrate) +from sympy.polys.polytools import factor +from sympy.polys.rootoftools import CRootOf +from sympy.polys.specialpolys import cyclotomic_poly +from sympy.printing import srepr +from sympy.printing.str import sstr +from sympy.simplify.simplify import simplify +from sympy.core.numbers import comp +from sympy.core.evalf import (complex_accuracy, PrecisionExhausted, + scaled_zero, get_integer_part, as_mpmath, evalf, _evalf_with_bounded_error) +from mpmath import inf, ninf, make_mpc +from mpmath.libmp.libmpf import from_float, fzero +from sympy.core.expr import unchanged +from sympy.testing.pytest import raises, XFAIL +from sympy.abc import n, x, y + + +def NS(e, n=15, **options): + return sstr(sympify(e).evalf(n, **options), full_prec=True) + + +def test_evalf_helpers(): + from mpmath.libmp import finf + assert complex_accuracy((from_float(2.0), None, 35, None)) == 35 + assert complex_accuracy((from_float(2.0), from_float(10.0), 35, 100)) == 37 + assert complex_accuracy( + (from_float(2.0), from_float(1000.0), 35, 100)) == 43 + assert complex_accuracy((from_float(2.0), from_float(10.0), 100, 35)) == 35 + assert complex_accuracy( + (from_float(2.0), from_float(1000.0), 100, 35)) == 35 + assert complex_accuracy(finf) == math.inf + assert complex_accuracy(zoo) == math.inf + raises(ValueError, lambda: get_integer_part(zoo, 1, {})) + + +def test_evalf_basic(): + assert NS('pi', 15) == '3.14159265358979' + assert NS('2/3', 10) == '0.6666666667' + assert NS('355/113-pi', 6) == '2.66764e-7' + assert NS('16*atan(1/5)-4*atan(1/239)', 15) == '3.14159265358979' + + +def test_cancellation(): + assert NS(Add(pi, Rational(1, 10**1000), -pi, evaluate=False), 15, + maxn=1200) == '1.00000000000000e-1000' + + +def test_evalf_powers(): + assert NS('pi**(10**20)', 10) == '1.339148777e+49714987269413385435' + assert NS(pi**(10**100), 10) == ('4.946362032e+4971498726941338543512682882' + '9089887365167832438044244613405349992494711208' + '95526746555473864642912223') + assert NS('2**(1/10**50)', 15) == '1.00000000000000' + assert NS('2**(1/10**50)-1', 15) == '6.93147180559945e-51' + +# Evaluation of Rump's ill-conditioned polynomial + + +def test_evalf_rump(): + a = 1335*y**6/4 + x**2*(11*x**2*y**2 - y**6 - 121*y**4 - 2) + 11*y**8/2 + x/(2*y) + assert NS(a, 15, subs={x: 77617, y: 33096}) == '-0.827396059946821' + + +def test_evalf_complex(): + assert NS('2*sqrt(pi)*I', 10) == '3.544907702*I' + assert NS('3+3*I', 15) == '3.00000000000000 + 3.00000000000000*I' + assert NS('E+pi*I', 15) == '2.71828182845905 + 3.14159265358979*I' + assert NS('pi * (3+4*I)', 15) == '9.42477796076938 + 12.5663706143592*I' + assert NS('I*(2+I)', 15) == '-1.00000000000000 + 2.00000000000000*I' + + +@XFAIL +def test_evalf_complex_bug(): + assert NS('(pi+E*I)*(E+pi*I)', 15) in ('0.e-15 + 17.25866050002*I', + '0.e-17 + 17.25866050002*I', '-0.e-17 + 17.25866050002*I') + + +def test_evalf_complex_powers(): + assert NS('(E+pi*I)**100000000000000000') == \ + '-3.58896782867793e+61850354284995199 + 4.58581754997159e+61850354284995199*I' + # XXX: rewrite if a+a*I simplification introduced in SymPy + #assert NS('(pi + pi*I)**2') in ('0.e-15 + 19.7392088021787*I', '0.e-16 + 19.7392088021787*I') + assert NS('(pi + pi*I)**2', chop=True) == '19.7392088021787*I' + assert NS( + '(pi + 1/10**8 + pi*I)**2') == '6.2831853e-8 + 19.7392088650106*I' + assert NS('(pi + 1/10**12 + pi*I)**2') == '6.283e-12 + 19.7392088021850*I' + assert NS('(pi + pi*I)**4', chop=True) == '-389.636364136010' + assert NS( + '(pi + 1/10**8 + pi*I)**4') == '-389.636366616512 + 2.4805021e-6*I' + assert NS('(pi + 1/10**12 + pi*I)**4') == '-389.636364136258 + 2.481e-10*I' + assert NS( + '(10000*pi + 10000*pi*I)**4', chop=True) == '-3.89636364136010e+18' + + +@XFAIL +def test_evalf_complex_powers_bug(): + assert NS('(pi + pi*I)**4') == '-389.63636413601 + 0.e-14*I' + + +def test_evalf_exponentiation(): + assert NS(sqrt(-pi)) == '1.77245385090552*I' + assert NS(Pow(pi*I, Rational( + 1, 2), evaluate=False)) == '1.25331413731550 + 1.25331413731550*I' + assert NS(pi**I) == '0.413292116101594 + 0.910598499212615*I' + assert NS(pi**(E + I/3)) == '20.8438653991931 + 8.36343473930031*I' + assert NS((pi + I/3)**(E + I/3)) == '17.2442906093590 + 13.6839376767037*I' + assert NS(exp(pi)) == '23.1406926327793' + assert NS(exp(pi + E*I)) == '-21.0981542849657 + 9.50576358282422*I' + assert NS(pi**pi) == '36.4621596072079' + assert NS((-pi)**pi) == '-32.9138577418939 - 15.6897116534332*I' + assert NS((-pi)**(-pi)) == '-0.0247567717232697 + 0.0118013091280262*I' + +# An example from Smith, "Multiple Precision Complex Arithmetic and Functions" + + +def test_evalf_complex_cancellation(): + A = Rational('63287/100000') + B = Rational('52498/100000') + C = Rational('69301/100000') + D = Rational('83542/100000') + F = Rational('2231321613/2500000000') + # XXX: the number of returned mantissa digits in the real part could + # change with the implementation. What matters is that the returned digits are + # correct; those that are showing now are correct. + # >>> ((A+B*I)*(C+D*I)).expand() + # 64471/10000000000 + 2231321613*I/2500000000 + # >>> 2231321613*4 + # 8925286452L + assert NS((A + B*I)*(C + D*I), 6) == '6.44710e-6 + 0.892529*I' + assert NS((A + B*I)*(C + D*I), 10) == '6.447100000e-6 + 0.8925286452*I' + assert NS((A + B*I)*( + C + D*I) - F*I, 5) in ('6.4471e-6 + 0.e-14*I', '6.4471e-6 - 0.e-14*I') + + +def test_evalf_logs(): + assert NS("log(3+pi*I)", 15) == '1.46877619736226 + 0.808448792630022*I' + assert NS("log(pi*I)", 15) == '1.14472988584940 + 1.57079632679490*I' + assert NS('log(-1 + 0.00001)', 2) == '-1.0e-5 + 3.1*I' + assert NS('log(100, 10, evaluate=False)', 15) == '2.00000000000000' + assert NS('-2*I*log(-(-1)**(S(1)/9))', 15) == '-5.58505360638185' + + +def test_evalf_trig(): + assert NS('sin(1)', 15) == '0.841470984807897' + assert NS('cos(1)', 15) == '0.540302305868140' + assert NS('tan(1)', 15) == '1.55740772465490' + assert NS('sin(10**-6)', 15) == '9.99999999999833e-7' + assert NS('cos(10**-6)', 15) == '0.999999999999500' + assert NS('tan(10**-6)', 15) == '1.00000000000033e-6' + assert NS('sin(E*10**100)', 15) == '0.409160531722613' + assert NS('tan(I)',15) =='0.761594155955765*I' + assert NS('tan(1000*I)',15)== '1.00000000000000*I' + # Some input near roots + assert NS(sin(exp(pi*sqrt(163))*pi), 15) == '-2.35596641936785e-12' + assert NS(sin(pi*10**100 + Rational(7, 10**5), evaluate=False), 15, maxn=120) == \ + '6.99999999428333e-5' + assert NS(sin(Rational(7, 10**5), evaluate=False), 15) == \ + '6.99999999428333e-5' + +# Check detection of various false identities + + +def test_evalf_near_integers(): + # Binet's formula + f = lambda n: ((1 + sqrt(5))**n)/(2**n * sqrt(5)) + assert NS(f(5000) - fibonacci(5000), 10, maxn=1500) == '5.156009964e-1046' + # Some near-integer identities from + # http://mathworld.wolfram.com/AlmostInteger.html + assert NS('sin(2017*2**(1/5))', 15) == '-1.00000000000000' + assert NS('sin(2017*2**(1/5))', 20) == '-0.99999999999999997857' + assert NS('1+sin(2017*2**(1/5))', 15) == '2.14322287389390e-17' + assert NS('45 - 613*E/37 + 35/991', 15) == '6.03764498766326e-11' + + +def test_evalf_ramanujan(): + assert NS(exp(pi*sqrt(163)) - 640320**3 - 744, 10) == '-7.499274028e-13' + # A related identity + A = 262537412640768744*exp(-pi*sqrt(163)) + B = 196884*exp(-2*pi*sqrt(163)) + C = 103378831900730205293632*exp(-3*pi*sqrt(163)) + assert NS(1 - A - B + C, 10) == '1.613679005e-59' + +# Input that for various reasons have failed at some point + + +def test_evalf_bugs(): + assert NS(sin(1) + exp(-10**10), 10) == NS(sin(1), 10) + assert NS(exp(10**10) + sin(1), 10) == NS(exp(10**10), 10) + assert NS('expand_log(log(1+1/10**50))', 20) == '1.0000000000000000000e-50' + assert NS('log(10**100,10)', 10) == '100.0000000' + assert NS('log(2)', 10) == '0.6931471806' + assert NS( + '(sin(x)-x)/x**3', 15, subs={x: '1/10**50'}) == '-0.166666666666667' + assert NS(sin(1) + Rational( + 1, 10**100)*I, 15) == '0.841470984807897 + 1.00000000000000e-100*I' + assert x.evalf() == x + assert NS((1 + I)**2*I, 6) == '-2.00000' + d = {n: ( + -1)**Rational(6, 7), y: (-1)**Rational(4, 7), x: (-1)**Rational(2, 7)} + assert NS((x*(1 + y*(1 + n))).subs(d).evalf(), 6) == '0.346011 + 0.433884*I' + assert NS(((-I - sqrt(2)*I)**2).evalf()) == '-5.82842712474619' + assert NS((1 + I)**2*I, 15) == '-2.00000000000000' + # issue 4758 (1/2): + assert NS(pi.evalf(69) - pi) == '-4.43863937855894e-71' + # issue 4758 (2/2): With the bug present, this still only fails if the + # terms are in the order given here. This is not generally the case, + # because the order depends on the hashes of the terms. + assert NS(20 - 5008329267844*n**25 - 477638700*n**37 - 19*n, + subs={n: .01}) == '19.8100000000000' + assert NS(((x - 1)*(1 - x)**1000).n() + ) == '(1.00000000000000 - x)**1000*(x - 1.00000000000000)' + assert NS((-x).n()) == '-x' + assert NS((-2*x).n()) == '-2.00000000000000*x' + assert NS((-2*x*y).n()) == '-2.00000000000000*x*y' + assert cos(x).n(subs={x: 1+I}) == cos(x).subs(x, 1+I).n() + # issue 6660. Also NaN != mpmath.nan + # In this order: + # 0*nan, 0/nan, 0*inf, 0/inf + # 0+nan, 0-nan, 0+inf, 0-inf + # >>> n = Some Number + # n*nan, n/nan, n*inf, n/inf + # n+nan, n-nan, n+inf, n-inf + assert (0*E**(oo)).n() is S.NaN + assert (0/E**(oo)).n() is S.Zero + + assert (0+E**(oo)).n() is S.Infinity + assert (0-E**(oo)).n() is S.NegativeInfinity + + assert (5*E**(oo)).n() is S.Infinity + assert (5/E**(oo)).n() is S.Zero + + assert (5+E**(oo)).n() is S.Infinity + assert (5-E**(oo)).n() is S.NegativeInfinity + + #issue 7416 + assert as_mpmath(0.0, 10, {'chop': True}) == 0 + + #issue 5412 + assert ((oo*I).n() == S.Infinity*I) + assert ((oo+oo*I).n() == S.Infinity + S.Infinity*I) + + #issue 11518 + assert NS(2*x**2.5, 5) == '2.0000*x**2.5000' + + #issue 13076 + assert NS(Mul(Max(0, y), x, evaluate=False).evalf()) == 'x*Max(0, y)' + + #issue 18516 + assert NS(log(S(3273390607896141870013189696827599152216642046043064789483291368096133796404674554883270092325904157150886684127560071009217256545885393053328527589376)/36360291795869936842385267079543319118023385026001623040346035832580600191583895484198508262979388783308179702534403855752855931517013066142992430916562025780021771247847643450125342836565813209972590371590152578728008385990139795377610001).evalf(15, chop=True)) == '-oo' + + +def test_evalf_integer_parts(): + a = floor(log(8)/log(2) - exp(-1000), evaluate=False) + b = floor(log(8)/log(2), evaluate=False) + assert a.evalf() == 3.0 + assert b.evalf() == 3.0 + # equals, as a fallback, can still fail but it might succeed as here + assert ceiling(10*(sin(1)**2 + cos(1)**2)) == 10 + + assert int(floor(factorial(50)/E, evaluate=False).evalf(70)) == \ + int(11188719610782480504630258070757734324011354208865721592720336800) + assert int(ceiling(factorial(50)/E, evaluate=False).evalf(70)) == \ + int(11188719610782480504630258070757734324011354208865721592720336801) + assert int(floor(GoldenRatio**999 / sqrt(5) + S.Half) + .evalf(1000)) == fibonacci(999) + assert int(floor(GoldenRatio**1000 / sqrt(5) + S.Half) + .evalf(1000)) == fibonacci(1000) + + assert ceiling(x).evalf(subs={x: 3}) == 3.0 + assert ceiling(x).evalf(subs={x: 3*I}) == 3.0*I + assert ceiling(x).evalf(subs={x: 2 + 3*I}) == 2.0 + 3.0*I + assert ceiling(x).evalf(subs={x: 3.}) == 3.0 + assert ceiling(x).evalf(subs={x: 3.*I}) == 3.0*I + assert ceiling(x).evalf(subs={x: 2. + 3*I}) == 2.0 + 3.0*I + + assert float((floor(1.5, evaluate=False)+1/9).evalf()) == 1 + 1/9 + assert float((floor(0.5, evaluate=False)+20).evalf()) == 20 + + # issue 19991 + n = 1169809367327212570704813632106852886389036911 + r = 744723773141314414542111064094745678855643068 + + assert floor(n / (pi / 2)) == r + assert floor(80782 * sqrt(2)) == 114242 + + # issue 20076 + assert 260515 - floor(260515/pi + 1/2) * pi == atan(tan(260515)) + + assert floor(x).evalf(subs={x: sqrt(2)}) == 1.0 + + +def test_evalf_trig_zero_detection(): + a = sin(160*pi, evaluate=False) + t = a.evalf(maxn=100) + assert abs(t) < 1e-100 + assert t._prec < 2 + assert a.evalf(chop=True) == 0 + raises(PrecisionExhausted, lambda: a.evalf(strict=True)) + + +def test_evalf_sum(): + assert Sum(n,(n,1,2)).evalf() == 3. + assert Sum(n,(n,1,2)).doit().evalf() == 3. + # the next test should return instantly + assert Sum(1/n,(n,1,2)).evalf() == 1.5 + + # issue 8219 + assert Sum(E/factorial(n), (n, 0, oo)).evalf() == (E*E).evalf() + # issue 8254 + assert Sum(2**n*n/factorial(n), (n, 0, oo)).evalf() == (2*E*E).evalf() + # issue 8411 + s = Sum(1/x**2, (x, 100, oo)) + assert s.n() == s.doit().n() + + +def test_evalf_divergent_series(): + raises(ValueError, lambda: Sum(1/n, (n, 1, oo)).evalf()) + raises(ValueError, lambda: Sum(n/(n**2 + 1), (n, 1, oo)).evalf()) + raises(ValueError, lambda: Sum((-1)**n, (n, 1, oo)).evalf()) + raises(ValueError, lambda: Sum((-1)**n, (n, 1, oo)).evalf()) + raises(ValueError, lambda: Sum(n**2, (n, 1, oo)).evalf()) + raises(ValueError, lambda: Sum(2**n, (n, 1, oo)).evalf()) + raises(ValueError, lambda: Sum((-2)**n, (n, 1, oo)).evalf()) + raises(ValueError, lambda: Sum((2*n + 3)/(3*n**2 + 4), (n, 0, oo)).evalf()) + raises(ValueError, lambda: Sum((0.5*n**3)/(n**4 + 1), (n, 0, oo)).evalf()) + + +def test_evalf_product(): + assert Product(n, (n, 1, 10)).evalf() == 3628800. + assert comp(Product(1 - S.Half**2/n**2, (n, 1, oo)).n(5), 0.63662) + assert Product(n, (n, -1, 3)).evalf() == 0 + + +def test_evalf_py_methods(): + assert abs(float(pi + 1) - 4.1415926535897932) < 1e-10 + assert abs(complex(pi + 1) - 4.1415926535897932) < 1e-10 + assert abs( + complex(pi + E*I) - (3.1415926535897931 + 2.7182818284590451j)) < 1e-10 + raises(TypeError, lambda: float(pi + x)) + + +def test_evalf_power_subs_bugs(): + assert (x**2).evalf(subs={x: 0}) == 0 + assert sqrt(x).evalf(subs={x: 0}) == 0 + assert (x**Rational(2, 3)).evalf(subs={x: 0}) == 0 + assert (x**x).evalf(subs={x: 0}) == 1.0 + assert (3**x).evalf(subs={x: 0}) == 1.0 + assert exp(x).evalf(subs={x: 0}) == 1.0 + assert ((2 + I)**x).evalf(subs={x: 0}) == 1.0 + assert (0**x).evalf(subs={x: 0}) == 1.0 + + +def test_evalf_arguments(): + raises(TypeError, lambda: pi.evalf(method="garbage")) + + +def test_implemented_function_evalf(): + from sympy.utilities.lambdify import implemented_function + f = Function('f') + f = implemented_function(f, lambda x: x + 1) + assert str(f(x)) == "f(x)" + assert str(f(2)) == "f(2)" + assert f(2).evalf() == 3.0 + assert f(x).evalf() == f(x) + f = implemented_function(Function('sin'), lambda x: x + 1) + assert f(2).evalf() != sin(2) + del f._imp_ # XXX: due to caching _imp_ would influence all other tests + + +def test_evaluate_false(): + for no in [0, False]: + assert Add(3, 2, evaluate=no).is_Add + assert Mul(3, 2, evaluate=no).is_Mul + assert Pow(3, 2, evaluate=no).is_Pow + assert Pow(y, 2, evaluate=True) - Pow(y, 2, evaluate=True) == 0 + + +def test_evalf_relational(): + assert Eq(x/5, y/10).evalf() == Eq(0.2*x, 0.1*y) + # if this first assertion fails it should be replaced with + # one that doesn't + assert unchanged(Eq, (3 - I)**2/2 + I, 0) + assert Eq((3 - I)**2/2 + I, 0).n() is S.false + assert nfloat(Eq((3 - I)**2 + I, 0)) == S.false + + +def test_issue_5486(): + assert not cos(sqrt(0.5 + I)).n().is_Function + + +def test_issue_5486_bug(): + from sympy.core.expr import Expr + from sympy.core.numbers import I + assert abs(Expr._from_mpmath(I._to_mpmath(15), 15) - I) < 1.0e-15 + + +def test_bugs(): + from sympy.functions.elementary.complexes import (polar_lift, re) + + assert abs(re((1 + I)**2)) < 1e-15 + + # anything that evalf's to 0 will do in place of polar_lift + assert abs(polar_lift(0)).n() == 0 + + +def test_subs(): + assert NS('besseli(-x, y) - besseli(x, y)', subs={x: 3.5, y: 20.0}) == \ + '-4.92535585957223e-10' + assert NS('Piecewise((x, x>0)) + Piecewise((1-x, x>0))', subs={x: 0.1}) == \ + '1.00000000000000' + raises(TypeError, lambda: x.evalf(subs=(x, 1))) + + +def test_issue_4956_5204(): + # issue 4956 + v = S('''(-27*12**(1/3)*sqrt(31)*I + + 27*2**(2/3)*3**(1/3)*sqrt(31)*I)/(-2511*2**(2/3)*3**(1/3) + + (29*18**(1/3) + 9*2**(1/3)*3**(2/3)*sqrt(31)*I + + 87*2**(1/3)*3**(1/6)*I)**2)''') + assert NS(v, 1) == '0.e-118 - 0.e-118*I' + + # issue 5204 + v = S('''-(357587765856 + 18873261792*249**(1/2) + 56619785376*I*83**(1/2) + + 108755765856*I*3**(1/2) + 41281887168*6**(1/3)*(1422 + + 54*249**(1/2))**(1/3) - 1239810624*6**(1/3)*249**(1/2)*(1422 + + 54*249**(1/2))**(1/3) - 3110400000*I*6**(1/3)*83**(1/2)*(1422 + + 54*249**(1/2))**(1/3) + 13478400000*I*3**(1/2)*6**(1/3)*(1422 + + 54*249**(1/2))**(1/3) + 1274950152*6**(2/3)*(1422 + + 54*249**(1/2))**(2/3) + 32347944*6**(2/3)*249**(1/2)*(1422 + + 54*249**(1/2))**(2/3) - 1758790152*I*3**(1/2)*6**(2/3)*(1422 + + 54*249**(1/2))**(2/3) - 304403832*I*6**(2/3)*83**(1/2)*(1422 + + 4*249**(1/2))**(2/3))/(175732658352 + (1106028 + 25596*249**(1/2) + + 76788*I*83**(1/2))**2)''') + assert NS(v, 5) == '0.077284 + 1.1104*I' + assert NS(v, 1) == '0.08 + 1.*I' + + +def test_old_docstring(): + a = (E + pi*I)*(E - pi*I) + assert NS(a) == '17.2586605000200' + assert a.n() == 17.25866050002001 + + +def test_issue_4806(): + assert integrate(atan(x)**2, (x, -1, 1)).evalf().round(1) == Float(0.5, 1) + assert atan(0, evaluate=False).n() == 0 + + +def test_evalf_mul(): + # SymPy should not try to expand this; it should be handled term-wise + # in evalf through mpmath + assert NS(product(1 + sqrt(n)*I, (n, 1, 500)), 1) == '5.e+567 + 2.e+568*I' + + +def test_scaled_zero(): + a, b = (([0], 1, 100, 1), -1) + assert scaled_zero(100) == (a, b) + assert scaled_zero(a) == (0, 1, 100, 1) + a, b = (([1], 1, 100, 1), -1) + assert scaled_zero(100, -1) == (a, b) + assert scaled_zero(a) == (1, 1, 100, 1) + raises(ValueError, lambda: scaled_zero(scaled_zero(100))) + raises(ValueError, lambda: scaled_zero(100, 2)) + raises(ValueError, lambda: scaled_zero(100, 0)) + raises(ValueError, lambda: scaled_zero((1, 5, 1, 3))) + + +def test_chop_value(): + for i in range(-27, 28): + assert (Pow(10, i)*2).n(chop=10**i) and not (Pow(10, i)).n(chop=10**i) + + +def test_infinities(): + assert oo.evalf(chop=True) == inf + assert (-oo).evalf(chop=True) == ninf + + +def test_to_mpmath(): + assert sqrt(3)._to_mpmath(20)._mpf_ == (0, int(908093), -19, 20) + assert S(3.2)._to_mpmath(20)._mpf_ == (0, int(838861), -18, 20) + + +def test_issue_6632_evalf(): + add = (-100000*sqrt(2500000001) + 5000000001) + assert add.n() == 9.999999998e-11 + assert (add*add).n() == 9.999999996e-21 + + +def test_issue_4945(): + from sympy.abc import H + assert (H/0).evalf(subs={H:1}) == zoo + + +def test_evalf_integral(): + # test that workprec has to increase in order to get a result other than 0 + eps = Rational(1, 1000000) + assert Integral(sin(x), (x, -pi, pi + eps)).n(2)._prec == 10 + + +def test_issue_8821_highprec_from_str(): + s = str(pi.evalf(128)) + p = N(s) + assert Abs(sin(p)) < 1e-15 + p = N(s, 64) + assert Abs(sin(p)) < 1e-64 + + +def test_issue_8853(): + p = Symbol('x', even=True, positive=True) + assert floor(-p - S.Half).is_even == False + assert floor(-p + S.Half).is_even == True + assert ceiling(p - S.Half).is_even == True + assert ceiling(p + S.Half).is_even == False + + assert get_integer_part(S.Half, -1, {}, True) == (0, 0) + assert get_integer_part(S.Half, 1, {}, True) == (1, 0) + assert get_integer_part(Rational(-1, 2), -1, {}, True) == (-1, 0) + assert get_integer_part(Rational(-1, 2), 1, {}, True) == (0, 0) + + +def test_issue_17681(): + class identity_func(Function): + + def _eval_evalf(self, *args, **kwargs): + return self.args[0].evalf(*args, **kwargs) + + assert floor(identity_func(S(0))) == 0 + assert get_integer_part(S(0), 1, {}, True) == (0, 0) + + +def test_issue_9326(): + from sympy.core.symbol import Dummy + d1 = Dummy('d') + d2 = Dummy('d') + e = d1 + d2 + assert e.evalf(subs = {d1: 1, d2: 2}) == 3.0 + + +def test_issue_10323(): + assert ceiling(sqrt(2**30 + 1)) == 2**15 + 1 + + +def test_AssocOp_Function(): + # the first arg of Min is not comparable in the imaginary part + raises(ValueError, lambda: S(''' + Min(-sqrt(3)*cos(pi/18)/6 + re(1/((-1/2 - sqrt(3)*I/2)*(1/6 + + sqrt(3)*I/18)**(1/3)))/3 + sin(pi/18)/2 + 2 + I*(-cos(pi/18)/2 - + sqrt(3)*sin(pi/18)/6 + im(1/((-1/2 - sqrt(3)*I/2)*(1/6 + + sqrt(3)*I/18)**(1/3)))/3), re(1/((-1/2 + sqrt(3)*I/2)*(1/6 + + sqrt(3)*I/18)**(1/3)))/3 - sqrt(3)*cos(pi/18)/6 - sin(pi/18)/2 + 2 + + I*(im(1/((-1/2 + sqrt(3)*I/2)*(1/6 + sqrt(3)*I/18)**(1/3)))/3 - + sqrt(3)*sin(pi/18)/6 + cos(pi/18)/2))''')) + # if that is changed so a non-comparable number remains as + # an arg, then the Min/Max instantiation needs to be changed + # to watch out for non-comparable args when making simplifications + # and the following test should be added instead (with e being + # the sympified expression above): + # raises(ValueError, lambda: e._eval_evalf(2)) + + +def test_issue_10395(): + eq = x*Max(0, y) + assert nfloat(eq) == eq + eq = x*Max(y, -1.1) + assert nfloat(eq) == eq + assert Max(y, 4).n() == Max(4.0, y) + + +def test_issue_13098(): + assert floor(log(S('9.'+'9'*20), 10)) == 0 + assert ceiling(log(S('9.'+'9'*20), 10)) == 1 + assert floor(log(20 - S('9.'+'9'*20), 10)) == 1 + assert ceiling(log(20 - S('9.'+'9'*20), 10)) == 2 + + +def test_issue_14601(): + e = 5*x*y/2 - y*(35*(x**3)/2 - 15*x/2) + subst = {x:0.0, y:0.0} + e2 = e.evalf(subs=subst) + assert float(e2) == 0.0 + assert float((x + x*(x**2 + x)).evalf(subs={x: 0.0})) == 0.0 + + +def test_issue_11151(): + z = S.Zero + e = Sum(z, (x, 1, 2)) + assert e != z # it shouldn't evaluate + # when it does evaluate, this is what it should give + assert evalf(e, 15, {}) == \ + evalf(z, 15, {}) == (None, None, 15, None) + # so this shouldn't fail + assert (e/2).n() == 0 + # this was where the issue appeared + expr0 = Sum(x**2 + x, (x, 1, 2)) + expr1 = Sum(0, (x, 1, 2)) + expr2 = expr1/expr0 + assert simplify(factor(expr2) - expr2) == 0 + + +def test_issue_13425(): + assert N('2**.5', 30) == N('sqrt(2)', 30) + assert N('x - x', 30) == 0 + assert abs((N('pi*.1', 22)*10 - pi).n()) < 1e-22 + + +def test_issue_17421(): + assert N(acos(-I + acosh(cosh(cosh(1) + I)))) == 1.0*I + + +def test_issue_20291(): + from sympy.sets import EmptySet, Reals + from sympy.sets.sets import (Complement, FiniteSet, Intersection) + a = Symbol('a') + b = Symbol('b') + A = FiniteSet(a, b) + assert A.evalf(subs={a: 1, b: 2}) == FiniteSet(1.0, 2.0) + B = FiniteSet(a-b, 1) + assert B.evalf(subs={a: 1, b: 2}) == FiniteSet(-1.0, 1.0) + + sol = Complement(Intersection(FiniteSet(-b/2 - sqrt(b**2-4*pi)/2), Reals), FiniteSet(0)) + assert sol.evalf(subs={b: 1}) == EmptySet + + +def test_evalf_with_zoo(): + assert (1/x).evalf(subs={x: 0}) == zoo # issue 8242 + assert (-1/x).evalf(subs={x: 0}) == zoo # PR 16150 + assert (0 ** x).evalf(subs={x: -1}) == zoo # PR 16150 + assert (0 ** x).evalf(subs={x: -1 + I}) == nan + assert Mul(2, Pow(0, -1, evaluate=False), evaluate=False).evalf() == zoo # issue 21147 + assert Mul(x, 1/x, evaluate=False).evalf(subs={x: 0}) == Mul(x, 1/x, evaluate=False).subs(x, 0) == nan + assert Mul(1/x, 1/x, evaluate=False).evalf(subs={x: 0}) == zoo + assert Mul(1/x, Abs(1/x), evaluate=False).evalf(subs={x: 0}) == zoo + assert Abs(zoo, evaluate=False).evalf() == oo + assert re(zoo, evaluate=False).evalf() == nan + assert im(zoo, evaluate=False).evalf() == nan + assert Add(zoo, zoo, evaluate=False).evalf() == nan + assert Add(oo, zoo, evaluate=False).evalf() == nan + assert Pow(zoo, -1, evaluate=False).evalf() == 0 + assert Pow(zoo, Rational(-1, 3), evaluate=False).evalf() == 0 + assert Pow(zoo, Rational(1, 3), evaluate=False).evalf() == zoo + assert Pow(zoo, S.Half, evaluate=False).evalf() == zoo + assert Pow(zoo, 2, evaluate=False).evalf() == zoo + assert Pow(0, zoo, evaluate=False).evalf() == nan + assert log(zoo, evaluate=False).evalf() == zoo + assert zoo.evalf(chop=True) == zoo + assert x.evalf(subs={x: zoo}) == zoo + + +def test_evalf_with_bounded_error(): + cases = [ + # zero + (Rational(0), None, 1), + # zero im part + (pi, None, 10), + # zero real part + (pi*I, None, 10), + # re and im nonzero + (2-3*I, None, 5), + # similar tests again, but using eps instead of m + (Rational(0), Rational(1, 2), None), + (pi, Rational(1, 1000), None), + (pi * I, Rational(1, 1000), None), + (2 - 3 * I, Rational(1, 1000), None), + # very large eps + (2 - 3 * I, Rational(1000), None), + # case where x already small, hence some cancellation in p = m + n - 1 + (Rational(1234, 10**8), Rational(1, 10**12), None), + ] + for x0, eps, m in cases: + a, b, _, _ = evalf(x0, 53, {}) + c, d, _, _ = _evalf_with_bounded_error(x0, eps, m) + if eps is None: + eps = 2**(-m) + z = make_mpc((a or fzero, b or fzero)) + w = make_mpc((c or fzero, d or fzero)) + assert abs(w - z) < eps + + # eps must be positive + raises(ValueError, lambda: _evalf_with_bounded_error(pi, Rational(0))) + raises(ValueError, lambda: _evalf_with_bounded_error(pi, -pi)) + raises(ValueError, lambda: _evalf_with_bounded_error(pi, I)) + + +def test_issue_22849(): + a = -8 + 3 * sqrt(3) + x = AlgebraicNumber(a) + assert evalf(a, 1, {}) == evalf(x, 1, {}) + + +def test_evalf_real_alg_num(): + # This test demonstrates why the entry for `AlgebraicNumber` in + # `sympy.core.evalf._create_evalf_table()` has to use `x.to_root()`, + # instead of `x.as_expr()`. If the latter is used, then `z` will be + # a complex number with `0.e-20` for imaginary part, even though `a5` + # is a real number. + zeta = Symbol('zeta') + a5 = AlgebraicNumber(CRootOf(cyclotomic_poly(5), -1), [-1, -1, 0, 0], alias=zeta) + z = a5.evalf() + assert isinstance(z, Float) + assert not hasattr(z, '_mpc_') + assert hasattr(z, '_mpf_') + + +def test_issue_20733(): + expr = 1/((x - 9)*(x - 8)*(x - 7)*(x - 4)**2*(x - 3)**3*(x - 2)) + assert str(expr.evalf(1, subs={x:1})) == '-4.e-5' + assert str(expr.evalf(2, subs={x:1})) == '-4.1e-5' + assert str(expr.evalf(11, subs={x:1})) == '-4.1335978836e-5' + assert str(expr.evalf(20, subs={x:1})) == '-0.000041335978835978835979' + + expr = Mul(*((x - i) for i in range(2, 1000))) + assert srepr(expr.evalf(2, subs={x: 1})) == "Float('4.0271e+2561', precision=10)" + assert srepr(expr.evalf(10, subs={x: 1})) == "Float('4.02790050126e+2561', precision=37)" + assert srepr(expr.evalf(53, subs={x: 1})) == "Float('4.0279005012722099453824067459760158730668154575647110393e+2561', precision=179)" diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_expand.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_expand.py new file mode 100644 index 0000000000000000000000000000000000000000..e7abb5daacebbe81664b3de3a7ac35a490ab31bc --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_expand.py @@ -0,0 +1,364 @@ +from sympy.core.expr import unchanged +from sympy.core.mul import Mul +from sympy.core.numbers import (I, Rational as R, pi) +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.series.order import O +from sympy.simplify.radsimp import expand_numer +from sympy.core.function import (expand, expand_multinomial, + expand_power_base, expand_log) + +from sympy.testing.pytest import raises +from sympy.core.random import verify_numerically + +from sympy.abc import x, y, z + + +def test_expand_no_log(): + assert ( + (1 + log(x**4))**2).expand(log=False) == 1 + 2*log(x**4) + log(x**4)**2 + assert ((1 + log(x**4))*(1 + log(x**3))).expand( + log=False) == 1 + log(x**4) + log(x**3) + log(x**4)*log(x**3) + + +def test_expand_no_multinomial(): + assert ((1 + x)*(1 + (1 + x)**4)).expand(multinomial=False) == \ + 1 + x + (1 + x)**4 + x*(1 + x)**4 + + +def test_expand_negative_integer_powers(): + expr = (x + y)**(-2) + assert expr.expand() == 1 / (2*x*y + x**2 + y**2) + assert expr.expand(multinomial=False) == (x + y)**(-2) + expr = (x + y)**(-3) + assert expr.expand() == 1 / (3*x*x*y + 3*x*y*y + x**3 + y**3) + assert expr.expand(multinomial=False) == (x + y)**(-3) + expr = (x + y)**(2) * (x + y)**(-4) + assert expr.expand() == 1 / (2*x*y + x**2 + y**2) + assert expr.expand(multinomial=False) == (x + y)**(-2) + + +def test_expand_non_commutative(): + A = Symbol('A', commutative=False) + B = Symbol('B', commutative=False) + C = Symbol('C', commutative=False) + a = Symbol('a') + b = Symbol('b') + i = Symbol('i', integer=True) + n = Symbol('n', negative=True) + m = Symbol('m', negative=True) + p = Symbol('p', polar=True) + np = Symbol('p', polar=False) + + assert (C*(A + B)).expand() == C*A + C*B + assert (C*(A + B)).expand() != A*C + B*C + assert ((A + B)**2).expand() == A**2 + A*B + B*A + B**2 + assert ((A + B)**3).expand() == (A**2*B + B**2*A + A*B**2 + B*A**2 + + A**3 + B**3 + A*B*A + B*A*B) + # issue 6219 + assert ((a*A*B*A**-1)**2).expand() == a**2*A*B**2/A + # Note that (a*A*B*A**-1)**2 is automatically converted to a**2*(A*B*A**-1)**2 + assert ((a*A*B*A**-1)**2).expand(deep=False) == a**2*(A*B*A**-1)**2 + assert ((a*A*B*A**-1)**2).expand() == a**2*(A*B**2*A**-1) + assert ((a*A*B*A**-1)**2).expand(force=True) == a**2*A*B**2*A**(-1) + assert ((a*A*B)**2).expand() == a**2*A*B*A*B + assert ((a*A)**2).expand() == a**2*A**2 + assert ((a*A*B)**i).expand() == a**i*(A*B)**i + assert ((a*A*(B*(A*B/A)**2))**i).expand() == a**i*(A*B*A*B**2/A)**i + # issue 6558 + assert (A*B*(A*B)**-1).expand() == 1 + assert ((a*A)**i).expand() == a**i*A**i + assert ((a*A*B*A**-1)**3).expand() == a**3*A*B**3/A + assert ((a*A*B*A*B/A)**3).expand() == \ + a**3*A*B*(A*B**2)*(A*B**2)*A*B*A**(-1) + assert ((a*A*B*A*B/A)**-2).expand() == \ + A*B**-1*A**-1*B**-2*A**-1*B**-1*A**-1/a**2 + assert ((a*b*A*B*A**-1)**i).expand() == a**i*b**i*(A*B/A)**i + assert ((a*(a*b)**i)**i).expand() == a**i*a**(i**2)*b**(i**2) + e = Pow(Mul(a, 1/a, A, B, evaluate=False), S(2), evaluate=False) + assert e.expand() == A*B*A*B + assert sqrt(a*(A*b)**i).expand() == sqrt(a*b**i*A**i) + assert (sqrt(-a)**a).expand() == sqrt(-a)**a + assert expand((-2*n)**(i/3)) == 2**(i/3)*(-n)**(i/3) + assert expand((-2*n*m)**(i/a)) == (-2)**(i/a)*(-n)**(i/a)*(-m)**(i/a) + assert expand((-2*a*p)**b) == 2**b*p**b*(-a)**b + assert expand((-2*a*np)**b) == 2**b*(-a*np)**b + assert expand(sqrt(A*B)) == sqrt(A*B) + assert expand(sqrt(-2*a*b)) == sqrt(2)*sqrt(-a*b) + + +def test_expand_radicals(): + a = (x + y)**R(1, 2) + + assert (a**1).expand() == a + assert (a**3).expand() == x*a + y*a + assert (a**5).expand() == x**2*a + 2*x*y*a + y**2*a + + assert (1/a**1).expand() == 1/a + assert (1/a**3).expand() == 1/(x*a + y*a) + assert (1/a**5).expand() == 1/(x**2*a + 2*x*y*a + y**2*a) + + a = (x + y)**R(1, 3) + + assert (a**1).expand() == a + assert (a**2).expand() == a**2 + assert (a**4).expand() == x*a + y*a + assert (a**5).expand() == x*a**2 + y*a**2 + assert (a**7).expand() == x**2*a + 2*x*y*a + y**2*a + + +def test_expand_modulus(): + assert ((x + y)**11).expand(modulus=11) == x**11 + y**11 + assert ((x + sqrt(2)*y)**11).expand(modulus=11) == x**11 + 10*sqrt(2)*y**11 + assert (x + y/2).expand(modulus=1) == y/2 + + raises(ValueError, lambda: ((x + y)**11).expand(modulus=0)) + raises(ValueError, lambda: ((x + y)**11).expand(modulus=x)) + + +def test_issue_5743(): + assert (x*sqrt( + x + y)*(1 + sqrt(x + y))).expand() == x**2 + x*y + x*sqrt(x + y) + assert (x*sqrt( + x + y)*(1 + x*sqrt(x + y))).expand() == x**3 + x**2*y + x*sqrt(x + y) + + +def test_expand_frac(): + assert expand((x + y)*y/x/(x + 1), frac=True) == \ + (x*y + y**2)/(x**2 + x) + assert expand((x + y)*y/x/(x + 1), numer=True) == \ + (x*y + y**2)/(x*(x + 1)) + assert expand((x + y)*y/x/(x + 1), denom=True) == \ + y*(x + y)/(x**2 + x) + eq = (x + 1)**2/y + assert expand_numer(eq, multinomial=False) == eq + # issue 26329 + eq = (exp(x*z) - exp(y*z))/exp(z*(x + y)) + ans = exp(-y*z) - exp(-x*z) + assert eq.expand(numer=True) != ans + assert eq.expand(numer=True, exact=True) == ans + assert expand_numer(eq) != ans + assert expand_numer(eq, exact=True) == ans + + +def test_issue_6121(): + eq = -I*exp(-3*I*pi/4)/(4*pi**(S(3)/2)*sqrt(x)) + assert eq.expand(complex=True) # does not give oo recursion + eq = -I*exp(-3*I*pi/4)/(4*pi**(R(3, 2))*sqrt(x)) + assert eq.expand(complex=True) # does not give oo recursion + + +def test_expand_power_base(): + assert expand_power_base((x*y*z)**4) == x**4*y**4*z**4 + assert expand_power_base((x*y*z)**x).is_Pow + assert expand_power_base((x*y*z)**x, force=True) == x**x*y**x*z**x + assert expand_power_base((x*(y*z)**2)**3) == x**3*y**6*z**6 + + assert expand_power_base((sin((x*y)**2)*y)**z).is_Pow + assert expand_power_base( + (sin((x*y)**2)*y)**z, force=True) == sin((x*y)**2)**z*y**z + assert expand_power_base( + (sin((x*y)**2)*y)**z, deep=True) == (sin(x**2*y**2)*y)**z + + assert expand_power_base(exp(x)**2) == exp(2*x) + assert expand_power_base((exp(x)*exp(y))**2) == exp(2*x)*exp(2*y) + + assert expand_power_base( + (exp((x*y)**z)*exp(y))**2) == exp(2*(x*y)**z)*exp(2*y) + assert expand_power_base((exp((x*y)**z)*exp( + y))**2, deep=True, force=True) == exp(2*x**z*y**z)*exp(2*y) + + assert expand_power_base((exp(x)*exp(y))**z).is_Pow + assert expand_power_base( + (exp(x)*exp(y))**z, force=True) == exp(x)**z*exp(y)**z + + +def test_expand_arit(): + a = Symbol("a") + b = Symbol("b", positive=True) + c = Symbol("c") + + p = R(5) + e = (a + b)*c + assert e == c*(a + b) + assert (e.expand() - a*c - b*c) == R(0) + e = (a + b)*(a + b) + assert e == (a + b)**2 + assert e.expand() == 2*a*b + a**2 + b**2 + e = (a + b)*(a + b)**R(2) + assert e == (a + b)**3 + assert e.expand() == 3*b*a**2 + 3*a*b**2 + a**3 + b**3 + assert e.expand() == 3*b*a**2 + 3*a*b**2 + a**3 + b**3 + e = (a + b)*(a + c)*(b + c) + assert e == (a + c)*(a + b)*(b + c) + assert e.expand() == 2*a*b*c + b*a**2 + c*a**2 + b*c**2 + a*c**2 + c*b**2 + a*b**2 + e = (a + R(1))**p + assert e == (1 + a)**5 + assert e.expand() == 1 + 5*a + 10*a**2 + 10*a**3 + 5*a**4 + a**5 + e = (a + b + c)*(a + c + p) + assert e == (5 + a + c)*(a + b + c) + assert e.expand() == 5*a + 5*b + 5*c + 2*a*c + b*c + a*b + a**2 + c**2 + x = Symbol("x") + s = exp(x*x) - 1 + e = s.nseries(x, 0, 6)/x**2 + assert e.expand() == 1 + x**2/2 + O(x**4) + + e = (x*(y + z))**(x*(y + z))*(x + y) + assert e.expand(power_exp=False, power_base=False) == x*(x*y + x* + z)**(x*y + x*z) + y*(x*y + x*z)**(x*y + x*z) + assert e.expand(power_exp=False, power_base=False, deep=False) == x* \ + (x*(y + z))**(x*(y + z)) + y*(x*(y + z))**(x*(y + z)) + e = x * (x + (y + 1)**2) + assert e.expand(deep=False) == x**2 + x*(y + 1)**2 + e = (x*(y + z))**z + assert e.expand(power_base=True, mul=True, deep=True) in [x**z*(y + + z)**z, (x*y + x*z)**z] + assert ((2*y)**z).expand() == 2**z*y**z + p = Symbol('p', positive=True) + assert sqrt(-x).expand().is_Pow + assert sqrt(-x).expand(force=True) == I*sqrt(x) + assert ((2*y*p)**z).expand() == 2**z*p**z*y**z + assert ((2*y*p*x)**z).expand() == 2**z*p**z*(x*y)**z + assert ((2*y*p*x)**z).expand(force=True) == 2**z*p**z*x**z*y**z + assert ((2*y*p*-pi)**z).expand() == 2**z*pi**z*p**z*(-y)**z + assert ((2*y*p*-pi*x)**z).expand() == 2**z*pi**z*p**z*(-x*y)**z + n = Symbol('n', negative=True) + m = Symbol('m', negative=True) + assert ((-2*x*y*n)**z).expand() == 2**z*(-n)**z*(x*y)**z + assert ((-2*x*y*n*m)**z).expand() == 2**z*(-m)**z*(-n)**z*(-x*y)**z + # issue 5482 + assert sqrt(-2*x*n) == sqrt(2)*sqrt(-n)*sqrt(x) + # issue 5605 (2) + assert (cos(x + y)**2).expand(trig=True) in [ + (-sin(x)*sin(y) + cos(x)*cos(y))**2, + sin(x)**2*sin(y)**2 - 2*sin(x)*sin(y)*cos(x)*cos(y) + cos(x)**2*cos(y)**2 + ] + + # Check that this isn't too slow + x = Symbol('x') + W = 1 + for i in range(1, 21): + W = W * (x - i) + W = W.expand() + assert W.has(-1672280820*x**15) + +def test_expand_mul(): + # part of issue 20597 + e = Mul(2, 3, evaluate=False) + assert e.expand() == 6 + + e = Mul(2, 3, 1/x, evaluate=False) + assert e.expand() == 6/x + e = Mul(2, R(1, 3), evaluate=False) + assert e.expand() == R(2, 3) + +def test_power_expand(): + """Test for Pow.expand()""" + a = Symbol('a') + b = Symbol('b') + p = (a + b)**2 + assert p.expand() == a**2 + b**2 + 2*a*b + + p = (1 + 2*(1 + a))**2 + assert p.expand() == 9 + 4*(a**2) + 12*a + + p = 2**(a + b) + assert p.expand() == 2**a*2**b + + A = Symbol('A', commutative=False) + B = Symbol('B', commutative=False) + assert (2**(A + B)).expand() == 2**(A + B) + assert (A**(a + b)).expand() != A**(a + b) + + +def test_issues_5919_6830(): + # issue 5919 + n = -1 + 1/x + z = n/x/(-n)**2 - 1/n/x + assert expand(z) == 1/(x**2 - 2*x + 1) - 1/(x - 2 + 1/x) - 1/(-x + 1) + + # issue 6830 + p = (1 + x)**2 + assert expand_multinomial((1 + x*p)**2) == ( + x**2*(x**4 + 4*x**3 + 6*x**2 + 4*x + 1) + 2*x*(x**2 + 2*x + 1) + 1) + assert expand_multinomial((1 + (y + x)*p)**2) == ( + 2*((x + y)*(x**2 + 2*x + 1)) + (x**2 + 2*x*y + y**2)* + (x**4 + 4*x**3 + 6*x**2 + 4*x + 1) + 1) + A = Symbol('A', commutative=False) + p = (1 + A)**2 + assert expand_multinomial((1 + x*p)**2) == ( + x**2*(1 + 4*A + 6*A**2 + 4*A**3 + A**4) + 2*x*(1 + 2*A + A**2) + 1) + assert expand_multinomial((1 + (y + x)*p)**2) == ( + (x + y)*(1 + 2*A + A**2)*2 + (x**2 + 2*x*y + y**2)* + (1 + 4*A + 6*A**2 + 4*A**3 + A**4) + 1) + assert expand_multinomial((1 + (y + x)*p)**3) == ( + (x + y)*(1 + 2*A + A**2)*3 + (x**2 + 2*x*y + y**2)*(1 + 4*A + + 6*A**2 + 4*A**3 + A**4)*3 + (x**3 + 3*x**2*y + 3*x*y**2 + y**3)*(1 + 6*A + + 15*A**2 + 20*A**3 + 15*A**4 + 6*A**5 + A**6) + 1) + # unevaluate powers + eq = (Pow((x + 1)*((A + 1)**2), 2, evaluate=False)) + # - in this case the base is not an Add so no further + # expansion is done + assert expand_multinomial(eq) == \ + (x**2 + 2*x + 1)*(1 + 4*A + 6*A**2 + 4*A**3 + A**4) + # - but here, the expanded base *is* an Add so it gets expanded + eq = (Pow(((A + 1)**2), 2, evaluate=False)) + assert expand_multinomial(eq) == 1 + 4*A + 6*A**2 + 4*A**3 + A**4 + + # coverage + def ok(a, b, n): + e = (a + I*b)**n + return verify_numerically(e, expand_multinomial(e)) + + for a in [2, S.Half]: + for b in [3, R(1, 3)]: + for n in range(2, 6): + assert ok(a, b, n) + + assert expand_multinomial((x + 1 + O(z))**2) == \ + 1 + 2*x + x**2 + O(z) + assert expand_multinomial((x + 1 + O(z))**3) == \ + 1 + 3*x + 3*x**2 + x**3 + O(z) + + assert expand_multinomial(3**(x + y + 3)) == 27*3**(x + y) + +def test_expand_log(): + t = Symbol('t', positive=True) + # after first expansion, -2*log(2) + log(4); then 0 after second + assert expand(log(t**2) - log(t**2/4) - 2*log(2)) == 0 + assert expand_log(log(7*6)/log(6)) == 1 + log(7)/log(6) + b = factorial(10) + assert expand_log(log(7*b**4)/log(b) + ) == 4 + log(7)/log(b) + + +def test_issue_23952(): + assert (x**(y + z)).expand(force=True) == x**y*x**z + one = Symbol('1', integer=True, prime=True, odd=True, positive=True) + two = Symbol('2', integer=True, prime=True, even=True) + e = two - one + for b in (0, x): + # 0**e = 0, 0**-e = zoo; but if expanded then nan + assert unchanged(Pow, b, e) # power_exp + assert unchanged(Pow, b, -e) # power_exp + assert unchanged(Pow, b, y - x) # power_exp + assert unchanged(Pow, b, 3 - x) # multinomial + assert (b**e).expand().is_Pow # power_exp + assert (b**-e).expand().is_Pow # power_exp + assert (b**(y - x)).expand().is_Pow # power_exp + assert (b**(3 - x)).expand().is_Pow # multinomial + nn1 = Symbol('nn1', nonnegative=True) + nn2 = Symbol('nn2', nonnegative=True) + nn3 = Symbol('nn3', nonnegative=True) + assert (x**(nn1 + nn2)).expand() == x**nn1*x**nn2 + assert (x**(-nn1 - nn2)).expand() == x**-nn1*x**-nn2 + assert unchanged(Pow, x, nn1 + nn2 - nn3) + assert unchanged(Pow, x, 1 + nn2 - nn3) + assert unchanged(Pow, x, nn1 - nn2) + assert unchanged(Pow, x, 1 - nn2) + assert unchanged(Pow, x, -1 + nn2) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_expr.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_expr.py new file mode 100644 index 0000000000000000000000000000000000000000..af63823345e2b0564ebb7e9015bfe1b423c9bafa --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_expr.py @@ -0,0 +1,2313 @@ +from sympy.assumptions.refine import refine +from sympy.concrete.summations import Sum +from sympy.core.add import Add +from sympy.core.basic import Basic +from sympy.core.containers import Tuple +from sympy.core.expr import (ExprBuilder, unchanged, Expr, + UnevaluatedExpr) +from sympy.core.function import (Function, expand, WildFunction, + AppliedUndef, Derivative, diff, Subs) +from sympy.core.mul import Mul, _unevaluated_Mul +from sympy.core.numbers import (NumberSymbol, E, zoo, oo, Float, I, + Rational, nan, Integer, Number, pi, _illegal) +from sympy.core.power import Pow +from sympy.core.relational import Ge, Lt, Gt, Le +from sympy.core.singleton import S +from sympy.core.sorting import default_sort_key +from sympy.core.symbol import Symbol, symbols, Dummy, Wild +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.exponential import exp_polar, exp, log +from sympy.functions.elementary.hyperbolic import sinh, tanh +from sympy.functions.elementary.miscellaneous import sqrt, Max +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import tan, sin, cos +from sympy.functions.special.delta_functions import (Heaviside, + DiracDelta) +from sympy.functions.special.error_functions import Si +from sympy.functions.special.gamma_functions import gamma +from sympy.integrals.integrals import integrate, Integral +from sympy.physics.secondquant import FockState +from sympy.polys.partfrac import apart +from sympy.polys.polytools import factor, cancel, Poly +from sympy.polys.rationaltools import together +from sympy.series.order import O +from sympy.sets.sets import FiniteSet +from sympy.simplify.combsimp import combsimp +from sympy.simplify.gammasimp import gammasimp +from sympy.simplify.powsimp import powsimp +from sympy.simplify.radsimp import collect, radsimp +from sympy.simplify.ratsimp import ratsimp +from sympy.simplify.simplify import simplify, nsimplify +from sympy.simplify.trigsimp import trigsimp +from sympy.tensor.indexed import Indexed +from sympy.physics.units import meter + +from sympy.testing.pytest import raises, XFAIL + +from sympy.abc import a, b, c, n, t, u, x, y, z + + +f, g, h = symbols('f,g,h', cls=Function) + + +class DummyNumber: + """ + Minimal implementation of a number that works with SymPy. + + If one has a Number class (e.g. Sage Integer, or some other custom class) + that one wants to work well with SymPy, one has to implement at least the + methods of this class DummyNumber, resp. its subclasses I5 and F1_1. + + Basically, one just needs to implement either __int__() or __float__() and + then one needs to make sure that the class works with Python integers and + with itself. + """ + + def __radd__(self, a): + if isinstance(a, (int, float)): + return a + self.number + return NotImplemented + + def __add__(self, a): + if isinstance(a, (int, float, DummyNumber)): + return self.number + a + return NotImplemented + + def __rsub__(self, a): + if isinstance(a, (int, float)): + return a - self.number + return NotImplemented + + def __sub__(self, a): + if isinstance(a, (int, float, DummyNumber)): + return self.number - a + return NotImplemented + + def __rmul__(self, a): + if isinstance(a, (int, float)): + return a * self.number + return NotImplemented + + def __mul__(self, a): + if isinstance(a, (int, float, DummyNumber)): + return self.number * a + return NotImplemented + + def __rtruediv__(self, a): + if isinstance(a, (int, float)): + return a / self.number + return NotImplemented + + def __truediv__(self, a): + if isinstance(a, (int, float, DummyNumber)): + return self.number / a + return NotImplemented + + def __rpow__(self, a): + if isinstance(a, (int, float)): + return a ** self.number + return NotImplemented + + def __pow__(self, a): + if isinstance(a, (int, float, DummyNumber)): + return self.number ** a + return NotImplemented + + def __pos__(self): + return self.number + + def __neg__(self): + return - self.number + + +class I5(DummyNumber): + number = 5 + + def __int__(self): + return self.number + + +class F1_1(DummyNumber): + number = 1.1 + + def __float__(self): + return self.number + +i5 = I5() +f1_1 = F1_1() + +# basic SymPy objects +basic_objs = [ + Rational(2), + Float("1.3"), + x, + y, + pow(x, y)*y, +] + +# all supported objects +all_objs = basic_objs + [ + 5, + 5.5, + i5, + f1_1 +] + + +def dotest(s): + for xo in all_objs: + for yo in all_objs: + s(xo, yo) + return True + + +def test_basic(): + def j(a, b): + x = a + x = +a + x = -a + x = a + b + x = a - b + x = a*b + x = a/b + x = a**b + del x + assert dotest(j) + + +def test_ibasic(): + def s(a, b): + x = a + x += b + x = a + x -= b + x = a + x *= b + x = a + x /= b + assert dotest(s) + + +class NonBasic: + '''This class represents an object that knows how to implement binary + operations like +, -, etc with Expr but is not a subclass of Basic itself. + The NonExpr subclass below does subclass Basic but not Expr. + + For both NonBasic and NonExpr it should be possible for them to override + Expr.__add__ etc because Expr.__add__ should be returning NotImplemented + for non Expr classes. Otherwise Expr.__add__ would create meaningless + objects like Add(Integer(1), FiniteSet(2)) and it wouldn't be possible for + other classes to override these operations when interacting with Expr. + ''' + def __add__(self, other): + return SpecialOp('+', self, other) + + def __radd__(self, other): + return SpecialOp('+', other, self) + + def __sub__(self, other): + return SpecialOp('-', self, other) + + def __rsub__(self, other): + return SpecialOp('-', other, self) + + def __mul__(self, other): + return SpecialOp('*', self, other) + + def __rmul__(self, other): + return SpecialOp('*', other, self) + + def __truediv__(self, other): + return SpecialOp('/', self, other) + + def __rtruediv__(self, other): + return SpecialOp('/', other, self) + + def __floordiv__(self, other): + return SpecialOp('//', self, other) + + def __rfloordiv__(self, other): + return SpecialOp('//', other, self) + + def __mod__(self, other): + return SpecialOp('%', self, other) + + def __rmod__(self, other): + return SpecialOp('%', other, self) + + def __divmod__(self, other): + return SpecialOp('divmod', self, other) + + def __rdivmod__(self, other): + return SpecialOp('divmod', other, self) + + def __pow__(self, other): + return SpecialOp('**', self, other) + + def __rpow__(self, other): + return SpecialOp('**', other, self) + + def __lt__(self, other): + return SpecialOp('<', self, other) + + def __gt__(self, other): + return SpecialOp('>', self, other) + + def __le__(self, other): + return SpecialOp('<=', self, other) + + def __ge__(self, other): + return SpecialOp('>=', self, other) + + +class NonExpr(Basic, NonBasic): + '''Like NonBasic above except this is a subclass of Basic but not Expr''' + pass + + +class SpecialOp(): + '''Represents the results of operations with NonBasic and NonExpr''' + def __new__(cls, op, arg1, arg2): + obj = object.__new__(cls) + obj.args = (op, arg1, arg2) + return obj + + +class NonArithmetic(Basic): + '''Represents a Basic subclass that does not support arithmetic operations''' + pass + + +def test_cooperative_operations(): + '''Tests that Expr uses binary operations cooperatively. + + In particular it should be possible for non-Expr classes to override + binary operators like +, - etc when used with Expr instances. This should + work for non-Expr classes whether they are Basic subclasses or not. Also + non-Expr classes that do not define binary operators with Expr should give + TypeError. + ''' + # A bunch of instances of Expr subclasses + exprs = [ + Expr(), + S.Zero, + S.One, + S.Infinity, + S.NegativeInfinity, + S.ComplexInfinity, + S.Half, + Float(0.5), + Integer(2), + Symbol('x'), + Mul(2, Symbol('x')), + Add(2, Symbol('x')), + Pow(2, Symbol('x')), + ] + + for e in exprs: + # Test that these classes can override arithmetic operations in + # combination with various Expr types. + for ne in [NonBasic(), NonExpr()]: + + results = [ + (ne + e, ('+', ne, e)), + (e + ne, ('+', e, ne)), + (ne - e, ('-', ne, e)), + (e - ne, ('-', e, ne)), + (ne * e, ('*', ne, e)), + (e * ne, ('*', e, ne)), + (ne / e, ('/', ne, e)), + (e / ne, ('/', e, ne)), + (ne // e, ('//', ne, e)), + (e // ne, ('//', e, ne)), + (ne % e, ('%', ne, e)), + (e % ne, ('%', e, ne)), + (divmod(ne, e), ('divmod', ne, e)), + (divmod(e, ne), ('divmod', e, ne)), + (ne ** e, ('**', ne, e)), + (e ** ne, ('**', e, ne)), + (e < ne, ('>', ne, e)), + (ne < e, ('<', ne, e)), + (e > ne, ('<', ne, e)), + (ne > e, ('>', ne, e)), + (e <= ne, ('>=', ne, e)), + (ne <= e, ('<=', ne, e)), + (e >= ne, ('<=', ne, e)), + (ne >= e, ('>=', ne, e)), + ] + + for res, args in results: + assert type(res) is SpecialOp and res.args == args + + # These classes do not support binary operators with Expr. Every + # operation should raise in combination with any of the Expr types. + for na in [NonArithmetic(), object()]: + + raises(TypeError, lambda : e + na) + raises(TypeError, lambda : na + e) + raises(TypeError, lambda : e - na) + raises(TypeError, lambda : na - e) + raises(TypeError, lambda : e * na) + raises(TypeError, lambda : na * e) + raises(TypeError, lambda : e / na) + raises(TypeError, lambda : na / e) + raises(TypeError, lambda : e // na) + raises(TypeError, lambda : na // e) + raises(TypeError, lambda : e % na) + raises(TypeError, lambda : na % e) + raises(TypeError, lambda : divmod(e, na)) + raises(TypeError, lambda : divmod(na, e)) + raises(TypeError, lambda : e ** na) + raises(TypeError, lambda : na ** e) + raises(TypeError, lambda : e > na) + raises(TypeError, lambda : na > e) + raises(TypeError, lambda : e < na) + raises(TypeError, lambda : na < e) + raises(TypeError, lambda : e >= na) + raises(TypeError, lambda : na >= e) + raises(TypeError, lambda : e <= na) + raises(TypeError, lambda : na <= e) + + +def test_relational(): + from sympy.core.relational import Lt + assert (pi < 3) is S.false + assert (pi <= 3) is S.false + assert (pi > 3) is S.true + assert (pi >= 3) is S.true + assert (-pi < 3) is S.true + assert (-pi <= 3) is S.true + assert (-pi > 3) is S.false + assert (-pi >= 3) is S.false + r = Symbol('r', real=True) + assert (r - 2 < r - 3) is S.false + assert Lt(x + I, x + I + 2).func == Lt # issue 8288 + + +def test_relational_assumptions(): + m1 = Symbol("m1", nonnegative=False) + m2 = Symbol("m2", positive=False) + m3 = Symbol("m3", nonpositive=False) + m4 = Symbol("m4", negative=False) + assert (m1 < 0) == Lt(m1, 0) + assert (m2 <= 0) == Le(m2, 0) + assert (m3 > 0) == Gt(m3, 0) + assert (m4 >= 0) == Ge(m4, 0) + m1 = Symbol("m1", nonnegative=False, real=True) + m2 = Symbol("m2", positive=False, real=True) + m3 = Symbol("m3", nonpositive=False, real=True) + m4 = Symbol("m4", negative=False, real=True) + assert (m1 < 0) is S.true + assert (m2 <= 0) is S.true + assert (m3 > 0) is S.true + assert (m4 >= 0) is S.true + m1 = Symbol("m1", negative=True) + m2 = Symbol("m2", nonpositive=True) + m3 = Symbol("m3", positive=True) + m4 = Symbol("m4", nonnegative=True) + assert (m1 < 0) is S.true + assert (m2 <= 0) is S.true + assert (m3 > 0) is S.true + assert (m4 >= 0) is S.true + m1 = Symbol("m1", negative=False, real=True) + m2 = Symbol("m2", nonpositive=False, real=True) + m3 = Symbol("m3", positive=False, real=True) + m4 = Symbol("m4", nonnegative=False, real=True) + assert (m1 < 0) is S.false + assert (m2 <= 0) is S.false + assert (m3 > 0) is S.false + assert (m4 >= 0) is S.false + + +# See https://github.com/sympy/sympy/issues/17708 +#def test_relational_noncommutative(): +# from sympy import Lt, Gt, Le, Ge +# A, B = symbols('A,B', commutative=False) +# assert (A < B) == Lt(A, B) +# assert (A <= B) == Le(A, B) +# assert (A > B) == Gt(A, B) +# assert (A >= B) == Ge(A, B) + + +def test_basic_nostr(): + for obj in basic_objs: + raises(TypeError, lambda: obj + '1') + raises(TypeError, lambda: obj - '1') + if obj == 2: + assert obj * '1' == '11' + else: + raises(TypeError, lambda: obj * '1') + raises(TypeError, lambda: obj / '1') + raises(TypeError, lambda: obj ** '1') + + +def test_series_expansion_for_uniform_order(): + assert (1/x + y + x).series(x, 0, 0) == 1/x + O(1, x) + assert (1/x + y + x).series(x, 0, 1) == 1/x + y + O(x) + assert (1/x + 1 + x).series(x, 0, 0) == 1/x + O(1, x) + assert (1/x + 1 + x).series(x, 0, 1) == 1/x + 1 + O(x) + assert (1/x + x).series(x, 0, 0) == 1/x + O(1, x) + assert (1/x + y + y*x + x).series(x, 0, 0) == 1/x + O(1, x) + assert (1/x + y + y*x + x).series(x, 0, 1) == 1/x + y + O(x) + + +def test_leadterm(): + assert (3 + 2*x**(log(3)/log(2) - 1)).leadterm(x) == (3, 0) + + assert (1/x**2 + 1 + x + x**2).leadterm(x)[1] == -2 + assert (1/x + 1 + x + x**2).leadterm(x)[1] == -1 + assert (x**2 + 1/x).leadterm(x)[1] == -1 + assert (1 + x**2).leadterm(x)[1] == 0 + assert (x + 1).leadterm(x)[1] == 0 + assert (x + x**2).leadterm(x)[1] == 1 + assert (x**2).leadterm(x)[1] == 2 + + +def test_as_leading_term(): + assert (3 + 2*x**(log(3)/log(2) - 1)).as_leading_term(x) == 3 + assert (1/x**2 + 1 + x + x**2).as_leading_term(x) == 1/x**2 + assert (1/x + 1 + x + x**2).as_leading_term(x) == 1/x + assert (x**2 + 1/x).as_leading_term(x) == 1/x + assert (1 + x**2).as_leading_term(x) == 1 + assert (x + 1).as_leading_term(x) == 1 + assert (x + x**2).as_leading_term(x) == x + assert (x**2).as_leading_term(x) == x**2 + assert (x + oo).as_leading_term(x) is oo + + raises(ValueError, lambda: (x + 1).as_leading_term(1)) + + # https://github.com/sympy/sympy/issues/21177 + e = -3*x + (x + Rational(3, 2) - sqrt(3)*S.ImaginaryUnit/2)**2\ + - Rational(3, 2) + 3*sqrt(3)*S.ImaginaryUnit/2 + assert e.as_leading_term(x) == -sqrt(3)*I*x + + # https://github.com/sympy/sympy/issues/21245 + e = 1 - x - x**2 + d = (1 + sqrt(5))/2 + assert e.subs(x, y + 1/d).as_leading_term(y) == \ + (-40*y - 16*sqrt(5)*y)/(16 + 8*sqrt(5)) + + # https://github.com/sympy/sympy/issues/26991 + assert sinh(tanh(3/(100*x))).as_leading_term(x, cdir = 1) == sinh(1) + + +def test_leadterm2(): + assert (x*cos(1)*cos(1 + sin(1)) + sin(1 + sin(1))).leadterm(x) == \ + (sin(1 + sin(1)), 0) + + +def test_leadterm3(): + assert (y + z + x).leadterm(x) == (y + z, 0) + + +def test_as_leading_term2(): + assert (x*cos(1)*cos(1 + sin(1)) + sin(1 + sin(1))).as_leading_term(x) == \ + sin(1 + sin(1)) + + +def test_as_leading_term3(): + assert (2 + pi + x).as_leading_term(x) == 2 + pi + assert (2*x + pi*x + x**2).as_leading_term(x) == 2*x + pi*x + + +def test_as_leading_term4(): + # see issue 6843 + n = Symbol('n', integer=True, positive=True) + r = -n**3/(2*n**2 + 4*n + 2) - n**2/(n**2 + 2*n + 1) + \ + n**2/(n + 1) - n/(2*n**2 + 4*n + 2) + n/(n*x + x) + 2*n/(n + 1) - \ + 1 + 1/(n*x + x) + 1/(n + 1) - 1/x + assert r.as_leading_term(x).cancel() == n/2 + + +def test_as_leading_term_stub(): + class foo(Function): + pass + assert foo(1/x).as_leading_term(x) == foo(1/x) + assert foo(1).as_leading_term(x) == foo(1) + raises(NotImplementedError, lambda: foo(x).as_leading_term(x)) + + +def test_as_leading_term_deriv_integral(): + # related to issue 11313 + assert Derivative(x ** 3, x).as_leading_term(x) == 3*x**2 + assert Derivative(x ** 3, y).as_leading_term(x) == 0 + + assert Integral(x ** 3, x).as_leading_term(x) == x**4/4 + assert Integral(x ** 3, y).as_leading_term(x) == y*x**3 + + assert Derivative(exp(x), x).as_leading_term(x) == 1 + assert Derivative(log(x), x).as_leading_term(x) == (1/x).as_leading_term(x) + + +def test_atoms(): + assert x.atoms() == {x} + assert (1 + x).atoms() == {x, S.One} + + assert (1 + 2*cos(x)).atoms(Symbol) == {x} + assert (1 + 2*cos(x)).atoms(Symbol, Number) == {S.One, S(2), x} + + assert (2*(x**(y**x))).atoms() == {S(2), x, y} + + assert S.Half.atoms() == {S.Half} + assert S.Half.atoms(Symbol) == set() + + assert sin(oo).atoms(oo) == set() + + assert Poly(0, x).atoms() == {S.Zero, x} + assert Poly(1, x).atoms() == {S.One, x} + + assert Poly(x, x).atoms() == {x} + assert Poly(x, x, y).atoms() == {x, y} + assert Poly(x + y, x, y).atoms() == {x, y} + assert Poly(x + y, x, y, z).atoms() == {x, y, z} + assert Poly(x + y*t, x, y, z).atoms() == {t, x, y, z} + + assert (I*pi).atoms(NumberSymbol) == {pi} + assert (I*pi).atoms(NumberSymbol, I) == \ + (I*pi).atoms(I, NumberSymbol) == {pi, I} + + assert exp(exp(x)).atoms(exp) == {exp(exp(x)), exp(x)} + assert (1 + x*(2 + y) + exp(3 + z)).atoms(Add) == \ + {1 + x*(2 + y) + exp(3 + z), 2 + y, 3 + z} + + # issue 6132 + e = (f(x) + sin(x) + 2) + assert e.atoms(AppliedUndef) == \ + {f(x)} + assert e.atoms(AppliedUndef, Function) == \ + {f(x), sin(x)} + assert e.atoms(Function) == \ + {f(x), sin(x)} + assert e.atoms(AppliedUndef, Number) == \ + {f(x), S(2)} + assert e.atoms(Function, Number) == \ + {S(2), sin(x), f(x)} + + +def test_is_polynomial(): + k = Symbol('k', nonnegative=True, integer=True) + + assert Rational(2).is_polynomial(x, y, z) is True + assert (S.Pi).is_polynomial(x, y, z) is True + + assert x.is_polynomial(x) is True + assert x.is_polynomial(y) is True + + assert (x**2).is_polynomial(x) is True + assert (x**2).is_polynomial(y) is True + + assert (x**(-2)).is_polynomial(x) is False + assert (x**(-2)).is_polynomial(y) is True + + assert (2**x).is_polynomial(x) is False + assert (2**x).is_polynomial(y) is True + + assert (x**k).is_polynomial(x) is False + assert (x**k).is_polynomial(k) is False + assert (x**x).is_polynomial(x) is False + assert (k**k).is_polynomial(k) is False + assert (k**x).is_polynomial(k) is False + + assert (x**(-k)).is_polynomial(x) is False + assert ((2*x)**k).is_polynomial(x) is False + + assert (x**2 + 3*x - 8).is_polynomial(x) is True + assert (x**2 + 3*x - 8).is_polynomial(y) is True + + assert (x**2 + 3*x - 8).is_polynomial() is True + + assert sqrt(x).is_polynomial(x) is False + assert (sqrt(x)**3).is_polynomial(x) is False + + assert (x**2 + 3*x*sqrt(y) - 8).is_polynomial(x) is True + assert (x**2 + 3*x*sqrt(y) - 8).is_polynomial(y) is False + + assert ((x**2)*(y**2) + x*(y**2) + y*x + exp(2)).is_polynomial() is True + assert ((x**2)*(y**2) + x*(y**2) + y*x + exp(x)).is_polynomial() is False + + assert ( + (x**2)*(y**2) + x*(y**2) + y*x + exp(2)).is_polynomial(x, y) is True + assert ( + (x**2)*(y**2) + x*(y**2) + y*x + exp(x)).is_polynomial(x, y) is False + + assert (1/f(x) + 1).is_polynomial(f(x)) is False + + +def test_is_rational_function(): + assert Integer(1).is_rational_function() is True + assert Integer(1).is_rational_function(x) is True + + assert Rational(17, 54).is_rational_function() is True + assert Rational(17, 54).is_rational_function(x) is True + + assert (12/x).is_rational_function() is True + assert (12/x).is_rational_function(x) is True + + assert (x/y).is_rational_function() is True + assert (x/y).is_rational_function(x) is True + assert (x/y).is_rational_function(x, y) is True + + assert (x**2 + 1/x/y).is_rational_function() is True + assert (x**2 + 1/x/y).is_rational_function(x) is True + assert (x**2 + 1/x/y).is_rational_function(x, y) is True + + assert (sin(y)/x).is_rational_function() is False + assert (sin(y)/x).is_rational_function(y) is False + assert (sin(y)/x).is_rational_function(x) is True + assert (sin(y)/x).is_rational_function(x, y) is False + + for i in _illegal: + assert not i.is_rational_function() + for d in (1, x): + assert not (i/d).is_rational_function() + + +def test_is_meromorphic(): + f = a/x**2 + b + x + c*x**2 + assert f.is_meromorphic(x, 0) is True + assert f.is_meromorphic(x, 1) is True + assert f.is_meromorphic(x, zoo) is True + + g = 3 + 2*x**(log(3)/log(2) - 1) + assert g.is_meromorphic(x, 0) is False + assert g.is_meromorphic(x, 1) is True + assert g.is_meromorphic(x, zoo) is False + + n = Symbol('n', integer=True) + e = sin(1/x)**n*x + assert e.is_meromorphic(x, 0) is False + assert e.is_meromorphic(x, 1) is True + assert e.is_meromorphic(x, zoo) is False + + e = log(x)**pi + assert e.is_meromorphic(x, 0) is False + assert e.is_meromorphic(x, 1) is False + assert e.is_meromorphic(x, 2) is True + assert e.is_meromorphic(x, zoo) is False + + assert (log(x)**a).is_meromorphic(x, 0) is False + assert (log(x)**a).is_meromorphic(x, 1) is False + assert (a**log(x)).is_meromorphic(x, 0) is None + assert (3**log(x)).is_meromorphic(x, 0) is False + assert (3**log(x)).is_meromorphic(x, 1) is True + +def test_is_algebraic_expr(): + assert sqrt(3).is_algebraic_expr(x) is True + assert sqrt(3).is_algebraic_expr() is True + + eq = ((1 + x**2)/(1 - y**2))**(S.One/3) + assert eq.is_algebraic_expr(x) is True + assert eq.is_algebraic_expr(y) is True + + assert (sqrt(x) + y**(S(2)/3)).is_algebraic_expr(x) is True + assert (sqrt(x) + y**(S(2)/3)).is_algebraic_expr(y) is True + assert (sqrt(x) + y**(S(2)/3)).is_algebraic_expr() is True + + assert (cos(y)/sqrt(x)).is_algebraic_expr() is False + assert (cos(y)/sqrt(x)).is_algebraic_expr(x) is True + assert (cos(y)/sqrt(x)).is_algebraic_expr(y) is False + assert (cos(y)/sqrt(x)).is_algebraic_expr(x, y) is False + + +def test_SAGE1(): + #see https://github.com/sympy/sympy/issues/3346 + class MyInt: + def _sympy_(self): + return Integer(5) + m = MyInt() + e = Rational(2)*m + assert e == 10 + + raises(TypeError, lambda: Rational(2)*MyInt) + + +def test_SAGE2(): + class MyInt: + def __int__(self): + return 5 + assert sympify(MyInt()) == 5 + e = Rational(2)*MyInt() + assert e == 10 + + raises(TypeError, lambda: Rational(2)*MyInt) + + +def test_SAGE3(): + class MySymbol: + def __rmul__(self, other): + return ('mys', other, self) + + o = MySymbol() + e = x*o + + assert e == ('mys', x, o) + + +def test_len(): + e = x*y + assert len(e.args) == 2 + e = x + y + z + assert len(e.args) == 3 + + +def test_doit(): + a = Integral(x**2, x) + + assert isinstance(a.doit(), Integral) is False + + assert isinstance(a.doit(integrals=True), Integral) is False + assert isinstance(a.doit(integrals=False), Integral) is True + + assert (2*Integral(x, x)).doit() == x**2 + + +def test_attribute_error(): + raises(AttributeError, lambda: x.cos()) + raises(AttributeError, lambda: x.sin()) + raises(AttributeError, lambda: x.exp()) + + +def test_args(): + assert (x*y).args in ((x, y), (y, x)) + assert (x + y).args in ((x, y), (y, x)) + assert (x*y + 1).args in ((x*y, 1), (1, x*y)) + assert sin(x*y).args == (x*y,) + assert sin(x*y).args[0] == x*y + assert (x**y).args == (x, y) + assert (x**y).args[0] == x + assert (x**y).args[1] == y + + +def test_noncommutative_expand_issue_3757(): + A, B, C = symbols('A,B,C', commutative=False) + assert A*B - B*A != 0 + assert (A*(A + B)*B).expand() == A**2*B + A*B**2 + assert (A*(A + B + C)*B).expand() == A**2*B + A*B**2 + A*C*B + + +def test_as_numer_denom(): + a, b, c = symbols('a, b, c') + + assert nan.as_numer_denom() == (nan, 1) + assert oo.as_numer_denom() == (oo, 1) + assert (-oo).as_numer_denom() == (-oo, 1) + assert zoo.as_numer_denom() == (zoo, 1) + assert (-zoo).as_numer_denom() == (zoo, 1) + + assert x.as_numer_denom() == (x, 1) + assert (1/x).as_numer_denom() == (1, x) + assert (x/y).as_numer_denom() == (x, y) + assert (x/2).as_numer_denom() == (x, 2) + assert (x*y/z).as_numer_denom() == (x*y, z) + assert (x/(y*z)).as_numer_denom() == (x, y*z) + assert S.Half.as_numer_denom() == (1, 2) + assert (1/y**2).as_numer_denom() == (1, y**2) + assert (x/y**2).as_numer_denom() == (x, y**2) + assert ((x**2 + 1)/y).as_numer_denom() == (x**2 + 1, y) + assert (x*(y + 1)/y**7).as_numer_denom() == (x*(y + 1), y**7) + assert (x**-2).as_numer_denom() == (1, x**2) + assert (a/x + b/2/x + c/3/x).as_numer_denom() == \ + (6*a + 3*b + 2*c, 6*x) + assert (a/x + b/2/x + c/3/y).as_numer_denom() == \ + (2*c*x + y*(6*a + 3*b), 6*x*y) + assert (a/x + b/2/x + c/.5/x).as_numer_denom() == \ + (2*a + b + 4.0*c, 2*x) + # this should take no more than a few seconds + assert int(log(Add(*[Dummy()/i/x for i in range(1, 705)] + ).as_numer_denom()[1]/x).n(4)) == 705 + for i in [S.Infinity, S.NegativeInfinity, S.ComplexInfinity]: + assert (i + x/3).as_numer_denom() == \ + (x + i, 3) + assert (S.Infinity + x/3 + y/4).as_numer_denom() == \ + (4*x + 3*y + S.Infinity, 12) + assert (oo*x + zoo*y).as_numer_denom() == \ + (zoo*y + oo*x, 1) + + A, B, C = symbols('A,B,C', commutative=False) + + assert (A*B*C**-1).as_numer_denom() == (A*B*C**-1, 1) + assert (A*B*C**-1/x).as_numer_denom() == (A*B*C**-1, x) + assert (C**-1*A*B).as_numer_denom() == (C**-1*A*B, 1) + assert (C**-1*A*B/x).as_numer_denom() == (C**-1*A*B, x) + assert ((A*B*C)**-1).as_numer_denom() == ((A*B*C)**-1, 1) + assert ((A*B*C)**-1/x).as_numer_denom() == ((A*B*C)**-1, x) + + # the following morphs from Add to Mul during processing + assert Add(0, (x + y)/z/-2, evaluate=False).as_numer_denom( + ) == (-x - y, 2*z) + + +def test_trunc(): + import math + x, y = symbols('x y') + assert math.trunc(2) == 2 + assert math.trunc(4.57) == 4 + assert math.trunc(-5.79) == -5 + assert math.trunc(pi) == 3 + assert math.trunc(log(7)) == 1 + assert math.trunc(exp(5)) == 148 + assert math.trunc(cos(pi)) == -1 + assert math.trunc(sin(5)) == 0 + + raises(TypeError, lambda: math.trunc(x)) + raises(TypeError, lambda: math.trunc(x + y**2)) + raises(TypeError, lambda: math.trunc(oo)) + + +def test_as_independent(): + assert S.Zero.as_independent(x, as_Add=True) == (0, 0) + assert S.Zero.as_independent(x, as_Add=False) == (0, 0) + assert (2*x*sin(x) + y + x).as_independent(x) == (y, x + 2*x*sin(x)) + assert (2*x*sin(x) + y + x).as_independent(y) == (x + 2*x*sin(x), y) + + assert (2*x*sin(x) + y + x).as_independent(x, y) == (0, y + x + 2*x*sin(x)) + + assert (x*sin(x)*cos(y)).as_independent(x) == (cos(y), x*sin(x)) + assert (x*sin(x)*cos(y)).as_independent(y) == (x*sin(x), cos(y)) + + assert (x*sin(x)*cos(y)).as_independent(x, y) == (1, x*sin(x)*cos(y)) + + assert (sin(x)).as_independent(x) == (1, sin(x)) + assert (sin(x)).as_independent(y) == (sin(x), 1) + + assert (2*sin(x)).as_independent(x) == (2, sin(x)) + assert (2*sin(x)).as_independent(y) == (2*sin(x), 1) + + # issue 4903 = 1766b + n1, n2, n3 = symbols('n1 n2 n3', commutative=False) + assert (n1 + n1*n2).as_independent(n2) == (n1, n1*n2) + assert (n2*n1 + n1*n2).as_independent(n2) == (0, n1*n2 + n2*n1) + assert (n1*n2*n1).as_independent(n2) == (n1, n2*n1) + assert (n1*n2*n1).as_independent(n1) == (1, n1*n2*n1) + + assert (3*x).as_independent(x, as_Add=True) == (0, 3*x) + assert (3*x).as_independent(x, as_Add=False) == (3, x) + assert (3 + x).as_independent(x, as_Add=True) == (3, x) + assert (3 + x).as_independent(x, as_Add=False) == (1, 3 + x) + + # issue 5479 + assert (3*x).as_independent(Symbol) == (3, x) + + # issue 5648 + assert (n1*x*y).as_independent(x) == (n1*y, x) + assert ((x + n1)*(x - y)).as_independent(x) == (1, (x + n1)*(x - y)) + assert ((x + n1)*(x - y)).as_independent(y) == (x + n1, x - y) + assert (DiracDelta(x - n1)*DiracDelta(x - y)).as_independent(x) \ + == (1, DiracDelta(x - n1)*DiracDelta(x - y)) + assert (x*y*n1*n2*n3).as_independent(n2) == (x*y*n1, n2*n3) + assert (x*y*n1*n2*n3).as_independent(n1) == (x*y, n1*n2*n3) + assert (x*y*n1*n2*n3).as_independent(n3) == (x*y*n1*n2, n3) + assert (DiracDelta(x - n1)*DiracDelta(y - n1)*DiracDelta(x - n2)).as_independent(y) == \ + (DiracDelta(x - n1)*DiracDelta(x - n2), DiracDelta(y - n1)) + + # issue 5784 + assert (x + Integral(x, (x, 1, 2))).as_independent(x, strict=True) == \ + (Integral(x, (x, 1, 2)), x) + + eq = Add(x, -x, 2, -3, evaluate=False) + assert eq.as_independent(x) == (-1, Add(x, -x, evaluate=False)) + eq = Mul(x, 1/x, 2, -3, evaluate=False) + assert eq.as_independent(x) == (-6, Mul(x, 1/x, evaluate=False)) + + assert (x*y).as_independent(z, as_Add=True) == (x*y, 0) + +@XFAIL +def test_call_2(): + # TODO UndefinedFunction does not subclass Expr + assert (2*f)(x) == 2*f(x) + + +def test_replace(): + e = log(sin(x)) + tan(sin(x**2)) + + assert e.replace(sin, cos) == log(cos(x)) + tan(cos(x**2)) + assert e.replace( + sin, lambda a: sin(2*a)) == log(sin(2*x)) + tan(sin(2*x**2)) + + a = Wild('a') + b = Wild('b') + + assert e.replace(sin(a), cos(a)) == log(cos(x)) + tan(cos(x**2)) + assert e.replace( + sin(a), lambda a: sin(2*a)) == log(sin(2*x)) + tan(sin(2*x**2)) + # test exact + assert (2*x).replace(a*x + b, b - a, exact=True) == 2*x + assert (2*x).replace(a*x + b, b - a) == 2*x + assert (2*x).replace(a*x + b, b - a, exact=False) == 2/x + assert (2*x).replace(a*x + b, lambda a, b: b - a, exact=True) == 2*x + assert (2*x).replace(a*x + b, lambda a, b: b - a) == 2*x + assert (2*x).replace(a*x + b, lambda a, b: b - a, exact=False) == 2/x + + g = 2*sin(x**3) + + assert g.replace( + lambda expr: expr.is_Number, lambda expr: expr**2) == 4*sin(x**9) + + assert cos(x).replace(cos, sin, map=True) == (sin(x), {cos(x): sin(x)}) + assert sin(x).replace(cos, sin) == sin(x) + + cond, func = lambda x: x.is_Mul, lambda x: 2*x + assert (x*y).replace(cond, func, map=True) == (2*x*y, {x*y: 2*x*y}) + assert (x*(1 + x*y)).replace(cond, func, map=True) == \ + (2*x*(2*x*y + 1), {x*(2*x*y + 1): 2*x*(2*x*y + 1), x*y: 2*x*y}) + assert (y*sin(x)).replace(sin, lambda expr: sin(expr)/y, map=True) == \ + (sin(x), {sin(x): sin(x)/y}) + # if not simultaneous then y*sin(x) -> y*sin(x)/y = sin(x) -> sin(x)/y + assert (y*sin(x)).replace(sin, lambda expr: sin(expr)/y, + simultaneous=False) == sin(x)/y + assert (x**2 + O(x**3)).replace(Pow, lambda b, e: b**e/e + ) == x**2/2 + O(x**3) + assert (x**2 + O(x**3)).replace(Pow, lambda b, e: b**e/e, + simultaneous=False) == x**2/2 + O(x**3) + assert (x*(x*y + 3)).replace(lambda x: x.is_Mul, lambda x: 2 + x) == \ + x*(x*y + 5) + 2 + e = (x*y + 1)*(2*x*y + 1) + 1 + assert e.replace(cond, func, map=True) == ( + 2*((2*x*y + 1)*(4*x*y + 1)) + 1, + {2*x*y: 4*x*y, x*y: 2*x*y, (2*x*y + 1)*(4*x*y + 1): + 2*((2*x*y + 1)*(4*x*y + 1))}) + assert x.replace(x, y) == y + assert (x + 1).replace(1, 2) == x + 2 + + # https://groups.google.com/forum/#!topic/sympy/8wCgeC95tz0 + n1, n2, n3 = symbols('n1:4', commutative=False) + assert (n1*f(n2)).replace(f, lambda x: x) == n1*n2 + assert (n3*f(n2)).replace(f, lambda x: x) == n3*n2 + + # issue 16725 + assert S.Zero.replace(Wild('x'), 1) == 1 + # let the user override the default decision of False + assert S.Zero.replace(Wild('x'), 1, exact=True) == 0 + + +def test_replace_integral(): + # https://github.com/sympy/sympy/issues/27142 + q, p, s, t = symbols('q p s t', cls=Wild) + a, b, c, d = symbols('a b c d') + i = Integral(a + b, (b, c, d)) + pattern = Integral(q, (p, s, t)) + assert i.replace(pattern, q) == a + b + + +def test_find(): + expr = (x + y + 2 + sin(3*x)) + + assert expr.find(lambda u: u.is_Integer) == {S(2), S(3)} + assert expr.find(lambda u: u.is_Symbol) == {x, y} + + assert expr.find(lambda u: u.is_Integer, group=True) == {S(2): 1, S(3): 1} + assert expr.find(lambda u: u.is_Symbol, group=True) == {x: 2, y: 1} + + assert expr.find(Integer) == {S(2), S(3)} + assert expr.find(Symbol) == {x, y} + + assert expr.find(Integer, group=True) == {S(2): 1, S(3): 1} + assert expr.find(Symbol, group=True) == {x: 2, y: 1} + + a = Wild('a') + + expr = sin(sin(x)) + sin(x) + cos(x) + x + + assert expr.find(lambda u: type(u) is sin) == {sin(x), sin(sin(x))} + assert expr.find( + lambda u: type(u) is sin, group=True) == {sin(x): 2, sin(sin(x)): 1} + + assert expr.find(sin(a)) == {sin(x), sin(sin(x))} + assert expr.find(sin(a), group=True) == {sin(x): 2, sin(sin(x)): 1} + + assert expr.find(sin) == {sin(x), sin(sin(x))} + assert expr.find(sin, group=True) == {sin(x): 2, sin(sin(x)): 1} + + +def test_count(): + expr = (x + y + 2 + sin(3*x)) + + assert expr.count(lambda u: u.is_Integer) == 2 + assert expr.count(lambda u: u.is_Symbol) == 3 + + assert expr.count(Integer) == 2 + assert expr.count(Symbol) == 3 + assert expr.count(2) == 1 + + a = Wild('a') + + assert expr.count(sin) == 1 + assert expr.count(sin(a)) == 1 + assert expr.count(lambda u: type(u) is sin) == 1 + + assert f(x).count(f(x)) == 1 + assert f(x).diff(x).count(f(x)) == 1 + assert f(x).diff(x).count(x) == 2 + + +def test_has_basics(): + p = Wild('p') + + assert sin(x).has(x) + assert sin(x).has(sin) + assert not sin(x).has(y) + assert not sin(x).has(cos) + assert f(x).has(x) + assert f(x).has(f) + assert not f(x).has(y) + assert not f(x).has(g) + + assert f(x).diff(x).has(x) + assert f(x).diff(x).has(f) + assert f(x).diff(x).has(Derivative) + assert not f(x).diff(x).has(y) + assert not f(x).diff(x).has(g) + assert not f(x).diff(x).has(sin) + + assert (x**2).has(Symbol) + assert not (x**2).has(Wild) + assert (2*p).has(Wild) + + assert not x.has() + + # see issue at https://github.com/sympy/sympy/issues/5190 + assert not S(1).has(Wild) + assert not x.has(Wild) + + +def test_has_multiple(): + f = x**2*y + sin(2**t + log(z)) + + assert f.has(x) + assert f.has(y) + assert f.has(z) + assert f.has(t) + + assert not f.has(u) + + assert f.has(x, y, z, t) + assert f.has(x, y, z, t, u) + + i = Integer(4400) + + assert not i.has(x) + + assert (i*x**i).has(x) + assert not (i*y**i).has(x) + assert (i*y**i).has(x, y) + assert not (i*y**i).has(x, z) + + +def test_has_piecewise(): + f = (x*y + 3/y)**(3 + 2) + p = Piecewise((g(x), x < -1), (1, x <= 1), (f, True)) + + assert p.has(x) + assert p.has(y) + assert not p.has(z) + assert p.has(1) + assert p.has(3) + assert not p.has(4) + assert p.has(f) + assert p.has(g) + assert not p.has(h) + + +def test_has_iterative(): + A, B, C = symbols('A,B,C', commutative=False) + f = x*gamma(x)*sin(x)*exp(x*y)*A*B*C*cos(x*A*B) + + assert f.has(x) + assert f.has(x*y) + assert f.has(x*sin(x)) + assert not f.has(x*sin(y)) + assert f.has(x*A) + assert f.has(x*A*B) + assert not f.has(x*A*C) + assert f.has(x*A*B*C) + assert not f.has(x*A*C*B) + assert f.has(x*sin(x)*A*B*C) + assert not f.has(x*sin(x)*A*C*B) + assert not f.has(x*sin(y)*A*B*C) + assert f.has(x*gamma(x)) + assert not f.has(x + sin(x)) + + assert (x & y & z).has(x & z) + + +def test_has_integrals(): + f = Integral(x**2 + sin(x*y*z), (x, 0, x + y + z)) + + assert f.has(x + y) + assert f.has(x + z) + assert f.has(y + z) + + assert f.has(x*y) + assert f.has(x*z) + assert f.has(y*z) + + assert not f.has(2*x + y) + assert not f.has(2*x*y) + + +def test_has_tuple(): + assert Tuple(x, y).has(x) + assert not Tuple(x, y).has(z) + assert Tuple(f(x), g(x)).has(x) + assert not Tuple(f(x), g(x)).has(y) + assert Tuple(f(x), g(x)).has(f) + assert Tuple(f(x), g(x)).has(f(x)) + # XXX to be deprecated + #assert not Tuple(f, g).has(x) + #assert Tuple(f, g).has(f) + #assert not Tuple(f, g).has(h) + assert Tuple(True).has(True) + assert Tuple(True).has(S.true) + assert not Tuple(True).has(1) + + +def test_has_units(): + from sympy.physics.units import m, s + + assert (x*m/s).has(x) + assert (x*m/s).has(y, z) is False + + +def test_has_polys(): + poly = Poly(x**2 + x*y*sin(z), x, y, t) + + assert poly.has(x) + assert poly.has(x, y, z) + assert poly.has(x, y, z, t) + + +def test_has_physics(): + assert FockState((x, y)).has(x) + + +def test_as_poly_as_expr(): + f = x**2 + 2*x*y + + assert f.as_poly().as_expr() == f + assert f.as_poly(x, y).as_expr() == f + + assert (f + sin(x)).as_poly(x, y) is None + + p = Poly(f, x, y) + + assert p.as_poly() == p + + # https://github.com/sympy/sympy/issues/20610 + assert S(2).as_poly() is None + assert sqrt(2).as_poly(extension=True) is None + + raises(AttributeError, lambda: Tuple(x, x).as_poly(x)) + raises(AttributeError, lambda: Tuple(x ** 2, x, y).as_poly(x)) + + +def test_nonzero(): + assert bool(S.Zero) is False + assert bool(S.One) is True + assert bool(x) is True + assert bool(x + y) is True + assert bool(x - x) is False + assert bool(x*y) is True + assert bool(x*1) is True + assert bool(x*0) is False + + +def test_is_number(): + assert Float(3.14).is_number is True + assert Integer(737).is_number is True + assert Rational(3, 2).is_number is True + assert Rational(8).is_number is True + assert x.is_number is False + assert (2*x).is_number is False + assert (x + y).is_number is False + assert log(2).is_number is True + assert log(x).is_number is False + assert (2 + log(2)).is_number is True + assert (8 + log(2)).is_number is True + assert (2 + log(x)).is_number is False + assert (8 + log(2) + x).is_number is False + assert (1 + x**2/x - x).is_number is True + assert Tuple(Integer(1)).is_number is False + assert Add(2, x).is_number is False + assert Mul(3, 4).is_number is True + assert Pow(log(2), 2).is_number is True + assert oo.is_number is True + g = WildFunction('g') + assert g.is_number is False + assert (2*g).is_number is False + assert (x**2).subs(x, 3).is_number is True + + # test extensibility of .is_number + # on subinstances of Basic + class A(Basic): + pass + a = A() + assert a.is_number is False + + +def test_as_coeff_add(): + assert S(2).as_coeff_add() == (2, ()) + assert S(3.0).as_coeff_add() == (0, (S(3.0),)) + assert S(-3.0).as_coeff_add() == (0, (S(-3.0),)) + assert x.as_coeff_add() == (0, (x,)) + assert (x - 1).as_coeff_add() == (-1, (x,)) + assert (x + 1).as_coeff_add() == (1, (x,)) + assert (x + 2).as_coeff_add() == (2, (x,)) + assert (x + y).as_coeff_add(y) == (x, (y,)) + assert (3*x).as_coeff_add(y) == (3*x, ()) + # don't do expansion + e = (x + y)**2 + assert e.as_coeff_add(y) == (0, (e,)) + + +def test_as_coeff_mul(): + assert S(2).as_coeff_mul() == (2, ()) + assert S(3.0).as_coeff_mul() == (1, (S(3.0),)) + assert S(-3.0).as_coeff_mul() == (-1, (S(3.0),)) + assert S(-3.0).as_coeff_mul(rational=False) == (-S(3.0), ()) + assert x.as_coeff_mul() == (1, (x,)) + assert (-x).as_coeff_mul() == (-1, (x,)) + assert (2*x).as_coeff_mul() == (2, (x,)) + assert (x*y).as_coeff_mul(y) == (x, (y,)) + assert (3 + x).as_coeff_mul() == (1, (3 + x,)) + assert (3 + x).as_coeff_mul(y) == (3 + x, ()) + # don't do expansion + e = exp(x + y) + assert e.as_coeff_mul(y) == (1, (e,)) + e = 2**(x + y) + assert e.as_coeff_mul(y) == (1, (e,)) + assert (1.1*x).as_coeff_mul(rational=False) == (1.1, (x,)) + assert (1.1*x).as_coeff_mul() == (1, (1.1, x)) + assert (-oo*x).as_coeff_mul(rational=True) == (-1, (oo, x)) + + +def test_as_coeff_exponent(): + assert (3*x**4).as_coeff_exponent(x) == (3, 4) + assert (2*x**3).as_coeff_exponent(x) == (2, 3) + assert (4*x**2).as_coeff_exponent(x) == (4, 2) + assert (6*x**1).as_coeff_exponent(x) == (6, 1) + assert (3*x**0).as_coeff_exponent(x) == (3, 0) + assert (2*x**0).as_coeff_exponent(x) == (2, 0) + assert (1*x**0).as_coeff_exponent(x) == (1, 0) + assert (0*x**0).as_coeff_exponent(x) == (0, 0) + assert (-1*x**0).as_coeff_exponent(x) == (-1, 0) + assert (-2*x**0).as_coeff_exponent(x) == (-2, 0) + assert (2*x**3 + pi*x**3).as_coeff_exponent(x) == (2 + pi, 3) + assert (x*log(2)/(2*x + pi*x)).as_coeff_exponent(x) == \ + (log(2)/(2 + pi), 0) + # issue 4784 + D = Derivative + fx = D(f(x), x) + assert fx.as_coeff_exponent(f(x)) == (fx, 0) + + +def test_extractions(): + for base in (2, S.Exp1): + assert Pow(base**x, 3, evaluate=False + ).extract_multiplicatively(base**x) == base**(2*x) + assert (base**(5*x)).extract_multiplicatively( + base**(3*x)) == base**(2*x) + assert ((x*y)**3).extract_multiplicatively(x**2 * y) == x*y**2 + assert ((x*y)**3).extract_multiplicatively(x**4 * y) is None + assert (2*x).extract_multiplicatively(2) == x + assert (2*x).extract_multiplicatively(3) is None + assert (2*x).extract_multiplicatively(-1) is None + assert (S.Half*x).extract_multiplicatively(3) == x/6 + assert (sqrt(x)).extract_multiplicatively(x) is None + assert (sqrt(x)).extract_multiplicatively(1/x) is None + assert x.extract_multiplicatively(-x) is None + assert (-2 - 4*I).extract_multiplicatively(-2) == 1 + 2*I + assert (-2 - 4*I).extract_multiplicatively(3) is None + assert (-2*x - 4*y - 8).extract_multiplicatively(-2) == x + 2*y + 4 + assert (-2*x*y - 4*x**2*y).extract_multiplicatively(-2*y) == 2*x**2 + x + assert (2*x*y + 4*x**2*y).extract_multiplicatively(2*y) == 2*x**2 + x + assert (-4*y**2*x).extract_multiplicatively(-3*y) is None + assert (2*x).extract_multiplicatively(1) == 2*x + assert (-oo).extract_multiplicatively(5) is -oo + assert (oo).extract_multiplicatively(5) is oo + + assert ((x*y)**3).extract_additively(1) is None + assert (x + 1).extract_additively(x) == 1 + assert (x + 1).extract_additively(2*x) is None + assert (x + 1).extract_additively(-x) is None + assert (-x + 1).extract_additively(2*x) is None + assert (2*x + 3).extract_additively(x) == x + 3 + assert (2*x + 3).extract_additively(2) == 2*x + 1 + assert (2*x + 3).extract_additively(3) == 2*x + assert (2*x + 3).extract_additively(-2) is None + assert (2*x + 3).extract_additively(3*x) is None + assert (2*x + 3).extract_additively(2*x) == 3 + assert x.extract_additively(0) == x + assert S(2).extract_additively(x) is None + assert S(2.).extract_additively(2.) is S.Zero + assert S(2.).extract_additively(2) is S.Zero + assert S(2*x + 3).extract_additively(x + 1) == x + 2 + assert S(2*x + 3).extract_additively(y + 1) is None + assert S(2*x - 3).extract_additively(x + 1) is None + assert S(2*x - 3).extract_additively(y + z) is None + assert ((a + 1)*x*4 + y).extract_additively(x).expand() == \ + 4*a*x + 3*x + y + assert ((a + 1)*x*4 + 3*y).extract_additively(x + 2*y).expand() == \ + 4*a*x + 3*x + y + assert (y*(x + 1)).extract_additively(x + 1) is None + assert ((y + 1)*(x + 1) + 3).extract_additively(x + 1) == \ + y*(x + 1) + 3 + assert ((x + y)*(x + 1) + x + y + 3).extract_additively(x + y) == \ + x*(x + y) + 3 + assert (x + y + 2*((x + y)*(x + 1)) + 3).extract_additively((x + y)*(x + 1)) == \ + x + y + (x + 1)*(x + y) + 3 + assert ((y + 1)*(x + 2*y + 1) + 3).extract_additively(y + 1) == \ + (x + 2*y)*(y + 1) + 3 + assert (-x - x*I).extract_additively(-x) == -I*x + # extraction does not leave artificats, now + assert (4*x*(y + 1) + y).extract_additively(x) == x*(4*y + 3) + y + + n = Symbol("n", integer=True) + assert (Integer(-3)).could_extract_minus_sign() is True + assert (-n*x + x).could_extract_minus_sign() != \ + (n*x - x).could_extract_minus_sign() + assert (x - y).could_extract_minus_sign() != \ + (-x + y).could_extract_minus_sign() + assert (1 - x - y).could_extract_minus_sign() is True + assert (1 - x + y).could_extract_minus_sign() is False + assert ((-x - x*y)/y).could_extract_minus_sign() is False + assert ((x + x*y)/(-y)).could_extract_minus_sign() is True + assert ((x + x*y)/y).could_extract_minus_sign() is False + assert ((-x - y)/(x + y)).could_extract_minus_sign() is False + + class sign_invariant(Function, Expr): + nargs = 1 + def __neg__(self): + return self + foo = sign_invariant(x) + assert foo == -foo + assert foo.could_extract_minus_sign() is False + assert (x - y).could_extract_minus_sign() is False + assert (-x + y).could_extract_minus_sign() is True + assert (x - 1).could_extract_minus_sign() is False + assert (1 - x).could_extract_minus_sign() is True + assert (sqrt(2) - 1).could_extract_minus_sign() is True + assert (1 - sqrt(2)).could_extract_minus_sign() is False + # check that result is canonical + eq = (3*x + 15*y).extract_multiplicatively(3) + assert eq.args == eq.func(*eq.args).args + + +def test_nan_extractions(): + for r in (1, 0, I, nan): + assert nan.extract_additively(r) is None + assert nan.extract_multiplicatively(r) is None + + +def test_coeff(): + assert (x + 1).coeff(x + 1) == 1 + assert (3*x).coeff(0) == 0 + assert (z*(1 + x)*x**2).coeff(1 + x) == z*x**2 + assert (1 + 2*x*x**(1 + x)).coeff(x*x**(1 + x)) == 2 + assert (1 + 2*x**(y + z)).coeff(x**(y + z)) == 2 + assert (3 + 2*x + 4*x**2).coeff(1) == 0 + assert (3 + 2*x + 4*x**2).coeff(-1) == 0 + assert (3 + 2*x + 4*x**2).coeff(x) == 2 + assert (3 + 2*x + 4*x**2).coeff(x**2) == 4 + assert (3 + 2*x + 4*x**2).coeff(x**3) == 0 + + assert (-x/8 + x*y).coeff(x) == Rational(-1, 8) + y + assert (-x/8 + x*y).coeff(-x) == S.One/8 + assert (4*x).coeff(2*x) == 0 + assert (2*x).coeff(2*x) == 1 + assert (-oo*x).coeff(x*oo) == -1 + assert (10*x).coeff(x, 0) == 0 + assert (10*x).coeff(10*x, 0) == 0 + + n1, n2 = symbols('n1 n2', commutative=False) + assert (n1*n2).coeff(n1) == 1 + assert (n1*n2).coeff(n2) == n1 + assert (n1*n2 + x*n1).coeff(n1) == 1 # 1*n1*(n2+x) + assert (n2*n1 + x*n1).coeff(n1) == n2 + x + assert (n2*n1 + x*n1**2).coeff(n1) == n2 + assert (n1**x).coeff(n1) == 0 + assert (n1*n2 + n2*n1).coeff(n1) == 0 + assert (2*(n1 + n2)*n2).coeff(n1 + n2, right=1) == n2 + assert (2*(n1 + n2)*n2).coeff(n1 + n2, right=0) == 2 + + assert (2*f(x) + 3*f(x).diff(x)).coeff(f(x)) == 2 + + expr = z*(x + y)**2 + expr2 = z*(x + y)**2 + z*(2*x + 2*y)**2 + assert expr.coeff(z) == (x + y)**2 + assert expr.coeff(x + y) == 0 + assert expr2.coeff(z) == (x + y)**2 + (2*x + 2*y)**2 + + assert (x + y + 3*z).coeff(1) == x + y + assert (-x + 2*y).coeff(-1) == x + assert (x - 2*y).coeff(-1) == 2*y + assert (3 + 2*x + 4*x**2).coeff(1) == 0 + assert (-x - 2*y).coeff(2) == -y + assert (x + sqrt(2)*x).coeff(sqrt(2)) == x + assert (3 + 2*x + 4*x**2).coeff(x) == 2 + assert (3 + 2*x + 4*x**2).coeff(x**2) == 4 + assert (3 + 2*x + 4*x**2).coeff(x**3) == 0 + assert (z*(x + y)**2).coeff((x + y)**2) == z + assert (z*(x + y)**2).coeff(x + y) == 0 + assert (2 + 2*x + (x + 1)*y).coeff(x + 1) == y + + assert (x + 2*y + 3).coeff(1) == x + assert (x + 2*y + 3).coeff(x, 0) == 2*y + 3 + assert (x**2 + 2*y + 3*x).coeff(x**2, 0) == 2*y + 3*x + assert x.coeff(0, 0) == 0 + assert x.coeff(x, 0) == 0 + + n, m, o, l = symbols('n m o l', commutative=False) + assert n.coeff(n) == 1 + assert y.coeff(n) == 0 + assert (3*n).coeff(n) == 3 + assert (2 + n).coeff(x*m) == 0 + assert (2*x*n*m).coeff(x) == 2*n*m + assert (2 + n).coeff(x*m*n + y) == 0 + assert (2*x*n*m).coeff(3*n) == 0 + assert (n*m + m*n*m).coeff(n) == 1 + m + assert (n*m + m*n*m).coeff(n, right=True) == m # = (1 + m)*n*m + assert (n*m + m*n).coeff(n) == 0 + assert (n*m + o*m*n).coeff(m*n) == o + assert (n*m + o*m*n).coeff(m*n, right=True) == 1 + assert (n*m + n*m*n).coeff(n*m, right=True) == 1 + n # = n*m*(n + 1) + + assert (x*y).coeff(z, 0) == x*y + + assert (x*n + y*n + z*m).coeff(n) == x + y + assert (n*m + n*o + o*l).coeff(n, right=True) == m + o + assert (x*n*m*n + y*n*m*o + z*l).coeff(m, right=True) == x*n + y*o + assert (x*n*m*n + x*n*m*o + z*l).coeff(m, right=True) == n + o + assert (x*n*m*n + x*n*m*o + z*l).coeff(m) == x*n + + +def test_coeff2(): + r, kappa = symbols('r, kappa') + psi = Function("psi") + g = 1/r**2 * (2*r*psi(r).diff(r, 1) + r**2 * psi(r).diff(r, 2)) + g = g.expand() + assert g.coeff(psi(r).diff(r)) == 2/r + + +def test_coeff2_0(): + r, kappa = symbols('r, kappa') + psi = Function("psi") + g = 1/r**2 * (2*r*psi(r).diff(r, 1) + r**2 * psi(r).diff(r, 2)) + g = g.expand() + + assert g.coeff(psi(r).diff(r, 2)) == 1 + + +def test_coeff_expand(): + expr = z*(x + y)**2 + expr2 = z*(x + y)**2 + z*(2*x + 2*y)**2 + assert expr.coeff(z) == (x + y)**2 + assert expr2.coeff(z) == (x + y)**2 + (2*x + 2*y)**2 + + +def test_integrate(): + assert x.integrate(x) == x**2/2 + assert x.integrate((x, 0, 1)) == S.Half + + +def test_as_base_exp(): + assert x.as_base_exp() == (x, S.One) + assert (x*y*z).as_base_exp() == (x*y*z, S.One) + assert (x + y + z).as_base_exp() == (x + y + z, S.One) + assert ((x + y)**z).as_base_exp() == (x + y, z) + assert (x**2*y**2).as_base_exp() == (x*y, 2) + assert (x**z*y**z).as_base_exp() == (x**z*y**z, S.One) + + +def test_issue_4963(): + assert hasattr(Mul(x, y), "is_commutative") + assert hasattr(Mul(x, y, evaluate=False), "is_commutative") + assert hasattr(Pow(x, y), "is_commutative") + assert hasattr(Pow(x, y, evaluate=False), "is_commutative") + expr = Mul(Pow(2, 2, evaluate=False), 3, evaluate=False) + 1 + assert hasattr(expr, "is_commutative") + + +def test_action_verbs(): + assert nsimplify(1/(exp(3*pi*x/5) + 1)) == \ + (1/(exp(3*pi*x/5) + 1)).nsimplify() + assert ratsimp(1/x + 1/y) == (1/x + 1/y).ratsimp() + assert trigsimp(log(x), deep=True) == (log(x)).trigsimp(deep=True) + assert radsimp(1/(2 + sqrt(2))) == (1/(2 + sqrt(2))).radsimp() + assert radsimp(1/(a + b*sqrt(c)), symbolic=False) == \ + (1/(a + b*sqrt(c))).radsimp(symbolic=False) + assert powsimp(x**y*x**z*y**z, combine='all') == \ + (x**y*x**z*y**z).powsimp(combine='all') + assert (x**t*y**t).powsimp(force=True) == (x*y)**t + assert simplify(x**y*x**z*y**z) == (x**y*x**z*y**z).simplify() + assert together(1/x + 1/y) == (1/x + 1/y).together() + assert collect(a*x**2 + b*x**2 + a*x - b*x + c, x) == \ + (a*x**2 + b*x**2 + a*x - b*x + c).collect(x) + assert apart(y/(y + 2)/(y + 1), y) == (y/(y + 2)/(y + 1)).apart(y) + assert combsimp(y/(x + 2)/(x + 1)) == (y/(x + 2)/(x + 1)).combsimp() + assert gammasimp(gamma(x)/gamma(x-5)) == (gamma(x)/gamma(x-5)).gammasimp() + assert factor(x**2 + 5*x + 6) == (x**2 + 5*x + 6).factor() + assert refine(sqrt(x**2)) == sqrt(x**2).refine() + assert cancel((x**2 + 5*x + 6)/(x + 2)) == ((x**2 + 5*x + 6)/(x + 2)).cancel() + + +def test_as_powers_dict(): + assert x.as_powers_dict() == {x: 1} + assert (x**y*z).as_powers_dict() == {x: y, z: 1} + assert Mul(2, 2, evaluate=False).as_powers_dict() == {S(2): S(2)} + assert (x*y).as_powers_dict()[z] == 0 + assert (x + y).as_powers_dict()[z] == 0 + + +def test_as_coefficients_dict(): + check = [S.One, x, y, x*y, 1] + assert [Add(3*x, 2*x, y, 3).as_coefficients_dict()[i] for i in check] == \ + [3, 5, 1, 0, 3] + assert [Add(3*x, 2*x, y, 3, evaluate=False).as_coefficients_dict()[i] + for i in check] == [3, 5, 1, 0, 3] + assert [(3*x*y).as_coefficients_dict()[i] for i in check] == \ + [0, 0, 0, 3, 0] + assert [(3.0*x*y).as_coefficients_dict()[i] for i in check] == \ + [0, 0, 0, 3.0, 0] + assert (3.0*x*y).as_coefficients_dict()[3.0*x*y] == 0 + eq = x*(x + 1)*a + x*b + c/x + assert eq.as_coefficients_dict(x) == {x: b, 1/x: c, + x*(x + 1): a} + assert eq.expand().as_coefficients_dict(x) == {x**2: a, x: a + b, 1/x: c} + assert x.as_coefficients_dict() == {x: S.One} + + +def test_args_cnc(): + A = symbols('A', commutative=False) + assert (x + A).args_cnc() == \ + [[], [x + A]] + assert (x + a).args_cnc() == \ + [[a + x], []] + assert (x*a).args_cnc() == \ + [[a, x], []] + assert (x*y*A*(A + 1)).args_cnc(cset=True) == \ + [{x, y}, [A, 1 + A]] + assert Mul(x, x, evaluate=False).args_cnc(cset=True, warn=False) == \ + [{x}, []] + assert Mul(x, x**2, evaluate=False).args_cnc(cset=True, warn=False) == \ + [{x, x**2}, []] + raises(ValueError, lambda: Mul(x, x, evaluate=False).args_cnc(cset=True)) + assert Mul(x, y, x, evaluate=False).args_cnc() == \ + [[x, y, x], []] + # always split -1 from leading number + assert (-1.*x).args_cnc() == [[-1, 1.0, x], []] + + +def test_new_rawargs(): + n = Symbol('n', commutative=False) + a = x + n + assert a.is_commutative is False + assert a._new_rawargs(x).is_commutative + assert a._new_rawargs(x, y).is_commutative + assert a._new_rawargs(x, n).is_commutative is False + assert a._new_rawargs(x, y, n).is_commutative is False + m = x*n + assert m.is_commutative is False + assert m._new_rawargs(x).is_commutative + assert m._new_rawargs(n).is_commutative is False + assert m._new_rawargs(x, y).is_commutative + assert m._new_rawargs(x, n).is_commutative is False + assert m._new_rawargs(x, y, n).is_commutative is False + + assert m._new_rawargs(x, n, reeval=False).is_commutative is False + assert m._new_rawargs(S.One) is S.One + + +def test_issue_5226(): + assert Add(evaluate=False) == 0 + assert Mul(evaluate=False) == 1 + assert Mul(x + y, evaluate=False).is_Add + + +def test_free_symbols(): + # free_symbols should return the free symbols of an object + assert S.One.free_symbols == set() + assert x.free_symbols == {x} + assert Integral(x, (x, 1, y)).free_symbols == {y} + assert (-Integral(x, (x, 1, y))).free_symbols == {y} + assert meter.free_symbols == set() + assert (meter**x).free_symbols == {x} + + +def test_has_free(): + assert x.has_free(x) + assert not x.has_free(y) + assert (x + y).has_free(x) + assert (x + y).has_free(*(x, z)) + assert f(x).has_free(x) + assert f(x).has_free(f(x)) + assert Integral(f(x), (f(x), 1, y)).has_free(y) + assert not Integral(f(x), (f(x), 1, y)).has_free(x) + assert not Integral(f(x), (f(x), 1, y)).has_free(f(x)) + # simple extraction + assert (x + 1 + y).has_free(x + 1) + assert not (x + 2 + y).has_free(x + 1) + assert (2 + 3*x*y).has_free(3*x) + raises(TypeError, lambda: x.has_free({x, y})) + s = FiniteSet(1, 2) + assert Piecewise((s, x > 3), (4, True)).has_free(s) + assert not Piecewise((1, x > 3), (4, True)).has_free(s) + # can't make set of these, but fallback will handle + raises(TypeError, lambda: x.has_free(y, [])) + + +def test_has_xfree(): + assert (x + 1).has_xfree({x}) + assert ((x + 1)**2).has_xfree({x + 1}) + assert not (x + y + 1).has_xfree({x + 1}) + raises(TypeError, lambda: x.has_xfree(x)) + raises(TypeError, lambda: x.has_xfree([x])) + + +def test_issue_5300(): + x = Symbol('x', commutative=False) + assert x*sqrt(2)/sqrt(6) == x*sqrt(3)/3 + + +def test_floordiv(): + from sympy.functions.elementary.integers import floor + assert x // y == floor(x / y) + + +def test_as_coeff_Mul(): + assert Integer(3).as_coeff_Mul() == (Integer(3), Integer(1)) + assert Rational(3, 4).as_coeff_Mul() == (Rational(3, 4), Integer(1)) + assert Float(5.0).as_coeff_Mul() == (Float(5.0), Integer(1)) + assert Float(0.0).as_coeff_Mul() == (Float(0.0), Integer(1)) + + assert (Integer(3)*x).as_coeff_Mul() == (Integer(3), x) + assert (Rational(3, 4)*x).as_coeff_Mul() == (Rational(3, 4), x) + assert (Float(5.0)*x).as_coeff_Mul() == (Float(5.0), x) + + assert (Integer(3)*x*y).as_coeff_Mul() == (Integer(3), x*y) + assert (Rational(3, 4)*x*y).as_coeff_Mul() == (Rational(3, 4), x*y) + assert (Float(5.0)*x*y).as_coeff_Mul() == (Float(5.0), x*y) + + assert (x).as_coeff_Mul() == (S.One, x) + assert (x*y).as_coeff_Mul() == (S.One, x*y) + assert (-oo*x).as_coeff_Mul(rational=True) == (-1, oo*x) + + +def test_as_coeff_Add(): + assert Integer(3).as_coeff_Add() == (Integer(3), Integer(0)) + assert Rational(3, 4).as_coeff_Add() == (Rational(3, 4), Integer(0)) + assert Float(5.0).as_coeff_Add() == (Float(5.0), Integer(0)) + + assert (Integer(3) + x).as_coeff_Add() == (Integer(3), x) + assert (Rational(3, 4) + x).as_coeff_Add() == (Rational(3, 4), x) + assert (Float(5.0) + x).as_coeff_Add() == (Float(5.0), x) + assert (Float(5.0) + x).as_coeff_Add(rational=True) == (0, Float(5.0) + x) + + assert (Integer(3) + x + y).as_coeff_Add() == (Integer(3), x + y) + assert (Rational(3, 4) + x + y).as_coeff_Add() == (Rational(3, 4), x + y) + assert (Float(5.0) + x + y).as_coeff_Add() == (Float(5.0), x + y) + + assert (x).as_coeff_Add() == (S.Zero, x) + assert (x*y).as_coeff_Add() == (S.Zero, x*y) + + +def test_expr_sorting(): + + exprs = [1/x**2, 1/x, sqrt(sqrt(x)), sqrt(x), x, sqrt(x)**3, x**2] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [x, 2*x, 2*x**2, 2*x**3, x**n, 2*x**n, sin(x), sin(x)**n, + sin(x**2), cos(x), cos(x**2), tan(x)] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [x + 1, x**2 + x + 1, x**3 + x**2 + x + 1] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [S(4), x - 3*I/2, x + 3*I/2, x - 4*I + 1, x + 4*I + 1] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [f(1), f(2), f(3), f(1, 2, 3), g(1), g(2), g(3), g(1, 2, 3)] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [f(x), g(x), exp(x), sin(x), cos(x), factorial(x)] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [Tuple(x, y), Tuple(x, z), Tuple(x, y, z)] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [[3], [1, 2]] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [[1, 2], [2, 3]] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [[1, 2], [1, 2, 3]] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [{x: -y}, {x: y}] + assert sorted(exprs, key=default_sort_key) == exprs + + exprs = [{1}, {1, 2}] + assert sorted(exprs, key=default_sort_key) == exprs + + a, b = exprs = [Dummy('x'), Dummy('x')] + assert sorted([b, a], key=default_sort_key) == exprs + + +def test_as_ordered_factors(): + + assert x.as_ordered_factors() == [x] + assert (2*x*x**n*sin(x)*cos(x)).as_ordered_factors() \ + == [Integer(2), x, x**n, sin(x), cos(x)] + + args = [f(1), f(2), f(3), f(1, 2, 3), g(1), g(2), g(3), g(1, 2, 3)] + expr = Mul(*args) + + assert expr.as_ordered_factors() == args + + A, B = symbols('A,B', commutative=False) + + assert (A*B).as_ordered_factors() == [A, B] + assert (B*A).as_ordered_factors() == [B, A] + + +def test_as_ordered_terms(): + + assert x.as_ordered_terms() == [x] + assert (sin(x)**2*cos(x) + sin(x)*cos(x)**2 + 1).as_ordered_terms() \ + == [sin(x)**2*cos(x), sin(x)*cos(x)**2, 1] + + args = [f(1), f(2), f(3), f(1, 2, 3), g(1), g(2), g(3), g(1, 2, 3)] + expr = Add(*args) + + assert expr.as_ordered_terms() == args + + assert (1 + 4*sqrt(3)*pi*x).as_ordered_terms() == [4*pi*x*sqrt(3), 1] + + assert ( 2 + 3*I).as_ordered_terms() == [2, 3*I] + assert (-2 + 3*I).as_ordered_terms() == [-2, 3*I] + assert ( 2 - 3*I).as_ordered_terms() == [2, -3*I] + assert (-2 - 3*I).as_ordered_terms() == [-2, -3*I] + + assert ( 4 + 3*I).as_ordered_terms() == [4, 3*I] + assert (-4 + 3*I).as_ordered_terms() == [-4, 3*I] + assert ( 4 - 3*I).as_ordered_terms() == [4, -3*I] + assert (-4 - 3*I).as_ordered_terms() == [-4, -3*I] + + e = x**2*y**2 + x*y**4 + y + 2 + + assert e.as_ordered_terms(order="lex") == [x**2*y**2, x*y**4, y, 2] + assert e.as_ordered_terms(order="grlex") == [x*y**4, x**2*y**2, y, 2] + assert e.as_ordered_terms(order="rev-lex") == [2, y, x*y**4, x**2*y**2] + assert e.as_ordered_terms(order="rev-grlex") == [2, y, x**2*y**2, x*y**4] + + k = symbols('k') + assert k.as_ordered_terms(data=True) == ([(k, ((1.0, 0.0), (1,), ()))], [k]) + + +def test_sort_key_atomic_expr(): + from sympy.physics.units import m, s + assert sorted([-m, s], key=lambda arg: arg.sort_key()) == [-m, s] + + +def test_eval_interval(): + assert exp(x)._eval_interval(*Tuple(x, 0, 1)) == exp(1) - exp(0) + + # issue 4199 + a = x/y + raises(NotImplementedError, lambda: a._eval_interval(x, S.Zero, oo)._eval_interval(y, oo, S.Zero)) + raises(NotImplementedError, lambda: a._eval_interval(x, S.Zero, oo)._eval_interval(y, S.Zero, oo)) + a = x - y + raises(NotImplementedError, lambda: a._eval_interval(x, S.One, oo)._eval_interval(y, oo, S.One)) + raises(ValueError, lambda: x._eval_interval(x, None, None)) + a = -y*Heaviside(x - y) + assert a._eval_interval(x, -oo, oo) == -y + assert a._eval_interval(x, oo, -oo) == y + + +def test_eval_interval_zoo(): + # Test that limit is used when zoo is returned + assert Si(1/x)._eval_interval(x, S.Zero, S.One) == -pi/2 + Si(1) + + +def test_primitive(): + assert (3*(x + 1)**2).primitive() == (3, (x + 1)**2) + assert (6*x + 2).primitive() == (2, 3*x + 1) + assert (x/2 + 3).primitive() == (S.Half, x + 6) + eq = (6*x + 2)*(x/2 + 3) + assert eq.primitive()[0] == 1 + eq = (2 + 2*x)**2 + assert eq.primitive()[0] == 1 + assert (4.0*x).primitive() == (1, 4.0*x) + assert (4.0*x + y/2).primitive() == (S.Half, 8.0*x + y) + assert (-2*x).primitive() == (2, -x) + assert Add(5*z/7, 0.5*x, 3*y/2, evaluate=False).primitive() == \ + (S.One/14, 7.0*x + 21*y + 10*z) + for i in [S.Infinity, S.NegativeInfinity, S.ComplexInfinity]: + assert (i + x/3).primitive() == \ + (S.One/3, i + x) + assert (S.Infinity + 2*x/3 + 4*y/7).primitive() == \ + (S.One/21, 14*x + 12*y + oo) + assert S.Zero.primitive() == (S.One, S.Zero) + + +def test_issue_5843(): + a = 1 + x + assert (2*a).extract_multiplicatively(a) == 2 + assert (4*a).extract_multiplicatively(2*a) == 2 + assert ((3*a)*(2*a)).extract_multiplicatively(a) == 6*a + + +def test_is_constant(): + from sympy.solvers.solvers import checksol + assert Sum(x, (x, 1, 10)).is_constant() is True + assert Sum(x, (x, 1, n)).is_constant() is False + assert Sum(x, (x, 1, n)).is_constant(y) is True + assert Sum(x, (x, 1, n)).is_constant(n) is False + assert Sum(x, (x, 1, n)).is_constant(x) is True + eq = a*cos(x)**2 + a*sin(x)**2 - a + assert eq.is_constant() is True + assert eq.subs({x: pi, a: 2}) == eq.subs({x: pi, a: 3}) == 0 + assert x.is_constant() is False + assert x.is_constant(y) is True + assert log(x/y).is_constant() is False + + assert checksol(x, x, Sum(x, (x, 1, n))) is False + assert checksol(x, x, Sum(x, (x, 1, n))) is False + assert f(1).is_constant + assert checksol(x, x, f(x)) is False + + assert Pow(x, S.Zero, evaluate=False).is_constant() is True # == 1 + assert Pow(S.Zero, x, evaluate=False).is_constant() is False # == 0 or 1 + assert (2**x).is_constant() is False + assert Pow(S(2), S(3), evaluate=False).is_constant() is True + + z1, z2 = symbols('z1 z2', zero=True) + assert (z1 + 2*z2).is_constant() is True + + assert meter.is_constant() is True + assert (3*meter).is_constant() is True + assert (x*meter).is_constant() is False + + +def test_equals(): + assert (-3 - sqrt(5) + (-sqrt(10)/2 - sqrt(2)/2)**2).equals(0) + assert (x**2 - 1).equals((x + 1)*(x - 1)) + assert (cos(x)**2 + sin(x)**2).equals(1) + assert (a*cos(x)**2 + a*sin(x)**2).equals(a) + r = sqrt(2) + assert (-1/(r + r*x) + 1/r/(1 + x)).equals(0) + assert factorial(x + 1).equals((x + 1)*factorial(x)) + assert sqrt(3).equals(2*sqrt(3)) is False + assert (sqrt(5)*sqrt(3)).equals(sqrt(3)) is False + assert (sqrt(5) + sqrt(3)).equals(0) is False + assert (sqrt(5) + pi).equals(0) is False + assert meter.equals(0) is False + assert (3*meter**2).equals(0) is False + eq = -(-1)**(S(3)/4)*6**(S.One/4) + (-6)**(S.One/4)*I + if eq != 0: # if canonicalization makes this zero, skip the test + assert eq.equals(0) + assert sqrt(x).equals(0) is False + + # from integrate(x*sqrt(1 + 2*x), x); + # diff is zero only when assumptions allow + i = 2*sqrt(2)*x**(S(5)/2)*(1 + 1/(2*x))**(S(5)/2)/5 + \ + 2*sqrt(2)*x**(S(3)/2)*(1 + 1/(2*x))**(S(5)/2)/(-6 - 3/x) + ans = sqrt(2*x + 1)*(6*x**2 + x - 1)/15 + diff = i - ans + assert diff.equals(0) is None # should be False, but previously this was False due to wrong intermediate result + assert diff.subs(x, Rational(-1, 2)/2) == 7*sqrt(2)/120 + # there are regions for x for which the expression is True, for + # example, when x < -1/2 or x > 0 the expression is zero + p = Symbol('p', positive=True) + assert diff.subs(x, p).equals(0) is True + assert diff.subs(x, -1).equals(0) is True + + # prove via minimal_polynomial or self-consistency + eq = sqrt(1 + sqrt(3)) + sqrt(3 + 3*sqrt(3)) - sqrt(10 + 6*sqrt(3)) + assert eq.equals(0) + q = 3**Rational(1, 3) + 3 + p = expand(q**3)**Rational(1, 3) + assert (p - q).equals(0) + + # issue 6829 + # eq = q*x + q/4 + x**4 + x**3 + 2*x**2 - S.One/3 + # z = eq.subs(x, solve(eq, x)[0]) + q = symbols('q') + z = (q*(-sqrt(-2*(-(q - S(7)/8)**S(2)/8 - S(2197)/13824)**(S.One/3) - + S(13)/12)/2 - sqrt((2*q - S(7)/4)/sqrt(-2*(-(q - S(7)/8)**S(2)/8 - + S(2197)/13824)**(S.One/3) - S(13)/12) + 2*(-(q - S(7)/8)**S(2)/8 - + S(2197)/13824)**(S.One/3) - S(13)/6)/2 - S.One/4) + q/4 + (-sqrt(-2*(-(q + - S(7)/8)**S(2)/8 - S(2197)/13824)**(S.One/3) - S(13)/12)/2 - sqrt((2*q + - S(7)/4)/sqrt(-2*(-(q - S(7)/8)**S(2)/8 - S(2197)/13824)**(S.One/3) - + S(13)/12) + 2*(-(q - S(7)/8)**S(2)/8 - S(2197)/13824)**(S.One/3) - + S(13)/6)/2 - S.One/4)**4 + (-sqrt(-2*(-(q - S(7)/8)**S(2)/8 - + S(2197)/13824)**(S.One/3) - S(13)/12)/2 - sqrt((2*q - + S(7)/4)/sqrt(-2*(-(q - S(7)/8)**S(2)/8 - S(2197)/13824)**(S.One/3) - + S(13)/12) + 2*(-(q - S(7)/8)**S(2)/8 - S(2197)/13824)**(S.One/3) - + S(13)/6)/2 - S.One/4)**3 + 2*(-sqrt(-2*(-(q - S(7)/8)**S(2)/8 - + S(2197)/13824)**(S.One/3) - S(13)/12)/2 - sqrt((2*q - + S(7)/4)/sqrt(-2*(-(q - S(7)/8)**S(2)/8 - S(2197)/13824)**(S.One/3) - + S(13)/12) + 2*(-(q - S(7)/8)**S(2)/8 - S(2197)/13824)**(S.One/3) - + S(13)/6)/2 - S.One/4)**2 - Rational(1, 3)) + assert z.equals(0) + + +def test_random(): + from sympy.functions.combinatorial.numbers import lucas + from sympy.simplify.simplify import posify + assert posify(x)[0]._random() is not None + assert lucas(n)._random(2, -2, 0, -1, 1) is None + + # issue 8662 + assert Piecewise((Max(x, y), z))._random() is None + + +def test_round(): + assert str(Float('0.1249999').round(2)) == '0.12' + d20 = 12345678901234567890 + ans = S(d20).round(2) + assert ans.is_Integer and ans == d20 + ans = S(d20).round(-2) + assert ans.is_Integer and ans == 12345678901234567900 + assert str(S('1/7').round(4)) == '0.1429' + assert str(S('.[12345]').round(4)) == '0.1235' + assert str(S('.1349').round(2)) == '0.13' + n = S(12345) + ans = n.round() + assert ans.is_Integer + assert ans == n + ans = n.round(1) + assert ans.is_Integer + assert ans == n + ans = n.round(4) + assert ans.is_Integer + assert ans == n + assert n.round(-1) == 12340 + + r = Float(str(n)).round(-4) + assert r == 10000.0 + + assert n.round(-5) == 0 + + assert str((pi + sqrt(2)).round(2)) == '4.56' + assert (10*(pi + sqrt(2))).round(-1) == 50.0 + raises(TypeError, lambda: round(x + 2, 2)) + assert str(S(2.3).round(1)) == '2.3' + # rounding in SymPy (as in Decimal) should be + # exact for the given precision; we check here + # that when a 5 follows the last digit that + # the rounded digit will be even. + for i in range(-99, 100): + # construct a decimal that ends in 5, e.g. 123 -> 0.1235 + s = str(abs(i)) + p = len(s) # we are going to round to the last digit of i + n = '0.%s5' % s # put a 5 after i's digits + j = p + 2 # 2 for '0.' + if i < 0: # 1 for '-' + j += 1 + n = '-' + n + v = str(Float(n).round(p))[:j] # pertinent digits + if v.endswith('.'): + continue # it ends with 0 which is even + L = int(v[-1]) # last digit + assert L % 2 == 0, (n, '->', v) + + assert (Float(.3, 3) + 2*pi).round() == 7 + assert (Float(.3, 3) + 2*pi*100).round() == 629 + assert (pi + 2*E*I).round() == 3 + 5*I + # don't let request for extra precision give more than + # what is known (in this case, only 3 digits) + assert str((Float(.03, 3) + 2*pi/100).round(5)) == '0.0928' + assert str((Float(.03, 3) + 2*pi/100).round(4)) == '0.0928' + + assert S.Zero.round() == 0 + + a = (Add(1, Float('1.' + '9'*27, ''), evaluate=False)) + assert a.round(10) == Float('3.000000000000000000000000000', '') + assert a.round(25) == Float('3.000000000000000000000000000', '') + assert a.round(26) == Float('3.000000000000000000000000000', '') + assert a.round(27) == Float('2.999999999999999999999999999', '') + assert a.round(30) == Float('2.999999999999999999999999999', '') + #assert a.round(10) == Float('3.0000000000', '') + #assert a.round(25) == Float('3.0000000000000000000000000', '') + #assert a.round(26) == Float('3.00000000000000000000000000', '') + #assert a.round(27) == Float('2.999999999999999999999999999', '') + #assert a.round(30) == Float('2.999999999999999999999999999', '') + + # XXX: Should round set the precision of the result? + # The previous version of the tests above is this but they only pass + # because Floats with unequal precision compare equal: + # + # assert a.round(10) == Float('3.0000000000', '') + # assert a.round(25) == Float('3.0000000000000000000000000', '') + # assert a.round(26) == Float('3.00000000000000000000000000', '') + # assert a.round(27) == Float('2.999999999999999999999999999', '') + # assert a.round(30) == Float('2.999999999999999999999999999', '') + + raises(TypeError, lambda: x.round()) + raises(TypeError, lambda: f(1).round()) + + # exact magnitude of 10 + assert str(S.One.round()) == '1' + assert str(S(100).round()) == '100' + + # applied to real and imaginary portions + assert (2*pi + E*I).round() == 6 + 3*I + assert (2*pi + I/10).round() == 6 + assert (pi/10 + 2*I).round() == 2*I + # the lhs re and im parts are Float with dps of 2 + # and those on the right have dps of 15 so they won't compare + # equal unless we use string or compare components (which will + # then coerce the floats to the same precision) or re-create + # the floats + assert str((pi/10 + E*I).round(2)) == '0.31 + 2.72*I' + assert str((pi/10 + E*I).round(2).as_real_imag()) == '(0.31, 2.72)' + assert str((pi/10 + E*I).round(2)) == '0.31 + 2.72*I' + + # issue 6914 + assert (I**(I + 3)).round(3) == Float('-0.208', '')*I + + # issue 8720 + assert S(-123.6).round() == -124 + assert S(-1.5).round() == -2 + assert S(-100.5).round() == -100 + assert S(-1.5 - 10.5*I).round() == -2 - 10*I + + # issue 7961 + assert str(S(0.006).round(2)) == '0.01' + assert str(S(0.00106).round(4)) == '0.0011' + + # issue 8147 + assert S.NaN.round() is S.NaN + assert S.Infinity.round() is S.Infinity + assert S.NegativeInfinity.round() is S.NegativeInfinity + assert S.ComplexInfinity.round() is S.ComplexInfinity + + # check that types match + for i in range(2): + fi = float(i) + # 2 args + assert all(type(round(i, p)) is int for p in (-1, 0, 1)) + assert all(S(i).round(p).is_Integer for p in (-1, 0, 1)) + assert all(type(round(fi, p)) is float for p in (-1, 0, 1)) + assert all(S(fi).round(p).is_Float for p in (-1, 0, 1)) + # 1 arg (p is None) + assert type(round(i)) is int + assert S(i).round().is_Integer + assert type(round(fi)) is int + assert S(fi).round().is_Integer + + # issue 25698 + n = 6000002 + assert int(n*(log(n) + log(log(n)))) == 110130079 + one = cos(2)**2 + sin(2)**2 + eq = exp(one*I*pi) + qr, qi = eq.as_real_imag() + assert qi.round(2) == 0.0 + assert eq.round(2) == -1.0 + eq = one - 1/S(10**120) + assert S.true not in (eq > 1, eq < 1) + assert int(eq) == int(.9) == 0 + assert int(-eq) == int(-.9) == 0 + + +def test_held_expression_UnevaluatedExpr(): + x = symbols("x") + he = UnevaluatedExpr(1/x) + e1 = x*he + + assert isinstance(e1, Mul) + assert e1.args == (x, he) + assert e1.doit() == 1 + assert UnevaluatedExpr(Derivative(x, x)).doit(deep=False + ) == Derivative(x, x) + assert UnevaluatedExpr(Derivative(x, x)).doit() == 1 + + xx = Mul(x, x, evaluate=False) + assert xx != x**2 + + ue2 = UnevaluatedExpr(xx) + assert isinstance(ue2, UnevaluatedExpr) + assert ue2.args == (xx,) + assert ue2.doit() == x**2 + assert ue2.doit(deep=False) == xx + + x2 = UnevaluatedExpr(2)*2 + assert type(x2) is Mul + assert x2.args == (2, UnevaluatedExpr(2)) + +def test_round_exception_nostr(): + # Don't use the string form of the expression in the round exception, as + # it's too slow + s = Symbol('bad') + try: + s.round() + except TypeError as e: + assert 'bad' not in str(e) + else: + # Did not raise + raise AssertionError("Did not raise") + + +def test_extract_branch_factor(): + assert exp_polar(2.0*I*pi).extract_branch_factor() == (1, 1) + + +def test_identity_removal(): + assert Add.make_args(x + 0) == (x,) + assert Mul.make_args(x*1) == (x,) + + +def test_float_0(): + assert Float(0.0) + 1 == Float(1.0) + + +@XFAIL +def test_float_0_fail(): + assert Float(0.0)*x == Float(0.0) + assert (x + Float(0.0)).is_Add + + +def test_issue_6325(): + ans = (b**2 + z**2 - (b*(a + b*t) + z*(c + t*z))**2/( + (a + b*t)**2 + (c + t*z)**2))/sqrt((a + b*t)**2 + (c + t*z)**2) + e = sqrt((a + b*t)**2 + (c + z*t)**2) + assert diff(e, t, 2) == ans + assert e.diff(t, 2) == ans + assert diff(e, t, 2, simplify=False) != ans + + +def test_issue_7426(): + f1 = a % c + f2 = x % z + assert f1.equals(f2) is None + + +def test_issue_11122(): + x = Symbol('x', extended_positive=False) + assert unchanged(Gt, x, 0) # (x > 0) + # (x > 0) should remain unevaluated after PR #16956 + + x = Symbol('x', positive=False, real=True) + assert (x > 0) is S.false + + +def test_issue_10651(): + x = Symbol('x', real=True) + e1 = (-1 + x)/(1 - x) + e3 = (4*x**2 - 4)/((1 - x)*(1 + x)) + e4 = 1/(cos(x)**2) - (tan(x))**2 + x = Symbol('x', positive=True) + e5 = (1 + x)/x + assert e1.is_constant() is None + assert e3.is_constant() is None + assert e4.is_constant() is None + assert e5.is_constant() is False + + +def test_issue_10161(): + x = symbols('x', real=True) + assert x*abs(x)*abs(x) == x**3 + + +def test_issue_10755(): + x = symbols('x') + raises(TypeError, lambda: int(log(x))) + raises(TypeError, lambda: log(x).round(2)) + + +def test_issue_11877(): + x = symbols('x') + assert integrate(log(S.Half - x), (x, 0, S.Half)) == Rational(-1, 2) -log(2)/2 + + +def test_normal(): + x = symbols('x') + e = Mul(S.Half, 1 + x, evaluate=False) + assert e.normal() == e + + +def test_expr(): + x = symbols('x') + raises(TypeError, lambda: tan(x).series(x, 2, oo, "+")) + + +def test_ExprBuilder(): + eb = ExprBuilder(Mul) + eb.args.extend([x, x]) + assert eb.build() == x**2 + + +def test_issue_22020(): + from sympy.parsing.sympy_parser import parse_expr + x = parse_expr("log((2*V/3-V)/C)/-(R+r)*C") + y = parse_expr("log((2*V/3-V)/C)/-(R+r)*2") + assert x.equals(y) is False + + +def test_non_string_equality(): + # Expressions should not compare equal to strings + x = symbols('x') + one = sympify(1) + assert (x == 'x') is False + assert (x != 'x') is True + assert (one == '1') is False + assert (one != '1') is True + assert (x + 1 == 'x + 1') is False + assert (x + 1 != 'x + 1') is True + + # Make sure == doesn't try to convert the resulting expression to a string + # (e.g., by calling sympify() instead of _sympify()) + + class BadRepr: + def __repr__(self): + raise RuntimeError + + assert (x == BadRepr()) is False + assert (x != BadRepr()) is True + + +def test_21494(): + from sympy.testing.pytest import warns_deprecated_sympy + + with warns_deprecated_sympy(): + assert x.expr_free_symbols == {x} + + with warns_deprecated_sympy(): + assert Basic().expr_free_symbols == set() + + with warns_deprecated_sympy(): + assert S(2).expr_free_symbols == {S(2)} + + with warns_deprecated_sympy(): + assert Indexed("A", x).expr_free_symbols == {Indexed("A", x)} + + with warns_deprecated_sympy(): + assert Subs(x, x, 0).expr_free_symbols == set() + + +def test_Expr__eq__iterable_handling(): + assert x != range(3) + + +def test_format(): + assert '{:1.2f}'.format(S.Zero) == '0.00' + assert '{:+3.0f}'.format(S(3)) == ' +3' + assert '{:23.20f}'.format(pi) == ' 3.14159265358979323846' + assert '{:50.48f}'.format(exp(sin(1))) == '2.319776824715853173956590377503266813254904772376' + + +def test_issue_24045(): + assert powsimp(exp(a)/((c*a - c*b)*(Float(1.0)*c*a - Float(1.0)*c*b))) # doesn't raise + + +def test__unevaluated_Mul(): + A, B = symbols('A B', commutative=False) + assert _unevaluated_Mul(x, A, B, S(2), A).args == (2, x, A, B, A) + assert _unevaluated_Mul(-x*A*B, S(2), A).args == (-2, x, A, B, A) + + +def test_Float_zero_division_error(): + # issue 27165 + assert Float('1.7567e-1417').round(15) == Float(0) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_exprtools.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_exprtools.py new file mode 100644 index 0000000000000000000000000000000000000000..b550db1606866fb76442980ea2139aaf61219525 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_exprtools.py @@ -0,0 +1,493 @@ +"""Tests for tools for manipulating of large commutative expressions. """ + +from sympy.concrete.summations import Sum +from sympy.core.add import Add +from sympy.core.basic import Basic +from sympy.core.containers import (Dict, Tuple) +from sympy.core.function import Function +from sympy.core.mul import Mul +from sympy.core.numbers import (I, Rational, oo) +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol, symbols) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import (root, sqrt) +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.integrals.integrals import Integral +from sympy.series.order import O +from sympy.sets.sets import Interval +from sympy.simplify.radsimp import collect +from sympy.simplify.simplify import simplify +from sympy.core.exprtools import (decompose_power, Factors, Term, _gcd_terms, + gcd_terms, factor_terms, factor_nc, _mask_nc, + _monotonic_sign) +from sympy.core.mul import _keep_coeff as _keep_coeff +from sympy.simplify.cse_opts import sub_pre +from sympy.testing.pytest import raises + +from sympy.abc import a, b, t, x, y, z + + +def test_decompose_power(): + assert decompose_power(x) == (x, 1) + assert decompose_power(x**2) == (x, 2) + assert decompose_power(x**(2*y)) == (x**y, 2) + assert decompose_power(x**(2*y/3)) == (x**(y/3), 2) + assert decompose_power(x**(y*Rational(2, 3))) == (x**(y/3), 2) + + +def test_Factors(): + assert Factors() == Factors({}) == Factors(S.One) + assert Factors().as_expr() is S.One + assert Factors({x: 2, y: 3, sin(x): 4}).as_expr() == x**2*y**3*sin(x)**4 + assert Factors(S.Infinity) == Factors({oo: 1}) + assert Factors(S.NegativeInfinity) == Factors({oo: 1, -1: 1}) + # issue #18059: + assert Factors((x**2)**S.Half).as_expr() == (x**2)**S.Half + + a = Factors({x: 5, y: 3, z: 7}) + b = Factors({ y: 4, z: 3, t: 10}) + + assert a.mul(b) == a*b == Factors({x: 5, y: 7, z: 10, t: 10}) + + assert a.div(b) == divmod(a, b) == \ + (Factors({x: 5, z: 4}), Factors({y: 1, t: 10})) + assert a.quo(b) == a/b == Factors({x: 5, z: 4}) + assert a.rem(b) == a % b == Factors({y: 1, t: 10}) + + assert a.pow(3) == a**3 == Factors({x: 15, y: 9, z: 21}) + assert b.pow(3) == b**3 == Factors({y: 12, z: 9, t: 30}) + + assert a.gcd(b) == Factors({y: 3, z: 3}) + assert a.lcm(b) == Factors({x: 5, y: 4, z: 7, t: 10}) + + a = Factors({x: 4, y: 7, t: 7}) + b = Factors({z: 1, t: 3}) + + assert a.normal(b) == (Factors({x: 4, y: 7, t: 4}), Factors({z: 1})) + + assert Factors(sqrt(2)*x).as_expr() == sqrt(2)*x + + assert Factors(-I)*I == Factors() + assert Factors({S.NegativeOne: S(3)})*Factors({S.NegativeOne: S.One, I: S(5)}) == \ + Factors(I) + assert Factors(sqrt(I)*I) == Factors(I**(S(3)/2)) == Factors({I: S(3)/2}) + assert Factors({I: S(3)/2}).as_expr() == I**(S(3)/2) + + assert Factors(S(2)**x).div(S(3)**x) == \ + (Factors({S(2): x}), Factors({S(3): x})) + assert Factors(2**(2*x + 2)).div(S(8)) == \ + (Factors({S(2): 2*x + 2}), Factors({S(8): S.One})) + + # coverage + # /!\ things break if this is not True + assert Factors({S.NegativeOne: Rational(3, 2)}) == Factors({I: S.One, S.NegativeOne: S.One}) + assert Factors({I: S.One, S.NegativeOne: Rational(1, 3)}).as_expr() == I*(-1)**Rational(1, 3) + + assert Factors(-1.) == Factors({S.NegativeOne: S.One, S(1.): 1}) + assert Factors(-2.) == Factors({S.NegativeOne: S.One, S(2.): 1}) + assert Factors((-2.)**x) == Factors({S(-2.): x}) + assert Factors(S(-2)) == Factors({S.NegativeOne: S.One, S(2): 1}) + assert Factors(S.Half) == Factors({S(2): -S.One}) + assert Factors(Rational(3, 2)) == Factors({S(3): S.One, S(2): S.NegativeOne}) + assert Factors({I: S.One}) == Factors(I) + assert Factors({-1.0: 2, I: 1}) == Factors({S(1.0): 1, I: 1}) + assert Factors({S.NegativeOne: Rational(-3, 2)}).as_expr() == I + A = symbols('A', commutative=False) + assert Factors(2*A**2) == Factors({S(2): 1, A**2: 1}) + assert Factors(I) == Factors({I: S.One}) + assert Factors(x).normal(S(2)) == (Factors(x), Factors(S(2))) + assert Factors(x).normal(S.Zero) == (Factors(), Factors(S.Zero)) + raises(ZeroDivisionError, lambda: Factors(x).div(S.Zero)) + assert Factors(x).mul(S(2)) == Factors(2*x) + assert Factors(x).mul(S.Zero).is_zero + assert Factors(x).mul(1/x).is_one + assert Factors(x**sqrt(2)**3).as_expr() == x**(2*sqrt(2)) + assert Factors(x)**Factors(S(2)) == Factors(x**2) + assert Factors(x).gcd(S.Zero) == Factors(x) + assert Factors(x).lcm(S.Zero).is_zero + assert Factors(S.Zero).div(x) == (Factors(S.Zero), Factors()) + assert Factors(x).div(x) == (Factors(), Factors()) + assert Factors({x: .2})/Factors({x: .2}) == Factors() + assert Factors(x) != Factors() + assert Factors(S.Zero).normal(x) == (Factors(S.Zero), Factors()) + n, d = x**(2 + y), x**2 + f = Factors(n) + assert f.div(d) == f.normal(d) == (Factors(x**y), Factors()) + assert f.gcd(d) == Factors() + d = x**y + assert f.div(d) == f.normal(d) == (Factors(x**2), Factors()) + assert f.gcd(d) == Factors(d) + n = d = 2**x + f = Factors(n) + assert f.div(d) == f.normal(d) == (Factors(), Factors()) + assert f.gcd(d) == Factors(d) + n, d = 2**x, 2**y + f = Factors(n) + assert f.div(d) == f.normal(d) == (Factors({S(2): x}), Factors({S(2): y})) + assert f.gcd(d) == Factors() + + # extraction of constant only + n = x**(x + 3) + assert Factors(n).normal(x**-3) == (Factors({x: x + 6}), Factors({})) + assert Factors(n).normal(x**3) == (Factors({x: x}), Factors({})) + assert Factors(n).normal(x**4) == (Factors({x: x}), Factors({x: 1})) + assert Factors(n).normal(x**(y - 3)) == \ + (Factors({x: x + 6}), Factors({x: y})) + assert Factors(n).normal(x**(y + 3)) == (Factors({x: x}), Factors({x: y})) + assert Factors(n).normal(x**(y + 4)) == \ + (Factors({x: x}), Factors({x: y + 1})) + + assert Factors(n).div(x**-3) == (Factors({x: x + 6}), Factors({})) + assert Factors(n).div(x**3) == (Factors({x: x}), Factors({})) + assert Factors(n).div(x**4) == (Factors({x: x}), Factors({x: 1})) + assert Factors(n).div(x**(y - 3)) == \ + (Factors({x: x + 6}), Factors({x: y})) + assert Factors(n).div(x**(y + 3)) == (Factors({x: x}), Factors({x: y})) + assert Factors(n).div(x**(y + 4)) == \ + (Factors({x: x}), Factors({x: y + 1})) + + assert Factors(3 * x / 2) == Factors({3: 1, 2: -1, x: 1}) + assert Factors(x * x / y) == Factors({x: 2, y: -1}) + assert Factors(27 * x / y**9) == Factors({27: 1, x: 1, y: -9}) + + +def test_Term(): + a = Term(4*x*y**2/z/t**3) + b = Term(2*x**3*y**5/t**3) + + assert a == Term(4, Factors({x: 1, y: 2}), Factors({z: 1, t: 3})) + assert b == Term(2, Factors({x: 3, y: 5}), Factors({t: 3})) + + assert a.as_expr() == 4*x*y**2/z/t**3 + assert b.as_expr() == 2*x**3*y**5/t**3 + + assert a.inv() == \ + Term(S.One/4, Factors({z: 1, t: 3}), Factors({x: 1, y: 2})) + assert b.inv() == Term(S.Half, Factors({t: 3}), Factors({x: 3, y: 5})) + + assert a.mul(b) == a*b == \ + Term(8, Factors({x: 4, y: 7}), Factors({z: 1, t: 6})) + assert a.quo(b) == a/b == Term(2, Factors({}), Factors({x: 2, y: 3, z: 1})) + + assert a.pow(3) == a**3 == \ + Term(64, Factors({x: 3, y: 6}), Factors({z: 3, t: 9})) + assert b.pow(3) == b**3 == Term(8, Factors({x: 9, y: 15}), Factors({t: 9})) + + assert a.pow(-3) == a**(-3) == \ + Term(S.One/64, Factors({z: 3, t: 9}), Factors({x: 3, y: 6})) + assert b.pow(-3) == b**(-3) == \ + Term(S.One/8, Factors({t: 9}), Factors({x: 9, y: 15})) + + assert a.gcd(b) == Term(2, Factors({x: 1, y: 2}), Factors({t: 3})) + assert a.lcm(b) == Term(4, Factors({x: 3, y: 5}), Factors({z: 1, t: 3})) + + a = Term(4*x*y**2/z/t**3) + b = Term(2*x**3*y**5*t**7) + + assert a.mul(b) == Term(8, Factors({x: 4, y: 7, t: 4}), Factors({z: 1})) + + assert Term((2*x + 2)**3) == Term(8, Factors({x + 1: 3}), Factors({})) + assert Term((2*x + 2)*(3*x + 6)**2) == \ + Term(18, Factors({x + 1: 1, x + 2: 2}), Factors({})) + + +def test_gcd_terms(): + f = 2*(x + 1)*(x + 4)/(5*x**2 + 5) + (2*x + 2)*(x + 5)/(x**2 + 1)/5 + \ + (2*x + 2)*(x + 6)/(5*x**2 + 5) + + assert _gcd_terms(f) == ((Rational(6, 5))*((1 + x)/(1 + x**2)), 5 + x, 1) + assert _gcd_terms(Add.make_args(f)) == \ + ((Rational(6, 5))*((1 + x)/(1 + x**2)), 5 + x, 1) + + newf = (Rational(6, 5))*((1 + x)*(5 + x)/(1 + x**2)) + assert gcd_terms(f) == newf + args = Add.make_args(f) + # non-Basic sequences of terms treated as terms of Add + assert gcd_terms(list(args)) == newf + assert gcd_terms(tuple(args)) == newf + assert gcd_terms(set(args)) == newf + # but a Basic sequence is treated as a container + assert gcd_terms(Tuple(*args)) != newf + assert gcd_terms(Basic(Tuple(S(1), 3*y + 3*x*y), Tuple(S(1), S(3)))) == \ + Basic(Tuple(S(1), 3*y*(x + 1)), Tuple(S(1), S(3))) + # but we shouldn't change keys of a dictionary or some may be lost + assert gcd_terms(Dict((x*(1 + y), S(2)), (x + x*y, y + x*y))) == \ + Dict({x*(y + 1): S(2), x + x*y: y*(1 + x)}) + + assert gcd_terms((2*x + 2)**3 + (2*x + 2)**2) == 4*(x + 1)**2*(2*x + 3) + + assert gcd_terms(0) == 0 + assert gcd_terms(1) == 1 + assert gcd_terms(x) == x + assert gcd_terms(2 + 2*x) == Mul(2, 1 + x, evaluate=False) + arg = x*(2*x + 4*y) + garg = 2*x*(x + 2*y) + assert gcd_terms(arg) == garg + assert gcd_terms(sin(arg)) == sin(garg) + + # issue 6139-like + alpha, alpha1, alpha2, alpha3 = symbols('alpha:4') + a = alpha**2 - alpha*x**2 + alpha + x**3 - x*(alpha + 1) + rep = (alpha, (1 + sqrt(5))/2 + alpha1*x + alpha2*x**2 + alpha3*x**3) + s = (a/(x - alpha)).subs(*rep).series(x, 0, 1) + assert simplify(collect(s, x)) == -sqrt(5)/2 - Rational(3, 2) + O(x) + + # issue 5917 + assert _gcd_terms([S.Zero, S.Zero]) == (0, 0, 1) + assert _gcd_terms([2*x + 4]) == (2, x + 2, 1) + + eq = x/(x + 1/x) + assert gcd_terms(eq, fraction=False) == eq + eq = x/2/y + 1/x/y + assert gcd_terms(eq, fraction=True, clear=True) == \ + (x**2 + 2)/(2*x*y) + assert gcd_terms(eq, fraction=True, clear=False) == \ + (x**2/2 + 1)/(x*y) + assert gcd_terms(eq, fraction=False, clear=True) == \ + (x + 2/x)/(2*y) + assert gcd_terms(eq, fraction=False, clear=False) == \ + (x/2 + 1/x)/y + + +def test_factor_terms(): + A = Symbol('A', commutative=False) + assert factor_terms(9*(x + x*y + 1) + (3*x + 3)**(2 + 2*x)) == \ + 9*x*y + 9*x + _keep_coeff(S(3), x + 1)**_keep_coeff(S(2), x + 1) + 9 + assert factor_terms(9*(x + x*y + 1) + (3)**(2 + 2*x)) == \ + _keep_coeff(S(9), 3**(2*x) + x*y + x + 1) + assert factor_terms(3**(2 + 2*x) + a*3**(2 + 2*x)) == \ + 9*3**(2*x)*(a + 1) + assert factor_terms(x + x*A) == \ + x*(1 + A) + assert factor_terms(sin(x + x*A)) == \ + sin(x*(1 + A)) + assert factor_terms((3*x + 3)**((2 + 2*x)/3)) == \ + _keep_coeff(S(3), x + 1)**_keep_coeff(Rational(2, 3), x + 1) + assert factor_terms(x + (x*y + x)**(3*x + 3)) == \ + x + (x*(y + 1))**_keep_coeff(S(3), x + 1) + assert factor_terms(a*(x + x*y) + b*(x*2 + y*x*2)) == \ + x*(a + 2*b)*(y + 1) + i = Integral(x, (x, 0, oo)) + assert factor_terms(i) == i + + assert factor_terms(x/2 + y) == x/2 + y + # fraction doesn't apply to integer denominators + assert factor_terms(x/2 + y, fraction=True) == x/2 + y + # clear *does* apply to the integer denominators + assert factor_terms(x/2 + y, clear=True) == Mul(S.Half, x + 2*y, evaluate=False) + + # check radical extraction + eq = sqrt(2) + sqrt(10) + assert factor_terms(eq) == eq + assert factor_terms(eq, radical=True) == sqrt(2)*(1 + sqrt(5)) + eq = root(-6, 3) + root(6, 3) + assert factor_terms(eq, radical=True) == 6**(S.One/3)*(1 + (-1)**(S.One/3)) + + eq = [x + x*y] + ans = [x*(y + 1)] + for c in [list, tuple, set]: + assert factor_terms(c(eq)) == c(ans) + assert factor_terms(Tuple(x + x*y)) == Tuple(x*(y + 1)) + assert factor_terms(Interval(0, 1)) == Interval(0, 1) + e = 1/sqrt(a/2 + 1) + assert factor_terms(e, clear=False) == 1/sqrt(a/2 + 1) + assert factor_terms(e, clear=True) == sqrt(2)/sqrt(a + 2) + + eq = x/(x + 1/x) + 1/(x**2 + 1) + assert factor_terms(eq, fraction=False) == eq + assert factor_terms(eq, fraction=True) == 1 + + assert factor_terms((1/(x**3 + x**2) + 2/x**2)*y) == \ + y*(2 + 1/(x + 1))/x**2 + + # if not True, then processesing for this in factor_terms is not necessary + assert gcd_terms(-x - y) == -x - y + assert factor_terms(-x - y) == Mul(-1, x + y, evaluate=False) + + # if not True, then "special" processesing in factor_terms is not necessary + assert gcd_terms(exp(Mul(-1, x + 1))) == exp(-x - 1) + e = exp(-x - 2) + x + assert factor_terms(e) == exp(Mul(-1, x + 2, evaluate=False)) + x + assert factor_terms(e, sign=False) == e + assert factor_terms(exp(-4*x - 2) - x) == -x + exp(Mul(-2, 2*x + 1, evaluate=False)) + + # sum/integral tests + for F in (Sum, Integral): + assert factor_terms(F(x, (y, 1, 10))) == x * F(1, (y, 1, 10)) + assert factor_terms(F(x, (y, 1, 10)) + x) == x * (1 + F(1, (y, 1, 10))) + assert factor_terms(F(x*y + x*y**2, (y, 1, 10))) == x*F(y*(y + 1), (y, 1, 10)) + + # expressions involving Pow terms with base 0 + assert factor_terms(0**(x - 2) - 1) == 0**(x - 2) - 1 + assert factor_terms(0**(x + 2) - 1) == 0**(x + 2) - 1 + assert factor_terms((0**(x + 2) - 1).subs(x,-2)) == 0 + + +def test_xreplace(): + e = Mul(2, 1 + x, evaluate=False) + assert e.xreplace({}) == e + assert e.xreplace({y: x}) == e + + +def test_factor_nc(): + x, y = symbols('x,y') + k = symbols('k', integer=True) + n, m, o = symbols('n,m,o', commutative=False) + + # mul and multinomial expansion is needed + from sympy.core.function import _mexpand + e = x*(1 + y)**2 + assert _mexpand(e) == x + x*2*y + x*y**2 + + def factor_nc_test(e): + ex = _mexpand(e) + assert ex.is_Add + f = factor_nc(ex) + assert not f.is_Add and _mexpand(f) == ex + + factor_nc_test(x*(1 + y)) + factor_nc_test(n*(x + 1)) + factor_nc_test(n*(x + m)) + factor_nc_test((x + m)*n) + factor_nc_test(n*m*(x*o + n*o*m)*n) + s = Sum(x, (x, 1, 2)) + factor_nc_test(x*(1 + s)) + factor_nc_test(x*(1 + s)*s) + factor_nc_test(x*(1 + sin(s))) + factor_nc_test((1 + n)**2) + + factor_nc_test((x + n)*(x + m)*(x + y)) + factor_nc_test(x*(n*m + 1)) + factor_nc_test(x*(n*m + x)) + factor_nc_test(x*(x*n*m + 1)) + factor_nc_test(n*(m/x + o)) + factor_nc_test(m*(n + o/2)) + factor_nc_test(x*n*(x*m + 1)) + factor_nc_test(x*(m*n + x*n*m)) + factor_nc_test(n*(1 - m)*n**2) + + factor_nc_test((n + m)**2) + factor_nc_test((n - m)*(n + m)**2) + factor_nc_test((n + m)**2*(n - m)) + factor_nc_test((m - n)*(n + m)**2*(n - m)) + + assert factor_nc(n*(n + n*m)) == n**2*(1 + m) + assert factor_nc(m*(m*n + n*m*n**2)) == m*(m + n*m*n)*n + eq = m*sin(n) - sin(n)*m + assert factor_nc(eq) == eq + + # for coverage: + from sympy.physics.secondquant import Commutator + from sympy.polys.polytools import factor + eq = 1 + x*Commutator(m, n) + assert factor_nc(eq) == eq + eq = x*Commutator(m, n) + x*Commutator(m, o)*Commutator(m, n) + assert factor(eq) == x*(1 + Commutator(m, o))*Commutator(m, n) + + # issue 6534 + assert (2*n + 2*m).factor() == 2*(n + m) + + # issue 6701 + _n = symbols('nz', zero=False, commutative=False) + assert factor_nc(_n**k + _n**(k + 1)) == _n**k*(1 + _n) + assert factor_nc((m*n)**k + (m*n)**(k + 1)) == (1 + m*n)*(m*n)**k + + # issue 6918 + assert factor_nc(-n*(2*x**2 + 2*x)) == -2*n*x*(x + 1) + + +def test_issue_6360(): + a, b = symbols("a b") + apb = a + b + eq = apb + apb**2*(-2*a - 2*b) + assert factor_terms(sub_pre(eq)) == a + b - 2*(a + b)**3 + + +def test_issue_7903(): + a = symbols(r'a', real=True) + t = exp(I*cos(a)) + exp(-I*sin(a)) + assert t.simplify() + +def test_issue_8263(): + F, G = symbols('F, G', commutative=False, cls=Function) + x, y = symbols('x, y') + expr, dummies, _ = _mask_nc(F(x)*G(y) - G(y)*F(x)) + for v in dummies.values(): + assert not v.is_commutative + assert not expr.is_zero + +def test_monotonic_sign(): + F = _monotonic_sign + x = symbols('x') + assert F(x) is None + assert F(-x) is None + assert F(Dummy(prime=True)) == 2 + assert F(Dummy(prime=True, odd=True)) == 3 + assert F(Dummy(composite=True)) == 4 + assert F(Dummy(composite=True, odd=True)) == 9 + assert F(Dummy(positive=True, integer=True)) == 1 + assert F(Dummy(positive=True, even=True)) == 2 + assert F(Dummy(positive=True, even=True, prime=False)) == 4 + assert F(Dummy(negative=True, integer=True)) == -1 + assert F(Dummy(negative=True, even=True)) == -2 + assert F(Dummy(zero=True)) == 0 + assert F(Dummy(nonnegative=True)) == 0 + assert F(Dummy(nonpositive=True)) == 0 + + assert F(Dummy(positive=True) + 1).is_positive + assert F(Dummy(positive=True, integer=True) - 1).is_nonnegative + assert F(Dummy(positive=True) - 1) is None + assert F(Dummy(negative=True) + 1) is None + assert F(Dummy(negative=True, integer=True) - 1).is_nonpositive + assert F(Dummy(negative=True) - 1).is_negative + assert F(-Dummy(positive=True) + 1) is None + assert F(-Dummy(positive=True, integer=True) - 1).is_negative + assert F(-Dummy(positive=True) - 1).is_negative + assert F(-Dummy(negative=True) + 1).is_positive + assert F(-Dummy(negative=True, integer=True) - 1).is_nonnegative + assert F(-Dummy(negative=True) - 1) is None + x = Dummy(negative=True) + assert F(x**3).is_nonpositive + assert F(x**3 + log(2)*x - 1).is_negative + x = Dummy(positive=True) + assert F(-x**3).is_nonpositive + + p = Dummy(positive=True) + assert F(1/p).is_positive + assert F(p/(p + 1)).is_positive + p = Dummy(nonnegative=True) + assert F(p/(p + 1)).is_nonnegative + p = Dummy(positive=True) + assert F(-1/p).is_negative + p = Dummy(nonpositive=True) + assert F(p/(-p + 1)).is_nonpositive + + p = Dummy(positive=True, integer=True) + q = Dummy(positive=True, integer=True) + assert F(-2/p/q).is_negative + assert F(-2/(p - 1)/q) is None + + assert F((p - 1)*q + 1).is_positive + assert F(-(p - 1)*q - 1).is_negative + +def test_issue_17256(): + from sympy.sets.fancysets import Range + x = Symbol('x') + s1 = Sum(x + 1, (x, 1, 9)) + s2 = Sum(x + 1, (x, Range(1, 10))) + a = Symbol('a') + r1 = s1.xreplace({x:a}) + r2 = s2.xreplace({x:a}) + + assert r1.doit() == r2.doit() + s1 = Sum(x + 1, (x, 0, 9)) + s2 = Sum(x + 1, (x, Range(10))) + a = Symbol('a') + r1 = s1.xreplace({x:a}) + r2 = s2.xreplace({x:a}) + assert r1 == r2 + +def test_issue_21623(): + from sympy.matrices.expressions.matexpr import MatrixSymbol + M = MatrixSymbol('X', 2, 2) + assert gcd_terms(M[0,0], 1) == M[0,0] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_facts.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_facts.py new file mode 100644 index 0000000000000000000000000000000000000000..7ca04877d0bdaf8124258ea1d25a10bcfa0f5f3a --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_facts.py @@ -0,0 +1,312 @@ +from sympy.core.facts import (deduce_alpha_implications, + apply_beta_to_alpha_route, rules_2prereq, FactRules, FactKB) +from sympy.core.logic import And, Not +from sympy.testing.pytest import raises + +T = True +F = False +U = None + + +def test_deduce_alpha_implications(): + def D(i): + I = deduce_alpha_implications(i) + P = rules_2prereq({ + (k, True): {(v, True) for v in S} for k, S in I.items()}) + return I, P + + # transitivity + I, P = D([('a', 'b'), ('b', 'c')]) + assert I == {'a': {'b', 'c'}, 'b': {'c'}, Not('b'): + {Not('a')}, Not('c'): {Not('a'), Not('b')}} + assert P == {'a': {'b', 'c'}, 'b': {'a', 'c'}, 'c': {'a', 'b'}} + + # Duplicate entry + I, P = D([('a', 'b'), ('b', 'c'), ('b', 'c')]) + assert I == {'a': {'b', 'c'}, 'b': {'c'}, Not('b'): {Not('a')}, Not('c'): {Not('a'), Not('b')}} + assert P == {'a': {'b', 'c'}, 'b': {'a', 'c'}, 'c': {'a', 'b'}} + + # see if it is tolerant to cycles + assert D([('a', 'a'), ('a', 'a')]) == ({}, {}) + assert D([('a', 'b'), ('b', 'a')]) == ( + {'a': {'b'}, 'b': {'a'}, Not('a'): {Not('b')}, Not('b'): {Not('a')}}, + {'a': {'b'}, 'b': {'a'}}) + + # see if it catches inconsistency + raises(ValueError, lambda: D([('a', Not('a'))])) + raises(ValueError, lambda: D([('a', 'b'), ('b', Not('a'))])) + raises(ValueError, lambda: D([('a', 'b'), ('b', 'c'), ('b', 'na'), + ('na', Not('a'))])) + + # see if it handles implications with negations + I, P = D([('a', Not('b')), ('c', 'b')]) + assert I == {'a': {Not('b'), Not('c')}, 'b': {Not('a')}, 'c': {'b', Not('a')}, Not('b'): {Not('c')}} + assert P == {'a': {'b', 'c'}, 'b': {'a', 'c'}, 'c': {'a', 'b'}} + I, P = D([(Not('a'), 'b'), ('a', 'c')]) + assert I == {'a': {'c'}, Not('a'): {'b'}, Not('b'): {'a', + 'c'}, Not('c'): {Not('a'), 'b'},} + assert P == {'a': {'b', 'c'}, 'b': {'a', 'c'}, 'c': {'a', 'b'}} + + + # Long deductions + I, P = D([('a', 'b'), ('b', 'c'), ('c', 'd'), ('d', 'e')]) + assert I == {'a': {'b', 'c', 'd', 'e'}, 'b': {'c', 'd', 'e'}, + 'c': {'d', 'e'}, 'd': {'e'}, Not('b'): {Not('a')}, + Not('c'): {Not('a'), Not('b')}, Not('d'): {Not('a'), Not('b'), + Not('c')}, Not('e'): {Not('a'), Not('b'), Not('c'), Not('d')}} + assert P == {'a': {'b', 'c', 'd', 'e'}, 'b': {'a', 'c', 'd', + 'e'}, 'c': {'a', 'b', 'd', 'e'}, 'd': {'a', 'b', 'c', 'e'}, + 'e': {'a', 'b', 'c', 'd'}} + + # something related to real-world + I, P = D([('rat', 'real'), ('int', 'rat')]) + + assert I == {'int': {'rat', 'real'}, 'rat': {'real'}, + Not('real'): {Not('rat'), Not('int')}, Not('rat'): {Not('int')}} + assert P == {'rat': {'int', 'real'}, 'real': {'int', 'rat'}, + 'int': {'rat', 'real'}} + + +# TODO move me to appropriate place +def test_apply_beta_to_alpha_route(): + APPLY = apply_beta_to_alpha_route + + # indicates empty alpha-chain with attached beta-rule #bidx + def Q(bidx): + return (set(), [bidx]) + + # x -> a &(a,b) -> x -- x -> a + A = {'x': {'a'}} + B = [(And('a', 'b'), 'x')] + assert APPLY(A, B) == {'x': ({'a'}, []), 'a': Q(0), 'b': Q(0)} + + # x -> a &(a,!x) -> b -- x -> a + A = {'x': {'a'}} + B = [(And('a', Not('x')), 'b')] + assert APPLY(A, B) == {'x': ({'a'}, []), Not('x'): Q(0), 'a': Q(0)} + + # x -> a b &(a,b) -> c -- x -> a b c + A = {'x': {'a', 'b'}} + B = [(And('a', 'b'), 'c')] + assert APPLY(A, B) == \ + {'x': ({'a', 'b', 'c'}, []), 'a': Q(0), 'b': Q(0)} + + # x -> a &(a,b) -> y -- x -> a [#0] + A = {'x': {'a'}} + B = [(And('a', 'b'), 'y')] + assert APPLY(A, B) == {'x': ({'a'}, [0]), 'a': Q(0), 'b': Q(0)} + + # x -> a b c &(a,b) -> c -- x -> a b c + A = {'x': {'a', 'b', 'c'}} + B = [(And('a', 'b'), 'c')] + assert APPLY(A, B) == \ + {'x': ({'a', 'b', 'c'}, []), 'a': Q(0), 'b': Q(0)} + + # x -> a b &(a,b,c) -> y -- x -> a b [#0] + A = {'x': {'a', 'b'}} + B = [(And('a', 'b', 'c'), 'y')] + assert APPLY(A, B) == \ + {'x': ({'a', 'b'}, [0]), 'a': Q(0), 'b': Q(0), 'c': Q(0)} + + # x -> a b &(a,b) -> c -- x -> a b c d + # c -> d c -> d + A = {'x': {'a', 'b'}, 'c': {'d'}} + B = [(And('a', 'b'), 'c')] + assert APPLY(A, B) == {'x': ({'a', 'b', 'c', 'd'}, []), + 'c': ({'d'}, []), 'a': Q(0), 'b': Q(0)} + + # x -> a b &(a,b) -> c -- x -> a b c d e + # c -> d &(c,d) -> e c -> d e + A = {'x': {'a', 'b'}, 'c': {'d'}} + B = [(And('a', 'b'), 'c'), (And('c', 'd'), 'e')] + assert APPLY(A, B) == {'x': ({'a', 'b', 'c', 'd', 'e'}, []), + 'c': ({'d', 'e'}, []), 'a': Q(0), 'b': Q(0), 'd': Q(1)} + + # x -> a b &(a,y) -> z -- x -> a b y z + # &(a,b) -> y + A = {'x': {'a', 'b'}} + B = [(And('a', 'y'), 'z'), (And('a', 'b'), 'y')] + assert APPLY(A, B) == {'x': ({'a', 'b', 'y', 'z'}, []), + 'a': (set(), [0, 1]), 'y': Q(0), 'b': Q(1)} + + # x -> a b &(a,!b) -> c -- x -> a b + A = {'x': {'a', 'b'}} + B = [(And('a', Not('b')), 'c')] + assert APPLY(A, B) == \ + {'x': ({'a', 'b'}, []), 'a': Q(0), Not('b'): Q(0)} + + # !x -> !a !b &(!a,b) -> c -- !x -> !a !b + A = {Not('x'): {Not('a'), Not('b')}} + B = [(And(Not('a'), 'b'), 'c')] + assert APPLY(A, B) == \ + {Not('x'): ({Not('a'), Not('b')}, []), Not('a'): Q(0), 'b': Q(0)} + + # x -> a b &(b,c) -> !a -- x -> a b + A = {'x': {'a', 'b'}} + B = [(And('b', 'c'), Not('a'))] + assert APPLY(A, B) == {'x': ({'a', 'b'}, []), 'b': Q(0), 'c': Q(0)} + + # x -> a b &(a, b) -> c -- x -> a b c p + # c -> p a + A = {'x': {'a', 'b'}, 'c': {'p', 'a'}} + B = [(And('a', 'b'), 'c')] + assert APPLY(A, B) == {'x': ({'a', 'b', 'c', 'p'}, []), + 'c': ({'p', 'a'}, []), 'a': Q(0), 'b': Q(0)} + + +def test_FactRules_parse(): + f = FactRules('a -> b') + assert f.prereq == {'b': {'a'}, 'a': {'b'}} + + f = FactRules('a -> !b') + assert f.prereq == {'b': {'a'}, 'a': {'b'}} + + f = FactRules('!a -> b') + assert f.prereq == {'b': {'a'}, 'a': {'b'}} + + f = FactRules('!a -> !b') + assert f.prereq == {'b': {'a'}, 'a': {'b'}} + + f = FactRules('!z == nz') + assert f.prereq == {'z': {'nz'}, 'nz': {'z'}} + + +def test_FactRules_parse2(): + raises(ValueError, lambda: FactRules('a -> !a')) + + +def test_FactRules_deduce(): + f = FactRules(['a -> b', 'b -> c', 'b -> d', 'c -> e']) + + def D(facts): + kb = FactKB(f) + kb.deduce_all_facts(facts) + return kb + + assert D({'a': T}) == {'a': T, 'b': T, 'c': T, 'd': T, 'e': T} + assert D({'b': T}) == { 'b': T, 'c': T, 'd': T, 'e': T} + assert D({'c': T}) == { 'c': T, 'e': T} + assert D({'d': T}) == { 'd': T } + assert D({'e': T}) == { 'e': T} + + assert D({'a': F}) == {'a': F } + assert D({'b': F}) == {'a': F, 'b': F } + assert D({'c': F}) == {'a': F, 'b': F, 'c': F } + assert D({'d': F}) == {'a': F, 'b': F, 'd': F } + + assert D({'a': U}) == {'a': U} # XXX ok? + + +def test_FactRules_deduce2(): + # pos/neg/zero, but the rules are not sufficient to derive all relations + f = FactRules(['pos -> !neg', 'pos -> !z']) + + def D(facts): + kb = FactKB(f) + kb.deduce_all_facts(facts) + return kb + + assert D({'pos': T}) == {'pos': T, 'neg': F, 'z': F} + assert D({'pos': F}) == {'pos': F } + assert D({'neg': T}) == {'pos': F, 'neg': T } + assert D({'neg': F}) == { 'neg': F } + assert D({'z': T}) == {'pos': F, 'z': T} + assert D({'z': F}) == { 'z': F} + + # pos/neg/zero. rules are sufficient to derive all relations + f = FactRules(['pos -> !neg', 'neg -> !pos', 'pos -> !z', 'neg -> !z']) + + assert D({'pos': T}) == {'pos': T, 'neg': F, 'z': F} + assert D({'pos': F}) == {'pos': F } + assert D({'neg': T}) == {'pos': F, 'neg': T, 'z': F} + assert D({'neg': F}) == { 'neg': F } + assert D({'z': T}) == {'pos': F, 'neg': F, 'z': T} + assert D({'z': F}) == { 'z': F} + + +def test_FactRules_deduce_multiple(): + # deduction that involves _several_ starting points + f = FactRules(['real == pos | npos']) + + def D(facts): + kb = FactKB(f) + kb.deduce_all_facts(facts) + return kb + + assert D({'real': T}) == {'real': T} + assert D({'real': F}) == {'real': F, 'pos': F, 'npos': F} + assert D({'pos': T}) == {'real': T, 'pos': T} + assert D({'npos': T}) == {'real': T, 'npos': T} + + # --- key tests below --- + assert D({'pos': F, 'npos': F}) == {'real': F, 'pos': F, 'npos': F} + assert D({'real': T, 'pos': F}) == {'real': T, 'pos': F, 'npos': T} + assert D({'real': T, 'npos': F}) == {'real': T, 'pos': T, 'npos': F} + + assert D({'pos': T, 'npos': F}) == {'real': T, 'pos': T, 'npos': F} + assert D({'pos': F, 'npos': T}) == {'real': T, 'pos': F, 'npos': T} + + +def test_FactRules_deduce_multiple2(): + f = FactRules(['real == neg | zero | pos']) + + def D(facts): + kb = FactKB(f) + kb.deduce_all_facts(facts) + return kb + + assert D({'real': T}) == {'real': T} + assert D({'real': F}) == {'real': F, 'neg': F, 'zero': F, 'pos': F} + assert D({'neg': T}) == {'real': T, 'neg': T} + assert D({'zero': T}) == {'real': T, 'zero': T} + assert D({'pos': T}) == {'real': T, 'pos': T} + + # --- key tests below --- + assert D({'neg': F, 'zero': F, 'pos': F}) == {'real': F, 'neg': F, + 'zero': F, 'pos': F} + assert D({'real': T, 'neg': F}) == {'real': T, 'neg': F} + assert D({'real': T, 'zero': F}) == {'real': T, 'zero': F} + assert D({'real': T, 'pos': F}) == {'real': T, 'pos': F} + + assert D({'real': T, 'zero': F, 'pos': F}) == {'real': T, + 'neg': T, 'zero': F, 'pos': F} + assert D({'real': T, 'neg': F, 'pos': F}) == {'real': T, + 'neg': F, 'zero': T, 'pos': F} + assert D({'real': T, 'neg': F, 'zero': F }) == {'real': T, + 'neg': F, 'zero': F, 'pos': T} + + assert D({'neg': T, 'zero': F, 'pos': F}) == {'real': T, 'neg': T, + 'zero': F, 'pos': F} + assert D({'neg': F, 'zero': T, 'pos': F}) == {'real': T, 'neg': F, + 'zero': T, 'pos': F} + assert D({'neg': F, 'zero': F, 'pos': T}) == {'real': T, 'neg': F, + 'zero': F, 'pos': T} + + +def test_FactRules_deduce_base(): + # deduction that starts from base + + f = FactRules(['real == neg | zero | pos', + 'neg -> real & !zero & !pos', + 'pos -> real & !zero & !neg']) + base = FactKB(f) + + base.deduce_all_facts({'real': T, 'neg': F}) + assert base == {'real': T, 'neg': F} + + base.deduce_all_facts({'zero': F}) + assert base == {'real': T, 'neg': F, 'zero': F, 'pos': T} + + +def test_FactRules_deduce_staticext(): + # verify that static beta-extensions deduction takes place + f = FactRules(['real == neg | zero | pos', + 'neg -> real & !zero & !pos', + 'pos -> real & !zero & !neg', + 'nneg == real & !neg', + 'npos == real & !pos']) + + assert ('npos', True) in f.full_implications[('neg', True)] + assert ('nneg', True) in f.full_implications[('pos', True)] + assert ('nneg', True) in f.full_implications[('zero', True)] + assert ('npos', True) in f.full_implications[('zero', True)] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_function.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_function.py new file mode 100644 index 0000000000000000000000000000000000000000..a69c6b81b786ab0f0592367eaf402c2165a615dc --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_function.py @@ -0,0 +1,1459 @@ +from sympy.concrete.summations import Sum +from sympy.core.basic import Basic, _aresame +from sympy.core.cache import clear_cache +from sympy.core.containers import Dict, Tuple +from sympy.core.expr import Expr, unchanged +from sympy.core.function import (Subs, Function, diff, Lambda, expand, + nfloat, Derivative) +from sympy.core.numbers import E, Float, zoo, Rational, pi, I, oo, nan +from sympy.core.power import Pow +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import symbols, Dummy, Symbol +from sympy.functions.elementary.complexes import im, re +from sympy.functions.elementary.exponential import log, exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import sin, cos, acos +from sympy.functions.special.error_functions import expint +from sympy.functions.special.gamma_functions import loggamma, polygamma +from sympy.matrices.dense import Matrix +from sympy.printing.str import sstr +from sympy.series.order import O +from sympy.tensor.indexed import Indexed +from sympy.core.function import (PoleError, _mexpand, arity, + BadSignatureError, BadArgumentsError) +from sympy.core.parameters import _exp_is_pow +from sympy.core.sympify import sympify, SympifyError +from sympy.matrices import MutableMatrix, ImmutableMatrix +from sympy.sets.sets import FiniteSet +from sympy.solvers.solveset import solveset +from sympy.tensor.array import NDimArray +from sympy.utilities.iterables import subsets, variations +from sympy.testing.pytest import XFAIL, raises, warns_deprecated_sympy, _both_exp_pow + +from sympy.abc import t, w, x, y, z +f, g, h = symbols('f g h', cls=Function) +_xi_1, _xi_2, _xi_3 = [Dummy() for i in range(3)] + +def test_f_expand_complex(): + x = Symbol('x', real=True) + + assert f(x).expand(complex=True) == I*im(f(x)) + re(f(x)) + assert exp(x).expand(complex=True) == exp(x) + assert exp(I*x).expand(complex=True) == cos(x) + I*sin(x) + assert exp(z).expand(complex=True) == cos(im(z))*exp(re(z)) + \ + I*sin(im(z))*exp(re(z)) + + +def test_bug1(): + e = sqrt(-log(w)) + assert e.subs(log(w), -x) == sqrt(x) + + e = sqrt(-5*log(w)) + assert e.subs(log(w), -x) == sqrt(5*x) + + +def test_general_function(): + nu = Function('nu') + + e = nu(x) + edx = e.diff(x) + edy = e.diff(y) + edxdx = e.diff(x).diff(x) + edxdy = e.diff(x).diff(y) + assert e == nu(x) + assert edx != nu(x) + assert edx == diff(nu(x), x) + assert edy == 0 + assert edxdx == diff(diff(nu(x), x), x) + assert edxdy == 0 + +def test_general_function_nullary(): + nu = Function('nu') + + e = nu() + edx = e.diff(x) + edxdx = e.diff(x).diff(x) + assert e == nu() + assert edx != nu() + assert edx == 0 + assert edxdx == 0 + + +def test_derivative_subs_bug(): + e = diff(g(x), x) + assert e.subs(g(x), f(x)) != e + assert e.subs(g(x), f(x)) == Derivative(f(x), x) + assert e.subs(g(x), -f(x)) == Derivative(-f(x), x) + + assert e.subs(x, y) == Derivative(g(y), y) + + +def test_derivative_subs_self_bug(): + d = diff(f(x), x) + + assert d.subs(d, y) == y + + +def test_derivative_linearity(): + assert diff(-f(x), x) == -diff(f(x), x) + assert diff(8*f(x), x) == 8*diff(f(x), x) + assert diff(8*f(x), x) != 7*diff(f(x), x) + assert diff(8*f(x)*x, x) == 8*f(x) + 8*x*diff(f(x), x) + assert diff(8*f(x)*y*x, x).expand() == 8*y*f(x) + 8*y*x*diff(f(x), x) + + +def test_derivative_evaluate(): + assert Derivative(sin(x), x) != diff(sin(x), x) + assert Derivative(sin(x), x).doit() == diff(sin(x), x) + + assert Derivative(Derivative(f(x), x), x) == diff(f(x), x, x) + assert Derivative(sin(x), x, 0) == sin(x) + assert Derivative(sin(x), (x, y), (x, -y)) == sin(x) + + +def test_diff_symbols(): + assert diff(f(x, y, z), x, y, z) == Derivative(f(x, y, z), x, y, z) + assert diff(f(x, y, z), x, x, x) == Derivative(f(x, y, z), x, x, x) == Derivative(f(x, y, z), (x, 3)) + assert diff(f(x, y, z), x, 3) == Derivative(f(x, y, z), x, 3) + + # issue 5028 + assert [diff(-z + x/y, sym) for sym in (z, x, y)] == [-1, 1/y, -x/y**2] + assert diff(f(x, y, z), x, y, z, 2) == Derivative(f(x, y, z), x, y, z, z) + assert diff(f(x, y, z), x, y, z, 2, evaluate=False) == \ + Derivative(f(x, y, z), x, y, z, z) + assert Derivative(f(x, y, z), x, y, z)._eval_derivative(z) == \ + Derivative(f(x, y, z), x, y, z, z) + assert Derivative(Derivative(f(x, y, z), x), y)._eval_derivative(z) == \ + Derivative(f(x, y, z), x, y, z) + + raises(TypeError, lambda: cos(x).diff((x, y)).variables) + assert cos(x).diff((x, y))._wrt_variables == [x] + + # issue 23222 + assert sympify("a*x+b").diff("x") == sympify("a") + +def test_Function(): + class myfunc(Function): + @classmethod + def eval(cls): # zero args + return + + assert myfunc.nargs == FiniteSet(0) + assert myfunc().nargs == FiniteSet(0) + raises(TypeError, lambda: myfunc(x).nargs) + + class myfunc(Function): + @classmethod + def eval(cls, x): # one arg + return + + assert myfunc.nargs == FiniteSet(1) + assert myfunc(x).nargs == FiniteSet(1) + raises(TypeError, lambda: myfunc(x, y).nargs) + + class myfunc(Function): + @classmethod + def eval(cls, *x): # star args + return + + assert myfunc.nargs == S.Naturals0 + assert myfunc(x).nargs == S.Naturals0 + + +def test_nargs(): + f = Function('f') + assert f.nargs == S.Naturals0 + assert f(1).nargs == S.Naturals0 + assert Function('f', nargs=2)(1, 2).nargs == FiniteSet(2) + assert sin.nargs == FiniteSet(1) + assert sin(2).nargs == FiniteSet(1) + assert log.nargs == FiniteSet(1, 2) + assert log(2).nargs == FiniteSet(1, 2) + assert Function('f', nargs=2).nargs == FiniteSet(2) + assert Function('f', nargs=0).nargs == FiniteSet(0) + assert Function('f', nargs=(0, 1)).nargs == FiniteSet(0, 1) + assert Function('f', nargs=None).nargs == S.Naturals0 + raises(ValueError, lambda: Function('f', nargs=())) + +def test_nargs_inheritance(): + class f1(Function): + nargs = 2 + class f2(f1): + pass + class f3(f2): + pass + class f4(f3): + nargs = 1,2 + class f5(f4): + pass + class f6(f5): + pass + class f7(f6): + nargs=None + class f8(f7): + pass + class f9(f8): + pass + class f10(f9): + nargs = 1 + class f11(f10): + pass + assert f1.nargs == FiniteSet(2) + assert f2.nargs == FiniteSet(2) + assert f3.nargs == FiniteSet(2) + assert f4.nargs == FiniteSet(1, 2) + assert f5.nargs == FiniteSet(1, 2) + assert f6.nargs == FiniteSet(1, 2) + assert f7.nargs == S.Naturals0 + assert f8.nargs == S.Naturals0 + assert f9.nargs == S.Naturals0 + assert f10.nargs == FiniteSet(1) + assert f11.nargs == FiniteSet(1) + +def test_arity(): + f = lambda x, y: 1 + assert arity(f) == 2 + def f(x, y, z=None): + pass + assert arity(f) == (2, 3) + assert arity(lambda *x: x) is None + assert arity(log) == (1, 2) + + +def test_Lambda(): + e = Lambda(x, x**2) + assert e(4) == 16 + assert e(x) == x**2 + assert e(y) == y**2 + + assert Lambda((), 42)() == 42 + assert unchanged(Lambda, (), 42) + assert Lambda((), 42) != Lambda((), 43) + assert Lambda((), f(x))() == f(x) + assert Lambda((), 42).nargs == FiniteSet(0) + + assert unchanged(Lambda, (x,), x**2) + assert Lambda(x, x**2) == Lambda((x,), x**2) + assert Lambda(x, x**2) != Lambda(x, x**2 + 1) + assert Lambda((x, y), x**y) != Lambda((y, x), y**x) + assert Lambda((x, y), x**y) != Lambda((x, y), y**x) + + assert Lambda((x, y), x**y)(x, y) == x**y + assert Lambda((x, y), x**y)(3, 3) == 3**3 + assert Lambda((x, y), x**y)(x, 3) == x**3 + assert Lambda((x, y), x**y)(3, y) == 3**y + assert Lambda(x, f(x))(x) == f(x) + assert Lambda(x, x**2)(e(x)) == x**4 + assert e(e(x)) == x**4 + + x1, x2 = (Indexed('x', i) for i in (1, 2)) + assert Lambda((x1, x2), x1 + x2)(x, y) == x + y + + assert Lambda((x, y), x + y).nargs == FiniteSet(2) + + p = x, y, z, t + assert Lambda(p, t*(x + y + z))(*p) == t * (x + y + z) + + eq = Lambda(x, 2*x) + Lambda(y, 2*y) + assert eq != 2*Lambda(x, 2*x) + assert eq.as_dummy() == 2*Lambda(x, 2*x).as_dummy() + assert Lambda(x, 2*x) not in [ Lambda(x, x) ] + raises(BadSignatureError, lambda: Lambda(1, x)) + assert Lambda(x, 1)(1) is S.One + + raises(BadSignatureError, lambda: Lambda((x, x), x + 2)) + raises(BadSignatureError, lambda: Lambda(((x, x), y), x)) + raises(BadSignatureError, lambda: Lambda(((y, x), x), x)) + raises(BadSignatureError, lambda: Lambda(((y, 1), 2), x)) + + with warns_deprecated_sympy(): + assert Lambda([x, y], x+y) == Lambda((x, y), x+y) + + flam = Lambda(((x, y),), x + y) + assert flam((2, 3)) == 5 + flam = Lambda(((x, y), z), x + y + z) + assert flam((2, 3), 1) == 6 + flam = Lambda((((x, y), z),), x + y + z) + assert flam(((2, 3), 1)) == 6 + raises(BadArgumentsError, lambda: flam(1, 2, 3)) + flam = Lambda( (x,), (x, x)) + assert flam(1,) == (1, 1) + assert flam((1,)) == ((1,), (1,)) + flam = Lambda( ((x,),), (x, x)) + raises(BadArgumentsError, lambda: flam(1)) + assert flam((1,)) == (1, 1) + + # Previously TypeError was raised so this is potentially needed for + # backwards compatibility. + assert issubclass(BadSignatureError, TypeError) + assert issubclass(BadArgumentsError, TypeError) + + # These are tested to see they don't raise: + hash(Lambda(x, 2*x)) + hash(Lambda(x, x)) # IdentityFunction subclass + + +def test_IdentityFunction(): + assert Lambda(x, x) is Lambda(y, y) is S.IdentityFunction + assert Lambda(x, 2*x) is not S.IdentityFunction + assert Lambda((x, y), x) is not S.IdentityFunction + + +def test_Lambda_symbols(): + assert Lambda(x, 2*x).free_symbols == set() + assert Lambda(x, x*y).free_symbols == {y} + assert Lambda((), 42).free_symbols == set() + assert Lambda((), x*y).free_symbols == {x,y} + + +def test_functionclas_symbols(): + assert f.free_symbols == set() + + +def test_Lambda_arguments(): + raises(TypeError, lambda: Lambda(x, 2*x)(x, y)) + raises(TypeError, lambda: Lambda((x, y), x + y)(x)) + raises(TypeError, lambda: Lambda((), 42)(x)) + + +def test_Lambda_equality(): + assert Lambda((x, y), 2*x) == Lambda((x, y), 2*x) + # these, of course, should never be equal + assert Lambda(x, 2*x) != Lambda((x, y), 2*x) + assert Lambda(x, 2*x) != 2*x + # But it is tempting to want expressions that differ only + # in bound symbols to compare the same. But this is not what + # Python's `==` is intended to do; two objects that compare + # as equal means that they are indistibguishable and cache to the + # same value. We wouldn't want to expression that are + # mathematically the same but written in different variables to be + # interchanged else what is the point of allowing for different + # variable names? + assert Lambda(x, 2*x) != Lambda(y, 2*y) + + +def test_Subs(): + assert Subs(1, (), ()) is S.One + # check null subs influence on hashing + assert Subs(x, y, z) != Subs(x, y, 1) + # neutral subs works + assert Subs(x, x, 1).subs(x, y).has(y) + # self mapping var/point + assert Subs(Derivative(f(x), (x, 2)), x, x).doit() == f(x).diff(x, x) + assert Subs(x, x, 0).has(x) # it's a structural answer + assert not Subs(x, x, 0).free_symbols + assert Subs(Subs(x + y, x, 2), y, 1) == Subs(x + y, (x, y), (2, 1)) + assert Subs(x, (x,), (0,)) == Subs(x, x, 0) + assert Subs(x, x, 0) == Subs(y, y, 0) + assert Subs(x, x, 0).subs(x, 1) == Subs(x, x, 0) + assert Subs(y, x, 0).subs(y, 1) == Subs(1, x, 0) + assert Subs(f(x), x, 0).doit() == f(0) + assert Subs(f(x**2), x**2, 0).doit() == f(0) + assert Subs(f(x, y, z), (x, y, z), (0, 1, 1)) != \ + Subs(f(x, y, z), (x, y, z), (0, 0, 1)) + assert Subs(x, y, 2).subs(x, y).doit() == 2 + assert Subs(f(x, y), (x, y, z), (0, 1, 1)) != \ + Subs(f(x, y) + z, (x, y, z), (0, 1, 0)) + assert Subs(f(x, y), (x, y), (0, 1)).doit() == f(0, 1) + assert Subs(Subs(f(x, y), x, 0), y, 1).doit() == f(0, 1) + raises(ValueError, lambda: Subs(f(x, y), (x, y), (0, 0, 1))) + raises(ValueError, lambda: Subs(f(x, y), (x, x, y), (0, 0, 1))) + + assert len(Subs(f(x, y), (x, y), (0, 1)).variables) == 2 + assert Subs(f(x, y), (x, y), (0, 1)).point == Tuple(0, 1) + + assert Subs(f(x), x, 0) == Subs(f(y), y, 0) + assert Subs(f(x, y), (x, y), (0, 1)) == Subs(f(x, y), (y, x), (1, 0)) + assert Subs(f(x)*y, (x, y), (0, 1)) == Subs(f(y)*x, (y, x), (0, 1)) + assert Subs(f(x)*y, (x, y), (1, 1)) == Subs(f(y)*x, (x, y), (1, 1)) + + assert Subs(f(x), x, 0).subs(x, 1).doit() == f(0) + assert Subs(f(x), x, y).subs(y, 0) == Subs(f(x), x, 0) + assert Subs(y*f(x), x, y).subs(y, 2) == Subs(2*f(x), x, 2) + assert (2 * Subs(f(x), x, 0)).subs(Subs(f(x), x, 0), y) == 2*y + + assert Subs(f(x), x, 0).free_symbols == set() + assert Subs(f(x, y), x, z).free_symbols == {y, z} + + assert Subs(f(x).diff(x), x, 0).doit(), Subs(f(x).diff(x), x, 0) + assert Subs(1 + f(x).diff(x), x, 0).doit(), 1 + Subs(f(x).diff(x), x, 0) + assert Subs(y*f(x, y).diff(x), (x, y), (0, 2)).doit() == \ + 2*Subs(Derivative(f(x, 2), x), x, 0) + assert Subs(y**2*f(x), x, 0).diff(y) == 2*y*f(0) + + e = Subs(y**2*f(x), x, y) + assert e.diff(y) == e.doit().diff(y) == y**2*Derivative(f(y), y) + 2*y*f(y) + + assert Subs(f(x), x, 0) + Subs(f(x), x, 0) == 2*Subs(f(x), x, 0) + e1 = Subs(z*f(x), x, 1) + e2 = Subs(z*f(y), y, 1) + assert e1 + e2 == 2*e1 + assert e1.__hash__() == e2.__hash__() + assert Subs(z*f(x + 1), x, 1) not in [ e1, e2 ] + assert Derivative(f(x), x).subs(x, g(x)) == Derivative(f(g(x)), g(x)) + assert Derivative(f(x), x).subs(x, x + y) == Subs(Derivative(f(x), x), + x, x + y) + assert Subs(f(x)*cos(y) + z, (x, y), (0, pi/3)).n(2) == \ + Subs(f(x)*cos(y) + z, (x, y), (0, pi/3)).evalf(2) == \ + z + Rational('1/2').n(2)*f(0) + + assert f(x).diff(x).subs(x, 0).subs(x, y) == f(x).diff(x).subs(x, 0) + assert (x*f(x).diff(x).subs(x, 0)).subs(x, y) == y*f(x).diff(x).subs(x, 0) + assert Subs(Derivative(g(x)**2, g(x), x), g(x), exp(x) + ).doit() == 2*exp(x) + assert Subs(Derivative(g(x)**2, g(x), x), g(x), exp(x) + ).doit(deep=False) == 2*Derivative(exp(x), x) + assert Derivative(f(x, g(x)), x).doit() == Derivative( + f(x, g(x)), g(x))*Derivative(g(x), x) + Subs(Derivative( + f(y, g(x)), y), y, x) + +def test_doitdoit(): + done = Derivative(f(x, g(x)), x, g(x)).doit() + assert done == done.doit() + + +@XFAIL +def test_Subs2(): + # this reflects a limitation of subs(), probably won't fix + assert Subs(f(x), x**2, x).doit() == f(sqrt(x)) + + +def test_expand_function(): + assert expand(x + y) == x + y + assert expand(x + y, complex=True) == I*im(x) + I*im(y) + re(x) + re(y) + assert expand((x + y)**11, modulus=11) == x**11 + y**11 + + +def test_function_comparable(): + assert sin(x).is_comparable is False + assert cos(x).is_comparable is False + + assert sin(Float('0.1')).is_comparable is True + assert cos(Float('0.1')).is_comparable is True + + assert sin(E).is_comparable is True + assert cos(E).is_comparable is True + + assert sin(Rational(1, 3)).is_comparable is True + assert cos(Rational(1, 3)).is_comparable is True + + +def test_function_comparable_infinities(): + assert sin(oo).is_comparable is False + assert sin(-oo).is_comparable is False + assert sin(zoo).is_comparable is False + assert sin(nan).is_comparable is False + + +def test_deriv1(): + # These all require derivatives evaluated at a point (issue 4719) to work. + # See issue 4624 + assert f(2*x).diff(x) == 2*Subs(Derivative(f(x), x), x, 2*x) + assert (f(x)**3).diff(x) == 3*f(x)**2*f(x).diff(x) + assert (f(2*x)**3).diff(x) == 6*f(2*x)**2*Subs( + Derivative(f(x), x), x, 2*x) + + assert f(2 + x).diff(x) == Subs(Derivative(f(x), x), x, x + 2) + assert f(2 + 3*x).diff(x) == 3*Subs( + Derivative(f(x), x), x, 3*x + 2) + assert f(3*sin(x)).diff(x) == 3*cos(x)*Subs( + Derivative(f(x), x), x, 3*sin(x)) + + # See issue 8510 + assert f(x, x + z).diff(x) == ( + Subs(Derivative(f(y, x + z), y), y, x) + + Subs(Derivative(f(x, y), y), y, x + z)) + assert f(x, x**2).diff(x) == ( + 2*x*Subs(Derivative(f(x, y), y), y, x**2) + + Subs(Derivative(f(y, x**2), y), y, x)) + # but Subs is not always necessary + assert f(x, g(y)).diff(g(y)) == Derivative(f(x, g(y)), g(y)) + + +def test_deriv2(): + assert (x**3).diff(x) == 3*x**2 + assert (x**3).diff(x, evaluate=False) != 3*x**2 + assert (x**3).diff(x, evaluate=False) == Derivative(x**3, x) + + assert diff(x**3, x) == 3*x**2 + assert diff(x**3, x, evaluate=False) != 3*x**2 + assert diff(x**3, x, evaluate=False) == Derivative(x**3, x) + + +def test_func_deriv(): + assert f(x).diff(x) == Derivative(f(x), x) + # issue 4534 + assert f(x, y).diff(x, y) - f(x, y).diff(y, x) == 0 + assert Derivative(f(x, y), x, y).args[1:] == ((x, 1), (y, 1)) + assert Derivative(f(x, y), y, x).args[1:] == ((y, 1), (x, 1)) + assert (Derivative(f(x, y), x, y) - Derivative(f(x, y), y, x)).doit() == 0 + + +def test_suppressed_evaluation(): + a = sin(0, evaluate=False) + assert a != 0 + assert a.func is sin + assert a.args == (0,) + + +def test_function_evalf(): + def eq(a, b, eps): + return abs(a - b) < eps + assert eq(sin(1).evalf(15), Float("0.841470984807897"), 1e-13) + assert eq( + sin(2).evalf(25), Float("0.9092974268256816953960199", 25), 1e-23) + assert eq(sin(1 + I).evalf( + 15), Float("1.29845758141598") + Float("0.634963914784736")*I, 1e-13) + assert eq(exp(1 + I).evalf(15), Float( + "1.46869393991588") + Float("2.28735528717884239")*I, 1e-13) + assert eq(exp(-0.5 + 1.5*I).evalf(15), Float( + "0.0429042815937374") + Float("0.605011292285002")*I, 1e-13) + assert eq(log(pi + sqrt(2)*I).evalf( + 15), Float("1.23699044022052") + Float("0.422985442737893")*I, 1e-13) + assert eq(cos(100).evalf(15), Float("0.86231887228768"), 1e-13) + + +def test_extensibility_eval(): + class MyFunc(Function): + @classmethod + def eval(cls, *args): + return (0, 0, 0) + assert MyFunc(0) == (0, 0, 0) + + +@_both_exp_pow +def test_function_non_commutative(): + x = Symbol('x', commutative=False) + assert f(x).is_commutative is False + assert sin(x).is_commutative is False + assert exp(x).is_commutative is False + assert log(x).is_commutative is False + assert f(x).is_complex is False + assert sin(x).is_complex is False + assert exp(x).is_complex is False + assert log(x).is_complex is False + + +def test_function_complex(): + x = Symbol('x', complex=True) + xzf = Symbol('x', complex=True, zero=False) + assert f(x).is_commutative is True + assert sin(x).is_commutative is True + assert exp(x).is_commutative is True + assert log(x).is_commutative is True + assert f(x).is_complex is None + assert sin(x).is_complex is True + assert exp(x).is_complex is True + assert log(x).is_complex is None + assert log(xzf).is_complex is True + + +def test_function__eval_nseries(): + n = Symbol('n') + + assert sin(x)._eval_nseries(x, 2, None) == x + O(x**2) + assert sin(x + 1)._eval_nseries(x, 2, None) == x*cos(1) + sin(1) + O(x**2) + assert sin(pi*(1 - x))._eval_nseries(x, 2, None) == pi*x + O(x**2) + assert acos(1 - x**2)._eval_nseries(x, 2, None) == sqrt(2)*sqrt(x**2) + O(x**2) + assert polygamma(n, x + 1)._eval_nseries(x, 2, None) == \ + polygamma(n, 1) + polygamma(n + 1, 1)*x + O(x**2) + raises(PoleError, lambda: sin(1/x)._eval_nseries(x, 2, None)) + assert acos(1 - x)._eval_nseries(x, 2, None) == sqrt(2)*sqrt(x) + sqrt(2)*x**(S(3)/2)/12 + O(x**2) + assert acos(1 + x)._eval_nseries(x, 2, None) == sqrt(2)*sqrt(-x) + sqrt(2)*(-x)**(S(3)/2)/12 + O(x**2) + assert loggamma(1/x)._eval_nseries(x, 0, None) == \ + log(x)/2 - log(x)/x - 1/x + O(1, x) + assert loggamma(log(1/x)).nseries(x, n=1, logx=y) == loggamma(-y) + + # issue 6725: + assert expint(Rational(3, 2), -x)._eval_nseries(x, 5, None) == \ + 2 - 2*x - x**2/3 - x**3/15 - x**4/84 - 2*I*sqrt(pi)*sqrt(x) + O(x**5) + assert sin(sqrt(x))._eval_nseries(x, 3, None) == \ + sqrt(x) - x**Rational(3, 2)/6 + x**Rational(5, 2)/120 + O(x**3) + + # issue 19065: + s1 = f(x,y).series(y, n=2) + assert {i.name for i in s1.atoms(Symbol)} == {'x', 'xi', 'y'} + xi = Symbol('xi') + s2 = f(xi, y).series(y, n=2) + assert {i.name for i in s2.atoms(Symbol)} == {'xi', 'xi0', 'y'} + +def test_doit(): + n = Symbol('n', integer=True) + f = Sum(2 * n * x, (n, 1, 3)) + d = Derivative(f, x) + assert d.doit() == 12 + assert d.doit(deep=False) == Sum(2*n, (n, 1, 3)) + + +def test_evalf_default(): + from sympy.functions.special.gamma_functions import polygamma + assert type(sin(4.0)) == Float + assert type(re(sin(I + 1.0))) == Float + assert type(im(sin(I + 1.0))) == Float + assert type(sin(4)) == sin + assert type(polygamma(2.0, 4.0)) == Float + assert type(sin(Rational(1, 4))) == sin + + +def test_issue_5399(): + args = [x, y, S(2), S.Half] + + def ok(a): + """Return True if the input args for diff are ok""" + if not a: + return False + if a[0].is_Symbol is False: + return False + s_at = [i for i in range(len(a)) if a[i].is_Symbol] + n_at = [i for i in range(len(a)) if not a[i].is_Symbol] + # every symbol is followed by symbol or int + # every number is followed by a symbol + return (all(a[i + 1].is_Symbol or a[i + 1].is_Integer + for i in s_at if i + 1 < len(a)) and + all(a[i + 1].is_Symbol + for i in n_at if i + 1 < len(a))) + eq = x**10*y**8 + for a in subsets(args): + for v in variations(a, len(a)): + if ok(v): + eq.diff(*v) # does not raise + else: + raises(ValueError, lambda: eq.diff(*v)) + + +def test_derivative_numerically(): + z0 = x._random() + assert abs(Derivative(sin(x), x).doit_numerically(z0) - cos(z0)) < 1e-15 + + +def test_fdiff_argument_index_error(): + from sympy.core.function import ArgumentIndexError + + class myfunc(Function): + nargs = 1 # define since there is no eval routine + + def fdiff(self, idx): + raise ArgumentIndexError + mf = myfunc(x) + assert mf.diff(x) == Derivative(mf, x) + raises(TypeError, lambda: myfunc(x, x)) + + +def test_deriv_wrt_function(): + x = f(t) + xd = diff(x, t) + xdd = diff(xd, t) + y = g(t) + yd = diff(y, t) + + assert diff(x, t) == xd + assert diff(2 * x + 4, t) == 2 * xd + assert diff(2 * x + 4 + y, t) == 2 * xd + yd + assert diff(2 * x + 4 + y * x, t) == 2 * xd + x * yd + xd * y + assert diff(2 * x + 4 + y * x, x) == 2 + y + assert (diff(4 * x**2 + 3 * x + x * y, t) == 3 * xd + x * yd + xd * y + + 8 * x * xd) + assert (diff(4 * x**2 + 3 * xd + x * y, t) == 3 * xdd + x * yd + xd * y + + 8 * x * xd) + assert diff(4 * x**2 + 3 * xd + x * y, xd) == 3 + assert diff(4 * x**2 + 3 * xd + x * y, xdd) == 0 + assert diff(sin(x), t) == xd * cos(x) + assert diff(exp(x), t) == xd * exp(x) + assert diff(sqrt(x), t) == xd / (2 * sqrt(x)) + + +def test_diff_wrt_value(): + assert Expr()._diff_wrt is False + assert x._diff_wrt is True + assert f(x)._diff_wrt is True + assert Derivative(f(x), x)._diff_wrt is True + assert Derivative(x**2, x)._diff_wrt is False + + +def test_diff_wrt(): + fx = f(x) + dfx = diff(f(x), x) + ddfx = diff(f(x), x, x) + + assert diff(sin(fx) + fx**2, fx) == cos(fx) + 2*fx + assert diff(sin(dfx) + dfx**2, dfx) == cos(dfx) + 2*dfx + assert diff(sin(ddfx) + ddfx**2, ddfx) == cos(ddfx) + 2*ddfx + assert diff(fx**2, dfx) == 0 + assert diff(fx**2, ddfx) == 0 + assert diff(dfx**2, fx) == 0 + assert diff(dfx**2, ddfx) == 0 + assert diff(ddfx**2, dfx) == 0 + + assert diff(fx*dfx*ddfx, fx) == dfx*ddfx + assert diff(fx*dfx*ddfx, dfx) == fx*ddfx + assert diff(fx*dfx*ddfx, ddfx) == fx*dfx + + assert diff(f(x), x).diff(f(x)) == 0 + assert (sin(f(x)) - cos(diff(f(x), x))).diff(f(x)) == cos(f(x)) + + assert diff(sin(fx), fx, x) == diff(sin(fx), x, fx) + + # Chain rule cases + assert f(g(x)).diff(x) == \ + Derivative(g(x), x)*Derivative(f(g(x)), g(x)) + assert diff(f(g(x), h(y)), x) == \ + Derivative(g(x), x)*Derivative(f(g(x), h(y)), g(x)) + assert diff(f(g(x), h(x)), x) == ( + Derivative(f(g(x), h(x)), g(x))*Derivative(g(x), x) + + Derivative(f(g(x), h(x)), h(x))*Derivative(h(x), x)) + assert f( + sin(x)).diff(x) == cos(x)*Subs(Derivative(f(x), x), x, sin(x)) + + assert diff(f(g(x)), g(x)) == Derivative(f(g(x)), g(x)) + + +def test_diff_wrt_func_subs(): + assert f(g(x)).diff(x).subs(g, Lambda(x, 2*x)).doit() == f(2*x).diff(x) + + +def test_subs_in_derivative(): + expr = sin(x*exp(y)) + u = Function('u') + v = Function('v') + assert Derivative(expr, y).subs(expr, y) == Derivative(y, y) + assert Derivative(expr, y).subs(y, x).doit() == \ + Derivative(expr, y).doit().subs(y, x) + assert Derivative(f(x, y), y).subs(y, x) == Subs(Derivative(f(x, y), y), y, x) + assert Derivative(f(x, y), y).subs(x, y) == Subs(Derivative(f(x, y), y), x, y) + assert Derivative(f(x, y), y).subs(y, g(x, y)) == Subs(Derivative(f(x, y), y), y, g(x, y)).doit() + assert Derivative(f(x, y), y).subs(x, g(x, y)) == Subs(Derivative(f(x, y), y), x, g(x, y)) + assert Derivative(f(x, y), g(y)).subs(x, g(x, y)) == Derivative(f(g(x, y), y), g(y)) + assert Derivative(f(u(x), h(y)), h(y)).subs(h(y), g(x, y)) == \ + Subs(Derivative(f(u(x), h(y)), h(y)), h(y), g(x, y)).doit() + assert Derivative(f(x, y), y).subs(y, z) == Derivative(f(x, z), z) + assert Derivative(f(x, y), y).subs(y, g(y)) == Derivative(f(x, g(y)), g(y)) + assert Derivative(f(g(x), h(y)), h(y)).subs(h(y), u(y)) == \ + Derivative(f(g(x), u(y)), u(y)) + assert Derivative(f(x, f(x, x)), f(x, x)).subs( + f, Lambda((x, y), x + y)) == Subs( + Derivative(z + x, z), z, 2*x) + assert Subs(Derivative(f(f(x)), x), f, cos).doit() == sin(x)*sin(cos(x)) + assert Subs(Derivative(f(f(x)), f(x)), f, cos).doit() == -sin(cos(x)) + # Issue 13791. No comparison (it's a long formula) but this used to raise an exception. + assert isinstance(v(x, y, u(x, y)).diff(y).diff(x).diff(y), Expr) + # This is also related to issues 13791 and 13795; issue 15190 + F = Lambda((x, y), exp(2*x + 3*y)) + abstract = f(x, f(x, x)).diff(x, 2) + concrete = F(x, F(x, x)).diff(x, 2) + assert (abstract.subs(f, F).doit() - concrete).simplify() == 0 + # don't introduce a new symbol if not necessary + assert x in f(x).diff(x).subs(x, 0).atoms() + # case (4) + assert Derivative(f(x,f(x,y)), x, y).subs(x, g(y) + ) == Subs(Derivative(f(x, f(x, y)), x, y), x, g(y)) + + assert Derivative(f(x, x), x).subs(x, 0 + ) == Subs(Derivative(f(x, x), x), x, 0) + # issue 15194 + assert Derivative(f(y, g(x)), (x, z)).subs(z, x + ) == Derivative(f(y, g(x)), (x, x)) + + df = f(x).diff(x) + assert df.subs(df, 1) is S.One + assert df.diff(df) is S.One + dxy = Derivative(f(x, y), x, y) + dyx = Derivative(f(x, y), y, x) + assert dxy.subs(Derivative(f(x, y), y, x), 1) is S.One + assert dxy.diff(dyx) is S.One + assert Derivative(f(x, y), x, 2, y, 3).subs( + dyx, g(x, y)) == Derivative(g(x, y), x, 1, y, 2) + assert Derivative(f(x, x - y), y).subs(x, x + y) == Subs( + Derivative(f(x, x - y), y), x, x + y) + + +def test_diff_wrt_not_allowed(): + # issue 7027 included + for wrt in ( + cos(x), re(x), x**2, x*y, 1 + x, + Derivative(cos(x), x), Derivative(f(f(x)), x)): + raises(ValueError, lambda: diff(f(x), wrt)) + # if we don't differentiate wrt then don't raise error + assert diff(exp(x*y), x*y, 0) == exp(x*y) + + +def test_diff_wrt_intlike(): + class Two: + def __int__(self): + return 2 + + assert cos(x).diff(x, Two()) == -cos(x) + + +def test_klein_gordon_lagrangian(): + m = Symbol('m') + phi = f(x, t) + + L = -(diff(phi, t)**2 - diff(phi, x)**2 - m**2*phi**2)/2 + eqna = Eq( + diff(L, phi) - diff(L, diff(phi, x), x) - diff(L, diff(phi, t), t), 0) + eqnb = Eq(diff(phi, t, t) - diff(phi, x, x) + m**2*phi, 0) + assert eqna == eqnb + + +def test_sho_lagrangian(): + m = Symbol('m') + k = Symbol('k') + x = f(t) + + L = m*diff(x, t)**2/2 - k*x**2/2 + eqna = Eq(diff(L, x), diff(L, diff(x, t), t)) + eqnb = Eq(-k*x, m*diff(x, t, t)) + assert eqna == eqnb + + assert diff(L, x, t) == diff(L, t, x) + assert diff(L, diff(x, t), t) == m*diff(x, t, 2) + assert diff(L, t, diff(x, t)) == -k*x + m*diff(x, t, 2) + + +def test_straight_line(): + F = f(x) + Fd = F.diff(x) + L = sqrt(1 + Fd**2) + assert diff(L, F) == 0 + assert diff(L, Fd) == Fd/sqrt(1 + Fd**2) + + +def test_sort_variable(): + vsort = Derivative._sort_variable_count + def vsort0(*v, reverse=False): + return [i[0] for i in vsort([(i, 0) for i in ( + reversed(v) if reverse else v)])] + + for R in range(2): + assert vsort0(y, x, reverse=R) == [x, y] + assert vsort0(f(x), x, reverse=R) == [x, f(x)] + assert vsort0(f(y), f(x), reverse=R) == [f(x), f(y)] + assert vsort0(g(x), f(y), reverse=R) == [f(y), g(x)] + assert vsort0(f(x, y), f(x), reverse=R) == [f(x), f(x, y)] + fx = f(x).diff(x) + assert vsort0(fx, y, reverse=R) == [y, fx] + fy = f(y).diff(y) + assert vsort0(fy, fx, reverse=R) == [fx, fy] + fxx = fx.diff(x) + assert vsort0(fxx, fx, reverse=R) == [fx, fxx] + assert vsort0(Basic(x), f(x), reverse=R) == [f(x), Basic(x)] + assert vsort0(Basic(y), Basic(x), reverse=R) == [Basic(x), Basic(y)] + assert vsort0(Basic(y, z), Basic(x), reverse=R) == [ + Basic(x), Basic(y, z)] + assert vsort0(fx, x, reverse=R) == [ + x, fx] if R else [fx, x] + assert vsort0(Basic(x), x, reverse=R) == [ + x, Basic(x)] if R else [Basic(x), x] + assert vsort0(Basic(f(x)), f(x), reverse=R) == [ + f(x), Basic(f(x))] if R else [Basic(f(x)), f(x)] + assert vsort0(Basic(x, z), Basic(x), reverse=R) == [ + Basic(x), Basic(x, z)] if R else [Basic(x, z), Basic(x)] + assert vsort([]) == [] + assert _aresame(vsort([(x, 1)]), [Tuple(x, 1)]) + assert vsort([(x, y), (x, z)]) == [(x, y + z)] + assert vsort([(y, 1), (x, 1 + y)]) == [(x, 1 + y), (y, 1)] + # coverage complete; legacy tests below + assert vsort([(x, 3), (y, 2), (z, 1)]) == [(x, 3), (y, 2), (z, 1)] + assert vsort([(h(x), 1), (g(x), 1), (f(x), 1)]) == [ + (f(x), 1), (g(x), 1), (h(x), 1)] + assert vsort([(z, 1), (y, 2), (x, 3), (h(x), 1), (g(x), 1), + (f(x), 1)]) == [(x, 3), (y, 2), (z, 1), (f(x), 1), (g(x), 1), + (h(x), 1)] + assert vsort([(x, 1), (f(x), 1), (y, 1), (f(y), 1)]) == [(x, 1), + (y, 1), (f(x), 1), (f(y), 1)] + assert vsort([(y, 1), (x, 2), (g(x), 1), (f(x), 1), (z, 1), + (h(x), 1), (y, 2), (x, 1)]) == [(x, 3), (y, 3), (z, 1), + (f(x), 1), (g(x), 1), (h(x), 1)] + assert vsort([(z, 1), (y, 1), (f(x), 1), (x, 1), (f(x), 1), + (g(x), 1)]) == [(x, 1), (y, 1), (z, 1), (f(x), 2), (g(x), 1)] + assert vsort([(z, 1), (y, 2), (f(x), 1), (x, 2), (f(x), 2), + (g(x), 1), (z, 2), (z, 1), (y, 1), (x, 1)]) == [(x, 3), (y, 3), + (z, 4), (f(x), 3), (g(x), 1)] + assert vsort(((y, 2), (x, 1), (y, 1), (x, 1))) == [(x, 2), (y, 3)] + assert isinstance(vsort([(x, 3), (y, 2), (z, 1)])[0], Tuple) + assert vsort([(x, 1), (f(x), 1), (x, 1)]) == [(x, 2), (f(x), 1)] + assert vsort([(y, 2), (x, 3), (z, 1)]) == [(x, 3), (y, 2), (z, 1)] + assert vsort([(h(y), 1), (g(x), 1), (f(x), 1)]) == [ + (f(x), 1), (g(x), 1), (h(y), 1)] + assert vsort([(x, 1), (y, 1), (x, 1)]) == [(x, 2), (y, 1)] + assert vsort([(f(x), 1), (f(y), 1), (f(x), 1)]) == [ + (f(x), 2), (f(y), 1)] + dfx = f(x).diff(x) + self = [(dfx, 1), (x, 1)] + assert vsort(self) == self + assert vsort([ + (dfx, 1), (y, 1), (f(x), 1), (x, 1), (f(y), 1), (x, 1)]) == [ + (y, 1), (f(x), 1), (f(y), 1), (dfx, 1), (x, 2)] + dfy = f(y).diff(y) + assert vsort([(dfy, 1), (dfx, 1)]) == [(dfx, 1), (dfy, 1)] + d2fx = dfx.diff(x) + assert vsort([(d2fx, 1), (dfx, 1)]) == [(dfx, 1), (d2fx, 1)] + + +def test_multiple_derivative(): + # Issue #15007 + assert f(x, y).diff(y, y, x, y, x + ) == Derivative(f(x, y), (x, 2), (y, 3)) + + +def test_unhandled(): + class MyExpr(Expr): + def _eval_derivative(self, s): + if not s.name.startswith('xi'): + return self + else: + return None + + eq = MyExpr(f(x), y, z) + assert diff(eq, x, y, f(x), z) == Derivative(eq, f(x)) + assert diff(eq, f(x), x) == Derivative(eq, f(x)) + assert f(x, y).diff(x,(y, z)) == Derivative(f(x, y), x, (y, z)) + assert f(x, y).diff(x,(y, 0)) == Derivative(f(x, y), x) + + +def test_nfloat(): + from sympy.core.basic import _aresame + from sympy.polys.rootoftools import rootof + + x = Symbol("x") + eq = x**Rational(4, 3) + 4*x**(S.One/3)/3 + assert _aresame(nfloat(eq), x**Rational(4, 3) + (4.0/3)*x**(S.One/3)) + assert _aresame(nfloat(eq, exponent=True), x**(4.0/3) + (4.0/3)*x**(1.0/3)) + eq = x**Rational(4, 3) + 4*x**(x/3)/3 + assert _aresame(nfloat(eq), x**Rational(4, 3) + (4.0/3)*x**(x/3)) + big = 12345678901234567890 + # specify precision to match value used in nfloat + Float_big = Float(big, 15) + assert _aresame(nfloat(big), Float_big) + assert _aresame(nfloat(big*x), Float_big*x) + assert _aresame(nfloat(x**big, exponent=True), x**Float_big) + assert nfloat(cos(x + sqrt(2))) == cos(x + nfloat(sqrt(2))) + + # issue 6342 + f = S('x*lamda + lamda**3*(x/2 + 1/2) + lamda**2 + 1/4') + assert not any(a.free_symbols for a in solveset(f.subs(x, -0.139))) + + # issue 6632 + assert nfloat(-100000*sqrt(2500000001) + 5000000001) == \ + 9.99999999800000e-11 + + # issue 7122 + eq = cos(3*x**4 + y)*rootof(x**5 + 3*x**3 + 1, 0) + assert str(nfloat(eq, exponent=False, n=1)) == '-0.7*cos(3.0*x**4 + y)' + + # issue 10933 + for ti in (dict, Dict): + d = ti({S.Half: S.Half}) + n = nfloat(d) + assert isinstance(n, ti) + assert _aresame(list(n.items()).pop(), (S.Half, Float(.5))) + for ti in (dict, Dict): + d = ti({S.Half: S.Half}) + n = nfloat(d, dkeys=True) + assert isinstance(n, ti) + assert _aresame(list(n.items()).pop(), (Float(.5), Float(.5))) + d = [S.Half] + n = nfloat(d) + assert type(n) is list + assert _aresame(n[0], Float(.5)) + assert _aresame(nfloat(Eq(x, S.Half)).rhs, Float(.5)) + assert _aresame(nfloat(S(True)), S(True)) + assert _aresame(nfloat(Tuple(S.Half))[0], Float(.5)) + assert nfloat(Eq((3 - I)**2/2 + I, 0)) == S.false + # pass along kwargs + assert nfloat([{S.Half: x}], dkeys=True) == [{Float(0.5): x}] + + # Issue 17706 + A = MutableMatrix([[1, 2], [3, 4]]) + B = MutableMatrix( + [[Float('1.0', precision=53), Float('2.0', precision=53)], + [Float('3.0', precision=53), Float('4.0', precision=53)]]) + assert _aresame(nfloat(A), B) + A = ImmutableMatrix([[1, 2], [3, 4]]) + B = ImmutableMatrix( + [[Float('1.0', precision=53), Float('2.0', precision=53)], + [Float('3.0', precision=53), Float('4.0', precision=53)]]) + assert _aresame(nfloat(A), B) + + # issue 22524 + f = Function('f') + assert not nfloat(f(2)).atoms(Float) + + +def test_issue_7068(): + from sympy.abc import a, b + f = Function('f') + y1 = Dummy('y') + y2 = Dummy('y') + func1 = f(a + y1 * b) + func2 = f(a + y2 * b) + func1_y = func1.diff(y1) + func2_y = func2.diff(y2) + assert func1_y != func2_y + z1 = Subs(f(a), a, y1) + z2 = Subs(f(a), a, y2) + assert z1 != z2 + + +def test_issue_7231(): + from sympy.abc import a + ans1 = f(x).series(x, a) + res = (f(a) + (-a + x)*Subs(Derivative(f(y), y), y, a) + + (-a + x)**2*Subs(Derivative(f(y), y, y), y, a)/2 + + (-a + x)**3*Subs(Derivative(f(y), y, y, y), + y, a)/6 + + (-a + x)**4*Subs(Derivative(f(y), y, y, y, y), + y, a)/24 + + (-a + x)**5*Subs(Derivative(f(y), y, y, y, y, y), + y, a)/120 + O((-a + x)**6, (x, a))) + assert res == ans1 + ans2 = f(x).series(x, a) + assert res == ans2 + + +def test_issue_7687(): + from sympy.core.function import Function + from sympy.abc import x + f = Function('f')(x) + ff = Function('f')(x) + match_with_cache = ff.matches(f) + assert isinstance(f, type(ff)) + clear_cache() + ff = Function('f')(x) + assert isinstance(f, type(ff)) + assert match_with_cache == ff.matches(f) + + +def test_issue_7688(): + from sympy.core.function import Function, UndefinedFunction + + f = Function('f') # actually an UndefinedFunction + clear_cache() + class A(UndefinedFunction): + pass + a = A('f') + assert isinstance(a, type(f)) + + +def test_mexpand(): + from sympy.abc import x + assert _mexpand(None) is None + assert _mexpand(1) is S.One + assert _mexpand(x*(x + 1)**2) == (x*(x + 1)**2).expand() + + +def test_issue_8469(): + # This should not take forever to run + N = 40 + def g(w, theta): + return 1/(1+exp(w-theta)) + + ws = symbols(['w%i'%i for i in range(N)]) + import functools + expr = functools.reduce(g, ws) + assert isinstance(expr, Pow) + + +def test_issue_12996(): + # foo=True imitates the sort of arguments that Derivative can get + # from Integral when it passes doit to the expression + assert Derivative(im(x), x).doit(foo=True) == Derivative(im(x), x) + + +def test_should_evalf(): + # This should not take forever to run (see #8506) + assert isinstance(sin((1.0 + 1.0*I)**10000 + 1), sin) + + +def test_Derivative_as_finite_difference(): + # Central 1st derivative at gridpoint + x, h = symbols('x h', real=True) + dfdx = f(x).diff(x) + assert (dfdx.as_finite_difference([x-2, x-1, x, x+1, x+2]) - + (S.One/12*(f(x-2)-f(x+2)) + Rational(2, 3)*(f(x+1)-f(x-1)))).simplify() == 0 + + # Central 1st derivative "half-way" + assert (dfdx.as_finite_difference() - + (f(x + S.Half)-f(x - S.Half))).simplify() == 0 + assert (dfdx.as_finite_difference(h) - + (f(x + h/S(2))-f(x - h/S(2)))/h).simplify() == 0 + assert (dfdx.as_finite_difference([x - 3*h, x-h, x+h, x + 3*h]) - + (S(9)/(8*2*h)*(f(x+h) - f(x-h)) + + S.One/(24*2*h)*(f(x - 3*h) - f(x + 3*h)))).simplify() == 0 + + # One sided 1st derivative at gridpoint + assert (dfdx.as_finite_difference([0, 1, 2], 0) - + (Rational(-3, 2)*f(0) + 2*f(1) - f(2)/2)).simplify() == 0 + assert (dfdx.as_finite_difference([x, x+h], x) - + (f(x+h) - f(x))/h).simplify() == 0 + assert (dfdx.as_finite_difference([x-h, x, x+h], x-h) - + (-S(3)/(2*h)*f(x-h) + 2/h*f(x) - + S.One/(2*h)*f(x+h))).simplify() == 0 + + # One sided 1st derivative "half-way" + assert (dfdx.as_finite_difference([x-h, x+h, x + 3*h, x + 5*h, x + 7*h]) + - 1/(2*h)*(-S(11)/(12)*f(x-h) + S(17)/(24)*f(x+h) + + Rational(3, 8)*f(x + 3*h) - Rational(5, 24)*f(x + 5*h) + + S.One/24*f(x + 7*h))).simplify() == 0 + + d2fdx2 = f(x).diff(x, 2) + # Central 2nd derivative at gridpoint + assert (d2fdx2.as_finite_difference([x-h, x, x+h]) - + h**-2 * (f(x-h) + f(x+h) - 2*f(x))).simplify() == 0 + + assert (d2fdx2.as_finite_difference([x - 2*h, x-h, x, x+h, x + 2*h]) - + h**-2 * (Rational(-1, 12)*(f(x - 2*h) + f(x + 2*h)) + + Rational(4, 3)*(f(x+h) + f(x-h)) - Rational(5, 2)*f(x))).simplify() == 0 + + # Central 2nd derivative "half-way" + assert (d2fdx2.as_finite_difference([x - 3*h, x-h, x+h, x + 3*h]) - + (2*h)**-2 * (S.Half*(f(x - 3*h) + f(x + 3*h)) - + S.Half*(f(x+h) + f(x-h)))).simplify() == 0 + + # One sided 2nd derivative at gridpoint + assert (d2fdx2.as_finite_difference([x, x+h, x + 2*h, x + 3*h]) - + h**-2 * (2*f(x) - 5*f(x+h) + + 4*f(x+2*h) - f(x+3*h))).simplify() == 0 + + # One sided 2nd derivative at "half-way" + assert (d2fdx2.as_finite_difference([x-h, x+h, x + 3*h, x + 5*h]) - + (2*h)**-2 * (Rational(3, 2)*f(x-h) - Rational(7, 2)*f(x+h) + Rational(5, 2)*f(x + 3*h) - + S.Half*f(x + 5*h))).simplify() == 0 + + d3fdx3 = f(x).diff(x, 3) + # Central 3rd derivative at gridpoint + assert (d3fdx3.as_finite_difference() - + (-f(x - Rational(3, 2)) + 3*f(x - S.Half) - + 3*f(x + S.Half) + f(x + Rational(3, 2)))).simplify() == 0 + + assert (d3fdx3.as_finite_difference( + [x - 3*h, x - 2*h, x-h, x, x+h, x + 2*h, x + 3*h]) - + h**-3 * (S.One/8*(f(x - 3*h) - f(x + 3*h)) - f(x - 2*h) + + f(x + 2*h) + Rational(13, 8)*(f(x-h) - f(x+h)))).simplify() == 0 + + # Central 3rd derivative at "half-way" + assert (d3fdx3.as_finite_difference([x - 3*h, x-h, x+h, x + 3*h]) - + (2*h)**-3 * (f(x + 3*h)-f(x - 3*h) + + 3*(f(x-h)-f(x+h)))).simplify() == 0 + + # One sided 3rd derivative at gridpoint + assert (d3fdx3.as_finite_difference([x, x+h, x + 2*h, x + 3*h]) - + h**-3 * (f(x + 3*h)-f(x) + 3*(f(x+h)-f(x + 2*h)))).simplify() == 0 + + # One sided 3rd derivative at "half-way" + assert (d3fdx3.as_finite_difference([x-h, x+h, x + 3*h, x + 5*h]) - + (2*h)**-3 * (f(x + 5*h)-f(x-h) + + 3*(f(x+h)-f(x + 3*h)))).simplify() == 0 + + # issue 11007 + y = Symbol('y', real=True) + d2fdxdy = f(x, y).diff(x, y) + + ref0 = Derivative(f(x + S.Half, y), y) - Derivative(f(x - S.Half, y), y) + assert (d2fdxdy.as_finite_difference(wrt=x) - ref0).simplify() == 0 + + half = S.Half + xm, xp, ym, yp = x-half, x+half, y-half, y+half + ref2 = f(xm, ym) + f(xp, yp) - f(xp, ym) - f(xm, yp) + assert (d2fdxdy.as_finite_difference() - ref2).simplify() == 0 + + +def test_issue_11159(): + # Tests Application._eval_subs + with _exp_is_pow(False): + expr1 = E + expr0 = expr1 * expr1 + expr1 = expr0.subs(expr1,expr0) + assert expr0 == expr1 + with _exp_is_pow(True): + expr1 = E + expr0 = expr1 * expr1 + expr2 = expr0.subs(expr1, expr0) + assert expr2 == E ** 4 + + +def test_issue_12005(): + e1 = Subs(Derivative(f(x), x), x, x) + assert e1.diff(x) == Derivative(f(x), x, x) + e2 = Subs(Derivative(f(x), x), x, x**2 + 1) + assert e2.diff(x) == 2*x*Subs(Derivative(f(x), x, x), x, x**2 + 1) + e3 = Subs(Derivative(f(x) + y**2 - y, y), y, y**2) + assert e3.diff(y) == 4*y + e4 = Subs(Derivative(f(x + y), y), y, (x**2)) + assert e4.diff(y) is S.Zero + e5 = Subs(Derivative(f(x), x), (y, z), (y, z)) + assert e5.diff(x) == Derivative(f(x), x, x) + assert f(g(x)).diff(g(x), g(x)) == Derivative(f(g(x)), g(x), g(x)) + + +def test_issue_13843(): + x = symbols('x') + f = Function('f') + m, n = symbols('m n', integer=True) + assert Derivative(Derivative(f(x), (x, m)), (x, n)) == Derivative(f(x), (x, m + n)) + assert Derivative(Derivative(f(x), (x, m+5)), (x, n+3)) == Derivative(f(x), (x, m + n + 8)) + + assert Derivative(f(x), (x, n)).doit() == Derivative(f(x), (x, n)) + + +def test_order_could_be_zero(): + x, y = symbols('x, y') + n = symbols('n', integer=True, nonnegative=True) + m = symbols('m', integer=True, positive=True) + assert diff(y, (x, n)) == Piecewise((y, Eq(n, 0)), (0, True)) + assert diff(y, (x, n + 1)) is S.Zero + assert diff(y, (x, m)) is S.Zero + + +def test_undefined_function_eq(): + f = Function('f') + f2 = Function('f') + g = Function('g') + f_real = Function('f', is_real=True) + + # This test may only be meaningful if the cache is turned off + assert f == f2 + assert hash(f) == hash(f2) + assert f == f + + assert f != g + + assert f != f_real + + +def test_function_assumptions(): + x = Symbol('x') + f = Function('f') + f_real = Function('f', real=True) + f_real1 = Function('f', real=1) + f_real_inherit = Function(Symbol('f', real=True)) + + assert f_real == f_real1 # assumptions are sanitized + assert f != f_real + assert f(x) != f_real(x) + + assert f(x).is_real is None + assert f_real(x).is_real is True + assert f_real_inherit(x).is_real is True and f_real_inherit.name == 'f' + + # Can also do it this way, but it won't be equal to f_real because of the + # way UndefinedFunction.__new__ works. Any non-recognized assumptions + # are just added literally as something which is used in the hash + f_real2 = Function('f', is_real=True) + assert f_real2(x).is_real is True + + +def test_undef_fcn_float_issue_6938(): + f = Function('ceil') + assert not f(0.3).is_number + f = Function('sin') + assert not f(0.3).is_number + assert not f(pi).evalf().is_number + x = Symbol('x') + assert not f(x).evalf(subs={x:1.2}).is_number + + +def test_undefined_function_eval(): + # Issue 15170. Make sure UndefinedFunction with eval defined works + # properly. + + fdiff = lambda self, argindex=1: cos(self.args[argindex - 1]) + eval = classmethod(lambda cls, t: None) + _imp_ = classmethod(lambda cls, t: sin(t)) + + temp = Function('temp', fdiff=fdiff, eval=eval, _imp_=_imp_) + + expr = temp(t) + assert sympify(expr) == expr + assert type(sympify(expr)).fdiff.__name__ == "" + assert expr.diff(t) == cos(t) + + +def test_issue_15241(): + F = f(x) + Fx = F.diff(x) + assert (F + x*Fx).diff(x, Fx) == 2 + assert (F + x*Fx).diff(Fx, x) == 1 + assert (x*F + x*Fx*F).diff(F, x) == x*Fx.diff(x) + Fx + 1 + assert (x*F + x*Fx*F).diff(x, F) == x*Fx.diff(x) + Fx + 1 + y = f(x) + G = f(y) + Gy = G.diff(y) + assert (G + y*Gy).diff(y, Gy) == 2 + assert (G + y*Gy).diff(Gy, y) == 1 + assert (y*G + y*Gy*G).diff(G, y) == y*Gy.diff(y) + Gy + 1 + assert (y*G + y*Gy*G).diff(y, G) == y*Gy.diff(y) + Gy + 1 + + +def test_issue_15226(): + assert Subs(Derivative(f(y), x, y), y, g(x)).doit() != 0 + + +def test_issue_7027(): + for wrt in (cos(x), re(x), Derivative(cos(x), x)): + raises(ValueError, lambda: diff(f(x), wrt)) + + +def test_derivative_quick_exit(): + assert f(x).diff(y) == 0 + assert f(x).diff(y, f(x)) == 0 + assert f(x).diff(x, f(y)) == 0 + assert f(f(x)).diff(x, f(x), f(y)) == 0 + assert f(f(x)).diff(x, f(x), y) == 0 + assert f(x).diff(g(x)) == 0 + assert f(x).diff(x, f(x).diff(x)) == 1 + df = f(x).diff(x) + assert f(x).diff(df) == 0 + dg = g(x).diff(x) + assert dg.diff(df).doit() == 0 + + +def test_issue_15084_13166(): + eq = f(x, g(x)) + assert eq.diff((g(x), y)) == Derivative(f(x, g(x)), (g(x), y)) + # issue 13166 + assert eq.diff(x, 2).doit() == ( + (Derivative(f(x, g(x)), (g(x), 2))*Derivative(g(x), x) + + Subs(Derivative(f(x, _xi_2), _xi_2, x), _xi_2, g(x)))*Derivative(g(x), + x) + Derivative(f(x, g(x)), g(x))*Derivative(g(x), (x, 2)) + + Derivative(g(x), x)*Subs(Derivative(f(_xi_1, g(x)), _xi_1, g(x)), + _xi_1, x) + Subs(Derivative(f(_xi_1, g(x)), (_xi_1, 2)), _xi_1, x)) + # issue 6681 + assert diff(f(x, t, g(x, t)), x).doit() == ( + Derivative(f(x, t, g(x, t)), g(x, t))*Derivative(g(x, t), x) + + Subs(Derivative(f(_xi_1, t, g(x, t)), _xi_1), _xi_1, x)) + # make sure the order doesn't matter when using diff + assert eq.diff(x, g(x)) == eq.diff(g(x), x) + + +def test_negative_counts(): + # issue 13873 + raises(ValueError, lambda: sin(x).diff(x, -1)) + + +def test_Derivative__new__(): + raises(TypeError, lambda: f(x).diff((x, 2), 0)) + assert f(x, y).diff([(x, y), 0]) == f(x, y) + assert f(x, y).diff([(x, y), 1]) == NDimArray([ + Derivative(f(x, y), x), Derivative(f(x, y), y)]) + assert f(x,y).diff(y, (x, z), y, x) == Derivative( + f(x, y), (x, z + 1), (y, 2)) + assert Matrix([x]).diff(x, 2) == Matrix([0]) # is_zero exit + + +def test_issue_14719_10150(): + class V(Expr): + _diff_wrt = True + is_scalar = False + assert V().diff(V()) == Derivative(V(), V()) + assert (2*V()).diff(V()) == 2*Derivative(V(), V()) + class X(Expr): + _diff_wrt = True + assert X().diff(X()) == 1 + assert (2*X()).diff(X()) == 2 + + +def test_noncommutative_issue_15131(): + x = Symbol('x', commutative=False) + t = Symbol('t', commutative=False) + fx = Function('Fx', commutative=False)(x) + ft = Function('Ft', commutative=False)(t) + A = Symbol('A', commutative=False) + eq = fx * A * ft + eqdt = eq.diff(t) + assert eqdt.args[-1] == ft.diff(t) + + +def test_Subs_Derivative(): + a = Derivative(f(g(x), h(x)), g(x), h(x),x) + b = Derivative(Derivative(f(g(x), h(x)), g(x), h(x)),x) + c = f(g(x), h(x)).diff(g(x), h(x), x) + d = f(g(x), h(x)).diff(g(x), h(x)).diff(x) + e = Derivative(f(g(x), h(x)), x) + eqs = (a, b, c, d, e) + subs = lambda arg: arg.subs(f, Lambda((x, y), exp(x + y)) + ).subs(g(x), 1/x).subs(h(x), x**3) + ans = 3*x**2*exp(1/x)*exp(x**3) - exp(1/x)*exp(x**3)/x**2 + assert all(subs(i).doit().expand() == ans for i in eqs) + assert all(subs(i.doit()).doit().expand() == ans for i in eqs) + +def test_issue_15360(): + f = Function('f') + assert f.name == 'f' + + +def test_issue_15947(): + assert f._diff_wrt is False + raises(TypeError, lambda: f(f)) + raises(TypeError, lambda: f(x).diff(f)) + + +def test_Derivative_free_symbols(): + f = Function('f') + n = Symbol('n', integer=True, positive=True) + assert diff(f(x), (x, n)).free_symbols == {n, x} + + +def test_issue_20683(): + x = Symbol('x') + y = Symbol('y') + z = Symbol('z') + y = Derivative(z, x).subs(x,0) + assert y.doit() == 0 + y = Derivative(8, x).subs(x,0) + assert y.doit() == 0 + + +def test_issue_10503(): + f = exp(x**3)*cos(x**6) + assert f.series(x, 0, 14) == 1 + x**3 + x**6/2 + x**9/6 - 11*x**12/24 + O(x**14) + + +def test_issue_17382(): + # copied from sympy/core/tests/test_evalf.py + def NS(e, n=15, **options): + return sstr(sympify(e).evalf(n, **options), full_prec=True) + + x = Symbol('x') + expr = solveset(2 * cos(x) * cos(2 * x) - 1, x, S.Reals) + expected = "Union(" \ + "ImageSet(Lambda(_n, 6.28318530717959*_n + 5.79812359592087), Integers), " \ + "ImageSet(Lambda(_n, 6.28318530717959*_n + 0.485061711258717), Integers))" + assert NS(expr) == expected + +def test_eval_sympified(): + # Check both arguments and return types from eval are sympified + + class F(Function): + @classmethod + def eval(cls, x): + assert x is S.One + return 1 + + assert F(1) is S.One + + # String arguments are not allowed + class F2(Function): + @classmethod + def eval(cls, x): + if x == 0: + return '1' + + raises(SympifyError, lambda: F2(0)) + F2(1) # Doesn't raise + + # TODO: Disable string inputs (https://github.com/sympy/sympy/issues/11003) + # raises(SympifyError, lambda: F2('2')) + +def test_eval_classmethod_check(): + with raises(TypeError): + class F(Function): + def eval(self, x): + pass + + +def test_issue_27163(): + # https://github.com/sympy/sympy/issues/27163 + raises(TypeError, lambda: Derivative(f, t)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_kind.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_kind.py new file mode 100644 index 0000000000000000000000000000000000000000..cbfdffb9304b49488756752ca198fd4067087437 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_kind.py @@ -0,0 +1,57 @@ +from sympy.core.add import Add +from sympy.core.kind import NumberKind, UndefinedKind +from sympy.core.mul import Mul +from sympy.core.numbers import pi, zoo, I, AlgebraicNumber +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.integrals.integrals import Integral +from sympy.core.function import Derivative +from sympy.matrices import (Matrix, SparseMatrix, ImmutableMatrix, + ImmutableSparseMatrix, MatrixSymbol, MatrixKind, MatMul) + +comm_x = Symbol('x') +noncomm_x = Symbol('x', commutative=False) + +def test_NumberKind(): + assert S.One.kind is NumberKind + assert pi.kind is NumberKind + assert S.NaN.kind is NumberKind + assert zoo.kind is NumberKind + assert I.kind is NumberKind + assert AlgebraicNumber(1).kind is NumberKind + +def test_Add_kind(): + assert Add(2, 3, evaluate=False).kind is NumberKind + assert Add(2,comm_x).kind is NumberKind + assert Add(2,noncomm_x).kind is UndefinedKind + +def test_mul_kind(): + assert Mul(2,comm_x, evaluate=False).kind is NumberKind + assert Mul(2,3, evaluate=False).kind is NumberKind + assert Mul(noncomm_x,2, evaluate=False).kind is UndefinedKind + assert Mul(2,noncomm_x, evaluate=False).kind is UndefinedKind + +def test_Symbol_kind(): + assert comm_x.kind is NumberKind + assert noncomm_x.kind is UndefinedKind + +def test_Integral_kind(): + A = MatrixSymbol('A', 2,2) + assert Integral(comm_x, comm_x).kind is NumberKind + assert Integral(A, comm_x).kind is MatrixKind(NumberKind) + +def test_Derivative_kind(): + A = MatrixSymbol('A', 2,2) + assert Derivative(comm_x, comm_x).kind is NumberKind + assert Derivative(A, comm_x).kind is MatrixKind(NumberKind) + +def test_Matrix_kind(): + classes = (Matrix, SparseMatrix, ImmutableMatrix, ImmutableSparseMatrix) + for cls in classes: + m = cls.zeros(3, 2) + assert m.kind is MatrixKind(NumberKind) + +def test_MatMul_kind(): + M = Matrix([[1,2],[3,4]]) + assert MatMul(2, M).kind is MatrixKind(NumberKind) + assert MatMul(comm_x, M).kind is MatrixKind(NumberKind) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_logic.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_logic.py new file mode 100644 index 0000000000000000000000000000000000000000..df5647f32ea7c4e326eb4e3aec6a7b2987f32aee --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_logic.py @@ -0,0 +1,198 @@ +from sympy.core.logic import (fuzzy_not, Logic, And, Or, Not, fuzzy_and, + fuzzy_or, _fuzzy_group, _torf, fuzzy_nand, fuzzy_xor) +from sympy.testing.pytest import raises + +from itertools import product + +T = True +F = False +U = None + + + +def test_torf(): + v = [T, F, U] + for i in product(*[v]*3): + assert _torf(i) is (True if all(j for j in i) else + (False if all(j is False for j in i) else None)) + + +def test_fuzzy_group(): + v = [T, F, U] + for i in product(*[v]*3): + assert _fuzzy_group(i) is (None if None in i else + (True if all(j for j in i) else False)) + assert _fuzzy_group(i, quick_exit=True) is \ + (None if (i.count(False) > 1) else + (None if None in i else (True if all(j for j in i) else False))) + it = (True if (i == 0) else None for i in range(2)) + assert _torf(it) is None + it = (True if (i == 1) else None for i in range(2)) + assert _torf(it) is None + + +def test_fuzzy_not(): + assert fuzzy_not(T) == F + assert fuzzy_not(F) == T + assert fuzzy_not(U) == U + + +def test_fuzzy_and(): + assert fuzzy_and([T, T]) == T + assert fuzzy_and([T, F]) == F + assert fuzzy_and([T, U]) == U + assert fuzzy_and([F, F]) == F + assert fuzzy_and([F, U]) == F + assert fuzzy_and([U, U]) == U + assert [fuzzy_and([w]) for w in [U, T, F]] == [U, T, F] + assert fuzzy_and([T, F, U]) == F + assert fuzzy_and([]) == T + raises(TypeError, lambda: fuzzy_and()) + + +def test_fuzzy_or(): + assert fuzzy_or([T, T]) == T + assert fuzzy_or([T, F]) == T + assert fuzzy_or([T, U]) == T + assert fuzzy_or([F, F]) == F + assert fuzzy_or([F, U]) == U + assert fuzzy_or([U, U]) == U + assert [fuzzy_or([w]) for w in [U, T, F]] == [U, T, F] + assert fuzzy_or([T, F, U]) == T + assert fuzzy_or([]) == F + raises(TypeError, lambda: fuzzy_or()) + + +def test_logic_cmp(): + l1 = And('a', Not('b')) + l2 = And('a', Not('b')) + + assert hash(l1) == hash(l2) + assert (l1 == l2) == T + assert (l1 != l2) == F + + assert And('a', 'b', 'c') == And('b', 'a', 'c') + assert And('a', 'b', 'c') == And('c', 'b', 'a') + assert And('a', 'b', 'c') == And('c', 'a', 'b') + + assert Not('a') < Not('b') + assert (Not('b') < Not('a')) is False + assert (Not('a') < 2) is False + + +def test_logic_onearg(): + assert And() is True + assert Or() is False + + assert And(T) == T + assert And(F) == F + assert Or(T) == T + assert Or(F) == F + + assert And('a') == 'a' + assert Or('a') == 'a' + + +def test_logic_xnotx(): + assert And('a', Not('a')) == F + assert Or('a', Not('a')) == T + + +def test_logic_eval_TF(): + assert And(F, F) == F + assert And(F, T) == F + assert And(T, F) == F + assert And(T, T) == T + + assert Or(F, F) == F + assert Or(F, T) == T + assert Or(T, F) == T + assert Or(T, T) == T + + assert And('a', T) == 'a' + assert And('a', F) == F + assert Or('a', T) == T + assert Or('a', F) == 'a' + + +def test_logic_combine_args(): + assert And('a', 'b', 'a') == And('a', 'b') + assert Or('a', 'b', 'a') == Or('a', 'b') + + assert And(And('a', 'b'), And('c', 'd')) == And('a', 'b', 'c', 'd') + assert Or(Or('a', 'b'), Or('c', 'd')) == Or('a', 'b', 'c', 'd') + + assert Or('t', And('n', 'p', 'r'), And('n', 'r'), And('n', 'p', 'r'), 't', + And('n', 'r')) == Or('t', And('n', 'p', 'r'), And('n', 'r')) + + +def test_logic_expand(): + t = And(Or('a', 'b'), 'c') + assert t.expand() == Or(And('a', 'c'), And('b', 'c')) + + t = And(Or('a', Not('b')), 'b') + assert t.expand() == And('a', 'b') + + t = And(Or('a', 'b'), Or('c', 'd')) + assert t.expand() == \ + Or(And('a', 'c'), And('a', 'd'), And('b', 'c'), And('b', 'd')) + + +def test_logic_fromstring(): + S = Logic.fromstring + + assert S('a') == 'a' + assert S('!a') == Not('a') + assert S('a & b') == And('a', 'b') + assert S('a | b') == Or('a', 'b') + assert S('a | b & c') == And(Or('a', 'b'), 'c') + assert S('a & b | c') == Or(And('a', 'b'), 'c') + assert S('a & b & c') == And('a', 'b', 'c') + assert S('a | b | c') == Or('a', 'b', 'c') + + raises(ValueError, lambda: S('| a')) + raises(ValueError, lambda: S('& a')) + raises(ValueError, lambda: S('a | | b')) + raises(ValueError, lambda: S('a | & b')) + raises(ValueError, lambda: S('a & & b')) + raises(ValueError, lambda: S('a |')) + raises(ValueError, lambda: S('a|b')) + raises(ValueError, lambda: S('!')) + raises(ValueError, lambda: S('! a')) + raises(ValueError, lambda: S('!(a + 1)')) + raises(ValueError, lambda: S('')) + + +def test_logic_not(): + assert Not('a') != '!a' + assert Not('!a') != 'a' + assert Not(True) == False + assert Not(False) == True + + # NOTE: we may want to change default Not behaviour and put this + # functionality into some method. + assert Not(And('a', 'b')) == Or(Not('a'), Not('b')) + assert Not(Or('a', 'b')) == And(Not('a'), Not('b')) + + raises(ValueError, lambda: Not(1)) + + +def test_formatting(): + S = Logic.fromstring + raises(ValueError, lambda: S('a&b')) + raises(ValueError, lambda: S('a|b')) + raises(ValueError, lambda: S('! a')) + + +def test_fuzzy_xor(): + assert fuzzy_xor((None,)) is None + assert fuzzy_xor((None, True)) is None + assert fuzzy_xor((None, False)) is None + assert fuzzy_xor((True, False)) is True + assert fuzzy_xor((True, True)) is False + assert fuzzy_xor((True, True, False)) is False + assert fuzzy_xor((True, True, False, True)) is True + +def test_fuzzy_nand(): + for args in [(1, 0), (1, 1), (0, 0)]: + assert fuzzy_nand(args) == fuzzy_not(fuzzy_and(args)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_match.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_match.py new file mode 100644 index 0000000000000000000000000000000000000000..b44012bebc4a5f3ec413c236dca1dec71da78cf5 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_match.py @@ -0,0 +1,766 @@ +from sympy import abc +from sympy.concrete.summations import Sum +from sympy.core.add import Add +from sympy.core.function import (Derivative, Function, diff) +from sympy.core.mul import Mul +from sympy.core.numbers import (Float, I, Integer, Rational, oo, pi) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, Wild, symbols) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.functions.special.hyper import meijerg +from sympy.polys.polytools import Poly +from sympy.simplify.radsimp import collect +from sympy.simplify.simplify import signsimp + +from sympy.testing.pytest import XFAIL + + +def test_symbol(): + x = Symbol('x') + a, b, c, p, q = map(Wild, 'abcpq') + + e = x + assert e.match(x) == {} + assert e.matches(x) == {} + assert e.match(a) == {a: x} + + e = Rational(5) + assert e.match(c) == {c: 5} + assert e.match(e) == {} + assert e.match(e + 1) is None + + +def test_add(): + x, y, a, b, c = map(Symbol, 'xyabc') + p, q, r = map(Wild, 'pqr') + + e = a + b + assert e.match(p + b) == {p: a} + assert e.match(p + a) == {p: b} + + e = 1 + b + assert e.match(p + b) == {p: 1} + + e = a + b + c + assert e.match(a + p + c) == {p: b} + assert e.match(b + p + c) == {p: a} + + e = a + b + c + x + assert e.match(a + p + x + c) == {p: b} + assert e.match(b + p + c + x) == {p: a} + assert e.match(b) is None + assert e.match(b + p) == {p: a + c + x} + assert e.match(a + p + c) == {p: b + x} + assert e.match(b + p + c) == {p: a + x} + + e = 4*x + 5 + assert e.match(4*x + p) == {p: 5} + assert e.match(3*x + p) == {p: x + 5} + assert e.match(p*x + 5) == {p: 4} + + +def test_power(): + x, y, a, b, c = map(Symbol, 'xyabc') + p, q, r = map(Wild, 'pqr') + + e = (x + y)**a + assert e.match(p**q) == {p: x + y, q: a} + assert e.match(p**p) is None + + e = (x + y)**(x + y) + assert e.match(p**p) == {p: x + y} + assert e.match(p**q) == {p: x + y, q: x + y} + + e = (2*x)**2 + assert e.match(p*q**r) == {p: 4, q: x, r: 2} + + e = Integer(1) + assert e.match(x**p) == {p: 0} + + +def test_match_exclude(): + x = Symbol('x') + y = Symbol('y') + p = Wild("p") + q = Wild("q") + r = Wild("r") + + e = Rational(6) + assert e.match(2*p) == {p: 3} + + e = 3/(4*x + 5) + assert e.match(3/(p*x + q)) == {p: 4, q: 5} + + e = 3/(4*x + 5) + assert e.match(p/(q*x + r)) == {p: 3, q: 4, r: 5} + + e = 2/(x + 1) + assert e.match(p/(q*x + r)) == {p: 2, q: 1, r: 1} + + e = 1/(x + 1) + assert e.match(p/(q*x + r)) == {p: 1, q: 1, r: 1} + + e = 4*x + 5 + assert e.match(p*x + q) == {p: 4, q: 5} + + e = 4*x + 5*y + 6 + assert e.match(p*x + q*y + r) == {p: 4, q: 5, r: 6} + + a = Wild('a', exclude=[x]) + + e = 3*x + assert e.match(p*x) == {p: 3} + assert e.match(a*x) == {a: 3} + + e = 3*x**2 + assert e.match(p*x) == {p: 3*x} + assert e.match(a*x) is None + + e = 3*x + 3 + 6/x + assert e.match(p*x**2 + p*x + 2*p) == {p: 3/x} + assert e.match(a*x**2 + a*x + 2*a) is None + + +def test_mul(): + x, y, a, b, c = map(Symbol, 'xyabc') + p, q = map(Wild, 'pq') + + e = 4*x + assert e.match(p*x) == {p: 4} + assert e.match(p*y) is None + assert e.match(e + p*y) == {p: 0} + + e = a*x*b*c + assert e.match(p*x) == {p: a*b*c} + assert e.match(c*p*x) == {p: a*b} + + e = (a + b)*(a + c) + assert e.match((p + b)*(p + c)) == {p: a} + + e = x + assert e.match(p*x) == {p: 1} + + e = exp(x) + assert e.match(x**p*exp(x*q)) == {p: 0, q: 1} + + e = I*Poly(x, x) + assert e.match(I*p) == {p: x} + + +def test_mul_noncommutative(): + x, y = symbols('x y') + A, B, C = symbols('A B C', commutative=False) + u, v = symbols('u v', cls=Wild) + w, z = symbols('w z', cls=Wild, commutative=False) + + assert (u*v).matches(x) in ({v: x, u: 1}, {u: x, v: 1}) + assert (u*v).matches(x*y) in ({v: y, u: x}, {u: y, v: x}) + assert (u*v).matches(A) is None + assert (u*v).matches(A*B) is None + assert (u*v).matches(x*A) is None + assert (u*v).matches(x*y*A) is None + assert (u*v).matches(x*A*B) is None + assert (u*v).matches(x*y*A*B) is None + + assert (v*w).matches(x) is None + assert (v*w).matches(x*y) is None + assert (v*w).matches(A) == {w: A, v: 1} + assert (v*w).matches(A*B) == {w: A*B, v: 1} + assert (v*w).matches(x*A) == {w: A, v: x} + assert (v*w).matches(x*y*A) == {w: A, v: x*y} + assert (v*w).matches(x*A*B) == {w: A*B, v: x} + assert (v*w).matches(x*y*A*B) == {w: A*B, v: x*y} + + assert (v*w).matches(-x) is None + assert (v*w).matches(-x*y) is None + assert (v*w).matches(-A) == {w: A, v: -1} + assert (v*w).matches(-A*B) == {w: A*B, v: -1} + assert (v*w).matches(-x*A) == {w: A, v: -x} + assert (v*w).matches(-x*y*A) == {w: A, v: -x*y} + assert (v*w).matches(-x*A*B) == {w: A*B, v: -x} + assert (v*w).matches(-x*y*A*B) == {w: A*B, v: -x*y} + + assert (w*z).matches(x) is None + assert (w*z).matches(x*y) is None + assert (w*z).matches(A) is None + assert (w*z).matches(A*B) == {w: A, z: B} + assert (w*z).matches(B*A) == {w: B, z: A} + assert (w*z).matches(A*B*C) in [{w: A, z: B*C}, {w: A*B, z: C}] + assert (w*z).matches(x*A) is None + assert (w*z).matches(x*y*A) is None + assert (w*z).matches(x*A*B) is None + assert (w*z).matches(x*y*A*B) is None + + assert (w*A).matches(A) is None + assert (A*w*B).matches(A*B) is None + + assert (u*w*z).matches(x) is None + assert (u*w*z).matches(x*y) is None + assert (u*w*z).matches(A) is None + assert (u*w*z).matches(A*B) == {u: 1, w: A, z: B} + assert (u*w*z).matches(B*A) == {u: 1, w: B, z: A} + assert (u*w*z).matches(x*A) is None + assert (u*w*z).matches(x*y*A) is None + assert (u*w*z).matches(x*A*B) == {u: x, w: A, z: B} + assert (u*w*z).matches(x*B*A) == {u: x, w: B, z: A} + assert (u*w*z).matches(x*y*A*B) == {u: x*y, w: A, z: B} + assert (u*w*z).matches(x*y*B*A) == {u: x*y, w: B, z: A} + + assert (u*A).matches(x*A) == {u: x} + assert (u*A).matches(x*A*B) is None + assert (u*B).matches(x*A) is None + assert (u*A*B).matches(x*A*B) == {u: x} + assert (u*A*B).matches(x*B*A) is None + assert (u*A*B).matches(x*A) is None + + assert (u*w*A).matches(x*A*B) is None + assert (u*w*B).matches(x*A*B) == {u: x, w: A} + + assert (u*v*A*B).matches(x*A*B) in [{u: x, v: 1}, {v: x, u: 1}] + assert (u*v*A*B).matches(x*B*A) is None + assert (u*v*A*B).matches(u*v*A*C) is None + + +def test_mul_noncommutative_mismatch(): + A, B, C = symbols('A B C', commutative=False) + w = symbols('w', cls=Wild, commutative=False) + + assert (w*B*w).matches(A*B*A) == {w: A} + assert (w*B*w).matches(A*C*B*A*C) == {w: A*C} + assert (w*B*w).matches(A*C*B*A*B) is None + assert (w*B*w).matches(A*B*C) is None + assert (w*w*C).matches(A*B*C) is None + + +def test_mul_noncommutative_pow(): + A, B, C = symbols('A B C', commutative=False) + w = symbols('w', cls=Wild, commutative=False) + + assert (A*B*w).matches(A*B**2) == {w: B} + assert (A*(B**2)*w*(B**3)).matches(A*B**8) == {w: B**3} + assert (A*B*w*C).matches(A*(B**4)*C) == {w: B**3} + + assert (A*B*(w**(-1))).matches(A*B*(C**(-1))) == {w: C} + assert (A*(B*w)**(-1)*C).matches(A*(B*C)**(-1)*C) == {w: C} + + assert ((w**2)*B*C).matches((A**2)*B*C) == {w: A} + assert ((w**2)*B*(w**3)).matches((A**2)*B*(A**3)) == {w: A} + assert ((w**2)*B*(w**4)).matches((A**2)*B*(A**2)) is None + +def test_complex(): + a, b, c = map(Symbol, 'abc') + x, y = map(Wild, 'xy') + + assert (1 + I).match(x + I) == {x: 1} + assert (a + I).match(x + I) == {x: a} + assert (2*I).match(x*I) == {x: 2} + assert (a*I).match(x*I) == {x: a} + assert (a*I).match(x*y) == {x: I, y: a} + assert (2*I).match(x*y) == {x: 2, y: I} + assert (a + b*I).match(x + y*I) == {x: a, y: b} + + +def test_functions(): + from sympy.core.function import WildFunction + x = Symbol('x') + g = WildFunction('g') + p = Wild('p') + q = Wild('q') + + f = cos(5*x) + notf = x + assert f.match(p*cos(q*x)) == {p: 1, q: 5} + assert f.match(p*g) == {p: 1, g: cos(5*x)} + assert notf.match(g) is None + + +@XFAIL +def test_functions_X1(): + from sympy.core.function import WildFunction + x = Symbol('x') + g = WildFunction('g') + p = Wild('p') + q = Wild('q') + + f = cos(5*x) + assert f.match(p*g(q*x)) == {p: 1, g: cos, q: 5} + + +def test_interface(): + x, y = map(Symbol, 'xy') + p, q = map(Wild, 'pq') + + assert (x + 1).match(p + 1) == {p: x} + assert (x*3).match(p*3) == {p: x} + assert (x**3).match(p**3) == {p: x} + assert (x*cos(y)).match(p*cos(q)) == {p: x, q: y} + + assert (x*y).match(p*q) in [{p:x, q:y}, {p:y, q:x}] + assert (x + y).match(p + q) in [{p:x, q:y}, {p:y, q:x}] + assert (x*y + 1).match(p*q) in [{p:1, q:1 + x*y}, {p:1 + x*y, q:1}] + + +def test_derivative1(): + x, y = map(Symbol, 'xy') + p, q = map(Wild, 'pq') + + f = Function('f', nargs=1) + fd = Derivative(f(x), x) + + assert fd.match(p) == {p: fd} + assert (fd + 1).match(p + 1) == {p: fd} + assert (fd).match(fd) == {} + assert (3*fd).match(p*fd) is not None + assert (3*fd - 1).match(p*fd + q) == {p: 3, q: -1} + + +def test_derivative_bug1(): + f = Function("f") + x = Symbol("x") + a = Wild("a", exclude=[f, x]) + b = Wild("b", exclude=[f]) + pattern = a * Derivative(f(x), x, x) + b + expr = Derivative(f(x), x) + x**2 + d1 = {b: x**2} + d2 = pattern.xreplace(d1).matches(expr, d1) + assert d2 is None + + +def test_derivative2(): + f = Function("f") + x = Symbol("x") + a = Wild("a", exclude=[f, x]) + b = Wild("b", exclude=[f]) + e = Derivative(f(x), x) + assert e.match(Derivative(f(x), x)) == {} + assert e.match(Derivative(f(x), x, x)) is None + e = Derivative(f(x), x, x) + assert e.match(Derivative(f(x), x)) is None + assert e.match(Derivative(f(x), x, x)) == {} + e = Derivative(f(x), x) + x**2 + assert e.match(a*Derivative(f(x), x) + b) == {a: 1, b: x**2} + assert e.match(a*Derivative(f(x), x, x) + b) is None + e = Derivative(f(x), x, x) + x**2 + assert e.match(a*Derivative(f(x), x) + b) is None + assert e.match(a*Derivative(f(x), x, x) + b) == {a: 1, b: x**2} + + +def test_match_deriv_bug1(): + n = Function('n') + l = Function('l') + + x = Symbol('x') + p = Wild('p') + + e = diff(l(x), x)/x - diff(diff(n(x), x), x)/2 - \ + diff(n(x), x)**2/4 + diff(n(x), x)*diff(l(x), x)/4 + e = e.subs(n(x), -l(x)).doit() + t = x*exp(-l(x)) + t2 = t.diff(x, x)/t + assert e.match( (p*t2).expand() ) == {p: Rational(-1, 2)} + + +def test_match_bug2(): + x, y = map(Symbol, 'xy') + p, q, r = map(Wild, 'pqr') + res = (x + y).match(p + q + r) + assert (p + q + r).subs(res) == x + y + + +def test_match_bug3(): + x, a, b = map(Symbol, 'xab') + p = Wild('p') + assert (b*x*exp(a*x)).match(x*exp(p*x)) is None + + +def test_match_bug4(): + x = Symbol('x') + p = Wild('p') + e = x + assert e.match(-p*x) == {p: -1} + + +def test_match_bug5(): + x = Symbol('x') + p = Wild('p') + e = -x + assert e.match(-p*x) == {p: 1} + + +def test_match_bug6(): + x = Symbol('x') + p = Wild('p') + e = x + assert e.match(3*p*x) == {p: Rational(1)/3} + + +def test_match_polynomial(): + x = Symbol('x') + a = Wild('a', exclude=[x]) + b = Wild('b', exclude=[x]) + c = Wild('c', exclude=[x]) + d = Wild('d', exclude=[x]) + + eq = 4*x**3 + 3*x**2 + 2*x + 1 + pattern = a*x**3 + b*x**2 + c*x + d + assert eq.match(pattern) == {a: 4, b: 3, c: 2, d: 1} + assert (eq - 3*x**2).match(pattern) == {a: 4, b: 0, c: 2, d: 1} + assert (x + sqrt(2) + 3).match(a + b*x + c*x**2) == \ + {b: 1, a: sqrt(2) + 3, c: 0} + + +def test_exclude(): + x, y, a = map(Symbol, 'xya') + p = Wild('p', exclude=[1, x]) + q = Wild('q') + r = Wild('r', exclude=[sin, y]) + + assert sin(x).match(r) is None + assert cos(y).match(r) is None + + e = 3*x**2 + y*x + a + assert e.match(p*x**2 + q*x + r) == {p: 3, q: y, r: a} + + e = x + 1 + assert e.match(x + p) is None + assert e.match(p + 1) is None + assert e.match(x + 1 + p) == {p: 0} + + e = cos(x) + 5*sin(y) + assert e.match(r) is None + assert e.match(cos(y) + r) is None + assert e.match(r + p*sin(q)) == {r: cos(x), p: 5, q: y} + + +def test_floats(): + a, b = map(Wild, 'ab') + + e = cos(0.12345, evaluate=False)**2 + r = e.match(a*cos(b)**2) + assert r == {a: 1, b: Float(0.12345)} + + +def test_Derivative_bug1(): + f = Function("f") + x = abc.x + a = Wild("a", exclude=[f(x)]) + b = Wild("b", exclude=[f(x)]) + eq = f(x).diff(x) + assert eq.match(a*Derivative(f(x), x) + b) == {a: 1, b: 0} + + +def test_match_wild_wild(): + p = Wild('p') + q = Wild('q') + r = Wild('r') + + assert p.match(q + r) in [ {q: p, r: 0}, {q: 0, r: p} ] + assert p.match(q*r) in [ {q: p, r: 1}, {q: 1, r: p} ] + + p = Wild('p') + q = Wild('q', exclude=[p]) + r = Wild('r') + + assert p.match(q + r) == {q: 0, r: p} + assert p.match(q*r) == {q: 1, r: p} + + p = Wild('p') + q = Wild('q', exclude=[p]) + r = Wild('r', exclude=[p]) + + assert p.match(q + r) is None + assert p.match(q*r) is None + + +def test__combine_inverse(): + x, y = symbols("x y") + assert Mul._combine_inverse(x*I*y, x*I) == y + assert Mul._combine_inverse(x*x**(1 + y), x**(1 + y)) == x + assert Mul._combine_inverse(x*I*y, y*I) == x + assert Mul._combine_inverse(oo*I*y, y*I) is oo + assert Mul._combine_inverse(oo*I*y, oo*I) == y + assert Mul._combine_inverse(oo*I*y, oo*I) == y + assert Mul._combine_inverse(oo*y, -oo) == -y + assert Mul._combine_inverse(-oo*y, oo) == -y + assert Mul._combine_inverse((1-exp(x/y)),(exp(x/y)-1)) == -1 + assert Add._combine_inverse(oo, oo) is S.Zero + assert Add._combine_inverse(oo*I, oo*I) is S.Zero + assert Add._combine_inverse(x*oo, x*oo) is S.Zero + assert Add._combine_inverse(-x*oo, -x*oo) is S.Zero + assert Add._combine_inverse((x - oo)*(x + oo), -oo) + + +def test_issue_3773(): + x = symbols('x') + z, phi, r = symbols('z phi r') + c, A, B, N = symbols('c A B N', cls=Wild) + l = Wild('l', exclude=(0,)) + + eq = z * sin(2*phi) * r**7 + matcher = c * sin(phi*N)**l * r**A * log(r)**B + + assert eq.match(matcher) == {c: z, l: 1, N: 2, A: 7, B: 0} + assert (-eq).match(matcher) == {c: -z, l: 1, N: 2, A: 7, B: 0} + assert (x*eq).match(matcher) == {c: x*z, l: 1, N: 2, A: 7, B: 0} + assert (-7*x*eq).match(matcher) == {c: -7*x*z, l: 1, N: 2, A: 7, B: 0} + + matcher = c*sin(phi*N)**l * r**A + + assert eq.match(matcher) == {c: z, l: 1, N: 2, A: 7} + assert (-eq).match(matcher) == {c: -z, l: 1, N: 2, A: 7} + assert (x*eq).match(matcher) == {c: x*z, l: 1, N: 2, A: 7} + assert (-7*x*eq).match(matcher) == {c: -7*x*z, l: 1, N: 2, A: 7} + + +def test_issue_3883(): + from sympy.abc import gamma, mu, x + f = (-gamma * (x - mu)**2 - log(gamma) + log(2*pi))/2 + a, b, c = symbols('a b c', cls=Wild, exclude=(gamma,)) + + assert f.match(a * log(gamma) + b * gamma + c) == \ + {a: Rational(-1, 2), b: -(-mu + x)**2/2, c: log(2*pi)/2} + assert f.expand().collect(gamma).match(a * log(gamma) + b * gamma + c) == \ + {a: Rational(-1, 2), b: (-(x - mu)**2/2).expand(), c: (log(2*pi)/2).expand()} + g1 = Wild('g1', exclude=[gamma]) + g2 = Wild('g2', exclude=[gamma]) + g3 = Wild('g3', exclude=[gamma]) + assert f.expand().match(g1 * log(gamma) + g2 * gamma + g3) == \ + {g3: log(2)/2 + log(pi)/2, g1: Rational(-1, 2), g2: -mu**2/2 + mu*x - x**2/2} + + +def test_issue_4418(): + x = Symbol('x') + a, b, c = symbols('a b c', cls=Wild, exclude=(x,)) + f, g = symbols('f g', cls=Function) + + eq = diff(g(x)*f(x).diff(x), x) + + assert eq.match( + g(x).diff(x)*f(x).diff(x) + g(x)*f(x).diff(x, x) + c) == {c: 0} + assert eq.match(a*g(x).diff( + x)*f(x).diff(x) + b*g(x)*f(x).diff(x, x) + c) == {a: 1, b: 1, c: 0} + + +def test_issue_4700(): + f = Function('f') + x = Symbol('x') + a, b = symbols('a b', cls=Wild, exclude=(f(x),)) + + p = a*f(x) + b + eq1 = sin(x) + eq2 = f(x) + sin(x) + eq3 = f(x) + x + sin(x) + eq4 = x + sin(x) + + assert eq1.match(p) == {a: 0, b: sin(x)} + assert eq2.match(p) == {a: 1, b: sin(x)} + assert eq3.match(p) == {a: 1, b: x + sin(x)} + assert eq4.match(p) == {a: 0, b: x + sin(x)} + + +def test_issue_5168(): + a, b, c = symbols('a b c', cls=Wild) + x = Symbol('x') + f = Function('f') + + assert x.match(a) == {a: x} + assert x.match(a*f(x)**c) == {a: x, c: 0} + assert x.match(a*b) == {a: 1, b: x} + assert x.match(a*b*f(x)**c) == {a: 1, b: x, c: 0} + + assert (-x).match(a) == {a: -x} + assert (-x).match(a*f(x)**c) == {a: -x, c: 0} + assert (-x).match(a*b) == {a: -1, b: x} + assert (-x).match(a*b*f(x)**c) == {a: -1, b: x, c: 0} + + assert (2*x).match(a) == {a: 2*x} + assert (2*x).match(a*f(x)**c) == {a: 2*x, c: 0} + assert (2*x).match(a*b) == {a: 2, b: x} + assert (2*x).match(a*b*f(x)**c) == {a: 2, b: x, c: 0} + + assert (-2*x).match(a) == {a: -2*x} + assert (-2*x).match(a*f(x)**c) == {a: -2*x, c: 0} + assert (-2*x).match(a*b) == {a: -2, b: x} + assert (-2*x).match(a*b*f(x)**c) == {a: -2, b: x, c: 0} + + +def test_issue_4559(): + x = Symbol('x') + e = Symbol('e') + w = Wild('w', exclude=[x]) + y = Wild('y') + + # this is as it should be + + assert (3/x).match(w/y) == {w: 3, y: x} + assert (3*x).match(w*y) == {w: 3, y: x} + assert (x/3).match(y/w) == {w: 3, y: x} + assert (3*x).match(y/w) == {w: S.One/3, y: x} + assert (3*x).match(y/w) == {w: Rational(1, 3), y: x} + + # these could be allowed to fail + + assert (x/3).match(w/y) == {w: S.One/3, y: 1/x} + assert (3*x).match(w/y) == {w: 3, y: 1/x} + assert (3/x).match(w*y) == {w: 3, y: 1/x} + + # Note that solve will give + # multiple roots but match only gives one: + # + # >>> solve(x**r-y**2,y) + # [-x**(r/2), x**(r/2)] + + r = Symbol('r', rational=True) + assert (x**r).match(y**2) == {y: x**(r/2)} + assert (x**e).match(y**2) == {y: sqrt(x**e)} + + # since (x**i = y) -> x = y**(1/i) where i is an integer + # the following should also be valid as long as y is not + # zero when i is negative. + + a = Wild('a') + + e = S.Zero + assert e.match(a) == {a: e} + assert e.match(1/a) is None + assert e.match(a**.3) is None + + e = S(3) + assert e.match(1/a) == {a: 1/e} + assert e.match(1/a**2) == {a: 1/sqrt(e)} + e = pi + assert e.match(1/a) == {a: 1/e} + assert e.match(1/a**2) == {a: 1/sqrt(e)} + assert (-e).match(sqrt(a)) is None + assert (-e).match(a**2) == {a: I*sqrt(pi)} + +# The pattern matcher doesn't know how to handle (x - a)**2 == (a - x)**2. To +# avoid ambiguity in actual applications, don't put a coefficient (including a +# minus sign) in front of a wild. +@XFAIL +def test_issue_4883(): + a = Wild('a') + x = Symbol('x') + + e = [i**2 for i in (x - 2, 2 - x)] + p = [i**2 for i in (x - a, a- x)] + for eq in e: + for pat in p: + assert eq.match(pat) == {a: 2} + + +def test_issue_4319(): + x, y = symbols('x y') + + p = -x*(S.One/8 - y) + ans = {S.Zero, y - S.One/8} + + def ok(pat): + assert set(p.match(pat).values()) == ans + + ok(Wild("coeff", exclude=[x])*x + Wild("rest")) + ok(Wild("w", exclude=[x])*x + Wild("rest")) + ok(Wild("coeff", exclude=[x])*x + Wild("rest")) + ok(Wild("w", exclude=[x])*x + Wild("rest")) + ok(Wild("e", exclude=[x])*x + Wild("rest")) + ok(Wild("ress", exclude=[x])*x + Wild("rest")) + ok(Wild("resu", exclude=[x])*x + Wild("rest")) + + +def test_issue_3778(): + p, c, q = symbols('p c q', cls=Wild) + x = Symbol('x') + + assert (sin(x)**2).match(sin(p)*sin(q)*c) == {q: x, c: 1, p: x} + assert (2*sin(x)).match(sin(p) + sin(q) + c) == {q: x, c: 0, p: x} + + +def test_issue_6103(): + x = Symbol('x') + a = Wild('a') + assert (-I*x*oo).match(I*a*oo) == {a: -x} + + +def test_issue_3539(): + a = Wild('a') + x = Symbol('x') + assert (x - 2).match(a - x) is None + assert (6/x).match(a*x) is None + assert (6/x**2).match(a/x) == {a: 6/x} + +def test_gh_issue_2711(): + x = Symbol('x') + f = meijerg(((), ()), ((0,), ()), x) + a = Wild('a') + b = Wild('b') + + assert f.find(a) == {(S.Zero,), ((), ()), ((S.Zero,), ()), x, S.Zero, + (), meijerg(((), ()), ((S.Zero,), ()), x)} + assert f.find(a + b) == \ + {meijerg(((), ()), ((S.Zero,), ()), x), x, S.Zero} + assert f.find(a**2) == {meijerg(((), ()), ((S.Zero,), ()), x), x} + + +def test_issue_17354(): + from sympy.core.symbol import (Wild, symbols) + x, y = symbols("x y", real=True) + a, b = symbols("a b", cls=Wild) + assert ((0 <= x).reversed | (y <= x)).match((1/a <= b) | (a <= b)) is None + + +def test_match_issue_17397(): + f = Function("f") + x = Symbol("x") + a3 = Wild('a3', exclude=[f(x), f(x).diff(x), f(x).diff(x, 2)]) + b3 = Wild('b3', exclude=[f(x), f(x).diff(x), f(x).diff(x, 2)]) + c3 = Wild('c3', exclude=[f(x), f(x).diff(x), f(x).diff(x, 2)]) + deq = a3*(f(x).diff(x, 2)) + b3*f(x).diff(x) + c3*f(x) + + eq = (x-2)**2*(f(x).diff(x, 2)) + (x-2)*(f(x).diff(x)) + ((x-2)**2 - 4)*f(x) + r = collect(eq, [f(x).diff(x, 2), f(x).diff(x), f(x)]).match(deq) + assert r == {a3: (x - 2)**2, c3: (x - 2)**2 - 4, b3: x - 2} + + eq =x*f(x) + x*Derivative(f(x), (x, 2)) - 4*f(x) + Derivative(f(x), x) \ + - 4*Derivative(f(x), (x, 2)) - 2*Derivative(f(x), x)/x + 4*Derivative(f(x), (x, 2))/x + r = collect(eq, [f(x).diff(x, 2), f(x).diff(x), f(x)]).match(deq) + assert r == {a3: x - 4 + 4/x, b3: 1 - 2/x, c3: x - 4} + + +def test_match_issue_21942(): + a, r, w = symbols('a, r, w', nonnegative=True) + p = symbols('p', positive=True) + g_ = Wild('g') + pattern = g_ ** (1 / (1 - p)) + eq = (a * r ** (1 - p) + w ** (1 - p) * (1 - a)) ** (1 / (1 - p)) + m = {g_: a * r ** (1 - p) + w ** (1 - p) * (1 - a)} + assert pattern.matches(eq) == m + assert (-pattern).matches(-eq) == m + assert pattern.matches(signsimp(eq)) is None + + +def test_match_terms(): + X, Y = map(Wild, "XY") + x, y, z = symbols('x y z') + assert (5*y - x).match(5*X - Y) == {X: y, Y: x} + # 15907 + assert (x + (y - 1)*z).match(x + X*z) == {X: y - 1} + # 20747 + assert (x - log(x/y)*(1-exp(x/y))).match(x - log(X/y)*(1-exp(x/y))) == {X: x} + + +def test_match_bound(): + V, W = map(Wild, "VW") + x, y = symbols('x y') + assert Sum(x, (x, 1, 2)).match(Sum(y, (y, 1, W))) is None + assert Sum(x, (x, 1, 2)).match(Sum(V, (V, 1, W))) == {W: 2, V:x} + assert Sum(x, (x, 1, 2)).match(Sum(V, (V, 1, 2))) == {V:x} + + +def test_issue_22462(): + x, f = symbols('x'), Function('f') + n, Q = symbols('n Q', cls=Wild) + pattern = -Q*f(x)**n + eq = 5*f(x)**2 + assert pattern.matches(eq) == {n: 2, Q: -5} diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_multidimensional.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_multidimensional.py new file mode 100644 index 0000000000000000000000000000000000000000..765c78adf8dbed2ead43721ca4ab9510dbeeb282 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_multidimensional.py @@ -0,0 +1,24 @@ +from sympy.core.function import (Derivative, Function, diff) +from sympy.core.symbol import symbols +from sympy.functions.elementary.trigonometric import sin +from sympy.core.multidimensional import vectorize +x, y, z = symbols('x y z') +f, g, h = list(map(Function, 'fgh')) + + +def test_vectorize(): + @vectorize(0) + def vsin(x): + return sin(x) + + assert vsin([1, x, y]) == [sin(1), sin(x), sin(y)] + + @vectorize(0, 1) + def vdiff(f, y): + return diff(f, y) + + assert vdiff([f(x, y, z), g(x, y, z), h(x, y, z)], [x, y, z]) == \ + [[Derivative(f(x, y, z), x), Derivative(f(x, y, z), y), + Derivative(f(x, y, z), z)], [Derivative(g(x, y, z), x), + Derivative(g(x, y, z), y), Derivative(g(x, y, z), z)], + [Derivative(h(x, y, z), x), Derivative(h(x, y, z), y), Derivative(h(x, y, z), z)]] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_noncommutative.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_noncommutative.py new file mode 100644 index 0000000000000000000000000000000000000000..b3d3a3cec2ef64aa500aad08b438c90cc8987581 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_noncommutative.py @@ -0,0 +1,140 @@ +"""Tests for noncommutative symbols and expressions.""" + +from sympy.core.function import expand +from sympy.core.numbers import I +from sympy.core.symbol import symbols +from sympy.functions.elementary.complexes import (adjoint, conjugate, transpose) +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.polys.polytools import (cancel, factor) +from sympy.simplify.combsimp import combsimp +from sympy.simplify.gammasimp import gammasimp +from sympy.simplify.radsimp import (collect, radsimp, rcollect) +from sympy.simplify.ratsimp import ratsimp +from sympy.simplify.simplify import (posify, simplify) +from sympy.simplify.trigsimp import trigsimp +from sympy.abc import x, y, z +from sympy.testing.pytest import XFAIL + +A, B, C = symbols("A B C", commutative=False) +X = symbols("X", commutative=False, hermitian=True) +Y = symbols("Y", commutative=False, antihermitian=True) + + +def test_adjoint(): + assert adjoint(A).is_commutative is False + assert adjoint(A*A) == adjoint(A)**2 + assert adjoint(A*B) == adjoint(B)*adjoint(A) + assert adjoint(A*B**2) == adjoint(B)**2*adjoint(A) + assert adjoint(A*B - B*A) == adjoint(B)*adjoint(A) - adjoint(A)*adjoint(B) + assert adjoint(A + I*B) == adjoint(A) - I*adjoint(B) + + assert adjoint(X) == X + assert adjoint(-I*X) == I*X + assert adjoint(Y) == -Y + assert adjoint(-I*Y) == -I*Y + + assert adjoint(X) == conjugate(transpose(X)) + assert adjoint(Y) == conjugate(transpose(Y)) + assert adjoint(X) == transpose(conjugate(X)) + assert adjoint(Y) == transpose(conjugate(Y)) + + +def test_cancel(): + assert cancel(A*B - B*A) == A*B - B*A + assert cancel(A*B*(x - 1)) == A*B*(x - 1) + assert cancel(A*B*(x**2 - 1)/(x + 1)) == A*B*(x - 1) + assert cancel(A*B*(x**2 - 1)/(x + 1) - B*A*(x - 1)) == A*B*(x - 1) + (1 - x)*B*A + + +@XFAIL +def test_collect(): + assert collect(A*B - B*A, A) == A*B - B*A + assert collect(A*B - B*A, B) == A*B - B*A + assert collect(A*B - B*A, x) == A*B - B*A + + +def test_combsimp(): + assert combsimp(A*B - B*A) == A*B - B*A + + +def test_gammasimp(): + assert gammasimp(A*B - B*A) == A*B - B*A + + +def test_conjugate(): + assert conjugate(A).is_commutative is False + assert (A*A).conjugate() == conjugate(A)**2 + assert (A*B).conjugate() == conjugate(A)*conjugate(B) + assert (A*B**2).conjugate() == conjugate(A)*conjugate(B)**2 + assert (A*B - B*A).conjugate() == \ + conjugate(A)*conjugate(B) - conjugate(B)*conjugate(A) + assert (A*B).conjugate() - (B*A).conjugate() == \ + conjugate(A)*conjugate(B) - conjugate(B)*conjugate(A) + assert (A + I*B).conjugate() == conjugate(A) - I*conjugate(B) + + +def test_expand(): + assert expand((A*B)**2) == A*B*A*B + assert expand(A*B - B*A) == A*B - B*A + assert expand((A*B/A)**2) == A*B*B/A + assert expand(B*A*(A + B)*B) == B*A**2*B + B*A*B**2 + assert expand(B*A*(A + C)*B) == B*A**2*B + B*A*C*B + + +def test_factor(): + assert factor(A*B - B*A) == A*B - B*A + + +def test_posify(): + assert posify(A)[0].is_commutative is False + for q in (A*B/A, (A*B/A)**2, (A*B)**2, A*B - B*A): + p = posify(q) + assert p[0].subs(p[1]) == q + + +def test_radsimp(): + assert radsimp(A*B - B*A) == A*B - B*A + + +@XFAIL +def test_ratsimp(): + assert ratsimp(A*B - B*A) == A*B - B*A + + +@XFAIL +def test_rcollect(): + assert rcollect(A*B - B*A, A) == A*B - B*A + assert rcollect(A*B - B*A, B) == A*B - B*A + assert rcollect(A*B - B*A, x) == A*B - B*A + + +def test_simplify(): + assert simplify(A*B - B*A) == A*B - B*A + + +def test_subs(): + assert (x*y*A).subs(x*y, z) == A*z + assert (x*A*B).subs(x*A, C) == C*B + assert (x*A*x*x).subs(x**2*A, C) == x*C + assert (x*A*x*B).subs(x**2*A, C) == C*B + assert (A**2*B**2).subs(A*B**2, C) == A*C + assert (A*A*A + A*B*A).subs(A*A*A, C) == C + A*B*A + + +def test_transpose(): + assert transpose(A).is_commutative is False + assert transpose(A*A) == transpose(A)**2 + assert transpose(A*B) == transpose(B)*transpose(A) + assert transpose(A*B**2) == transpose(B)**2*transpose(A) + assert transpose(A*B - B*A) == \ + transpose(B)*transpose(A) - transpose(A)*transpose(B) + assert transpose(A + I*B) == transpose(A) + I*transpose(B) + + assert transpose(X) == conjugate(X) + assert transpose(-I*X) == -I*conjugate(X) + assert transpose(Y) == -conjugate(Y) + assert transpose(-I*Y) == I*conjugate(Y) + + +def test_trigsimp(): + assert trigsimp(A*sin(x)**2 + A*cos(x)**2) == A diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_numbers.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_numbers.py new file mode 100644 index 0000000000000000000000000000000000000000..10d14b6ac09fb0ab102c37cb99405440bd0bbffb --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_numbers.py @@ -0,0 +1,2335 @@ +import numbers as nums +import decimal +from sympy.concrete.summations import Sum +from sympy.core import (EulerGamma, Catalan, TribonacciConstant, + GoldenRatio) +from sympy.core.containers import Tuple +from sympy.core.expr import unchanged +from sympy.core.logic import fuzzy_not +from sympy.core.mul import Mul +from sympy.core.numbers import (mpf_norm, seterr, + Integer, I, pi, comp, Rational, E, nan, + oo, AlgebraicNumber, Number, Float, zoo, equal_valued, + int_valued, all_close) +from sympy.core.intfunc import (igcd, igcdex, igcd2, igcd_lehmer, + ilcm, integer_nthroot, isqrt, integer_log, mod_inverse) +from sympy.core.power import Pow +from sympy.core.relational import Ge, Gt, Le, Lt +from sympy.core.singleton import S +from sympy.core.symbol import Dummy, Symbol +from sympy.core.sympify import sympify +from sympy.functions.combinatorial.factorials import factorial +from sympy.functions.elementary.integers import floor +from sympy.functions.combinatorial.numbers import fibonacci +from sympy.functions.elementary.exponential import exp, log +from sympy.functions.elementary.miscellaneous import sqrt, cbrt +from sympy.functions.elementary.trigonometric import cos, sin +from sympy.polys.domains.realfield import RealField +from sympy.printing.latex import latex +from sympy.printing.repr import srepr +from sympy.simplify import simplify +from sympy.polys.domains.groundtypes import PythonRational +from sympy.utilities.decorator import conserve_mpmath_dps +from sympy.utilities.iterables import permutations +from sympy.testing.pytest import (XFAIL, raises, _both_exp_pow, + warns_deprecated_sympy) +from sympy import Add + +from mpmath import mpf +import mpmath +from sympy.core import numbers +t = Symbol('t', real=False) + +_ninf = float(-oo) +_inf = float(oo) + + +def same_and_same_prec(a, b): + # stricter matching for Floats + return a == b and a._prec == b._prec + + +def test_seterr(): + seterr(divide=True) + raises(ValueError, lambda: S.Zero/S.Zero) + seterr(divide=False) + assert S.Zero / S.Zero is S.NaN + + +def test_mod(): + x = S.Half + y = Rational(3, 4) + z = Rational(5, 18043) + + assert x % x == 0 + assert x % y == S.Half + assert x % z == Rational(3, 36086) + assert y % x == Rational(1, 4) + assert y % y == 0 + assert y % z == Rational(9, 72172) + assert z % x == Rational(5, 18043) + assert z % y == Rational(5, 18043) + assert z % z == 0 + + a = Float(2.6) + + assert (a % .2) == 0.0 + assert (a % 2).round(15) == 0.6 + assert (a % 0.5).round(15) == 0.1 + + p = Symbol('p', infinite=True) + + assert oo % oo is nan + assert zoo % oo is nan + assert 5 % oo is nan + assert p % 5 is nan + + # In these two tests, if the precision of m does + # not match the precision of the ans, then it is + # likely that the change made now gives an answer + # with degraded accuracy. + r = Rational(500, 41) + f = Float('.36', 3) + m = r % f + ans = Float(r % Rational(f), 3) + assert m == ans and m._prec == ans._prec + f = Float('8.36', 3) + m = f % r + ans = Float(Rational(f) % r, 3) + assert m == ans and m._prec == ans._prec + + s = S.Zero + + assert s % float(1) == 0.0 + + # No rounding required since these numbers can be represented + # exactly. + assert Rational(3, 4) % Float(1.1) == 0.75 + assert Float(1.5) % Rational(5, 4) == 0.25 + assert Rational(5, 4).__rmod__(Float('1.5')) == 0.25 + assert Float('1.5').__rmod__(Float('2.75')) == Float('1.25') + assert 2.75 % Float('1.5') == Float('1.25') + + a = Integer(7) + b = Integer(4) + + assert type(a % b) == Integer + assert a % b == Integer(3) + assert Integer(1) % Rational(2, 3) == Rational(1, 3) + assert Rational(7, 5) % Integer(1) == Rational(2, 5) + assert Integer(2) % 1.5 == 0.5 + + assert Integer(3).__rmod__(Integer(10)) == Integer(1) + assert Integer(10) % 4 == Integer(2) + assert 15 % Integer(4) == Integer(3) + + +def test_divmod(): + x = Symbol("x") + assert divmod(S(12), S(8)) == Tuple(1, 4) + assert divmod(-S(12), S(8)) == Tuple(-2, 4) + assert divmod(S.Zero, S.One) == Tuple(0, 0) + raises(ZeroDivisionError, lambda: divmod(S.Zero, S.Zero)) + raises(ZeroDivisionError, lambda: divmod(S.One, S.Zero)) + assert divmod(S(12), 8) == Tuple(1, 4) + assert divmod(12, S(8)) == Tuple(1, 4) + assert S(1024)//x == 1024//x == floor(1024/x) + + assert divmod(S("2"), S("3/2")) == Tuple(S("1"), S("1/2")) + assert divmod(S("3/2"), S("2")) == Tuple(S("0"), S("3/2")) + assert divmod(S("2"), S("3.5")) == Tuple(S("0"), S("2.")) + assert divmod(S("3.5"), S("2")) == Tuple(S("1"), S("1.5")) + assert divmod(S("2"), S("1/3")) == Tuple(S("6"), S("0")) + assert divmod(S("1/3"), S("2")) == Tuple(S("0"), S("1/3")) + assert divmod(S("2"), S("1/10")) == Tuple(S("20"), S("0")) + assert divmod(S("2"), S(".1"))[0] == 19 + assert divmod(S("0.1"), S("2")) == Tuple(S("0"), S("0.1")) + assert divmod(S("2"), 2) == Tuple(S("1"), S("0")) + assert divmod(2, S("2")) == Tuple(S("1"), S("0")) + assert divmod(S("2"), 1.5) == Tuple(S("1"), S("0.5")) + assert divmod(1.5, S("2")) == Tuple(S("0"), S("1.5")) + assert divmod(0.3, S("2")) == Tuple(S("0"), S("0.3")) + assert divmod(S("3/2"), S("3.5")) == Tuple(S("0"), S(3/2)) + assert divmod(S("3.5"), S("3/2")) == Tuple(S("2"), S("0.5")) + assert divmod(S("3/2"), S("1/3")) == Tuple(S("4"), S("1/6")) + assert divmod(S("1/3"), S("3/2")) == Tuple(S("0"), S("1/3")) + assert divmod(S("3/2"), S("0.1"))[0] == 14 + assert divmod(S("0.1"), S("3/2")) == Tuple(S("0"), S("0.1")) + assert divmod(S("3/2"), 2) == Tuple(S("0"), S("3/2")) + assert divmod(2, S("3/2")) == Tuple(S("1"), S("1/2")) + assert divmod(S("3/2"), 1.5) == Tuple(S("1"), S("0.")) + assert divmod(1.5, S("3/2")) == Tuple(S("1"), S("0.")) + assert divmod(S("3/2"), 0.3) == Tuple(S("5"), S("0.")) + assert divmod(0.3, S("3/2")) == Tuple(S("0"), S("0.3")) + assert divmod(S("1/3"), S("3.5")) == (0, 1/3) + assert divmod(S("3.5"), S("0.1")) == Tuple(S("35"), S("0.")) + assert divmod(S("0.1"), S("3.5")) == Tuple(S("0"), S("0.1")) + assert divmod(S("3.5"), 2) == Tuple(S("1"), S("1.5")) + assert divmod(2, S("3.5")) == Tuple(S("0"), S("2.")) + assert divmod(S("3.5"), 1.5) == Tuple(S("2"), S("0.5")) + assert divmod(1.5, S("3.5")) == Tuple(S("0"), S("1.5")) + assert divmod(0.3, S("3.5")) == Tuple(S("0"), S("0.3")) + assert divmod(S("0.1"), S("1/3")) == Tuple(S("0"), S("0.1")) + assert divmod(S("1/3"), 2) == Tuple(S("0"), S("1/3")) + assert divmod(2, S("1/3")) == Tuple(S("6"), S("0")) + assert divmod(S("1/3"), 1.5) == (0, 1/3) + assert divmod(0.3, S("1/3")) == (0, 0.3) + assert divmod(S("0.1"), 2) == (0, 0.1) + assert divmod(2, S("0.1"))[0] == 19 + assert divmod(S("0.1"), 1.5) == (0, 0.1) + assert divmod(1.5, S("0.1")) == Tuple(S("15"), S("0.")) + assert divmod(S("0.1"), 0.3) == Tuple(S("0"), S("0.1")) + + assert str(divmod(S("2"), 0.3)) == '(6, 0.2)' + assert str(divmod(S("3.5"), S("1/3"))) == '(10, 0.166666666666667)' + assert str(divmod(S("3.5"), 0.3)) == '(11, 0.2)' + assert str(divmod(S("1/3"), S("0.1"))) == '(3, 0.0333333333333333)' + assert str(divmod(1.5, S("1/3"))) == '(4, 0.166666666666667)' + assert str(divmod(S("1/3"), 0.3)) == '(1, 0.0333333333333333)' + assert str(divmod(0.3, S("0.1"))) == '(2, 0.1)' + + assert divmod(-3, S(2)) == (-2, 1) + assert divmod(S(-3), S(2)) == (-2, 1) + assert divmod(S(-3), 2) == (-2, 1) + + assert divmod(oo, 1) == (S.NaN, S.NaN) + assert divmod(S.NaN, 1) == (S.NaN, S.NaN) + assert divmod(1, S.NaN) == (S.NaN, S.NaN) + ans = [(-1, oo), (-1, oo), (0, 0), (0, 1), (0, 2)] + OO = float('inf') + ANS = [tuple(map(float, i)) for i in ans] + assert [divmod(i, oo) for i in range(-2, 3)] == ans + ans = [(0, -2), (0, -1), (0, 0), (-1, -oo), (-1, -oo)] + ANS = [tuple(map(float, i)) for i in ans] + assert [divmod(i, -oo) for i in range(-2, 3)] == ans + assert [divmod(i, -OO) for i in range(-2, 3)] == ANS + + # sympy's divmod gives an Integer for the quotient rather than a float + dmod = lambda a, b: tuple([j if i else int(j) for i, j in enumerate(divmod(a, b))]) + for a in (4, 4., 4.25, 0, 0., -4, -4. -4.25): + for b in (2, 2., 2.5, -2, -2., -2.5): + assert divmod(S(a), S(b)) == dmod(a, b) + + +def test_igcd(): + assert igcd(0, 0) == 0 + assert igcd(0, 1) == 1 + assert igcd(1, 0) == 1 + assert igcd(0, 7) == 7 + assert igcd(7, 0) == 7 + assert igcd(7, 1) == 1 + assert igcd(1, 7) == 1 + assert igcd(-1, 0) == 1 + assert igcd(0, -1) == 1 + assert igcd(-1, -1) == 1 + assert igcd(-1, 7) == 1 + assert igcd(7, -1) == 1 + assert igcd(8, 2) == 2 + assert igcd(4, 8) == 4 + assert igcd(8, 16) == 8 + assert igcd(7, -3) == 1 + assert igcd(-7, 3) == 1 + assert igcd(-7, -3) == 1 + assert igcd(*[10, 20, 30]) == 10 + raises(TypeError, lambda: igcd()) + raises(TypeError, lambda: igcd(2)) + raises(ValueError, lambda: igcd(0, None)) + raises(ValueError, lambda: igcd(1, 2.2)) + for args in permutations((45.1, 1, 30)): + raises(ValueError, lambda: igcd(*args)) + for args in permutations((1, 2, None)): + raises(ValueError, lambda: igcd(*args)) + + +def test_igcd_lehmer(): + a, b = fibonacci(10001), fibonacci(10000) + # len(str(a)) == 2090 + # small divisors, long Euclidean sequence + assert igcd_lehmer(a, b) == 1 + c = fibonacci(100) + assert igcd_lehmer(a*c, b*c) == c + # big divisor + assert igcd_lehmer(a, 10**1000) == 1 + # swapping argument + assert igcd_lehmer(1, 2) == igcd_lehmer(2, 1) + + +def test_igcd2(): + # short loop + assert igcd2(2**100 - 1, 2**99 - 1) == 1 + # Lehmer's algorithm + a, b = int(fibonacci(10001)), int(fibonacci(10000)) + assert igcd2(a, b) == 1 + + +def test_ilcm(): + assert ilcm(0, 0) == 0 + assert ilcm(1, 0) == 0 + assert ilcm(0, 1) == 0 + assert ilcm(1, 1) == 1 + assert ilcm(2, 1) == 2 + assert ilcm(8, 2) == 8 + assert ilcm(8, 6) == 24 + assert ilcm(8, 7) == 56 + assert ilcm(*[10, 20, 30]) == 60 + raises(ValueError, lambda: ilcm(8.1, 7)) + raises(ValueError, lambda: ilcm(8, 7.1)) + raises(TypeError, lambda: ilcm(8)) + + +def test_igcdex(): + assert igcdex(2, 3) == (-1, 1, 1) + assert igcdex(10, 12) == (-1, 1, 2) + assert igcdex(100, 2004) == (-20, 1, 4) + assert igcdex(0, 0) == (0, 0, 0) + assert igcdex(1, 0) == (1, 0, 1) + + +def _strictly_equal(a, b): + return (a.p, a.q, type(a.p), type(a.q)) == \ + (b.p, b.q, type(b.p), type(b.q)) + + +def _test_rational_new(cls): + """ + Tests that are common between Integer and Rational. + """ + assert cls(0) is S.Zero + assert cls(1) is S.One + assert cls(-1) is S.NegativeOne + # These look odd, but are similar to int(): + assert cls('1') is S.One + assert cls('-1') is S.NegativeOne + + i = Integer(10) + assert _strictly_equal(i, cls('10')) + assert _strictly_equal(i, cls('10')) + assert _strictly_equal(i, cls(int(10))) + assert _strictly_equal(i, cls(i)) + + raises(TypeError, lambda: cls(Symbol('x'))) + + +def test_Integer_new(): + """ + Test for Integer constructor + """ + _test_rational_new(Integer) + + assert _strictly_equal(Integer(0.9), S.Zero) + assert _strictly_equal(Integer(10.5), Integer(10)) + raises(ValueError, lambda: Integer("10.5")) + assert Integer(Rational('1.' + '9'*20)) == 1 + + +def test_Rational_new(): + """" + Test for Rational constructor + """ + _test_rational_new(Rational) + + n1 = S.Half + assert n1 == Rational(Integer(1), 2) + assert n1 == Rational(Integer(1), Integer(2)) + assert n1 == Rational(1, Integer(2)) + assert n1 == Rational(S.Half) + assert 1 == Rational(n1, n1) + assert Rational(3, 2) == Rational(S.Half, Rational(1, 3)) + assert Rational(3, 1) == Rational(1, Rational(1, 3)) + n3_4 = Rational(3, 4) + assert Rational('3/4') == n3_4 + assert -Rational('-3/4') == n3_4 + assert Rational('.76').limit_denominator(4) == n3_4 + assert Rational(19, 25).limit_denominator(4) == n3_4 + assert Rational('19/25').limit_denominator(4) == n3_4 + assert Rational(1.0, 3) == Rational(1, 3) + assert Rational(1, 3.0) == Rational(1, 3) + assert Rational(Float(0.5)) == S.Half + assert Rational('1e2/1e-2') == Rational(10000) + assert Rational('1 234') == Rational(1234) + assert Rational('1/1 234') == Rational(1, 1234) + assert Rational(-1, 0) is S.ComplexInfinity + assert Rational(1, 0) is S.ComplexInfinity + # Make sure Rational doesn't lose precision on Floats + assert Rational(pi.evalf(100)).evalf(100) == pi.evalf(100) + raises(TypeError, lambda: Rational('3**3')) + raises(TypeError, lambda: Rational('1/2 + 2/3')) + + # handle fractions.Fraction instances + try: + import fractions + assert Rational(fractions.Fraction(1, 2)) == S.Half + except ImportError: + pass + + assert Rational(PythonRational(2, 6)) == Rational(1, 3) + + with warns_deprecated_sympy(): + assert Rational(2, 4, gcd=1).q == 4 + with warns_deprecated_sympy(): + n = Rational(2, -4, gcd=1) + assert n.q == 4 + assert n.p == -2 + + assert Rational.from_coprime_ints(3, 5) == Rational(3, 5) + + +def test_issue_24543(): + for p in ('1.5', 1.5, 2): + for q in ('1.5', 1.5, 2): + assert Rational(p, q).as_numer_denom() == Rational('%s/%s'%(p,q)).as_numer_denom() + + assert Rational('0.5', '100') == Rational(1, 200) + + +def test_Number_new(): + """" + Test for Number constructor + """ + # Expected behavior on numbers and strings + assert Number(1) is S.One + assert Number(2).__class__ is Integer + assert Number(-622).__class__ is Integer + assert Number(5, 3).__class__ is Rational + assert Number(5.3).__class__ is Float + assert Number('1') is S.One + assert Number('2').__class__ is Integer + assert Number('-622').__class__ is Integer + assert Number('5/3').__class__ is Rational + assert Number('5.3').__class__ is Float + raises(ValueError, lambda: Number('cos')) + raises(TypeError, lambda: Number(cos)) + a = Rational(3, 5) + assert Number(a) is a # Check idempotence on Numbers + u = ['inf', '-inf', 'nan', 'iNF', '+inf'] + v = [oo, -oo, nan, oo, oo] + for i, a in zip(u, v): + assert Number(i) is a, (i, Number(i), a) + + +def test_Number_cmp(): + n1 = Number(1) + n2 = Number(2) + n3 = Number(-3) + + assert n1 < n2 + assert n1 <= n2 + assert n3 < n1 + assert n2 > n3 + assert n2 >= n3 + + raises(TypeError, lambda: n1 < S.NaN) + raises(TypeError, lambda: n1 <= S.NaN) + raises(TypeError, lambda: n1 > S.NaN) + raises(TypeError, lambda: n1 >= S.NaN) + + +def test_Rational_cmp(): + n1 = Rational(1, 4) + n2 = Rational(1, 3) + n3 = Rational(2, 4) + n4 = Rational(2, -4) + n5 = Rational(0) + n6 = Rational(1) + n7 = Rational(3) + n8 = Rational(-3) + + assert n8 < n5 + assert n5 < n6 + assert n6 < n7 + assert n8 < n7 + assert n7 > n8 + assert (n1 + 1)**n2 < 2 + assert ((n1 + n6)/n7) < 1 + + assert n4 < n3 + assert n2 < n3 + assert n1 < n2 + assert n3 > n1 + assert not n3 < n1 + assert not (Rational(-1) > 0) + assert Rational(-1) < 0 + + raises(TypeError, lambda: n1 < S.NaN) + raises(TypeError, lambda: n1 <= S.NaN) + raises(TypeError, lambda: n1 > S.NaN) + raises(TypeError, lambda: n1 >= S.NaN) + + +def test_Float(): + def eq(a, b): + t = Float("1.0E-15") + return (-t < a - b < t) + + equal_pairs = [ + (0, 0.0), # This is just how Python works... + (0, S.Zero), + (0.0, Float(0)), + ] + unequal_pairs = [ + (0.0, S.Zero), + (0, Float(0)), + (S.Zero, Float(0)), + ] + for p1, p2 in equal_pairs: + assert (p1 == p2) is True + assert (p1 != p2) is False + assert (p2 == p1) is True + assert (p2 != p1) is False + for p1, p2 in unequal_pairs: + assert (p1 == p2) is False + assert (p1 != p2) is True + assert (p2 == p1) is False + assert (p2 != p1) is True + + assert S.Zero.is_zero + + a = Float(2) ** Float(3) + assert eq(a.evalf(), Float(8)) + assert eq((pi ** -1).evalf(), Float("0.31830988618379067")) + a = Float(2) ** Float(4) + assert eq(a.evalf(), Float(16)) + assert (S(.3) == S(.5)) is False + + mpf = (0, 5404319552844595, -52, 53) + x_str = Float((0, '13333333333333', -52, 53)) + x_0xstr = Float((0, '0x13333333333333', -52, 53)) + x2_str = Float((0, '26666666666666', -53, 54)) + x_hex = Float((0, int(0x13333333333333), -52, 53)) + x_dec = Float(mpf) + assert x_str == x_0xstr == x_hex == x_dec == Float(1.2) + # x2_str was entered slightly malformed in that the mantissa + # was even -- it should be odd and the even part should be + # included with the exponent, but this is resolved by normalization + # ONLY IF REQUIREMENTS of mpf_norm are met: the bitcount must + # be exact: double the mantissa ==> increase bc by 1 + assert Float(1.2)._mpf_ == mpf + assert x2_str._mpf_ == mpf + + assert Float((0, int(0), -123, -1)) is S.NaN + assert Float((0, int(0), -456, -2)) is S.Infinity + assert Float((1, int(0), -789, -3)) is S.NegativeInfinity + # if you don't give the full signature, it's not special + assert Float((0, int(0), -123)) == Float(0) + assert Float((0, int(0), -456)) == Float(0) + assert Float((1, int(0), -789)) == Float(0) + + raises(ValueError, lambda: Float((0, 7, 1, 3), '')) + + assert Float('0.0').is_finite is True + assert Float('0.0').is_negative is False + assert Float('0.0').is_positive is False + assert Float('0.0').is_infinite is False + assert Float('0.0').is_zero is True + + # rationality properties + # if the integer test fails then the use of intlike + # should be removed from gamma_functions.py + assert Float(1).is_integer is None + assert Float(1).is_rational is None + assert Float(1).is_irrational is None + assert sqrt(2).n(15).is_rational is None + assert sqrt(2).n(15).is_irrational is None + + # do not automatically evalf + def teq(a): + assert (a.evalf() == a) is False + assert (a.evalf() != a) is True + assert (a == a.evalf()) is False + assert (a != a.evalf()) is True + + teq(pi) + teq(2*pi) + teq(cos(0.1, evaluate=False)) + + # long integer + i = 12345678901234567890 + assert same_and_same_prec(Float(12, ''), Float('12', '')) + assert same_and_same_prec(Float(Integer(i), ''), Float(i, '')) + assert same_and_same_prec(Float(i, ''), Float(str(i), 20)) + assert same_and_same_prec(Float(str(i)), Float(i, '')) + assert same_and_same_prec(Float(i), Float(i, '')) + + # inexact floats (repeating binary = denom not multiple of 2) + # cannot have precision greater than 15 + assert Float(.125, 22)._prec == 76 + assert Float(2.0, 22)._prec == 76 + # only default prec is equal, even for exactly representable float + assert Float(.125, 22) != .125 + #assert Float(2.0, 22) == 2 + assert float(Float('.12500000000000001', '')) == .125 + raises(ValueError, lambda: Float(.12500000000000001, '')) + + # allow spaces + assert Float('123 456.123 456') == Float('123456.123456') + assert Integer('123 456') == Integer('123456') + assert Rational('123 456.123 456') == Rational('123456.123456') + assert Float(' .3e2') == Float('0.3e2') + # but treat them as strictly ass underscore between digits: only 1 + raises(ValueError, lambda: Float('1 2')) + + # allow underscore between digits + assert Float('1_23.4_56') == Float('123.456') + # assert Float('1_23.4_5_6', 12) == Float('123.456', 12) + # ...but not in all cases (per Py 3.6) + raises(ValueError, lambda: Float('1_')) + raises(ValueError, lambda: Float('1__2')) + raises(ValueError, lambda: Float('_1')) + raises(ValueError, lambda: Float('_inf')) + + # allow auto precision detection + assert Float('.1', '') == Float(.1, 1) + assert Float('.125', '') == Float(.125, 3) + assert Float('.100', '') == Float(.1, 3) + assert Float('2.0', '') == Float('2', 2) + + raises(ValueError, lambda: Float("12.3d-4", "")) + raises(ValueError, lambda: Float(12.3, "")) + raises(ValueError, lambda: Float('.')) + raises(ValueError, lambda: Float('-.')) + + zero = Float('0.0') + assert Float('-0') == zero + assert Float('.0') == zero + assert Float('-.0') == zero + assert Float('-0.0') == zero + assert Float(0.0) == zero + assert Float(0) == zero + assert Float(0, '') == Float('0', '') + assert Float(1) == Float(1.0) + assert Float(S.Zero) == zero + assert Float(S.One) == Float(1.0) + + assert Float(decimal.Decimal('0.1'), 3) == Float('.1', 3) + assert Float(decimal.Decimal('nan')) is S.NaN + assert Float(decimal.Decimal('Infinity')) is S.Infinity + assert Float(decimal.Decimal('-Infinity')) is S.NegativeInfinity + + assert '{:.3f}'.format(Float(4.236622)) == '4.237' + assert '{:.35f}'.format(Float(pi.n(40), 40)) == \ + '3.14159265358979323846264338327950288' + + # unicode + assert Float('0.73908513321516064100000000') == \ + Float('0.73908513321516064100000000') + assert Float('0.73908513321516064100000000', 28) == \ + Float('0.73908513321516064100000000', 28) + + # binary precision + # Decimal value 0.1 cannot be expressed precisely as a base 2 fraction + a = Float(S.One/10, dps=15) + b = Float(S.One/10, dps=16) + p = Float(S.One/10, precision=53) + q = Float(S.One/10, precision=54) + assert a._mpf_ == p._mpf_ + assert not a._mpf_ == q._mpf_ + assert not b._mpf_ == q._mpf_ + + # Precision specifying errors + raises(ValueError, lambda: Float("1.23", dps=3, precision=10)) + raises(ValueError, lambda: Float("1.23", dps="", precision=10)) + raises(ValueError, lambda: Float("1.23", dps=3, precision="")) + raises(ValueError, lambda: Float("1.23", dps="", precision="")) + + # from NumberSymbol + assert same_and_same_prec(Float(pi, 32), pi.evalf(32)) + assert same_and_same_prec(Float(Catalan), Catalan.evalf()) + + # oo and nan + u = ['inf', '-inf', 'nan', 'iNF', '+inf'] + v = [oo, -oo, nan, oo, oo] + for i, a in zip(u, v): + assert Float(i) is a + + +def test_zero_not_false(): + # https://github.com/sympy/sympy/issues/20796 + assert (S(0.0) == S.false) is False + assert (S.false == S(0.0)) is False + assert (S(0) == S.false) is False + assert (S.false == S(0)) is False + + +@conserve_mpmath_dps +def test_float_mpf(): + import mpmath + mpmath.mp.dps = 100 + mp_pi = mpmath.pi() + + assert Float(mp_pi, 100) == Float(mp_pi._mpf_, 100) == pi.evalf(100) + + mpmath.mp.dps = 15 + + assert Float(mp_pi, 100) == Float(mp_pi._mpf_, 100) == pi.evalf(100) + + +def test_Float_RealElement(): + repi = RealField(dps=100)(pi.evalf(100)) + # We still have to pass the precision because Float doesn't know what + # RealElement is, but make sure it keeps full precision from the result. + assert Float(repi, 100) == pi.evalf(100) + + +def test_Float_default_to_highprec_from_str(): + s = str(pi.evalf(128)) + assert same_and_same_prec(Float(s), Float(s, '')) + + +def test_Float_eval(): + a = Float(3.2) + assert (a**2).is_Float + + +def test_Float_issue_2107(): + a = Float(0.1, 10) + b = Float("0.1", 10) + + assert a - a == 0 + assert a + (-a) == 0 + assert S.Zero + a - a == 0 + assert S.Zero + a + (-a) == 0 + + assert b - b == 0 + assert b + (-b) == 0 + assert S.Zero + b - b == 0 + assert S.Zero + b + (-b) == 0 + + +def test_issue_14289(): + from sympy.polys.numberfields import to_number_field + + a = 1 - sqrt(2) + b = to_number_field(a) + assert b.as_expr() == a + assert b.minpoly(a).expand() == 0 + + +def test_Float_from_tuple(): + a = Float((0, '1L', 0, 1)) + b = Float((0, '1', 0, 1)) + assert a == b + + +def test_Infinity(): + assert oo != 1 + assert 1*oo is oo + assert 1 != oo + assert oo != -oo + assert oo != Symbol("x")**3 + assert oo + 1 is oo + assert 2 + oo is oo + assert 3*oo + 2 is oo + assert S.Half**oo == 0 + assert S.Half**(-oo) is oo + assert -oo*3 is -oo + assert oo + oo is oo + assert -oo + oo*(-5) is -oo + assert 1/oo == 0 + assert 1/(-oo) == 0 + assert 8/oo == 0 + assert oo % 2 is nan + assert 2 % oo is nan + assert oo/oo is nan + assert oo/-oo is nan + assert -oo/oo is nan + assert -oo/-oo is nan + assert oo - oo is nan + assert oo - -oo is oo + assert -oo - oo is -oo + assert -oo - -oo is nan + assert oo + -oo is nan + assert -oo + oo is nan + assert oo + oo is oo + assert -oo + oo is nan + assert oo + -oo is nan + assert -oo + -oo is -oo + assert oo*oo is oo + assert -oo*oo is -oo + assert oo*-oo is -oo + assert -oo*-oo is oo + assert oo/0 is oo + assert -oo/0 is -oo + assert 0/oo == 0 + assert 0/-oo == 0 + assert oo*0 is nan + assert -oo*0 is nan + assert 0*oo is nan + assert 0*-oo is nan + assert oo + 0 is oo + assert -oo + 0 is -oo + assert 0 + oo is oo + assert 0 + -oo is -oo + assert oo - 0 is oo + assert -oo - 0 is -oo + assert 0 - oo is -oo + assert 0 - -oo is oo + assert oo/2 is oo + assert -oo/2 is -oo + assert oo/-2 is -oo + assert -oo/-2 is oo + assert oo*2 is oo + assert -oo*2 is -oo + assert oo*-2 is -oo + assert 2/oo == 0 + assert 2/-oo == 0 + assert -2/oo == 0 + assert -2/-oo == 0 + assert 2*oo is oo + assert 2*-oo is -oo + assert -2*oo is -oo + assert -2*-oo is oo + assert 2 + oo is oo + assert 2 - oo is -oo + assert -2 + oo is oo + assert -2 - oo is -oo + assert 2 + -oo is -oo + assert 2 - -oo is oo + assert -2 + -oo is -oo + assert -2 - -oo is oo + assert S(2) + oo is oo + assert S(2) - oo is -oo + assert oo/I == -oo*I + assert -oo/I == oo*I + assert oo*float(1) == _inf and (oo*float(1)) is oo + assert -oo*float(1) == _ninf and (-oo*float(1)) is -oo + assert oo/float(1) == _inf and (oo/float(1)) is oo + assert -oo/float(1) == _ninf and (-oo/float(1)) is -oo + assert oo*float(-1) == _ninf and (oo*float(-1)) is -oo + assert -oo*float(-1) == _inf and (-oo*float(-1)) is oo + assert oo/float(-1) == _ninf and (oo/float(-1)) is -oo + assert -oo/float(-1) == _inf and (-oo/float(-1)) is oo + assert oo + float(1) == _inf and (oo + float(1)) is oo + assert -oo + float(1) == _ninf and (-oo + float(1)) is -oo + assert oo - float(1) == _inf and (oo - float(1)) is oo + assert -oo - float(1) == _ninf and (-oo - float(1)) is -oo + assert float(1)*oo == _inf and (float(1)*oo) is oo + assert float(1)*-oo == _ninf and (float(1)*-oo) is -oo + assert float(1)/oo == 0 + assert float(1)/-oo == 0 + assert float(-1)*oo == _ninf and (float(-1)*oo) is -oo + assert float(-1)*-oo == _inf and (float(-1)*-oo) is oo + assert float(-1)/oo == 0 + assert float(-1)/-oo == 0 + assert float(1) + oo is oo + assert float(1) + -oo is -oo + assert float(1) - oo is -oo + assert float(1) - -oo is oo + assert oo == float(oo) + assert (oo != float(oo)) is False + assert type(float(oo)) is float + assert -oo == float(-oo) + assert (-oo != float(-oo)) is False + assert type(float(-oo)) is float + + assert Float('nan') is nan + assert nan*1.0 is nan + assert -1.0*nan is nan + assert nan*oo is nan + assert nan*-oo is nan + assert nan/oo is nan + assert nan/-oo is nan + assert nan + oo is nan + assert nan + -oo is nan + assert nan - oo is nan + assert nan - -oo is nan + assert -oo * S.Zero is nan + + assert oo*nan is nan + assert -oo*nan is nan + assert oo/nan is nan + assert -oo/nan is nan + assert oo + nan is nan + assert -oo + nan is nan + assert oo - nan is nan + assert -oo - nan is nan + assert S.Zero * oo is nan + assert oo.is_Rational is False + assert isinstance(oo, Rational) is False + + assert S.One/oo == 0 + assert -S.One/oo == 0 + assert S.One/-oo == 0 + assert -S.One/-oo == 0 + assert S.One*oo is oo + assert -S.One*oo is -oo + assert S.One*-oo is -oo + assert -S.One*-oo is oo + assert S.One/nan is nan + assert S.One - -oo is oo + assert S.One + nan is nan + assert S.One - nan is nan + assert nan - S.One is nan + assert nan/S.One is nan + assert -oo - S.One is -oo + + +def test_Infinity_2(): + x = Symbol('x') + assert oo*x != oo + assert oo*(pi - 1) is oo + assert oo*(1 - pi) is -oo + + assert (-oo)*x != -oo + assert (-oo)*(pi - 1) is -oo + assert (-oo)*(1 - pi) is oo + + assert (-1)**S.NaN is S.NaN + assert oo - _inf is S.NaN + assert oo + _ninf is S.NaN + assert oo*0 is S.NaN + assert oo/_inf is S.NaN + assert oo/_ninf is S.NaN + assert oo**S.NaN is S.NaN + assert -oo + _inf is S.NaN + assert -oo - _ninf is S.NaN + assert -oo*S.NaN is S.NaN + assert -oo*0 is S.NaN + assert -oo/_inf is S.NaN + assert -oo/_ninf is S.NaN + assert -oo/S.NaN is S.NaN + assert abs(-oo) is oo + assert all((-oo)**i is S.NaN for i in (oo, -oo, S.NaN)) + assert (-oo)**3 is -oo + assert (-oo)**2 is oo + assert abs(S.ComplexInfinity) is oo + + +def test_Mul_Infinity_Zero(): + assert Float(0)*_inf is nan + assert Float(0)*_ninf is nan + assert Float(0)*_inf is nan + assert Float(0)*_ninf is nan + assert _inf*Float(0) is nan + assert _ninf*Float(0) is nan + assert _inf*Float(0) is nan + assert _ninf*Float(0) is nan + + +def test_Div_By_Zero(): + assert 1/S.Zero is zoo + assert 1/Float(0) is zoo + assert 0/S.Zero is nan + assert 0/Float(0) is nan + assert S.Zero/0 is nan + assert Float(0)/0 is nan + assert -1/S.Zero is zoo + assert -1/Float(0) is zoo + + +@_both_exp_pow +def test_Infinity_inequations(): + assert oo > pi + assert not (oo < pi) + assert exp(-3) < oo + + assert _inf > pi + assert not (_inf < pi) + assert exp(-3) < _inf + + raises(TypeError, lambda: oo < I) + raises(TypeError, lambda: oo <= I) + raises(TypeError, lambda: oo > I) + raises(TypeError, lambda: oo >= I) + raises(TypeError, lambda: -oo < I) + raises(TypeError, lambda: -oo <= I) + raises(TypeError, lambda: -oo > I) + raises(TypeError, lambda: -oo >= I) + + raises(TypeError, lambda: I < oo) + raises(TypeError, lambda: I <= oo) + raises(TypeError, lambda: I > oo) + raises(TypeError, lambda: I >= oo) + raises(TypeError, lambda: I < -oo) + raises(TypeError, lambda: I <= -oo) + raises(TypeError, lambda: I > -oo) + raises(TypeError, lambda: I >= -oo) + + assert oo > -oo and oo >= -oo + assert (oo < -oo) == False and (oo <= -oo) == False + assert -oo < oo and -oo <= oo + assert (-oo > oo) == False and (-oo >= oo) == False + + assert (oo < oo) == False # issue 7775 + assert (oo > oo) == False + assert (-oo > -oo) == False and (-oo < -oo) == False + assert oo >= oo and oo <= oo and -oo >= -oo and -oo <= -oo + assert (-oo < -_inf) == False + assert (oo > _inf) == False + assert -oo >= -_inf + assert oo <= _inf + + x = Symbol('x') + b = Symbol('b', finite=True, real=True) + assert (x < oo) == Lt(x, oo) # issue 7775 + assert b < oo and b > -oo and b <= oo and b >= -oo + assert oo > b and oo >= b and (oo < b) == False and (oo <= b) == False + assert (-oo > b) == False and (-oo >= b) == False and -oo < b and -oo <= b + assert (oo < x) == Lt(oo, x) and (oo > x) == Gt(oo, x) + assert (oo <= x) == Le(oo, x) and (oo >= x) == Ge(oo, x) + assert (-oo < x) == Lt(-oo, x) and (-oo > x) == Gt(-oo, x) + assert (-oo <= x) == Le(-oo, x) and (-oo >= x) == Ge(-oo, x) + + +def test_NaN(): + assert nan is nan + assert nan != 1 + assert 1*nan is nan + assert 1 != nan + assert -nan is nan + assert oo != Symbol("x")**3 + assert 2 + nan is nan + assert 3*nan + 2 is nan + assert -nan*3 is nan + assert nan + nan is nan + assert -nan + nan*(-5) is nan + assert 8/nan is nan + raises(TypeError, lambda: nan > 0) + raises(TypeError, lambda: nan < 0) + raises(TypeError, lambda: nan >= 0) + raises(TypeError, lambda: nan <= 0) + raises(TypeError, lambda: 0 < nan) + raises(TypeError, lambda: 0 > nan) + raises(TypeError, lambda: 0 <= nan) + raises(TypeError, lambda: 0 >= nan) + assert nan**0 == 1 # as per IEEE 754 + assert 1**nan is nan # IEEE 754 is not the best choice for symbolic work + # test Pow._eval_power's handling of NaN + assert Pow(nan, 0, evaluate=False)**2 == 1 + for n in (1, 1., S.One, S.NegativeOne, Float(1)): + assert n + nan is nan + assert n - nan is nan + assert nan + n is nan + assert nan - n is nan + assert n/nan is nan + assert nan/n is nan + + +def test_special_numbers(): + assert isinstance(S.NaN, Number) is True + assert isinstance(S.Infinity, Number) is True + assert isinstance(S.NegativeInfinity, Number) is True + + assert S.NaN.is_number is True + assert S.Infinity.is_number is True + assert S.NegativeInfinity.is_number is True + assert S.ComplexInfinity.is_number is True + + assert isinstance(S.NaN, Rational) is False + assert isinstance(S.Infinity, Rational) is False + assert isinstance(S.NegativeInfinity, Rational) is False + + assert S.NaN.is_rational is not True + assert S.Infinity.is_rational is not True + assert S.NegativeInfinity.is_rational is not True + + +def test_powers(): + assert integer_nthroot(1, 2) == (1, True) + assert integer_nthroot(1, 5) == (1, True) + assert integer_nthroot(2, 1) == (2, True) + assert integer_nthroot(2, 2) == (1, False) + assert integer_nthroot(2, 5) == (1, False) + assert integer_nthroot(4, 2) == (2, True) + assert integer_nthroot(123**25, 25) == (123, True) + assert integer_nthroot(123**25 + 1, 25) == (123, False) + assert integer_nthroot(123**25 - 1, 25) == (122, False) + assert integer_nthroot(1, 1) == (1, True) + assert integer_nthroot(0, 1) == (0, True) + assert integer_nthroot(0, 3) == (0, True) + assert integer_nthroot(10000, 1) == (10000, True) + assert integer_nthroot(4, 2) == (2, True) + assert integer_nthroot(16, 2) == (4, True) + assert integer_nthroot(26, 2) == (5, False) + assert integer_nthroot(1234567**7, 7) == (1234567, True) + assert integer_nthroot(1234567**7 + 1, 7) == (1234567, False) + assert integer_nthroot(1234567**7 - 1, 7) == (1234566, False) + b = 25**1000 + assert integer_nthroot(b, 1000) == (25, True) + assert integer_nthroot(b + 1, 1000) == (25, False) + assert integer_nthroot(b - 1, 1000) == (24, False) + c = 10**400 + c2 = c**2 + assert integer_nthroot(c2, 2) == (c, True) + assert integer_nthroot(c2 + 1, 2) == (c, False) + assert integer_nthroot(c2 - 1, 2) == (c - 1, False) + assert integer_nthroot(2, 10**10) == (1, False) + + p, r = integer_nthroot(int(factorial(10000)), 100) + assert p % (10**10) == 5322420655 + assert not r + + # Test that this is fast + assert integer_nthroot(2, 10**10) == (1, False) + + # output should be int if possible + assert type(integer_nthroot(2**61, 2)[0]) is int + + +def test_integer_nthroot_overflow(): + assert integer_nthroot(10**(50*50), 50) == (10**50, True) + assert integer_nthroot(10**100000, 10000) == (10**10, True) + + +def test_integer_log(): + raises(ValueError, lambda: integer_log(2, 1)) + raises(ValueError, lambda: integer_log(0, 2)) + raises(ValueError, lambda: integer_log(1.1, 2)) + raises(ValueError, lambda: integer_log(1, 2.2)) + + assert integer_log(1, 2) == (0, True) + assert integer_log(1, 3) == (0, True) + assert integer_log(2, 3) == (0, False) + assert integer_log(3, 3) == (1, True) + assert integer_log(3*2, 3) == (1, False) + assert integer_log(3**2, 3) == (2, True) + assert integer_log(3*4, 3) == (2, False) + assert integer_log(3**3, 3) == (3, True) + assert integer_log(27, 5) == (2, False) + assert integer_log(2, 3) == (0, False) + assert integer_log(-4, 2) == (2, False) + assert integer_log(-16, 4) == (0, False) + assert integer_log(-4, -2) == (2, False) + assert integer_log(4, -2) == (2, True) + assert integer_log(-8, -2) == (3, True) + assert integer_log(8, -2) == (3, False) + assert integer_log(-9, 3) == (0, False) + assert integer_log(-9, -3) == (2, False) + assert integer_log(9, -3) == (2, True) + assert integer_log(-27, -3) == (3, True) + assert integer_log(27, -3) == (3, False) + + +def test_isqrt(): + from math import sqrt as _sqrt + limit = 4503599761588223 + assert int(_sqrt(limit)) == integer_nthroot(limit, 2)[0] + assert int(_sqrt(limit + 1)) != integer_nthroot(limit + 1, 2)[0] + assert isqrt(limit + 1) == integer_nthroot(limit + 1, 2)[0] + assert isqrt(limit + S.Half) == integer_nthroot(limit, 2)[0] + assert isqrt(limit + 1 + S.Half) == integer_nthroot(limit + 1, 2)[0] + assert isqrt(limit + 2 + S.Half) == integer_nthroot(limit + 2, 2)[0] + + # Regression tests for https://github.com/sympy/sympy/issues/17034 + assert isqrt(4503599761588224) == 67108864 + assert isqrt(9999999999999999) == 99999999 + + # Other corner cases, especially involving non-integers. + raises(ValueError, lambda: isqrt(-1)) + raises(ValueError, lambda: isqrt(-10**1000)) + raises(ValueError, lambda: isqrt(Rational(-1, 2))) + + tiny = Rational(1, 10**1000) + raises(ValueError, lambda: isqrt(-tiny)) + assert isqrt(1-tiny) == 0 + assert isqrt(4503599761588224-tiny) == 67108864 + assert isqrt(10**100 - tiny) == 10**50 - 1 + + +def test_powers_Integer(): + """Test Integer._eval_power""" + # check infinity + assert S.One ** S.Infinity is S.NaN + assert S.NegativeOne** S.Infinity is S.NaN + assert S(2) ** S.Infinity is S.Infinity + assert S(-2)** S.Infinity == zoo + assert S(0) ** S.Infinity is S.Zero + + # check Nan + assert S.One ** S.NaN is S.NaN + assert S.NegativeOne ** S.NaN is S.NaN + + # check for exact roots + assert S.NegativeOne ** Rational(6, 5) == - (-1)**(S.One/5) + assert sqrt(S(4)) == 2 + assert sqrt(S(-4)) == I * 2 + assert S(16) ** Rational(1, 4) == 2 + assert S(-16) ** Rational(1, 4) == 2 * (-1)**Rational(1, 4) + assert S(9) ** Rational(3, 2) == 27 + assert S(-9) ** Rational(3, 2) == -27*I + assert S(27) ** Rational(2, 3) == 9 + assert S(-27) ** Rational(2, 3) == 9 * (S.NegativeOne ** Rational(2, 3)) + assert (-2) ** Rational(-2, 1) == Rational(1, 4) + + # not exact roots + assert sqrt(-3) == I*sqrt(3) + assert (3) ** (Rational(3, 2)) == 3 * sqrt(3) + assert (-3) ** (Rational(3, 2)) == - 3 * sqrt(-3) + assert (-3) ** (Rational(5, 2)) == 9 * I * sqrt(3) + assert (-3) ** (Rational(7, 2)) == - I * 27 * sqrt(3) + assert (2) ** (Rational(3, 2)) == 2 * sqrt(2) + assert (2) ** (Rational(-3, 2)) == sqrt(2) / 4 + assert (81) ** (Rational(2, 3)) == 9 * (S(3) ** (Rational(2, 3))) + assert (-81) ** (Rational(2, 3)) == 9 * (S(-3) ** (Rational(2, 3))) + assert (-3) ** Rational(-7, 3) == \ + -(-1)**Rational(2, 3)*3**Rational(2, 3)/27 + assert (-3) ** Rational(-2, 3) == \ + -(-1)**Rational(1, 3)*3**Rational(1, 3)/3 + + # join roots + assert sqrt(6) + sqrt(24) == 3*sqrt(6) + assert sqrt(2) * sqrt(3) == sqrt(6) + + # separate symbols & constansts + x = Symbol("x") + assert sqrt(49 * x) == 7 * sqrt(x) + assert sqrt((3 - sqrt(pi)) ** 2) == 3 - sqrt(pi) + + # check that it is fast for big numbers + assert (2**64 + 1) ** Rational(4, 3) + assert (2**64 + 1) ** Rational(17, 25) + + # negative rational power and negative base + assert (-3) ** Rational(-7, 3) == \ + -(-1)**Rational(2, 3)*3**Rational(2, 3)/27 + assert (-3) ** Rational(-2, 3) == \ + -(-1)**Rational(1, 3)*3**Rational(1, 3)/3 + assert (-2) ** Rational(-10, 3) == \ + (-1)**Rational(2, 3)*2**Rational(2, 3)/16 + assert abs(Pow(-2, Rational(-10, 3)).n() - + Pow(-2, Rational(-10, 3), evaluate=False).n()) < 1e-16 + + # negative base and rational power with some simplification + assert (-8) ** Rational(2, 5) == \ + 2*(-1)**Rational(2, 5)*2**Rational(1, 5) + assert (-4) ** Rational(9, 5) == \ + -8*(-1)**Rational(4, 5)*2**Rational(3, 5) + + assert S(1234).factors() == {617: 1, 2: 1} + assert Rational(2*3, 3*5*7).factors() == {2: 1, 5: -1, 7: -1} + + # test that eval_power factors numbers bigger than + # the current limit in factor_trial_division (2**15) + from sympy.ntheory.generate import nextprime + n = nextprime(2**15) + assert sqrt(n**2) == n + assert sqrt(n**3) == n*sqrt(n) + assert sqrt(4*n) == 2*sqrt(n) + + # check that factors of base with powers sharing gcd with power are removed + assert (2**4*3)**Rational(1, 6) == 2**Rational(2, 3)*3**Rational(1, 6) + assert (2**4*3)**Rational(5, 6) == 8*2**Rational(1, 3)*3**Rational(5, 6) + + # check that bases sharing a gcd are exptracted + assert 2**Rational(1, 3)*3**Rational(1, 4)*6**Rational(1, 5) == \ + 2**Rational(8, 15)*3**Rational(9, 20) + assert sqrt(8)*24**Rational(1, 3)*6**Rational(1, 5) == \ + 4*2**Rational(7, 10)*3**Rational(8, 15) + assert sqrt(8)*(-24)**Rational(1, 3)*(-6)**Rational(1, 5) == \ + 4*(-3)**Rational(8, 15)*2**Rational(7, 10) + assert 2**Rational(1, 3)*2**Rational(8, 9) == 2*2**Rational(2, 9) + assert 2**Rational(2, 3)*6**Rational(1, 3) == 2*3**Rational(1, 3) + assert 2**Rational(2, 3)*6**Rational(8, 9) == \ + 2*2**Rational(5, 9)*3**Rational(8, 9) + assert (-2)**Rational(2, S(3))*(-4)**Rational(1, S(3)) == -2*2**Rational(1, 3) + assert 3*Pow(3, 2, evaluate=False) == 3**3 + assert 3*Pow(3, Rational(-1, 3), evaluate=False) == 3**Rational(2, 3) + assert (-2)**Rational(1, 3)*(-3)**Rational(1, 4)*(-5)**Rational(5, 6) == \ + -(-1)**Rational(5, 12)*2**Rational(1, 3)*3**Rational(1, 4) * \ + 5**Rational(5, 6) + + assert Integer(-2)**Symbol('', even=True) == \ + Integer(2)**Symbol('', even=True) + assert (-1)**Float(.5) == 1.0*I + + +def test_powers_Rational(): + """Test Rational._eval_power""" + # check infinity + assert S.Half ** S.Infinity == 0 + assert Rational(3, 2) ** S.Infinity is S.Infinity + assert Rational(-1, 2) ** S.Infinity == 0 + assert Rational(-3, 2) ** S.Infinity == zoo + + # check Nan + assert Rational(3, 4) ** S.NaN is S.NaN + assert Rational(-2, 3) ** S.NaN is S.NaN + + # exact roots on numerator + assert sqrt(Rational(4, 3)) == 2 * sqrt(3) / 3 + assert Rational(4, 3) ** Rational(3, 2) == 8 * sqrt(3) / 9 + assert sqrt(Rational(-4, 3)) == I * 2 * sqrt(3) / 3 + assert Rational(-4, 3) ** Rational(3, 2) == - I * 8 * sqrt(3) / 9 + assert Rational(27, 2) ** Rational(1, 3) == 3 * (2 ** Rational(2, 3)) / 2 + assert Rational(5**3, 8**3) ** Rational(4, 3) == Rational(5**4, 8**4) + + # exact root on denominator + assert sqrt(Rational(1, 4)) == S.Half + assert sqrt(Rational(1, -4)) == I * S.Half + assert sqrt(Rational(3, 4)) == sqrt(3) / 2 + assert sqrt(Rational(3, -4)) == I * sqrt(3) / 2 + assert Rational(5, 27) ** Rational(1, 3) == (5 ** Rational(1, 3)) / 3 + + # not exact roots + assert sqrt(S.Half) == sqrt(2) / 2 + assert sqrt(Rational(-4, 7)) == I * sqrt(Rational(4, 7)) + assert Rational(-3, 2)**Rational(-7, 3) == \ + -4*(-1)**Rational(2, 3)*2**Rational(1, 3)*3**Rational(2, 3)/27 + assert Rational(-3, 2)**Rational(-2, 3) == \ + -(-1)**Rational(1, 3)*2**Rational(2, 3)*3**Rational(1, 3)/3 + assert Rational(-3, 2)**Rational(-10, 3) == \ + 8*(-1)**Rational(2, 3)*2**Rational(1, 3)*3**Rational(2, 3)/81 + assert abs(Pow(Rational(-2, 3), Rational(-7, 4)).n() - + Pow(Rational(-2, 3), Rational(-7, 4), evaluate=False).n()) < 1e-16 + + # negative integer power and negative rational base + assert Rational(-2, 3) ** Rational(-2, 1) == Rational(9, 4) + + a = Rational(1, 10) + assert a**Float(a, 2) == Float(a, 2)**Float(a, 2) + assert Rational(-2, 3)**Symbol('', even=True) == \ + Rational(2, 3)**Symbol('', even=True) + + +def test_powers_Float(): + assert str((S('-1/10')**S('3/10')).n()) == str(Float(-.1)**(.3)) + + +def test_lshift_Integer(): + assert Integer(0) << Integer(2) == Integer(0) + assert Integer(0) << 2 == Integer(0) + assert 0 << Integer(2) == Integer(0) + + assert Integer(0b11) << Integer(0) == Integer(0b11) + assert Integer(0b11) << 0 == Integer(0b11) + assert 0b11 << Integer(0) == Integer(0b11) + + assert Integer(0b11) << Integer(2) == Integer(0b11 << 2) + assert Integer(0b11) << 2 == Integer(0b11 << 2) + assert 0b11 << Integer(2) == Integer(0b11 << 2) + + assert Integer(-0b11) << Integer(2) == Integer(-0b11 << 2) + assert Integer(-0b11) << 2 == Integer(-0b11 << 2) + assert -0b11 << Integer(2) == Integer(-0b11 << 2) + + raises(TypeError, lambda: Integer(2) << 0.0) + raises(TypeError, lambda: 0.0 << Integer(2)) + raises(ValueError, lambda: Integer(1) << Integer(-1)) + + +def test_rshift_Integer(): + assert Integer(0) >> Integer(2) == Integer(0) + assert Integer(0) >> 2 == Integer(0) + assert 0 >> Integer(2) == Integer(0) + + assert Integer(0b11) >> Integer(0) == Integer(0b11) + assert Integer(0b11) >> 0 == Integer(0b11) + assert 0b11 >> Integer(0) == Integer(0b11) + + assert Integer(0b11) >> Integer(2) == Integer(0) + assert Integer(0b11) >> 2 == Integer(0) + assert 0b11 >> Integer(2) == Integer(0) + + assert Integer(-0b11) >> Integer(2) == Integer(-1) + assert Integer(-0b11) >> 2 == Integer(-1) + assert -0b11 >> Integer(2) == Integer(-1) + + assert Integer(0b1100) >> Integer(2) == Integer(0b1100 >> 2) + assert Integer(0b1100) >> 2 == Integer(0b1100 >> 2) + assert 0b1100 >> Integer(2) == Integer(0b1100 >> 2) + + assert Integer(-0b1100) >> Integer(2) == Integer(-0b1100 >> 2) + assert Integer(-0b1100) >> 2 == Integer(-0b1100 >> 2) + assert -0b1100 >> Integer(2) == Integer(-0b1100 >> 2) + + raises(TypeError, lambda: Integer(0b10) >> 0.0) + raises(TypeError, lambda: 0.0 >> Integer(2)) + raises(ValueError, lambda: Integer(1) >> Integer(-1)) + + +def test_and_Integer(): + assert Integer(0b01010101) & Integer(0b10101010) == Integer(0) + assert Integer(0b01010101) & 0b10101010 == Integer(0) + assert 0b01010101 & Integer(0b10101010) == Integer(0) + + assert Integer(0b01010101) & Integer(0b11011011) == Integer(0b01010001) + assert Integer(0b01010101) & 0b11011011 == Integer(0b01010001) + assert 0b01010101 & Integer(0b11011011) == Integer(0b01010001) + + assert -Integer(0b01010101) & Integer(0b11011011) == Integer(-0b01010101 & 0b11011011) + assert Integer(-0b01010101) & 0b11011011 == Integer(-0b01010101 & 0b11011011) + assert -0b01010101 & Integer(0b11011011) == Integer(-0b01010101 & 0b11011011) + + assert Integer(0b01010101) & -Integer(0b11011011) == Integer(0b01010101 & -0b11011011) + assert Integer(0b01010101) & -0b11011011 == Integer(0b01010101 & -0b11011011) + assert 0b01010101 & Integer(-0b11011011) == Integer(0b01010101 & -0b11011011) + + raises(TypeError, lambda: Integer(2) & 0.0) + raises(TypeError, lambda: 0.0 & Integer(2)) + + +def test_xor_Integer(): + assert Integer(0b01010101) ^ Integer(0b11111111) == Integer(0b10101010) + assert Integer(0b01010101) ^ 0b11111111 == Integer(0b10101010) + assert 0b01010101 ^ Integer(0b11111111) == Integer(0b10101010) + + assert Integer(0b01010101) ^ Integer(0b11011011) == Integer(0b10001110) + assert Integer(0b01010101) ^ 0b11011011 == Integer(0b10001110) + assert 0b01010101 ^ Integer(0b11011011) == Integer(0b10001110) + + assert -Integer(0b01010101) ^ Integer(0b11011011) == Integer(-0b01010101 ^ 0b11011011) + assert Integer(-0b01010101) ^ 0b11011011 == Integer(-0b01010101 ^ 0b11011011) + assert -0b01010101 ^ Integer(0b11011011) == Integer(-0b01010101 ^ 0b11011011) + + assert Integer(0b01010101) ^ -Integer(0b11011011) == Integer(0b01010101 ^ -0b11011011) + assert Integer(0b01010101) ^ -0b11011011 == Integer(0b01010101 ^ -0b11011011) + assert 0b01010101 ^ Integer(-0b11011011) == Integer(0b01010101 ^ -0b11011011) + + raises(TypeError, lambda: Integer(2) ^ 0.0) + raises(TypeError, lambda: 0.0 ^ Integer(2)) + + +def test_or_Integer(): + assert Integer(0b01010101) | Integer(0b10101010) == Integer(0b11111111) + assert Integer(0b01010101) | 0b10101010 == Integer(0b11111111) + assert 0b01010101 | Integer(0b10101010) == Integer(0b11111111) + + assert Integer(0b01010101) | Integer(0b11011011) == Integer(0b11011111) + assert Integer(0b01010101) | 0b11011011 == Integer(0b11011111) + assert 0b01010101 | Integer(0b11011011) == Integer(0b11011111) + + assert -Integer(0b01010101) | Integer(0b11011011) == Integer(-0b01010101 | 0b11011011) + assert Integer(-0b01010101) | 0b11011011 == Integer(-0b01010101 | 0b11011011) + assert -0b01010101 | Integer(0b11011011) == Integer(-0b01010101 | 0b11011011) + + assert Integer(0b01010101) | -Integer(0b11011011) == Integer(0b01010101 | -0b11011011) + assert Integer(0b01010101) | -0b11011011 == Integer(0b01010101 | -0b11011011) + assert 0b01010101 | Integer(-0b11011011) == Integer(0b01010101 | -0b11011011) + + raises(TypeError, lambda: Integer(2) | 0.0) + raises(TypeError, lambda: 0.0 | Integer(2)) + + +def test_invert_Integer(): + assert ~Integer(0b01010101) == Integer(-0b01010110) + assert ~Integer(0b01010101) == Integer(~0b01010101) + assert ~(~Integer(0b01010101)) == Integer(0b01010101) + + +def test_abs1(): + assert Rational(1, 6) != Rational(-1, 6) + assert abs(Rational(1, 6)) == abs(Rational(-1, 6)) + + +def test_accept_int(): + assert not Float(4) == 4 + assert Float(4) != 4 + assert Float(4) == 4.0 + + +def test_dont_accept_str(): + assert Float("0.2") != "0.2" + assert not (Float("0.2") == "0.2") + + +def test_int(): + a = Rational(5) + assert int(a) == 5 + a = Rational(9, 10) + assert int(a) == int(-a) == 0 + assert 1/(-1)**Rational(2, 3) == -(-1)**Rational(1, 3) + # issue 10368 + a = Rational(32442016954, 78058255275) + assert type(int(a)) is type(int(-a)) is int + + +def test_int_NumberSymbols(): + assert int(Catalan) == 0 + assert int(EulerGamma) == 0 + assert int(pi) == 3 + assert int(E) == 2 + assert int(GoldenRatio) == 1 + assert int(TribonacciConstant) == 1 + for i in [Catalan, E, EulerGamma, GoldenRatio, TribonacciConstant, pi]: + a, b = i.approximation_interval(Integer) + ia = int(i) + assert ia == a + assert isinstance(ia, int) + assert b == a + 1 + assert a.is_Integer and b.is_Integer + + +def test_real_bug(): + x = Symbol("x") + assert str(2.0*x*x) in ["(2.0*x)*x", "2.0*x**2", "2.00000000000000*x**2"] + assert str(2.1*x*x) != "(2.0*x)*x" + + +def test_bug_sqrt(): + assert ((sqrt(Rational(2)) + 1)*(sqrt(Rational(2)) - 1)).expand() == 1 + + +def test_pi_Pi(): + "Test that pi (instance) is imported, but Pi (class) is not" + from sympy import pi # noqa + with raises(ImportError): + from sympy import Pi # noqa + + +def test_no_len(): + # there should be no len for numbers + raises(TypeError, lambda: len(Rational(2))) + raises(TypeError, lambda: len(Rational(2, 3))) + raises(TypeError, lambda: len(Integer(2))) + + +def test_issue_3321(): + assert sqrt(Rational(1, 5)) == Rational(1, 5)**S.Half + assert 5 * sqrt(Rational(1, 5)) == sqrt(5) + + +def test_issue_3692(): + assert ((-1)**Rational(1, 6)).expand(complex=True) == I/2 + sqrt(3)/2 + assert ((-5)**Rational(1, 6)).expand(complex=True) == \ + 5**Rational(1, 6)*I/2 + 5**Rational(1, 6)*sqrt(3)/2 + assert ((-64)**Rational(1, 6)).expand(complex=True) == I + sqrt(3) + + +def test_issue_3423(): + x = Symbol("x") + assert sqrt(x - 1).as_base_exp() == (x - 1, S.Half) + assert sqrt(x - 1) != I*sqrt(1 - x) + + +def test_issue_3449(): + x = Symbol("x") + assert sqrt(x - 1).subs(x, 5) == 2 + + +def test_issue_13890(): + x = Symbol("x") + e = (-x/4 - S.One/12)**x - 1 + f = simplify(e) + a = Rational(9, 5) + assert abs(e.subs(x,a).evalf() - f.subs(x,a).evalf()) < 1e-15 + + +def test_Integer_factors(): + def F(i): + return Integer(i).factors() + + assert F(1) == {} + assert F(2) == {2: 1} + assert F(3) == {3: 1} + assert F(4) == {2: 2} + assert F(5) == {5: 1} + assert F(6) == {2: 1, 3: 1} + assert F(7) == {7: 1} + assert F(8) == {2: 3} + assert F(9) == {3: 2} + assert F(10) == {2: 1, 5: 1} + assert F(11) == {11: 1} + assert F(12) == {2: 2, 3: 1} + assert F(13) == {13: 1} + assert F(14) == {2: 1, 7: 1} + assert F(15) == {3: 1, 5: 1} + assert F(16) == {2: 4} + assert F(17) == {17: 1} + assert F(18) == {2: 1, 3: 2} + assert F(19) == {19: 1} + assert F(20) == {2: 2, 5: 1} + assert F(21) == {3: 1, 7: 1} + assert F(22) == {2: 1, 11: 1} + assert F(23) == {23: 1} + assert F(24) == {2: 3, 3: 1} + assert F(25) == {5: 2} + assert F(26) == {2: 1, 13: 1} + assert F(27) == {3: 3} + assert F(28) == {2: 2, 7: 1} + assert F(29) == {29: 1} + assert F(30) == {2: 1, 3: 1, 5: 1} + assert F(31) == {31: 1} + assert F(32) == {2: 5} + assert F(33) == {3: 1, 11: 1} + assert F(34) == {2: 1, 17: 1} + assert F(35) == {5: 1, 7: 1} + assert F(36) == {2: 2, 3: 2} + assert F(37) == {37: 1} + assert F(38) == {2: 1, 19: 1} + assert F(39) == {3: 1, 13: 1} + assert F(40) == {2: 3, 5: 1} + assert F(41) == {41: 1} + assert F(42) == {2: 1, 3: 1, 7: 1} + assert F(43) == {43: 1} + assert F(44) == {2: 2, 11: 1} + assert F(45) == {3: 2, 5: 1} + assert F(46) == {2: 1, 23: 1} + assert F(47) == {47: 1} + assert F(48) == {2: 4, 3: 1} + assert F(49) == {7: 2} + assert F(50) == {2: 1, 5: 2} + assert F(51) == {3: 1, 17: 1} + + +def test_Rational_factors(): + def F(p, q, visual=None): + return Rational(p, q).factors(visual=visual) + + assert F(2, 3) == {2: 1, 3: -1} + assert F(2, 9) == {2: 1, 3: -2} + assert F(2, 15) == {2: 1, 3: -1, 5: -1} + assert F(6, 10) == {3: 1, 5: -1} + + +def test_issue_4107(): + assert pi*(E + 10) + pi*(-E - 10) != 0 + assert pi*(E + 10**10) + pi*(-E - 10**10) != 0 + assert pi*(E + 10**20) + pi*(-E - 10**20) != 0 + assert pi*(E + 10**80) + pi*(-E - 10**80) != 0 + + assert (pi*(E + 10) + pi*(-E - 10)).expand() == 0 + assert (pi*(E + 10**10) + pi*(-E - 10**10)).expand() == 0 + assert (pi*(E + 10**20) + pi*(-E - 10**20)).expand() == 0 + assert (pi*(E + 10**80) + pi*(-E - 10**80)).expand() == 0 + + +def test_IntegerInteger(): + a = Integer(4) + b = Integer(a) + + assert a == b + + +def test_Rational_gcd_lcm_cofactors(): + assert Integer(4).gcd(2) == Integer(2) + assert Integer(4).lcm(2) == Integer(4) + assert Integer(4).gcd(Integer(2)) == Integer(2) + assert Integer(4).lcm(Integer(2)) == Integer(4) + a, b = 720**99911, 480**12342 + assert Integer(a).lcm(b) == a*b/Integer(a).gcd(b) + + assert Integer(4).gcd(3) == Integer(1) + assert Integer(4).lcm(3) == Integer(12) + assert Integer(4).gcd(Integer(3)) == Integer(1) + assert Integer(4).lcm(Integer(3)) == Integer(12) + + assert Rational(4, 3).gcd(2) == Rational(2, 3) + assert Rational(4, 3).lcm(2) == Integer(4) + assert Rational(4, 3).gcd(Integer(2)) == Rational(2, 3) + assert Rational(4, 3).lcm(Integer(2)) == Integer(4) + + assert Integer(4).gcd(Rational(2, 9)) == Rational(2, 9) + assert Integer(4).lcm(Rational(2, 9)) == Integer(4) + + assert Rational(4, 3).gcd(Rational(2, 9)) == Rational(2, 9) + assert Rational(4, 3).lcm(Rational(2, 9)) == Rational(4, 3) + assert Rational(4, 5).gcd(Rational(2, 9)) == Rational(2, 45) + assert Rational(4, 5).lcm(Rational(2, 9)) == Integer(4) + assert Rational(5, 9).lcm(Rational(3, 7)) == Rational(Integer(5).lcm(3),Integer(9).gcd(7)) + + assert Integer(4).cofactors(2) == (Integer(2), Integer(2), Integer(1)) + assert Integer(4).cofactors(Integer(2)) == \ + (Integer(2), Integer(2), Integer(1)) + + assert Integer(4).gcd(Float(2.0)) == Float(1.0) + assert Integer(4).lcm(Float(2.0)) == Float(8.0) + assert Integer(4).cofactors(Float(2.0)) == (Float(1.0), Float(4.0), Float(2.0)) + + assert S.Half.gcd(Float(2.0)) == Float(1.0) + assert S.Half.lcm(Float(2.0)) == Float(1.0) + assert S.Half.cofactors(Float(2.0)) == \ + (Float(1.0), Float(0.5), Float(2.0)) + + +def test_Float_gcd_lcm_cofactors(): + assert Float(2.0).gcd(Integer(4)) == Float(1.0) + assert Float(2.0).lcm(Integer(4)) == Float(8.0) + assert Float(2.0).cofactors(Integer(4)) == (Float(1.0), Float(2.0), Float(4.0)) + + assert Float(2.0).gcd(S.Half) == Float(1.0) + assert Float(2.0).lcm(S.Half) == Float(1.0) + assert Float(2.0).cofactors(S.Half) == \ + (Float(1.0), Float(2.0), Float(0.5)) + + +def test_issue_4611(): + assert abs(pi._evalf(50) - 3.14159265358979) < 1e-10 + assert abs(E._evalf(50) - 2.71828182845905) < 1e-10 + assert abs(Catalan._evalf(50) - 0.915965594177219) < 1e-10 + assert abs(EulerGamma._evalf(50) - 0.577215664901533) < 1e-10 + assert abs(GoldenRatio._evalf(50) - 1.61803398874989) < 1e-10 + assert abs(TribonacciConstant._evalf(50) - 1.83928675521416) < 1e-10 + + x = Symbol("x") + assert (pi + x).evalf() == pi.evalf() + x + assert (E + x).evalf() == E.evalf() + x + assert (Catalan + x).evalf() == Catalan.evalf() + x + assert (EulerGamma + x).evalf() == EulerGamma.evalf() + x + assert (GoldenRatio + x).evalf() == GoldenRatio.evalf() + x + assert (TribonacciConstant + x).evalf() == TribonacciConstant.evalf() + x + + +@conserve_mpmath_dps +def test_conversion_to_mpmath(): + assert mpmath.mpmathify(Integer(1)) == mpmath.mpf(1) + assert mpmath.mpmathify(S.Half) == mpmath.mpf(0.5) + assert mpmath.mpmathify(Float('1.23', 15)) == mpmath.mpf('1.23') + + assert mpmath.mpmathify(I) == mpmath.mpc(1j) + + assert mpmath.mpmathify(1 + 2*I) == mpmath.mpc(1 + 2j) + assert mpmath.mpmathify(1.0 + 2*I) == mpmath.mpc(1 + 2j) + assert mpmath.mpmathify(1 + 2.0*I) == mpmath.mpc(1 + 2j) + assert mpmath.mpmathify(1.0 + 2.0*I) == mpmath.mpc(1 + 2j) + assert mpmath.mpmathify(S.Half + S.Half*I) == mpmath.mpc(0.5 + 0.5j) + + assert mpmath.mpmathify(2*I) == mpmath.mpc(2j) + assert mpmath.mpmathify(2.0*I) == mpmath.mpc(2j) + assert mpmath.mpmathify(S.Half*I) == mpmath.mpc(0.5j) + + mpmath.mp.dps = 100 + assert mpmath.mpmathify(pi.evalf(100) + pi.evalf(100)*I) == mpmath.pi + mpmath.pi*mpmath.j + assert mpmath.mpmathify(pi.evalf(100)*I) == mpmath.pi*mpmath.j + + +def test_relational(): + # real + x = S(.1) + assert (x != cos) is True + assert (x == cos) is False + + # rational + x = Rational(1, 3) + assert (x != cos) is True + assert (x == cos) is False + + # integer defers to rational so these tests are omitted + + # number symbol + x = pi + assert (x != cos) is True + assert (x == cos) is False + + +def test_Integer_as_index(): + assert 'hello'[Integer(2):] == 'llo' + + +def test_Rational_int(): + assert int( Rational(7, 5)) == 1 + assert int( S.Half) == 0 + assert int(Rational(-1, 2)) == 0 + assert int(-Rational(7, 5)) == -1 + + +def test_zoo(): + b = Symbol('b', finite=True) + nz = Symbol('nz', nonzero=True) + p = Symbol('p', positive=True) + n = Symbol('n', negative=True) + im = Symbol('i', imaginary=True) + c = Symbol('c', complex=True) + pb = Symbol('pb', positive=True) + nb = Symbol('nb', negative=True) + imb = Symbol('ib', imaginary=True, finite=True) + for i in [I, S.Infinity, S.NegativeInfinity, S.Zero, S.One, S.Pi, S.Half, S(3), log(3), + b, nz, p, n, im, pb, nb, imb, c]: + if i.is_finite and (i.is_real or i.is_imaginary): + assert i + zoo is zoo + assert i - zoo is zoo + assert zoo + i is zoo + assert zoo - i is zoo + elif i.is_finite is not False: + assert (i + zoo).is_Add + assert (i - zoo).is_Add + assert (zoo + i).is_Add + assert (zoo - i).is_Add + else: + assert (i + zoo) is S.NaN + assert (i - zoo) is S.NaN + assert (zoo + i) is S.NaN + assert (zoo - i) is S.NaN + + if fuzzy_not(i.is_zero) and (i.is_extended_real or i.is_imaginary): + assert i*zoo is zoo + assert zoo*i is zoo + elif i.is_zero: + assert i*zoo is S.NaN + assert zoo*i is S.NaN + else: + assert (i*zoo).is_Mul + assert (zoo*i).is_Mul + + if fuzzy_not((1/i).is_zero) and (i.is_real or i.is_imaginary): + assert zoo/i is zoo + elif (1/i).is_zero: + assert zoo/i is S.NaN + elif i.is_zero: + assert zoo/i is zoo + else: + assert (zoo/i).is_Mul + + assert (I*oo).is_Mul # allow directed infinity + assert zoo + zoo is S.NaN + assert zoo * zoo is zoo + assert zoo - zoo is S.NaN + assert zoo/zoo is S.NaN + assert zoo**zoo is S.NaN + assert zoo**0 is S.One + assert zoo**2 is zoo + assert 1/zoo is S.Zero + + assert Mul.flatten([S.NegativeOne, oo, S(0)]) == ([S.NaN], [], None) + + +def test_issue_4122(): + x = Symbol('x', nonpositive=True) + assert oo + x is oo + x = Symbol('x', extended_nonpositive=True) + assert (oo + x).is_Add + x = Symbol('x', finite=True) + assert (oo + x).is_Add # x could be imaginary + x = Symbol('x', nonnegative=True) + assert oo + x is oo + x = Symbol('x', extended_nonnegative=True) + assert oo + x is oo + x = Symbol('x', finite=True, real=True) + assert oo + x is oo + + # similarly for negative infinity + x = Symbol('x', nonnegative=True) + assert -oo + x is -oo + x = Symbol('x', extended_nonnegative=True) + assert (-oo + x).is_Add + x = Symbol('x', finite=True) + assert (-oo + x).is_Add + x = Symbol('x', nonpositive=True) + assert -oo + x is -oo + x = Symbol('x', extended_nonpositive=True) + assert -oo + x is -oo + x = Symbol('x', finite=True, real=True) + assert -oo + x is -oo + + +def test_GoldenRatio_expand(): + assert GoldenRatio.expand(func=True) == S.Half + sqrt(5)/2 + + +def test_TribonacciConstant_expand(): + assert TribonacciConstant.expand(func=True) == \ + (1 + cbrt(19 - 3*sqrt(33)) + cbrt(19 + 3*sqrt(33))) / 3 + + +def test_as_content_primitive(): + assert S.Zero.as_content_primitive() == (1, 0) + assert S.Half.as_content_primitive() == (S.Half, 1) + assert (Rational(-1, 2)).as_content_primitive() == (S.Half, -1) + assert S(3).as_content_primitive() == (3, 1) + assert S(3.1).as_content_primitive() == (1, 3.1) + + +def test_hashing_sympy_integers(): + # Test for issue 5072 + assert {Integer(3)} == {int(3)} + assert hash(Integer(4)) == hash(int(4)) + + +def test_rounding_issue_4172(): + assert int((E**100).round()) == \ + 26881171418161354484126255515800135873611119 + assert int((pi**100).round()) == \ + 51878483143196131920862615246303013562686760680406 + assert int((Rational(1)/EulerGamma**100).round()) == \ + 734833795660954410469466 + + +@XFAIL +def test_mpmath_issues(): + from mpmath.libmp.libmpf import _normalize + import mpmath.libmp as mlib + rnd = mlib.round_nearest + mpf = (0, int(0), -123, -1, 53, rnd) # nan + assert _normalize(mpf, 53) != (0, int(0), 0, 0) + mpf = (0, int(0), -456, -2, 53, rnd) # +inf + assert _normalize(mpf, 53) != (0, int(0), 0, 0) + mpf = (1, int(0), -789, -3, 53, rnd) # -inf + assert _normalize(mpf, 53) != (0, int(0), 0, 0) + + from mpmath.libmp.libmpf import fnan + assert mlib.mpf_eq(fnan, fnan) + + +def test_Catalan_EulerGamma_prec(): + n = GoldenRatio + f = Float(n.n(), 5) + assert f._mpf_ == (0, int(212079), -17, 18) + assert f._prec == 20 + assert n._as_mpf_val(20) == f._mpf_ + + n = EulerGamma + f = Float(n.n(), 5) + assert f._mpf_ == (0, int(302627), -19, 19) + assert f._prec == 20 + assert n._as_mpf_val(20) == f._mpf_ + + +def test_Catalan_rewrite(): + k = Dummy('k', integer=True, nonnegative=True) + assert Catalan.rewrite(Sum).dummy_eq( + Sum((-1)**k/(2*k + 1)**2, (k, 0, oo))) + assert Catalan.rewrite() == Catalan + + +def test_bool_eq(): + assert 0 == False + assert S(0) == False + assert S(0) != S.false + assert 1 == True + assert S.One == True + assert S.One != S.true + + +def test_Float_eq(): + # Floats with different precision should not compare equal + assert Float(.5, 10) != Float(.5, 11) != Float(.5, 1) + # but floats that aren't exact in base-2 still + # don't compare the same because they have different + # underlying mpf values + assert Float(.12, 3) != Float(.12, 4) + assert Float(.12, 3) != .12 + assert 0.12 != Float(.12, 3) + assert Float('.12', 22) != .12 + # issue 11707 + # but Float/Rational -- except for 0 -- + # are exact so Rational(x) = Float(y) only if + # Rational(x) == Rational(Float(y)) + assert Float('1.1') != Rational(11, 10) + assert Rational(11, 10) != Float('1.1') + # coverage + assert not Float(3) == 2 + assert not Float(3) == Float(2) + assert not Float(3) == 3 + assert not Float(2**2) == S.Half + assert Float(2**2) == 4.0 + assert not Float(2**-2) == 1 + assert Float(2**-1) == 0.5 + assert not Float(2*3) == 3 + assert not Float(2*3) == 0.5 + assert Float(2*3) == 6.0 + assert not Float(2*3) == 6 + assert not Float(2*3) == 8 + assert not Float(.75) == Rational(3, 4) + assert Float(.75) == 0.75 + assert Float(5/18) == 5/18 + # 4473 + assert Float(2.) != 3 + assert not Float((0,1,-3)) == S.One/8 + assert Float((0,1,-3)) == 1/8 + assert Float((0,1,-3)) != S.One/9 + # 16196 + assert not 2 == Float(2) # unlike Python + assert t**2 != t**2.0 + + +def test_issue_6640(): + from mpmath.libmp.libmpf import finf, fninf + # fnan is not included because Float no longer returns fnan, + # but otherwise, the same sort of test could apply + assert Float(finf).is_zero is False + assert Float(fninf).is_zero is False + assert bool(Float(0)) is False + + +def test_issue_6349(): + assert Float('23.e3', '')._prec == 10 + assert Float('23e3', '')._prec == 20 + assert Float('23000', '')._prec == 20 + assert Float('-23000', '')._prec == 20 + + +def test_mpf_norm(): + assert mpf_norm((1, 0, 1, 0), 10) == mpf('0')._mpf_ + assert Float._new((1, 0, 1, 0), 10)._mpf_ == mpf('0')._mpf_ + + +def test_latex(): + assert latex(pi) == r"\pi" + assert latex(E) == r"e" + assert latex(GoldenRatio) == r"\phi" + assert latex(TribonacciConstant) == r"\text{TribonacciConstant}" + assert latex(EulerGamma) == r"\gamma" + assert latex(oo) == r"\infty" + assert latex(-oo) == r"-\infty" + assert latex(zoo) == r"\tilde{\infty}" + assert latex(nan) == r"\text{NaN}" + assert latex(I) == r"i" + + +def test_issue_7742(): + assert -oo % 1 is nan + + +def test_simplify_AlgebraicNumber(): + A = AlgebraicNumber + e = 3**(S.One/6)*(3 + (135 + 78*sqrt(3))**Rational(2, 3))/(45 + 26*sqrt(3))**(S.One/3) + assert simplify(A(e)) == A(12) # wester test_C20 + + e = (41 + 29*sqrt(2))**(S.One/5) + assert simplify(A(e)) == A(1 + sqrt(2)) # wester test_C21 + + e = (3 + 4*I)**Rational(3, 2) + assert simplify(A(e)) == A(2 + 11*I) # issue 4401 + + +def test_Float_idempotence(): + x = Float('1.23', '') + y = Float(x) + z = Float(x, 15) + assert same_and_same_prec(y, x) + assert not same_and_same_prec(z, x) + x = Float(10**20) + y = Float(x) + z = Float(x, 15) + assert same_and_same_prec(y, x) + assert not same_and_same_prec(z, x) + + +def test_comp1(): + # sqrt(2) = 1.414213 5623730950... + a = sqrt(2).n(7) + assert comp(a, 1.4142129) is False + assert comp(a, 1.4142130) + # ... + assert comp(a, 1.4142141) + assert comp(a, 1.4142142) is False + assert comp(sqrt(2).n(2), '1.4') + assert comp(sqrt(2).n(2), Float(1.4, 2), '') + assert comp(sqrt(2).n(2), 1.4, '') + assert comp(sqrt(2).n(2), Float(1.4, 3), '') is False + assert comp(sqrt(2) + sqrt(3)*I, 1.4 + 1.7*I, .1) + assert not comp(sqrt(2) + sqrt(3)*I, (1.5 + 1.7*I)*0.89, .1) + assert comp(sqrt(2) + sqrt(3)*I, (1.5 + 1.7*I)*0.90, .1) + assert comp(sqrt(2) + sqrt(3)*I, (1.5 + 1.7*I)*1.07, .1) + assert not comp(sqrt(2) + sqrt(3)*I, (1.5 + 1.7*I)*1.08, .1) + assert [(i, j) + for i in range(130, 150) + for j in range(170, 180) + if comp((sqrt(2)+ I*sqrt(3)).n(3), i/100. + I*j/100.)] == [ + (141, 173), (142, 173)] + raises(ValueError, lambda: comp(t, '1')) + raises(ValueError, lambda: comp(t, 1)) + assert comp(0, 0.0) + assert comp(.5, S.Half) + assert comp(2 + sqrt(2), 2.0 + sqrt(2)) + assert not comp(0, 1) + assert not comp(2, sqrt(2)) + assert not comp(2 + I, 2.0 + sqrt(2)) + assert not comp(2.0 + sqrt(2), 2 + I) + assert not comp(2.0 + sqrt(2), sqrt(3)) + assert comp(1/pi.n(4), 0.3183, 1e-5) + assert not comp(1/pi.n(4), 0.3183, 8e-6) + + +def test_issue_9491(): + assert oo**zoo is nan + + +def test_issue_10063(): + assert 2**Float(3) == Float(8) + + +def test_issue_10020(): + assert oo**I is S.NaN + assert oo**(1 + I) is S.ComplexInfinity + assert oo**(-1 + I) is S.Zero + assert (-oo)**I is S.NaN + assert (-oo)**(-1 + I) is S.Zero + assert oo**t == Pow(oo, t, evaluate=False) + assert (-oo)**t == Pow(-oo, t, evaluate=False) + + +def test_invert_numbers(): + assert S(2).invert(5) == 3 + assert S(2).invert(Rational(5, 2)) == S.Half + assert S(2).invert(5.) == S.Half + assert S(2).invert(S(5)) == 3 + assert S(2.).invert(5) == 0.5 + assert S(sqrt(2)).invert(5) == 1/sqrt(2) + assert S(sqrt(2)).invert(sqrt(3)) == 1/sqrt(2) + + +def test_mod_inverse(): + assert mod_inverse(3, 11) == 4 + assert mod_inverse(5, 11) == 9 + assert mod_inverse(21124921, 521512) == 7713 + assert mod_inverse(124215421, 5125) == 2981 + assert mod_inverse(214, 12515) == 1579 + assert mod_inverse(5823991, 3299) == 1442 + assert mod_inverse(123, 44) == 39 + assert mod_inverse(2, 5) == 3 + assert mod_inverse(-2, 5) == 2 + assert mod_inverse(2, -5) == -2 + assert mod_inverse(-2, -5) == -3 + assert mod_inverse(-3, -7) == -5 + x = Symbol('x') + assert S(2).invert(x) == S.Half + raises(TypeError, lambda: mod_inverse(2, x)) + raises(ValueError, lambda: mod_inverse(2, S.Half)) + raises(ValueError, lambda: mod_inverse(2, cos(1)**2 + sin(1)**2)) + + +def test_golden_ratio_rewrite_as_sqrt(): + assert GoldenRatio.rewrite(sqrt) == S.Half + sqrt(5)*S.Half + + +def test_tribonacci_constant_rewrite_as_sqrt(): + assert TribonacciConstant.rewrite(sqrt) == \ + (1 + cbrt(19 - 3*sqrt(33)) + cbrt(19 + 3*sqrt(33))) / 3 + + +def test_comparisons_with_unknown_type(): + class Foo: + """ + Class that is unaware of Basic, and relies on both classes returning + the NotImplemented singleton for equivalence to evaluate to False. + + """ + + ni, nf, nr = Integer(3), Float(1.0), Rational(1, 3) + foo = Foo() + + for n in ni, nf, nr, oo, -oo, zoo, nan: + assert n != foo + assert foo != n + assert not n == foo + assert not foo == n + raises(TypeError, lambda: n < foo) + raises(TypeError, lambda: foo > n) + raises(TypeError, lambda: n > foo) + raises(TypeError, lambda: foo < n) + raises(TypeError, lambda: n <= foo) + raises(TypeError, lambda: foo >= n) + raises(TypeError, lambda: n >= foo) + raises(TypeError, lambda: foo <= n) + + class Bar: + """ + Class that considers itself equal to any instance of Number except + infinities and nans, and relies on SymPy types returning the + NotImplemented singleton for symmetric equality relations. + + """ + def __eq__(self, other): + if other in (oo, -oo, zoo, nan): + return False + if isinstance(other, Number): + return True + return NotImplemented + + def __ne__(self, other): + return not self == other + + bar = Bar() + + for n in ni, nf, nr: + assert n == bar + assert bar == n + assert not n != bar + assert not bar != n + + for n in oo, -oo, zoo, nan: + assert n != bar + assert bar != n + assert not n == bar + assert not bar == n + + for n in ni, nf, nr, oo, -oo, zoo, nan: + raises(TypeError, lambda: n < bar) + raises(TypeError, lambda: bar > n) + raises(TypeError, lambda: n > bar) + raises(TypeError, lambda: bar < n) + raises(TypeError, lambda: n <= bar) + raises(TypeError, lambda: bar >= n) + raises(TypeError, lambda: n >= bar) + raises(TypeError, lambda: bar <= n) + + +def test_NumberSymbol_comparison(): + from sympy.core.tests.test_relational import rel_check + rpi = Rational('905502432259640373/288230376151711744') + fpi = Float(float(pi)) + assert rel_check(rpi, fpi) + + +def test_Integer_precision(): + # Make sure Integer inputs for keyword args work + assert Float('1.0', dps=Integer(15))._prec == 53 + assert Float('1.0', precision=Integer(15))._prec == 15 + assert type(Float('1.0', precision=Integer(15))._prec) == int + assert sympify(srepr(Float('1.0', precision=15))) == Float('1.0', precision=15) + + +def test_numpy_to_float(): + from sympy.testing.pytest import skip + from sympy.external import import_module + np = import_module('numpy') + if not np: + skip('numpy not installed. Abort numpy tests.') + + def check_prec_and_relerr(npval, ratval): + prec = np.finfo(npval).nmant + 1 + x = Float(npval) + assert x._prec == prec + y = Float(ratval, precision=prec) + assert abs((x - y)/y) < 2**(-(prec + 1)) + + check_prec_and_relerr(np.float16(2.0/3), Rational(2, 3)) + check_prec_and_relerr(np.float32(2.0/3), Rational(2, 3)) + check_prec_and_relerr(np.float64(2.0/3), Rational(2, 3)) + # extended precision, on some arch/compilers: + x = np.longdouble(2)/3 + check_prec_and_relerr(x, Rational(2, 3)) + y = Float(x, precision=10) + assert same_and_same_prec(y, Float(Rational(2, 3), precision=10)) + + raises(TypeError, lambda: Float(np.complex64(1+2j))) + raises(TypeError, lambda: Float(np.complex128(1+2j))) + + +def test_Integer_ceiling_floor(): + a = Integer(4) + + assert a.floor() == a + assert a.ceiling() == a + + +def test_ComplexInfinity(): + assert zoo.floor() is zoo + assert zoo.ceiling() is zoo + assert zoo**zoo is S.NaN + + +def test_Infinity_floor_ceiling_power(): + assert oo.floor() is oo + assert oo.ceiling() is oo + assert oo**S.NaN is S.NaN + assert oo**zoo is S.NaN + + +def test_One_power(): + assert S.One**12 is S.One + assert S.NegativeOne**S.NaN is S.NaN + + +def test_NegativeInfinity(): + assert (-oo).floor() is -oo + assert (-oo).ceiling() is -oo + assert (-oo)**11 is -oo + assert (-oo)**12 is oo + + +def test_issue_6133(): + raises(TypeError, lambda: (-oo < None)) + raises(TypeError, lambda: (S(-2) < None)) + raises(TypeError, lambda: (oo < None)) + raises(TypeError, lambda: (oo > None)) + raises(TypeError, lambda: (S(2) < None)) + + +def test_abc(): + x = numbers.Float(5) + assert(isinstance(x, nums.Number)) + assert(isinstance(x, numbers.Number)) + assert(isinstance(x, nums.Real)) + y = numbers.Rational(1, 3) + assert(isinstance(y, nums.Number)) + assert(y.numerator == 1) + assert(y.denominator == 3) + assert(isinstance(y, nums.Rational)) + z = numbers.Integer(3) + assert(isinstance(z, nums.Number)) + assert(isinstance(z, numbers.Number)) + assert(isinstance(z, nums.Rational)) + assert(isinstance(z, numbers.Rational)) + assert(isinstance(z, nums.Integral)) + + +def test_floordiv(): + assert S(2)//S.Half == 4 + + +def test_negation(): + assert -S.Zero is S.Zero + assert -Float(0) is not S.Zero and -Float(0) == 0.0 + + +def test_exponentiation_of_0(): + x = Symbol('x') + assert 0**-x == zoo**x + assert unchanged(Pow, 0, x) + x = Symbol('x', zero=True) + assert 0**-x == S.One + assert 0**x == S.One + + +def test_int_valued(): + x = Symbol('x') + assert int_valued(x) == False + assert int_valued(S.Half) == False + assert int_valued(S.One) == True + assert int_valued(Float(1)) == True + assert int_valued(Float(1.1)) == False + assert int_valued(pi) == False + + +def test_equal_valued(): + x = Symbol('x') + + equal_values = [ + [1, 1.0, S(1), S(1.0), S(1).n(5)], + [2, 2.0, S(2), S(2.0), S(2).n(5)], + [-1, -1.0, -S(1), -S(1.0), -S(1).n(5)], + [0.5, S(0.5), S(1)/2], + [-0.5, -S(0.5), -S(1)/2], + [0, 0.0, S(0), S(0.0), S(0).n()], + [pi], [pi.n()], # <-- not equal + [S(1)/10], [0.1, S(0.1)], # <-- not equal + [S(0.1).n(5)], + [oo], + [cos(x/2)], [cos(0.5*x)], # <-- no recursion + ] + + for m, values_m in enumerate(equal_values): + for value_i in values_m: + + # All values in same list equal + for value_j in values_m: + assert equal_valued(value_i, value_j) is True + + # Not equal to anything in any other list: + for n, values_n in enumerate(equal_values): + if n == m: + continue + for value_j in values_n: + assert equal_valued(value_i, value_j) is False + + +def test_all_close(): + x = Symbol('x') + y = Symbol('y') + z = Symbol('z') + assert all_close(2, 2) is True + assert all_close(2, 2.0000) is True + assert all_close(2, 2.0001) is False + assert all_close(1/3, 1/3.0001) is False + assert all_close(1/3, 1/3.0001, 1e-3, 1e-3) is True + assert all_close(1/3, Rational(1, 3)) is True + assert all_close(0.1*exp(0.2*x), exp(x/5)/10) is True + # The expressions should be structurally the same modulo identity: + assert all_close(1.4142135623730951, sqrt(2)) is False + assert all_close(1.4142135623730951, sqrt(2).evalf()) is True + assert all_close(x + 1e-20, x) is True + # We should be able to match terms of an Add/Mul in any order + assert all_close(Add(1, 2, evaluate=False), Add(2, 1, evaluate=False)) + # coverage + assert not all_close(2*x, 3*x) + assert all_close(2*x, 3*x, 1) + assert not all_close(2*x, 3*x, 0, 0.5) + assert all_close(2*x, 3*x, 0, 1) + assert not all_close(y*x, z*x) + assert all_close(2*x*exp(1.0*x), 2.0*x*exp(x)) + assert not all_close(2*x*exp(1.0*x), 2.0*x*exp(2.*x)) + assert all_close(x + 2.*y, 1.*x + 2*y) + assert all_close(x + exp(2.*x)*y, 1.*x + exp(2*x)*y) + assert not all_close(x + exp(2.*x)*y, 1.*x + 2*exp(2*x)*y) + assert not all_close(x + exp(2.*x)*y, 1.*x + exp(3*x)*y) + assert not all_close(x + 2.*y, 1.*x + 3*y) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_operations.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_operations.py new file mode 100644 index 0000000000000000000000000000000000000000..c60d691ef00ee9601ada04ef68e2db37794a81ad --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_operations.py @@ -0,0 +1,110 @@ +from sympy.core.expr import Expr +from sympy.core.numbers import Integer +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.core.operations import AssocOp, LatticeOp +from sympy.testing.pytest import raises +from sympy.core.sympify import SympifyError +from sympy.core.add import Add, add +from sympy.core.mul import Mul, mul + +# create the simplest possible Lattice class + + +class join(LatticeOp): + zero = Integer(0) + identity = Integer(1) + + +def test_lattice_simple(): + assert join(join(2, 3), 4) == join(2, join(3, 4)) + assert join(2, 3) == join(3, 2) + assert join(0, 2) == 0 + assert join(1, 2) == 2 + assert join(2, 2) == 2 + + assert join(join(2, 3), 4) == join(2, 3, 4) + assert join() == 1 + assert join(4) == 4 + assert join(1, 4, 2, 3, 1, 3, 2) == join(2, 3, 4) + + +def test_lattice_shortcircuit(): + raises(SympifyError, lambda: join(object)) + assert join(0, object) == 0 + + +def test_lattice_print(): + assert str(join(5, 4, 3, 2)) == 'join(2, 3, 4, 5)' + + +def test_lattice_make_args(): + assert join.make_args(join(2, 3, 4)) == {S(2), S(3), S(4)} + assert join.make_args(0) == {0} + assert list(join.make_args(0))[0] is S.Zero + assert Add.make_args(0)[0] is S.Zero + + +def test_issue_14025(): + a, b, c, d = symbols('a,b,c,d', commutative=False) + assert Mul(a, b, c).has(c*b) == False + assert Mul(a, b, c).has(b*c) == True + assert Mul(a, b, c, d).has(b*c*d) == True + + +def test_AssocOp_flatten(): + a, b, c, d = symbols('a,b,c,d') + + class MyAssoc(AssocOp): + identity = S.One + + assert MyAssoc(a, MyAssoc(b, c)).args == \ + MyAssoc(MyAssoc(a, b), c).args == \ + MyAssoc(MyAssoc(a, b, c)).args == \ + MyAssoc(a, b, c).args == \ + (a, b, c) + u = MyAssoc(b, c) + v = MyAssoc(u, d, evaluate=False) + assert v.args == (u, d) + # like Add, any unevaluated outer call will flatten inner args + assert MyAssoc(a, v).args == (a, b, c, d) + + +def test_add_dispatcher(): + + class NewBase(Expr): + @property + def _add_handler(self): + return NewAdd + class NewAdd(NewBase, Add): + pass + add.register_handlerclass((Add, NewAdd), NewAdd) + + a, b = Symbol('a'), NewBase() + + # Add called as fallback + assert add(1, 2) == Add(1, 2) + assert add(a, a) == Add(a, a) + + # selection by registered priority + assert add(a,b,a) == NewAdd(2*a, b) + + +def test_mul_dispatcher(): + + class NewBase(Expr): + @property + def _mul_handler(self): + return NewMul + class NewMul(NewBase, Mul): + pass + mul.register_handlerclass((Mul, NewMul), NewMul) + + a, b = Symbol('a'), NewBase() + + # Mul called as fallback + assert mul(1, 2) == Mul(1, 2) + assert mul(a, a) == Mul(a, a) + + # selection by registered priority + assert mul(a,b,a) == NewMul(a**2, b) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_parameters.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_parameters.py new file mode 100644 index 0000000000000000000000000000000000000000..21e03d717872a9a8165ceeebf7ef58e9842702c0 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_parameters.py @@ -0,0 +1,126 @@ +from sympy.abc import x, y +from sympy.core.parameters import evaluate +from sympy.core import Mul, Add, Pow, S +from sympy.core.numbers import oo +from sympy.functions.elementary.miscellaneous import sqrt + +def test_add(): + with evaluate(False): + p = oo - oo + assert isinstance(p, Add) and p.args == (oo, -oo) + p = 5 - oo + assert isinstance(p, Add) and p.args == (-oo, 5) + p = oo - 5 + assert isinstance(p, Add) and p.args == (oo, -5) + p = oo + 5 + assert isinstance(p, Add) and p.args == (oo, 5) + p = 5 + oo + assert isinstance(p, Add) and p.args == (oo, 5) + p = -oo + 5 + assert isinstance(p, Add) and p.args == (-oo, 5) + p = -5 - oo + assert isinstance(p, Add) and p.args == (-oo, -5) + + with evaluate(False): + expr = x + x + assert isinstance(expr, Add) + assert expr.args == (x, x) + + with evaluate(True): + assert (x + x).args == (2, x) + + assert (x + x).args == (x, x) + + assert isinstance(x + x, Mul) + + with evaluate(False): + assert S.One + 1 == Add(1, 1) + assert 1 + S.One == Add(1, 1) + + assert S(4) - 3 == Add(4, -3) + assert -3 + S(4) == Add(4, -3) + + assert S(2) * 4 == Mul(2, 4) + assert 4 * S(2) == Mul(2, 4) + + assert S(6) / 3 == Mul(6, Pow(3, -1)) + assert S.One / 3 * 6 == Mul(S.One / 3, 6) + + assert 9 ** S(2) == Pow(9, 2) + assert S(2) ** 9 == Pow(2, 9) + + assert S(2) / 2 == Mul(2, Pow(2, -1)) + assert S.One / 2 * 2 == Mul(S.One / 2, 2) + + assert S(2) / 3 + 1 == Add(S(2) / 3, 1) + assert 1 + S(2) / 3 == Add(1, S(2) / 3) + + assert S(4) / 7 - 3 == Add(S(4) / 7, -3) + assert -3 + S(4) / 7 == Add(-3, S(4) / 7) + + assert S(2) / 4 * 4 == Mul(S(2) / 4, 4) + assert 4 * (S(2) / 4) == Mul(4, S(2) / 4) + + assert S(6) / 3 == Mul(6, Pow(3, -1)) + assert S.One / 3 * 6 == Mul(S.One / 3, 6) + + assert S.One / 3 + sqrt(3) == Add(S.One / 3, sqrt(3)) + assert sqrt(3) + S.One / 3 == Add(sqrt(3), S.One / 3) + + assert S.One / 2 * 10.333 == Mul(S.One / 2, 10.333) + assert 10.333 * (S.One / 2) == Mul(10.333, S.One / 2) + + assert sqrt(2) * sqrt(2) == Mul(sqrt(2), sqrt(2)) + + assert S.One / 2 + x == Add(S.One / 2, x) + assert x + S.One / 2 == Add(x, S.One / 2) + + assert S.One / x * x == Mul(S.One / x, x) + assert x * (S.One / x) == Mul(x, Pow(x, -1)) + + assert S.One / 3 == Pow(3, -1) + assert S.One / x == Pow(x, -1) + assert 1 / S(3) == Pow(3, -1) + assert 1 / x == Pow(x, -1) + +def test_nested(): + with evaluate(False): + expr = (x + x) + (y + y) + assert expr.args == ((x + x), (y + y)) + assert expr.args[0].args == (x, x) + +def test_reentrantcy(): + with evaluate(False): + expr = x + x + assert expr.args == (x, x) + with evaluate(True): + expr = x + x + assert expr.args == (2, x) + expr = x + x + assert expr.args == (x, x) + +def test_reusability(): + f = evaluate(False) + + with f: + expr = x + x + assert expr.args == (x, x) + + expr = x + x + assert expr.args == (2, x) + + with f: + expr = x + x + assert expr.args == (x, x) + + # Assure reentrancy with reusability + ctx = evaluate(False) + with ctx: + expr = x + x + assert expr.args == (x, x) + with ctx: + expr = x + x + assert expr.args == (x, x) + + expr = x + x + assert expr.args == (2, x) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_power.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_power.py new file mode 100644 index 0000000000000000000000000000000000000000..80ae48c525c20da6153deffbc9feadef81acf527 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_power.py @@ -0,0 +1,670 @@ +from sympy.core import ( + Basic, Rational, Symbol, S, Float, Integer, Mul, Number, Pow, + Expr, I, nan, pi, symbols, oo, zoo, N) +from sympy.core.parameters import global_parameters +from sympy.core.tests.test_evalf import NS +from sympy.core.function import expand_multinomial +from sympy.functions.elementary.miscellaneous import sqrt, cbrt +from sympy.functions.elementary.exponential import exp, log +from sympy.functions.special.error_functions import erf +from sympy.functions.elementary.trigonometric import ( + sin, cos, tan, sec, csc, atan) +from sympy.functions.elementary.hyperbolic import cosh, sinh, tanh +from sympy.polys import Poly +from sympy.series.order import O +from sympy.sets import FiniteSet +from sympy.core.power import power +from sympy.core.intfunc import integer_nthroot +from sympy.testing.pytest import warns, _both_exp_pow +from sympy.utilities.exceptions import SymPyDeprecationWarning +from sympy.abc import a, b, c, x, y +from sympy.core.numbers import all_close + +def test_rational(): + a = Rational(1, 5) + + r = sqrt(5)/5 + assert sqrt(a) == r + assert 2*sqrt(a) == 2*r + + r = a*a**S.Half + assert a**Rational(3, 2) == r + assert 2*a**Rational(3, 2) == 2*r + + r = a**5*a**Rational(2, 3) + assert a**Rational(17, 3) == r + assert 2 * a**Rational(17, 3) == 2*r + + +def test_large_rational(): + e = (Rational(123712**12 - 1, 7) + Rational(1, 7))**Rational(1, 3) + assert e == 234232585392159195136 * (Rational(1, 7)**Rational(1, 3)) + + +def test_negative_real(): + def feq(a, b): + return abs(a - b) < 1E-10 + + assert feq(S.One / Float(-0.5), -Integer(2)) + + +def test_expand(): + assert (2**(-1 - x)).expand() == S.Half*2**(-x) + + +def test_issue_3449(): + #test if powers are simplified correctly + #see also issue 3995 + assert ((x**Rational(1, 3))**Rational(2)) == x**Rational(2, 3) + assert ( + (x**Rational(3))**Rational(2, 5)) == (x**Rational(3))**Rational(2, 5) + + a = Symbol('a', real=True) + b = Symbol('b', real=True) + assert (a**2)**b == (abs(a)**b)**2 + assert sqrt(1/a) != 1/sqrt(a) # e.g. for a = -1 + assert (a**3)**Rational(1, 3) != a + assert (x**a)**b != x**(a*b) # e.g. x = -1, a=2, b=1/2 + assert (x**.5)**b == x**(.5*b) + assert (x**.5)**.5 == x**.25 + assert (x**2.5)**.5 != x**1.25 # e.g. for x = 5*I + + k = Symbol('k', integer=True) + m = Symbol('m', integer=True) + assert (x**k)**m == x**(k*m) + assert Number(5)**Rational(2, 3) == Number(25)**Rational(1, 3) + + assert (x**.5)**2 == x**1.0 + assert (x**2)**k == (x**k)**2 == x**(2*k) + + a = Symbol('a', positive=True) + assert (a**3)**Rational(2, 5) == a**Rational(6, 5) + assert (a**2)**b == (a**b)**2 + assert (a**Rational(2, 3))**x == a**(x*Rational(2, 3)) != (a**x)**Rational(2, 3) + + +def test_issue_3866(): + assert --sqrt(sqrt(5) - 1) == sqrt(sqrt(5) - 1) + + +def test_negative_one(): + x = Symbol('x', complex=True) + y = Symbol('y', complex=True) + assert 1/x**y == x**(-y) + + +def test_issue_4362(): + neg = Symbol('neg', negative=True) + nonneg = Symbol('nonneg', nonnegative=True) + any = Symbol('any') + num, den = sqrt(1/neg).as_numer_denom() + assert num == sqrt(-1) + assert den == sqrt(-neg) + num, den = sqrt(1/nonneg).as_numer_denom() + assert num == 1 + assert den == sqrt(nonneg) + num, den = sqrt(1/any).as_numer_denom() + assert num == sqrt(1/any) + assert den == 1 + + def eqn(num, den, pow): + return (num/den)**pow + npos = 1 + nneg = -1 + dpos = 2 - sqrt(3) + dneg = 1 - sqrt(3) + assert dpos > 0 and dneg < 0 and npos > 0 and nneg < 0 + # pos or neg integer + eq = eqn(npos, dpos, 2) + assert eq.is_Pow and eq.as_numer_denom() == (1, dpos**2) + eq = eqn(npos, dneg, 2) + assert eq.is_Pow and eq.as_numer_denom() == (1, dneg**2) + eq = eqn(nneg, dpos, 2) + assert eq.is_Pow and eq.as_numer_denom() == (1, dpos**2) + eq = eqn(nneg, dneg, 2) + assert eq.is_Pow and eq.as_numer_denom() == (1, dneg**2) + eq = eqn(npos, dpos, -2) + assert eq.is_Pow and eq.as_numer_denom() == (dpos**2, 1) + eq = eqn(npos, dneg, -2) + assert eq.is_Pow and eq.as_numer_denom() == (dneg**2, 1) + eq = eqn(nneg, dpos, -2) + assert eq.is_Pow and eq.as_numer_denom() == (dpos**2, 1) + eq = eqn(nneg, dneg, -2) + assert eq.is_Pow and eq.as_numer_denom() == (dneg**2, 1) + # pos or neg rational + pow = S.Half + eq = eqn(npos, dpos, pow) + assert eq.is_Pow and eq.as_numer_denom() == (npos**pow, dpos**pow) + eq = eqn(npos, dneg, pow) + assert eq.is_Pow is False and eq.as_numer_denom() == ((-npos)**pow, (-dneg)**pow) + eq = eqn(nneg, dpos, pow) + assert not eq.is_Pow or eq.as_numer_denom() == (nneg**pow, dpos**pow) + eq = eqn(nneg, dneg, pow) + assert eq.is_Pow and eq.as_numer_denom() == ((-nneg)**pow, (-dneg)**pow) + eq = eqn(npos, dpos, -pow) + assert eq.is_Pow and eq.as_numer_denom() == (dpos**pow, npos**pow) + eq = eqn(npos, dneg, -pow) + assert eq.is_Pow is False and eq.as_numer_denom() == (-(-npos)**pow*(-dneg)**pow, npos) + eq = eqn(nneg, dpos, -pow) + assert not eq.is_Pow or eq.as_numer_denom() == (dpos**pow, nneg**pow) + eq = eqn(nneg, dneg, -pow) + assert eq.is_Pow and eq.as_numer_denom() == ((-dneg)**pow, (-nneg)**pow) + # unknown exponent + pow = 2*any + eq = eqn(npos, dpos, pow) + assert eq.is_Pow and eq.as_numer_denom() == (npos**pow, dpos**pow) + eq = eqn(npos, dneg, pow) + assert eq.is_Pow and eq.as_numer_denom() == ((-npos)**pow, (-dneg)**pow) + eq = eqn(nneg, dpos, pow) + assert eq.is_Pow and eq.as_numer_denom() == (nneg**pow, dpos**pow) + eq = eqn(nneg, dneg, pow) + assert eq.is_Pow and eq.as_numer_denom() == ((-nneg)**pow, (-dneg)**pow) + eq = eqn(npos, dpos, -pow) + assert eq.as_numer_denom() == (dpos**pow, npos**pow) + eq = eqn(npos, dneg, -pow) + assert eq.is_Pow and eq.as_numer_denom() == ((-dneg)**pow, (-npos)**pow) + eq = eqn(nneg, dpos, -pow) + assert eq.is_Pow and eq.as_numer_denom() == (dpos**pow, nneg**pow) + eq = eqn(nneg, dneg, -pow) + assert eq.is_Pow and eq.as_numer_denom() == ((-dneg)**pow, (-nneg)**pow) + + assert ((1/(1 + x/3))**(-S.One)).as_numer_denom() == (3 + x, 3) + notp = Symbol('notp', positive=False) # not positive does not imply real + b = ((1 + x/notp)**-2) + assert (b**(-y)).as_numer_denom() == (1, b**y) + assert (b**(-S.One)).as_numer_denom() == ((notp + x)**2, notp**2) + nonp = Symbol('nonp', nonpositive=True) + assert (((1 + x/nonp)**-2)**(-S.One)).as_numer_denom() == ((-nonp - + x)**2, nonp**2) + + n = Symbol('n', negative=True) + assert (x**n).as_numer_denom() == (1, x**-n) + assert sqrt(1/n).as_numer_denom() == (S.ImaginaryUnit, sqrt(-n)) + n = Symbol('0 or neg', nonpositive=True) + # if x and n are split up without negating each term and n is negative + # then the answer might be wrong; if n is 0 it won't matter since + # 1/oo and 1/zoo are both zero as is sqrt(0)/sqrt(-x) unless x is also + # zero (in which case the negative sign doesn't matter): + # 1/sqrt(1/-1) = -I but sqrt(-1)/sqrt(1) = I + assert (1/sqrt(x/n)).as_numer_denom() == (sqrt(-n), sqrt(-x)) + c = Symbol('c', complex=True) + e = sqrt(1/c) + assert e.as_numer_denom() == (e, 1) + i = Symbol('i', integer=True) + assert ((1 + x/y)**i).as_numer_denom() == ((x + y)**i, y**i) + + +def test_Pow_Expr_args(): + bases = [Basic(), Poly(x, x), FiniteSet(x)] + for base in bases: + # The cache can mess with the stacklevel test + with warns(SymPyDeprecationWarning, test_stacklevel=False): + Pow(base, S.One) + + +def test_Pow_signs(): + """Cf. issues 4595 and 5250""" + n = Symbol('n', even=True) + assert (3 - y)**2 != (y - 3)**2 + assert (3 - y)**n != (y - 3)**n + assert (-3 + y - x)**2 != (3 - y + x)**2 + assert (y - 3)**3 != -(3 - y)**3 + + +def test_power_with_noncommutative_mul_as_base(): + x = Symbol('x', commutative=False) + y = Symbol('y', commutative=False) + assert not (x*y)**3 == x**3*y**3 + assert (2*x*y)**3 == 8*(x*y)**3 + + +@_both_exp_pow +def test_power_rewrite_exp(): + assert (I**I).rewrite(exp) == exp(-pi/2) + + expr = (2 + 3*I)**(4 + 5*I) + assert expr.rewrite(exp) == exp((4 + 5*I)*(log(sqrt(13)) + I*atan(Rational(3, 2)))) + assert expr.rewrite(exp).expand() == \ + 169*exp(5*I*log(13)/2)*exp(4*I*atan(Rational(3, 2)))*exp(-5*atan(Rational(3, 2))) + + assert ((6 + 7*I)**5).rewrite(exp) == 7225*sqrt(85)*exp(5*I*atan(Rational(7, 6))) + + expr = 5**(6 + 7*I) + assert expr.rewrite(exp) == exp((6 + 7*I)*log(5)) + assert expr.rewrite(exp).expand() == 15625*exp(7*I*log(5)) + + assert Pow(123, 789, evaluate=False).rewrite(exp) == 123**789 + assert (1**I).rewrite(exp) == 1**I + assert (0**I).rewrite(exp) == 0**I + + expr = (-2)**(2 + 5*I) + assert expr.rewrite(exp) == exp((2 + 5*I)*(log(2) + I*pi)) + assert expr.rewrite(exp).expand() == 4*exp(-5*pi)*exp(5*I*log(2)) + + assert ((-2)**S(-5)).rewrite(exp) == (-2)**S(-5) + + x, y = symbols('x y') + assert (x**y).rewrite(exp) == exp(y*log(x)) + if global_parameters.exp_is_pow: + assert (7**x).rewrite(exp) == Pow(S.Exp1, x*log(7), evaluate=False) + else: + assert (7**x).rewrite(exp) == exp(x*log(7), evaluate=False) + assert ((2 + 3*I)**x).rewrite(exp) == exp(x*(log(sqrt(13)) + I*atan(Rational(3, 2)))) + assert (y**(5 + 6*I)).rewrite(exp) == exp(log(y)*(5 + 6*I)) + + assert all((1/func(x)).rewrite(exp) == 1/(func(x).rewrite(exp)) for func in + (sin, cos, tan, sec, csc, sinh, cosh, tanh)) + + +def test_zero(): + assert 0**x != 0 + assert 0**(2*x) == 0**x + assert 0**(1.0*x) == 0**x + assert 0**(2.0*x) == 0**x + assert (0**(2 - x)).as_base_exp() == (0, 2 - x) + assert 0**(x - 2) != S.Infinity**(2 - x) + assert 0**(2*x*y) == 0**(x*y) + assert 0**(-2*x*y) == S.ComplexInfinity**(x*y) + assert Float(0)**2 is not S.Zero + assert Float(0)**2 == 0.0 + assert Float(0)**-2 is zoo + assert Float(0)**oo is S.Zero + + #Test issue 19572 + assert 0 ** -oo is zoo + assert power(0, -oo) is zoo + assert Float(0)**-oo is zoo + +def test_pow_as_base_exp(): + assert (S.Infinity**(2 - x)).as_base_exp() == (S.Infinity, 2 - x) + assert (S.Infinity**(x - 2)).as_base_exp() == (S.Infinity, x - 2) + p = S.Half**x + assert p.base, p.exp == p.as_base_exp() == (S(2), -x) + p = (S(3)/2)**x + assert p.base, p.exp == p.as_base_exp() == (3*S.Half, x) + p = (S(2)/3)**x + assert p.as_base_exp() == (S(2)/3, x) + assert p.base, p.exp == (S(2)/3, x) + # issue 8344: + assert Pow(1, 2, evaluate=False).as_base_exp() == (S.One, S(2)) + + +def test_nseries(): + assert sqrt(I*x - 1)._eval_nseries(x, 4, None, 1) == I + x/2 + I*x**2/8 - x**3/16 + O(x**4) + assert sqrt(I*x - 1)._eval_nseries(x, 4, None, -1) == -I - x/2 - I*x**2/8 + x**3/16 + O(x**4) + assert cbrt(I*x - 1)._eval_nseries(x, 4, None, 1) == (-1)**(S(1)/3) - (-1)**(S(5)/6)*x/3 + \ + (-1)**(S(1)/3)*x**2/9 + 5*(-1)**(S(5)/6)*x**3/81 + O(x**4) + assert cbrt(I*x - 1)._eval_nseries(x, 4, None, -1) == -(-1)**(S(2)/3) - (-1)**(S(1)/6)*x/3 - \ + (-1)**(S(2)/3)*x**2/9 + 5*(-1)**(S(1)/6)*x**3/81 + O(x**4) + assert (1 / (exp(-1/x) + 1/x))._eval_nseries(x, 2, None) == x + O(x**2) + # test issue 23752 + assert sqrt(-I*x**2 + x - 3)._eval_nseries(x, 4, None, 1) == -sqrt(3)*I + sqrt(3)*I*x/6 - \ + sqrt(3)*I*x**2*(-S(1)/72 + I/6) - sqrt(3)*I*x**3*(-S(1)/432 + I/36) + O(x**4) + assert sqrt(-I*x**2 + x - 3)._eval_nseries(x, 4, None, -1) == -sqrt(3)*I + sqrt(3)*I*x/6 - \ + sqrt(3)*I*x**2*(-S(1)/72 + I/6) - sqrt(3)*I*x**3*(-S(1)/432 + I/36) + O(x**4) + assert cbrt(-I*x**2 + x - 3)._eval_nseries(x, 4, None, 1) == -(-1)**(S(2)/3)*3**(S(1)/3) + \ + (-1)**(S(2)/3)*3**(S(1)/3)*x/9 - (-1)**(S(2)/3)*3**(S(1)/3)*x**2*(-S(1)/81 + I/9) - \ + (-1)**(S(2)/3)*3**(S(1)/3)*x**3*(-S(5)/2187 + 2*I/81) + O(x**4) + assert cbrt(-I*x**2 + x - 3)._eval_nseries(x, 4, None, -1) == -(-1)**(S(2)/3)*3**(S(1)/3) + \ + (-1)**(S(2)/3)*3**(S(1)/3)*x/9 - (-1)**(S(2)/3)*3**(S(1)/3)*x**2*(-S(1)/81 + I/9) - \ + (-1)**(S(2)/3)*3**(S(1)/3)*x**3*(-S(5)/2187 + 2*I/81) + O(x**4) + + +def test_issue_6100_12942_4473(): + assert x**1.0 != x + assert x != x**1.0 + assert True != x**1.0 + assert x**1.0 is not True + assert x is not True + assert x*y != (x*y)**1.0 + # Pow != Symbol + assert (x**1.0)**1.0 != x + assert (x**1.0)**2.0 != x**2 + b = Expr() + assert Pow(b, 1.0, evaluate=False) != b + # if the following gets distributed as a Mul (x**1.0*y**1.0 then + # __eq__ methods could be added to Symbol and Pow to detect the + # power-of-1.0 case. + assert ((x*y)**1.0).func is Pow + + +def test_issue_6208(): + from sympy.functions.elementary.miscellaneous import root + assert sqrt(33**(I*9/10)) == -33**(I*9/20) + assert root((6*I)**(2*I), 3).as_base_exp()[1] == Rational(1, 3) # != 2*I/3 + assert root((6*I)**(I/3), 3).as_base_exp()[1] == I/9 + assert sqrt(exp(3*I)) == exp(3*I/2) + assert sqrt(-sqrt(3)*(1 + 2*I)) == sqrt(sqrt(3))*sqrt(-1 - 2*I) + assert sqrt(exp(5*I)) == -exp(5*I/2) + assert root(exp(5*I), 3).exp == Rational(1, 3) + + +def test_issue_6990(): + assert (sqrt(a + b*x + x**2)).series(x, 0, 3).removeO() == \ + sqrt(a)*x**2*(1/(2*a) - b**2/(8*a**2)) + sqrt(a) + b*x/(2*sqrt(a)) + + +def test_issue_6068(): + assert sqrt(sin(x)).series(x, 0, 7) == \ + sqrt(x) - x**Rational(5, 2)/12 + x**Rational(9, 2)/1440 - \ + x**Rational(13, 2)/24192 + O(x**7) + assert sqrt(sin(x)).series(x, 0, 9) == \ + sqrt(x) - x**Rational(5, 2)/12 + x**Rational(9, 2)/1440 - \ + x**Rational(13, 2)/24192 - 67*x**Rational(17, 2)/29030400 + O(x**9) + assert sqrt(sin(x**3)).series(x, 0, 19) == \ + x**Rational(3, 2) - x**Rational(15, 2)/12 + x**Rational(27, 2)/1440 + O(x**19) + assert sqrt(sin(x**3)).series(x, 0, 20) == \ + x**Rational(3, 2) - x**Rational(15, 2)/12 + x**Rational(27, 2)/1440 - \ + x**Rational(39, 2)/24192 + O(x**20) + + +def test_issue_6782(): + assert sqrt(sin(x**3)).series(x, 0, 7) == x**Rational(3, 2) + O(x**7) + assert sqrt(sin(x**4)).series(x, 0, 3) == x**2 + O(x**3) + + +def test_issue_6653(): + assert (1 / sqrt(1 + sin(x**2))).series(x, 0, 3) == 1 - x**2/2 + O(x**3) + + +def test_issue_6429(): + f = (c**2 + x)**(0.5) + assert f.series(x, x0=0, n=1) == (c**2)**0.5 + O(x) + assert f.taylor_term(0, x) == (c**2)**0.5 + assert f.taylor_term(1, x) == 0.5*x*(c**2)**(-0.5) + assert f.taylor_term(2, x) == -0.125*x**2*(c**2)**(-1.5) + + +def test_issue_7638(): + f = pi/log(sqrt(2)) + assert ((1 + I)**(I*f/2))**0.3 == (1 + I)**(0.15*I*f) + # if 1/3 -> 1.0/3 this should fail since it cannot be shown that the + # sign will be +/-1; for the previous "small arg" case, it didn't matter + # that this could not be proved + assert (1 + I)**(4*I*f) == ((1 + I)**(12*I*f))**Rational(1, 3) + + assert (((1 + I)**(I*(1 + 7*f)))**Rational(1, 3)).exp == Rational(1, 3) + r = symbols('r', real=True) + assert sqrt(r**2) == abs(r) + assert cbrt(r**3) != r + assert sqrt(Pow(2*I, 5*S.Half)) != (2*I)**Rational(5, 4) + p = symbols('p', positive=True) + assert cbrt(p**2) == p**Rational(2, 3) + assert NS(((0.2 + 0.7*I)**(0.7 + 1.0*I))**(0.5 - 0.1*I), 1) == '0.4 + 0.2*I' + assert sqrt(1/(1 + I)) == sqrt(1 - I)/sqrt(2) # or 1/sqrt(1 + I) + e = 1/(1 - sqrt(2)) + assert sqrt(e) == I/sqrt(-1 + sqrt(2)) + assert e**Rational(-1, 2) == -I*sqrt(-1 + sqrt(2)) + assert sqrt((cos(1)**2 + sin(1)**2 - 1)**(3 + I)).exp in [S.Half, + Rational(3, 2) + I/2] + assert sqrt(r**Rational(4, 3)) != r**Rational(2, 3) + assert sqrt((p + I)**Rational(4, 3)) == (p + I)**Rational(2, 3) + + for q in 1+I, 1-I: + assert sqrt(q**2) == q + for q in -1+I, -1-I: + assert sqrt(q**2) == -q + + assert sqrt((p + r*I)**2) != p + r*I + e = (1 + I/5) + assert sqrt(e**5) == e**(5*S.Half) + assert sqrt(e**6) == e**3 + assert sqrt((1 + I*r)**6) != (1 + I*r)**3 + + +def test_issue_8582(): + assert 1**oo is nan + assert 1**(-oo) is nan + assert 1**zoo is nan + assert 1**(oo + I) is nan + assert 1**(1 + I*oo) is nan + assert 1**(oo + I*oo) is nan + + +def test_issue_8650(): + n = Symbol('n', integer=True, nonnegative=True) + assert (n**n).is_positive is True + x = 5*n + 5 + assert (x**(5*(n + 1))).is_positive is True + + +def test_issue_13914(): + b = Symbol('b') + assert (-1)**zoo is nan + assert 2**zoo is nan + assert (S.Half)**(1 + zoo) is nan + assert I**(zoo + I) is nan + assert b**(I + zoo) is nan + + +def test_better_sqrt(): + n = Symbol('n', integer=True, nonnegative=True) + assert sqrt(3 + 4*I) == 2 + I + assert sqrt(3 - 4*I) == 2 - I + assert sqrt(-3 - 4*I) == 1 - 2*I + assert sqrt(-3 + 4*I) == 1 + 2*I + assert sqrt(32 + 24*I) == 6 + 2*I + assert sqrt(32 - 24*I) == 6 - 2*I + assert sqrt(-32 - 24*I) == 2 - 6*I + assert sqrt(-32 + 24*I) == 2 + 6*I + + # triple (3, 4, 5): + # parity of 3 matches parity of 5 and + # den, 4, is a square + assert sqrt((3 + 4*I)/4) == 1 + I/2 + # triple (8, 15, 17) + # parity of 8 doesn't match parity of 17 but + # den/2, 8/2, is a square + assert sqrt((8 + 15*I)/8) == (5 + 3*I)/4 + # handle the denominator + assert sqrt((3 - 4*I)/25) == (2 - I)/5 + assert sqrt((3 - 4*I)/26) == (2 - I)/sqrt(26) + # mul + # issue #12739 + assert sqrt((3 + 4*I)/(3 - 4*I)) == (3 + 4*I)/5 + assert sqrt(2/(3 + 4*I)) == sqrt(2)/5*(2 - I) + assert sqrt(n/(3 + 4*I)).subs(n, 2) == sqrt(2)/5*(2 - I) + assert sqrt(-2/(3 + 4*I)) == sqrt(2)/5*(1 + 2*I) + assert sqrt(-n/(3 + 4*I)).subs(n, 2) == sqrt(2)/5*(1 + 2*I) + # power + assert sqrt(1/(3 + I*4)) == (2 - I)/5 + assert sqrt(1/(3 - I)) == sqrt(10)*sqrt(3 + I)/10 + # symbolic + i = symbols('i', imaginary=True) + assert sqrt(3/i) == Mul(sqrt(3), 1/sqrt(i), evaluate=False) + # multiples of 1/2; don't make this too automatic + assert sqrt(3 + 4*I)**3 == (2 + I)**3 + assert Pow(3 + 4*I, Rational(3, 2)) == 2 + 11*I + assert Pow(6 + 8*I, Rational(3, 2)) == 2*sqrt(2)*(2 + 11*I) + n, d = (3 + 4*I), (3 - 4*I)**3 + a = n/d + assert a.args == (1/d, n) + eq = sqrt(a) + assert eq.args == (a, S.Half) + assert expand_multinomial(eq) == sqrt((-117 + 44*I)*(3 + 4*I))/125 + assert eq.expand() == (7 - 24*I)/125 + + # issue 12775 + # pos im part + assert sqrt(2*I) == (1 + I) + assert sqrt(2*9*I) == Mul(3, 1 + I, evaluate=False) + assert Pow(2*I, 3*S.Half) == (1 + I)**3 + # neg im part + assert sqrt(-I/2) == Mul(S.Half, 1 - I, evaluate=False) + # fractional im part + assert Pow(Rational(-9, 2)*I, Rational(3, 2)) == 27*(1 - I)**3/8 + + +def test_issue_2993(): + assert str((2.3*x - 4)**0.3) == '(2.3*x - 4)**0.3' + assert str((2.3*x + 4)**0.3) == '(2.3*x + 4)**0.3' + assert str((-2.3*x + 4)**0.3) == '(4 - 2.3*x)**0.3' + assert str((-2.3*x - 4)**0.3) == '(-2.3*x - 4)**0.3' + assert str((2.3*x - 2)**0.3) == '(2.3*x - 2)**0.3' + assert str((-2.3*x - 2)**0.3) == '(-2.3*x - 2)**0.3' + assert str((-2.3*x + 2)**0.3) == '(2 - 2.3*x)**0.3' + assert str((2.3*x + 2)**0.3) == '(2.3*x + 2)**0.3' + assert str((2.3*x - 4)**Rational(1, 3)) == '(2.3*x - 4)**(1/3)' + eq = (2.3*x + 4) + assert str(eq**2) == '(2.3*x + 4)**2' + assert (1/eq).args == (eq, -1) # don't change trivial power + # issue 17735 + q=.5*exp(x) - .5*exp(-x) + 0.1 + assert int((q**2).subs(x, 1)) == 1 + # issue 17756 + y = Symbol('y') + assert len(sqrt(x/(x + y)**2 + Float('0.008', 30)).subs(y, pi.n(25)).atoms(Float)) == 2 + # issue 17756 + a, b, c, d, e, f, g = symbols('a:g') + expr = sqrt(1 + a*(c**4 + g*d - 2*g*e - f*(-g + d))**2/ + (c**3*b**2*(d - 3*e + 2*f)**2))/2 + r = [ + (a, N('0.0170992456333788667034850458615', 30)), + (b, N('0.0966594956075474769169134801223', 30)), + (c, N('0.390911862903463913632151616184', 30)), + (d, N('0.152812084558656566271750185933', 30)), + (e, N('0.137562344465103337106561623432', 30)), + (f, N('0.174259178881496659302933610355', 30)), + (g, N('0.220745448491223779615401870086', 30))] + tru = expr.n(30, subs=dict(r)) + seq = expr.subs(r) + # although `tru` is the right way to evaluate + # expr with numerical values, `seq` will have + # significant loss of precision if extraction of + # the largest coefficient of a power's base's terms + # is done improperly + assert seq == tru + +def test_issue_17450(): + assert (erf(cosh(1)**7)**I).is_real is None + assert (erf(cosh(1)**7)**I).is_imaginary is False + assert (Pow(exp(1+sqrt(2)), ((1-sqrt(2))*I*pi), evaluate=False)).is_real is None + assert ((-10)**(10*I*pi/3)).is_real is False + assert ((-5)**(4*I*pi)).is_real is False + + +def test_issue_18190(): + assert sqrt(1 / tan(1 + I)) == 1 / sqrt(tan(1 + I)) + + +def test_issue_14815(): + x = Symbol('x', real=True) + assert sqrt(x).is_extended_negative is False + x = Symbol('x', real=False) + assert sqrt(x).is_extended_negative is None + x = Symbol('x', complex=True) + assert sqrt(x).is_extended_negative is False + x = Symbol('x', extended_real=True) + assert sqrt(x).is_extended_negative is False + assert sqrt(zoo, evaluate=False).is_extended_negative is False + assert sqrt(nan, evaluate=False).is_extended_negative is None + + +def test_issue_18509(): + x = Symbol('x', prime=True) + assert x**oo is oo + assert (1/x)**oo is S.Zero + assert (-1/x)**oo is S.Zero + assert (-x)**oo is zoo + assert (-oo)**(-1 + I) is S.Zero + assert (-oo)**(1 + I) is zoo + assert (oo)**(-1 + I) is S.Zero + assert (oo)**(1 + I) is zoo + + +def test_issue_18762(): + e, p = symbols('e p') + g0 = sqrt(1 + e**2 - 2*e*cos(p)) + assert len(g0.series(e, 1, 3).args) == 4 + + +def test_issue_21860(): + e = 3*2**Rational(66666666667,200000000000)*3**Rational(16666666667,50000000000)*x**Rational(66666666667, 200000000000) + ans = Mul(Rational(3, 2), + Pow(Integer(2), Rational(33333333333, 100000000000)), + Pow(Integer(3), Rational(26666666667, 40000000000))) + assert e.xreplace({x: Rational(3,8)}) == ans + + +def test_issue_21647(): + e = log((Integer(567)/500)**(811*(Integer(567)/500)**x/100)) + ans = log(Mul(Rational(64701150190720499096094005280169087619821081527, + 76293945312500000000000000000000000000000000000), + Pow(Integer(2), Rational(396204892125479941, 781250000000000000)), + Pow(Integer(3), Rational(385045107874520059, 390625000000000000)), + Pow(Integer(5), Rational(407364676376439823, 1562500000000000000)), + Pow(Integer(7), Rational(385045107874520059, 1562500000000000000)))) + assert e.xreplace({x: 6}) == ans + + +def test_issue_21762(): + e = (x**2 + 6)**(Integer(33333333333333333)/50000000000000000) + ans = Mul(Rational(5, 4), + Pow(Integer(2), Rational(16666666666666667, 25000000000000000)), + Pow(Integer(5), Rational(8333333333333333, 25000000000000000))) + assert e.xreplace({x: S.Half}) == ans + + +def test_issue_14704(): + a = 144**144 + x, xexact = integer_nthroot(a,a) + assert x == 1 and xexact is False + + +def test_rational_powers_larger_than_one(): + assert Rational(2, 3)**Rational(3, 2) == 2*sqrt(6)/9 + assert Rational(1, 6)**Rational(9, 4) == 6**Rational(3, 4)/216 + assert Rational(3, 7)**Rational(7, 3) == 9*3**Rational(1, 3)*7**Rational(2, 3)/343 + + +def test_power_dispatcher(): + + class NewBase(Expr): + pass + class NewPow(NewBase, Pow): + pass + a, b = Symbol('a'), NewBase() + + @power.register(Expr, NewBase) + @power.register(NewBase, Expr) + @power.register(NewBase, NewBase) + def _(a, b): + return NewPow(a, b) + + # Pow called as fallback + assert power(2, 3) == 8*S.One + assert power(a, 2) == Pow(a, 2) + assert power(a, a) == Pow(a, a) + + # NewPow called by dispatch + assert power(a, b) == NewPow(a, b) + assert power(b, a) == NewPow(b, a) + assert power(b, b) == NewPow(b, b) + + +def test_powers_of_I(): + assert [sqrt(I)**i for i in range(13)] == [ + 1, sqrt(I), I, sqrt(I)**3, -1, -sqrt(I), -I, -sqrt(I)**3, + 1, sqrt(I), I, sqrt(I)**3, -1] + assert sqrt(I)**(S(9)/2) == -I**(S(1)/4) + + +def test_issue_23918(): + b = S(2)/3 + assert (b**x).as_base_exp() == (b, x) + + +def test_issue_26546(): + x = Symbol('x', real=True) + assert x.is_extended_real is True + assert sqrt(x+I).is_extended_real is False + assert Pow(x+I, S.Half).is_extended_real is False + assert Pow(x+I, Rational(1,2)).is_extended_real is False + assert Pow(x+I, Rational(1,13)).is_extended_real is False + assert Pow(x+I, Rational(2,3)).is_extended_real is None + + +def test_issue_25165(): + e1 = (1/sqrt(( - x + 1)**2 + (x - 0.23)**4)).series(x, 0, 2) + e2 = 0.998603724830355 + 1.02004923189934*x + O(x**2) + assert all_close(e1, e2) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_priority.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_priority.py new file mode 100644 index 0000000000000000000000000000000000000000..276e653100f886243e07b866b699b8da53cdaf88 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_priority.py @@ -0,0 +1,145 @@ +from sympy.core.decorators import call_highest_priority +from sympy.core.expr import Expr +from sympy.core.mod import Mod +from sympy.core.numbers import Integer +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.elementary.integers import floor + + +class Higher(Integer): + ''' + Integer of value 1 and _op_priority 20 + + Operations handled by this class return 1 and reverse operations return 2 + ''' + + _op_priority = 20.0 + result: Expr = S.One + + def __new__(cls): + obj = Expr.__new__(cls) + obj.p = 1 + return obj + + @call_highest_priority('__rmul__') + def __mul__(self, other): + return self.result + + @call_highest_priority('__mul__') + def __rmul__(self, other): + return 2*self.result + + @call_highest_priority('__radd__') + def __add__(self, other): + return self.result + + @call_highest_priority('__add__') + def __radd__(self, other): + return 2*self.result + + @call_highest_priority('__rsub__') + def __sub__(self, other): + return self.result + + @call_highest_priority('__sub__') + def __rsub__(self, other): + return 2*self.result + + @call_highest_priority('__rpow__') + def __pow__(self, other): + return self.result + + @call_highest_priority('__pow__') + def __rpow__(self, other): + return 2*self.result + + @call_highest_priority('__rtruediv__') + def __truediv__(self, other): + return self.result + + @call_highest_priority('__truediv__') + def __rtruediv__(self, other): + return 2*self.result + + @call_highest_priority('__rmod__') + def __mod__(self, other): + return self.result + + @call_highest_priority('__mod__') + def __rmod__(self, other): + return 2*self.result + + @call_highest_priority('__rfloordiv__') + def __floordiv__(self, other): + return self.result + + @call_highest_priority('__floordiv__') + def __rfloordiv__(self, other): + return 2*self.result + + +class Lower(Higher): + ''' + Integer of value -1 and _op_priority 5 + + Operations handled by this class return -1 and reverse operations return -2 + ''' + + _op_priority = 5.0 + result: Expr = S.NegativeOne + + def __new__(cls): + obj = Expr.__new__(cls) + obj.p = -1 + return obj + + +x = Symbol('x') +h = Higher() +l = Lower() + + +def test_mul(): + assert h*l == h*x == 1 + assert l*h == x*h == 2 + assert x*l == l*x == -x + + +def test_add(): + assert h + l == h + x == 1 + assert l + h == x + h == 2 + assert x + l == l + x == x - 1 + + +def test_sub(): + assert h - l == h - x == 1 + assert l - h == x - h == 2 + assert x - l == -(l - x) == x + 1 + + +def test_pow(): + assert h**l == h**x == 1 + assert l**h == x**h == 2 + assert (x**l).args == (1/x).args and (x**l).is_Pow + assert (l**x).args == ((-1)**x).args and (l**x).is_Pow + + +def test_div(): + assert h/l == h/x == 1 + assert l/h == x/h == 2 + assert x/l == 1/(l/x) == -x + + +def test_mod(): + assert h%l == h%x == 1 + assert l%h == x%h == 2 + assert x%l == Mod(x, -1) + assert l%x == Mod(-1, x) + + +def test_floordiv(): + assert h//l == h//x == 1 + assert l//h == x//h == 2 + assert x//l == floor(-x) + assert l//x == floor(-1/x) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_random.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_random.py new file mode 100644 index 0000000000000000000000000000000000000000..01c677126285eb66349253368b94b3270fb97793 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_random.py @@ -0,0 +1,61 @@ +import random +from sympy.core.random import random as rand, seed, shuffle, _assumptions_shuffle +from sympy.core.symbol import Symbol, symbols +from sympy.functions.elementary.trigonometric import sin, acos +from sympy.abc import x + + +def test_random(): + random.seed(42) + a = random.random() + random.seed(42) + Symbol('z').is_finite + b = random.random() + assert a == b + + got = set() + for i in range(2): + random.seed(28) + m0, m1 = symbols('m_0 m_1', real=True) + _ = acos(-m0/m1) + got.add(random.uniform(0,1)) + assert len(got) == 1 + + random.seed(10) + y = 0 + for i in range(4): + y += sin(random.uniform(-10,10) * x) + random.seed(10) + z = 0 + for i in range(4): + z += sin(random.uniform(-10,10) * x) + assert y == z + + +def test_seed(): + assert rand() < 1 + seed(1) + a = rand() + b = rand() + seed(1) + c = rand() + d = rand() + assert a == c + if not c == d: + assert a != b + else: + assert a == b + + abc = 'abc' + first = list(abc) + second = list(abc) + third = list(abc) + + seed(123) + shuffle(first) + + seed(123) + shuffle(second) + _assumptions_shuffle(third) + + assert first == second == third diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_relational.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_relational.py new file mode 100644 index 0000000000000000000000000000000000000000..60c026fd5f5b8cee2e90e00582047cc7763bb8a4 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_relational.py @@ -0,0 +1,1271 @@ +from sympy.core.logic import fuzzy_and +from sympy.core.sympify import _sympify +from sympy.multipledispatch import dispatch +from sympy.testing.pytest import XFAIL, raises +from sympy.assumptions.ask import Q +from sympy.core.add import Add +from sympy.core.basic import Basic +from sympy.core.expr import Expr, unchanged +from sympy.core.function import Function +from sympy.core.mul import Mul +from sympy.core.numbers import (Float, I, Rational, nan, oo, pi, zoo) +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import sign, Abs +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.exponential import (exp, exp_polar, log) +from sympy.functions.elementary.integers import (ceiling, floor) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.logic.boolalg import (And, Implies, Not, Or, Xor) +from sympy.sets import Reals +from sympy.simplify.simplify import simplify +from sympy.simplify.trigsimp import trigsimp +from sympy.core.relational import (Relational, Equality, Unequality, + GreaterThan, LessThan, StrictGreaterThan, + StrictLessThan, Rel, Eq, Lt, Le, + Gt, Ge, Ne, is_le, is_gt, is_ge, is_lt, is_eq, is_neq) +from sympy.sets.sets import Interval, FiniteSet + +from itertools import combinations + +x, y, z, t = symbols('x,y,z,t') + + +def rel_check(a, b): + from sympy.testing.pytest import raises + assert a.is_number and b.is_number + for do in range(len({type(a), type(b)})): + if S.NaN in (a, b): + v = [(a == b), (a != b)] + assert len(set(v)) == 1 and v[0] == False + assert not (a != b) and not (a == b) + assert raises(TypeError, lambda: a < b) + assert raises(TypeError, lambda: a <= b) + assert raises(TypeError, lambda: a > b) + assert raises(TypeError, lambda: a >= b) + else: + E = [(a == b), (a != b)] + assert len(set(E)) == 2 + v = [ + (a < b), (a <= b), (a > b), (a >= b)] + i = [ + [True, True, False, False], + [False, True, False, True], # <-- i == 1 + [False, False, True, True]].index(v) + if i == 1: + assert E[0] or (a.is_Float != b.is_Float) # ugh + else: + assert E[1] + a, b = b, a + return True + + +def test_rel_ne(): + assert Relational(x, y, '!=') == Ne(x, y) + + # issue 6116 + p = Symbol('p', positive=True) + assert Ne(p, 0) is S.true + + +def test_rel_subs(): + e = Relational(x, y, '==') + e = e.subs(x, z) + + assert isinstance(e, Equality) + assert e.lhs == z + assert e.rhs == y + + e = Relational(x, y, '>=') + e = e.subs(x, z) + + assert isinstance(e, GreaterThan) + assert e.lhs == z + assert e.rhs == y + + e = Relational(x, y, '<=') + e = e.subs(x, z) + + assert isinstance(e, LessThan) + assert e.lhs == z + assert e.rhs == y + + e = Relational(x, y, '>') + e = e.subs(x, z) + + assert isinstance(e, StrictGreaterThan) + assert e.lhs == z + assert e.rhs == y + + e = Relational(x, y, '<') + e = e.subs(x, z) + + assert isinstance(e, StrictLessThan) + assert e.lhs == z + assert e.rhs == y + + e = Eq(x, 0) + assert e.subs(x, 0) is S.true + assert e.subs(x, 1) is S.false + + +def test_wrappers(): + e = x + x**2 + + res = Relational(y, e, '==') + assert Rel(y, x + x**2, '==') == res + assert Eq(y, x + x**2) == res + + res = Relational(y, e, '<') + assert Lt(y, x + x**2) == res + + res = Relational(y, e, '<=') + assert Le(y, x + x**2) == res + + res = Relational(y, e, '>') + assert Gt(y, x + x**2) == res + + res = Relational(y, e, '>=') + assert Ge(y, x + x**2) == res + + res = Relational(y, e, '!=') + assert Ne(y, x + x**2) == res + + +def test_Eq_Ne(): + + assert Eq(x, x) # issue 5719 + + # issue 6116 + p = Symbol('p', positive=True) + assert Eq(p, 0) is S.false + + # issue 13348; 19048 + # SymPy is strict about 0 and 1 not being + # interpreted as Booleans + assert Eq(True, 1) is S.false + assert Eq(False, 0) is S.false + assert Eq(~x, 0) is S.false + assert Eq(~x, 1) is S.false + assert Ne(True, 1) is S.true + assert Ne(False, 0) is S.true + assert Ne(~x, 0) is S.true + assert Ne(~x, 1) is S.true + + assert Eq((), 1) is S.false + assert Ne((), 1) is S.true + + +def test_as_poly(): + from sympy.polys.polytools import Poly + # Only Eq should have an as_poly method: + assert Eq(x, 1).as_poly() == Poly(x - 1, x, domain='ZZ') + raises(AttributeError, lambda: Ne(x, 1).as_poly()) + raises(AttributeError, lambda: Ge(x, 1).as_poly()) + raises(AttributeError, lambda: Gt(x, 1).as_poly()) + raises(AttributeError, lambda: Le(x, 1).as_poly()) + raises(AttributeError, lambda: Lt(x, 1).as_poly()) + + +def test_rel_Infinity(): + # NOTE: All of these are actually handled by sympy.core.Number, and do + # not create Relational objects. + assert (oo > oo) is S.false + assert (oo > -oo) is S.true + assert (oo > 1) is S.true + assert (oo < oo) is S.false + assert (oo < -oo) is S.false + assert (oo < 1) is S.false + assert (oo >= oo) is S.true + assert (oo >= -oo) is S.true + assert (oo >= 1) is S.true + assert (oo <= oo) is S.true + assert (oo <= -oo) is S.false + assert (oo <= 1) is S.false + assert (-oo > oo) is S.false + assert (-oo > -oo) is S.false + assert (-oo > 1) is S.false + assert (-oo < oo) is S.true + assert (-oo < -oo) is S.false + assert (-oo < 1) is S.true + assert (-oo >= oo) is S.false + assert (-oo >= -oo) is S.true + assert (-oo >= 1) is S.false + assert (-oo <= oo) is S.true + assert (-oo <= -oo) is S.true + assert (-oo <= 1) is S.true + + +def test_infinite_symbol_inequalities(): + x = Symbol('x', extended_positive=True, infinite=True) + y = Symbol('y', extended_positive=True, infinite=True) + z = Symbol('z', extended_negative=True, infinite=True) + w = Symbol('w', extended_negative=True, infinite=True) + + inf_set = (x, y, oo) + ninf_set = (z, w, -oo) + + for inf1 in inf_set: + assert (inf1 < 1) is S.false + assert (inf1 > 1) is S.true + assert (inf1 <= 1) is S.false + assert (inf1 >= 1) is S.true + + for inf2 in inf_set: + assert (inf1 < inf2) is S.false + assert (inf1 > inf2) is S.false + assert (inf1 <= inf2) is S.true + assert (inf1 >= inf2) is S.true + + for ninf1 in ninf_set: + assert (inf1 < ninf1) is S.false + assert (inf1 > ninf1) is S.true + assert (inf1 <= ninf1) is S.false + assert (inf1 >= ninf1) is S.true + assert (ninf1 < inf1) is S.true + assert (ninf1 > inf1) is S.false + assert (ninf1 <= inf1) is S.true + assert (ninf1 >= inf1) is S.false + + for ninf1 in ninf_set: + assert (ninf1 < 1) is S.true + assert (ninf1 > 1) is S.false + assert (ninf1 <= 1) is S.true + assert (ninf1 >= 1) is S.false + + for ninf2 in ninf_set: + assert (ninf1 < ninf2) is S.false + assert (ninf1 > ninf2) is S.false + assert (ninf1 <= ninf2) is S.true + assert (ninf1 >= ninf2) is S.true + + +def test_bool(): + assert Eq(0, 0) is S.true + assert Eq(1, 0) is S.false + assert Ne(0, 0) is S.false + assert Ne(1, 0) is S.true + assert Lt(0, 1) is S.true + assert Lt(1, 0) is S.false + assert Le(0, 1) is S.true + assert Le(1, 0) is S.false + assert Le(0, 0) is S.true + assert Gt(1, 0) is S.true + assert Gt(0, 1) is S.false + assert Ge(1, 0) is S.true + assert Ge(0, 1) is S.false + assert Ge(1, 1) is S.true + assert Eq(I, 2) is S.false + assert Ne(I, 2) is S.true + raises(TypeError, lambda: Gt(I, 2)) + raises(TypeError, lambda: Ge(I, 2)) + raises(TypeError, lambda: Lt(I, 2)) + raises(TypeError, lambda: Le(I, 2)) + a = Float('.000000000000000000001', '') + b = Float('.0000000000000000000001', '') + assert Eq(pi + a, pi + b) is S.false + + +def test_rich_cmp(): + assert (x < y) == Lt(x, y) + assert (x <= y) == Le(x, y) + assert (x > y) == Gt(x, y) + assert (x >= y) == Ge(x, y) + + +def test_doit(): + from sympy.core.symbol import Symbol + p = Symbol('p', positive=True) + n = Symbol('n', negative=True) + np = Symbol('np', nonpositive=True) + nn = Symbol('nn', nonnegative=True) + + assert Gt(p, 0).doit() is S.true + assert Gt(p, 1).doit() == Gt(p, 1) + assert Ge(p, 0).doit() is S.true + assert Le(p, 0).doit() is S.false + assert Lt(n, 0).doit() is S.true + assert Le(np, 0).doit() is S.true + assert Gt(nn, 0).doit() == Gt(nn, 0) + assert Lt(nn, 0).doit() is S.false + + assert Eq(x, 0).doit() == Eq(x, 0) + + +def test_new_relational(): + x = Symbol('x') + + assert Eq(x, 0) == Relational(x, 0) # None ==> Equality + assert Eq(x, 0) == Relational(x, 0, '==') + assert Eq(x, 0) == Relational(x, 0, 'eq') + assert Eq(x, 0) == Equality(x, 0) + + assert Eq(x, 0) != Relational(x, 1) # None ==> Equality + assert Eq(x, 0) != Relational(x, 1, '==') + assert Eq(x, 0) != Relational(x, 1, 'eq') + assert Eq(x, 0) != Equality(x, 1) + + assert Eq(x, -1) == Relational(x, -1) # None ==> Equality + assert Eq(x, -1) == Relational(x, -1, '==') + assert Eq(x, -1) == Relational(x, -1, 'eq') + assert Eq(x, -1) == Equality(x, -1) + assert Eq(x, -1) != Relational(x, 1) # None ==> Equality + assert Eq(x, -1) != Relational(x, 1, '==') + assert Eq(x, -1) != Relational(x, 1, 'eq') + assert Eq(x, -1) != Equality(x, 1) + + assert Ne(x, 0) == Relational(x, 0, '!=') + assert Ne(x, 0) == Relational(x, 0, '<>') + assert Ne(x, 0) == Relational(x, 0, 'ne') + assert Ne(x, 0) == Unequality(x, 0) + assert Ne(x, 0) != Relational(x, 1, '!=') + assert Ne(x, 0) != Relational(x, 1, '<>') + assert Ne(x, 0) != Relational(x, 1, 'ne') + assert Ne(x, 0) != Unequality(x, 1) + + assert Ge(x, 0) == Relational(x, 0, '>=') + assert Ge(x, 0) == Relational(x, 0, 'ge') + assert Ge(x, 0) == GreaterThan(x, 0) + assert Ge(x, 1) != Relational(x, 0, '>=') + assert Ge(x, 1) != Relational(x, 0, 'ge') + assert Ge(x, 1) != GreaterThan(x, 0) + assert (x >= 1) == Relational(x, 1, '>=') + assert (x >= 1) == Relational(x, 1, 'ge') + assert (x >= 1) == GreaterThan(x, 1) + assert (x >= 0) != Relational(x, 1, '>=') + assert (x >= 0) != Relational(x, 1, 'ge') + assert (x >= 0) != GreaterThan(x, 1) + + assert Le(x, 0) == Relational(x, 0, '<=') + assert Le(x, 0) == Relational(x, 0, 'le') + assert Le(x, 0) == LessThan(x, 0) + assert Le(x, 1) != Relational(x, 0, '<=') + assert Le(x, 1) != Relational(x, 0, 'le') + assert Le(x, 1) != LessThan(x, 0) + assert (x <= 1) == Relational(x, 1, '<=') + assert (x <= 1) == Relational(x, 1, 'le') + assert (x <= 1) == LessThan(x, 1) + assert (x <= 0) != Relational(x, 1, '<=') + assert (x <= 0) != Relational(x, 1, 'le') + assert (x <= 0) != LessThan(x, 1) + + assert Gt(x, 0) == Relational(x, 0, '>') + assert Gt(x, 0) == Relational(x, 0, 'gt') + assert Gt(x, 0) == StrictGreaterThan(x, 0) + assert Gt(x, 1) != Relational(x, 0, '>') + assert Gt(x, 1) != Relational(x, 0, 'gt') + assert Gt(x, 1) != StrictGreaterThan(x, 0) + assert (x > 1) == Relational(x, 1, '>') + assert (x > 1) == Relational(x, 1, 'gt') + assert (x > 1) == StrictGreaterThan(x, 1) + assert (x > 0) != Relational(x, 1, '>') + assert (x > 0) != Relational(x, 1, 'gt') + assert (x > 0) != StrictGreaterThan(x, 1) + + assert Lt(x, 0) == Relational(x, 0, '<') + assert Lt(x, 0) == Relational(x, 0, 'lt') + assert Lt(x, 0) == StrictLessThan(x, 0) + assert Lt(x, 1) != Relational(x, 0, '<') + assert Lt(x, 1) != Relational(x, 0, 'lt') + assert Lt(x, 1) != StrictLessThan(x, 0) + assert (x < 1) == Relational(x, 1, '<') + assert (x < 1) == Relational(x, 1, 'lt') + assert (x < 1) == StrictLessThan(x, 1) + assert (x < 0) != Relational(x, 1, '<') + assert (x < 0) != Relational(x, 1, 'lt') + assert (x < 0) != StrictLessThan(x, 1) + + # finally, some fuzz testing + from sympy.core.random import randint + for i in range(100): + while 1: + strtype, length = (chr, 65535) if randint(0, 1) else (chr, 255) + relation_type = strtype(randint(0, length)) + if randint(0, 1): + relation_type += strtype(randint(0, length)) + if relation_type not in ('==', 'eq', '!=', '<>', 'ne', '>=', 'ge', + '<=', 'le', '>', 'gt', '<', 'lt', ':=', + '+=', '-=', '*=', '/=', '%='): + break + + raises(ValueError, lambda: Relational(x, 1, relation_type)) + assert all(Relational(x, 0, op).rel_op == '==' for op in ('eq', '==')) + assert all(Relational(x, 0, op).rel_op == '!=' + for op in ('ne', '<>', '!=')) + assert all(Relational(x, 0, op).rel_op == '>' for op in ('gt', '>')) + assert all(Relational(x, 0, op).rel_op == '<' for op in ('lt', '<')) + assert all(Relational(x, 0, op).rel_op == '>=' for op in ('ge', '>=')) + assert all(Relational(x, 0, op).rel_op == '<=' for op in ('le', '<=')) + + +def test_relational_arithmetic(): + for cls in [Eq, Ne, Le, Lt, Ge, Gt]: + rel = cls(x, y) + raises(TypeError, lambda: 0+rel) + raises(TypeError, lambda: 1*rel) + raises(TypeError, lambda: 1**rel) + raises(TypeError, lambda: rel**1) + raises(TypeError, lambda: Add(0, rel)) + raises(TypeError, lambda: Mul(1, rel)) + raises(TypeError, lambda: Pow(1, rel)) + raises(TypeError, lambda: Pow(rel, 1)) + + +def test_relational_bool_output(): + # https://github.com/sympy/sympy/issues/5931 + raises(TypeError, lambda: bool(x > 3)) + raises(TypeError, lambda: bool(x >= 3)) + raises(TypeError, lambda: bool(x < 3)) + raises(TypeError, lambda: bool(x <= 3)) + raises(TypeError, lambda: bool(Eq(x, 3))) + raises(TypeError, lambda: bool(Ne(x, 3))) + + +def test_relational_logic_symbols(): + # See issue 6204 + assert (x < y) & (z < t) == And(x < y, z < t) + assert (x < y) | (z < t) == Or(x < y, z < t) + assert ~(x < y) == Not(x < y) + assert (x < y) >> (z < t) == Implies(x < y, z < t) + assert (x < y) << (z < t) == Implies(z < t, x < y) + assert (x < y) ^ (z < t) == Xor(x < y, z < t) + + assert isinstance((x < y) & (z < t), And) + assert isinstance((x < y) | (z < t), Or) + assert isinstance(~(x < y), GreaterThan) + assert isinstance((x < y) >> (z < t), Implies) + assert isinstance((x < y) << (z < t), Implies) + assert isinstance((x < y) ^ (z < t), (Or, Xor)) + + +def test_univariate_relational_as_set(): + assert (x > 0).as_set() == Interval(0, oo, True, True) + assert (x >= 0).as_set() == Interval(0, oo) + assert (x < 0).as_set() == Interval(-oo, 0, True, True) + assert (x <= 0).as_set() == Interval(-oo, 0) + assert Eq(x, 0).as_set() == FiniteSet(0) + assert Ne(x, 0).as_set() == Interval(-oo, 0, True, True) + \ + Interval(0, oo, True, True) + + assert (x**2 >= 4).as_set() == Interval(-oo, -2) + Interval(2, oo) + + +@XFAIL +def test_multivariate_relational_as_set(): + assert (x*y >= 0).as_set() == Interval(0, oo)*Interval(0, oo) + \ + Interval(-oo, 0)*Interval(-oo, 0) + + +def test_Not(): + assert Not(Equality(x, y)) == Unequality(x, y) + assert Not(Unequality(x, y)) == Equality(x, y) + assert Not(StrictGreaterThan(x, y)) == LessThan(x, y) + assert Not(StrictLessThan(x, y)) == GreaterThan(x, y) + assert Not(GreaterThan(x, y)) == StrictLessThan(x, y) + assert Not(LessThan(x, y)) == StrictGreaterThan(x, y) + + +def test_evaluate(): + assert str(Eq(x, x, evaluate=False)) == 'Eq(x, x)' + assert Eq(x, x, evaluate=False).doit() == S.true + assert str(Ne(x, x, evaluate=False)) == 'Ne(x, x)' + assert Ne(x, x, evaluate=False).doit() == S.false + + assert str(Ge(x, x, evaluate=False)) == 'x >= x' + assert str(Le(x, x, evaluate=False)) == 'x <= x' + assert str(Gt(x, x, evaluate=False)) == 'x > x' + assert str(Lt(x, x, evaluate=False)) == 'x < x' + + +def assert_all_ineq_raise_TypeError(a, b): + raises(TypeError, lambda: a > b) + raises(TypeError, lambda: a >= b) + raises(TypeError, lambda: a < b) + raises(TypeError, lambda: a <= b) + raises(TypeError, lambda: b > a) + raises(TypeError, lambda: b >= a) + raises(TypeError, lambda: b < a) + raises(TypeError, lambda: b <= a) + + +def assert_all_ineq_give_class_Inequality(a, b): + """All inequality operations on `a` and `b` result in class Inequality.""" + from sympy.core.relational import _Inequality as Inequality + assert isinstance(a > b, Inequality) + assert isinstance(a >= b, Inequality) + assert isinstance(a < b, Inequality) + assert isinstance(a <= b, Inequality) + assert isinstance(b > a, Inequality) + assert isinstance(b >= a, Inequality) + assert isinstance(b < a, Inequality) + assert isinstance(b <= a, Inequality) + + +def test_imaginary_compare_raises_TypeError(): + # See issue #5724 + assert_all_ineq_raise_TypeError(I, x) + + +def test_complex_compare_not_real(): + # two cases which are not real + y = Symbol('y', imaginary=True) + z = Symbol('z', complex=True, extended_real=False) + for w in (y, z): + assert_all_ineq_raise_TypeError(2, w) + # some cases which should remain un-evaluated + t = Symbol('t') + x = Symbol('x', real=True) + z = Symbol('z', complex=True) + for w in (x, z, t): + assert_all_ineq_give_class_Inequality(2, w) + + +def test_imaginary_and_inf_compare_raises_TypeError(): + # See pull request #7835 + y = Symbol('y', imaginary=True) + assert_all_ineq_raise_TypeError(oo, y) + assert_all_ineq_raise_TypeError(-oo, y) + + +def test_complex_pure_imag_not_ordered(): + raises(TypeError, lambda: 2*I < 3*I) + + # more generally + x = Symbol('x', real=True, nonzero=True) + y = Symbol('y', imaginary=True) + z = Symbol('z', complex=True) + assert_all_ineq_raise_TypeError(I, y) + + t = I*x # an imaginary number, should raise errors + assert_all_ineq_raise_TypeError(2, t) + + t = -I*y # a real number, so no errors + assert_all_ineq_give_class_Inequality(2, t) + + t = I*z # unknown, should be unevaluated + assert_all_ineq_give_class_Inequality(2, t) + + +def test_x_minus_y_not_same_as_x_lt_y(): + """ + A consequence of pull request #7792 is that `x - y < 0` and `x < y` + are not synonymous. + """ + x = I + 2 + y = I + 3 + raises(TypeError, lambda: x < y) + assert x - y < 0 + + ineq = Lt(x, y, evaluate=False) + raises(TypeError, lambda: ineq.doit()) + assert ineq.lhs - ineq.rhs < 0 + + t = Symbol('t', imaginary=True) + x = 2 + t + y = 3 + t + ineq = Lt(x, y, evaluate=False) + raises(TypeError, lambda: ineq.doit()) + assert ineq.lhs - ineq.rhs < 0 + + # this one should give error either way + x = I + 2 + y = 2*I + 3 + raises(TypeError, lambda: x < y) + raises(TypeError, lambda: x - y < 0) + + +def test_nan_equality_exceptions(): + # See issue #7774 + import random + assert Equality(nan, nan) is S.false + assert Unequality(nan, nan) is S.true + + # See issue #7773 + A = (x, S.Zero, S.One/3, pi, oo, -oo) + assert Equality(nan, random.choice(A)) is S.false + assert Equality(random.choice(A), nan) is S.false + assert Unequality(nan, random.choice(A)) is S.true + assert Unequality(random.choice(A), nan) is S.true + + +def test_nan_inequality_raise_errors(): + # See discussion in pull request #7776. We test inequalities with + # a set including examples of various classes. + for q in (x, S.Zero, S(10), S.One/3, pi, S(1.3), oo, -oo, nan): + assert_all_ineq_raise_TypeError(q, nan) + + +def test_nan_complex_inequalities(): + # Comparisons of NaN with non-real raise errors, we're not too + # fussy whether its the NaN error or complex error. + for r in (I, zoo, Symbol('z', imaginary=True)): + assert_all_ineq_raise_TypeError(r, nan) + + +def test_complex_infinity_inequalities(): + raises(TypeError, lambda: zoo > 0) + raises(TypeError, lambda: zoo >= 0) + raises(TypeError, lambda: zoo < 0) + raises(TypeError, lambda: zoo <= 0) + + +def test_inequalities_symbol_name_same(): + """Using the operator and functional forms should give same results.""" + # We test all combinations from a set + # FIXME: could replace with random selection after test passes + A = (x, y, S.Zero, S.One/3, pi, oo, -oo) + for a in A: + for b in A: + assert Gt(a, b) == (a > b) + assert Lt(a, b) == (a < b) + assert Ge(a, b) == (a >= b) + assert Le(a, b) == (a <= b) + + for b in (y, S.Zero, S.One/3, pi, oo, -oo): + assert Gt(x, b, evaluate=False) == (x > b) + assert Lt(x, b, evaluate=False) == (x < b) + assert Ge(x, b, evaluate=False) == (x >= b) + assert Le(x, b, evaluate=False) == (x <= b) + + for b in (y, S.Zero, S.One/3, pi, oo, -oo): + assert Gt(b, x, evaluate=False) == (b > x) + assert Lt(b, x, evaluate=False) == (b < x) + assert Ge(b, x, evaluate=False) == (b >= x) + assert Le(b, x, evaluate=False) == (b <= x) + + +def test_inequalities_symbol_name_same_complex(): + """Using the operator and functional forms should give same results. + With complex non-real numbers, both should raise errors. + """ + # FIXME: could replace with random selection after test passes + for a in (x, S.Zero, S.One/3, pi, oo, Rational(1, 3)): + raises(TypeError, lambda: Gt(a, I)) + raises(TypeError, lambda: a > I) + raises(TypeError, lambda: Lt(a, I)) + raises(TypeError, lambda: a < I) + raises(TypeError, lambda: Ge(a, I)) + raises(TypeError, lambda: a >= I) + raises(TypeError, lambda: Le(a, I)) + raises(TypeError, lambda: a <= I) + + +def test_inequalities_cant_sympify_other(): + # see issue 7833 + from operator import gt, lt, ge, le + + bar = "foo" + + for a in (x, S.Zero, S.One/3, pi, I, zoo, oo, -oo, nan, Rational(1, 3)): + for op in (lt, gt, le, ge): + raises(TypeError, lambda: op(a, bar)) + + +def test_ineq_avoid_wild_symbol_flip(): + # see issue #7951, we try to avoid this internally, e.g., by using + # __lt__ instead of "<". + from sympy.core.symbol import Wild + p = symbols('p', cls=Wild) + # x > p might flip, but Gt should not: + assert Gt(x, p) == Gt(x, p, evaluate=False) + # Previously failed as 'p > x': + e = Lt(x, y).subs({y: p}) + assert e == Lt(x, p, evaluate=False) + # Previously failed as 'p <= x': + e = Ge(x, p).doit() + assert e == Ge(x, p, evaluate=False) + + +def test_issue_8245(): + a = S("6506833320952669167898688709329/5070602400912917605986812821504") + assert rel_check(a, a.n(10)) + assert rel_check(a, a.n(20)) + assert rel_check(a, a.n()) + # prec of 31 is enough to fully capture a as mpf + assert Float(a, 31) == Float(str(a.p), '')/Float(str(a.q), '') + for i in range(31): + r = Rational(Float(a, i)) + f = Float(r) + assert (f < a) == (Rational(f) < a) + # test sign handling + assert (-f < -a) == (Rational(-f) < -a) + # test equivalence handling + isa = Float(a.p,'')/Float(a.q,'') + assert isa <= a + assert not isa < a + assert isa >= a + assert not isa > a + assert isa > 0 + + a = sqrt(2) + r = Rational(str(a.n(30))) + assert rel_check(a, r) + + a = sqrt(2) + r = Rational(str(a.n(29))) + assert rel_check(a, r) + + assert Eq(log(cos(2)**2 + sin(2)**2), 0) is S.true + + +def test_issue_8449(): + p = Symbol('p', nonnegative=True) + assert Lt(-oo, p) + assert Ge(-oo, p) is S.false + assert Gt(oo, -p) + assert Le(oo, -p) is S.false + + +def test_simplify_relational(): + assert simplify(x*(y + 1) - x*y - x + 1 < x) == (x > 1) + assert simplify(x*(y + 1) - x*y - x - 1 < x) == (x > -1) + assert simplify(x < x*(y + 1) - x*y - x + 1) == (x < 1) + q, r = symbols("q r") + assert (((-q + r) - (q - r)) <= 0).simplify() == (q >= r) + root2 = sqrt(2) + equation = ((root2 * (-q + r) - root2 * (q - r)) <= 0).simplify() + assert equation == (q >= r) + r = S.One < x + # canonical operations are not the same as simplification, + # so if there is no simplification, canonicalization will + # be done unless the measure forbids it + assert simplify(r) == r.canonical + assert simplify(r, ratio=0) != r.canonical + # this is not a random test; in _eval_simplify + # this will simplify to S.false and that is the + # reason for the 'if r.is_Relational' in Relational's + # _eval_simplify routine + assert simplify(-(2**(pi*Rational(3, 2)) + 6**pi)**(1/pi) + + 2*(2**(pi/2) + 3**pi)**(1/pi) < 0) is S.false + # canonical at least + assert Eq(y, x).simplify() == Eq(x, y) + assert Eq(x - 1, 0).simplify() == Eq(x, 1) + assert Eq(x - 1, x).simplify() == S.false + assert Eq(2*x - 1, x).simplify() == Eq(x, 1) + assert Eq(2*x, 4).simplify() == Eq(x, 2) + z = cos(1)**2 + sin(1)**2 - 1 # z.is_zero is None + assert Eq(z*x, 0).simplify() == S.true + + assert Ne(y, x).simplify() == Ne(x, y) + assert Ne(x - 1, 0).simplify() == Ne(x, 1) + assert Ne(x - 1, x).simplify() == S.true + assert Ne(2*x - 1, x).simplify() == Ne(x, 1) + assert Ne(2*x, 4).simplify() == Ne(x, 2) + assert Ne(z*x, 0).simplify() == S.false + + # No real-valued assumptions + assert Ge(y, x).simplify() == Le(x, y) + assert Ge(x - 1, 0).simplify() == Ge(x, 1) + assert Ge(x - 1, x).simplify() == S.false + assert Ge(2*x - 1, x).simplify() == Ge(x, 1) + assert Ge(2*x, 4).simplify() == Ge(x, 2) + assert Ge(z*x, 0).simplify() == S.true + assert Ge(x, -2).simplify() == Ge(x, -2) + assert Ge(-x, -2).simplify() == Le(x, 2) + assert Ge(x, 2).simplify() == Ge(x, 2) + assert Ge(-x, 2).simplify() == Le(x, -2) + + assert Le(y, x).simplify() == Ge(x, y) + assert Le(x - 1, 0).simplify() == Le(x, 1) + assert Le(x - 1, x).simplify() == S.true + assert Le(2*x - 1, x).simplify() == Le(x, 1) + assert Le(2*x, 4).simplify() == Le(x, 2) + assert Le(z*x, 0).simplify() == S.true + assert Le(x, -2).simplify() == Le(x, -2) + assert Le(-x, -2).simplify() == Ge(x, 2) + assert Le(x, 2).simplify() == Le(x, 2) + assert Le(-x, 2).simplify() == Ge(x, -2) + + assert Gt(y, x).simplify() == Lt(x, y) + assert Gt(x - 1, 0).simplify() == Gt(x, 1) + assert Gt(x - 1, x).simplify() == S.false + assert Gt(2*x - 1, x).simplify() == Gt(x, 1) + assert Gt(2*x, 4).simplify() == Gt(x, 2) + assert Gt(z*x, 0).simplify() == S.false + assert Gt(x, -2).simplify() == Gt(x, -2) + assert Gt(-x, -2).simplify() == Lt(x, 2) + assert Gt(x, 2).simplify() == Gt(x, 2) + assert Gt(-x, 2).simplify() == Lt(x, -2) + + assert Lt(y, x).simplify() == Gt(x, y) + assert Lt(x - 1, 0).simplify() == Lt(x, 1) + assert Lt(x - 1, x).simplify() == S.true + assert Lt(2*x - 1, x).simplify() == Lt(x, 1) + assert Lt(2*x, 4).simplify() == Lt(x, 2) + assert Lt(z*x, 0).simplify() == S.false + assert Lt(x, -2).simplify() == Lt(x, -2) + assert Lt(-x, -2).simplify() == Gt(x, 2) + assert Lt(x, 2).simplify() == Lt(x, 2) + assert Lt(-x, 2).simplify() == Gt(x, -2) + + # Test particular branches of _eval_simplify + m = exp(1) - exp_polar(1) + assert simplify(m*x > 1) is S.false + # These two test the same branch + assert simplify(m*x + 2*m*y > 1) is S.false + assert simplify(m*x + y > 1 + y) is S.false + + +def test_equals(): + w, x, y, z = symbols('w:z') + f = Function('f') + assert Eq(x, 1).equals(Eq(x*(y + 1) - x*y - x + 1, x)) + assert Eq(x, y).equals(x < y, True) == False + assert Eq(x, f(1)).equals(Eq(x, f(2)), True) == f(1) - f(2) + assert Eq(f(1), y).equals(Eq(f(2), y), True) == f(1) - f(2) + assert Eq(x, f(1)).equals(Eq(f(2), x), True) == f(1) - f(2) + assert Eq(f(1), x).equals(Eq(x, f(2)), True) == f(1) - f(2) + assert Eq(w, x).equals(Eq(y, z), True) == False + assert Eq(f(1), f(2)).equals(Eq(f(3), f(4)), True) == f(1) - f(3) + assert (x < y).equals(y > x, True) == True + assert (x < y).equals(y >= x, True) == False + assert (x < y).equals(z < y, True) == False + assert (x < y).equals(x < z, True) == False + assert (x < f(1)).equals(x < f(2), True) == f(1) - f(2) + assert (f(1) < x).equals(f(2) < x, True) == f(1) - f(2) + + +def test_reversed(): + assert (x < y).reversed == (y > x) + assert (x <= y).reversed == (y >= x) + assert Eq(x, y, evaluate=False).reversed == Eq(y, x, evaluate=False) + assert Ne(x, y, evaluate=False).reversed == Ne(y, x, evaluate=False) + assert (x >= y).reversed == (y <= x) + assert (x > y).reversed == (y < x) + + +def test_canonical(): + c = [i.canonical for i in ( + x + y < z, + x + 2 > 3, + x < 2, + S(2) > x, + x**2 > -x/y, + Gt(3, 2, evaluate=False) + )] + assert [i.canonical for i in c] == c + assert [i.reversed.canonical for i in c] == c + assert not any(i.lhs.is_Number and not i.rhs.is_Number for i in c) + + c = [i.reversed.func(i.rhs, i.lhs, evaluate=False).canonical for i in c] + assert [i.canonical for i in c] == c + assert [i.reversed.canonical for i in c] == c + assert not any(i.lhs.is_Number and not i.rhs.is_Number for i in c) + assert Eq(y < x, x > y).canonical is S.true + + +@XFAIL +def test_issue_8444_nonworkingtests(): + x = symbols('x', real=True) + assert (x <= oo) == (x >= -oo) == True + + x = symbols('x') + assert x >= floor(x) + assert (x < floor(x)) == False + assert x <= ceiling(x) + assert (x > ceiling(x)) == False + + +def test_issue_8444_workingtests(): + x = symbols('x') + assert Gt(x, floor(x)) == Gt(x, floor(x), evaluate=False) + assert Ge(x, floor(x)) == Ge(x, floor(x), evaluate=False) + assert Lt(x, ceiling(x)) == Lt(x, ceiling(x), evaluate=False) + assert Le(x, ceiling(x)) == Le(x, ceiling(x), evaluate=False) + i = symbols('i', integer=True) + assert (i > floor(i)) == False + assert (i < ceiling(i)) == False + + +def test_issue_10304(): + d = cos(1)**2 + sin(1)**2 - 1 + assert d.is_comparable is False # if this fails, find a new d + e = 1 + d*I + assert simplify(Eq(e, 0)) is S.false + + +def test_issue_18412(): + d = (Rational(1, 6) + z / 4 / y) + assert Eq(x, pi * y**3 * d).replace(y**3, z) == Eq(x, pi * z * d) + + +def test_issue_10401(): + x = symbols('x') + fin = symbols('inf', finite=True) + inf = symbols('inf', infinite=True) + inf2 = symbols('inf2', infinite=True) + infx = symbols('infx', infinite=True, extended_real=True) + # Used in the commented tests below: + #infx2 = symbols('infx2', infinite=True, extended_real=True) + infnx = symbols('inf~x', infinite=True, extended_real=False) + infnx2 = symbols('inf~x2', infinite=True, extended_real=False) + infp = symbols('infp', infinite=True, extended_positive=True) + infp1 = symbols('infp1', infinite=True, extended_positive=True) + infn = symbols('infn', infinite=True, extended_negative=True) + zero = symbols('z', zero=True) + nonzero = symbols('nz', zero=False, finite=True) + + assert Eq(1/(1/x + 1), 1).func is Eq + assert Eq(1/(1/x + 1), 1).subs(x, S.ComplexInfinity) is S.true + assert Eq(1/(1/fin + 1), 1) is S.false + + T, F = S.true, S.false + assert Eq(fin, inf) is F + assert Eq(inf, inf2) not in (T, F) and inf != inf2 + assert Eq(1 + inf, 2 + inf2) not in (T, F) and inf != inf2 + assert Eq(infp, infp1) is T + assert Eq(infp, infn) is F + assert Eq(1 + I*oo, I*oo) is F + assert Eq(I*oo, 1 + I*oo) is F + assert Eq(1 + I*oo, 2 + I*oo) is F + assert Eq(1 + I*oo, 2 + I*infx) is F + assert Eq(1 + I*oo, 2 + infx) is F + # FIXME: The test below fails because (-infx).is_extended_positive is True + # (should be None) + #assert Eq(1 + I*infx, 1 + I*infx2) not in (T, F) and infx != infx2 + # + assert Eq(zoo, sqrt(2) + I*oo) is F + assert Eq(zoo, oo) is F + r = Symbol('r', real=True) + i = Symbol('i', imaginary=True) + assert Eq(i*I, r) not in (T, F) + assert Eq(infx, infnx) is F + assert Eq(infnx, infnx2) not in (T, F) and infnx != infnx2 + assert Eq(zoo, oo) is F + assert Eq(inf/inf2, 0) is F + assert Eq(inf/fin, 0) is F + assert Eq(fin/inf, 0) is T + assert Eq(zero/nonzero, 0) is T and ((zero/nonzero) != 0) + # The commented out test below is incorrect because: + assert zoo == -zoo + assert Eq(zoo, -zoo) is T + assert Eq(oo, -oo) is F + assert Eq(inf, -inf) not in (T, F) + + assert Eq(fin/(fin + 1), 1) is S.false + + o = symbols('o', odd=True) + assert Eq(o, 2*o) is S.false + + p = symbols('p', positive=True) + assert Eq(p/(p - 1), 1) is F + + +def test_issue_10633(): + assert Eq(True, False) == False + assert Eq(False, True) == False + assert Eq(True, True) == True + assert Eq(False, False) == True + + +def test_issue_10927(): + x = symbols('x') + assert str(Eq(x, oo)) == 'Eq(x, oo)' + assert str(Eq(x, -oo)) == 'Eq(x, -oo)' + + +def test_issues_13081_12583_12534(): + # 13081 + r = Rational('905502432259640373/288230376151711744') + assert (r < pi) is S.false + assert (r > pi) is S.true + # 12583 + v = sqrt(2) + u = sqrt(v) + 2/sqrt(10 - 8/sqrt(2 - v) + 4*v*(1/sqrt(2 - v) - 1)) + assert (u >= 0) is S.true + # 12534; Rational vs NumberSymbol + # here are some precisions for which Rational forms + # at a lower and higher precision bracket the value of pi + # e.g. for p = 20: + # Rational(pi.n(p + 1)).n(25) = 3.14159265358979323846 2834 + # pi.n(25) = 3.14159265358979323846 2643 + # Rational(pi.n(p )).n(25) = 3.14159265358979323846 1987 + assert [p for p in range(20, 50) if + (Rational(pi.n(p)) < pi) and + (pi < Rational(pi.n(p + 1)))] == [20, 24, 27, 33, 37, 43, 48] + # pick one such precision and affirm that the reversed operation + # gives the opposite result, i.e. if x < y is true then x > y + # must be false + for i in (20, 21): + v = pi.n(i) + assert rel_check(Rational(v), pi) + assert rel_check(v, pi) + assert rel_check(pi.n(20), pi.n(21)) + # Float vs Rational + # the rational form is less than the floating representation + # at the same precision + assert [i for i in range(15, 50) if Rational(pi.n(i)) > pi.n(i)] == [] + # this should be the same if we reverse the relational + assert [i for i in range(15, 50) if pi.n(i) < Rational(pi.n(i))] == [] + +def test_issue_18188(): + from sympy.sets.conditionset import ConditionSet + result1 = Eq(x*cos(x) - 3*sin(x), 0) + assert result1.as_set() == ConditionSet(x, Eq(x*cos(x) - 3*sin(x), 0), Reals) + + result2 = Eq(x**2 + sqrt(x*2) + sin(x), 0) + assert result2.as_set() == ConditionSet(x, Eq(sqrt(2)*sqrt(x) + x**2 + sin(x), 0), Reals) + +def test_binary_symbols(): + ans = {x} + for f in Eq, Ne: + for t in S.true, S.false: + eq = f(x, S.true) + assert eq.binary_symbols == ans + assert eq.reversed.binary_symbols == ans + assert f(x, 1).binary_symbols == set() + + +def test_rel_args(): + # can't have Boolean args; this is automatic for True/False + # with Python 3 and we confirm that SymPy does the same + # for true/false + for op in ['<', '<=', '>', '>=']: + for b in (S.true, x < 1, And(x, y)): + for v in (0.1, 1, 2**32, t, S.One): + raises(TypeError, lambda: Relational(b, v, op)) + + +def test_nothing_happens_to_Eq_condition_during_simplify(): + # issue 25701 + r = symbols('r', real=True) + assert Eq(2*sign(r + 3)/(5*Abs(r + 3)**Rational(3, 5)), 0 + ).simplify() == Eq(Piecewise( + (0, Eq(r, -3)), ((r + 3)/(5*Abs((r + 3)**Rational(8, 5)))*2, True)), 0) + + +def test_issue_15847(): + a = Ne(x*(x + y), x**2 + x*y) + assert simplify(a) == False + + +def test_negated_property(): + eq = Eq(x, y) + assert eq.negated == Ne(x, y) + + eq = Ne(x, y) + assert eq.negated == Eq(x, y) + + eq = Ge(x + y, y - x) + assert eq.negated == Lt(x + y, y - x) + + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(x, y).negated.negated == f(x, y) + + +def test_reversedsign_property(): + eq = Eq(x, y) + assert eq.reversedsign == Eq(-x, -y) + + eq = Ne(x, y) + assert eq.reversedsign == Ne(-x, -y) + + eq = Ge(x + y, y - x) + assert eq.reversedsign == Le(-x - y, x - y) + + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(x, y).reversedsign.reversedsign == f(x, y) + + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(-x, y).reversedsign.reversedsign == f(-x, y) + + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(x, -y).reversedsign.reversedsign == f(x, -y) + + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(-x, -y).reversedsign.reversedsign == f(-x, -y) + + +def test_reversed_reversedsign_property(): + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(x, y).reversed.reversedsign == f(x, y).reversedsign.reversed + + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(-x, y).reversed.reversedsign == f(-x, y).reversedsign.reversed + + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(x, -y).reversed.reversedsign == f(x, -y).reversedsign.reversed + + for f in (Eq, Ne, Ge, Gt, Le, Lt): + assert f(-x, -y).reversed.reversedsign == \ + f(-x, -y).reversedsign.reversed + + +def test_improved_canonical(): + def test_different_forms(listofforms): + for form1, form2 in combinations(listofforms, 2): + assert form1.canonical == form2.canonical + + def generate_forms(expr): + return [expr, expr.reversed, expr.reversedsign, + expr.reversed.reversedsign] + + test_different_forms(generate_forms(x > -y)) + test_different_forms(generate_forms(x >= -y)) + test_different_forms(generate_forms(Eq(x, -y))) + test_different_forms(generate_forms(Ne(x, -y))) + test_different_forms(generate_forms(pi < x)) + test_different_forms(generate_forms(pi - 5*y < -x + 2*y**2 - 7)) + + assert (pi >= x).canonical == (x <= pi) + + +def test_set_equality_canonical(): + a, b, c = symbols('a b c') + + A = Eq(FiniteSet(a, b, c), FiniteSet(1, 2, 3)) + B = Ne(FiniteSet(a, b, c), FiniteSet(4, 5, 6)) + + assert A.canonical == A.reversed + assert B.canonical == B.reversed + + +def test_trigsimp(): + # issue 16736 + s, c = sin(2*x), cos(2*x) + eq = Eq(s, c) + assert trigsimp(eq) == eq # no rearrangement of sides + # simplification of sides might result in + # an unevaluated Eq + changed = trigsimp(Eq(s + c, sqrt(2))) + assert isinstance(changed, Eq) + assert changed.subs(x, pi/8) is S.true + # or an evaluated one + assert trigsimp(Eq(cos(x)**2 + sin(x)**2, 1)) is S.true + + +def test_polynomial_relation_simplification(): + assert Ge(3*x*(x + 1) + 4, 3*x).simplify() in [Ge(x**2, -Rational(4,3)), Le(-x**2, Rational(4, 3))] + assert Le(-(3*x*(x + 1) + 4), -3*x).simplify() in [Ge(x**2, -Rational(4,3)), Le(-x**2, Rational(4, 3))] + assert ((x**2+3)*(x**2-1)+3*x >= 2*x**2).simplify() in [(x**4 + 3*x >= 3), (-x**4 - 3*x <= -3)] + + +def test_multivariate_linear_function_simplification(): + assert Ge(x + y, x - y).simplify() == Ge(y, 0) + assert Le(-x + y, -x - y).simplify() == Le(y, 0) + assert Eq(2*x + y, 2*x + y - 3).simplify() == False + assert (2*x + y > 2*x + y - 3).simplify() == True + assert (2*x + y < 2*x + y - 3).simplify() == False + assert (2*x + y < 2*x + y + 3).simplify() == True + a, b, c, d, e, f, g = symbols('a b c d e f g') + assert Lt(a + b + c + 2*d, 3*d - f + g). simplify() == Lt(a, -b - c + d - f + g) + + +def test_nonpolymonial_relations(): + assert Eq(cos(x), 0).simplify() == Eq(cos(x), 0) + +def test_18778(): + raises(TypeError, lambda: is_le(Basic(), Basic())) + raises(TypeError, lambda: is_gt(Basic(), Basic())) + raises(TypeError, lambda: is_ge(Basic(), Basic())) + raises(TypeError, lambda: is_lt(Basic(), Basic())) + +def test_EvalEq(): + """ + + This test exists to ensure backwards compatibility. + The method to use is _eval_is_eq + """ + from sympy.core.expr import Expr + + class PowTest(Expr): + def __new__(cls, base, exp): + return Basic.__new__(PowTest, _sympify(base), _sympify(exp)) + + def _eval_Eq(lhs, rhs): + if type(lhs) == PowTest and type(rhs) == PowTest: + return lhs.args[0] == rhs.args[0] and lhs.args[1] == rhs.args[1] + + assert is_eq(PowTest(3, 4), PowTest(3,4)) + assert is_eq(PowTest(3, 4), _sympify(4)) is None + assert is_neq(PowTest(3, 4), PowTest(3,7)) + + +def test_is_eq(): + # test assumptions + assert is_eq(x, y, Q.infinite(x) & Q.finite(y)) is False + assert is_eq(x, y, Q.infinite(x) & Q.infinite(y) & Q.extended_real(x) & ~Q.extended_real(y)) is False + assert is_eq(x, y, Q.infinite(x) & Q.infinite(y) & Q.extended_positive(x) & Q.extended_negative(y)) is False + + assert is_eq(x+I, y+I, Q.infinite(x) & Q.finite(y)) is False + assert is_eq(1+x*I, 1+y*I, Q.infinite(x) & Q.finite(y)) is False + + assert is_eq(x, S(0), assumptions=Q.zero(x)) + assert is_eq(x, S(0), assumptions=~Q.zero(x)) is False + assert is_eq(x, S(0), assumptions=Q.nonzero(x)) is False + assert is_neq(x, S(0), assumptions=Q.zero(x)) is False + assert is_neq(x, S(0), assumptions=~Q.zero(x)) + assert is_neq(x, S(0), assumptions=Q.nonzero(x)) + + # test registration + class PowTest(Expr): + def __new__(cls, base, exp): + return Basic.__new__(cls, _sympify(base), _sympify(exp)) + + @dispatch(PowTest, PowTest) + def _eval_is_eq(lhs, rhs): + if type(lhs) == PowTest and type(rhs) == PowTest: + return fuzzy_and([is_eq(lhs.args[0], rhs.args[0]), is_eq(lhs.args[1], rhs.args[1])]) + + assert is_eq(PowTest(3, 4), PowTest(3,4)) + assert is_eq(PowTest(3, 4), _sympify(4)) is None + assert is_neq(PowTest(3, 4), PowTest(3,7)) + + +def test_is_ge_le(): + # test assumptions + assert is_ge(x, S(0), Q.nonnegative(x)) is True + assert is_ge(x, S(0), Q.negative(x)) is False + + # test registration + class PowTest(Expr): + def __new__(cls, base, exp): + return Basic.__new__(cls, _sympify(base), _sympify(exp)) + + @dispatch(PowTest, PowTest) + def _eval_is_ge(lhs, rhs): + if type(lhs) == PowTest and type(rhs) == PowTest: + return fuzzy_and([is_ge(lhs.args[0], rhs.args[0]), is_ge(lhs.args[1], rhs.args[1])]) + + assert is_ge(PowTest(3, 9), PowTest(3,2)) + assert is_gt(PowTest(3, 9), PowTest(3,2)) + assert is_le(PowTest(3, 2), PowTest(3,9)) + assert is_lt(PowTest(3, 2), PowTest(3,9)) + + +def test_weak_strict(): + for func in (Eq, Ne): + eq = func(x, 1) + assert eq.strict == eq.weak == eq + eq = Gt(x, 1) + assert eq.weak == Ge(x, 1) + assert eq.strict == eq + eq = Lt(x, 1) + assert eq.weak == Le(x, 1) + assert eq.strict == eq + eq = Ge(x, 1) + assert eq.strict == Gt(x, 1) + assert eq.weak == eq + eq = Le(x, 1) + assert eq.strict == Lt(x, 1) + assert eq.weak == eq + + +def test_issue_23731(): + i = symbols('i', integer=True) + assert unchanged(Eq, i, 1.0) + assert unchanged(Eq, i/2, 0.5) + ni = symbols('ni', integer=False) + assert Eq(ni, 1) == False + assert unchanged(Eq, ni, .1) + assert Eq(ni, 1.0) == False + nr = symbols('nr', rational=False) + assert Eq(nr, .1) == False + + +def test_rewrite_Add(): + from sympy.testing.pytest import warns_deprecated_sympy + with warns_deprecated_sympy(): + assert Eq(x, y).rewrite(Add) == x - y diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_rules.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_rules.py new file mode 100644 index 0000000000000000000000000000000000000000..31cb88b52db21f39653033b4567526e992be99f0 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_rules.py @@ -0,0 +1,14 @@ +from sympy.core.rules import Transform + +from sympy.testing.pytest import raises + + +def test_Transform(): + add1 = Transform(lambda x: x + 1, lambda x: x % 2 == 1) + assert add1[1] == 2 + assert (1 in add1) is True + assert add1.get(1) == 2 + + raises(KeyError, lambda: add1[2]) + assert (2 in add1) is False + assert add1.get(2) is None diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_singleton.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_singleton.py new file mode 100644 index 0000000000000000000000000000000000000000..893713f27d74b884391ad800d186eafe5337ab1c --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_singleton.py @@ -0,0 +1,76 @@ +from sympy.core.basic import Basic +from sympy.core.numbers import Rational +from sympy.core.singleton import S, Singleton + +def test_Singleton(): + + class MySingleton(Basic, metaclass=Singleton): + pass + + MySingleton() # force instantiation + assert MySingleton() is not Basic() + assert MySingleton() is MySingleton() + assert S.MySingleton is MySingleton() + + class MySingleton_sub(MySingleton): + pass + + MySingleton_sub() + assert MySingleton_sub() is not MySingleton() + assert MySingleton_sub() is MySingleton_sub() + +def test_singleton_redefinition(): + class TestSingleton(Basic, metaclass=Singleton): + pass + + assert TestSingleton() is S.TestSingleton + + class TestSingleton(Basic, metaclass=Singleton): + pass + + assert TestSingleton() is S.TestSingleton + +def test_names_in_namespace(): + # Every singleton name should be accessible from the 'from sympy import *' + # namespace in addition to the S object. However, it does not need to be + # by the same name (e.g., oo instead of S.Infinity). + + # As a general rule, things should only be added to the singleton registry + # if they are used often enough that code can benefit either from the + # performance benefit of being able to use 'is' (this only matters in very + # tight loops), or from the memory savings of having exactly one instance + # (this matters for the numbers singletons, but very little else). The + # singleton registry is already a bit overpopulated, and things cannot be + # removed from it without breaking backwards compatibility. So if you got + # here by adding something new to the singletons, ask yourself if it + # really needs to be singletonized. Note that SymPy classes compare to one + # another just fine, so Class() == Class() will give True even if each + # Class() returns a new instance. Having unique instances is only + # necessary for the above noted performance gains. It should not be needed + # for any behavioral purposes. + + # If you determine that something really should be a singleton, it must be + # accessible to sympify() without using 'S' (hence this test). Also, its + # str printer should print a form that does not use S. This is because + # sympify() disables attribute lookups by default for safety purposes. + d = {} + exec('from sympy import *', d) + + for name in dir(S) + list(S._classes_to_install): + if name.startswith('_'): + continue + if name == 'register': + continue + if isinstance(getattr(S, name), Rational): + continue + if getattr(S, name).__module__.startswith('sympy.physics'): + continue + if name in ['MySingleton', 'MySingleton_sub', 'TestSingleton']: + # From the tests above + continue + if name == 'NegativeInfinity': + # Accessible by -oo + continue + + # Use is here to ensure it is the exact same object + assert any(getattr(S, name) is i for i in d.values()), name diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_sorting.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_sorting.py new file mode 100644 index 0000000000000000000000000000000000000000..a18dbfb624552cf2fa11bb7f3c3a9e865caeb0c4 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_sorting.py @@ -0,0 +1,28 @@ +from sympy.core.sorting import default_sort_key, ordered +from sympy.testing.pytest import raises + +from sympy.abc import x + + +def test_default_sort_key(): + func = lambda x: x + assert sorted([func, x, func], key=default_sort_key) == [func, func, x] + + class C: + def __repr__(self): + return 'x.y' + func = C() + assert sorted([x, func], key=default_sort_key) == [func, x] + + +def test_ordered(): + # Issue 7210 - this had been failing with python2/3 problems + assert (list(ordered([{1:3, 2:4, 9:10}, {1:3}])) == \ + [{1: 3}, {1: 3, 2: 4, 9: 10}]) + # warnings should not be raised for identical items + l = [1, 1] + assert list(ordered(l, warn=True)) == l + l = [[1], [2], [1]] + assert list(ordered(l, warn=True)) == [[1], [1], [2]] + raises(ValueError, lambda: list(ordered(['a', 'ab'], keys=[lambda x: x[0]], + default=False, warn=True))) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_subs.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_subs.py new file mode 100644 index 0000000000000000000000000000000000000000..0803a4b1b5e93b8a35f43516ccef3ab9a16f08ec --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_subs.py @@ -0,0 +1,895 @@ +from sympy.calculus.accumulationbounds import AccumBounds +from sympy.core.add import Add +from sympy.core.basic import Basic +from sympy.core.containers import (Dict, Tuple) +from sympy.core.function import (Derivative, Function, Lambda, Subs) +from sympy.core.mul import Mul +from sympy.core.numbers import (Float, I, Integer, Rational, oo, pi, zoo) +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, Wild, symbols) +from sympy.core.sympify import SympifyError +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.piecewise import Piecewise +from sympy.functions.elementary.trigonometric import (atan2, cos, cot, sin, tan) +from sympy.matrices.dense import (Matrix, zeros) +from sympy.matrices.expressions.special import ZeroMatrix +from sympy.polys.polytools import factor +from sympy.polys.rootoftools import RootOf +from sympy.simplify.cse_main import cse +from sympy.simplify.simplify import nsimplify +from sympy.core.basic import _aresame +from sympy.testing.pytest import XFAIL, raises +from sympy.abc import a, x, y, z, t + + +def test_subs(): + n3 = Rational(3) + e = x + e = e.subs(x, n3) + assert e == Rational(3) + + e = 2*x + assert e == 2*x + e = e.subs(x, n3) + assert e == Rational(6) + + +def test_subs_Matrix(): + z = zeros(2) + z1 = ZeroMatrix(2, 2) + assert (x*y).subs({x:z, y:0}) in [z, z1] + assert (x*y).subs({y:z, x:0}) == 0 + assert (x*y).subs({y:z, x:0}, simultaneous=True) in [z, z1] + assert (x + y).subs({x: z, y: z}, simultaneous=True) in [z, z1] + assert (x + y).subs({x: z, y: z}) in [z, z1] + + # Issue #15528 + assert Mul(Matrix([[3]]), x).subs(x, 2.0) == Matrix([[6.0]]) + # Does not raise a TypeError, see comment on the MatAdd postprocessor + assert Add(Matrix([[3]]), x).subs(x, 2.0) == Add(Matrix([[3]]), 2.0) + + +def test_subs_AccumBounds(): + e = x + e = e.subs(x, AccumBounds(1, 3)) + assert e == AccumBounds(1, 3) + + e = 2*x + e = e.subs(x, AccumBounds(1, 3)) + assert e == AccumBounds(2, 6) + + e = x + x**2 + e = e.subs(x, AccumBounds(-1, 1)) + assert e == AccumBounds(-1, 2) + + +def test_trigonometric(): + n3 = Rational(3) + e = (sin(x)**2).diff(x) + assert e == 2*sin(x)*cos(x) + e = e.subs(x, n3) + assert e == 2*cos(n3)*sin(n3) + + e = (sin(x)**2).diff(x) + assert e == 2*sin(x)*cos(x) + e = e.subs(sin(x), cos(x)) + assert e == 2*cos(x)**2 + + assert exp(pi).subs(exp, sin) == 0 + assert cos(exp(pi)).subs(exp, sin) == 1 + + i = Symbol('i', integer=True) + zoo = S.ComplexInfinity + assert tan(x).subs(x, pi/2) is zoo + assert cot(x).subs(x, pi) is zoo + assert cot(i*x).subs(x, pi) is zoo + assert tan(i*x).subs(x, pi/2) == tan(i*pi/2) + assert tan(i*x).subs(x, pi/2).subs(i, 1) is zoo + o = Symbol('o', odd=True) + assert tan(o*x).subs(x, pi/2) == tan(o*pi/2) + + +def test_powers(): + assert sqrt(1 - sqrt(x)).subs(x, 4) == I + assert (sqrt(1 - x**2)**3).subs(x, 2) == - 3*I*sqrt(3) + assert (x**Rational(1, 3)).subs(x, 27) == 3 + assert (x**Rational(1, 3)).subs(x, -27) == 3*(-1)**Rational(1, 3) + assert ((-x)**Rational(1, 3)).subs(x, 27) == 3*(-1)**Rational(1, 3) + n = Symbol('n', negative=True) + assert (x**n).subs(x, 0) is S.ComplexInfinity + assert exp(-1).subs(S.Exp1, 0) is S.ComplexInfinity + assert (x**(4.0*y)).subs(x**(2.0*y), n) == n**2.0 + assert (2**(x + 2)).subs(2, 3) == 3**(x + 3) + + +def test_logexppow(): # no eval() + x = Symbol('x', real=True) + w = Symbol('w') + e = (3**(1 + x) + 2**(1 + x))/(3**x + 2**x) + assert e.subs(2**x, w) != e + assert e.subs(exp(x*log(Rational(2))), w) != e + + +def test_bug(): + x1 = Symbol('x1') + x2 = Symbol('x2') + y = x1*x2 + assert y.subs(x1, Float(3.0)) == Float(3.0)*x2 + + +def test_subbug1(): + # see that they don't fail + (x**x).subs(x, 1) + (x**x).subs(x, 1.0) + + +def test_subbug2(): + # Ensure this does not cause infinite recursion + assert Float(7.7).epsilon_eq(abs(x).subs(x, -7.7)) + + +def test_dict_set(): + a, b, c = map(Wild, 'abc') + + f = 3*cos(4*x) + r = f.match(a*cos(b*x)) + assert r == {a: 3, b: 4} + e = a/b*sin(b*x) + assert e.subs(r) == r[a]/r[b]*sin(r[b]*x) + assert e.subs(r) == 3*sin(4*x) / 4 + s = set(r.items()) + assert e.subs(s) == r[a]/r[b]*sin(r[b]*x) + assert e.subs(s) == 3*sin(4*x) / 4 + + assert e.subs(r) == r[a]/r[b]*sin(r[b]*x) + assert e.subs(r) == 3*sin(4*x) / 4 + assert x.subs(Dict((x, 1))) == 1 + + +def test_dict_ambigous(): # see issue 3566 + f = x*exp(x) + g = z*exp(z) + + df = {x: y, exp(x): y} + dg = {z: y, exp(z): y} + + assert f.subs(df) == y**2 + assert g.subs(dg) == y**2 + + # and this is how order can affect the result + assert f.subs(x, y).subs(exp(x), y) == y*exp(y) + assert f.subs(exp(x), y).subs(x, y) == y**2 + + # length of args and count_ops are the same so + # default_sort_key resolves ordering...if one + # doesn't want this result then an unordered + # sequence should not be used. + e = 1 + x*y + assert e.subs({x: y, y: 2}) == 5 + # here, there are no obviously clashing keys or values + # but the results depend on the order + assert exp(x/2 + y).subs({exp(y + 1): 2, x: 2}) == exp(y + 1) + + +def test_deriv_sub_bug3(): + f = Function('f') + pat = Derivative(f(x), x, x) + assert pat.subs(y, y**2) == Derivative(f(x), x, x) + assert pat.subs(y, y**2) != Derivative(f(x), x) + + +def test_equality_subs1(): + f = Function('f') + eq = Eq(f(x)**2, x) + res = Eq(Integer(16), x) + assert eq.subs(f(x), 4) == res + + +def test_equality_subs2(): + f = Function('f') + eq = Eq(f(x)**2, 16) + assert bool(eq.subs(f(x), 3)) is False + assert bool(eq.subs(f(x), 4)) is True + + +def test_issue_3742(): + e = sqrt(x)*exp(y) + assert e.subs(sqrt(x), 1) == exp(y) + + +def test_subs_dict1(): + assert (1 + x*y).subs(x, pi) == 1 + pi*y + assert (1 + x*y).subs({x: pi, y: 2}) == 1 + 2*pi + + c2, c3, q1p, q2p, c1, s1, s2, s3 = symbols('c2 c3 q1p q2p c1 s1 s2 s3') + test = (c2**2*q2p*c3 + c1**2*s2**2*q2p*c3 + s1**2*s2**2*q2p*c3 + - c1**2*q1p*c2*s3 - s1**2*q1p*c2*s3) + assert (test.subs({c1**2: 1 - s1**2, c2**2: 1 - s2**2, c3**3: 1 - s3**2}) + == c3*q2p*(1 - s2**2) + c3*q2p*s2**2*(1 - s1**2) + - c2*q1p*s3*(1 - s1**2) + c3*q2p*s1**2*s2**2 - c2*q1p*s3*s1**2) + + +def test_mul(): + x, y, z, a, b, c = symbols('x y z a b c') + A, B, C = symbols('A B C', commutative=0) + assert (x*y*z).subs(z*x, y) == y**2 + assert (z*x).subs(1/x, z) == 1 + assert (x*y/z).subs(1/z, a) == a*x*y + assert (x*y/z).subs(x/z, a) == a*y + assert (x*y/z).subs(y/z, a) == a*x + assert (x*y/z).subs(x/z, 1/a) == y/a + assert (x*y/z).subs(x, 1/a) == y/(z*a) + assert (2*x*y).subs(5*x*y, z) != z*Rational(2, 5) + assert (x*y*A).subs(x*y, a) == a*A + assert (x**2*y**(x*Rational(3, 2))).subs(x*y**(x/2), 2) == 4*y**(x/2) + assert (x*exp(x*2)).subs(x*exp(x), 2) == 2*exp(x) + assert ((x**(2*y))**3).subs(x**y, 2) == 64 + assert (x*A*B).subs(x*A, y) == y*B + assert (x*y*(1 + x)*(1 + x*y)).subs(x*y, 2) == 6*(1 + x) + assert ((1 + A*B)*A*B).subs(A*B, x*A*B) + assert (x*a/z).subs(x/z, A) == a*A + assert (x**3*A).subs(x**2*A, a) == a*x + assert (x**2*A*B).subs(x**2*B, a) == a*A + assert (x**2*A*B).subs(x**2*A, a) == a*B + assert (b*A**3/(a**3*c**3)).subs(a**4*c**3*A**3/b**4, z) == \ + b*A**3/(a**3*c**3) + assert (6*x).subs(2*x, y) == 3*y + assert (y*exp(x*Rational(3, 2))).subs(y*exp(x), 2) == 2*exp(x/2) + assert (y*exp(x*Rational(3, 2))).subs(y*exp(x), 2) == 2*exp(x/2) + assert (A**2*B*A**2*B*A**2).subs(A*B*A, C) == A*C**2*A + assert (x*A**3).subs(x*A, y) == y*A**2 + assert (x**2*A**3).subs(x*A, y) == y**2*A + assert (x*A**3).subs(x*A, B) == B*A**2 + assert (x*A*B*A*exp(x*A*B)).subs(x*A, B) == B**2*A*exp(B*B) + assert (x**2*A*B*A*exp(x*A*B)).subs(x*A, B) == B**3*exp(B**2) + assert (x**3*A*exp(x*A*B)*A*exp(x*A*B)).subs(x*A, B) == \ + x*B*exp(B**2)*B*exp(B**2) + assert (x*A*B*C*A*B).subs(x*A*B, C) == C**2*A*B + assert (-I*a*b).subs(a*b, 2) == -2*I + + # issue 6361 + assert (-8*I*a).subs(-2*a, 1) == 4*I + assert (-I*a).subs(-a, 1) == I + + # issue 6441 + assert (4*x**2).subs(2*x, y) == y**2 + assert (2*4*x**2).subs(2*x, y) == 2*y**2 + assert (-x**3/9).subs(-x/3, z) == -z**2*x + assert (-x**3/9).subs(x/3, z) == -z**2*x + assert (-2*x**3/9).subs(x/3, z) == -2*x*z**2 + assert (-2*x**3/9).subs(-x/3, z) == -2*x*z**2 + assert (-2*x**3/9).subs(-2*x, z) == z*x**2/9 + assert (-2*x**3/9).subs(2*x, z) == -z*x**2/9 + assert (2*(3*x/5/7)**2).subs(3*x/5, z) == 2*(Rational(1, 7))**2*z**2 + assert (4*x).subs(-2*x, z) == 4*x # try keep subs literal + + +def test_subs_simple(): + a = symbols('a', commutative=True) + x = symbols('x', commutative=False) + + assert (2*a).subs(1, 3) == 2*a + assert (2*a).subs(2, 3) == 3*a + assert (2*a).subs(a, 3) == 6 + assert sin(2).subs(1, 3) == sin(2) + assert sin(2).subs(2, 3) == sin(3) + assert sin(a).subs(a, 3) == sin(3) + + assert (2*x).subs(1, 3) == 2*x + assert (2*x).subs(2, 3) == 3*x + assert (2*x).subs(x, 3) == 6 + assert sin(x).subs(x, 3) == sin(3) + + +def test_subs_constants(): + a, b = symbols('a b', commutative=True) + x, y = symbols('x y', commutative=False) + + assert (a*b).subs(2*a, 1) == a*b + assert (1.5*a*b).subs(a, 1) == 1.5*b + assert (2*a*b).subs(2*a, 1) == b + assert (2*a*b).subs(4*a, 1) == 2*a*b + + assert (x*y).subs(2*x, 1) == x*y + assert (1.5*x*y).subs(x, 1) == 1.5*y + assert (2*x*y).subs(2*x, 1) == y + assert (2*x*y).subs(4*x, 1) == 2*x*y + + +def test_subs_commutative(): + a, b, c, d, K = symbols('a b c d K', commutative=True) + + assert (a*b).subs(a*b, K) == K + assert (a*b*a*b).subs(a*b, K) == K**2 + assert (a*a*b*b).subs(a*b, K) == K**2 + assert (a*b*c*d).subs(a*b*c, K) == d*K + assert (a*b**c).subs(a, K) == K*b**c + assert (a*b**c).subs(b, K) == a*K**c + assert (a*b**c).subs(c, K) == a*b**K + assert (a*b*c*b*a).subs(a*b, K) == c*K**2 + assert (a**3*b**2*a).subs(a*b, K) == a**2*K**2 + + +def test_subs_noncommutative(): + w, x, y, z, L = symbols('w x y z L', commutative=False) + alpha = symbols('alpha', commutative=True) + someint = symbols('someint', commutative=True, integer=True) + + assert (x*y).subs(x*y, L) == L + assert (w*y*x).subs(x*y, L) == w*y*x + assert (w*x*y*z).subs(x*y, L) == w*L*z + assert (x*y*x*y).subs(x*y, L) == L**2 + assert (x*x*y).subs(x*y, L) == x*L + assert (x*x*y*y).subs(x*y, L) == x*L*y + assert (w*x*y).subs(x*y*z, L) == w*x*y + assert (x*y**z).subs(x, L) == L*y**z + assert (x*y**z).subs(y, L) == x*L**z + assert (x*y**z).subs(z, L) == x*y**L + assert (w*x*y*z*x*y).subs(x*y*z, L) == w*L*x*y + assert (w*x*y*y*w*x*x*y*x*y*y*x*y).subs(x*y, L) == w*L*y*w*x*L**2*y*L + + # Check fractional power substitutions. It should not do + # substitutions that choose a value for noncommutative log, + # or inverses that don't already appear in the expressions. + assert (x*x*x).subs(x*x, L) == L*x + assert (x*x*x*y*x*x*x*x).subs(x*x, L) == L*x*y*L**2 + for p in range(1, 5): + for k in range(10): + assert (y * x**k).subs(x**p, L) == y * L**(k//p) * x**(k % p) + assert (x**Rational(3, 2)).subs(x**S.Half, L) == x**Rational(3, 2) + assert (x**S.Half).subs(x**S.Half, L) == L + assert (x**Rational(-1, 2)).subs(x**S.Half, L) == x**Rational(-1, 2) + assert (x**Rational(-1, 2)).subs(x**Rational(-1, 2), L) == L + + assert (x**(2*someint)).subs(x**someint, L) == L**2 + assert (x**(2*someint + 3)).subs(x**someint, L) == L**2*x**3 + assert (x**(3*someint + 3)).subs(x**someint, L) == L**3*x**3 + assert (x**(3*someint)).subs(x**(2*someint), L) == L * x**someint + assert (x**(4*someint)).subs(x**(2*someint), L) == L**2 + assert (x**(4*someint + 1)).subs(x**(2*someint), L) == L**2 * x + assert (x**(4*someint)).subs(x**(3*someint), L) == L * x**someint + assert (x**(4*someint + 1)).subs(x**(3*someint), L) == L * x**(someint + 1) + + assert (x**(2*alpha)).subs(x**alpha, L) == x**(2*alpha) + assert (x**(2*alpha + 2)).subs(x**2, L) == x**(2*alpha + 2) + assert ((2*z)**alpha).subs(z**alpha, y) == (2*z)**alpha + assert (x**(2*someint*alpha)).subs(x**someint, L) == x**(2*someint*alpha) + assert (x**(2*someint + alpha)).subs(x**someint, L) == x**(2*someint + alpha) + + # This could in principle be substituted, but is not currently + # because it requires recognizing that someint**2 is divisible by + # someint. + assert (x**(someint**2 + 3)).subs(x**someint, L) == x**(someint**2 + 3) + + # alpha**z := exp(log(alpha) z) is usually well-defined + assert (4**z).subs(2**z, y) == y**2 + + # Negative powers + assert (x**(-1)).subs(x**3, L) == x**(-1) + assert (x**(-2)).subs(x**3, L) == x**(-2) + assert (x**(-3)).subs(x**3, L) == L**(-1) + assert (x**(-4)).subs(x**3, L) == L**(-1) * x**(-1) + assert (x**(-5)).subs(x**3, L) == L**(-1) * x**(-2) + + assert (x**(-1)).subs(x**(-3), L) == x**(-1) + assert (x**(-2)).subs(x**(-3), L) == x**(-2) + assert (x**(-3)).subs(x**(-3), L) == L + assert (x**(-4)).subs(x**(-3), L) == L * x**(-1) + assert (x**(-5)).subs(x**(-3), L) == L * x**(-2) + + assert (x**1).subs(x**(-3), L) == x + assert (x**2).subs(x**(-3), L) == x**2 + assert (x**3).subs(x**(-3), L) == L**(-1) + assert (x**4).subs(x**(-3), L) == L**(-1) * x + assert (x**5).subs(x**(-3), L) == L**(-1) * x**2 + + +def test_subs_basic_funcs(): + a, b, c, d, K = symbols('a b c d K', commutative=True) + w, x, y, z, L = symbols('w x y z L', commutative=False) + + assert (x + y).subs(x + y, L) == L + assert (x - y).subs(x - y, L) == L + assert (x/y).subs(x, L) == L/y + assert (x**y).subs(x, L) == L**y + assert (x**y).subs(y, L) == x**L + assert ((a - c)/b).subs(b, K) == (a - c)/K + assert (exp(x*y - z)).subs(x*y, L) == exp(L - z) + assert (a*exp(x*y - w*z) + b*exp(x*y + w*z)).subs(z, 0) == \ + a*exp(x*y) + b*exp(x*y) + assert ((a - b)/(c*d - a*b)).subs(c*d - a*b, K) == (a - b)/K + assert (w*exp(a*b - c)*x*y/4).subs(x*y, L) == w*exp(a*b - c)*L/4 + + +def test_subs_wild(): + R, S, T, U = symbols('R S T U', cls=Wild) + + assert (R*S).subs(R*S, T) == T + assert (S*R).subs(R*S, T) == T + assert (R + S).subs(R + S, T) == T + assert (R**S).subs(R, T) == T**S + assert (R**S).subs(S, T) == R**T + assert (R*S**T).subs(R, U) == U*S**T + assert (R*S**T).subs(S, U) == R*U**T + assert (R*S**T).subs(T, U) == R*S**U + + +def test_subs_mixed(): + a, b, c, d, K = symbols('a b c d K', commutative=True) + w, x, y, z, L = symbols('w x y z L', commutative=False) + R, S, T, U = symbols('R S T U', cls=Wild) + + assert (a*x*y).subs(x*y, L) == a*L + assert (a*b*x*y*x).subs(x*y, L) == a*b*L*x + assert (R*x*y*exp(x*y)).subs(x*y, L) == R*L*exp(L) + assert (a*x*y*y*x - x*y*z*exp(a*b)).subs(x*y, L) == a*L*y*x - L*z*exp(a*b) + e = c*y*x*y*x**(R*S - a*b) - T*(a*R*b*S) + assert e.subs(x*y, L).subs(a*b, K).subs(R*S, U) == \ + c*y*L*x**(U - K) - T*(U*K) + + +def test_division(): + a, b, c = symbols('a b c', commutative=True) + x, y, z = symbols('x y z', commutative=True) + + assert (1/a).subs(a, c) == 1/c + assert (1/a**2).subs(a, c) == 1/c**2 + assert (1/a**2).subs(a, -2) == Rational(1, 4) + assert (-(1/a**2)).subs(a, -2) == Rational(-1, 4) + + assert (1/x).subs(x, z) == 1/z + assert (1/x**2).subs(x, z) == 1/z**2 + assert (1/x**2).subs(x, -2) == Rational(1, 4) + assert (-(1/x**2)).subs(x, -2) == Rational(-1, 4) + + #issue 5360 + assert (1/x).subs(x, 0) == 1/S.Zero + + +def test_add(): + a, b, c, d, x, y, t = symbols('a b c d x y t') + + assert (a**2 - b - c).subs(a**2 - b, d) in [d - c, a**2 - b - c] + assert (a**2 - c).subs(a**2 - c, d) == d + assert (a**2 - b - c).subs(a**2 - c, d) in [d - b, a**2 - b - c] + assert (a**2 - x - c).subs(a**2 - c, d) in [d - x, a**2 - x - c] + assert (a**2 - b - sqrt(a)).subs(a**2 - sqrt(a), c) == c - b + assert (a + b + exp(a + b)).subs(a + b, c) == c + exp(c) + assert (c + b + exp(c + b)).subs(c + b, a) == a + exp(a) + assert (a + b + c + d).subs(b + c, x) == a + d + x + assert (a + b + c + d).subs(-b - c, x) == a + d - x + assert ((x + 1)*y).subs(x + 1, t) == t*y + assert ((-x - 1)*y).subs(x + 1, t) == -t*y + assert ((x - 1)*y).subs(x + 1, t) == y*(t - 2) + assert ((-x + 1)*y).subs(x + 1, t) == y*(-t + 2) + + # this should work every time: + e = a**2 - b - c + assert e.subs(Add(*e.args[:2]), d) == d + e.args[2] + assert e.subs(a**2 - c, d) == d - b + + # the fallback should recognize when a change has + # been made; while .1 == Rational(1, 10) they are not the same + # and the change should be made + assert (0.1 + a).subs(0.1, Rational(1, 10)) == Rational(1, 10) + a + + e = (-x*(-y + 1) - y*(y - 1)) + ans = (-x*(x) - y*(-x)).expand() + assert e.subs(-y + 1, x) == ans + + #Test issue 18747 + assert (exp(x) + cos(x)).subs(x, oo) == oo + assert Add(*[AccumBounds(-1, 1), oo]) == oo + assert Add(*[oo, AccumBounds(-1, 1)]) == oo + + +def test_subs_issue_4009(): + assert (I*Symbol('a')).subs(1, 2) == I*Symbol('a') + + +def test_functions_subs(): + f, g = symbols('f g', cls=Function) + l = Lambda((x, y), sin(x) + y) + assert (g(y, x) + cos(x)).subs(g, l) == sin(y) + x + cos(x) + assert (f(x)**2).subs(f, sin) == sin(x)**2 + assert (f(x, y)).subs(f, log) == log(x, y) + assert (f(x, y)).subs(f, sin) == f(x, y) + assert (sin(x) + atan2(x, y)).subs([[atan2, f], [sin, g]]) == \ + f(x, y) + g(x) + assert (g(f(x + y, x))).subs([[f, l], [g, exp]]) == exp(x + sin(x + y)) + + +def test_derivative_subs(): + f = Function('f') + g = Function('g') + assert Derivative(f(x), x).subs(f(x), y) != 0 + # need xreplace to put the function back, see #13803 + assert Derivative(f(x), x).subs(f(x), y).xreplace({y: f(x)}) == \ + Derivative(f(x), x) + # issues 5085, 5037 + assert cse(Derivative(f(x), x) + f(x))[1][0].has(Derivative) + assert cse(Derivative(f(x, y), x) + + Derivative(f(x, y), y))[1][0].has(Derivative) + eq = Derivative(g(x), g(x)) + assert eq.subs(g, f) == Derivative(f(x), f(x)) + assert eq.subs(g(x), f(x)) == Derivative(f(x), f(x)) + assert eq.subs(g, cos) == Subs(Derivative(y, y), y, cos(x)) + + +def test_derivative_subs2(): + f_func, g_func = symbols('f g', cls=Function) + f, g = f_func(x, y, z), g_func(x, y, z) + assert Derivative(f, x, y).subs(Derivative(f, x, y), g) == g + assert Derivative(f, y, x).subs(Derivative(f, x, y), g) == g + assert Derivative(f, x, y).subs(Derivative(f, x), g) == Derivative(g, y) + assert Derivative(f, x, y).subs(Derivative(f, y), g) == Derivative(g, x) + assert (Derivative(f, x, y, z).subs( + Derivative(f, x, z), g) == Derivative(g, y)) + assert (Derivative(f, x, y, z).subs( + Derivative(f, z, y), g) == Derivative(g, x)) + assert (Derivative(f, x, y, z).subs( + Derivative(f, z, y, x), g) == g) + + # Issue 9135 + assert (Derivative(f, x, x, y).subs( + Derivative(f, y, y), g) == Derivative(f, x, x, y)) + assert (Derivative(f, x, y, y, z).subs( + Derivative(f, x, y, y, y), g) == Derivative(f, x, y, y, z)) + + assert Derivative(f, x, y).subs(Derivative(f_func(x), x, y), g) == Derivative(f, x, y) + + +def test_derivative_subs3(): + dex = Derivative(exp(x), x) + assert Derivative(dex, x).subs(dex, exp(x)) == dex + assert dex.subs(exp(x), dex) == Derivative(exp(x), x, x) + + +def test_issue_5284(): + A, B = symbols('A B', commutative=False) + assert (x*A).subs(x**2*A, B) == x*A + assert (A**2).subs(A**3, B) == A**2 + assert (A**6).subs(A**3, B) == B**2 + + +def test_subs_iter(): + assert x.subs(reversed([[x, y]])) == y + it = iter([[x, y]]) + assert x.subs(it) == y + assert x.subs(Tuple((x, y))) == y + + +def test_subs_dict(): + a, b, c, d, e = symbols('a b c d e') + + assert (2*x + y + z).subs({"x": 1, "y": 2}) == 4 + z + + l = [(sin(x), 2), (x, 1)] + assert (sin(x)).subs(l) == \ + (sin(x)).subs(dict(l)) == 2 + assert sin(x).subs(reversed(l)) == sin(1) + + expr = sin(2*x) + sqrt(sin(2*x))*cos(2*x)*sin(exp(x)*x) + reps = {sin(2*x): c, + sqrt(sin(2*x)): a, + cos(2*x): b, + exp(x): e, + x: d,} + assert expr.subs(reps) == c + a*b*sin(d*e) + + l = [(x, 3), (y, x**2)] + assert (x + y).subs(l) == 3 + x**2 + assert (x + y).subs(reversed(l)) == 12 + + # If changes are made to convert lists into dictionaries and do + # a dictionary-lookup replacement, these tests will help to catch + # some logical errors that might occur + l = [(y, z + 2), (1 + z, 5), (z, 2)] + assert (y - 1 + 3*x).subs(l) == 5 + 3*x + l = [(y, z + 2), (z, 3)] + assert (y - 2).subs(l) == 3 + + +def test_no_arith_subs_on_floats(): + assert (x + 3).subs(x + 3, a) == a + assert (x + 3).subs(x + 2, a) == a + 1 + + assert (x + y + 3).subs(x + 3, a) == a + y + assert (x + y + 3).subs(x + 2, a) == a + y + 1 + + assert (x + 3.0).subs(x + 3.0, a) == a + assert (x + 3.0).subs(x + 2.0, a) == x + 3.0 + + assert (x + y + 3.0).subs(x + 3.0, a) == a + y + assert (x + y + 3.0).subs(x + 2.0, a) == x + y + 3.0 + + +def test_issue_5651(): + a, b, c, K = symbols('a b c K', commutative=True) + assert (a/(b*c)).subs(b*c, K) == a/K + assert (a/(b**2*c**3)).subs(b*c, K) == a/(c*K**2) + assert (1/(x*y)).subs(x*y, 2) == S.Half + assert ((1 + x*y)/(x*y)).subs(x*y, 1) == 2 + assert (x*y*z).subs(x*y, 2) == 2*z + assert ((1 + x*y)/(x*y)/z).subs(x*y, 1) == 2/z + + +def test_issue_6075(): + assert Tuple(1, True).subs(1, 2) == Tuple(2, True) + + +def test_issue_6079(): + # since x + 2.0 == x + 2 we can't do a simple equality test + assert _aresame((x + 2.0).subs(2, 3), x + 2.0) + assert _aresame((x + 2.0).subs(2.0, 3), x + 3) + assert not _aresame(x + 2, x + 2.0) + assert not _aresame(Basic(cos(x), S(1)), Basic(cos(x), S(1.))) + assert _aresame(cos, cos) + assert not _aresame(1, S.One) + assert not _aresame(x, symbols('x', positive=True)) + + +def test_issue_4680(): + N = Symbol('N') + assert N.subs({"N": 3}) == 3 + + +def test_issue_6158(): + assert (x - 1).subs(1, y) == x - y + assert (x - 1).subs(-1, y) == x + y + assert (x - oo).subs(oo, y) == x - y + assert (x - oo).subs(-oo, y) == x + y + + +def test_Function_subs(): + f, g, h, i = symbols('f g h i', cls=Function) + p = Piecewise((g(f(x, y)), x < -1), (g(x), x <= 1)) + assert p.subs(g, h) == Piecewise((h(f(x, y)), x < -1), (h(x), x <= 1)) + assert (f(y) + g(x)).subs({f: h, g: i}) == i(x) + h(y) + + +def test_simultaneous_subs(): + reps = {x: 0, y: 0} + assert (x/y).subs(reps) != (y/x).subs(reps) + assert (x/y).subs(reps, simultaneous=True) == \ + (y/x).subs(reps, simultaneous=True) + reps = reps.items() + assert (x/y).subs(reps) != (y/x).subs(reps) + assert (x/y).subs(reps, simultaneous=True) == \ + (y/x).subs(reps, simultaneous=True) + assert Derivative(x, y, z).subs(reps, simultaneous=True) == \ + Subs(Derivative(0, y, z), y, 0) + + +def test_issue_6419_6421(): + assert (1/(1 + x/y)).subs(x/y, x) == 1/(1 + x) + assert (-2*I).subs(2*I, x) == -x + assert (-I*x).subs(I*x, x) == -x + assert (-3*I*y**4).subs(3*I*y**2, x) == -x*y**2 + + +def test_issue_6559(): + assert (-12*x + y).subs(-x, 1) == 12 + y + # though this involves cse it generated a failure in Mul._eval_subs + x0, x1 = symbols('x0 x1') + e = -log(-12*sqrt(2) + 17)/24 - log(-2*sqrt(2) + 3)/12 + sqrt(2)/3 + # XXX modify cse so x1 is eliminated and x0 = -sqrt(2)? + assert cse(e) == ( + [(x0, sqrt(2))], [x0/3 - log(-12*x0 + 17)/24 - log(-2*x0 + 3)/12]) + + +def test_issue_5261(): + x = symbols('x', real=True) + e = I*x + assert exp(e).subs(exp(x), y) == y**I + assert (2**e).subs(2**x, y) == y**I + eq = (-2)**e + assert eq.subs((-2)**x, y) == eq + + +def test_issue_6923(): + assert (-2*x*sqrt(2)).subs(2*x, y) == -sqrt(2)*y + + +def test_2arg_hack(): + N = Symbol('N', commutative=False) + ans = Mul(2, y + 1, evaluate=False) + assert (2*x*(y + 1)).subs(x, 1, hack2=True) == ans + assert (2*(y + 1 + N)).subs(N, 0, hack2=True) == ans + + +@XFAIL +def test_mul2(): + """When this fails, remove things labelled "2-arg hack" + 1) remove special handling in the fallback of subs that + was added in the same commit as this test + 2) remove the special handling in Mul.flatten + """ + assert (2*(x + 1)).is_Mul + + +def test_noncommutative_subs(): + x,y = symbols('x,y', commutative=False) + assert (x*y*x).subs([(x, x*y), (y, x)], simultaneous=True) == (x*y*x**2*y) + + +def test_issue_2877(): + f = Float(2.0) + assert (x + f).subs({f: 2}) == x + 2 + + def r(a, b, c): + return factor(a*x**2 + b*x + c) + e = r(5.0/6, 10, 5) + assert nsimplify(e) == 5*x**2/6 + 10*x + 5 + + +def test_issue_5910(): + t = Symbol('t') + assert (1/(1 - t)).subs(t, 1) is zoo + n = t + d = t - 1 + assert (n/d).subs(t, 1) is zoo + assert (-n/-d).subs(t, 1) is zoo + + +def test_issue_5217(): + s = Symbol('s') + z = (1 - 2*x*x) + w = (1 + 2*x*x) + q = 2*x*x*2*y*y + sub = {2*x*x: s} + assert w.subs(sub) == 1 + s + assert z.subs(sub) == 1 - s + assert q == 4*x**2*y**2 + assert q.subs(sub) == 2*y**2*s + + +def test_issue_10829(): + assert (4**x).subs(2**x, y) == y**2 + assert (9**x).subs(3**x, y) == y**2 + + +def test_pow_eval_subs_no_cache(): + # Tests pull request 9376 is working + from sympy.core.cache import clear_cache + + s = 1/sqrt(x**2) + # This bug only appeared when the cache was turned off. + # We need to approximate running this test without the cache. + # This creates approximately the same situation. + clear_cache() + + # This used to fail with a wrong result. + # It incorrectly returned 1/sqrt(x**2) before this pull request. + result = s.subs(sqrt(x**2), y) + assert result == 1/y + + +def test_RootOf_issue_10092(): + x = Symbol('x', real=True) + eq = x**3 - 17*x**2 + 81*x - 118 + r = RootOf(eq, 0) + assert (x < r).subs(x, r) is S.false + + +def test_issue_8886(): + from sympy.physics.mechanics import ReferenceFrame as R + # if something can't be sympified we assume that it + # doesn't play well with SymPy and disallow the + # substitution + v = R('A').x + raises(SympifyError, lambda: x.subs(x, v)) + raises(SympifyError, lambda: v.subs(v, x)) + assert v.__eq__(x) is False + + +def test_issue_12657(): + # treat -oo like the atom that it is + reps = [(-oo, 1), (oo, 2)] + assert (x < -oo).subs(reps) == (x < 1) + assert (x < -oo).subs(list(reversed(reps))) == (x < 1) + reps = [(-oo, 2), (oo, 1)] + assert (x < oo).subs(reps) == (x < 1) + assert (x < oo).subs(list(reversed(reps))) == (x < 1) + + +def test_recurse_Application_args(): + F = Lambda((x, y), exp(2*x + 3*y)) + f = Function('f') + A = f(x, f(x, x)) + C = F(x, F(x, x)) + assert A.subs(f, F) == A.replace(f, F) == C + + +def test_Subs_subs(): + assert Subs(x*y, x, x).subs(x, y) == Subs(x*y, x, y) + assert Subs(x*y, x, x + 1).subs(x, y) == \ + Subs(x*y, x, y + 1) + assert Subs(x*y, y, x + 1).subs(x, y) == \ + Subs(y**2, y, y + 1) + a = Subs(x*y*z, (y, x, z), (x + 1, x + z, x)) + b = Subs(x*y*z, (y, x, z), (x + 1, y + z, y)) + assert a.subs(x, y) == b and \ + a.doit().subs(x, y) == a.subs(x, y).doit() + f = Function('f') + g = Function('g') + assert Subs(2*f(x, y) + g(x), f(x, y), 1).subs(y, 2) == Subs( + 2*f(x, y) + g(x), (f(x, y), y), (1, 2)) + + +def test_issue_13333(): + eq = 1/x + assert eq.subs({"x": '1/2'}) == 2 + assert eq.subs({"x": '(1/2)'}) == 2 + + +def test_issue_15234(): + x, y = symbols('x y', real=True) + p = 6*x**5 + x**4 - 4*x**3 + 4*x**2 - 2*x + 3 + p_subbed = 6*x**5 - 4*x**3 - 2*x + y**4 + 4*y**2 + 3 + assert p.subs([(x**i, y**i) for i in [2, 4]]) == p_subbed + x, y = symbols('x y', complex=True) + p = 6*x**5 + x**4 - 4*x**3 + 4*x**2 - 2*x + 3 + p_subbed = 6*x**5 - 4*x**3 - 2*x + y**4 + 4*y**2 + 3 + assert p.subs([(x**i, y**i) for i in [2, 4]]) == p_subbed + + +def test_issue_6976(): + x, y = symbols('x y') + assert (sqrt(x)**3 + sqrt(x) + x + x**2).subs(sqrt(x), y) == \ + y**4 + y**3 + y**2 + y + assert (x**4 + x**3 + x**2 + x + sqrt(x)).subs(x**2, y) == \ + sqrt(x) + x**3 + x + y**2 + y + assert x.subs(x**3, y) == x + assert x.subs(x**Rational(1, 3), y) == y**3 + + # More substitutions are possible with nonnegative symbols + x, y = symbols('x y', nonnegative=True) + assert (x**4 + x**3 + x**2 + x + sqrt(x)).subs(x**2, y) == \ + y**Rational(1, 4) + y**Rational(3, 2) + sqrt(y) + y**2 + y + assert x.subs(x**3, y) == y**Rational(1, 3) + + +def test_issue_11746(): + assert (1/x).subs(x**2, 1) == 1/x + assert (1/(x**3)).subs(x**2, 1) == x**(-3) + assert (1/(x**4)).subs(x**2, 1) == 1 + assert (1/(x**3)).subs(x**4, 1) == x**(-3) + assert (1/(y**5)).subs(x**5, 1) == y**(-5) + + +def test_issue_17823(): + from sympy.physics.mechanics import dynamicsymbols + q1, q2 = dynamicsymbols('q1, q2') + expr = q1.diff().diff()**2*q1 + q1.diff()*q2.diff() + reps={q1: a, q1.diff(): a*x*y, q1.diff().diff(): z} + assert expr.subs(reps) == a*x*y*Derivative(q2, t) + a*z**2 + + +def test_issue_19326(): + x, y = [i(t) for i in map(Function, 'xy')] + assert (x*y).subs({x: 1 + x, y: x}) == (1 + x)*x + + +def test_issue_19558(): + e = (7*x*cos(x) - 12*log(x)**3)*(-log(x)**4 + 2*sin(x) + 1)**2/ \ + (2*(x*cos(x) - 2*log(x)**3)*(3*log(x)**4 - 7*sin(x) + 3)**2) + + assert e.subs(x, oo) == AccumBounds(-oo, oo) + assert (sin(x) + cos(x)).subs(x, oo) == AccumBounds(-2, 2) + + +def test_issue_22033(): + xr = Symbol('xr', real=True) + e = (1/xr) + assert e.subs(xr**2, y) == e + + +def test_guard_against_indeterminate_evaluation(): + eq = x**y + assert eq.subs([(x, 1), (y, oo)]) == 1 # because 1**y == 1 + assert eq.subs([(y, oo), (x, 1)]) is S.NaN + assert eq.subs({x: 1, y: oo}) is S.NaN + assert eq.subs([(x, 1), (y, oo)], simultaneous=True) is S.NaN diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_symbol.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_symbol.py new file mode 100644 index 0000000000000000000000000000000000000000..acf27700825c4822456207afe95108480505ce2c --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_symbol.py @@ -0,0 +1,421 @@ +import threading + +from sympy.core.function import Function, UndefinedFunction +from sympy.core.numbers import (I, Rational, pi) +from sympy.core.relational import (GreaterThan, LessThan, StrictGreaterThan, StrictLessThan) +from sympy.core.symbol import (Dummy, Symbol, Wild, symbols) +from sympy.core.sympify import sympify # can't import as S yet +from sympy.core.symbol import uniquely_named_symbol, _symbol, Str + +from sympy.testing.pytest import raises, skip_under_pyodide +from sympy.core.symbol import disambiguate + + +def test_Str(): + a1 = Str('a') + a2 = Str('a') + b = Str('b') + assert a1 == a2 != b + raises(TypeError, lambda: Str()) + + +def test_Symbol(): + a = Symbol("a") + x1 = Symbol("x") + x2 = Symbol("x") + xdummy1 = Dummy("x") + xdummy2 = Dummy("x") + + assert a != x1 + assert a != x2 + assert x1 == x2 + assert x1 != xdummy1 + assert xdummy1 != xdummy2 + + assert Symbol("x") == Symbol("x") + assert Dummy("x") != Dummy("x") + d = symbols('d', cls=Dummy) + assert isinstance(d, Dummy) + c, d = symbols('c,d', cls=Dummy) + assert isinstance(c, Dummy) + assert isinstance(d, Dummy) + raises(TypeError, lambda: Symbol()) + + +def test_Dummy(): + assert Dummy() != Dummy() + + +def test_Dummy_force_dummy_index(): + raises(AssertionError, lambda: Dummy(dummy_index=1)) + assert Dummy('d', dummy_index=2) == Dummy('d', dummy_index=2) + assert Dummy('d1', dummy_index=2) != Dummy('d2', dummy_index=2) + d1 = Dummy('d', dummy_index=3) + d2 = Dummy('d') + # might fail if d1 were created with dummy_index >= 10**6 + assert d1 != d2 + d3 = Dummy('d', dummy_index=3) + assert d1 == d3 + assert Dummy()._count == Dummy('d', dummy_index=3)._count + + +def test_lt_gt(): + S = sympify + x, y = Symbol('x'), Symbol('y') + + assert (x >= y) == GreaterThan(x, y) + assert (x >= 0) == GreaterThan(x, 0) + assert (x <= y) == LessThan(x, y) + assert (x <= 0) == LessThan(x, 0) + + assert (0 <= x) == GreaterThan(x, 0) + assert (0 >= x) == LessThan(x, 0) + assert (S(0) >= x) == GreaterThan(0, x) + assert (S(0) <= x) == LessThan(0, x) + + assert (x > y) == StrictGreaterThan(x, y) + assert (x > 0) == StrictGreaterThan(x, 0) + assert (x < y) == StrictLessThan(x, y) + assert (x < 0) == StrictLessThan(x, 0) + + assert (0 < x) == StrictGreaterThan(x, 0) + assert (0 > x) == StrictLessThan(x, 0) + assert (S(0) > x) == StrictGreaterThan(0, x) + assert (S(0) < x) == StrictLessThan(0, x) + + e = x**2 + 4*x + 1 + assert (e >= 0) == GreaterThan(e, 0) + assert (0 <= e) == GreaterThan(e, 0) + assert (e > 0) == StrictGreaterThan(e, 0) + assert (0 < e) == StrictGreaterThan(e, 0) + + assert (e <= 0) == LessThan(e, 0) + assert (0 >= e) == LessThan(e, 0) + assert (e < 0) == StrictLessThan(e, 0) + assert (0 > e) == StrictLessThan(e, 0) + + assert (S(0) >= e) == GreaterThan(0, e) + assert (S(0) <= e) == LessThan(0, e) + assert (S(0) < e) == StrictLessThan(0, e) + assert (S(0) > e) == StrictGreaterThan(0, e) + + +def test_no_len(): + # there should be no len for numbers + x = Symbol('x') + raises(TypeError, lambda: len(x)) + + +def test_ineq_unequal(): + S = sympify + x, y, z = symbols('x,y,z') + + e = ( + S(-1) >= x, S(-1) >= y, S(-1) >= z, + S(-1) > x, S(-1) > y, S(-1) > z, + S(-1) <= x, S(-1) <= y, S(-1) <= z, + S(-1) < x, S(-1) < y, S(-1) < z, + S(0) >= x, S(0) >= y, S(0) >= z, + S(0) > x, S(0) > y, S(0) > z, + S(0) <= x, S(0) <= y, S(0) <= z, + S(0) < x, S(0) < y, S(0) < z, + S('3/7') >= x, S('3/7') >= y, S('3/7') >= z, + S('3/7') > x, S('3/7') > y, S('3/7') > z, + S('3/7') <= x, S('3/7') <= y, S('3/7') <= z, + S('3/7') < x, S('3/7') < y, S('3/7') < z, + S(1.5) >= x, S(1.5) >= y, S(1.5) >= z, + S(1.5) > x, S(1.5) > y, S(1.5) > z, + S(1.5) <= x, S(1.5) <= y, S(1.5) <= z, + S(1.5) < x, S(1.5) < y, S(1.5) < z, + S(2) >= x, S(2) >= y, S(2) >= z, + S(2) > x, S(2) > y, S(2) > z, + S(2) <= x, S(2) <= y, S(2) <= z, + S(2) < x, S(2) < y, S(2) < z, + x >= -1, y >= -1, z >= -1, + x > -1, y > -1, z > -1, + x <= -1, y <= -1, z <= -1, + x < -1, y < -1, z < -1, + x >= 0, y >= 0, z >= 0, + x > 0, y > 0, z > 0, + x <= 0, y <= 0, z <= 0, + x < 0, y < 0, z < 0, + x >= 1.5, y >= 1.5, z >= 1.5, + x > 1.5, y > 1.5, z > 1.5, + x <= 1.5, y <= 1.5, z <= 1.5, + x < 1.5, y < 1.5, z < 1.5, + x >= 2, y >= 2, z >= 2, + x > 2, y > 2, z > 2, + x <= 2, y <= 2, z <= 2, + x < 2, y < 2, z < 2, + + x >= y, x >= z, y >= x, y >= z, z >= x, z >= y, + x > y, x > z, y > x, y > z, z > x, z > y, + x <= y, x <= z, y <= x, y <= z, z <= x, z <= y, + x < y, x < z, y < x, y < z, z < x, z < y, + + x - pi >= y + z, y - pi >= x + z, z - pi >= x + y, + x - pi > y + z, y - pi > x + z, z - pi > x + y, + x - pi <= y + z, y - pi <= x + z, z - pi <= x + y, + x - pi < y + z, y - pi < x + z, z - pi < x + y, + True, False + ) + + left_e = e[:-1] + for i, e1 in enumerate( left_e ): + for e2 in e[i + 1:]: + assert e1 != e2 + + +def test_Wild_properties(): + S = sympify + # these tests only include Atoms + x = Symbol("x") + y = Symbol("y") + p = Symbol("p", positive=True) + k = Symbol("k", integer=True) + n = Symbol("n", integer=True, positive=True) + + given_patterns = [ x, y, p, k, -k, n, -n, S(-3), S(3), + pi, Rational(3, 2), I ] + + integerp = lambda k: k.is_integer + positivep = lambda k: k.is_positive + symbolp = lambda k: k.is_Symbol + realp = lambda k: k.is_extended_real + + S = Wild("S", properties=[symbolp]) + R = Wild("R", properties=[realp]) + Y = Wild("Y", exclude=[x, p, k, n]) + P = Wild("P", properties=[positivep]) + K = Wild("K", properties=[integerp]) + N = Wild("N", properties=[positivep, integerp]) + + given_wildcards = [ S, R, Y, P, K, N ] + + goodmatch = { + S: (x, y, p, k, n), + R: (p, k, -k, n, -n, -3, 3, pi, Rational(3, 2)), + Y: (y, -3, 3, pi, Rational(3, 2), I ), + P: (p, n, 3, pi, Rational(3, 2)), + K: (k, -k, n, -n, -3, 3), + N: (n, 3)} + + for A in given_wildcards: + for pat in given_patterns: + d = pat.match(A) + if pat in goodmatch[A]: + assert d[A] in goodmatch[A] + else: + assert d is None + + +def test_symbols(): + x = Symbol('x') + y = Symbol('y') + z = Symbol('z') + + assert symbols('x') == x + assert symbols('x ') == x + assert symbols(' x ') == x + assert symbols('x,') == (x,) + assert symbols('x, ') == (x,) + assert symbols('x ,') == (x,) + + assert symbols('x , y') == (x, y) + + assert symbols('x,y,z') == (x, y, z) + assert symbols('x y z') == (x, y, z) + + assert symbols('x,y,z,') == (x, y, z) + assert symbols('x y z ') == (x, y, z) + + xyz = Symbol('xyz') + abc = Symbol('abc') + + assert symbols('xyz') == xyz + assert symbols('xyz,') == (xyz,) + assert symbols('xyz,abc') == (xyz, abc) + + assert symbols(('xyz',)) == (xyz,) + assert symbols(('xyz,',)) == ((xyz,),) + assert symbols(('x,y,z,',)) == ((x, y, z),) + assert symbols(('xyz', 'abc')) == (xyz, abc) + assert symbols(('xyz,abc',)) == ((xyz, abc),) + assert symbols(('xyz,abc', 'x,y,z')) == ((xyz, abc), (x, y, z)) + + assert symbols(('x', 'y', 'z')) == (x, y, z) + assert symbols(['x', 'y', 'z']) == [x, y, z] + assert symbols({'x', 'y', 'z'}) == {x, y, z} + + raises(ValueError, lambda: symbols('')) + raises(ValueError, lambda: symbols(',')) + raises(ValueError, lambda: symbols('x,,y,,z')) + raises(ValueError, lambda: symbols(('x', '', 'y', '', 'z'))) + + a, b = symbols('x,y', real=True) + assert a.is_real and b.is_real + + x0 = Symbol('x0') + x1 = Symbol('x1') + x2 = Symbol('x2') + + y0 = Symbol('y0') + y1 = Symbol('y1') + + assert symbols('x0:0') == () + assert symbols('x0:1') == (x0,) + assert symbols('x0:2') == (x0, x1) + assert symbols('x0:3') == (x0, x1, x2) + + assert symbols('x:0') == () + assert symbols('x:1') == (x0,) + assert symbols('x:2') == (x0, x1) + assert symbols('x:3') == (x0, x1, x2) + + assert symbols('x1:1') == () + assert symbols('x1:2') == (x1,) + assert symbols('x1:3') == (x1, x2) + + assert symbols('x1:3,x,y,z') == (x1, x2, x, y, z) + + assert symbols('x:3,y:2') == (x0, x1, x2, y0, y1) + assert symbols(('x:3', 'y:2')) == ((x0, x1, x2), (y0, y1)) + + a = Symbol('a') + b = Symbol('b') + c = Symbol('c') + d = Symbol('d') + + assert symbols('x:z') == (x, y, z) + assert symbols('a:d,x:z') == (a, b, c, d, x, y, z) + assert symbols(('a:d', 'x:z')) == ((a, b, c, d), (x, y, z)) + + aa = Symbol('aa') + ab = Symbol('ab') + ac = Symbol('ac') + ad = Symbol('ad') + + assert symbols('aa:d') == (aa, ab, ac, ad) + assert symbols('aa:d,x:z') == (aa, ab, ac, ad, x, y, z) + assert symbols(('aa:d','x:z')) == ((aa, ab, ac, ad), (x, y, z)) + + assert type(symbols(('q:2', 'u:2'), cls=Function)[0][0]) == UndefinedFunction # issue 23532 + + # issue 6675 + def sym(s): + return str(symbols(s)) + assert sym('a0:4') == '(a0, a1, a2, a3)' + assert sym('a2:4,b1:3') == '(a2, a3, b1, b2)' + assert sym('a1(2:4)') == '(a12, a13)' + assert sym('a0:2.0:2') == '(a0.0, a0.1, a1.0, a1.1)' + assert sym('aa:cz') == '(aaz, abz, acz)' + assert sym('aa:c0:2') == '(aa0, aa1, ab0, ab1, ac0, ac1)' + assert sym('aa:ba:b') == '(aaa, aab, aba, abb)' + assert sym('a:3b') == '(a0b, a1b, a2b)' + assert sym('a-1:3b') == '(a-1b, a-2b)' + assert sym(r'a:2\,:2' + chr(0)) == '(a0,0%s, a0,1%s, a1,0%s, a1,1%s)' % ( + (chr(0),)*4) + assert sym('x(:a:3)') == '(x(a0), x(a1), x(a2))' + assert sym('x(:c):1') == '(xa0, xb0, xc0)' + assert sym('x((:a)):3') == '(x(a)0, x(a)1, x(a)2)' + assert sym('x(:a:3') == '(x(a0, x(a1, x(a2)' + assert sym(':2') == '(0, 1)' + assert sym(':b') == '(a, b)' + assert sym(':b:2') == '(a0, a1, b0, b1)' + assert sym(':2:2') == '(00, 01, 10, 11)' + assert sym(':b:b') == '(aa, ab, ba, bb)' + + raises(ValueError, lambda: symbols(':')) + raises(ValueError, lambda: symbols('a:')) + raises(ValueError, lambda: symbols('::')) + raises(ValueError, lambda: symbols('a::')) + raises(ValueError, lambda: symbols(':a:')) + raises(ValueError, lambda: symbols('::a')) + + +def test_symbols_become_functions_issue_3539(): + from sympy.abc import alpha, phi, beta, t + raises(TypeError, lambda: beta(2)) + raises(TypeError, lambda: beta(2.5)) + raises(TypeError, lambda: phi(2.5)) + raises(TypeError, lambda: alpha(2.5)) + raises(TypeError, lambda: phi(t)) + + +def test_unicode(): + xu = Symbol('x') + x = Symbol('x') + assert x == xu + + raises(TypeError, lambda: Symbol(1)) + + +def test_uniquely_named_symbol_and_Symbol(): + F = uniquely_named_symbol + x = Symbol('x') + assert F(x) == x + assert F('x') == x + assert str(F('x', x)) == 'x0' + assert str(F('x', (x + 1, 1/x))) == 'x0' + _x = Symbol('x', real=True) + assert F(('x', _x)) == _x + assert F((x, _x)) == _x + assert F('x', real=True).is_real + y = Symbol('y') + assert F(('x', y), real=True).is_real + r = Symbol('x', real=True) + assert F(('x', r)).is_real + assert F(('x', r), real=False).is_real + assert F('x1', Symbol('x1'), + compare=lambda i: str(i).rstrip('1')).name == 'x0' + assert F('x1', Symbol('x1'), + modify=lambda i: i + '_').name == 'x1_' + assert _symbol(x, _x) == x + + +def test_disambiguate(): + x, y, y_1, _x, x_1, x_2 = symbols('x y y_1 _x x_1 x_2') + t1 = Dummy('y'), _x, Dummy('x'), Dummy('x') + t2 = Dummy('x'), Dummy('x') + t3 = Dummy('x'), Dummy('y') + t4 = x, Dummy('x') + t5 = Symbol('x', integer=True), x, Symbol('x_1') + + assert disambiguate(*t1) == (y, x_2, x, x_1) + assert disambiguate(*t2) == (x, x_1) + assert disambiguate(*t3) == (x, y) + assert disambiguate(*t4) == (x_1, x) + assert disambiguate(*t5) == (t5[0], x_2, x_1) + assert disambiguate(*t5)[0] != x # assumptions are retained + + t6 = _x, Dummy('x')/y + t7 = y*Dummy('y'), y + + assert disambiguate(*t6) == (x_1, x/y) + assert disambiguate(*t7) == (y*y_1, y_1) + assert disambiguate(Dummy('x_1'), Dummy('x_1') + ) == (x_1, Symbol('x_1_1')) + + +@skip_under_pyodide("Cannot create threads under pyodide.") +def test_issue_gh_16734(): + # https://github.com/sympy/sympy/issues/16734 + + syms = list(symbols('x, y')) + + def thread1(): + for n in range(1000): + syms[0], syms[1] = symbols(f'x{n}, y{n}') + syms[0].is_positive # Check an assumption in this thread. + syms[0] = None + + def thread2(): + while syms[0] is not None: + # Compare the symbol in this thread. + result = (syms[0] == syms[1]) # noqa + + # Previously this would be very likely to raise an exception: + thread = threading.Thread(target=thread1) + thread.start() + thread2() + thread.join() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_sympify.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_sympify.py new file mode 100644 index 0000000000000000000000000000000000000000..40be30c25d5826ceadde6d176c160a0090967659 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_sympify.py @@ -0,0 +1,892 @@ +from sympy.core.add import Add +from sympy.core.containers import Tuple +from sympy.core.function import (Function, Lambda) +from sympy.core.mul import Mul +from sympy.core.numbers import (Float, I, Integer, Rational, pi, oo) +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.elementary.complexes import Abs +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.logic.boolalg import (false, Or, true, Xor) +from sympy.matrices.dense import Matrix +from sympy.parsing.sympy_parser import null +from sympy.polys.polytools import Poly +from sympy.printing.repr import srepr +from sympy.sets.fancysets import Range +from sympy.sets.sets import Interval +from sympy.abc import x, y +from sympy.core.sympify import (sympify, _sympify, SympifyError, kernS, + CantSympify, converter) +from sympy.core.decorators import _sympifyit +from sympy.external import import_module +from sympy.testing.pytest import raises, XFAIL, skip +from sympy.utilities.decorator import conserve_mpmath_dps +from sympy.geometry import Point, Line +from sympy.functions.combinatorial.factorials import factorial, factorial2 +from sympy.abc import _clash, _clash1, _clash2 +from sympy.external.gmpy import gmpy as _gmpy, flint as _flint +from sympy.sets import FiniteSet, EmptySet +from sympy.tensor.array.dense_ndim_array import ImmutableDenseNDimArray + +import mpmath +from collections import defaultdict, OrderedDict + + +numpy = import_module('numpy') + + +def test_issue_3538(): + v = sympify("exp(x)") + assert v == exp(x) + assert type(v) == type(exp(x)) + assert str(type(v)) == str(type(exp(x))) + + +def test_sympify1(): + assert sympify("x") == Symbol("x") + assert sympify(" x") == Symbol("x") + assert sympify(" x ") == Symbol("x") + # issue 4877 + assert sympify('--.5') == 0.5 + assert sympify('-1/2') == -S.Half + assert sympify('-+--.5') == -0.5 + assert sympify('-.[3]') == Rational(-1, 3) + assert sympify('.[3]') == Rational(1, 3) + assert sympify('+.[3]') == Rational(1, 3) + assert sympify('+0.[3]*10**-2') == Rational(1, 300) + assert sympify('.[052631578947368421]') == Rational(1, 19) + assert sympify('.0[526315789473684210]') == Rational(1, 19) + assert sympify('.034[56]') == Rational(1711, 49500) + # options to make reals into rationals + assert sympify('1.22[345]', rational=True) == \ + 1 + Rational(22, 100) + Rational(345, 99900) + assert sympify('2/2.6', rational=True) == Rational(10, 13) + assert sympify('2.6/2', rational=True) == Rational(13, 10) + assert sympify('2.6e2/17', rational=True) == Rational(260, 17) + assert sympify('2.6e+2/17', rational=True) == Rational(260, 17) + assert sympify('2.6e-2/17', rational=True) == Rational(26, 17000) + assert sympify('2.1+3/4', rational=True) == \ + Rational(21, 10) + Rational(3, 4) + assert sympify('2.234456', rational=True) == Rational(279307, 125000) + assert sympify('2.234456e23', rational=True) == 223445600000000000000000 + assert sympify('2.234456e-23', rational=True) == \ + Rational(279307, 12500000000000000000000000000) + assert sympify('-2.234456e-23', rational=True) == \ + Rational(-279307, 12500000000000000000000000000) + assert sympify('12345678901/17', rational=True) == \ + Rational(12345678901, 17) + assert sympify('1/.3 + x', rational=True) == Rational(10, 3) + x + # make sure longs in fractions work + assert sympify('222222222222/11111111111') == \ + Rational(222222222222, 11111111111) + # ... even if they come from repetend notation + assert sympify('1/.2[123456789012]') == Rational(333333333333, 70781892967) + # ... or from high precision reals + assert sympify('.1234567890123456', rational=True) == \ + Rational(19290123283179, 156250000000000) + + +def test_sympify_Fraction(): + try: + import fractions + except ImportError: + pass + else: + value = sympify(fractions.Fraction(101, 127)) + assert value == Rational(101, 127) and type(value) is Rational + + +def test_sympify_gmpy(): + if _gmpy is not None: + import gmpy2 + + value = sympify(gmpy2.mpz(1000001)) + assert value == Integer(1000001) and type(value) is Integer + + value = sympify(gmpy2.mpq(101, 127)) + assert value == Rational(101, 127) and type(value) is Rational + + +def test_sympify_flint(): + if _flint is not None: + import flint + + value = sympify(flint.fmpz(1000001)) + assert value == Integer(1000001) and type(value) is Integer + + value = sympify(flint.fmpq(101, 127)) + assert value == Rational(101, 127) and type(value) is Rational + + +@conserve_mpmath_dps +def test_sympify_mpmath(): + value = sympify(mpmath.mpf(1.0)) + assert value == Float(1.0) and type(value) is Float + + mpmath.mp.dps = 12 + assert sympify( + mpmath.pi).epsilon_eq(Float("3.14159265359"), Float("1e-12")) == True + assert sympify( + mpmath.pi).epsilon_eq(Float("3.14159265359"), Float("1e-13")) == False + + mpmath.mp.dps = 6 + assert sympify( + mpmath.pi).epsilon_eq(Float("3.14159"), Float("1e-5")) == True + assert sympify( + mpmath.pi).epsilon_eq(Float("3.14159"), Float("1e-6")) == False + + mpmath.mp.dps = 15 + assert sympify(mpmath.mpc(1.0 + 2.0j)) == Float(1.0) + Float(2.0)*I + + +def test_sympify2(): + class A: + def _sympy_(self): + return Symbol("x")**3 + + a = A() + + assert _sympify(a) == x**3 + assert sympify(a) == x**3 + assert a == x**3 + + +def test_sympify3(): + assert sympify("x**3") == x**3 + assert sympify("x^3") == x**3 + assert sympify("1/2") == Integer(1)/2 + + raises(SympifyError, lambda: _sympify('x**3')) + raises(SympifyError, lambda: _sympify('1/2')) + + +def test_sympify_keywords(): + raises(SympifyError, lambda: sympify('if')) + raises(SympifyError, lambda: sympify('for')) + raises(SympifyError, lambda: sympify('while')) + raises(SympifyError, lambda: sympify('lambda')) + + +def test_sympify_float(): + assert sympify("1e-64") != 0 + assert sympify("1e-20000") != 0 + + +def test_sympify_bool(): + assert sympify(True) is true + assert sympify(False) is false + + +def test_sympify_iterables(): + ans = [Rational(3, 10), Rational(1, 5)] + assert sympify(['.3', '.2'], rational=True) == ans + assert sympify({"x": 0, "y": 1}) == {x: 0, y: 1} + assert sympify(['1', '2', ['3', '4']]) == [S(1), S(2), [S(3), S(4)]] + + +@XFAIL +def test_issue_16772(): + # because there is a converter for tuple, the + # args are only sympified without the flags being passed + # along; list, on the other hand, is not converted + # with a converter so its args are traversed later + ans = [Rational(3, 10), Rational(1, 5)] + assert sympify(('.3', '.2'), rational=True) == Tuple(*ans) + + +def test_issue_16859(): + class no(float, CantSympify): + pass + raises(SympifyError, lambda: sympify(no(1.2))) + + +def test_sympify4(): + class A: + def _sympy_(self): + return Symbol("x") + + a = A() + + assert _sympify(a)**3 == x**3 + assert sympify(a)**3 == x**3 + assert a == x + + +def test_sympify_text(): + assert sympify('some') == Symbol('some') + assert sympify('core') == Symbol('core') + + assert sympify('True') is True + assert sympify('False') is False + + assert sympify('Poly') == Poly + assert sympify('sin') == sin + + +def test_sympify_function(): + assert sympify('factor(x**2-1, x)') == -(1 - x)*(x + 1) + assert sympify('sin(pi/2)*cos(pi)') == -Integer(1) + + +def test_sympify_poly(): + p = Poly(x**2 + x + 1, x) + + assert _sympify(p) is p + assert sympify(p) is p + + +def test_sympify_factorial(): + assert sympify('x!') == factorial(x) + assert sympify('(x+1)!') == factorial(x + 1) + assert sympify('(1 + y*(x + 1))!') == factorial(1 + y*(x + 1)) + assert sympify('(1 + y*(x + 1)!)^2') == (1 + y*factorial(x + 1))**2 + assert sympify('y*x!') == y*factorial(x) + assert sympify('x!!') == factorial2(x) + assert sympify('(x+1)!!') == factorial2(x + 1) + assert sympify('(1 + y*(x + 1))!!') == factorial2(1 + y*(x + 1)) + assert sympify('(1 + y*(x + 1)!!)^2') == (1 + y*factorial2(x + 1))**2 + assert sympify('y*x!!') == y*factorial2(x) + assert sympify('factorial2(x)!') == factorial(factorial2(x)) + + raises(SympifyError, lambda: sympify("+!!")) + raises(SympifyError, lambda: sympify(")!!")) + raises(SympifyError, lambda: sympify("!")) + raises(SympifyError, lambda: sympify("(!)")) + raises(SympifyError, lambda: sympify("x!!!")) + + +def test_issue_3595(): + assert sympify("a_") == Symbol("a_") + assert sympify("_a") == Symbol("_a") + + +def test_lambda(): + x = Symbol('x') + assert sympify('lambda: 1') == Lambda((), 1) + assert sympify('lambda x: x') == Lambda(x, x) + assert sympify('lambda x: 2*x') == Lambda(x, 2*x) + assert sympify('lambda x, y: 2*x+y') == Lambda((x, y), 2*x + y) + + +def test_lambda_raises(): + raises(SympifyError, lambda: sympify("lambda *args: args")) # args argument error + raises(SympifyError, lambda: sympify("lambda **kwargs: kwargs[0]")) # kwargs argument error + raises(SympifyError, lambda: sympify("lambda x = 1: x")) # Keyword argument error + with raises(SympifyError): + _sympify('lambda: 1') + + +def test_sympify_raises(): + raises(SympifyError, lambda: sympify("fx)")) + + class A: + def __str__(self): + return 'x' + + raises(SympifyError, lambda: sympify(A())) + + +def test__sympify(): + x = Symbol('x') + f = Function('f') + + # positive _sympify + assert _sympify(x) is x + assert _sympify(1) == Integer(1) + assert _sympify(0.5) == Float("0.5") + assert _sympify(1 + 1j) == 1.0 + I*1.0 + + # Function f is not Basic and can't sympify to Basic. We allow it to pass + # with sympify but not with _sympify. + # https://github.com/sympy/sympy/issues/20124 + assert sympify(f) is f + raises(SympifyError, lambda: _sympify(f)) + + class A: + def _sympy_(self): + return Integer(5) + + a = A() + assert _sympify(a) == Integer(5) + + # negative _sympify + raises(SympifyError, lambda: _sympify('1')) + raises(SympifyError, lambda: _sympify([1, 2, 3])) + + +def test_sympifyit(): + x = Symbol('x') + y = Symbol('y') + + @_sympifyit('b', NotImplemented) + def add(a, b): + return a + b + + assert add(x, 1) == x + 1 + assert add(x, 0.5) == x + Float('0.5') + assert add(x, y) == x + y + + assert add(x, '1') == NotImplemented + + @_sympifyit('b') + def add_raises(a, b): + return a + b + + assert add_raises(x, 1) == x + 1 + assert add_raises(x, 0.5) == x + Float('0.5') + assert add_raises(x, y) == x + y + + raises(SympifyError, lambda: add_raises(x, '1')) + + +def test_int_float(): + class F1_1: + def __float__(self): + return 1.1 + + class F1_1b: + """ + This class is still a float, even though it also implements __int__(). + """ + def __float__(self): + return 1.1 + + def __int__(self): + return 1 + + class F1_1c: + """ + This class is still a float, because it implements _sympy_() + """ + def __float__(self): + return 1.1 + + def __int__(self): + return 1 + + def _sympy_(self): + return Float(1.1) + + class I5: + def __int__(self): + return 5 + + class I5b: + """ + This class implements both __int__() and __float__(), so it will be + treated as Float in SymPy. One could change this behavior, by using + float(a) == int(a), but deciding that integer-valued floats represent + exact numbers is arbitrary and often not correct, so we do not do it. + If, in the future, we decide to do it anyway, the tests for I5b need to + be changed. + """ + def __float__(self): + return 5.0 + + def __int__(self): + return 5 + + class I5c: + """ + This class implements both __int__() and __float__(), but also + a _sympy_() method, so it will be Integer. + """ + def __float__(self): + return 5.0 + + def __int__(self): + return 5 + + def _sympy_(self): + return Integer(5) + + i5 = I5() + i5b = I5b() + i5c = I5c() + f1_1 = F1_1() + f1_1b = F1_1b() + f1_1c = F1_1c() + assert sympify(i5) == 5 + assert isinstance(sympify(i5), Integer) + assert sympify(i5b) == 5.0 + assert isinstance(sympify(i5b), Float) + assert sympify(i5c) == 5 + assert isinstance(sympify(i5c), Integer) + assert abs(sympify(f1_1) - 1.1) < 1e-5 + assert abs(sympify(f1_1b) - 1.1) < 1e-5 + assert abs(sympify(f1_1c) - 1.1) < 1e-5 + + assert _sympify(i5) == 5 + assert isinstance(_sympify(i5), Integer) + assert _sympify(i5b) == 5.0 + assert isinstance(_sympify(i5b), Float) + assert _sympify(i5c) == 5 + assert isinstance(_sympify(i5c), Integer) + assert abs(_sympify(f1_1) - 1.1) < 1e-5 + assert abs(_sympify(f1_1b) - 1.1) < 1e-5 + assert abs(_sympify(f1_1c) - 1.1) < 1e-5 + + +def test_evaluate_false(): + cases = { + '2 + 3': Add(2, 3, evaluate=False), + '2**2 / 3': Mul(Pow(2, 2, evaluate=False), Pow(3, -1, evaluate=False), evaluate=False), + '2 + 3 * 5': Add(2, Mul(3, 5, evaluate=False), evaluate=False), + '2 - 3 * 5': Add(2, Mul(-1, Mul(3, 5,evaluate=False), evaluate=False), evaluate=False), + '1 / 3': Mul(1, Pow(3, -1, evaluate=False), evaluate=False), + 'True | False': Or(True, False, evaluate=False), + '1 + 2 + 3 + 5*3 + integrate(x)': Add(1, 2, 3, Mul(5, 3, evaluate=False), x**2/2, evaluate=False), + '2 * 4 * 6 + 8': Add(Mul(2, 4, 6, evaluate=False), 8, evaluate=False), + '2 - 8 / 4': Add(2, Mul(-1, Mul(8, Pow(4, -1, evaluate=False), evaluate=False), evaluate=False), evaluate=False), + '2 - 2**2': Add(2, Mul(-1, Pow(2, 2, evaluate=False), evaluate=False), evaluate=False), + } + for case, result in cases.items(): + assert sympify(case, evaluate=False) == result + + +def test_issue_4133(): + a = sympify('Integer(4)') + + assert a == Integer(4) + assert a.is_Integer + + +def test_issue_3982(): + a = [3, 2.0] + assert sympify(a) == [Integer(3), Float(2.0)] + assert sympify(tuple(a)) == Tuple(Integer(3), Float(2.0)) + assert sympify(set(a)) == FiniteSet(Integer(3), Float(2.0)) + + +def test_S_sympify(): + assert S(1)/2 == sympify(1)/2 == S.Half + assert (-2)**(S(1)/2) == sqrt(2)*I + + +def test_issue_4788(): + assert srepr(S(1.0 + 0J)) == srepr(S(1.0)) == srepr(Float(1.0)) + + +def test_issue_4798_None(): + assert S(None) is None + + +def test_issue_3218(): + assert sympify("x+\ny") == x + y + +def test_issue_19399(): + if not numpy: + skip("numpy not installed.") + + a = numpy.array(Rational(1, 2)) + b = Rational(1, 3) + assert (a * b, type(a * b)) == (b * a, type(b * a)) + + +def test_issue_4988_builtins(): + C = Symbol('C') + vars = {'C': C} + exp1 = sympify('C') + assert exp1 == C # Make sure it did not get mixed up with sympy.C + + exp2 = sympify('C', vars) + assert exp2 == C # Make sure it did not get mixed up with sympy.C + + +def test_geometry(): + p = sympify(Point(0, 1)) + assert p == Point(0, 1) and isinstance(p, Point) + L = sympify(Line(p, (1, 0))) + assert L == Line((0, 1), (1, 0)) and isinstance(L, Line) + + +def test_kernS(): + s = '-1 - 2*(-(-x + 1/x)/(x*(x - 1/x)**2) - 1/(x*(x - 1/x)))' + # when 1497 is fixed, this no longer should pass: the expression + # should be unchanged + assert -1 - 2*(-(-x + 1/x)/(x*(x - 1/x)**2) - 1/(x*(x - 1/x))) == -1 + # sympification should not allow the constant to enter a Mul + # or else the structure can change dramatically + ss = kernS(s) + assert ss != -1 and ss.simplify() == -1 + s = '-1 - 2*(-(-x + 1/x)/(x*(x - 1/x)**2) - 1/(x*(x - 1/x)))'.replace( + 'x', '_kern') + ss = kernS(s) + assert ss != -1 and ss.simplify() == -1 + # issue 6687 + assert (kernS('Interval(-1,-2 - 4*(-3))') + == Interval(-1, Add(-2, Mul(12, 1, evaluate=False), evaluate=False))) + assert kernS('_kern') == Symbol('_kern') + assert kernS('E**-(x)') == exp(-x) + e = 2*(x + y)*y + assert kernS(['2*(x + y)*y', ('2*(x + y)*y',)]) == [e, (e,)] + assert kernS('-(2*sin(x)**2 + 2*sin(x)*cos(x))*y/2') == \ + -y*(2*sin(x)**2 + 2*sin(x)*cos(x))/2 + # issue 15132 + assert kernS('(1 - x)/(1 - x*(1-y))') == kernS('(1-x)/(1-(1-y)*x)') + assert kernS('(1-2**-(4+1)*(1-y)*x)') == (1 - x*(1 - y)/32) + assert kernS('(1-2**(4+1)*(1-y)*x)') == (1 - 32*x*(1 - y)) + assert kernS('(1-2.*(1-y)*x)') == 1 - 2.*x*(1 - y) + one = kernS('x - (x - 1)') + assert one != 1 and one.expand() == 1 + assert kernS("(2*x)/(x-1)") == 2*x/(x-1) + + +def test_issue_6540_6552(): + assert S('[[1/3,2], (2/5,)]') == [[Rational(1, 3), 2], (Rational(2, 5),)] + assert S('[[2/6,2], (2/4,)]') == [[Rational(1, 3), 2], (S.Half,)] + assert S('[[[2*(1)]]]') == [[[2]]] + assert S('Matrix([2*(1)])') == Matrix([2]) + + +def test_issue_6046(): + assert str(S("Q & C", locals=_clash1)) == 'C & Q' + assert str(S('pi(x)', locals=_clash2)) == 'pi(x)' + locals = {} + exec("from sympy.abc import Q, C", locals) + assert str(S('C&Q', locals)) == 'C & Q' + # clash can act as Symbol or Function + assert str(S('pi(C, Q)', locals=_clash)) == 'pi(C, Q)' + assert len(S('pi + x', locals=_clash2).free_symbols) == 2 + # but not both + raises(TypeError, lambda: S('pi + pi(x)', locals=_clash2)) + assert all(set(i.values()) == {null} for i in ( + _clash, _clash1, _clash2)) + + +def test_issue_8821_highprec_from_str(): + s = str(pi.evalf(128)) + p = sympify(s) + assert Abs(sin(p)) < 1e-127 + + +def test_issue_10295(): + if not numpy: + skip("numpy not installed.") + + A = numpy.array([[1, 3, -1], + [0, 1, 7]]) + sA = S(A) + assert sA.shape == (2, 3) + for (ri, ci), val in numpy.ndenumerate(A): + assert sA[ri, ci] == val + + B = numpy.array([-7, x, 3*y**2]) + sB = S(B) + assert sB.shape == (3,) + assert B[0] == sB[0] == -7 + assert B[1] == sB[1] == x + assert B[2] == sB[2] == 3*y**2 + + C = numpy.arange(0, 24) + C.resize(2,3,4) + sC = S(C) + assert sC[0, 0, 0].is_integer + assert sC[0, 0, 0] == 0 + + a1 = numpy.array([1, 2, 3]) + a2 = numpy.array(list(range(24))) + a2.resize(2, 4, 3) + assert sympify(a1) == ImmutableDenseNDimArray([1, 2, 3]) + assert sympify(a2) == ImmutableDenseNDimArray(list(range(24)), (2, 4, 3)) + + +def test_Range(): + # Only works in Python 3 where range returns a range type + assert sympify(range(10)) == Range(10) + assert _sympify(range(10)) == Range(10) + + +def test_sympify_set(): + n = Symbol('n') + assert sympify({n}) == FiniteSet(n) + assert sympify(set()) == EmptySet + + +def test_sympify_numpy(): + if not numpy: + skip('numpy not installed. Abort numpy tests.') + np = numpy + + def equal(x, y): + return x == y and type(x) == type(y) + + assert sympify(np.bool_(1)) is S(True) + try: + assert equal( + sympify(np.int_(1234567891234567891)), S(1234567891234567891)) + assert equal( + sympify(np.intp(1234567891234567891)), S(1234567891234567891)) + except OverflowError: + # May fail on 32-bit systems: Python int too large to convert to C long + pass + assert equal(sympify(np.intc(1234567891)), S(1234567891)) + assert equal(sympify(np.int8(-123)), S(-123)) + assert equal(sympify(np.int16(-12345)), S(-12345)) + assert equal(sympify(np.int32(-1234567891)), S(-1234567891)) + assert equal( + sympify(np.int64(-1234567891234567891)), S(-1234567891234567891)) + assert equal(sympify(np.uint8(123)), S(123)) + assert equal(sympify(np.uint16(12345)), S(12345)) + assert equal(sympify(np.uint32(1234567891)), S(1234567891)) + assert equal( + sympify(np.uint64(1234567891234567891)), S(1234567891234567891)) + assert equal(sympify(np.float32(1.123456)), Float(1.123456, precision=24)) + assert equal(sympify(np.float64(1.1234567891234)), + Float(1.1234567891234, precision=53)) + + # The exact precision of np.longdouble, npfloat128 and other extended + # precision dtypes is platform dependent. + ldprec = np.finfo(np.longdouble(1)).nmant + 1 + assert equal(sympify(np.longdouble(1.123456789)), + Float(1.123456789, precision=ldprec)) + + assert equal(sympify(np.complex64(1 + 2j)), S(1.0 + 2.0*I)) + assert equal(sympify(np.complex128(1 + 2j)), S(1.0 + 2.0*I)) + + lcprec = np.finfo(np.clongdouble(1)).nmant + 1 + assert equal(sympify(np.clongdouble(1 + 2j)), + Float(1.0, precision=lcprec) + Float(2.0, precision=lcprec)*I) + + #float96 does not exist on all platforms + if hasattr(np, 'float96'): + f96prec = np.finfo(np.float96(1)).nmant + 1 + assert equal(sympify(np.float96(1.123456789)), + Float(1.123456789, precision=f96prec)) + + #float128 does not exist on all platforms + if hasattr(np, 'float128'): + f128prec = np.finfo(np.float128(1)).nmant + 1 + assert equal(sympify(np.float128(1.123456789123)), + Float(1.123456789123, precision=f128prec)) + + +@XFAIL +def test_sympify_rational_numbers_set(): + ans = [Rational(3, 10), Rational(1, 5)] + assert sympify({'.3', '.2'}, rational=True) == FiniteSet(*ans) + + +def test_sympify_mro(): + """Tests the resolution order for classes that implement _sympy_""" + class a: + def _sympy_(self): + return Integer(1) + class b(a): + def _sympy_(self): + return Integer(2) + class c(a): + pass + + assert sympify(a()) == Integer(1) + assert sympify(b()) == Integer(2) + assert sympify(c()) == Integer(1) + + +def test_sympify_converter(): + """Tests the resolution order for classes in converter""" + class a: + pass + class b(a): + pass + class c(a): + pass + + converter[a] = lambda x: Integer(1) + converter[b] = lambda x: Integer(2) + + assert sympify(a()) == Integer(1) + assert sympify(b()) == Integer(2) + assert sympify(c()) == Integer(1) + + class MyInteger(Integer): + pass + + if int in converter: + int_converter = converter[int] + else: + int_converter = None + + try: + converter[int] = MyInteger + assert sympify(1) == MyInteger(1) + finally: + if int_converter is None: + del converter[int] + else: + converter[int] = int_converter + + +def test_issue_13924(): + if not numpy: + skip("numpy not installed.") + + a = sympify(numpy.array([1])) + assert isinstance(a, ImmutableDenseNDimArray) + assert a[0] == 1 + + +def test_numpy_sympify_args(): + # Issue 15098. Make sure sympify args work with numpy types (like numpy.str_) + if not numpy: + skip("numpy not installed.") + + a = sympify(numpy.str_('a')) + assert type(a) is Symbol + assert a == Symbol('a') + + class CustomSymbol(Symbol): + pass + + a = sympify(numpy.str_('a'), {"Symbol": CustomSymbol}) + assert isinstance(a, CustomSymbol) + + a = sympify(numpy.str_('x^y')) + assert a == x**y + a = sympify(numpy.str_('x^y'), convert_xor=False) + assert a == Xor(x, y) + + raises(SympifyError, lambda: sympify(numpy.str_('x'), strict=True)) + + a = sympify(numpy.str_('1.1')) + assert isinstance(a, Float) + assert a == 1.1 + + a = sympify(numpy.str_('1.1'), rational=True) + assert isinstance(a, Rational) + assert a == Rational(11, 10) + + a = sympify(numpy.str_('x + x')) + assert isinstance(a, Mul) + assert a == 2*x + + a = sympify(numpy.str_('x + x'), evaluate=False) + assert isinstance(a, Add) + assert a == Add(x, x, evaluate=False) + + +def test_issue_5939(): + a = Symbol('a') + b = Symbol('b') + assert sympify('''a+\nb''') == a + b + + +def test_issue_16759(): + d = sympify({.5: 1}) + assert S.Half not in d + assert Float(.5) in d + assert d[.5] is S.One + d = sympify(OrderedDict({.5: 1})) + assert S.Half not in d + assert Float(.5) in d + assert d[.5] is S.One + d = sympify(defaultdict(int, {.5: 1})) + assert S.Half not in d + assert Float(.5) in d + assert d[.5] is S.One + + +def test_issue_17811(): + a = Function('a') + assert sympify('a(x)*5', evaluate=False) == Mul(a(x), 5, evaluate=False) + + +def test_issue_8439(): + assert sympify(float('inf')) == oo + assert x + float('inf') == x + oo + assert S(float('inf')) == oo + + +def test_issue_14706(): + if not numpy: + skip("numpy not installed.") + + z1 = numpy.zeros((1, 1), dtype=numpy.float64) + z2 = numpy.zeros((2, 2), dtype=numpy.float64) + z3 = numpy.zeros((), dtype=numpy.float64) + + y1 = numpy.ones((1, 1), dtype=numpy.float64) + y2 = numpy.ones((2, 2), dtype=numpy.float64) + y3 = numpy.ones((), dtype=numpy.float64) + + assert numpy.all(x + z1 == numpy.full((1, 1), x)) + assert numpy.all(x + z2 == numpy.full((2, 2), x)) + assert numpy.all(z1 + x == numpy.full((1, 1), x)) + assert numpy.all(z2 + x == numpy.full((2, 2), x)) + for z in [z3, + numpy.int64(0), + numpy.float64(0), + numpy.complex64(0)]: + assert x + z == x + assert z + x == x + assert isinstance(x + z, Symbol) + assert isinstance(z + x, Symbol) + + # If these tests fail, then it means that numpy has finally + # fixed the issue of scalar conversion for rank>0 arrays + # which is mentioned in numpy/numpy#10404. In that case, + # some changes have to be made in sympify.py. + # Note: For future reference, for anyone who takes up this + # issue when numpy has finally fixed their side of the problem, + # the changes for this temporary fix were introduced in PR 18651 + assert numpy.all(x + y1 == numpy.full((1, 1), x + 1.0)) + assert numpy.all(x + y2 == numpy.full((2, 2), x + 1.0)) + assert numpy.all(y1 + x == numpy.full((1, 1), x + 1.0)) + assert numpy.all(y2 + x == numpy.full((2, 2), x + 1.0)) + for y_ in [y3, + numpy.int64(1), + numpy.float64(1), + numpy.complex64(1)]: + assert x + y_ == y_ + x + assert isinstance(x + y_, Add) + assert isinstance(y_ + x, Add) + + assert x + numpy.array(x) == 2 * x + assert x + numpy.array([x]) == numpy.array([2*x], dtype=object) + + assert sympify(numpy.array([1])) == ImmutableDenseNDimArray([1], 1) + assert sympify(numpy.array([[[1]]])) == ImmutableDenseNDimArray([1], (1, 1, 1)) + assert sympify(z1) == ImmutableDenseNDimArray([0.0], (1, 1)) + assert sympify(z2) == ImmutableDenseNDimArray([0.0, 0.0, 0.0, 0.0], (2, 2)) + assert sympify(z3) == ImmutableDenseNDimArray([0.0], ()) + assert sympify(z3, strict=True) == 0.0 + + raises(SympifyError, lambda: sympify(numpy.array([1]), strict=True)) + raises(SympifyError, lambda: sympify(z1, strict=True)) + raises(SympifyError, lambda: sympify(z2, strict=True)) + + +def test_issue_21536(): + #test to check evaluate=False in case of iterable input + u = sympify("x+3*x+2", evaluate=False) + v = sympify("2*x+4*x+2+4", evaluate=False) + + assert u.is_Add and set(u.args) == {x, 3*x, 2} + assert v.is_Add and set(v.args) == {2*x, 4*x, 2, 4} + assert sympify(["x+3*x+2", "2*x+4*x+2+4"], evaluate=False) == [u, v] + + #test to check evaluate=True in case of iterable input + u = sympify("x+3*x+2", evaluate=True) + v = sympify("2*x+4*x+2+4", evaluate=True) + + assert u.is_Add and set(u.args) == {4*x, 2} + assert v.is_Add and set(v.args) == {6*x, 6} + assert sympify(["x+3*x+2", "2*x+4*x+2+4"], evaluate=True) == [u, v] + + #test to check evaluate with no input in case of iterable input + u = sympify("x+3*x+2") + v = sympify("2*x+4*x+2+4") + + assert u.is_Add and set(u.args) == {4*x, 2} + assert v.is_Add and set(v.args) == {6*x, 6} + assert sympify(["x+3*x+2", "2*x+4*x+2+4"]) == [u, v] + +def test_issue_27284(): + if not numpy: + skip("numpy not installed.") + + assert Float(numpy.float32(float('inf'))) == S.Infinity + assert Float(numpy.float32(float('-inf'))) == S.NegativeInfinity diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_traversal.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_traversal.py new file mode 100644 index 0000000000000000000000000000000000000000..8bf067283eaba5d4a073a73feb07aac199055a7f --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_traversal.py @@ -0,0 +1,119 @@ +from sympy.core.basic import Basic +from sympy.core.containers import Tuple +from sympy.core.sorting import default_sort_key +from sympy.core.symbol import symbols +from sympy.core.singleton import S +from sympy.core.function import expand, Function +from sympy.core.numbers import I +from sympy.integrals.integrals import Integral +from sympy.polys.polytools import factor +from sympy.core.traversal import preorder_traversal, use, postorder_traversal, iterargs, iterfreeargs +from sympy.functions.elementary.piecewise import ExprCondPair, Piecewise +from sympy.testing.pytest import warns_deprecated_sympy +from sympy.utilities.iterables import capture + +b1 = Basic() +b2 = Basic(b1) +b3 = Basic(b2) +b21 = Basic(b2, b1) + + +def test_preorder_traversal(): + expr = Basic(b21, b3) + assert list( + preorder_traversal(expr)) == [expr, b21, b2, b1, b1, b3, b2, b1] + assert list(preorder_traversal(('abc', ('d', 'ef')))) == [ + ('abc', ('d', 'ef')), 'abc', ('d', 'ef'), 'd', 'ef'] + + result = [] + pt = preorder_traversal(expr) + for i in pt: + result.append(i) + if i == b2: + pt.skip() + assert result == [expr, b21, b2, b1, b3, b2] + + w, x, y, z = symbols('w:z') + expr = z + w*(x + y) + assert list(preorder_traversal([expr], keys=default_sort_key)) == \ + [[w*(x + y) + z], w*(x + y) + z, z, w*(x + y), w, x + y, x, y] + assert list(preorder_traversal((x + y)*z, keys=True)) == \ + [z*(x + y), z, x + y, x, y] + + +def test_use(): + x, y = symbols('x y') + + assert use(0, expand) == 0 + + f = (x + y)**2*x + 1 + + assert use(f, expand, level=0) == x**3 + 2*x**2*y + x*y**2 + + 1 + assert use(f, expand, level=1) == x**3 + 2*x**2*y + x*y**2 + + 1 + assert use(f, expand, level=2) == 1 + x*(2*x*y + x**2 + y**2) + assert use(f, expand, level=3) == (x + y)**2*x + 1 + + f = (x**2 + 1)**2 - 1 + kwargs = {'gaussian': True} + + assert use(f, factor, level=0, kwargs=kwargs) == x**2*(x**2 + 2) + assert use(f, factor, level=1, kwargs=kwargs) == (x + I)**2*(x - I)**2 - 1 + assert use(f, factor, level=2, kwargs=kwargs) == (x + I)**2*(x - I)**2 - 1 + assert use(f, factor, level=3, kwargs=kwargs) == (x**2 + 1)**2 - 1 + + +def test_postorder_traversal(): + x, y, z, w = symbols('x y z w') + expr = z + w*(x + y) + expected = [z, w, x, y, x + y, w*(x + y), w*(x + y) + z] + assert list(postorder_traversal(expr, keys=default_sort_key)) == expected + assert list(postorder_traversal(expr, keys=True)) == expected + + expr = Piecewise((x, x < 1), (x**2, True)) + expected = [ + x, 1, x, x < 1, ExprCondPair(x, x < 1), + 2, x, x**2, S.true, + ExprCondPair(x**2, True), Piecewise((x, x < 1), (x**2, True)) + ] + assert list(postorder_traversal(expr, keys=default_sort_key)) == expected + assert list(postorder_traversal( + [expr], keys=default_sort_key)) == expected + [[expr]] + + assert list(postorder_traversal(Integral(x**2, (x, 0, 1)), + keys=default_sort_key)) == [ + 2, x, x**2, 0, 1, x, Tuple(x, 0, 1), + Integral(x**2, Tuple(x, 0, 1)) + ] + assert list(postorder_traversal(('abc', ('d', 'ef')))) == [ + 'abc', 'd', 'ef', ('d', 'ef'), ('abc', ('d', 'ef'))] + + +def test_iterargs(): + f = Function('f') + x = symbols('x') + assert list(iterfreeargs(Integral(f(x), (f(x), 1)))) == [ + Integral(f(x), (f(x), 1)), 1] + assert list(iterargs(Integral(f(x), (f(x), 1)))) == [ + Integral(f(x), (f(x), 1)), f(x), (f(x), 1), x, f(x), 1, x] + +def test_deprecated_imports(): + x = symbols('x') + + with warns_deprecated_sympy(): + from sympy.core.basic import preorder_traversal + preorder_traversal(x) + with warns_deprecated_sympy(): + from sympy.simplify.simplify import bottom_up + bottom_up(x, lambda x: x) + with warns_deprecated_sympy(): + from sympy.simplify.simplify import walk + walk(x, lambda x: x) + with warns_deprecated_sympy(): + from sympy.simplify.traversaltools import use + use(x, lambda x: x) + with warns_deprecated_sympy(): + from sympy.utilities.iterables import postorder_traversal + postorder_traversal(x) + with warns_deprecated_sympy(): + from sympy.utilities.iterables import interactive_traversal + capture(lambda: interactive_traversal(x)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_truediv.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_truediv.py new file mode 100644 index 0000000000000000000000000000000000000000..1fcf9e1ab754d05a3b47e7ec0c2be5ea9929da02 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_truediv.py @@ -0,0 +1,54 @@ +#this module tests that SymPy works with true division turned on + +from sympy.core.numbers import (Float, Rational) +from sympy.core.symbol import Symbol + + +def test_truediv(): + assert 1/2 != 0 + assert Rational(1)/2 != 0 + + +def dotest(s): + x = Symbol("x") + y = Symbol("y") + l = [ + Rational(2), + Float("1.3"), + x, + y, + pow(x, y)*y, + 5, + 5.5 + ] + for x in l: + for y in l: + s(x, y) + return True + + +def test_basic(): + def s(a, b): + x = a + x = +a + x = -a + x = a + b + x = a - b + x = a*b + x = a/b + x = a**b + del x + assert dotest(s) + + +def test_ibasic(): + def s(a, b): + x = a + x += b + x = a + x -= b + x = a + x *= b + x = a + x /= b + assert dotest(s) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_var.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_var.py new file mode 100644 index 0000000000000000000000000000000000000000..a02709464c9878082fecaf70fa47067ac8838ac6 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/tests/test_var.py @@ -0,0 +1,62 @@ +from sympy.core.function import (Function, FunctionClass) +from sympy.core.symbol import (Symbol, var) +from sympy.testing.pytest import raises + +def test_var(): + ns = {"var": var, "raises": raises} + eval("var('a')", ns) + assert ns["a"] == Symbol("a") + + eval("var('b bb cc zz _x')", ns) + assert ns["b"] == Symbol("b") + assert ns["bb"] == Symbol("bb") + assert ns["cc"] == Symbol("cc") + assert ns["zz"] == Symbol("zz") + assert ns["_x"] == Symbol("_x") + + v = eval("var(['d', 'e', 'fg'])", ns) + assert ns['d'] == Symbol('d') + assert ns['e'] == Symbol('e') + assert ns['fg'] == Symbol('fg') + +# check return value + assert v != ['d', 'e', 'fg'] + assert v == [Symbol('d'), Symbol('e'), Symbol('fg')] + + +def test_var_return(): + ns = {"var": var, "raises": raises} + "raises(ValueError, lambda: var(''))" + v2 = eval("var('q')", ns) + v3 = eval("var('q p')", ns) + + assert v2 == Symbol('q') + assert v3 == (Symbol('q'), Symbol('p')) + + +def test_var_accepts_comma(): + ns = {"var": var} + v1 = eval("var('x y z')", ns) + v2 = eval("var('x,y,z')", ns) + v3 = eval("var('x,y z')", ns) + + assert v1 == v2 + assert v1 == v3 + + +def test_var_keywords(): + ns = {"var": var} + eval("var('x y', real=True)", ns) + assert ns['x'].is_real and ns['y'].is_real + + +def test_var_cls(): + ns = {"var": var, "Function": Function} + eval("var('f', cls=Function)", ns) + + assert isinstance(ns['f'], FunctionClass) + + eval("var('g,h', cls=Function)", ns) + + assert isinstance(ns['g'], FunctionClass) + assert isinstance(ns['h'], FunctionClass) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/trace.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/trace.py new file mode 100644 index 0000000000000000000000000000000000000000..58326ce1fdd5038f0b5805afe7c453314a22cb6a --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/trace.py @@ -0,0 +1,12 @@ +from sympy.utilities.exceptions import sympy_deprecation_warning + +sympy_deprecation_warning( + """ + sympy.core.trace is deprecated. Use sympy.physics.quantum.trace + instead. + """, + deprecated_since_version="1.10", + active_deprecations_target="sympy-core-trace-deprecated", +) + +from sympy.physics.quantum.trace import Tr # noqa:F401 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/traversal.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/traversal.py new file mode 100644 index 0000000000000000000000000000000000000000..e4e000ef44bf636b9adc700964a7ee4c2372a019 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/core/traversal.py @@ -0,0 +1,304 @@ +from __future__ import annotations + +from typing import Iterator + +from .basic import Basic +from .sorting import ordered +from .sympify import sympify +from sympy.utilities.iterables import iterable + + + +def iterargs(expr): + """Yield the args of a Basic object in a breadth-first traversal. + Depth-traversal stops if `arg.args` is either empty or is not + an iterable. + + Examples + ======== + + >>> from sympy import Integral, Function + >>> from sympy.abc import x + >>> f = Function('f') + >>> from sympy.core.traversal import iterargs + >>> list(iterargs(Integral(f(x), (f(x), 1)))) + [Integral(f(x), (f(x), 1)), f(x), (f(x), 1), x, f(x), 1, x] + + See Also + ======== + iterfreeargs, preorder_traversal + """ + args = [expr] + for i in args: + yield i + args.extend(i.args) + + +def iterfreeargs(expr, _first=True): + """Yield the args of a Basic object in a breadth-first traversal. + Depth-traversal stops if `arg.args` is either empty or is not + an iterable. The bound objects of an expression will be returned + as canonical variables. + + Examples + ======== + + >>> from sympy import Integral, Function + >>> from sympy.abc import x + >>> f = Function('f') + >>> from sympy.core.traversal import iterfreeargs + >>> list(iterfreeargs(Integral(f(x), (f(x), 1)))) + [Integral(f(x), (f(x), 1)), 1] + + See Also + ======== + iterargs, preorder_traversal + """ + args = [expr] + for i in args: + yield i + if _first and hasattr(i, 'bound_symbols'): + void = i.canonical_variables.values() + for i in iterfreeargs(i.as_dummy(), _first=False): + if not i.has(*void): + yield i + args.extend(i.args) + + +class preorder_traversal: + """ + Do a pre-order traversal of a tree. + + This iterator recursively yields nodes that it has visited in a pre-order + fashion. That is, it yields the current node then descends through the + tree breadth-first to yield all of a node's children's pre-order + traversal. + + + For an expression, the order of the traversal depends on the order of + .args, which in many cases can be arbitrary. + + Parameters + ========== + node : SymPy expression + The expression to traverse. + keys : (default None) sort key(s) + The key(s) used to sort args of Basic objects. When None, args of Basic + objects are processed in arbitrary order. If key is defined, it will + be passed along to ordered() as the only key(s) to use to sort the + arguments; if ``key`` is simply True then the default keys of ordered + will be used. + + Yields + ====== + subtree : SymPy expression + All of the subtrees in the tree. + + Examples + ======== + + >>> from sympy import preorder_traversal, symbols + >>> x, y, z = symbols('x y z') + + The nodes are returned in the order that they are encountered unless key + is given; simply passing key=True will guarantee that the traversal is + unique. + + >>> list(preorder_traversal((x + y)*z, keys=None)) # doctest: +SKIP + [z*(x + y), z, x + y, y, x] + >>> list(preorder_traversal((x + y)*z, keys=True)) + [z*(x + y), z, x + y, x, y] + + """ + def __init__(self, node, keys=None): + self._skip_flag = False + self._pt = self._preorder_traversal(node, keys) + + def _preorder_traversal(self, node, keys): + yield node + if self._skip_flag: + self._skip_flag = False + return + if isinstance(node, Basic): + if not keys and hasattr(node, '_argset'): + # LatticeOp keeps args as a set. We should use this if we + # don't care about the order, to prevent unnecessary sorting. + args = node._argset + else: + args = node.args + if keys: + if keys != True: + args = ordered(args, keys, default=False) + else: + args = ordered(args) + for arg in args: + yield from self._preorder_traversal(arg, keys) + elif iterable(node): + for item in node: + yield from self._preorder_traversal(item, keys) + + def skip(self): + """ + Skip yielding current node's (last yielded node's) subtrees. + + Examples + ======== + + >>> from sympy import preorder_traversal, symbols + >>> x, y, z = symbols('x y z') + >>> pt = preorder_traversal((x + y*z)*z) + >>> for i in pt: + ... print(i) + ... if i == x + y*z: + ... pt.skip() + z*(x + y*z) + z + x + y*z + """ + self._skip_flag = True + + def __next__(self): + return next(self._pt) + + def __iter__(self) -> Iterator[Basic]: + return self + + +def use(expr, func, level=0, args=(), kwargs={}): + """ + Use ``func`` to transform ``expr`` at the given level. + + Examples + ======== + + >>> from sympy import use, expand + >>> from sympy.abc import x, y + + >>> f = (x + y)**2*x + 1 + + >>> use(f, expand, level=2) + x*(x**2 + 2*x*y + y**2) + 1 + >>> expand(f) + x**3 + 2*x**2*y + x*y**2 + 1 + + """ + def _use(expr, level): + if not level: + return func(expr, *args, **kwargs) + else: + if expr.is_Atom: + return expr + else: + level -= 1 + _args = [_use(arg, level) for arg in expr.args] + return expr.__class__(*_args) + + return _use(sympify(expr), level) + + +def walk(e, *target): + """Iterate through the args that are the given types (target) and + return a list of the args that were traversed; arguments + that are not of the specified types are not traversed. + + Examples + ======== + + >>> from sympy.core.traversal import walk + >>> from sympy import Min, Max + >>> from sympy.abc import x, y, z + >>> list(walk(Min(x, Max(y, Min(1, z))), Min)) + [Min(x, Max(y, Min(1, z)))] + >>> list(walk(Min(x, Max(y, Min(1, z))), Min, Max)) + [Min(x, Max(y, Min(1, z))), Max(y, Min(1, z)), Min(1, z)] + + See Also + ======== + + bottom_up + """ + if isinstance(e, target): + yield e + for i in e.args: + yield from walk(i, *target) + + +def bottom_up(rv, F, atoms=False, nonbasic=False): + """Apply ``F`` to all expressions in an expression tree from the + bottom up. If ``atoms`` is True, apply ``F`` even if there are no args; + if ``nonbasic`` is True, try to apply ``F`` to non-Basic objects. + """ + args = getattr(rv, 'args', None) + if args is not None: + if args: + args = tuple([bottom_up(a, F, atoms, nonbasic) for a in args]) + if args != rv.args: + rv = rv.func(*args) + rv = F(rv) + elif atoms: + rv = F(rv) + else: + if nonbasic: + try: + rv = F(rv) + except TypeError: + pass + + return rv + + +def postorder_traversal(node, keys=None): + """ + Do a postorder traversal of a tree. + + This generator recursively yields nodes that it has visited in a postorder + fashion. That is, it descends through the tree depth-first to yield all of + a node's children's postorder traversal before yielding the node itself. + + Parameters + ========== + + node : SymPy expression + The expression to traverse. + keys : (default None) sort key(s) + The key(s) used to sort args of Basic objects. When None, args of Basic + objects are processed in arbitrary order. If key is defined, it will + be passed along to ordered() as the only key(s) to use to sort the + arguments; if ``key`` is simply True then the default keys of + ``ordered`` will be used (node count and default_sort_key). + + Yields + ====== + subtree : SymPy expression + All of the subtrees in the tree. + + Examples + ======== + + >>> from sympy import postorder_traversal + >>> from sympy.abc import w, x, y, z + + The nodes are returned in the order that they are encountered unless key + is given; simply passing key=True will guarantee that the traversal is + unique. + + >>> list(postorder_traversal(w + (x + y)*z)) # doctest: +SKIP + [z, y, x, x + y, z*(x + y), w, w + z*(x + y)] + >>> list(postorder_traversal(w + (x + y)*z, keys=True)) + [w, z, x, y, x + y, z*(x + y), w + z*(x + y)] + + + """ + if isinstance(node, Basic): + args = node.args + if keys: + if keys != True: + args = ordered(args, keys, default=False) + else: + args = ordered(args) + for arg in args: + yield from postorder_traversal(arg, keys) + elif iterable(node): + for item in node: + yield from postorder_traversal(item, keys) + yield node diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/crypto/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/crypto/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..2b27b4b036e5f2ed93a1ea88cd7d7144eb5615d4 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/crypto/__init__.py @@ -0,0 +1,35 @@ +from sympy.crypto.crypto import (cycle_list, + encipher_shift, encipher_affine, encipher_substitution, + check_and_join, encipher_vigenere, decipher_vigenere, bifid5_square, + bifid6_square, encipher_hill, decipher_hill, + encipher_bifid5, encipher_bifid6, decipher_bifid5, + decipher_bifid6, encipher_kid_rsa, decipher_kid_rsa, + kid_rsa_private_key, kid_rsa_public_key, decipher_rsa, rsa_private_key, + rsa_public_key, encipher_rsa, lfsr_connection_polynomial, + lfsr_autocorrelation, lfsr_sequence, encode_morse, decode_morse, + elgamal_private_key, elgamal_public_key, decipher_elgamal, + encipher_elgamal, dh_private_key, dh_public_key, dh_shared_key, + padded_key, encipher_bifid, decipher_bifid, bifid_square, bifid5, + bifid6, bifid10, decipher_gm, encipher_gm, gm_public_key, + gm_private_key, bg_private_key, bg_public_key, encipher_bg, decipher_bg, + encipher_rot13, decipher_rot13, encipher_atbash, decipher_atbash, + encipher_railfence, decipher_railfence) + +__all__ = [ + 'cycle_list', 'encipher_shift', 'encipher_affine', + 'encipher_substitution', 'check_and_join', 'encipher_vigenere', + 'decipher_vigenere', 'bifid5_square', 'bifid6_square', 'encipher_hill', + 'decipher_hill', 'encipher_bifid5', 'encipher_bifid6', 'decipher_bifid5', + 'decipher_bifid6', 'encipher_kid_rsa', 'decipher_kid_rsa', + 'kid_rsa_private_key', 'kid_rsa_public_key', 'decipher_rsa', + 'rsa_private_key', 'rsa_public_key', 'encipher_rsa', + 'lfsr_connection_polynomial', 'lfsr_autocorrelation', 'lfsr_sequence', + 'encode_morse', 'decode_morse', 'elgamal_private_key', + 'elgamal_public_key', 'decipher_elgamal', 'encipher_elgamal', + 'dh_private_key', 'dh_public_key', 'dh_shared_key', 'padded_key', + 'encipher_bifid', 'decipher_bifid', 'bifid_square', 'bifid5', 'bifid6', + 'bifid10', 'decipher_gm', 'encipher_gm', 'gm_public_key', + 'gm_private_key', 'bg_private_key', 'bg_public_key', 'encipher_bg', + 'decipher_bg', 'encipher_rot13', 'decipher_rot13', 'encipher_atbash', + 'decipher_atbash', 'encipher_railfence', 'decipher_railfence', +] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/crypto/crypto.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/crypto/crypto.py new file mode 100644 index 0000000000000000000000000000000000000000..2c298e4ac08616dbe7d607a9d56d33b7fe9d5e2d --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/crypto/crypto.py @@ -0,0 +1,3368 @@ +""" +This file contains some classical ciphers and routines +implementing a linear-feedback shift register (LFSR) +and the Diffie-Hellman key exchange. + +.. warning:: + + This module is intended for educational purposes only. Do not use the + functions in this module for real cryptographic applications. If you wish + to encrypt real data, we recommend using something like the `cryptography + `_ module. + +""" + +from string import whitespace, ascii_uppercase as uppercase, printable +from functools import reduce +import string +import warnings + +from itertools import cycle + +from sympy.external.gmpy import GROUND_TYPES +from sympy.core import Symbol +from sympy.core.numbers import Rational +from sympy.core.random import _randrange, _randint +from sympy.external.gmpy import gcd, invert +from sympy.functions.combinatorial.numbers import (totient as _euler, + reduced_totient as _carmichael) +from sympy.matrices import Matrix +from sympy.ntheory import isprime, primitive_root, factorint +from sympy.ntheory.generate import nextprime +from sympy.ntheory.modular import crt +from sympy.polys.domains import FF +from sympy.polys.polytools import Poly +from sympy.utilities.misc import as_int, filldedent, translate +from sympy.utilities.iterables import uniq, multiset +from sympy.utilities.decorator import doctest_depends_on + + +if GROUND_TYPES == 'flint': + __doctest_skip__ = ['lfsr_sequence'] + + +class NonInvertibleCipherWarning(RuntimeWarning): + """A warning raised if the cipher is not invertible.""" + def __init__(self, msg): + self.fullMessage = msg + + def __str__(self): + return '\n\t' + self.fullMessage + + def warn(self, stacklevel=3): + warnings.warn(self, stacklevel=stacklevel) + + +def AZ(s=None): + """Return the letters of ``s`` in uppercase. In case more than + one string is passed, each of them will be processed and a list + of upper case strings will be returned. + + Examples + ======== + + >>> from sympy.crypto.crypto import AZ + >>> AZ('Hello, world!') + 'HELLOWORLD' + >>> AZ('Hello, world!'.split()) + ['HELLO', 'WORLD'] + + See Also + ======== + + check_and_join + + """ + if not s: + return uppercase + t = isinstance(s, str) + if t: + s = [s] + rv = [check_and_join(i.upper().split(), uppercase, filter=True) + for i in s] + if t: + return rv[0] + return rv + +bifid5 = AZ().replace('J', '') +bifid6 = AZ() + string.digits +bifid10 = printable + + +def padded_key(key, symbols): + """Return a string of the distinct characters of ``symbols`` with + those of ``key`` appearing first. A ValueError is raised if + a) there are duplicate characters in ``symbols`` or + b) there are characters in ``key`` that are not in ``symbols``. + + Examples + ======== + + >>> from sympy.crypto.crypto import padded_key + >>> padded_key('PUPPY', 'OPQRSTUVWXY') + 'PUYOQRSTVWX' + >>> padded_key('RSA', 'ARTIST') + Traceback (most recent call last): + ... + ValueError: duplicate characters in symbols: T + + """ + syms = list(uniq(symbols)) + if len(syms) != len(symbols): + extra = ''.join(sorted({ + i for i in symbols if symbols.count(i) > 1})) + raise ValueError('duplicate characters in symbols: %s' % extra) + extra = set(key) - set(syms) + if extra: + raise ValueError( + 'characters in key but not symbols: %s' % ''.join( + sorted(extra))) + key0 = ''.join(list(uniq(key))) + # remove from syms characters in key0 + return key0 + translate(''.join(syms), None, key0) + + +def check_and_join(phrase, symbols=None, filter=None): + """ + Joins characters of ``phrase`` and if ``symbols`` is given, raises + an error if any character in ``phrase`` is not in ``symbols``. + + Parameters + ========== + + phrase + String or list of strings to be returned as a string. + + symbols + Iterable of characters allowed in ``phrase``. + + If ``symbols`` is ``None``, no checking is performed. + + Examples + ======== + + >>> from sympy.crypto.crypto import check_and_join + >>> check_and_join('a phrase') + 'a phrase' + >>> check_and_join('a phrase'.upper().split()) + 'APHRASE' + >>> check_and_join('a phrase!'.upper().split(), 'ARE', filter=True) + 'ARAE' + >>> check_and_join('a phrase!'.upper().split(), 'ARE') + Traceback (most recent call last): + ... + ValueError: characters in phrase but not symbols: "!HPS" + + """ + rv = ''.join(''.join(phrase)) + if symbols is not None: + symbols = check_and_join(symbols) + missing = ''.join(sorted(set(rv) - set(symbols))) + if missing: + if not filter: + raise ValueError( + 'characters in phrase but not symbols: "%s"' % missing) + rv = translate(rv, None, missing) + return rv + + +def _prep(msg, key, alp, default=None): + if not alp: + if not default: + alp = AZ() + msg = AZ(msg) + key = AZ(key) + else: + alp = default + else: + alp = ''.join(alp) + key = check_and_join(key, alp, filter=True) + msg = check_and_join(msg, alp, filter=True) + return msg, key, alp + + +def cycle_list(k, n): + """ + Returns the elements of the list ``range(n)`` shifted to the + left by ``k`` (so the list starts with ``k`` (mod ``n``)). + + Examples + ======== + + >>> from sympy.crypto.crypto import cycle_list + >>> cycle_list(3, 10) + [3, 4, 5, 6, 7, 8, 9, 0, 1, 2] + + """ + k = k % n + return list(range(k, n)) + list(range(k)) + + +######## shift cipher examples ############ + + +def encipher_shift(msg, key, symbols=None): + """ + Performs shift cipher encryption on plaintext msg, and returns the + ciphertext. + + Parameters + ========== + + key : int + The secret key. + + msg : str + Plaintext of upper-case letters. + + Returns + ======= + + str + Ciphertext of upper-case letters. + + Examples + ======== + + >>> from sympy.crypto.crypto import encipher_shift, decipher_shift + >>> msg = "GONAVYBEATARMY" + >>> ct = encipher_shift(msg, 1); ct + 'HPOBWZCFBUBSNZ' + + To decipher the shifted text, change the sign of the key: + + >>> encipher_shift(ct, -1) + 'GONAVYBEATARMY' + + There is also a convenience function that does this with the + original key: + + >>> decipher_shift(ct, 1) + 'GONAVYBEATARMY' + + Notes + ===== + + ALGORITHM: + + STEPS: + 0. Number the letters of the alphabet from 0, ..., N + 1. Compute from the string ``msg`` a list ``L1`` of + corresponding integers. + 2. Compute from the list ``L1`` a new list ``L2``, given by + adding ``(k mod 26)`` to each element in ``L1``. + 3. Compute from the list ``L2`` a string ``ct`` of + corresponding letters. + + The shift cipher is also called the Caesar cipher, after + Julius Caesar, who, according to Suetonius, used it with a + shift of three to protect messages of military significance. + Caesar's nephew Augustus reportedly used a similar cipher, but + with a right shift of 1. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Caesar_cipher + .. [2] https://mathworld.wolfram.com/CaesarsMethod.html + + See Also + ======== + + decipher_shift + + """ + msg, _, A = _prep(msg, '', symbols) + shift = len(A) - key % len(A) + key = A[shift:] + A[:shift] + return translate(msg, key, A) + + +def decipher_shift(msg, key, symbols=None): + """ + Return the text by shifting the characters of ``msg`` to the + left by the amount given by ``key``. + + Examples + ======== + + >>> from sympy.crypto.crypto import encipher_shift, decipher_shift + >>> msg = "GONAVYBEATARMY" + >>> ct = encipher_shift(msg, 1); ct + 'HPOBWZCFBUBSNZ' + + To decipher the shifted text, change the sign of the key: + + >>> encipher_shift(ct, -1) + 'GONAVYBEATARMY' + + Or use this function with the original key: + + >>> decipher_shift(ct, 1) + 'GONAVYBEATARMY' + + """ + return encipher_shift(msg, -key, symbols) + +def encipher_rot13(msg, symbols=None): + """ + Performs the ROT13 encryption on a given plaintext ``msg``. + + Explanation + =========== + + ROT13 is a substitution cipher which substitutes each letter + in the plaintext message for the letter furthest away from it + in the English alphabet. + + Equivalently, it is just a Caeser (shift) cipher with a shift + key of 13 (midway point of the alphabet). + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/ROT13 + + See Also + ======== + + decipher_rot13 + encipher_shift + + """ + return encipher_shift(msg, 13, symbols) + +def decipher_rot13(msg, symbols=None): + """ + Performs the ROT13 decryption on a given plaintext ``msg``. + + Explanation + ============ + + ``decipher_rot13`` is equivalent to ``encipher_rot13`` as both + ``decipher_shift`` with a key of 13 and ``encipher_shift`` key with a + key of 13 will return the same results. Nonetheless, + ``decipher_rot13`` has nonetheless been explicitly defined here for + consistency. + + Examples + ======== + + >>> from sympy.crypto.crypto import encipher_rot13, decipher_rot13 + >>> msg = 'GONAVYBEATARMY' + >>> ciphertext = encipher_rot13(msg);ciphertext + 'TBANILORNGNEZL' + >>> decipher_rot13(ciphertext) + 'GONAVYBEATARMY' + >>> encipher_rot13(msg) == decipher_rot13(msg) + True + >>> msg == decipher_rot13(ciphertext) + True + + """ + return decipher_shift(msg, 13, symbols) + +######## affine cipher examples ############ + + +def encipher_affine(msg, key, symbols=None, _inverse=False): + r""" + Performs the affine cipher encryption on plaintext ``msg``, and + returns the ciphertext. + + Explanation + =========== + + Encryption is based on the map `x \rightarrow ax+b` (mod `N`) + where ``N`` is the number of characters in the alphabet. + Decryption is based on the map `x \rightarrow cx+d` (mod `N`), + where `c = a^{-1}` (mod `N`) and `d = -a^{-1}b` (mod `N`). + In particular, for the map to be invertible, we need + `\mathrm{gcd}(a, N) = 1` and an error will be raised if this is + not true. + + Parameters + ========== + + msg : str + Characters that appear in ``symbols``. + + a, b : int, int + A pair integers, with ``gcd(a, N) = 1`` (the secret key). + + symbols + String of characters (default = uppercase letters). + + When no symbols are given, ``msg`` is converted to upper case + letters and all other characters are ignored. + + Returns + ======= + + ct + String of characters (the ciphertext message) + + Notes + ===== + + ALGORITHM: + + STEPS: + 0. Number the letters of the alphabet from 0, ..., N + 1. Compute from the string ``msg`` a list ``L1`` of + corresponding integers. + 2. Compute from the list ``L1`` a new list ``L2``, given by + replacing ``x`` by ``a*x + b (mod N)``, for each element + ``x`` in ``L1``. + 3. Compute from the list ``L2`` a string ``ct`` of + corresponding letters. + + This is a straightforward generalization of the shift cipher with + the added complexity of requiring 2 characters to be deciphered in + order to recover the key. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Affine_cipher + + See Also + ======== + + decipher_affine + + """ + msg, _, A = _prep(msg, '', symbols) + N = len(A) + a, b = key + assert gcd(a, N) == 1 + if _inverse: + c = invert(a, N) + d = -b*c + a, b = c, d + B = ''.join([A[(a*i + b) % N] for i in range(N)]) + return translate(msg, A, B) + + +def decipher_affine(msg, key, symbols=None): + r""" + Return the deciphered text that was made from the mapping, + `x \rightarrow ax+b` (mod `N`), where ``N`` is the + number of characters in the alphabet. Deciphering is done by + reciphering with a new key: `x \rightarrow cx+d` (mod `N`), + where `c = a^{-1}` (mod `N`) and `d = -a^{-1}b` (mod `N`). + + Examples + ======== + + >>> from sympy.crypto.crypto import encipher_affine, decipher_affine + >>> msg = "GO NAVY BEAT ARMY" + >>> key = (3, 1) + >>> encipher_affine(msg, key) + 'TROBMVENBGBALV' + >>> decipher_affine(_, key) + 'GONAVYBEATARMY' + + See Also + ======== + + encipher_affine + + """ + return encipher_affine(msg, key, symbols, _inverse=True) + + +def encipher_atbash(msg, symbols=None): + r""" + Enciphers a given ``msg`` into its Atbash ciphertext and returns it. + + Explanation + =========== + + Atbash is a substitution cipher originally used to encrypt the Hebrew + alphabet. Atbash works on the principle of mapping each alphabet to its + reverse / counterpart (i.e. a would map to z, b to y etc.) + + Atbash is functionally equivalent to the affine cipher with ``a = 25`` + and ``b = 25`` + + See Also + ======== + + decipher_atbash + + """ + return encipher_affine(msg, (25, 25), symbols) + + +def decipher_atbash(msg, symbols=None): + r""" + Deciphers a given ``msg`` using Atbash cipher and returns it. + + Explanation + =========== + + ``decipher_atbash`` is functionally equivalent to ``encipher_atbash``. + However, it has still been added as a separate function to maintain + consistency. + + Examples + ======== + + >>> from sympy.crypto.crypto import encipher_atbash, decipher_atbash + >>> msg = 'GONAVYBEATARMY' + >>> encipher_atbash(msg) + 'TLMZEBYVZGZINB' + >>> decipher_atbash(msg) + 'TLMZEBYVZGZINB' + >>> encipher_atbash(msg) == decipher_atbash(msg) + True + >>> msg == encipher_atbash(encipher_atbash(msg)) + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Atbash + + See Also + ======== + + encipher_atbash + + """ + return decipher_affine(msg, (25, 25), symbols) + +#################### substitution cipher ########################### + + +def encipher_substitution(msg, old, new=None): + r""" + Returns the ciphertext obtained by replacing each character that + appears in ``old`` with the corresponding character in ``new``. + If ``old`` is a mapping, then new is ignored and the replacements + defined by ``old`` are used. + + Explanation + =========== + + This is a more general than the affine cipher in that the key can + only be recovered by determining the mapping for each symbol. + Though in practice, once a few symbols are recognized the mappings + for other characters can be quickly guessed. + + Examples + ======== + + >>> from sympy.crypto.crypto import encipher_substitution, AZ + >>> old = 'OEYAG' + >>> new = '034^6' + >>> msg = AZ("go navy! beat army!") + >>> ct = encipher_substitution(msg, old, new); ct + '60N^V4B3^T^RM4' + + To decrypt a substitution, reverse the last two arguments: + + >>> encipher_substitution(ct, new, old) + 'GONAVYBEATARMY' + + In the special case where ``old`` and ``new`` are a permutation of + order 2 (representing a transposition of characters) their order + is immaterial: + + >>> old = 'NAVY' + >>> new = 'ANYV' + >>> encipher = lambda x: encipher_substitution(x, old, new) + >>> encipher('NAVY') + 'ANYV' + >>> encipher(_) + 'NAVY' + + The substitution cipher, in general, is a method + whereby "units" (not necessarily single characters) of plaintext + are replaced with ciphertext according to a regular system. + + >>> ords = dict(zip('abc', ['\\%i' % ord(i) for i in 'abc'])) + >>> print(encipher_substitution('abc', ords)) + \97\98\99 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Substitution_cipher + + """ + return translate(msg, old, new) + + +###################################################################### +#################### Vigenere cipher examples ######################## +###################################################################### + +def encipher_vigenere(msg, key, symbols=None): + """ + Performs the Vigenere cipher encryption on plaintext ``msg``, and + returns the ciphertext. + + Examples + ======== + + >>> from sympy.crypto.crypto import encipher_vigenere, AZ + >>> key = "encrypt" + >>> msg = "meet me on monday" + >>> encipher_vigenere(msg, key) + 'QRGKKTHRZQEBPR' + + Section 1 of the Kryptos sculpture at the CIA headquarters + uses this cipher and also changes the order of the + alphabet [2]_. Here is the first line of that section of + the sculpture: + + >>> from sympy.crypto.crypto import decipher_vigenere, padded_key + >>> alp = padded_key('KRYPTOS', AZ()) + >>> key = 'PALIMPSEST' + >>> msg = 'EMUFPHZLRFAXYUSDJKZLDKRNSHGNFIVJ' + >>> decipher_vigenere(msg, key, alp) + 'BETWEENSUBTLESHADINGANDTHEABSENC' + + Explanation + =========== + + The Vigenere cipher is named after Blaise de Vigenere, a sixteenth + century diplomat and cryptographer, by a historical accident. + Vigenere actually invented a different and more complicated cipher. + The so-called *Vigenere cipher* was actually invented + by Giovan Batista Belaso in 1553. + + This cipher was used in the 1800's, for example, during the American + Civil War. The Confederacy used a brass cipher disk to implement the + Vigenere cipher (now on display in the NSA Museum in Fort + Meade) [1]_. + + The Vigenere cipher is a generalization of the shift cipher. + Whereas the shift cipher shifts each letter by the same amount + (that amount being the key of the shift cipher) the Vigenere + cipher shifts a letter by an amount determined by the key (which is + a word or phrase known only to the sender and receiver). + + For example, if the key was a single letter, such as "C", then the + so-called Vigenere cipher is actually a shift cipher with a + shift of `2` (since "C" is the 2nd letter of the alphabet, if + you start counting at `0`). If the key was a word with two + letters, such as "CA", then the so-called Vigenere cipher will + shift letters in even positions by `2` and letters in odd positions + are left alone (shifted by `0`, since "A" is the 0th letter, if + you start counting at `0`). + + + ALGORITHM: + + INPUT: + + ``msg``: string of characters that appear in ``symbols`` + (the plaintext) + + ``key``: a string of characters that appear in ``symbols`` + (the secret key) + + ``symbols``: a string of letters defining the alphabet + + + OUTPUT: + + ``ct``: string of characters (the ciphertext message) + + STEPS: + 0. Number the letters of the alphabet from 0, ..., N + 1. Compute from the string ``key`` a list ``L1`` of + corresponding integers. Let ``n1 = len(L1)``. + 2. Compute from the string ``msg`` a list ``L2`` of + corresponding integers. Let ``n2 = len(L2)``. + 3. Break ``L2`` up sequentially into sublists of size + ``n1``; the last sublist may be smaller than ``n1`` + 4. For each of these sublists ``L`` of ``L2``, compute a + new list ``C`` given by ``C[i] = L[i] + L1[i] (mod N)`` + to the ``i``-th element in the sublist, for each ``i``. + 5. Assemble these lists ``C`` by concatenation into a new + list of length ``n2``. + 6. Compute from the new list a string ``ct`` of + corresponding letters. + + Once it is known that the key is, say, `n` characters long, + frequency analysis can be applied to every `n`-th letter of + the ciphertext to determine the plaintext. This method is + called *Kasiski examination* (although it was first discovered + by Babbage). If they key is as long as the message and is + comprised of randomly selected characters -- a one-time pad -- the + message is theoretically unbreakable. + + The cipher Vigenere actually discovered is an "auto-key" cipher + described as follows. + + ALGORITHM: + + INPUT: + + ``key``: a string of letters (the secret key) + + ``msg``: string of letters (the plaintext message) + + OUTPUT: + + ``ct``: string of upper-case letters (the ciphertext message) + + STEPS: + 0. Number the letters of the alphabet from 0, ..., N + 1. Compute from the string ``msg`` a list ``L2`` of + corresponding integers. Let ``n2 = len(L2)``. + 2. Let ``n1`` be the length of the key. Append to the + string ``key`` the first ``n2 - n1`` characters of + the plaintext message. Compute from this string (also of + length ``n2``) a list ``L1`` of integers corresponding + to the letter numbers in the first step. + 3. Compute a new list ``C`` given by + ``C[i] = L1[i] + L2[i] (mod N)``. + 4. Compute from the new list a string ``ct`` of letters + corresponding to the new integers. + + To decipher the auto-key ciphertext, the key is used to decipher + the first ``n1`` characters and then those characters become the + key to decipher the next ``n1`` characters, etc...: + + >>> m = AZ('go navy, beat army! yes you can'); m + 'GONAVYBEATARMYYESYOUCAN' + >>> key = AZ('gold bug'); n1 = len(key); n2 = len(m) + >>> auto_key = key + m[:n2 - n1]; auto_key + 'GOLDBUGGONAVYBEATARMYYE' + >>> ct = encipher_vigenere(m, auto_key); ct + 'MCYDWSHKOGAMKZCELYFGAYR' + >>> n1 = len(key) + >>> pt = [] + >>> while ct: + ... part, ct = ct[:n1], ct[n1:] + ... pt.append(decipher_vigenere(part, key)) + ... key = pt[-1] + ... + >>> ''.join(pt) == m + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Vigenere_cipher + .. [2] https://web.archive.org/web/20071116100808/https://filebox.vt.edu/users/batman/kryptos.html + (short URL: https://goo.gl/ijr22d) + + """ + msg, key, A = _prep(msg, key, symbols) + map = {c: i for i, c in enumerate(A)} + key = [map[c] for c in key] + N = len(map) + k = len(key) + rv = [] + for i, m in enumerate(msg): + rv.append(A[(map[m] + key[i % k]) % N]) + rv = ''.join(rv) + return rv + + +def decipher_vigenere(msg, key, symbols=None): + """ + Decode using the Vigenere cipher. + + Examples + ======== + + >>> from sympy.crypto.crypto import decipher_vigenere + >>> key = "encrypt" + >>> ct = "QRGK kt HRZQE BPR" + >>> decipher_vigenere(ct, key) + 'MEETMEONMONDAY' + + """ + msg, key, A = _prep(msg, key, symbols) + map = {c: i for i, c in enumerate(A)} + N = len(A) # normally, 26 + K = [map[c] for c in key] + n = len(K) + C = [map[c] for c in msg] + rv = ''.join([A[(-K[i % n] + c) % N] for i, c in enumerate(C)]) + return rv + + +#################### Hill cipher ######################## + + +def encipher_hill(msg, key, symbols=None, pad="Q"): + r""" + Return the Hill cipher encryption of ``msg``. + + Explanation + =========== + + The Hill cipher [1]_, invented by Lester S. Hill in the 1920's [2]_, + was the first polygraphic cipher in which it was practical + (though barely) to operate on more than three symbols at once. + The following discussion assumes an elementary knowledge of + matrices. + + First, each letter is first encoded as a number starting with 0. + Suppose your message `msg` consists of `n` capital letters, with no + spaces. This may be regarded an `n`-tuple M of elements of + `Z_{26}` (if the letters are those of the English alphabet). A key + in the Hill cipher is a `k x k` matrix `K`, all of whose entries + are in `Z_{26}`, such that the matrix `K` is invertible (i.e., the + linear transformation `K: Z_{N}^k \rightarrow Z_{N}^k` + is one-to-one). + + + Parameters + ========== + + msg + Plaintext message of `n` upper-case letters. + + key + A `k \times k` invertible matrix `K`, all of whose entries are + in `Z_{26}` (or whatever number of symbols are being used). + + pad + Character (default "Q") to use to make length of text be a + multiple of ``k``. + + Returns + ======= + + ct + Ciphertext of upper-case letters. + + Notes + ===== + + ALGORITHM: + + STEPS: + 0. Number the letters of the alphabet from 0, ..., N + 1. Compute from the string ``msg`` a list ``L`` of + corresponding integers. Let ``n = len(L)``. + 2. Break the list ``L`` up into ``t = ceiling(n/k)`` + sublists ``L_1``, ..., ``L_t`` of size ``k`` (with + the last list "padded" to ensure its size is + ``k``). + 3. Compute new list ``C_1``, ..., ``C_t`` given by + ``C[i] = K*L_i`` (arithmetic is done mod N), for each + ``i``. + 4. Concatenate these into a list ``C = C_1 + ... + C_t``. + 5. Compute from ``C`` a string ``ct`` of corresponding + letters. This has length ``k*t``. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Hill_cipher + .. [2] Lester S. Hill, Cryptography in an Algebraic Alphabet, + The American Mathematical Monthly Vol.36, June-July 1929, + pp.306-312. + + See Also + ======== + + decipher_hill + + """ + assert key.is_square + assert len(pad) == 1 + msg, pad, A = _prep(msg, pad, symbols) + map = {c: i for i, c in enumerate(A)} + P = [map[c] for c in msg] + N = len(A) + k = key.cols + n = len(P) + m, r = divmod(n, k) + if r: + P = P + [map[pad]]*(k - r) + m += 1 + rv = ''.join([A[c % N] for j in range(m) for c in + list(key*Matrix(k, 1, [P[i] + for i in range(k*j, k*(j + 1))]))]) + return rv + + +def decipher_hill(msg, key, symbols=None): + """ + Deciphering is the same as enciphering but using the inverse of the + key matrix. + + Examples + ======== + + >>> from sympy.crypto.crypto import encipher_hill, decipher_hill + >>> from sympy import Matrix + + >>> key = Matrix([[1, 2], [3, 5]]) + >>> encipher_hill("meet me on monday", key) + 'UEQDUEODOCTCWQ' + >>> decipher_hill(_, key) + 'MEETMEONMONDAY' + + When the length of the plaintext (stripped of invalid characters) + is not a multiple of the key dimension, extra characters will + appear at the end of the enciphered and deciphered text. In order to + decipher the text, those characters must be included in the text to + be deciphered. In the following, the key has a dimension of 4 but + the text is 2 short of being a multiple of 4 so two characters will + be added. + + >>> key = Matrix([[1, 1, 1, 2], [0, 1, 1, 0], + ... [2, 2, 3, 4], [1, 1, 0, 1]]) + >>> msg = "ST" + >>> encipher_hill(msg, key) + 'HJEB' + >>> decipher_hill(_, key) + 'STQQ' + >>> encipher_hill(msg, key, pad="Z") + 'ISPK' + >>> decipher_hill(_, key) + 'STZZ' + + If the last two characters of the ciphertext were ignored in + either case, the wrong plaintext would be recovered: + + >>> decipher_hill("HD", key) + 'ORMV' + >>> decipher_hill("IS", key) + 'UIKY' + + See Also + ======== + + encipher_hill + + """ + assert key.is_square + msg, _, A = _prep(msg, '', symbols) + map = {c: i for i, c in enumerate(A)} + C = [map[c] for c in msg] + N = len(A) + k = key.cols + n = len(C) + m, r = divmod(n, k) + if r: + C = C + [0]*(k - r) + m += 1 + key_inv = key.inv_mod(N) + rv = ''.join([A[p % N] for j in range(m) for p in + list(key_inv*Matrix( + k, 1, [C[i] for i in range(k*j, k*(j + 1))]))]) + return rv + + +#################### Bifid cipher ######################## + + +def encipher_bifid(msg, key, symbols=None): + r""" + Performs the Bifid cipher encryption on plaintext ``msg``, and + returns the ciphertext. + + This is the version of the Bifid cipher that uses an `n \times n` + Polybius square. + + Parameters + ========== + + msg + Plaintext string. + + key + Short string for key. + + Duplicate characters are ignored and then it is padded with the + characters in ``symbols`` that were not in the short key. + + symbols + `n \times n` characters defining the alphabet. + + (default is string.printable) + + Returns + ======= + + ciphertext + Ciphertext using Bifid5 cipher without spaces. + + See Also + ======== + + decipher_bifid, encipher_bifid5, encipher_bifid6 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Bifid_cipher + + """ + msg, key, A = _prep(msg, key, symbols, bifid10) + long_key = ''.join(uniq(key)) or A + + n = len(A)**.5 + if n != int(n): + raise ValueError( + 'Length of alphabet (%s) is not a square number.' % len(A)) + N = int(n) + if len(long_key) < N**2: + long_key = list(long_key) + [x for x in A if x not in long_key] + + # the fractionalization + row_col = {ch: divmod(i, N) for i, ch in enumerate(long_key)} + r, c = zip(*[row_col[x] for x in msg]) + rc = r + c + ch = {i: ch for ch, i in row_col.items()} + rv = ''.join(ch[i] for i in zip(rc[::2], rc[1::2])) + return rv + + +def decipher_bifid(msg, key, symbols=None): + r""" + Performs the Bifid cipher decryption on ciphertext ``msg``, and + returns the plaintext. + + This is the version of the Bifid cipher that uses the `n \times n` + Polybius square. + + Parameters + ========== + + msg + Ciphertext string. + + key + Short string for key. + + Duplicate characters are ignored and then it is padded with the + characters in symbols that were not in the short key. + + symbols + `n \times n` characters defining the alphabet. + + (default=string.printable, a `10 \times 10` matrix) + + Returns + ======= + + deciphered + Deciphered text. + + Examples + ======== + + >>> from sympy.crypto.crypto import ( + ... encipher_bifid, decipher_bifid, AZ) + + Do an encryption using the bifid5 alphabet: + + >>> alp = AZ().replace('J', '') + >>> ct = AZ("meet me on monday!") + >>> key = AZ("gold bug") + >>> encipher_bifid(ct, key, alp) + 'IEILHHFSTSFQYE' + + When entering the text or ciphertext, spaces are ignored so it + can be formatted as desired. Re-entering the ciphertext from the + preceding, putting 4 characters per line and padding with an extra + J, does not cause problems for the deciphering: + + >>> decipher_bifid(''' + ... IEILH + ... HFSTS + ... FQYEJ''', key, alp) + 'MEETMEONMONDAY' + + When no alphabet is given, all 100 printable characters will be + used: + + >>> key = '' + >>> encipher_bifid('hello world!', key) + 'bmtwmg-bIo*w' + >>> decipher_bifid(_, key) + 'hello world!' + + If the key is changed, a different encryption is obtained: + + >>> key = 'gold bug' + >>> encipher_bifid('hello world!', 'gold_bug') + 'hg2sfuei7t}w' + + And if the key used to decrypt the message is not exact, the + original text will not be perfectly obtained: + + >>> decipher_bifid(_, 'gold pug') + 'heldo~wor6d!' + + """ + msg, _, A = _prep(msg, '', symbols, bifid10) + long_key = ''.join(uniq(key)) or A + + n = len(A)**.5 + if n != int(n): + raise ValueError( + 'Length of alphabet (%s) is not a square number.' % len(A)) + N = int(n) + if len(long_key) < N**2: + long_key = list(long_key) + [x for x in A if x not in long_key] + + # the reverse fractionalization + row_col = { + ch: divmod(i, N) for i, ch in enumerate(long_key)} + rc = [i for c in msg for i in row_col[c]] + n = len(msg) + rc = zip(*(rc[:n], rc[n:])) + ch = {i: ch for ch, i in row_col.items()} + rv = ''.join(ch[i] for i in rc) + return rv + + +def bifid_square(key): + """Return characters of ``key`` arranged in a square. + + Examples + ======== + + >>> from sympy.crypto.crypto import ( + ... bifid_square, AZ, padded_key, bifid5) + >>> bifid_square(AZ().replace('J', '')) + Matrix([ + [A, B, C, D, E], + [F, G, H, I, K], + [L, M, N, O, P], + [Q, R, S, T, U], + [V, W, X, Y, Z]]) + + >>> bifid_square(padded_key(AZ('gold bug!'), bifid5)) + Matrix([ + [G, O, L, D, B], + [U, A, C, E, F], + [H, I, K, M, N], + [P, Q, R, S, T], + [V, W, X, Y, Z]]) + + See Also + ======== + + padded_key + + """ + A = ''.join(uniq(''.join(key))) + n = len(A)**.5 + if n != int(n): + raise ValueError( + 'Length of alphabet (%s) is not a square number.' % len(A)) + n = int(n) + f = lambda i, j: Symbol(A[n*i + j]) + rv = Matrix(n, n, f) + return rv + + +def encipher_bifid5(msg, key): + r""" + Performs the Bifid cipher encryption on plaintext ``msg``, and + returns the ciphertext. + + Explanation + =========== + + This is the version of the Bifid cipher that uses the `5 \times 5` + Polybius square. The letter "J" is ignored so it must be replaced + with something else (traditionally an "I") before encryption. + + ALGORITHM: (5x5 case) + + STEPS: + 0. Create the `5 \times 5` Polybius square ``S`` associated + to ``key`` as follows: + + a) moving from left-to-right, top-to-bottom, + place the letters of the key into a `5 \times 5` + matrix, + b) if the key has less than 25 letters, add the + letters of the alphabet not in the key until the + `5 \times 5` square is filled. + + 1. Create a list ``P`` of pairs of numbers which are the + coordinates in the Polybius square of the letters in + ``msg``. + 2. Let ``L1`` be the list of all first coordinates of ``P`` + (length of ``L1 = n``), let ``L2`` be the list of all + second coordinates of ``P`` (so the length of ``L2`` + is also ``n``). + 3. Let ``L`` be the concatenation of ``L1`` and ``L2`` + (length ``L = 2*n``), except that consecutive numbers + are paired ``(L[2*i], L[2*i + 1])``. You can regard + ``L`` as a list of pairs of length ``n``. + 4. Let ``C`` be the list of all letters which are of the + form ``S[i, j]``, for all ``(i, j)`` in ``L``. As a + string, this is the ciphertext of ``msg``. + + Parameters + ========== + + msg : str + Plaintext string. + + Converted to upper case and filtered of anything but all letters + except J. + + key + Short string for key; non-alphabetic letters, J and duplicated + characters are ignored and then, if the length is less than 25 + characters, it is padded with other letters of the alphabet + (in alphabetical order). + + Returns + ======= + + ct + Ciphertext (all caps, no spaces). + + Examples + ======== + + >>> from sympy.crypto.crypto import ( + ... encipher_bifid5, decipher_bifid5) + + "J" will be omitted unless it is replaced with something else: + + >>> round_trip = lambda m, k: \ + ... decipher_bifid5(encipher_bifid5(m, k), k) + >>> key = 'a' + >>> msg = "JOSIE" + >>> round_trip(msg, key) + 'OSIE' + >>> round_trip(msg.replace("J", "I"), key) + 'IOSIE' + >>> j = "QIQ" + >>> round_trip(msg.replace("J", j), key).replace(j, "J") + 'JOSIE' + + + Notes + ===== + + The Bifid cipher was invented around 1901 by Felix Delastelle. + It is a *fractional substitution* cipher, where letters are + replaced by pairs of symbols from a smaller alphabet. The + cipher uses a `5 \times 5` square filled with some ordering of the + alphabet, except that "J" is replaced with "I" (this is a so-called + Polybius square; there is a `6 \times 6` analog if you add back in + "J" and also append onto the usual 26 letter alphabet, the digits + 0, 1, ..., 9). + According to Helen Gaines' book *Cryptanalysis*, this type of cipher + was used in the field by the German Army during World War I. + + See Also + ======== + + decipher_bifid5, encipher_bifid + + """ + msg, key, _ = _prep(msg.upper(), key.upper(), None, bifid5) + key = padded_key(key, bifid5) + return encipher_bifid(msg, '', key) + + +def decipher_bifid5(msg, key): + r""" + Return the Bifid cipher decryption of ``msg``. + + Explanation + =========== + + This is the version of the Bifid cipher that uses the `5 \times 5` + Polybius square; the letter "J" is ignored unless a ``key`` of + length 25 is used. + + Parameters + ========== + + msg + Ciphertext string. + + key + Short string for key; duplicated characters are ignored and if + the length is less then 25 characters, it will be padded with + other letters from the alphabet omitting "J". + Non-alphabetic characters are ignored. + + Returns + ======= + + plaintext + Plaintext from Bifid5 cipher (all caps, no spaces). + + Examples + ======== + + >>> from sympy.crypto.crypto import encipher_bifid5, decipher_bifid5 + >>> key = "gold bug" + >>> encipher_bifid5('meet me on friday', key) + 'IEILEHFSTSFXEE' + >>> encipher_bifid5('meet me on monday', key) + 'IEILHHFSTSFQYE' + >>> decipher_bifid5(_, key) + 'MEETMEONMONDAY' + + """ + msg, key, _ = _prep(msg.upper(), key.upper(), None, bifid5) + key = padded_key(key, bifid5) + return decipher_bifid(msg, '', key) + + +def bifid5_square(key=None): + r""" + 5x5 Polybius square. + + Produce the Polybius square for the `5 \times 5` Bifid cipher. + + Examples + ======== + + >>> from sympy.crypto.crypto import bifid5_square + >>> bifid5_square("gold bug") + Matrix([ + [G, O, L, D, B], + [U, A, C, E, F], + [H, I, K, M, N], + [P, Q, R, S, T], + [V, W, X, Y, Z]]) + + """ + if not key: + key = bifid5 + else: + _, key, _ = _prep('', key.upper(), None, bifid5) + key = padded_key(key, bifid5) + return bifid_square(key) + + +def encipher_bifid6(msg, key): + r""" + Performs the Bifid cipher encryption on plaintext ``msg``, and + returns the ciphertext. + + This is the version of the Bifid cipher that uses the `6 \times 6` + Polybius square. + + Parameters + ========== + + msg + Plaintext string (digits okay). + + key + Short string for key (digits okay). + + If ``key`` is less than 36 characters long, the square will be + filled with letters A through Z and digits 0 through 9. + + Returns + ======= + + ciphertext + Ciphertext from Bifid cipher (all caps, no spaces). + + See Also + ======== + + decipher_bifid6, encipher_bifid + + """ + msg, key, _ = _prep(msg.upper(), key.upper(), None, bifid6) + key = padded_key(key, bifid6) + return encipher_bifid(msg, '', key) + + +def decipher_bifid6(msg, key): + r""" + Performs the Bifid cipher decryption on ciphertext ``msg``, and + returns the plaintext. + + This is the version of the Bifid cipher that uses the `6 \times 6` + Polybius square. + + Parameters + ========== + + msg + Ciphertext string (digits okay); converted to upper case + + key + Short string for key (digits okay). + + If ``key`` is less than 36 characters long, the square will be + filled with letters A through Z and digits 0 through 9. + All letters are converted to uppercase. + + Returns + ======= + + plaintext + Plaintext from Bifid cipher (all caps, no spaces). + + Examples + ======== + + >>> from sympy.crypto.crypto import encipher_bifid6, decipher_bifid6 + >>> key = "gold bug" + >>> encipher_bifid6('meet me on monday at 8am', key) + 'KFKLJJHF5MMMKTFRGPL' + >>> decipher_bifid6(_, key) + 'MEETMEONMONDAYAT8AM' + + """ + msg, key, _ = _prep(msg.upper(), key.upper(), None, bifid6) + key = padded_key(key, bifid6) + return decipher_bifid(msg, '', key) + + +def bifid6_square(key=None): + r""" + 6x6 Polybius square. + + Produces the Polybius square for the `6 \times 6` Bifid cipher. + Assumes alphabet of symbols is "A", ..., "Z", "0", ..., "9". + + Examples + ======== + + >>> from sympy.crypto.crypto import bifid6_square + >>> key = "gold bug" + >>> bifid6_square(key) + Matrix([ + [G, O, L, D, B, U], + [A, C, E, F, H, I], + [J, K, M, N, P, Q], + [R, S, T, V, W, X], + [Y, Z, 0, 1, 2, 3], + [4, 5, 6, 7, 8, 9]]) + + """ + if not key: + key = bifid6 + else: + _, key, _ = _prep('', key.upper(), None, bifid6) + key = padded_key(key, bifid6) + return bifid_square(key) + + +#################### RSA ############################# + +def _decipher_rsa_crt(i, d, factors): + """Decipher RSA using chinese remainder theorem from the information + of the relatively-prime factors of the modulus. + + Parameters + ========== + + i : integer + Ciphertext + + d : integer + The exponent component. + + factors : list of relatively-prime integers + The integers given must be coprime and the product must equal + the modulus component of the original RSA key. + + Examples + ======== + + How to decrypt RSA with CRT: + + >>> from sympy.crypto.crypto import rsa_public_key, rsa_private_key + >>> primes = [61, 53] + >>> e = 17 + >>> args = primes + [e] + >>> puk = rsa_public_key(*args) + >>> prk = rsa_private_key(*args) + + >>> from sympy.crypto.crypto import encipher_rsa, _decipher_rsa_crt + >>> msg = 65 + >>> crt_primes = primes + >>> encrypted = encipher_rsa(msg, puk) + >>> decrypted = _decipher_rsa_crt(encrypted, prk[1], primes) + >>> decrypted + 65 + """ + moduluses = [pow(i, d, p) for p in factors] + + result = crt(factors, moduluses) + if not result: + raise ValueError("CRT failed") + return result[0] + + +def _rsa_key(*args, public=True, private=True, totient='Euler', index=None, multipower=None): + r"""A private subroutine to generate RSA key + + Parameters + ========== + + public, private : bool, optional + Flag to generate either a public key, a private key. + + totient : 'Euler' or 'Carmichael' + Different notation used for totient. + + multipower : bool, optional + Flag to bypass warning for multipower RSA. + """ + + if len(args) < 2: + return False + + if totient not in ('Euler', 'Carmichael'): + raise ValueError( + "The argument totient={} should either be " \ + "'Euler', 'Carmichalel'." \ + .format(totient)) + + if totient == 'Euler': + _totient = _euler + else: + _totient = _carmichael + + if index is not None: + index = as_int(index) + if totient != 'Carmichael': + raise ValueError( + "Setting the 'index' keyword argument requires totient" + "notation to be specified as 'Carmichael'.") + + primes, e = args[:-1], args[-1] + + if not all(isprime(p) for p in primes): + new_primes = [] + for i in primes: + new_primes.extend(factorint(i, multiple=True)) + primes = new_primes + + n = reduce(lambda i, j: i*j, primes) + + tally = multiset(primes) + if all(v == 1 for v in tally.values()): + phi = int(_totient(tally)) + + else: + if not multipower: + NonInvertibleCipherWarning( + 'Non-distinctive primes found in the factors {}. ' + 'The cipher may not be decryptable for some numbers ' + 'in the complete residue system Z[{}], but the cipher ' + 'can still be valid if you restrict the domain to be ' + 'the reduced residue system Z*[{}]. You can pass ' + 'the flag multipower=True if you want to suppress this ' + 'warning.' + .format(primes, n, n) + # stacklevel=4 because most users will call a function that + # calls this function + ).warn(stacklevel=4) + phi = int(_totient(tally)) + + if gcd(e, phi) == 1: + if public and not private: + if isinstance(index, int): + e = e % phi + e += index * phi + return n, e + + if private and not public: + d = invert(e, phi) + if isinstance(index, int): + d += index * phi + return n, d + + return False + + +def rsa_public_key(*args, **kwargs): + r"""Return the RSA *public key* pair, `(n, e)` + + Parameters + ========== + + args : naturals + If specified as `p, q, e` where `p` and `q` are distinct primes + and `e` is a desired public exponent of the RSA, `n = p q` and + `e` will be verified against the totient + `\phi(n)` (Euler totient) or `\lambda(n)` (Carmichael totient) + to be `\gcd(e, \phi(n)) = 1` or `\gcd(e, \lambda(n)) = 1`. + + If specified as `p_1, p_2, \dots, p_n, e` where + `p_1, p_2, \dots, p_n` are specified as primes, + and `e` is specified as a desired public exponent of the RSA, + it will be able to form a multi-prime RSA, which is a more + generalized form of the popular 2-prime RSA. + + It can also be possible to form a single-prime RSA by specifying + the argument as `p, e`, which can be considered a trivial case + of a multiprime RSA. + + Furthermore, it can be possible to form a multi-power RSA by + specifying two or more pairs of the primes to be same. + However, unlike the two-distinct prime RSA or multi-prime + RSA, not every numbers in the complete residue system + (`\mathbb{Z}_n`) will be decryptable since the mapping + `\mathbb{Z}_{n} \rightarrow \mathbb{Z}_{n}` + will not be bijective. + (Only except for the trivial case when + `e = 1` + or more generally, + + .. math:: + e \in \left \{ 1 + k \lambda(n) + \mid k \in \mathbb{Z} \land k \geq 0 \right \} + + when RSA reduces to the identity.) + However, the RSA can still be decryptable for the numbers in the + reduced residue system (`\mathbb{Z}_n^{\times}`), since the + mapping + `\mathbb{Z}_{n}^{\times} \rightarrow \mathbb{Z}_{n}^{\times}` + can still be bijective. + + If you pass a non-prime integer to the arguments + `p_1, p_2, \dots, p_n`, the particular number will be + prime-factored and it will become either a multi-prime RSA or a + multi-power RSA in its canonical form, depending on whether the + product equals its radical or not. + `p_1 p_2 \dots p_n = \text{rad}(p_1 p_2 \dots p_n)` + + totient : bool, optional + If ``'Euler'``, it uses Euler's totient `\phi(n)` which is + :meth:`sympy.functions.combinatorial.numbers.totient` in SymPy. + + If ``'Carmichael'``, it uses Carmichael's totient `\lambda(n)` + which is :meth:`sympy.functions.combinatorial.numbers.reduced_totient` in SymPy. + + Unlike private key generation, this is a trivial keyword for + public key generation because + `\gcd(e, \phi(n)) = 1 \iff \gcd(e, \lambda(n)) = 1`. + + index : nonnegative integer, optional + Returns an arbitrary solution of a RSA public key at the index + specified at `0, 1, 2, \dots`. This parameter needs to be + specified along with ``totient='Carmichael'``. + + Similarly to the non-uniquenss of a RSA private key as described + in the ``index`` parameter documentation in + :meth:`rsa_private_key`, RSA public key is also not unique and + there is an infinite number of RSA public exponents which + can behave in the same manner. + + From any given RSA public exponent `e`, there are can be an + another RSA public exponent `e + k \lambda(n)` where `k` is an + integer, `\lambda` is a Carmichael's totient function. + + However, considering only the positive cases, there can be + a principal solution of a RSA public exponent `e_0` in + `0 < e_0 < \lambda(n)`, and all the other solutions + can be canonicalzed in a form of `e_0 + k \lambda(n)`. + + ``index`` specifies the `k` notation to yield any possible value + an RSA public key can have. + + An example of computing any arbitrary RSA public key: + + >>> from sympy.crypto.crypto import rsa_public_key + >>> rsa_public_key(61, 53, 17, totient='Carmichael', index=0) + (3233, 17) + >>> rsa_public_key(61, 53, 17, totient='Carmichael', index=1) + (3233, 797) + >>> rsa_public_key(61, 53, 17, totient='Carmichael', index=2) + (3233, 1577) + + multipower : bool, optional + Any pair of non-distinct primes found in the RSA specification + will restrict the domain of the cryptosystem, as noted in the + explanation of the parameter ``args``. + + SymPy RSA key generator may give a warning before dispatching it + as a multi-power RSA, however, you can disable the warning if + you pass ``True`` to this keyword. + + Returns + ======= + + (n, e) : int, int + `n` is a product of any arbitrary number of primes given as + the argument. + + `e` is relatively prime (coprime) to the Euler totient + `\phi(n)`. + + False + Returned if less than two arguments are given, or `e` is + not relatively prime to the modulus. + + Examples + ======== + + >>> from sympy.crypto.crypto import rsa_public_key + + A public key of a two-prime RSA: + + >>> p, q, e = 3, 5, 7 + >>> rsa_public_key(p, q, e) + (15, 7) + >>> rsa_public_key(p, q, 30) + False + + A public key of a multiprime RSA: + + >>> primes = [2, 3, 5, 7, 11, 13] + >>> e = 7 + >>> args = primes + [e] + >>> rsa_public_key(*args) + (30030, 7) + + Notes + ===== + + Although the RSA can be generalized over any modulus `n`, using + two large primes had became the most popular specification because a + product of two large primes is usually the hardest to factor + relatively to the digits of `n` can have. + + However, it may need further understanding of the time complexities + of each prime-factoring algorithms to verify the claim. + + See Also + ======== + + rsa_private_key + encipher_rsa + decipher_rsa + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/RSA_%28cryptosystem%29 + + .. [2] https://cacr.uwaterloo.ca/techreports/2006/cacr2006-16.pdf + + .. [3] https://link.springer.com/content/pdf/10.1007/BFb0055738.pdf + + .. [4] https://www.itiis.org/digital-library/manuscript/1381 + """ + return _rsa_key(*args, public=True, private=False, **kwargs) + + +def rsa_private_key(*args, **kwargs): + r"""Return the RSA *private key* pair, `(n, d)` + + Parameters + ========== + + args : naturals + The keyword is identical to the ``args`` in + :meth:`rsa_public_key`. + + totient : bool, optional + If ``'Euler'``, it uses Euler's totient convention `\phi(n)` + which is :meth:`sympy.functions.combinatorial.numbers.totient` in SymPy. + + If ``'Carmichael'``, it uses Carmichael's totient convention + `\lambda(n)` which is + :meth:`sympy.functions.combinatorial.numbers.reduced_totient` in SymPy. + + There can be some output differences for private key generation + as examples below. + + Example using Euler's totient: + + >>> from sympy.crypto.crypto import rsa_private_key + >>> rsa_private_key(61, 53, 17, totient='Euler') + (3233, 2753) + + Example using Carmichael's totient: + + >>> from sympy.crypto.crypto import rsa_private_key + >>> rsa_private_key(61, 53, 17, totient='Carmichael') + (3233, 413) + + index : nonnegative integer, optional + Returns an arbitrary solution of a RSA private key at the index + specified at `0, 1, 2, \dots`. This parameter needs to be + specified along with ``totient='Carmichael'``. + + RSA private exponent is a non-unique solution of + `e d \mod \lambda(n) = 1` and it is possible in any form of + `d + k \lambda(n)`, where `d` is an another + already-computed private exponent, and `\lambda` is a + Carmichael's totient function, and `k` is any integer. + + However, considering only the positive cases, there can be + a principal solution of a RSA private exponent `d_0` in + `0 < d_0 < \lambda(n)`, and all the other solutions + can be canonicalzed in a form of `d_0 + k \lambda(n)`. + + ``index`` specifies the `k` notation to yield any possible value + an RSA private key can have. + + An example of computing any arbitrary RSA private key: + + >>> from sympy.crypto.crypto import rsa_private_key + >>> rsa_private_key(61, 53, 17, totient='Carmichael', index=0) + (3233, 413) + >>> rsa_private_key(61, 53, 17, totient='Carmichael', index=1) + (3233, 1193) + >>> rsa_private_key(61, 53, 17, totient='Carmichael', index=2) + (3233, 1973) + + multipower : bool, optional + The keyword is identical to the ``multipower`` in + :meth:`rsa_public_key`. + + Returns + ======= + + (n, d) : int, int + `n` is a product of any arbitrary number of primes given as + the argument. + + `d` is the inverse of `e` (mod `\phi(n)`) where `e` is the + exponent given, and `\phi` is a Euler totient. + + False + Returned if less than two arguments are given, or `e` is + not relatively prime to the totient of the modulus. + + Examples + ======== + + >>> from sympy.crypto.crypto import rsa_private_key + + A private key of a two-prime RSA: + + >>> p, q, e = 3, 5, 7 + >>> rsa_private_key(p, q, e) + (15, 7) + >>> rsa_private_key(p, q, 30) + False + + A private key of a multiprime RSA: + + >>> primes = [2, 3, 5, 7, 11, 13] + >>> e = 7 + >>> args = primes + [e] + >>> rsa_private_key(*args) + (30030, 823) + + See Also + ======== + + rsa_public_key + encipher_rsa + decipher_rsa + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/RSA_%28cryptosystem%29 + + .. [2] https://cacr.uwaterloo.ca/techreports/2006/cacr2006-16.pdf + + .. [3] https://link.springer.com/content/pdf/10.1007/BFb0055738.pdf + + .. [4] https://www.itiis.org/digital-library/manuscript/1381 + """ + return _rsa_key(*args, public=False, private=True, **kwargs) + + +def _encipher_decipher_rsa(i, key, factors=None): + n, d = key + if not factors: + return pow(i, d, n) + + def _is_coprime_set(l): + is_coprime_set = True + for i in range(len(l)): + for j in range(i+1, len(l)): + if gcd(l[i], l[j]) != 1: + is_coprime_set = False + break + return is_coprime_set + + prod = reduce(lambda i, j: i*j, factors) + if prod == n and _is_coprime_set(factors): + return _decipher_rsa_crt(i, d, factors) + return _encipher_decipher_rsa(i, key, factors=None) + + +def encipher_rsa(i, key, factors=None): + r"""Encrypt the plaintext with RSA. + + Parameters + ========== + + i : integer + The plaintext to be encrypted for. + + key : (n, e) where n, e are integers + `n` is the modulus of the key and `e` is the exponent of the + key. The encryption is computed by `i^e \bmod n`. + + The key can either be a public key or a private key, however, + the message encrypted by a public key can only be decrypted by + a private key, and vice versa, as RSA is an asymmetric + cryptography system. + + factors : list of coprime integers + This is identical to the keyword ``factors`` in + :meth:`decipher_rsa`. + + Notes + ===== + + Some specifications may make the RSA not cryptographically + meaningful. + + For example, `0`, `1` will remain always same after taking any + number of exponentiation, thus, should be avoided. + + Furthermore, if `i^e < n`, `i` may easily be figured out by taking + `e` th root. + + And also, specifying the exponent as `1` or in more generalized form + as `1 + k \lambda(n)` where `k` is an nonnegative integer, + `\lambda` is a carmichael totient, the RSA becomes an identity + mapping. + + Examples + ======== + + >>> from sympy.crypto.crypto import encipher_rsa + >>> from sympy.crypto.crypto import rsa_public_key, rsa_private_key + + Public Key Encryption: + + >>> p, q, e = 3, 5, 7 + >>> puk = rsa_public_key(p, q, e) + >>> msg = 12 + >>> encipher_rsa(msg, puk) + 3 + + Private Key Encryption: + + >>> p, q, e = 3, 5, 7 + >>> prk = rsa_private_key(p, q, e) + >>> msg = 12 + >>> encipher_rsa(msg, prk) + 3 + + Encryption using chinese remainder theorem: + + >>> encipher_rsa(msg, prk, factors=[p, q]) + 3 + """ + return _encipher_decipher_rsa(i, key, factors=factors) + + +def decipher_rsa(i, key, factors=None): + r"""Decrypt the ciphertext with RSA. + + Parameters + ========== + + i : integer + The ciphertext to be decrypted for. + + key : (n, d) where n, d are integers + `n` is the modulus of the key and `d` is the exponent of the + key. The decryption is computed by `i^d \bmod n`. + + The key can either be a public key or a private key, however, + the message encrypted by a public key can only be decrypted by + a private key, and vice versa, as RSA is an asymmetric + cryptography system. + + factors : list of coprime integers + As the modulus `n` created from RSA key generation is composed + of arbitrary prime factors + `n = {p_1}^{k_1}{p_2}^{k_2}\dots{p_n}^{k_n}` where + `p_1, p_2, \dots, p_n` are distinct primes and + `k_1, k_2, \dots, k_n` are positive integers, chinese remainder + theorem can be used to compute `i^d \bmod n` from the + fragmented modulo operations like + + .. math:: + i^d \bmod {p_1}^{k_1}, i^d \bmod {p_2}^{k_2}, \dots, + i^d \bmod {p_n}^{k_n} + + or like + + .. math:: + i^d \bmod {p_1}^{k_1}{p_2}^{k_2}, + i^d \bmod {p_3}^{k_3}, \dots , + i^d \bmod {p_n}^{k_n} + + as long as every moduli does not share any common divisor each + other. + + The raw primes used in generating the RSA key pair can be a good + option. + + Note that the speed advantage of using this is only viable for + very large cases (Like 2048-bit RSA keys) since the + overhead of using pure Python implementation of + :meth:`sympy.ntheory.modular.crt` may overcompensate the + theoretical speed advantage. + + Notes + ===== + + See the ``Notes`` section in the documentation of + :meth:`encipher_rsa` + + Examples + ======== + + >>> from sympy.crypto.crypto import decipher_rsa, encipher_rsa + >>> from sympy.crypto.crypto import rsa_public_key, rsa_private_key + + Public Key Encryption and Decryption: + + >>> p, q, e = 3, 5, 7 + >>> prk = rsa_private_key(p, q, e) + >>> puk = rsa_public_key(p, q, e) + >>> msg = 12 + >>> new_msg = encipher_rsa(msg, prk) + >>> new_msg + 3 + >>> decipher_rsa(new_msg, puk) + 12 + + Private Key Encryption and Decryption: + + >>> p, q, e = 3, 5, 7 + >>> prk = rsa_private_key(p, q, e) + >>> puk = rsa_public_key(p, q, e) + >>> msg = 12 + >>> new_msg = encipher_rsa(msg, puk) + >>> new_msg + 3 + >>> decipher_rsa(new_msg, prk) + 12 + + Decryption using chinese remainder theorem: + + >>> decipher_rsa(new_msg, prk, factors=[p, q]) + 12 + + See Also + ======== + + encipher_rsa + """ + return _encipher_decipher_rsa(i, key, factors=factors) + + +#################### kid krypto (kid RSA) ############################# + + +def kid_rsa_public_key(a, b, A, B): + r""" + Kid RSA is a version of RSA useful to teach grade school children + since it does not involve exponentiation. + + Explanation + =========== + + Alice wants to talk to Bob. Bob generates keys as follows. + Key generation: + + * Select positive integers `a, b, A, B` at random. + * Compute `M = a b - 1`, `e = A M + a`, `d = B M + b`, + `n = (e d - 1)//M`. + * The *public key* is `(n, e)`. Bob sends these to Alice. + * The *private key* is `(n, d)`, which Bob keeps secret. + + Encryption: If `p` is the plaintext message then the + ciphertext is `c = p e \pmod n`. + + Decryption: If `c` is the ciphertext message then the + plaintext is `p = c d \pmod n`. + + Examples + ======== + + >>> from sympy.crypto.crypto import kid_rsa_public_key + >>> a, b, A, B = 3, 4, 5, 6 + >>> kid_rsa_public_key(a, b, A, B) + (369, 58) + + """ + M = a*b - 1 + e = A*M + a + d = B*M + b + n = (e*d - 1)//M + return n, e + + +def kid_rsa_private_key(a, b, A, B): + """ + Compute `M = a b - 1`, `e = A M + a`, `d = B M + b`, + `n = (e d - 1) / M`. The *private key* is `d`, which Bob + keeps secret. + + Examples + ======== + + >>> from sympy.crypto.crypto import kid_rsa_private_key + >>> a, b, A, B = 3, 4, 5, 6 + >>> kid_rsa_private_key(a, b, A, B) + (369, 70) + + """ + M = a*b - 1 + e = A*M + a + d = B*M + b + n = (e*d - 1)//M + return n, d + + +def encipher_kid_rsa(msg, key): + """ + Here ``msg`` is the plaintext and ``key`` is the public key. + + Examples + ======== + + >>> from sympy.crypto.crypto import ( + ... encipher_kid_rsa, kid_rsa_public_key) + >>> msg = 200 + >>> a, b, A, B = 3, 4, 5, 6 + >>> key = kid_rsa_public_key(a, b, A, B) + >>> encipher_kid_rsa(msg, key) + 161 + + """ + n, e = key + return (msg*e) % n + + +def decipher_kid_rsa(msg, key): + """ + Here ``msg`` is the plaintext and ``key`` is the private key. + + Examples + ======== + + >>> from sympy.crypto.crypto import ( + ... kid_rsa_public_key, kid_rsa_private_key, + ... decipher_kid_rsa, encipher_kid_rsa) + >>> a, b, A, B = 3, 4, 5, 6 + >>> d = kid_rsa_private_key(a, b, A, B) + >>> msg = 200 + >>> pub = kid_rsa_public_key(a, b, A, B) + >>> pri = kid_rsa_private_key(a, b, A, B) + >>> ct = encipher_kid_rsa(msg, pub) + >>> decipher_kid_rsa(ct, pri) + 200 + + """ + n, d = key + return (msg*d) % n + + +#################### Morse Code ###################################### + +morse_char = { + ".-": "A", "-...": "B", + "-.-.": "C", "-..": "D", + ".": "E", "..-.": "F", + "--.": "G", "....": "H", + "..": "I", ".---": "J", + "-.-": "K", ".-..": "L", + "--": "M", "-.": "N", + "---": "O", ".--.": "P", + "--.-": "Q", ".-.": "R", + "...": "S", "-": "T", + "..-": "U", "...-": "V", + ".--": "W", "-..-": "X", + "-.--": "Y", "--..": "Z", + "-----": "0", ".----": "1", + "..---": "2", "...--": "3", + "....-": "4", ".....": "5", + "-....": "6", "--...": "7", + "---..": "8", "----.": "9", + ".-.-.-": ".", "--..--": ",", + "---...": ":", "-.-.-.": ";", + "..--..": "?", "-....-": "-", + "..--.-": "_", "-.--.": "(", + "-.--.-": ")", ".----.": "'", + "-...-": "=", ".-.-.": "+", + "-..-.": "/", ".--.-.": "@", + "...-..-": "$", "-.-.--": "!"} +char_morse = {v: k for k, v in morse_char.items()} + + +def encode_morse(msg, sep='|', mapping=None): + """ + Encodes a plaintext into popular Morse Code with letters + separated by ``sep`` and words by a double ``sep``. + + Examples + ======== + + >>> from sympy.crypto.crypto import encode_morse + >>> msg = 'ATTACK RIGHT FLANK' + >>> encode_morse(msg) + '.-|-|-|.-|-.-.|-.-||.-.|..|--.|....|-||..-.|.-..|.-|-.|-.-' + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Morse_code + + """ + + mapping = mapping or char_morse + assert sep not in mapping + word_sep = 2*sep + mapping[" "] = word_sep + suffix = msg and msg[-1] in whitespace + + # normalize whitespace + msg = (' ' if word_sep else '').join(msg.split()) + # omit unmapped chars + chars = set(''.join(msg.split())) + ok = set(mapping.keys()) + msg = translate(msg, None, ''.join(chars - ok)) + + morsestring = [] + words = msg.split() + for word in words: + morseword = [] + for letter in word: + morseletter = mapping[letter] + morseword.append(morseletter) + + word = sep.join(morseword) + morsestring.append(word) + + return word_sep.join(morsestring) + (word_sep if suffix else '') + + +def decode_morse(msg, sep='|', mapping=None): + """ + Decodes a Morse Code with letters separated by ``sep`` + (default is '|') and words by `word_sep` (default is '||) + into plaintext. + + Examples + ======== + + >>> from sympy.crypto.crypto import decode_morse + >>> mc = '--|---|...-|.||.|.-|...|-' + >>> decode_morse(mc) + 'MOVE EAST' + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Morse_code + + """ + + mapping = mapping or morse_char + word_sep = 2*sep + characterstring = [] + words = msg.strip(word_sep).split(word_sep) + for word in words: + letters = word.split(sep) + chars = [mapping[c] for c in letters] + word = ''.join(chars) + characterstring.append(word) + rv = " ".join(characterstring) + return rv + + +#################### LFSRs ########################################## + + +@doctest_depends_on(ground_types=['python', 'gmpy']) +def lfsr_sequence(key, fill, n): + r""" + This function creates an LFSR sequence. + + Parameters + ========== + + key : list + A list of finite field elements, `[c_0, c_1, \ldots, c_k].` + + fill : list + The list of the initial terms of the LFSR sequence, + `[x_0, x_1, \ldots, x_k].` + + n + Number of terms of the sequence that the function returns. + + Returns + ======= + + L + The LFSR sequence defined by + `x_{n+1} = c_k x_n + \ldots + c_0 x_{n-k}`, for + `n \leq k`. + + Notes + ===== + + S. Golomb [G]_ gives a list of three statistical properties a + sequence of numbers `a = \{a_n\}_{n=1}^\infty`, + `a_n \in \{0,1\}`, should display to be considered + "random". Define the autocorrelation of `a` to be + + .. math:: + + C(k) = C(k,a) = \lim_{N\rightarrow \infty} {1\over N}\sum_{n=1}^N (-1)^{a_n + a_{n+k}}. + + In the case where `a` is periodic with period + `P` then this reduces to + + .. math:: + + C(k) = {1\over P}\sum_{n=1}^P (-1)^{a_n + a_{n+k}}. + + Assume `a` is periodic with period `P`. + + - balance: + + .. math:: + + \left|\sum_{n=1}^P(-1)^{a_n}\right| \leq 1. + + - low autocorrelation: + + .. math:: + + C(k) = \left\{ \begin{array}{cc} 1,& k = 0,\\ \epsilon, & k \ne 0. \end{array} \right. + + (For sequences satisfying these first two properties, it is known + that `\epsilon = -1/P` must hold.) + + - proportional runs property: In each period, half the runs have + length `1`, one-fourth have length `2`, etc. + Moreover, there are as many runs of `1`'s as there are of + `0`'s. + + Examples + ======== + + >>> from sympy.crypto.crypto import lfsr_sequence + >>> from sympy.polys.domains import FF + >>> F = FF(2) + >>> fill = [F(1), F(1), F(0), F(1)] + >>> key = [F(1), F(0), F(0), F(1)] + >>> lfsr_sequence(key, fill, 10) + [1 mod 2, 1 mod 2, 0 mod 2, 1 mod 2, 0 mod 2, + 1 mod 2, 1 mod 2, 0 mod 2, 0 mod 2, 1 mod 2] + + References + ========== + + .. [G] Solomon Golomb, Shift register sequences, Aegean Park Press, + Laguna Hills, Ca, 1967 + + """ + if not isinstance(key, list): + raise TypeError("key must be a list") + if not isinstance(fill, list): + raise TypeError("fill must be a list") + p = key[0].modulus() + F = FF(p) + s = fill + k = len(fill) + L = [] + for i in range(n): + s0 = s[:] + L.append(s[0]) + s = s[1:k] + x = sum(int(key[i]*s0[i]) for i in range(k)) + s.append(F(x)) + return L # use [int(x) for x in L] for int version + + +def lfsr_autocorrelation(L, P, k): + """ + This function computes the LFSR autocorrelation function. + + Parameters + ========== + + L + A periodic sequence of elements of `GF(2)`. + L must have length larger than P. + + P + The period of L. + + k : int + An integer `k` (`0 < k < P`). + + Returns + ======= + + autocorrelation + The k-th value of the autocorrelation of the LFSR L. + + Examples + ======== + + >>> from sympy.crypto.crypto import ( + ... lfsr_sequence, lfsr_autocorrelation) + >>> from sympy.polys.domains import FF + >>> F = FF(2) + >>> fill = [F(1), F(1), F(0), F(1)] + >>> key = [F(1), F(0), F(0), F(1)] + >>> s = lfsr_sequence(key, fill, 20) + >>> lfsr_autocorrelation(s, 15, 7) + -1/15 + >>> lfsr_autocorrelation(s, 15, 0) + 1 + + """ + if not isinstance(L, list): + raise TypeError("L (=%s) must be a list" % L) + P = int(P) + k = int(k) + L0 = L[:P] # slices makes a copy + L1 = L0 + L0[:k] + L2 = [(-1)**(int(L1[i]) + int(L1[i + k])) for i in range(P)] + tot = sum(L2) + return Rational(tot, P) + + +def lfsr_connection_polynomial(s): + """ + This function computes the LFSR connection polynomial. + + Parameters + ========== + + s + A sequence of elements of even length, with entries in a finite + field. + + Returns + ======= + + C(x) + The connection polynomial of a minimal LFSR yielding s. + + This implements the algorithm in section 3 of J. L. Massey's + article [M]_. + + Examples + ======== + + >>> from sympy.crypto.crypto import ( + ... lfsr_sequence, lfsr_connection_polynomial) + >>> from sympy.polys.domains import FF + >>> F = FF(2) + >>> fill = [F(1), F(1), F(0), F(1)] + >>> key = [F(1), F(0), F(0), F(1)] + >>> s = lfsr_sequence(key, fill, 20) + >>> lfsr_connection_polynomial(s) + x**4 + x + 1 + >>> fill = [F(1), F(0), F(0), F(1)] + >>> key = [F(1), F(1), F(0), F(1)] + >>> s = lfsr_sequence(key, fill, 20) + >>> lfsr_connection_polynomial(s) + x**3 + 1 + >>> fill = [F(1), F(0), F(1)] + >>> key = [F(1), F(1), F(0)] + >>> s = lfsr_sequence(key, fill, 20) + >>> lfsr_connection_polynomial(s) + x**3 + x**2 + 1 + >>> fill = [F(1), F(0), F(1)] + >>> key = [F(1), F(0), F(1)] + >>> s = lfsr_sequence(key, fill, 20) + >>> lfsr_connection_polynomial(s) + x**3 + x + 1 + + References + ========== + + .. [M] James L. Massey, "Shift-Register Synthesis and BCH Decoding." + IEEE Trans. on Information Theory, vol. 15(1), pp. 122-127, + Jan 1969. + + """ + # Initialization: + p = s[0].modulus() + x = Symbol("x") + C = 1*x**0 + B = 1*x**0 + m = 1 + b = 1*x**0 + L = 0 + N = 0 + while N < len(s): + if L > 0: + dC = Poly(C).degree() + r = min(L + 1, dC + 1) + coeffsC = [C.subs(x, 0)] + [C.coeff(x**i) + for i in range(1, dC + 1)] + d = (int(s[N]) + sum(coeffsC[i]*int(s[N - i]) + for i in range(1, r))) % p + if L == 0: + d = int(s[N])*x**0 + if d == 0: + m += 1 + N += 1 + if d > 0: + if 2*L > N: + C = (C - d*((b**(p - 2)) % p)*x**m*B).expand() + m += 1 + N += 1 + else: + T = C + C = (C - d*((b**(p - 2)) % p)*x**m*B).expand() + L = N + 1 - L + m = 1 + b = d + B = T + N += 1 + dC = Poly(C).degree() + coeffsC = [C.subs(x, 0)] + [C.coeff(x**i) for i in range(1, dC + 1)] + return sum(coeffsC[i] % p*x**i for i in range(dC + 1) + if coeffsC[i] is not None) + + +#################### ElGamal ############################# + + +def elgamal_private_key(digit=10, seed=None): + r""" + Return three number tuple as private key. + + Explanation + =========== + + Elgamal encryption is based on the mathematical problem + called the Discrete Logarithm Problem (DLP). For example, + + `a^{b} \equiv c \pmod p` + + In general, if ``a`` and ``b`` are known, ``ct`` is easily + calculated. If ``b`` is unknown, it is hard to use + ``a`` and ``ct`` to get ``b``. + + Parameters + ========== + + digit : int + Minimum number of binary digits for key. + + Returns + ======= + + tuple : (p, r, d) + p = prime number. + + r = primitive root. + + d = random number. + + Notes + ===== + + For testing purposes, the ``seed`` parameter may be set to control + the output of this routine. See sympy.core.random._randrange. + + Examples + ======== + + >>> from sympy.crypto.crypto import elgamal_private_key + >>> from sympy.ntheory import is_primitive_root, isprime + >>> a, b, _ = elgamal_private_key() + >>> isprime(a) + True + >>> is_primitive_root(b, a) + True + + """ + randrange = _randrange(seed) + p = nextprime(2**digit) + return p, primitive_root(p), randrange(2, p) + + +def elgamal_public_key(key): + r""" + Return three number tuple as public key. + + Parameters + ========== + + key : (p, r, e) + Tuple generated by ``elgamal_private_key``. + + Returns + ======= + + tuple : (p, r, e) + `e = r**d \bmod p` + + `d` is a random number in private key. + + Examples + ======== + + >>> from sympy.crypto.crypto import elgamal_public_key + >>> elgamal_public_key((1031, 14, 636)) + (1031, 14, 212) + + """ + p, r, e = key + return p, r, pow(r, e, p) + + +def encipher_elgamal(i, key, seed=None): + r""" + Encrypt message with public key. + + Explanation + =========== + + ``i`` is a plaintext message expressed as an integer. + ``key`` is public key (p, r, e). In order to encrypt + a message, a random number ``a`` in ``range(2, p)`` + is generated and the encrypted message is returned as + `c_{1}` and `c_{2}` where: + + `c_{1} \equiv r^{a} \pmod p` + + `c_{2} \equiv m e^{a} \pmod p` + + Parameters + ========== + + msg + int of encoded message. + + key + Public key. + + Returns + ======= + + tuple : (c1, c2) + Encipher into two number. + + Notes + ===== + + For testing purposes, the ``seed`` parameter may be set to control + the output of this routine. See sympy.core.random._randrange. + + Examples + ======== + + >>> from sympy.crypto.crypto import encipher_elgamal, elgamal_private_key, elgamal_public_key + >>> pri = elgamal_private_key(5, seed=[3]); pri + (37, 2, 3) + >>> pub = elgamal_public_key(pri); pub + (37, 2, 8) + >>> msg = 36 + >>> encipher_elgamal(msg, pub, seed=[3]) + (8, 6) + + """ + p, r, e = key + if i < 0 or i >= p: + raise ValueError( + 'Message (%s) should be in range(%s)' % (i, p)) + randrange = _randrange(seed) + a = randrange(2, p) + return pow(r, a, p), i*pow(e, a, p) % p + + +def decipher_elgamal(msg, key): + r""" + Decrypt message with private key. + + `msg = (c_{1}, c_{2})` + + `key = (p, r, d)` + + According to extended Eucliden theorem, + `u c_{1}^{d} + p n = 1` + + `u \equiv 1/{{c_{1}}^d} \pmod p` + + `u c_{2} \equiv \frac{1}{c_{1}^d} c_{2} \equiv \frac{1}{r^{ad}} c_{2} \pmod p` + + `\frac{1}{r^{ad}} m e^a \equiv \frac{1}{r^{ad}} m {r^{d a}} \equiv m \pmod p` + + Examples + ======== + + >>> from sympy.crypto.crypto import decipher_elgamal + >>> from sympy.crypto.crypto import encipher_elgamal + >>> from sympy.crypto.crypto import elgamal_private_key + >>> from sympy.crypto.crypto import elgamal_public_key + + >>> pri = elgamal_private_key(5, seed=[3]) + >>> pub = elgamal_public_key(pri); pub + (37, 2, 8) + >>> msg = 17 + >>> decipher_elgamal(encipher_elgamal(msg, pub), pri) == msg + True + + """ + p, _, d = key + c1, c2 = msg + u = pow(c1, -d, p) + return u * c2 % p + + +################ Diffie-Hellman Key Exchange ######################### + +def dh_private_key(digit=10, seed=None): + r""" + Return three integer tuple as private key. + + Explanation + =========== + + Diffie-Hellman key exchange is based on the mathematical problem + called the Discrete Logarithm Problem (see ElGamal). + + Diffie-Hellman key exchange is divided into the following steps: + + * Alice and Bob agree on a base that consist of a prime ``p`` + and a primitive root of ``p`` called ``g`` + * Alice choses a number ``a`` and Bob choses a number ``b`` where + ``a`` and ``b`` are random numbers in range `[2, p)`. These are + their private keys. + * Alice then publicly sends Bob `g^{a} \pmod p` while Bob sends + Alice `g^{b} \pmod p` + * They both raise the received value to their secretly chosen + number (``a`` or ``b``) and now have both as their shared key + `g^{ab} \pmod p` + + Parameters + ========== + + digit + Minimum number of binary digits required in key. + + Returns + ======= + + tuple : (p, g, a) + p = prime number. + + g = primitive root of p. + + a = random number from 2 through p - 1. + + Notes + ===== + + For testing purposes, the ``seed`` parameter may be set to control + the output of this routine. See sympy.core.random._randrange. + + Examples + ======== + + >>> from sympy.crypto.crypto import dh_private_key + >>> from sympy.ntheory import isprime, is_primitive_root + >>> p, g, _ = dh_private_key() + >>> isprime(p) + True + >>> is_primitive_root(g, p) + True + >>> p, g, _ = dh_private_key(5) + >>> isprime(p) + True + >>> is_primitive_root(g, p) + True + + """ + p = nextprime(2**digit) + g = primitive_root(p) + randrange = _randrange(seed) + a = randrange(2, p) + return p, g, a + + +def dh_public_key(key): + r""" + Return three number tuple as public key. + + This is the tuple that Alice sends to Bob. + + Parameters + ========== + + key : (p, g, a) + A tuple generated by ``dh_private_key``. + + Returns + ======= + + tuple : int, int, int + A tuple of `(p, g, g^a \mod p)` with `p`, `g` and `a` given as + parameters.s + + Examples + ======== + + >>> from sympy.crypto.crypto import dh_private_key, dh_public_key + >>> p, g, a = dh_private_key(); + >>> _p, _g, x = dh_public_key((p, g, a)) + >>> p == _p and g == _g + True + >>> x == pow(g, a, p) + True + + """ + p, g, a = key + return p, g, pow(g, a, p) + + +def dh_shared_key(key, b): + """ + Return an integer that is the shared key. + + This is what Bob and Alice can both calculate using the public + keys they received from each other and their private keys. + + Parameters + ========== + + key : (p, g, x) + Tuple `(p, g, x)` generated by ``dh_public_key``. + + b + Random number in the range of `2` to `p - 1` + (Chosen by second key exchange member (Bob)). + + Returns + ======= + + int + A shared key. + + Examples + ======== + + >>> from sympy.crypto.crypto import ( + ... dh_private_key, dh_public_key, dh_shared_key) + >>> prk = dh_private_key(); + >>> p, g, x = dh_public_key(prk); + >>> sk = dh_shared_key((p, g, x), 1000) + >>> sk == pow(x, 1000, p) + True + + """ + p, _, x = key + if 1 >= b or b >= p: + raise ValueError(filldedent(''' + Value of b should be greater 1 and less + than prime %s.''' % p)) + + return pow(x, b, p) + + +################ Goldwasser-Micali Encryption ######################### + + +def _legendre(a, p): + """ + Returns the legendre symbol of a and p + assuming that p is a prime. + + i.e. 1 if a is a quadratic residue mod p + -1 if a is not a quadratic residue mod p + 0 if a is divisible by p + + Parameters + ========== + + a : int + The number to test. + + p : prime + The prime to test ``a`` against. + + Returns + ======= + + int + Legendre symbol (a / p). + + """ + sig = pow(a, (p - 1)//2, p) + if sig == 1: + return 1 + elif sig == 0: + return 0 + else: + return -1 + + +def _random_coprime_stream(n, seed=None): + randrange = _randrange(seed) + while True: + y = randrange(n) + if gcd(y, n) == 1: + yield y + + +def gm_private_key(p, q, a=None): + r""" + Check if ``p`` and ``q`` can be used as private keys for + the Goldwasser-Micali encryption. The method works + roughly as follows. + + Explanation + =========== + + #. Pick two large primes $p$ and $q$. + #. Call their product $N$. + #. Given a message as an integer $i$, write $i$ in its bit representation $b_0, \dots, b_n$. + #. For each $k$, + + if $b_k = 0$: + let $a_k$ be a random square + (quadratic residue) modulo $p q$ + such that ``jacobi_symbol(a, p*q) = 1`` + if $b_k = 1$: + let $a_k$ be a random non-square + (non-quadratic residue) modulo $p q$ + such that ``jacobi_symbol(a, p*q) = 1`` + + returns $\left[a_1, a_2, \dots\right]$ + + $b_k$ can be recovered by checking whether or not + $a_k$ is a residue. And from the $b_k$'s, the message + can be reconstructed. + + The idea is that, while ``jacobi_symbol(a, p*q)`` + can be easily computed (and when it is equal to $-1$ will + tell you that $a$ is not a square mod $p q$), quadratic + residuosity modulo a composite number is hard to compute + without knowing its factorization. + + Moreover, approximately half the numbers coprime to $p q$ have + :func:`~.jacobi_symbol` equal to $1$ . And among those, approximately half + are residues and approximately half are not. This maximizes the + entropy of the code. + + Parameters + ========== + + p, q, a + Initialization variables. + + Returns + ======= + + tuple : (p, q) + The input value ``p`` and ``q``. + + Raises + ====== + + ValueError + If ``p`` and ``q`` are not distinct odd primes. + + """ + if p == q: + raise ValueError("expected distinct primes, " + "got two copies of %i" % p) + elif not isprime(p) or not isprime(q): + raise ValueError("first two arguments must be prime, " + "got %i of %i" % (p, q)) + elif p == 2 or q == 2: + raise ValueError("first two arguments must not be even, " + "got %i of %i" % (p, q)) + return p, q + + +def gm_public_key(p, q, a=None, seed=None): + """ + Compute public keys for ``p`` and ``q``. + Note that in Goldwasser-Micali Encryption, + public keys are randomly selected. + + Parameters + ========== + + p, q, a : int, int, int + Initialization variables. + + Returns + ======= + + tuple : (a, N) + ``a`` is the input ``a`` if it is not ``None`` otherwise + some random integer coprime to ``p`` and ``q``. + + ``N`` is the product of ``p`` and ``q``. + + """ + + p, q = gm_private_key(p, q) + N = p * q + + if a is None: + randrange = _randrange(seed) + while True: + a = randrange(N) + if _legendre(a, p) == _legendre(a, q) == -1: + break + else: + if _legendre(a, p) != -1 or _legendre(a, q) != -1: + return False + return (a, N) + + +def encipher_gm(i, key, seed=None): + """ + Encrypt integer 'i' using public_key 'key' + Note that gm uses random encryption. + + Parameters + ========== + + i : int + The message to encrypt. + + key : (a, N) + The public key. + + Returns + ======= + + list : list of int + The randomized encrypted message. + + """ + if i < 0: + raise ValueError( + "message must be a non-negative " + "integer: got %d instead" % i) + a, N = key + bits = [] + while i > 0: + bits.append(i % 2) + i //= 2 + + gen = _random_coprime_stream(N, seed) + rev = reversed(bits) + encode = lambda b: next(gen)**2*pow(a, b) % N + return [ encode(b) for b in rev ] + + + +def decipher_gm(message, key): + """ + Decrypt message 'message' using public_key 'key'. + + Parameters + ========== + + message : list of int + The randomized encrypted message. + + key : (p, q) + The private key. + + Returns + ======= + + int + The encrypted message. + + """ + p, q = key + res = lambda m, p: _legendre(m, p) > 0 + bits = [res(m, p) * res(m, q) for m in message] + m = 0 + for b in bits: + m <<= 1 + m += not b + return m + + + +########### RailFence Cipher ############# + +def encipher_railfence(message,rails): + """ + Performs Railfence Encryption on plaintext and returns ciphertext + + Examples + ======== + + >>> from sympy.crypto.crypto import encipher_railfence + >>> message = "hello world" + >>> encipher_railfence(message,3) + 'horel ollwd' + + Parameters + ========== + + message : string, the message to encrypt. + rails : int, the number of rails. + + Returns + ======= + + The Encrypted string message. + + References + ========== + .. [1] https://en.wikipedia.org/wiki/Rail_fence_cipher + + """ + r = list(range(rails)) + p = cycle(r + r[-2:0:-1]) + return ''.join(sorted(message, key=lambda i: next(p))) + + +def decipher_railfence(ciphertext,rails): + """ + Decrypt the message using the given rails + + Examples + ======== + + >>> from sympy.crypto.crypto import decipher_railfence + >>> decipher_railfence("horel ollwd",3) + 'hello world' + + Parameters + ========== + + message : string, the message to encrypt. + rails : int, the number of rails. + + Returns + ======= + + The Decrypted string message. + + """ + r = list(range(rails)) + p = cycle(r + r[-2:0:-1]) + + idx = sorted(range(len(ciphertext)), key=lambda i: next(p)) + res = [''] * len(ciphertext) + for i, c in zip(idx, ciphertext): + res[i] = c + return ''.join(res) + + +################ Blum-Goldwasser cryptosystem ######################### + +def bg_private_key(p, q): + """ + Check if p and q can be used as private keys for + the Blum-Goldwasser cryptosystem. + + Explanation + =========== + + The three necessary checks for p and q to pass + so that they can be used as private keys: + + 1. p and q must both be prime + 2. p and q must be distinct + 3. p and q must be congruent to 3 mod 4 + + Parameters + ========== + + p, q + The keys to be checked. + + Returns + ======= + + p, q + Input values. + + Raises + ====== + + ValueError + If p and q do not pass the above conditions. + + """ + + if not isprime(p) or not isprime(q): + raise ValueError("the two arguments must be prime, " + "got %i and %i" %(p, q)) + elif p == q: + raise ValueError("the two arguments must be distinct, " + "got two copies of %i. " %p) + elif (p - 3) % 4 != 0 or (q - 3) % 4 != 0: + raise ValueError("the two arguments must be congruent to 3 mod 4, " + "got %i and %i" %(p, q)) + return p, q + +def bg_public_key(p, q): + """ + Calculates public keys from private keys. + + Explanation + =========== + + The function first checks the validity of + private keys passed as arguments and + then returns their product. + + Parameters + ========== + + p, q + The private keys. + + Returns + ======= + + N + The public key. + + """ + p, q = bg_private_key(p, q) + N = p * q + return N + +def encipher_bg(i, key, seed=None): + """ + Encrypts the message using public key and seed. + + Explanation + =========== + + ALGORITHM: + 1. Encodes i as a string of L bits, m. + 2. Select a random element r, where 1 < r < key, and computes + x = r^2 mod key. + 3. Use BBS pseudo-random number generator to generate L random bits, b, + using the initial seed as x. + 4. Encrypted message, c_i = m_i XOR b_i, 1 <= i <= L. + 5. x_L = x^(2^L) mod key. + 6. Return (c, x_L) + + Parameters + ========== + + i + Message, a non-negative integer + + key + The public key + + Returns + ======= + + Tuple + (encrypted_message, x_L) + + Raises + ====== + + ValueError + If i is negative. + + """ + + if i < 0: + raise ValueError( + "message must be a non-negative " + "integer: got %d instead" % i) + + enc_msg = [] + while i > 0: + enc_msg.append(i % 2) + i //= 2 + enc_msg.reverse() + L = len(enc_msg) + + r = _randint(seed)(2, key - 1) + x = r**2 % key + x_L = pow(int(x), int(2**L), int(key)) + + rand_bits = [] + for _ in range(L): + rand_bits.append(x % 2) + x = x**2 % key + + encrypt_msg = [m ^ b for (m, b) in zip(enc_msg, rand_bits)] + + return (encrypt_msg, x_L) + +def decipher_bg(message, key): + """ + Decrypts the message using private keys. + + Explanation + =========== + + ALGORITHM: + 1. Let, c be the encrypted message, y the second number received, + and p and q be the private keys. + 2. Compute, r_p = y^((p+1)/4 ^ L) mod p and + r_q = y^((q+1)/4 ^ L) mod q. + 3. Compute x_0 = (q(q^-1 mod p)r_p + p(p^-1 mod q)r_q) mod N. + 4. From, recompute the bits using the BBS generator, as in the + encryption algorithm. + 5. Compute original message by XORing c and b. + + Parameters + ========== + + message + Tuple of encrypted message and a non-negative integer. + + key + Tuple of private keys. + + Returns + ======= + + orig_msg + The original message + + """ + + p, q = key + encrypt_msg, y = message + public_key = p * q + L = len(encrypt_msg) + p_t = ((p + 1)/4)**L + q_t = ((q + 1)/4)**L + r_p = pow(int(y), int(p_t), int(p)) + r_q = pow(int(y), int(q_t), int(q)) + + x = (q * invert(q, p) * r_p + p * invert(p, q) * r_q) % public_key + + orig_bits = [] + for _ in range(L): + orig_bits.append(x % 2) + x = x**2 % public_key + + orig_msg = 0 + for (m, b) in zip(encrypt_msg, orig_bits): + orig_msg = orig_msg * 2 + orig_msg += (m ^ b) + + return orig_msg diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/crypto/tests/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/crypto/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/crypto/tests/test_crypto.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/crypto/tests/test_crypto.py new file mode 100644 index 0000000000000000000000000000000000000000..c671138f9a61325f6e65cc7cafddc7cd46f19229 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/crypto/tests/test_crypto.py @@ -0,0 +1,562 @@ +from sympy.core import symbols +from sympy.crypto.crypto import (cycle_list, + encipher_shift, encipher_affine, encipher_substitution, + check_and_join, encipher_vigenere, decipher_vigenere, + encipher_hill, decipher_hill, encipher_bifid5, encipher_bifid6, + bifid5_square, bifid6_square, bifid5, bifid6, + decipher_bifid5, decipher_bifid6, encipher_kid_rsa, + decipher_kid_rsa, kid_rsa_private_key, kid_rsa_public_key, + decipher_rsa, rsa_private_key, rsa_public_key, encipher_rsa, + lfsr_connection_polynomial, lfsr_autocorrelation, lfsr_sequence, + encode_morse, decode_morse, elgamal_private_key, elgamal_public_key, + encipher_elgamal, decipher_elgamal, dh_private_key, dh_public_key, + dh_shared_key, decipher_shift, decipher_affine, encipher_bifid, + decipher_bifid, bifid_square, padded_key, uniq, decipher_gm, + encipher_gm, gm_public_key, gm_private_key, encipher_bg, decipher_bg, + bg_private_key, bg_public_key, encipher_rot13, decipher_rot13, + encipher_atbash, decipher_atbash, NonInvertibleCipherWarning, + encipher_railfence, decipher_railfence) +from sympy.external.gmpy import gcd +from sympy.matrices import Matrix +from sympy.ntheory import isprime, is_primitive_root +from sympy.polys.domains import FF + +from sympy.testing.pytest import raises, warns + +from sympy.core.random import randrange + +def test_encipher_railfence(): + assert encipher_railfence("hello world",2) == "hlowrdel ol" + assert encipher_railfence("hello world",3) == "horel ollwd" + assert encipher_railfence("hello world",4) == "hwe olordll" + +def test_decipher_railfence(): + assert decipher_railfence("hlowrdel ol",2) == "hello world" + assert decipher_railfence("horel ollwd",3) == "hello world" + assert decipher_railfence("hwe olordll",4) == "hello world" + + +def test_cycle_list(): + assert cycle_list(3, 4) == [3, 0, 1, 2] + assert cycle_list(-1, 4) == [3, 0, 1, 2] + assert cycle_list(1, 4) == [1, 2, 3, 0] + + +def test_encipher_shift(): + assert encipher_shift("ABC", 0) == "ABC" + assert encipher_shift("ABC", 1) == "BCD" + assert encipher_shift("ABC", -1) == "ZAB" + assert decipher_shift("ZAB", -1) == "ABC" + +def test_encipher_rot13(): + assert encipher_rot13("ABC") == "NOP" + assert encipher_rot13("NOP") == "ABC" + assert decipher_rot13("ABC") == "NOP" + assert decipher_rot13("NOP") == "ABC" + + +def test_encipher_affine(): + assert encipher_affine("ABC", (1, 0)) == "ABC" + assert encipher_affine("ABC", (1, 1)) == "BCD" + assert encipher_affine("ABC", (-1, 0)) == "AZY" + assert encipher_affine("ABC", (-1, 1), symbols="ABCD") == "BAD" + assert encipher_affine("123", (-1, 1), symbols="1234") == "214" + assert encipher_affine("ABC", (3, 16)) == "QTW" + assert decipher_affine("QTW", (3, 16)) == "ABC" + +def test_encipher_atbash(): + assert encipher_atbash("ABC") == "ZYX" + assert encipher_atbash("ZYX") == "ABC" + assert decipher_atbash("ABC") == "ZYX" + assert decipher_atbash("ZYX") == "ABC" + +def test_encipher_substitution(): + assert encipher_substitution("ABC", "BAC", "ABC") == "BAC" + assert encipher_substitution("123", "1243", "1234") == "124" + + +def test_check_and_join(): + assert check_and_join("abc") == "abc" + assert check_and_join(uniq("aaabc")) == "abc" + assert check_and_join("ab c".split()) == "abc" + assert check_and_join("abc", "a", filter=True) == "a" + raises(ValueError, lambda: check_and_join('ab', 'a')) + + +def test_encipher_vigenere(): + assert encipher_vigenere("ABC", "ABC") == "ACE" + assert encipher_vigenere("ABC", "ABC", symbols="ABCD") == "ACA" + assert encipher_vigenere("ABC", "AB", symbols="ABCD") == "ACC" + assert encipher_vigenere("AB", "ABC", symbols="ABCD") == "AC" + assert encipher_vigenere("A", "ABC", symbols="ABCD") == "A" + + +def test_decipher_vigenere(): + assert decipher_vigenere("ABC", "ABC") == "AAA" + assert decipher_vigenere("ABC", "ABC", symbols="ABCD") == "AAA" + assert decipher_vigenere("ABC", "AB", symbols="ABCD") == "AAC" + assert decipher_vigenere("AB", "ABC", symbols="ABCD") == "AA" + assert decipher_vigenere("A", "ABC", symbols="ABCD") == "A" + + +def test_encipher_hill(): + A = Matrix(2, 2, [1, 2, 3, 5]) + assert encipher_hill("ABCD", A) == "CFIV" + A = Matrix(2, 2, [1, 0, 0, 1]) + assert encipher_hill("ABCD", A) == "ABCD" + assert encipher_hill("ABCD", A, symbols="ABCD") == "ABCD" + A = Matrix(2, 2, [1, 2, 3, 5]) + assert encipher_hill("ABCD", A, symbols="ABCD") == "CBAB" + assert encipher_hill("AB", A, symbols="ABCD") == "CB" + # message length, n, does not need to be a multiple of k; + # it is padded + assert encipher_hill("ABA", A) == "CFGC" + assert encipher_hill("ABA", A, pad="Z") == "CFYV" + + +def test_decipher_hill(): + A = Matrix(2, 2, [1, 2, 3, 5]) + assert decipher_hill("CFIV", A) == "ABCD" + A = Matrix(2, 2, [1, 0, 0, 1]) + assert decipher_hill("ABCD", A) == "ABCD" + assert decipher_hill("ABCD", A, symbols="ABCD") == "ABCD" + A = Matrix(2, 2, [1, 2, 3, 5]) + assert decipher_hill("CBAB", A, symbols="ABCD") == "ABCD" + assert decipher_hill("CB", A, symbols="ABCD") == "AB" + # n does not need to be a multiple of k + assert decipher_hill("CFA", A) == "ABAA" + + +def test_encipher_bifid5(): + assert encipher_bifid5("AB", "AB") == "AB" + assert encipher_bifid5("AB", "CD") == "CO" + assert encipher_bifid5("ab", "c") == "CH" + assert encipher_bifid5("a bc", "b") == "BAC" + + +def test_bifid5_square(): + A = bifid5 + f = lambda i, j: symbols(A[5*i + j]) + M = Matrix(5, 5, f) + assert bifid5_square("") == M + + +def test_decipher_bifid5(): + assert decipher_bifid5("AB", "AB") == "AB" + assert decipher_bifid5("CO", "CD") == "AB" + assert decipher_bifid5("ch", "c") == "AB" + assert decipher_bifid5("b ac", "b") == "ABC" + + +def test_encipher_bifid6(): + assert encipher_bifid6("AB", "AB") == "AB" + assert encipher_bifid6("AB", "CD") == "CP" + assert encipher_bifid6("ab", "c") == "CI" + assert encipher_bifid6("a bc", "b") == "BAC" + + +def test_decipher_bifid6(): + assert decipher_bifid6("AB", "AB") == "AB" + assert decipher_bifid6("CP", "CD") == "AB" + assert decipher_bifid6("ci", "c") == "AB" + assert decipher_bifid6("b ac", "b") == "ABC" + + +def test_bifid6_square(): + A = bifid6 + f = lambda i, j: symbols(A[6*i + j]) + M = Matrix(6, 6, f) + assert bifid6_square("") == M + + +def test_rsa_public_key(): + assert rsa_public_key(2, 3, 1) == (6, 1) + assert rsa_public_key(5, 3, 3) == (15, 3) + + with warns(NonInvertibleCipherWarning): + assert rsa_public_key(2, 2, 1) == (4, 1) + assert rsa_public_key(8, 8, 8) is False + + +def test_rsa_private_key(): + assert rsa_private_key(2, 3, 1) == (6, 1) + assert rsa_private_key(5, 3, 3) == (15, 3) + assert rsa_private_key(23,29,5) == (667,493) + + with warns(NonInvertibleCipherWarning): + assert rsa_private_key(2, 2, 1) == (4, 1) + assert rsa_private_key(8, 8, 8) is False + + +def test_rsa_large_key(): + # Sample from + # http://www.herongyang.com/Cryptography/JCE-Public-Key-RSA-Private-Public-Key-Pair-Sample.html + p = int('101565610013301240713207239558950144682174355406589305284428666'\ + '903702505233009') + q = int('894687191887545488935455605955948413812376003053143521429242133'\ + '12069293984003') + e = int('65537') + d = int('893650581832704239530398858744759129594796235440844479456143566'\ + '6999402846577625762582824202269399672579058991442587406384754958587'\ + '400493169361356902030209') + assert rsa_public_key(p, q, e) == (p*q, e) + assert rsa_private_key(p, q, e) == (p*q, d) + + +def test_encipher_rsa(): + puk = rsa_public_key(2, 3, 1) + assert encipher_rsa(2, puk) == 2 + puk = rsa_public_key(5, 3, 3) + assert encipher_rsa(2, puk) == 8 + + with warns(NonInvertibleCipherWarning): + puk = rsa_public_key(2, 2, 1) + assert encipher_rsa(2, puk) == 2 + + +def test_decipher_rsa(): + prk = rsa_private_key(2, 3, 1) + assert decipher_rsa(2, prk) == 2 + prk = rsa_private_key(5, 3, 3) + assert decipher_rsa(8, prk) == 2 + + with warns(NonInvertibleCipherWarning): + prk = rsa_private_key(2, 2, 1) + assert decipher_rsa(2, prk) == 2 + + +def test_mutltiprime_rsa_full_example(): + # Test example from + # https://iopscience.iop.org/article/10.1088/1742-6596/995/1/012030 + puk = rsa_public_key(2, 3, 5, 7, 11, 13, 7) + prk = rsa_private_key(2, 3, 5, 7, 11, 13, 7) + assert puk == (30030, 7) + assert prk == (30030, 823) + + msg = 10 + encrypted = encipher_rsa(2 * msg - 15, puk) + assert encrypted == 18065 + decrypted = (decipher_rsa(encrypted, prk) + 15) / 2 + assert decrypted == msg + + # Test example from + # https://www.scirp.org/pdf/JCC_2018032215502008.pdf + puk1 = rsa_public_key(53, 41, 43, 47, 41) + prk1 = rsa_private_key(53, 41, 43, 47, 41) + puk2 = rsa_public_key(53, 41, 43, 47, 97) + prk2 = rsa_private_key(53, 41, 43, 47, 97) + + assert puk1 == (4391633, 41) + assert prk1 == (4391633, 294041) + assert puk2 == (4391633, 97) + assert prk2 == (4391633, 455713) + + msg = 12321 + encrypted = encipher_rsa(encipher_rsa(msg, puk1), puk2) + assert encrypted == 1081588 + decrypted = decipher_rsa(decipher_rsa(encrypted, prk2), prk1) + assert decrypted == msg + + +def test_rsa_crt_extreme(): + p = int( + '10177157607154245068023861503693082120906487143725062283406501' \ + '54082258226204046999838297167140821364638180697194879500245557' \ + '65445186962893346463841419427008800341257468600224049986260471' \ + '92257248163014468841725476918639415726709736077813632961290911' \ + '0256421232977833028677441206049309220354796014376698325101693') + + q = int( + '28752342353095132872290181526607275886182793241660805077850801' \ + '75689512797754286972952273553128181861830576836289738668745250' \ + '34028199691128870676414118458442900035778874482624765513861643' \ + '27966696316822188398336199002306588703902894100476186823849595' \ + '103239410527279605442148285816149368667083114802852804976893') + + r = int( + '17698229259868825776879500736350186838850961935956310134378261' \ + '89771862186717463067541369694816245225291921138038800171125596' \ + '07315449521981157084370187887650624061033066022458512942411841' \ + '18747893789972315277160085086164119879536041875335384844820566' \ + '0287479617671726408053319619892052000850883994343378882717849') + + s = int( + '68925428438585431029269182233502611027091755064643742383515623' \ + '64321310582896893395529367074942808353187138794422745718419645' \ + '28291231865157212604266903677599180789896916456120289112752835' \ + '98502265889669730331688206825220074713977607415178738015831030' \ + '364290585369150502819743827343552098197095520550865360159439' + ) + + t = int( + '69035483433453632820551311892368908779778144568711455301541094' \ + '31487047642322695357696860925747923189635033183069823820910521' \ + '71172909106797748883261493224162414050106920442445896819806600' \ + '15448444826108008217972129130625571421904893252804729877353352' \ + '739420480574842850202181462656251626522910618936534699566291' + ) + + e = 65537 + puk = rsa_public_key(p, q, r, s, t, e) + prk = rsa_private_key(p, q, r, s, t, e) + + plaintext = 1000 + ciphertext_1 = encipher_rsa(plaintext, puk) + ciphertext_2 = encipher_rsa(plaintext, puk, [p, q, r, s, t]) + assert ciphertext_1 == ciphertext_2 + assert decipher_rsa(ciphertext_1, prk) == \ + decipher_rsa(ciphertext_1, prk, [p, q, r, s, t]) + + +def test_rsa_exhaustive(): + p, q = 61, 53 + e = 17 + puk = rsa_public_key(p, q, e, totient='Carmichael') + prk = rsa_private_key(p, q, e, totient='Carmichael') + + for msg in range(puk[0]): + encrypted = encipher_rsa(msg, puk) + decrypted = decipher_rsa(encrypted, prk) + try: + assert decrypted == msg + except AssertionError: + raise AssertionError( + "The RSA is not correctly decrypted " \ + "(Original : {}, Encrypted : {}, Decrypted : {})" \ + .format(msg, encrypted, decrypted) + ) + + +def test_rsa_multiprime_exhanstive(): + primes = [3, 5, 7, 11] + e = 7 + args = primes + [e] + puk = rsa_public_key(*args, totient='Carmichael') + prk = rsa_private_key(*args, totient='Carmichael') + n = puk[0] + + for msg in range(n): + encrypted = encipher_rsa(msg, puk) + decrypted = decipher_rsa(encrypted, prk) + try: + assert decrypted == msg + except AssertionError: + raise AssertionError( + "The RSA is not correctly decrypted " \ + "(Original : {}, Encrypted : {}, Decrypted : {})" \ + .format(msg, encrypted, decrypted) + ) + + +def test_rsa_multipower_exhanstive(): + primes = [5, 5, 7] + e = 7 + args = primes + [e] + puk = rsa_public_key(*args, multipower=True) + prk = rsa_private_key(*args, multipower=True) + n = puk[0] + + for msg in range(n): + if gcd(msg, n) != 1: + continue + + encrypted = encipher_rsa(msg, puk) + decrypted = decipher_rsa(encrypted, prk) + try: + assert decrypted == msg + except AssertionError: + raise AssertionError( + "The RSA is not correctly decrypted " \ + "(Original : {}, Encrypted : {}, Decrypted : {})" \ + .format(msg, encrypted, decrypted) + ) + + +def test_kid_rsa_public_key(): + assert kid_rsa_public_key(1, 2, 1, 1) == (5, 2) + assert kid_rsa_public_key(1, 2, 2, 1) == (8, 3) + assert kid_rsa_public_key(1, 2, 1, 2) == (7, 2) + + +def test_kid_rsa_private_key(): + assert kid_rsa_private_key(1, 2, 1, 1) == (5, 3) + assert kid_rsa_private_key(1, 2, 2, 1) == (8, 3) + assert kid_rsa_private_key(1, 2, 1, 2) == (7, 4) + + +def test_encipher_kid_rsa(): + assert encipher_kid_rsa(1, (5, 2)) == 2 + assert encipher_kid_rsa(1, (8, 3)) == 3 + assert encipher_kid_rsa(1, (7, 2)) == 2 + + +def test_decipher_kid_rsa(): + assert decipher_kid_rsa(2, (5, 3)) == 1 + assert decipher_kid_rsa(3, (8, 3)) == 1 + assert decipher_kid_rsa(2, (7, 4)) == 1 + + +def test_encode_morse(): + assert encode_morse('ABC') == '.-|-...|-.-.' + assert encode_morse('SMS ') == '...|--|...||' + assert encode_morse('SMS\n') == '...|--|...||' + assert encode_morse('') == '' + assert encode_morse(' ') == '||' + assert encode_morse(' ', sep='`') == '``' + assert encode_morse(' ', sep='``') == '````' + assert encode_morse('!@#$%^&*()_+') == '-.-.--|.--.-.|...-..-|-.--.|-.--.-|..--.-|.-.-.' + assert encode_morse('12345') == '.----|..---|...--|....-|.....' + assert encode_morse('67890') == '-....|--...|---..|----.|-----' + + +def test_decode_morse(): + assert decode_morse('-.-|.|-.--') == 'KEY' + assert decode_morse('.-.|..-|-.||') == 'RUN' + raises(KeyError, lambda: decode_morse('.....----')) + + +def test_lfsr_sequence(): + raises(TypeError, lambda: lfsr_sequence(1, [1], 1)) + raises(TypeError, lambda: lfsr_sequence([1], 1, 1)) + F = FF(2) + assert lfsr_sequence([F(1)], [F(1)], 2) == [F(1), F(1)] + assert lfsr_sequence([F(0)], [F(1)], 2) == [F(1), F(0)] + F = FF(3) + assert lfsr_sequence([F(1)], [F(1)], 2) == [F(1), F(1)] + assert lfsr_sequence([F(0)], [F(2)], 2) == [F(2), F(0)] + assert lfsr_sequence([F(1)], [F(2)], 2) == [F(2), F(2)] + + +def test_lfsr_autocorrelation(): + raises(TypeError, lambda: lfsr_autocorrelation(1, 2, 3)) + F = FF(2) + s = lfsr_sequence([F(1), F(0)], [F(0), F(1)], 5) + assert lfsr_autocorrelation(s, 2, 0) == 1 + assert lfsr_autocorrelation(s, 2, 1) == -1 + + +def test_lfsr_connection_polynomial(): + F = FF(2) + x = symbols("x") + s = lfsr_sequence([F(1), F(0)], [F(0), F(1)], 5) + assert lfsr_connection_polynomial(s) == x**2 + 1 + s = lfsr_sequence([F(1), F(1)], [F(0), F(1)], 5) + assert lfsr_connection_polynomial(s) == x**2 + x + 1 + + +def test_elgamal_private_key(): + a, b, _ = elgamal_private_key(digit=100) + assert isprime(a) + assert is_primitive_root(b, a) + assert len(bin(a)) >= 102 + + +def test_elgamal(): + dk = elgamal_private_key(5) + ek = elgamal_public_key(dk) + P = ek[0] + assert P - 1 == decipher_elgamal(encipher_elgamal(P - 1, ek), dk) + raises(ValueError, lambda: encipher_elgamal(P, dk)) + raises(ValueError, lambda: encipher_elgamal(-1, dk)) + + +def test_dh_private_key(): + p, g, _ = dh_private_key(digit = 100) + assert isprime(p) + assert is_primitive_root(g, p) + assert len(bin(p)) >= 102 + + +def test_dh_public_key(): + p1, g1, a = dh_private_key(digit = 100) + p2, g2, ga = dh_public_key((p1, g1, a)) + assert p1 == p2 + assert g1 == g2 + assert ga == pow(g1, a, p1) + + +def test_dh_shared_key(): + prk = dh_private_key(digit = 100) + p, _, ga = dh_public_key(prk) + b = randrange(2, p) + sk = dh_shared_key((p, _, ga), b) + assert sk == pow(ga, b, p) + raises(ValueError, lambda: dh_shared_key((1031, 14, 565), 2000)) + + +def test_padded_key(): + assert padded_key('b', 'ab') == 'ba' + raises(ValueError, lambda: padded_key('ab', 'ace')) + raises(ValueError, lambda: padded_key('ab', 'abba')) + + +def test_bifid(): + raises(ValueError, lambda: encipher_bifid('abc', 'b', 'abcde')) + assert encipher_bifid('abc', 'b', 'abcd') == 'bdb' + raises(ValueError, lambda: decipher_bifid('bdb', 'b', 'abcde')) + assert encipher_bifid('bdb', 'b', 'abcd') == 'abc' + raises(ValueError, lambda: bifid_square('abcde')) + assert bifid5_square("B") == \ + bifid5_square('BACDEFGHIKLMNOPQRSTUVWXYZ') + assert bifid6_square('B0') == \ + bifid6_square('B0ACDEFGHIJKLMNOPQRSTUVWXYZ123456789') + + +def test_encipher_decipher_gm(): + ps = [131, 137, 139, 149, 151, 157, 163, 167, + 173, 179, 181, 191, 193, 197, 199] + qs = [89, 97, 101, 103, 107, 109, 113, 127, + 131, 137, 139, 149, 151, 157, 47] + messages = [ + 0, 32855, 34303, 14805, 1280, 75859, 38368, + 724, 60356, 51675, 76697, 61854, 18661, + ] + for p, q in zip(ps, qs): + pri = gm_private_key(p, q) + for msg in messages: + pub = gm_public_key(p, q) + enc = encipher_gm(msg, pub) + dec = decipher_gm(enc, pri) + assert dec == msg + + +def test_gm_private_key(): + raises(ValueError, lambda: gm_public_key(13, 15)) + raises(ValueError, lambda: gm_public_key(0, 0)) + raises(ValueError, lambda: gm_public_key(0, 5)) + assert 17, 19 == gm_public_key(17, 19) + + +def test_gm_public_key(): + assert 323 == gm_public_key(17, 19)[1] + assert 15 == gm_public_key(3, 5)[1] + raises(ValueError, lambda: gm_public_key(15, 19)) + +def test_encipher_decipher_bg(): + ps = [67, 7, 71, 103, 11, 43, 107, 47, + 79, 19, 83, 23, 59, 127, 31] + qs = qs = [7, 71, 103, 11, 43, 107, 47, + 79, 19, 83, 23, 59, 127, 31, 67] + messages = [ + 0, 328, 343, 148, 1280, 758, 383, + 724, 603, 516, 766, 618, 186, + ] + + for p, q in zip(ps, qs): + pri = bg_private_key(p, q) + for msg in messages: + pub = bg_public_key(p, q) + enc = encipher_bg(msg, pub) + dec = decipher_bg(enc, pri) + assert dec == msg + +def test_bg_private_key(): + raises(ValueError, lambda: bg_private_key(8, 16)) + raises(ValueError, lambda: bg_private_key(8, 8)) + raises(ValueError, lambda: bg_private_key(13, 17)) + assert 23, 31 == bg_private_key(23, 31) + +def test_bg_public_key(): + assert 5293 == bg_public_key(67, 79) + assert 713 == bg_public_key(23, 31) + raises(ValueError, lambda: bg_private_key(13, 17)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..8846a99510601c9675103e21ef5a0a1e839fdd11 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/__init__.py @@ -0,0 +1,19 @@ +from .diffgeom import ( + BaseCovarDerivativeOp, BaseScalarField, BaseVectorField, Commutator, + contravariant_order, CoordSystem, CoordinateSymbol, + CovarDerivativeOp, covariant_order, Differential, intcurve_diffequ, + intcurve_series, LieDerivative, Manifold, metric_to_Christoffel_1st, + metric_to_Christoffel_2nd, metric_to_Ricci_components, + metric_to_Riemann_components, Patch, Point, TensorProduct, twoform_to_matrix, + vectors_in_basis, WedgeProduct, +) + +__all__ = [ + 'BaseCovarDerivativeOp', 'BaseScalarField', 'BaseVectorField', 'Commutator', + 'contravariant_order', 'CoordSystem', 'CoordinateSymbol', + 'CovarDerivativeOp', 'covariant_order', 'Differential', 'intcurve_diffequ', + 'intcurve_series', 'LieDerivative', 'Manifold', 'metric_to_Christoffel_1st', + 'metric_to_Christoffel_2nd', 'metric_to_Ricci_components', + 'metric_to_Riemann_components', 'Patch', 'Point', 'TensorProduct', + 'twoform_to_matrix', 'vectors_in_basis', 'WedgeProduct', +] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/diffgeom.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/diffgeom.py new file mode 100644 index 0000000000000000000000000000000000000000..a95f83122d6de0b7015b9a3ad0573cbfd97a7ef3 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/diffgeom.py @@ -0,0 +1,2270 @@ +from __future__ import annotations +from typing import Any + +from functools import reduce +from itertools import permutations + +from sympy.combinatorics import Permutation +from sympy.core import ( + Basic, Expr, Function, diff, + Pow, Mul, Add, Lambda, S, Tuple, Dict +) +from sympy.core.cache import cacheit + +from sympy.core.symbol import Symbol, Dummy +from sympy.core.symbol import Str +from sympy.core.sympify import _sympify +from sympy.functions import factorial +from sympy.matrices import ImmutableDenseMatrix as Matrix +from sympy.solvers import solve + +from sympy.utilities.exceptions import (sympy_deprecation_warning, + SymPyDeprecationWarning, + ignore_warnings) + + +# TODO you are a bit excessive in the use of Dummies +# TODO dummy point, literal field +# TODO too often one needs to call doit or simplify on the output, check the +# tests and find out why +from sympy.tensor.array import ImmutableDenseNDimArray + + +class Manifold(Basic): + """ + A mathematical manifold. + + Explanation + =========== + + A manifold is a topological space that locally resembles + Euclidean space near each point [1]. + This class does not provide any means to study the topological + characteristics of the manifold that it represents, though. + + Parameters + ========== + + name : str + The name of the manifold. + + dim : int + The dimension of the manifold. + + Examples + ======== + + >>> from sympy.diffgeom import Manifold + >>> m = Manifold('M', 2) + >>> m + M + >>> m.dim + 2 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Manifold + """ + + def __new__(cls, name, dim, **kwargs): + if not isinstance(name, Str): + name = Str(name) + dim = _sympify(dim) + obj = super().__new__(cls, name, dim) + + obj.patches = _deprecated_list( + """ + Manifold.patches is deprecated. The Manifold object is now + immutable. Instead use a separate list to keep track of the + patches. + """, []) + return obj + + @property + def name(self): + return self.args[0] + + @property + def dim(self): + return self.args[1] + + +class Patch(Basic): + """ + A patch on a manifold. + + Explanation + =========== + + Coordinate patch, or patch in short, is a simply-connected open set around + a point in the manifold [1]. On a manifold one can have many patches that + do not always include the whole manifold. On these patches coordinate + charts can be defined that permit the parameterization of any point on the + patch in terms of a tuple of real numbers (the coordinates). + + This class does not provide any means to study the topological + characteristics of the patch that it represents. + + Parameters + ========== + + name : str + The name of the patch. + + manifold : Manifold + The manifold on which the patch is defined. + + Examples + ======== + + >>> from sympy.diffgeom import Manifold, Patch + >>> m = Manifold('M', 2) + >>> p = Patch('P', m) + >>> p + P + >>> p.dim + 2 + + References + ========== + + .. [1] G. Sussman, J. Wisdom, W. Farr, Functional Differential Geometry + (2013) + + """ + def __new__(cls, name, manifold, **kwargs): + if not isinstance(name, Str): + name = Str(name) + obj = super().__new__(cls, name, manifold) + + obj.manifold.patches.append(obj) # deprecated + obj.coord_systems = _deprecated_list( + """ + Patch.coord_systms is deprecated. The Patch class is now + immutable. Instead use a separate list to keep track of coordinate + systems. + """, []) + return obj + + @property + def name(self): + return self.args[0] + + @property + def manifold(self): + return self.args[1] + + @property + def dim(self): + return self.manifold.dim + + +class CoordSystem(Basic): + """ + A coordinate system defined on the patch. + + Explanation + =========== + + Coordinate system is a system that uses one or more coordinates to uniquely + determine the position of the points or other geometric elements on a + manifold [1]. + + By passing ``Symbols`` to *symbols* parameter, user can define the name and + assumptions of coordinate symbols of the coordinate system. If not passed, + these symbols are generated automatically and are assumed to be real valued. + + By passing *relations* parameter, user can define the transform relations of + coordinate systems. Inverse transformation and indirect transformation can + be found automatically. If this parameter is not passed, coordinate + transformation cannot be done. + + Parameters + ========== + + name : str + The name of the coordinate system. + + patch : Patch + The patch where the coordinate system is defined. + + symbols : list of Symbols, optional + Defines the names and assumptions of coordinate symbols. + + relations : dict, optional + Key is a tuple of two strings, who are the names of the systems where + the coordinates transform from and transform to. + Value is a tuple of the symbols before transformation and a tuple of + the expressions after transformation. + + Examples + ======== + + We define two-dimensional Cartesian coordinate system and polar coordinate + system. + + >>> from sympy import symbols, pi, sqrt, atan2, cos, sin + >>> from sympy.diffgeom import Manifold, Patch, CoordSystem + >>> m = Manifold('M', 2) + >>> p = Patch('P', m) + >>> x, y = symbols('x y', real=True) + >>> r, theta = symbols('r theta', nonnegative=True) + >>> relation_dict = { + ... ('Car2D', 'Pol'): [(x, y), (sqrt(x**2 + y**2), atan2(y, x))], + ... ('Pol', 'Car2D'): [(r, theta), (r*cos(theta), r*sin(theta))] + ... } + >>> Car2D = CoordSystem('Car2D', p, (x, y), relation_dict) + >>> Pol = CoordSystem('Pol', p, (r, theta), relation_dict) + + ``symbols`` property returns ``CoordinateSymbol`` instances. These symbols + are not same with the symbols used to construct the coordinate system. + + >>> Car2D + Car2D + >>> Car2D.dim + 2 + >>> Car2D.symbols + (x, y) + >>> _[0].func + + + ``transformation()`` method returns the transformation function from + one coordinate system to another. ``transform()`` method returns the + transformed coordinates. + + >>> Car2D.transformation(Pol) + Lambda((x, y), Matrix([ + [sqrt(x**2 + y**2)], + [ atan2(y, x)]])) + >>> Car2D.transform(Pol) + Matrix([ + [sqrt(x**2 + y**2)], + [ atan2(y, x)]]) + >>> Car2D.transform(Pol, [1, 2]) + Matrix([ + [sqrt(5)], + [atan(2)]]) + + ``jacobian()`` method returns the Jacobian matrix of coordinate + transformation between two systems. ``jacobian_determinant()`` method + returns the Jacobian determinant of coordinate transformation between two + systems. + + >>> Pol.jacobian(Car2D) + Matrix([ + [cos(theta), -r*sin(theta)], + [sin(theta), r*cos(theta)]]) + >>> Pol.jacobian(Car2D, [1, pi/2]) + Matrix([ + [0, -1], + [1, 0]]) + >>> Car2D.jacobian_determinant(Pol) + 1/sqrt(x**2 + y**2) + >>> Car2D.jacobian_determinant(Pol, [1,0]) + 1 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Coordinate_system + + """ + def __new__(cls, name, patch, symbols=None, relations={}, **kwargs): + if not isinstance(name, Str): + name = Str(name) + + # canonicallize the symbols + if symbols is None: + names = kwargs.get('names', None) + if names is None: + symbols = Tuple( + *[Symbol('%s_%s' % (name.name, i), real=True) + for i in range(patch.dim)] + ) + else: + sympy_deprecation_warning( + f""" +The 'names' argument to CoordSystem is deprecated. Use 'symbols' instead. That +is, replace + + CoordSystem(..., names={names}) + +with + + CoordSystem(..., symbols=[{', '.join(["Symbol(" + repr(n) + ", real=True)" for n in names])}]) + """, + deprecated_since_version="1.7", + active_deprecations_target="deprecated-diffgeom-mutable", + ) + symbols = Tuple( + *[Symbol(n, real=True) for n in names] + ) + else: + syms = [] + for s in symbols: + if isinstance(s, Symbol): + syms.append(Symbol(s.name, **s._assumptions.generator)) + elif isinstance(s, str): + sympy_deprecation_warning( + f""" + +Passing a string as the coordinate symbol name to CoordSystem is deprecated. +Pass a Symbol with the appropriate name and assumptions instead. + +That is, replace {s} with Symbol({s!r}, real=True). + """, + + deprecated_since_version="1.7", + active_deprecations_target="deprecated-diffgeom-mutable", + ) + syms.append(Symbol(s, real=True)) + symbols = Tuple(*syms) + + # canonicallize the relations + rel_temp = {} + for k,v in relations.items(): + s1, s2 = k + if not isinstance(s1, Str): + s1 = Str(s1) + if not isinstance(s2, Str): + s2 = Str(s2) + key = Tuple(s1, s2) + + # Old version used Lambda as a value. + if isinstance(v, Lambda): + v = (tuple(v.signature), tuple(v.expr)) + else: + v = (tuple(v[0]), tuple(v[1])) + rel_temp[key] = v + relations = Dict(rel_temp) + + # construct the object + obj = super().__new__(cls, name, patch, symbols, relations) + + # Add deprecated attributes + obj.transforms = _deprecated_dict( + """ + CoordSystem.transforms is deprecated. The CoordSystem class is now + immutable. Use the 'relations' keyword argument to the + CoordSystems() constructor to specify relations. + """, {}) + obj._names = [str(n) for n in symbols] + obj.patch.coord_systems.append(obj) # deprecated + obj._dummies = [Dummy(str(n)) for n in symbols] # deprecated + obj._dummy = Dummy() + + return obj + + @property + def name(self): + return self.args[0] + + @property + def patch(self): + return self.args[1] + + @property + def manifold(self): + return self.patch.manifold + + @property + def symbols(self): + return tuple(CoordinateSymbol(self, i, **s._assumptions.generator) + for i,s in enumerate(self.args[2])) + + @property + def relations(self): + return self.args[3] + + @property + def dim(self): + return self.patch.dim + + ########################################################################## + # Finding transformation relation + ########################################################################## + + def transformation(self, sys): + """ + Return coordinate transformation function from *self* to *sys*. + + Parameters + ========== + + sys : CoordSystem + + Returns + ======= + + sympy.Lambda + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r, R2_p + >>> R2_r.transformation(R2_p) + Lambda((x, y), Matrix([ + [sqrt(x**2 + y**2)], + [ atan2(y, x)]])) + + """ + signature = self.args[2] + + key = Tuple(self.name, sys.name) + if self == sys: + expr = Matrix(self.symbols) + elif key in self.relations: + expr = Matrix(self.relations[key][1]) + elif key[::-1] in self.relations: + expr = Matrix(self._inverse_transformation(sys, self)) + else: + expr = Matrix(self._indirect_transformation(self, sys)) + return Lambda(signature, expr) + + @staticmethod + def _solve_inverse(sym1, sym2, exprs, sys1_name, sys2_name): + ret = solve( + [t[0] - t[1] for t in zip(sym2, exprs)], + list(sym1), dict=True) + + if len(ret) == 0: + temp = "Cannot solve inverse relation from {} to {}." + raise NotImplementedError(temp.format(sys1_name, sys2_name)) + elif len(ret) > 1: + temp = "Obtained multiple inverse relation from {} to {}." + raise ValueError(temp.format(sys1_name, sys2_name)) + + return ret[0] + + @classmethod + def _inverse_transformation(cls, sys1, sys2): + # Find the transformation relation from sys2 to sys1 + forward = sys1.transform(sys2) + inv_results = cls._solve_inverse(sys1.symbols, sys2.symbols, forward, + sys1.name, sys2.name) + signature = tuple(sys1.symbols) + return [inv_results[s] for s in signature] + + @classmethod + @cacheit + def _indirect_transformation(cls, sys1, sys2): + # Find the transformation relation between two indirectly connected + # coordinate systems + rel = sys1.relations + path = cls._dijkstra(sys1, sys2) + + transforms = [] + for s1, s2 in zip(path, path[1:]): + if (s1, s2) in rel: + transforms.append(rel[(s1, s2)]) + else: + sym2, inv_exprs = rel[(s2, s1)] + sym1 = tuple(Dummy() for i in sym2) + ret = cls._solve_inverse(sym2, sym1, inv_exprs, s2, s1) + ret = tuple(ret[s] for s in sym2) + transforms.append((sym1, ret)) + syms = sys1.args[2] + exprs = syms + for newsyms, newexprs in transforms: + exprs = tuple(e.subs(zip(newsyms, exprs)) for e in newexprs) + return exprs + + @staticmethod + def _dijkstra(sys1, sys2): + # Use Dijkstra algorithm to find the shortest path between two indirectly-connected + # coordinate systems + # return value is the list of the names of the systems. + relations = sys1.relations + graph = {} + for s1, s2 in relations.keys(): + if s1 not in graph: + graph[s1] = {s2} + else: + graph[s1].add(s2) + if s2 not in graph: + graph[s2] = {s1} + else: + graph[s2].add(s1) + + path_dict = {sys:[0, [], 0] for sys in graph} # minimum distance, path, times of visited + + def visit(sys): + path_dict[sys][2] = 1 + for newsys in graph[sys]: + distance = path_dict[sys][0] + 1 + if path_dict[newsys][0] >= distance or not path_dict[newsys][1]: + path_dict[newsys][0] = distance + path_dict[newsys][1] = list(path_dict[sys][1]) + path_dict[newsys][1].append(sys) + + visit(sys1.name) + + while True: + min_distance = max(path_dict.values(), key=lambda x:x[0])[0] + newsys = None + for sys, lst in path_dict.items(): + if 0 < lst[0] <= min_distance and not lst[2]: + min_distance = lst[0] + newsys = sys + if newsys is None: + break + visit(newsys) + + result = path_dict[sys2.name][1] + result.append(sys2.name) + + if result == [sys2.name]: + raise KeyError("Two coordinate systems are not connected.") + return result + + def connect_to(self, to_sys, from_coords, to_exprs, inverse=True, fill_in_gaps=False): + sympy_deprecation_warning( + """ + The CoordSystem.connect_to() method is deprecated. Instead, + generate a new instance of CoordSystem with the 'relations' + keyword argument (CoordSystem classes are now immutable). + """, + deprecated_since_version="1.7", + active_deprecations_target="deprecated-diffgeom-mutable", + ) + + from_coords, to_exprs = dummyfy(from_coords, to_exprs) + self.transforms[to_sys] = Matrix(from_coords), Matrix(to_exprs) + + if inverse: + to_sys.transforms[self] = self._inv_transf(from_coords, to_exprs) + + if fill_in_gaps: + self._fill_gaps_in_transformations() + + @staticmethod + def _inv_transf(from_coords, to_exprs): + # Will be removed when connect_to is removed + inv_from = [i.as_dummy() for i in from_coords] + inv_to = solve( + [t[0] - t[1] for t in zip(inv_from, to_exprs)], + list(from_coords), dict=True)[0] + inv_to = [inv_to[fc] for fc in from_coords] + return Matrix(inv_from), Matrix(inv_to) + + @staticmethod + def _fill_gaps_in_transformations(): + # Will be removed when connect_to is removed + raise NotImplementedError + + ########################################################################## + # Coordinate transformations + ########################################################################## + + def transform(self, sys, coordinates=None): + """ + Return the result of coordinate transformation from *self* to *sys*. + If coordinates are not given, coordinate symbols of *self* are used. + + Parameters + ========== + + sys : CoordSystem + + coordinates : Any iterable, optional. + + Returns + ======= + + sympy.ImmutableDenseMatrix containing CoordinateSymbol + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r, R2_p + >>> R2_r.transform(R2_p) + Matrix([ + [sqrt(x**2 + y**2)], + [ atan2(y, x)]]) + >>> R2_r.transform(R2_p, [0, 1]) + Matrix([ + [ 1], + [pi/2]]) + + """ + if coordinates is None: + coordinates = self.symbols + if self != sys: + transf = self.transformation(sys) + coordinates = transf(*coordinates) + else: + coordinates = Matrix(coordinates) + return coordinates + + def coord_tuple_transform_to(self, to_sys, coords): + """Transform ``coords`` to coord system ``to_sys``.""" + sympy_deprecation_warning( + """ + The CoordSystem.coord_tuple_transform_to() method is deprecated. + Use the CoordSystem.transform() method instead. + """, + deprecated_since_version="1.7", + active_deprecations_target="deprecated-diffgeom-mutable", + ) + + coords = Matrix(coords) + if self != to_sys: + with ignore_warnings(SymPyDeprecationWarning): + transf = self.transforms[to_sys] + coords = transf[1].subs(list(zip(transf[0], coords))) + return coords + + def jacobian(self, sys, coordinates=None): + """ + Return the jacobian matrix of a transformation on given coordinates. + If coordinates are not given, coordinate symbols of *self* are used. + + Parameters + ========== + + sys : CoordSystem + + coordinates : Any iterable, optional. + + Returns + ======= + + sympy.ImmutableDenseMatrix + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r, R2_p + >>> R2_p.jacobian(R2_r) + Matrix([ + [cos(theta), -rho*sin(theta)], + [sin(theta), rho*cos(theta)]]) + >>> R2_p.jacobian(R2_r, [1, 0]) + Matrix([ + [1, 0], + [0, 1]]) + + """ + result = self.transform(sys).jacobian(self.symbols) + if coordinates is not None: + result = result.subs(list(zip(self.symbols, coordinates))) + return result + jacobian_matrix = jacobian + + def jacobian_determinant(self, sys, coordinates=None): + """ + Return the jacobian determinant of a transformation on given + coordinates. If coordinates are not given, coordinate symbols of *self* + are used. + + Parameters + ========== + + sys : CoordSystem + + coordinates : Any iterable, optional. + + Returns + ======= + + sympy.Expr + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r, R2_p + >>> R2_r.jacobian_determinant(R2_p) + 1/sqrt(x**2 + y**2) + >>> R2_r.jacobian_determinant(R2_p, [1, 0]) + 1 + + """ + return self.jacobian(sys, coordinates).det() + + + ########################################################################## + # Points + ########################################################################## + + def point(self, coords): + """Create a ``Point`` with coordinates given in this coord system.""" + return Point(self, coords) + + def point_to_coords(self, point): + """Calculate the coordinates of a point in this coord system.""" + return point.coords(self) + + ########################################################################## + # Base fields. + ########################################################################## + + def base_scalar(self, coord_index): + """Return ``BaseScalarField`` that takes a point and returns one of the coordinates.""" + return BaseScalarField(self, coord_index) + coord_function = base_scalar + + def base_scalars(self): + """Returns a list of all coordinate functions. + For more details see the ``base_scalar`` method of this class.""" + return [self.base_scalar(i) for i in range(self.dim)] + coord_functions = base_scalars + + def base_vector(self, coord_index): + """Return a basis vector field. + The basis vector field for this coordinate system. It is also an + operator on scalar fields.""" + return BaseVectorField(self, coord_index) + + def base_vectors(self): + """Returns a list of all base vectors. + For more details see the ``base_vector`` method of this class.""" + return [self.base_vector(i) for i in range(self.dim)] + + def base_oneform(self, coord_index): + """Return a basis 1-form field. + The basis one-form field for this coordinate system. It is also an + operator on vector fields.""" + return Differential(self.coord_function(coord_index)) + + def base_oneforms(self): + """Returns a list of all base oneforms. + For more details see the ``base_oneform`` method of this class.""" + return [self.base_oneform(i) for i in range(self.dim)] + + +class CoordinateSymbol(Symbol): + """A symbol which denotes an abstract value of i-th coordinate of + the coordinate system with given context. + + Explanation + =========== + + Each coordinates in coordinate system are represented by unique symbol, + such as x, y, z in Cartesian coordinate system. + + You may not construct this class directly. Instead, use `symbols` method + of CoordSystem. + + Parameters + ========== + + coord_sys : CoordSystem + + index : integer + + Examples + ======== + + >>> from sympy import symbols, Lambda, Matrix, sqrt, atan2, cos, sin + >>> from sympy.diffgeom import Manifold, Patch, CoordSystem + >>> m = Manifold('M', 2) + >>> p = Patch('P', m) + >>> x, y = symbols('x y', real=True) + >>> r, theta = symbols('r theta', nonnegative=True) + >>> relation_dict = { + ... ('Car2D', 'Pol'): Lambda((x, y), Matrix([sqrt(x**2 + y**2), atan2(y, x)])), + ... ('Pol', 'Car2D'): Lambda((r, theta), Matrix([r*cos(theta), r*sin(theta)])) + ... } + >>> Car2D = CoordSystem('Car2D', p, [x, y], relation_dict) + >>> Pol = CoordSystem('Pol', p, [r, theta], relation_dict) + >>> x, y = Car2D.symbols + + ``CoordinateSymbol`` contains its coordinate symbol and index. + + >>> x.name + 'x' + >>> x.coord_sys == Car2D + True + >>> x.index + 0 + >>> x.is_real + True + + You can transform ``CoordinateSymbol`` into other coordinate system using + ``rewrite()`` method. + + >>> x.rewrite(Pol) + r*cos(theta) + >>> sqrt(x**2 + y**2).rewrite(Pol).simplify() + r + + """ + def __new__(cls, coord_sys, index, **assumptions): + name = coord_sys.args[2][index].name + obj = super().__new__(cls, name, **assumptions) + obj.coord_sys = coord_sys + obj.index = index + return obj + + def __getnewargs__(self): + return (self.coord_sys, self.index) + + def _hashable_content(self): + return ( + self.coord_sys, self.index + ) + tuple(sorted(self.assumptions0.items())) + + def _eval_rewrite(self, rule, args, **hints): + if isinstance(rule, CoordSystem): + return rule.transform(self.coord_sys)[self.index] + return super()._eval_rewrite(rule, args, **hints) + + +class Point(Basic): + """Point defined in a coordinate system. + + Explanation + =========== + + Mathematically, point is defined in the manifold and does not have any coordinates + by itself. Coordinate system is what imbues the coordinates to the point by coordinate + chart. However, due to the difficulty of realizing such logic, you must supply + a coordinate system and coordinates to define a Point here. + + The usage of this object after its definition is independent of the + coordinate system that was used in order to define it, however due to + limitations in the simplification routines you can arrive at complicated + expressions if you use inappropriate coordinate systems. + + Parameters + ========== + + coord_sys : CoordSystem + + coords : list + The coordinates of the point. + + Examples + ======== + + >>> from sympy import pi + >>> from sympy.diffgeom import Point + >>> from sympy.diffgeom.rn import R2, R2_r, R2_p + >>> rho, theta = R2_p.symbols + + >>> p = Point(R2_p, [rho, 3*pi/4]) + + >>> p.manifold == R2 + True + + >>> p.coords() + Matrix([ + [ rho], + [3*pi/4]]) + >>> p.coords(R2_r) + Matrix([ + [-sqrt(2)*rho/2], + [ sqrt(2)*rho/2]]) + + """ + + def __new__(cls, coord_sys, coords, **kwargs): + coords = Matrix(coords) + obj = super().__new__(cls, coord_sys, coords) + obj._coord_sys = coord_sys + obj._coords = coords + return obj + + @property + def patch(self): + return self._coord_sys.patch + + @property + def manifold(self): + return self._coord_sys.manifold + + @property + def dim(self): + return self.manifold.dim + + def coords(self, sys=None): + """ + Coordinates of the point in given coordinate system. If coordinate system + is not passed, it returns the coordinates in the coordinate system in which + the point was defined. + """ + if sys is None: + return self._coords + else: + return self._coord_sys.transform(sys, self._coords) + + @property + def free_symbols(self): + return self._coords.free_symbols + + +class BaseScalarField(Expr): + """Base scalar field over a manifold for a given coordinate system. + + Explanation + =========== + + A scalar field takes a point as an argument and returns a scalar. + A base scalar field of a coordinate system takes a point and returns one of + the coordinates of that point in the coordinate system in question. + + To define a scalar field you need to choose the coordinate system and the + index of the coordinate. + + The use of the scalar field after its definition is independent of the + coordinate system in which it was defined, however due to limitations in + the simplification routines you may arrive at more complicated + expression if you use unappropriate coordinate systems. + You can build complicated scalar fields by just building up SymPy + expressions containing ``BaseScalarField`` instances. + + Parameters + ========== + + coord_sys : CoordSystem + + index : integer + + Examples + ======== + + >>> from sympy import Function, pi + >>> from sympy.diffgeom import BaseScalarField + >>> from sympy.diffgeom.rn import R2_r, R2_p + >>> rho, _ = R2_p.symbols + >>> point = R2_p.point([rho, 0]) + >>> fx, fy = R2_r.base_scalars() + >>> ftheta = BaseScalarField(R2_r, 1) + + >>> fx(point) + rho + >>> fy(point) + 0 + + >>> (fx**2+fy**2).rcall(point) + rho**2 + + >>> g = Function('g') + >>> fg = g(ftheta-pi) + >>> fg.rcall(point) + g(-pi) + + """ + + is_commutative = True + + def __new__(cls, coord_sys, index, **kwargs): + index = _sympify(index) + obj = super().__new__(cls, coord_sys, index) + obj._coord_sys = coord_sys + obj._index = index + return obj + + @property + def coord_sys(self): + return self.args[0] + + @property + def index(self): + return self.args[1] + + @property + def patch(self): + return self.coord_sys.patch + + @property + def manifold(self): + return self.coord_sys.manifold + + @property + def dim(self): + return self.manifold.dim + + def __call__(self, *args): + """Evaluating the field at a point or doing nothing. + If the argument is a ``Point`` instance, the field is evaluated at that + point. The field is returned itself if the argument is any other + object. It is so in order to have working recursive calling mechanics + for all fields (check the ``__call__`` method of ``Expr``). + """ + point = args[0] + if len(args) != 1 or not isinstance(point, Point): + return self + coords = point.coords(self._coord_sys) + # XXX Calling doit is necessary with all the Subs expressions + # XXX Calling simplify is necessary with all the trig expressions + return simplify(coords[self._index]).doit() + + # XXX Workaround for limitations on the content of args + free_symbols: set[Any] = set() + + +class BaseVectorField(Expr): + r"""Base vector field over a manifold for a given coordinate system. + + Explanation + =========== + + A vector field is an operator taking a scalar field and returning a + directional derivative (which is also a scalar field). + A base vector field is the same type of operator, however the derivation is + specifically done with respect to a chosen coordinate. + + To define a base vector field you need to choose the coordinate system and + the index of the coordinate. + + The use of the vector field after its definition is independent of the + coordinate system in which it was defined, however due to limitations in the + simplification routines you may arrive at more complicated expression if you + use unappropriate coordinate systems. + + Parameters + ========== + coord_sys : CoordSystem + + index : integer + + Examples + ======== + + >>> from sympy import Function + >>> from sympy.diffgeom.rn import R2_p, R2_r + >>> from sympy.diffgeom import BaseVectorField + >>> from sympy import pprint + + >>> x, y = R2_r.symbols + >>> rho, theta = R2_p.symbols + >>> fx, fy = R2_r.base_scalars() + >>> point_p = R2_p.point([rho, theta]) + >>> point_r = R2_r.point([x, y]) + + >>> g = Function('g') + >>> s_field = g(fx, fy) + + >>> v = BaseVectorField(R2_r, 1) + >>> pprint(v(s_field)) + / d \| + |---(g(x, xi))|| + \dxi /|xi=y + >>> pprint(v(s_field).rcall(point_r).doit()) + d + --(g(x, y)) + dy + >>> pprint(v(s_field).rcall(point_p)) + / d \| + |---(g(rho*cos(theta), xi))|| + \dxi /|xi=rho*sin(theta) + + """ + + is_commutative = False + + def __new__(cls, coord_sys, index, **kwargs): + index = _sympify(index) + obj = super().__new__(cls, coord_sys, index) + obj._coord_sys = coord_sys + obj._index = index + return obj + + @property + def coord_sys(self): + return self.args[0] + + @property + def index(self): + return self.args[1] + + @property + def patch(self): + return self.coord_sys.patch + + @property + def manifold(self): + return self.coord_sys.manifold + + @property + def dim(self): + return self.manifold.dim + + def __call__(self, scalar_field): + """Apply on a scalar field. + The action of a vector field on a scalar field is a directional + differentiation. + If the argument is not a scalar field an error is raised. + """ + if covariant_order(scalar_field) or contravariant_order(scalar_field): + raise ValueError('Only scalar fields can be supplied as arguments to vector fields.') + + if scalar_field is None: + return self + + base_scalars = list(scalar_field.atoms(BaseScalarField)) + + # First step: e_x(x+r**2) -> e_x(x) + 2*r*e_x(r) + d_var = self._coord_sys._dummy + # TODO: you need a real dummy function for the next line + d_funcs = [Function('_#_%s' % i)(d_var) for i, + b in enumerate(base_scalars)] + d_result = scalar_field.subs(list(zip(base_scalars, d_funcs))) + d_result = d_result.diff(d_var) + + # Second step: e_x(x) -> 1 and e_x(r) -> cos(atan2(x, y)) + coords = self._coord_sys.symbols + d_funcs_deriv = [f.diff(d_var) for f in d_funcs] + d_funcs_deriv_sub = [] + for b in base_scalars: + jac = self._coord_sys.jacobian(b._coord_sys, coords) + d_funcs_deriv_sub.append(jac[b._index, self._index]) + d_result = d_result.subs(list(zip(d_funcs_deriv, d_funcs_deriv_sub))) + + # Remove the dummies + result = d_result.subs(list(zip(d_funcs, base_scalars))) + result = result.subs(list(zip(coords, self._coord_sys.coord_functions()))) + return result.doit() + + +def _find_coords(expr): + # Finds CoordinateSystems existing in expr + fields = expr.atoms(BaseScalarField, BaseVectorField) + return {f._coord_sys for f in fields} + + +class Commutator(Expr): + r"""Commutator of two vector fields. + + Explanation + =========== + + The commutator of two vector fields `v_1` and `v_2` is defined as the + vector field `[v_1, v_2]` that evaluated on each scalar field `f` is equal + to `v_1(v_2(f)) - v_2(v_1(f))`. + + Examples + ======== + + + >>> from sympy.diffgeom.rn import R2_p, R2_r + >>> from sympy.diffgeom import Commutator + >>> from sympy import simplify + + >>> fx, fy = R2_r.base_scalars() + >>> e_x, e_y = R2_r.base_vectors() + >>> e_r = R2_p.base_vector(0) + + >>> c_xy = Commutator(e_x, e_y) + >>> c_xr = Commutator(e_x, e_r) + >>> c_xy + 0 + + Unfortunately, the current code is not able to compute everything: + + >>> c_xr + Commutator(e_x, e_rho) + >>> simplify(c_xr(fy**2)) + -2*cos(theta)*y**2/(x**2 + y**2) + + """ + def __new__(cls, v1, v2): + if (covariant_order(v1) or contravariant_order(v1) != 1 + or covariant_order(v2) or contravariant_order(v2) != 1): + raise ValueError( + 'Only commutators of vector fields are supported.') + if v1 == v2: + return S.Zero + coord_sys = set().union(*[_find_coords(v) for v in (v1, v2)]) + if len(coord_sys) == 1: + # Only one coordinate systems is used, hence it is easy enough to + # actually evaluate the commutator. + if all(isinstance(v, BaseVectorField) for v in (v1, v2)): + return S.Zero + bases_1, bases_2 = [list(v.atoms(BaseVectorField)) + for v in (v1, v2)] + coeffs_1 = [v1.expand().coeff(b) for b in bases_1] + coeffs_2 = [v2.expand().coeff(b) for b in bases_2] + res = 0 + for c1, b1 in zip(coeffs_1, bases_1): + for c2, b2 in zip(coeffs_2, bases_2): + res += c1*b1(c2)*b2 - c2*b2(c1)*b1 + return res + else: + obj = super().__new__(cls, v1, v2) + obj._v1 = v1 # deprecated assignment + obj._v2 = v2 # deprecated assignment + return obj + + @property + def v1(self): + return self.args[0] + + @property + def v2(self): + return self.args[1] + + def __call__(self, scalar_field): + """Apply on a scalar field. + If the argument is not a scalar field an error is raised. + """ + return self.v1(self.v2(scalar_field)) - self.v2(self.v1(scalar_field)) + + +class Differential(Expr): + r"""Return the differential (exterior derivative) of a form field. + + Explanation + =========== + + The differential of a form (i.e. the exterior derivative) has a complicated + definition in the general case. + The differential `df` of the 0-form `f` is defined for any vector field `v` + as `df(v) = v(f)`. + + Examples + ======== + + >>> from sympy import Function + >>> from sympy.diffgeom.rn import R2_r + >>> from sympy.diffgeom import Differential + >>> from sympy import pprint + + >>> fx, fy = R2_r.base_scalars() + >>> e_x, e_y = R2_r.base_vectors() + >>> g = Function('g') + >>> s_field = g(fx, fy) + >>> dg = Differential(s_field) + + >>> dg + d(g(x, y)) + >>> pprint(dg(e_x)) + / d \| + |---(g(xi, y))|| + \dxi /|xi=x + >>> pprint(dg(e_y)) + / d \| + |---(g(x, xi))|| + \dxi /|xi=y + + Applying the exterior derivative operator twice always results in: + + >>> Differential(dg) + 0 + """ + + is_commutative = False + + def __new__(cls, form_field): + if contravariant_order(form_field): + raise ValueError( + 'A vector field was supplied as an argument to Differential.') + if isinstance(form_field, Differential): + return S.Zero + else: + obj = super().__new__(cls, form_field) + obj._form_field = form_field # deprecated assignment + return obj + + @property + def form_field(self): + return self.args[0] + + def __call__(self, *vector_fields): + """Apply on a list of vector_fields. + + Explanation + =========== + + If the number of vector fields supplied is not equal to 1 + the order of + the form field inside the differential the result is undefined. + + For 1-forms (i.e. differentials of scalar fields) the evaluation is + done as `df(v)=v(f)`. However if `v` is ``None`` instead of a vector + field, the differential is returned unchanged. This is done in order to + permit partial contractions for higher forms. + + In the general case the evaluation is done by applying the form field + inside the differential on a list with one less elements than the number + of elements in the original list. Lowering the number of vector fields + is achieved through replacing each pair of fields by their + commutator. + + If the arguments are not vectors or ``None``s an error is raised. + """ + if any((contravariant_order(a) != 1 or covariant_order(a)) and a is not None + for a in vector_fields): + raise ValueError('The arguments supplied to Differential should be vector fields or Nones.') + k = len(vector_fields) + if k == 1: + if vector_fields[0]: + return vector_fields[0].rcall(self._form_field) + return self + else: + # For higher form it is more complicated: + # Invariant formula: + # https://en.wikipedia.org/wiki/Exterior_derivative#Invariant_formula + # df(v1, ... vn) = +/- vi(f(v1..no i..vn)) + # +/- f([vi,vj],v1..no i, no j..vn) + f = self._form_field + v = vector_fields + ret = 0 + for i in range(k): + t = v[i].rcall(f.rcall(*v[:i] + v[i + 1:])) + ret += (-1)**i*t + for j in range(i + 1, k): + c = Commutator(v[i], v[j]) + if c: # TODO this is ugly - the Commutator can be Zero and + # this causes the next line to fail + t = f.rcall(*(c,) + v[:i] + v[i + 1:j] + v[j + 1:]) + ret += (-1)**(i + j)*t + return ret + + +class TensorProduct(Expr): + """Tensor product of forms. + + Explanation + =========== + + The tensor product permits the creation of multilinear functionals (i.e. + higher order tensors) out of lower order fields (e.g. 1-forms and vector + fields). However, the higher tensors thus created lack the interesting + features provided by the other type of product, the wedge product, namely + they are not antisymmetric and hence are not form fields. + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r + >>> from sympy.diffgeom import TensorProduct + + >>> fx, fy = R2_r.base_scalars() + >>> e_x, e_y = R2_r.base_vectors() + >>> dx, dy = R2_r.base_oneforms() + + >>> TensorProduct(dx, dy)(e_x, e_y) + 1 + >>> TensorProduct(dx, dy)(e_y, e_x) + 0 + >>> TensorProduct(dx, fx*dy)(fx*e_x, e_y) + x**2 + >>> TensorProduct(e_x, e_y)(fx**2, fy**2) + 4*x*y + >>> TensorProduct(e_y, dx)(fy) + dx + + You can nest tensor products. + + >>> tp1 = TensorProduct(dx, dy) + >>> TensorProduct(tp1, dx)(e_x, e_y, e_x) + 1 + + You can make partial contraction for instance when 'raising an index'. + Putting ``None`` in the second argument of ``rcall`` means that the + respective position in the tensor product is left as it is. + + >>> TP = TensorProduct + >>> metric = TP(dx, dx) + 3*TP(dy, dy) + >>> metric.rcall(e_y, None) + 3*dy + + Or automatically pad the args with ``None`` without specifying them. + + >>> metric.rcall(e_y) + 3*dy + + """ + def __new__(cls, *args): + scalar = Mul(*[m for m in args if covariant_order(m) + contravariant_order(m) == 0]) + multifields = [m for m in args if covariant_order(m) + contravariant_order(m)] + if multifields: + if len(multifields) == 1: + return scalar*multifields[0] + return scalar*super().__new__(cls, *multifields) + else: + return scalar + + def __call__(self, *fields): + """Apply on a list of fields. + + If the number of input fields supplied is not equal to the order of + the tensor product field, the list of arguments is padded with ``None``'s. + + The list of arguments is divided in sublists depending on the order of + the forms inside the tensor product. The sublists are provided as + arguments to these forms and the resulting expressions are given to the + constructor of ``TensorProduct``. + + """ + tot_order = covariant_order(self) + contravariant_order(self) + tot_args = len(fields) + if tot_args != tot_order: + fields = list(fields) + [None]*(tot_order - tot_args) + orders = [covariant_order(f) + contravariant_order(f) for f in self._args] + indices = [sum(orders[:i + 1]) for i in range(len(orders) - 1)] + fields = [fields[i:j] for i, j in zip([0] + indices, indices + [None])] + multipliers = [t[0].rcall(*t[1]) for t in zip(self._args, fields)] + return TensorProduct(*multipliers) + + +class WedgeProduct(TensorProduct): + """Wedge product of forms. + + Explanation + =========== + + In the context of integration only completely antisymmetric forms make + sense. The wedge product permits the creation of such forms. + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r + >>> from sympy.diffgeom import WedgeProduct + + >>> fx, fy = R2_r.base_scalars() + >>> e_x, e_y = R2_r.base_vectors() + >>> dx, dy = R2_r.base_oneforms() + + >>> WedgeProduct(dx, dy)(e_x, e_y) + 1 + >>> WedgeProduct(dx, dy)(e_y, e_x) + -1 + >>> WedgeProduct(dx, fx*dy)(fx*e_x, e_y) + x**2 + >>> WedgeProduct(e_x, e_y)(fy, None) + -e_x + + You can nest wedge products. + + >>> wp1 = WedgeProduct(dx, dy) + >>> WedgeProduct(wp1, dx)(e_x, e_y, e_x) + 0 + + """ + # TODO the calculation of signatures is slow + # TODO you do not need all these permutations (neither the prefactor) + def __call__(self, *fields): + """Apply on a list of vector_fields. + The expression is rewritten internally in terms of tensor products and evaluated.""" + orders = (covariant_order(e) + contravariant_order(e) for e in self.args) + mul = 1/Mul(*(factorial(o) for o in orders)) + perms = permutations(fields) + perms_par = (Permutation( + p).signature() for p in permutations(range(len(fields)))) + tensor_prod = TensorProduct(*self.args) + return mul*Add(*[tensor_prod(*p[0])*p[1] for p in zip(perms, perms_par)]) + + +class LieDerivative(Expr): + """Lie derivative with respect to a vector field. + + Explanation + =========== + + The transport operator that defines the Lie derivative is the pushforward of + the field to be derived along the integral curve of the field with respect + to which one derives. + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r, R2_p + >>> from sympy.diffgeom import (LieDerivative, TensorProduct) + + >>> fx, fy = R2_r.base_scalars() + >>> e_x, e_y = R2_r.base_vectors() + >>> e_rho, e_theta = R2_p.base_vectors() + >>> dx, dy = R2_r.base_oneforms() + + >>> LieDerivative(e_x, fy) + 0 + >>> LieDerivative(e_x, fx) + 1 + >>> LieDerivative(e_x, e_x) + 0 + + The Lie derivative of a tensor field by another tensor field is equal to + their commutator: + + >>> LieDerivative(e_x, e_rho) + Commutator(e_x, e_rho) + >>> LieDerivative(e_x + e_y, fx) + 1 + + >>> tp = TensorProduct(dx, dy) + >>> LieDerivative(e_x, tp) + LieDerivative(e_x, TensorProduct(dx, dy)) + >>> LieDerivative(e_x, tp) + LieDerivative(e_x, TensorProduct(dx, dy)) + + """ + def __new__(cls, v_field, expr): + expr_form_ord = covariant_order(expr) + if contravariant_order(v_field) != 1 or covariant_order(v_field): + raise ValueError('Lie derivatives are defined only with respect to' + ' vector fields. The supplied argument was not a ' + 'vector field.') + if expr_form_ord > 0: + obj = super().__new__(cls, v_field, expr) + # deprecated assignments + obj._v_field = v_field + obj._expr = expr + return obj + if expr.atoms(BaseVectorField): + return Commutator(v_field, expr) + else: + return v_field.rcall(expr) + + @property + def v_field(self): + return self.args[0] + + @property + def expr(self): + return self.args[1] + + def __call__(self, *args): + v = self.v_field + expr = self.expr + lead_term = v(expr(*args)) + rest = Add(*[Mul(*args[:i] + (Commutator(v, args[i]),) + args[i + 1:]) + for i in range(len(args))]) + return lead_term - rest + + +class BaseCovarDerivativeOp(Expr): + """Covariant derivative operator with respect to a base vector. + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r + >>> from sympy.diffgeom import BaseCovarDerivativeOp + >>> from sympy.diffgeom import metric_to_Christoffel_2nd, TensorProduct + + >>> TP = TensorProduct + >>> fx, fy = R2_r.base_scalars() + >>> e_x, e_y = R2_r.base_vectors() + >>> dx, dy = R2_r.base_oneforms() + + >>> ch = metric_to_Christoffel_2nd(TP(dx, dx) + TP(dy, dy)) + >>> ch + [[[0, 0], [0, 0]], [[0, 0], [0, 0]]] + >>> cvd = BaseCovarDerivativeOp(R2_r, 0, ch) + >>> cvd(fx) + 1 + >>> cvd(fx*e_x) + e_x + """ + + def __new__(cls, coord_sys, index, christoffel): + index = _sympify(index) + christoffel = ImmutableDenseNDimArray(christoffel) + obj = super().__new__(cls, coord_sys, index, christoffel) + # deprecated assignments + obj._coord_sys = coord_sys + obj._index = index + obj._christoffel = christoffel + return obj + + @property + def coord_sys(self): + return self.args[0] + + @property + def index(self): + return self.args[1] + + @property + def christoffel(self): + return self.args[2] + + def __call__(self, field): + """Apply on a scalar field. + + The action of a vector field on a scalar field is a directional + differentiation. + If the argument is not a scalar field the behaviour is undefined. + """ + if covariant_order(field) != 0: + raise NotImplementedError() + + field = vectors_in_basis(field, self._coord_sys) + + wrt_vector = self._coord_sys.base_vector(self._index) + wrt_scalar = self._coord_sys.coord_function(self._index) + vectors = list(field.atoms(BaseVectorField)) + + # First step: replace all vectors with something susceptible to + # derivation and do the derivation + # TODO: you need a real dummy function for the next line + d_funcs = [Function('_#_%s' % i)(wrt_scalar) for i, + b in enumerate(vectors)] + d_result = field.subs(list(zip(vectors, d_funcs))) + d_result = wrt_vector(d_result) + + # Second step: backsubstitute the vectors in + d_result = d_result.subs(list(zip(d_funcs, vectors))) + + # Third step: evaluate the derivatives of the vectors + derivs = [] + for v in vectors: + d = Add(*[(self._christoffel[k, wrt_vector._index, v._index] + *v._coord_sys.base_vector(k)) + for k in range(v._coord_sys.dim)]) + derivs.append(d) + to_subs = [wrt_vector(d) for d in d_funcs] + # XXX: This substitution can fail when there are Dummy symbols and the + # cache is disabled: https://github.com/sympy/sympy/issues/17794 + result = d_result.subs(list(zip(to_subs, derivs))) + + # Remove the dummies + result = result.subs(list(zip(d_funcs, vectors))) + return result.doit() + + +class CovarDerivativeOp(Expr): + """Covariant derivative operator. + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2_r + >>> from sympy.diffgeom import CovarDerivativeOp + >>> from sympy.diffgeom import metric_to_Christoffel_2nd, TensorProduct + >>> TP = TensorProduct + >>> fx, fy = R2_r.base_scalars() + >>> e_x, e_y = R2_r.base_vectors() + >>> dx, dy = R2_r.base_oneforms() + >>> ch = metric_to_Christoffel_2nd(TP(dx, dx) + TP(dy, dy)) + + >>> ch + [[[0, 0], [0, 0]], [[0, 0], [0, 0]]] + >>> cvd = CovarDerivativeOp(fx*e_x, ch) + >>> cvd(fx) + x + >>> cvd(fx*e_x) + x*e_x + + """ + + def __new__(cls, wrt, christoffel): + if len({v._coord_sys for v in wrt.atoms(BaseVectorField)}) > 1: + raise NotImplementedError() + if contravariant_order(wrt) != 1 or covariant_order(wrt): + raise ValueError('Covariant derivatives are defined only with ' + 'respect to vector fields. The supplied argument ' + 'was not a vector field.') + christoffel = ImmutableDenseNDimArray(christoffel) + obj = super().__new__(cls, wrt, christoffel) + # deprecated assignments + obj._wrt = wrt + obj._christoffel = christoffel + return obj + + @property + def wrt(self): + return self.args[0] + + @property + def christoffel(self): + return self.args[1] + + def __call__(self, field): + vectors = list(self._wrt.atoms(BaseVectorField)) + base_ops = [BaseCovarDerivativeOp(v._coord_sys, v._index, self._christoffel) + for v in vectors] + return self._wrt.subs(list(zip(vectors, base_ops))).rcall(field) + + +############################################################################### +# Integral curves on vector fields +############################################################################### +def intcurve_series(vector_field, param, start_point, n=6, coord_sys=None, coeffs=False): + r"""Return the series expansion for an integral curve of the field. + + Explanation + =========== + + Integral curve is a function `\gamma` taking a parameter in `R` to a point + in the manifold. It verifies the equation: + + `V(f)\big(\gamma(t)\big) = \frac{d}{dt}f\big(\gamma(t)\big)` + + where the given ``vector_field`` is denoted as `V`. This holds for any + value `t` for the parameter and any scalar field `f`. + + This equation can also be decomposed of a basis of coordinate functions + `V(f_i)\big(\gamma(t)\big) = \frac{d}{dt}f_i\big(\gamma(t)\big) \quad \forall i` + + This function returns a series expansion of `\gamma(t)` in terms of the + coordinate system ``coord_sys``. The equations and expansions are necessarily + done in coordinate-system-dependent way as there is no other way to + represent movement between points on the manifold (i.e. there is no such + thing as a difference of points for a general manifold). + + Parameters + ========== + vector_field + the vector field for which an integral curve will be given + + param + the argument of the function `\gamma` from R to the curve + + start_point + the point which corresponds to `\gamma(0)` + + n + the order to which to expand + + coord_sys + the coordinate system in which to expand + coeffs (default False) - if True return a list of elements of the expansion + + Examples + ======== + + Use the predefined R2 manifold: + + >>> from sympy.abc import t, x, y + >>> from sympy.diffgeom.rn import R2_p, R2_r + >>> from sympy.diffgeom import intcurve_series + + Specify a starting point and a vector field: + + >>> start_point = R2_r.point([x, y]) + >>> vector_field = R2_r.e_x + + Calculate the series: + + >>> intcurve_series(vector_field, t, start_point, n=3) + Matrix([ + [t + x], + [ y]]) + + Or get the elements of the expansion in a list: + + >>> series = intcurve_series(vector_field, t, start_point, n=3, coeffs=True) + >>> series[0] + Matrix([ + [x], + [y]]) + >>> series[1] + Matrix([ + [t], + [0]]) + >>> series[2] + Matrix([ + [0], + [0]]) + + The series in the polar coordinate system: + + >>> series = intcurve_series(vector_field, t, start_point, + ... n=3, coord_sys=R2_p, coeffs=True) + >>> series[0] + Matrix([ + [sqrt(x**2 + y**2)], + [ atan2(y, x)]]) + >>> series[1] + Matrix([ + [t*x/sqrt(x**2 + y**2)], + [ -t*y/(x**2 + y**2)]]) + >>> series[2] + Matrix([ + [t**2*(-x**2/(x**2 + y**2)**(3/2) + 1/sqrt(x**2 + y**2))/2], + [ t**2*x*y/(x**2 + y**2)**2]]) + + See Also + ======== + + intcurve_diffequ + + """ + if contravariant_order(vector_field) != 1 or covariant_order(vector_field): + raise ValueError('The supplied field was not a vector field.') + + def iter_vfield(scalar_field, i): + """Return ``vector_field`` called `i` times on ``scalar_field``.""" + return reduce(lambda s, v: v.rcall(s), [vector_field, ]*i, scalar_field) + + def taylor_terms_per_coord(coord_function): + """Return the series for one of the coordinates.""" + return [param**i*iter_vfield(coord_function, i).rcall(start_point)/factorial(i) + for i in range(n)] + coord_sys = coord_sys if coord_sys else start_point._coord_sys + coord_functions = coord_sys.coord_functions() + taylor_terms = [taylor_terms_per_coord(f) for f in coord_functions] + if coeffs: + return [Matrix(t) for t in zip(*taylor_terms)] + else: + return Matrix([sum(c) for c in taylor_terms]) + + +def intcurve_diffequ(vector_field, param, start_point, coord_sys=None): + r"""Return the differential equation for an integral curve of the field. + + Explanation + =========== + + Integral curve is a function `\gamma` taking a parameter in `R` to a point + in the manifold. It verifies the equation: + + `V(f)\big(\gamma(t)\big) = \frac{d}{dt}f\big(\gamma(t)\big)` + + where the given ``vector_field`` is denoted as `V`. This holds for any + value `t` for the parameter and any scalar field `f`. + + This function returns the differential equation of `\gamma(t)` in terms of the + coordinate system ``coord_sys``. The equations and expansions are necessarily + done in coordinate-system-dependent way as there is no other way to + represent movement between points on the manifold (i.e. there is no such + thing as a difference of points for a general manifold). + + Parameters + ========== + + vector_field + the vector field for which an integral curve will be given + + param + the argument of the function `\gamma` from R to the curve + + start_point + the point which corresponds to `\gamma(0)` + + coord_sys + the coordinate system in which to give the equations + + Returns + ======= + + a tuple of (equations, initial conditions) + + Examples + ======== + + Use the predefined R2 manifold: + + >>> from sympy.abc import t + >>> from sympy.diffgeom.rn import R2, R2_p, R2_r + >>> from sympy.diffgeom import intcurve_diffequ + + Specify a starting point and a vector field: + + >>> start_point = R2_r.point([0, 1]) + >>> vector_field = -R2.y*R2.e_x + R2.x*R2.e_y + + Get the equation: + + >>> equations, init_cond = intcurve_diffequ(vector_field, t, start_point) + >>> equations + [f_1(t) + Derivative(f_0(t), t), -f_0(t) + Derivative(f_1(t), t)] + >>> init_cond + [f_0(0), f_1(0) - 1] + + The series in the polar coordinate system: + + >>> equations, init_cond = intcurve_diffequ(vector_field, t, start_point, R2_p) + >>> equations + [Derivative(f_0(t), t), Derivative(f_1(t), t) - 1] + >>> init_cond + [f_0(0) - 1, f_1(0) - pi/2] + + See Also + ======== + + intcurve_series + + """ + if contravariant_order(vector_field) != 1 or covariant_order(vector_field): + raise ValueError('The supplied field was not a vector field.') + coord_sys = coord_sys if coord_sys else start_point._coord_sys + gammas = [Function('f_%d' % i)(param) for i in range( + start_point._coord_sys.dim)] + arbitrary_p = Point(coord_sys, gammas) + coord_functions = coord_sys.coord_functions() + equations = [simplify(diff(cf.rcall(arbitrary_p), param) - vector_field.rcall(cf).rcall(arbitrary_p)) + for cf in coord_functions] + init_cond = [simplify(cf.rcall(arbitrary_p).subs(param, 0) - cf.rcall(start_point)) + for cf in coord_functions] + return equations, init_cond + + +############################################################################### +# Helpers +############################################################################### +def dummyfy(args, exprs): + # TODO Is this a good idea? + d_args = Matrix([s.as_dummy() for s in args]) + reps = dict(zip(args, d_args)) + d_exprs = Matrix([_sympify(expr).subs(reps) for expr in exprs]) + return d_args, d_exprs + +############################################################################### +# Helpers +############################################################################### +def contravariant_order(expr, _strict=False): + """Return the contravariant order of an expression. + + Examples + ======== + + >>> from sympy.diffgeom import contravariant_order + >>> from sympy.diffgeom.rn import R2 + >>> from sympy.abc import a + + >>> contravariant_order(a) + 0 + >>> contravariant_order(a*R2.x + 2) + 0 + >>> contravariant_order(a*R2.x*R2.e_y + R2.e_x) + 1 + + """ + # TODO move some of this to class methods. + # TODO rewrite using the .as_blah_blah methods + if isinstance(expr, Add): + orders = [contravariant_order(e) for e in expr.args] + if len(set(orders)) != 1: + raise ValueError('Misformed expression containing contravariant fields of varying order.') + return orders[0] + elif isinstance(expr, Mul): + orders = [contravariant_order(e) for e in expr.args] + not_zero = [o for o in orders if o != 0] + if len(not_zero) > 1: + raise ValueError('Misformed expression containing multiplication between vectors.') + return 0 if not not_zero else not_zero[0] + elif isinstance(expr, Pow): + if covariant_order(expr.base) or covariant_order(expr.exp): + raise ValueError( + 'Misformed expression containing a power of a vector.') + return 0 + elif isinstance(expr, BaseVectorField): + return 1 + elif isinstance(expr, TensorProduct): + return sum(contravariant_order(a) for a in expr.args) + elif not _strict or expr.atoms(BaseScalarField): + return 0 + else: # If it does not contain anything related to the diffgeom module and it is _strict + return -1 + + +def covariant_order(expr, _strict=False): + """Return the covariant order of an expression. + + Examples + ======== + + >>> from sympy.diffgeom import covariant_order + >>> from sympy.diffgeom.rn import R2 + >>> from sympy.abc import a + + >>> covariant_order(a) + 0 + >>> covariant_order(a*R2.x + 2) + 0 + >>> covariant_order(a*R2.x*R2.dy + R2.dx) + 1 + + """ + # TODO move some of this to class methods. + # TODO rewrite using the .as_blah_blah methods + if isinstance(expr, Add): + orders = [covariant_order(e) for e in expr.args] + if len(set(orders)) != 1: + raise ValueError('Misformed expression containing form fields of varying order.') + return orders[0] + elif isinstance(expr, Mul): + orders = [covariant_order(e) for e in expr.args] + not_zero = [o for o in orders if o != 0] + if len(not_zero) > 1: + raise ValueError('Misformed expression containing multiplication between forms.') + return 0 if not not_zero else not_zero[0] + elif isinstance(expr, Pow): + if covariant_order(expr.base) or covariant_order(expr.exp): + raise ValueError( + 'Misformed expression containing a power of a form.') + return 0 + elif isinstance(expr, Differential): + return covariant_order(*expr.args) + 1 + elif isinstance(expr, TensorProduct): + return sum(covariant_order(a) for a in expr.args) + elif not _strict or expr.atoms(BaseScalarField): + return 0 + else: # If it does not contain anything related to the diffgeom module and it is _strict + return -1 + + +############################################################################### +# Coordinate transformation functions +############################################################################### +def vectors_in_basis(expr, to_sys): + """Transform all base vectors in base vectors of a specified coord basis. + While the new base vectors are in the new coordinate system basis, any + coefficients are kept in the old system. + + Examples + ======== + + >>> from sympy.diffgeom import vectors_in_basis + >>> from sympy.diffgeom.rn import R2_r, R2_p + + >>> vectors_in_basis(R2_r.e_x, R2_p) + -y*e_theta/(x**2 + y**2) + x*e_rho/sqrt(x**2 + y**2) + >>> vectors_in_basis(R2_p.e_r, R2_r) + sin(theta)*e_y + cos(theta)*e_x + + """ + vectors = list(expr.atoms(BaseVectorField)) + new_vectors = [] + for v in vectors: + cs = v._coord_sys + jac = cs.jacobian(to_sys, cs.coord_functions()) + new = (jac.T*Matrix(to_sys.base_vectors()))[v._index] + new_vectors.append(new) + return expr.subs(list(zip(vectors, new_vectors))) + + +############################################################################### +# Coordinate-dependent functions +############################################################################### +def twoform_to_matrix(expr): + """Return the matrix representing the twoform. + + For the twoform `w` return the matrix `M` such that `M[i,j]=w(e_i, e_j)`, + where `e_i` is the i-th base vector field for the coordinate system in + which the expression of `w` is given. + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2 + >>> from sympy.diffgeom import twoform_to_matrix, TensorProduct + >>> TP = TensorProduct + + >>> twoform_to_matrix(TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + Matrix([ + [1, 0], + [0, 1]]) + >>> twoform_to_matrix(R2.x*TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + Matrix([ + [x, 0], + [0, 1]]) + >>> twoform_to_matrix(TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy) - TP(R2.dx, R2.dy)/2) + Matrix([ + [ 1, 0], + [-1/2, 1]]) + + """ + if covariant_order(expr) != 2 or contravariant_order(expr): + raise ValueError('The input expression is not a two-form.') + coord_sys = _find_coords(expr) + if len(coord_sys) != 1: + raise ValueError('The input expression concerns more than one ' + 'coordinate systems, hence there is no unambiguous ' + 'way to choose a coordinate system for the matrix.') + coord_sys = coord_sys.pop() + vectors = coord_sys.base_vectors() + expr = expr.expand() + matrix_content = [[expr.rcall(v1, v2) for v1 in vectors] + for v2 in vectors] + return Matrix(matrix_content) + + +def metric_to_Christoffel_1st(expr): + """Return the nested list of Christoffel symbols for the given metric. + This returns the Christoffel symbol of first kind that represents the + Levi-Civita connection for the given metric. + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2 + >>> from sympy.diffgeom import metric_to_Christoffel_1st, TensorProduct + >>> TP = TensorProduct + + >>> metric_to_Christoffel_1st(TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + [[[0, 0], [0, 0]], [[0, 0], [0, 0]]] + >>> metric_to_Christoffel_1st(R2.x*TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + [[[1/2, 0], [0, 0]], [[0, 0], [0, 0]]] + + """ + matrix = twoform_to_matrix(expr) + if not matrix.is_symmetric(): + raise ValueError( + 'The two-form representing the metric is not symmetric.') + coord_sys = _find_coords(expr).pop() + deriv_matrices = [matrix.applyfunc(d) for d in coord_sys.base_vectors()] + indices = list(range(coord_sys.dim)) + christoffel = [[[(deriv_matrices[k][i, j] + deriv_matrices[j][i, k] - deriv_matrices[i][j, k])/2 + for k in indices] + for j in indices] + for i in indices] + return ImmutableDenseNDimArray(christoffel) + + +def metric_to_Christoffel_2nd(expr): + """Return the nested list of Christoffel symbols for the given metric. + This returns the Christoffel symbol of second kind that represents the + Levi-Civita connection for the given metric. + + Examples + ======== + + >>> from sympy.diffgeom.rn import R2 + >>> from sympy.diffgeom import metric_to_Christoffel_2nd, TensorProduct + >>> TP = TensorProduct + + >>> metric_to_Christoffel_2nd(TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + [[[0, 0], [0, 0]], [[0, 0], [0, 0]]] + >>> metric_to_Christoffel_2nd(R2.x*TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + [[[1/(2*x), 0], [0, 0]], [[0, 0], [0, 0]]] + + """ + ch_1st = metric_to_Christoffel_1st(expr) + coord_sys = _find_coords(expr).pop() + indices = list(range(coord_sys.dim)) + # XXX workaround, inverting a matrix does not work if it contains non + # symbols + #matrix = twoform_to_matrix(expr).inv() + matrix = twoform_to_matrix(expr) + s_fields = set() + for e in matrix: + s_fields.update(e.atoms(BaseScalarField)) + s_fields = list(s_fields) + dums = coord_sys.symbols + matrix = matrix.subs(list(zip(s_fields, dums))).inv().subs(list(zip(dums, s_fields))) + # XXX end of workaround + christoffel = [[[Add(*[matrix[i, l]*ch_1st[l, j, k] for l in indices]) + for k in indices] + for j in indices] + for i in indices] + return ImmutableDenseNDimArray(christoffel) + + +def metric_to_Riemann_components(expr): + """Return the components of the Riemann tensor expressed in a given basis. + + Given a metric it calculates the components of the Riemann tensor in the + canonical basis of the coordinate system in which the metric expression is + given. + + Examples + ======== + + >>> from sympy import exp + >>> from sympy.diffgeom.rn import R2 + >>> from sympy.diffgeom import metric_to_Riemann_components, TensorProduct + >>> TP = TensorProduct + + >>> metric_to_Riemann_components(TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + [[[[0, 0], [0, 0]], [[0, 0], [0, 0]]], [[[0, 0], [0, 0]], [[0, 0], [0, 0]]]] + >>> non_trivial_metric = exp(2*R2.r)*TP(R2.dr, R2.dr) + \ + R2.r**2*TP(R2.dtheta, R2.dtheta) + >>> non_trivial_metric + exp(2*rho)*TensorProduct(drho, drho) + rho**2*TensorProduct(dtheta, dtheta) + >>> riemann = metric_to_Riemann_components(non_trivial_metric) + >>> riemann[0, :, :, :] + [[[0, 0], [0, 0]], [[0, exp(-2*rho)*rho], [-exp(-2*rho)*rho, 0]]] + >>> riemann[1, :, :, :] + [[[0, -1/rho], [1/rho, 0]], [[0, 0], [0, 0]]] + + """ + ch_2nd = metric_to_Christoffel_2nd(expr) + coord_sys = _find_coords(expr).pop() + indices = list(range(coord_sys.dim)) + deriv_ch = [[[[d(ch_2nd[i, j, k]) + for d in coord_sys.base_vectors()] + for k in indices] + for j in indices] + for i in indices] + riemann_a = [[[[deriv_ch[rho][sig][nu][mu] - deriv_ch[rho][sig][mu][nu] + for nu in indices] + for mu in indices] + for sig in indices] + for rho in indices] + riemann_b = [[[[Add(*[ch_2nd[rho, l, mu]*ch_2nd[l, sig, nu] - ch_2nd[rho, l, nu]*ch_2nd[l, sig, mu] for l in indices]) + for nu in indices] + for mu in indices] + for sig in indices] + for rho in indices] + riemann = [[[[riemann_a[rho][sig][mu][nu] + riemann_b[rho][sig][mu][nu] + for nu in indices] + for mu in indices] + for sig in indices] + for rho in indices] + return ImmutableDenseNDimArray(riemann) + + +def metric_to_Ricci_components(expr): + + """Return the components of the Ricci tensor expressed in a given basis. + + Given a metric it calculates the components of the Ricci tensor in the + canonical basis of the coordinate system in which the metric expression is + given. + + Examples + ======== + + >>> from sympy import exp + >>> from sympy.diffgeom.rn import R2 + >>> from sympy.diffgeom import metric_to_Ricci_components, TensorProduct + >>> TP = TensorProduct + + >>> metric_to_Ricci_components(TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + [[0, 0], [0, 0]] + >>> non_trivial_metric = exp(2*R2.r)*TP(R2.dr, R2.dr) + \ + R2.r**2*TP(R2.dtheta, R2.dtheta) + >>> non_trivial_metric + exp(2*rho)*TensorProduct(drho, drho) + rho**2*TensorProduct(dtheta, dtheta) + >>> metric_to_Ricci_components(non_trivial_metric) + [[1/rho, 0], [0, exp(-2*rho)*rho]] + + """ + riemann = metric_to_Riemann_components(expr) + coord_sys = _find_coords(expr).pop() + indices = list(range(coord_sys.dim)) + ricci = [[Add(*[riemann[k, i, k, j] for k in indices]) + for j in indices] + for i in indices] + return ImmutableDenseNDimArray(ricci) + +############################################################################### +# Classes for deprecation +############################################################################### + +class _deprecated_container: + # This class gives deprecation warning. + # When deprecated features are completely deleted, this should be removed as well. + # See https://github.com/sympy/sympy/pull/19368 + def __init__(self, message, data): + super().__init__(data) + self.message = message + + def warn(self): + sympy_deprecation_warning( + self.message, + deprecated_since_version="1.7", + active_deprecations_target="deprecated-diffgeom-mutable", + stacklevel=4 + ) + + def __iter__(self): + self.warn() + return super().__iter__() + + def __getitem__(self, key): + self.warn() + return super().__getitem__(key) + + def __contains__(self, key): + self.warn() + return super().__contains__(key) + + +class _deprecated_list(_deprecated_container, list): + pass + + +class _deprecated_dict(_deprecated_container, dict): + pass + + +# Import at end to avoid cyclic imports +from sympy.simplify.simplify import simplify diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/rn.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/rn.py new file mode 100644 index 0000000000000000000000000000000000000000..897c7e82bc804d260612f79c820af92632f3b281 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/rn.py @@ -0,0 +1,143 @@ +"""Predefined R^n manifolds together with common coord. systems. + +Coordinate systems are predefined as well as the transformation laws between +them. + +Coordinate functions can be accessed as attributes of the manifold (eg `R2.x`), +as attributes of the coordinate systems (eg `R2_r.x` and `R2_p.theta`), or by +using the usual `coord_sys.coord_function(index, name)` interface. +""" + +from typing import Any +import warnings + +from sympy.core.symbol import (Dummy, symbols) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (acos, atan2, cos, sin) +from .diffgeom import Manifold, Patch, CoordSystem + +__all__ = [ + 'R2', 'R2_origin', 'relations_2d', 'R2_r', 'R2_p', + 'R3', 'R3_origin', 'relations_3d', 'R3_r', 'R3_c', 'R3_s' +] + +############################################################################### +# R2 +############################################################################### +R2: Any = Manifold('R^2', 2) + +R2_origin: Any = Patch('origin', R2) + +x, y = symbols('x y', real=True) +r, theta = symbols('rho theta', nonnegative=True) + +relations_2d = { + ('rectangular', 'polar'): [(x, y), (sqrt(x**2 + y**2), atan2(y, x))], + ('polar', 'rectangular'): [(r, theta), (r*cos(theta), r*sin(theta))], +} + +R2_r: Any = CoordSystem('rectangular', R2_origin, (x, y), relations_2d) +R2_p: Any = CoordSystem('polar', R2_origin, (r, theta), relations_2d) + +# support deprecated feature +with warnings.catch_warnings(): + warnings.simplefilter("ignore") + x, y, r, theta = symbols('x y r theta', cls=Dummy) + R2_r.connect_to(R2_p, [x, y], + [sqrt(x**2 + y**2), atan2(y, x)], + inverse=False, fill_in_gaps=False) + R2_p.connect_to(R2_r, [r, theta], + [r*cos(theta), r*sin(theta)], + inverse=False, fill_in_gaps=False) + +# Defining the basis coordinate functions and adding shortcuts for them to the +# manifold and the patch. +R2.x, R2.y = R2_origin.x, R2_origin.y = R2_r.x, R2_r.y = R2_r.coord_functions() +R2.r, R2.theta = R2_origin.r, R2_origin.theta = R2_p.r, R2_p.theta = R2_p.coord_functions() + +# Defining the basis vector fields and adding shortcuts for them to the +# manifold and the patch. +R2.e_x, R2.e_y = R2_origin.e_x, R2_origin.e_y = R2_r.e_x, R2_r.e_y = R2_r.base_vectors() +R2.e_r, R2.e_theta = R2_origin.e_r, R2_origin.e_theta = R2_p.e_r, R2_p.e_theta = R2_p.base_vectors() + +# Defining the basis oneform fields and adding shortcuts for them to the +# manifold and the patch. +R2.dx, R2.dy = R2_origin.dx, R2_origin.dy = R2_r.dx, R2_r.dy = R2_r.base_oneforms() +R2.dr, R2.dtheta = R2_origin.dr, R2_origin.dtheta = R2_p.dr, R2_p.dtheta = R2_p.base_oneforms() + +############################################################################### +# R3 +############################################################################### +R3: Any = Manifold('R^3', 3) + +R3_origin: Any = Patch('origin', R3) + +x, y, z = symbols('x y z', real=True) +rho, psi, r, theta, phi = symbols('rho psi r theta phi', nonnegative=True) + +relations_3d = { + ('rectangular', 'cylindrical'): [(x, y, z), + (sqrt(x**2 + y**2), atan2(y, x), z)], + ('cylindrical', 'rectangular'): [(rho, psi, z), + (rho*cos(psi), rho*sin(psi), z)], + ('rectangular', 'spherical'): [(x, y, z), + (sqrt(x**2 + y**2 + z**2), + acos(z/sqrt(x**2 + y**2 + z**2)), + atan2(y, x))], + ('spherical', 'rectangular'): [(r, theta, phi), + (r*sin(theta)*cos(phi), + r*sin(theta)*sin(phi), + r*cos(theta))], + ('cylindrical', 'spherical'): [(rho, psi, z), + (sqrt(rho**2 + z**2), + acos(z/sqrt(rho**2 + z**2)), + psi)], + ('spherical', 'cylindrical'): [(r, theta, phi), + (r*sin(theta), phi, r*cos(theta))], +} + +R3_r: Any = CoordSystem('rectangular', R3_origin, (x, y, z), relations_3d) +R3_c: Any = CoordSystem('cylindrical', R3_origin, (rho, psi, z), relations_3d) +R3_s: Any = CoordSystem('spherical', R3_origin, (r, theta, phi), relations_3d) + +# support deprecated feature +with warnings.catch_warnings(): + warnings.simplefilter("ignore") + x, y, z, rho, psi, r, theta, phi = symbols('x y z rho psi r theta phi', cls=Dummy) + R3_r.connect_to(R3_c, [x, y, z], + [sqrt(x**2 + y**2), atan2(y, x), z], + inverse=False, fill_in_gaps=False) + R3_c.connect_to(R3_r, [rho, psi, z], + [rho*cos(psi), rho*sin(psi), z], + inverse=False, fill_in_gaps=False) + ## rectangular <-> spherical + R3_r.connect_to(R3_s, [x, y, z], + [sqrt(x**2 + y**2 + z**2), acos(z/ + sqrt(x**2 + y**2 + z**2)), atan2(y, x)], + inverse=False, fill_in_gaps=False) + R3_s.connect_to(R3_r, [r, theta, phi], + [r*sin(theta)*cos(phi), r*sin( + theta)*sin(phi), r*cos(theta)], + inverse=False, fill_in_gaps=False) + ## cylindrical <-> spherical + R3_c.connect_to(R3_s, [rho, psi, z], + [sqrt(rho**2 + z**2), acos(z/sqrt(rho**2 + z**2)), psi], + inverse=False, fill_in_gaps=False) + R3_s.connect_to(R3_c, [r, theta, phi], + [r*sin(theta), phi, r*cos(theta)], + inverse=False, fill_in_gaps=False) + +# Defining the basis coordinate functions. +R3_r.x, R3_r.y, R3_r.z = R3_r.coord_functions() +R3_c.rho, R3_c.psi, R3_c.z = R3_c.coord_functions() +R3_s.r, R3_s.theta, R3_s.phi = R3_s.coord_functions() + +# Defining the basis vector fields. +R3_r.e_x, R3_r.e_y, R3_r.e_z = R3_r.base_vectors() +R3_c.e_rho, R3_c.e_psi, R3_c.e_z = R3_c.base_vectors() +R3_s.e_r, R3_s.e_theta, R3_s.e_phi = R3_s.base_vectors() + +# Defining the basis oneform fields. +R3_r.dx, R3_r.dy, R3_r.dz = R3_r.base_oneforms() +R3_c.drho, R3_c.dpsi, R3_c.dz = R3_c.base_oneforms() +R3_s.dr, R3_s.dtheta, R3_s.dphi = R3_s.base_oneforms() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/tests/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/tests/test_class_structure.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/tests/test_class_structure.py new file mode 100644 index 0000000000000000000000000000000000000000..c649fd9fcb9acdf1f410a021966c6e0fee62cc2b --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/tests/test_class_structure.py @@ -0,0 +1,33 @@ +from sympy.diffgeom import Manifold, Patch, CoordSystem, Point +from sympy.core.function import Function +from sympy.core.symbol import symbols +from sympy.testing.pytest import warns_deprecated_sympy + +m = Manifold('m', 2) +p = Patch('p', m) +a, b = symbols('a b') +cs = CoordSystem('cs', p, [a, b]) +x, y = symbols('x y') +f = Function('f') +s1, s2 = cs.coord_functions() +v1, v2 = cs.base_vectors() +f1, f2 = cs.base_oneforms() + +def test_point(): + point = Point(cs, [x, y]) + assert point != Point(cs, [2, y]) + #TODO assert point.subs(x, 2) == Point(cs, [2, y]) + #TODO assert point.free_symbols == set([x, y]) + +def test_subs(): + assert s1.subs(s1, s2) == s2 + assert v1.subs(v1, v2) == v2 + assert f1.subs(f1, f2) == f2 + assert (x*f(s1) + y).subs(s1, s2) == x*f(s2) + y + assert (f(s1)*v1).subs(v1, v2) == f(s1)*v2 + assert (y*f(s1)*f1).subs(f1, f2) == y*f(s1)*f2 + +def test_deprecated(): + with warns_deprecated_sympy(): + cs_wname = CoordSystem('cs', p, ['a', 'b']) + assert cs_wname == cs_wname.func(*cs_wname.args) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/tests/test_diffgeom.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/tests/test_diffgeom.py new file mode 100644 index 0000000000000000000000000000000000000000..7c3c9265785896b8f4ffa3a2b41816ca90579758 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/tests/test_diffgeom.py @@ -0,0 +1,342 @@ +from sympy.core import Lambda, Symbol, symbols +from sympy.diffgeom.rn import R2, R2_p, R2_r, R3_r, R3_c, R3_s, R2_origin +from sympy.diffgeom import (Manifold, Patch, CoordSystem, Commutator, Differential, TensorProduct, + WedgeProduct, BaseCovarDerivativeOp, CovarDerivativeOp, LieDerivative, + covariant_order, contravariant_order, twoform_to_matrix, metric_to_Christoffel_1st, + metric_to_Christoffel_2nd, metric_to_Riemann_components, + metric_to_Ricci_components, intcurve_diffequ, intcurve_series) +from sympy.simplify import trigsimp, simplify +from sympy.functions import sqrt, atan2, sin +from sympy.matrices import Matrix +from sympy.testing.pytest import raises, nocache_fail +from sympy.testing.pytest import warns_deprecated_sympy + +TP = TensorProduct + + +def test_coordsys_transform(): + # test inverse transforms + p, q, r, s = symbols('p q r s') + rel = {('first', 'second'): [(p, q), (q, -p)]} + R2_pq = CoordSystem('first', R2_origin, [p, q], rel) + R2_rs = CoordSystem('second', R2_origin, [r, s], rel) + r, s = R2_rs.symbols + assert R2_rs.transform(R2_pq) == Matrix([[-s], [r]]) + + # inverse transform impossible case + a, b = symbols('a b', positive=True) + rel = {('first', 'second'): [(a,), (-a,)]} + R2_a = CoordSystem('first', R2_origin, [a], rel) + R2_b = CoordSystem('second', R2_origin, [b], rel) + # This transformation is uninvertible because there is no positive a, b satisfying a = -b + with raises(NotImplementedError): + R2_b.transform(R2_a) + + # inverse transform ambiguous case + c, d = symbols('c d') + rel = {('first', 'second'): [(c,), (c**2,)]} + R2_c = CoordSystem('first', R2_origin, [c], rel) + R2_d = CoordSystem('second', R2_origin, [d], rel) + # The transform method should throw if it finds multiple inverses for a coordinate transformation. + with raises(ValueError): + R2_d.transform(R2_c) + + # test indirect transformation + a, b, c, d, e, f = symbols('a, b, c, d, e, f') + rel = {('C1', 'C2'): [(a, b), (2*a, 3*b)], + ('C2', 'C3'): [(c, d), (3*c, 2*d)]} + C1 = CoordSystem('C1', R2_origin, (a, b), rel) + C2 = CoordSystem('C2', R2_origin, (c, d), rel) + C3 = CoordSystem('C3', R2_origin, (e, f), rel) + a, b = C1.symbols + c, d = C2.symbols + e, f = C3.symbols + assert C2.transform(C1) == Matrix([c/2, d/3]) + assert C1.transform(C3) == Matrix([6*a, 6*b]) + assert C3.transform(C1) == Matrix([e/6, f/6]) + assert C3.transform(C2) == Matrix([e/3, f/2]) + + a, b, c, d, e, f = symbols('a, b, c, d, e, f') + rel = {('C1', 'C2'): [(a, b), (2*a, 3*b + 1)], + ('C3', 'C2'): [(e, f), (-e - 2, 2*f)]} + C1 = CoordSystem('C1', R2_origin, (a, b), rel) + C2 = CoordSystem('C2', R2_origin, (c, d), rel) + C3 = CoordSystem('C3', R2_origin, (e, f), rel) + a, b = C1.symbols + c, d = C2.symbols + e, f = C3.symbols + assert C2.transform(C1) == Matrix([c/2, (d - 1)/3]) + assert C1.transform(C3) == Matrix([-2*a - 2, (3*b + 1)/2]) + assert C3.transform(C1) == Matrix([-e/2 - 1, (2*f - 1)/3]) + assert C3.transform(C2) == Matrix([-e - 2, 2*f]) + + # old signature uses Lambda + a, b, c, d, e, f = symbols('a, b, c, d, e, f') + rel = {('C1', 'C2'): Lambda((a, b), (2*a, 3*b + 1)), + ('C3', 'C2'): Lambda((e, f), (-e - 2, 2*f))} + C1 = CoordSystem('C1', R2_origin, (a, b), rel) + C2 = CoordSystem('C2', R2_origin, (c, d), rel) + C3 = CoordSystem('C3', R2_origin, (e, f), rel) + a, b = C1.symbols + c, d = C2.symbols + e, f = C3.symbols + assert C2.transform(C1) == Matrix([c/2, (d - 1)/3]) + assert C1.transform(C3) == Matrix([-2*a - 2, (3*b + 1)/2]) + assert C3.transform(C1) == Matrix([-e/2 - 1, (2*f - 1)/3]) + assert C3.transform(C2) == Matrix([-e - 2, 2*f]) + + +def test_R2(): + x0, y0, r0, theta0 = symbols('x0, y0, r0, theta0', real=True) + point_r = R2_r.point([x0, y0]) + point_p = R2_p.point([r0, theta0]) + + # r**2 = x**2 + y**2 + assert (R2.r**2 - R2.x**2 - R2.y**2).rcall(point_r) == 0 + assert trigsimp( (R2.r**2 - R2.x**2 - R2.y**2).rcall(point_p) ) == 0 + assert trigsimp(R2.e_r(R2.x**2 + R2.y**2).rcall(point_p).doit()) == 2*r0 + + # polar->rect->polar == Id + a, b = symbols('a b', positive=True) + m = Matrix([[a], [b]]) + + #TODO assert m == R2_r.transform(R2_p, R2_p.transform(R2_r, [a, b])).applyfunc(simplify) + assert m == R2_p.transform(R2_r, R2_r.transform(R2_p, m)).applyfunc(simplify) + + # deprecated method + with warns_deprecated_sympy(): + assert m == R2_p.coord_tuple_transform_to( + R2_r, R2_r.coord_tuple_transform_to(R2_p, m)).applyfunc(simplify) + + +def test_R3(): + a, b, c = symbols('a b c', positive=True) + m = Matrix([[a], [b], [c]]) + + assert m == R3_c.transform(R3_r, R3_r.transform(R3_c, m)).applyfunc(simplify) + #TODO assert m == R3_r.transform(R3_c, R3_c.transform(R3_r, m)).applyfunc(simplify) + assert m == R3_s.transform( + R3_r, R3_r.transform(R3_s, m)).applyfunc(simplify) + #TODO assert m == R3_r.transform(R3_s, R3_s.transform(R3_r, m)).applyfunc(simplify) + assert m == R3_s.transform( + R3_c, R3_c.transform(R3_s, m)).applyfunc(simplify) + #TODO assert m == R3_c.transform(R3_s, R3_s.transform(R3_c, m)).applyfunc(simplify) + + with warns_deprecated_sympy(): + assert m == R3_c.coord_tuple_transform_to( + R3_r, R3_r.coord_tuple_transform_to(R3_c, m)).applyfunc(simplify) + #TODO assert m == R3_r.coord_tuple_transform_to(R3_c, R3_c.coord_tuple_transform_to(R3_r, m)).applyfunc(simplify) + assert m == R3_s.coord_tuple_transform_to( + R3_r, R3_r.coord_tuple_transform_to(R3_s, m)).applyfunc(simplify) + #TODO assert m == R3_r.coord_tuple_transform_to(R3_s, R3_s.coord_tuple_transform_to(R3_r, m)).applyfunc(simplify) + assert m == R3_s.coord_tuple_transform_to( + R3_c, R3_c.coord_tuple_transform_to(R3_s, m)).applyfunc(simplify) + #TODO assert m == R3_c.coord_tuple_transform_to(R3_s, R3_s.coord_tuple_transform_to(R3_c, m)).applyfunc(simplify) + + +def test_CoordinateSymbol(): + x, y = R2_r.symbols + r, theta = R2_p.symbols + assert y.rewrite(R2_p) == r*sin(theta) + + +def test_point(): + x, y = symbols('x, y') + p = R2_r.point([x, y]) + assert p.free_symbols == {x, y} + assert p.coords(R2_r) == p.coords() == Matrix([x, y]) + assert p.coords(R2_p) == Matrix([sqrt(x**2 + y**2), atan2(y, x)]) + + +def test_commutator(): + assert Commutator(R2.e_x, R2.e_y) == 0 + assert Commutator(R2.x*R2.e_x, R2.x*R2.e_x) == 0 + assert Commutator(R2.x*R2.e_x, R2.x*R2.e_y) == R2.x*R2.e_y + c = Commutator(R2.e_x, R2.e_r) + assert c(R2.x) == R2.y*(R2.x**2 + R2.y**2)**(-1)*sin(R2.theta) + + +def test_differential(): + xdy = R2.x*R2.dy + dxdy = Differential(xdy) + assert xdy.rcall(None) == xdy + assert dxdy(R2.e_x, R2.e_y) == 1 + assert dxdy(R2.e_x, R2.x*R2.e_y) == R2.x + assert Differential(dxdy) == 0 + + +def test_products(): + assert TensorProduct( + R2.dx, R2.dy)(R2.e_x, R2.e_y) == R2.dx(R2.e_x)*R2.dy(R2.e_y) == 1 + assert TensorProduct(R2.dx, R2.dy)(None, R2.e_y) == R2.dx + assert TensorProduct(R2.dx, R2.dy)(R2.e_x, None) == R2.dy + assert TensorProduct(R2.dx, R2.dy)(R2.e_x) == R2.dy + assert TensorProduct(R2.x, R2.dx) == R2.x*R2.dx + assert TensorProduct( + R2.e_x, R2.e_y)(R2.x, R2.y) == R2.e_x(R2.x) * R2.e_y(R2.y) == 1 + assert TensorProduct(R2.e_x, R2.e_y)(None, R2.y) == R2.e_x + assert TensorProduct(R2.e_x, R2.e_y)(R2.x, None) == R2.e_y + assert TensorProduct(R2.e_x, R2.e_y)(R2.x) == R2.e_y + assert TensorProduct(R2.x, R2.e_x) == R2.x * R2.e_x + assert TensorProduct( + R2.dx, R2.e_y)(R2.e_x, R2.y) == R2.dx(R2.e_x) * R2.e_y(R2.y) == 1 + assert TensorProduct(R2.dx, R2.e_y)(None, R2.y) == R2.dx + assert TensorProduct(R2.dx, R2.e_y)(R2.e_x, None) == R2.e_y + assert TensorProduct(R2.dx, R2.e_y)(R2.e_x) == R2.e_y + assert TensorProduct(R2.x, R2.e_x) == R2.x * R2.e_x + assert TensorProduct( + R2.e_x, R2.dy)(R2.x, R2.e_y) == R2.e_x(R2.x) * R2.dy(R2.e_y) == 1 + assert TensorProduct(R2.e_x, R2.dy)(None, R2.e_y) == R2.e_x + assert TensorProduct(R2.e_x, R2.dy)(R2.x, None) == R2.dy + assert TensorProduct(R2.e_x, R2.dy)(R2.x) == R2.dy + assert TensorProduct(R2.e_y,R2.e_x)(R2.x**2 + R2.y**2,R2.x**2 + R2.y**2) == 4*R2.x*R2.y + + assert WedgeProduct(R2.dx, R2.dy)(R2.e_x, R2.e_y) == 1 + assert WedgeProduct(R2.e_x, R2.e_y)(R2.x, R2.y) == 1 + + +def test_lie_derivative(): + assert LieDerivative(R2.e_x, R2.y) == R2.e_x(R2.y) == 0 + assert LieDerivative(R2.e_x, R2.x) == R2.e_x(R2.x) == 1 + assert LieDerivative(R2.e_x, R2.e_x) == Commutator(R2.e_x, R2.e_x) == 0 + assert LieDerivative(R2.e_x, R2.e_r) == Commutator(R2.e_x, R2.e_r) + assert LieDerivative(R2.e_x + R2.e_y, R2.x) == 1 + assert LieDerivative( + R2.e_x, TensorProduct(R2.dx, R2.dy))(R2.e_x, R2.e_y) == 0 + + +@nocache_fail +def test_covar_deriv(): + ch = metric_to_Christoffel_2nd(TP(R2.dx, R2.dx) + TP(R2.dy, R2.dy)) + cvd = BaseCovarDerivativeOp(R2_r, 0, ch) + assert cvd(R2.x) == 1 + # This line fails if the cache is disabled: + assert cvd(R2.x*R2.e_x) == R2.e_x + cvd = CovarDerivativeOp(R2.x*R2.e_x, ch) + assert cvd(R2.x) == R2.x + assert cvd(R2.x*R2.e_x) == R2.x*R2.e_x + + +def test_intcurve_diffequ(): + t = symbols('t') + start_point = R2_r.point([1, 0]) + vector_field = -R2.y*R2.e_x + R2.x*R2.e_y + equations, init_cond = intcurve_diffequ(vector_field, t, start_point) + assert str(equations) == '[f_1(t) + Derivative(f_0(t), t), -f_0(t) + Derivative(f_1(t), t)]' + assert str(init_cond) == '[f_0(0) - 1, f_1(0)]' + equations, init_cond = intcurve_diffequ(vector_field, t, start_point, R2_p) + assert str( + equations) == '[Derivative(f_0(t), t), Derivative(f_1(t), t) - 1]' + assert str(init_cond) == '[f_0(0) - 1, f_1(0)]' + + +def test_helpers_and_coordinate_dependent(): + one_form = R2.dr + R2.dx + two_form = Differential(R2.x*R2.dr + R2.r*R2.dx) + three_form = Differential( + R2.y*two_form) + Differential(R2.x*Differential(R2.r*R2.dr)) + metric = TensorProduct(R2.dx, R2.dx) + TensorProduct(R2.dy, R2.dy) + metric_ambig = TensorProduct(R2.dx, R2.dx) + TensorProduct(R2.dr, R2.dr) + misform_a = TensorProduct(R2.dr, R2.dr) + R2.dr + misform_b = R2.dr**4 + misform_c = R2.dx*R2.dy + twoform_not_sym = TensorProduct(R2.dx, R2.dx) + TensorProduct(R2.dx, R2.dy) + twoform_not_TP = WedgeProduct(R2.dx, R2.dy) + + one_vector = R2.e_x + R2.e_y + two_vector = TensorProduct(R2.e_x, R2.e_y) + three_vector = TensorProduct(R2.e_x, R2.e_y, R2.e_x) + two_wp = WedgeProduct(R2.e_x,R2.e_y) + + assert covariant_order(one_form) == 1 + assert covariant_order(two_form) == 2 + assert covariant_order(three_form) == 3 + assert covariant_order(two_form + metric) == 2 + assert covariant_order(two_form + metric_ambig) == 2 + assert covariant_order(two_form + twoform_not_sym) == 2 + assert covariant_order(two_form + twoform_not_TP) == 2 + + assert contravariant_order(one_vector) == 1 + assert contravariant_order(two_vector) == 2 + assert contravariant_order(three_vector) == 3 + assert contravariant_order(two_vector + two_wp) == 2 + + raises(ValueError, lambda: covariant_order(misform_a)) + raises(ValueError, lambda: covariant_order(misform_b)) + raises(ValueError, lambda: covariant_order(misform_c)) + + assert twoform_to_matrix(metric) == Matrix([[1, 0], [0, 1]]) + assert twoform_to_matrix(twoform_not_sym) == Matrix([[1, 0], [1, 0]]) + assert twoform_to_matrix(twoform_not_TP) == Matrix([[0, -1], [1, 0]]) + + raises(ValueError, lambda: twoform_to_matrix(one_form)) + raises(ValueError, lambda: twoform_to_matrix(three_form)) + raises(ValueError, lambda: twoform_to_matrix(metric_ambig)) + + raises(ValueError, lambda: metric_to_Christoffel_1st(twoform_not_sym)) + raises(ValueError, lambda: metric_to_Christoffel_2nd(twoform_not_sym)) + raises(ValueError, lambda: metric_to_Riemann_components(twoform_not_sym)) + raises(ValueError, lambda: metric_to_Ricci_components(twoform_not_sym)) + + +def test_correct_arguments(): + raises(ValueError, lambda: R2.e_x(R2.e_x)) + raises(ValueError, lambda: R2.e_x(R2.dx)) + + raises(ValueError, lambda: Commutator(R2.e_x, R2.x)) + raises(ValueError, lambda: Commutator(R2.dx, R2.e_x)) + + raises(ValueError, lambda: Differential(Differential(R2.e_x))) + + raises(ValueError, lambda: R2.dx(R2.x)) + + raises(ValueError, lambda: LieDerivative(R2.dx, R2.dx)) + raises(ValueError, lambda: LieDerivative(R2.x, R2.dx)) + + raises(ValueError, lambda: CovarDerivativeOp(R2.dx, [])) + raises(ValueError, lambda: CovarDerivativeOp(R2.x, [])) + + a = Symbol('a') + raises(ValueError, lambda: intcurve_series(R2.dx, a, R2_r.point([1, 2]))) + raises(ValueError, lambda: intcurve_series(R2.x, a, R2_r.point([1, 2]))) + + raises(ValueError, lambda: intcurve_diffequ(R2.dx, a, R2_r.point([1, 2]))) + raises(ValueError, lambda: intcurve_diffequ(R2.x, a, R2_r.point([1, 2]))) + + raises(ValueError, lambda: contravariant_order(R2.e_x + R2.dx)) + raises(ValueError, lambda: covariant_order(R2.e_x + R2.dx)) + + raises(ValueError, lambda: contravariant_order(R2.e_x*R2.e_y)) + raises(ValueError, lambda: covariant_order(R2.dx*R2.dy)) + +def test_simplify(): + x, y = R2_r.coord_functions() + dx, dy = R2_r.base_oneforms() + ex, ey = R2_r.base_vectors() + assert simplify(x) == x + assert simplify(x*y) == x*y + assert simplify(dx*dy) == dx*dy + assert simplify(ex*ey) == ex*ey + assert ((1-x)*dx)/(1-x)**2 == dx/(1-x) + + +def test_issue_17917(): + X = R2.x*R2.e_x - R2.y*R2.e_y + Y = (R2.x**2 + R2.y**2)*R2.e_x - R2.x*R2.y*R2.e_y + assert LieDerivative(X, Y).expand() == ( + R2.x**2*R2.e_x - 3*R2.y**2*R2.e_x - R2.x*R2.y*R2.e_y) + +def test_deprecations(): + m = Manifold('M', 2) + p = Patch('P', m) + with warns_deprecated_sympy(): + CoordSystem('Car2d', p, names=['x', 'y']) + + with warns_deprecated_sympy(): + c = CoordSystem('Car2d', p, ['x', 'y']) + + with warns_deprecated_sympy(): + list(m.patches) + + with warns_deprecated_sympy(): + list(c.transforms) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/tests/test_function_diffgeom_book.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/tests/test_function_diffgeom_book.py new file mode 100644 index 0000000000000000000000000000000000000000..44d9623bc34ab73c7d575d9d9fd5b6d84f8e4a94 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/tests/test_function_diffgeom_book.py @@ -0,0 +1,145 @@ +from sympy.diffgeom.rn import R2, R2_p, R2_r, R3_r +from sympy.diffgeom import intcurve_series, Differential, WedgeProduct +from sympy.core import symbols, Function, Derivative +from sympy.simplify import trigsimp, simplify +from sympy.functions import sqrt, atan2, sin, cos +from sympy.matrices import Matrix + +# Most of the functionality is covered in the +# test_functional_diffgeom_ch* tests which are based on the +# example from the paper of Sussman and Wisdom. +# If they do not cover something, additional tests are added in other test +# functions. + +# From "Functional Differential Geometry" as of 2011 +# by Sussman and Wisdom. + + +def test_functional_diffgeom_ch2(): + x0, y0, r0, theta0 = symbols('x0, y0, r0, theta0', real=True) + x, y = symbols('x, y', real=True) + f = Function('f') + + assert (R2_p.point_to_coords(R2_r.point([x0, y0])) == + Matrix([sqrt(x0**2 + y0**2), atan2(y0, x0)])) + assert (R2_r.point_to_coords(R2_p.point([r0, theta0])) == + Matrix([r0*cos(theta0), r0*sin(theta0)])) + + assert R2_p.jacobian(R2_r, [r0, theta0]) == Matrix( + [[cos(theta0), -r0*sin(theta0)], [sin(theta0), r0*cos(theta0)]]) + + field = f(R2.x, R2.y) + p1_in_rect = R2_r.point([x0, y0]) + p1_in_polar = R2_p.point([sqrt(x0**2 + y0**2), atan2(y0, x0)]) + assert field.rcall(p1_in_rect) == f(x0, y0) + assert field.rcall(p1_in_polar) == f(x0, y0) + + p_r = R2_r.point([x0, y0]) + p_p = R2_p.point([r0, theta0]) + assert R2.x(p_r) == x0 + assert R2.x(p_p) == r0*cos(theta0) + assert R2.r(p_p) == r0 + assert R2.r(p_r) == sqrt(x0**2 + y0**2) + assert R2.theta(p_r) == atan2(y0, x0) + + h = R2.x*R2.r**2 + R2.y**3 + assert h.rcall(p_r) == x0*(x0**2 + y0**2) + y0**3 + assert h.rcall(p_p) == r0**3*sin(theta0)**3 + r0**3*cos(theta0) + + +def test_functional_diffgeom_ch3(): + x0, y0 = symbols('x0, y0', real=True) + x, y, t = symbols('x, y, t', real=True) + f = Function('f') + b1 = Function('b1') + b2 = Function('b2') + p_r = R2_r.point([x0, y0]) + + s_field = f(R2.x, R2.y) + v_field = b1(R2.x)*R2.e_x + b2(R2.y)*R2.e_y + assert v_field.rcall(s_field).rcall(p_r).doit() == b1( + x0)*Derivative(f(x0, y0), x0) + b2(y0)*Derivative(f(x0, y0), y0) + + assert R2.e_x(R2.r**2).rcall(p_r) == 2*x0 + v = R2.e_x + 2*R2.e_y + s = R2.r**2 + 3*R2.x + assert v.rcall(s).rcall(p_r).doit() == 2*x0 + 4*y0 + 3 + + circ = -R2.y*R2.e_x + R2.x*R2.e_y + series = intcurve_series(circ, t, R2_r.point([1, 0]), coeffs=True) + series_x, series_y = zip(*series) + assert all( + term == cos(t).taylor_term(i, t) for i, term in enumerate(series_x)) + assert all( + term == sin(t).taylor_term(i, t) for i, term in enumerate(series_y)) + + +def test_functional_diffgeom_ch4(): + x0, y0, theta0 = symbols('x0, y0, theta0', real=True) + x, y, r, theta = symbols('x, y, r, theta', real=True) + r0 = symbols('r0', positive=True) + f = Function('f') + b1 = Function('b1') + b2 = Function('b2') + p_r = R2_r.point([x0, y0]) + p_p = R2_p.point([r0, theta0]) + + f_field = b1(R2.x, R2.y)*R2.dx + b2(R2.x, R2.y)*R2.dy + assert f_field.rcall(R2.e_x).rcall(p_r) == b1(x0, y0) + assert f_field.rcall(R2.e_y).rcall(p_r) == b2(x0, y0) + + s_field_r = f(R2.x, R2.y) + df = Differential(s_field_r) + assert df(R2.e_x).rcall(p_r).doit() == Derivative(f(x0, y0), x0) + assert df(R2.e_y).rcall(p_r).doit() == Derivative(f(x0, y0), y0) + + s_field_p = f(R2.r, R2.theta) + df = Differential(s_field_p) + assert trigsimp(df(R2.e_x).rcall(p_p).doit()) == ( + cos(theta0)*Derivative(f(r0, theta0), r0) - + sin(theta0)*Derivative(f(r0, theta0), theta0)/r0) + assert trigsimp(df(R2.e_y).rcall(p_p).doit()) == ( + sin(theta0)*Derivative(f(r0, theta0), r0) + + cos(theta0)*Derivative(f(r0, theta0), theta0)/r0) + + assert R2.dx(R2.e_x).rcall(p_r) == 1 + assert R2.dx(R2.e_x) == 1 + assert R2.dx(R2.e_y).rcall(p_r) == 0 + assert R2.dx(R2.e_y) == 0 + + circ = -R2.y*R2.e_x + R2.x*R2.e_y + assert R2.dx(circ).rcall(p_r).doit() == -y0 + assert R2.dy(circ).rcall(p_r) == x0 + assert R2.dr(circ).rcall(p_r) == 0 + assert simplify(R2.dtheta(circ).rcall(p_r)) == 1 + + assert (circ - R2.e_theta).rcall(s_field_r).rcall(p_r) == 0 + + +def test_functional_diffgeom_ch6(): + u0, u1, u2, v0, v1, v2, w0, w1, w2 = symbols('u0:3, v0:3, w0:3', real=True) + + u = u0*R2.e_x + u1*R2.e_y + v = v0*R2.e_x + v1*R2.e_y + wp = WedgeProduct(R2.dx, R2.dy) + assert wp(u, v) == u0*v1 - u1*v0 + + u = u0*R3_r.e_x + u1*R3_r.e_y + u2*R3_r.e_z + v = v0*R3_r.e_x + v1*R3_r.e_y + v2*R3_r.e_z + w = w0*R3_r.e_x + w1*R3_r.e_y + w2*R3_r.e_z + wp = WedgeProduct(R3_r.dx, R3_r.dy, R3_r.dz) + assert wp( + u, v, w) == Matrix(3, 3, [u0, u1, u2, v0, v1, v2, w0, w1, w2]).det() + + a, b, c = symbols('a, b, c', cls=Function) + a_f = a(R3_r.x, R3_r.y, R3_r.z) + b_f = b(R3_r.x, R3_r.y, R3_r.z) + c_f = c(R3_r.x, R3_r.y, R3_r.z) + theta = a_f*R3_r.dx + b_f*R3_r.dy + c_f*R3_r.dz + dtheta = Differential(theta) + da = Differential(a_f) + db = Differential(b_f) + dc = Differential(c_f) + expr = dtheta - WedgeProduct( + da, R3_r.dx) - WedgeProduct(db, R3_r.dy) - WedgeProduct(dc, R3_r.dz) + assert expr.rcall(R3_r.e_x, R3_r.e_y) == 0 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/tests/test_hyperbolic_space.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/tests/test_hyperbolic_space.py new file mode 100644 index 0000000000000000000000000000000000000000..48ddc7f8065f2b69bcd8eca4726a21c5901514ec --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/diffgeom/tests/test_hyperbolic_space.py @@ -0,0 +1,91 @@ +r''' +unit test describing the hyperbolic half-plane with the Poincare metric. This +is a basic model of hyperbolic geometry on the (positive) half-space + +{(x,y) \in R^2 | y > 0} + +with the Riemannian metric + +ds^2 = (dx^2 + dy^2)/y^2 + +It has constant negative scalar curvature = -2 + +https://en.wikipedia.org/wiki/Poincare_half-plane_model +''' +from sympy.matrices.dense import diag +from sympy.diffgeom import (twoform_to_matrix, + metric_to_Christoffel_1st, metric_to_Christoffel_2nd, + metric_to_Riemann_components, metric_to_Ricci_components) +import sympy.diffgeom.rn +from sympy.tensor.array import ImmutableDenseNDimArray + + +def test_H2(): + TP = sympy.diffgeom.TensorProduct + R2 = sympy.diffgeom.rn.R2 + y = R2.y + dy = R2.dy + dx = R2.dx + g = (TP(dx, dx) + TP(dy, dy))*y**(-2) + automat = twoform_to_matrix(g) + mat = diag(y**(-2), y**(-2)) + assert mat == automat + + gamma1 = metric_to_Christoffel_1st(g) + assert gamma1[0, 0, 0] == 0 + assert gamma1[0, 0, 1] == -y**(-3) + assert gamma1[0, 1, 0] == -y**(-3) + assert gamma1[0, 1, 1] == 0 + + assert gamma1[1, 1, 1] == -y**(-3) + assert gamma1[1, 1, 0] == 0 + assert gamma1[1, 0, 1] == 0 + assert gamma1[1, 0, 0] == y**(-3) + + gamma2 = metric_to_Christoffel_2nd(g) + assert gamma2[0, 0, 0] == 0 + assert gamma2[0, 0, 1] == -y**(-1) + assert gamma2[0, 1, 0] == -y**(-1) + assert gamma2[0, 1, 1] == 0 + + assert gamma2[1, 1, 1] == -y**(-1) + assert gamma2[1, 1, 0] == 0 + assert gamma2[1, 0, 1] == 0 + assert gamma2[1, 0, 0] == y**(-1) + + Rm = metric_to_Riemann_components(g) + assert Rm[0, 0, 0, 0] == 0 + assert Rm[0, 0, 0, 1] == 0 + assert Rm[0, 0, 1, 0] == 0 + assert Rm[0, 0, 1, 1] == 0 + + assert Rm[0, 1, 0, 0] == 0 + assert Rm[0, 1, 0, 1] == -y**(-2) + assert Rm[0, 1, 1, 0] == y**(-2) + assert Rm[0, 1, 1, 1] == 0 + + assert Rm[1, 0, 0, 0] == 0 + assert Rm[1, 0, 0, 1] == y**(-2) + assert Rm[1, 0, 1, 0] == -y**(-2) + assert Rm[1, 0, 1, 1] == 0 + + assert Rm[1, 1, 0, 0] == 0 + assert Rm[1, 1, 0, 1] == 0 + assert Rm[1, 1, 1, 0] == 0 + assert Rm[1, 1, 1, 1] == 0 + + Ric = metric_to_Ricci_components(g) + assert Ric[0, 0] == -y**(-2) + assert Ric[0, 1] == 0 + assert Ric[1, 0] == 0 + assert Ric[0, 0] == -y**(-2) + + assert Ric == ImmutableDenseNDimArray([-y**(-2), 0, 0, -y**(-2)], (2, 2)) + + ## scalar curvature is -2 + #TODO - it would be nice to have index contraction built-in + R = (Ric[0, 0] + Ric[1, 1])*y**2 + assert R == -2 + + ## Gauss curvature is -1 + assert R/2 == -1 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..968c4caa0d4562b71285f414bfb70f43d0b35111 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/__init__.py @@ -0,0 +1,20 @@ +"""This module contains functions which operate on discrete sequences. + +Transforms - ``fft``, ``ifft``, ``ntt``, ``intt``, ``fwht``, ``ifwht``, + ``mobius_transform``, ``inverse_mobius_transform`` + +Convolutions - ``convolution``, ``convolution_fft``, ``convolution_ntt``, + ``convolution_fwht``, ``convolution_subset``, + ``covering_product``, ``intersecting_product`` +""" + +from .transforms import (fft, ifft, ntt, intt, fwht, ifwht, + mobius_transform, inverse_mobius_transform) +from .convolutions import convolution, covering_product, intersecting_product + +__all__ = [ + 'fft', 'ifft', 'ntt', 'intt', 'fwht', 'ifwht', 'mobius_transform', + 'inverse_mobius_transform', + + 'convolution', 'covering_product', 'intersecting_product', +] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/convolutions.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/convolutions.py new file mode 100644 index 0000000000000000000000000000000000000000..ac9a3dbbb26b8b117ea1ee99cf7ebabbd21322cc --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/convolutions.py @@ -0,0 +1,597 @@ +""" +Convolution (using **FFT**, **NTT**, **FWHT**), Subset Convolution, +Covering Product, Intersecting Product +""" + +from sympy.core import S, sympify, Rational +from sympy.core.function import expand_mul +from sympy.discrete.transforms import ( + fft, ifft, ntt, intt, fwht, ifwht, + mobius_transform, inverse_mobius_transform) +from sympy.external.gmpy import MPZ, lcm +from sympy.utilities.iterables import iterable +from sympy.utilities.misc import as_int + + +def convolution(a, b, cycle=0, dps=None, prime=None, dyadic=None, subset=None): + """ + Performs convolution by determining the type of desired + convolution using hints. + + Exactly one of ``dps``, ``prime``, ``dyadic``, ``subset`` arguments + should be specified explicitly for identifying the type of convolution, + and the argument ``cycle`` can be specified optionally. + + For the default arguments, linear convolution is performed using **FFT**. + + Parameters + ========== + + a, b : iterables + The sequences for which convolution is performed. + cycle : Integer + Specifies the length for doing cyclic convolution. + dps : Integer + Specifies the number of decimal digits for precision for + performing **FFT** on the sequence. + prime : Integer + Prime modulus of the form `(m 2^k + 1)` to be used for + performing **NTT** on the sequence. + dyadic : bool + Identifies the convolution type as dyadic (*bitwise-XOR*) + convolution, which is performed using **FWHT**. + subset : bool + Identifies the convolution type as subset convolution. + + Examples + ======== + + >>> from sympy import convolution, symbols, S, I + >>> u, v, w, x, y, z = symbols('u v w x y z') + + >>> convolution([1 + 2*I, 4 + 3*I], [S(5)/4, 6], dps=3) + [1.25 + 2.5*I, 11.0 + 15.8*I, 24.0 + 18.0*I] + >>> convolution([1, 2, 3], [4, 5, 6], cycle=3) + [31, 31, 28] + + >>> convolution([111, 777], [888, 444], prime=19*2**10 + 1) + [1283, 19351, 14219] + >>> convolution([111, 777], [888, 444], prime=19*2**10 + 1, cycle=2) + [15502, 19351] + + >>> convolution([u, v], [x, y, z], dyadic=True) + [u*x + v*y, u*y + v*x, u*z, v*z] + >>> convolution([u, v], [x, y, z], dyadic=True, cycle=2) + [u*x + u*z + v*y, u*y + v*x + v*z] + + >>> convolution([u, v, w], [x, y, z], subset=True) + [u*x, u*y + v*x, u*z + w*x, v*z + w*y] + >>> convolution([u, v, w], [x, y, z], subset=True, cycle=3) + [u*x + v*z + w*y, u*y + v*x, u*z + w*x] + + """ + + c = as_int(cycle) + if c < 0: + raise ValueError("The length for cyclic convolution " + "must be non-negative") + + dyadic = True if dyadic else None + subset = True if subset else None + if sum(x is not None for x in (prime, dps, dyadic, subset)) > 1: + raise TypeError("Ambiguity in determining the type of convolution") + + if prime is not None: + ls = convolution_ntt(a, b, prime=prime) + return ls if not c else [sum(ls[i::c]) % prime for i in range(c)] + + if dyadic: + ls = convolution_fwht(a, b) + elif subset: + ls = convolution_subset(a, b) + else: + def loop(a): + dens = [] + for i in a: + if isinstance(i, Rational) and i.q - 1: + dens.append(i.q) + elif not isinstance(i, int): + return + if dens: + l = lcm(*dens) + return [i*l if type(i) is int else i.p*(l//i.q) for i in a], l + # no lcm of den to deal with + return a, 1 + ls = None + da = loop(a) + if da is not None: + db = loop(b) + if db is not None: + (ia, ma), (ib, mb) = da, db + den = ma*mb + ls = convolution_int(ia, ib) + if den != 1: + ls = [Rational(i, den) for i in ls] + if ls is None: + ls = convolution_fft(a, b, dps) + + return ls if not c else [sum(ls[i::c]) for i in range(c)] + + +#----------------------------------------------------------------------------# +# # +# Convolution for Complex domain # +# # +#----------------------------------------------------------------------------# + +def convolution_fft(a, b, dps=None): + """ + Performs linear convolution using Fast Fourier Transform. + + Parameters + ========== + + a, b : iterables + The sequences for which convolution is performed. + dps : Integer + Specifies the number of decimal digits for precision. + + Examples + ======== + + >>> from sympy import S, I + >>> from sympy.discrete.convolutions import convolution_fft + + >>> convolution_fft([2, 3], [4, 5]) + [8, 22, 15] + >>> convolution_fft([2, 5], [6, 7, 3]) + [12, 44, 41, 15] + >>> convolution_fft([1 + 2*I, 4 + 3*I], [S(5)/4, 6]) + [5/4 + 5*I/2, 11 + 63*I/4, 24 + 18*I] + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Convolution_theorem + .. [2] https://en.wikipedia.org/wiki/Discrete_Fourier_transform_(general%29 + + """ + + a, b = a[:], b[:] + n = m = len(a) + len(b) - 1 # convolution size + + if n > 0 and n&(n - 1): # not a power of 2 + n = 2**n.bit_length() + + # padding with zeros + a += [S.Zero]*(n - len(a)) + b += [S.Zero]*(n - len(b)) + + a, b = fft(a, dps), fft(b, dps) + a = [expand_mul(x*y) for x, y in zip(a, b)] + a = ifft(a, dps)[:m] + + return a + + +#----------------------------------------------------------------------------# +# # +# Convolution for GF(p) # +# # +#----------------------------------------------------------------------------# + +def convolution_ntt(a, b, prime): + """ + Performs linear convolution using Number Theoretic Transform. + + Parameters + ========== + + a, b : iterables + The sequences for which convolution is performed. + prime : Integer + Prime modulus of the form `(m 2^k + 1)` to be used for performing + **NTT** on the sequence. + + Examples + ======== + + >>> from sympy.discrete.convolutions import convolution_ntt + >>> convolution_ntt([2, 3], [4, 5], prime=19*2**10 + 1) + [8, 22, 15] + >>> convolution_ntt([2, 5], [6, 7, 3], prime=19*2**10 + 1) + [12, 44, 41, 15] + >>> convolution_ntt([333, 555], [222, 666], prime=19*2**10 + 1) + [15555, 14219, 19404] + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Convolution_theorem + .. [2] https://en.wikipedia.org/wiki/Discrete_Fourier_transform_(general%29 + + """ + + a, b, p = a[:], b[:], as_int(prime) + n = m = len(a) + len(b) - 1 # convolution size + + if n > 0 and n&(n - 1): # not a power of 2 + n = 2**n.bit_length() + + # padding with zeros + a += [0]*(n - len(a)) + b += [0]*(n - len(b)) + + a, b = ntt(a, p), ntt(b, p) + a = [x*y % p for x, y in zip(a, b)] + a = intt(a, p)[:m] + + return a + + +#----------------------------------------------------------------------------# +# # +# Convolution for 2**n-group # +# # +#----------------------------------------------------------------------------# + +def convolution_fwht(a, b): + """ + Performs dyadic (*bitwise-XOR*) convolution using Fast Walsh Hadamard + Transform. + + The convolution is automatically padded to the right with zeros, as the + *radix-2 FWHT* requires the number of sample points to be a power of 2. + + Parameters + ========== + + a, b : iterables + The sequences for which convolution is performed. + + Examples + ======== + + >>> from sympy import symbols, S, I + >>> from sympy.discrete.convolutions import convolution_fwht + + >>> u, v, x, y = symbols('u v x y') + >>> convolution_fwht([u, v], [x, y]) + [u*x + v*y, u*y + v*x] + + >>> convolution_fwht([2, 3], [4, 5]) + [23, 22] + >>> convolution_fwht([2, 5 + 4*I, 7], [6*I, 7, 3 + 4*I]) + [56 + 68*I, -10 + 30*I, 6 + 50*I, 48 + 32*I] + + >>> convolution_fwht([S(33)/7, S(55)/6, S(7)/4], [S(2)/3, 5]) + [2057/42, 1870/63, 7/6, 35/4] + + References + ========== + + .. [1] https://www.radioeng.cz/fulltexts/2002/02_03_40_42.pdf + .. [2] https://en.wikipedia.org/wiki/Hadamard_transform + + """ + + if not a or not b: + return [] + + a, b = a[:], b[:] + n = max(len(a), len(b)) + + if n&(n - 1): # not a power of 2 + n = 2**n.bit_length() + + # padding with zeros + a += [S.Zero]*(n - len(a)) + b += [S.Zero]*(n - len(b)) + + a, b = fwht(a), fwht(b) + a = [expand_mul(x*y) for x, y in zip(a, b)] + a = ifwht(a) + + return a + + +#----------------------------------------------------------------------------# +# # +# Subset Convolution # +# # +#----------------------------------------------------------------------------# + +def convolution_subset(a, b): + """ + Performs Subset Convolution of given sequences. + + The indices of each argument, considered as bit strings, correspond to + subsets of a finite set. + + The sequence is automatically padded to the right with zeros, as the + definition of subset based on bitmasks (indices) requires the size of + sequence to be a power of 2. + + Parameters + ========== + + a, b : iterables + The sequences for which convolution is performed. + + Examples + ======== + + >>> from sympy import symbols, S + >>> from sympy.discrete.convolutions import convolution_subset + >>> u, v, x, y, z = symbols('u v x y z') + + >>> convolution_subset([u, v], [x, y]) + [u*x, u*y + v*x] + >>> convolution_subset([u, v, x], [y, z]) + [u*y, u*z + v*y, x*y, x*z] + + >>> convolution_subset([1, S(2)/3], [3, 4]) + [3, 6] + >>> convolution_subset([1, 3, S(5)/7], [7]) + [7, 21, 5, 0] + + References + ========== + + .. [1] https://people.csail.mit.edu/rrw/presentations/subset-conv.pdf + + """ + + if not a or not b: + return [] + + if not iterable(a) or not iterable(b): + raise TypeError("Expected a sequence of coefficients for convolution") + + a = [sympify(arg) for arg in a] + b = [sympify(arg) for arg in b] + n = max(len(a), len(b)) + + if n&(n - 1): # not a power of 2 + n = 2**n.bit_length() + + # padding with zeros + a += [S.Zero]*(n - len(a)) + b += [S.Zero]*(n - len(b)) + + c = [S.Zero]*n + + for mask in range(n): + smask = mask + while smask > 0: + c[mask] += expand_mul(a[smask] * b[mask^smask]) + smask = (smask - 1)&mask + + c[mask] += expand_mul(a[smask] * b[mask^smask]) + + return c + + +#----------------------------------------------------------------------------# +# # +# Covering Product # +# # +#----------------------------------------------------------------------------# + +def covering_product(a, b): + """ + Returns the covering product of given sequences. + + The indices of each argument, considered as bit strings, correspond to + subsets of a finite set. + + The covering product of given sequences is a sequence which contains + the sum of products of the elements of the given sequences grouped by + the *bitwise-OR* of the corresponding indices. + + The sequence is automatically padded to the right with zeros, as the + definition of subset based on bitmasks (indices) requires the size of + sequence to be a power of 2. + + Parameters + ========== + + a, b : iterables + The sequences for which covering product is to be obtained. + + Examples + ======== + + >>> from sympy import symbols, S, I, covering_product + >>> u, v, x, y, z = symbols('u v x y z') + + >>> covering_product([u, v], [x, y]) + [u*x, u*y + v*x + v*y] + >>> covering_product([u, v, x], [y, z]) + [u*y, u*z + v*y + v*z, x*y, x*z] + + >>> covering_product([1, S(2)/3], [3, 4 + 5*I]) + [3, 26/3 + 25*I/3] + >>> covering_product([1, 3, S(5)/7], [7, 8]) + [7, 53, 5, 40/7] + + References + ========== + + .. [1] https://people.csail.mit.edu/rrw/presentations/subset-conv.pdf + + """ + + if not a or not b: + return [] + + a, b = a[:], b[:] + n = max(len(a), len(b)) + + if n&(n - 1): # not a power of 2 + n = 2**n.bit_length() + + # padding with zeros + a += [S.Zero]*(n - len(a)) + b += [S.Zero]*(n - len(b)) + + a, b = mobius_transform(a), mobius_transform(b) + a = [expand_mul(x*y) for x, y in zip(a, b)] + a = inverse_mobius_transform(a) + + return a + + +#----------------------------------------------------------------------------# +# # +# Intersecting Product # +# # +#----------------------------------------------------------------------------# + +def intersecting_product(a, b): + """ + Returns the intersecting product of given sequences. + + The indices of each argument, considered as bit strings, correspond to + subsets of a finite set. + + The intersecting product of given sequences is the sequence which + contains the sum of products of the elements of the given sequences + grouped by the *bitwise-AND* of the corresponding indices. + + The sequence is automatically padded to the right with zeros, as the + definition of subset based on bitmasks (indices) requires the size of + sequence to be a power of 2. + + Parameters + ========== + + a, b : iterables + The sequences for which intersecting product is to be obtained. + + Examples + ======== + + >>> from sympy import symbols, S, I, intersecting_product + >>> u, v, x, y, z = symbols('u v x y z') + + >>> intersecting_product([u, v], [x, y]) + [u*x + u*y + v*x, v*y] + >>> intersecting_product([u, v, x], [y, z]) + [u*y + u*z + v*y + x*y + x*z, v*z, 0, 0] + + >>> intersecting_product([1, S(2)/3], [3, 4 + 5*I]) + [9 + 5*I, 8/3 + 10*I/3] + >>> intersecting_product([1, 3, S(5)/7], [7, 8]) + [327/7, 24, 0, 0] + + References + ========== + + .. [1] https://people.csail.mit.edu/rrw/presentations/subset-conv.pdf + + """ + + if not a or not b: + return [] + + a, b = a[:], b[:] + n = max(len(a), len(b)) + + if n&(n - 1): # not a power of 2 + n = 2**n.bit_length() + + # padding with zeros + a += [S.Zero]*(n - len(a)) + b += [S.Zero]*(n - len(b)) + + a, b = mobius_transform(a, subset=False), mobius_transform(b, subset=False) + a = [expand_mul(x*y) for x, y in zip(a, b)] + a = inverse_mobius_transform(a, subset=False) + + return a + + +#----------------------------------------------------------------------------# +# # +# Integer Convolutions # +# # +#----------------------------------------------------------------------------# + +def convolution_int(a, b): + """Return the convolution of two sequences as a list. + + The iterables must consist solely of integers. + + Parameters + ========== + + a, b : Sequence + The sequences for which convolution is performed. + + Explanation + =========== + + This function performs the convolution of ``a`` and ``b`` by packing + each into a single integer, multiplying them together, and then + unpacking the result from the product. The intuition behind this is + that if we evaluate some polynomial [1]: + + .. math :: + 1156x^6 + 3808x^5 + 8440x^4 + 14856x^3 + 16164x^2 + 14040x + 8100 + + at say $x = 10^5$ we obtain $1156038080844014856161641404008100$. + Note we can read of the coefficients for each term every five digits. + If the $x$ we chose to evaluate at is large enough, the same will hold + for the product. + + The idea now is since big integer multiplication in libraries such + as GMP is highly optimised, this will be reasonably fast. + + Examples + ======== + + >>> from sympy.discrete.convolutions import convolution_int + + >>> convolution_int([2, 3], [4, 5]) + [8, 22, 15] + >>> convolution_int([1, 1, -1], [1, 1]) + [1, 2, 0, -1] + + References + ========== + + .. [1] Fateman, Richard J. + Can you save time in multiplying polynomials by encoding them as integers? + University of California, Berkeley, California (2004). + https://people.eecs.berkeley.edu/~fateman/papers/polysbyGMP.pdf + """ + # An upper bound on the largest coefficient in p(x)q(x) is given by (1 + min(dp, dq))N(p)N(q) + # where dp = deg(p), dq = deg(q), N(f) denotes the coefficient of largest modulus in f [1] + B = max(abs(c) for c in a)*max(abs(c) for c in b)*(1 + min(len(a) - 1, len(b) - 1)) + x, power = MPZ(1), 0 + while x <= (2*B): # multiply by two for negative coefficients, see [1] + x <<= 1 + power += 1 + + def to_integer(poly): + n, mul = MPZ(0), 0 + for c in reversed(poly): + if c and not mul: mul = -1 if c < 0 else 1 + n <<= power + n += mul*int(c) + return mul, n + + # Perform packing and multiplication + (a_mul, a_packed), (b_mul, b_packed) = to_integer(a), to_integer(b) + result = a_packed * b_packed + + # Perform unpacking + mul = a_mul * b_mul + mask, half, borrow, poly = x - 1, x >> 1, 0, [] + while result or borrow: + coeff = (result & mask) + borrow + result >>= power + borrow = coeff >= half + poly.append(mul * int(coeff if coeff < half else coeff - x)) + return poly or [0] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/recurrences.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/recurrences.py new file mode 100644 index 0000000000000000000000000000000000000000..0b0ed80d304161cf9ca298321aedc094c8cae1b3 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/recurrences.py @@ -0,0 +1,166 @@ +""" +Recurrences +""" + +from sympy.core import S, sympify +from sympy.utilities.iterables import iterable +from sympy.utilities.misc import as_int + + +def linrec(coeffs, init, n): + r""" + Evaluation of univariate linear recurrences of homogeneous type + having coefficients independent of the recurrence variable. + + Parameters + ========== + + coeffs : iterable + Coefficients of the recurrence + init : iterable + Initial values of the recurrence + n : Integer + Point of evaluation for the recurrence + + Notes + ===== + + Let `y(n)` be the recurrence of given type, ``c`` be the sequence + of coefficients, ``b`` be the sequence of initial/base values of the + recurrence and ``k`` (equal to ``len(c)``) be the order of recurrence. + Then, + + .. math :: y(n) = \begin{cases} b_n & 0 \le n < k \\ + c_0 y(n-1) + c_1 y(n-2) + \cdots + c_{k-1} y(n-k) & n \ge k + \end{cases} + + Let `x_0, x_1, \ldots, x_n` be a sequence and consider the transformation + that maps each polynomial `f(x)` to `T(f(x))` where each power `x^i` is + replaced by the corresponding value `x_i`. The sequence is then a solution + of the recurrence if and only if `T(x^i p(x)) = 0` for each `i \ge 0` where + `p(x) = x^k - c_0 x^(k-1) - \cdots - c_{k-1}` is the characteristic + polynomial. + + Then `T(f(x)p(x)) = 0` for each polynomial `f(x)` (as it is a linear + combination of powers `x^i`). Now, if `x^n` is congruent to + `g(x) = a_0 x^0 + a_1 x^1 + \cdots + a_{k-1} x^{k-1}` modulo `p(x)`, then + `T(x^n) = x_n` is equal to + `T(g(x)) = a_0 x_0 + a_1 x_1 + \cdots + a_{k-1} x_{k-1}`. + + Computation of `x^n`, + given `x^k = c_0 x^{k-1} + c_1 x^{k-2} + \cdots + c_{k-1}` + is performed using exponentiation by squaring (refer to [1_]) with + an additional reduction step performed to retain only first `k` powers + of `x` in the representation of `x^n`. + + Examples + ======== + + >>> from sympy.discrete.recurrences import linrec + >>> from sympy.abc import x, y, z + + >>> linrec(coeffs=[1, 1], init=[0, 1], n=10) + 55 + + >>> linrec(coeffs=[1, 1], init=[x, y], n=10) + 34*x + 55*y + + >>> linrec(coeffs=[x, y], init=[0, 1], n=5) + x**2*y + x*(x**3 + 2*x*y) + y**2 + + >>> linrec(coeffs=[1, 2, 3, 0, 0, 4], init=[x, y, z], n=16) + 13576*x + 5676*y + 2356*z + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Exponentiation_by_squaring + .. [2] https://en.wikipedia.org/w/index.php?title=Modular_exponentiation§ion=6#Matrices + + See Also + ======== + + sympy.polys.agca.extensions.ExtensionElement.__pow__ + + """ + + if not coeffs: + return S.Zero + + if not iterable(coeffs): + raise TypeError("Expected a sequence of coefficients for" + " the recurrence") + + if not iterable(init): + raise TypeError("Expected a sequence of values for the initialization" + " of the recurrence") + + n = as_int(n) + if n < 0: + raise ValueError("Point of evaluation of recurrence must be a " + "non-negative integer") + + c = [sympify(arg) for arg in coeffs] + b = [sympify(arg) for arg in init] + k = len(c) + + if len(b) > k: + raise TypeError("Count of initial values should not exceed the " + "order of the recurrence") + else: + b += [S.Zero]*(k - len(b)) # remaining initial values default to zero + + if n < k: + return b[n] + terms = [u*v for u, v in zip(linrec_coeffs(c, n), b)] + return sum(terms[:-1], terms[-1]) + + +def linrec_coeffs(c, n): + r""" + Compute the coefficients of n'th term in linear recursion + sequence defined by c. + + `x^k = c_0 x^{k-1} + c_1 x^{k-2} + \cdots + c_{k-1}`. + + It computes the coefficients by using binary exponentiation. + This function is used by `linrec` and `_eval_pow_by_cayley`. + + Parameters + ========== + + c = coefficients of the divisor polynomial + n = exponent of x, so dividend is x^n + + """ + + k = len(c) + + def _square_and_reduce(u, offset): + # squares `(u_0 + u_1 x + u_2 x^2 + \cdots + u_{k-1} x^k)` (and + # multiplies by `x` if offset is 1) and reduces the above result of + # length upto `2k` to `k` using the characteristic equation of the + # recurrence given by, `x^k = c_0 x^{k-1} + c_1 x^{k-2} + \cdots + c_{k-1}` + + w = [S.Zero]*(2*len(u) - 1 + offset) + for i, p in enumerate(u): + for j, q in enumerate(u): + w[offset + i + j] += p*q + + for j in range(len(w) - 1, k - 1, -1): + for i in range(k): + w[j - i - 1] += w[j]*c[i] + + return w[:k] + + def _final_coeffs(n): + # computes the final coefficient list - `cf` corresponding to the + # point at which recurrence is to be evalauted - `n`, such that, + # `y(n) = cf_0 y(k-1) + cf_1 y(k-2) + \cdots + cf_{k-1} y(0)` + + if n < k: + return [S.Zero]*n + [S.One] + [S.Zero]*(k - n - 1) + else: + return _square_and_reduce(_final_coeffs(n // 2), n % 2) + + return _final_coeffs(n) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/tests/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/tests/test_convolutions.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/tests/test_convolutions.py new file mode 100644 index 0000000000000000000000000000000000000000..96e5fc801ac63f95c01eb18d48143ae3a1ac6222 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/tests/test_convolutions.py @@ -0,0 +1,392 @@ +from sympy.core.numbers import (E, Rational, pi) +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.core import S, symbols, I +from sympy.discrete.convolutions import ( + convolution, convolution_fft, convolution_ntt, convolution_fwht, + convolution_subset, covering_product, intersecting_product, + convolution_int) +from sympy.testing.pytest import raises +from sympy.abc import x, y + +def test_convolution(): + # fft + a = [1, Rational(5, 3), sqrt(3), Rational(7, 5)] + b = [9, 5, 5, 4, 3, 2] + c = [3, 5, 3, 7, 8] + d = [1422, 6572, 3213, 5552] + e = [-1, Rational(5, 3), Rational(7, 5)] + + assert convolution(a, b) == convolution_fft(a, b) + assert convolution(a, b, dps=9) == convolution_fft(a, b, dps=9) + assert convolution(a, d, dps=7) == convolution_fft(d, a, dps=7) + assert convolution(a, d[1:], dps=3) == convolution_fft(d[1:], a, dps=3) + + # prime moduli of the form (m*2**k + 1), sequence length + # should be a divisor of 2**k + p = 7*17*2**23 + 1 + q = 19*2**10 + 1 + + # ntt + assert convolution(d, b, prime=q) == convolution_ntt(b, d, prime=q) + assert convolution(c, b, prime=p) == convolution_ntt(b, c, prime=p) + assert convolution(d, c, prime=p) == convolution_ntt(c, d, prime=p) + raises(TypeError, lambda: convolution(b, d, dps=5, prime=q)) + raises(TypeError, lambda: convolution(b, d, dps=6, prime=q)) + + # fwht + assert convolution(a, b, dyadic=True) == convolution_fwht(a, b) + assert convolution(a, b, dyadic=False) == convolution(a, b) + raises(TypeError, lambda: convolution(b, d, dps=2, dyadic=True)) + raises(TypeError, lambda: convolution(b, d, prime=p, dyadic=True)) + raises(TypeError, lambda: convolution(a, b, dps=2, dyadic=True)) + raises(TypeError, lambda: convolution(b, c, prime=p, dyadic=True)) + + # subset + assert convolution(a, b, subset=True) == convolution_subset(a, b) == \ + convolution(a, b, subset=True, dyadic=False) == \ + convolution(a, b, subset=True) + assert convolution(a, b, subset=False) == convolution(a, b) + raises(TypeError, lambda: convolution(a, b, subset=True, dyadic=True)) + raises(TypeError, lambda: convolution(c, d, subset=True, dps=6)) + raises(TypeError, lambda: convolution(a, c, subset=True, prime=q)) + + # integer + assert convolution([0], [0]) == convolution_int([0], [0]) + assert convolution(b, c) == convolution_int(b, c) + + # rational + assert convolution([Rational(1,2)], [Rational(1,2)]) == [Rational(1, 4)] + assert convolution(b, e) == [-9, 10, Rational(239, 15), Rational(34, 3), + Rational(32, 3), Rational(43, 5), Rational(113, 15), + Rational(14, 5)] + + +def test_cyclic_convolution(): + # fft + a = [1, Rational(5, 3), sqrt(3), Rational(7, 5)] + b = [9, 5, 5, 4, 3, 2] + + assert convolution([1, 2, 3], [4, 5, 6], cycle=0) == \ + convolution([1, 2, 3], [4, 5, 6], cycle=5) == \ + convolution([1, 2, 3], [4, 5, 6]) + + assert convolution([1, 2, 3], [4, 5, 6], cycle=3) == [31, 31, 28] + + a = [Rational(1, 3), Rational(7, 3), Rational(5, 9), Rational(2, 7), Rational(5, 8)] + b = [Rational(3, 5), Rational(4, 7), Rational(7, 8), Rational(8, 9)] + + assert convolution(a, b, cycle=0) == \ + convolution(a, b, cycle=len(a) + len(b) - 1) + + assert convolution(a, b, cycle=4) == [Rational(87277, 26460), Rational(30521, 11340), + Rational(11125, 4032), Rational(3653, 1080)] + + assert convolution(a, b, cycle=6) == [Rational(20177, 20160), Rational(676, 315), Rational(47, 24), + Rational(3053, 1080), Rational(16397, 5292), Rational(2497, 2268)] + + assert convolution(a, b, cycle=9) == \ + convolution(a, b, cycle=0) + [S.Zero] + + # ntt + a = [2313, 5323532, S(3232), 42142, 42242421] + b = [S(33456), 56757, 45754, 432423] + + assert convolution(a, b, prime=19*2**10 + 1, cycle=0) == \ + convolution(a, b, prime=19*2**10 + 1, cycle=8) == \ + convolution(a, b, prime=19*2**10 + 1) + + assert convolution(a, b, prime=19*2**10 + 1, cycle=5) == [96, 17146, 2664, + 15534, 3517] + + assert convolution(a, b, prime=19*2**10 + 1, cycle=7) == [4643, 3458, 1260, + 15534, 3517, 16314, 13688] + + assert convolution(a, b, prime=19*2**10 + 1, cycle=9) == \ + convolution(a, b, prime=19*2**10 + 1) + [0] + + # fwht + u, v, w, x, y = symbols('u v w x y') + p, q, r, s, t = symbols('p q r s t') + c = [u, v, w, x, y] + d = [p, q, r, s, t] + + assert convolution(a, b, dyadic=True, cycle=3) == \ + [2499522285783, 19861417974796, 4702176579021] + + assert convolution(a, b, dyadic=True, cycle=5) == [2718149225143, + 2114320852171, 20571217906407, 246166418903, 1413262436976] + + assert convolution(c, d, dyadic=True, cycle=4) == \ + [p*u + p*y + q*v + r*w + s*x + t*u + t*y, + p*v + q*u + q*y + r*x + s*w + t*v, + p*w + q*x + r*u + r*y + s*v + t*w, + p*x + q*w + r*v + s*u + s*y + t*x] + + assert convolution(c, d, dyadic=True, cycle=6) == \ + [p*u + q*v + r*w + r*y + s*x + t*w + t*y, + p*v + q*u + r*x + s*w + s*y + t*x, + p*w + q*x + r*u + s*v, + p*x + q*w + r*v + s*u, + p*y + t*u, + q*y + t*v] + + # subset + assert convolution(a, b, subset=True, cycle=7) == [18266671799811, + 178235365533, 213958794, 246166418903, 1413262436976, + 2397553088697, 1932759730434] + + assert convolution(a[1:], b, subset=True, cycle=4) == \ + [178104086592, 302255835516, 244982785880, 3717819845434] + + assert convolution(a, b[:-1], subset=True, cycle=6) == [1932837114162, + 178235365533, 213958794, 245166224504, 1413262436976, 2397553088697] + + assert convolution(c, d, subset=True, cycle=3) == \ + [p*u + p*x + q*w + r*v + r*y + s*u + t*w, + p*v + p*y + q*u + s*y + t*u + t*x, + p*w + q*y + r*u + t*v] + + assert convolution(c, d, subset=True, cycle=5) == \ + [p*u + q*y + t*v, + p*v + q*u + r*y + t*w, + p*w + r*u + s*y + t*x, + p*x + q*w + r*v + s*u, + p*y + t*u] + + raises(ValueError, lambda: convolution([1, 2, 3], [4, 5, 6], cycle=-1)) + + +def test_convolution_fft(): + assert all(convolution_fft([], x, dps=y) == [] for x in ([], [1]) for y in (None, 3)) + assert convolution_fft([1, 2, 3], [4, 5, 6]) == [4, 13, 28, 27, 18] + assert convolution_fft([1], [5, 6, 7]) == [5, 6, 7] + assert convolution_fft([1, 3], [5, 6, 7]) == [5, 21, 25, 21] + + assert convolution_fft([1 + 2*I], [2 + 3*I]) == [-4 + 7*I] + assert convolution_fft([1 + 2*I, 3 + 4*I, 5 + 3*I/5], [Rational(2, 5) + 4*I/7]) == \ + [Rational(-26, 35) + I*48/35, Rational(-38, 35) + I*116/35, Rational(58, 35) + I*542/175] + + assert convolution_fft([Rational(3, 4), Rational(5, 6)], [Rational(7, 8), Rational(1, 3), Rational(2, 5)]) == \ + [Rational(21, 32), Rational(47, 48), Rational(26, 45), Rational(1, 3)] + + assert convolution_fft([Rational(1, 9), Rational(2, 3), Rational(3, 5)], [Rational(2, 5), Rational(3, 7), Rational(4, 9)]) == \ + [Rational(2, 45), Rational(11, 35), Rational(8152, 14175), Rational(523, 945), Rational(4, 15)] + + assert convolution_fft([pi, E, sqrt(2)], [sqrt(3), 1/pi, 1/E]) == \ + [sqrt(3)*pi, 1 + sqrt(3)*E, E/pi + pi*exp(-1) + sqrt(6), + sqrt(2)/pi + 1, sqrt(2)*exp(-1)] + + assert convolution_fft([2321, 33123], [5321, 6321, 71323]) == \ + [12350041, 190918524, 374911166, 2362431729] + + assert convolution_fft([312313, 31278232], [32139631, 319631]) == \ + [10037624576503, 1005370659728895, 9997492572392] + + raises(TypeError, lambda: convolution_fft(x, y)) + raises(ValueError, lambda: convolution_fft([x, y], [y, x])) + + +def test_convolution_ntt(): + # prime moduli of the form (m*2**k + 1), sequence length + # should be a divisor of 2**k + p = 7*17*2**23 + 1 + q = 19*2**10 + 1 + r = 2*500000003 + 1 # only for sequences of length 1 or 2 + # s = 2*3*5*7 # composite modulus + + assert all(convolution_ntt([], x, prime=y) == [] for x in ([], [1]) for y in (p, q, r)) + assert convolution_ntt([2], [3], r) == [6] + assert convolution_ntt([2, 3], [4], r) == [8, 12] + + assert convolution_ntt([32121, 42144, 4214, 4241], [32132, 3232, 87242], p) == [33867619, + 459741727, 79180879, 831885249, 381344700, 369993322] + assert convolution_ntt([121913, 3171831, 31888131, 12], [17882, 21292, 29921, 312], q) == \ + [8158, 3065, 3682, 7090, 1239, 2232, 3744] + + assert convolution_ntt([12, 19, 21, 98, 67], [2, 6, 7, 8, 9], p) == \ + convolution_ntt([12, 19, 21, 98, 67], [2, 6, 7, 8, 9], q) + assert convolution_ntt([12, 19, 21, 98, 67], [21, 76, 17, 78, 69], p) == \ + convolution_ntt([12, 19, 21, 98, 67], [21, 76, 17, 78, 69], q) + + raises(ValueError, lambda: convolution_ntt([2, 3], [4, 5], r)) + raises(ValueError, lambda: convolution_ntt([x, y], [y, x], q)) + raises(TypeError, lambda: convolution_ntt(x, y, p)) + + +def test_convolution_fwht(): + assert convolution_fwht([], []) == [] + assert convolution_fwht([], [1]) == [] + assert convolution_fwht([1, 2, 3], [4, 5, 6]) == [32, 13, 18, 27] + + assert convolution_fwht([Rational(5, 7), Rational(6, 8), Rational(7, 3)], [2, 4, Rational(6, 7)]) == \ + [Rational(45, 7), Rational(61, 14), Rational(776, 147), Rational(419, 42)] + + a = [1, Rational(5, 3), sqrt(3), Rational(7, 5), 4 + 5*I] + b = [94, 51, 53, 45, 31, 27, 13] + c = [3 + 4*I, 5 + 7*I, 3, Rational(7, 6), 8] + + assert convolution_fwht(a, b) == [53*sqrt(3) + 366 + 155*I, + 45*sqrt(3) + Rational(5848, 15) + 135*I, + 94*sqrt(3) + Rational(1257, 5) + 65*I, + 51*sqrt(3) + Rational(3974, 15), + 13*sqrt(3) + 452 + 470*I, + Rational(4513, 15) + 255*I, + 31*sqrt(3) + Rational(1314, 5) + 265*I, + 27*sqrt(3) + Rational(3676, 15) + 225*I] + + assert convolution_fwht(b, c) == [Rational(1993, 2) + 733*I, Rational(6215, 6) + 862*I, + Rational(1659, 2) + 527*I, Rational(1988, 3) + 551*I, 1019 + 313*I, Rational(3955, 6) + 325*I, + Rational(1175, 2) + 52*I, Rational(3253, 6) + 91*I] + + assert convolution_fwht(a[3:], c) == [Rational(-54, 5) + I*293/5, -1 + I*204/5, + Rational(133, 15) + I*35/6, Rational(409, 30) + 15*I, Rational(56, 5), 32 + 40*I, 0, 0] + + u, v, w, x, y, z = symbols('u v w x y z') + + assert convolution_fwht([u, v], [x, y]) == [u*x + v*y, u*y + v*x] + + assert convolution_fwht([u, v, w], [x, y]) == \ + [u*x + v*y, u*y + v*x, w*x, w*y] + + assert convolution_fwht([u, v, w], [x, y, z]) == \ + [u*x + v*y + w*z, u*y + v*x, u*z + w*x, v*z + w*y] + + raises(TypeError, lambda: convolution_fwht(x, y)) + raises(TypeError, lambda: convolution_fwht(x*y, u + v)) + + +def test_convolution_subset(): + assert convolution_subset([], []) == [] + assert convolution_subset([], [Rational(1, 3)]) == [] + assert convolution_subset([6 + I*3/7], [Rational(2, 3)]) == [4 + I*2/7] + + a = [1, Rational(5, 3), sqrt(3), 4 + 5*I] + b = [64, 71, 55, 47, 33, 29, 15] + c = [3 + I*2/3, 5 + 7*I, 7, Rational(7, 5), 9] + + assert convolution_subset(a, b) == [64, Rational(533, 3), 55 + 64*sqrt(3), + 71*sqrt(3) + Rational(1184, 3) + 320*I, 33, 84, + 15 + 33*sqrt(3), 29*sqrt(3) + 157 + 165*I] + + assert convolution_subset(b, c) == [192 + I*128/3, 533 + I*1486/3, + 613 + I*110/3, Rational(5013, 5) + I*1249/3, + 675 + 22*I, 891 + I*751/3, + 771 + 10*I, Rational(3736, 5) + 105*I] + + assert convolution_subset(a, c) == convolution_subset(c, a) + assert convolution_subset(a[:2], b) == \ + [64, Rational(533, 3), 55, Rational(416, 3), 33, 84, 15, 25] + + assert convolution_subset(a[:2], c) == \ + [3 + I*2/3, 10 + I*73/9, 7, Rational(196, 15), 9, 15, 0, 0] + + u, v, w, x, y, z = symbols('u v w x y z') + + assert convolution_subset([u, v, w], [x, y]) == [u*x, u*y + v*x, w*x, w*y] + assert convolution_subset([u, v, w, x], [y, z]) == \ + [u*y, u*z + v*y, w*y, w*z + x*y] + + assert convolution_subset([u, v], [x, y, z]) == \ + convolution_subset([x, y, z], [u, v]) + + raises(TypeError, lambda: convolution_subset(x, z)) + raises(TypeError, lambda: convolution_subset(Rational(7, 3), u)) + + +def test_covering_product(): + assert covering_product([], []) == [] + assert covering_product([], [Rational(1, 3)]) == [] + assert covering_product([6 + I*3/7], [Rational(2, 3)]) == [4 + I*2/7] + + a = [1, Rational(5, 8), sqrt(7), 4 + 9*I] + b = [66, 81, 95, 49, 37, 89, 17] + c = [3 + I*2/3, 51 + 72*I, 7, Rational(7, 15), 91] + + assert covering_product(a, b) == [66, Rational(1383, 8), 95 + 161*sqrt(7), + 130*sqrt(7) + 1303 + 2619*I, 37, + Rational(671, 4), 17 + 54*sqrt(7), + 89*sqrt(7) + Rational(4661, 8) + 1287*I] + + assert covering_product(b, c) == [198 + 44*I, 7740 + 10638*I, + 1412 + I*190/3, Rational(42684, 5) + I*31202/3, + 9484 + I*74/3, 22163 + I*27394/3, + 10621 + I*34/3, Rational(90236, 15) + 1224*I] + + assert covering_product(a, c) == covering_product(c, a) + assert covering_product(b, c[:-1]) == [198 + 44*I, 7740 + 10638*I, + 1412 + I*190/3, Rational(42684, 5) + I*31202/3, + 111 + I*74/3, 6693 + I*27394/3, + 429 + I*34/3, Rational(23351, 15) + 1224*I] + + assert covering_product(a, c[:-1]) == [3 + I*2/3, + Rational(339, 4) + I*1409/12, 7 + 10*sqrt(7) + 2*sqrt(7)*I/3, + -403 + 772*sqrt(7)/15 + 72*sqrt(7)*I + I*12658/15] + + u, v, w, x, y, z = symbols('u v w x y z') + + assert covering_product([u, v, w], [x, y]) == \ + [u*x, u*y + v*x + v*y, w*x, w*y] + + assert covering_product([u, v, w, x], [y, z]) == \ + [u*y, u*z + v*y + v*z, w*y, w*z + x*y + x*z] + + assert covering_product([u, v], [x, y, z]) == \ + covering_product([x, y, z], [u, v]) + + raises(TypeError, lambda: covering_product(x, z)) + raises(TypeError, lambda: covering_product(Rational(7, 3), u)) + + +def test_intersecting_product(): + assert intersecting_product([], []) == [] + assert intersecting_product([], [Rational(1, 3)]) == [] + assert intersecting_product([6 + I*3/7], [Rational(2, 3)]) == [4 + I*2/7] + + a = [1, sqrt(5), Rational(3, 8) + 5*I, 4 + 7*I] + b = [67, 51, 65, 48, 36, 79, 27] + c = [3 + I*2/5, 5 + 9*I, 7, Rational(7, 19), 13] + + assert intersecting_product(a, b) == [195*sqrt(5) + Rational(6979, 8) + 1886*I, + 178*sqrt(5) + 520 + 910*I, Rational(841, 2) + 1344*I, + 192 + 336*I, 0, 0, 0, 0] + + assert intersecting_product(b, c) == [Rational(128553, 19) + I*9521/5, + Rational(17820, 19) + 1602*I, Rational(19264, 19), Rational(336, 19), 1846, 0, 0, 0] + + assert intersecting_product(a, c) == intersecting_product(c, a) + assert intersecting_product(b[1:], c[:-1]) == [Rational(64788, 19) + I*8622/5, + Rational(12804, 19) + 1152*I, Rational(11508, 19), Rational(252, 19), 0, 0, 0, 0] + + assert intersecting_product(a, c[:-2]) == \ + [Rational(-99, 5) + 10*sqrt(5) + 2*sqrt(5)*I/5 + I*3021/40, + -43 + 5*sqrt(5) + 9*sqrt(5)*I + 71*I, Rational(245, 8) + 84*I, 0] + + u, v, w, x, y, z = symbols('u v w x y z') + + assert intersecting_product([u, v, w], [x, y]) == \ + [u*x + u*y + v*x + w*x + w*y, v*y, 0, 0] + + assert intersecting_product([u, v, w, x], [y, z]) == \ + [u*y + u*z + v*y + w*y + w*z + x*y, v*z + x*z, 0, 0] + + assert intersecting_product([u, v], [x, y, z]) == \ + intersecting_product([x, y, z], [u, v]) + + raises(TypeError, lambda: intersecting_product(x, z)) + raises(TypeError, lambda: intersecting_product(u, Rational(8, 3))) + + +def test_convolution_int(): + assert convolution_int([1], [1]) == [1] + assert convolution_int([1, 1], [0]) == [0] + assert convolution_int([1, 2, 3], [4, 5, 6]) == [4, 13, 28, 27, 18] + assert convolution_int([1], [5, 6, 7]) == [5, 6, 7] + assert convolution_int([1, 3], [5, 6, 7]) == [5, 21, 25, 21] + assert convolution_int([10, -5, 1, 3], [-5, 6, 7]) == [-50, 85, 35, -44, 25, 21] + assert convolution_int([0, 1, 0, -1], [1, 0, -1, 0]) == [0, 1, 0, -2, 0, 1] + assert convolution_int( + [-341, -5, 1, 3, -71, -99, 43, 87], + [5, 6, 7, 12, 345, 21, -78, -7, -89] + ) == [-1705, -2071, -2412, -4106, -118035, -9774, 25998, 2981, 5509, + -34317, 19228, 38870, 5485, 1724, -4436, -7743] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/tests/test_recurrences.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/tests/test_recurrences.py new file mode 100644 index 0000000000000000000000000000000000000000..2c2186ca525b6680350a03edbe44ca88f8f95c3c --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/tests/test_recurrences.py @@ -0,0 +1,59 @@ +from sympy.core.numbers import Rational +from sympy.functions.combinatorial.numbers import fibonacci +from sympy.core import S, symbols +from sympy.testing.pytest import raises +from sympy.discrete.recurrences import linrec + +def test_linrec(): + assert linrec(coeffs=[1, 1], init=[1, 1], n=20) == 10946 + assert linrec(coeffs=[1, 2, 3, 4, 5], init=[1, 1, 0, 2], n=10) == 1040 + assert linrec(coeffs=[0, 0, 11, 13], init=[23, 27], n=25) == 59628567384 + assert linrec(coeffs=[0, 0, 1, 1, 2], init=[1, 5, 3], n=15) == 165 + assert linrec(coeffs=[11, 13, 15, 17], init=[1, 2, 3, 4], n=70) == \ + 56889923441670659718376223533331214868804815612050381493741233489928913241 + assert linrec(coeffs=[0]*55 + [1, 1, 2, 3], init=[0]*50 + [1, 2, 3], n=4000) == \ + 702633573874937994980598979769135096432444135301118916539 + + assert linrec(coeffs=[11, 13, 15, 17], init=[1, 2, 3, 4], n=10**4) + assert linrec(coeffs=[11, 13, 15, 17], init=[1, 2, 3, 4], n=10**5) + + assert all(linrec(coeffs=[1, 1], init=[0, 1], n=n) == fibonacci(n) + for n in range(95, 115)) + + assert all(linrec(coeffs=[1, 1], init=[1, 1], n=n) == fibonacci(n + 1) + for n in range(595, 615)) + + a = [S.Half, Rational(3, 4), Rational(5, 6), 7, Rational(8, 9), Rational(3, 5)] + b = [1, 2, 8, Rational(5, 7), Rational(3, 7), Rational(2, 9), 6] + x, y, z = symbols('x y z') + + assert linrec(coeffs=a[:5], init=b[:4], n=80) == \ + Rational(1726244235456268979436592226626304376013002142588105090705187189, + 1960143456748895967474334873705475211264) + + assert linrec(coeffs=a[:4], init=b[:4], n=50) == \ + Rational(368949940033050147080268092104304441, 504857282956046106624) + + assert linrec(coeffs=a[3:], init=b[:3], n=35) == \ + Rational(97409272177295731943657945116791049305244422833125109, + 814315512679031689453125) + + assert linrec(coeffs=[0]*60 + [Rational(2, 3), Rational(4, 5)], init=b, n=3000) == \ + Rational(26777668739896791448594650497024, 48084516708184142230517578125) + + raises(TypeError, lambda: linrec(coeffs=[11, 13, 15, 17], init=[1, 2, 3, 4, 5], n=1)) + raises(TypeError, lambda: linrec(coeffs=a[:4], init=b[:5], n=10000)) + raises(ValueError, lambda: linrec(coeffs=a[:4], init=b[:4], n=-10000)) + raises(TypeError, lambda: linrec(x, b, n=10000)) + raises(TypeError, lambda: linrec(a, y, n=10000)) + + assert linrec(coeffs=[x, y, z], init=[1, 1, 1], n=4) == \ + x**2 + x*y + x*z + y + z + assert linrec(coeffs=[1, 2, 1], init=[x, y, z], n=20) == \ + 269542*x + 664575*y + 578949*z + assert linrec(coeffs=[0, 3, 1, 2], init=[x, y], n=30) == \ + 58516436*x + 56372788*y + assert linrec(coeffs=[0]*50 + [1, 2, 3], init=[x, y, z], n=1000) == \ + 11477135884896*x + 25999077948732*y + 41975630244216*z + assert linrec(coeffs=[], init=[1, 1], n=20) == 0 + assert linrec(coeffs=[x, y, z], init=[1, 2, 3], n=2) == 3 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/transforms.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/transforms.py new file mode 100644 index 0000000000000000000000000000000000000000..cb3550837021a4cf99e38c6b15f89ce8bb69b25a --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/discrete/transforms.py @@ -0,0 +1,425 @@ +""" +Discrete Fourier Transform, Number Theoretic Transform, +Walsh Hadamard Transform, Mobius Transform +""" + +from sympy.core import S, Symbol, sympify +from sympy.core.function import expand_mul +from sympy.core.numbers import pi, I +from sympy.functions.elementary.trigonometric import sin, cos +from sympy.ntheory import isprime, primitive_root +from sympy.utilities.iterables import ibin, iterable +from sympy.utilities.misc import as_int + + +#----------------------------------------------------------------------------# +# # +# Discrete Fourier Transform # +# # +#----------------------------------------------------------------------------# + +def _fourier_transform(seq, dps, inverse=False): + """Utility function for the Discrete Fourier Transform""" + + if not iterable(seq): + raise TypeError("Expected a sequence of numeric coefficients " + "for Fourier Transform") + + a = [sympify(arg) for arg in seq] + if any(x.has(Symbol) for x in a): + raise ValueError("Expected non-symbolic coefficients") + + n = len(a) + if n < 2: + return a + + b = n.bit_length() - 1 + if n&(n - 1): # not a power of 2 + b += 1 + n = 2**b + + a += [S.Zero]*(n - len(a)) + for i in range(1, n): + j = int(ibin(i, b, str=True)[::-1], 2) + if i < j: + a[i], a[j] = a[j], a[i] + + ang = -2*pi/n if inverse else 2*pi/n + + if dps is not None: + ang = ang.evalf(dps + 2) + + w = [cos(ang*i) + I*sin(ang*i) for i in range(n // 2)] + + h = 2 + while h <= n: + hf, ut = h // 2, n // h + for i in range(0, n, h): + for j in range(hf): + u, v = a[i + j], expand_mul(a[i + j + hf]*w[ut * j]) + a[i + j], a[i + j + hf] = u + v, u - v + h *= 2 + + if inverse: + a = [(x/n).evalf(dps) for x in a] if dps is not None \ + else [x/n for x in a] + + return a + + +def fft(seq, dps=None): + r""" + Performs the Discrete Fourier Transform (**DFT**) in the complex domain. + + The sequence is automatically padded to the right with zeros, as the + *radix-2 FFT* requires the number of sample points to be a power of 2. + + This method should be used with default arguments only for short sequences + as the complexity of expressions increases with the size of the sequence. + + Parameters + ========== + + seq : iterable + The sequence on which **DFT** is to be applied. + dps : Integer + Specifies the number of decimal digits for precision. + + Examples + ======== + + >>> from sympy import fft, ifft + + >>> fft([1, 2, 3, 4]) + [10, -2 - 2*I, -2, -2 + 2*I] + >>> ifft(_) + [1, 2, 3, 4] + + >>> ifft([1, 2, 3, 4]) + [5/2, -1/2 + I/2, -1/2, -1/2 - I/2] + >>> fft(_) + [1, 2, 3, 4] + + >>> ifft([1, 7, 3, 4], dps=15) + [3.75, -0.5 - 0.75*I, -1.75, -0.5 + 0.75*I] + >>> fft(_) + [1.0, 7.0, 3.0, 4.0] + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Cooley%E2%80%93Tukey_FFT_algorithm + .. [2] https://mathworld.wolfram.com/FastFourierTransform.html + + """ + + return _fourier_transform(seq, dps=dps) + + +def ifft(seq, dps=None): + return _fourier_transform(seq, dps=dps, inverse=True) + +ifft.__doc__ = fft.__doc__ + + +#----------------------------------------------------------------------------# +# # +# Number Theoretic Transform # +# # +#----------------------------------------------------------------------------# + +def _number_theoretic_transform(seq, prime, inverse=False): + """Utility function for the Number Theoretic Transform""" + + if not iterable(seq): + raise TypeError("Expected a sequence of integer coefficients " + "for Number Theoretic Transform") + + p = as_int(prime) + if not isprime(p): + raise ValueError("Expected prime modulus for " + "Number Theoretic Transform") + + a = [as_int(x) % p for x in seq] + + n = len(a) + if n < 1: + return a + + b = n.bit_length() - 1 + if n&(n - 1): + b += 1 + n = 2**b + + if (p - 1) % n: + raise ValueError("Expected prime modulus of the form (m*2**k + 1)") + + a += [0]*(n - len(a)) + for i in range(1, n): + j = int(ibin(i, b, str=True)[::-1], 2) + if i < j: + a[i], a[j] = a[j], a[i] + + pr = primitive_root(p) + + rt = pow(pr, (p - 1) // n, p) + if inverse: + rt = pow(rt, p - 2, p) + + w = [1]*(n // 2) + for i in range(1, n // 2): + w[i] = w[i - 1]*rt % p + + h = 2 + while h <= n: + hf, ut = h // 2, n // h + for i in range(0, n, h): + for j in range(hf): + u, v = a[i + j], a[i + j + hf]*w[ut * j] + a[i + j], a[i + j + hf] = (u + v) % p, (u - v) % p + h *= 2 + + if inverse: + rv = pow(n, p - 2, p) + a = [x*rv % p for x in a] + + return a + + +def ntt(seq, prime): + r""" + Performs the Number Theoretic Transform (**NTT**), which specializes the + Discrete Fourier Transform (**DFT**) over quotient ring `Z/pZ` for prime + `p` instead of complex numbers `C`. + + The sequence is automatically padded to the right with zeros, as the + *radix-2 NTT* requires the number of sample points to be a power of 2. + + Parameters + ========== + + seq : iterable + The sequence on which **DFT** is to be applied. + prime : Integer + Prime modulus of the form `(m 2^k + 1)` to be used for performing + **NTT** on the sequence. + + Examples + ======== + + >>> from sympy import ntt, intt + >>> ntt([1, 2, 3, 4], prime=3*2**8 + 1) + [10, 643, 767, 122] + >>> intt(_, 3*2**8 + 1) + [1, 2, 3, 4] + >>> intt([1, 2, 3, 4], prime=3*2**8 + 1) + [387, 415, 384, 353] + >>> ntt(_, prime=3*2**8 + 1) + [1, 2, 3, 4] + + References + ========== + + .. [1] http://www.apfloat.org/ntt.html + .. [2] https://mathworld.wolfram.com/NumberTheoreticTransform.html + .. [3] https://en.wikipedia.org/wiki/Discrete_Fourier_transform_(general%29 + + """ + + return _number_theoretic_transform(seq, prime=prime) + + +def intt(seq, prime): + return _number_theoretic_transform(seq, prime=prime, inverse=True) + +intt.__doc__ = ntt.__doc__ + + +#----------------------------------------------------------------------------# +# # +# Walsh Hadamard Transform # +# # +#----------------------------------------------------------------------------# + +def _walsh_hadamard_transform(seq, inverse=False): + """Utility function for the Walsh Hadamard Transform""" + + if not iterable(seq): + raise TypeError("Expected a sequence of coefficients " + "for Walsh Hadamard Transform") + + a = [sympify(arg) for arg in seq] + n = len(a) + if n < 2: + return a + + if n&(n - 1): + n = 2**n.bit_length() + + a += [S.Zero]*(n - len(a)) + h = 2 + while h <= n: + hf = h // 2 + for i in range(0, n, h): + for j in range(hf): + u, v = a[i + j], a[i + j + hf] + a[i + j], a[i + j + hf] = u + v, u - v + h *= 2 + + if inverse: + a = [x/n for x in a] + + return a + + +def fwht(seq): + r""" + Performs the Walsh Hadamard Transform (**WHT**), and uses Hadamard + ordering for the sequence. + + The sequence is automatically padded to the right with zeros, as the + *radix-2 FWHT* requires the number of sample points to be a power of 2. + + Parameters + ========== + + seq : iterable + The sequence on which WHT is to be applied. + + Examples + ======== + + >>> from sympy import fwht, ifwht + >>> fwht([4, 2, 2, 0, 0, 2, -2, 0]) + [8, 0, 8, 0, 8, 8, 0, 0] + >>> ifwht(_) + [4, 2, 2, 0, 0, 2, -2, 0] + + >>> ifwht([19, -1, 11, -9, -7, 13, -15, 5]) + [2, 0, 4, 0, 3, 10, 0, 0] + >>> fwht(_) + [19, -1, 11, -9, -7, 13, -15, 5] + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Hadamard_transform + .. [2] https://en.wikipedia.org/wiki/Fast_Walsh%E2%80%93Hadamard_transform + + """ + + return _walsh_hadamard_transform(seq) + + +def ifwht(seq): + return _walsh_hadamard_transform(seq, inverse=True) + +ifwht.__doc__ = fwht.__doc__ + + +#----------------------------------------------------------------------------# +# # +# Mobius Transform for Subset Lattice # +# # +#----------------------------------------------------------------------------# + +def _mobius_transform(seq, sgn, subset): + r"""Utility function for performing Mobius Transform using + Yate's Dynamic Programming method""" + + if not iterable(seq): + raise TypeError("Expected a sequence of coefficients") + + a = [sympify(arg) for arg in seq] + + n = len(a) + if n < 2: + return a + + if n&(n - 1): + n = 2**n.bit_length() + + a += [S.Zero]*(n - len(a)) + + if subset: + i = 1 + while i < n: + for j in range(n): + if j & i: + a[j] += sgn*a[j ^ i] + i *= 2 + + else: + i = 1 + while i < n: + for j in range(n): + if j & i: + continue + a[j] += sgn*a[j ^ i] + i *= 2 + + return a + + +def mobius_transform(seq, subset=True): + r""" + Performs the Mobius Transform for subset lattice with indices of + sequence as bitmasks. + + The indices of each argument, considered as bit strings, correspond + to subsets of a finite set. + + The sequence is automatically padded to the right with zeros, as the + definition of subset/superset based on bitmasks (indices) requires + the size of sequence to be a power of 2. + + Parameters + ========== + + seq : iterable + The sequence on which Mobius Transform is to be applied. + subset : bool + Specifies if Mobius Transform is applied by enumerating subsets + or supersets of the given set. + + Examples + ======== + + >>> from sympy import symbols + >>> from sympy import mobius_transform, inverse_mobius_transform + >>> x, y, z = symbols('x y z') + + >>> mobius_transform([x, y, z]) + [x, x + y, x + z, x + y + z] + >>> inverse_mobius_transform(_) + [x, y, z, 0] + + >>> mobius_transform([x, y, z], subset=False) + [x + y + z, y, z, 0] + >>> inverse_mobius_transform(_, subset=False) + [x, y, z, 0] + + >>> mobius_transform([1, 2, 3, 4]) + [1, 3, 4, 10] + >>> inverse_mobius_transform(_) + [1, 2, 3, 4] + >>> mobius_transform([1, 2, 3, 4], subset=False) + [10, 6, 7, 4] + >>> inverse_mobius_transform(_, subset=False) + [1, 2, 3, 4] + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/M%C3%B6bius_inversion_formula + .. [2] https://people.csail.mit.edu/rrw/presentations/subset-conv.pdf + .. [3] https://arxiv.org/pdf/1211.0189.pdf + + """ + + return _mobius_transform(seq, sgn=+1, subset=subset) + +def inverse_mobius_transform(seq, subset=True): + return _mobius_transform(seq, sgn=-1, subset=subset) + +inverse_mobius_transform.__doc__ = mobius_transform.__doc__