diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/benchmarks/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/benchmarks/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/benchmarks/bench_matrix.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/benchmarks/bench_matrix.py new file mode 100644 index 0000000000000000000000000000000000000000..4fb845600533c4c6fef196fe5a45b98890f4ad78 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/benchmarks/bench_matrix.py @@ -0,0 +1,21 @@ +from sympy.core.numbers import Integer +from sympy.matrices.dense import (eye, zeros) + +i3 = Integer(3) +M = eye(100) + + +def timeit_Matrix__getitem_ii(): + M[3, 3] + + +def timeit_Matrix__getitem_II(): + M[i3, i3] + + +def timeit_Matrix__getslice(): + M[:, :] + + +def timeit_Matrix_zeronm(): + zeros(100, 100) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..5f4ab203ab74165d1003cdedd83945ea3fcf8f47 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/__init__.py @@ -0,0 +1,62 @@ +""" A module which handles Matrix Expressions """ + +from .slice import MatrixSlice +from .blockmatrix import BlockMatrix, BlockDiagMatrix, block_collapse, blockcut +from .companion import CompanionMatrix +from .funcmatrix import FunctionMatrix +from .inverse import Inverse +from .matadd import MatAdd +from .matexpr import MatrixExpr, MatrixSymbol, matrix_symbols +from .matmul import MatMul +from .matpow import MatPow +from .trace import Trace, trace +from .determinant import Determinant, det, Permanent, per +from .transpose import Transpose +from .adjoint import Adjoint +from .hadamard import hadamard_product, HadamardProduct, hadamard_power, HadamardPower +from .diagonal import DiagonalMatrix, DiagonalOf, DiagMatrix, diagonalize_vector +from .dotproduct import DotProduct +from .kronecker import kronecker_product, KroneckerProduct, combine_kronecker +from .permutation import PermutationMatrix, MatrixPermute +from .sets import MatrixSet +from .special import ZeroMatrix, Identity, OneMatrix + +__all__ = [ + 'MatrixSlice', + + 'BlockMatrix', 'BlockDiagMatrix', 'block_collapse', 'blockcut', + 'FunctionMatrix', + + 'CompanionMatrix', + + 'Inverse', + + 'MatAdd', + + 'Identity', 'MatrixExpr', 'MatrixSymbol', 'ZeroMatrix', 'OneMatrix', + 'matrix_symbols', 'MatrixSet', + + 'MatMul', + + 'MatPow', + + 'Trace', 'trace', + + 'Determinant', 'det', + + 'Transpose', + + 'Adjoint', + + 'hadamard_product', 'HadamardProduct', 'hadamard_power', 'HadamardPower', + + 'DiagonalMatrix', 'DiagonalOf', 'DiagMatrix', 'diagonalize_vector', + + 'DotProduct', + + 'kronecker_product', 'KroneckerProduct', 'combine_kronecker', + + 'PermutationMatrix', 'MatrixPermute', + + 'Permanent', 'per' +] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/_shape.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/_shape.py new file mode 100644 index 0000000000000000000000000000000000000000..a95d481bf8e1edf4c62992044cd50563b335caac --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/_shape.py @@ -0,0 +1,102 @@ +from sympy.core.relational import Eq +from sympy.core.expr import Expr +from sympy.core.numbers import Integer +from sympy.logic.boolalg import Boolean, And +from sympy.matrices.expressions.matexpr import MatrixExpr +from sympy.matrices.exceptions import ShapeError +from typing import Union + + +def is_matadd_valid(*args: MatrixExpr) -> Boolean: + """Return the symbolic condition how ``MatAdd``, ``HadamardProduct`` + makes sense. + + Parameters + ========== + + args + The list of arguments of matrices to be tested for. + + Examples + ======== + + >>> from sympy import MatrixSymbol, symbols + >>> from sympy.matrices.expressions._shape import is_matadd_valid + + >>> m, n, p, q = symbols('m n p q') + >>> A = MatrixSymbol('A', m, n) + >>> B = MatrixSymbol('B', p, q) + >>> is_matadd_valid(A, B) + Eq(m, p) & Eq(n, q) + """ + rows, cols = zip(*(arg.shape for arg in args)) + return And( + *(Eq(i, j) for i, j in zip(rows[:-1], rows[1:])), + *(Eq(i, j) for i, j in zip(cols[:-1], cols[1:])), + ) + + +def is_matmul_valid(*args: Union[MatrixExpr, Expr]) -> Boolean: + """Return the symbolic condition how ``MatMul`` makes sense + + Parameters + ========== + + args + The list of arguments of matrices and scalar expressions to be tested + for. + + Examples + ======== + + >>> from sympy import MatrixSymbol, symbols + >>> from sympy.matrices.expressions._shape import is_matmul_valid + + >>> m, n, p, q = symbols('m n p q') + >>> A = MatrixSymbol('A', m, n) + >>> B = MatrixSymbol('B', p, q) + >>> is_matmul_valid(A, B) + Eq(n, p) + """ + rows, cols = zip(*(arg.shape for arg in args if isinstance(arg, MatrixExpr))) + return And(*(Eq(i, j) for i, j in zip(cols[:-1], rows[1:]))) + + +def is_square(arg: MatrixExpr, /) -> Boolean: + """Return the symbolic condition how the matrix is assumed to be square + + Parameters + ========== + + arg + The matrix to be tested for. + + Examples + ======== + + >>> from sympy import MatrixSymbol, symbols + >>> from sympy.matrices.expressions._shape import is_square + + >>> m, n = symbols('m n') + >>> A = MatrixSymbol('A', m, n) + >>> is_square(A) + Eq(m, n) + """ + return Eq(arg.rows, arg.cols) + + +def validate_matadd_integer(*args: MatrixExpr) -> None: + """Validate matrix shape for addition only for integer values""" + rows, cols = zip(*(x.shape for x in args)) + if len(set(filter(lambda x: isinstance(x, (int, Integer)), rows))) > 1: + raise ShapeError(f"Matrices have mismatching shape: {rows}") + if len(set(filter(lambda x: isinstance(x, (int, Integer)), cols))) > 1: + raise ShapeError(f"Matrices have mismatching shape: {cols}") + + +def validate_matmul_integer(*args: MatrixExpr) -> None: + """Validate matrix shape for multiplication only for integer values""" + for A, B in zip(args[:-1], args[1:]): + i, j = A.cols, B.rows + if isinstance(i, (int, Integer)) and isinstance(j, (int, Integer)) and i != j: + raise ShapeError("Matrices are not aligned", i, j) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/adjoint.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/adjoint.py new file mode 100644 index 0000000000000000000000000000000000000000..2039a7b2eb8eeacb02435979121c4133a11d8e02 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/adjoint.py @@ -0,0 +1,60 @@ +from sympy.core import Basic +from sympy.functions import adjoint, conjugate +from sympy.matrices.expressions.matexpr import MatrixExpr + + +class Adjoint(MatrixExpr): + """ + The Hermitian adjoint of a matrix expression. + + This is a symbolic object that simply stores its argument without + evaluating it. To actually compute the adjoint, use the ``adjoint()`` + function. + + Examples + ======== + + >>> from sympy import MatrixSymbol, Adjoint, adjoint + >>> A = MatrixSymbol('A', 3, 5) + >>> B = MatrixSymbol('B', 5, 3) + >>> Adjoint(A*B) + Adjoint(A*B) + >>> adjoint(A*B) + Adjoint(B)*Adjoint(A) + >>> adjoint(A*B) == Adjoint(A*B) + False + >>> adjoint(A*B) == Adjoint(A*B).doit() + True + """ + is_Adjoint = True + + def doit(self, **hints): + arg = self.arg + if hints.get('deep', True) and isinstance(arg, Basic): + return adjoint(arg.doit(**hints)) + else: + return adjoint(self.arg) + + @property + def arg(self): + return self.args[0] + + @property + def shape(self): + return self.arg.shape[::-1] + + def _entry(self, i, j, **kwargs): + return conjugate(self.arg._entry(j, i, **kwargs)) + + def _eval_adjoint(self): + return self.arg + + def _eval_transpose(self): + return self.arg.conjugate() + + def _eval_conjugate(self): + return self.arg.transpose() + + def _eval_trace(self): + from sympy.matrices.expressions.trace import Trace + return conjugate(Trace(self.arg)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/applyfunc.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/applyfunc.py new file mode 100644 index 0000000000000000000000000000000000000000..c0363658447a8dc37a152b30e45533bac582b10c --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/applyfunc.py @@ -0,0 +1,204 @@ +from sympy.core.expr import ExprBuilder +from sympy.core.function import (Function, FunctionClass, Lambda) +from sympy.core.symbol import Dummy +from sympy.core.sympify import sympify, _sympify +from sympy.matrices.expressions import MatrixExpr +from sympy.matrices.matrixbase import MatrixBase + + +class ElementwiseApplyFunction(MatrixExpr): + r""" + Apply function to a matrix elementwise without evaluating. + + Examples + ======== + + It can be created by calling ``.applyfunc()`` on a matrix + expression: + + >>> from sympy import MatrixSymbol + >>> from sympy.matrices.expressions.applyfunc import ElementwiseApplyFunction + >>> from sympy import exp + >>> X = MatrixSymbol("X", 3, 3) + >>> X.applyfunc(exp) + Lambda(_d, exp(_d)).(X) + + Otherwise using the class constructor: + + >>> from sympy import eye + >>> expr = ElementwiseApplyFunction(exp, eye(3)) + >>> expr + Lambda(_d, exp(_d)).(Matrix([ + [1, 0, 0], + [0, 1, 0], + [0, 0, 1]])) + >>> expr.doit() + Matrix([ + [E, 1, 1], + [1, E, 1], + [1, 1, E]]) + + Notice the difference with the real mathematical functions: + + >>> exp(eye(3)) + Matrix([ + [E, 0, 0], + [0, E, 0], + [0, 0, E]]) + """ + + def __new__(cls, function, expr): + expr = _sympify(expr) + if not expr.is_Matrix: + raise ValueError("{} must be a matrix instance.".format(expr)) + + if expr.shape == (1, 1): + # Check if the function returns a matrix, in that case, just apply + # the function instead of creating an ElementwiseApplyFunc object: + ret = function(expr) + if isinstance(ret, MatrixExpr): + return ret + + if not isinstance(function, (FunctionClass, Lambda)): + d = Dummy('d') + function = Lambda(d, function(d)) + + function = sympify(function) + if not isinstance(function, (FunctionClass, Lambda)): + raise ValueError( + "{} should be compatible with SymPy function classes." + .format(function)) + + if 1 not in function.nargs: + raise ValueError( + '{} should be able to accept 1 arguments.'.format(function)) + + if not isinstance(function, Lambda): + d = Dummy('d') + function = Lambda(d, function(d)) + + obj = MatrixExpr.__new__(cls, function, expr) + return obj + + @property + def function(self): + return self.args[0] + + @property + def expr(self): + return self.args[1] + + @property + def shape(self): + return self.expr.shape + + def doit(self, **hints): + deep = hints.get("deep", True) + expr = self.expr + if deep: + expr = expr.doit(**hints) + function = self.function + if isinstance(function, Lambda) and function.is_identity: + # This is a Lambda containing the identity function. + return expr + if isinstance(expr, MatrixBase): + return expr.applyfunc(self.function) + elif isinstance(expr, ElementwiseApplyFunction): + return ElementwiseApplyFunction( + lambda x: self.function(expr.function(x)), + expr.expr + ).doit(**hints) + else: + return self + + def _entry(self, i, j, **kwargs): + return self.function(self.expr._entry(i, j, **kwargs)) + + def _get_function_fdiff(self): + d = Dummy("d") + function = self.function(d) + fdiff = function.diff(d) + if isinstance(fdiff, Function): + fdiff = type(fdiff) + else: + fdiff = Lambda(d, fdiff) + return fdiff + + def _eval_derivative(self, x): + from sympy.matrices.expressions.hadamard import hadamard_product + dexpr = self.expr.diff(x) + fdiff = self._get_function_fdiff() + return hadamard_product( + dexpr, + ElementwiseApplyFunction(fdiff, self.expr) + ) + + def _eval_derivative_matrix_lines(self, x): + from sympy.matrices.expressions.special import Identity + from sympy.tensor.array.expressions.array_expressions import ArrayContraction + from sympy.tensor.array.expressions.array_expressions import ArrayDiagonal + from sympy.tensor.array.expressions.array_expressions import ArrayTensorProduct + + fdiff = self._get_function_fdiff() + lr = self.expr._eval_derivative_matrix_lines(x) + ewdiff = ElementwiseApplyFunction(fdiff, self.expr) + if 1 in x.shape: + # Vector: + iscolumn = self.shape[1] == 1 + for i in lr: + if iscolumn: + ptr1 = i.first_pointer + ptr2 = Identity(self.shape[1]) + else: + ptr1 = Identity(self.shape[0]) + ptr2 = i.second_pointer + + subexpr = ExprBuilder( + ArrayDiagonal, + [ + ExprBuilder( + ArrayTensorProduct, + [ + ewdiff, + ptr1, + ptr2, + ] + ), + (0, 2) if iscolumn else (1, 4) + ], + validator=ArrayDiagonal._validate + ) + i._lines = [subexpr] + i._first_pointer_parent = subexpr.args[0].args + i._first_pointer_index = 1 + i._second_pointer_parent = subexpr.args[0].args + i._second_pointer_index = 2 + else: + # Matrix case: + for i in lr: + ptr1 = i.first_pointer + ptr2 = i.second_pointer + newptr1 = Identity(ptr1.shape[1]) + newptr2 = Identity(ptr2.shape[1]) + subexpr = ExprBuilder( + ArrayContraction, + [ + ExprBuilder( + ArrayTensorProduct, + [ptr1, newptr1, ewdiff, ptr2, newptr2] + ), + (1, 2, 4), + (5, 7, 8), + ], + validator=ArrayContraction._validate + ) + i._first_pointer_parent = subexpr.args[0].args + i._first_pointer_index = 1 + i._second_pointer_parent = subexpr.args[0].args + i._second_pointer_index = 4 + i._lines = [subexpr] + return lr + + def _eval_transpose(self): + from sympy.matrices.expressions.transpose import Transpose + return self.func(self.function, Transpose(self.expr).doit()) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/blockmatrix.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/blockmatrix.py new file mode 100644 index 0000000000000000000000000000000000000000..0125d6233ba7cf8c0b590fbb655d9c7c447e0bd4 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/blockmatrix.py @@ -0,0 +1,975 @@ +from sympy.assumptions.ask import (Q, ask) +from sympy.core import Basic, Add, Mul, S +from sympy.core.sympify import _sympify +from sympy.functions.elementary.complexes import re, im +from sympy.strategies import typed, exhaust, condition, do_one, unpack +from sympy.strategies.traverse import bottom_up +from sympy.utilities.iterables import is_sequence, sift +from sympy.utilities.misc import filldedent + +from sympy.matrices import Matrix, ShapeError +from sympy.matrices.exceptions import NonInvertibleMatrixError +from sympy.matrices.expressions.determinant import det, Determinant +from sympy.matrices.expressions.inverse import Inverse +from sympy.matrices.expressions.matadd import MatAdd +from sympy.matrices.expressions.matexpr import MatrixExpr, MatrixElement +from sympy.matrices.expressions.matmul import MatMul +from sympy.matrices.expressions.matpow import MatPow +from sympy.matrices.expressions.slice import MatrixSlice +from sympy.matrices.expressions.special import ZeroMatrix, Identity +from sympy.matrices.expressions.trace import trace +from sympy.matrices.expressions.transpose import Transpose, transpose + + +class BlockMatrix(MatrixExpr): + """A BlockMatrix is a Matrix comprised of other matrices. + + The submatrices are stored in a SymPy Matrix object but accessed as part of + a Matrix Expression + + >>> from sympy import (MatrixSymbol, BlockMatrix, symbols, + ... Identity, ZeroMatrix, block_collapse) + >>> n,m,l = symbols('n m l') + >>> X = MatrixSymbol('X', n, n) + >>> Y = MatrixSymbol('Y', m, m) + >>> Z = MatrixSymbol('Z', n, m) + >>> B = BlockMatrix([[X, Z], [ZeroMatrix(m,n), Y]]) + >>> print(B) + Matrix([ + [X, Z], + [0, Y]]) + + >>> C = BlockMatrix([[Identity(n), Z]]) + >>> print(C) + Matrix([[I, Z]]) + + >>> print(block_collapse(C*B)) + Matrix([[X, Z + Z*Y]]) + + Some matrices might be comprised of rows of blocks with + the matrices in each row having the same height and the + rows all having the same total number of columns but + not having the same number of columns for each matrix + in each row. In this case, the matrix is not a block + matrix and should be instantiated by Matrix. + + >>> from sympy import ones, Matrix + >>> dat = [ + ... [ones(3,2), ones(3,3)*2], + ... [ones(2,3)*3, ones(2,2)*4]] + ... + >>> BlockMatrix(dat) + Traceback (most recent call last): + ... + ValueError: + Although this matrix is comprised of blocks, the blocks do not fill + the matrix in a size-symmetric fashion. To create a full matrix from + these arguments, pass them directly to Matrix. + >>> Matrix(dat) + Matrix([ + [1, 1, 2, 2, 2], + [1, 1, 2, 2, 2], + [1, 1, 2, 2, 2], + [3, 3, 3, 4, 4], + [3, 3, 3, 4, 4]]) + + See Also + ======== + sympy.matrices.matrixbase.MatrixBase.irregular + """ + def __new__(cls, *args, **kwargs): + from sympy.matrices.immutable import ImmutableDenseMatrix + isMat = lambda i: getattr(i, 'is_Matrix', False) + if len(args) != 1 or \ + not is_sequence(args[0]) or \ + len({isMat(r) for r in args[0]}) != 1: + raise ValueError(filldedent(''' + expecting a sequence of 1 or more rows + containing Matrices.''')) + rows = args[0] if args else [] + if not isMat(rows): + if rows and isMat(rows[0]): + rows = [rows] # rows is not list of lists or [] + # regularity check + # same number of matrices in each row + blocky = ok = len({len(r) for r in rows}) == 1 + if ok: + # same number of rows for each matrix in a row + for r in rows: + ok = len({i.rows for i in r}) == 1 + if not ok: + break + blocky = ok + if ok: + # same number of cols for each matrix in each col + for c in range(len(rows[0])): + ok = len({rows[i][c].cols + for i in range(len(rows))}) == 1 + if not ok: + break + if not ok: + # same total cols in each row + ok = len({ + sum(i.cols for i in r) for r in rows}) == 1 + if blocky and ok: + raise ValueError(filldedent(''' + Although this matrix is comprised of blocks, + the blocks do not fill the matrix in a + size-symmetric fashion. To create a full matrix + from these arguments, pass them directly to + Matrix.''')) + raise ValueError(filldedent(''' + When there are not the same number of rows in each + row's matrices or there are not the same number of + total columns in each row, the matrix is not a + block matrix. If this matrix is known to consist of + blocks fully filling a 2-D space then see + Matrix.irregular.''')) + mat = ImmutableDenseMatrix(rows, evaluate=False) + obj = Basic.__new__(cls, mat) + return obj + + @property + def shape(self): + numrows = numcols = 0 + M = self.blocks + for i in range(M.shape[0]): + numrows += M[i, 0].shape[0] + for i in range(M.shape[1]): + numcols += M[0, i].shape[1] + return (numrows, numcols) + + @property + def blockshape(self): + return self.blocks.shape + + @property + def blocks(self): + return self.args[0] + + @property + def rowblocksizes(self): + return [self.blocks[i, 0].rows for i in range(self.blockshape[0])] + + @property + def colblocksizes(self): + return [self.blocks[0, i].cols for i in range(self.blockshape[1])] + + def structurally_equal(self, other): + return (isinstance(other, BlockMatrix) + and self.shape == other.shape + and self.blockshape == other.blockshape + and self.rowblocksizes == other.rowblocksizes + and self.colblocksizes == other.colblocksizes) + + def _blockmul(self, other): + if (isinstance(other, BlockMatrix) and + self.colblocksizes == other.rowblocksizes): + return BlockMatrix(self.blocks*other.blocks) + + return self * other + + def _blockadd(self, other): + if (isinstance(other, BlockMatrix) + and self.structurally_equal(other)): + return BlockMatrix(self.blocks + other.blocks) + + return self + other + + def _eval_transpose(self): + # Flip all the individual matrices + matrices = [transpose(matrix) for matrix in self.blocks] + # Make a copy + M = Matrix(self.blockshape[0], self.blockshape[1], matrices) + # Transpose the block structure + M = M.transpose() + return BlockMatrix(M) + + def _eval_adjoint(self): + return BlockMatrix( + Matrix(self.blockshape[0], self.blockshape[1], self.blocks).adjoint() + ) + + def _eval_trace(self): + if self.rowblocksizes == self.colblocksizes: + blocks = [self.blocks[i, i] for i in range(self.blockshape[0])] + return Add(*[trace(block) for block in blocks]) + + def _eval_determinant(self): + if self.blockshape == (1, 1): + return det(self.blocks[0, 0]) + if self.blockshape == (2, 2): + [[A, B], + [C, D]] = self.blocks.tolist() + if ask(Q.invertible(A)): + return det(A)*det(D - C*A.I*B) + elif ask(Q.invertible(D)): + return det(D)*det(A - B*D.I*C) + return Determinant(self) + + def _eval_as_real_imag(self): + real_matrices = [re(matrix) for matrix in self.blocks] + real_matrices = Matrix(self.blockshape[0], self.blockshape[1], real_matrices) + + im_matrices = [im(matrix) for matrix in self.blocks] + im_matrices = Matrix(self.blockshape[0], self.blockshape[1], im_matrices) + + return (BlockMatrix(real_matrices), BlockMatrix(im_matrices)) + + def _eval_derivative(self, x): + return BlockMatrix(self.blocks.diff(x)) + + def transpose(self): + """Return transpose of matrix. + + Examples + ======== + + >>> from sympy import MatrixSymbol, BlockMatrix, ZeroMatrix + >>> from sympy.abc import m, n + >>> X = MatrixSymbol('X', n, n) + >>> Y = MatrixSymbol('Y', m, m) + >>> Z = MatrixSymbol('Z', n, m) + >>> B = BlockMatrix([[X, Z], [ZeroMatrix(m,n), Y]]) + >>> B.transpose() + Matrix([ + [X.T, 0], + [Z.T, Y.T]]) + >>> _.transpose() + Matrix([ + [X, Z], + [0, Y]]) + """ + return self._eval_transpose() + + def schur(self, mat = 'A', generalized = False): + """Return the Schur Complement of the 2x2 BlockMatrix + + Parameters + ========== + + mat : String, optional + The matrix with respect to which the + Schur Complement is calculated. 'A' is + used by default + + generalized : bool, optional + If True, returns the generalized Schur + Component which uses Moore-Penrose Inverse + + Examples + ======== + + >>> from sympy import symbols, MatrixSymbol, BlockMatrix + >>> m, n = symbols('m n') + >>> A = MatrixSymbol('A', n, n) + >>> B = MatrixSymbol('B', n, m) + >>> C = MatrixSymbol('C', m, n) + >>> D = MatrixSymbol('D', m, m) + >>> X = BlockMatrix([[A, B], [C, D]]) + + The default Schur Complement is evaluated with "A" + + >>> X.schur() + -C*A**(-1)*B + D + >>> X.schur('D') + A - B*D**(-1)*C + + Schur complement with non-invertible matrices is not + defined. Instead, the generalized Schur complement can + be calculated which uses the Moore-Penrose Inverse. To + achieve this, `generalized` must be set to `True` + + >>> X.schur('B', generalized=True) + C - D*(B.T*B)**(-1)*B.T*A + >>> X.schur('C', generalized=True) + -A*(C.T*C)**(-1)*C.T*D + B + + Returns + ======= + + M : Matrix + The Schur Complement Matrix + + Raises + ====== + + ShapeError + If the block matrix is not a 2x2 matrix + + NonInvertibleMatrixError + If given matrix is non-invertible + + References + ========== + + .. [1] Wikipedia Article on Schur Component : https://en.wikipedia.org/wiki/Schur_complement + + See Also + ======== + + sympy.matrices.matrixbase.MatrixBase.pinv + """ + + if self.blockshape == (2, 2): + [[A, B], + [C, D]] = self.blocks.tolist() + d={'A' : A, 'B' : B, 'C' : C, 'D' : D} + try: + inv = (d[mat].T*d[mat]).inv()*d[mat].T if generalized else d[mat].inv() + if mat == 'A': + return D - C * inv * B + elif mat == 'B': + return C - D * inv * A + elif mat == 'C': + return B - A * inv * D + elif mat == 'D': + return A - B * inv * C + #For matrices where no sub-matrix is square + return self + except NonInvertibleMatrixError: + raise NonInvertibleMatrixError('The given matrix is not invertible. Please set generalized=True \ + to compute the generalized Schur Complement which uses Moore-Penrose Inverse') + else: + raise ShapeError('Schur Complement can only be calculated for 2x2 block matrices') + + def LDUdecomposition(self): + """Returns the Block LDU decomposition of + a 2x2 Block Matrix + + Returns + ======= + + (L, D, U) : Matrices + L : Lower Diagonal Matrix + D : Diagonal Matrix + U : Upper Diagonal Matrix + + Examples + ======== + + >>> from sympy import symbols, MatrixSymbol, BlockMatrix, block_collapse + >>> m, n = symbols('m n') + >>> A = MatrixSymbol('A', n, n) + >>> B = MatrixSymbol('B', n, m) + >>> C = MatrixSymbol('C', m, n) + >>> D = MatrixSymbol('D', m, m) + >>> X = BlockMatrix([[A, B], [C, D]]) + >>> L, D, U = X.LDUdecomposition() + >>> block_collapse(L*D*U) + Matrix([ + [A, B], + [C, D]]) + + Raises + ====== + + ShapeError + If the block matrix is not a 2x2 matrix + + NonInvertibleMatrixError + If the matrix "A" is non-invertible + + See Also + ======== + sympy.matrices.expressions.blockmatrix.BlockMatrix.UDLdecomposition + sympy.matrices.expressions.blockmatrix.BlockMatrix.LUdecomposition + """ + if self.blockshape == (2,2): + [[A, B], + [C, D]] = self.blocks.tolist() + try: + AI = A.I + except NonInvertibleMatrixError: + raise NonInvertibleMatrixError('Block LDU decomposition cannot be calculated when\ + "A" is singular') + Ip = Identity(B.shape[0]) + Iq = Identity(B.shape[1]) + Z = ZeroMatrix(*B.shape) + L = BlockMatrix([[Ip, Z], [C*AI, Iq]]) + D = BlockDiagMatrix(A, self.schur()) + U = BlockMatrix([[Ip, AI*B],[Z.T, Iq]]) + return L, D, U + else: + raise ShapeError("Block LDU decomposition is supported only for 2x2 block matrices") + + def UDLdecomposition(self): + """Returns the Block UDL decomposition of + a 2x2 Block Matrix + + Returns + ======= + + (U, D, L) : Matrices + U : Upper Diagonal Matrix + D : Diagonal Matrix + L : Lower Diagonal Matrix + + Examples + ======== + + >>> from sympy import symbols, MatrixSymbol, BlockMatrix, block_collapse + >>> m, n = symbols('m n') + >>> A = MatrixSymbol('A', n, n) + >>> B = MatrixSymbol('B', n, m) + >>> C = MatrixSymbol('C', m, n) + >>> D = MatrixSymbol('D', m, m) + >>> X = BlockMatrix([[A, B], [C, D]]) + >>> U, D, L = X.UDLdecomposition() + >>> block_collapse(U*D*L) + Matrix([ + [A, B], + [C, D]]) + + Raises + ====== + + ShapeError + If the block matrix is not a 2x2 matrix + + NonInvertibleMatrixError + If the matrix "D" is non-invertible + + See Also + ======== + sympy.matrices.expressions.blockmatrix.BlockMatrix.LDUdecomposition + sympy.matrices.expressions.blockmatrix.BlockMatrix.LUdecomposition + """ + if self.blockshape == (2,2): + [[A, B], + [C, D]] = self.blocks.tolist() + try: + DI = D.I + except NonInvertibleMatrixError: + raise NonInvertibleMatrixError('Block UDL decomposition cannot be calculated when\ + "D" is singular') + Ip = Identity(A.shape[0]) + Iq = Identity(B.shape[1]) + Z = ZeroMatrix(*B.shape) + U = BlockMatrix([[Ip, B*DI], [Z.T, Iq]]) + D = BlockDiagMatrix(self.schur('D'), D) + L = BlockMatrix([[Ip, Z],[DI*C, Iq]]) + return U, D, L + else: + raise ShapeError("Block UDL decomposition is supported only for 2x2 block matrices") + + def LUdecomposition(self): + """Returns the Block LU decomposition of + a 2x2 Block Matrix + + Returns + ======= + + (L, U) : Matrices + L : Lower Diagonal Matrix + U : Upper Diagonal Matrix + + Examples + ======== + + >>> from sympy import symbols, MatrixSymbol, BlockMatrix, block_collapse + >>> m, n = symbols('m n') + >>> A = MatrixSymbol('A', n, n) + >>> B = MatrixSymbol('B', n, m) + >>> C = MatrixSymbol('C', m, n) + >>> D = MatrixSymbol('D', m, m) + >>> X = BlockMatrix([[A, B], [C, D]]) + >>> L, U = X.LUdecomposition() + >>> block_collapse(L*U) + Matrix([ + [A, B], + [C, D]]) + + Raises + ====== + + ShapeError + If the block matrix is not a 2x2 matrix + + NonInvertibleMatrixError + If the matrix "A" is non-invertible + + See Also + ======== + sympy.matrices.expressions.blockmatrix.BlockMatrix.UDLdecomposition + sympy.matrices.expressions.blockmatrix.BlockMatrix.LDUdecomposition + """ + if self.blockshape == (2,2): + [[A, B], + [C, D]] = self.blocks.tolist() + try: + A = A**S.Half + AI = A.I + except NonInvertibleMatrixError: + raise NonInvertibleMatrixError('Block LU decomposition cannot be calculated when\ + "A" is singular') + Z = ZeroMatrix(*B.shape) + Q = self.schur()**S.Half + L = BlockMatrix([[A, Z], [C*AI, Q]]) + U = BlockMatrix([[A, AI*B],[Z.T, Q]]) + return L, U + else: + raise ShapeError("Block LU decomposition is supported only for 2x2 block matrices") + + def _entry(self, i, j, **kwargs): + # Find row entry + orig_i, orig_j = i, j + for row_block, numrows in enumerate(self.rowblocksizes): + cmp = i < numrows + if cmp == True: + break + elif cmp == False: + i -= numrows + elif row_block < self.blockshape[0] - 1: + # Can't tell which block and it's not the last one, return unevaluated + return MatrixElement(self, orig_i, orig_j) + for col_block, numcols in enumerate(self.colblocksizes): + cmp = j < numcols + if cmp == True: + break + elif cmp == False: + j -= numcols + elif col_block < self.blockshape[1] - 1: + return MatrixElement(self, orig_i, orig_j) + return self.blocks[row_block, col_block][i, j] + + @property + def is_Identity(self): + if self.blockshape[0] != self.blockshape[1]: + return False + for i in range(self.blockshape[0]): + for j in range(self.blockshape[1]): + if i==j and not self.blocks[i, j].is_Identity: + return False + if i!=j and not self.blocks[i, j].is_ZeroMatrix: + return False + return True + + @property + def is_structurally_symmetric(self): + return self.rowblocksizes == self.colblocksizes + + def equals(self, other): + if self == other: + return True + if (isinstance(other, BlockMatrix) and self.blocks == other.blocks): + return True + return super().equals(other) + + +class BlockDiagMatrix(BlockMatrix): + """A sparse matrix with block matrices along its diagonals + + Examples + ======== + + >>> from sympy import MatrixSymbol, BlockDiagMatrix, symbols + >>> n, m, l = symbols('n m l') + >>> X = MatrixSymbol('X', n, n) + >>> Y = MatrixSymbol('Y', m, m) + >>> BlockDiagMatrix(X, Y) + Matrix([ + [X, 0], + [0, Y]]) + + Notes + ===== + + If you want to get the individual diagonal blocks, use + :meth:`get_diag_blocks`. + + See Also + ======== + + sympy.matrices.dense.diag + """ + def __new__(cls, *mats): + return Basic.__new__(BlockDiagMatrix, *[_sympify(m) for m in mats]) + + @property + def diag(self): + return self.args + + @property + def blocks(self): + from sympy.matrices.immutable import ImmutableDenseMatrix + mats = self.args + data = [[mats[i] if i == j else ZeroMatrix(mats[i].rows, mats[j].cols) + for j in range(len(mats))] + for i in range(len(mats))] + return ImmutableDenseMatrix(data, evaluate=False) + + @property + def shape(self): + return (sum(block.rows for block in self.args), + sum(block.cols for block in self.args)) + + @property + def blockshape(self): + n = len(self.args) + return (n, n) + + @property + def rowblocksizes(self): + return [block.rows for block in self.args] + + @property + def colblocksizes(self): + return [block.cols for block in self.args] + + def _all_square_blocks(self): + """Returns true if all blocks are square""" + return all(mat.is_square for mat in self.args) + + def _eval_determinant(self): + if self._all_square_blocks(): + return Mul(*[det(mat) for mat in self.args]) + # At least one block is non-square. Since the entire matrix must be square we know there must + # be at least two blocks in this matrix, in which case the entire matrix is necessarily rank-deficient + return S.Zero + + def _eval_inverse(self, expand='ignored'): + if self._all_square_blocks(): + return BlockDiagMatrix(*[mat.inverse() for mat in self.args]) + # See comment in _eval_determinant() + raise NonInvertibleMatrixError('Matrix det == 0; not invertible.') + + def _eval_transpose(self): + return BlockDiagMatrix(*[mat.transpose() for mat in self.args]) + + def _blockmul(self, other): + if (isinstance(other, BlockDiagMatrix) and + self.colblocksizes == other.rowblocksizes): + return BlockDiagMatrix(*[a*b for a, b in zip(self.args, other.args)]) + else: + return BlockMatrix._blockmul(self, other) + + def _blockadd(self, other): + if (isinstance(other, BlockDiagMatrix) and + self.blockshape == other.blockshape and + self.rowblocksizes == other.rowblocksizes and + self.colblocksizes == other.colblocksizes): + return BlockDiagMatrix(*[a + b for a, b in zip(self.args, other.args)]) + else: + return BlockMatrix._blockadd(self, other) + + def get_diag_blocks(self): + """Return the list of diagonal blocks of the matrix. + + Examples + ======== + + >>> from sympy import BlockDiagMatrix, Matrix + + >>> A = Matrix([[1, 2], [3, 4]]) + >>> B = Matrix([[5, 6], [7, 8]]) + >>> M = BlockDiagMatrix(A, B) + + How to get diagonal blocks from the block diagonal matrix: + + >>> diag_blocks = M.get_diag_blocks() + >>> diag_blocks[0] + Matrix([ + [1, 2], + [3, 4]]) + >>> diag_blocks[1] + Matrix([ + [5, 6], + [7, 8]]) + """ + return self.args + + +def block_collapse(expr): + """Evaluates a block matrix expression + + >>> from sympy import MatrixSymbol, BlockMatrix, symbols, Identity, ZeroMatrix, block_collapse + >>> n,m,l = symbols('n m l') + >>> X = MatrixSymbol('X', n, n) + >>> Y = MatrixSymbol('Y', m, m) + >>> Z = MatrixSymbol('Z', n, m) + >>> B = BlockMatrix([[X, Z], [ZeroMatrix(m, n), Y]]) + >>> print(B) + Matrix([ + [X, Z], + [0, Y]]) + + >>> C = BlockMatrix([[Identity(n), Z]]) + >>> print(C) + Matrix([[I, Z]]) + + >>> print(block_collapse(C*B)) + Matrix([[X, Z + Z*Y]]) + """ + from sympy.strategies.util import expr_fns + + hasbm = lambda expr: isinstance(expr, MatrixExpr) and expr.has(BlockMatrix) + + conditioned_rl = condition( + hasbm, + typed( + {MatAdd: do_one(bc_matadd, bc_block_plus_ident), + MatMul: do_one(bc_matmul, bc_dist), + MatPow: bc_matmul, + Transpose: bc_transpose, + Inverse: bc_inverse, + BlockMatrix: do_one(bc_unpack, deblock)} + ) + ) + + rule = exhaust( + bottom_up( + exhaust(conditioned_rl), + fns=expr_fns + ) + ) + + result = rule(expr) + doit = getattr(result, 'doit', None) + if doit is not None: + return doit() + else: + return result + +def bc_unpack(expr): + if expr.blockshape == (1, 1): + return expr.blocks[0, 0] + return expr + +def bc_matadd(expr): + args = sift(expr.args, lambda M: isinstance(M, BlockMatrix)) + blocks = args[True] + if not blocks: + return expr + + nonblocks = args[False] + block = blocks[0] + for b in blocks[1:]: + block = block._blockadd(b) + if nonblocks: + return MatAdd(*nonblocks) + block + else: + return block + +def bc_block_plus_ident(expr): + idents = [arg for arg in expr.args if arg.is_Identity] + if not idents: + return expr + + blocks = [arg for arg in expr.args if isinstance(arg, BlockMatrix)] + if (blocks and all(b.structurally_equal(blocks[0]) for b in blocks) + and blocks[0].is_structurally_symmetric): + block_id = BlockDiagMatrix(*[Identity(k) + for k in blocks[0].rowblocksizes]) + rest = [arg for arg in expr.args if not arg.is_Identity and not isinstance(arg, BlockMatrix)] + return MatAdd(block_id * len(idents), *blocks, *rest).doit() + + return expr + +def bc_dist(expr): + """ Turn a*[X, Y] into [a*X, a*Y] """ + factor, mat = expr.as_coeff_mmul() + if factor == 1: + return expr + + unpacked = unpack(mat) + + if isinstance(unpacked, BlockDiagMatrix): + B = unpacked.diag + new_B = [factor * mat for mat in B] + return BlockDiagMatrix(*new_B) + elif isinstance(unpacked, BlockMatrix): + B = unpacked.blocks + new_B = [ + [factor * B[i, j] for j in range(B.cols)] for i in range(B.rows)] + return BlockMatrix(new_B) + return expr + + +def bc_matmul(expr): + if isinstance(expr, MatPow): + if expr.args[1].is_Integer and expr.args[1] > 0: + factor, matrices = 1, [expr.args[0]]*expr.args[1] + else: + return expr + else: + factor, matrices = expr.as_coeff_matrices() + + i = 0 + while (i+1 < len(matrices)): + A, B = matrices[i:i+2] + if isinstance(A, BlockMatrix) and isinstance(B, BlockMatrix): + matrices[i] = A._blockmul(B) + matrices.pop(i+1) + elif isinstance(A, BlockMatrix): + matrices[i] = A._blockmul(BlockMatrix([[B]])) + matrices.pop(i+1) + elif isinstance(B, BlockMatrix): + matrices[i] = BlockMatrix([[A]])._blockmul(B) + matrices.pop(i+1) + else: + i+=1 + return MatMul(factor, *matrices).doit() + +def bc_transpose(expr): + collapse = block_collapse(expr.arg) + return collapse._eval_transpose() + + +def bc_inverse(expr): + if isinstance(expr.arg, BlockDiagMatrix): + return expr.inverse() + + expr2 = blockinverse_1x1(expr) + if expr != expr2: + return expr2 + return blockinverse_2x2(Inverse(reblock_2x2(expr.arg))) + +def blockinverse_1x1(expr): + if isinstance(expr.arg, BlockMatrix) and expr.arg.blockshape == (1, 1): + mat = Matrix([[expr.arg.blocks[0].inverse()]]) + return BlockMatrix(mat) + return expr + + +def blockinverse_2x2(expr): + if isinstance(expr.arg, BlockMatrix) and expr.arg.blockshape == (2, 2): + # See: Inverses of 2x2 Block Matrices, Tzon-Tzer Lu and Sheng-Hua Shiou + [[A, B], + [C, D]] = expr.arg.blocks.tolist() + + formula = _choose_2x2_inversion_formula(A, B, C, D) + if formula != None: + MI = expr.arg.schur(formula).I + if formula == 'A': + AI = A.I + return BlockMatrix([[AI + AI * B * MI * C * AI, -AI * B * MI], [-MI * C * AI, MI]]) + if formula == 'B': + BI = B.I + return BlockMatrix([[-MI * D * BI, MI], [BI + BI * A * MI * D * BI, -BI * A * MI]]) + if formula == 'C': + CI = C.I + return BlockMatrix([[-CI * D * MI, CI + CI * D * MI * A * CI], [MI, -MI * A * CI]]) + if formula == 'D': + DI = D.I + return BlockMatrix([[MI, -MI * B * DI], [-DI * C * MI, DI + DI * C * MI * B * DI]]) + + return expr + + +def _choose_2x2_inversion_formula(A, B, C, D): + """ + Assuming [[A, B], [C, D]] would form a valid square block matrix, find + which of the classical 2x2 block matrix inversion formulas would be + best suited. + + Returns 'A', 'B', 'C', 'D' to represent the algorithm involving inversion + of the given argument or None if the matrix cannot be inverted using + any of those formulas. + """ + # Try to find a known invertible matrix. Note that the Schur complement + # is currently not being considered for this + A_inv = ask(Q.invertible(A)) + if A_inv == True: + return 'A' + B_inv = ask(Q.invertible(B)) + if B_inv == True: + return 'B' + C_inv = ask(Q.invertible(C)) + if C_inv == True: + return 'C' + D_inv = ask(Q.invertible(D)) + if D_inv == True: + return 'D' + # Otherwise try to find a matrix that isn't known to be non-invertible + if A_inv != False: + return 'A' + if B_inv != False: + return 'B' + if C_inv != False: + return 'C' + if D_inv != False: + return 'D' + return None + + +def deblock(B): + """ Flatten a BlockMatrix of BlockMatrices """ + if not isinstance(B, BlockMatrix) or not B.blocks.has(BlockMatrix): + return B + wrap = lambda x: x if isinstance(x, BlockMatrix) else BlockMatrix([[x]]) + bb = B.blocks.applyfunc(wrap) # everything is a block + + try: + MM = Matrix(0, sum(bb[0, i].blocks.shape[1] for i in range(bb.shape[1])), []) + for row in range(0, bb.shape[0]): + M = Matrix(bb[row, 0].blocks) + for col in range(1, bb.shape[1]): + M = M.row_join(bb[row, col].blocks) + MM = MM.col_join(M) + + return BlockMatrix(MM) + except ShapeError: + return B + + +def reblock_2x2(expr): + """ + Reblock a BlockMatrix so that it has 2x2 blocks of block matrices. If + possible in such a way that the matrix continues to be invertible using the + classical 2x2 block inversion formulas. + """ + if not isinstance(expr, BlockMatrix) or not all(d > 2 for d in expr.blockshape): + return expr + + BM = BlockMatrix # for brevity's sake + rowblocks, colblocks = expr.blockshape + blocks = expr.blocks + for i in range(1, rowblocks): + for j in range(1, colblocks): + # try to split rows at i and cols at j + A = bc_unpack(BM(blocks[:i, :j])) + B = bc_unpack(BM(blocks[:i, j:])) + C = bc_unpack(BM(blocks[i:, :j])) + D = bc_unpack(BM(blocks[i:, j:])) + + formula = _choose_2x2_inversion_formula(A, B, C, D) + if formula is not None: + return BlockMatrix([[A, B], [C, D]]) + + # else: nothing worked, just split upper left corner + return BM([[blocks[0, 0], BM(blocks[0, 1:])], + [BM(blocks[1:, 0]), BM(blocks[1:, 1:])]]) + + +def bounds(sizes): + """ Convert sequence of numbers into pairs of low-high pairs + + >>> from sympy.matrices.expressions.blockmatrix import bounds + >>> bounds((1, 10, 50)) + [(0, 1), (1, 11), (11, 61)] + """ + low = 0 + rv = [] + for size in sizes: + rv.append((low, low + size)) + low += size + return rv + +def blockcut(expr, rowsizes, colsizes): + """ Cut a matrix expression into Blocks + + >>> from sympy import ImmutableMatrix, blockcut + >>> M = ImmutableMatrix(4, 4, range(16)) + >>> B = blockcut(M, (1, 3), (1, 3)) + >>> type(B).__name__ + 'BlockMatrix' + >>> ImmutableMatrix(B.blocks[0, 1]) + Matrix([[1, 2, 3]]) + """ + + rowbounds = bounds(rowsizes) + colbounds = bounds(colsizes) + return BlockMatrix([[MatrixSlice(expr, rowbound, colbound) + for colbound in colbounds] + for rowbound in rowbounds]) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/companion.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/companion.py new file mode 100644 index 0000000000000000000000000000000000000000..6969c917f63806cb1f5417804e01ecc1350d1406 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/companion.py @@ -0,0 +1,56 @@ +from sympy.core.singleton import S +from sympy.core.sympify import _sympify +from sympy.polys.polytools import Poly + +from .matexpr import MatrixExpr + + +class CompanionMatrix(MatrixExpr): + """A symbolic companion matrix of a polynomial. + + Examples + ======== + + >>> from sympy import Poly, Symbol, symbols + >>> from sympy.matrices.expressions import CompanionMatrix + >>> x = Symbol('x') + >>> c0, c1, c2, c3, c4 = symbols('c0:5') + >>> p = Poly(c0 + c1*x + c2*x**2 + c3*x**3 + c4*x**4 + x**5, x) + >>> CompanionMatrix(p) + CompanionMatrix(Poly(x**5 + c4*x**4 + c3*x**3 + c2*x**2 + c1*x + c0, + x, domain='ZZ[c0,c1,c2,c3,c4]')) + """ + def __new__(cls, poly): + poly = _sympify(poly) + if not isinstance(poly, Poly): + raise ValueError("{} must be a Poly instance.".format(poly)) + if not poly.is_monic: + raise ValueError("{} must be a monic polynomial.".format(poly)) + if not poly.is_univariate: + raise ValueError( + "{} must be a univariate polynomial.".format(poly)) + if not poly.degree() >= 1: + raise ValueError( + "{} must have degree not less than 1.".format(poly)) + + return super().__new__(cls, poly) + + + @property + def shape(self): + poly = self.args[0] + size = poly.degree() + return size, size + + + def _entry(self, i, j): + if j == self.cols - 1: + return -self.args[0].all_coeffs()[-1 - i] + elif i == j + 1: + return S.One + return S.Zero + + + def as_explicit(self): + from sympy.matrices.immutable import ImmutableDenseMatrix + return ImmutableDenseMatrix.companion(self.args[0]) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/determinant.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/determinant.py new file mode 100644 index 0000000000000000000000000000000000000000..b323b3f93a5a0404bf2205f39d25b931d173b6d9 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/determinant.py @@ -0,0 +1,148 @@ +from sympy.core.basic import Basic +from sympy.core.expr import Expr +from sympy.core.singleton import S +from sympy.core.sympify import sympify +from sympy.matrices.exceptions import NonSquareMatrixError +from sympy.matrices.matrixbase import MatrixBase + + +class Determinant(Expr): + """Matrix Determinant + + Represents the determinant of a matrix expression. + + Examples + ======== + + >>> from sympy import MatrixSymbol, Determinant, eye + >>> A = MatrixSymbol('A', 3, 3) + >>> Determinant(A) + Determinant(A) + >>> Determinant(eye(3)).doit() + 1 + """ + is_commutative = True + + def __new__(cls, mat): + mat = sympify(mat) + if not mat.is_Matrix: + raise TypeError("Input to Determinant, %s, not a matrix" % str(mat)) + + if mat.is_square is False: + raise NonSquareMatrixError("Det of a non-square matrix") + + return Basic.__new__(cls, mat) + + @property + def arg(self): + return self.args[0] + + @property + def kind(self): + return self.arg.kind.element_kind + + def doit(self, **hints): + arg = self.arg + if hints.get('deep', True): + arg = arg.doit(**hints) + + result = arg._eval_determinant() + if result is not None: + return result + + return self + + +def det(matexpr): + """ Matrix Determinant + + Examples + ======== + + >>> from sympy import MatrixSymbol, det, eye + >>> A = MatrixSymbol('A', 3, 3) + >>> det(A) + Determinant(A) + >>> det(eye(3)) + 1 + """ + + return Determinant(matexpr).doit() + +class Permanent(Expr): + """Matrix Permanent + + Represents the permanent of a matrix expression. + + Examples + ======== + + >>> from sympy import MatrixSymbol, Permanent, ones + >>> A = MatrixSymbol('A', 3, 3) + >>> Permanent(A) + Permanent(A) + >>> Permanent(ones(3, 3)).doit() + 6 + """ + + def __new__(cls, mat): + mat = sympify(mat) + if not mat.is_Matrix: + raise TypeError("Input to Permanent, %s, not a matrix" % str(mat)) + + return Basic.__new__(cls, mat) + + @property + def arg(self): + return self.args[0] + + def doit(self, expand=False, **hints): + if isinstance(self.arg, MatrixBase): + return self.arg.per() + else: + return self + +def per(matexpr): + """ Matrix Permanent + + Examples + ======== + + >>> from sympy import MatrixSymbol, Matrix, per, ones + >>> A = MatrixSymbol('A', 3, 3) + >>> per(A) + Permanent(A) + >>> per(ones(5, 5)) + 120 + >>> M = Matrix([1, 2, 5]) + >>> per(M) + 8 + """ + + return Permanent(matexpr).doit() + +from sympy.assumptions.ask import ask, Q +from sympy.assumptions.refine import handlers_dict + + +def refine_Determinant(expr, assumptions): + """ + >>> from sympy import MatrixSymbol, Q, assuming, refine, det + >>> X = MatrixSymbol('X', 2, 2) + >>> det(X) + Determinant(X) + >>> with assuming(Q.orthogonal(X)): + ... print(refine(det(X))) + 1 + """ + if ask(Q.orthogonal(expr.arg), assumptions): + return S.One + elif ask(Q.singular(expr.arg), assumptions): + return S.Zero + elif ask(Q.unit_triangular(expr.arg), assumptions): + return S.One + + return expr + + +handlers_dict['Determinant'] = refine_Determinant diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/diagonal.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/diagonal.py new file mode 100644 index 0000000000000000000000000000000000000000..ba8a0216588143e3e251dab84c25f038fad550a4 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/diagonal.py @@ -0,0 +1,220 @@ +from sympy.core.sympify import _sympify + +from sympy.matrices.expressions import MatrixExpr +from sympy.core import S, Eq, Ge +from sympy.core.mul import Mul +from sympy.functions.special.tensor_functions import KroneckerDelta + + +class DiagonalMatrix(MatrixExpr): + """DiagonalMatrix(M) will create a matrix expression that + behaves as though all off-diagonal elements, + `M[i, j]` where `i != j`, are zero. + + Examples + ======== + + >>> from sympy import MatrixSymbol, DiagonalMatrix, Symbol + >>> n = Symbol('n', integer=True) + >>> m = Symbol('m', integer=True) + >>> D = DiagonalMatrix(MatrixSymbol('x', 2, 3)) + >>> D[1, 2] + 0 + >>> D[1, 1] + x[1, 1] + + The length of the diagonal -- the lesser of the two dimensions of `M` -- + is accessed through the `diagonal_length` property: + + >>> D.diagonal_length + 2 + >>> DiagonalMatrix(MatrixSymbol('x', n + 1, n)).diagonal_length + n + + When one of the dimensions is symbolic the other will be treated as + though it is smaller: + + >>> tall = DiagonalMatrix(MatrixSymbol('x', n, 3)) + >>> tall.diagonal_length + 3 + >>> tall[10, 1] + 0 + + When the size of the diagonal is not known, a value of None will + be returned: + + >>> DiagonalMatrix(MatrixSymbol('x', n, m)).diagonal_length is None + True + + """ + arg = property(lambda self: self.args[0]) + + shape = property(lambda self: self.arg.shape) # type:ignore + + @property + def diagonal_length(self): + r, c = self.shape + if r.is_Integer and c.is_Integer: + m = min(r, c) + elif r.is_Integer and not c.is_Integer: + m = r + elif c.is_Integer and not r.is_Integer: + m = c + elif r == c: + m = r + else: + try: + m = min(r, c) + except TypeError: + m = None + return m + + def _entry(self, i, j, **kwargs): + if self.diagonal_length is not None: + if Ge(i, self.diagonal_length) is S.true: + return S.Zero + elif Ge(j, self.diagonal_length) is S.true: + return S.Zero + eq = Eq(i, j) + if eq is S.true: + return self.arg[i, i] + elif eq is S.false: + return S.Zero + return self.arg[i, j]*KroneckerDelta(i, j) + + +class DiagonalOf(MatrixExpr): + """DiagonalOf(M) will create a matrix expression that + is equivalent to the diagonal of `M`, represented as + a single column matrix. + + Examples + ======== + + >>> from sympy import MatrixSymbol, DiagonalOf, Symbol + >>> n = Symbol('n', integer=True) + >>> m = Symbol('m', integer=True) + >>> x = MatrixSymbol('x', 2, 3) + >>> diag = DiagonalOf(x) + >>> diag.shape + (2, 1) + + The diagonal can be addressed like a matrix or vector and will + return the corresponding element of the original matrix: + + >>> diag[1, 0] == diag[1] == x[1, 1] + True + + The length of the diagonal -- the lesser of the two dimensions of `M` -- + is accessed through the `diagonal_length` property: + + >>> diag.diagonal_length + 2 + >>> DiagonalOf(MatrixSymbol('x', n + 1, n)).diagonal_length + n + + When only one of the dimensions is symbolic the other will be + treated as though it is smaller: + + >>> dtall = DiagonalOf(MatrixSymbol('x', n, 3)) + >>> dtall.diagonal_length + 3 + + When the size of the diagonal is not known, a value of None will + be returned: + + >>> DiagonalOf(MatrixSymbol('x', n, m)).diagonal_length is None + True + + """ + arg = property(lambda self: self.args[0]) + @property + def shape(self): + r, c = self.arg.shape + if r.is_Integer and c.is_Integer: + m = min(r, c) + elif r.is_Integer and not c.is_Integer: + m = r + elif c.is_Integer and not r.is_Integer: + m = c + elif r == c: + m = r + else: + try: + m = min(r, c) + except TypeError: + m = None + return m, S.One + + @property + def diagonal_length(self): + return self.shape[0] + + def _entry(self, i, j, **kwargs): + return self.arg._entry(i, i, **kwargs) + + +class DiagMatrix(MatrixExpr): + """ + Turn a vector into a diagonal matrix. + """ + def __new__(cls, vector): + vector = _sympify(vector) + obj = MatrixExpr.__new__(cls, vector) + shape = vector.shape + dim = shape[1] if shape[0] == 1 else shape[0] + if vector.shape[0] != 1: + obj._iscolumn = True + else: + obj._iscolumn = False + obj._shape = (dim, dim) + obj._vector = vector + return obj + + @property + def shape(self): + return self._shape + + def _entry(self, i, j, **kwargs): + if self._iscolumn: + result = self._vector._entry(i, 0, **kwargs) + else: + result = self._vector._entry(0, j, **kwargs) + if i != j: + result *= KroneckerDelta(i, j) + return result + + def _eval_transpose(self): + return self + + def as_explicit(self): + from sympy.matrices.dense import diag + return diag(*list(self._vector.as_explicit())) + + def doit(self, **hints): + from sympy.assumptions import ask, Q + from sympy.matrices.expressions.matmul import MatMul + from sympy.matrices.expressions.transpose import Transpose + from sympy.matrices.dense import eye + from sympy.matrices.matrixbase import MatrixBase + vector = self._vector + # This accounts for shape (1, 1) and identity matrices, among others: + if ask(Q.diagonal(vector)): + return vector + if isinstance(vector, MatrixBase): + ret = eye(max(vector.shape)) + for i in range(ret.shape[0]): + ret[i, i] = vector[i] + return type(vector)(ret) + if vector.is_MatMul: + matrices = [arg for arg in vector.args if arg.is_Matrix] + scalars = [arg for arg in vector.args if arg not in matrices] + if scalars: + return Mul.fromiter(scalars)*DiagMatrix(MatMul.fromiter(matrices).doit()).doit() + if isinstance(vector, Transpose): + vector = vector.arg + return DiagMatrix(vector) + + +def diagonalize_vector(vector): + return DiagMatrix(vector).doit() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/dotproduct.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/dotproduct.py new file mode 100644 index 0000000000000000000000000000000000000000..3a413f8c79a221505f0c082d7f19f78597a2befc --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/dotproduct.py @@ -0,0 +1,55 @@ +from sympy.core import Basic, Expr +from sympy.core.sympify import _sympify +from sympy.matrices.expressions.transpose import transpose + + +class DotProduct(Expr): + """ + Dot product of vector matrices + + The input should be two 1 x n or n x 1 matrices. The output represents the + scalar dotproduct. + + This is similar to using MatrixElement and MatMul, except DotProduct does + not require that one vector to be a row vector and the other vector to be + a column vector. + + >>> from sympy import MatrixSymbol, DotProduct + >>> A = MatrixSymbol('A', 1, 3) + >>> B = MatrixSymbol('B', 1, 3) + >>> DotProduct(A, B) + DotProduct(A, B) + >>> DotProduct(A, B).doit() + A[0, 0]*B[0, 0] + A[0, 1]*B[0, 1] + A[0, 2]*B[0, 2] + """ + + def __new__(cls, arg1, arg2): + arg1, arg2 = _sympify((arg1, arg2)) + + if not arg1.is_Matrix: + raise TypeError("Argument 1 of DotProduct is not a matrix") + if not arg2.is_Matrix: + raise TypeError("Argument 2 of DotProduct is not a matrix") + if not (1 in arg1.shape): + raise TypeError("Argument 1 of DotProduct is not a vector") + if not (1 in arg2.shape): + raise TypeError("Argument 2 of DotProduct is not a vector") + + if set(arg1.shape) != set(arg2.shape): + raise TypeError("DotProduct arguments are not the same length") + + return Basic.__new__(cls, arg1, arg2) + + def doit(self, expand=False, **hints): + if self.args[0].shape == self.args[1].shape: + if self.args[0].shape[0] == 1: + mul = self.args[0]*transpose(self.args[1]) + else: + mul = transpose(self.args[0])*self.args[1] + else: + if self.args[0].shape[0] == 1: + mul = self.args[0]*self.args[1] + else: + mul = transpose(self.args[0])*transpose(self.args[1]) + + return mul[0] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/factorizations.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/factorizations.py new file mode 100644 index 0000000000000000000000000000000000000000..aff2bb81ecff99d8e733f282ac2dd187d76ce895 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/factorizations.py @@ -0,0 +1,62 @@ +from sympy.matrices.expressions import MatrixExpr +from sympy.assumptions.ask import Q + +class Factorization(MatrixExpr): + arg = property(lambda self: self.args[0]) + shape = property(lambda self: self.arg.shape) # type: ignore + +class LofLU(Factorization): + @property + def predicates(self): + return (Q.lower_triangular,) +class UofLU(Factorization): + @property + def predicates(self): + return (Q.upper_triangular,) + +class LofCholesky(LofLU): pass +class UofCholesky(UofLU): pass + +class QofQR(Factorization): + @property + def predicates(self): + return (Q.orthogonal,) +class RofQR(Factorization): + @property + def predicates(self): + return (Q.upper_triangular,) + +class EigenVectors(Factorization): + @property + def predicates(self): + return (Q.orthogonal,) +class EigenValues(Factorization): + @property + def predicates(self): + return (Q.diagonal,) + +class UofSVD(Factorization): + @property + def predicates(self): + return (Q.orthogonal,) +class SofSVD(Factorization): + @property + def predicates(self): + return (Q.diagonal,) +class VofSVD(Factorization): + @property + def predicates(self): + return (Q.orthogonal,) + + +def lu(expr): + return LofLU(expr), UofLU(expr) + +def qr(expr): + return QofQR(expr), RofQR(expr) + +def eig(expr): + return EigenValues(expr), EigenVectors(expr) + +def svd(expr): + return UofSVD(expr), SofSVD(expr), VofSVD(expr) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/fourier.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/fourier.py new file mode 100644 index 0000000000000000000000000000000000000000..5fa9222c2a9b218f42636267235d5dd44c25f8bb --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/fourier.py @@ -0,0 +1,91 @@ +from sympy.core.sympify import _sympify +from sympy.matrices.expressions import MatrixExpr +from sympy.core.numbers import I +from sympy.core.singleton import S +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt + + +class DFT(MatrixExpr): + r""" + Returns a discrete Fourier transform matrix. The matrix is scaled + with :math:`\frac{1}{\sqrt{n}}` so that it is unitary. + + Parameters + ========== + + n : integer or Symbol + Size of the transform. + + Examples + ======== + + >>> from sympy.abc import n + >>> from sympy.matrices.expressions.fourier import DFT + >>> DFT(3) + DFT(3) + >>> DFT(3).as_explicit() + Matrix([ + [sqrt(3)/3, sqrt(3)/3, sqrt(3)/3], + [sqrt(3)/3, sqrt(3)*exp(-2*I*pi/3)/3, sqrt(3)*exp(2*I*pi/3)/3], + [sqrt(3)/3, sqrt(3)*exp(2*I*pi/3)/3, sqrt(3)*exp(-2*I*pi/3)/3]]) + >>> DFT(n).shape + (n, n) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/DFT_matrix + + """ + + def __new__(cls, n): + n = _sympify(n) + cls._check_dim(n) + + obj = super().__new__(cls, n) + return obj + + n = property(lambda self: self.args[0]) # type: ignore + shape = property(lambda self: (self.n, self.n)) # type: ignore + + def _entry(self, i, j, **kwargs): + w = exp(-2*S.Pi*I/self.n) + return w**(i*j) / sqrt(self.n) + + def _eval_inverse(self): + return IDFT(self.n) + + +class IDFT(DFT): + r""" + Returns an inverse discrete Fourier transform matrix. The matrix is scaled + with :math:`\frac{1}{\sqrt{n}}` so that it is unitary. + + Parameters + ========== + + n : integer or Symbol + Size of the transform + + Examples + ======== + + >>> from sympy.matrices.expressions.fourier import DFT, IDFT + >>> IDFT(3) + IDFT(3) + >>> IDFT(4)*DFT(4) + I + + See Also + ======== + + DFT + + """ + def _entry(self, i, j, **kwargs): + w = exp(-2*S.Pi*I/self.n) + return w**(-i*j) / sqrt(self.n) + + def _eval_inverse(self): + return DFT(self.n) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/funcmatrix.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/funcmatrix.py new file mode 100644 index 0000000000000000000000000000000000000000..91106edb489b73ac9dd6cb94adc508c0db75d3a5 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/funcmatrix.py @@ -0,0 +1,118 @@ +from .matexpr import MatrixExpr +from sympy.core.function import FunctionClass, Lambda +from sympy.core.symbol import Dummy +from sympy.core.sympify import _sympify, sympify +from sympy.matrices import Matrix +from sympy.functions.elementary.complexes import re, im + + +class FunctionMatrix(MatrixExpr): + """Represents a matrix using a function (``Lambda``) which gives + outputs according to the coordinates of each matrix entries. + + Parameters + ========== + + rows : nonnegative integer. Can be symbolic. + + cols : nonnegative integer. Can be symbolic. + + lamda : Function, Lambda or str + If it is a SymPy ``Function`` or ``Lambda`` instance, + it should be able to accept two arguments which represents the + matrix coordinates. + + If it is a pure string containing Python ``lambda`` semantics, + it is interpreted by the SymPy parser and casted into a SymPy + ``Lambda`` instance. + + Examples + ======== + + Creating a ``FunctionMatrix`` from ``Lambda``: + + >>> from sympy import FunctionMatrix, symbols, Lambda, MatPow + >>> i, j, n, m = symbols('i,j,n,m') + >>> FunctionMatrix(n, m, Lambda((i, j), i + j)) + FunctionMatrix(n, m, Lambda((i, j), i + j)) + + Creating a ``FunctionMatrix`` from a SymPy function: + + >>> from sympy import KroneckerDelta + >>> X = FunctionMatrix(3, 3, KroneckerDelta) + >>> X.as_explicit() + Matrix([ + [1, 0, 0], + [0, 1, 0], + [0, 0, 1]]) + + Creating a ``FunctionMatrix`` from a SymPy undefined function: + + >>> from sympy import Function + >>> f = Function('f') + >>> X = FunctionMatrix(3, 3, f) + >>> X.as_explicit() + Matrix([ + [f(0, 0), f(0, 1), f(0, 2)], + [f(1, 0), f(1, 1), f(1, 2)], + [f(2, 0), f(2, 1), f(2, 2)]]) + + Creating a ``FunctionMatrix`` from Python ``lambda``: + + >>> FunctionMatrix(n, m, 'lambda i, j: i + j') + FunctionMatrix(n, m, Lambda((i, j), i + j)) + + Example of lazy evaluation of matrix product: + + >>> Y = FunctionMatrix(1000, 1000, Lambda((i, j), i + j)) + >>> isinstance(Y*Y, MatPow) # this is an expression object + True + >>> (Y**2)[10,10] # So this is evaluated lazily + 342923500 + + Notes + ===== + + This class provides an alternative way to represent an extremely + dense matrix with entries in some form of a sequence, in a most + sparse way. + """ + def __new__(cls, rows, cols, lamda): + rows, cols = _sympify(rows), _sympify(cols) + cls._check_dim(rows) + cls._check_dim(cols) + + lamda = sympify(lamda) + if not isinstance(lamda, (FunctionClass, Lambda)): + raise ValueError( + "{} should be compatible with SymPy function classes." + .format(lamda)) + + if 2 not in lamda.nargs: + raise ValueError( + '{} should be able to accept 2 arguments.'.format(lamda)) + + if not isinstance(lamda, Lambda): + i, j = Dummy('i'), Dummy('j') + lamda = Lambda((i, j), lamda(i, j)) + + return super().__new__(cls, rows, cols, lamda) + + @property + def shape(self): + return self.args[0:2] + + @property + def lamda(self): + return self.args[2] + + def _entry(self, i, j, **kwargs): + return self.lamda(i, j) + + def _eval_trace(self): + from sympy.matrices.expressions.trace import Trace + from sympy.concrete.summations import Sum + return Trace(self).rewrite(Sum).doit() + + def _eval_as_real_imag(self): + return (re(Matrix(self)), im(Matrix(self))) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/hadamard.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/hadamard.py new file mode 100644 index 0000000000000000000000000000000000000000..38c9033ebea3a7bfc569223978dc6ef3890206cf --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/hadamard.py @@ -0,0 +1,464 @@ +from collections import Counter + +from sympy.core import Mul, sympify +from sympy.core.add import Add +from sympy.core.expr import ExprBuilder +from sympy.core.sorting import default_sort_key +from sympy.functions.elementary.exponential import log +from sympy.matrices.expressions.matexpr import MatrixExpr +from sympy.matrices.expressions._shape import validate_matadd_integer as validate +from sympy.matrices.expressions.special import ZeroMatrix, OneMatrix +from sympy.strategies import ( + unpack, flatten, condition, exhaust, rm_id, sort +) +from sympy.utilities.exceptions import sympy_deprecation_warning + + +def hadamard_product(*matrices): + """ + Return the elementwise (aka Hadamard) product of matrices. + + Examples + ======== + + >>> from sympy import hadamard_product, MatrixSymbol + >>> A = MatrixSymbol('A', 2, 3) + >>> B = MatrixSymbol('B', 2, 3) + >>> hadamard_product(A) + A + >>> hadamard_product(A, B) + HadamardProduct(A, B) + >>> hadamard_product(A, B)[0, 1] + A[0, 1]*B[0, 1] + """ + if not matrices: + raise TypeError("Empty Hadamard product is undefined") + if len(matrices) == 1: + return matrices[0] + return HadamardProduct(*matrices).doit() + + +class HadamardProduct(MatrixExpr): + """ + Elementwise product of matrix expressions + + Examples + ======== + + Hadamard product for matrix symbols: + + >>> from sympy import hadamard_product, HadamardProduct, MatrixSymbol + >>> A = MatrixSymbol('A', 5, 5) + >>> B = MatrixSymbol('B', 5, 5) + >>> isinstance(hadamard_product(A, B), HadamardProduct) + True + + Notes + ===== + + This is a symbolic object that simply stores its argument without + evaluating it. To actually compute the product, use the function + ``hadamard_product()`` or ``HadamardProduct.doit`` + """ + is_HadamardProduct = True + + def __new__(cls, *args, evaluate=False, check=None): + args = list(map(sympify, args)) + if len(args) == 0: + # We currently don't have a way to support one-matrices of generic dimensions: + raise ValueError("HadamardProduct needs at least one argument") + + if not all(isinstance(arg, MatrixExpr) for arg in args): + raise TypeError("Mix of Matrix and Scalar symbols") + + if check is not None: + sympy_deprecation_warning( + "Passing check to HadamardProduct is deprecated and the check argument will be removed in a future version.", + deprecated_since_version="1.11", + active_deprecations_target='remove-check-argument-from-matrix-operations') + + if check is not False: + validate(*args) + + obj = super().__new__(cls, *args) + if evaluate: + obj = obj.doit(deep=False) + return obj + + @property + def shape(self): + return self.args[0].shape + + def _entry(self, i, j, **kwargs): + return Mul(*[arg._entry(i, j, **kwargs) for arg in self.args]) + + def _eval_transpose(self): + from sympy.matrices.expressions.transpose import transpose + return HadamardProduct(*list(map(transpose, self.args))) + + def doit(self, **hints): + expr = self.func(*(i.doit(**hints) for i in self.args)) + # Check for explicit matrices: + from sympy.matrices.matrixbase import MatrixBase + from sympy.matrices.immutable import ImmutableMatrix + + explicit = [i for i in expr.args if isinstance(i, MatrixBase)] + if explicit: + remainder = [i for i in expr.args if i not in explicit] + expl_mat = ImmutableMatrix([ + Mul.fromiter(i) for i in zip(*explicit) + ]).reshape(*self.shape) + expr = HadamardProduct(*([expl_mat] + remainder)) + + return canonicalize(expr) + + def _eval_derivative(self, x): + terms = [] + args = list(self.args) + for i in range(len(args)): + factors = args[:i] + [args[i].diff(x)] + args[i+1:] + terms.append(hadamard_product(*factors)) + return Add.fromiter(terms) + + def _eval_derivative_matrix_lines(self, x): + from sympy.tensor.array.expressions.array_expressions import ArrayDiagonal + from sympy.tensor.array.expressions.array_expressions import ArrayTensorProduct + from sympy.matrices.expressions.matexpr import _make_matrix + + with_x_ind = [i for i, arg in enumerate(self.args) if arg.has(x)] + lines = [] + for ind in with_x_ind: + left_args = self.args[:ind] + right_args = self.args[ind+1:] + + d = self.args[ind]._eval_derivative_matrix_lines(x) + hadam = hadamard_product(*(right_args + left_args)) + diagonal = [(0, 2), (3, 4)] + diagonal = [e for j, e in enumerate(diagonal) if self.shape[j] != 1] + for i in d: + l1 = i._lines[i._first_line_index] + l2 = i._lines[i._second_line_index] + subexpr = ExprBuilder( + ArrayDiagonal, + [ + ExprBuilder( + ArrayTensorProduct, + [ + ExprBuilder(_make_matrix, [l1]), + hadam, + ExprBuilder(_make_matrix, [l2]), + ] + ), + *diagonal], + + ) + i._first_pointer_parent = subexpr.args[0].args[0].args + i._first_pointer_index = 0 + i._second_pointer_parent = subexpr.args[0].args[2].args + i._second_pointer_index = 0 + i._lines = [subexpr] + lines.append(i) + + return lines + + +# TODO Implement algorithm for rewriting Hadamard product as diagonal matrix +# if matmul identy matrix is multiplied. +def canonicalize(x): + """Canonicalize the Hadamard product ``x`` with mathematical properties. + + Examples + ======== + + >>> from sympy import MatrixSymbol, HadamardProduct + >>> from sympy import OneMatrix, ZeroMatrix + >>> from sympy.matrices.expressions.hadamard import canonicalize + >>> from sympy import init_printing + >>> init_printing(use_unicode=False) + + >>> A = MatrixSymbol('A', 2, 2) + >>> B = MatrixSymbol('B', 2, 2) + >>> C = MatrixSymbol('C', 2, 2) + + Hadamard product associativity: + + >>> X = HadamardProduct(A, HadamardProduct(B, C)) + >>> X + A.*(B.*C) + >>> canonicalize(X) + A.*B.*C + + Hadamard product commutativity: + + >>> X = HadamardProduct(A, B) + >>> Y = HadamardProduct(B, A) + >>> X + A.*B + >>> Y + B.*A + >>> canonicalize(X) + A.*B + >>> canonicalize(Y) + A.*B + + Hadamard product identity: + + >>> X = HadamardProduct(A, OneMatrix(2, 2)) + >>> X + A.*1 + >>> canonicalize(X) + A + + Absorbing element of Hadamard product: + + >>> X = HadamardProduct(A, ZeroMatrix(2, 2)) + >>> X + A.*0 + >>> canonicalize(X) + 0 + + Rewriting to Hadamard Power + + >>> X = HadamardProduct(A, A, A) + >>> X + A.*A.*A + >>> canonicalize(X) + .3 + A + + Notes + ===== + + As the Hadamard product is associative, nested products can be flattened. + + The Hadamard product is commutative so that factors can be sorted for + canonical form. + + A matrix of only ones is an identity for Hadamard product, + so every matrices of only ones can be removed. + + Any zero matrix will make the whole product a zero matrix. + + Duplicate elements can be collected and rewritten as HadamardPower + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Hadamard_product_(matrices) + """ + # Associativity + rule = condition( + lambda x: isinstance(x, HadamardProduct), + flatten + ) + fun = exhaust(rule) + x = fun(x) + + # Identity + fun = condition( + lambda x: isinstance(x, HadamardProduct), + rm_id(lambda x: isinstance(x, OneMatrix)) + ) + x = fun(x) + + # Absorbing by Zero Matrix + def absorb(x): + if any(isinstance(c, ZeroMatrix) for c in x.args): + return ZeroMatrix(*x.shape) + else: + return x + fun = condition( + lambda x: isinstance(x, HadamardProduct), + absorb + ) + x = fun(x) + + # Rewriting with HadamardPower + if isinstance(x, HadamardProduct): + tally = Counter(x.args) + + new_arg = [] + for base, exp in tally.items(): + if exp == 1: + new_arg.append(base) + else: + new_arg.append(HadamardPower(base, exp)) + + x = HadamardProduct(*new_arg) + + # Commutativity + fun = condition( + lambda x: isinstance(x, HadamardProduct), + sort(default_sort_key) + ) + x = fun(x) + + # Unpacking + x = unpack(x) + return x + + +def hadamard_power(base, exp): + base = sympify(base) + exp = sympify(exp) + if exp == 1: + return base + if not base.is_Matrix: + return base**exp + if exp.is_Matrix: + raise ValueError("cannot raise expression to a matrix") + return HadamardPower(base, exp) + + +class HadamardPower(MatrixExpr): + r""" + Elementwise power of matrix expressions + + Parameters + ========== + + base : scalar or matrix + + exp : scalar or matrix + + Notes + ===== + + There are four definitions for the hadamard power which can be used. + Let's consider `A, B` as `(m, n)` matrices, and `a, b` as scalars. + + Matrix raised to a scalar exponent: + + .. math:: + A^{\circ b} = \begin{bmatrix} + A_{0, 0}^b & A_{0, 1}^b & \cdots & A_{0, n-1}^b \\ + A_{1, 0}^b & A_{1, 1}^b & \cdots & A_{1, n-1}^b \\ + \vdots & \vdots & \ddots & \vdots \\ + A_{m-1, 0}^b & A_{m-1, 1}^b & \cdots & A_{m-1, n-1}^b + \end{bmatrix} + + Scalar raised to a matrix exponent: + + .. math:: + a^{\circ B} = \begin{bmatrix} + a^{B_{0, 0}} & a^{B_{0, 1}} & \cdots & a^{B_{0, n-1}} \\ + a^{B_{1, 0}} & a^{B_{1, 1}} & \cdots & a^{B_{1, n-1}} \\ + \vdots & \vdots & \ddots & \vdots \\ + a^{B_{m-1, 0}} & a^{B_{m-1, 1}} & \cdots & a^{B_{m-1, n-1}} + \end{bmatrix} + + Matrix raised to a matrix exponent: + + .. math:: + A^{\circ B} = \begin{bmatrix} + A_{0, 0}^{B_{0, 0}} & A_{0, 1}^{B_{0, 1}} & + \cdots & A_{0, n-1}^{B_{0, n-1}} \\ + A_{1, 0}^{B_{1, 0}} & A_{1, 1}^{B_{1, 1}} & + \cdots & A_{1, n-1}^{B_{1, n-1}} \\ + \vdots & \vdots & + \ddots & \vdots \\ + A_{m-1, 0}^{B_{m-1, 0}} & A_{m-1, 1}^{B_{m-1, 1}} & + \cdots & A_{m-1, n-1}^{B_{m-1, n-1}} + \end{bmatrix} + + Scalar raised to a scalar exponent: + + .. math:: + a^{\circ b} = a^b + """ + + def __new__(cls, base, exp): + base = sympify(base) + exp = sympify(exp) + + if base.is_scalar and exp.is_scalar: + return base ** exp + + if isinstance(base, MatrixExpr) and isinstance(exp, MatrixExpr): + validate(base, exp) + + obj = super().__new__(cls, base, exp) + return obj + + @property + def base(self): + return self._args[0] + + @property + def exp(self): + return self._args[1] + + @property + def shape(self): + if self.base.is_Matrix: + return self.base.shape + return self.exp.shape + + def _entry(self, i, j, **kwargs): + base = self.base + exp = self.exp + + if base.is_Matrix: + a = base._entry(i, j, **kwargs) + elif base.is_scalar: + a = base + else: + raise ValueError( + 'The base {} must be a scalar or a matrix.'.format(base)) + + if exp.is_Matrix: + b = exp._entry(i, j, **kwargs) + elif exp.is_scalar: + b = exp + else: + raise ValueError( + 'The exponent {} must be a scalar or a matrix.'.format(exp)) + + return a ** b + + def _eval_transpose(self): + from sympy.matrices.expressions.transpose import transpose + return HadamardPower(transpose(self.base), self.exp) + + def _eval_derivative(self, x): + dexp = self.exp.diff(x) + logbase = self.base.applyfunc(log) + dlbase = logbase.diff(x) + return hadamard_product( + dexp*logbase + self.exp*dlbase, + self + ) + + def _eval_derivative_matrix_lines(self, x): + from sympy.tensor.array.expressions.array_expressions import ArrayTensorProduct + from sympy.tensor.array.expressions.array_expressions import ArrayDiagonal + from sympy.matrices.expressions.matexpr import _make_matrix + + lr = self.base._eval_derivative_matrix_lines(x) + for i in lr: + diagonal = [(1, 2), (3, 4)] + diagonal = [e for j, e in enumerate(diagonal) if self.base.shape[j] != 1] + l1 = i._lines[i._first_line_index] + l2 = i._lines[i._second_line_index] + subexpr = ExprBuilder( + ArrayDiagonal, + [ + ExprBuilder( + ArrayTensorProduct, + [ + ExprBuilder(_make_matrix, [l1]), + self.exp*hadamard_power(self.base, self.exp-1), + ExprBuilder(_make_matrix, [l2]), + ] + ), + *diagonal], + validator=ArrayDiagonal._validate + ) + i._first_pointer_parent = subexpr.args[0].args[0].args + i._first_pointer_index = 0 + i._first_line_index = 0 + i._second_pointer_parent = subexpr.args[0].args[2].args + i._second_pointer_index = 0 + i._second_line_index = 0 + i._lines = [subexpr] + return lr diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/inverse.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/inverse.py new file mode 100644 index 0000000000000000000000000000000000000000..cfc3feccd7126a761f18f23599eed9413c86a9e5 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/inverse.py @@ -0,0 +1,112 @@ +from sympy.core.sympify import _sympify +from sympy.core import S, Basic + +from sympy.matrices.exceptions import NonSquareMatrixError +from sympy.matrices.expressions.matpow import MatPow + + +class Inverse(MatPow): + """ + The multiplicative inverse of a matrix expression + + This is a symbolic object that simply stores its argument without + evaluating it. To actually compute the inverse, use the ``.inverse()`` + method of matrices. + + Examples + ======== + + >>> from sympy import MatrixSymbol, Inverse + >>> A = MatrixSymbol('A', 3, 3) + >>> B = MatrixSymbol('B', 3, 3) + >>> Inverse(A) + A**(-1) + >>> A.inverse() == Inverse(A) + True + >>> (A*B).inverse() + B**(-1)*A**(-1) + >>> Inverse(A*B) + (A*B)**(-1) + + """ + is_Inverse = True + exp = S.NegativeOne + + def __new__(cls, mat, exp=S.NegativeOne): + # exp is there to make it consistent with + # inverse.func(*inverse.args) == inverse + mat = _sympify(mat) + exp = _sympify(exp) + if not mat.is_Matrix: + raise TypeError("mat should be a matrix") + if mat.is_square is False: + raise NonSquareMatrixError("Inverse of non-square matrix %s" % mat) + return Basic.__new__(cls, mat, exp) + + @property + def arg(self): + return self.args[0] + + @property + def shape(self): + return self.arg.shape + + def _eval_inverse(self): + return self.arg + + def _eval_transpose(self): + return Inverse(self.arg.transpose()) + + def _eval_adjoint(self): + return Inverse(self.arg.adjoint()) + + def _eval_conjugate(self): + return Inverse(self.arg.conjugate()) + + def _eval_determinant(self): + from sympy.matrices.expressions.determinant import det + return 1/det(self.arg) + + def doit(self, **hints): + if 'inv_expand' in hints and hints['inv_expand'] == False: + return self + + arg = self.arg + if hints.get('deep', True): + arg = arg.doit(**hints) + + return arg.inverse() + + def _eval_derivative_matrix_lines(self, x): + arg = self.args[0] + lines = arg._eval_derivative_matrix_lines(x) + for line in lines: + line.first_pointer *= -self.T + line.second_pointer *= self + return lines + + +from sympy.assumptions.ask import ask, Q +from sympy.assumptions.refine import handlers_dict + + +def refine_Inverse(expr, assumptions): + """ + >>> from sympy import MatrixSymbol, Q, assuming, refine + >>> X = MatrixSymbol('X', 2, 2) + >>> X.I + X**(-1) + >>> with assuming(Q.orthogonal(X)): + ... print(refine(X.I)) + X.T + """ + if ask(Q.orthogonal(expr), assumptions): + return expr.arg.T + elif ask(Q.unitary(expr), assumptions): + return expr.arg.conjugate() + elif ask(Q.singular(expr), assumptions): + raise ValueError("Inverse of singular matrix %s" % expr.arg) + + return expr + +handlers_dict['Inverse'] = refine_Inverse diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/kronecker.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/kronecker.py new file mode 100644 index 0000000000000000000000000000000000000000..1dd175cb0d500af3e786e2d0dbf6b010947840b4 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/kronecker.py @@ -0,0 +1,434 @@ +"""Implementation of the Kronecker product""" +from functools import reduce +from math import prod + +from sympy.core import Mul, sympify +from sympy.functions import adjoint +from sympy.matrices.exceptions import ShapeError +from sympy.matrices.expressions.matexpr import MatrixExpr +from sympy.matrices.expressions.transpose import transpose +from sympy.matrices.expressions.special import Identity +from sympy.matrices.matrixbase import MatrixBase +from sympy.strategies import ( + canon, condition, distribute, do_one, exhaust, flatten, typed, unpack) +from sympy.strategies.traverse import bottom_up +from sympy.utilities import sift + +from .matadd import MatAdd +from .matmul import MatMul +from .matpow import MatPow + + +def kronecker_product(*matrices): + """ + The Kronecker product of two or more arguments. + + This computes the explicit Kronecker product for subclasses of + ``MatrixBase`` i.e. explicit matrices. Otherwise, a symbolic + ``KroneckerProduct`` object is returned. + + + Examples + ======== + + For ``MatrixSymbol`` arguments a ``KroneckerProduct`` object is returned. + Elements of this matrix can be obtained by indexing, or for MatrixSymbols + with known dimension the explicit matrix can be obtained with + ``.as_explicit()`` + + >>> from sympy import kronecker_product, MatrixSymbol + >>> A = MatrixSymbol('A', 2, 2) + >>> B = MatrixSymbol('B', 2, 2) + >>> kronecker_product(A) + A + >>> kronecker_product(A, B) + KroneckerProduct(A, B) + >>> kronecker_product(A, B)[0, 1] + A[0, 0]*B[0, 1] + >>> kronecker_product(A, B).as_explicit() + Matrix([ + [A[0, 0]*B[0, 0], A[0, 0]*B[0, 1], A[0, 1]*B[0, 0], A[0, 1]*B[0, 1]], + [A[0, 0]*B[1, 0], A[0, 0]*B[1, 1], A[0, 1]*B[1, 0], A[0, 1]*B[1, 1]], + [A[1, 0]*B[0, 0], A[1, 0]*B[0, 1], A[1, 1]*B[0, 0], A[1, 1]*B[0, 1]], + [A[1, 0]*B[1, 0], A[1, 0]*B[1, 1], A[1, 1]*B[1, 0], A[1, 1]*B[1, 1]]]) + + For explicit matrices the Kronecker product is returned as a Matrix + + >>> from sympy import Matrix, kronecker_product + >>> sigma_x = Matrix([ + ... [0, 1], + ... [1, 0]]) + ... + >>> Isigma_y = Matrix([ + ... [0, 1], + ... [-1, 0]]) + ... + >>> kronecker_product(sigma_x, Isigma_y) + Matrix([ + [ 0, 0, 0, 1], + [ 0, 0, -1, 0], + [ 0, 1, 0, 0], + [-1, 0, 0, 0]]) + + See Also + ======== + KroneckerProduct + + """ + if not matrices: + raise TypeError("Empty Kronecker product is undefined") + if len(matrices) == 1: + return matrices[0] + else: + return KroneckerProduct(*matrices).doit() + + +class KroneckerProduct(MatrixExpr): + """ + The Kronecker product of two or more arguments. + + The Kronecker product is a non-commutative product of matrices. + Given two matrices of dimension (m, n) and (s, t) it produces a matrix + of dimension (m s, n t). + + This is a symbolic object that simply stores its argument without + evaluating it. To actually compute the product, use the function + ``kronecker_product()`` or call the ``.doit()`` or ``.as_explicit()`` + methods. + + >>> from sympy import KroneckerProduct, MatrixSymbol + >>> A = MatrixSymbol('A', 5, 5) + >>> B = MatrixSymbol('B', 5, 5) + >>> isinstance(KroneckerProduct(A, B), KroneckerProduct) + True + """ + is_KroneckerProduct = True + + def __new__(cls, *args, check=True): + args = list(map(sympify, args)) + if all(a.is_Identity for a in args): + ret = Identity(prod(a.rows for a in args)) + if all(isinstance(a, MatrixBase) for a in args): + return ret.as_explicit() + else: + return ret + + if check: + validate(*args) + return super().__new__(cls, *args) + + @property + def shape(self): + rows, cols = self.args[0].shape + for mat in self.args[1:]: + rows *= mat.rows + cols *= mat.cols + return (rows, cols) + + def _entry(self, i, j, **kwargs): + result = 1 + for mat in reversed(self.args): + i, m = divmod(i, mat.rows) + j, n = divmod(j, mat.cols) + result *= mat[m, n] + return result + + def _eval_adjoint(self): + return KroneckerProduct(*list(map(adjoint, self.args))).doit() + + def _eval_conjugate(self): + return KroneckerProduct(*[a.conjugate() for a in self.args]).doit() + + def _eval_transpose(self): + return KroneckerProduct(*list(map(transpose, self.args))).doit() + + def _eval_trace(self): + from .trace import trace + return Mul(*[trace(a) for a in self.args]) + + def _eval_determinant(self): + from .determinant import det, Determinant + if not all(a.is_square for a in self.args): + return Determinant(self) + + m = self.rows + return Mul(*[det(a)**(m/a.rows) for a in self.args]) + + def _eval_inverse(self): + try: + return KroneckerProduct(*[a.inverse() for a in self.args]) + except ShapeError: + from sympy.matrices.expressions.inverse import Inverse + return Inverse(self) + + def structurally_equal(self, other): + '''Determine whether two matrices have the same Kronecker product structure + + Examples + ======== + + >>> from sympy import KroneckerProduct, MatrixSymbol, symbols + >>> m, n = symbols(r'm, n', integer=True) + >>> A = MatrixSymbol('A', m, m) + >>> B = MatrixSymbol('B', n, n) + >>> C = MatrixSymbol('C', m, m) + >>> D = MatrixSymbol('D', n, n) + >>> KroneckerProduct(A, B).structurally_equal(KroneckerProduct(C, D)) + True + >>> KroneckerProduct(A, B).structurally_equal(KroneckerProduct(D, C)) + False + >>> KroneckerProduct(A, B).structurally_equal(C) + False + ''' + # Inspired by BlockMatrix + return (isinstance(other, KroneckerProduct) + and self.shape == other.shape + and len(self.args) == len(other.args) + and all(a.shape == b.shape for (a, b) in zip(self.args, other.args))) + + def has_matching_shape(self, other): + '''Determine whether two matrices have the appropriate structure to bring matrix + multiplication inside the KroneckerProdut + + Examples + ======== + >>> from sympy import KroneckerProduct, MatrixSymbol, symbols + >>> m, n = symbols(r'm, n', integer=True) + >>> A = MatrixSymbol('A', m, n) + >>> B = MatrixSymbol('B', n, m) + >>> KroneckerProduct(A, B).has_matching_shape(KroneckerProduct(B, A)) + True + >>> KroneckerProduct(A, B).has_matching_shape(KroneckerProduct(A, B)) + False + >>> KroneckerProduct(A, B).has_matching_shape(A) + False + ''' + return (isinstance(other, KroneckerProduct) + and self.cols == other.rows + and len(self.args) == len(other.args) + and all(a.cols == b.rows for (a, b) in zip(self.args, other.args))) + + def _eval_expand_kroneckerproduct(self, **hints): + return flatten(canon(typed({KroneckerProduct: distribute(KroneckerProduct, MatAdd)}))(self)) + + def _kronecker_add(self, other): + if self.structurally_equal(other): + return self.__class__(*[a + b for (a, b) in zip(self.args, other.args)]) + else: + return self + other + + def _kronecker_mul(self, other): + if self.has_matching_shape(other): + return self.__class__(*[a*b for (a, b) in zip(self.args, other.args)]) + else: + return self * other + + def doit(self, **hints): + deep = hints.get('deep', True) + if deep: + args = [arg.doit(**hints) for arg in self.args] + else: + args = self.args + return canonicalize(KroneckerProduct(*args)) + + +def validate(*args): + if not all(arg.is_Matrix for arg in args): + raise TypeError("Mix of Matrix and Scalar symbols") + + +# rules + +def extract_commutative(kron): + c_part = [] + nc_part = [] + for arg in kron.args: + c, nc = arg.args_cnc() + c_part.extend(c) + nc_part.append(Mul._from_args(nc)) + + c_part = Mul(*c_part) + if c_part != 1: + return c_part*KroneckerProduct(*nc_part) + return kron + + +def matrix_kronecker_product(*matrices): + """Compute the Kronecker product of a sequence of SymPy Matrices. + + This is the standard Kronecker product of matrices [1]. + + Parameters + ========== + + matrices : tuple of MatrixBase instances + The matrices to take the Kronecker product of. + + Returns + ======= + + matrix : MatrixBase + The Kronecker product matrix. + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.matrices.expressions.kronecker import ( + ... matrix_kronecker_product) + + >>> m1 = Matrix([[1,2],[3,4]]) + >>> m2 = Matrix([[1,0],[0,1]]) + >>> matrix_kronecker_product(m1, m2) + Matrix([ + [1, 0, 2, 0], + [0, 1, 0, 2], + [3, 0, 4, 0], + [0, 3, 0, 4]]) + >>> matrix_kronecker_product(m2, m1) + Matrix([ + [1, 2, 0, 0], + [3, 4, 0, 0], + [0, 0, 1, 2], + [0, 0, 3, 4]]) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Kronecker_product + """ + # Make sure we have a sequence of Matrices + if not all(isinstance(m, MatrixBase) for m in matrices): + raise TypeError( + 'Sequence of Matrices expected, got: %s' % repr(matrices) + ) + + # Pull out the first element in the product. + matrix_expansion = matrices[-1] + # Do the kronecker product working from right to left. + for mat in reversed(matrices[:-1]): + rows = mat.rows + cols = mat.cols + # Go through each row appending kronecker product to. + # running matrix_expansion. + for i in range(rows): + start = matrix_expansion*mat[i*cols] + # Go through each column joining each item + for j in range(cols - 1): + start = start.row_join( + matrix_expansion*mat[i*cols + j + 1] + ) + # If this is the first element, make it the start of the + # new row. + if i == 0: + next = start + else: + next = next.col_join(start) + matrix_expansion = next + + MatrixClass = max(matrices, key=lambda M: M._class_priority).__class__ + if isinstance(matrix_expansion, MatrixClass): + return matrix_expansion + else: + return MatrixClass(matrix_expansion) + + +def explicit_kronecker_product(kron): + # Make sure we have a sequence of Matrices + if not all(isinstance(m, MatrixBase) for m in kron.args): + return kron + + return matrix_kronecker_product(*kron.args) + + +rules = (unpack, + explicit_kronecker_product, + flatten, + extract_commutative) + +canonicalize = exhaust(condition(lambda x: isinstance(x, KroneckerProduct), + do_one(*rules))) + + +def _kronecker_dims_key(expr): + if isinstance(expr, KroneckerProduct): + return tuple(a.shape for a in expr.args) + else: + return (0,) + + +def kronecker_mat_add(expr): + args = sift(expr.args, _kronecker_dims_key) + nonkrons = args.pop((0,), None) + if not args: + return expr + + krons = [reduce(lambda x, y: x._kronecker_add(y), group) + for group in args.values()] + + if not nonkrons: + return MatAdd(*krons) + else: + return MatAdd(*krons) + nonkrons + + +def kronecker_mat_mul(expr): + # modified from block matrix code + factor, matrices = expr.as_coeff_matrices() + + i = 0 + while i < len(matrices) - 1: + A, B = matrices[i:i+2] + if isinstance(A, KroneckerProduct) and isinstance(B, KroneckerProduct): + matrices[i] = A._kronecker_mul(B) + matrices.pop(i+1) + else: + i += 1 + + return factor*MatMul(*matrices) + + +def kronecker_mat_pow(expr): + if isinstance(expr.base, KroneckerProduct) and all(a.is_square for a in expr.base.args): + return KroneckerProduct(*[MatPow(a, expr.exp) for a in expr.base.args]) + else: + return expr + + +def combine_kronecker(expr): + """Combine KronekeckerProduct with expression. + + If possible write operations on KroneckerProducts of compatible shapes + as a single KroneckerProduct. + + Examples + ======== + + >>> from sympy.matrices.expressions import combine_kronecker + >>> from sympy import MatrixSymbol, KroneckerProduct, symbols + >>> m, n = symbols(r'm, n', integer=True) + >>> A = MatrixSymbol('A', m, n) + >>> B = MatrixSymbol('B', n, m) + >>> combine_kronecker(KroneckerProduct(A, B)*KroneckerProduct(B, A)) + KroneckerProduct(A*B, B*A) + >>> combine_kronecker(KroneckerProduct(A, B)+KroneckerProduct(B.T, A.T)) + KroneckerProduct(A + B.T, B + A.T) + >>> C = MatrixSymbol('C', n, n) + >>> D = MatrixSymbol('D', m, m) + >>> combine_kronecker(KroneckerProduct(C, D)**m) + KroneckerProduct(C**m, D**m) + """ + def haskron(expr): + return isinstance(expr, MatrixExpr) and expr.has(KroneckerProduct) + + rule = exhaust( + bottom_up(exhaust(condition(haskron, typed( + {MatAdd: kronecker_mat_add, + MatMul: kronecker_mat_mul, + MatPow: kronecker_mat_pow}))))) + result = rule(expr) + doit = getattr(result, 'doit', None) + if doit is not None: + return doit() + else: + return result diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/matadd.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/matadd.py new file mode 100644 index 0000000000000000000000000000000000000000..cfae1e5010e4077c7210c85c4315ed2404f245d7 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/matadd.py @@ -0,0 +1,155 @@ +from functools import reduce +import operator + +from sympy.core import Basic, sympify +from sympy.core.add import add, Add, _could_extract_minus_sign +from sympy.core.sorting import default_sort_key +from sympy.functions import adjoint +from sympy.matrices.matrixbase import MatrixBase +from sympy.matrices.expressions.transpose import transpose +from sympy.strategies import (rm_id, unpack, flatten, sort, condition, + exhaust, do_one, glom) +from sympy.matrices.expressions.matexpr import MatrixExpr +from sympy.matrices.expressions.special import ZeroMatrix, GenericZeroMatrix +from sympy.matrices.expressions._shape import validate_matadd_integer as validate +from sympy.utilities.iterables import sift +from sympy.utilities.exceptions import sympy_deprecation_warning + +# XXX: MatAdd should perhaps not subclass directly from Add +class MatAdd(MatrixExpr, Add): + """A Sum of Matrix Expressions + + MatAdd inherits from and operates like SymPy Add + + Examples + ======== + + >>> from sympy import MatAdd, MatrixSymbol + >>> A = MatrixSymbol('A', 5, 5) + >>> B = MatrixSymbol('B', 5, 5) + >>> C = MatrixSymbol('C', 5, 5) + >>> MatAdd(A, B, C) + A + B + C + """ + is_MatAdd = True + + identity = GenericZeroMatrix() + + def __new__(cls, *args, evaluate=False, check=None, _sympify=True): + if not args: + return cls.identity + + # This must be removed aggressively in the constructor to avoid + # TypeErrors from GenericZeroMatrix().shape + args = list(filter(lambda i: cls.identity != i, args)) + if _sympify: + args = list(map(sympify, args)) + + if not all(isinstance(arg, MatrixExpr) for arg in args): + raise TypeError("Mix of Matrix and Scalar symbols") + + obj = Basic.__new__(cls, *args) + + if check is not None: + sympy_deprecation_warning( + "Passing check to MatAdd is deprecated and the check argument will be removed in a future version.", + deprecated_since_version="1.11", + active_deprecations_target='remove-check-argument-from-matrix-operations') + + if check is not False: + validate(*args) + + if evaluate: + obj = cls._evaluate(obj) + + return obj + + @classmethod + def _evaluate(cls, expr): + return canonicalize(expr) + + @property + def shape(self): + return self.args[0].shape + + def could_extract_minus_sign(self): + return _could_extract_minus_sign(self) + + def expand(self, **kwargs): + expanded = super(MatAdd, self).expand(**kwargs) + return self._evaluate(expanded) + + def _entry(self, i, j, **kwargs): + return Add(*[arg._entry(i, j, **kwargs) for arg in self.args]) + + def _eval_transpose(self): + return MatAdd(*[transpose(arg) for arg in self.args]).doit() + + def _eval_adjoint(self): + return MatAdd(*[adjoint(arg) for arg in self.args]).doit() + + def _eval_trace(self): + from .trace import trace + return Add(*[trace(arg) for arg in self.args]).doit() + + def doit(self, **hints): + deep = hints.get('deep', True) + if deep: + args = [arg.doit(**hints) for arg in self.args] + else: + args = self.args + return canonicalize(MatAdd(*args)) + + def _eval_derivative_matrix_lines(self, x): + add_lines = [arg._eval_derivative_matrix_lines(x) for arg in self.args] + return [j for i in add_lines for j in i] + +add.register_handlerclass((Add, MatAdd), MatAdd) + + +factor_of = lambda arg: arg.as_coeff_mmul()[0] +matrix_of = lambda arg: unpack(arg.as_coeff_mmul()[1]) +def combine(cnt, mat): + if cnt == 1: + return mat + else: + return cnt * mat + + +def merge_explicit(matadd): + """ Merge explicit MatrixBase arguments + + Examples + ======== + + >>> from sympy import MatrixSymbol, eye, Matrix, MatAdd, pprint + >>> from sympy.matrices.expressions.matadd import merge_explicit + >>> A = MatrixSymbol('A', 2, 2) + >>> B = eye(2) + >>> C = Matrix([[1, 2], [3, 4]]) + >>> X = MatAdd(A, B, C) + >>> pprint(X) + [1 0] [1 2] + A + [ ] + [ ] + [0 1] [3 4] + >>> pprint(merge_explicit(X)) + [2 2] + A + [ ] + [3 5] + """ + groups = sift(matadd.args, lambda arg: isinstance(arg, MatrixBase)) + if len(groups[True]) > 1: + return MatAdd(*(groups[False] + [reduce(operator.add, groups[True])])) + else: + return matadd + + +rules = (rm_id(lambda x: x == 0 or isinstance(x, ZeroMatrix)), + unpack, + flatten, + glom(matrix_of, factor_of, combine), + merge_explicit, + sort(default_sort_key)) + +canonicalize = exhaust(condition(lambda x: isinstance(x, MatAdd), + do_one(*rules))) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/matexpr.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/matexpr.py new file mode 100644 index 0000000000000000000000000000000000000000..a4e99296ccfcbdac5e09a86ecee020adf9831c73 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/matexpr.py @@ -0,0 +1,888 @@ +from __future__ import annotations +from functools import wraps + +from sympy.core import S, Integer, Basic, Mul, Add +from sympy.core.assumptions import check_assumptions +from sympy.core.decorators import call_highest_priority +from sympy.core.expr import Expr, ExprBuilder +from sympy.core.logic import FuzzyBool +from sympy.core.symbol import Str, Dummy, symbols, Symbol +from sympy.core.sympify import SympifyError, _sympify +from sympy.external.gmpy import SYMPY_INTS +from sympy.functions import conjugate, adjoint +from sympy.functions.special.tensor_functions import KroneckerDelta +from sympy.matrices.exceptions import NonSquareMatrixError +from sympy.matrices.kind import MatrixKind +from sympy.matrices.matrixbase import MatrixBase +from sympy.multipledispatch import dispatch +from sympy.utilities.misc import filldedent + + +def _sympifyit(arg, retval=None): + # This version of _sympifyit sympifies MutableMatrix objects + def deco(func): + @wraps(func) + def __sympifyit_wrapper(a, b): + try: + b = _sympify(b) + return func(a, b) + except SympifyError: + return retval + + return __sympifyit_wrapper + + return deco + + +class MatrixExpr(Expr): + """Superclass for Matrix Expressions + + MatrixExprs represent abstract matrices, linear transformations represented + within a particular basis. + + Examples + ======== + + >>> from sympy import MatrixSymbol + >>> A = MatrixSymbol('A', 3, 3) + >>> y = MatrixSymbol('y', 3, 1) + >>> x = (A.T*A).I * A * y + + See Also + ======== + + MatrixSymbol, MatAdd, MatMul, Transpose, Inverse + """ + __slots__: tuple[str, ...] = () + + # Should not be considered iterable by the + # sympy.utilities.iterables.iterable function. Subclass that actually are + # iterable (i.e., explicit matrices) should set this to True. + _iterable = False + + _op_priority = 11.0 + + is_Matrix: bool = True + is_MatrixExpr: bool = True + is_Identity: FuzzyBool = None + is_Inverse = False + is_Transpose = False + is_ZeroMatrix = False + is_MatAdd = False + is_MatMul = False + + is_commutative = False + is_number = False + is_symbol = False + is_scalar = False + + kind: MatrixKind = MatrixKind() + + def __new__(cls, *args, **kwargs): + args = map(_sympify, args) + return Basic.__new__(cls, *args, **kwargs) + + # The following is adapted from the core Expr object + + @property + def shape(self) -> tuple[Expr, Expr]: + raise NotImplementedError + + @property + def _add_handler(self): + return MatAdd + + @property + def _mul_handler(self): + return MatMul + + def __neg__(self): + return MatMul(S.NegativeOne, self).doit() + + def __abs__(self): + raise NotImplementedError + + @_sympifyit('other', NotImplemented) + @call_highest_priority('__radd__') + def __add__(self, other): + return MatAdd(self, other).doit() + + @_sympifyit('other', NotImplemented) + @call_highest_priority('__add__') + def __radd__(self, other): + return MatAdd(other, self).doit() + + @_sympifyit('other', NotImplemented) + @call_highest_priority('__rsub__') + def __sub__(self, other): + return MatAdd(self, -other).doit() + + @_sympifyit('other', NotImplemented) + @call_highest_priority('__sub__') + def __rsub__(self, other): + return MatAdd(other, -self).doit() + + @_sympifyit('other', NotImplemented) + @call_highest_priority('__rmul__') + def __mul__(self, other): + return MatMul(self, other).doit() + + @_sympifyit('other', NotImplemented) + @call_highest_priority('__rmul__') + def __matmul__(self, other): + return MatMul(self, other).doit() + + @_sympifyit('other', NotImplemented) + @call_highest_priority('__mul__') + def __rmul__(self, other): + return MatMul(other, self).doit() + + @_sympifyit('other', NotImplemented) + @call_highest_priority('__mul__') + def __rmatmul__(self, other): + return MatMul(other, self).doit() + + @_sympifyit('other', NotImplemented) + @call_highest_priority('__rpow__') + def __pow__(self, other): + return MatPow(self, other).doit() + + @_sympifyit('other', NotImplemented) + @call_highest_priority('__pow__') + def __rpow__(self, other): + raise NotImplementedError("Matrix Power not defined") + + @_sympifyit('other', NotImplemented) + @call_highest_priority('__rtruediv__') + def __truediv__(self, other): + return self * other**S.NegativeOne + + @_sympifyit('other', NotImplemented) + @call_highest_priority('__truediv__') + def __rtruediv__(self, other): + raise NotImplementedError() + #return MatMul(other, Pow(self, S.NegativeOne)) + + @property + def rows(self): + return self.shape[0] + + @property + def cols(self): + return self.shape[1] + + @property + def is_square(self) -> bool | None: + rows, cols = self.shape + if isinstance(rows, Integer) and isinstance(cols, Integer): + return rows == cols + if rows == cols: + return True + return None + + def _eval_conjugate(self): + from sympy.matrices.expressions.adjoint import Adjoint + return Adjoint(Transpose(self)) + + def as_real_imag(self, deep=True, **hints): + return self._eval_as_real_imag() + + def _eval_as_real_imag(self): + real = S.Half * (self + self._eval_conjugate()) + im = (self - self._eval_conjugate())/(2*S.ImaginaryUnit) + return (real, im) + + def _eval_inverse(self): + return Inverse(self) + + def _eval_determinant(self): + return Determinant(self) + + def _eval_transpose(self): + return Transpose(self) + + def _eval_trace(self): + return None + + def _eval_power(self, exp): + """ + Override this in sub-classes to implement simplification of powers. The cases where the exponent + is -1, 0, 1 are already covered in MatPow.doit(), so implementations can exclude these cases. + """ + return MatPow(self, exp) + + def _eval_simplify(self, **kwargs): + if self.is_Atom: + return self + else: + from sympy.simplify import simplify + return self.func(*[simplify(x, **kwargs) for x in self.args]) + + def _eval_adjoint(self): + from sympy.matrices.expressions.adjoint import Adjoint + return Adjoint(self) + + def _eval_derivative_n_times(self, x, n): + return Basic._eval_derivative_n_times(self, x, n) + + def _eval_derivative(self, x): + # `x` is a scalar: + if self.has(x): + # See if there are other methods using it: + return super()._eval_derivative(x) + else: + return ZeroMatrix(*self.shape) + + @classmethod + def _check_dim(cls, dim): + """Helper function to check invalid matrix dimensions""" + ok = not dim.is_Float and check_assumptions( + dim, integer=True, nonnegative=True) + if ok is False: + raise ValueError( + "The dimension specification {} should be " + "a nonnegative integer.".format(dim)) + + + def _entry(self, i, j, **kwargs): + raise NotImplementedError( + "Indexing not implemented for %s" % self.__class__.__name__) + + def adjoint(self): + return adjoint(self) + + def as_coeff_Mul(self, rational=False): + """Efficiently extract the coefficient of a product.""" + return S.One, self + + def conjugate(self): + return conjugate(self) + + def transpose(self): + from sympy.matrices.expressions.transpose import transpose + return transpose(self) + + @property + def T(self): + '''Matrix transposition''' + return self.transpose() + + def inverse(self): + if self.is_square is False: + raise NonSquareMatrixError('Inverse of non-square matrix') + return self._eval_inverse() + + def inv(self): + return self.inverse() + + def det(self): + from sympy.matrices.expressions.determinant import det + return det(self) + + @property + def I(self): + return self.inverse() + + def valid_index(self, i, j): + def is_valid(idx): + return isinstance(idx, (int, Integer, Symbol, Expr)) + return (is_valid(i) and is_valid(j) and + (self.rows is None or + (i >= -self.rows) != False and (i < self.rows) != False) and + (j >= -self.cols) != False and (j < self.cols) != False) + + def __getitem__(self, key): + if not isinstance(key, tuple) and isinstance(key, slice): + from sympy.matrices.expressions.slice import MatrixSlice + return MatrixSlice(self, key, (0, None, 1)) + if isinstance(key, tuple) and len(key) == 2: + i, j = key + if isinstance(i, slice) or isinstance(j, slice): + from sympy.matrices.expressions.slice import MatrixSlice + return MatrixSlice(self, i, j) + i, j = _sympify(i), _sympify(j) + if self.valid_index(i, j) != False: + return self._entry(i, j) + else: + raise IndexError("Invalid indices (%s, %s)" % (i, j)) + elif isinstance(key, (SYMPY_INTS, Integer)): + # row-wise decomposition of matrix + rows, cols = self.shape + # allow single indexing if number of columns is known + if not isinstance(cols, Integer): + raise IndexError(filldedent(''' + Single indexing is only supported when the number + of columns is known.''')) + key = _sympify(key) + i = key // cols + j = key % cols + if self.valid_index(i, j) != False: + return self._entry(i, j) + else: + raise IndexError("Invalid index %s" % key) + elif isinstance(key, (Symbol, Expr)): + raise IndexError(filldedent(''' + Only integers may be used when addressing the matrix + with a single index.''')) + raise IndexError("Invalid index, wanted %s[i,j]" % self) + + def _is_shape_symbolic(self) -> bool: + return (not isinstance(self.rows, (SYMPY_INTS, Integer)) + or not isinstance(self.cols, (SYMPY_INTS, Integer))) + + def as_explicit(self): + """ + Returns a dense Matrix with elements represented explicitly + + Returns an object of type ImmutableDenseMatrix. + + Examples + ======== + + >>> from sympy import Identity + >>> I = Identity(3) + >>> I + I + >>> I.as_explicit() + Matrix([ + [1, 0, 0], + [0, 1, 0], + [0, 0, 1]]) + + See Also + ======== + as_mutable: returns mutable Matrix type + + """ + if self._is_shape_symbolic(): + raise ValueError( + 'Matrix with symbolic shape ' + 'cannot be represented explicitly.') + from sympy.matrices.immutable import ImmutableDenseMatrix + return ImmutableDenseMatrix([[self[i, j] + for j in range(self.cols)] + for i in range(self.rows)]) + + def as_mutable(self): + """ + Returns a dense, mutable matrix with elements represented explicitly + + Examples + ======== + + >>> from sympy import Identity + >>> I = Identity(3) + >>> I + I + >>> I.shape + (3, 3) + >>> I.as_mutable() + Matrix([ + [1, 0, 0], + [0, 1, 0], + [0, 0, 1]]) + + See Also + ======== + as_explicit: returns ImmutableDenseMatrix + """ + return self.as_explicit().as_mutable() + + def __array__(self, dtype=object, copy=None): + if copy is not None and not copy: + raise TypeError("Cannot implement copy=False when converting Matrix to ndarray") + from numpy import empty + a = empty(self.shape, dtype=object) + for i in range(self.rows): + for j in range(self.cols): + a[i, j] = self[i, j] + return a + + def equals(self, other): + """ + Test elementwise equality between matrices, potentially of different + types + + >>> from sympy import Identity, eye + >>> Identity(3).equals(eye(3)) + True + """ + return self.as_explicit().equals(other) + + def canonicalize(self): + return self + + def as_coeff_mmul(self): + return S.One, MatMul(self) + + @staticmethod + def from_index_summation(expr, first_index=None, last_index=None, dimensions=None): + r""" + Parse expression of matrices with explicitly summed indices into a + matrix expression without indices, if possible. + + This transformation expressed in mathematical notation: + + `\sum_{j=0}^{N-1} A_{i,j} B_{j,k} \Longrightarrow \mathbf{A}\cdot \mathbf{B}` + + Optional parameter ``first_index``: specify which free index to use as + the index starting the expression. + + Examples + ======== + + >>> from sympy import MatrixSymbol, MatrixExpr, Sum + >>> from sympy.abc import i, j, k, l, N + >>> A = MatrixSymbol("A", N, N) + >>> B = MatrixSymbol("B", N, N) + >>> expr = Sum(A[i, j]*B[j, k], (j, 0, N-1)) + >>> MatrixExpr.from_index_summation(expr) + A*B + + Transposition is detected: + + >>> expr = Sum(A[j, i]*B[j, k], (j, 0, N-1)) + >>> MatrixExpr.from_index_summation(expr) + A.T*B + + Detect the trace: + + >>> expr = Sum(A[i, i], (i, 0, N-1)) + >>> MatrixExpr.from_index_summation(expr) + Trace(A) + + More complicated expressions: + + >>> expr = Sum(A[i, j]*B[k, j]*A[l, k], (j, 0, N-1), (k, 0, N-1)) + >>> MatrixExpr.from_index_summation(expr) + A*B.T*A.T + """ + from sympy.tensor.array.expressions.from_indexed_to_array import convert_indexed_to_array + from sympy.tensor.array.expressions.from_array_to_matrix import convert_array_to_matrix + first_indices = [] + if first_index is not None: + first_indices.append(first_index) + if last_index is not None: + first_indices.append(last_index) + arr = convert_indexed_to_array(expr, first_indices=first_indices) + return convert_array_to_matrix(arr) + + def applyfunc(self, func): + from .applyfunc import ElementwiseApplyFunction + return ElementwiseApplyFunction(func, self) + + +@dispatch(MatrixExpr, Expr) +def _eval_is_eq(lhs, rhs): # noqa:F811 + return False + +@dispatch(MatrixExpr, MatrixExpr) # type: ignore +def _eval_is_eq(lhs, rhs): # noqa:F811 + if lhs.shape != rhs.shape: + return False + if (lhs - rhs).is_ZeroMatrix: + return True + +def get_postprocessor(cls): + def _postprocessor(expr): + # To avoid circular imports, we can't have MatMul/MatAdd on the top level + mat_class = {Mul: MatMul, Add: MatAdd}[cls] + nonmatrices = [] + matrices = [] + for term in expr.args: + if isinstance(term, MatrixExpr): + matrices.append(term) + else: + nonmatrices.append(term) + + if not matrices: + return cls._from_args(nonmatrices) + + if nonmatrices: + if cls == Mul: + for i in range(len(matrices)): + if not matrices[i].is_MatrixExpr: + # If one of the matrices explicit, absorb the scalar into it + # (doit will combine all explicit matrices into one, so it + # doesn't matter which) + matrices[i] = matrices[i].__mul__(cls._from_args(nonmatrices)) + nonmatrices = [] + break + + else: + # Maintain the ability to create Add(scalar, matrix) without + # raising an exception. That way different algorithms can + # replace matrix expressions with non-commutative symbols to + # manipulate them like non-commutative scalars. + return cls._from_args(nonmatrices + [mat_class(*matrices).doit(deep=False)]) + + if mat_class == MatAdd: + return mat_class(*matrices).doit(deep=False) + return mat_class(cls._from_args(nonmatrices), *matrices).doit(deep=False) + return _postprocessor + + +Basic._constructor_postprocessor_mapping[MatrixExpr] = { + "Mul": [get_postprocessor(Mul)], + "Add": [get_postprocessor(Add)], +} + + +def _matrix_derivative(expr, x, old_algorithm=False): + + if isinstance(expr, MatrixBase) or isinstance(x, MatrixBase): + # Do not use array expressions for explicit matrices: + old_algorithm = True + + if old_algorithm: + return _matrix_derivative_old_algorithm(expr, x) + + from sympy.tensor.array.expressions.from_matrix_to_array import convert_matrix_to_array + from sympy.tensor.array.expressions.arrayexpr_derivatives import array_derive + from sympy.tensor.array.expressions.from_array_to_matrix import convert_array_to_matrix + + array_expr = convert_matrix_to_array(expr) + diff_array_expr = array_derive(array_expr, x) + diff_matrix_expr = convert_array_to_matrix(diff_array_expr) + return diff_matrix_expr + + +def _matrix_derivative_old_algorithm(expr, x): + from sympy.tensor.array.array_derivatives import ArrayDerivative + lines = expr._eval_derivative_matrix_lines(x) + + parts = [i.build() for i in lines] + + from sympy.tensor.array.expressions.from_array_to_matrix import convert_array_to_matrix + + parts = [[convert_array_to_matrix(j) for j in i] for i in parts] + + def _get_shape(elem): + if isinstance(elem, MatrixExpr): + return elem.shape + return 1, 1 + + def get_rank(parts): + return sum(j not in (1, None) for i in parts for j in _get_shape(i)) + + ranks = [get_rank(i) for i in parts] + rank = ranks[0] + + def contract_one_dims(parts): + if len(parts) == 1: + return parts[0] + else: + p1, p2 = parts[:2] + if p2.is_Matrix: + p2 = p2.T + if p1 == Identity(1): + pbase = p2 + elif p2 == Identity(1): + pbase = p1 + else: + pbase = p1*p2 + if len(parts) == 2: + return pbase + else: # len(parts) > 2 + if pbase.is_Matrix: + raise ValueError("") + return pbase*Mul.fromiter(parts[2:]) + + if rank <= 2: + return Add.fromiter([contract_one_dims(i) for i in parts]) + + return ArrayDerivative(expr, x) + + +class MatrixElement(Expr): + parent = property(lambda self: self.args[0]) + i = property(lambda self: self.args[1]) + j = property(lambda self: self.args[2]) + _diff_wrt = True + is_symbol = True + is_commutative = True + + def __new__(cls, name, n, m): + n, m = map(_sympify, (n, m)) + if isinstance(name, str): + name = Symbol(name) + else: + if isinstance(name, MatrixBase): + if n.is_Integer and m.is_Integer: + return name[n, m] + name = _sympify(name) # change mutable into immutable + else: + name = _sympify(name) + if not isinstance(name.kind, MatrixKind): + raise TypeError("First argument of MatrixElement should be a matrix") + if not getattr(name, 'valid_index', lambda n, m: True)(n, m): + raise IndexError('indices out of range') + obj = Expr.__new__(cls, name, n, m) + return obj + + @property + def symbol(self): + return self.args[0] + + def doit(self, **hints): + deep = hints.get('deep', True) + if deep: + args = [arg.doit(**hints) for arg in self.args] + else: + args = self.args + return args[0][args[1], args[2]] + + @property + def indices(self): + return self.args[1:] + + def _eval_derivative(self, v): + + if not isinstance(v, MatrixElement): + return self.parent.diff(v)[self.i, self.j] + + M = self.args[0] + + m, n = self.parent.shape + + if M == v.args[0]: + return KroneckerDelta(self.args[1], v.args[1], (0, m-1)) * \ + KroneckerDelta(self.args[2], v.args[2], (0, n-1)) + + if isinstance(M, Inverse): + from sympy.concrete.summations import Sum + i, j = self.args[1:] + i1, i2 = symbols("z1, z2", cls=Dummy) + Y = M.args[0] + r1, r2 = Y.shape + return -Sum(M[i, i1]*Y[i1, i2].diff(v)*M[i2, j], (i1, 0, r1-1), (i2, 0, r2-1)) + + if self.has(v.args[0]): + return None + + return S.Zero + + +class MatrixSymbol(MatrixExpr): + """Symbolic representation of a Matrix object + + Creates a SymPy Symbol to represent a Matrix. This matrix has a shape and + can be included in Matrix Expressions + + Examples + ======== + + >>> from sympy import MatrixSymbol, Identity + >>> A = MatrixSymbol('A', 3, 4) # A 3 by 4 Matrix + >>> B = MatrixSymbol('B', 4, 3) # A 4 by 3 Matrix + >>> A.shape + (3, 4) + >>> 2*A*B + Identity(3) + I + 2*A*B + """ + is_commutative = False + is_symbol = True + _diff_wrt = True + + def __new__(cls, name, n, m): + n, m = _sympify(n), _sympify(m) + + cls._check_dim(m) + cls._check_dim(n) + + if isinstance(name, str): + name = Str(name) + obj = Basic.__new__(cls, name, n, m) + return obj + + @property + def shape(self): + return self.args[1], self.args[2] + + @property + def name(self): + return self.args[0].name + + def _entry(self, i, j, **kwargs): + return MatrixElement(self, i, j) + + @property + def free_symbols(self): + return {self} + + def _eval_simplify(self, **kwargs): + return self + + def _eval_derivative(self, x): + # x is a scalar: + return ZeroMatrix(self.shape[0], self.shape[1]) + + def _eval_derivative_matrix_lines(self, x): + if self != x: + first = ZeroMatrix(x.shape[0], self.shape[0]) if self.shape[0] != 1 else S.Zero + second = ZeroMatrix(x.shape[1], self.shape[1]) if self.shape[1] != 1 else S.Zero + return [_LeftRightArgs( + [first, second], + )] + else: + first = Identity(self.shape[0]) if self.shape[0] != 1 else S.One + second = Identity(self.shape[1]) if self.shape[1] != 1 else S.One + return [_LeftRightArgs( + [first, second], + )] + + +def matrix_symbols(expr): + return [sym for sym in expr.free_symbols if sym.is_Matrix] + + +class _LeftRightArgs: + r""" + Helper class to compute matrix derivatives. + + The logic: when an expression is derived by a matrix `X_{mn}`, two lines of + matrix multiplications are created: the one contracted to `m` (first line), + and the one contracted to `n` (second line). + + Transposition flips the side by which new matrices are connected to the + lines. + + The trace connects the end of the two lines. + """ + + def __init__(self, lines, higher=S.One): + self._lines = list(lines) + self._first_pointer_parent = self._lines + self._first_pointer_index = 0 + self._first_line_index = 0 + self._second_pointer_parent = self._lines + self._second_pointer_index = 1 + self._second_line_index = 1 + self.higher = higher + + @property + def first_pointer(self): + return self._first_pointer_parent[self._first_pointer_index] + + @first_pointer.setter + def first_pointer(self, value): + self._first_pointer_parent[self._first_pointer_index] = value + + @property + def second_pointer(self): + return self._second_pointer_parent[self._second_pointer_index] + + @second_pointer.setter + def second_pointer(self, value): + self._second_pointer_parent[self._second_pointer_index] = value + + def __repr__(self): + built = [self._build(i) for i in self._lines] + return "_LeftRightArgs(lines=%s, higher=%s)" % ( + built, + self.higher, + ) + + def transpose(self): + self._first_pointer_parent, self._second_pointer_parent = self._second_pointer_parent, self._first_pointer_parent + self._first_pointer_index, self._second_pointer_index = self._second_pointer_index, self._first_pointer_index + self._first_line_index, self._second_line_index = self._second_line_index, self._first_line_index + return self + + @staticmethod + def _build(expr): + if isinstance(expr, ExprBuilder): + return expr.build() + if isinstance(expr, list): + if len(expr) == 1: + return expr[0] + else: + return expr[0](*[_LeftRightArgs._build(i) for i in expr[1]]) + else: + return expr + + def build(self): + data = [self._build(i) for i in self._lines] + if self.higher != 1: + data += [self._build(self.higher)] + data = list(data) + return data + + def matrix_form(self): + if self.first != 1 and self.higher != 1: + raise ValueError("higher dimensional array cannot be represented") + + def _get_shape(elem): + if isinstance(elem, MatrixExpr): + return elem.shape + return (None, None) + + if _get_shape(self.first)[1] != _get_shape(self.second)[1]: + # Remove one-dimensional identity matrices: + # (this is needed by `a.diff(a)` where `a` is a vector) + if _get_shape(self.second) == (1, 1): + return self.first*self.second[0, 0] + if _get_shape(self.first) == (1, 1): + return self.first[1, 1]*self.second.T + raise ValueError("incompatible shapes") + if self.first != 1: + return self.first*self.second.T + else: + return self.higher + + def rank(self): + """ + Number of dimensions different from trivial (warning: not related to + matrix rank). + """ + rank = 0 + if self.first != 1: + rank += sum(i != 1 for i in self.first.shape) + if self.second != 1: + rank += sum(i != 1 for i in self.second.shape) + if self.higher != 1: + rank += 2 + return rank + + def _multiply_pointer(self, pointer, other): + from ...tensor.array.expressions.array_expressions import ArrayTensorProduct + from ...tensor.array.expressions.array_expressions import ArrayContraction + + subexpr = ExprBuilder( + ArrayContraction, + [ + ExprBuilder( + ArrayTensorProduct, + [ + pointer, + other + ] + ), + (1, 2) + ], + validator=ArrayContraction._validate + ) + + return subexpr + + def append_first(self, other): + self.first_pointer *= other + + def append_second(self, other): + self.second_pointer *= other + + +def _make_matrix(x): + from sympy.matrices.immutable import ImmutableDenseMatrix + if isinstance(x, MatrixExpr): + return x + return ImmutableDenseMatrix([[x]]) + + +from .matmul import MatMul +from .matadd import MatAdd +from .matpow import MatPow +from .transpose import Transpose +from .inverse import Inverse +from .special import ZeroMatrix, Identity +from .determinant import Determinant diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/matmul.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/matmul.py new file mode 100644 index 0000000000000000000000000000000000000000..1c46f7ff5251d89793423f92ea02d7243601de3f --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/matmul.py @@ -0,0 +1,496 @@ +from sympy.assumptions.ask import ask, Q +from sympy.assumptions.refine import handlers_dict +from sympy.core import Basic, sympify, S +from sympy.core.mul import mul, Mul +from sympy.core.numbers import Number, Integer +from sympy.core.symbol import Dummy +from sympy.functions import adjoint +from sympy.strategies import (rm_id, unpack, typed, flatten, exhaust, + do_one, new) +from sympy.matrices.exceptions import NonInvertibleMatrixError +from sympy.matrices.matrixbase import MatrixBase +from sympy.utilities.exceptions import sympy_deprecation_warning +from sympy.matrices.expressions._shape import validate_matmul_integer as validate + +from .inverse import Inverse +from .matexpr import MatrixExpr +from .matpow import MatPow +from .transpose import transpose +from .permutation import PermutationMatrix +from .special import ZeroMatrix, Identity, GenericIdentity, OneMatrix + + +# XXX: MatMul should perhaps not subclass directly from Mul +class MatMul(MatrixExpr, Mul): + """ + A product of matrix expressions + + Examples + ======== + + >>> from sympy import MatMul, MatrixSymbol + >>> A = MatrixSymbol('A', 5, 4) + >>> B = MatrixSymbol('B', 4, 3) + >>> C = MatrixSymbol('C', 3, 6) + >>> MatMul(A, B, C) + A*B*C + """ + is_MatMul = True + + identity = GenericIdentity() + + def __new__(cls, *args, evaluate=False, check=None, _sympify=True): + if not args: + return cls.identity + + # This must be removed aggressively in the constructor to avoid + # TypeErrors from GenericIdentity().shape + args = list(filter(lambda i: cls.identity != i, args)) + if _sympify: + args = list(map(sympify, args)) + obj = Basic.__new__(cls, *args) + factor, matrices = obj.as_coeff_matrices() + + if check is not None: + sympy_deprecation_warning( + "Passing check to MatMul is deprecated and the check argument will be removed in a future version.", + deprecated_since_version="1.11", + active_deprecations_target='remove-check-argument-from-matrix-operations') + + if check is not False: + validate(*matrices) + + if not matrices: + # Should it be + # + # return Basic.__neq__(cls, factor, GenericIdentity()) ? + return factor + + if evaluate: + return cls._evaluate(obj) + + return obj + + @classmethod + def _evaluate(cls, expr): + return canonicalize(expr) + + @property + def shape(self): + matrices = [arg for arg in self.args if arg.is_Matrix] + return (matrices[0].rows, matrices[-1].cols) + + def _entry(self, i, j, expand=True, **kwargs): + # Avoid cyclic imports + from sympy.concrete.summations import Sum + from sympy.matrices.immutable import ImmutableMatrix + + coeff, matrices = self.as_coeff_matrices() + + if len(matrices) == 1: # situation like 2*X, matmul is just X + return coeff * matrices[0][i, j] + + indices = [None]*(len(matrices) + 1) + ind_ranges = [None]*(len(matrices) - 1) + indices[0] = i + indices[-1] = j + + def f(): + counter = 1 + while True: + yield Dummy("i_%i" % counter) + counter += 1 + + dummy_generator = kwargs.get("dummy_generator", f()) + + for i in range(1, len(matrices)): + indices[i] = next(dummy_generator) + + for i, arg in enumerate(matrices[:-1]): + ind_ranges[i] = arg.shape[1] - 1 + matrices = [arg._entry(indices[i], indices[i+1], dummy_generator=dummy_generator) for i, arg in enumerate(matrices)] + expr_in_sum = Mul.fromiter(matrices) + if any(v.has(ImmutableMatrix) for v in matrices): + expand = True + result = coeff*Sum( + expr_in_sum, + *zip(indices[1:-1], [0]*len(ind_ranges), ind_ranges) + ) + + # Don't waste time in result.doit() if the sum bounds are symbolic + if not any(isinstance(v, (Integer, int)) for v in ind_ranges): + expand = False + return result.doit() if expand else result + + def as_coeff_matrices(self): + scalars = [x for x in self.args if not x.is_Matrix] + matrices = [x for x in self.args if x.is_Matrix] + coeff = Mul(*scalars) + if coeff.is_commutative is False: + raise NotImplementedError("noncommutative scalars in MatMul are not supported.") + + return coeff, matrices + + def as_coeff_mmul(self): + coeff, matrices = self.as_coeff_matrices() + return coeff, MatMul(*matrices) + + def expand(self, **kwargs): + expanded = super(MatMul, self).expand(**kwargs) + return self._evaluate(expanded) + + def _eval_transpose(self): + """Transposition of matrix multiplication. + + Notes + ===== + + The following rules are applied. + + Transposition for matrix multiplied with another matrix: + `\\left(A B\\right)^{T} = B^{T} A^{T}` + + Transposition for matrix multiplied with scalar: + `\\left(c A\\right)^{T} = c A^{T}` + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Transpose + """ + coeff, matrices = self.as_coeff_matrices() + return MatMul( + coeff, *[transpose(arg) for arg in matrices[::-1]]).doit() + + def _eval_adjoint(self): + return MatMul(*[adjoint(arg) for arg in self.args[::-1]]).doit() + + def _eval_trace(self): + factor, mmul = self.as_coeff_mmul() + if factor != 1: + from .trace import trace + return factor * trace(mmul.doit()) + + def _eval_determinant(self): + from sympy.matrices.expressions.determinant import Determinant + factor, matrices = self.as_coeff_matrices() + square_matrices = only_squares(*matrices) + return factor**self.rows * Mul(*list(map(Determinant, square_matrices))) + + def _eval_inverse(self): + if all(arg.is_square for arg in self.args if isinstance(arg, MatrixExpr)): + return MatMul(*( + arg.inverse() if isinstance(arg, MatrixExpr) else arg**-1 + for arg in self.args[::-1] + ) + ).doit() + return Inverse(self) + + def doit(self, **hints): + deep = hints.get('deep', True) + if deep: + args = tuple(arg.doit(**hints) for arg in self.args) + else: + args = self.args + + # treat scalar*MatrixSymbol or scalar*MatPow separately + expr = canonicalize(MatMul(*args)) + return expr + + # Needed for partial compatibility with Mul + def args_cnc(self, cset=False, warn=True, **kwargs): + coeff_c = [x for x in self.args if x.is_commutative] + coeff_nc = [x for x in self.args if not x.is_commutative] + if cset: + clen = len(coeff_c) + coeff_c = set(coeff_c) + if clen and warn and len(coeff_c) != clen: + raise ValueError('repeated commutative arguments: %s' % + [ci for ci in coeff_c if list(self.args).count(ci) > 1]) + return [coeff_c, coeff_nc] + + def _eval_derivative_matrix_lines(self, x): + from .transpose import Transpose + with_x_ind = [i for i, arg in enumerate(self.args) if arg.has(x)] + lines = [] + for ind in with_x_ind: + left_args = self.args[:ind] + right_args = self.args[ind+1:] + + if right_args: + right_mat = MatMul.fromiter(right_args) + else: + right_mat = Identity(self.shape[1]) + if left_args: + left_rev = MatMul.fromiter([Transpose(i).doit() if i.is_Matrix else i for i in reversed(left_args)]) + else: + left_rev = Identity(self.shape[0]) + + d = self.args[ind]._eval_derivative_matrix_lines(x) + for i in d: + i.append_first(left_rev) + i.append_second(right_mat) + lines.append(i) + + return lines + +mul.register_handlerclass((Mul, MatMul), MatMul) + + +# Rules +def newmul(*args): + if args[0] == 1: + args = args[1:] + return new(MatMul, *args) + +def any_zeros(mul): + if any(arg.is_zero or (arg.is_Matrix and arg.is_ZeroMatrix) + for arg in mul.args): + matrices = [arg for arg in mul.args if arg.is_Matrix] + return ZeroMatrix(matrices[0].rows, matrices[-1].cols) + return mul + +def merge_explicit(matmul): + """ Merge explicit MatrixBase arguments + + >>> from sympy import MatrixSymbol, Matrix, MatMul, pprint + >>> from sympy.matrices.expressions.matmul import merge_explicit + >>> A = MatrixSymbol('A', 2, 2) + >>> B = Matrix([[1, 1], [1, 1]]) + >>> C = Matrix([[1, 2], [3, 4]]) + >>> X = MatMul(A, B, C) + >>> pprint(X) + [1 1] [1 2] + A*[ ]*[ ] + [1 1] [3 4] + >>> pprint(merge_explicit(X)) + [4 6] + A*[ ] + [4 6] + + >>> X = MatMul(B, A, C) + >>> pprint(X) + [1 1] [1 2] + [ ]*A*[ ] + [1 1] [3 4] + >>> pprint(merge_explicit(X)) + [1 1] [1 2] + [ ]*A*[ ] + [1 1] [3 4] + """ + if not any(isinstance(arg, MatrixBase) for arg in matmul.args): + return matmul + newargs = [] + last = matmul.args[0] + for arg in matmul.args[1:]: + if isinstance(arg, (MatrixBase, Number)) and isinstance(last, (MatrixBase, Number)): + last = last * arg + else: + newargs.append(last) + last = arg + newargs.append(last) + + return MatMul(*newargs) + +def remove_ids(mul): + """ Remove Identities from a MatMul + + This is a modified version of sympy.strategies.rm_id. + This is necessary because MatMul may contain both MatrixExprs and Exprs + as args. + + See Also + ======== + + sympy.strategies.rm_id + """ + # Separate Exprs from MatrixExprs in args + factor, mmul = mul.as_coeff_mmul() + # Apply standard rm_id for MatMuls + result = rm_id(lambda x: x.is_Identity is True)(mmul) + if result != mmul: + return newmul(factor, *result.args) # Recombine and return + else: + return mul + +def factor_in_front(mul): + factor, matrices = mul.as_coeff_matrices() + if factor != 1: + return newmul(factor, *matrices) + return mul + +def combine_powers(mul): + r"""Combine consecutive powers with the same base into one, e.g. + $$A \times A^2 \Rightarrow A^3$$ + + This also cancels out the possible matrix inverses using the + knowledgebase of :class:`~.Inverse`, e.g., + $$ Y \times X \times X^{-1} \Rightarrow Y $$ + """ + factor, args = mul.as_coeff_matrices() + new_args = [args[0]] + + for i in range(1, len(args)): + A = new_args[-1] + B = args[i] + + if isinstance(B, Inverse) and isinstance(B.arg, MatMul): + Bargs = B.arg.args + l = len(Bargs) + if list(Bargs) == new_args[-l:]: + new_args = new_args[:-l] + [Identity(B.shape[0])] + continue + + if isinstance(A, Inverse) and isinstance(A.arg, MatMul): + Aargs = A.arg.args + l = len(Aargs) + if list(Aargs) == args[i:i+l]: + identity = Identity(A.shape[0]) + new_args[-1] = identity + for j in range(i, i+l): + args[j] = identity + continue + + if A.is_square == False or B.is_square == False: + new_args.append(B) + continue + + if isinstance(A, MatPow): + A_base, A_exp = A.args + else: + A_base, A_exp = A, S.One + + if isinstance(B, MatPow): + B_base, B_exp = B.args + else: + B_base, B_exp = B, S.One + + if A_base == B_base: + new_exp = A_exp + B_exp + new_args[-1] = MatPow(A_base, new_exp).doit(deep=False) + continue + elif not isinstance(B_base, MatrixBase): + try: + B_base_inv = B_base.inverse() + except NonInvertibleMatrixError: + B_base_inv = None + if B_base_inv is not None and A_base == B_base_inv: + new_exp = A_exp - B_exp + new_args[-1] = MatPow(A_base, new_exp).doit(deep=False) + continue + new_args.append(B) + + return newmul(factor, *new_args) + +def combine_permutations(mul): + """Refine products of permutation matrices as the products of cycles. + """ + args = mul.args + l = len(args) + if l < 2: + return mul + + result = [args[0]] + for i in range(1, l): + A = result[-1] + B = args[i] + if isinstance(A, PermutationMatrix) and \ + isinstance(B, PermutationMatrix): + cycle_1 = A.args[0] + cycle_2 = B.args[0] + result[-1] = PermutationMatrix(cycle_1 * cycle_2) + else: + result.append(B) + + return MatMul(*result) + +def combine_one_matrices(mul): + """ + Combine products of OneMatrix + + e.g. OneMatrix(2, 3) * OneMatrix(3, 4) -> 3 * OneMatrix(2, 4) + """ + factor, args = mul.as_coeff_matrices() + new_args = [args[0]] + + for B in args[1:]: + A = new_args[-1] + if not isinstance(A, OneMatrix) or not isinstance(B, OneMatrix): + new_args.append(B) + continue + new_args.pop() + new_args.append(OneMatrix(A.shape[0], B.shape[1])) + factor *= A.shape[1] + + return newmul(factor, *new_args) + +def distribute_monom(mul): + """ + Simplify MatMul expressions but distributing + rational term to MatMul. + + e.g. 2*(A+B) -> 2*A + 2*B + """ + args = mul.args + if len(args) == 2: + from .matadd import MatAdd + if args[0].is_MatAdd and args[1].is_Rational: + return MatAdd(*[MatMul(mat, args[1]).doit() for mat in args[0].args]) + if args[1].is_MatAdd and args[0].is_Rational: + return MatAdd(*[MatMul(args[0], mat).doit() for mat in args[1].args]) + return mul + +rules = ( + distribute_monom, any_zeros, remove_ids, combine_one_matrices, combine_powers, unpack, rm_id(lambda x: x == 1), + merge_explicit, factor_in_front, flatten, combine_permutations) + +canonicalize = exhaust(typed({MatMul: do_one(*rules)})) + +def only_squares(*matrices): + """factor matrices only if they are square""" + if matrices[0].rows != matrices[-1].cols: + raise RuntimeError("Invalid matrices being multiplied") + out = [] + start = 0 + for i, M in enumerate(matrices): + if M.cols == matrices[start].rows: + out.append(MatMul(*matrices[start:i+1]).doit()) + start = i+1 + return out + + +def refine_MatMul(expr, assumptions): + """ + >>> from sympy import MatrixSymbol, Q, assuming, refine + >>> X = MatrixSymbol('X', 2, 2) + >>> expr = X * X.T + >>> print(expr) + X*X.T + >>> with assuming(Q.orthogonal(X)): + ... print(refine(expr)) + I + """ + newargs = [] + exprargs = [] + + for args in expr.args: + if args.is_Matrix: + exprargs.append(args) + else: + newargs.append(args) + + last = exprargs[0] + for arg in exprargs[1:]: + if arg == last.T and ask(Q.orthogonal(arg), assumptions): + last = Identity(arg.shape[0]) + elif arg == last.conjugate() and ask(Q.unitary(arg), assumptions): + last = Identity(arg.shape[0]) + else: + newargs.append(last) + last = arg + newargs.append(last) + + return MatMul(*newargs) + + +handlers_dict['MatMul'] = refine_MatMul diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/matpow.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/matpow.py new file mode 100644 index 0000000000000000000000000000000000000000..b6472995e134e9e5ebfd28a901480665d1531275 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/matpow.py @@ -0,0 +1,150 @@ +from .matexpr import MatrixExpr +from .special import Identity +from sympy.core import S +from sympy.core.expr import ExprBuilder +from sympy.core.cache import cacheit +from sympy.core.power import Pow +from sympy.core.sympify import _sympify +from sympy.matrices import MatrixBase +from sympy.matrices.exceptions import NonSquareMatrixError + + +class MatPow(MatrixExpr): + def __new__(cls, base, exp, evaluate=False, **options): + base = _sympify(base) + if not base.is_Matrix: + raise TypeError("MatPow base should be a matrix") + + if base.is_square is False: + raise NonSquareMatrixError("Power of non-square matrix %s" % base) + + exp = _sympify(exp) + obj = super().__new__(cls, base, exp) + + if evaluate: + obj = obj.doit(deep=False) + + return obj + + @property + def base(self): + return self.args[0] + + @property + def exp(self): + return self.args[1] + + @property + def shape(self): + return self.base.shape + + @cacheit + def _get_explicit_matrix(self): + return self.base.as_explicit()**self.exp + + def _entry(self, i, j, **kwargs): + from sympy.matrices.expressions import MatMul + A = self.doit() + if isinstance(A, MatPow): + # We still have a MatPow, make an explicit MatMul out of it. + if A.exp.is_Integer and A.exp.is_positive: + A = MatMul(*[A.base for k in range(A.exp)]) + elif not self._is_shape_symbolic(): + return A._get_explicit_matrix()[i, j] + else: + # Leave the expression unevaluated: + from sympy.matrices.expressions.matexpr import MatrixElement + return MatrixElement(self, i, j) + return A[i, j] + + def doit(self, **hints): + if hints.get('deep', True): + base, exp = (arg.doit(**hints) for arg in self.args) + else: + base, exp = self.args + + # combine all powers, e.g. (A ** 2) ** 3 -> A ** 6 + while isinstance(base, MatPow): + exp *= base.args[1] + base = base.args[0] + + if isinstance(base, MatrixBase): + # Delegate + return base ** exp + + # Handle simple cases so that _eval_power() in MatrixExpr sub-classes can ignore them + if exp == S.One: + return base + if exp == S.Zero: + return Identity(base.rows) + if exp == S.NegativeOne: + from sympy.matrices.expressions import Inverse + return Inverse(base).doit(**hints) + + eval_power = getattr(base, '_eval_power', None) + if eval_power is not None: + return eval_power(exp) + + return MatPow(base, exp) + + def _eval_transpose(self): + base, exp = self.args + return MatPow(base.transpose(), exp) + + def _eval_adjoint(self): + base, exp = self.args + return MatPow(base.adjoint(), exp) + + def _eval_conjugate(self): + base, exp = self.args + return MatPow(base.conjugate(), exp) + + def _eval_derivative(self, x): + return Pow._eval_derivative(self, x) + + def _eval_derivative_matrix_lines(self, x): + from sympy.tensor.array.expressions.array_expressions import ArrayContraction + from ...tensor.array.expressions.array_expressions import ArrayTensorProduct + from .matmul import MatMul + from .inverse import Inverse + exp = self.exp + if self.base.shape == (1, 1) and not exp.has(x): + lr = self.base._eval_derivative_matrix_lines(x) + for i in lr: + subexpr = ExprBuilder( + ArrayContraction, + [ + ExprBuilder( + ArrayTensorProduct, + [ + Identity(1), + i._lines[0], + exp*self.base**(exp-1), + i._lines[1], + Identity(1), + ] + ), + (0, 3, 4), (5, 7, 8) + ], + validator=ArrayContraction._validate + ) + i._first_pointer_parent = subexpr.args[0].args + i._first_pointer_index = 0 + i._second_pointer_parent = subexpr.args[0].args + i._second_pointer_index = 4 + i._lines = [subexpr] + return lr + if (exp > 0) == True: + newexpr = MatMul.fromiter([self.base for i in range(exp)]) + elif (exp == -1) == True: + return Inverse(self.base)._eval_derivative_matrix_lines(x) + elif (exp < 0) == True: + newexpr = MatMul.fromiter([Inverse(self.base) for i in range(-exp)]) + elif (exp == 0) == True: + return self.doit()._eval_derivative_matrix_lines(x) + else: + raise NotImplementedError("cannot evaluate %s derived by %s" % (self, x)) + return newexpr._eval_derivative_matrix_lines(x) + + def _eval_inverse(self): + return MatPow(self.base, -self.exp) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/permutation.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/permutation.py new file mode 100644 index 0000000000000000000000000000000000000000..5634fa941a53d8890583fe61bb29bc34f4e6000d --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/permutation.py @@ -0,0 +1,303 @@ +from sympy.core import S +from sympy.core.sympify import _sympify +from sympy.functions import KroneckerDelta + +from .matexpr import MatrixExpr +from .special import ZeroMatrix, Identity, OneMatrix + + +class PermutationMatrix(MatrixExpr): + """A Permutation Matrix + + Parameters + ========== + + perm : Permutation + The permutation the matrix uses. + + The size of the permutation determines the matrix size. + + See the documentation of + :class:`sympy.combinatorics.permutations.Permutation` for + the further information of how to create a permutation object. + + Examples + ======== + + >>> from sympy import Matrix, PermutationMatrix + >>> from sympy.combinatorics import Permutation + + Creating a permutation matrix: + + >>> p = Permutation(1, 2, 0) + >>> P = PermutationMatrix(p) + >>> P = P.as_explicit() + >>> P + Matrix([ + [0, 1, 0], + [0, 0, 1], + [1, 0, 0]]) + + Permuting a matrix row and column: + + >>> M = Matrix([0, 1, 2]) + >>> Matrix(P*M) + Matrix([ + [1], + [2], + [0]]) + + >>> Matrix(M.T*P) + Matrix([[2, 0, 1]]) + + See Also + ======== + + sympy.combinatorics.permutations.Permutation + """ + + def __new__(cls, perm): + from sympy.combinatorics.permutations import Permutation + + perm = _sympify(perm) + if not isinstance(perm, Permutation): + raise ValueError( + "{} must be a SymPy Permutation instance.".format(perm)) + + return super().__new__(cls, perm) + + @property + def shape(self): + size = self.args[0].size + return (size, size) + + @property + def is_Identity(self): + return self.args[0].is_Identity + + def doit(self, **hints): + if self.is_Identity: + return Identity(self.rows) + return self + + def _entry(self, i, j, **kwargs): + perm = self.args[0] + return KroneckerDelta(perm.apply(i), j) + + def _eval_power(self, exp): + return PermutationMatrix(self.args[0] ** exp).doit() + + def _eval_inverse(self): + return PermutationMatrix(self.args[0] ** -1) + + _eval_transpose = _eval_adjoint = _eval_inverse + + def _eval_determinant(self): + sign = self.args[0].signature() + if sign == 1: + return S.One + elif sign == -1: + return S.NegativeOne + raise NotImplementedError + + def _eval_rewrite_as_BlockDiagMatrix(self, *args, **kwargs): + from sympy.combinatorics.permutations import Permutation + from .blockmatrix import BlockDiagMatrix + + perm = self.args[0] + full_cyclic_form = perm.full_cyclic_form + + cycles_picks = [] + + # Stage 1. Decompose the cycles into the blockable form. + a, b, c = 0, 0, 0 + flag = False + for cycle in full_cyclic_form: + l = len(cycle) + m = max(cycle) + + if not flag: + if m + 1 > a + l: + flag = True + temp = [cycle] + b = m + c = l + else: + cycles_picks.append([cycle]) + a += l + + else: + if m > b: + if m + 1 == a + c + l: + temp.append(cycle) + cycles_picks.append(temp) + flag = False + a = m+1 + else: + b = m + temp.append(cycle) + c += l + else: + if b + 1 == a + c + l: + temp.append(cycle) + cycles_picks.append(temp) + flag = False + a = b+1 + else: + temp.append(cycle) + c += l + + # Stage 2. Normalize each decomposed cycles and build matrix. + p = 0 + args = [] + for pick in cycles_picks: + new_cycles = [] + l = 0 + for cycle in pick: + new_cycle = [i - p for i in cycle] + new_cycles.append(new_cycle) + l += len(cycle) + p += l + perm = Permutation(new_cycles) + mat = PermutationMatrix(perm) + args.append(mat) + + return BlockDiagMatrix(*args) + + +class MatrixPermute(MatrixExpr): + r"""Symbolic representation for permuting matrix rows or columns. + + Parameters + ========== + + perm : Permutation, PermutationMatrix + The permutation to use for permuting the matrix. + The permutation can be resized to the suitable one, + + axis : 0 or 1 + The axis to permute alongside. + If `0`, it will permute the matrix rows. + If `1`, it will permute the matrix columns. + + Notes + ===== + + This follows the same notation used in + :meth:`sympy.matrices.matrixbase.MatrixBase.permute`. + + Examples + ======== + + >>> from sympy import Matrix, MatrixPermute + >>> from sympy.combinatorics import Permutation + + Permuting the matrix rows: + + >>> p = Permutation(1, 2, 0) + >>> A = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + >>> B = MatrixPermute(A, p, axis=0) + >>> B.as_explicit() + Matrix([ + [4, 5, 6], + [7, 8, 9], + [1, 2, 3]]) + + Permuting the matrix columns: + + >>> B = MatrixPermute(A, p, axis=1) + >>> B.as_explicit() + Matrix([ + [2, 3, 1], + [5, 6, 4], + [8, 9, 7]]) + + See Also + ======== + + sympy.matrices.matrixbase.MatrixBase.permute + """ + def __new__(cls, mat, perm, axis=S.Zero): + from sympy.combinatorics.permutations import Permutation + + mat = _sympify(mat) + if not mat.is_Matrix: + raise ValueError( + "{} must be a SymPy matrix instance.".format(perm)) + + perm = _sympify(perm) + if isinstance(perm, PermutationMatrix): + perm = perm.args[0] + + if not isinstance(perm, Permutation): + raise ValueError( + "{} must be a SymPy Permutation or a PermutationMatrix " \ + "instance".format(perm)) + + axis = _sympify(axis) + if axis not in (0, 1): + raise ValueError("The axis must be 0 or 1.") + + mat_size = mat.shape[axis] + if mat_size != perm.size: + try: + perm = perm.resize(mat_size) + except ValueError: + raise ValueError( + "Size does not match between the permutation {} " + "and the matrix {} threaded over the axis {} " + "and cannot be converted." + .format(perm, mat, axis)) + + return super().__new__(cls, mat, perm, axis) + + def doit(self, deep=True, **hints): + mat, perm, axis = self.args + + if deep: + mat = mat.doit(deep=deep, **hints) + perm = perm.doit(deep=deep, **hints) + + if perm.is_Identity: + return mat + + if mat.is_Identity: + if axis is S.Zero: + return PermutationMatrix(perm) + elif axis is S.One: + return PermutationMatrix(perm**-1) + + if isinstance(mat, (ZeroMatrix, OneMatrix)): + return mat + + if isinstance(mat, MatrixPermute) and mat.args[2] == axis: + return MatrixPermute(mat.args[0], perm * mat.args[1], axis) + + return self + + @property + def shape(self): + return self.args[0].shape + + def _entry(self, i, j, **kwargs): + mat, perm, axis = self.args + + if axis == 0: + return mat[perm.apply(i), j] + elif axis == 1: + return mat[i, perm.apply(j)] + + def _eval_rewrite_as_MatMul(self, *args, **kwargs): + from .matmul import MatMul + + mat, perm, axis = self.args + + deep = kwargs.get("deep", True) + + if deep: + mat = mat.rewrite(MatMul) + + if axis == 0: + return MatMul(PermutationMatrix(perm), mat) + elif axis == 1: + return MatMul(mat, PermutationMatrix(perm**-1)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/sets.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/sets.py new file mode 100644 index 0000000000000000000000000000000000000000..ab4930ea8f1b058977a8dd1abdc62f1f5e2195c1 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/sets.py @@ -0,0 +1,68 @@ +from sympy.core.assumptions import check_assumptions +from sympy.core.logic import fuzzy_and +from sympy.core.sympify import _sympify +from sympy.matrices.kind import MatrixKind +from sympy.sets.sets import Set, SetKind +from sympy.core.kind import NumberKind +from .matexpr import MatrixExpr + + +class MatrixSet(Set): + """ + MatrixSet represents the set of matrices with ``shape = (n, m)`` over the + given set. + + Examples + ======== + + >>> from sympy.matrices import MatrixSet + >>> from sympy import S, I, Matrix + >>> M = MatrixSet(2, 2, set=S.Reals) + >>> X = Matrix([[1, 2], [3, 4]]) + >>> X in M + True + >>> X = Matrix([[1, 2], [I, 4]]) + >>> X in M + False + + """ + is_empty = False + + def __new__(cls, n, m, set): + n, m, set = _sympify(n), _sympify(m), _sympify(set) + cls._check_dim(n) + cls._check_dim(m) + if not isinstance(set, Set): + raise TypeError("{} should be an instance of Set.".format(set)) + return Set.__new__(cls, n, m, set) + + @property + def shape(self): + return self.args[:2] + + @property + def set(self): + return self.args[2] + + def _contains(self, other): + if not isinstance(other, MatrixExpr): + raise TypeError("{} should be an instance of MatrixExpr.".format(other)) + if other.shape != self.shape: + are_symbolic = any(_sympify(x).is_Symbol for x in other.shape + self.shape) + if are_symbolic: + return None + return False + return fuzzy_and(self.set.contains(x) for x in other) + + @classmethod + def _check_dim(cls, dim): + """Helper function to check invalid matrix dimensions""" + ok = not dim.is_Float and check_assumptions( + dim, integer=True, nonnegative=True) + if ok is False: + raise ValueError( + "The dimension specification {} should be " + "a nonnegative integer.".format(dim)) + + def _kind(self): + return SetKind(MatrixKind(NumberKind)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/slice.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/slice.py new file mode 100644 index 0000000000000000000000000000000000000000..1904b49f29c503fb4c0c909532f8342fb0f4b135 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/slice.py @@ -0,0 +1,114 @@ +from sympy.matrices.expressions.matexpr import MatrixExpr +from sympy.core.basic import Basic +from sympy.core.containers import Tuple +from sympy.functions.elementary.integers import floor + +def normalize(i, parentsize): + if isinstance(i, slice): + i = (i.start, i.stop, i.step) + if not isinstance(i, (tuple, list, Tuple)): + if (i < 0) == True: + i += parentsize + i = (i, i+1, 1) + i = list(i) + if len(i) == 2: + i.append(1) + start, stop, step = i + start = start or 0 + if stop is None: + stop = parentsize + if (start < 0) == True: + start += parentsize + if (stop < 0) == True: + stop += parentsize + step = step or 1 + + if ((stop - start) * step < 1) == True: + raise IndexError() + + return (start, stop, step) + +class MatrixSlice(MatrixExpr): + """ A MatrixSlice of a Matrix Expression + + Examples + ======== + + >>> from sympy import MatrixSlice, ImmutableMatrix + >>> M = ImmutableMatrix(4, 4, range(16)) + >>> M + Matrix([ + [ 0, 1, 2, 3], + [ 4, 5, 6, 7], + [ 8, 9, 10, 11], + [12, 13, 14, 15]]) + + >>> B = MatrixSlice(M, (0, 2), (2, 4)) + >>> ImmutableMatrix(B) + Matrix([ + [2, 3], + [6, 7]]) + """ + parent = property(lambda self: self.args[0]) + rowslice = property(lambda self: self.args[1]) + colslice = property(lambda self: self.args[2]) + + def __new__(cls, parent, rowslice, colslice): + rowslice = normalize(rowslice, parent.shape[0]) + colslice = normalize(colslice, parent.shape[1]) + if not (len(rowslice) == len(colslice) == 3): + raise IndexError() + if ((0 > rowslice[0]) == True or + (parent.shape[0] < rowslice[1]) == True or + (0 > colslice[0]) == True or + (parent.shape[1] < colslice[1]) == True): + raise IndexError() + if isinstance(parent, MatrixSlice): + return mat_slice_of_slice(parent, rowslice, colslice) + return Basic.__new__(cls, parent, Tuple(*rowslice), Tuple(*colslice)) + + @property + def shape(self): + rows = self.rowslice[1] - self.rowslice[0] + rows = rows if self.rowslice[2] == 1 else floor(rows/self.rowslice[2]) + cols = self.colslice[1] - self.colslice[0] + cols = cols if self.colslice[2] == 1 else floor(cols/self.colslice[2]) + return rows, cols + + def _entry(self, i, j, **kwargs): + return self.parent._entry(i*self.rowslice[2] + self.rowslice[0], + j*self.colslice[2] + self.colslice[0], + **kwargs) + + @property + def on_diag(self): + return self.rowslice == self.colslice + + +def slice_of_slice(s, t): + start1, stop1, step1 = s + start2, stop2, step2 = t + + start = start1 + start2*step1 + step = step1 * step2 + stop = start1 + step1*stop2 + + if stop > stop1: + raise IndexError() + + return start, stop, step + + +def mat_slice_of_slice(parent, rowslice, colslice): + """ Collapse nested matrix slices + + >>> from sympy import MatrixSymbol + >>> X = MatrixSymbol('X', 10, 10) + >>> X[:, 1:5][5:8, :] + X[5:8, 1:5] + >>> X[1:9:2, 2:6][1:3, 2] + X[3:7:2, 4:5] + """ + row = slice_of_slice(parent.rowslice, rowslice) + col = slice_of_slice(parent.colslice, colslice) + return MatrixSlice(parent.parent, row, col) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/special.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/special.py new file mode 100644 index 0000000000000000000000000000000000000000..d1e426f16ada0e4245b644867974b41b6f86b5cc --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/special.py @@ -0,0 +1,299 @@ +from sympy.assumptions.ask import ask, Q +from sympy.core.relational import Eq +from sympy.core.singleton import S +from sympy.core.sympify import _sympify +from sympy.functions.special.tensor_functions import KroneckerDelta +from sympy.matrices.exceptions import NonInvertibleMatrixError +from .matexpr import MatrixExpr + + +class ZeroMatrix(MatrixExpr): + """The Matrix Zero 0 - additive identity + + Examples + ======== + + >>> from sympy import MatrixSymbol, ZeroMatrix + >>> A = MatrixSymbol('A', 3, 5) + >>> Z = ZeroMatrix(3, 5) + >>> A + Z + A + >>> Z*A.T + 0 + """ + is_ZeroMatrix = True + + def __new__(cls, m, n): + m, n = _sympify(m), _sympify(n) + cls._check_dim(m) + cls._check_dim(n) + + return super().__new__(cls, m, n) + + @property + def shape(self): + return (self.args[0], self.args[1]) + + def _eval_power(self, exp): + # exp = -1, 0, 1 are already handled at this stage + if (exp < 0) == True: + raise NonInvertibleMatrixError("Matrix det == 0; not invertible") + return self + + def _eval_transpose(self): + return ZeroMatrix(self.cols, self.rows) + + def _eval_adjoint(self): + return ZeroMatrix(self.cols, self.rows) + + def _eval_trace(self): + return S.Zero + + def _eval_determinant(self): + return S.Zero + + def _eval_inverse(self): + raise NonInvertibleMatrixError("Matrix det == 0; not invertible.") + + def _eval_as_real_imag(self): + return (self, self) + + def _eval_conjugate(self): + return self + + def _entry(self, i, j, **kwargs): + return S.Zero + + +class GenericZeroMatrix(ZeroMatrix): + """ + A zero matrix without a specified shape + + This exists primarily so MatAdd() with no arguments can return something + meaningful. + """ + def __new__(cls): + # super(ZeroMatrix, cls) instead of super(GenericZeroMatrix, cls) + # because ZeroMatrix.__new__ doesn't have the same signature + return super(ZeroMatrix, cls).__new__(cls) + + @property + def rows(self): + raise TypeError("GenericZeroMatrix does not have a specified shape") + + @property + def cols(self): + raise TypeError("GenericZeroMatrix does not have a specified shape") + + @property + def shape(self): + raise TypeError("GenericZeroMatrix does not have a specified shape") + + # Avoid Matrix.__eq__ which might call .shape + def __eq__(self, other): + return isinstance(other, GenericZeroMatrix) + + def __ne__(self, other): + return not (self == other) + + def __hash__(self): + return super().__hash__() + + + +class Identity(MatrixExpr): + """The Matrix Identity I - multiplicative identity + + Examples + ======== + + >>> from sympy import Identity, MatrixSymbol + >>> A = MatrixSymbol('A', 3, 5) + >>> I = Identity(3) + >>> I*A + A + """ + + is_Identity = True + + def __new__(cls, n): + n = _sympify(n) + cls._check_dim(n) + + return super().__new__(cls, n) + + @property + def rows(self): + return self.args[0] + + @property + def cols(self): + return self.args[0] + + @property + def shape(self): + return (self.args[0], self.args[0]) + + @property + def is_square(self): + return True + + def _eval_transpose(self): + return self + + def _eval_trace(self): + return self.rows + + def _eval_inverse(self): + return self + + def _eval_as_real_imag(self): + return (self, ZeroMatrix(*self.shape)) + + def _eval_conjugate(self): + return self + + def _eval_adjoint(self): + return self + + def _entry(self, i, j, **kwargs): + eq = Eq(i, j) + if eq is S.true: + return S.One + elif eq is S.false: + return S.Zero + return KroneckerDelta(i, j, (0, self.cols-1)) + + def _eval_determinant(self): + return S.One + + def _eval_power(self, exp): + return self + + +class GenericIdentity(Identity): + """ + An identity matrix without a specified shape + + This exists primarily so MatMul() with no arguments can return something + meaningful. + """ + def __new__(cls): + # super(Identity, cls) instead of super(GenericIdentity, cls) because + # Identity.__new__ doesn't have the same signature + return super(Identity, cls).__new__(cls) + + @property + def rows(self): + raise TypeError("GenericIdentity does not have a specified shape") + + @property + def cols(self): + raise TypeError("GenericIdentity does not have a specified shape") + + @property + def shape(self): + raise TypeError("GenericIdentity does not have a specified shape") + + @property + def is_square(self): + return True + + # Avoid Matrix.__eq__ which might call .shape + def __eq__(self, other): + return isinstance(other, GenericIdentity) + + def __ne__(self, other): + return not (self == other) + + def __hash__(self): + return super().__hash__() + + +class OneMatrix(MatrixExpr): + """ + Matrix whose all entries are ones. + """ + def __new__(cls, m, n, evaluate=False): + m, n = _sympify(m), _sympify(n) + cls._check_dim(m) + cls._check_dim(n) + + if evaluate: + condition = Eq(m, 1) & Eq(n, 1) + if condition == True: + return Identity(1) + + obj = super().__new__(cls, m, n) + return obj + + @property + def shape(self): + return self._args + + @property + def is_Identity(self): + return self._is_1x1() == True + + def as_explicit(self): + from sympy.matrices.immutable import ImmutableDenseMatrix + return ImmutableDenseMatrix.ones(*self.shape) + + def doit(self, **hints): + args = self.args + if hints.get('deep', True): + args = [a.doit(**hints) for a in args] + return self.func(*args, evaluate=True) + + def _eval_power(self, exp): + # exp = -1, 0, 1 are already handled at this stage + if self._is_1x1() == True: + return Identity(1) + if (exp < 0) == True: + raise NonInvertibleMatrixError("Matrix det == 0; not invertible") + if ask(Q.integer(exp)): + return self.shape[0] ** (exp - 1) * OneMatrix(*self.shape) + return super()._eval_power(exp) + + def _eval_transpose(self): + return OneMatrix(self.cols, self.rows) + + def _eval_adjoint(self): + return OneMatrix(self.cols, self.rows) + + def _eval_trace(self): + return S.One*self.rows + + def _is_1x1(self): + """Returns true if the matrix is known to be 1x1""" + shape = self.shape + return Eq(shape[0], 1) & Eq(shape[1], 1) + + def _eval_determinant(self): + condition = self._is_1x1() + if condition == True: + return S.One + elif condition == False: + return S.Zero + else: + from sympy.matrices.expressions.determinant import Determinant + return Determinant(self) + + def _eval_inverse(self): + condition = self._is_1x1() + if condition == True: + return Identity(1) + elif condition == False: + raise NonInvertibleMatrixError("Matrix det == 0; not invertible.") + else: + from .inverse import Inverse + return Inverse(self) + + def _eval_as_real_imag(self): + return (self, ZeroMatrix(*self.shape)) + + def _eval_conjugate(self): + return self + + def _entry(self, i, j, **kwargs): + return S.One diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_adjoint.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_adjoint.py new file mode 100644 index 0000000000000000000000000000000000000000..7106b5740b1dc7c32f2c6f5ecb9d286b5e1dd222 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_adjoint.py @@ -0,0 +1,34 @@ +from sympy.core import symbols, S +from sympy.functions import adjoint, conjugate, transpose +from sympy.matrices.expressions import MatrixSymbol, Adjoint, trace, Transpose +from sympy.matrices import eye, Matrix + +n, m, l, k, p = symbols('n m l k p', integer=True) +A = MatrixSymbol('A', n, m) +B = MatrixSymbol('B', m, l) +C = MatrixSymbol('C', n, n) + + +def test_adjoint(): + Sq = MatrixSymbol('Sq', n, n) + + assert Adjoint(A).shape == (m, n) + assert Adjoint(A*B).shape == (l, n) + assert adjoint(Adjoint(A)) == A + assert isinstance(Adjoint(Adjoint(A)), Adjoint) + + assert conjugate(Adjoint(A)) == Transpose(A) + assert transpose(Adjoint(A)) == Adjoint(Transpose(A)) + + assert Adjoint(eye(3)).doit() == eye(3) + + assert Adjoint(S(5)).doit() == S(5) + + assert Adjoint(Matrix([[1, 2], [3, 4]])).doit() == Matrix([[1, 3], [2, 4]]) + + assert adjoint(trace(Sq)) == conjugate(trace(Sq)) + assert trace(adjoint(Sq)) == conjugate(trace(Sq)) + + assert Adjoint(Sq)[0, 1] == conjugate(Sq[1, 0]) + + assert Adjoint(A*B).doit() == Adjoint(B) * Adjoint(A) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_applyfunc.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_applyfunc.py new file mode 100644 index 0000000000000000000000000000000000000000..d98732e2751e53938d96d7ea56c916e6fee4578e --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_applyfunc.py @@ -0,0 +1,118 @@ +from sympy.core.symbol import symbols, Dummy +from sympy.matrices.expressions.applyfunc import ElementwiseApplyFunction +from sympy.core.function import Lambda +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.trigonometric import sin +from sympy.matrices.dense import Matrix +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.matrices.expressions.matmul import MatMul +from sympy.simplify.simplify import simplify + + +X = MatrixSymbol("X", 3, 3) +Y = MatrixSymbol("Y", 3, 3) + +k = symbols("k") +Xk = MatrixSymbol("X", k, k) + +Xd = X.as_explicit() + +x, y, z, t = symbols("x y z t") + + +def test_applyfunc_matrix(): + x = Dummy('x') + double = Lambda(x, x**2) + + expr = ElementwiseApplyFunction(double, Xd) + assert isinstance(expr, ElementwiseApplyFunction) + assert expr.doit() == Xd.applyfunc(lambda x: x**2) + assert expr.shape == (3, 3) + assert expr.func(*expr.args) == expr + assert simplify(expr) == expr + assert expr[0, 0] == double(Xd[0, 0]) + + expr = ElementwiseApplyFunction(double, X) + assert isinstance(expr, ElementwiseApplyFunction) + assert isinstance(expr.doit(), ElementwiseApplyFunction) + assert expr == X.applyfunc(double) + assert expr.func(*expr.args) == expr + + expr = ElementwiseApplyFunction(exp, X*Y) + assert expr.expr == X*Y + assert expr.function.dummy_eq(Lambda(x, exp(x))) + assert expr.dummy_eq((X*Y).applyfunc(exp)) + assert expr.func(*expr.args) == expr + + assert isinstance(X*expr, MatMul) + assert (X*expr).shape == (3, 3) + Z = MatrixSymbol("Z", 2, 3) + assert (Z*expr).shape == (2, 3) + + expr = ElementwiseApplyFunction(exp, Z.T)*ElementwiseApplyFunction(exp, Z) + assert expr.shape == (3, 3) + expr = ElementwiseApplyFunction(exp, Z)*ElementwiseApplyFunction(exp, Z.T) + assert expr.shape == (2, 2) + + M = Matrix([[x, y], [z, t]]) + expr = ElementwiseApplyFunction(sin, M) + assert isinstance(expr, ElementwiseApplyFunction) + assert expr.function.dummy_eq(Lambda(x, sin(x))) + assert expr.expr == M + assert expr.doit() == M.applyfunc(sin) + assert expr.doit() == Matrix([[sin(x), sin(y)], [sin(z), sin(t)]]) + assert expr.func(*expr.args) == expr + + expr = ElementwiseApplyFunction(double, Xk) + assert expr.doit() == expr + assert expr.subs(k, 2).shape == (2, 2) + assert (expr*expr).shape == (k, k) + M = MatrixSymbol("M", k, t) + expr2 = M.T*expr*M + assert isinstance(expr2, MatMul) + assert expr2.args[1] == expr + assert expr2.shape == (t, t) + expr3 = expr*M + assert expr3.shape == (k, t) + + expr1 = ElementwiseApplyFunction(lambda x: x+1, Xk) + expr2 = ElementwiseApplyFunction(lambda x: x, Xk) + assert expr1 != expr2 + + +def test_applyfunc_entry(): + + af = X.applyfunc(sin) + assert af[0, 0] == sin(X[0, 0]) + + af = Xd.applyfunc(sin) + assert af[0, 0] == sin(X[0, 0]) + + +def test_applyfunc_as_explicit(): + + af = X.applyfunc(sin) + assert af.as_explicit() == Matrix([ + [sin(X[0, 0]), sin(X[0, 1]), sin(X[0, 2])], + [sin(X[1, 0]), sin(X[1, 1]), sin(X[1, 2])], + [sin(X[2, 0]), sin(X[2, 1]), sin(X[2, 2])], + ]) + + +def test_applyfunc_transpose(): + + af = Xk.applyfunc(sin) + assert af.T.dummy_eq(Xk.T.applyfunc(sin)) + + +def test_applyfunc_shape_11_matrices(): + M = MatrixSymbol("M", 1, 1) + + double = Lambda(x, x*2) + + expr = M.applyfunc(sin) + assert isinstance(expr, ElementwiseApplyFunction) + + expr = M.applyfunc(double) + assert isinstance(expr, MatMul) + assert expr == 2*M diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_blockmatrix.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_blockmatrix.py new file mode 100644 index 0000000000000000000000000000000000000000..1d4893cd9a4b3e47dd8e84db33031f7f6f3201fd --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_blockmatrix.py @@ -0,0 +1,469 @@ +from sympy.matrices.expressions.trace import Trace +from sympy.testing.pytest import raises, slow +from sympy.matrices.expressions.blockmatrix import ( + block_collapse, bc_matmul, bc_block_plus_ident, BlockDiagMatrix, + BlockMatrix, bc_dist, bc_matadd, bc_transpose, bc_inverse, + blockcut, reblock_2x2, deblock) +from sympy.matrices.expressions import ( + MatrixSymbol, Identity, trace, det, ZeroMatrix, OneMatrix) +from sympy.matrices.expressions.inverse import Inverse +from sympy.matrices.expressions.matpow import MatPow +from sympy.matrices.expressions.transpose import Transpose +from sympy.matrices.exceptions import NonInvertibleMatrixError +from sympy.matrices import ( + Matrix, ImmutableMatrix, ImmutableSparseMatrix, zeros) +from sympy.core import Tuple, Expr, S, Function +from sympy.core.symbol import Symbol, symbols +from sympy.functions import transpose, im, re + +i, j, k, l, m, n, p = symbols('i:n, p', integer=True) +A = MatrixSymbol('A', n, n) +B = MatrixSymbol('B', n, n) +C = MatrixSymbol('C', n, n) +D = MatrixSymbol('D', n, n) +G = MatrixSymbol('G', n, n) +H = MatrixSymbol('H', n, n) +b1 = BlockMatrix([[G, H]]) +b2 = BlockMatrix([[G], [H]]) + +def test_bc_matmul(): + assert bc_matmul(H*b1*b2*G) == BlockMatrix([[(H*G*G + H*H*H)*G]]) + +def test_bc_matadd(): + assert bc_matadd(BlockMatrix([[G, H]]) + BlockMatrix([[H, H]])) == \ + BlockMatrix([[G+H, H+H]]) + +def test_bc_transpose(): + assert bc_transpose(Transpose(BlockMatrix([[A, B], [C, D]]))) == \ + BlockMatrix([[A.T, C.T], [B.T, D.T]]) + +def test_bc_dist_diag(): + A = MatrixSymbol('A', n, n) + B = MatrixSymbol('B', m, m) + C = MatrixSymbol('C', l, l) + X = BlockDiagMatrix(A, B, C) + + assert bc_dist(X+X).equals(BlockDiagMatrix(2*A, 2*B, 2*C)) + +def test_block_plus_ident(): + A = MatrixSymbol('A', n, n) + B = MatrixSymbol('B', n, m) + C = MatrixSymbol('C', m, n) + D = MatrixSymbol('D', m, m) + X = BlockMatrix([[A, B], [C, D]]) + Z = MatrixSymbol('Z', n + m, n + m) + assert bc_block_plus_ident(X + Identity(m + n) + Z) == \ + BlockDiagMatrix(Identity(n), Identity(m)) + X + Z + +def test_BlockMatrix(): + A = MatrixSymbol('A', n, m) + B = MatrixSymbol('B', n, k) + C = MatrixSymbol('C', l, m) + D = MatrixSymbol('D', l, k) + M = MatrixSymbol('M', m + k, p) + N = MatrixSymbol('N', l + n, k + m) + X = BlockMatrix(Matrix([[A, B], [C, D]])) + + assert X.__class__(*X.args) == X + + # block_collapse does nothing on normal inputs + E = MatrixSymbol('E', n, m) + assert block_collapse(A + 2*E) == A + 2*E + F = MatrixSymbol('F', m, m) + assert block_collapse(E.T*A*F) == E.T*A*F + + assert X.shape == (l + n, k + m) + assert X.blockshape == (2, 2) + assert transpose(X) == BlockMatrix(Matrix([[A.T, C.T], [B.T, D.T]])) + assert transpose(X).shape == X.shape[::-1] + + # Test that BlockMatrices and MatrixSymbols can still mix + assert (X*M).is_MatMul + assert X._blockmul(M).is_MatMul + assert (X*M).shape == (n + l, p) + assert (X + N).is_MatAdd + assert X._blockadd(N).is_MatAdd + assert (X + N).shape == X.shape + + E = MatrixSymbol('E', m, 1) + F = MatrixSymbol('F', k, 1) + + Y = BlockMatrix(Matrix([[E], [F]])) + + assert (X*Y).shape == (l + n, 1) + assert block_collapse(X*Y).blocks[0, 0] == A*E + B*F + assert block_collapse(X*Y).blocks[1, 0] == C*E + D*F + + # block_collapse passes down into container objects, transposes, and inverse + assert block_collapse(transpose(X*Y)) == transpose(block_collapse(X*Y)) + assert block_collapse(Tuple(X*Y, 2*X)) == ( + block_collapse(X*Y), block_collapse(2*X)) + + # Make sure that MatrixSymbols will enter 1x1 BlockMatrix if it simplifies + Ab = BlockMatrix([[A]]) + Z = MatrixSymbol('Z', *A.shape) + assert block_collapse(Ab + Z) == A + Z + +def test_block_collapse_explicit_matrices(): + A = Matrix([[1, 2], [3, 4]]) + assert block_collapse(BlockMatrix([[A]])) == A + + A = ImmutableSparseMatrix([[1, 2], [3, 4]]) + assert block_collapse(BlockMatrix([[A]])) == A + +def test_issue_17624(): + a = MatrixSymbol("a", 2, 2) + z = ZeroMatrix(2, 2) + b = BlockMatrix([[a, z], [z, z]]) + assert block_collapse(b * b) == BlockMatrix([[a**2, z], [z, z]]) + assert block_collapse(b * b * b) == BlockMatrix([[a**3, z], [z, z]]) + +def test_issue_18618(): + A = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + assert A == Matrix(BlockDiagMatrix(A)) + +def test_BlockMatrix_trace(): + A, B, C, D = [MatrixSymbol(s, 3, 3) for s in 'ABCD'] + X = BlockMatrix([[A, B], [C, D]]) + assert trace(X) == trace(A) + trace(D) + assert trace(BlockMatrix([ZeroMatrix(n, n)])) == 0 + +def test_BlockMatrix_Determinant(): + A, B, C, D = [MatrixSymbol(s, 3, 3) for s in 'ABCD'] + X = BlockMatrix([[A, B], [C, D]]) + from sympy.assumptions.ask import Q + from sympy.assumptions.assume import assuming + with assuming(Q.invertible(A)): + assert det(X) == det(A) * det(X.schur('A')) + + assert isinstance(det(X), Expr) + assert det(BlockMatrix([A])) == det(A) + assert det(BlockMatrix([ZeroMatrix(n, n)])) == 0 + +def test_squareBlockMatrix(): + A = MatrixSymbol('A', n, n) + B = MatrixSymbol('B', n, m) + C = MatrixSymbol('C', m, n) + D = MatrixSymbol('D', m, m) + X = BlockMatrix([[A, B], [C, D]]) + Y = BlockMatrix([[A]]) + + assert X.is_square + + Q = X + Identity(m + n) + assert (block_collapse(Q) == + BlockMatrix([[A + Identity(n), B], [C, D + Identity(m)]])) + + assert (X + MatrixSymbol('Q', n + m, n + m)).is_MatAdd + assert (X * MatrixSymbol('Q', n + m, n + m)).is_MatMul + + assert block_collapse(Y.I) == A.I + + assert isinstance(X.inverse(), Inverse) + + assert not X.is_Identity + + Z = BlockMatrix([[Identity(n), B], [C, D]]) + assert not Z.is_Identity + + +def test_BlockMatrix_2x2_inverse_symbolic(): + A = MatrixSymbol('A', n, m) + B = MatrixSymbol('B', n, k - m) + C = MatrixSymbol('C', k - n, m) + D = MatrixSymbol('D', k - n, k - m) + X = BlockMatrix([[A, B], [C, D]]) + assert X.is_square and X.shape == (k, k) + assert isinstance(block_collapse(X.I), Inverse) # Can't invert when none of the blocks is square + + # test code path where only A is invertible + A = MatrixSymbol('A', n, n) + B = MatrixSymbol('B', n, m) + C = MatrixSymbol('C', m, n) + D = ZeroMatrix(m, m) + X = BlockMatrix([[A, B], [C, D]]) + assert block_collapse(X.inverse()) == BlockMatrix([ + [A.I + A.I * B * X.schur('A').I * C * A.I, -A.I * B * X.schur('A').I], + [-X.schur('A').I * C * A.I, X.schur('A').I], + ]) + + # test code path where only B is invertible + A = MatrixSymbol('A', n, m) + B = MatrixSymbol('B', n, n) + C = ZeroMatrix(m, m) + D = MatrixSymbol('D', m, n) + X = BlockMatrix([[A, B], [C, D]]) + assert block_collapse(X.inverse()) == BlockMatrix([ + [-X.schur('B').I * D * B.I, X.schur('B').I], + [B.I + B.I * A * X.schur('B').I * D * B.I, -B.I * A * X.schur('B').I], + ]) + + # test code path where only C is invertible + A = MatrixSymbol('A', n, m) + B = ZeroMatrix(n, n) + C = MatrixSymbol('C', m, m) + D = MatrixSymbol('D', m, n) + X = BlockMatrix([[A, B], [C, D]]) + assert block_collapse(X.inverse()) == BlockMatrix([ + [-C.I * D * X.schur('C').I, C.I + C.I * D * X.schur('C').I * A * C.I], + [X.schur('C').I, -X.schur('C').I * A * C.I], + ]) + + # test code path where only D is invertible + A = ZeroMatrix(n, n) + B = MatrixSymbol('B', n, m) + C = MatrixSymbol('C', m, n) + D = MatrixSymbol('D', m, m) + X = BlockMatrix([[A, B], [C, D]]) + assert block_collapse(X.inverse()) == BlockMatrix([ + [X.schur('D').I, -X.schur('D').I * B * D.I], + [-D.I * C * X.schur('D').I, D.I + D.I * C * X.schur('D').I * B * D.I], + ]) + + +def test_BlockMatrix_2x2_inverse_numeric(): + """Test 2x2 block matrix inversion numerically for all 4 formulas""" + M = Matrix([[1, 2], [3, 4]]) + # rank deficient matrices that have full rank when two of them combined + D1 = Matrix([[1, 2], [2, 4]]) + D2 = Matrix([[1, 3], [3, 9]]) + D3 = Matrix([[1, 4], [4, 16]]) + assert D1.rank() == D2.rank() == D3.rank() == 1 + assert (D1 + D2).rank() == (D2 + D3).rank() == (D3 + D1).rank() == 2 + + # Only A is invertible + K = BlockMatrix([[M, D1], [D2, D3]]) + assert block_collapse(K.inv()).as_explicit() == K.as_explicit().inv() + # Only B is invertible + K = BlockMatrix([[D1, M], [D2, D3]]) + assert block_collapse(K.inv()).as_explicit() == K.as_explicit().inv() + # Only C is invertible + K = BlockMatrix([[D1, D2], [M, D3]]) + assert block_collapse(K.inv()).as_explicit() == K.as_explicit().inv() + # Only D is invertible + K = BlockMatrix([[D1, D2], [D3, M]]) + assert block_collapse(K.inv()).as_explicit() == K.as_explicit().inv() + + +@slow +def test_BlockMatrix_3x3_symbolic(): + # Only test one of these, instead of all permutations, because it's slow + rowblocksizes = (n, m, k) + colblocksizes = (m, k, n) + K = BlockMatrix([ + [MatrixSymbol('M%s%s' % (rows, cols), rows, cols) for cols in colblocksizes] + for rows in rowblocksizes + ]) + collapse = block_collapse(K.I) + assert isinstance(collapse, BlockMatrix) + + +def test_BlockDiagMatrix(): + A = MatrixSymbol('A', n, n) + B = MatrixSymbol('B', m, m) + C = MatrixSymbol('C', l, l) + M = MatrixSymbol('M', n + m + l, n + m + l) + + X = BlockDiagMatrix(A, B, C) + Y = BlockDiagMatrix(A, 2*B, 3*C) + + assert X.blocks[1, 1] == B + assert X.shape == (n + m + l, n + m + l) + assert all(X.blocks[i, j].is_ZeroMatrix if i != j else X.blocks[i, j] in [A, B, C] + for i in range(3) for j in range(3)) + assert X.__class__(*X.args) == X + assert X.get_diag_blocks() == (A, B, C) + + assert isinstance(block_collapse(X.I * X), Identity) + + assert bc_matmul(X*X) == BlockDiagMatrix(A*A, B*B, C*C) + assert block_collapse(X*X) == BlockDiagMatrix(A*A, B*B, C*C) + #XXX: should be == ?? + assert block_collapse(X + X).equals(BlockDiagMatrix(2*A, 2*B, 2*C)) + assert block_collapse(X*Y) == BlockDiagMatrix(A*A, 2*B*B, 3*C*C) + assert block_collapse(X + Y) == BlockDiagMatrix(2*A, 3*B, 4*C) + + # Ensure that BlockDiagMatrices can still interact with normal MatrixExprs + assert (X*(2*M)).is_MatMul + assert (X + (2*M)).is_MatAdd + + assert (X._blockmul(M)).is_MatMul + assert (X._blockadd(M)).is_MatAdd + +def test_BlockDiagMatrix_nonsquare(): + A = MatrixSymbol('A', n, m) + B = MatrixSymbol('B', k, l) + X = BlockDiagMatrix(A, B) + assert X.shape == (n + k, m + l) + assert X.shape == (n + k, m + l) + assert X.rowblocksizes == [n, k] + assert X.colblocksizes == [m, l] + C = MatrixSymbol('C', n, m) + D = MatrixSymbol('D', k, l) + Y = BlockDiagMatrix(C, D) + assert block_collapse(X + Y) == BlockDiagMatrix(A + C, B + D) + assert block_collapse(X * Y.T) == BlockDiagMatrix(A * C.T, B * D.T) + raises(NonInvertibleMatrixError, lambda: BlockDiagMatrix(A, C.T).inverse()) + +def test_BlockDiagMatrix_determinant(): + A = MatrixSymbol('A', n, n) + B = MatrixSymbol('B', m, m) + assert det(BlockDiagMatrix()) == 1 + assert det(BlockDiagMatrix(A)) == det(A) + assert det(BlockDiagMatrix(A, B)) == det(A) * det(B) + + # non-square blocks + C = MatrixSymbol('C', m, n) + D = MatrixSymbol('D', n, m) + assert det(BlockDiagMatrix(C, D)) == 0 + +def test_BlockDiagMatrix_trace(): + assert trace(BlockDiagMatrix()) == 0 + assert trace(BlockDiagMatrix(ZeroMatrix(n, n))) == 0 + A = MatrixSymbol('A', n, n) + assert trace(BlockDiagMatrix(A)) == trace(A) + B = MatrixSymbol('B', m, m) + assert trace(BlockDiagMatrix(A, B)) == trace(A) + trace(B) + + # non-square blocks + C = MatrixSymbol('C', m, n) + D = MatrixSymbol('D', n, m) + assert isinstance(trace(BlockDiagMatrix(C, D)), Trace) + +def test_BlockDiagMatrix_transpose(): + A = MatrixSymbol('A', n, m) + B = MatrixSymbol('B', k, l) + assert transpose(BlockDiagMatrix()) == BlockDiagMatrix() + assert transpose(BlockDiagMatrix(A)) == BlockDiagMatrix(A.T) + assert transpose(BlockDiagMatrix(A, B)) == BlockDiagMatrix(A.T, B.T) + +def test_issue_2460(): + bdm1 = BlockDiagMatrix(Matrix([i]), Matrix([j])) + bdm2 = BlockDiagMatrix(Matrix([k]), Matrix([l])) + assert block_collapse(bdm1 + bdm2) == BlockDiagMatrix(Matrix([i + k]), Matrix([j + l])) + +def test_blockcut(): + A = MatrixSymbol('A', n, m) + B = blockcut(A, (n/2, n/2), (m/2, m/2)) + assert B == BlockMatrix([[A[:n/2, :m/2], A[:n/2, m/2:]], + [A[n/2:, :m/2], A[n/2:, m/2:]]]) + + M = ImmutableMatrix(4, 4, range(16)) + B = blockcut(M, (2, 2), (2, 2)) + assert M == ImmutableMatrix(B) + + B = blockcut(M, (1, 3), (2, 2)) + assert ImmutableMatrix(B.blocks[0, 1]) == ImmutableMatrix([[2, 3]]) + +def test_reblock_2x2(): + B = BlockMatrix([[MatrixSymbol('A_%d%d'%(i,j), 2, 2) + for j in range(3)] + for i in range(3)]) + assert B.blocks.shape == (3, 3) + + BB = reblock_2x2(B) + assert BB.blocks.shape == (2, 2) + + assert B.shape == BB.shape + assert B.as_explicit() == BB.as_explicit() + +def test_deblock(): + B = BlockMatrix([[MatrixSymbol('A_%d%d'%(i,j), n, n) + for j in range(4)] + for i in range(4)]) + + assert deblock(reblock_2x2(B)) == B + +def test_block_collapse_type(): + bm1 = BlockDiagMatrix(ImmutableMatrix([1]), ImmutableMatrix([2])) + bm2 = BlockDiagMatrix(ImmutableMatrix([3]), ImmutableMatrix([4])) + + assert bm1.T.__class__ == BlockDiagMatrix + assert block_collapse(bm1 - bm2).__class__ == BlockDiagMatrix + assert block_collapse(Inverse(bm1)).__class__ == BlockDiagMatrix + assert block_collapse(Transpose(bm1)).__class__ == BlockDiagMatrix + assert bc_transpose(Transpose(bm1)).__class__ == BlockDiagMatrix + assert bc_inverse(Inverse(bm1)).__class__ == BlockDiagMatrix + +def test_invalid_block_matrix(): + raises(ValueError, lambda: BlockMatrix([ + [Identity(2), Identity(5)], + ])) + raises(ValueError, lambda: BlockMatrix([ + [Identity(n), Identity(m)], + ])) + raises(ValueError, lambda: BlockMatrix([ + [ZeroMatrix(n, n), ZeroMatrix(n, n)], + [ZeroMatrix(n, n - 1), ZeroMatrix(n, n + 1)], + ])) + raises(ValueError, lambda: BlockMatrix([ + [ZeroMatrix(n - 1, n), ZeroMatrix(n, n)], + [ZeroMatrix(n + 1, n), ZeroMatrix(n, n)], + ])) + +def test_block_lu_decomposition(): + A = MatrixSymbol('A', n, n) + B = MatrixSymbol('B', n, m) + C = MatrixSymbol('C', m, n) + D = MatrixSymbol('D', m, m) + X = BlockMatrix([[A, B], [C, D]]) + + #LDU decomposition + L, D, U = X.LDUdecomposition() + assert block_collapse(L*D*U) == X + + #UDL decomposition + U, D, L = X.UDLdecomposition() + assert block_collapse(U*D*L) == X + + #LU decomposition + L, U = X.LUdecomposition() + assert block_collapse(L*U) == X + +def test_issue_21866(): + n = 10 + I = Identity(n) + O = ZeroMatrix(n, n) + A = BlockMatrix([[ I, O, O, O ], + [ O, I, O, O ], + [ O, O, I, O ], + [ I, O, O, I ]]) + Ainv = block_collapse(A.inv()) + AinvT = BlockMatrix([[ I, O, O, O ], + [ O, I, O, O ], + [ O, O, I, O ], + [ -I, O, O, I ]]) + assert Ainv == AinvT + + +def test_adjoint_and_special_matrices(): + A = Identity(3) + B = OneMatrix(3, 2) + C = ZeroMatrix(2, 3) + D = Identity(2) + X = BlockMatrix([[A, B], [C, D]]) + X2 = BlockMatrix([[A, S.ImaginaryUnit*B], [C, D]]) + assert X.adjoint() == BlockMatrix([[A, ZeroMatrix(3, 2)], [OneMatrix(2, 3), D]]) + assert re(X) == X + assert X2.adjoint() == BlockMatrix([[A, ZeroMatrix(3, 2)], [-S.ImaginaryUnit*OneMatrix(2, 3), D]]) + assert im(X2) == BlockMatrix([[ZeroMatrix(3, 3), OneMatrix(3, 2)], [ZeroMatrix(2, 3), ZeroMatrix(2, 2)]]) + + +def test_block_matrix_derivative(): + x = symbols('x') + A = Matrix(3, 3, [Function(f'a{i}')(x) for i in range(9)]) + bc = BlockMatrix([[A[:2, :2], A[:2, 2]], [A[2, :2], A[2:, 2]]]) + assert Matrix(bc.diff(x)) - A.diff(x) == zeros(3, 3) + + +def test_transpose_inverse_commute(): + n = Symbol('n') + I = Identity(n) + Z = ZeroMatrix(n, n) + A = BlockMatrix([[I, Z], [Z, I]]) + + assert block_collapse(A.transpose().inverse()) == A + assert block_collapse(A.inverse().transpose()) == A + + assert block_collapse(MatPow(A.transpose(), -2)) == MatPow(A, -2) + assert block_collapse(MatPow(A, -2).transpose()) == MatPow(A, -2) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_companion.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_companion.py new file mode 100644 index 0000000000000000000000000000000000000000..edc592c29098eddce0c6352806aa73d5d889e999 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_companion.py @@ -0,0 +1,48 @@ +from sympy.core.expr import unchanged +from sympy.core.symbol import Symbol, symbols +from sympy.matrices.immutable import ImmutableDenseMatrix +from sympy.matrices.expressions.companion import CompanionMatrix +from sympy.polys.polytools import Poly +from sympy.testing.pytest import raises + + +def test_creation(): + x = Symbol('x') + y = Symbol('y') + raises(ValueError, lambda: CompanionMatrix(1)) + raises(ValueError, lambda: CompanionMatrix(Poly([1], x))) + raises(ValueError, lambda: CompanionMatrix(Poly([2, 1], x))) + raises(ValueError, lambda: CompanionMatrix(Poly(x*y, [x, y]))) + assert unchanged(CompanionMatrix, Poly([1, 2, 3], x)) + + +def test_shape(): + c0, c1, c2 = symbols('c0:3') + x = Symbol('x') + assert CompanionMatrix(Poly([1, c0], x)).shape == (1, 1) + assert CompanionMatrix(Poly([1, c1, c0], x)).shape == (2, 2) + assert CompanionMatrix(Poly([1, c2, c1, c0], x)).shape == (3, 3) + + +def test_entry(): + c0, c1, c2 = symbols('c0:3') + x = Symbol('x') + A = CompanionMatrix(Poly([1, c2, c1, c0], x)) + assert A[0, 0] == 0 + assert A[1, 0] == 1 + assert A[1, 1] == 0 + assert A[2, 1] == 1 + assert A[0, 2] == -c0 + assert A[1, 2] == -c1 + assert A[2, 2] == -c2 + + +def test_as_explicit(): + c0, c1, c2 = symbols('c0:3') + x = Symbol('x') + assert CompanionMatrix(Poly([1, c0], x)).as_explicit() == \ + ImmutableDenseMatrix([-c0]) + assert CompanionMatrix(Poly([1, c1, c0], x)).as_explicit() == \ + ImmutableDenseMatrix([[0, -c0], [1, -c1]]) + assert CompanionMatrix(Poly([1, c2, c1, c0], x)).as_explicit() == \ + ImmutableDenseMatrix([[0, 0, -c0], [1, 0, -c1], [0, 1, -c2]]) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_derivatives.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_derivatives.py new file mode 100644 index 0000000000000000000000000000000000000000..77484c994dda62eea9771a76afd8b3caeadacb93 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_derivatives.py @@ -0,0 +1,477 @@ +""" +Some examples have been taken from: + +http://www.math.uwaterloo.ca/~hwolkowi//matrixcookbook.pdf +""" +from sympy import KroneckerProduct +from sympy.combinatorics import Permutation +from sympy.concrete.summations import Sum +from sympy.core.numbers import Rational +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 (cos, sin, tan) +from sympy.functions.special.tensor_functions import KroneckerDelta +from sympy.matrices.expressions.determinant import Determinant +from sympy.matrices.expressions.diagonal import DiagMatrix +from sympy.matrices.expressions.hadamard import (HadamardPower, HadamardProduct, hadamard_product) +from sympy.matrices.expressions.inverse import Inverse +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.matrices.expressions.special import OneMatrix +from sympy.matrices.expressions.trace import Trace +from sympy.matrices.expressions.matadd import MatAdd +from sympy.matrices.expressions.matmul import MatMul +from sympy.matrices.expressions.special import (Identity, ZeroMatrix) +from sympy.tensor.array.array_derivatives import ArrayDerivative +from sympy.matrices.expressions import hadamard_power +from sympy.tensor.array.expressions.array_expressions import ArrayAdd, ArrayTensorProduct, PermuteDims + +i, j, k = symbols("i j k") +m, n = symbols("m n") + +X = MatrixSymbol("X", k, k) +x = MatrixSymbol("x", k, 1) +y = MatrixSymbol("y", k, 1) + +A = MatrixSymbol("A", k, k) +B = MatrixSymbol("B", k, k) +C = MatrixSymbol("C", k, k) +D = MatrixSymbol("D", k, k) + +a = MatrixSymbol("a", k, 1) +b = MatrixSymbol("b", k, 1) +c = MatrixSymbol("c", k, 1) +d = MatrixSymbol("d", k, 1) + + +KDelta = lambda i, j: KroneckerDelta(i, j, (0, k-1)) + + +def _check_derivative_with_explicit_matrix(expr, x, diffexpr, dim=2): + # TODO: this is commented because it slows down the tests. + return + + expr = expr.xreplace({k: dim}) + x = x.xreplace({k: dim}) + diffexpr = diffexpr.xreplace({k: dim}) + + expr = expr.as_explicit() + x = x.as_explicit() + diffexpr = diffexpr.as_explicit() + + assert expr.diff(x).reshape(*diffexpr.shape).tomatrix() == diffexpr + + +def test_matrix_derivative_by_scalar(): + assert A.diff(i) == ZeroMatrix(k, k) + assert (A*(X + B)*c).diff(i) == ZeroMatrix(k, 1) + assert x.diff(i) == ZeroMatrix(k, 1) + assert (x.T*y).diff(i) == ZeroMatrix(1, 1) + assert (x*x.T).diff(i) == ZeroMatrix(k, k) + assert (x + y).diff(i) == ZeroMatrix(k, 1) + assert hadamard_power(x, 2).diff(i) == ZeroMatrix(k, 1) + assert hadamard_power(x, i).diff(i).dummy_eq( + HadamardProduct(x.applyfunc(log), HadamardPower(x, i))) + assert hadamard_product(x, y).diff(i) == ZeroMatrix(k, 1) + assert hadamard_product(i*OneMatrix(k, 1), x, y).diff(i) == hadamard_product(x, y) + assert (i*x).diff(i) == x + assert (sin(i)*A*B*x).diff(i) == cos(i)*A*B*x + assert x.applyfunc(sin).diff(i) == ZeroMatrix(k, 1) + assert Trace(i**2*X).diff(i) == 2*i*Trace(X) + + mu = symbols("mu") + expr = (2*mu*x) + assert expr.diff(x) == 2*mu*Identity(k) + + +def test_one_matrix(): + assert MatMul(x.T, OneMatrix(k, 1)).diff(x) == OneMatrix(k, 1) + + +def test_matrix_derivative_non_matrix_result(): + # This is a 4-dimensional array: + I = Identity(k) + AdA = PermuteDims(ArrayTensorProduct(I, I), Permutation(3)(1, 2)) + assert A.diff(A) == AdA + assert A.T.diff(A) == PermuteDims(ArrayTensorProduct(I, I), Permutation(3)(1, 2, 3)) + assert (2*A).diff(A) == PermuteDims(ArrayTensorProduct(2*I, I), Permutation(3)(1, 2)) + assert MatAdd(A, A).diff(A) == ArrayAdd(AdA, AdA) + assert (A + B).diff(A) == AdA + + +def test_matrix_derivative_trivial_cases(): + # Cookbook example 33: + # TODO: find a way to represent a four-dimensional zero-array: + assert X.diff(A) == ArrayDerivative(X, A) + + +def test_matrix_derivative_with_inverse(): + + # Cookbook example 61: + expr = a.T*Inverse(X)*b + assert expr.diff(X) == -Inverse(X).T*a*b.T*Inverse(X).T + + # Cookbook example 62: + expr = Determinant(Inverse(X)) + # Not implemented yet: + # assert expr.diff(X) == -Determinant(X.inv())*(X.inv()).T + + # Cookbook example 63: + expr = Trace(A*Inverse(X)*B) + assert expr.diff(X) == -(X**(-1)*B*A*X**(-1)).T + + # Cookbook example 64: + expr = Trace(Inverse(X + A)) + assert expr.diff(X) == -(Inverse(X + A)).T**2 + + +def test_matrix_derivative_vectors_and_scalars(): + + assert x.diff(x) == Identity(k) + assert x[i, 0].diff(x[m, 0]).doit() == KDelta(m, i) + + assert x.T.diff(x) == Identity(k) + + # Cookbook example 69: + expr = x.T*a + assert expr.diff(x) == a + assert expr[0, 0].diff(x[m, 0]).doit() == a[m, 0] + expr = a.T*x + assert expr.diff(x) == a + + # Cookbook example 70: + expr = a.T*X*b + assert expr.diff(X) == a*b.T + + # Cookbook example 71: + expr = a.T*X.T*b + assert expr.diff(X) == b*a.T + + # Cookbook example 72: + expr = a.T*X*a + assert expr.diff(X) == a*a.T + expr = a.T*X.T*a + assert expr.diff(X) == a*a.T + + # Cookbook example 77: + expr = b.T*X.T*X*c + assert expr.diff(X) == X*b*c.T + X*c*b.T + + # Cookbook example 78: + expr = (B*x + b).T*C*(D*x + d) + assert expr.diff(x) == B.T*C*(D*x + d) + D.T*C.T*(B*x + b) + + # Cookbook example 81: + expr = x.T*B*x + assert expr.diff(x) == B*x + B.T*x + + # Cookbook example 82: + expr = b.T*X.T*D*X*c + assert expr.diff(X) == D.T*X*b*c.T + D*X*c*b.T + + # Cookbook example 83: + expr = (X*b + c).T*D*(X*b + c) + assert expr.diff(X) == D*(X*b + c)*b.T + D.T*(X*b + c)*b.T + assert str(expr[0, 0].diff(X[m, n]).doit()) == \ + 'b[n, 0]*Sum((c[_i_1, 0] + Sum(X[_i_1, _i_3]*b[_i_3, 0], (_i_3, 0, k - 1)))*D[_i_1, m], (_i_1, 0, k - 1)) + Sum((c[_i_2, 0] + Sum(X[_i_2, _i_4]*b[_i_4, 0], (_i_4, 0, k - 1)))*D[m, _i_2]*b[n, 0], (_i_2, 0, k - 1))' + + # See https://github.com/sympy/sympy/issues/16504#issuecomment-1018339957 + expr = x*x.T*x + I = Identity(k) + assert expr.diff(x) == KroneckerProduct(I, x.T*x) + 2*x*x.T + + +def test_matrix_derivatives_of_traces(): + + expr = Trace(A)*A + I = Identity(k) + assert expr.diff(A) == ArrayAdd(ArrayTensorProduct(I, A), PermuteDims(ArrayTensorProduct(Trace(A)*I, I), Permutation(3)(1, 2))) + assert expr[i, j].diff(A[m, n]).doit() == ( + KDelta(i, m)*KDelta(j, n)*Trace(A) + + KDelta(m, n)*A[i, j] + ) + + ## First order: + + # Cookbook example 99: + expr = Trace(X) + assert expr.diff(X) == Identity(k) + assert expr.rewrite(Sum).diff(X[m, n]).doit() == KDelta(m, n) + + # Cookbook example 100: + expr = Trace(X*A) + assert expr.diff(X) == A.T + assert expr.rewrite(Sum).diff(X[m, n]).doit() == A[n, m] + + # Cookbook example 101: + expr = Trace(A*X*B) + assert expr.diff(X) == A.T*B.T + assert expr.rewrite(Sum).diff(X[m, n]).doit().dummy_eq((A.T*B.T)[m, n]) + + # Cookbook example 102: + expr = Trace(A*X.T*B) + assert expr.diff(X) == B*A + + # Cookbook example 103: + expr = Trace(X.T*A) + assert expr.diff(X) == A + + # Cookbook example 104: + expr = Trace(A*X.T) + assert expr.diff(X) == A + + # Cookbook example 105: + # TODO: TensorProduct is not supported + #expr = Trace(TensorProduct(A, X)) + #assert expr.diff(X) == Trace(A)*Identity(k) + + ## Second order: + + # Cookbook example 106: + expr = Trace(X**2) + assert expr.diff(X) == 2*X.T + + # Cookbook example 107: + expr = Trace(X**2*B) + assert expr.diff(X) == (X*B + B*X).T + expr = Trace(MatMul(X, X, B)) + assert expr.diff(X) == (X*B + B*X).T + + # Cookbook example 108: + expr = Trace(X.T*B*X) + assert expr.diff(X) == B*X + B.T*X + + # Cookbook example 109: + expr = Trace(B*X*X.T) + assert expr.diff(X) == B*X + B.T*X + + # Cookbook example 110: + expr = Trace(X*X.T*B) + assert expr.diff(X) == B*X + B.T*X + + # Cookbook example 111: + expr = Trace(X*B*X.T) + assert expr.diff(X) == X*B.T + X*B + + # Cookbook example 112: + expr = Trace(B*X.T*X) + assert expr.diff(X) == X*B.T + X*B + + # Cookbook example 113: + expr = Trace(X.T*X*B) + assert expr.diff(X) == X*B.T + X*B + + # Cookbook example 114: + expr = Trace(A*X*B*X) + assert expr.diff(X) == A.T*X.T*B.T + B.T*X.T*A.T + + # Cookbook example 115: + expr = Trace(X.T*X) + assert expr.diff(X) == 2*X + expr = Trace(X*X.T) + assert expr.diff(X) == 2*X + + # Cookbook example 116: + expr = Trace(B.T*X.T*C*X*B) + assert expr.diff(X) == C.T*X*B*B.T + C*X*B*B.T + + # Cookbook example 117: + expr = Trace(X.T*B*X*C) + assert expr.diff(X) == B*X*C + B.T*X*C.T + + # Cookbook example 118: + expr = Trace(A*X*B*X.T*C) + assert expr.diff(X) == A.T*C.T*X*B.T + C*A*X*B + + # Cookbook example 119: + expr = Trace((A*X*B + C)*(A*X*B + C).T) + assert expr.diff(X) == 2*A.T*(A*X*B + C)*B.T + + # Cookbook example 120: + # TODO: no support for TensorProduct. + # expr = Trace(TensorProduct(X, X)) + # expr = Trace(X)*Trace(X) + # expr.diff(X) == 2*Trace(X)*Identity(k) + + # Higher Order + + # Cookbook example 121: + expr = Trace(X**k) + #assert expr.diff(X) == k*(X**(k-1)).T + + # Cookbook example 122: + expr = Trace(A*X**k) + #assert expr.diff(X) == # Needs indices + + # Cookbook example 123: + expr = Trace(B.T*X.T*C*X*X.T*C*X*B) + assert expr.diff(X) == C*X*X.T*C*X*B*B.T + C.T*X*B*B.T*X.T*C.T*X + C*X*B*B.T*X.T*C*X + C.T*X*X.T*C.T*X*B*B.T + + # Other + + # Cookbook example 124: + expr = Trace(A*X**(-1)*B) + assert expr.diff(X) == -Inverse(X).T*A.T*B.T*Inverse(X).T + + # Cookbook example 125: + expr = Trace(Inverse(X.T*C*X)*A) + # Warning: result in the cookbook is equivalent if B and C are symmetric: + assert expr.diff(X) == - X.inv().T*A.T*X.inv()*C.inv().T*X.inv().T - X.inv().T*A*X.inv()*C.inv()*X.inv().T + + # Cookbook example 126: + expr = Trace((X.T*C*X).inv()*(X.T*B*X)) + assert expr.diff(X) == -2*C*X*(X.T*C*X).inv()*X.T*B*X*(X.T*C*X).inv() + 2*B*X*(X.T*C*X).inv() + + # Cookbook example 127: + expr = Trace((A + X.T*C*X).inv()*(X.T*B*X)) + # Warning: result in the cookbook is equivalent if B and C are symmetric: + assert expr.diff(X) == B*X*Inverse(A + X.T*C*X) - C*X*Inverse(A + X.T*C*X)*X.T*B*X*Inverse(A + X.T*C*X) - C.T*X*Inverse(A.T + (C*X).T*X)*X.T*B.T*X*Inverse(A.T + (C*X).T*X) + B.T*X*Inverse(A.T + (C*X).T*X) + + +def test_derivatives_of_complicated_matrix_expr(): + expr = a.T*(A*X*(X.T*B + X*A) + B.T*X.T*(a*b.T*(X*D*X.T + X*(X.T*B + A*X)*D*B - X.T*C.T*A)*B + B*(X*D.T + B*A*X*A.T - 3*X*D))*B + 42*X*B*X.T*A.T*(X + X.T))*b + result = (B*(B*A*X*A.T - 3*X*D + X*D.T) + a*b.T*(X*(A*X + X.T*B)*D*B + X*D*X.T - X.T*C.T*A)*B)*B*b*a.T*B.T + B**2*b*a.T*B.T*X.T*a*b.T*X*D + 42*A*X*B.T*X.T*a*b.T + B*D*B**3*b*a.T*B.T*X.T*a*b.T*X + B*b*a.T*A*X + a*b.T*(42*X + 42*X.T)*A*X*B.T + b*a.T*X*B*a*b.T*B.T**2*X*D.T + b*a.T*X*B*a*b.T*B.T**3*D.T*(B.T*X + X.T*A.T) + 42*b*a.T*X*B*X.T*A.T + A.T*(42*X + 42*X.T)*b*a.T*X*B + A.T*B.T**2*X*B*a*b.T*B.T*A + A.T*a*b.T*(A.T*X.T + B.T*X) + A.T*X.T*b*a.T*X*B*a*b.T*B.T**3*D.T + B.T*X*B*a*b.T*B.T*D - 3*B.T*X*B*a*b.T*B.T*D.T - C.T*A*B**2*b*a.T*B.T*X.T*a*b.T + X.T*A.T*a*b.T*A.T + assert expr.diff(X) == result + + +def test_mixed_deriv_mixed_expressions(): + + expr = 3*Trace(A) + assert expr.diff(A) == 3*Identity(k) + + expr = k + deriv = expr.diff(A) + assert isinstance(deriv, ZeroMatrix) + assert deriv == ZeroMatrix(k, k) + + expr = Trace(A)**2 + assert expr.diff(A) == (2*Trace(A))*Identity(k) + + expr = Trace(A)*A + I = Identity(k) + assert expr.diff(A) == ArrayAdd(ArrayTensorProduct(I, A), PermuteDims(ArrayTensorProduct(Trace(A)*I, I), Permutation(3)(1, 2))) + + expr = Trace(Trace(A)*A) + assert expr.diff(A) == (2*Trace(A))*Identity(k) + + expr = Trace(Trace(Trace(A)*A)*A) + assert expr.diff(A) == (3*Trace(A)**2)*Identity(k) + + +def test_derivatives_matrix_norms(): + + expr = x.T*y + assert expr.diff(x) == y + assert expr[0, 0].diff(x[m, 0]).doit() == y[m, 0] + + expr = (x.T*y)**S.Half + assert expr.diff(x) == y/(2*sqrt(x.T*y)) + + expr = (x.T*x)**S.Half + assert expr.diff(x) == x*(x.T*x)**Rational(-1, 2) + + expr = (c.T*a*x.T*b)**S.Half + assert expr.diff(x) == b*a.T*c/sqrt(c.T*a*x.T*b)/2 + + expr = (c.T*a*x.T*b)**Rational(1, 3) + assert expr.diff(x) == b*a.T*c*(c.T*a*x.T*b)**Rational(-2, 3)/3 + + expr = (a.T*X*b)**S.Half + assert expr.diff(X) == a/(2*sqrt(a.T*X*b))*b.T + + expr = d.T*x*(a.T*X*b)**S.Half*y.T*c + assert expr.diff(X) == a/(2*sqrt(a.T*X*b))*x.T*d*y.T*c*b.T + + +def test_derivatives_elementwise_applyfunc(): + + expr = x.applyfunc(tan) + assert expr.diff(x).dummy_eq( + DiagMatrix(x.applyfunc(lambda x: tan(x)**2 + 1))) + assert expr[i, 0].diff(x[m, 0]).doit() == (tan(x[i, 0])**2 + 1)*KDelta(i, m) + _check_derivative_with_explicit_matrix(expr, x, expr.diff(x)) + + expr = (i**2*x).applyfunc(sin) + assert expr.diff(i).dummy_eq( + HadamardProduct((2*i)*x, (i**2*x).applyfunc(cos))) + assert expr[i, 0].diff(i).doit() == 2*i*x[i, 0]*cos(i**2*x[i, 0]) + _check_derivative_with_explicit_matrix(expr, i, expr.diff(i)) + + expr = (log(i)*A*B).applyfunc(sin) + assert expr.diff(i).dummy_eq( + HadamardProduct(A*B/i, (log(i)*A*B).applyfunc(cos))) + _check_derivative_with_explicit_matrix(expr, i, expr.diff(i)) + + expr = A*x.applyfunc(exp) + # TODO: restore this result (currently returning the transpose): + # assert expr.diff(x).dummy_eq(DiagMatrix(x.applyfunc(exp))*A.T) + _check_derivative_with_explicit_matrix(expr, x, expr.diff(x)) + + expr = x.T*A*x + k*y.applyfunc(sin).T*x + assert expr.diff(x).dummy_eq(A.T*x + A*x + k*y.applyfunc(sin)) + _check_derivative_with_explicit_matrix(expr, x, expr.diff(x)) + + expr = x.applyfunc(sin).T*y + # TODO: restore (currently returning the transpose): + # assert expr.diff(x).dummy_eq(DiagMatrix(x.applyfunc(cos))*y) + _check_derivative_with_explicit_matrix(expr, x, expr.diff(x)) + + expr = (a.T * X * b).applyfunc(sin) + assert expr.diff(X).dummy_eq(a*(a.T*X*b).applyfunc(cos)*b.T) + _check_derivative_with_explicit_matrix(expr, X, expr.diff(X)) + + expr = a.T * X.applyfunc(sin) * b + assert expr.diff(X).dummy_eq( + DiagMatrix(a)*X.applyfunc(cos)*DiagMatrix(b)) + _check_derivative_with_explicit_matrix(expr, X, expr.diff(X)) + + expr = a.T * (A*X*B).applyfunc(sin) * b + assert expr.diff(X).dummy_eq( + A.T*DiagMatrix(a)*(A*X*B).applyfunc(cos)*DiagMatrix(b)*B.T) + _check_derivative_with_explicit_matrix(expr, X, expr.diff(X)) + + expr = a.T * (A*X*b).applyfunc(sin) * b.T + # TODO: not implemented + #assert expr.diff(X) == ... + #_check_derivative_with_explicit_matrix(expr, X, expr.diff(X)) + + expr = a.T*A*X.applyfunc(sin)*B*b + assert expr.diff(X).dummy_eq( + HadamardProduct(A.T * a * b.T * B.T, X.applyfunc(cos))) + + expr = a.T * (A*X.applyfunc(sin)*B).applyfunc(log) * b + # TODO: wrong + # assert expr.diff(X) == A.T*DiagMatrix(a)*(A*X.applyfunc(sin)*B).applyfunc(Lambda(k, 1/k))*DiagMatrix(b)*B.T + + expr = a.T * (X.applyfunc(sin)).applyfunc(log) * b + # TODO: wrong + # assert expr.diff(X) == DiagMatrix(a)*X.applyfunc(sin).applyfunc(Lambda(k, 1/k))*DiagMatrix(b) + + +def test_derivatives_of_hadamard_expressions(): + + # Hadamard Product + + expr = hadamard_product(a, x, b) + assert expr.diff(x) == DiagMatrix(hadamard_product(b, a)) + + expr = a.T*hadamard_product(A, X, B)*b + assert expr.diff(X) == HadamardProduct(a*b.T, A, B) + + # Hadamard Power + + expr = hadamard_power(x, 2) + assert expr.diff(x).doit() == 2*DiagMatrix(x) + + expr = hadamard_power(x.T, 2) + assert expr.diff(x).doit() == 2*DiagMatrix(x) + + expr = hadamard_power(x, S.Half) + assert expr.diff(x) == S.Half*DiagMatrix(hadamard_power(x, Rational(-1, 2))) + + expr = hadamard_power(a.T*X*b, 2) + assert expr.diff(X) == 2*a*a.T*X*b*b.T + + expr = hadamard_power(a.T*X*b, S.Half) + assert expr.diff(X) == a/(2*sqrt(a.T*X*b))*b.T diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_determinant.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_determinant.py new file mode 100644 index 0000000000000000000000000000000000000000..d1a66c728f076f8c769d2519ee47c8a9cc90a90e --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_determinant.py @@ -0,0 +1,65 @@ +from sympy.core import S, symbols +from sympy.matrices import eye, ones, Matrix, ShapeError +from sympy.matrices.expressions import ( + Identity, MatrixExpr, MatrixSymbol, Determinant, + det, per, ZeroMatrix, Transpose, + Permanent, MatMul +) +from sympy.matrices.expressions.special import OneMatrix +from sympy.testing.pytest import raises +from sympy.assumptions.ask import Q +from sympy.assumptions.refine import refine + +n = symbols('n', integer=True) +A = MatrixSymbol('A', n, n) +B = MatrixSymbol('B', n, n) +C = MatrixSymbol('C', 3, 4) + + +def test_det(): + assert isinstance(Determinant(A), Determinant) + assert not isinstance(Determinant(A), MatrixExpr) + raises(ShapeError, lambda: Determinant(C)) + assert det(eye(3)) == 1 + assert det(Matrix(3, 3, [1, 3, 2, 4, 1, 3, 2, 5, 2])) == 17 + _ = A / det(A) # Make sure this is possible + + raises(TypeError, lambda: Determinant(S.One)) + + assert Determinant(A).arg is A + + +def test_eval_determinant(): + assert det(Identity(n)) == 1 + assert det(ZeroMatrix(n, n)) == 0 + assert det(OneMatrix(n, n)) == Determinant(OneMatrix(n, n)) + assert det(OneMatrix(1, 1)) == 1 + assert det(OneMatrix(2, 2)) == 0 + assert det(Transpose(A)) == det(A) + assert Determinant(MatMul(eye(2), eye(2))).doit(deep=True) == 1 + + +def test_refine(): + assert refine(det(A), Q.orthogonal(A)) == 1 + assert refine(det(A), Q.singular(A)) == 0 + assert refine(det(A), Q.unit_triangular(A)) == 1 + assert refine(det(A), Q.normal(A)) == det(A) + + +def test_commutative(): + det_a = Determinant(A) + det_b = Determinant(B) + assert det_a.is_commutative + assert det_b.is_commutative + assert det_a * det_b == det_b * det_a + + +def test_permanent(): + assert isinstance(Permanent(A), Permanent) + assert not isinstance(Permanent(A), MatrixExpr) + assert isinstance(Permanent(C), Permanent) + assert Permanent(ones(3, 3)).doit() == 6 + _ = C / per(C) + assert per(Matrix(3, 3, [1, 3, 2, 4, 1, 3, 2, 5, 2])) == 103 + raises(TypeError, lambda: Permanent(S.One)) + assert Permanent(A).arg is A diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_diagonal.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_diagonal.py new file mode 100644 index 0000000000000000000000000000000000000000..3e4f7ea4c178121c33eeb26c09675403d274c1e8 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_diagonal.py @@ -0,0 +1,156 @@ +from sympy.matrices.expressions import MatrixSymbol +from sympy.matrices.expressions.diagonal import DiagonalMatrix, DiagonalOf, DiagMatrix, diagonalize_vector +from sympy.assumptions.ask import (Q, ask) +from sympy.core.symbol import Symbol +from sympy.functions.special.tensor_functions import KroneckerDelta +from sympy.matrices.dense import Matrix +from sympy.matrices.expressions.matmul import MatMul +from sympy.matrices.expressions.special import Identity +from sympy.testing.pytest import raises + + +n = Symbol('n') +m = Symbol('m') + + +def test_DiagonalMatrix(): + x = MatrixSymbol('x', n, m) + D = DiagonalMatrix(x) + assert D.diagonal_length is None + assert D.shape == (n, m) + + x = MatrixSymbol('x', n, n) + D = DiagonalMatrix(x) + assert D.diagonal_length == n + assert D.shape == (n, n) + assert D[1, 2] == 0 + assert D[1, 1] == x[1, 1] + i = Symbol('i') + j = Symbol('j') + x = MatrixSymbol('x', 3, 3) + ij = DiagonalMatrix(x)[i, j] + assert ij != 0 + assert ij.subs({i:0, j:0}) == x[0, 0] + assert ij.subs({i:0, j:1}) == 0 + assert ij.subs({i:1, j:1}) == x[1, 1] + assert ask(Q.diagonal(D)) # affirm that D is diagonal + + x = MatrixSymbol('x', n, 3) + D = DiagonalMatrix(x) + assert D.diagonal_length == 3 + assert D.shape == (n, 3) + assert D[2, m] == KroneckerDelta(2, m)*x[2, m] + assert D[3, m] == 0 + raises(IndexError, lambda: D[m, 3]) + + x = MatrixSymbol('x', 3, n) + D = DiagonalMatrix(x) + assert D.diagonal_length == 3 + assert D.shape == (3, n) + assert D[m, 2] == KroneckerDelta(m, 2)*x[m, 2] + assert D[m, 3] == 0 + raises(IndexError, lambda: D[3, m]) + + x = MatrixSymbol('x', n, m) + D = DiagonalMatrix(x) + assert D.diagonal_length is None + assert D.shape == (n, m) + assert D[m, 4] != 0 + + x = MatrixSymbol('x', 3, 4) + assert [DiagonalMatrix(x)[i] for i in range(12)] == [ + x[0, 0], 0, 0, 0, 0, x[1, 1], 0, 0, 0, 0, x[2, 2], 0] + + # shape is retained, issue 12427 + assert ( + DiagonalMatrix(MatrixSymbol('x', 3, 4))* + DiagonalMatrix(MatrixSymbol('x', 4, 2))).shape == (3, 2) + + +def test_DiagonalOf(): + x = MatrixSymbol('x', n, n) + d = DiagonalOf(x) + assert d.shape == (n, 1) + assert d.diagonal_length == n + assert d[2, 0] == d[2] == x[2, 2] + + x = MatrixSymbol('x', n, m) + d = DiagonalOf(x) + assert d.shape == (None, 1) + assert d.diagonal_length is None + assert d[2, 0] == d[2] == x[2, 2] + + d = DiagonalOf(MatrixSymbol('x', 4, 3)) + assert d.shape == (3, 1) + d = DiagonalOf(MatrixSymbol('x', n, 3)) + assert d.shape == (3, 1) + d = DiagonalOf(MatrixSymbol('x', 3, n)) + assert d.shape == (3, 1) + x = MatrixSymbol('x', n, m) + assert [DiagonalOf(x)[i] for i in range(4)] ==[ + x[0, 0], x[1, 1], x[2, 2], x[3, 3]] + + +def test_DiagMatrix(): + x = MatrixSymbol('x', n, 1) + d = DiagMatrix(x) + assert d.shape == (n, n) + assert d[0, 1] == 0 + assert d[0, 0] == x[0, 0] + + a = MatrixSymbol('a', 1, 1) + d = diagonalize_vector(a) + assert isinstance(d, MatrixSymbol) + assert a == d + assert diagonalize_vector(Identity(3)) == Identity(3) + assert DiagMatrix(Identity(3)).doit() == Identity(3) + assert isinstance(DiagMatrix(Identity(3)), DiagMatrix) + + # A diagonal matrix is equal to its transpose: + assert DiagMatrix(x).T == DiagMatrix(x) + assert diagonalize_vector(x.T) == DiagMatrix(x) + + dx = DiagMatrix(x) + assert dx[0, 0] == x[0, 0] + assert dx[1, 1] == x[1, 0] + assert dx[0, 1] == 0 + assert dx[0, m] == x[0, 0]*KroneckerDelta(0, m) + + z = MatrixSymbol('z', 1, n) + dz = DiagMatrix(z) + assert dz[0, 0] == z[0, 0] + assert dz[1, 1] == z[0, 1] + assert dz[0, 1] == 0 + assert dz[0, m] == z[0, m]*KroneckerDelta(0, m) + + v = MatrixSymbol('v', 3, 1) + dv = DiagMatrix(v) + assert dv.as_explicit() == Matrix([ + [v[0, 0], 0, 0], + [0, v[1, 0], 0], + [0, 0, v[2, 0]], + ]) + + v = MatrixSymbol('v', 1, 3) + dv = DiagMatrix(v) + assert dv.as_explicit() == Matrix([ + [v[0, 0], 0, 0], + [0, v[0, 1], 0], + [0, 0, v[0, 2]], + ]) + + dv = DiagMatrix(3*v) + assert dv.args == (3*v,) + assert dv.doit() == 3*DiagMatrix(v) + assert isinstance(dv.doit(), MatMul) + + a = MatrixSymbol("a", 3, 1).as_explicit() + expr = DiagMatrix(a) + result = Matrix([ + [a[0, 0], 0, 0], + [0, a[1, 0], 0], + [0, 0, a[2, 0]], + ]) + assert expr.doit() == result + expr = DiagMatrix(a.T) + assert expr.doit() == result diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_dotproduct.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_dotproduct.py new file mode 100644 index 0000000000000000000000000000000000000000..abf8ab8e935cbd3039f25f83d3603ac444e5a7bb --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_dotproduct.py @@ -0,0 +1,35 @@ +from sympy.core.expr import unchanged +from sympy.core.mul import Mul +from sympy.matrices import Matrix +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.matrices.expressions.dotproduct import DotProduct +from sympy.testing.pytest import raises + + +A = Matrix(3, 1, [1, 2, 3]) +B = Matrix(3, 1, [1, 3, 5]) +C = Matrix(4, 1, [1, 2, 4, 5]) +D = Matrix(2, 2, [1, 2, 3, 4]) + +def test_docproduct(): + assert DotProduct(A, B).doit() == 22 + assert DotProduct(A.T, B).doit() == 22 + assert DotProduct(A, B.T).doit() == 22 + assert DotProduct(A.T, B.T).doit() == 22 + + raises(TypeError, lambda: DotProduct(1, A)) + raises(TypeError, lambda: DotProduct(A, 1)) + raises(TypeError, lambda: DotProduct(A, D)) + raises(TypeError, lambda: DotProduct(D, A)) + + raises(TypeError, lambda: DotProduct(B, C).doit()) + +def test_dotproduct_symbolic(): + A = MatrixSymbol('A', 3, 1) + B = MatrixSymbol('B', 3, 1) + + dot = DotProduct(A, B) + assert dot.is_scalar == True + assert unchanged(Mul, 2, dot) + # XXX Fix forced evaluation for arithmetics with matrix expressions + assert dot * A == (A[0, 0]*B[0, 0] + A[1, 0]*B[1, 0] + A[2, 0]*B[2, 0])*A diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_factorizations.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_factorizations.py new file mode 100644 index 0000000000000000000000000000000000000000..a0319acabbb7409dfa5c24ceca39e25ff0240618 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_factorizations.py @@ -0,0 +1,29 @@ +from sympy.matrices.expressions.factorizations import lu, LofCholesky, qr, svd +from sympy.assumptions.ask import (Q, ask) +from sympy.core.symbol import Symbol +from sympy.matrices.expressions.matexpr import MatrixSymbol + +n = Symbol('n') +X = MatrixSymbol('X', n, n) + +def test_LU(): + L, U = lu(X) + assert L.shape == U.shape == X.shape + assert ask(Q.lower_triangular(L)) + assert ask(Q.upper_triangular(U)) + +def test_Cholesky(): + LofCholesky(X) + +def test_QR(): + Q_, R = qr(X) + assert Q_.shape == R.shape == X.shape + assert ask(Q.orthogonal(Q_)) + assert ask(Q.upper_triangular(R)) + +def test_svd(): + U, S, V = svd(X) + assert U.shape == S.shape == V.shape == X.shape + assert ask(Q.orthogonal(U)) + assert ask(Q.orthogonal(V)) + assert ask(Q.diagonal(S)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_fourier.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_fourier.py new file mode 100644 index 0000000000000000000000000000000000000000..0230c8a0957ed28fb0a5cc1e9ee77ecae797265b --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_fourier.py @@ -0,0 +1,44 @@ +from sympy.assumptions.ask import (Q, ask) +from sympy.core.numbers import (I, Rational) +from sympy.core.singleton import S +from sympy.functions.elementary.complexes import Abs +from sympy.functions.elementary.exponential import exp +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.simplify.simplify import simplify +from sympy.core.symbol import symbols +from sympy.matrices.expressions.fourier import DFT, IDFT +from sympy.matrices import det, Matrix, Identity +from sympy.testing.pytest import raises + + +def test_dft_creation(): + assert DFT(2) + assert DFT(0) + raises(ValueError, lambda: DFT(-1)) + raises(ValueError, lambda: DFT(2.0)) + raises(ValueError, lambda: DFT(2 + 1j)) + + n = symbols('n') + assert DFT(n) + n = symbols('n', integer=False) + raises(ValueError, lambda: DFT(n)) + n = symbols('n', negative=True) + raises(ValueError, lambda: DFT(n)) + + +def test_dft(): + n, i, j = symbols('n i j') + assert DFT(4).shape == (4, 4) + assert ask(Q.unitary(DFT(4))) + assert Abs(simplify(det(Matrix(DFT(4))))) == 1 + assert DFT(n)*IDFT(n) == Identity(n) + assert DFT(n)[i, j] == exp(-2*S.Pi*I/n)**(i*j) / sqrt(n) + + +def test_dft2(): + assert DFT(1).as_explicit() == Matrix([[1]]) + assert DFT(2).as_explicit() == 1/sqrt(2)*Matrix([[1,1],[1,-1]]) + assert DFT(4).as_explicit() == Matrix([[S.Half, S.Half, S.Half, S.Half], + [S.Half, -I/2, Rational(-1,2), I/2], + [S.Half, Rational(-1,2), S.Half, Rational(-1,2)], + [S.Half, I/2, Rational(-1,2), -I/2]]) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_funcmatrix.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_funcmatrix.py new file mode 100644 index 0000000000000000000000000000000000000000..e4850fe5c739b9390fac6afa10757b5babf821c6 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_funcmatrix.py @@ -0,0 +1,54 @@ +from sympy.core import symbols, Lambda +from sympy.core.sympify import SympifyError +from sympy.functions import KroneckerDelta +from sympy.matrices import Matrix +from sympy.matrices.expressions import FunctionMatrix, MatrixExpr, Identity +from sympy.testing.pytest import raises + + +def test_funcmatrix_creation(): + i, j, k = symbols('i j k') + assert FunctionMatrix(2, 2, Lambda((i, j), 0)) + assert FunctionMatrix(0, 0, Lambda((i, j), 0)) + + raises(ValueError, lambda: FunctionMatrix(-1, 0, Lambda((i, j), 0))) + raises(ValueError, lambda: FunctionMatrix(2.0, 0, Lambda((i, j), 0))) + raises(ValueError, lambda: FunctionMatrix(2j, 0, Lambda((i, j), 0))) + raises(ValueError, lambda: FunctionMatrix(0, -1, Lambda((i, j), 0))) + raises(ValueError, lambda: FunctionMatrix(0, 2.0, Lambda((i, j), 0))) + raises(ValueError, lambda: FunctionMatrix(0, 2j, Lambda((i, j), 0))) + + raises(ValueError, lambda: FunctionMatrix(2, 2, Lambda(i, 0))) + raises(SympifyError, lambda: FunctionMatrix(2, 2, lambda i, j: 0)) + raises(ValueError, lambda: FunctionMatrix(2, 2, Lambda((i,), 0))) + raises(ValueError, lambda: FunctionMatrix(2, 2, Lambda((i, j, k), 0))) + raises(ValueError, lambda: FunctionMatrix(2, 2, i+j)) + assert FunctionMatrix(2, 2, "lambda i, j: 0") == \ + FunctionMatrix(2, 2, Lambda((i, j), 0)) + + m = FunctionMatrix(2, 2, KroneckerDelta) + assert m.as_explicit() == Identity(2).as_explicit() + assert m.args[2].dummy_eq(Lambda((i, j), KroneckerDelta(i, j))) + + n = symbols('n') + assert FunctionMatrix(n, n, Lambda((i, j), 0)) + n = symbols('n', integer=False) + raises(ValueError, lambda: FunctionMatrix(n, n, Lambda((i, j), 0))) + n = symbols('n', negative=True) + raises(ValueError, lambda: FunctionMatrix(n, n, Lambda((i, j), 0))) + + +def test_funcmatrix(): + i, j = symbols('i,j') + X = FunctionMatrix(3, 3, Lambda((i, j), i - j)) + assert X[1, 1] == 0 + assert X[1, 2] == -1 + assert X.shape == (3, 3) + assert X.rows == X.cols == 3 + assert Matrix(X) == Matrix(3, 3, lambda i, j: i - j) + assert isinstance(X*X + X, MatrixExpr) + + +def test_replace_issue(): + X = FunctionMatrix(3, 3, KroneckerDelta) + assert X.replace(lambda x: True, lambda x: x) == X diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_hadamard.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_hadamard.py new file mode 100644 index 0000000000000000000000000000000000000000..800fa830a9b089103d69b372db93ebcea541d02b --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_hadamard.py @@ -0,0 +1,141 @@ +from sympy.matrices.dense import Matrix, eye +from sympy.matrices.exceptions import ShapeError +from sympy.matrices.expressions.matadd import MatAdd +from sympy.matrices.expressions.special import Identity, OneMatrix, ZeroMatrix +from sympy.core import symbols +from sympy.testing.pytest import raises, warns_deprecated_sympy + +from sympy.matrices import MatrixSymbol +from sympy.matrices.expressions import (HadamardProduct, hadamard_product, HadamardPower, hadamard_power) + +n, m, k = symbols('n,m,k') +Z = MatrixSymbol('Z', n, n) +A = MatrixSymbol('A', n, m) +B = MatrixSymbol('B', n, m) +C = MatrixSymbol('C', m, k) + + +def test_HadamardProduct(): + assert HadamardProduct(A, B, A).shape == A.shape + + raises(TypeError, lambda: HadamardProduct(A, n)) + raises(TypeError, lambda: HadamardProduct(A, 1)) + + assert HadamardProduct(A, 2*B, -A)[1, 1] == \ + -2 * A[1, 1] * B[1, 1] * A[1, 1] + + mix = HadamardProduct(Z*A, B)*C + assert mix.shape == (n, k) + + assert set(HadamardProduct(A, B, A).T.args) == {A.T, A.T, B.T} + + +def test_HadamardProduct_isnt_commutative(): + assert HadamardProduct(A, B) != HadamardProduct(B, A) + + +def test_mixed_indexing(): + X = MatrixSymbol('X', 2, 2) + Y = MatrixSymbol('Y', 2, 2) + Z = MatrixSymbol('Z', 2, 2) + + assert (X*HadamardProduct(Y, Z))[0, 0] == \ + X[0, 0]*Y[0, 0]*Z[0, 0] + X[0, 1]*Y[1, 0]*Z[1, 0] + + +def test_canonicalize(): + X = MatrixSymbol('X', 2, 2) + Y = MatrixSymbol('Y', 2, 2) + with warns_deprecated_sympy(): + expr = HadamardProduct(X, check=False) + assert isinstance(expr, HadamardProduct) + expr2 = expr.doit() # unpack is called + assert isinstance(expr2, MatrixSymbol) + Z = ZeroMatrix(2, 2) + U = OneMatrix(2, 2) + assert HadamardProduct(Z, X).doit() == Z + assert HadamardProduct(U, X, X, U).doit() == HadamardPower(X, 2) + assert HadamardProduct(X, U, Y).doit() == HadamardProduct(X, Y) + assert HadamardProduct(X, Z, U, Y).doit() == Z + + +def test_hadamard(): + m, n, p = symbols('m, n, p', integer=True) + A = MatrixSymbol('A', m, n) + B = MatrixSymbol('B', m, n) + X = MatrixSymbol('X', m, m) + I = Identity(m) + + raises(TypeError, lambda: hadamard_product()) + assert hadamard_product(A) == A + assert isinstance(hadamard_product(A, B), HadamardProduct) + assert hadamard_product(A, B).doit() == hadamard_product(A, B) + assert hadamard_product(X, I) == HadamardProduct(I, X) + assert isinstance(hadamard_product(X, I), HadamardProduct) + + a = MatrixSymbol("a", k, 1) + expr = MatAdd(ZeroMatrix(k, 1), OneMatrix(k, 1)) + expr = HadamardProduct(expr, a) + assert expr.doit() == a + + raises(ValueError, lambda: HadamardProduct()) + + +def test_hadamard_product_with_explicit_mat(): + A = MatrixSymbol("A", 3, 3).as_explicit() + B = MatrixSymbol("B", 3, 3).as_explicit() + X = MatrixSymbol("X", 3, 3) + expr = hadamard_product(A, B) + ret = Matrix([i*j for i, j in zip(A, B)]).reshape(3, 3) + assert expr == ret + expr = hadamard_product(A, X, B) + assert expr == HadamardProduct(ret, X) + expr = hadamard_product(eye(3), A) + assert expr == Matrix([[A[0, 0], 0, 0], [0, A[1, 1], 0], [0, 0, A[2, 2]]]) + expr = hadamard_product(eye(3), eye(3)) + assert expr == eye(3) + + +def test_hadamard_power(): + m, n, p = symbols('m, n, p', integer=True) + A = MatrixSymbol('A', m, n) + + assert hadamard_power(A, 1) == A + assert isinstance(hadamard_power(A, 2), HadamardPower) + assert hadamard_power(A, n).T == hadamard_power(A.T, n) + assert hadamard_power(A, n)[0, 0] == A[0, 0]**n + assert hadamard_power(m, n) == m**n + raises(ValueError, lambda: hadamard_power(A, A)) + + +def test_hadamard_power_explicit(): + A = MatrixSymbol('A', 2, 2) + B = MatrixSymbol('B', 2, 2) + a, b = symbols('a b') + + assert HadamardPower(a, b) == a**b + + assert HadamardPower(a, B).as_explicit() == \ + Matrix([ + [a**B[0, 0], a**B[0, 1]], + [a**B[1, 0], a**B[1, 1]]]) + + assert HadamardPower(A, b).as_explicit() == \ + Matrix([ + [A[0, 0]**b, A[0, 1]**b], + [A[1, 0]**b, A[1, 1]**b]]) + + assert HadamardPower(A, B).as_explicit() == \ + Matrix([ + [A[0, 0]**B[0, 0], A[0, 1]**B[0, 1]], + [A[1, 0]**B[1, 0], A[1, 1]**B[1, 1]]]) + + +def test_shape_error(): + A = MatrixSymbol('A', 2, 3) + B = MatrixSymbol('B', 3, 3) + raises(ShapeError, lambda: HadamardProduct(A, B)) + raises(ShapeError, lambda: HadamardPower(A, B)) + A = MatrixSymbol('A', 3, 2) + raises(ShapeError, lambda: HadamardProduct(A, B)) + raises(ShapeError, lambda: HadamardPower(A, B)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_indexing.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_indexing.py new file mode 100644 index 0000000000000000000000000000000000000000..500761f248eef5f627c2a7344a6817aca0b8a802 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_indexing.py @@ -0,0 +1,299 @@ +from sympy.concrete.summations import Sum +from sympy.core.symbol import symbols, Symbol, Dummy +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.special.tensor_functions import KroneckerDelta +from sympy.matrices.dense import eye +from sympy.matrices.expressions.blockmatrix import BlockMatrix +from sympy.matrices.expressions.hadamard import HadamardPower +from sympy.matrices.expressions.matexpr import (MatrixSymbol, + MatrixExpr, MatrixElement) +from sympy.matrices.expressions.matpow import MatPow +from sympy.matrices.expressions.special import (ZeroMatrix, Identity, + OneMatrix) +from sympy.matrices.expressions.trace import Trace, trace +from sympy.matrices.immutable import ImmutableMatrix +from sympy.tensor.array.expressions.array_expressions import ArrayTensorProduct +from sympy.testing.pytest import XFAIL, raises + +k, l, m, n = symbols('k l m n', integer=True) +i, j = symbols('i j', integer=True) + +W = MatrixSymbol('W', k, l) +X = MatrixSymbol('X', l, m) +Y = MatrixSymbol('Y', l, m) +Z = MatrixSymbol('Z', m, n) + +X1 = MatrixSymbol('X1', m, m) +X2 = MatrixSymbol('X2', m, m) +X3 = MatrixSymbol('X3', m, m) +X4 = MatrixSymbol('X4', m, m) + +A = MatrixSymbol('A', 2, 2) +B = MatrixSymbol('B', 2, 2) +x = MatrixSymbol('x', 1, 2) +y = MatrixSymbol('x', 2, 1) + + +def test_symbolic_indexing(): + x12 = X[1, 2] + assert all(s in str(x12) for s in ['1', '2', X.name]) + # We don't care about the exact form of this. We do want to make sure + # that all of these features are present + + +def test_add_index(): + assert (X + Y)[i, j] == X[i, j] + Y[i, j] + + +def test_mul_index(): + assert (A*y)[0, 0] == A[0, 0]*y[0, 0] + A[0, 1]*y[1, 0] + assert (A*B).as_mutable() == (A.as_mutable() * B.as_mutable()) + X = MatrixSymbol('X', n, m) + Y = MatrixSymbol('Y', m, k) + + result = (X*Y)[4,2] + expected = Sum(X[4, i]*Y[i, 2], (i, 0, m - 1)) + assert result.args[0].dummy_eq(expected.args[0], i) + assert result.args[1][1:] == expected.args[1][1:] + + +def test_pow_index(): + Q = MatPow(A, 2) + assert Q[0, 0] == A[0, 0]**2 + A[0, 1]*A[1, 0] + n = symbols("n") + Q2 = A**n + assert Q2[0, 0] == 2*( + -sqrt((A[0, 0] + A[1, 1])**2 - 4*A[0, 0]*A[1, 1] + + 4*A[0, 1]*A[1, 0])/2 + A[0, 0]/2 + A[1, 1]/2 + )**n * \ + A[0, 1]*A[1, 0]/( + (sqrt(A[0, 0]**2 - 2*A[0, 0]*A[1, 1] + 4*A[0, 1]*A[1, 0] + + A[1, 1]**2) + A[0, 0] - A[1, 1])* + sqrt(A[0, 0]**2 - 2*A[0, 0]*A[1, 1] + 4*A[0, 1]*A[1, 0] + A[1, 1]**2) + ) - 2*( + sqrt((A[0, 0] + A[1, 1])**2 - 4*A[0, 0]*A[1, 1] + + 4*A[0, 1]*A[1, 0])/2 + A[0, 0]/2 + A[1, 1]/2 + )**n * A[0, 1]*A[1, 0]/( + (-sqrt(A[0, 0]**2 - 2*A[0, 0]*A[1, 1] + 4*A[0, 1]*A[1, 0] + + A[1, 1]**2) + A[0, 0] - A[1, 1])* + sqrt(A[0, 0]**2 - 2*A[0, 0]*A[1, 1] + 4*A[0, 1]*A[1, 0] + A[1, 1]**2) + ) + + +def test_transpose_index(): + assert X.T[i, j] == X[j, i] + + +def test_Identity_index(): + I = Identity(3) + assert I[0, 0] == I[1, 1] == I[2, 2] == 1 + assert I[1, 0] == I[0, 1] == I[2, 1] == 0 + assert I[i, 0].delta_range == (0, 2) + raises(IndexError, lambda: I[3, 3]) + + +def test_block_index(): + I = Identity(3) + Z = ZeroMatrix(3, 3) + B = BlockMatrix([[I, I], [I, I]]) + e3 = ImmutableMatrix(eye(3)) + BB = BlockMatrix([[e3, e3], [e3, e3]]) + assert B[0, 0] == B[3, 0] == B[0, 3] == B[3, 3] == 1 + assert B[4, 3] == B[5, 1] == 0 + + BB = BlockMatrix([[e3, e3], [e3, e3]]) + assert B.as_explicit() == BB.as_explicit() + + BI = BlockMatrix([[I, Z], [Z, I]]) + + assert BI.as_explicit().equals(eye(6)) + + +def test_block_index_symbolic(): + # Note that these matrices may be zero-sized and indices may be negative, which causes + # all naive simplifications given in the comments to be invalid + A1 = MatrixSymbol('A1', n, k) + A2 = MatrixSymbol('A2', n, l) + A3 = MatrixSymbol('A3', m, k) + A4 = MatrixSymbol('A4', m, l) + A = BlockMatrix([[A1, A2], [A3, A4]]) + assert A[0, 0] == MatrixElement(A, 0, 0) # Cannot be A1[0, 0] + assert A[n - 1, k - 1] == A1[n - 1, k - 1] + assert A[n, k] == A4[0, 0] + assert A[n + m - 1, 0] == MatrixElement(A, n + m - 1, 0) # Cannot be A3[m - 1, 0] + assert A[0, k + l - 1] == MatrixElement(A, 0, k + l - 1) # Cannot be A2[0, l - 1] + assert A[n + m - 1, k + l - 1] == MatrixElement(A, n + m - 1, k + l - 1) # Cannot be A4[m - 1, l - 1] + assert A[i, j] == MatrixElement(A, i, j) + assert A[n + i, k + j] == MatrixElement(A, n + i, k + j) # Cannot be A4[i, j] + assert A[n - i - 1, k - j - 1] == MatrixElement(A, n - i - 1, k - j - 1) # Cannot be A1[n - i - 1, k - j - 1] + + +def test_block_index_symbolic_nonzero(): + # All invalid simplifications from test_block_index_symbolic() that become valid if all + # matrices have nonzero size and all indices are nonnegative + k, l, m, n = symbols('k l m n', integer=True, positive=True) + i, j = symbols('i j', integer=True, nonnegative=True) + A1 = MatrixSymbol('A1', n, k) + A2 = MatrixSymbol('A2', n, l) + A3 = MatrixSymbol('A3', m, k) + A4 = MatrixSymbol('A4', m, l) + A = BlockMatrix([[A1, A2], [A3, A4]]) + assert A[0, 0] == A1[0, 0] + assert A[n + m - 1, 0] == A3[m - 1, 0] + assert A[0, k + l - 1] == A2[0, l - 1] + assert A[n + m - 1, k + l - 1] == A4[m - 1, l - 1] + assert A[i, j] == MatrixElement(A, i, j) + assert A[n + i, k + j] == A4[i, j] + assert A[n - i - 1, k - j - 1] == A1[n - i - 1, k - j - 1] + assert A[2 * n, 2 * k] == A4[n, k] + + +def test_block_index_large(): + n, m, k = symbols('n m k', integer=True, positive=True) + i = symbols('i', integer=True, nonnegative=True) + A1 = MatrixSymbol('A1', n, n) + A2 = MatrixSymbol('A2', n, m) + A3 = MatrixSymbol('A3', n, k) + A4 = MatrixSymbol('A4', m, n) + A5 = MatrixSymbol('A5', m, m) + A6 = MatrixSymbol('A6', m, k) + A7 = MatrixSymbol('A7', k, n) + A8 = MatrixSymbol('A8', k, m) + A9 = MatrixSymbol('A9', k, k) + A = BlockMatrix([[A1, A2, A3], [A4, A5, A6], [A7, A8, A9]]) + assert A[n + i, n + i] == MatrixElement(A, n + i, n + i) + + +@XFAIL +def test_block_index_symbolic_fail(): + # To make this work, symbolic matrix dimensions would need to be somehow assumed nonnegative + # even if the symbols aren't specified as such. Then 2 * n < n would correctly evaluate to + # False in BlockMatrix._entry() + A1 = MatrixSymbol('A1', n, 1) + A2 = MatrixSymbol('A2', m, 1) + A = BlockMatrix([[A1], [A2]]) + assert A[2 * n, 0] == A2[n, 0] + + +def test_slicing(): + A.as_explicit()[0, :] # does not raise an error + + +def test_errors(): + raises(IndexError, lambda: Identity(2)[1, 2, 3, 4, 5]) + raises(IndexError, lambda: Identity(2)[[1, 2, 3, 4, 5]]) + + +def test_matrix_expression_to_indices(): + i, j = symbols("i, j") + i1, i2, i3 = symbols("i_1:4") + + def replace_dummies(expr): + repl = {i: Symbol(i.name) for i in expr.atoms(Dummy)} + return expr.xreplace(repl) + + expr = W*X*Z + assert replace_dummies(expr._entry(i, j)) == \ + Sum(W[i, i1]*X[i1, i2]*Z[i2, j], (i1, 0, l-1), (i2, 0, m-1)) + assert MatrixExpr.from_index_summation(expr._entry(i, j)) == expr + + expr = Z.T*X.T*W.T + assert replace_dummies(expr._entry(i, j)) == \ + Sum(W[j, i2]*X[i2, i1]*Z[i1, i], (i1, 0, m-1), (i2, 0, l-1)) + assert MatrixExpr.from_index_summation(expr._entry(i, j), i) == expr + + expr = W*X*Z + W*Y*Z + assert replace_dummies(expr._entry(i, j)) == \ + Sum(W[i, i1]*X[i1, i2]*Z[i2, j], (i1, 0, l-1), (i2, 0, m-1)) +\ + Sum(W[i, i1]*Y[i1, i2]*Z[i2, j], (i1, 0, l-1), (i2, 0, m-1)) + assert MatrixExpr.from_index_summation(expr._entry(i, j)) == expr + + expr = 2*W*X*Z + 3*W*Y*Z + assert replace_dummies(expr._entry(i, j)) == \ + 2*Sum(W[i, i1]*X[i1, i2]*Z[i2, j], (i1, 0, l-1), (i2, 0, m-1)) +\ + 3*Sum(W[i, i1]*Y[i1, i2]*Z[i2, j], (i1, 0, l-1), (i2, 0, m-1)) + assert MatrixExpr.from_index_summation(expr._entry(i, j)) == expr + + expr = W*(X + Y)*Z + assert replace_dummies(expr._entry(i, j)) == \ + Sum(W[i, i1]*(X[i1, i2] + Y[i1, i2])*Z[i2, j], (i1, 0, l-1), (i2, 0, m-1)) + assert MatrixExpr.from_index_summation(expr._entry(i, j)) == expr + + expr = A*B**2*A + #assert replace_dummies(expr._entry(i, j)) == \ + # Sum(A[i, i1]*B[i1, i2]*B[i2, i3]*A[i3, j], (i1, 0, 1), (i2, 0, 1), (i3, 0, 1)) + + # Check that different dummies are used in sub-multiplications: + expr = (X1*X2 + X2*X1)*X3 + assert replace_dummies(expr._entry(i, j)) == \ + Sum((Sum(X1[i, i2] * X2[i2, i1], (i2, 0, m - 1)) + Sum(X1[i3, i1] * X2[i, i3], (i3, 0, m - 1))) * X3[ + i1, j], (i1, 0, m - 1)) + + +def test_matrix_expression_from_index_summation(): + from sympy.abc import a,b,c,d + A = MatrixSymbol("A", k, k) + B = MatrixSymbol("B", k, k) + C = MatrixSymbol("C", k, k) + w1 = MatrixSymbol("w1", k, 1) + + i0, i1, i2, i3, i4 = symbols("i0:5", cls=Dummy) + + expr = Sum(W[a,b]*X[b,c]*Z[c,d], (b, 0, l-1), (c, 0, m-1)) + assert MatrixExpr.from_index_summation(expr, a) == W*X*Z + expr = Sum(W.T[b,a]*X[b,c]*Z[c,d], (b, 0, l-1), (c, 0, m-1)) + assert MatrixExpr.from_index_summation(expr, a) == W*X*Z + expr = Sum(A[b, a]*B[b, c]*C[c, d], (b, 0, k-1), (c, 0, k-1)) + assert MatrixSymbol.from_index_summation(expr, a) == A.T*B*C + expr = Sum(A[b, a]*B[c, b]*C[c, d], (b, 0, k-1), (c, 0, k-1)) + assert MatrixSymbol.from_index_summation(expr, a) == A.T*B.T*C + expr = Sum(C[c, d]*A[b, a]*B[c, b], (b, 0, k-1), (c, 0, k-1)) + assert MatrixSymbol.from_index_summation(expr, a) == A.T*B.T*C + expr = Sum(A[a, b] + B[a, b], (a, 0, k-1), (b, 0, k-1)) + assert MatrixExpr.from_index_summation(expr, a) == OneMatrix(1, k)*A*OneMatrix(k, 1) + OneMatrix(1, k)*B*OneMatrix(k, 1) + expr = Sum(A[a, b]**2, (a, 0, k - 1), (b, 0, k - 1)) + assert MatrixExpr.from_index_summation(expr, a) == Trace(A * A.T) + expr = Sum(A[a, b]**3, (a, 0, k - 1), (b, 0, k - 1)) + assert MatrixExpr.from_index_summation(expr, a) == Trace(HadamardPower(A.T, 2) * A) + expr = Sum((A[a, b] + B[a, b])*C[b, c], (b, 0, k-1)) + assert MatrixExpr.from_index_summation(expr, a) == (A+B)*C + expr = Sum((A[a, b] + B[b, a])*C[b, c], (b, 0, k-1)) + assert MatrixExpr.from_index_summation(expr, a) == (A+B.T)*C + expr = Sum(A[a, b]*A[b, c]*A[c, d], (b, 0, k-1), (c, 0, k-1)) + assert MatrixExpr.from_index_summation(expr, a) == A**3 + expr = Sum(A[a, b]*A[b, c]*B[c, d], (b, 0, k-1), (c, 0, k-1)) + assert MatrixExpr.from_index_summation(expr, a) == A**2*B + + # Parse the trace of a matrix: + + expr = Sum(A[a, a], (a, 0, k-1)) + assert MatrixExpr.from_index_summation(expr, None) == trace(A) + expr = Sum(A[a, a]*B[b, c]*C[c, d], (a, 0, k-1), (c, 0, k-1)) + assert MatrixExpr.from_index_summation(expr, b) == trace(A)*B*C + + # Check wrong sum ranges (should raise an exception): + + ## Case 1: 0 to m instead of 0 to m-1 + expr = Sum(W[a,b]*X[b,c]*Z[c,d], (b, 0, l-1), (c, 0, m)) + raises(ValueError, lambda: MatrixExpr.from_index_summation(expr, a)) + ## Case 2: 1 to m-1 instead of 0 to m-1 + expr = Sum(W[a,b]*X[b,c]*Z[c,d], (b, 0, l-1), (c, 1, m-1)) + raises(ValueError, lambda: MatrixExpr.from_index_summation(expr, a)) + + # Parse nested sums: + expr = Sum(A[a, b]*Sum(B[b, c]*C[c, d], (c, 0, k-1)), (b, 0, k-1)) + assert MatrixExpr.from_index_summation(expr, a) == A*B*C + + # Test Kronecker delta: + expr = Sum(A[a, b]*KroneckerDelta(b, c)*B[c, d], (b, 0, k-1), (c, 0, k-1)) + assert MatrixExpr.from_index_summation(expr, a) == A*B + + expr = Sum(KroneckerDelta(i1, m)*KroneckerDelta(i2, n)*A[i, i1]*A[j, i2], (i1, 0, k-1), (i2, 0, k-1)) + assert MatrixExpr.from_index_summation(expr, m) == ArrayTensorProduct(A.T, A) + + # Test numbered indices: + expr = Sum(A[i1, i2]*w1[i2, 0], (i2, 0, k-1)) + assert MatrixExpr.from_index_summation(expr, i1) == MatrixElement(A*w1, i1, 0) + + expr = Sum(A[i1, i2]*B[i2, 0], (i2, 0, k-1)) + assert MatrixExpr.from_index_summation(expr, i1) == MatrixElement(A*B, i1, 0) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_inverse.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_inverse.py new file mode 100644 index 0000000000000000000000000000000000000000..4bcc7d4de2b2bee4c4922bda8bc48a52aa205961 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_inverse.py @@ -0,0 +1,69 @@ +from sympy.core import symbols, S +from sympy.matrices.expressions import MatrixSymbol, Inverse, MatPow, ZeroMatrix, OneMatrix +from sympy.matrices.exceptions import NonInvertibleMatrixError, NonSquareMatrixError +from sympy.matrices import eye, Identity +from sympy.testing.pytest import raises +from sympy.assumptions.ask import Q +from sympy.assumptions.refine import refine + +n, m, l = symbols('n m l', integer=True) +A = MatrixSymbol('A', n, m) +B = MatrixSymbol('B', m, l) +C = MatrixSymbol('C', n, n) +D = MatrixSymbol('D', n, n) +E = MatrixSymbol('E', m, n) + + +def test_inverse(): + assert Inverse(C).args == (C, S.NegativeOne) + assert Inverse(C).shape == (n, n) + assert Inverse(A*E).shape == (n, n) + assert Inverse(E*A).shape == (m, m) + assert Inverse(C).inverse() == C + assert Inverse(Inverse(C)).doit() == C + assert isinstance(Inverse(Inverse(C)), Inverse) + + assert Inverse(*Inverse(E*A).args) == Inverse(E*A) + + assert C.inverse().inverse() == C + + assert C.inverse()*C == Identity(C.rows) + + assert Identity(n).inverse() == Identity(n) + assert (3*Identity(n)).inverse() == Identity(n)/3 + + # Simplifies Muls if possible (i.e. submatrices are square) + assert (C*D).inverse() == D.I*C.I + # But still works when not possible + assert isinstance((A*E).inverse(), Inverse) + assert Inverse(C*D).doit(inv_expand=False) == Inverse(C*D) + + assert Inverse(eye(3)).doit() == eye(3) + assert Inverse(eye(3)).doit(deep=False) == eye(3) + + assert OneMatrix(1, 1).I == Identity(1) + assert isinstance(OneMatrix(n, n).I, Inverse) + +def test_inverse_non_invertible(): + raises(NonInvertibleMatrixError, lambda: ZeroMatrix(n, n).I) + raises(NonInvertibleMatrixError, lambda: OneMatrix(2, 2).I) + +def test_refine(): + assert refine(C.I, Q.orthogonal(C)) == C.T + + +def test_inverse_matpow_canonicalization(): + A = MatrixSymbol('A', 3, 3) + assert Inverse(MatPow(A, 3)).doit() == MatPow(Inverse(A), 3).doit() + + +def test_nonsquare_error(): + A = MatrixSymbol('A', 3, 4) + raises(NonSquareMatrixError, lambda: Inverse(A)) + + +def test_adjoint_trnaspose_conjugate(): + A = MatrixSymbol('A', n, n) + assert A.transpose().inverse() == A.inverse().transpose() + assert A.conjugate().inverse() == A.inverse().conjugate() + assert A.adjoint().inverse() == A.inverse().adjoint() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_kronecker.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_kronecker.py new file mode 100644 index 0000000000000000000000000000000000000000..b4444716a76a52e3638dd7a36238a9f459179083 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_kronecker.py @@ -0,0 +1,150 @@ +from sympy.core.mod import Mod +from sympy.core.numbers import I +from sympy.core.symbol import symbols +from sympy.functions.elementary.integers import floor +from sympy.matrices.dense import (Matrix, eye) +from sympy.matrices import MatrixSymbol, Identity +from sympy.matrices.expressions import det, trace + +from sympy.matrices.expressions.kronecker import (KroneckerProduct, + kronecker_product, + combine_kronecker) + + +mat1 = Matrix([[1, 2 * I], [1 + I, 3]]) +mat2 = Matrix([[2 * I, 3], [4 * I, 2]]) + +i, j, k, n, m, o, p, x = symbols('i,j,k,n,m,o,p,x') +Z = MatrixSymbol('Z', n, n) +W = MatrixSymbol('W', m, m) +A = MatrixSymbol('A', n, m) +B = MatrixSymbol('B', n, m) +C = MatrixSymbol('C', m, k) + + +def test_KroneckerProduct(): + assert isinstance(KroneckerProduct(A, B), KroneckerProduct) + assert KroneckerProduct(A, B).subs(A, C) == KroneckerProduct(C, B) + assert KroneckerProduct(A, C).shape == (n*m, m*k) + assert (KroneckerProduct(A, C) + KroneckerProduct(-A, C)).is_ZeroMatrix + assert (KroneckerProduct(W, Z) * KroneckerProduct(W.I, Z.I)).is_Identity + + +def test_KroneckerProduct_identity(): + assert KroneckerProduct(Identity(m), Identity(n)) == Identity(m*n) + assert KroneckerProduct(eye(2), eye(3)) == eye(6) + + +def test_KroneckerProduct_explicit(): + X = MatrixSymbol('X', 2, 2) + Y = MatrixSymbol('Y', 2, 2) + kp = KroneckerProduct(X, Y) + assert kp.shape == (4, 4) + assert kp.as_explicit() == Matrix( + [ + [X[0, 0]*Y[0, 0], X[0, 0]*Y[0, 1], X[0, 1]*Y[0, 0], X[0, 1]*Y[0, 1]], + [X[0, 0]*Y[1, 0], X[0, 0]*Y[1, 1], X[0, 1]*Y[1, 0], X[0, 1]*Y[1, 1]], + [X[1, 0]*Y[0, 0], X[1, 0]*Y[0, 1], X[1, 1]*Y[0, 0], X[1, 1]*Y[0, 1]], + [X[1, 0]*Y[1, 0], X[1, 0]*Y[1, 1], X[1, 1]*Y[1, 0], X[1, 1]*Y[1, 1]] + ] + ) + + +def test_tensor_product_adjoint(): + assert KroneckerProduct(I*A, B).adjoint() == \ + -I*KroneckerProduct(A.adjoint(), B.adjoint()) + assert KroneckerProduct(mat1, mat2).adjoint() == \ + kronecker_product(mat1.adjoint(), mat2.adjoint()) + + +def test_tensor_product_conjugate(): + assert KroneckerProduct(I*A, B).conjugate() == \ + -I*KroneckerProduct(A.conjugate(), B.conjugate()) + assert KroneckerProduct(mat1, mat2).conjugate() == \ + kronecker_product(mat1.conjugate(), mat2.conjugate()) + + +def test_tensor_product_transpose(): + assert KroneckerProduct(I*A, B).transpose() == \ + I*KroneckerProduct(A.transpose(), B.transpose()) + assert KroneckerProduct(mat1, mat2).transpose() == \ + kronecker_product(mat1.transpose(), mat2.transpose()) + + +def test_KroneckerProduct_is_associative(): + assert kronecker_product(A, kronecker_product( + B, C)) == kronecker_product(kronecker_product(A, B), C) + assert kronecker_product(A, kronecker_product( + B, C)) == KroneckerProduct(A, B, C) + + +def test_KroneckerProduct_is_bilinear(): + assert kronecker_product(x*A, B) == x*kronecker_product(A, B) + assert kronecker_product(A, x*B) == x*kronecker_product(A, B) + + +def test_KroneckerProduct_determinant(): + kp = kronecker_product(W, Z) + assert det(kp) == det(W)**n * det(Z)**m + + +def test_KroneckerProduct_trace(): + kp = kronecker_product(W, Z) + assert trace(kp) == trace(W)*trace(Z) + + +def test_KroneckerProduct_isnt_commutative(): + assert KroneckerProduct(A, B) != KroneckerProduct(B, A) + assert KroneckerProduct(A, B).is_commutative is False + + +def test_KroneckerProduct_extracts_commutative_part(): + assert kronecker_product(x * A, 2 * B) == x * \ + 2 * KroneckerProduct(A, B) + + +def test_KroneckerProduct_inverse(): + kp = kronecker_product(W, Z) + assert kp.inverse() == kronecker_product(W.inverse(), Z.inverse()) + + +def test_KroneckerProduct_combine_add(): + kp1 = kronecker_product(A, B) + kp2 = kronecker_product(C, W) + assert combine_kronecker(kp1*kp2) == kronecker_product(A*C, B*W) + + +def test_KroneckerProduct_combine_mul(): + X = MatrixSymbol('X', m, n) + Y = MatrixSymbol('Y', m, n) + kp1 = kronecker_product(A, X) + kp2 = kronecker_product(B, Y) + assert combine_kronecker(kp1+kp2) == kronecker_product(A+B, X+Y) + + +def test_KroneckerProduct_combine_pow(): + X = MatrixSymbol('X', n, n) + Y = MatrixSymbol('Y', n, n) + assert combine_kronecker(KroneckerProduct( + X, Y)**x) == KroneckerProduct(X**x, Y**x) + assert combine_kronecker(x * KroneckerProduct(X, Y) + ** 2) == x * KroneckerProduct(X**2, Y**2) + assert combine_kronecker( + x * (KroneckerProduct(X, Y)**2) * KroneckerProduct(A, B)) == x * KroneckerProduct(X**2 * A, Y**2 * B) + # cannot simplify because of non-square arguments to kronecker product: + assert combine_kronecker(KroneckerProduct(A, B.T) ** m) == KroneckerProduct(A, B.T) ** m + + +def test_KroneckerProduct_expand(): + X = MatrixSymbol('X', n, n) + Y = MatrixSymbol('Y', n, n) + + assert KroneckerProduct(X + Y, Y + Z).expand(kroneckerproduct=True) == \ + KroneckerProduct(X, Y) + KroneckerProduct(X, Z) + \ + KroneckerProduct(Y, Y) + KroneckerProduct(Y, Z) + +def test_KroneckerProduct_entry(): + A = MatrixSymbol('A', n, m) + B = MatrixSymbol('B', o, p) + + assert KroneckerProduct(A, B)._entry(i, j) == A[Mod(floor(i/o), n), Mod(floor(j/p), m)]*B[Mod(i, o), Mod(j, p)] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_matadd.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_matadd.py new file mode 100644 index 0000000000000000000000000000000000000000..43229ae8c2e42f0253a5f3eceefa5fffe7a99f29 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_matadd.py @@ -0,0 +1,58 @@ +from sympy.matrices.expressions import MatrixSymbol, MatAdd, MatPow, MatMul +from sympy.matrices.expressions.special import GenericZeroMatrix, ZeroMatrix +from sympy.matrices.exceptions import ShapeError +from sympy.matrices import eye, ImmutableMatrix +from sympy.core import Add, Basic, S +from sympy.core.add import add +from sympy.testing.pytest import XFAIL, raises + +X = MatrixSymbol('X', 2, 2) +Y = MatrixSymbol('Y', 2, 2) + +def test_evaluate(): + assert MatAdd(X, X, evaluate=True) == add(X, X, evaluate=True) == MatAdd(X, X).doit() + +def test_sort_key(): + assert MatAdd(Y, X).doit().args == add(Y, X).doit().args == (X, Y) + + +def test_matadd_sympify(): + assert isinstance(MatAdd(eye(1), eye(1)).args[0], Basic) + assert isinstance(add(eye(1), eye(1)).args[0], Basic) + + +def test_matadd_of_matrices(): + assert MatAdd(eye(2), 4*eye(2), eye(2)).doit() == ImmutableMatrix(6*eye(2)) + assert add(eye(2), 4*eye(2), eye(2)).doit() == ImmutableMatrix(6*eye(2)) + + +def test_doit_args(): + A = ImmutableMatrix([[1, 2], [3, 4]]) + B = ImmutableMatrix([[2, 3], [4, 5]]) + assert MatAdd(A, MatPow(B, 2)).doit() == A + B**2 + assert MatAdd(A, MatMul(A, B)).doit() == A + A*B + assert (MatAdd(A, X, MatMul(A, B), Y, MatAdd(2*A, B)).doit() == + add(A, X, MatMul(A, B), Y, add(2*A, B)).doit() == + MatAdd(3*A + A*B + B, X, Y)) + + +def test_generic_identity(): + assert MatAdd.identity == GenericZeroMatrix() + assert MatAdd.identity != S.Zero + + +def test_zero_matrix_add(): + assert Add(ZeroMatrix(2, 2), ZeroMatrix(2, 2)) == ZeroMatrix(2, 2) + +@XFAIL +def test_matrix_Add_with_scalar(): + raises(TypeError, lambda: Add(0, ZeroMatrix(2, 2))) + + +def test_shape_error(): + A = MatrixSymbol('A', 2, 3) + B = MatrixSymbol('B', 3, 3) + raises(ShapeError, lambda: MatAdd(A, B)) + + A = MatrixSymbol('A', 3, 2) + raises(ShapeError, lambda: MatAdd(A, B)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_matexpr.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_matexpr.py new file mode 100644 index 0000000000000000000000000000000000000000..f2319e8d8097c2ad3519eab783c4665623c55b80 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_matexpr.py @@ -0,0 +1,592 @@ +from sympy.concrete.summations import Sum +from sympy.core.exprtools import gcd_terms +from sympy.core.function import (diff, expand) +from sympy.core.relational import Eq +from sympy.core.symbol import (Dummy, Symbol, Str) +from sympy.functions.special.tensor_functions import KroneckerDelta +from sympy.matrices.dense import zeros +from sympy.polys.polytools import factor + +from sympy.core import (S, symbols, Add, Mul, SympifyError, Rational, + Function) +from sympy.functions import sin, cos, tan, sqrt, cbrt, exp +from sympy.simplify import simplify +from sympy.matrices import (ImmutableMatrix, Inverse, MatAdd, MatMul, + MatPow, Matrix, MatrixExpr, MatrixSymbol, + SparseMatrix, Transpose, Adjoint, MatrixSet) +from sympy.matrices.exceptions import NonSquareMatrixError +from sympy.matrices.expressions.determinant import Determinant, det +from sympy.matrices.expressions.matexpr import MatrixElement +from sympy.matrices.expressions.special import ZeroMatrix, Identity +from sympy.testing.pytest import raises, XFAIL, skip +from importlib.metadata import version + +n, m, l, k, p = symbols('n m l k p', integer=True) +x = symbols('x') +A = MatrixSymbol('A', n, m) +B = MatrixSymbol('B', m, l) +C = MatrixSymbol('C', n, n) +D = MatrixSymbol('D', n, n) +E = MatrixSymbol('E', m, n) +w = MatrixSymbol('w', n, 1) + + +def test_matrix_symbol_creation(): + assert MatrixSymbol('A', 2, 2) + assert MatrixSymbol('A', 0, 0) + raises(ValueError, lambda: MatrixSymbol('A', -1, 2)) + raises(ValueError, lambda: MatrixSymbol('A', 2.0, 2)) + raises(ValueError, lambda: MatrixSymbol('A', 2j, 2)) + raises(ValueError, lambda: MatrixSymbol('A', 2, -1)) + raises(ValueError, lambda: MatrixSymbol('A', 2, 2.0)) + raises(ValueError, lambda: MatrixSymbol('A', 2, 2j)) + + n = symbols('n') + assert MatrixSymbol('A', n, n) + n = symbols('n', integer=False) + raises(ValueError, lambda: MatrixSymbol('A', n, n)) + n = symbols('n', negative=True) + raises(ValueError, lambda: MatrixSymbol('A', n, n)) + + +def test_matexpr_properties(): + assert A.shape == (n, m) + assert (A * B).shape == (n, l) + assert A[0, 1].indices == (0, 1) + assert A[0, 0].symbol == A + assert A[0, 0].symbol.name == 'A' + + +def test_matexpr(): + assert (x*A).shape == A.shape + assert (x*A).__class__ == MatMul + assert 2*A - A - A == ZeroMatrix(*A.shape) + assert (A*B).shape == (n, l) + + +def test_matexpr_subs(): + A = MatrixSymbol('A', n, m) + B = MatrixSymbol('B', m, l) + C = MatrixSymbol('C', m, l) + + assert A.subs(n, m).shape == (m, m) + assert (A*B).subs(B, C) == A*C + assert (A*B).subs(l, n).is_square + + W = MatrixSymbol("W", 3, 3) + X = MatrixSymbol("X", 2, 2) + Y = MatrixSymbol("Y", 1, 2) + Z = MatrixSymbol("Z", n, 2) + # no restrictions on Symbol replacement + assert X.subs(X, Y) == Y + # it might be better to just change the name + y = Str('y') + assert X.subs(Str("X"), y).args == (y, 2, 2) + # it's ok to introduce a wider matrix + assert X[1, 1].subs(X, W) == W[1, 1] + # but for a given MatrixExpression, only change + # name if indexing on the new shape is valid. + # Here, X is 2,2; Y is 1,2 and Y[1, 1] is out + # of range so an error is raised + raises(IndexError, lambda: X[1, 1].subs(X, Y)) + # here, [0, 1] is in range so the subs succeeds + assert X[0, 1].subs(X, Y) == Y[0, 1] + # and here the size of n will accept any index + # in the first position + assert W[2, 1].subs(W, Z) == Z[2, 1] + # but not in the second position + raises(IndexError, lambda: W[2, 2].subs(W, Z)) + # any matrix should raise if invalid + raises(IndexError, lambda: W[2, 2].subs(W, zeros(2))) + + A = SparseMatrix([[1, 2], [3, 4]]) + B = Matrix([[1, 2], [3, 4]]) + C, D = MatrixSymbol('C', 2, 2), MatrixSymbol('D', 2, 2) + + assert (C*D).subs({C: A, D: B}) == MatMul(A, B) + + +def test_addition(): + A = MatrixSymbol('A', n, m) + B = MatrixSymbol('B', n, m) + + assert isinstance(A + B, MatAdd) + assert (A + B).shape == A.shape + assert isinstance(A - A + 2*B, MatMul) + + raises(TypeError, lambda: A + 1) + raises(TypeError, lambda: 5 + A) + raises(TypeError, lambda: 5 - A) + + assert A + ZeroMatrix(n, m) - A == ZeroMatrix(n, m) + raises(TypeError, lambda: ZeroMatrix(n, m) + S.Zero) + + +def test_multiplication(): + A = MatrixSymbol('A', n, m) + B = MatrixSymbol('B', m, l) + C = MatrixSymbol('C', n, n) + + assert (2*A*B).shape == (n, l) + assert (A*0*B) == ZeroMatrix(n, l) + assert (2*A).shape == A.shape + + assert A * ZeroMatrix(m, m) * B == ZeroMatrix(n, l) + + assert C * Identity(n) * C.I == Identity(n) + + assert B/2 == S.Half*B + raises(NotImplementedError, lambda: 2/B) + + A = MatrixSymbol('A', n, n) + B = MatrixSymbol('B', n, n) + assert Identity(n) * (A + B) == A + B + + assert A**2*A == A**3 + assert A**2*(A.I)**3 == A.I + assert A**3*(A.I)**2 == A + + +def test_MatPow(): + A = MatrixSymbol('A', n, n) + + AA = MatPow(A, 2) + assert AA.exp == 2 + assert AA.base == A + assert (A**n).exp == n + + assert A**0 == Identity(n) + assert A**1 == A + assert A**2 == AA + assert A**-1 == Inverse(A) + assert (A**-1)**-1 == A + assert (A**2)**3 == A**6 + assert A**S.Half == sqrt(A) + assert A**Rational(1, 3) == cbrt(A) + raises(NonSquareMatrixError, lambda: MatrixSymbol('B', 3, 2)**2) + + +def test_MatrixSymbol(): + n, m, t = symbols('n,m,t') + X = MatrixSymbol('X', n, m) + assert X.shape == (n, m) + raises(TypeError, lambda: MatrixSymbol('X', n, m)(t)) # issue 5855 + assert X.doit() == X + + +def test_dense_conversion(): + X = MatrixSymbol('X', 2, 2) + assert ImmutableMatrix(X) == ImmutableMatrix(2, 2, lambda i, j: X[i, j]) + assert Matrix(X) == Matrix(2, 2, lambda i, j: X[i, j]) + + +def test_free_symbols(): + assert (C*D).free_symbols == {C, D} + + +def test_zero_matmul(): + assert isinstance(S.Zero * MatrixSymbol('X', 2, 2), MatrixExpr) + + +def test_matadd_simplify(): + A = MatrixSymbol('A', 1, 1) + assert simplify(MatAdd(A, ImmutableMatrix([[sin(x)**2 + cos(x)**2]]))) == \ + MatAdd(A, Matrix([[1]])) + + +def test_matmul_simplify(): + A = MatrixSymbol('A', 1, 1) + assert simplify(MatMul(A, ImmutableMatrix([[sin(x)**2 + cos(x)**2]]))) == \ + MatMul(A, Matrix([[1]])) + + +def test_invariants(): + A = MatrixSymbol('A', n, m) + B = MatrixSymbol('B', m, l) + X = MatrixSymbol('X', n, n) + objs = [Identity(n), ZeroMatrix(m, n), A, MatMul(A, B), MatAdd(A, A), + Transpose(A), Adjoint(A), Inverse(X), MatPow(X, 2), MatPow(X, -1), + MatPow(X, 0)] + for obj in objs: + assert obj == obj.__class__(*obj.args) + + +def test_matexpr_indexing(): + A = MatrixSymbol('A', n, m) + A[1, 2] + A[l, k] + A[l + 1, k + 1] + A = MatrixSymbol('A', 2, 1) + for i in range(-2, 2): + for j in range(-1, 1): + A[i, j] + + +def test_single_indexing(): + A = MatrixSymbol('A', 2, 3) + assert A[1] == A[0, 1] + assert A[int(1)] == A[0, 1] + assert A[3] == A[1, 0] + assert list(A[:2, :2]) == [A[0, 0], A[0, 1], A[1, 0], A[1, 1]] + raises(IndexError, lambda: A[6]) + raises(IndexError, lambda: A[n]) + B = MatrixSymbol('B', n, m) + raises(IndexError, lambda: B[1]) + B = MatrixSymbol('B', n, 3) + assert B[3] == B[1, 0] + + +def test_MatrixElement_commutative(): + assert A[0, 1]*A[1, 0] == A[1, 0]*A[0, 1] + + +def test_MatrixSymbol_determinant(): + A = MatrixSymbol('A', 4, 4) + assert A.as_explicit().det() == A[0, 0]*A[1, 1]*A[2, 2]*A[3, 3] - \ + A[0, 0]*A[1, 1]*A[2, 3]*A[3, 2] - A[0, 0]*A[1, 2]*A[2, 1]*A[3, 3] + \ + A[0, 0]*A[1, 2]*A[2, 3]*A[3, 1] + A[0, 0]*A[1, 3]*A[2, 1]*A[3, 2] - \ + A[0, 0]*A[1, 3]*A[2, 2]*A[3, 1] - A[0, 1]*A[1, 0]*A[2, 2]*A[3, 3] + \ + A[0, 1]*A[1, 0]*A[2, 3]*A[3, 2] + A[0, 1]*A[1, 2]*A[2, 0]*A[3, 3] - \ + A[0, 1]*A[1, 2]*A[2, 3]*A[3, 0] - A[0, 1]*A[1, 3]*A[2, 0]*A[3, 2] + \ + A[0, 1]*A[1, 3]*A[2, 2]*A[3, 0] + A[0, 2]*A[1, 0]*A[2, 1]*A[3, 3] - \ + A[0, 2]*A[1, 0]*A[2, 3]*A[3, 1] - A[0, 2]*A[1, 1]*A[2, 0]*A[3, 3] + \ + A[0, 2]*A[1, 1]*A[2, 3]*A[3, 0] + A[0, 2]*A[1, 3]*A[2, 0]*A[3, 1] - \ + A[0, 2]*A[1, 3]*A[2, 1]*A[3, 0] - A[0, 3]*A[1, 0]*A[2, 1]*A[3, 2] + \ + A[0, 3]*A[1, 0]*A[2, 2]*A[3, 1] + A[0, 3]*A[1, 1]*A[2, 0]*A[3, 2] - \ + A[0, 3]*A[1, 1]*A[2, 2]*A[3, 0] - A[0, 3]*A[1, 2]*A[2, 0]*A[3, 1] + \ + A[0, 3]*A[1, 2]*A[2, 1]*A[3, 0] + + B = MatrixSymbol('B', 4, 4) + assert Determinant(A + B).doit() == det(A + B) == (A + B).det() + + +def test_MatrixElement_diff(): + assert (A[3, 0]*A[0, 0]).diff(A[0, 0]) == A[3, 0] + + +def test_MatrixElement_doit(): + u = MatrixSymbol('u', 2, 1) + v = ImmutableMatrix([3, 5]) + assert u[0, 0].subs(u, v).doit() == v[0, 0] + + +def test_identity_powers(): + M = Identity(n) + assert MatPow(M, 3).doit() == M**3 + assert M**n == M + assert MatPow(M, 0).doit() == M**2 + assert M**-2 == M + assert MatPow(M, -2).doit() == M**0 + N = Identity(3) + assert MatPow(N, 2).doit() == N**n + assert MatPow(N, 3).doit() == N + assert MatPow(N, -2).doit() == N**4 + assert MatPow(N, 2).doit() == N**0 + + +def test_Zero_power(): + z1 = ZeroMatrix(n, n) + assert z1**4 == z1 + raises(ValueError, lambda:z1**-2) + assert z1**0 == Identity(n) + assert MatPow(z1, 2).doit() == z1**2 + raises(ValueError, lambda:MatPow(z1, -2).doit()) + z2 = ZeroMatrix(3, 3) + assert MatPow(z2, 4).doit() == z2**4 + raises(ValueError, lambda:z2**-3) + assert z2**3 == MatPow(z2, 3).doit() + assert z2**0 == Identity(3) + raises(ValueError, lambda:MatPow(z2, -1).doit()) + + +def test_matrixelement_diff(): + dexpr = diff((D*w)[k,0], w[p,0]) + + assert w[k, p].diff(w[k, p]) == 1 + assert w[k, p].diff(w[0, 0]) == KroneckerDelta(0, k, (0, n-1))*KroneckerDelta(0, p, (0, 0)) + _i_1 = Dummy("_i_1") + assert dexpr.dummy_eq(Sum(KroneckerDelta(_i_1, p, (0, n-1))*D[k, _i_1], (_i_1, 0, n - 1))) + assert dexpr.doit() == D[k, p] + + +def test_MatrixElement_with_values(): + x, y, z, w = symbols("x y z w") + M = Matrix([[x, y], [z, w]]) + i, j = symbols("i, j") + Mij = M[i, j] + assert isinstance(Mij, MatrixElement) + Ms = SparseMatrix([[2, 3], [4, 5]]) + msij = Ms[i, j] + assert isinstance(msij, MatrixElement) + for oi, oj in [(0, 0), (0, 1), (1, 0), (1, 1)]: + assert Mij.subs({i: oi, j: oj}) == M[oi, oj] + assert msij.subs({i: oi, j: oj}) == Ms[oi, oj] + A = MatrixSymbol("A", 2, 2) + assert A[0, 0].subs(A, M) == x + assert A[i, j].subs(A, M) == M[i, j] + assert M[i, j].subs(M, A) == A[i, j] + + assert isinstance(M[3*i - 2, j], MatrixElement) + assert M[3*i - 2, j].subs({i: 1, j: 0}) == M[1, 0] + assert isinstance(M[i, 0], MatrixElement) + assert M[i, 0].subs(i, 0) == M[0, 0] + assert M[0, i].subs(i, 1) == M[0, 1] + + assert M[i, j].diff(x) == Matrix([[1, 0], [0, 0]])[i, j] + + raises(ValueError, lambda: M[i, 2]) + raises(ValueError, lambda: M[i, -1]) + raises(ValueError, lambda: M[2, i]) + raises(ValueError, lambda: M[-1, i]) + + +def test_inv(): + B = MatrixSymbol('B', 3, 3) + assert B.inv() == B**-1 + + # https://github.com/sympy/sympy/issues/19162 + X = MatrixSymbol('X', 1, 1).as_explicit() + assert X.inv() == Matrix([[1/X[0, 0]]]) + + X = MatrixSymbol('X', 2, 2).as_explicit() + detX = X[0, 0]*X[1, 1] - X[0, 1]*X[1, 0] + invX = Matrix([[ X[1, 1], -X[0, 1]], + [-X[1, 0], X[0, 0]]]) / detX + assert X.inv() == invX + + +@XFAIL +def test_factor_expand(): + A = MatrixSymbol("A", n, n) + B = MatrixSymbol("B", n, n) + expr1 = (A + B)*(C + D) + expr2 = A*C + B*C + A*D + B*D + assert expr1 != expr2 + assert expand(expr1) == expr2 + assert factor(expr2) == expr1 + + expr = B**(-1)*(A**(-1)*B**(-1) - A**(-1)*C*B**(-1))**(-1)*A**(-1) + I = Identity(n) + # Ideally we get the first, but we at least don't want a wrong answer + assert factor(expr) in [I - C, B**-1*(A**-1*(I - C)*B**-1)**-1*A**-1] + +def test_numpy_conversion(): + try: + from numpy import array, array_equal + except ImportError: + skip('NumPy must be available to test creating matrices from ndarrays') + A = MatrixSymbol('A', 2, 2) + np_array = array([[MatrixElement(A, 0, 0), MatrixElement(A, 0, 1)], + [MatrixElement(A, 1, 0), MatrixElement(A, 1, 1)]]) + assert array_equal(array(A), np_array) + assert array_equal(array(A, copy=True), np_array) + if(int(version('numpy').split('.')[0]) >= 2): #run this test only if numpy is new enough that copy variable is passed properly. + raises(TypeError, lambda: array(A, copy=False)) + +def test_issue_2749(): + A = MatrixSymbol("A", 5, 2) + assert (A.T * A).I.as_explicit() == Matrix([[(A.T * A).I[0, 0], (A.T * A).I[0, 1]], \ + [(A.T * A).I[1, 0], (A.T * A).I[1, 1]]]) + + +def test_issue_2750(): + x = MatrixSymbol('x', 1, 1) + assert (x.T*x).as_explicit()**-1 == Matrix([[x[0, 0]**(-2)]]) + + +def test_issue_7842(): + A = MatrixSymbol('A', 3, 1) + B = MatrixSymbol('B', 2, 1) + assert Eq(A, B) == False + assert Eq(A[1,0], B[1, 0]).func is Eq + A = ZeroMatrix(2, 3) + B = ZeroMatrix(2, 3) + assert Eq(A, B) == True + + +def test_issue_21195(): + t = symbols('t') + x = Function('x')(t) + dx = x.diff(t) + exp1 = cos(x) + cos(x)*dx + exp2 = sin(x) + tan(x)*(dx.diff(t)) + exp3 = sin(x)*sin(t)*(dx.diff(t)).diff(t) + A = Matrix([[exp1], [exp2], [exp3]]) + B = Matrix([[exp1.diff(x)], [exp2.diff(x)], [exp3.diff(x)]]) + assert A.diff(x) == B + + +def test_issue_24859(): + A = MatrixSymbol('A', 2, 3) + B = MatrixSymbol('B', 3, 2) + J = A*B + Jinv = Matrix(J).adjugate() + u = MatrixSymbol('u', 2, 3) + Jk = Jinv.subs(A, A + x*u) + + expected = B[0, 1]*u[1, 0] + B[1, 1]*u[1, 1] + B[2, 1]*u[1, 2] + assert Jk[0, 0].diff(x) == expected + assert diff(Jk[0, 0], x).doit() == expected + + +def test_MatMul_postprocessor(): + z = zeros(2) + z1 = ZeroMatrix(2, 2) + assert Mul(0, z) == Mul(z, 0) in [z, z1] + + M = Matrix([[1, 2], [3, 4]]) + Mx = Matrix([[x, 2*x], [3*x, 4*x]]) + assert Mul(x, M) == Mul(M, x) == Mx + + A = MatrixSymbol("A", 2, 2) + assert Mul(A, M) == MatMul(A, M) + assert Mul(M, A) == MatMul(M, A) + # Scalars should be absorbed into constant matrices + a = Mul(x, M, A) + b = Mul(M, x, A) + c = Mul(M, A, x) + assert a == b == c == MatMul(Mx, A) + a = Mul(x, A, M) + b = Mul(A, x, M) + c = Mul(A, M, x) + assert a == b == c == MatMul(A, Mx) + assert Mul(M, M) == M**2 + assert Mul(A, M, M) == MatMul(A, M**2) + assert Mul(M, M, A) == MatMul(M**2, A) + assert Mul(M, A, M) == MatMul(M, A, M) + + assert Mul(A, x, M, M, x) == MatMul(A, Mx**2) + + +@XFAIL +def test_MatAdd_postprocessor_xfail(): + # This is difficult to get working because of the way that Add processes + # its args. + z = zeros(2) + assert Add(z, S.NaN) == Add(S.NaN, z) + + +def test_MatAdd_postprocessor(): + # Some of these are nonsensical, but we do not raise errors for Add + # because that breaks algorithms that want to replace matrices with dummy + # symbols. + + z = zeros(2) + + assert Add(0, z) == Add(z, 0) == z + + a = Add(S.Infinity, z) + assert a == Add(z, S.Infinity) + assert isinstance(a, Add) + assert a.args == (S.Infinity, z) + + a = Add(S.ComplexInfinity, z) + assert a == Add(z, S.ComplexInfinity) + assert isinstance(a, Add) + assert a.args == (S.ComplexInfinity, z) + + a = Add(z, S.NaN) + # assert a == Add(S.NaN, z) # See the XFAIL above + assert isinstance(a, Add) + assert a.args == (S.NaN, z) + + M = Matrix([[1, 2], [3, 4]]) + a = Add(x, M) + assert a == Add(M, x) + assert isinstance(a, Add) + assert a.args == (x, M) + + A = MatrixSymbol("A", 2, 2) + assert Add(A, M) == Add(M, A) == A + M + + # Scalars should be absorbed into constant matrices (producing an error) + a = Add(x, M, A) + assert a == Add(M, x, A) == Add(M, A, x) == Add(x, A, M) == Add(A, x, M) == Add(A, M, x) + assert isinstance(a, Add) + assert a.args == (x, A + M) + + assert Add(M, M) == 2*M + assert Add(M, A, M) == Add(M, M, A) == Add(A, M, M) == A + 2*M + + a = Add(A, x, M, M, x) + assert isinstance(a, Add) + assert a.args == (2*x, A + 2*M) + + +def test_simplify_matrix_expressions(): + # Various simplification functions + assert type(gcd_terms(C*D + D*C)) == MatAdd + a = gcd_terms(2*C*D + 4*D*C) + assert type(a) == MatAdd + assert a.args == (2*C*D, 4*D*C) + + +def test_exp(): + A = MatrixSymbol('A', 2, 2) + B = MatrixSymbol('B', 2, 2) + expr1 = exp(A)*exp(B) + expr2 = exp(B)*exp(A) + assert expr1 != expr2 + assert expr1 - expr2 != 0 + assert not isinstance(expr1, exp) + assert not isinstance(expr2, exp) + + +def test_invalid_args(): + raises(SympifyError, lambda: MatrixSymbol(1, 2, 'A')) + + +def test_matrixsymbol_from_symbol(): + # The label should be preserved during doit and subs + A_label = Symbol('A', complex=True) + A = MatrixSymbol(A_label, 2, 2) + + A_1 = A.doit() + A_2 = A.subs(2, 3) + assert A_1.args == A.args + assert A_2.args[0] == A.args[0] + + +def test_as_explicit(): + Z = MatrixSymbol('Z', 2, 3) + assert Z.as_explicit() == ImmutableMatrix([ + [Z[0, 0], Z[0, 1], Z[0, 2]], + [Z[1, 0], Z[1, 1], Z[1, 2]], + ]) + raises(ValueError, lambda: A.as_explicit()) + + +def test_MatrixSet(): + M = MatrixSet(2, 2, set=S.Reals) + assert M.shape == (2, 2) + assert M.set == S.Reals + X = Matrix([[1, 2], [3, 4]]) + assert X in M + X = ZeroMatrix(2, 2) + assert X in M + raises(TypeError, lambda: A in M) + raises(TypeError, lambda: 1 in M) + M = MatrixSet(n, m, set=S.Reals) + assert A in M + raises(TypeError, lambda: C in M) + raises(TypeError, lambda: X in M) + M = MatrixSet(2, 2, set={1, 2, 3}) + X = Matrix([[1, 2], [3, 4]]) + Y = Matrix([[1, 2]]) + assert (X in M) == S.false + assert (Y in M) == S.false + raises(ValueError, lambda: MatrixSet(2, -2, S.Reals)) + raises(ValueError, lambda: MatrixSet(2.4, -1, S.Reals)) + raises(TypeError, lambda: MatrixSet(2, 2, (1, 2, 3))) + + +def test_matrixsymbol_solving(): + A = MatrixSymbol('A', 2, 2) + B = MatrixSymbol('B', 2, 2) + Z = ZeroMatrix(2, 2) + assert -(-A + B) - A + B == Z + assert (-(-A + B) - A + B).simplify() == Z + assert (-(-A + B) - A + B).expand() == Z + assert (-(-A + B) - A + B - Z).simplify() == Z + assert (-(-A + B) - A + B - Z).expand() == Z + assert (A*(A + B) + B*(A.T + B.T)).expand() == A**2 + A*B + B*A.T + B*B.T diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_matmul.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_matmul.py new file mode 100644 index 0000000000000000000000000000000000000000..813926e2c83e27716f4f894ebebd09b2a576f046 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_matmul.py @@ -0,0 +1,193 @@ +from sympy.core import I, symbols, Basic, Mul, S +from sympy.core.mul import mul +from sympy.functions import adjoint, transpose +from sympy.matrices.exceptions import ShapeError +from sympy.matrices import (Identity, Inverse, Matrix, MatrixSymbol, ZeroMatrix, + eye, ImmutableMatrix) +from sympy.matrices.expressions import Adjoint, Transpose, det, MatPow +from sympy.matrices.expressions.special import GenericIdentity +from sympy.matrices.expressions.matmul import (factor_in_front, remove_ids, + MatMul, combine_powers, any_zeros, unpack, only_squares) +from sympy.strategies import null_safe +from sympy.assumptions.ask import Q +from sympy.assumptions.refine import refine +from sympy.core.symbol import Symbol + +from sympy.testing.pytest import XFAIL, raises + +n, m, l, k = symbols('n m l k', integer=True) +x = symbols('x') +A = MatrixSymbol('A', n, m) +B = MatrixSymbol('B', m, l) +C = MatrixSymbol('C', n, n) +D = MatrixSymbol('D', n, n) +E = MatrixSymbol('E', m, n) + +def test_evaluate(): + assert MatMul(C, C, evaluate=True) == MatMul(C, C).doit() + +def test_adjoint(): + assert adjoint(A*B) == Adjoint(B)*Adjoint(A) + assert adjoint(2*A*B) == 2*Adjoint(B)*Adjoint(A) + assert adjoint(2*I*C) == -2*I*Adjoint(C) + + M = Matrix(2, 2, [1, 2 + I, 3, 4]) + MA = Matrix(2, 2, [1, 3, 2 - I, 4]) + assert adjoint(M) == MA + assert adjoint(2*M) == 2*MA + assert adjoint(MatMul(2, M)) == MatMul(2, MA).doit() + + +def test_transpose(): + assert transpose(A*B) == Transpose(B)*Transpose(A) + assert transpose(2*A*B) == 2*Transpose(B)*Transpose(A) + assert transpose(2*I*C) == 2*I*Transpose(C) + + M = Matrix(2, 2, [1, 2 + I, 3, 4]) + MT = Matrix(2, 2, [1, 3, 2 + I, 4]) + assert transpose(M) == MT + assert transpose(2*M) == 2*MT + assert transpose(x*M) == x*MT + assert transpose(MatMul(2, M)) == MatMul(2, MT).doit() + + +def test_factor_in_front(): + assert factor_in_front(MatMul(A, 2, B, evaluate=False)) ==\ + MatMul(2, A, B, evaluate=False) + + +def test_remove_ids(): + assert remove_ids(MatMul(A, Identity(m), B, evaluate=False)) == \ + MatMul(A, B, evaluate=False) + assert null_safe(remove_ids)(MatMul(Identity(n), evaluate=False)) == \ + MatMul(Identity(n), evaluate=False) + + +def test_combine_powers(): + assert combine_powers(MatMul(D, Inverse(D), D, evaluate=False)) == \ + MatMul(Identity(n), D, evaluate=False) + assert combine_powers(MatMul(B.T, Inverse(E*A), E, A, B, evaluate=False)) == \ + MatMul(B.T, Identity(m), B, evaluate=False) + assert combine_powers(MatMul(A, E, Inverse(A*E), D, evaluate=False)) == \ + MatMul(Identity(n), D, evaluate=False) + + +def test_any_zeros(): + assert any_zeros(MatMul(A, ZeroMatrix(m, k), evaluate=False)) == \ + ZeroMatrix(n, k) + + +def test_unpack(): + assert unpack(MatMul(A, evaluate=False)) == A + x = MatMul(A, B) + assert unpack(x) == x + + +def test_only_squares(): + assert only_squares(C) == [C] + assert only_squares(C, D) == [C, D] + assert only_squares(C, A, A.T, D) == [C, A*A.T, D] + + +def test_determinant(): + assert det(2*C) == 2**n*det(C) + assert det(2*C*D) == 2**n*det(C)*det(D) + assert det(3*C*A*A.T*D) == 3**n*det(C)*det(A*A.T)*det(D) + + +def test_doit(): + assert MatMul(C, 2, D).args == (C, 2, D) + assert MatMul(C, 2, D).doit().args == (2, C, D) + assert MatMul(C, Transpose(D*C)).args == (C, Transpose(D*C)) + assert MatMul(C, Transpose(D*C)).doit(deep=True).args == (C, C.T, D.T) + + +def test_doit_drills_down(): + X = ImmutableMatrix([[1, 2], [3, 4]]) + Y = ImmutableMatrix([[2, 3], [4, 5]]) + assert MatMul(X, MatPow(Y, 2)).doit() == X*Y**2 + assert MatMul(C, Transpose(D*C)).doit().args == (C, C.T, D.T) + + +def test_doit_deep_false_still_canonical(): + assert (MatMul(C, Transpose(D*C), 2).doit(deep=False).args == + (2, C, Transpose(D*C))) + + +def test_matmul_scalar_Matrix_doit(): + # Issue 9053 + X = Matrix([[1, 2], [3, 4]]) + assert MatMul(2, X).doit() == 2*X + + +def test_matmul_sympify(): + assert isinstance(MatMul(eye(1), eye(1)).args[0], Basic) + + +def test_collapse_MatrixBase(): + A = Matrix([[1, 1], [1, 1]]) + B = Matrix([[1, 2], [3, 4]]) + assert MatMul(A, B).doit() == ImmutableMatrix([[4, 6], [4, 6]]) + + +def test_refine(): + assert refine(C*C.T*D, Q.orthogonal(C)).doit() == D + + kC = k*C + assert refine(kC*C.T, Q.orthogonal(C)).doit() == k*Identity(n) + assert refine(kC* kC.T, Q.orthogonal(C)).doit() == (k**2)*Identity(n) + +def test_matmul_no_matrices(): + assert MatMul(1) == 1 + assert MatMul(n, m) == n*m + assert not isinstance(MatMul(n, m), MatMul) + +def test_matmul_args_cnc(): + assert MatMul(n, A, A.T).args_cnc() == [[n], [A, A.T]] + assert MatMul(A, A.T).args_cnc() == [[], [A, A.T]] + +@XFAIL +def test_matmul_args_cnc_symbols(): + # Not currently supported + a, b = symbols('a b', commutative=False) + assert MatMul(n, a, b, A, A.T).args_cnc() == [[n], [a, b, A, A.T]] + assert MatMul(n, a, A, b, A.T).args_cnc() == [[n], [a, A, b, A.T]] + +def test_issue_12950(): + M = Matrix([[Symbol("x")]]) * MatrixSymbol("A", 1, 1) + assert MatrixSymbol("A", 1, 1).as_explicit()[0]*Symbol('x') == M.as_explicit()[0] + +def test_construction_with_Mul(): + assert Mul(C, D) == MatMul(C, D) + assert Mul(D, C) == MatMul(D, C) + +def test_construction_with_mul(): + assert mul(C, D) == MatMul(C, D) + assert mul(D, C) == MatMul(D, C) + assert mul(C, D) != MatMul(D, C) + +def test_generic_identity(): + assert MatMul.identity == GenericIdentity() + assert MatMul.identity != S.One + + +def test_issue_23519(): + N = Symbol("N", integer=True) + M1 = MatrixSymbol("M1", N, N) + M2 = MatrixSymbol("M2", N, N) + I = Identity(N) + z = (M2 + 2 * (M2 + I) * M1 + I) + assert z.coeff(M1) == 2*I + 2*M2 + + +def test_shape_error(): + A = MatrixSymbol('A', 2, 2) + B = MatrixSymbol('B', 3, 3) + raises(ShapeError, lambda: MatMul(A, B)) + + +def test_matmul_transpose(): + # https://github.com/sympy/sympy/issues/9503 + M = Matrix(2, 2, [1, 2 + I, 3, 4]) + a = Symbol('a') + assert (MatMul(a, M).T).expand() == (a*Matrix([[1, 3],[2 + I, 4]])).expand() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_matpow.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_matpow.py new file mode 100644 index 0000000000000000000000000000000000000000..2afb5fdc2aa652c321de52aba43db63da60941fd --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_matpow.py @@ -0,0 +1,217 @@ +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.simplify.powsimp import powsimp +from sympy.testing.pytest import raises +from sympy.core.expr import unchanged +from sympy.core import symbols, S +from sympy.matrices import Identity, MatrixSymbol, ImmutableMatrix, ZeroMatrix, OneMatrix, Matrix +from sympy.matrices.exceptions import NonSquareMatrixError +from sympy.matrices.expressions import MatPow, MatAdd, MatMul +from sympy.matrices.expressions.inverse import Inverse +from sympy.matrices.expressions.matexpr import MatrixElement + +n, m, l, k = symbols('n m l k', integer=True) +A = MatrixSymbol('A', n, m) +B = MatrixSymbol('B', m, l) +C = MatrixSymbol('C', n, n) +D = MatrixSymbol('D', n, n) +E = MatrixSymbol('E', m, n) + + +def test_entry_matrix(): + X = ImmutableMatrix([[1, 2], [3, 4]]) + assert MatPow(X, 0)[0, 0] == 1 + assert MatPow(X, 0)[0, 1] == 0 + assert MatPow(X, 1)[0, 0] == 1 + assert MatPow(X, 1)[0, 1] == 2 + assert MatPow(X, 2)[0, 0] == 7 + + +def test_entry_symbol(): + from sympy.concrete import Sum + assert MatPow(C, 0)[0, 0] == 1 + assert MatPow(C, 0)[0, 1] == 0 + assert MatPow(C, 1)[0, 0] == C[0, 0] + assert isinstance(MatPow(C, 2)[0, 0], Sum) + assert isinstance(MatPow(C, n)[0, 0], MatrixElement) + + +def test_as_explicit_symbol(): + X = MatrixSymbol('X', 2, 2) + assert MatPow(X, 0).as_explicit() == ImmutableMatrix(Identity(2)) + assert MatPow(X, 1).as_explicit() == X.as_explicit() + assert MatPow(X, 2).as_explicit() == (X.as_explicit())**2 + assert MatPow(X, n).as_explicit() == ImmutableMatrix([ + [(X ** n)[0, 0], (X ** n)[0, 1]], + [(X ** n)[1, 0], (X ** n)[1, 1]], + ]) + + a = MatrixSymbol("a", 3, 1) + b = MatrixSymbol("b", 3, 1) + c = MatrixSymbol("c", 3, 1) + + expr = (a.T*b)**S.Half + assert expr.as_explicit() == Matrix([[sqrt(a[0, 0]*b[0, 0] + a[1, 0]*b[1, 0] + a[2, 0]*b[2, 0])]]) + + expr = c*(a.T*b)**S.Half + m = sqrt(a[0, 0]*b[0, 0] + a[1, 0]*b[1, 0] + a[2, 0]*b[2, 0]) + assert expr.as_explicit() == Matrix([[c[0, 0]*m], [c[1, 0]*m], [c[2, 0]*m]]) + + expr = (a*b.T)**S.Half + denom = sqrt(a[0, 0]*b[0, 0] + a[1, 0]*b[1, 0] + a[2, 0]*b[2, 0]) + expected = (a*b.T).as_explicit()/denom + assert expr.as_explicit() == expected + + expr = X**-1 + det = X[0, 0]*X[1, 1] - X[1, 0]*X[0, 1] + expected = Matrix([[X[1, 1], -X[0, 1]], [-X[1, 0], X[0, 0]]])/det + assert expr.as_explicit() == expected + + expr = X**m + assert expr.as_explicit() == X.as_explicit()**m + + +def test_as_explicit_matrix(): + A = ImmutableMatrix([[1, 2], [3, 4]]) + assert MatPow(A, 0).as_explicit() == ImmutableMatrix(Identity(2)) + assert MatPow(A, 1).as_explicit() == A + assert MatPow(A, 2).as_explicit() == A**2 + assert MatPow(A, -1).as_explicit() == A.inv() + assert MatPow(A, -2).as_explicit() == (A.inv())**2 + # less expensive than testing on a 2x2 + A = ImmutableMatrix([4]) + assert MatPow(A, S.Half).as_explicit() == A**S.Half + + +def test_doit_symbol(): + assert MatPow(C, 0).doit() == Identity(n) + assert MatPow(C, 1).doit() == C + assert MatPow(C, -1).doit() == C.I + for r in [2, S.Half, S.Pi, n]: + assert MatPow(C, r).doit() == MatPow(C, r) + + +def test_doit_matrix(): + X = ImmutableMatrix([[1, 2], [3, 4]]) + assert MatPow(X, 0).doit() == ImmutableMatrix(Identity(2)) + assert MatPow(X, 1).doit() == X + assert MatPow(X, 2).doit() == X**2 + assert MatPow(X, -1).doit() == X.inv() + assert MatPow(X, -2).doit() == (X.inv())**2 + # less expensive than testing on a 2x2 + assert MatPow(ImmutableMatrix([4]), S.Half).doit() == ImmutableMatrix([2]) + X = ImmutableMatrix([[0, 2], [0, 4]]) # det() == 0 + raises(ValueError, lambda: MatPow(X,-1).doit()) + raises(ValueError, lambda: MatPow(X,-2).doit()) + + +def test_nonsquare(): + A = MatrixSymbol('A', 2, 3) + B = ImmutableMatrix([[1, 2, 3], [4, 5, 6]]) + for r in [-1, 0, 1, 2, S.Half, S.Pi, n]: + raises(NonSquareMatrixError, lambda: MatPow(A, r)) + raises(NonSquareMatrixError, lambda: MatPow(B, r)) + + +def test_doit_equals_pow(): #17179 + X = ImmutableMatrix ([[1,0],[0,1]]) + assert MatPow(X, n).doit() == X**n == X + + +def test_doit_nested_MatrixExpr(): + X = ImmutableMatrix([[1, 2], [3, 4]]) + Y = ImmutableMatrix([[2, 3], [4, 5]]) + assert MatPow(MatMul(X, Y), 2).doit() == (X*Y)**2 + assert MatPow(MatAdd(X, Y), 2).doit() == (X + Y)**2 + + +def test_identity_power(): + k = Identity(n) + assert MatPow(k, 4).doit() == k + assert MatPow(k, n).doit() == k + assert MatPow(k, -3).doit() == k + assert MatPow(k, 0).doit() == k + l = Identity(3) + assert MatPow(l, n).doit() == l + assert MatPow(l, -1).doit() == l + assert MatPow(l, 0).doit() == l + + +def test_zero_power(): + z1 = ZeroMatrix(n, n) + assert MatPow(z1, 3).doit() == z1 + raises(ValueError, lambda:MatPow(z1, -1).doit()) + assert MatPow(z1, 0).doit() == Identity(n) + assert MatPow(z1, n).doit() == z1 + raises(ValueError, lambda:MatPow(z1, -2).doit()) + z2 = ZeroMatrix(4, 4) + assert MatPow(z2, n).doit() == z2 + raises(ValueError, lambda:MatPow(z2, -3).doit()) + assert MatPow(z2, 2).doit() == z2 + assert MatPow(z2, 0).doit() == Identity(4) + raises(ValueError, lambda:MatPow(z2, -1).doit()) + + +def test_OneMatrix_power(): + o = OneMatrix(3, 3) + assert o ** 0 == Identity(3) + assert o ** 1 == o + assert o * o == o ** 2 == 3 * o + assert o * o * o == o ** 3 == 9 * o + + o = OneMatrix(n, n) + assert o * o == o ** 2 == n * o + # powsimp necessary as n ** (n - 2) * n does not produce n ** (n - 1) + assert powsimp(o ** (n - 1) * o) == o ** n == n ** (n - 1) * o + + +def test_transpose_power(): + from sympy.matrices.expressions.transpose import Transpose as TP + + assert (C*D).T**5 == ((C*D)**5).T == (D.T * C.T)**5 + assert ((C*D).T**5).T == (C*D)**5 + + assert (C.T.I.T)**7 == C**-7 + assert (C.T**l).T**k == C**(l*k) + + assert ((E.T * A.T)**5).T == (A*E)**5 + assert ((A*E).T**5).T**7 == (A*E)**35 + assert TP(TP(C**2 * D**3)**5).doit() == (C**2 * D**3)**5 + + assert ((D*C)**-5).T**-5 == ((D*C)**25).T + assert (((D*C)**l).T**k).T == (D*C)**(l*k) + + +def test_Inverse(): + assert Inverse(MatPow(C, 0)).doit() == Identity(n) + assert Inverse(MatPow(C, 1)).doit() == Inverse(C) + assert Inverse(MatPow(C, 2)).doit() == MatPow(C, -2) + assert Inverse(MatPow(C, -1)).doit() == C + + assert MatPow(Inverse(C), 0).doit() == Identity(n) + assert MatPow(Inverse(C), 1).doit() == Inverse(C) + assert MatPow(Inverse(C), 2).doit() == MatPow(C, -2) + assert MatPow(Inverse(C), -1).doit() == C + + +def test_combine_powers(): + assert (C ** 1) ** 1 == C + assert (C ** 2) ** 3 == MatPow(C, 6) + assert (C ** -2) ** -3 == MatPow(C, 6) + assert (C ** -1) ** -1 == C + assert (((C ** 2) ** 3) ** 4) ** 5 == MatPow(C, 120) + assert (C ** n) ** n == C ** (n ** 2) + + +def test_unchanged(): + assert unchanged(MatPow, C, 0) + assert unchanged(MatPow, C, 1) + assert unchanged(MatPow, Inverse(C), -1) + assert unchanged(Inverse, MatPow(C, -1), -1) + assert unchanged(MatPow, MatPow(C, -1), -1) + assert unchanged(MatPow, MatPow(C, 1), 1) + + +def test_no_exponentiation(): + # if this passes, Pow.as_numer_denom should recognize + # MatAdd as exponent + raises(NotImplementedError, lambda: 3**(-2*C)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_permutation.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_permutation.py new file mode 100644 index 0000000000000000000000000000000000000000..41a924f6636afb2e5b6560987e38a0fa0c861f1e --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_permutation.py @@ -0,0 +1,166 @@ +from sympy.combinatorics import Permutation +from sympy.core.expr import unchanged +from sympy.matrices import Matrix +from sympy.matrices.expressions import \ + MatMul, BlockDiagMatrix, Determinant, Inverse +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.matrices.expressions.special import ZeroMatrix, OneMatrix, Identity +from sympy.matrices.expressions.permutation import \ + MatrixPermute, PermutationMatrix +from sympy.testing.pytest import raises +from sympy.core.symbol import Symbol + + +def test_PermutationMatrix_basic(): + p = Permutation([1, 0]) + assert unchanged(PermutationMatrix, p) + raises(ValueError, lambda: PermutationMatrix((0, 1, 2))) + assert PermutationMatrix(p).as_explicit() == Matrix([[0, 1], [1, 0]]) + assert isinstance(PermutationMatrix(p)*MatrixSymbol('A', 2, 2), MatMul) + + +def test_PermutationMatrix_matmul(): + p = Permutation([1, 2, 0]) + P = PermutationMatrix(p) + M = Matrix([[0, 1, 2], [3, 4, 5], [6, 7, 8]]) + assert (P*M).as_explicit() == P.as_explicit()*M + assert (M*P).as_explicit() == M*P.as_explicit() + + P1 = PermutationMatrix(Permutation([1, 2, 0])) + P2 = PermutationMatrix(Permutation([2, 1, 0])) + P3 = PermutationMatrix(Permutation([1, 0, 2])) + assert P1*P2 == P3 + + +def test_PermutationMatrix_matpow(): + p1 = Permutation([1, 2, 0]) + P1 = PermutationMatrix(p1) + p2 = Permutation([2, 0, 1]) + P2 = PermutationMatrix(p2) + assert P1**2 == P2 + assert P1**3 == Identity(3) + + +def test_PermutationMatrix_identity(): + p = Permutation([0, 1]) + assert PermutationMatrix(p).is_Identity + + p = Permutation([1, 0]) + assert not PermutationMatrix(p).is_Identity + + +def test_PermutationMatrix_determinant(): + P = PermutationMatrix(Permutation([0, 1, 2])) + assert Determinant(P).doit() == 1 + P = PermutationMatrix(Permutation([0, 2, 1])) + assert Determinant(P).doit() == -1 + P = PermutationMatrix(Permutation([2, 0, 1])) + assert Determinant(P).doit() == 1 + + +def test_PermutationMatrix_inverse(): + P = PermutationMatrix(Permutation(0, 1, 2)) + assert Inverse(P).doit() == PermutationMatrix(Permutation(0, 2, 1)) + + +def test_PermutationMatrix_rewrite_BlockDiagMatrix(): + P = PermutationMatrix(Permutation([0, 1, 2, 3, 4, 5])) + P0 = PermutationMatrix(Permutation([0])) + assert P.rewrite(BlockDiagMatrix) == \ + BlockDiagMatrix(P0, P0, P0, P0, P0, P0) + + P = PermutationMatrix(Permutation([0, 1, 3, 2, 4, 5])) + P10 = PermutationMatrix(Permutation(0, 1)) + assert P.rewrite(BlockDiagMatrix) == \ + BlockDiagMatrix(P0, P0, P10, P0, P0) + + P = PermutationMatrix(Permutation([1, 0, 3, 2, 5, 4])) + assert P.rewrite(BlockDiagMatrix) == \ + BlockDiagMatrix(P10, P10, P10) + + P = PermutationMatrix(Permutation([0, 4, 3, 2, 1, 5])) + P3210 = PermutationMatrix(Permutation([3, 2, 1, 0])) + assert P.rewrite(BlockDiagMatrix) == \ + BlockDiagMatrix(P0, P3210, P0) + + P = PermutationMatrix(Permutation([0, 4, 2, 3, 1, 5])) + P3120 = PermutationMatrix(Permutation([3, 1, 2, 0])) + assert P.rewrite(BlockDiagMatrix) == \ + BlockDiagMatrix(P0, P3120, P0) + + P = PermutationMatrix(Permutation(0, 3)(1, 4)(2, 5)) + assert P.rewrite(BlockDiagMatrix) == BlockDiagMatrix(P) + + +def test_MartrixPermute_basic(): + p = Permutation(0, 1) + P = PermutationMatrix(p) + A = MatrixSymbol('A', 2, 2) + + raises(ValueError, lambda: MatrixPermute(Symbol('x'), p)) + raises(ValueError, lambda: MatrixPermute(A, Symbol('x'))) + + assert MatrixPermute(A, P) == MatrixPermute(A, p) + raises(ValueError, lambda: MatrixPermute(A, p, 2)) + + pp = Permutation(0, 1, size=3) + assert MatrixPermute(A, pp) == MatrixPermute(A, p) + pp = Permutation(0, 1, 2) + raises(ValueError, lambda: MatrixPermute(A, pp)) + + +def test_MatrixPermute_shape(): + p = Permutation(0, 1) + A = MatrixSymbol('A', 2, 3) + assert MatrixPermute(A, p).shape == (2, 3) + + +def test_MatrixPermute_explicit(): + p = Permutation(0, 1, 2) + A = MatrixSymbol('A', 3, 3) + AA = A.as_explicit() + assert MatrixPermute(A, p, 0).as_explicit() == \ + AA.permute(p, orientation='rows') + assert MatrixPermute(A, p, 1).as_explicit() == \ + AA.permute(p, orientation='cols') + + +def test_MatrixPermute_rewrite_MatMul(): + p = Permutation(0, 1, 2) + A = MatrixSymbol('A', 3, 3) + + assert MatrixPermute(A, p, 0).rewrite(MatMul).as_explicit() == \ + MatrixPermute(A, p, 0).as_explicit() + assert MatrixPermute(A, p, 1).rewrite(MatMul).as_explicit() == \ + MatrixPermute(A, p, 1).as_explicit() + + +def test_MatrixPermute_doit(): + p = Permutation(0, 1, 2) + A = MatrixSymbol('A', 3, 3) + assert MatrixPermute(A, p).doit() == MatrixPermute(A, p) + + p = Permutation(0, size=3) + A = MatrixSymbol('A', 3, 3) + assert MatrixPermute(A, p).doit().as_explicit() == \ + MatrixPermute(A, p).as_explicit() + + p = Permutation(0, 1, 2) + A = Identity(3) + assert MatrixPermute(A, p, 0).doit().as_explicit() == \ + MatrixPermute(A, p, 0).as_explicit() + assert MatrixPermute(A, p, 1).doit().as_explicit() == \ + MatrixPermute(A, p, 1).as_explicit() + + A = ZeroMatrix(3, 3) + assert MatrixPermute(A, p).doit() == A + A = OneMatrix(3, 3) + assert MatrixPermute(A, p).doit() == A + + A = MatrixSymbol('A', 4, 4) + p1 = Permutation(0, 1, 2, 3) + p2 = Permutation(0, 2, 3, 1) + expr = MatrixPermute(MatrixPermute(A, p1, 0), p2, 0) + assert expr.as_explicit() == expr.doit().as_explicit() + expr = MatrixPermute(MatrixPermute(A, p1, 1), p2, 1) + assert expr.as_explicit() == expr.doit().as_explicit() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_sets.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_sets.py new file mode 100644 index 0000000000000000000000000000000000000000..e811c7968c5a22d65f1c99e995aaa7e5e59d15c4 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_sets.py @@ -0,0 +1,42 @@ +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.matrices import Matrix +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.matrices.expressions.sets import MatrixSet +from sympy.matrices.expressions.special import ZeroMatrix +from sympy.testing.pytest import raises +from sympy.sets.sets import SetKind +from sympy.matrices.kind import MatrixKind +from sympy.core.kind import NumberKind + + +def test_MatrixSet(): + n, m = symbols('n m', integer=True) + A = MatrixSymbol('A', n, m) + C = MatrixSymbol('C', n, n) + + M = MatrixSet(2, 2, set=S.Reals) + assert M.shape == (2, 2) + assert M.set == S.Reals + X = Matrix([[1, 2], [3, 4]]) + assert X in M + X = ZeroMatrix(2, 2) + assert X in M + raises(TypeError, lambda: A in M) + raises(TypeError, lambda: 1 in M) + M = MatrixSet(n, m, set=S.Reals) + assert A in M + raises(TypeError, lambda: C in M) + raises(TypeError, lambda: X in M) + M = MatrixSet(2, 2, set={1, 2, 3}) + X = Matrix([[1, 2], [3, 4]]) + Y = Matrix([[1, 2]]) + assert (X in M) == S.false + assert (Y in M) == S.false + raises(ValueError, lambda: MatrixSet(2, -2, S.Reals)) + raises(ValueError, lambda: MatrixSet(2.4, -1, S.Reals)) + raises(TypeError, lambda: MatrixSet(2, 2, (1, 2, 3))) + + +def test_SetKind_MatrixSet(): + assert MatrixSet(2, 2, set=S.Reals).kind is SetKind(MatrixKind(NumberKind)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_slice.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_slice.py new file mode 100644 index 0000000000000000000000000000000000000000..36490719e26908b9e913ed99b7673d602647c492 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_slice.py @@ -0,0 +1,65 @@ +from sympy.matrices.expressions.slice import MatrixSlice +from sympy.matrices.expressions import MatrixSymbol +from sympy.abc import a, b, c, d, k, l, m, n +from sympy.testing.pytest import raises, XFAIL +from sympy.functions.elementary.integers import floor +from sympy.assumptions import assuming, Q + + +X = MatrixSymbol('X', n, m) +Y = MatrixSymbol('Y', m, k) + +def test_shape(): + B = MatrixSlice(X, (a, b), (c, d)) + assert B.shape == (b - a, d - c) + +def test_entry(): + B = MatrixSlice(X, (a, b), (c, d)) + assert B[0,0] == X[a, c] + assert B[k,l] == X[a+k, c+l] + raises(IndexError, lambda : MatrixSlice(X, 1, (2, 5))[1, 0]) + + assert X[1::2, :][1, 3] == X[1+2, 3] + assert X[:, 1::2][3, 1] == X[3, 1+2] + +def test_on_diag(): + assert not MatrixSlice(X, (a, b), (c, d)).on_diag + assert MatrixSlice(X, (a, b), (a, b)).on_diag + +def test_inputs(): + assert MatrixSlice(X, 1, (2, 5)) == MatrixSlice(X, (1, 2), (2, 5)) + assert MatrixSlice(X, 1, (2, 5)).shape == (1, 3) + +def test_slicing(): + assert X[1:5, 2:4] == MatrixSlice(X, (1, 5), (2, 4)) + assert X[1, 2:4] == MatrixSlice(X, 1, (2, 4)) + assert X[1:5, :].shape == (4, X.shape[1]) + assert X[:, 1:5].shape == (X.shape[0], 4) + + assert X[::2, ::2].shape == (floor(n/2), floor(m/2)) + assert X[2, :] == MatrixSlice(X, 2, (0, m)) + assert X[k, :] == MatrixSlice(X, k, (0, m)) + +def test_exceptions(): + X = MatrixSymbol('x', 10, 20) + raises(IndexError, lambda: X[0:12, 2]) + raises(IndexError, lambda: X[0:9, 22]) + raises(IndexError, lambda: X[-1:5, 2]) + +@XFAIL +def test_symmetry(): + X = MatrixSymbol('x', 10, 10) + Y = X[:5, 5:] + with assuming(Q.symmetric(X)): + assert Y.T == X[5:, :5] + +def test_slice_of_slice(): + X = MatrixSymbol('x', 10, 10) + assert X[2, :][:, 3][0, 0] == X[2, 3] + assert X[:5, :5][:4, :4] == X[:4, :4] + assert X[1:5, 2:6][1:3, 2] == X[2:4, 4] + assert X[1:9:2, 2:6][1:3, 2] == X[3:7:2, 4] + +def test_negative_index(): + X = MatrixSymbol('x', 10, 10) + assert X[-1, :] == X[9, :] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_special.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_special.py new file mode 100644 index 0000000000000000000000000000000000000000..beeaf1d76a63673b6622709cda598dfcb295bba4 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_special.py @@ -0,0 +1,228 @@ +from sympy.core.add import Add +from sympy.core.expr import unchanged +from sympy.core.mul import Mul +from sympy.core.symbol import symbols +from sympy.core.relational import Eq +from sympy.concrete.summations import Sum +from sympy.functions.elementary.complexes import im, re +from sympy.functions.elementary.piecewise import Piecewise +from sympy.matrices.immutable import ImmutableDenseMatrix +from sympy.matrices.expressions.matexpr import MatrixSymbol +from sympy.matrices.expressions.matadd import MatAdd +from sympy.matrices.expressions.special import ( + ZeroMatrix, GenericZeroMatrix, Identity, GenericIdentity, OneMatrix) +from sympy.matrices.expressions.matmul import MatMul +from sympy.testing.pytest import raises + + +def test_zero_matrix_creation(): + assert unchanged(ZeroMatrix, 2, 2) + assert unchanged(ZeroMatrix, 0, 0) + raises(ValueError, lambda: ZeroMatrix(-1, 2)) + raises(ValueError, lambda: ZeroMatrix(2.0, 2)) + raises(ValueError, lambda: ZeroMatrix(2j, 2)) + raises(ValueError, lambda: ZeroMatrix(2, -1)) + raises(ValueError, lambda: ZeroMatrix(2, 2.0)) + raises(ValueError, lambda: ZeroMatrix(2, 2j)) + + n = symbols('n') + assert unchanged(ZeroMatrix, n, n) + n = symbols('n', integer=False) + raises(ValueError, lambda: ZeroMatrix(n, n)) + n = symbols('n', negative=True) + raises(ValueError, lambda: ZeroMatrix(n, n)) + + +def test_generic_zero_matrix(): + z = GenericZeroMatrix() + n = symbols('n', integer=True) + A = MatrixSymbol("A", n, n) + + assert z == z + assert z != A + assert A != z + + assert z.is_ZeroMatrix + + raises(TypeError, lambda: z.shape) + raises(TypeError, lambda: z.rows) + raises(TypeError, lambda: z.cols) + + assert MatAdd() == z + assert MatAdd(z, A) == MatAdd(A) + # Make sure it is hashable + hash(z) + + +def test_identity_matrix_creation(): + assert Identity(2) + assert Identity(0) + raises(ValueError, lambda: Identity(-1)) + raises(ValueError, lambda: Identity(2.0)) + raises(ValueError, lambda: Identity(2j)) + + n = symbols('n') + assert Identity(n) + n = symbols('n', integer=False) + raises(ValueError, lambda: Identity(n)) + n = symbols('n', negative=True) + raises(ValueError, lambda: Identity(n)) + + +def test_generic_identity(): + I = GenericIdentity() + n = symbols('n', integer=True) + A = MatrixSymbol("A", n, n) + + assert I == I + assert I != A + assert A != I + + assert I.is_Identity + assert I**-1 == I + + raises(TypeError, lambda: I.shape) + raises(TypeError, lambda: I.rows) + raises(TypeError, lambda: I.cols) + + assert MatMul() == I + assert MatMul(I, A) == MatMul(A) + # Make sure it is hashable + hash(I) + + +def test_one_matrix_creation(): + assert OneMatrix(2, 2) + assert OneMatrix(0, 0) + assert Eq(OneMatrix(1, 1), Identity(1)) + raises(ValueError, lambda: OneMatrix(-1, 2)) + raises(ValueError, lambda: OneMatrix(2.0, 2)) + raises(ValueError, lambda: OneMatrix(2j, 2)) + raises(ValueError, lambda: OneMatrix(2, -1)) + raises(ValueError, lambda: OneMatrix(2, 2.0)) + raises(ValueError, lambda: OneMatrix(2, 2j)) + + n = symbols('n') + assert OneMatrix(n, n) + n = symbols('n', integer=False) + raises(ValueError, lambda: OneMatrix(n, n)) + n = symbols('n', negative=True) + raises(ValueError, lambda: OneMatrix(n, n)) + + +def test_ZeroMatrix(): + n, m = symbols('n m', integer=True) + A = MatrixSymbol('A', n, m) + Z = ZeroMatrix(n, m) + + assert A + Z == A + assert A*Z.T == ZeroMatrix(n, n) + assert Z*A.T == ZeroMatrix(n, n) + assert A - A == ZeroMatrix(*A.shape) + + assert Z + + assert Z.transpose() == ZeroMatrix(m, n) + assert Z.conjugate() == Z + assert Z.adjoint() == ZeroMatrix(m, n) + assert re(Z) == Z + assert im(Z) == Z + + assert ZeroMatrix(n, n)**0 == Identity(n) + assert ZeroMatrix(3, 3).as_explicit() == ImmutableDenseMatrix.zeros(3, 3) + + +def test_ZeroMatrix_doit(): + n = symbols('n', integer=True) + Znn = ZeroMatrix(Add(n, n, evaluate=False), n) + assert isinstance(Znn.rows, Add) + assert Znn.doit() == ZeroMatrix(2*n, n) + assert isinstance(Znn.doit().rows, Mul) + + +def test_OneMatrix(): + n, m = symbols('n m', integer=True) + A = MatrixSymbol('A', n, m) + U = OneMatrix(n, m) + + assert U.shape == (n, m) + assert isinstance(A + U, Add) + assert U.transpose() == OneMatrix(m, n) + assert U.conjugate() == U + assert U.adjoint() == OneMatrix(m, n) + assert re(U) == U + assert im(U) == ZeroMatrix(n, m) + + assert OneMatrix(n, n) ** 0 == Identity(n) + + U = OneMatrix(n, n) + assert U[1, 2] == 1 + + U = OneMatrix(2, 3) + assert U.as_explicit() == ImmutableDenseMatrix.ones(2, 3) + + +def test_OneMatrix_doit(): + n = symbols('n', integer=True) + Unn = OneMatrix(Add(n, n, evaluate=False), n) + assert isinstance(Unn.rows, Add) + assert Unn.doit() == OneMatrix(2 * n, n) + assert isinstance(Unn.doit().rows, Mul) + + +def test_OneMatrix_mul(): + n, m, k = symbols('n m k', integer=True) + w = MatrixSymbol('w', n, 1) + assert OneMatrix(n, m) * OneMatrix(m, k) == OneMatrix(n, k) * m + assert w * OneMatrix(1, 1) == w + assert OneMatrix(1, 1) * w.T == w.T + + +def test_Identity(): + n, m = symbols('n m', integer=True) + A = MatrixSymbol('A', n, m) + i, j = symbols('i j') + + In = Identity(n) + Im = Identity(m) + + assert A*Im == A + assert In*A == A + + assert In.transpose() == In + assert In.inverse() == In + assert In.conjugate() == In + assert In.adjoint() == In + assert re(In) == In + assert im(In) == ZeroMatrix(n, n) + + assert In[i, j] != 0 + assert Sum(In[i, j], (i, 0, n-1), (j, 0, n-1)).subs(n,3).doit() == 3 + assert Sum(Sum(In[i, j], (i, 0, n-1)), (j, 0, n-1)).subs(n,3).doit() == 3 + + # If range exceeds the limit `(0, n-1)`, do not remove `Piecewise`: + expr = Sum(In[i, j], (i, 0, n-1)) + assert expr.doit() == 1 + expr = Sum(In[i, j], (i, 0, n-2)) + assert expr.doit().dummy_eq( + Piecewise( + (1, (j >= 0) & (j <= n-2)), + (0, True) + ) + ) + expr = Sum(In[i, j], (i, 1, n-1)) + assert expr.doit().dummy_eq( + Piecewise( + (1, (j >= 1) & (j <= n-1)), + (0, True) + ) + ) + assert Identity(3).as_explicit() == ImmutableDenseMatrix.eye(3) + + +def test_Identity_doit(): + n = symbols('n', integer=True) + Inn = Identity(Add(n, n, evaluate=False)) + assert isinstance(Inn.rows, Add) + assert Inn.doit() == Identity(2*n) + assert isinstance(Inn.doit().rows, Mul) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_trace.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_trace.py new file mode 100644 index 0000000000000000000000000000000000000000..3bd66bec2377dae634ff486f42cc474eda7b23b1 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_trace.py @@ -0,0 +1,116 @@ +from sympy.core import Lambda, S, symbols +from sympy.concrete import Sum +from sympy.functions import adjoint, conjugate, transpose +from sympy.matrices import eye, Matrix, ShapeError, ImmutableMatrix +from sympy.matrices.expressions import ( + Adjoint, Identity, FunctionMatrix, MatrixExpr, MatrixSymbol, Trace, + ZeroMatrix, trace, MatPow, MatAdd, MatMul +) +from sympy.matrices.expressions.special import OneMatrix +from sympy.testing.pytest import raises +from sympy.abc import i + + +n = symbols('n', integer=True) +A = MatrixSymbol('A', n, n) +B = MatrixSymbol('B', n, n) +C = MatrixSymbol('C', 3, 4) + + +def test_Trace(): + assert isinstance(Trace(A), Trace) + assert not isinstance(Trace(A), MatrixExpr) + raises(ShapeError, lambda: Trace(C)) + assert trace(eye(3)) == 3 + assert trace(Matrix(3, 3, [1, 2, 3, 4, 5, 6, 7, 8, 9])) == 15 + + assert adjoint(Trace(A)) == trace(Adjoint(A)) + assert conjugate(Trace(A)) == trace(Adjoint(A)) + assert transpose(Trace(A)) == Trace(A) + + _ = A / Trace(A) # Make sure this is possible + + # Some easy simplifications + assert trace(Identity(5)) == 5 + assert trace(ZeroMatrix(5, 5)) == 0 + assert trace(OneMatrix(1, 1)) == 1 + assert trace(OneMatrix(2, 2)) == 2 + assert trace(OneMatrix(n, n)) == n + assert trace(2*A*B) == 2*Trace(A*B) + assert trace(A.T) == trace(A) + + i, j = symbols('i j') + F = FunctionMatrix(3, 3, Lambda((i, j), i + j)) + assert trace(F) == (0 + 0) + (1 + 1) + (2 + 2) + + raises(TypeError, lambda: Trace(S.One)) + + assert Trace(A).arg is A + + assert str(trace(A)) == str(Trace(A).doit()) + + assert Trace(A).is_commutative is True + +def test_Trace_A_plus_B(): + assert trace(A + B) == Trace(A) + Trace(B) + assert Trace(A + B).arg == MatAdd(A, B) + assert Trace(A + B).doit() == Trace(A) + Trace(B) + + +def test_Trace_MatAdd_doit(): + # See issue #9028 + X = ImmutableMatrix([[1, 2, 3]]*3) + Y = MatrixSymbol('Y', 3, 3) + q = MatAdd(X, 2*X, Y, -3*Y) + assert Trace(q).arg == q + assert Trace(q).doit() == 18 - 2*Trace(Y) + + +def test_Trace_MatPow_doit(): + X = Matrix([[1, 2], [3, 4]]) + assert Trace(X).doit() == 5 + q = MatPow(X, 2) + assert Trace(q).arg == q + assert Trace(q).doit() == 29 + + +def test_Trace_MutableMatrix_plus(): + # See issue #9043 + X = Matrix([[1, 2], [3, 4]]) + assert Trace(X) + Trace(X) == 2*Trace(X) + + +def test_Trace_doit_deep_False(): + X = Matrix([[1, 2], [3, 4]]) + q = MatPow(X, 2) + assert Trace(q).doit(deep=False).arg == q + q = MatAdd(X, 2*X) + assert Trace(q).doit(deep=False).arg == q + q = MatMul(X, 2*X) + assert Trace(q).doit(deep=False).arg == q + + +def test_trace_constant_factor(): + # Issue 9052: gave 2*Trace(MatMul(A)) instead of 2*Trace(A) + assert trace(2*A) == 2*Trace(A) + X = ImmutableMatrix([[1, 2], [3, 4]]) + assert trace(MatMul(2, X)) == 10 + + +def test_trace_rewrite(): + assert trace(A).rewrite(Sum) == Sum(A[i, i], (i, 0, n - 1)) + assert trace(eye(3)).rewrite(Sum) == 3 + + +def test_trace_normalize(): + assert Trace(B*A) != Trace(A*B) + assert Trace(B*A)._normalize() == Trace(A*B) + assert Trace(B*A.T)._normalize() == Trace(A*B.T) + + +def test_trace_as_explicit(): + raises(ValueError, lambda: Trace(A).as_explicit()) + + X = MatrixSymbol("X", 3, 3) + assert Trace(X).as_explicit() == X[0, 0] + X[1, 1] + X[2, 2] + assert Trace(eye(3)).as_explicit() == 3 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_transpose.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_transpose.py new file mode 100644 index 0000000000000000000000000000000000000000..a1a6113873426d99bacf85484d3b66781f300af7 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/tests/test_transpose.py @@ -0,0 +1,69 @@ +from sympy.functions import adjoint, conjugate, transpose +from sympy.matrices.expressions import MatrixSymbol, Adjoint, trace, Transpose +from sympy.matrices import eye, Matrix +from sympy.assumptions.ask import Q +from sympy.assumptions.refine import refine +from sympy.core.singleton import S +from sympy.core.symbol import symbols + +n, m, l, k, p = symbols('n m l k p', integer=True) +A = MatrixSymbol('A', n, m) +B = MatrixSymbol('B', m, l) +C = MatrixSymbol('C', n, n) + + +def test_transpose(): + Sq = MatrixSymbol('Sq', n, n) + + assert transpose(A) == Transpose(A) + assert Transpose(A).shape == (m, n) + assert Transpose(A*B).shape == (l, n) + assert transpose(Transpose(A)) == A + assert isinstance(Transpose(Transpose(A)), Transpose) + + assert adjoint(Transpose(A)) == Adjoint(Transpose(A)) + assert conjugate(Transpose(A)) == Adjoint(A) + + assert Transpose(eye(3)).doit() == eye(3) + + assert Transpose(S(5)).doit() == S(5) + + assert Transpose(Matrix([[1, 2], [3, 4]])).doit() == Matrix([[1, 3], [2, 4]]) + + assert transpose(trace(Sq)) == trace(Sq) + assert trace(Transpose(Sq)) == trace(Sq) + + assert Transpose(Sq)[0, 1] == Sq[1, 0] + + assert Transpose(A*B).doit() == Transpose(B) * Transpose(A) + + +def test_transpose_MatAdd_MatMul(): + # Issue 16807 + from sympy.functions.elementary.trigonometric import cos + + x = symbols('x') + M = MatrixSymbol('M', 3, 3) + N = MatrixSymbol('N', 3, 3) + + assert (N + (cos(x) * M)).T == cos(x)*M.T + N.T + + +def test_refine(): + assert refine(C.T, Q.symmetric(C)) == C + + +def test_transpose1x1(): + m = MatrixSymbol('m', 1, 1) + assert m == refine(m.T) + assert m == refine(m.T.T) + +def test_issue_9817(): + from sympy.matrices.expressions import Identity + v = MatrixSymbol('v', 3, 1) + A = MatrixSymbol('A', 3, 3) + x = Matrix([i + 1 for i in range(3)]) + X = Identity(3) + quadratic = v.T * A * v + subbed = quadratic.xreplace({v:x, A:X}) + assert subbed.as_explicit() == Matrix([[14]]) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/trace.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/trace.py new file mode 100644 index 0000000000000000000000000000000000000000..b5f9f94ea7486dc21b47c2e2e783a93280b180e0 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/trace.py @@ -0,0 +1,167 @@ +from sympy.core.basic import Basic +from sympy.core.expr import Expr, ExprBuilder +from sympy.core.singleton import S +from sympy.core.sorting import default_sort_key +from sympy.core.symbol import uniquely_named_symbol +from sympy.core.sympify import sympify +from sympy.matrices.matrixbase import MatrixBase +from sympy.matrices.exceptions import NonSquareMatrixError + + +class Trace(Expr): + """Matrix Trace + + Represents the trace of a matrix expression. + + Examples + ======== + + >>> from sympy import MatrixSymbol, Trace, eye + >>> A = MatrixSymbol('A', 3, 3) + >>> Trace(A) + Trace(A) + >>> Trace(eye(3)) + Trace(Matrix([ + [1, 0, 0], + [0, 1, 0], + [0, 0, 1]])) + >>> Trace(eye(3)).simplify() + 3 + """ + is_Trace = True + is_commutative = True + + def __new__(cls, mat): + mat = sympify(mat) + + if not mat.is_Matrix: + raise TypeError("input to Trace, %s, is not a matrix" % str(mat)) + + if mat.is_square is False: + raise NonSquareMatrixError("Trace of a non-square matrix") + + return Basic.__new__(cls, mat) + + def _eval_transpose(self): + return self + + def _eval_derivative(self, v): + from sympy.concrete.summations import Sum + from .matexpr import MatrixElement + if isinstance(v, MatrixElement): + return self.rewrite(Sum).diff(v) + expr = self.doit() + if isinstance(expr, Trace): + # Avoid looping infinitely: + raise NotImplementedError + return expr._eval_derivative(v) + + def _eval_derivative_matrix_lines(self, x): + from sympy.tensor.array.expressions.array_expressions import ArrayTensorProduct, ArrayContraction + r = self.args[0]._eval_derivative_matrix_lines(x) + for lr in r: + if lr.higher == 1: + lr.higher = ExprBuilder( + ArrayContraction, + [ + ExprBuilder( + ArrayTensorProduct, + [ + lr._lines[0], + lr._lines[1], + ] + ), + (1, 3), + ], + validator=ArrayContraction._validate + ) + else: + # This is not a matrix line: + lr.higher = ExprBuilder( + ArrayContraction, + [ + ExprBuilder( + ArrayTensorProduct, + [ + lr._lines[0], + lr._lines[1], + lr.higher, + ] + ), + (1, 3), (0, 2) + ] + ) + lr._lines = [S.One, S.One] + lr._first_pointer_parent = lr._lines + lr._second_pointer_parent = lr._lines + lr._first_pointer_index = 0 + lr._second_pointer_index = 1 + return r + + @property + def arg(self): + return self.args[0] + + def doit(self, **hints): + if hints.get('deep', True): + arg = self.arg.doit(**hints) + result = arg._eval_trace() + if result is not None: + return result + else: + return Trace(arg) + else: + # _eval_trace would go too deep here + if isinstance(self.arg, MatrixBase): + return trace(self.arg) + else: + return Trace(self.arg) + + def as_explicit(self): + return Trace(self.arg.as_explicit()).doit() + + def _normalize(self): + # Normalization of trace of matrix products. Use transposition and + # cyclic properties of traces to make sure the arguments of the matrix + # product are sorted and the first argument is not a transposition. + from sympy.matrices.expressions.matmul import MatMul + from sympy.matrices.expressions.transpose import Transpose + trace_arg = self.arg + if isinstance(trace_arg, MatMul): + + def get_arg_key(x): + a = trace_arg.args[x] + if isinstance(a, Transpose): + a = a.arg + return default_sort_key(a) + + indmin = min(range(len(trace_arg.args)), key=get_arg_key) + if isinstance(trace_arg.args[indmin], Transpose): + trace_arg = Transpose(trace_arg).doit() + indmin = min(range(len(trace_arg.args)), key=lambda x: default_sort_key(trace_arg.args[x])) + trace_arg = MatMul.fromiter(trace_arg.args[indmin:] + trace_arg.args[:indmin]) + return Trace(trace_arg) + return self + + def _eval_rewrite_as_Sum(self, expr, **kwargs): + from sympy.concrete.summations import Sum + i = uniquely_named_symbol('i', [expr]) + s = Sum(self.arg[i, i], (i, 0, self.arg.rows - 1)) + return s.doit() + + +def trace(expr): + """Trace of a Matrix. Sum of the diagonal elements. + + Examples + ======== + + >>> from sympy import trace, Symbol, MatrixSymbol, eye + >>> n = Symbol('n') + >>> X = MatrixSymbol('X', n, n) # A square matrix + >>> trace(2*X) + 2*Trace(X) + >>> trace(eye(3)) + 3 + """ + return Trace(expr).doit() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/transpose.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/transpose.py new file mode 100644 index 0000000000000000000000000000000000000000..b11f7fc21490aab219420610ca529d81d6995d40 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/expressions/transpose.py @@ -0,0 +1,103 @@ +from sympy.core.basic import Basic +from sympy.matrices.expressions.matexpr import MatrixExpr + + +class Transpose(MatrixExpr): + """ + The transpose of a matrix expression. + + This is a symbolic object that simply stores its argument without + evaluating it. To actually compute the transpose, use the ``transpose()`` + function, or the ``.T`` attribute of matrices. + + Examples + ======== + + >>> from sympy import MatrixSymbol, Transpose, transpose + >>> A = MatrixSymbol('A', 3, 5) + >>> B = MatrixSymbol('B', 5, 3) + >>> Transpose(A) + A.T + >>> A.T == transpose(A) == Transpose(A) + True + >>> Transpose(A*B) + (A*B).T + >>> transpose(A*B) + B.T*A.T + + """ + is_Transpose = True + + def doit(self, **hints): + arg = self.arg + if hints.get('deep', True) and isinstance(arg, Basic): + arg = arg.doit(**hints) + _eval_transpose = getattr(arg, '_eval_transpose', None) + if _eval_transpose is not None: + result = _eval_transpose() + return result if result is not None else Transpose(arg) + else: + return Transpose(arg) + + @property + def arg(self): + return self.args[0] + + @property + def shape(self): + return self.arg.shape[::-1] + + def _entry(self, i, j, expand=False, **kwargs): + return self.arg._entry(j, i, expand=expand, **kwargs) + + def _eval_adjoint(self): + return self.arg.conjugate() + + def _eval_conjugate(self): + return self.arg.adjoint() + + def _eval_transpose(self): + return self.arg + + def _eval_trace(self): + from .trace import Trace + return Trace(self.arg) # Trace(X.T) => Trace(X) + + def _eval_determinant(self): + from sympy.matrices.expressions.determinant import det + return det(self.arg) + + def _eval_derivative(self, x): + # x is a scalar: + return self.arg._eval_derivative(x) + + def _eval_derivative_matrix_lines(self, x): + lines = self.args[0]._eval_derivative_matrix_lines(x) + return [i.transpose() for i in lines] + + +def transpose(expr): + """Matrix transpose""" + return Transpose(expr).doit(deep=False) + + +from sympy.assumptions.ask import ask, Q +from sympy.assumptions.refine import handlers_dict + + +def refine_Transpose(expr, assumptions): + """ + >>> from sympy import MatrixSymbol, Q, assuming, refine + >>> X = MatrixSymbol('X', 2, 2) + >>> X.T + X.T + >>> with assuming(Q.symmetric(X)): + ... print(refine(X.T)) + X + """ + if ask(Q.symmetric(expr), assumptions): + return expr.arg + + return expr + +handlers_dict['Transpose'] = refine_Transpose diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/immutable.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/immutable.py new file mode 100644 index 0000000000000000000000000000000000000000..7ec2174bf1c785e1a4698e1b55078d300e62dafe --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/immutable.py @@ -0,0 +1,196 @@ +from mpmath.matrices.matrices import _matrix + +from sympy.core import Basic, Dict, Tuple +from sympy.core.numbers import Integer +from sympy.core.cache import cacheit +from sympy.core.sympify import _sympy_converter as sympify_converter, _sympify +from sympy.matrices.dense import DenseMatrix +from sympy.matrices.expressions import MatrixExpr +from sympy.matrices.matrixbase import MatrixBase +from sympy.matrices.repmatrix import RepMatrix +from sympy.matrices.sparse import SparseRepMatrix +from sympy.multipledispatch import dispatch + + +def sympify_matrix(arg): + return arg.as_immutable() + + +sympify_converter[MatrixBase] = sympify_matrix + + +def sympify_mpmath_matrix(arg): + mat = [_sympify(x) for x in arg] + return ImmutableDenseMatrix(arg.rows, arg.cols, mat) + + +sympify_converter[_matrix] = sympify_mpmath_matrix + + +class ImmutableRepMatrix(RepMatrix, MatrixExpr): # type: ignore + """Immutable matrix based on RepMatrix + + Uses DomainMAtrix as the internal representation. + """ + + # + # This is a subclass of RepMatrix that adds/overrides some methods to make + # the instances Basic and immutable. ImmutableRepMatrix is a superclass for + # both ImmutableDenseMatrix and ImmutableSparseMatrix. + # + + def __new__(cls, *args, **kwargs): + return cls._new(*args, **kwargs) + + __hash__ = MatrixExpr.__hash__ + + def copy(self): + return self + + @property + def cols(self): + return self._cols + + @property + def rows(self): + return self._rows + + @property + def shape(self): + return self._rows, self._cols + + def as_immutable(self): + return self + + def _entry(self, i, j, **kwargs): + return self[i, j] + + def __setitem__(self, *args): + raise TypeError("Cannot set values of {}".format(self.__class__)) + + def is_diagonalizable(self, reals_only=False, **kwargs): + return super().is_diagonalizable( + reals_only=reals_only, **kwargs) + + is_diagonalizable.__doc__ = SparseRepMatrix.is_diagonalizable.__doc__ + is_diagonalizable = cacheit(is_diagonalizable) + + def analytic_func(self, f, x): + return self.as_mutable().analytic_func(f, x).as_immutable() + + +class ImmutableDenseMatrix(DenseMatrix, ImmutableRepMatrix): # type: ignore + """Create an immutable version of a matrix. + + Examples + ======== + + >>> from sympy import eye, ImmutableMatrix + >>> ImmutableMatrix(eye(3)) + Matrix([ + [1, 0, 0], + [0, 1, 0], + [0, 0, 1]]) + >>> _[0, 0] = 42 + Traceback (most recent call last): + ... + TypeError: Cannot set values of ImmutableDenseMatrix + """ + + # MatrixExpr is set as NotIterable, but we want explicit matrices to be + # iterable + _iterable = True + _class_priority = 8 + _op_priority = 10.001 + + @classmethod + def _new(cls, *args, **kwargs): + if len(args) == 1 and isinstance(args[0], ImmutableDenseMatrix): + return args[0] + if kwargs.get('copy', True) is False: + if len(args) != 3: + raise TypeError("'copy=False' requires a matrix be initialized as rows,cols,[list]") + rows, cols, flat_list = args + else: + rows, cols, flat_list = cls._handle_creation_inputs(*args, **kwargs) + flat_list = list(flat_list) # create a shallow copy + + rep = cls._flat_list_to_DomainMatrix(rows, cols, flat_list) + + return cls._fromrep(rep) + + @classmethod + def _fromrep(cls, rep): + rows, cols = rep.shape + flat_list = rep.to_sympy().to_list_flat() + obj = Basic.__new__(cls, + Integer(rows), + Integer(cols), + Tuple(*flat_list, sympify=False)) + obj._rows = rows + obj._cols = cols + obj._rep = rep + return obj + + +# make sure ImmutableDenseMatrix is aliased as ImmutableMatrix +ImmutableMatrix = ImmutableDenseMatrix + + +class ImmutableSparseMatrix(SparseRepMatrix, ImmutableRepMatrix): # type:ignore + """Create an immutable version of a sparse matrix. + + Examples + ======== + + >>> from sympy import eye, ImmutableSparseMatrix + >>> ImmutableSparseMatrix(1, 1, {}) + Matrix([[0]]) + >>> ImmutableSparseMatrix(eye(3)) + Matrix([ + [1, 0, 0], + [0, 1, 0], + [0, 0, 1]]) + >>> _[0, 0] = 42 + Traceback (most recent call last): + ... + TypeError: Cannot set values of ImmutableSparseMatrix + >>> _.shape + (3, 3) + """ + is_Matrix = True + _class_priority = 9 + + @classmethod + def _new(cls, *args, **kwargs): + rows, cols, smat = cls._handle_creation_inputs(*args, **kwargs) + + rep = cls._smat_to_DomainMatrix(rows, cols, smat) + + return cls._fromrep(rep) + + @classmethod + def _fromrep(cls, rep): + rows, cols = rep.shape + smat = rep.to_sympy().to_dok() + obj = Basic.__new__(cls, Integer(rows), Integer(cols), Dict(smat)) + obj._rows = rows + obj._cols = cols + obj._rep = rep + return obj + + +@dispatch(ImmutableDenseMatrix, ImmutableDenseMatrix) +def _eval_is_eq(lhs, rhs): # noqa:F811 + """Helper method for Equality with matrices.sympy. + + Relational automatically converts matrices to ImmutableDenseMatrix + instances, so this method only applies here. Returns True if the + matrices are definitively the same, False if they are definitively + different, and None if undetermined (e.g. if they contain Symbols). + Returning None triggers default handling of Equalities. + + """ + if lhs.shape != rhs.shape: + return False + return (lhs - rhs).is_zero_matrix diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/inverse.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/inverse.py new file mode 100644 index 0000000000000000000000000000000000000000..61d9e12edf013d2f5555d61786343aa3840edfd3 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/inverse.py @@ -0,0 +1,524 @@ +from sympy.polys.matrices.exceptions import DMNonInvertibleMatrixError +from sympy.polys.domains import EX + +from .exceptions import MatrixError, NonSquareMatrixError, NonInvertibleMatrixError +from .utilities import _iszero + + +def _pinv_full_rank(M): + """Subroutine for full row or column rank matrices. + + For full row rank matrices, inverse of ``A * A.H`` Exists. + For full column rank matrices, inverse of ``A.H * A`` Exists. + + This routine can apply for both cases by checking the shape + and have small decision. + """ + + if M.is_zero_matrix: + return M.H + + if M.rows >= M.cols: + return M.H.multiply(M).inv().multiply(M.H) + else: + return M.H.multiply(M.multiply(M.H).inv()) + +def _pinv_rank_decomposition(M): + """Subroutine for rank decomposition + + With rank decompositions, `A` can be decomposed into two full- + rank matrices, and each matrix can take pseudoinverse + individually. + """ + + if M.is_zero_matrix: + return M.H + + B, C = M.rank_decomposition() + + Bp = _pinv_full_rank(B) + Cp = _pinv_full_rank(C) + + return Cp.multiply(Bp) + +def _pinv_diagonalization(M): + """Subroutine using diagonalization + + This routine can sometimes fail if SymPy's eigenvalue + computation is not reliable. + """ + + if M.is_zero_matrix: + return M.H + + A = M + AH = M.H + + try: + if M.rows >= M.cols: + P, D = AH.multiply(A).diagonalize(normalize=True) + D_pinv = D.applyfunc(lambda x: 0 if _iszero(x) else 1 / x) + + return P.multiply(D_pinv).multiply(P.H).multiply(AH) + + else: + P, D = A.multiply(AH).diagonalize( + normalize=True) + D_pinv = D.applyfunc(lambda x: 0 if _iszero(x) else 1 / x) + + return AH.multiply(P).multiply(D_pinv).multiply(P.H) + + except MatrixError: + raise NotImplementedError( + 'pinv for rank-deficient matrices where ' + 'diagonalization of A.H*A fails is not supported yet.') + +def _pinv(M, method='RD'): + """Calculate the Moore-Penrose pseudoinverse of the matrix. + + The Moore-Penrose pseudoinverse exists and is unique for any matrix. + If the matrix is invertible, the pseudoinverse is the same as the + inverse. + + Parameters + ========== + + method : String, optional + Specifies the method for computing the pseudoinverse. + + If ``'RD'``, Rank-Decomposition will be used. + + If ``'ED'``, Diagonalization will be used. + + Examples + ======== + + Computing pseudoinverse by rank decomposition : + + >>> from sympy import Matrix + >>> A = Matrix([[1, 2, 3], [4, 5, 6]]) + >>> A.pinv() + Matrix([ + [-17/18, 4/9], + [ -1/9, 1/9], + [ 13/18, -2/9]]) + + Computing pseudoinverse by diagonalization : + + >>> B = A.pinv(method='ED') + >>> B.simplify() + >>> B + Matrix([ + [-17/18, 4/9], + [ -1/9, 1/9], + [ 13/18, -2/9]]) + + See Also + ======== + + inv + pinv_solve + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Moore-Penrose_pseudoinverse + + """ + + # Trivial case: pseudoinverse of all-zero matrix is its transpose. + if M.is_zero_matrix: + return M.H + + if method == 'RD': + return _pinv_rank_decomposition(M) + elif method == 'ED': + return _pinv_diagonalization(M) + else: + raise ValueError('invalid pinv method %s' % repr(method)) + + +def _verify_invertible(M, iszerofunc=_iszero): + """Initial check to see if a matrix is invertible. Raises or returns + determinant for use in _inv_ADJ.""" + + if not M.is_square: + raise NonSquareMatrixError("A Matrix must be square to invert.") + + d = M.det(method='berkowitz') + zero = d.equals(0) + + if zero is None: # if equals() can't decide, will rref be able to? + ok = M.rref(simplify=True)[0] + zero = any(iszerofunc(ok[j, j]) for j in range(ok.rows)) + + if zero: + raise NonInvertibleMatrixError("Matrix det == 0; not invertible.") + + return d + +def _inv_ADJ(M, iszerofunc=_iszero): + """Calculates the inverse using the adjugate matrix and a determinant. + + See Also + ======== + + inv + inverse_GE + inverse_LU + inverse_CH + inverse_LDL + """ + + d = _verify_invertible(M, iszerofunc=iszerofunc) + + return M.adjugate() / d + +def _inv_GE(M, iszerofunc=_iszero): + """Calculates the inverse using Gaussian elimination. + + See Also + ======== + + inv + inverse_ADJ + inverse_LU + inverse_CH + inverse_LDL + """ + + from .dense import Matrix + + if not M.is_square: + raise NonSquareMatrixError("A Matrix must be square to invert.") + + big = Matrix.hstack(M.as_mutable(), Matrix.eye(M.rows)) + red = big.rref(iszerofunc=iszerofunc, simplify=True)[0] + + if any(iszerofunc(red[j, j]) for j in range(red.rows)): + raise NonInvertibleMatrixError("Matrix det == 0; not invertible.") + + return M._new(red[:, big.rows:]) + +def _inv_LU(M, iszerofunc=_iszero): + """Calculates the inverse using LU decomposition. + + See Also + ======== + + inv + inverse_ADJ + inverse_GE + inverse_CH + inverse_LDL + """ + + if not M.is_square: + raise NonSquareMatrixError("A Matrix must be square to invert.") + if M.free_symbols: + _verify_invertible(M, iszerofunc=iszerofunc) + + return M.LUsolve(M.eye(M.rows), iszerofunc=_iszero) + +def _inv_CH(M, iszerofunc=_iszero): + """Calculates the inverse using cholesky decomposition. + + See Also + ======== + + inv + inverse_ADJ + inverse_GE + inverse_LU + inverse_LDL + """ + + _verify_invertible(M, iszerofunc=iszerofunc) + + return M.cholesky_solve(M.eye(M.rows)) + +def _inv_LDL(M, iszerofunc=_iszero): + """Calculates the inverse using LDL decomposition. + + See Also + ======== + + inv + inverse_ADJ + inverse_GE + inverse_LU + inverse_CH + """ + + _verify_invertible(M, iszerofunc=iszerofunc) + + return M.LDLsolve(M.eye(M.rows)) + +def _inv_QR(M, iszerofunc=_iszero): + """Calculates the inverse using QR decomposition. + + See Also + ======== + + inv + inverse_ADJ + inverse_GE + inverse_CH + inverse_LDL + """ + + _verify_invertible(M, iszerofunc=iszerofunc) + + return M.QRsolve(M.eye(M.rows)) + +def _try_DM(M, use_EX=False): + """Try to convert a matrix to a ``DomainMatrix``.""" + dM = M.to_DM() + K = dM.domain + + # Return DomainMatrix if a domain is found. Only use EX if use_EX=True. + if not use_EX and K.is_EXRAW: + return None + elif K.is_EXRAW: + return dM.convert_to(EX) + else: + return dM + + +def _use_exact_domain(dom): + """Check whether to convert to an exact domain.""" + # DomainMatrix can handle RR and CC with partial pivoting. Other inexact + # domains like RR[a,b,...] can only be handled by converting to an exact + # domain like QQ[a,b,...] + if dom.is_RR or dom.is_CC: + return False + else: + return not dom.is_Exact + + +def _inv_DM(dM, cancel=True): + """Calculates the inverse using ``DomainMatrix``. + + See Also + ======== + + inv + inverse_ADJ + inverse_GE + inverse_CH + inverse_LDL + sympy.polys.matrices.domainmatrix.DomainMatrix.inv + """ + m, n = dM.shape + dom = dM.domain + + if m != n: + raise NonSquareMatrixError("A Matrix must be square to invert.") + + # Convert RR[a,b,...] to QQ[a,b,...] + use_exact = _use_exact_domain(dom) + + if use_exact: + dom_exact = dom.get_exact() + dM = dM.convert_to(dom_exact) + + try: + dMi, den = dM.inv_den() + except DMNonInvertibleMatrixError: + raise NonInvertibleMatrixError("Matrix det == 0; not invertible.") + + if use_exact: + dMi = dMi.convert_to(dom) + den = dom.convert_from(den, dom_exact) + + if cancel: + # Convert to field and cancel with the denominator. + if not dMi.domain.is_Field: + dMi = dMi.to_field() + Mi = (dMi / den).to_Matrix() + else: + # Convert to Matrix and divide without cancelling + Mi = dMi.to_Matrix() / dMi.domain.to_sympy(den) + + return Mi + +def _inv_block(M, iszerofunc=_iszero): + """Calculates the inverse using BLOCKWISE inversion. + + See Also + ======== + + inv + inverse_ADJ + inverse_GE + inverse_CH + inverse_LDL + """ + from sympy.matrices.expressions.blockmatrix import BlockMatrix + i = M.shape[0] + if i <= 20 : + return M.inv(method="LU", iszerofunc=_iszero) + A = M[:i // 2, :i //2] + B = M[:i // 2, i // 2:] + C = M[i // 2:, :i // 2] + D = M[i // 2:, i // 2:] + try: + D_inv = _inv_block(D) + except NonInvertibleMatrixError: + return M.inv(method="LU", iszerofunc=_iszero) + B_D_i = B*D_inv + BDC = B_D_i*C + A_n = A - BDC + try: + A_n = _inv_block(A_n) + except NonInvertibleMatrixError: + return M.inv(method="LU", iszerofunc=_iszero) + B_n = -A_n*B_D_i + dc = D_inv*C + C_n = -dc*A_n + D_n = D_inv + dc*-B_n + nn = BlockMatrix([[A_n, B_n], [C_n, D_n]]).as_explicit() + return nn + +def _inv(M, method=None, iszerofunc=_iszero, try_block_diag=False): + """ + Return the inverse of a matrix using the method indicated. The default + is DM if a suitable domain is found or otherwise GE for dense matrices + LDL for sparse matrices. + + Parameters + ========== + + method : ('DM', 'DMNC', 'GE', 'LU', 'ADJ', 'CH', 'LDL', 'QR') + + iszerofunc : function, optional + Zero-testing function to use. + + try_block_diag : bool, optional + If True then will try to form block diagonal matrices using the + method get_diag_blocks(), invert these individually, and then + reconstruct the full inverse matrix. + + Examples + ======== + + >>> from sympy import SparseMatrix, Matrix + >>> A = SparseMatrix([ + ... [ 2, -1, 0], + ... [-1, 2, -1], + ... [ 0, 0, 2]]) + >>> A.inv('CH') + Matrix([ + [2/3, 1/3, 1/6], + [1/3, 2/3, 1/3], + [ 0, 0, 1/2]]) + >>> A.inv(method='LDL') # use of 'method=' is optional + Matrix([ + [2/3, 1/3, 1/6], + [1/3, 2/3, 1/3], + [ 0, 0, 1/2]]) + >>> A * _ + Matrix([ + [1, 0, 0], + [0, 1, 0], + [0, 0, 1]]) + >>> A = Matrix(A) + >>> A.inv('CH') + Matrix([ + [2/3, 1/3, 1/6], + [1/3, 2/3, 1/3], + [ 0, 0, 1/2]]) + >>> A.inv('ADJ') == A.inv('GE') == A.inv('LU') == A.inv('CH') == A.inv('LDL') == A.inv('QR') + True + + Notes + ===== + + According to the ``method`` keyword, it calls the appropriate method: + + DM .... Use DomainMatrix ``inv_den`` method + DMNC .... Use DomainMatrix ``inv_den`` method without cancellation + GE .... inverse_GE(); default for dense matrices + LU .... inverse_LU() + ADJ ... inverse_ADJ() + CH ... inverse_CH() + LDL ... inverse_LDL(); default for sparse matrices + QR ... inverse_QR() + + Note, the GE and LU methods may require the matrix to be simplified + before it is inverted in order to properly detect zeros during + pivoting. In difficult cases a custom zero detection function can + be provided by setting the ``iszerofunc`` argument to a function that + should return True if its argument is zero. The ADJ routine computes + the determinant and uses that to detect singular matrices in addition + to testing for zeros on the diagonal. + + See Also + ======== + + inverse_ADJ + inverse_GE + inverse_LU + inverse_CH + inverse_LDL + + Raises + ====== + + ValueError + If the determinant of the matrix is zero. + """ + + from sympy.matrices import diag, SparseMatrix + + if not M.is_square: + raise NonSquareMatrixError("A Matrix must be square to invert.") + + if try_block_diag: + blocks = M.get_diag_blocks() + r = [] + + for block in blocks: + r.append(block.inv(method=method, iszerofunc=iszerofunc)) + + return diag(*r) + + # Default: Use DomainMatrix if the domain is not EX. + # If DM is requested explicitly then use it even if the domain is EX. + if method is None and iszerofunc is _iszero: + dM = _try_DM(M, use_EX=False) + if dM is not None: + method = 'DM' + elif method in ("DM", "DMNC"): + dM = _try_DM(M, use_EX=True) + + # A suitable domain was not found, fall back to GE for dense matrices + # and LDL for sparse matrices. + if method is None: + if isinstance(M, SparseMatrix): + method = 'LDL' + else: + method = 'GE' + + if method == "DM": + rv = _inv_DM(dM) + elif method == "DMNC": + rv = _inv_DM(dM, cancel=False) + elif method == "GE": + rv = M.inverse_GE(iszerofunc=iszerofunc) + elif method == "LU": + rv = M.inverse_LU(iszerofunc=iszerofunc) + elif method == "ADJ": + rv = M.inverse_ADJ(iszerofunc=iszerofunc) + elif method == "CH": + rv = M.inverse_CH(iszerofunc=iszerofunc) + elif method == "LDL": + rv = M.inverse_LDL(iszerofunc=iszerofunc) + elif method == "QR": + rv = M.inverse_QR(iszerofunc=iszerofunc) + elif method == "BLOCK": + rv = M.inverse_BLOCK(iszerofunc=iszerofunc) + else: + raise ValueError("Inversion method unrecognized") + + return M._new(rv) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/kind.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/kind.py new file mode 100644 index 0000000000000000000000000000000000000000..f9f53ffe16f7cbde60213e49071a2a74e80e5c6c --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/kind.py @@ -0,0 +1,97 @@ +# sympy.matrices.kind + +from sympy.core.kind import Kind, _NumberKind, NumberKind +from sympy.core.mul import Mul + + +class MatrixKind(Kind): + """ + Kind for all matrices in SymPy. + + Basic class for this kind is ``MatrixBase`` and ``MatrixExpr``, + but any expression representing the matrix can have this. + + Parameters + ========== + + element_kind : Kind + Kind of the element. Default is + :class:`sympy.core.kind.NumberKind`, + which means that the matrix contains only numbers. + + Examples + ======== + + Any instance of matrix class has kind ``MatrixKind``: + + >>> from sympy import MatrixSymbol + >>> A = MatrixSymbol('A', 2, 2) + >>> A.kind + MatrixKind(NumberKind) + + An expression representing a matrix may not be an instance of + the Matrix class, but it will have kind ``MatrixKind``: + + >>> from sympy import MatrixExpr, Integral + >>> from sympy.abc import x + >>> intM = Integral(A, x) + >>> isinstance(intM, MatrixExpr) + False + >>> intM.kind + MatrixKind(NumberKind) + + Use ``isinstance()`` to check for ``MatrixKind`` without specifying the + element kind. Use ``is`` to check the kind including the element kind: + + >>> from sympy import Matrix + >>> from sympy.core import NumberKind + >>> from sympy.matrices import MatrixKind + >>> M = Matrix([1, 2]) + >>> isinstance(M.kind, MatrixKind) + True + >>> M.kind is MatrixKind(NumberKind) + True + + See Also + ======== + + sympy.core.kind.NumberKind + sympy.core.kind.UndefinedKind + sympy.core.containers.TupleKind + sympy.sets.sets.SetKind + + """ + def __new__(cls, element_kind=NumberKind): + obj = super().__new__(cls, element_kind) + obj.element_kind = element_kind + return obj + + def __repr__(self): + return "MatrixKind(%s)" % self.element_kind + + +@Mul._kind_dispatcher.register(_NumberKind, MatrixKind) +def num_mat_mul(k1, k2): + """ + Return MatrixKind. The element kind is selected by recursive dispatching. + Do not need to dispatch in reversed order because KindDispatcher + searches for this automatically. + """ + # Deal with Mul._kind_dispatcher's commutativity + # XXX: this function is called with either k1 or k2 as MatrixKind because + # the Mul kind dispatcher is commutative. Maybe it shouldn't be. Need to + # swap the args here because NumberKind does not have an element_kind + # attribute. + if not isinstance(k2, MatrixKind): + k1, k2 = k2, k1 + elemk = Mul._kind_dispatcher(k1, k2.element_kind) + return MatrixKind(elemk) + + +@Mul._kind_dispatcher.register(MatrixKind, MatrixKind) +def mat_mat_mul(k1, k2): + """ + Return MatrixKind. The element kind is selected by recursive dispatching. + """ + elemk = Mul._kind_dispatcher(k1.element_kind, k2.element_kind) + return MatrixKind(elemk) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/matrices.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/matrices.py new file mode 100644 index 0000000000000000000000000000000000000000..fed41a626cb395ac0529071317630d853e0d3a96 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/matrices.py @@ -0,0 +1,687 @@ +# +# A module consisting of deprecated matrix classes. New code should not be +# added here. +# +from sympy.core.basic import Basic +from sympy.core.symbol import Dummy + +from .common import MatrixCommon + +from .exceptions import NonSquareMatrixError + +from .utilities import _iszero, _is_zero_after_expand_mul, _simplify + +from .determinant import ( + _find_reasonable_pivot, _find_reasonable_pivot_naive, + _adjugate, _charpoly, _cofactor, _cofactor_matrix, _per, + _det, _det_bareiss, _det_berkowitz, _det_bird, _det_laplace, _det_LU, + _minor, _minor_submatrix) + +from .reductions import _is_echelon, _echelon_form, _rank, _rref +from .subspaces import _columnspace, _nullspace, _rowspace, _orthogonalize + +from .eigen import ( + _eigenvals, _eigenvects, + _bidiagonalize, _bidiagonal_decomposition, + _is_diagonalizable, _diagonalize, + _is_positive_definite, _is_positive_semidefinite, + _is_negative_definite, _is_negative_semidefinite, _is_indefinite, + _jordan_form, _left_eigenvects, _singular_values) + + +# This class was previously defined in this module, but was moved to +# sympy.matrices.matrixbase. We import it here for backwards compatibility in +# case someone was importing it from here. +from .matrixbase import MatrixBase + + +__doctest_requires__ = { + ('MatrixEigen.is_indefinite', + 'MatrixEigen.is_negative_definite', + 'MatrixEigen.is_negative_semidefinite', + 'MatrixEigen.is_positive_definite', + 'MatrixEigen.is_positive_semidefinite'): ['matplotlib'], +} + + +class MatrixDeterminant(MatrixCommon): + """Provides basic matrix determinant operations. Should not be instantiated + directly. See ``determinant.py`` for their implementations.""" + + def _eval_det_bareiss(self, iszerofunc=_is_zero_after_expand_mul): + return _det_bareiss(self, iszerofunc=iszerofunc) + + def _eval_det_berkowitz(self): + return _det_berkowitz(self) + + def _eval_det_lu(self, iszerofunc=_iszero, simpfunc=None): + return _det_LU(self, iszerofunc=iszerofunc, simpfunc=simpfunc) + + def _eval_det_bird(self): + return _det_bird(self) + + def _eval_det_laplace(self): + return _det_laplace(self) + + def _eval_determinant(self): # for expressions.determinant.Determinant + return _det(self) + + def adjugate(self, method="berkowitz"): + return _adjugate(self, method=method) + + def charpoly(self, x='lambda', simplify=_simplify): + return _charpoly(self, x=x, simplify=simplify) + + def cofactor(self, i, j, method="berkowitz"): + return _cofactor(self, i, j, method=method) + + def cofactor_matrix(self, method="berkowitz"): + return _cofactor_matrix(self, method=method) + + def det(self, method="bareiss", iszerofunc=None): + return _det(self, method=method, iszerofunc=iszerofunc) + + def per(self): + return _per(self) + + def minor(self, i, j, method="berkowitz"): + return _minor(self, i, j, method=method) + + def minor_submatrix(self, i, j): + return _minor_submatrix(self, i, j) + + _find_reasonable_pivot.__doc__ = _find_reasonable_pivot.__doc__ + _find_reasonable_pivot_naive.__doc__ = _find_reasonable_pivot_naive.__doc__ + _eval_det_bareiss.__doc__ = _det_bareiss.__doc__ + _eval_det_berkowitz.__doc__ = _det_berkowitz.__doc__ + _eval_det_bird.__doc__ = _det_bird.__doc__ + _eval_det_laplace.__doc__ = _det_laplace.__doc__ + _eval_det_lu.__doc__ = _det_LU.__doc__ + _eval_determinant.__doc__ = _det.__doc__ + adjugate.__doc__ = _adjugate.__doc__ + charpoly.__doc__ = _charpoly.__doc__ + cofactor.__doc__ = _cofactor.__doc__ + cofactor_matrix.__doc__ = _cofactor_matrix.__doc__ + det.__doc__ = _det.__doc__ + per.__doc__ = _per.__doc__ + minor.__doc__ = _minor.__doc__ + minor_submatrix.__doc__ = _minor_submatrix.__doc__ + + +class MatrixReductions(MatrixDeterminant): + """Provides basic matrix row/column operations. Should not be instantiated + directly. See ``reductions.py`` for some of their implementations.""" + + def echelon_form(self, iszerofunc=_iszero, simplify=False, with_pivots=False): + return _echelon_form(self, iszerofunc=iszerofunc, simplify=simplify, + with_pivots=with_pivots) + + @property + def is_echelon(self): + return _is_echelon(self) + + def rank(self, iszerofunc=_iszero, simplify=False): + return _rank(self, iszerofunc=iszerofunc, simplify=simplify) + + def rref_rhs(self, rhs): + """Return reduced row-echelon form of matrix, matrix showing + rhs after reduction steps. ``rhs`` must have the same number + of rows as ``self``. + + Examples + ======== + + >>> from sympy import Matrix, symbols + >>> r1, r2 = symbols('r1 r2') + >>> Matrix([[1, 1], [2, 1]]).rref_rhs(Matrix([r1, r2])) + (Matrix([ + [1, 0], + [0, 1]]), Matrix([ + [ -r1 + r2], + [2*r1 - r2]])) + """ + r, _ = _rref(self.hstack(self, self.eye(self.rows), rhs)) + return r[:, :self.cols], r[:, -rhs.cols:] + + def rref(self, iszerofunc=_iszero, simplify=False, pivots=True, + normalize_last=True): + return _rref(self, iszerofunc=iszerofunc, simplify=simplify, + pivots=pivots, normalize_last=normalize_last) + + echelon_form.__doc__ = _echelon_form.__doc__ + is_echelon.__doc__ = _is_echelon.__doc__ + rank.__doc__ = _rank.__doc__ + rref.__doc__ = _rref.__doc__ + + def _normalize_op_args(self, op, col, k, col1, col2, error_str="col"): + """Validate the arguments for a row/column operation. ``error_str`` + can be one of "row" or "col" depending on the arguments being parsed.""" + if op not in ["n->kn", "n<->m", "n->n+km"]: + raise ValueError("Unknown {} operation '{}'. Valid col operations " + "are 'n->kn', 'n<->m', 'n->n+km'".format(error_str, op)) + + # define self_col according to error_str + self_cols = self.cols if error_str == 'col' else self.rows + + # normalize and validate the arguments + if op == "n->kn": + col = col if col is not None else col1 + if col is None or k is None: + raise ValueError("For a {0} operation 'n->kn' you must provide the " + "kwargs `{0}` and `k`".format(error_str)) + if not 0 <= col < self_cols: + raise ValueError("This matrix does not have a {} '{}'".format(error_str, col)) + + elif op == "n<->m": + # we need two cols to swap. It does not matter + # how they were specified, so gather them together and + # remove `None` + cols = {col, k, col1, col2}.difference([None]) + if len(cols) > 2: + # maybe the user left `k` by mistake? + cols = {col, col1, col2}.difference([None]) + if len(cols) != 2: + raise ValueError("For a {0} operation 'n<->m' you must provide the " + "kwargs `{0}1` and `{0}2`".format(error_str)) + col1, col2 = cols + if not 0 <= col1 < self_cols: + raise ValueError("This matrix does not have a {} '{}'".format(error_str, col1)) + if not 0 <= col2 < self_cols: + raise ValueError("This matrix does not have a {} '{}'".format(error_str, col2)) + + elif op == "n->n+km": + col = col1 if col is None else col + col2 = col1 if col2 is None else col2 + if col is None or col2 is None or k is None: + raise ValueError("For a {0} operation 'n->n+km' you must provide the " + "kwargs `{0}`, `k`, and `{0}2`".format(error_str)) + if col == col2: + raise ValueError("For a {0} operation 'n->n+km' `{0}` and `{0}2` must " + "be different.".format(error_str)) + if not 0 <= col < self_cols: + raise ValueError("This matrix does not have a {} '{}'".format(error_str, col)) + if not 0 <= col2 < self_cols: + raise ValueError("This matrix does not have a {} '{}'".format(error_str, col2)) + + else: + raise ValueError('invalid operation %s' % repr(op)) + + return op, col, k, col1, col2 + + def _eval_col_op_multiply_col_by_const(self, col, k): + def entry(i, j): + if j == col: + return k * self[i, j] + return self[i, j] + return self._new(self.rows, self.cols, entry) + + def _eval_col_op_swap(self, col1, col2): + def entry(i, j): + if j == col1: + return self[i, col2] + elif j == col2: + return self[i, col1] + return self[i, j] + return self._new(self.rows, self.cols, entry) + + def _eval_col_op_add_multiple_to_other_col(self, col, k, col2): + def entry(i, j): + if j == col: + return self[i, j] + k * self[i, col2] + return self[i, j] + return self._new(self.rows, self.cols, entry) + + def _eval_row_op_swap(self, row1, row2): + def entry(i, j): + if i == row1: + return self[row2, j] + elif i == row2: + return self[row1, j] + return self[i, j] + return self._new(self.rows, self.cols, entry) + + def _eval_row_op_multiply_row_by_const(self, row, k): + def entry(i, j): + if i == row: + return k * self[i, j] + return self[i, j] + return self._new(self.rows, self.cols, entry) + + def _eval_row_op_add_multiple_to_other_row(self, row, k, row2): + def entry(i, j): + if i == row: + return self[i, j] + k * self[row2, j] + return self[i, j] + return self._new(self.rows, self.cols, entry) + + def elementary_col_op(self, op="n->kn", col=None, k=None, col1=None, col2=None): + """Performs the elementary column operation `op`. + + `op` may be one of + + * ``"n->kn"`` (column n goes to k*n) + * ``"n<->m"`` (swap column n and column m) + * ``"n->n+km"`` (column n goes to column n + k*column m) + + Parameters + ========== + + op : string; the elementary row operation + col : the column to apply the column operation + k : the multiple to apply in the column operation + col1 : one column of a column swap + col2 : second column of a column swap or column "m" in the column operation + "n->n+km" + """ + + op, col, k, col1, col2 = self._normalize_op_args(op, col, k, col1, col2, "col") + + # now that we've validated, we're all good to dispatch + if op == "n->kn": + return self._eval_col_op_multiply_col_by_const(col, k) + if op == "n<->m": + return self._eval_col_op_swap(col1, col2) + if op == "n->n+km": + return self._eval_col_op_add_multiple_to_other_col(col, k, col2) + + def elementary_row_op(self, op="n->kn", row=None, k=None, row1=None, row2=None): + """Performs the elementary row operation `op`. + + `op` may be one of + + * ``"n->kn"`` (row n goes to k*n) + * ``"n<->m"`` (swap row n and row m) + * ``"n->n+km"`` (row n goes to row n + k*row m) + + Parameters + ========== + + op : string; the elementary row operation + row : the row to apply the row operation + k : the multiple to apply in the row operation + row1 : one row of a row swap + row2 : second row of a row swap or row "m" in the row operation + "n->n+km" + """ + + op, row, k, row1, row2 = self._normalize_op_args(op, row, k, row1, row2, "row") + + # now that we've validated, we're all good to dispatch + if op == "n->kn": + return self._eval_row_op_multiply_row_by_const(row, k) + if op == "n<->m": + return self._eval_row_op_swap(row1, row2) + if op == "n->n+km": + return self._eval_row_op_add_multiple_to_other_row(row, k, row2) + + +class MatrixSubspaces(MatrixReductions): + """Provides methods relating to the fundamental subspaces of a matrix. + Should not be instantiated directly. See ``subspaces.py`` for their + implementations.""" + + def columnspace(self, simplify=False): + return _columnspace(self, simplify=simplify) + + def nullspace(self, simplify=False, iszerofunc=_iszero): + return _nullspace(self, simplify=simplify, iszerofunc=iszerofunc) + + def rowspace(self, simplify=False): + return _rowspace(self, simplify=simplify) + + # This is a classmethod but is converted to such later in order to allow + # assignment of __doc__ since that does not work for already wrapped + # classmethods in Python 3.6. + def orthogonalize(cls, *vecs, **kwargs): + return _orthogonalize(cls, *vecs, **kwargs) + + columnspace.__doc__ = _columnspace.__doc__ + nullspace.__doc__ = _nullspace.__doc__ + rowspace.__doc__ = _rowspace.__doc__ + orthogonalize.__doc__ = _orthogonalize.__doc__ + + orthogonalize = classmethod(orthogonalize) # type:ignore + + +class MatrixEigen(MatrixSubspaces): + """Provides basic matrix eigenvalue/vector operations. + Should not be instantiated directly. See ``eigen.py`` for their + implementations.""" + + def eigenvals(self, error_when_incomplete=True, **flags): + return _eigenvals(self, error_when_incomplete=error_when_incomplete, **flags) + + def eigenvects(self, error_when_incomplete=True, iszerofunc=_iszero, **flags): + return _eigenvects(self, error_when_incomplete=error_when_incomplete, + iszerofunc=iszerofunc, **flags) + + def is_diagonalizable(self, reals_only=False, **kwargs): + return _is_diagonalizable(self, reals_only=reals_only, **kwargs) + + def diagonalize(self, reals_only=False, sort=False, normalize=False): + return _diagonalize(self, reals_only=reals_only, sort=sort, + normalize=normalize) + + def bidiagonalize(self, upper=True): + return _bidiagonalize(self, upper=upper) + + def bidiagonal_decomposition(self, upper=True): + return _bidiagonal_decomposition(self, upper=upper) + + @property + def is_positive_definite(self): + return _is_positive_definite(self) + + @property + def is_positive_semidefinite(self): + return _is_positive_semidefinite(self) + + @property + def is_negative_definite(self): + return _is_negative_definite(self) + + @property + def is_negative_semidefinite(self): + return _is_negative_semidefinite(self) + + @property + def is_indefinite(self): + return _is_indefinite(self) + + def jordan_form(self, calc_transform=True, **kwargs): + return _jordan_form(self, calc_transform=calc_transform, **kwargs) + + def left_eigenvects(self, **flags): + return _left_eigenvects(self, **flags) + + def singular_values(self): + return _singular_values(self) + + eigenvals.__doc__ = _eigenvals.__doc__ + eigenvects.__doc__ = _eigenvects.__doc__ + is_diagonalizable.__doc__ = _is_diagonalizable.__doc__ + diagonalize.__doc__ = _diagonalize.__doc__ + is_positive_definite.__doc__ = _is_positive_definite.__doc__ + is_positive_semidefinite.__doc__ = _is_positive_semidefinite.__doc__ + is_negative_definite.__doc__ = _is_negative_definite.__doc__ + is_negative_semidefinite.__doc__ = _is_negative_semidefinite.__doc__ + is_indefinite.__doc__ = _is_indefinite.__doc__ + jordan_form.__doc__ = _jordan_form.__doc__ + left_eigenvects.__doc__ = _left_eigenvects.__doc__ + singular_values.__doc__ = _singular_values.__doc__ + bidiagonalize.__doc__ = _bidiagonalize.__doc__ + bidiagonal_decomposition.__doc__ = _bidiagonal_decomposition.__doc__ + + +class MatrixCalculus(MatrixCommon): + """Provides calculus-related matrix operations.""" + + def diff(self, *args, evaluate=True, **kwargs): + """Calculate the derivative of each element in the matrix. + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.abc import x, y + >>> M = Matrix([[x, y], [1, 0]]) + >>> M.diff(x) + Matrix([ + [1, 0], + [0, 0]]) + + See Also + ======== + + integrate + limit + """ + # XXX this should be handled here rather than in Derivative + from sympy.tensor.array.array_derivatives import ArrayDerivative + deriv = ArrayDerivative(self, *args, evaluate=evaluate) + # XXX This can rather changed to always return immutable matrix + if not isinstance(self, Basic) and evaluate: + return deriv.as_mutable() + return deriv + + def _eval_derivative(self, arg): + return self.applyfunc(lambda x: x.diff(arg)) + + def integrate(self, *args, **kwargs): + """Integrate each element of the matrix. ``args`` will + be passed to the ``integrate`` function. + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.abc import x, y + >>> M = Matrix([[x, y], [1, 0]]) + >>> M.integrate((x, )) + Matrix([ + [x**2/2, x*y], + [ x, 0]]) + >>> M.integrate((x, 0, 2)) + Matrix([ + [2, 2*y], + [2, 0]]) + + See Also + ======== + + limit + diff + """ + return self.applyfunc(lambda x: x.integrate(*args, **kwargs)) + + def jacobian(self, X): + """Calculates the Jacobian matrix (derivative of a vector-valued function). + + Parameters + ========== + + ``self`` : vector of expressions representing functions f_i(x_1, ..., x_n). + X : set of x_i's in order, it can be a list or a Matrix + + Both ``self`` and X can be a row or a column matrix in any order + (i.e., jacobian() should always work). + + Examples + ======== + + >>> from sympy import sin, cos, Matrix + >>> from sympy.abc import rho, phi + >>> X = Matrix([rho*cos(phi), rho*sin(phi), rho**2]) + >>> Y = Matrix([rho, phi]) + >>> X.jacobian(Y) + Matrix([ + [cos(phi), -rho*sin(phi)], + [sin(phi), rho*cos(phi)], + [ 2*rho, 0]]) + >>> X = Matrix([rho*cos(phi), rho*sin(phi)]) + >>> X.jacobian(Y) + Matrix([ + [cos(phi), -rho*sin(phi)], + [sin(phi), rho*cos(phi)]]) + + See Also + ======== + + hessian + wronskian + """ + if not isinstance(X, MatrixBase): + X = self._new(X) + # Both X and ``self`` can be a row or a column matrix, so we need to make + # sure all valid combinations work, but everything else fails: + if self.shape[0] == 1: + m = self.shape[1] + elif self.shape[1] == 1: + m = self.shape[0] + else: + raise TypeError("``self`` must be a row or a column matrix") + if X.shape[0] == 1: + n = X.shape[1] + elif X.shape[1] == 1: + n = X.shape[0] + else: + raise TypeError("X must be a row or a column matrix") + + # m is the number of functions and n is the number of variables + # computing the Jacobian is now easy: + return self._new(m, n, lambda j, i: self[j].diff(X[i])) + + def limit(self, *args): + """Calculate the limit of each element in the matrix. + ``args`` will be passed to the ``limit`` function. + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.abc import x, y + >>> M = Matrix([[x, y], [1, 0]]) + >>> M.limit(x, 2) + Matrix([ + [2, y], + [1, 0]]) + + See Also + ======== + + integrate + diff + """ + return self.applyfunc(lambda x: x.limit(*args)) + + +# https://github.com/sympy/sympy/pull/12854 +class MatrixDeprecated(MatrixCommon): + """A class to house deprecated matrix methods.""" + def berkowitz_charpoly(self, x=Dummy('lambda'), simplify=_simplify): + return self.charpoly(x=x) + + def berkowitz_det(self): + """Computes determinant using Berkowitz method. + + See Also + ======== + + det + berkowitz + """ + return self.det(method='berkowitz') + + def berkowitz_eigenvals(self, **flags): + """Computes eigenvalues of a Matrix using Berkowitz method. + + See Also + ======== + + berkowitz + """ + return self.eigenvals(**flags) + + def berkowitz_minors(self): + """Computes principal minors using Berkowitz method. + + See Also + ======== + + berkowitz + """ + sign, minors = self.one, [] + + for poly in self.berkowitz(): + minors.append(sign * poly[-1]) + sign = -sign + + return tuple(minors) + + def berkowitz(self): + from sympy.matrices import zeros + berk = ((1,),) + if not self: + return berk + + if not self.is_square: + raise NonSquareMatrixError() + + A, N = self, self.rows + transforms = [0] * (N - 1) + + for n in range(N, 1, -1): + T, k = zeros(n + 1, n), n - 1 + + R, C = -A[k, :k], A[:k, k] + A, a = A[:k, :k], -A[k, k] + + items = [C] + + for i in range(0, n - 2): + items.append(A * items[i]) + + for i, B in enumerate(items): + items[i] = (R * B)[0, 0] + + items = [self.one, a] + items + + for i in range(n): + T[i:, i] = items[:n - i + 1] + + transforms[k - 1] = T + + polys = [self._new([self.one, -A[0, 0]])] + + for i, T in enumerate(transforms): + polys.append(T * polys[i]) + + return berk + tuple(map(tuple, polys)) + + def cofactorMatrix(self, method="berkowitz"): + return self.cofactor_matrix(method=method) + + def det_bareis(self): + return _det_bareiss(self) + + def det_LU_decomposition(self): + """Compute matrix determinant using LU decomposition. + + + Note that this method fails if the LU decomposition itself + fails. In particular, if the matrix has no inverse this method + will fail. + + TODO: Implement algorithm for sparse matrices (SFF), + https://www.eecis.udel.edu/~saunders/papers/sffge/it5.ps + + See Also + ======== + + + det + det_bareiss + berkowitz_det + """ + return self.det(method='lu') + + def jordan_cell(self, eigenval, n): + return self.jordan_block(size=n, eigenvalue=eigenval) + + def jordan_cells(self, calc_transformation=True): + P, J = self.jordan_form() + return P, J.get_diag_blocks() + + def minorEntry(self, i, j, method="berkowitz"): + return self.minor(i, j, method=method) + + def minorMatrix(self, i, j): + return self.minor_submatrix(i, j) + + def permuteBkwd(self, perm): + """Permute the rows of the matrix with the given permutation in reverse.""" + return self.permute_rows(perm, direction='backward') + + def permuteFwd(self, perm): + """Permute the rows of the matrix with the given permutation.""" + return self.permute_rows(perm, direction='forward') diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/matrixbase.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/matrixbase.py new file mode 100644 index 0000000000000000000000000000000000000000..49acc04043b30e003f7eed256f2e06e6a6556401 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/matrixbase.py @@ -0,0 +1,5428 @@ +from __future__ import annotations +from collections import defaultdict +from collections.abc import Iterable +from inspect import isfunction +from functools import reduce + +from sympy.assumptions.refine import refine +from sympy.core import SympifyError, Add +from sympy.core.basic import Atom, Basic +from sympy.core.kind import UndefinedKind +from sympy.core.numbers import Integer +from sympy.core.mod import Mod +from sympy.core.symbol import Symbol, Dummy +from sympy.core.sympify import sympify, _sympify +from sympy.core.function import diff +from sympy.polys import cancel +from sympy.functions.elementary.complexes import Abs, re, im +from sympy.printing import sstr +from sympy.functions.elementary.miscellaneous import Max, Min, sqrt +from sympy.functions.special.tensor_functions import KroneckerDelta, LeviCivita +from sympy.core.singleton import S +from sympy.printing.defaults import Printable +from sympy.printing.str import StrPrinter +from sympy.functions.elementary.exponential import exp, log +from sympy.functions.combinatorial.factorials import binomial, factorial + +import mpmath as mp +from collections.abc import Callable +from sympy.utilities.iterables import reshape +from sympy.core.expr import Expr +from sympy.core.power import Pow +from sympy.core.symbol import uniquely_named_symbol + +from .utilities import _dotprodsimp, _simplify as _utilities_simplify +from sympy.polys.polytools import Poly +from sympy.utilities.iterables import flatten, is_sequence +from sympy.utilities.misc import as_int, filldedent +from sympy.core.decorators import call_highest_priority +from sympy.core.logic import fuzzy_and, FuzzyBool +from sympy.tensor.array import NDimArray +from sympy.utilities.iterables import NotIterable + +from .utilities import _get_intermediate_simp_bool + +from .kind import MatrixKind + +from .exceptions import ( + MatrixError, ShapeError, NonSquareMatrixError, NonInvertibleMatrixError, +) + +from .utilities import _iszero, _is_zero_after_expand_mul + +from .determinant import ( + _find_reasonable_pivot, _find_reasonable_pivot_naive, + _adjugate, _charpoly, _cofactor, _cofactor_matrix, _per, + _det, _det_bareiss, _det_berkowitz, _det_bird, _det_laplace, _det_LU, + _minor, _minor_submatrix) + +from .reductions import _is_echelon, _echelon_form, _rank, _rref + +from .solvers import ( + _diagonal_solve, _lower_triangular_solve, _upper_triangular_solve, + _cholesky_solve, _LDLsolve, _LUsolve, _QRsolve, _gauss_jordan_solve, + _pinv_solve, _cramer_solve, _solve, _solve_least_squares) + +from .inverse import ( + _pinv, _inv_ADJ, _inv_GE, _inv_LU, _inv_CH, _inv_LDL, _inv_QR, + _inv, _inv_block) + +from .subspaces import _columnspace, _nullspace, _rowspace, _orthogonalize + +from .eigen import ( + _eigenvals, _eigenvects, + _bidiagonalize, _bidiagonal_decomposition, + _is_diagonalizable, _diagonalize, + _is_positive_definite, _is_positive_semidefinite, + _is_negative_definite, _is_negative_semidefinite, _is_indefinite, + _jordan_form, _left_eigenvects, _singular_values) + +from .decompositions import ( + _rank_decomposition, _cholesky, _LDLdecomposition, + _LUdecomposition, _LUdecomposition_Simple, _LUdecompositionFF, + _singular_value_decomposition, _QRdecomposition, _upper_hessenberg_decomposition) + +from .graph import ( + _connected_components, _connected_components_decomposition, + _strongly_connected_components, _strongly_connected_components_decomposition) + + +__doctest_requires__ = { + ('MatrixBase.is_indefinite', + 'MatrixBase.is_positive_definite', + 'MatrixBase.is_positive_semidefinite', + 'MatrixBase.is_negative_definite', + 'MatrixBase.is_negative_semidefinite'): ['matplotlib'], +} + + +class MatrixBase(Printable): + """All common matrix operations including basic arithmetic, shaping, + and special matrices like `zeros`, and `eye`.""" + + _op_priority = 10.01 + + # Added just for numpy compatibility + __array_priority__ = 11 + + is_Matrix = True + _class_priority = 3 + _sympify = staticmethod(sympify) + zero = S.Zero + one = S.One + + _diff_wrt: bool = True + rows: int + cols: int + _simplify = None + + @classmethod + def _new(cls, *args, **kwargs): + """`_new` must, at minimum, be callable as + `_new(rows, cols, mat) where mat is a flat list of the + elements of the matrix.""" + raise NotImplementedError("Subclasses must implement this.") + + def __eq__(self, other): + raise NotImplementedError("Subclasses must implement this.") + + def __getitem__(self, key): + """Implementations of __getitem__ should accept ints, in which + case the matrix is indexed as a flat list, tuples (i,j) in which + case the (i,j) entry is returned, slices, or mixed tuples (a,b) + where a and b are any combination of slices and integers.""" + raise NotImplementedError("Subclasses must implement this.") + + @property + def shape(self): + """The shape (dimensions) of the matrix as the 2-tuple (rows, cols). + + Examples + ======== + + >>> from sympy import zeros + >>> M = zeros(2, 3) + >>> M.shape + (2, 3) + >>> M.rows + 2 + >>> M.cols + 3 + """ + return (self.rows, self.cols) + + def _eval_col_del(self, col): + def entry(i, j): + return self[i, j] if j < col else self[i, j + 1] + return self._new(self.rows, self.cols - 1, entry) + + def _eval_col_insert(self, pos, other): + + def entry(i, j): + if j < pos: + return self[i, j] + elif pos <= j < pos + other.cols: + return other[i, j - pos] + return self[i, j - other.cols] + + return self._new(self.rows, self.cols + other.cols, entry) + + def _eval_col_join(self, other): + rows = self.rows + + def entry(i, j): + if i < rows: + return self[i, j] + return other[i - rows, j] + + return classof(self, other)._new(self.rows + other.rows, self.cols, + entry) + + def _eval_extract(self, rowsList, colsList): + mat = list(self) + cols = self.cols + indices = (i * cols + j for i in rowsList for j in colsList) + return self._new(len(rowsList), len(colsList), + [mat[i] for i in indices]) + + def _eval_get_diag_blocks(self): + sub_blocks = [] + + def recurse_sub_blocks(M): + for i in range(1, M.shape[0] + 1): + if i == 1: + to_the_right = M[0, i:] + to_the_bottom = M[i:, 0] + else: + to_the_right = M[:i, i:] + to_the_bottom = M[i:, :i] + if any(to_the_right) or any(to_the_bottom): + continue + sub_blocks.append(M[:i, :i]) + if M.shape != M[:i, :i].shape: + recurse_sub_blocks(M[i:, i:]) + return + + recurse_sub_blocks(self) + return sub_blocks + + def _eval_row_del(self, row): + def entry(i, j): + return self[i, j] if i < row else self[i + 1, j] + return self._new(self.rows - 1, self.cols, entry) + + def _eval_row_insert(self, pos, other): + entries = list(self) + insert_pos = pos * self.cols + entries[insert_pos:insert_pos] = list(other) + return self._new(self.rows + other.rows, self.cols, entries) + + def _eval_row_join(self, other): + cols = self.cols + + def entry(i, j): + if j < cols: + return self[i, j] + return other[i, j - cols] + + return classof(self, other)._new(self.rows, self.cols + other.cols, + entry) + + def _eval_tolist(self): + return [list(self[i,:]) for i in range(self.rows)] + + def _eval_todok(self): + dok = {} + rows, cols = self.shape + for i in range(rows): + for j in range(cols): + val = self[i, j] + if val != self.zero: + dok[i, j] = val + return dok + + @classmethod + def _eval_from_dok(cls, rows, cols, dok): + out_flat = [cls.zero] * (rows * cols) + for (i, j), val in dok.items(): + out_flat[i * cols + j] = val + return cls._new(rows, cols, out_flat) + + def _eval_vec(self): + rows = self.rows + + def entry(n, _): + # we want to read off the columns first + j = n // rows + i = n - j * rows + return self[i, j] + + return self._new(len(self), 1, entry) + + def _eval_vech(self, diagonal): + c = self.cols + v = [] + if diagonal: + for j in range(c): + for i in range(j, c): + v.append(self[i, j]) + else: + for j in range(c): + for i in range(j + 1, c): + v.append(self[i, j]) + return self._new(len(v), 1, v) + + def col_del(self, col): + """Delete the specified column.""" + if col < 0: + col += self.cols + if not 0 <= col < self.cols: + raise IndexError("Column {} is out of range.".format(col)) + return self._eval_col_del(col) + + def col_insert(self, pos, other): + """Insert one or more columns at the given column position. + + Examples + ======== + + >>> from sympy import zeros, ones + >>> M = zeros(3) + >>> V = ones(3, 1) + >>> M.col_insert(1, V) + Matrix([ + [0, 1, 0, 0], + [0, 1, 0, 0], + [0, 1, 0, 0]]) + + See Also + ======== + + col + row_insert + """ + # Allows you to build a matrix even if it is null matrix + if not self: + return type(self)(other) + + pos = as_int(pos) + + if pos < 0: + pos = self.cols + pos + if pos < 0: + pos = 0 + elif pos > self.cols: + pos = self.cols + + if self.rows != other.rows: + raise ShapeError( + "The matrices have incompatible number of rows ({} and {})" + .format(self.rows, other.rows)) + + return self._eval_col_insert(pos, other) + + def col_join(self, other): + """Concatenates two matrices along self's last and other's first row. + + Examples + ======== + + >>> from sympy import zeros, ones + >>> M = zeros(3) + >>> V = ones(1, 3) + >>> M.col_join(V) + Matrix([ + [0, 0, 0], + [0, 0, 0], + [0, 0, 0], + [1, 1, 1]]) + + See Also + ======== + + col + row_join + """ + # A null matrix can always be stacked (see #10770) + if self.rows == 0 and self.cols != other.cols: + return self._new(0, other.cols, []).col_join(other) + + if self.cols != other.cols: + raise ShapeError( + "The matrices have incompatible number of columns ({} and {})" + .format(self.cols, other.cols)) + return self._eval_col_join(other) + + def col(self, j): + """Elementary column selector. + + Examples + ======== + + >>> from sympy import eye + >>> eye(2).col(0) + Matrix([ + [1], + [0]]) + + See Also + ======== + + row + col_del + col_join + col_insert + """ + return self[:, j] + + def extract(self, rowsList, colsList): + r"""Return a submatrix by specifying a list of rows and columns. + Negative indices can be given. All indices must be in the range + $-n \le i < n$ where $n$ is the number of rows or columns. + + Examples + ======== + + >>> from sympy import Matrix + >>> m = Matrix(4, 3, range(12)) + >>> m + Matrix([ + [0, 1, 2], + [3, 4, 5], + [6, 7, 8], + [9, 10, 11]]) + >>> m.extract([0, 1, 3], [0, 1]) + Matrix([ + [0, 1], + [3, 4], + [9, 10]]) + + Rows or columns can be repeated: + + >>> m.extract([0, 0, 1], [-1]) + Matrix([ + [2], + [2], + [5]]) + + Every other row can be taken by using range to provide the indices: + + >>> m.extract(range(0, m.rows, 2), [-1]) + Matrix([ + [2], + [8]]) + + RowsList or colsList can also be a list of booleans, in which case + the rows or columns corresponding to the True values will be selected: + + >>> m.extract([0, 1, 2, 3], [True, False, True]) + Matrix([ + [0, 2], + [3, 5], + [6, 8], + [9, 11]]) + """ + + if not is_sequence(rowsList) or not is_sequence(colsList): + raise TypeError("rowsList and colsList must be iterable") + # ensure rowsList and colsList are lists of integers + if rowsList and all(isinstance(i, bool) for i in rowsList): + rowsList = [index for index, item in enumerate(rowsList) if item] + if colsList and all(isinstance(i, bool) for i in colsList): + colsList = [index for index, item in enumerate(colsList) if item] + + # ensure everything is in range + rowsList = [a2idx(k, self.rows) for k in rowsList] + colsList = [a2idx(k, self.cols) for k in colsList] + + return self._eval_extract(rowsList, colsList) + + def get_diag_blocks(self): + """Obtains the square sub-matrices on the main diagonal of a square matrix. + + Useful for inverting symbolic matrices or solving systems of + linear equations which may be decoupled by having a block diagonal + structure. + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.abc import x, y, z + >>> A = Matrix([[1, 3, 0, 0], [y, z*z, 0, 0], [0, 0, x, 0], [0, 0, 0, 0]]) + >>> a1, a2, a3 = A.get_diag_blocks() + >>> a1 + Matrix([ + [1, 3], + [y, z**2]]) + >>> a2 + Matrix([[x]]) + >>> a3 + Matrix([[0]]) + + """ + return self._eval_get_diag_blocks() + + @classmethod + def hstack(cls, *args): + """Return a matrix formed by joining args horizontally (i.e. + by repeated application of row_join). + + Examples + ======== + + >>> from sympy import Matrix, eye + >>> Matrix.hstack(eye(2), 2*eye(2)) + Matrix([ + [1, 0, 2, 0], + [0, 1, 0, 2]]) + """ + if len(args) == 0: + return cls._new() + + kls = type(args[0]) + return reduce(kls.row_join, args) + + def reshape(self, rows, cols): + """Reshape the matrix. Total number of elements must remain the same. + + Examples + ======== + + >>> from sympy import Matrix + >>> m = Matrix(2, 3, lambda i, j: 1) + >>> m + Matrix([ + [1, 1, 1], + [1, 1, 1]]) + >>> m.reshape(1, 6) + Matrix([[1, 1, 1, 1, 1, 1]]) + >>> m.reshape(3, 2) + Matrix([ + [1, 1], + [1, 1], + [1, 1]]) + + """ + if self.rows * self.cols != rows * cols: + raise ValueError("Invalid reshape parameters %d %d" % (rows, cols)) + dok = {divmod(i*self.cols + j, cols): + v for (i, j), v in self.todok().items()} + return self._eval_from_dok(rows, cols, dok) + + def row_del(self, row): + """Delete the specified row.""" + if row < 0: + row += self.rows + if not 0 <= row < self.rows: + raise IndexError("Row {} is out of range.".format(row)) + + return self._eval_row_del(row) + + def row_insert(self, pos, other): + """Insert one or more rows at the given row position. + + Examples + ======== + + >>> from sympy import zeros, ones + >>> M = zeros(3) + >>> V = ones(1, 3) + >>> M.row_insert(1, V) + Matrix([ + [0, 0, 0], + [1, 1, 1], + [0, 0, 0], + [0, 0, 0]]) + + See Also + ======== + + row + col_insert + """ + # Allows you to build a matrix even if it is null matrix + if not self: + return self._new(other) + + pos = as_int(pos) + + if pos < 0: + pos = self.rows + pos + if pos < 0: + pos = 0 + elif pos > self.rows: + pos = self.rows + + if self.cols != other.cols: + raise ShapeError( + "The matrices have incompatible number of columns ({} and {})" + .format(self.cols, other.cols)) + + return self._eval_row_insert(pos, other) + + def row_join(self, other): + """Concatenates two matrices along self's last and rhs's first column + + Examples + ======== + + >>> from sympy import zeros, ones + >>> M = zeros(3) + >>> V = ones(3, 1) + >>> M.row_join(V) + Matrix([ + [0, 0, 0, 1], + [0, 0, 0, 1], + [0, 0, 0, 1]]) + + See Also + ======== + + row + col_join + """ + # A null matrix can always be stacked (see #10770) + if self.cols == 0 and self.rows != other.rows: + return self._new(other.rows, 0, []).row_join(other) + + if self.rows != other.rows: + raise ShapeError( + "The matrices have incompatible number of rows ({} and {})" + .format(self.rows, other.rows)) + return self._eval_row_join(other) + + def diagonal(self, k=0): + """Returns the kth diagonal of self. The main diagonal + corresponds to `k=0`; diagonals above and below correspond to + `k > 0` and `k < 0`, respectively. The values of `self[i, j]` + for which `j - i = k`, are returned in order of increasing + `i + j`, starting with `i + j = |k|`. + + Examples + ======== + + >>> from sympy import Matrix + >>> m = Matrix(3, 3, lambda i, j: j - i); m + Matrix([ + [ 0, 1, 2], + [-1, 0, 1], + [-2, -1, 0]]) + >>> _.diagonal() + Matrix([[0, 0, 0]]) + >>> m.diagonal(1) + Matrix([[1, 1]]) + >>> m.diagonal(-2) + Matrix([[-2]]) + + Even though the diagonal is returned as a Matrix, the element + retrieval can be done with a single index: + + >>> Matrix.diag(1, 2, 3).diagonal()[1] # instead of [0, 1] + 2 + + See Also + ======== + + diag + """ + rv = [] + k = as_int(k) + r = 0 if k > 0 else -k + c = 0 if r else k + while True: + if r == self.rows or c == self.cols: + break + rv.append(self[r, c]) + r += 1 + c += 1 + if not rv: + raise ValueError(filldedent(''' + The %s diagonal is out of range [%s, %s]''' % ( + k, 1 - self.rows, self.cols - 1))) + return self._new(1, len(rv), rv) + + def row(self, i): + """Elementary row selector. + + Examples + ======== + + >>> from sympy import eye + >>> eye(2).row(0) + Matrix([[1, 0]]) + + See Also + ======== + + col + row_del + row_join + row_insert + """ + return self[i, :] + + def todok(self): + """Return the matrix as dictionary of keys. + + Examples + ======== + + >>> from sympy import Matrix + >>> M = Matrix.eye(3) + >>> M.todok() + {(0, 0): 1, (1, 1): 1, (2, 2): 1} + """ + return self._eval_todok() + + @classmethod + def from_dok(cls, rows, cols, dok): + """Create a matrix from a dictionary of keys. + + Examples + ======== + + >>> from sympy import Matrix + >>> d = {(0, 0): 1, (1, 2): 3, (2, 1): 4} + >>> Matrix.from_dok(3, 3, d) + Matrix([ + [1, 0, 0], + [0, 0, 3], + [0, 4, 0]]) + """ + dok = {ij: cls._sympify(val) for ij, val in dok.items()} + return cls._eval_from_dok(rows, cols, dok) + + def tolist(self): + """Return the Matrix as a nested Python list. + + Examples + ======== + + >>> from sympy import Matrix, ones + >>> m = Matrix(3, 3, range(9)) + >>> m + Matrix([ + [0, 1, 2], + [3, 4, 5], + [6, 7, 8]]) + >>> m.tolist() + [[0, 1, 2], [3, 4, 5], [6, 7, 8]] + >>> ones(3, 0).tolist() + [[], [], []] + + When there are no rows then it will not be possible to tell how + many columns were in the original matrix: + + >>> ones(0, 3).tolist() + [] + + """ + if not self.rows: + return [] + if not self.cols: + return [[] for i in range(self.rows)] + return self._eval_tolist() + + def todod(M): + """Returns matrix as dict of dicts containing non-zero elements of the Matrix + + Examples + ======== + + >>> from sympy import Matrix + >>> A = Matrix([[0, 1],[0, 3]]) + >>> A + Matrix([ + [0, 1], + [0, 3]]) + >>> A.todod() + {0: {1: 1}, 1: {1: 3}} + + + """ + rowsdict = {} + Mlol = M.tolist() + for i, Mi in enumerate(Mlol): + row = {j: Mij for j, Mij in enumerate(Mi) if Mij} + if row: + rowsdict[i] = row + return rowsdict + + def vec(self): + """Return the Matrix converted into a one column matrix by stacking columns + + Examples + ======== + + >>> from sympy import Matrix + >>> m=Matrix([[1, 3], [2, 4]]) + >>> m + Matrix([ + [1, 3], + [2, 4]]) + >>> m.vec() + Matrix([ + [1], + [2], + [3], + [4]]) + + See Also + ======== + + vech + """ + return self._eval_vec() + + def vech(self, diagonal=True, check_symmetry=True): + """Reshapes the matrix into a column vector by stacking the + elements in the lower triangle. + + Parameters + ========== + + diagonal : bool, optional + If ``True``, it includes the diagonal elements. + + check_symmetry : bool, optional + If ``True``, it checks whether the matrix is symmetric. + + Examples + ======== + + >>> from sympy import Matrix + >>> m=Matrix([[1, 2], [2, 3]]) + >>> m + Matrix([ + [1, 2], + [2, 3]]) + >>> m.vech() + Matrix([ + [1], + [2], + [3]]) + >>> m.vech(diagonal=False) + Matrix([[2]]) + + Notes + ===== + + This should work for symmetric matrices and ``vech`` can + represent symmetric matrices in vector form with less size than + ``vec``. + + See Also + ======== + + vec + """ + if not self.is_square: + raise NonSquareMatrixError + + if check_symmetry and not self.is_symmetric(): + raise ValueError("The matrix is not symmetric.") + + return self._eval_vech(diagonal) + + @classmethod + def vstack(cls, *args): + """Return a matrix formed by joining args vertically (i.e. + by repeated application of col_join). + + Examples + ======== + + >>> from sympy import Matrix, eye + >>> Matrix.vstack(eye(2), 2*eye(2)) + Matrix([ + [1, 0], + [0, 1], + [2, 0], + [0, 2]]) + """ + if len(args) == 0: + return cls._new() + + kls = type(args[0]) + return reduce(kls.col_join, args) + + @classmethod + def _eval_diag(cls, rows, cols, diag_dict): + """diag_dict is a defaultdict containing + all the entries of the diagonal matrix.""" + def entry(i, j): + return diag_dict[(i, j)] + return cls._new(rows, cols, entry) + + @classmethod + def _eval_eye(cls, rows, cols): + vals = [cls.zero]*(rows*cols) + vals[::cols+1] = [cls.one]*min(rows, cols) + return cls._new(rows, cols, vals, copy=False) + + @classmethod + def _eval_jordan_block(cls, size: int, eigenvalue, band='upper'): + if band == 'lower': + def entry(i, j): + if i == j: + return eigenvalue + elif j + 1 == i: + return cls.one + return cls.zero + else: + def entry(i, j): + if i == j: + return eigenvalue + elif i + 1 == j: + return cls.one + return cls.zero + return cls._new(size, size, entry) + + @classmethod + def _eval_ones(cls, rows, cols): + def entry(i, j): + return cls.one + return cls._new(rows, cols, entry) + + @classmethod + def _eval_zeros(cls, rows, cols): + return cls._new(rows, cols, [cls.zero]*(rows*cols), copy=False) + + @classmethod + def _eval_wilkinson(cls, n): + def entry(i, j): + return cls.one if i + 1 == j else cls.zero + + D = cls._new(2*n + 1, 2*n + 1, entry) + + wminus = cls.diag(list(range(-n, n + 1)), unpack=True) + D + D.T + wplus = abs(cls.diag(list(range(-n, n + 1)), unpack=True)) + D + D.T + + return wminus, wplus + + @classmethod + def diag(kls, *args, strict=False, unpack=True, rows=None, cols=None, **kwargs): + """Returns a matrix with the specified diagonal. + If matrices are passed, a block-diagonal matrix + is created (i.e. the "direct sum" of the matrices). + + kwargs + ====== + + rows : rows of the resulting matrix; computed if + not given. + + cols : columns of the resulting matrix; computed if + not given. + + cls : class for the resulting matrix + + unpack : bool which, when True (default), unpacks a single + sequence rather than interpreting it as a Matrix. + + strict : bool which, when False (default), allows Matrices to + have variable-length rows. + + Examples + ======== + + >>> from sympy import Matrix + >>> Matrix.diag(1, 2, 3) + Matrix([ + [1, 0, 0], + [0, 2, 0], + [0, 0, 3]]) + + The current default is to unpack a single sequence. If this is + not desired, set `unpack=False` and it will be interpreted as + a matrix. + + >>> Matrix.diag([1, 2, 3]) == Matrix.diag(1, 2, 3) + True + + When more than one element is passed, each is interpreted as + something to put on the diagonal. Lists are converted to + matrices. Filling of the diagonal always continues from + the bottom right hand corner of the previous item: this + will create a block-diagonal matrix whether the matrices + are square or not. + + >>> col = [1, 2, 3] + >>> row = [[4, 5]] + >>> Matrix.diag(col, row) + Matrix([ + [1, 0, 0], + [2, 0, 0], + [3, 0, 0], + [0, 4, 5]]) + + When `unpack` is False, elements within a list need not all be + of the same length. Setting `strict` to True would raise a + ValueError for the following: + + >>> Matrix.diag([[1, 2, 3], [4, 5], [6]], unpack=False) + Matrix([ + [1, 2, 3], + [4, 5, 0], + [6, 0, 0]]) + + The type of the returned matrix can be set with the ``cls`` + keyword. + + >>> from sympy import ImmutableMatrix + >>> from sympy.utilities.misc import func_name + >>> func_name(Matrix.diag(1, cls=ImmutableMatrix)) + 'ImmutableDenseMatrix' + + A zero dimension matrix can be used to position the start of + the filling at the start of an arbitrary row or column: + + >>> from sympy import ones + >>> r2 = ones(0, 2) + >>> Matrix.diag(r2, 1, 2) + Matrix([ + [0, 0, 1, 0], + [0, 0, 0, 2]]) + + See Also + ======== + eye + diagonal + .dense.diag + .expressions.blockmatrix.BlockMatrix + .sparsetools.banded + """ + from sympy.matrices.matrixbase import MatrixBase + from sympy.matrices.dense import Matrix + from sympy.matrices import SparseMatrix + klass = kwargs.get('cls', kls) + if unpack and len(args) == 1 and is_sequence(args[0]) and \ + not isinstance(args[0], MatrixBase): + args = args[0] + + # fill a default dict with the diagonal entries + diag_entries = defaultdict(int) + rmax = cmax = 0 # keep track of the biggest index seen + for m in args: + if isinstance(m, list): + if strict: + # if malformed, Matrix will raise an error + _ = Matrix(m) + r, c = _.shape + m = _.tolist() + else: + r, c, smat = SparseMatrix._handle_creation_inputs(m) + for (i, j), _ in smat.items(): + diag_entries[(i + rmax, j + cmax)] = _ + m = [] # to skip process below + elif hasattr(m, 'shape'): # a Matrix + # convert to list of lists + r, c = m.shape + m = m.tolist() + else: # in this case, we're a single value + diag_entries[(rmax, cmax)] = m + rmax += 1 + cmax += 1 + continue + # process list of lists + for i, mi in enumerate(m): + for j, _ in enumerate(mi): + diag_entries[(i + rmax, j + cmax)] = _ + rmax += r + cmax += c + if rows is None: + rows, cols = cols, rows + if rows is None: + rows, cols = rmax, cmax + else: + cols = rows if cols is None else cols + if rows < rmax or cols < cmax: + raise ValueError(filldedent(''' + The constructed matrix is {} x {} but a size of {} x {} + was specified.'''.format(rmax, cmax, rows, cols))) + return klass._eval_diag(rows, cols, diag_entries) + + @classmethod + def eye(kls, rows, cols=None, **kwargs): + """Returns an identity matrix. + + Parameters + ========== + + rows : rows of the matrix + cols : cols of the matrix (if None, cols=rows) + + kwargs + ====== + cls : class of the returned matrix + """ + if cols is None: + cols = rows + if rows < 0 or cols < 0: + raise ValueError("Cannot create a {} x {} matrix. " + "Both dimensions must be positive".format(rows, cols)) + klass = kwargs.get('cls', kls) + rows, cols = as_int(rows), as_int(cols) + + return klass._eval_eye(rows, cols) + + @classmethod + def jordan_block(kls, size=None, eigenvalue=None, *, band='upper', **kwargs): + """Returns a Jordan block + + Parameters + ========== + + size : Integer, optional + Specifies the shape of the Jordan block matrix. + + eigenvalue : Number or Symbol + Specifies the value for the main diagonal of the matrix. + + .. note:: + The keyword ``eigenval`` is also specified as an alias + of this keyword, but it is not recommended to use. + + We may deprecate the alias in later release. + + band : 'upper' or 'lower', optional + Specifies the position of the off-diagonal to put `1` s on. + + cls : Matrix, optional + Specifies the matrix class of the output form. + + If it is not specified, the class type where the method is + being executed on will be returned. + + Returns + ======= + + Matrix + A Jordan block matrix. + + Raises + ====== + + ValueError + If insufficient arguments are given for matrix size + specification, or no eigenvalue is given. + + Examples + ======== + + Creating a default Jordan block: + + >>> from sympy import Matrix + >>> from sympy.abc import x + >>> Matrix.jordan_block(4, x) + Matrix([ + [x, 1, 0, 0], + [0, x, 1, 0], + [0, 0, x, 1], + [0, 0, 0, x]]) + + Creating an alternative Jordan block matrix where `1` is on + lower off-diagonal: + + >>> Matrix.jordan_block(4, x, band='lower') + Matrix([ + [x, 0, 0, 0], + [1, x, 0, 0], + [0, 1, x, 0], + [0, 0, 1, x]]) + + Creating a Jordan block with keyword arguments + + >>> Matrix.jordan_block(size=4, eigenvalue=x) + Matrix([ + [x, 1, 0, 0], + [0, x, 1, 0], + [0, 0, x, 1], + [0, 0, 0, x]]) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Jordan_matrix + """ + klass = kwargs.pop('cls', kls) + + eigenval = kwargs.get('eigenval', None) + if eigenvalue is None and eigenval is None: + raise ValueError("Must supply an eigenvalue") + elif eigenvalue != eigenval and None not in (eigenval, eigenvalue): + raise ValueError( + "Inconsistent values are given: 'eigenval'={}, " + "'eigenvalue'={}".format(eigenval, eigenvalue)) + else: + if eigenval is not None: + eigenvalue = eigenval + + if size is None: + raise ValueError("Must supply a matrix size") + + size = as_int(size) + return klass._eval_jordan_block(size, eigenvalue, band) + + @classmethod + def ones(kls, rows, cols=None, **kwargs): + """Returns a matrix of ones. + + Parameters + ========== + + rows : rows of the matrix + cols : cols of the matrix (if None, cols=rows) + + kwargs + ====== + cls : class of the returned matrix + """ + if cols is None: + cols = rows + klass = kwargs.get('cls', kls) + rows, cols = as_int(rows), as_int(cols) + + return klass._eval_ones(rows, cols) + + @classmethod + def zeros(kls, rows, cols=None, **kwargs): + """Returns a matrix of zeros. + + Parameters + ========== + + rows : rows of the matrix + cols : cols of the matrix (if None, cols=rows) + + kwargs + ====== + cls : class of the returned matrix + """ + if cols is None: + cols = rows + if rows < 0 or cols < 0: + raise ValueError("Cannot create a {} x {} matrix. " + "Both dimensions must be positive".format(rows, cols)) + klass = kwargs.get('cls', kls) + rows, cols = as_int(rows), as_int(cols) + + return klass._eval_zeros(rows, cols) + + @classmethod + def companion(kls, poly): + """Returns a companion matrix of a polynomial. + + Examples + ======== + + >>> from sympy import Matrix, Poly, Symbol, symbols + >>> x = Symbol('x') + >>> c0, c1, c2, c3, c4 = symbols('c0:5') + >>> p = Poly(c0 + c1*x + c2*x**2 + c3*x**3 + c4*x**4 + x**5, x) + >>> Matrix.companion(p) + Matrix([ + [0, 0, 0, 0, -c0], + [1, 0, 0, 0, -c1], + [0, 1, 0, 0, -c2], + [0, 0, 1, 0, -c3], + [0, 0, 0, 1, -c4]]) + """ + poly = kls._sympify(poly) + if not isinstance(poly, Poly): + raise ValueError("{} must be a Poly instance.".format(poly)) + if not poly.is_monic: + raise ValueError("{} must be a monic polynomial.".format(poly)) + if not poly.is_univariate: + raise ValueError( + "{} must be a univariate polynomial.".format(poly)) + + size = poly.degree() + if not size >= 1: + raise ValueError( + "{} must have degree not less than 1.".format(poly)) + + coeffs = poly.all_coeffs() + def entry(i, j): + if j == size - 1: + return -coeffs[-1 - i] + elif i == j + 1: + return kls.one + return kls.zero + return kls._new(size, size, entry) + + + @classmethod + def wilkinson(kls, n, **kwargs): + """Returns two square Wilkinson Matrix of size 2*n + 1 + $W_{2n + 1}^-, W_{2n + 1}^+ =$ Wilkinson(n) + + Examples + ======== + + >>> from sympy import Matrix + >>> wminus, wplus = Matrix.wilkinson(3) + >>> wminus + Matrix([ + [-3, 1, 0, 0, 0, 0, 0], + [ 1, -2, 1, 0, 0, 0, 0], + [ 0, 1, -1, 1, 0, 0, 0], + [ 0, 0, 1, 0, 1, 0, 0], + [ 0, 0, 0, 1, 1, 1, 0], + [ 0, 0, 0, 0, 1, 2, 1], + [ 0, 0, 0, 0, 0, 1, 3]]) + >>> wplus + Matrix([ + [3, 1, 0, 0, 0, 0, 0], + [1, 2, 1, 0, 0, 0, 0], + [0, 1, 1, 1, 0, 0, 0], + [0, 0, 1, 0, 1, 0, 0], + [0, 0, 0, 1, 1, 1, 0], + [0, 0, 0, 0, 1, 2, 1], + [0, 0, 0, 0, 0, 1, 3]]) + + References + ========== + + .. [1] https://blogs.mathworks.com/cleve/2013/04/15/wilkinsons-matrices-2/ + .. [2] J. H. Wilkinson, The Algebraic Eigenvalue Problem, Claredon Press, Oxford, 1965, 662 pp. + + """ + klass = kwargs.get('cls', kls) + n = as_int(n) + return klass._eval_wilkinson(n) + + # The RepMatrix subclass uses more efficient sparse implementations of + # _eval_iter_values and other things. + + def _eval_iter_values(self): + return (i for i in self if i is not S.Zero) + + def _eval_values(self): + return list(self.iter_values()) + + def _eval_iter_items(self): + for i in range(self.rows): + for j in range(self.cols): + if self[i, j]: + yield (i, j), self[i, j] + + def _eval_atoms(self, *types): + values = self.values() + if len(values) < self.rows * self.cols and isinstance(S.Zero, types): + s = {S.Zero} + else: + s = set() + return s.union(*[v.atoms(*types) for v in values]) + + def _eval_free_symbols(self): + return set().union(*(i.free_symbols for i in set(self.values()))) + + def _eval_has(self, *patterns): + return any(a.has(*patterns) for a in self.iter_values()) + + def _eval_is_symbolic(self): + return self.has(Symbol) + + # _eval_is_hermitian is called by some general SymPy + # routines and has a different *args signature. Make + # sure the names don't clash by adding `_matrix_` in name. + def _eval_is_matrix_hermitian(self, simpfunc): + herm = lambda i, j: simpfunc(self[i, j] - self[j, i].adjoint()).is_zero + return fuzzy_and(herm(i, j) for (i, j), v in self.iter_items()) + + def _eval_is_zero_matrix(self): + return fuzzy_and(v.is_zero for v in self.iter_values()) + + def _eval_is_Identity(self) -> FuzzyBool: + one = self.one + zero = self.zero + ident = lambda i, j, v: v is one if i == j else v is zero + return all(ident(i, j, v) for (i, j), v in self.iter_items()) + + def _eval_is_diagonal(self): + return fuzzy_and(v.is_zero for (i, j), v in self.iter_items() if i != j) + + def _eval_is_lower(self): + return all(v.is_zero for (i, j), v in self.iter_items() if i < j) + + def _eval_is_upper(self): + return all(v.is_zero for (i, j), v in self.iter_items() if i > j) + + def _eval_is_lower_hessenberg(self): + return all(v.is_zero for (i, j), v in self.iter_items() if i + 1 < j) + + def _eval_is_upper_hessenberg(self): + return all(v.is_zero for (i, j), v in self.iter_items() if i > j + 1) + + def _eval_is_symmetric(self, simpfunc): + sym = lambda i, j: simpfunc(self[i, j] - self[j, i]).is_zero + return fuzzy_and(sym(i, j) for (i, j), v in self.iter_items()) + + def _eval_is_anti_symmetric(self, simpfunc): + anti = lambda i, j: simpfunc(self[i, j] + self[j, i]).is_zero + return fuzzy_and(anti(i, j) for (i, j), v in self.iter_items()) + + def _has_positive_diagonals(self): + diagonal_entries = (self[i, i] for i in range(self.rows)) + return fuzzy_and(x.is_positive for x in diagonal_entries) + + def _has_nonnegative_diagonals(self): + diagonal_entries = (self[i, i] for i in range(self.rows)) + return fuzzy_and(x.is_nonnegative for x in diagonal_entries) + + def atoms(self, *types): + """Returns the atoms that form the current object. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy import Matrix + >>> Matrix([[x]]) + Matrix([[x]]) + >>> _.atoms() + {x} + >>> Matrix([[x, y], [y, x]]) + Matrix([ + [x, y], + [y, x]]) + >>> _.atoms() + {x, y} + """ + + types = tuple(t if isinstance(t, type) else type(t) for t in types) + if not types: + types = (Atom,) + return self._eval_atoms(*types) + + @property + def free_symbols(self): + """Returns the free symbols within the matrix. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import Matrix + >>> Matrix([[x], [1]]).free_symbols + {x} + """ + return self._eval_free_symbols() + + def has(self, *patterns): + """Test whether any subexpression matches any of the patterns. + + Examples + ======== + + >>> from sympy import Matrix, SparseMatrix, Float + >>> from sympy.abc import x, y + >>> A = Matrix(((1, x), (0.2, 3))) + >>> B = SparseMatrix(((1, x), (0.2, 3))) + >>> A.has(x) + True + >>> A.has(y) + False + >>> A.has(Float) + True + >>> B.has(x) + True + >>> B.has(y) + False + >>> B.has(Float) + True + """ + return self._eval_has(*patterns) + + def is_anti_symmetric(self, simplify=True): + """Check if matrix M is an antisymmetric matrix, + that is, M is a square matrix with all M[i, j] == -M[j, i]. + + When ``simplify=True`` (default), the sum M[i, j] + M[j, i] is + simplified before testing to see if it is zero. By default, + the SymPy simplify function is used. To use a custom function + set simplify to a function that accepts a single argument which + returns a simplified expression. To skip simplification, set + simplify to False but note that although this will be faster, + it may induce false negatives. + + Examples + ======== + + >>> from sympy import Matrix, symbols + >>> m = Matrix(2, 2, [0, 1, -1, 0]) + >>> m + Matrix([ + [ 0, 1], + [-1, 0]]) + >>> m.is_anti_symmetric() + True + >>> x, y = symbols('x y') + >>> m = Matrix(2, 3, [0, 0, x, -y, 0, 0]) + >>> m + Matrix([ + [ 0, 0, x], + [-y, 0, 0]]) + >>> m.is_anti_symmetric() + False + + >>> from sympy.abc import x, y + >>> m = Matrix(3, 3, [0, x**2 + 2*x + 1, y, + ... -(x + 1)**2, 0, x*y, + ... -y, -x*y, 0]) + + Simplification of matrix elements is done by default so even + though two elements which should be equal and opposite would not + pass an equality test, the matrix is still reported as + anti-symmetric: + + >>> m[0, 1] == -m[1, 0] + False + >>> m.is_anti_symmetric() + True + + If ``simplify=False`` is used for the case when a Matrix is already + simplified, this will speed things up. Here, we see that without + simplification the matrix does not appear anti-symmetric: + + >>> print(m.is_anti_symmetric(simplify=False)) + None + + But if the matrix were already expanded, then it would appear + anti-symmetric and simplification in the is_anti_symmetric routine + is not needed: + + >>> m = m.expand() + >>> m.is_anti_symmetric(simplify=False) + True + """ + # accept custom simplification + simpfunc = simplify + if not isfunction(simplify): + simpfunc = _utilities_simplify if simplify else lambda x: x + + if not self.is_square: + return False + return self._eval_is_anti_symmetric(simpfunc) + + def is_diagonal(self): + """Check if matrix is diagonal, + that is matrix in which the entries outside the main diagonal are all zero. + + Examples + ======== + + >>> from sympy import Matrix, diag + >>> m = Matrix(2, 2, [1, 0, 0, 2]) + >>> m + Matrix([ + [1, 0], + [0, 2]]) + >>> m.is_diagonal() + True + + >>> m = Matrix(2, 2, [1, 1, 0, 2]) + >>> m + Matrix([ + [1, 1], + [0, 2]]) + >>> m.is_diagonal() + False + + >>> m = diag(1, 2, 3) + >>> m + Matrix([ + [1, 0, 0], + [0, 2, 0], + [0, 0, 3]]) + >>> m.is_diagonal() + True + + See Also + ======== + + is_lower + is_upper + sympy.matrices.matrixbase.MatrixBase.is_diagonalizable + diagonalize + """ + return self._eval_is_diagonal() + + @property + def is_weakly_diagonally_dominant(self): + r"""Tests if the matrix is row weakly diagonally dominant. + + Explanation + =========== + + A $n, n$ matrix $A$ is row weakly diagonally dominant if + + .. math:: + \left|A_{i, i}\right| \ge \sum_{j = 0, j \neq i}^{n-1} + \left|A_{i, j}\right| \quad {\text{for all }} + i \in \{ 0, ..., n-1 \} + + Examples + ======== + + >>> from sympy import Matrix + >>> A = Matrix([[3, -2, 1], [1, -3, 2], [-1, 2, 4]]) + >>> A.is_weakly_diagonally_dominant + True + + >>> A = Matrix([[-2, 2, 1], [1, 3, 2], [1, -2, 0]]) + >>> A.is_weakly_diagonally_dominant + False + + >>> A = Matrix([[-4, 2, 1], [1, 6, 2], [1, -2, 5]]) + >>> A.is_weakly_diagonally_dominant + True + + Notes + ===== + + If you want to test whether a matrix is column diagonally + dominant, you can apply the test after transposing the matrix. + """ + if not self.is_square: + return False + + rows, cols = self.shape + + def test_row(i): + summation = self.zero + for j in range(cols): + if i != j: + summation += Abs(self[i, j]) + return (Abs(self[i, i]) - summation).is_nonnegative + + return fuzzy_and(test_row(i) for i in range(rows)) + + @property + def is_strongly_diagonally_dominant(self): + r"""Tests if the matrix is row strongly diagonally dominant. + + Explanation + =========== + + A $n, n$ matrix $A$ is row strongly diagonally dominant if + + .. math:: + \left|A_{i, i}\right| > \sum_{j = 0, j \neq i}^{n-1} + \left|A_{i, j}\right| \quad {\text{for all }} + i \in \{ 0, ..., n-1 \} + + Examples + ======== + + >>> from sympy import Matrix + >>> A = Matrix([[3, -2, 1], [1, -3, 2], [-1, 2, 4]]) + >>> A.is_strongly_diagonally_dominant + False + + >>> A = Matrix([[-2, 2, 1], [1, 3, 2], [1, -2, 0]]) + >>> A.is_strongly_diagonally_dominant + False + + >>> A = Matrix([[-4, 2, 1], [1, 6, 2], [1, -2, 5]]) + >>> A.is_strongly_diagonally_dominant + True + + Notes + ===== + + If you want to test whether a matrix is column diagonally + dominant, you can apply the test after transposing the matrix. + """ + if not self.is_square: + return False + + rows, cols = self.shape + + def test_row(i): + summation = self.zero + for j in range(cols): + if i != j: + summation += Abs(self[i, j]) + return (Abs(self[i, i]) - summation).is_positive + + return fuzzy_and(test_row(i) for i in range(rows)) + + @property + def is_hermitian(self): + """Checks if the matrix is Hermitian. + + In a Hermitian matrix element i,j is the complex conjugate of + element j,i. + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy import I + >>> from sympy.abc import x + >>> a = Matrix([[1, I], [-I, 1]]) + >>> a + Matrix([ + [ 1, I], + [-I, 1]]) + >>> a.is_hermitian + True + >>> a[0, 0] = 2*I + >>> a.is_hermitian + False + >>> a[0, 0] = x + >>> a.is_hermitian + >>> a[0, 1] = a[1, 0]*I + >>> a.is_hermitian + False + """ + if not self.is_square: + return False + + return self._eval_is_matrix_hermitian(_utilities_simplify) + + @property + def is_Identity(self) -> FuzzyBool: + if not self.is_square: + return False + return self._eval_is_Identity() + + @property + def is_lower_hessenberg(self): + r"""Checks if the matrix is in the lower-Hessenberg form. + + The lower hessenberg matrix has zero entries + above the first superdiagonal. + + Examples + ======== + + >>> from sympy import Matrix + >>> a = Matrix([[1, 2, 0, 0], [5, 2, 3, 0], [3, 4, 3, 7], [5, 6, 1, 1]]) + >>> a + Matrix([ + [1, 2, 0, 0], + [5, 2, 3, 0], + [3, 4, 3, 7], + [5, 6, 1, 1]]) + >>> a.is_lower_hessenberg + True + + See Also + ======== + + is_upper_hessenberg + is_lower + """ + return self._eval_is_lower_hessenberg() + + @property + def is_lower(self): + """Check if matrix is a lower triangular matrix. True can be returned + even if the matrix is not square. + + Examples + ======== + + >>> from sympy import Matrix + >>> m = Matrix(2, 2, [1, 0, 0, 1]) + >>> m + Matrix([ + [1, 0], + [0, 1]]) + >>> m.is_lower + True + + >>> m = Matrix(4, 3, [0, 0, 0, 2, 0, 0, 1, 4, 0, 6, 6, 5]) + >>> m + Matrix([ + [0, 0, 0], + [2, 0, 0], + [1, 4, 0], + [6, 6, 5]]) + >>> m.is_lower + True + + >>> from sympy.abc import x, y + >>> m = Matrix(2, 2, [x**2 + y, y**2 + x, 0, x + y]) + >>> m + Matrix([ + [x**2 + y, x + y**2], + [ 0, x + y]]) + >>> m.is_lower + False + + See Also + ======== + + is_upper + is_diagonal + is_lower_hessenberg + """ + return self._eval_is_lower() + + @property + def is_square(self): + """Checks if a matrix is square. + + A matrix is square if the number of rows equals the number of columns. + The empty matrix is square by definition, since the number of rows and + the number of columns are both zero. + + Examples + ======== + + >>> from sympy import Matrix + >>> a = Matrix([[1, 2, 3], [4, 5, 6]]) + >>> b = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + >>> c = Matrix([]) + >>> a.is_square + False + >>> b.is_square + True + >>> c.is_square + True + """ + return self.rows == self.cols + + def is_symbolic(self): + """Checks if any elements contain Symbols. + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.abc import x, y + >>> M = Matrix([[x, y], [1, 0]]) + >>> M.is_symbolic() + True + + """ + return self._eval_is_symbolic() + + def is_symmetric(self, simplify=True): + """Check if matrix is symmetric matrix, + that is square matrix and is equal to its transpose. + + By default, simplifications occur before testing symmetry. + They can be skipped using 'simplify=False'; while speeding things a bit, + this may however induce false negatives. + + Examples + ======== + + >>> from sympy import Matrix + >>> m = Matrix(2, 2, [0, 1, 1, 2]) + >>> m + Matrix([ + [0, 1], + [1, 2]]) + >>> m.is_symmetric() + True + + >>> m = Matrix(2, 2, [0, 1, 2, 0]) + >>> m + Matrix([ + [0, 1], + [2, 0]]) + >>> m.is_symmetric() + False + + >>> m = Matrix(2, 3, [0, 0, 0, 0, 0, 0]) + >>> m + Matrix([ + [0, 0, 0], + [0, 0, 0]]) + >>> m.is_symmetric() + False + + >>> from sympy.abc import x, y + >>> m = Matrix(3, 3, [1, x**2 + 2*x + 1, y, (x + 1)**2, 2, 0, y, 0, 3]) + >>> m + Matrix([ + [ 1, x**2 + 2*x + 1, y], + [(x + 1)**2, 2, 0], + [ y, 0, 3]]) + >>> m.is_symmetric() + True + + If the matrix is already simplified, you may speed-up is_symmetric() + test by using 'simplify=False'. + + >>> bool(m.is_symmetric(simplify=False)) + False + >>> m1 = m.expand() + >>> m1.is_symmetric(simplify=False) + True + """ + simpfunc = simplify + if not isfunction(simplify): + simpfunc = _utilities_simplify if simplify else lambda x: x + + if not self.is_square: + return False + + return self._eval_is_symmetric(simpfunc) + + @property + def is_upper_hessenberg(self): + """Checks if the matrix is the upper-Hessenberg form. + + The upper hessenberg matrix has zero entries + below the first subdiagonal. + + Examples + ======== + + >>> from sympy import Matrix + >>> a = Matrix([[1, 4, 2, 3], [3, 4, 1, 7], [0, 2, 3, 4], [0, 0, 1, 3]]) + >>> a + Matrix([ + [1, 4, 2, 3], + [3, 4, 1, 7], + [0, 2, 3, 4], + [0, 0, 1, 3]]) + >>> a.is_upper_hessenberg + True + + See Also + ======== + + is_lower_hessenberg + is_upper + """ + return self._eval_is_upper_hessenberg() + + @property + def is_upper(self): + """Check if matrix is an upper triangular matrix. True can be returned + even if the matrix is not square. + + Examples + ======== + + >>> from sympy import Matrix + >>> m = Matrix(2, 2, [1, 0, 0, 1]) + >>> m + Matrix([ + [1, 0], + [0, 1]]) + >>> m.is_upper + True + + >>> m = Matrix(4, 3, [5, 1, 9, 0, 4, 6, 0, 0, 5, 0, 0, 0]) + >>> m + Matrix([ + [5, 1, 9], + [0, 4, 6], + [0, 0, 5], + [0, 0, 0]]) + >>> m.is_upper + True + + >>> m = Matrix(2, 3, [4, 2, 5, 6, 1, 1]) + >>> m + Matrix([ + [4, 2, 5], + [6, 1, 1]]) + >>> m.is_upper + False + + See Also + ======== + + is_lower + is_diagonal + is_upper_hessenberg + """ + return self._eval_is_upper() + + @property + def is_zero_matrix(self): + """Checks if a matrix is a zero matrix. + + A matrix is zero if every element is zero. A matrix need not be square + to be considered zero. The empty matrix is zero by the principle of + vacuous truth. For a matrix that may or may not be zero (e.g. + contains a symbol), this will be None + + Examples + ======== + + >>> from sympy import Matrix, zeros + >>> from sympy.abc import x + >>> a = Matrix([[0, 0], [0, 0]]) + >>> b = zeros(3, 4) + >>> c = Matrix([[0, 1], [0, 0]]) + >>> d = Matrix([]) + >>> e = Matrix([[x, 0], [0, 0]]) + >>> a.is_zero_matrix + True + >>> b.is_zero_matrix + True + >>> c.is_zero_matrix + False + >>> d.is_zero_matrix + True + >>> e.is_zero_matrix + """ + return self._eval_is_zero_matrix() + + def values(self): + """Return non-zero values of self. + + Examples + ======== + + >>> from sympy import Matrix + >>> m = Matrix([[0, 1], [2, 3]]) + >>> m.values() + [1, 2, 3] + + See Also + ======== + + iter_values + tolist + flat + """ + return self._eval_values() + + def iter_values(self): + """ + Iterate over non-zero values of self. + + Examples + ======== + + >>> from sympy import Matrix + >>> m = Matrix([[0, 1], [2, 3]]) + >>> list(m.iter_values()) + [1, 2, 3] + + See Also + ======== + + values + """ + return self._eval_iter_values() + + def iter_items(self): + """Iterate over indices and values of nonzero items. + + Examples + ======== + + >>> from sympy import Matrix + >>> m = Matrix([[0, 1], [2, 3]]) + >>> list(m.iter_items()) + [((0, 1), 1), ((1, 0), 2), ((1, 1), 3)] + + See Also + ======== + + iter_values + todok + """ + return self._eval_iter_items() + + def _eval_adjoint(self): + return self.transpose().applyfunc(lambda x: x.adjoint()) + + def _eval_applyfunc(self, f): + cols = self.cols + size = self.rows*self.cols + + dok = self.todok() + valmap = {v: f(v) for v in dok.values()} + + if len(dok) < size and ((fzero := f(S.Zero)) is not S.Zero): + out_flat = [fzero]*size + for (i, j), v in dok.items(): + out_flat[i*cols + j] = valmap[v] + out = self._new(self.rows, self.cols, out_flat) + else: + fdok = {ij: valmap[v] for ij, v in dok.items()} + out = self.from_dok(self.rows, self.cols, fdok) + + return out + + def _eval_as_real_imag(self): # type: ignore + return (self.applyfunc(re), self.applyfunc(im)) + + def _eval_conjugate(self): + return self.applyfunc(lambda x: x.conjugate()) + + def _eval_permute_cols(self, perm): + # apply the permutation to a list + mapping = list(perm) + + def entry(i, j): + return self[i, mapping[j]] + + return self._new(self.rows, self.cols, entry) + + def _eval_permute_rows(self, perm): + # apply the permutation to a list + mapping = list(perm) + + def entry(i, j): + return self[mapping[i], j] + + return self._new(self.rows, self.cols, entry) + + def _eval_trace(self): + return sum(self[i, i] for i in range(self.rows)) + + def _eval_transpose(self): + return self._new(self.cols, self.rows, lambda i, j: self[j, i]) + + def adjoint(self): + """Conjugate transpose or Hermitian conjugation.""" + return self._eval_adjoint() + + def applyfunc(self, f): + """Apply a function to each element of the matrix. + + Examples + ======== + + >>> from sympy import Matrix + >>> m = Matrix(2, 2, lambda i, j: i*2+j) + >>> m + Matrix([ + [0, 1], + [2, 3]]) + >>> m.applyfunc(lambda i: 2*i) + Matrix([ + [0, 2], + [4, 6]]) + + """ + if not callable(f): + raise TypeError("`f` must be callable.") + + return self._eval_applyfunc(f) + + def as_real_imag(self, deep=True, **hints): + """Returns a tuple containing the (real, imaginary) part of matrix.""" + # XXX: Ignoring deep and hints... + return self._eval_as_real_imag() + + def conjugate(self): + """Return the by-element conjugation. + + Examples + ======== + + >>> from sympy import SparseMatrix, I + >>> a = SparseMatrix(((1, 2 + I), (3, 4), (I, -I))) + >>> a + Matrix([ + [1, 2 + I], + [3, 4], + [I, -I]]) + >>> a.C + Matrix([ + [ 1, 2 - I], + [ 3, 4], + [-I, I]]) + + See Also + ======== + + transpose: Matrix transposition + H: Hermite conjugation + sympy.matrices.matrixbase.MatrixBase.D: Dirac conjugation + """ + return self._eval_conjugate() + + def doit(self, **hints): + return self.applyfunc(lambda x: x.doit(**hints)) + + def evalf(self, n=15, subs=None, maxn=100, chop=False, strict=False, quad=None, verbose=False): + """Apply evalf() to each element of self.""" + options = {'subs':subs, 'maxn':maxn, 'chop':chop, 'strict':strict, + 'quad':quad, 'verbose':verbose} + return self.applyfunc(lambda i: i.evalf(n, **options)) + + def expand(self, deep=True, modulus=None, power_base=True, power_exp=True, + mul=True, log=True, multinomial=True, basic=True, **hints): + """Apply core.function.expand to each entry of the matrix. + + Examples + ======== + + >>> from sympy.abc import x + >>> from sympy import Matrix + >>> Matrix(1, 1, [x*(x+1)]) + Matrix([[x*(x + 1)]]) + >>> _.expand() + Matrix([[x**2 + x]]) + + """ + return self.applyfunc(lambda x: x.expand( + deep, modulus, power_base, power_exp, mul, log, multinomial, basic, + **hints)) + + @property + def H(self): + """Return Hermite conjugate. + + Examples + ======== + + >>> from sympy import Matrix, I + >>> m = Matrix((0, 1 + I, 2, 3)) + >>> m + Matrix([ + [ 0], + [1 + I], + [ 2], + [ 3]]) + >>> m.H + Matrix([[0, 1 - I, 2, 3]]) + + See Also + ======== + + conjugate: By-element conjugation + sympy.matrices.matrixbase.MatrixBase.D: Dirac conjugation + """ + return self.adjoint() + + def permute(self, perm, orientation='rows', direction='forward'): + r"""Permute the rows or columns of a matrix by the given list of + swaps. + + Parameters + ========== + + perm : Permutation, list, or list of lists + A representation for the permutation. + + If it is ``Permutation``, it is used directly with some + resizing with respect to the matrix size. + + If it is specified as list of lists, + (e.g., ``[[0, 1], [0, 2]]``), then the permutation is formed + from applying the product of cycles. The direction how the + cyclic product is applied is described in below. + + If it is specified as a list, the list should represent + an array form of a permutation. (e.g., ``[1, 2, 0]``) which + would would form the swapping function + `0 \mapsto 1, 1 \mapsto 2, 2\mapsto 0`. + + orientation : 'rows', 'cols' + A flag to control whether to permute the rows or the columns + + direction : 'forward', 'backward' + A flag to control whether to apply the permutations from + the start of the list first, or from the back of the list + first. + + For example, if the permutation specification is + ``[[0, 1], [0, 2]]``, + + If the flag is set to ``'forward'``, the cycle would be + formed as `0 \mapsto 2, 2 \mapsto 1, 1 \mapsto 0`. + + If the flag is set to ``'backward'``, the cycle would be + formed as `0 \mapsto 1, 1 \mapsto 2, 2 \mapsto 0`. + + If the argument ``perm`` is not in a form of list of lists, + this flag takes no effect. + + Examples + ======== + + >>> from sympy import eye + >>> M = eye(3) + >>> M.permute([[0, 1], [0, 2]], orientation='rows', direction='forward') + Matrix([ + [0, 0, 1], + [1, 0, 0], + [0, 1, 0]]) + + >>> from sympy import eye + >>> M = eye(3) + >>> M.permute([[0, 1], [0, 2]], orientation='rows', direction='backward') + Matrix([ + [0, 1, 0], + [0, 0, 1], + [1, 0, 0]]) + + Notes + ===== + + If a bijective function + `\sigma : \mathbb{N}_0 \rightarrow \mathbb{N}_0` denotes the + permutation. + + If the matrix `A` is the matrix to permute, represented as + a horizontal or a vertical stack of vectors: + + .. math:: + A = + \begin{bmatrix} + a_0 \\ a_1 \\ \vdots \\ a_{n-1} + \end{bmatrix} = + \begin{bmatrix} + \alpha_0 & \alpha_1 & \cdots & \alpha_{n-1} + \end{bmatrix} + + If the matrix `B` is the result, the permutation of matrix rows + is defined as: + + .. math:: + B := \begin{bmatrix} + a_{\sigma(0)} \\ a_{\sigma(1)} \\ \vdots \\ a_{\sigma(n-1)} + \end{bmatrix} + + And the permutation of matrix columns is defined as: + + .. math:: + B := \begin{bmatrix} + \alpha_{\sigma(0)} & \alpha_{\sigma(1)} & + \cdots & \alpha_{\sigma(n-1)} + \end{bmatrix} + """ + from sympy.combinatorics import Permutation + + # allow british variants and `columns` + if direction == 'forwards': + direction = 'forward' + if direction == 'backwards': + direction = 'backward' + if orientation == 'columns': + orientation = 'cols' + + if direction not in ('forward', 'backward'): + raise TypeError("direction='{}' is an invalid kwarg. " + "Try 'forward' or 'backward'".format(direction)) + if orientation not in ('rows', 'cols'): + raise TypeError("orientation='{}' is an invalid kwarg. " + "Try 'rows' or 'cols'".format(orientation)) + + if not isinstance(perm, (Permutation, Iterable)): + raise ValueError( + "{} must be a list, a list of lists, " + "or a SymPy permutation object.".format(perm)) + + # ensure all swaps are in range + max_index = self.rows if orientation == 'rows' else self.cols + if not all(0 <= t <= max_index for t in flatten(list(perm))): + raise IndexError("`swap` indices out of range.") + + if perm and not isinstance(perm, Permutation) and \ + isinstance(perm[0], Iterable): + if direction == 'forward': + perm = list(reversed(perm)) + perm = Permutation(perm, size=max_index+1) + else: + perm = Permutation(perm, size=max_index+1) + + if orientation == 'rows': + return self._eval_permute_rows(perm) + if orientation == 'cols': + return self._eval_permute_cols(perm) + + def permute_cols(self, swaps, direction='forward'): + """Alias for + ``self.permute(swaps, orientation='cols', direction=direction)`` + + See Also + ======== + + permute + """ + return self.permute(swaps, orientation='cols', direction=direction) + + def permute_rows(self, swaps, direction='forward'): + """Alias for + ``self.permute(swaps, orientation='rows', direction=direction)`` + + See Also + ======== + + permute + """ + return self.permute(swaps, orientation='rows', direction=direction) + + def refine(self, assumptions=True): + """Apply refine to each element of the matrix. + + Examples + ======== + + >>> from sympy import Symbol, Matrix, Abs, sqrt, Q + >>> x = Symbol('x') + >>> Matrix([[Abs(x)**2, sqrt(x**2)],[sqrt(x**2), Abs(x)**2]]) + Matrix([ + [ Abs(x)**2, sqrt(x**2)], + [sqrt(x**2), Abs(x)**2]]) + >>> _.refine(Q.real(x)) + Matrix([ + [ x**2, Abs(x)], + [Abs(x), x**2]]) + + """ + return self.applyfunc(lambda x: refine(x, assumptions)) + + def replace(self, F, G, map=False, simultaneous=True, exact=None): + """Replaces Function F in Matrix entries with Function G. + + Examples + ======== + + >>> from sympy import symbols, Function, Matrix + >>> F, G = symbols('F, G', cls=Function) + >>> M = Matrix(2, 2, lambda i, j: F(i+j)) ; M + Matrix([ + [F(0), F(1)], + [F(1), F(2)]]) + >>> N = M.replace(F,G) + >>> N + Matrix([ + [G(0), G(1)], + [G(1), G(2)]]) + """ + kwargs = {'map': map, 'simultaneous': simultaneous, 'exact': exact} + + if map: + + d = {} + def func(eij): + eij, dij = eij.replace(F, G, **kwargs) + d.update(dij) + return eij + + M = self.applyfunc(func) + return M, d + + else: + return self.applyfunc(lambda i: i.replace(F, G, **kwargs)) + + def rot90(self, k=1): + """Rotates Matrix by 90 degrees + + Parameters + ========== + + k : int + Specifies how many times the matrix is rotated by 90 degrees + (clockwise when positive, counter-clockwise when negative). + + Examples + ======== + + >>> from sympy import Matrix, symbols + >>> A = Matrix(2, 2, symbols('a:d')) + >>> A + Matrix([ + [a, b], + [c, d]]) + + Rotating the matrix clockwise one time: + + >>> A.rot90(1) + Matrix([ + [c, a], + [d, b]]) + + Rotating the matrix anticlockwise two times: + + >>> A.rot90(-2) + Matrix([ + [d, c], + [b, a]]) + """ + + mod = k%4 + if mod == 0: + return self + if mod == 1: + return self[::-1, ::].T + if mod == 2: + return self[::-1, ::-1] + if mod == 3: + return self[::, ::-1].T + + def simplify(self, **kwargs): + """Apply simplify to each element of the matrix. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy import SparseMatrix, sin, cos + >>> SparseMatrix(1, 1, [x*sin(y)**2 + x*cos(y)**2]) + Matrix([[x*sin(y)**2 + x*cos(y)**2]]) + >>> _.simplify() + Matrix([[x]]) + """ + return self.applyfunc(lambda x: x.simplify(**kwargs)) + + def subs(self, *args, **kwargs): # should mirror core.basic.subs + """Return a new matrix with subs applied to each entry. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy import SparseMatrix, Matrix + >>> SparseMatrix(1, 1, [x]) + Matrix([[x]]) + >>> _.subs(x, y) + Matrix([[y]]) + >>> Matrix(_).subs(y, x) + Matrix([[x]]) + """ + + if len(args) == 1 and not isinstance(args[0], (dict, set)) and iter(args[0]) and not is_sequence(args[0]): + args = (list(args[0]),) + + return self.applyfunc(lambda x: x.subs(*args, **kwargs)) + + def trace(self): + """ + Returns the trace of a square matrix i.e. the sum of the + diagonal elements. + + Examples + ======== + + >>> from sympy import Matrix + >>> A = Matrix(2, 2, [1, 2, 3, 4]) + >>> A.trace() + 5 + + """ + if self.rows != self.cols: + raise NonSquareMatrixError() + return self._eval_trace() + + def transpose(self): + """ + Returns the transpose of the matrix. + + Examples + ======== + + >>> from sympy import Matrix + >>> A = Matrix(2, 2, [1, 2, 3, 4]) + >>> A.transpose() + Matrix([ + [1, 3], + [2, 4]]) + + >>> from sympy import Matrix, I + >>> m=Matrix(((1, 2+I), (3, 4))) + >>> m + Matrix([ + [1, 2 + I], + [3, 4]]) + >>> m.transpose() + Matrix([ + [ 1, 3], + [2 + I, 4]]) + >>> m.T == m.transpose() + True + + See Also + ======== + + conjugate: By-element conjugation + + """ + return self._eval_transpose() + + @property + def T(self): + '''Matrix transposition''' + return self.transpose() + + @property + def C(self): + '''By-element conjugation''' + return self.conjugate() + + def n(self, *args, **kwargs): + """Apply evalf() to each element of self.""" + return self.evalf(*args, **kwargs) + + def xreplace(self, rule): # should mirror core.basic.xreplace + """Return a new matrix with xreplace applied to each entry. + + Examples + ======== + + >>> from sympy.abc import x, y + >>> from sympy import SparseMatrix, Matrix + >>> SparseMatrix(1, 1, [x]) + Matrix([[x]]) + >>> _.xreplace({x: y}) + Matrix([[y]]) + >>> Matrix(_).xreplace({y: x}) + Matrix([[x]]) + """ + return self.applyfunc(lambda x: x.xreplace(rule)) + + def _eval_simplify(self, **kwargs): + # XXX: We can't use self.simplify here as mutable subclasses will + # override simplify and have it return None + return self.applyfunc(lambda x: x.simplify(**kwargs)) + + def _eval_trigsimp(self, **opts): + from sympy.simplify.trigsimp import trigsimp + return self.applyfunc(lambda x: trigsimp(x, **opts)) + + def upper_triangular(self, k=0): + """Return the elements on and above the kth diagonal of a matrix. + If k is not specified then simply returns upper-triangular portion + of a matrix + + Examples + ======== + + >>> from sympy import ones + >>> A = ones(4) + >>> A.upper_triangular() + Matrix([ + [1, 1, 1, 1], + [0, 1, 1, 1], + [0, 0, 1, 1], + [0, 0, 0, 1]]) + + >>> A.upper_triangular(2) + Matrix([ + [0, 0, 1, 1], + [0, 0, 0, 1], + [0, 0, 0, 0], + [0, 0, 0, 0]]) + + >>> A.upper_triangular(-1) + Matrix([ + [1, 1, 1, 1], + [1, 1, 1, 1], + [0, 1, 1, 1], + [0, 0, 1, 1]]) + + """ + + def entry(i, j): + return self[i, j] if i + k <= j else self.zero + + return self._new(self.rows, self.cols, entry) + + def lower_triangular(self, k=0): + """Return the elements on and below the kth diagonal of a matrix. + If k is not specified then simply returns lower-triangular portion + of a matrix + + Examples + ======== + + >>> from sympy import ones + >>> A = ones(4) + >>> A.lower_triangular() + Matrix([ + [1, 0, 0, 0], + [1, 1, 0, 0], + [1, 1, 1, 0], + [1, 1, 1, 1]]) + + >>> A.lower_triangular(-2) + Matrix([ + [0, 0, 0, 0], + [0, 0, 0, 0], + [1, 0, 0, 0], + [1, 1, 0, 0]]) + + >>> A.lower_triangular(1) + Matrix([ + [1, 1, 0, 0], + [1, 1, 1, 0], + [1, 1, 1, 1], + [1, 1, 1, 1]]) + + """ + + def entry(i, j): + return self[i, j] if i + k >= j else self.zero + + return self._new(self.rows, self.cols, entry) + + def _eval_Abs(self): + return self._new(self.rows, self.cols, lambda i, j: Abs(self[i, j])) + + def _eval_add(self, other): + return self._new(self.rows, self.cols, + lambda i, j: self[i, j] + other[i, j]) + + def _eval_matrix_mul(self, other): + def entry(i, j): + vec = [self[i,k]*other[k,j] for k in range(self.cols)] + try: + return Add(*vec) + except (TypeError, SympifyError): + # Some matrices don't work with `sum` or `Add` + # They don't work with `sum` because `sum` tries to add `0` + # Fall back to a safe way to multiply if the `Add` fails. + return reduce(lambda a, b: a + b, vec) + + return self._new(self.rows, other.cols, entry) + + def _eval_matrix_mul_elementwise(self, other): + return self._new(self.rows, self.cols, lambda i, j: self[i,j]*other[i,j]) + + def _eval_matrix_rmul(self, other): + def entry(i, j): + return sum(other[i,k]*self[k,j] for k in range(other.cols)) + return self._new(other.rows, self.cols, entry) + + def _eval_pow_by_recursion(self, num): + if num == 1: + return self + + if num % 2 == 1: + a, b = self, self._eval_pow_by_recursion(num - 1) + else: + a = b = self._eval_pow_by_recursion(num // 2) + + return a.multiply(b) + + def _eval_pow_by_cayley(self, exp): + from sympy.discrete.recurrences import linrec_coeffs + row = self.shape[0] + p = self.charpoly() + + coeffs = (-p).all_coeffs()[1:] + coeffs = linrec_coeffs(coeffs, exp) + new_mat = self.eye(row) + ans = self.zeros(row) + + for i in range(row): + ans += coeffs[i]*new_mat + new_mat *= self + + return ans + + def _eval_pow_by_recursion_dotprodsimp(self, num, prevsimp=None): + if prevsimp is None: + prevsimp = [True]*len(self) + + if num == 1: + return self + + if num % 2 == 1: + a, b = self, self._eval_pow_by_recursion_dotprodsimp(num - 1, + prevsimp=prevsimp) + else: + a = b = self._eval_pow_by_recursion_dotprodsimp(num // 2, + prevsimp=prevsimp) + + m = a.multiply(b, dotprodsimp=False) + lenm = len(m) + elems = [None]*lenm + + for i in range(lenm): + if prevsimp[i]: + elems[i], prevsimp[i] = _dotprodsimp(m[i], withsimp=True) + else: + elems[i] = m[i] + + return m._new(m.rows, m.cols, elems) + + def _eval_scalar_mul(self, other): + return self._new(self.rows, self.cols, lambda i, j: self[i,j]*other) + + def _eval_scalar_rmul(self, other): + return self._new(self.rows, self.cols, lambda i, j: other*self[i,j]) + + def _eval_Mod(self, other): + return self._new(self.rows, self.cols, lambda i, j: Mod(self[i, j], other)) + + # Python arithmetic functions + def __abs__(self): + """Returns a new matrix with entry-wise absolute values.""" + return self._eval_Abs() + + @call_highest_priority('__radd__') + def __add__(self, other): + """Return self + other, raising ShapeError if shapes do not match.""" + + other, T = _coerce_operand(self, other) + + if T != "is_matrix": + return NotImplemented + + if self.shape != other.shape: + raise ShapeError(f"Matrix size mismatch: {self.shape} + {other.shape}.") + + # Unify matrix types + a, b = self, other + if a.__class__ != classof(a, b): + b, a = a, b + + return a._eval_add(b) + + @call_highest_priority('__rtruediv__') + def __truediv__(self, other): + return self * (self.one / other) + + @call_highest_priority('__rmatmul__') + def __matmul__(self, other): + self, other, T = _unify_with_other(self, other) + + if T != "is_matrix": + return NotImplemented + + return self.__mul__(other) + + def __mod__(self, other): + return self.applyfunc(lambda x: x % other) + + @call_highest_priority('__rmul__') + def __mul__(self, other): + """Return self*other where other is either a scalar or a matrix + of compatible dimensions. + + Examples + ======== + + >>> from sympy import Matrix + >>> A = Matrix([[1, 2, 3], [4, 5, 6]]) + >>> 2*A == A*2 == Matrix([[2, 4, 6], [8, 10, 12]]) + True + >>> B = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + >>> A*B + Matrix([ + [30, 36, 42], + [66, 81, 96]]) + >>> B*A + Traceback (most recent call last): + ... + ShapeError: Matrices size mismatch. + >>> + + See Also + ======== + + matrix_multiply_elementwise + """ + + return self.multiply(other) + + def multiply(self, other, dotprodsimp=None): + """Same as __mul__() but with optional simplification. + + Parameters + ========== + + dotprodsimp : bool, optional + Specifies whether intermediate term algebraic simplification is used + during matrix multiplications to control expression blowup and thus + speed up calculation. Default is off. + """ + + isimpbool = _get_intermediate_simp_bool(False, dotprodsimp) + + self, other, T = _unify_with_other(self, other) + + if T == "possible_scalar": + try: + return self._eval_scalar_mul(other) + except TypeError: + return NotImplemented + + elif T == "is_matrix": + + if self.shape[1] != other.shape[0]: + raise ShapeError(f"Matrix size mismatch: {self.shape} * {other.shape}.") + + m = self._eval_matrix_mul(other) + + if isimpbool: + m = m._new(m.rows, m.cols, [_dotprodsimp(e) for e in m]) + + return m + + else: + return NotImplemented + + def multiply_elementwise(self, other): + """Return the Hadamard product (elementwise product) of A and B + + Examples + ======== + + >>> from sympy import Matrix + >>> A = Matrix([[0, 1, 2], [3, 4, 5]]) + >>> B = Matrix([[1, 10, 100], [100, 10, 1]]) + >>> A.multiply_elementwise(B) + Matrix([ + [ 0, 10, 200], + [300, 40, 5]]) + + See Also + ======== + + sympy.matrices.matrixbase.MatrixBase.cross + sympy.matrices.matrixbase.MatrixBase.dot + multiply + """ + if self.shape != other.shape: + raise ShapeError("Matrix shapes must agree {} != {}".format(self.shape, other.shape)) + + return self._eval_matrix_mul_elementwise(other) + + def __neg__(self): + return self._eval_scalar_mul(-1) + + @call_highest_priority('__rpow__') + def __pow__(self, exp): + """Return self**exp a scalar or symbol.""" + + return self.pow(exp) + + + def pow(self, exp, method=None): + r"""Return self**exp a scalar or symbol. + + Parameters + ========== + + method : multiply, mulsimp, jordan, cayley + If multiply then it returns exponentiation using recursion. + If jordan then Jordan form exponentiation will be used. + If cayley then the exponentiation is done using Cayley-Hamilton + theorem. + If mulsimp then the exponentiation is done using recursion + with dotprodsimp. This specifies whether intermediate term + algebraic simplification is used during naive matrix power to + control expression blowup and thus speed up calculation. + If None, then it heuristically decides which method to use. + + """ + + if method is not None and method not in ['multiply', 'mulsimp', 'jordan', 'cayley']: + raise TypeError('No such method') + if self.rows != self.cols: + raise NonSquareMatrixError() + a = self + jordan_pow = getattr(a, '_matrix_pow_by_jordan_blocks', None) + exp = sympify(exp) + + if exp.is_zero: + return a._new(a.rows, a.cols, lambda i, j: int(i == j)) + if exp == 1: + return a + + diagonal = getattr(a, 'is_diagonal', None) + if diagonal is not None and diagonal(): + return a._new(a.rows, a.cols, lambda i, j: a[i,j]**exp if i == j else 0) + + if exp.is_Number and exp % 1 == 0: + if a.rows == 1: + return a._new([[a[0]**exp]]) + if exp < 0: + exp = -exp + a = a.inv() + # When certain conditions are met, + # Jordan block algorithm is faster than + # computation by recursion. + if method == 'jordan': + try: + return jordan_pow(exp) + except MatrixError: + if method == 'jordan': + raise + + elif method == 'cayley': + if not exp.is_Number or exp % 1 != 0: + raise ValueError("cayley method is only valid for integer powers") + return a._eval_pow_by_cayley(exp) + + elif method == "mulsimp": + if not exp.is_Number or exp % 1 != 0: + raise ValueError("mulsimp method is only valid for integer powers") + return a._eval_pow_by_recursion_dotprodsimp(exp) + + elif method == "multiply": + if not exp.is_Number or exp % 1 != 0: + raise ValueError("multiply method is only valid for integer powers") + return a._eval_pow_by_recursion(exp) + + elif method is None and exp.is_Number and exp % 1 == 0: + if exp.is_Float: + exp = Integer(exp) + # Decide heuristically which method to apply + if a.rows == 2 and exp > 100000: + return jordan_pow(exp) + elif _get_intermediate_simp_bool(True, None): + return a._eval_pow_by_recursion_dotprodsimp(exp) + elif exp > 10000: + return a._eval_pow_by_cayley(exp) + else: + return a._eval_pow_by_recursion(exp) + + if jordan_pow: + try: + return jordan_pow(exp) + except NonInvertibleMatrixError: + # Raised by jordan_pow on zero determinant matrix unless exp is + # definitely known to be a non-negative integer. + # Here we raise if n is definitely not a non-negative integer + # but otherwise we can leave this as an unevaluated MatPow. + if exp.is_integer is False or exp.is_nonnegative is False: + raise + + from sympy.matrices.expressions import MatPow + return MatPow(a, exp) + + @call_highest_priority('__add__') + def __radd__(self, other): + return self.__add__(other) + + @call_highest_priority('__matmul__') + def __rmatmul__(self, other): + self, other, T = _unify_with_other(self, other) + + if T != "is_matrix": + return NotImplemented + + return self.__rmul__(other) + + @call_highest_priority('__mul__') + def __rmul__(self, other): + return self.rmultiply(other) + + def rmultiply(self, other, dotprodsimp=None): + """Same as __rmul__() but with optional simplification. + + Parameters + ========== + + dotprodsimp : bool, optional + Specifies whether intermediate term algebraic simplification is used + during matrix multiplications to control expression blowup and thus + speed up calculation. Default is off. + """ + isimpbool = _get_intermediate_simp_bool(False, dotprodsimp) + self, other, T = _unify_with_other(self, other) + + if T == "possible_scalar": + try: + return self._eval_scalar_rmul(other) + except TypeError: + return NotImplemented + + elif T == "is_matrix": + if self.shape[0] != other.shape[1]: + raise ShapeError("Matrix size mismatch.") + + m = self._eval_matrix_rmul(other) + + if isimpbool: + return m._new(m.rows, m.cols, [_dotprodsimp(e) for e in m]) + + return m + + else: + return NotImplemented + + @call_highest_priority('__sub__') + def __rsub__(self, a): + return (-self) + a + + @call_highest_priority('__rsub__') + def __sub__(self, a): + return self + (-a) + + def _eval_det_bareiss(self, iszerofunc=_is_zero_after_expand_mul): + return _det_bareiss(self, iszerofunc=iszerofunc) + + def _eval_det_berkowitz(self): + return _det_berkowitz(self) + + def _eval_det_lu(self, iszerofunc=_iszero, simpfunc=None): + return _det_LU(self, iszerofunc=iszerofunc, simpfunc=simpfunc) + + def _eval_det_bird(self): + return _det_bird(self) + + def _eval_det_laplace(self): + return _det_laplace(self) + + def _eval_determinant(self): # for expressions.determinant.Determinant + return _det(self) + + def adjugate(self, method="berkowitz"): + return _adjugate(self, method=method) + + def charpoly(self, x='lambda', simplify=_utilities_simplify): + return _charpoly(self, x=x, simplify=simplify) + + def cofactor(self, i, j, method="berkowitz"): + return _cofactor(self, i, j, method=method) + + def cofactor_matrix(self, method="berkowitz"): + return _cofactor_matrix(self, method=method) + + def det(self, method="bareiss", iszerofunc=None): + return _det(self, method=method, iszerofunc=iszerofunc) + + def per(self): + return _per(self) + + def minor(self, i, j, method="berkowitz"): + return _minor(self, i, j, method=method) + + def minor_submatrix(self, i, j): + return _minor_submatrix(self, i, j) + + _find_reasonable_pivot.__doc__ = _find_reasonable_pivot.__doc__ + _find_reasonable_pivot_naive.__doc__ = _find_reasonable_pivot_naive.__doc__ + _eval_det_bareiss.__doc__ = _det_bareiss.__doc__ + _eval_det_berkowitz.__doc__ = _det_berkowitz.__doc__ + _eval_det_bird.__doc__ = _det_bird.__doc__ + _eval_det_laplace.__doc__ = _det_laplace.__doc__ + _eval_det_lu.__doc__ = _det_LU.__doc__ + _eval_determinant.__doc__ = _det.__doc__ + adjugate.__doc__ = _adjugate.__doc__ + charpoly.__doc__ = _charpoly.__doc__ + cofactor.__doc__ = _cofactor.__doc__ + cofactor_matrix.__doc__ = _cofactor_matrix.__doc__ + det.__doc__ = _det.__doc__ + per.__doc__ = _per.__doc__ + minor.__doc__ = _minor.__doc__ + minor_submatrix.__doc__ = _minor_submatrix.__doc__ + + def echelon_form(self, iszerofunc=_iszero, simplify=False, with_pivots=False): + return _echelon_form(self, iszerofunc=iszerofunc, simplify=simplify, + with_pivots=with_pivots) + + @property + def is_echelon(self): + return _is_echelon(self) + + def rank(self, iszerofunc=_iszero, simplify=False): + return _rank(self, iszerofunc=iszerofunc, simplify=simplify) + + def rref_rhs(self, rhs): + """Return reduced row-echelon form of matrix, matrix showing + rhs after reduction steps. ``rhs`` must have the same number + of rows as ``self``. + + Examples + ======== + + >>> from sympy import Matrix, symbols + >>> r1, r2 = symbols('r1 r2') + >>> Matrix([[1, 1], [2, 1]]).rref_rhs(Matrix([r1, r2])) + (Matrix([ + [1, 0], + [0, 1]]), Matrix([ + [ -r1 + r2], + [2*r1 - r2]])) + """ + r, _ = _rref(self.hstack(self, self.eye(self.rows), rhs)) + return r[:, :self.cols], r[:, -rhs.cols:] + + def rref(self, iszerofunc=_iszero, simplify=False, pivots=True, + normalize_last=True): + return _rref(self, iszerofunc=iszerofunc, simplify=simplify, + pivots=pivots, normalize_last=normalize_last) + + echelon_form.__doc__ = _echelon_form.__doc__ + is_echelon.__doc__ = _is_echelon.__doc__ + rank.__doc__ = _rank.__doc__ + rref.__doc__ = _rref.__doc__ + + def _normalize_op_args(self, op, col, k, col1, col2, error_str="col"): + """Validate the arguments for a row/column operation. ``error_str`` + can be one of "row" or "col" depending on the arguments being parsed.""" + if op not in ["n->kn", "n<->m", "n->n+km"]: + raise ValueError("Unknown {} operation '{}'. Valid col operations " + "are 'n->kn', 'n<->m', 'n->n+km'".format(error_str, op)) + + # define self_col according to error_str + self_cols = self.cols if error_str == 'col' else self.rows + + # normalize and validate the arguments + if op == "n->kn": + col = col if col is not None else col1 + if col is None or k is None: + raise ValueError("For a {0} operation 'n->kn' you must provide the " + "kwargs `{0}` and `k`".format(error_str)) + if not 0 <= col < self_cols: + raise ValueError("This matrix does not have a {} '{}'".format(error_str, col)) + + elif op == "n<->m": + # we need two cols to swap. It does not matter + # how they were specified, so gather them together and + # remove `None` + cols = {col, k, col1, col2}.difference([None]) + if len(cols) > 2: + # maybe the user left `k` by mistake? + cols = {col, col1, col2}.difference([None]) + if len(cols) != 2: + raise ValueError("For a {0} operation 'n<->m' you must provide the " + "kwargs `{0}1` and `{0}2`".format(error_str)) + col1, col2 = cols + if not 0 <= col1 < self_cols: + raise ValueError("This matrix does not have a {} '{}'".format(error_str, col1)) + if not 0 <= col2 < self_cols: + raise ValueError("This matrix does not have a {} '{}'".format(error_str, col2)) + + elif op == "n->n+km": + col = col1 if col is None else col + col2 = col1 if col2 is None else col2 + if col is None or col2 is None or k is None: + raise ValueError("For a {0} operation 'n->n+km' you must provide the " + "kwargs `{0}`, `k`, and `{0}2`".format(error_str)) + if col == col2: + raise ValueError("For a {0} operation 'n->n+km' `{0}` and `{0}2` must " + "be different.".format(error_str)) + if not 0 <= col < self_cols: + raise ValueError("This matrix does not have a {} '{}'".format(error_str, col)) + if not 0 <= col2 < self_cols: + raise ValueError("This matrix does not have a {} '{}'".format(error_str, col2)) + + else: + raise ValueError('invalid operation %s' % repr(op)) + + return op, col, k, col1, col2 + + def _eval_col_op_multiply_col_by_const(self, col, k): + def entry(i, j): + if j == col: + return k * self[i, j] + return self[i, j] + return self._new(self.rows, self.cols, entry) + + def _eval_col_op_swap(self, col1, col2): + def entry(i, j): + if j == col1: + return self[i, col2] + elif j == col2: + return self[i, col1] + return self[i, j] + return self._new(self.rows, self.cols, entry) + + def _eval_col_op_add_multiple_to_other_col(self, col, k, col2): + def entry(i, j): + if j == col: + return self[i, j] + k * self[i, col2] + return self[i, j] + return self._new(self.rows, self.cols, entry) + + def _eval_row_op_swap(self, row1, row2): + def entry(i, j): + if i == row1: + return self[row2, j] + elif i == row2: + return self[row1, j] + return self[i, j] + return self._new(self.rows, self.cols, entry) + + def _eval_row_op_multiply_row_by_const(self, row, k): + def entry(i, j): + if i == row: + return k * self[i, j] + return self[i, j] + return self._new(self.rows, self.cols, entry) + + def _eval_row_op_add_multiple_to_other_row(self, row, k, row2): + def entry(i, j): + if i == row: + return self[i, j] + k * self[row2, j] + return self[i, j] + return self._new(self.rows, self.cols, entry) + + def elementary_col_op(self, op="n->kn", col=None, k=None, col1=None, col2=None): + """Performs the elementary column operation `op`. + + `op` may be one of + + * ``"n->kn"`` (column n goes to k*n) + * ``"n<->m"`` (swap column n and column m) + * ``"n->n+km"`` (column n goes to column n + k*column m) + + Parameters + ========== + + op : string; the elementary row operation + col : the column to apply the column operation + k : the multiple to apply in the column operation + col1 : one column of a column swap + col2 : second column of a column swap or column "m" in the column operation + "n->n+km" + """ + + op, col, k, col1, col2 = self._normalize_op_args(op, col, k, col1, col2, "col") + + # now that we've validated, we're all good to dispatch + if op == "n->kn": + return self._eval_col_op_multiply_col_by_const(col, k) + if op == "n<->m": + return self._eval_col_op_swap(col1, col2) + if op == "n->n+km": + return self._eval_col_op_add_multiple_to_other_col(col, k, col2) + + def elementary_row_op(self, op="n->kn", row=None, k=None, row1=None, row2=None): + """Performs the elementary row operation `op`. + + `op` may be one of + + * ``"n->kn"`` (row n goes to k*n) + * ``"n<->m"`` (swap row n and row m) + * ``"n->n+km"`` (row n goes to row n + k*row m) + + Parameters + ========== + + op : string; the elementary row operation + row : the row to apply the row operation + k : the multiple to apply in the row operation + row1 : one row of a row swap + row2 : second row of a row swap or row "m" in the row operation + "n->n+km" + """ + + op, row, k, row1, row2 = self._normalize_op_args(op, row, k, row1, row2, "row") + + # now that we've validated, we're all good to dispatch + if op == "n->kn": + return self._eval_row_op_multiply_row_by_const(row, k) + if op == "n<->m": + return self._eval_row_op_swap(row1, row2) + if op == "n->n+km": + return self._eval_row_op_add_multiple_to_other_row(row, k, row2) + + def columnspace(self, simplify=False): + return _columnspace(self, simplify=simplify) + + def nullspace(self, simplify=False, iszerofunc=_iszero): + return _nullspace(self, simplify=simplify, iszerofunc=iszerofunc) + + def rowspace(self, simplify=False): + return _rowspace(self, simplify=simplify) + + # This is a classmethod but is converted to such later in order to allow + # assignment of __doc__ since that does not work for already wrapped + # classmethods in Python 3.6. + def orthogonalize(cls, *vecs, **kwargs): + return _orthogonalize(cls, *vecs, **kwargs) + + columnspace.__doc__ = _columnspace.__doc__ + nullspace.__doc__ = _nullspace.__doc__ + rowspace.__doc__ = _rowspace.__doc__ + orthogonalize.__doc__ = _orthogonalize.__doc__ + + orthogonalize = classmethod(orthogonalize) # type:ignore + + def eigenvals(self, error_when_incomplete=True, **flags): + return _eigenvals(self, error_when_incomplete=error_when_incomplete, **flags) + + def eigenvects(self, error_when_incomplete=True, iszerofunc=_iszero, **flags): + return _eigenvects(self, error_when_incomplete=error_when_incomplete, + iszerofunc=iszerofunc, **flags) + + def is_diagonalizable(self, reals_only=False, **kwargs): + return _is_diagonalizable(self, reals_only=reals_only, **kwargs) + + def diagonalize(self, reals_only=False, sort=False, normalize=False): + return _diagonalize(self, reals_only=reals_only, sort=sort, + normalize=normalize) + + def bidiagonalize(self, upper=True): + return _bidiagonalize(self, upper=upper) + + def bidiagonal_decomposition(self, upper=True): + return _bidiagonal_decomposition(self, upper=upper) + + @property + def is_positive_definite(self): + return _is_positive_definite(self) + + @property + def is_positive_semidefinite(self): + return _is_positive_semidefinite(self) + + @property + def is_negative_definite(self): + return _is_negative_definite(self) + + @property + def is_negative_semidefinite(self): + return _is_negative_semidefinite(self) + + @property + def is_indefinite(self): + return _is_indefinite(self) + + def jordan_form(self, calc_transform=True, **kwargs): + return _jordan_form(self, calc_transform=calc_transform, **kwargs) + + def left_eigenvects(self, **flags): + return _left_eigenvects(self, **flags) + + def singular_values(self): + return _singular_values(self) + + eigenvals.__doc__ = _eigenvals.__doc__ + eigenvects.__doc__ = _eigenvects.__doc__ + is_diagonalizable.__doc__ = _is_diagonalizable.__doc__ + diagonalize.__doc__ = _diagonalize.__doc__ + is_positive_definite.__doc__ = _is_positive_definite.__doc__ + is_positive_semidefinite.__doc__ = _is_positive_semidefinite.__doc__ + is_negative_definite.__doc__ = _is_negative_definite.__doc__ + is_negative_semidefinite.__doc__ = _is_negative_semidefinite.__doc__ + is_indefinite.__doc__ = _is_indefinite.__doc__ + jordan_form.__doc__ = _jordan_form.__doc__ + left_eigenvects.__doc__ = _left_eigenvects.__doc__ + singular_values.__doc__ = _singular_values.__doc__ + bidiagonalize.__doc__ = _bidiagonalize.__doc__ + bidiagonal_decomposition.__doc__ = _bidiagonal_decomposition.__doc__ + + def diff(self, *args, evaluate=True, **kwargs): + """Calculate the derivative of each element in the matrix. + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.abc import x, y + >>> M = Matrix([[x, y], [1, 0]]) + >>> M.diff(x) + Matrix([ + [1, 0], + [0, 0]]) + + See Also + ======== + + integrate + limit + """ + # XXX this should be handled here rather than in Derivative + from sympy.tensor.array.array_derivatives import ArrayDerivative + deriv = ArrayDerivative(self, *args, evaluate=evaluate) + # XXX This can rather changed to always return immutable matrix + if not isinstance(self, Basic) and evaluate: + return deriv.as_mutable() + return deriv + + def _eval_derivative(self, arg): + return self.applyfunc(lambda x: x.diff(arg)) + + def integrate(self, *args, **kwargs): + """Integrate each element of the matrix. ``args`` will + be passed to the ``integrate`` function. + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.abc import x, y + >>> M = Matrix([[x, y], [1, 0]]) + >>> M.integrate((x, )) + Matrix([ + [x**2/2, x*y], + [ x, 0]]) + >>> M.integrate((x, 0, 2)) + Matrix([ + [2, 2*y], + [2, 0]]) + + See Also + ======== + + limit + diff + """ + return self.applyfunc(lambda x: x.integrate(*args, **kwargs)) + + def jacobian(self, X): + """Calculates the Jacobian matrix (derivative of a vector-valued function). + + Parameters + ========== + + ``self`` : vector of expressions representing functions f_i(x_1, ..., x_n). + X : set of x_i's in order, it can be a list or a Matrix + + Both ``self`` and X can be a row or a column matrix in any order + (i.e., jacobian() should always work). + + Examples + ======== + + >>> from sympy import sin, cos, Matrix + >>> from sympy.abc import rho, phi + >>> X = Matrix([rho*cos(phi), rho*sin(phi), rho**2]) + >>> Y = Matrix([rho, phi]) + >>> X.jacobian(Y) + Matrix([ + [cos(phi), -rho*sin(phi)], + [sin(phi), rho*cos(phi)], + [ 2*rho, 0]]) + >>> X = Matrix([rho*cos(phi), rho*sin(phi)]) + >>> X.jacobian(Y) + Matrix([ + [cos(phi), -rho*sin(phi)], + [sin(phi), rho*cos(phi)]]) + + See Also + ======== + + hessian + wronskian + """ + from sympy.matrices.matrixbase import MatrixBase + if not isinstance(X, MatrixBase): + X = self._new(X) + # Both X and ``self`` can be a row or a column matrix, so we need to make + # sure all valid combinations work, but everything else fails: + if self.shape[0] == 1: + m = self.shape[1] + elif self.shape[1] == 1: + m = self.shape[0] + else: + raise TypeError("``self`` must be a row or a column matrix") + if X.shape[0] == 1: + n = X.shape[1] + elif X.shape[1] == 1: + n = X.shape[0] + else: + raise TypeError("X must be a row or a column matrix") + + # m is the number of functions and n is the number of variables + # computing the Jacobian is now easy: + return self._new(m, n, lambda j, i: self[j].diff(X[i])) + + def limit(self, *args): + """Calculate the limit of each element in the matrix. + ``args`` will be passed to the ``limit`` function. + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.abc import x, y + >>> M = Matrix([[x, y], [1, 0]]) + >>> M.limit(x, 2) + Matrix([ + [2, y], + [1, 0]]) + + See Also + ======== + + integrate + diff + """ + return self.applyfunc(lambda x: x.limit(*args)) + + def berkowitz_charpoly(self, x=Dummy('lambda'), simplify=_utilities_simplify): + return self.charpoly(x=x) + + def berkowitz_det(self): + """Computes determinant using Berkowitz method. + + See Also + ======== + + det + """ + return self.det(method='berkowitz') + + def berkowitz_eigenvals(self, **flags): + """Computes eigenvalues of a Matrix using Berkowitz method.""" + return self.eigenvals(**flags) + + def berkowitz_minors(self): + """Computes principal minors using Berkowitz method.""" + sign, minors = self.one, [] + + for poly in self.berkowitz(): + minors.append(sign * poly[-1]) + sign = -sign + + return tuple(minors) + + def berkowitz(self): + from sympy.matrices import zeros + berk = ((1,),) + if not self: + return berk + + if not self.is_square: + raise NonSquareMatrixError() + + A, N = self, self.rows + transforms = [0] * (N - 1) + + for n in range(N, 1, -1): + T, k = zeros(n + 1, n), n - 1 + + R, C = -A[k, :k], A[:k, k] + A, a = A[:k, :k], -A[k, k] + + items = [C] + + for i in range(0, n - 2): + items.append(A * items[i]) + + for i, B in enumerate(items): + items[i] = (R * B)[0, 0] + + items = [self.one, a] + items + + for i in range(n): + T[i:, i] = items[:n - i + 1] + + transforms[k - 1] = T + + polys = [self._new([self.one, -A[0, 0]])] + + for i, T in enumerate(transforms): + polys.append(T * polys[i]) + + return berk + tuple(map(tuple, polys)) + + def cofactorMatrix(self, method="berkowitz"): + return self.cofactor_matrix(method=method) + + def det_bareis(self): + return _det_bareiss(self) + + def det_LU_decomposition(self): + """Compute matrix determinant using LU decomposition. + + + Note that this method fails if the LU decomposition itself + fails. In particular, if the matrix has no inverse this method + will fail. + + TODO: Implement algorithm for sparse matrices (SFF), + http://www.eecis.udel.edu/~saunders/papers/sffge/it5.ps. + + See Also + ======== + + + det + berkowitz_det + """ + return self.det(method='lu') + + def jordan_cell(self, eigenval, n): + return self.jordan_block(size=n, eigenvalue=eigenval) + + def jordan_cells(self, calc_transformation=True): + P, J = self.jordan_form() + return P, J.get_diag_blocks() + + def minorEntry(self, i, j, method="berkowitz"): + return self.minor(i, j, method=method) + + def minorMatrix(self, i, j): + return self.minor_submatrix(i, j) + + def permuteBkwd(self, perm): + """Permute the rows of the matrix with the given permutation in reverse.""" + return self.permute_rows(perm, direction='backward') + + def permuteFwd(self, perm): + """Permute the rows of the matrix with the given permutation.""" + return self.permute_rows(perm, direction='forward') + + @property + def kind(self) -> MatrixKind: + elem_kinds = {e.kind for e in self.flat()} + if len(elem_kinds) == 1: + elemkind, = elem_kinds + else: + elemkind = UndefinedKind + return MatrixKind(elemkind) + + def flat(self): + """ + Returns a flat list of all elements in the matrix. + + Examples + ======== + + >>> from sympy import Matrix + >>> m = Matrix([[0, 2], [3, 4]]) + >>> m.flat() + [0, 2, 3, 4] + + See Also + ======== + + tolist + values + """ + return [self[i, j] for i in range(self.rows) for j in range(self.cols)] + + def __array__(self, dtype=object, copy=None): + if copy is not None and not copy: + raise TypeError("Cannot implement copy=False when converting Matrix to ndarray") + from .dense import matrix2numpy + return matrix2numpy(self, dtype=dtype) + + def __len__(self): + """Return the number of elements of ``self``. + + Implemented mainly so bool(Matrix()) == False. + """ + return self.rows * self.cols + + def _matrix_pow_by_jordan_blocks(self, num): + from sympy.matrices import diag, MutableMatrix + + def jordan_cell_power(jc, n): + N = jc.shape[0] + l = jc[0,0] + if l.is_zero: + if N == 1 and n.is_nonnegative: + jc[0,0] = l**n + elif not (n.is_integer and n.is_nonnegative): + raise NonInvertibleMatrixError("Non-invertible matrix can only be raised to a nonnegative integer") + else: + for i in range(N): + jc[0,i] = KroneckerDelta(i, n) + else: + for i in range(N): + bn = binomial(n, i) + if isinstance(bn, binomial): + bn = bn._eval_expand_func() + jc[0,i] = l**(n-i)*bn + for i in range(N): + for j in range(1, N-i): + jc[j,i+j] = jc [j-1,i+j-1] + + P, J = self.jordan_form() + jordan_cells = J.get_diag_blocks() + # Make sure jordan_cells matrices are mutable: + jordan_cells = [MutableMatrix(j) for j in jordan_cells] + for j in jordan_cells: + jordan_cell_power(j, num) + return self._new(P.multiply(diag(*jordan_cells)) + .multiply(P.inv())) + + def __str__(self): + if S.Zero in self.shape: + return 'Matrix(%s, %s, [])' % (self.rows, self.cols) + return "Matrix(%s)" % str(self.tolist()) + + def _format_str(self, printer=None): + if not printer: + printer = StrPrinter() + # Handle zero dimensions: + if S.Zero in self.shape: + return 'Matrix(%s, %s, [])' % (self.rows, self.cols) + if self.rows == 1: + return "Matrix([%s])" % self.table(printer, rowsep=',\n') + return "Matrix([\n%s])" % self.table(printer, rowsep=',\n') + + @classmethod + def irregular(cls, ntop, *matrices, **kwargs): + """Return a matrix filled by the given matrices which + are listed in order of appearance from left to right, top to + bottom as they first appear in the matrix. They must fill the + matrix completely. + + Examples + ======== + + >>> from sympy import ones, Matrix + >>> Matrix.irregular(3, ones(2,1), ones(3,3)*2, ones(2,2)*3, + ... ones(1,1)*4, ones(2,2)*5, ones(1,2)*6, ones(1,2)*7) + Matrix([ + [1, 2, 2, 2, 3, 3], + [1, 2, 2, 2, 3, 3], + [4, 2, 2, 2, 5, 5], + [6, 6, 7, 7, 5, 5]]) + """ + ntop = as_int(ntop) + # make sure we are working with explicit matrices + b = [i.as_explicit() if hasattr(i, 'as_explicit') else i + for i in matrices] + q = list(range(len(b))) + dat = [i.rows for i in b] + active = [q.pop(0) for _ in range(ntop)] + cols = sum(b[i].cols for i in active) + rows = [] + while any(dat): + r = [] + for a, j in enumerate(active): + r.extend(b[j][-dat[j], :]) + dat[j] -= 1 + if dat[j] == 0 and q: + active[a] = q.pop(0) + if len(r) != cols: + raise ValueError(filldedent(''' + Matrices provided do not appear to fill + the space completely.''')) + rows.append(r) + return cls._new(rows) + + @classmethod + def _handle_ndarray(cls, arg): + # NumPy array or matrix or some other object that implements + # __array__. So let's first use this method to get a + # numpy.array() and then make a Python list out of it. + arr = arg.__array__() + if len(arr.shape) == 2: + rows, cols = arr.shape[0], arr.shape[1] + flat_list = [cls._sympify(i) for i in arr.ravel()] + return rows, cols, flat_list + elif len(arr.shape) == 1: + flat_list = [cls._sympify(i) for i in arr] + return arr.shape[0], 1, flat_list + else: + raise NotImplementedError( + "SymPy supports just 1D and 2D matrices") + + @classmethod + def _handle_creation_inputs(cls, *args, **kwargs): + """Return the number of rows, cols and flat matrix elements. + + Examples + ======== + + >>> from sympy import Matrix, I + + Matrix can be constructed as follows: + + * from a nested list of iterables + + >>> Matrix( ((1, 2+I), (3, 4)) ) + Matrix([ + [1, 2 + I], + [3, 4]]) + + * from un-nested iterable (interpreted as a column) + + >>> Matrix( [1, 2] ) + Matrix([ + [1], + [2]]) + + * from un-nested iterable with dimensions + + >>> Matrix(1, 2, [1, 2] ) + Matrix([[1, 2]]) + + * from no arguments (a 0 x 0 matrix) + + >>> Matrix() + Matrix(0, 0, []) + + * from a rule + + >>> Matrix(2, 2, lambda i, j: i/(j + 1) ) + Matrix([ + [0, 0], + [1, 1/2]]) + + See Also + ======== + irregular - filling a matrix with irregular blocks + """ + from sympy.matrices import SparseMatrix + from sympy.matrices.expressions.matexpr import MatrixSymbol + from sympy.matrices.expressions.blockmatrix import BlockMatrix + + flat_list = None + + if len(args) == 1: + # Matrix(SparseMatrix(...)) + if isinstance(args[0], SparseMatrix): + return args[0].rows, args[0].cols, flatten(args[0].tolist()) + + # Matrix(Matrix(...)) + elif isinstance(args[0], MatrixBase): + return args[0].rows, args[0].cols, args[0].flat() + + # Matrix(MatrixSymbol('X', 2, 2)) + elif isinstance(args[0], Basic) and args[0].is_Matrix: + return args[0].rows, args[0].cols, args[0].as_explicit().flat() + + elif isinstance(args[0], mp.matrix): + M = args[0] + flat_list = [cls._sympify(x) for x in M] + return M.rows, M.cols, flat_list + + # Matrix(numpy.ones((2, 2))) + elif hasattr(args[0], "__array__"): + return cls._handle_ndarray(args[0]) + + # Matrix([1, 2, 3]) or Matrix([[1, 2], [3, 4]]) + elif is_sequence(args[0]) \ + and not isinstance(args[0], DeferredVector): + dat = list(args[0]) + ismat = lambda i: isinstance(i, MatrixBase) and ( + evaluate or isinstance(i, (BlockMatrix, MatrixSymbol))) + raw = lambda i: is_sequence(i) and not ismat(i) + evaluate = kwargs.get('evaluate', True) + + + if evaluate: + + def make_explicit(x): + """make Block and Symbol explicit""" + if isinstance(x, BlockMatrix): + return x.as_explicit() + elif isinstance(x, MatrixSymbol) and all(_.is_Integer for _ in x.shape): + return x.as_explicit() + else: + return x + + def make_explicit_row(row): + # Could be list or could be list of lists + if isinstance(row, (list, tuple)): + return [make_explicit(x) for x in row] + else: + return make_explicit(row) + + if isinstance(dat, (list, tuple)): + dat = [make_explicit_row(row) for row in dat] + + if len(dat) == 0: + rows = cols = 0 + flat_list = [] + elif all(raw(i) for i in dat) and len(dat[0]) == 0: + if not all(len(i) == 0 for i in dat): + raise ValueError('mismatched dimensions') + rows = len(dat) + cols = 0 + flat_list = [] + elif not any(raw(i) or ismat(i) for i in dat): + # a column as a list of values + flat_list = [cls._sympify(i) for i in dat] + rows = len(flat_list) + cols = 1 if rows else 0 + elif evaluate and all(ismat(i) for i in dat): + # a column as a list of matrices + ncol = {i.cols for i in dat if any(i.shape)} + if ncol: + if len(ncol) != 1: + raise ValueError('mismatched dimensions') + flat_list = [_ for i in dat for r in i.tolist() for _ in r] + cols = ncol.pop() + rows = len(flat_list)//cols + else: + rows = cols = 0 + flat_list = [] + elif evaluate and any(ismat(i) for i in dat): + ncol = set() + flat_list = [] + for i in dat: + if ismat(i): + flat_list.extend( + [k for j in i.tolist() for k in j]) + if any(i.shape): + ncol.add(i.cols) + elif raw(i): + if i: + ncol.add(len(i)) + flat_list.extend([cls._sympify(ij) for ij in i]) + else: + ncol.add(1) + flat_list.append(i) + if len(ncol) > 1: + raise ValueError('mismatched dimensions') + cols = ncol.pop() + rows = len(flat_list)//cols + else: + # list of lists; each sublist is a logical row + # which might consist of many rows if the values in + # the row are matrices + flat_list = [] + ncol = set() + rows = cols = 0 + for row in dat: + if not is_sequence(row) and \ + not getattr(row, 'is_Matrix', False): + raise ValueError('expecting list of lists') + + if hasattr(row, '__array__'): + if 0 in row.shape: + continue + + if evaluate and all(ismat(i) for i in row): + r, c, flatT = cls._handle_creation_inputs( + [i.T for i in row]) + T = reshape(flatT, [c]) + flat = \ + [T[i][j] for j in range(c) for i in range(r)] + r, c = c, r + else: + r = 1 + if getattr(row, 'is_Matrix', False): + c = 1 + flat = [row] + else: + c = len(row) + flat = [cls._sympify(i) for i in row] + ncol.add(c) + if len(ncol) > 1: + raise ValueError('mismatched dimensions') + flat_list.extend(flat) + rows += r + cols = ncol.pop() if ncol else 0 + + elif len(args) == 3: + rows = as_int(args[0]) + cols = as_int(args[1]) + + if rows < 0 or cols < 0: + raise ValueError("Cannot create a {} x {} matrix. " + "Both dimensions must be positive".format(rows, cols)) + + # Matrix(2, 2, lambda i, j: i+j) + if len(args) == 3 and isinstance(args[2], Callable): + op = args[2] + flat_list = [] + for i in range(rows): + flat_list.extend( + [cls._sympify(op(cls._sympify(i), cls._sympify(j))) + for j in range(cols)]) + + # Matrix(2, 2, [1, 2, 3, 4]) + elif len(args) == 3 and is_sequence(args[2]): + flat_list = args[2] + if len(flat_list) != rows * cols: + raise ValueError( + 'List length should be equal to rows*columns') + flat_list = [cls._sympify(i) for i in flat_list] + + + # Matrix() + elif len(args) == 0: + # Empty Matrix + rows = cols = 0 + flat_list = [] + + if flat_list is None: + raise TypeError(filldedent(''' + Data type not understood; expecting list of lists + or lists of values.''')) + + return rows, cols, flat_list + + def _setitem(self, key, value): + """Helper to set value at location given by key. + + Examples + ======== + + >>> from sympy import Matrix, I, zeros, ones + >>> m = Matrix(((1, 2+I), (3, 4))) + >>> m + Matrix([ + [1, 2 + I], + [3, 4]]) + >>> m[1, 0] = 9 + >>> m + Matrix([ + [1, 2 + I], + [9, 4]]) + >>> m[1, 0] = [[0, 1]] + + To replace row r you assign to position r*m where m + is the number of columns: + + >>> M = zeros(4) + >>> m = M.cols + >>> M[3*m] = ones(1, m)*2; M + Matrix([ + [0, 0, 0, 0], + [0, 0, 0, 0], + [0, 0, 0, 0], + [2, 2, 2, 2]]) + + And to replace column c you can assign to position c: + + >>> M[2] = ones(m, 1)*4; M + Matrix([ + [0, 0, 4, 0], + [0, 0, 4, 0], + [0, 0, 4, 0], + [2, 2, 4, 2]]) + """ + from .dense import Matrix + + is_slice = isinstance(key, slice) + i, j = key = self.key2ij(key) + is_mat = isinstance(value, MatrixBase) + if isinstance(i, slice) or isinstance(j, slice): + if is_mat: + self.copyin_matrix(key, value) + return + if not isinstance(value, Expr) and is_sequence(value): + self.copyin_list(key, value) + return + raise ValueError('unexpected value: %s' % value) + else: + if (not is_mat and + not isinstance(value, Basic) and is_sequence(value)): + value = Matrix(value) + is_mat = True + if is_mat: + if is_slice: + key = (slice(*divmod(i, self.cols)), + slice(*divmod(j, self.cols))) + else: + key = (slice(i, i + value.rows), + slice(j, j + value.cols)) + self.copyin_matrix(key, value) + else: + return i, j, self._sympify(value) + return + + def add(self, b): + """Return self + b.""" + return self + b + + def condition_number(self): + """Returns the condition number of a matrix. + + This is the maximum singular value divided by the minimum singular value + + Examples + ======== + + >>> from sympy import Matrix, S + >>> A = Matrix([[1, 0, 0], [0, 10, 0], [0, 0, S.One/10]]) + >>> A.condition_number() + 100 + + See Also + ======== + + singular_values + """ + + if not self: + return self.zero + singularvalues = self.singular_values() + return Max(*singularvalues) / Min(*singularvalues) + + def copy(self): + """ + Returns the copy of a matrix. + + Examples + ======== + + >>> from sympy import Matrix + >>> A = Matrix(2, 2, [1, 2, 3, 4]) + >>> A.copy() + Matrix([ + [1, 2], + [3, 4]]) + + """ + return self._new(self.rows, self.cols, self.flat()) + + def cross(self, b): + r""" + Return the cross product of ``self`` and ``b`` relaxing the condition + of compatible dimensions: if each has 3 elements, a matrix of the + same type and shape as ``self`` will be returned. If ``b`` has the same + shape as ``self`` then common identities for the cross product (like + `a \times b = - b \times a`) will hold. + + Parameters + ========== + b : 3x1 or 1x3 Matrix + + See Also + ======== + + dot + hat + vee + multiply + multiply_elementwise + """ + from sympy.matrices.expressions.matexpr import MatrixExpr + + if not isinstance(b, (MatrixBase, MatrixExpr)): + raise TypeError( + "{} must be a Matrix, not {}.".format(b, type(b))) + + if not (self.rows * self.cols == b.rows * b.cols == 3): + raise ShapeError("Dimensions incorrect for cross product: %s x %s" % + ((self.rows, self.cols), (b.rows, b.cols))) + else: + return self._new(self.rows, self.cols, ( + (self[1] * b[2] - self[2] * b[1]), + (self[2] * b[0] - self[0] * b[2]), + (self[0] * b[1] - self[1] * b[0]))) + + def hat(self): + r""" + Return the skew-symmetric matrix representing the cross product, + so that ``self.hat() * b`` is equivalent to ``self.cross(b)``. + + Examples + ======== + + Calling ``hat`` creates a skew-symmetric 3x3 Matrix from a 3x1 Matrix: + + >>> from sympy import Matrix + >>> a = Matrix([1, 2, 3]) + >>> a.hat() + Matrix([ + [ 0, -3, 2], + [ 3, 0, -1], + [-2, 1, 0]]) + + Multiplying it with another 3x1 Matrix calculates the cross product: + + >>> b = Matrix([3, 2, 1]) + >>> a.hat() * b + Matrix([ + [-4], + [ 8], + [-4]]) + + Which is equivalent to calling the ``cross`` method: + + >>> a.cross(b) + Matrix([ + [-4], + [ 8], + [-4]]) + + See Also + ======== + + dot + cross + vee + multiply + multiply_elementwise + """ + + if self.shape != (3, 1): + raise ShapeError("Dimensions incorrect, expected (3, 1), got " + + str(self.shape)) + else: + x, y, z = self + return self._new(3, 3, ( + 0, -z, y, + z, 0, -x, + -y, x, 0)) + + def vee(self): + r""" + Return a 3x1 vector from a skew-symmetric matrix representing the cross product, + so that ``self * b`` is equivalent to ``self.vee().cross(b)``. + + Examples + ======== + + Calling ``vee`` creates a vector from a skew-symmetric Matrix: + + >>> from sympy import Matrix + >>> A = Matrix([[0, -3, 2], [3, 0, -1], [-2, 1, 0]]) + >>> a = A.vee() + >>> a + Matrix([ + [1], + [2], + [3]]) + + Calculating the matrix product of the original matrix with a vector + is equivalent to a cross product: + + >>> b = Matrix([3, 2, 1]) + >>> A * b + Matrix([ + [-4], + [ 8], + [-4]]) + + >>> a.cross(b) + Matrix([ + [-4], + [ 8], + [-4]]) + + ``vee`` can also be used to retrieve angular velocity expressions. + Defining a rotation matrix: + + >>> from sympy import rot_ccw_axis3, trigsimp + >>> from sympy.physics.mechanics import dynamicsymbols + >>> theta = dynamicsymbols('theta') + >>> R = rot_ccw_axis3(theta) + >>> R + Matrix([ + [cos(theta(t)), -sin(theta(t)), 0], + [sin(theta(t)), cos(theta(t)), 0], + [ 0, 0, 1]]) + + We can retrieve the angular velocity: + + >>> Omega = R.T * R.diff() + >>> Omega = trigsimp(Omega) + >>> Omega.vee() + Matrix([ + [ 0], + [ 0], + [Derivative(theta(t), t)]]) + + See Also + ======== + + dot + cross + hat + multiply + multiply_elementwise + """ + + if self.shape != (3, 3): + raise ShapeError("Dimensions incorrect, expected (3, 3), got " + + str(self.shape)) + elif not self.is_anti_symmetric(): + raise ValueError("Matrix is not skew-symmetric") + else: + return self._new(3, 1, ( + self[2, 1], + self[0, 2], + self[1, 0])) + + @property + def D(self): + """Return Dirac conjugate (if ``self.rows == 4``). + + Examples + ======== + + >>> from sympy import Matrix, I, eye + >>> m = Matrix((0, 1 + I, 2, 3)) + >>> m.D + Matrix([[0, 1 - I, -2, -3]]) + >>> m = (eye(4) + I*eye(4)) + >>> m[0, 3] = 2 + >>> m.D + Matrix([ + [1 - I, 0, 0, 0], + [ 0, 1 - I, 0, 0], + [ 0, 0, -1 + I, 0], + [ 2, 0, 0, -1 + I]]) + + If the matrix does not have 4 rows an AttributeError will be raised + because this property is only defined for matrices with 4 rows. + + >>> Matrix(eye(2)).D + Traceback (most recent call last): + ... + AttributeError: Matrix has no attribute D. + + See Also + ======== + + sympy.matrices.matrixbase.MatrixBase.conjugate: By-element conjugation + sympy.matrices.matrixbase.MatrixBase.H: Hermite conjugation + """ + from sympy.physics.matrices import mgamma + if self.rows != 4: + # In Python 3.2, properties can only return an AttributeError + # so we can't raise a ShapeError -- see commit which added the + # first line of this inline comment. Also, there is no need + # for a message since MatrixBase will raise the AttributeError + raise AttributeError + return self.H * mgamma(0) + + def dot(self, b, hermitian=None, conjugate_convention=None): + """Return the dot or inner product of two vectors of equal length. + Here ``self`` must be a ``Matrix`` of size 1 x n or n x 1, and ``b`` + must be either a matrix of size 1 x n, n x 1, or a list/tuple of length n. + A scalar is returned. + + By default, ``dot`` does not conjugate ``self`` or ``b``, even if there are + complex entries. Set ``hermitian=True`` (and optionally a ``conjugate_convention``) + to compute the hermitian inner product. + + Possible kwargs are ``hermitian`` and ``conjugate_convention``. + + If ``conjugate_convention`` is ``"left"``, ``"math"`` or ``"maths"``, + the conjugate of the first vector (``self``) is used. If ``"right"`` + or ``"physics"`` is specified, the conjugate of the second vector ``b`` is used. + + Examples + ======== + + >>> from sympy import Matrix + >>> M = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + >>> v = Matrix([1, 1, 1]) + >>> M.row(0).dot(v) + 6 + >>> M.col(0).dot(v) + 12 + >>> v = [3, 2, 1] + >>> M.row(0).dot(v) + 10 + + >>> from sympy import I + >>> q = Matrix([1*I, 1*I, 1*I]) + >>> q.dot(q, hermitian=False) + -3 + + >>> q.dot(q, hermitian=True) + 3 + + >>> q1 = Matrix([1, 1, 1*I]) + >>> q.dot(q1, hermitian=True, conjugate_convention="maths") + 1 - 2*I + >>> q.dot(q1, hermitian=True, conjugate_convention="physics") + 1 + 2*I + + + See Also + ======== + + cross + multiply + multiply_elementwise + """ + from .dense import Matrix + + if not isinstance(b, MatrixBase): + if is_sequence(b): + if len(b) != self.cols and len(b) != self.rows: + raise ShapeError( + "Dimensions incorrect for dot product: %s, %s" % ( + self.shape, len(b))) + return self.dot(Matrix(b)) + else: + raise TypeError( + "`b` must be an ordered iterable or Matrix, not %s." % + type(b)) + + if (1 not in self.shape) or (1 not in b.shape): + raise ShapeError + if len(self) != len(b): + raise ShapeError( + "Dimensions incorrect for dot product: %s, %s" % (self.shape, b.shape)) + + mat = self + n = len(mat) + if mat.shape != (1, n): + mat = mat.reshape(1, n) + if b.shape != (n, 1): + b = b.reshape(n, 1) + + # Now ``mat`` is a row vector and ``b`` is a column vector. + + # If it so happens that only conjugate_convention is passed + # then automatically set hermitian to True. If only hermitian + # is true but no conjugate_convention is not passed then + # automatically set it to ``"maths"`` + + if conjugate_convention is not None and hermitian is None: + hermitian = True + if hermitian and conjugate_convention is None: + conjugate_convention = "maths" + + if hermitian == True: + if conjugate_convention in ("maths", "left", "math"): + mat = mat.conjugate() + elif conjugate_convention in ("physics", "right"): + b = b.conjugate() + else: + raise ValueError("Unknown conjugate_convention was entered." + " conjugate_convention must be one of the" + " following: math, maths, left, physics or right.") + return (mat * b)[0] + + def dual(self): + """Returns the dual of a matrix. + + A dual of a matrix is: + + ``(1/2)*levicivita(i, j, k, l)*M(k, l)`` summed over indices `k` and `l` + + Since the levicivita method is anti_symmetric for any pairwise + exchange of indices, the dual of a symmetric matrix is the zero + matrix. Strictly speaking the dual defined here assumes that the + 'matrix' `M` is a contravariant anti_symmetric second rank tensor, + so that the dual is a covariant second rank tensor. + + """ + from sympy.matrices import zeros + + M, n = self[:, :], self.rows + work = zeros(n) + if self.is_symmetric(): + return work + + for i in range(1, n): + for j in range(1, n): + acum = 0 + for k in range(1, n): + acum += LeviCivita(i, j, 0, k) * M[0, k] + work[i, j] = acum + work[j, i] = -acum + + for l in range(1, n): + acum = 0 + for a in range(1, n): + for b in range(1, n): + acum += LeviCivita(0, l, a, b) * M[a, b] + acum /= 2 + work[0, l] = -acum + work[l, 0] = acum + + return work + + def _eval_matrix_exp_jblock(self): + """A helper function to compute an exponential of a Jordan block + matrix + + Examples + ======== + + >>> from sympy import Symbol, Matrix + >>> l = Symbol('lamda') + + A trivial example of 1*1 Jordan block: + + >>> m = Matrix.jordan_block(1, l) + >>> m._eval_matrix_exp_jblock() + Matrix([[exp(lamda)]]) + + An example of 3*3 Jordan block: + + >>> m = Matrix.jordan_block(3, l) + >>> m._eval_matrix_exp_jblock() + Matrix([ + [exp(lamda), exp(lamda), exp(lamda)/2], + [ 0, exp(lamda), exp(lamda)], + [ 0, 0, exp(lamda)]]) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Matrix_function#Jordan_decomposition + """ + size = self.rows + l = self[0, 0] + exp_l = exp(l) + + bands = {i: exp_l / factorial(i) for i in range(size)} + + from .sparsetools import banded + return self.__class__(banded(size, bands)) + + + def analytic_func(self, f, x): + """ + Computes f(A) where A is a Square Matrix + and f is an analytic function. + + Examples + ======== + + >>> from sympy import Symbol, Matrix, S, log + + >>> x = Symbol('x') + >>> m = Matrix([[S(5)/4, S(3)/4], [S(3)/4, S(5)/4]]) + >>> f = log(x) + >>> m.analytic_func(f, x) + Matrix([ + [ 0, log(2)], + [log(2), 0]]) + + Parameters + ========== + + f : Expr + Analytic Function + x : Symbol + parameter of f + + """ + + f, x = _sympify(f), _sympify(x) + if not self.is_square: + raise NonSquareMatrixError + if not x.is_symbol: + raise ValueError("{} must be a symbol.".format(x)) + if x not in f.free_symbols: + raise ValueError( + "{} must be a parameter of {}.".format(x, f)) + if x in self.free_symbols: + raise ValueError( + "{} must not be a parameter of {}.".format(x, self)) + + eigen = self.eigenvals() + max_mul = max(eigen.values()) + derivative = {} + dd = f + for i in range(max_mul - 1): + dd = diff(dd, x) + derivative[i + 1] = dd + n = self.shape[0] + r = self.zeros(n) + f_val = self.zeros(n, 1) + row = 0 + + for i in eigen: + mul = eigen[i] + f_val[row] = f.subs(x, i) + if f_val[row].is_number and not f_val[row].is_complex: + raise ValueError( + "Cannot evaluate the function because the " + "function {} is not analytic at the given " + "eigenvalue {}".format(f, f_val[row])) + val = 1 + for a in range(n): + r[row, a] = val + val *= i + if mul > 1: + coe = [1 for ii in range(n)] + deri = 1 + while mul > 1: + row = row + 1 + mul -= 1 + d_i = derivative[deri].subs(x, i) + if d_i.is_number and not d_i.is_complex: + raise ValueError( + "Cannot evaluate the function because the " + "derivative {} is not analytic at the given " + "eigenvalue {}".format(derivative[deri], d_i)) + f_val[row] = d_i + for a in range(n): + if a - deri + 1 <= 0: + r[row, a] = 0 + coe[a] = 0 + continue + coe[a] = coe[a]*(a - deri + 1) + r[row, a] = coe[a]*pow(i, a - deri) + deri += 1 + row += 1 + c = r.solve(f_val) + ans = self.zeros(n) + pre = self.eye(n) + for i in range(n): + ans = ans + c[i]*pre + pre *= self + return ans + + + def exp(self): + """Return the exponential of a square matrix. + + Examples + ======== + + >>> from sympy import Symbol, Matrix + + >>> t = Symbol('t') + >>> m = Matrix([[0, 1], [-1, 0]]) * t + >>> m.exp() + Matrix([ + [ exp(I*t)/2 + exp(-I*t)/2, -I*exp(I*t)/2 + I*exp(-I*t)/2], + [I*exp(I*t)/2 - I*exp(-I*t)/2, exp(I*t)/2 + exp(-I*t)/2]]) + """ + if not self.is_square: + raise NonSquareMatrixError( + "Exponentiation is valid only for square matrices") + try: + P, J = self.jordan_form() + cells = J.get_diag_blocks() + except MatrixError: + raise NotImplementedError( + "Exponentiation is implemented only for matrices for which the Jordan normal form can be computed") + + blocks = [cell._eval_matrix_exp_jblock() for cell in cells] + from sympy.matrices import diag + eJ = diag(*blocks) + # n = self.rows + ret = P.multiply(eJ, dotprodsimp=None).multiply(P.inv(), dotprodsimp=None) + if all(value.is_real for value in self.values()): + return type(self)(re(ret)) + else: + return type(self)(ret) + + def _eval_matrix_log_jblock(self): + """Helper function to compute logarithm of a jordan block. + + Examples + ======== + + >>> from sympy import Symbol, Matrix + >>> l = Symbol('lamda') + + A trivial example of 1*1 Jordan block: + + >>> m = Matrix.jordan_block(1, l) + >>> m._eval_matrix_log_jblock() + Matrix([[log(lamda)]]) + + An example of 3*3 Jordan block: + + >>> m = Matrix.jordan_block(3, l) + >>> m._eval_matrix_log_jblock() + Matrix([ + [log(lamda), 1/lamda, -1/(2*lamda**2)], + [ 0, log(lamda), 1/lamda], + [ 0, 0, log(lamda)]]) + """ + size = self.rows + l = self[0, 0] + + if l.is_zero: + raise MatrixError( + 'Could not take logarithm or reciprocal for the given ' + 'eigenvalue {}'.format(l)) + + bands = {0: log(l)} + for i in range(1, size): + bands[i] = -((-l) ** -i) / i + + from .sparsetools import banded + return self.__class__(banded(size, bands)) + + def log(self, simplify=cancel): + """Return the logarithm of a square matrix. + + Parameters + ========== + + simplify : function, bool + The function to simplify the result with. + + Default is ``cancel``, which is effective to reduce the + expression growing for taking reciprocals and inverses for + symbolic matrices. + + Examples + ======== + + >>> from sympy import S, Matrix + + Examples for positive-definite matrices: + + >>> m = Matrix([[1, 1], [0, 1]]) + >>> m.log() + Matrix([ + [0, 1], + [0, 0]]) + + >>> m = Matrix([[S(5)/4, S(3)/4], [S(3)/4, S(5)/4]]) + >>> m.log() + Matrix([ + [ 0, log(2)], + [log(2), 0]]) + + Examples for non positive-definite matrices: + + >>> m = Matrix([[S(3)/4, S(5)/4], [S(5)/4, S(3)/4]]) + >>> m.log() + Matrix([ + [ I*pi/2, log(2) - I*pi/2], + [log(2) - I*pi/2, I*pi/2]]) + + >>> m = Matrix( + ... [[0, 0, 0, 1], + ... [0, 0, 1, 0], + ... [0, 1, 0, 0], + ... [1, 0, 0, 0]]) + >>> m.log() + Matrix([ + [ I*pi/2, 0, 0, -I*pi/2], + [ 0, I*pi/2, -I*pi/2, 0], + [ 0, -I*pi/2, I*pi/2, 0], + [-I*pi/2, 0, 0, I*pi/2]]) + """ + if not self.is_square: + raise NonSquareMatrixError( + "Logarithm is valid only for square matrices") + + try: + if simplify: + P, J = simplify(self).jordan_form() + else: + P, J = self.jordan_form() + + cells = J.get_diag_blocks() + except MatrixError: + raise NotImplementedError( + "Logarithm is implemented only for matrices for which " + "the Jordan normal form can be computed") + + blocks = [ + cell._eval_matrix_log_jblock() + for cell in cells] + from sympy.matrices import diag + eJ = diag(*blocks) + + if simplify: + ret = simplify(P * eJ * simplify(P.inv())) + ret = self.__class__(ret) + else: + ret = P * eJ * P.inv() + + return ret + + def is_nilpotent(self): + """Checks if a matrix is nilpotent. + + A matrix B is nilpotent if for some integer k, B**k is + a zero matrix. + + Examples + ======== + + >>> from sympy import Matrix + >>> a = Matrix([[0, 0, 0], [1, 0, 0], [1, 1, 0]]) + >>> a.is_nilpotent() + True + + >>> a = Matrix([[1, 0, 1], [1, 0, 0], [1, 1, 0]]) + >>> a.is_nilpotent() + False + """ + if not self: + return True + if not self.is_square: + raise NonSquareMatrixError( + "Nilpotency is valid only for square matrices") + x = uniquely_named_symbol('x', self, modify=lambda s: '_' + s) + p = self.charpoly(x) + if p.args[0] == x ** self.rows: + return True + return False + + def key2bounds(self, keys): + """Converts a key with potentially mixed types of keys (integer and slice) + into a tuple of ranges and raises an error if any index is out of ``self``'s + range. + + See Also + ======== + + key2ij + """ + islice, jslice = [isinstance(k, slice) for k in keys] + if islice: + if not self.rows: + rlo = rhi = 0 + else: + rlo, rhi = keys[0].indices(self.rows)[:2] + else: + rlo = a2idx(keys[0], self.rows) + rhi = rlo + 1 + if jslice: + if not self.cols: + clo = chi = 0 + else: + clo, chi = keys[1].indices(self.cols)[:2] + else: + clo = a2idx(keys[1], self.cols) + chi = clo + 1 + return rlo, rhi, clo, chi + + def key2ij(self, key): + """Converts key into canonical form, converting integers or indexable + items into valid integers for ``self``'s range or returning slices + unchanged. + + See Also + ======== + + key2bounds + """ + if is_sequence(key): + if not len(key) == 2: + raise TypeError('key must be a sequence of length 2') + return [a2idx(i, n) if not isinstance(i, slice) else i + for i, n in zip(key, self.shape)] + elif isinstance(key, slice): + return key.indices(len(self))[:2] + else: + return divmod(a2idx(key, len(self)), self.cols) + + def normalized(self, iszerofunc=_iszero): + """Return the normalized version of ``self``. + + Parameters + ========== + + iszerofunc : Function, optional + A function to determine whether ``self`` is a zero vector. + The default ``_iszero`` tests to see if each element is + exactly zero. + + Returns + ======= + + Matrix + Normalized vector form of ``self``. + It has the same length as a unit vector. However, a zero vector + will be returned for a vector with norm 0. + + Raises + ====== + + ShapeError + If the matrix is not in a vector form. + + See Also + ======== + + norm + """ + if self.rows != 1 and self.cols != 1: + raise ShapeError("A Matrix must be a vector to normalize.") + norm = self.norm() + if iszerofunc(norm): + out = self.zeros(self.rows, self.cols) + else: + out = self.applyfunc(lambda i: i / norm) + return out + + def norm(self, ord=None): + """Return the Norm of a Matrix or Vector. + + In the simplest case this is the geometric size of the vector + Other norms can be specified by the ord parameter + + + ===== ============================ ========================== + ord norm for matrices norm for vectors + ===== ============================ ========================== + None Frobenius norm 2-norm + 'fro' Frobenius norm - does not exist + inf maximum row sum max(abs(x)) + -inf -- min(abs(x)) + 1 maximum column sum as below + -1 -- as below + 2 2-norm (largest sing. value) as below + -2 smallest singular value as below + other - does not exist sum(abs(x)**ord)**(1./ord) + ===== ============================ ========================== + + Examples + ======== + + >>> from sympy import Matrix, Symbol, trigsimp, cos, sin, oo + >>> x = Symbol('x', real=True) + >>> v = Matrix([cos(x), sin(x)]) + >>> trigsimp( v.norm() ) + 1 + >>> v.norm(10) + (sin(x)**10 + cos(x)**10)**(1/10) + >>> A = Matrix([[1, 1], [1, 1]]) + >>> A.norm(1) # maximum sum of absolute values of A is 2 + 2 + >>> A.norm(2) # Spectral norm (max of |Ax|/|x| under 2-vector-norm) + 2 + >>> A.norm(-2) # Inverse spectral norm (smallest singular value) + 0 + >>> A.norm() # Frobenius Norm + 2 + >>> A.norm(oo) # Infinity Norm + 2 + >>> Matrix([1, -2]).norm(oo) + 2 + >>> Matrix([-1, 2]).norm(-oo) + 1 + + See Also + ======== + + normalized + """ + # Row or Column Vector Norms + vals = list(self.values()) or [0] + if S.One in self.shape: + if ord in (2, None): # Common case sqrt() + return sqrt(Add(*(abs(i) ** 2 for i in vals))) + + elif ord == 1: # sum(abs(x)) + return Add(*(abs(i) for i in vals)) + + elif ord is S.Infinity: # max(abs(x)) + return Max(*[abs(i) for i in vals]) + + elif ord is S.NegativeInfinity: # min(abs(x)) + return Min(*[abs(i) for i in vals]) + + # Otherwise generalize the 2-norm, Sum(x_i**ord)**(1/ord) + # Note that while useful this is not mathematically a norm + try: + return Pow(Add(*(abs(i) ** ord for i in vals)), S.One / ord) + except (NotImplementedError, TypeError): + raise ValueError("Expected order to be Number, Symbol, oo") + + # Matrix Norms + else: + if ord == 1: # Maximum column sum + m = self.applyfunc(abs) + return Max(*[sum(m.col(i)) for i in range(m.cols)]) + + elif ord == 2: # Spectral Norm + # Maximum singular value + return Max(*self.singular_values()) + + elif ord == -2: + # Minimum singular value + return Min(*self.singular_values()) + + elif ord is S.Infinity: # Infinity Norm - Maximum row sum + m = self.applyfunc(abs) + return Max(*[sum(m.row(i)) for i in range(m.rows)]) + + elif (ord is None or isinstance(ord, + str) and ord.lower() in + ['f', 'fro', 'frobenius', 'vector']): + # Reshape as vector and send back to norm function + return self.vec().norm(ord=2) + + else: + raise NotImplementedError("Matrix Norms under development") + + def print_nonzero(self, symb="X"): + """Shows location of non-zero entries for fast shape lookup. + + Examples + ======== + + >>> from sympy import Matrix, eye + >>> m = Matrix(2, 3, lambda i, j: i*3+j) + >>> m + Matrix([ + [0, 1, 2], + [3, 4, 5]]) + >>> m.print_nonzero() + [ XX] + [XXX] + >>> m = eye(4) + >>> m.print_nonzero("x") + [x ] + [ x ] + [ x ] + [ x] + + """ + s = [] + for i in range(self.rows): + line = [] + for j in range(self.cols): + if self[i, j] == 0: + line.append(" ") + else: + line.append(str(symb)) + s.append("[%s]" % ''.join(line)) + print('\n'.join(s)) + + def project(self, v): + """Return the projection of ``self`` onto the line containing ``v``. + + Examples + ======== + + >>> from sympy import Matrix, S, sqrt + >>> V = Matrix([sqrt(3)/2, S.Half]) + >>> x = Matrix([[1, 0]]) + >>> V.project(x) + Matrix([[sqrt(3)/2, 0]]) + >>> V.project(-x) + Matrix([[sqrt(3)/2, 0]]) + """ + return v * (self.dot(v) / v.dot(v)) + + def table(self, printer, rowstart='[', rowend=']', rowsep='\n', + colsep=', ', align='right'): + r""" + String form of Matrix as a table. + + ``printer`` is the printer to use for on the elements (generally + something like StrPrinter()) + + ``rowstart`` is the string used to start each row (by default '['). + + ``rowend`` is the string used to end each row (by default ']'). + + ``rowsep`` is the string used to separate rows (by default a newline). + + ``colsep`` is the string used to separate columns (by default ', '). + + ``align`` defines how the elements are aligned. Must be one of 'left', + 'right', or 'center'. You can also use '<', '>', and '^' to mean the + same thing, respectively. + + This is used by the string printer for Matrix. + + Examples + ======== + + >>> from sympy import Matrix, StrPrinter + >>> M = Matrix([[1, 2], [-33, 4]]) + >>> printer = StrPrinter() + >>> M.table(printer) + '[ 1, 2]\n[-33, 4]' + >>> print(M.table(printer)) + [ 1, 2] + [-33, 4] + >>> print(M.table(printer, rowsep=',\n')) + [ 1, 2], + [-33, 4] + >>> print('[%s]' % M.table(printer, rowsep=',\n')) + [[ 1, 2], + [-33, 4]] + >>> print(M.table(printer, colsep=' ')) + [ 1 2] + [-33 4] + >>> print(M.table(printer, align='center')) + [ 1 , 2] + [-33, 4] + >>> print(M.table(printer, rowstart='{', rowend='}')) + { 1, 2} + {-33, 4} + """ + # Handle zero dimensions: + if S.Zero in self.shape: + return '[]' + # Build table of string representations of the elements + res = [] + # Track per-column max lengths for pretty alignment + maxlen = [0] * self.cols + for i in range(self.rows): + res.append([]) + for j in range(self.cols): + s = printer._print(self[i, j]) + res[-1].append(s) + maxlen[j] = max(len(s), maxlen[j]) + # Patch strings together + align = { + 'left': 'ljust', + 'right': 'rjust', + 'center': 'center', + '<': 'ljust', + '>': 'rjust', + '^': 'center', + }[align] + for i, row in enumerate(res): + for j, elem in enumerate(row): + row[j] = getattr(elem, align)(maxlen[j]) + res[i] = rowstart + colsep.join(row) + rowend + return rowsep.join(res) + + def rank_decomposition(self, iszerofunc=_iszero, simplify=False): + return _rank_decomposition(self, iszerofunc=iszerofunc, + simplify=simplify) + + def cholesky(self, hermitian=True): + raise NotImplementedError('This function is implemented in DenseMatrix or SparseMatrix') + + def LDLdecomposition(self, hermitian=True): + raise NotImplementedError('This function is implemented in DenseMatrix or SparseMatrix') + + def LUdecomposition(self, iszerofunc=_iszero, simpfunc=None, + rankcheck=False): + return _LUdecomposition(self, iszerofunc=iszerofunc, simpfunc=simpfunc, + rankcheck=rankcheck) + + def LUdecomposition_Simple(self, iszerofunc=_iszero, simpfunc=None, + rankcheck=False): + return _LUdecomposition_Simple(self, iszerofunc=iszerofunc, + simpfunc=simpfunc, rankcheck=rankcheck) + + def LUdecompositionFF(self): + return _LUdecompositionFF(self) + + def singular_value_decomposition(self): + return _singular_value_decomposition(self) + + def QRdecomposition(self): + return _QRdecomposition(self) + + def upper_hessenberg_decomposition(self): + return _upper_hessenberg_decomposition(self) + + def diagonal_solve(self, rhs): + return _diagonal_solve(self, rhs) + + def lower_triangular_solve(self, rhs): + raise NotImplementedError('This function is implemented in DenseMatrix or SparseMatrix') + + def upper_triangular_solve(self, rhs): + raise NotImplementedError('This function is implemented in DenseMatrix or SparseMatrix') + + def cholesky_solve(self, rhs): + return _cholesky_solve(self, rhs) + + def LDLsolve(self, rhs): + return _LDLsolve(self, rhs) + + def LUsolve(self, rhs, iszerofunc=_iszero): + return _LUsolve(self, rhs, iszerofunc=iszerofunc) + + def QRsolve(self, b): + return _QRsolve(self, b) + + def gauss_jordan_solve(self, B, freevar=False): + return _gauss_jordan_solve(self, B, freevar=freevar) + + def pinv_solve(self, B, arbitrary_matrix=None): + return _pinv_solve(self, B, arbitrary_matrix=arbitrary_matrix) + + def cramer_solve(self, rhs, det_method="laplace"): + return _cramer_solve(self, rhs, det_method=det_method) + + def solve(self, rhs, method='GJ'): + return _solve(self, rhs, method=method) + + def solve_least_squares(self, rhs, method='CH'): + return _solve_least_squares(self, rhs, method=method) + + def pinv(self, method='RD'): + return _pinv(self, method=method) + + def inverse_ADJ(self, iszerofunc=_iszero): + return _inv_ADJ(self, iszerofunc=iszerofunc) + + def inverse_BLOCK(self, iszerofunc=_iszero): + return _inv_block(self, iszerofunc=iszerofunc) + + def inverse_GE(self, iszerofunc=_iszero): + return _inv_GE(self, iszerofunc=iszerofunc) + + def inverse_LU(self, iszerofunc=_iszero): + return _inv_LU(self, iszerofunc=iszerofunc) + + def inverse_CH(self, iszerofunc=_iszero): + return _inv_CH(self, iszerofunc=iszerofunc) + + def inverse_LDL(self, iszerofunc=_iszero): + return _inv_LDL(self, iszerofunc=iszerofunc) + + def inverse_QR(self, iszerofunc=_iszero): + return _inv_QR(self, iszerofunc=iszerofunc) + + def inv(self, method=None, iszerofunc=_iszero, try_block_diag=False): + return _inv(self, method=method, iszerofunc=iszerofunc, + try_block_diag=try_block_diag) + + def connected_components(self): + return _connected_components(self) + + def connected_components_decomposition(self): + return _connected_components_decomposition(self) + + def strongly_connected_components(self): + return _strongly_connected_components(self) + + def strongly_connected_components_decomposition(self, lower=True): + return _strongly_connected_components_decomposition(self, lower=lower) + + _sage_ = Basic._sage_ + + rank_decomposition.__doc__ = _rank_decomposition.__doc__ + cholesky.__doc__ = _cholesky.__doc__ + LDLdecomposition.__doc__ = _LDLdecomposition.__doc__ + LUdecomposition.__doc__ = _LUdecomposition.__doc__ + LUdecomposition_Simple.__doc__ = _LUdecomposition_Simple.__doc__ + LUdecompositionFF.__doc__ = _LUdecompositionFF.__doc__ + singular_value_decomposition.__doc__ = _singular_value_decomposition.__doc__ + QRdecomposition.__doc__ = _QRdecomposition.__doc__ + upper_hessenberg_decomposition.__doc__ = _upper_hessenberg_decomposition.__doc__ + + diagonal_solve.__doc__ = _diagonal_solve.__doc__ + lower_triangular_solve.__doc__ = _lower_triangular_solve.__doc__ + upper_triangular_solve.__doc__ = _upper_triangular_solve.__doc__ + cholesky_solve.__doc__ = _cholesky_solve.__doc__ + LDLsolve.__doc__ = _LDLsolve.__doc__ + LUsolve.__doc__ = _LUsolve.__doc__ + QRsolve.__doc__ = _QRsolve.__doc__ + gauss_jordan_solve.__doc__ = _gauss_jordan_solve.__doc__ + pinv_solve.__doc__ = _pinv_solve.__doc__ + cramer_solve.__doc__ = _cramer_solve.__doc__ + solve.__doc__ = _solve.__doc__ + solve_least_squares.__doc__ = _solve_least_squares.__doc__ + + pinv.__doc__ = _pinv.__doc__ + inverse_ADJ.__doc__ = _inv_ADJ.__doc__ + inverse_GE.__doc__ = _inv_GE.__doc__ + inverse_LU.__doc__ = _inv_LU.__doc__ + inverse_CH.__doc__ = _inv_CH.__doc__ + inverse_LDL.__doc__ = _inv_LDL.__doc__ + inverse_QR.__doc__ = _inv_QR.__doc__ + inverse_BLOCK.__doc__ = _inv_block.__doc__ + inv.__doc__ = _inv.__doc__ + + connected_components.__doc__ = _connected_components.__doc__ + connected_components_decomposition.__doc__ = \ + _connected_components_decomposition.__doc__ + strongly_connected_components.__doc__ = \ + _strongly_connected_components.__doc__ + strongly_connected_components_decomposition.__doc__ = \ + _strongly_connected_components_decomposition.__doc__ + + +def _convert_matrix(typ, mat): + """Convert mat to a Matrix of type typ.""" + from sympy.matrices.matrixbase import MatrixBase + if getattr(mat, "is_Matrix", False) and not isinstance(mat, MatrixBase): + # This is needed for interop between Matrix and the redundant matrix + # mixin types like _MinimalMatrix etc. If anyone should happen to be + # using those then this keeps them working. Really _MinimalMatrix etc + # should be deprecated and removed though. + return typ(*mat.shape, list(mat)) + else: + return typ(mat) + + +def _has_matrix_shape(other): + shape = getattr(other, 'shape', None) + if shape is None: + return False + return isinstance(shape, tuple) and len(shape) == 2 + + +def _has_rows_cols(other): + return hasattr(other, 'rows') and hasattr(other, 'cols') + + +def _coerce_operand(self, other): + """Convert other to a Matrix, or check for possible scalar.""" + + INVALID = None, 'invalid_type' + + # Disallow mixing Matrix and Array + if isinstance(other, NDimArray): + return INVALID + + is_Matrix = getattr(other, 'is_Matrix', None) + + # Return a Matrix as-is + if is_Matrix: + return other, 'is_matrix' + + # Try to convert numpy array, mpmath matrix etc. + if is_Matrix is None: + if _has_matrix_shape(other) or _has_rows_cols(other): + return _convert_matrix(type(self), other), 'is_matrix' + + # Could be a scalar but only if not iterable... + if not isinstance(other, Iterable): + return other, 'possible_scalar' + + return INVALID + + +def classof(A, B): + """ + Get the type of the result when combining matrices of different types. + + Currently the strategy is that immutability is contagious. + + Examples + ======== + + >>> from sympy import Matrix, ImmutableMatrix + >>> from sympy.matrices.matrixbase import classof + >>> M = Matrix([[1, 2], [3, 4]]) # a Mutable Matrix + >>> IM = ImmutableMatrix([[1, 2], [3, 4]]) + >>> classof(M, IM) + + """ + priority_A = getattr(A, '_class_priority', None) + priority_B = getattr(B, '_class_priority', None) + if None not in (priority_A, priority_B): + if A._class_priority > B._class_priority: + return A.__class__ + else: + return B.__class__ + + try: + import numpy + except ImportError: + pass + else: + if isinstance(A, numpy.ndarray): + return B.__class__ + if isinstance(B, numpy.ndarray): + return A.__class__ + + raise TypeError("Incompatible classes %s, %s" % (A.__class__, B.__class__)) + + +def _unify_with_other(self, other): + """Unify self and other into a single matrix type, or check for scalar.""" + other, T = _coerce_operand(self, other) + + if T == "is_matrix": + typ = classof(self, other) + if typ != self.__class__: + self = _convert_matrix(typ, self) + if typ != other.__class__: + other = _convert_matrix(typ, other) + + return self, other, T + + +def a2idx(j, n=None): + """Return integer after making positive and validating against n.""" + if not isinstance(j, int): + jindex = getattr(j, '__index__', None) + if jindex is not None: + j = jindex() + else: + raise IndexError("Invalid index a[%r]" % (j,)) + if n is not None: + if j < 0: + j += n + if not (j >= 0 and j < n): + raise IndexError("Index out of range: a[%s]" % (j,)) + return int(j) + + +class DeferredVector(Symbol, NotIterable): # type: ignore + """A vector whose components are deferred (e.g. for use with lambdify). + + Examples + ======== + + >>> from sympy import DeferredVector, lambdify + >>> X = DeferredVector( 'X' ) + >>> X + X + >>> expr = (X[0] + 2, X[2] + 3) + >>> func = lambdify( X, expr) + >>> func( [1, 2, 3] ) + (3, 6) + """ + + def __getitem__(self, i): + if i == -0: + i = 0 + if i < 0: + raise IndexError('DeferredVector index out of range') + component_name = '%s[%d]' % (self.name, i) + return Symbol(component_name) + + def __str__(self): + return sstr(self) + + def __repr__(self): + return "DeferredVector('%s')" % self.name diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/normalforms.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/normalforms.py new file mode 100644 index 0000000000000000000000000000000000000000..61a7d26bbdb8c8a3e8e3044d39b2403b2e14b7d5 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/normalforms.py @@ -0,0 +1,156 @@ +'''Functions returning normal forms of matrices''' + +from sympy.polys.domains.integerring import ZZ +from sympy.polys.polytools import Poly +from sympy.polys.matrices import DomainMatrix +from sympy.polys.matrices.normalforms import ( + smith_normal_form as _snf, + is_smith_normal_form as _is_snf, + smith_normal_decomp as _snd, + invariant_factors as _invf, + hermite_normal_form as _hnf, + ) + + +def _to_domain(m, domain=None): + """Convert Matrix to DomainMatrix""" + # XXX: deprecated support for RawMatrix: + ring = getattr(m, "ring", None) + m = m.applyfunc(lambda e: e.as_expr() if isinstance(e, Poly) else e) + + dM = DomainMatrix.from_Matrix(m) + + domain = domain or ring + if domain is not None: + dM = dM.convert_to(domain) + return dM + + +def smith_normal_form(m, domain=None): + ''' + Return the Smith Normal Form of a matrix `m` over the ring `domain`. + This will only work if the ring is a principal ideal domain. + + Examples + ======== + + >>> from sympy import Matrix, ZZ + >>> from sympy.matrices.normalforms import smith_normal_form + >>> m = Matrix([[12, 6, 4], [3, 9, 6], [2, 16, 14]]) + >>> print(smith_normal_form(m, domain=ZZ)) + Matrix([[1, 0, 0], [0, 10, 0], [0, 0, 30]]) + + ''' + dM = _to_domain(m, domain) + return _snf(dM).to_Matrix() + + +def is_smith_normal_form(m, domain=None): + ''' + Checks that the matrix is in Smith Normal Form + ''' + dM = _to_domain(m, domain) + return _is_snf(dM) + + +def smith_normal_decomp(m, domain=None): + ''' + Return the Smith Normal Decomposition of a matrix `m` over the ring + `domain`. This will only work if the ring is a principal ideal domain. + + Examples + ======== + + >>> from sympy import Matrix, ZZ + >>> from sympy.matrices.normalforms import smith_normal_decomp + >>> m = Matrix([[12, 6, 4], [3, 9, 6], [2, 16, 14]]) + >>> a, s, t = smith_normal_decomp(m, domain=ZZ) + >>> assert a == s * m * t + ''' + dM = _to_domain(m, domain) + a, s, t = _snd(dM) + return a.to_Matrix(), s.to_Matrix(), t.to_Matrix() + + +def invariant_factors(m, domain=None): + ''' + Return the tuple of abelian invariants for a matrix `m` + (as in the Smith-Normal form) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Smith_normal_form#Algorithm + .. [2] https://web.archive.org/web/20200331143852/https://sierra.nmsu.edu/morandi/notes/SmithNormalForm.pdf + + ''' + dM = _to_domain(m, domain) + factors = _invf(dM) + factors = tuple(dM.domain.to_sympy(f) for f in factors) + # XXX: deprecated. + if hasattr(m, "ring"): + if m.ring.is_PolynomialRing: + K = m.ring + to_poly = lambda f: Poly(f, K.symbols, domain=K.domain) + factors = tuple(to_poly(f) for f in factors) + return factors + + +def hermite_normal_form(A, *, D=None, check_rank=False): + r""" + Compute the Hermite Normal Form of a Matrix *A* of integers. + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.matrices.normalforms import hermite_normal_form + >>> m = Matrix([[12, 6, 4], [3, 9, 6], [2, 16, 14]]) + >>> print(hermite_normal_form(m)) + Matrix([[10, 0, 2], [0, 15, 3], [0, 0, 2]]) + + Parameters + ========== + + A : $m \times n$ ``Matrix`` of integers. + + D : int, optional + Let $W$ be the HNF of *A*. If known in advance, a positive integer *D* + being any multiple of $\det(W)$ may be provided. In this case, if *A* + also has rank $m$, then we may use an alternative algorithm that works + mod *D* in order to prevent coefficient explosion. + + check_rank : boolean, optional (default=False) + The basic assumption is that, if you pass a value for *D*, then + you already believe that *A* has rank $m$, so we do not waste time + checking it for you. If you do want this to be checked (and the + ordinary, non-modulo *D* algorithm to be used if the check fails), then + set *check_rank* to ``True``. + + Returns + ======= + + ``Matrix`` + The HNF of matrix *A*. + + Raises + ====== + + DMDomainError + If the domain of the matrix is not :ref:`ZZ`. + + DMShapeError + If the mod *D* algorithm is used but the matrix has more rows than + columns. + + References + ========== + + .. [1] Cohen, H. *A Course in Computational Algebraic Number Theory.* + (See Algorithms 2.4.5 and 2.4.8.) + + """ + # Accept any of Python int, SymPy Integer, and ZZ itself: + if D is not None and not ZZ.of_type(D): + D = ZZ(int(D)) + return _hnf(A._rep, D=D, check_rank=check_rank).to_Matrix() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/reductions.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/reductions.py new file mode 100644 index 0000000000000000000000000000000000000000..aace8c0336358e1869a34d99f79390cc0c0163fe --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/reductions.py @@ -0,0 +1,387 @@ +from types import FunctionType + +from sympy.polys.polyerrors import CoercionFailed +from sympy.polys.domains import ZZ, QQ + +from .utilities import _get_intermediate_simp, _iszero, _dotprodsimp, _simplify +from .determinant import _find_reasonable_pivot + + +def _row_reduce_list(mat, rows, cols, one, iszerofunc, simpfunc, + normalize_last=True, normalize=True, zero_above=True): + """Row reduce a flat list representation of a matrix and return a tuple + (rref_matrix, pivot_cols, swaps) where ``rref_matrix`` is a flat list, + ``pivot_cols`` are the pivot columns and ``swaps`` are any row swaps that + were used in the process of row reduction. + + Parameters + ========== + + mat : list + list of matrix elements, must be ``rows`` * ``cols`` in length + + rows, cols : integer + number of rows and columns in flat list representation + + one : SymPy object + represents the value one, from ``Matrix.one`` + + iszerofunc : determines if an entry can be used as a pivot + + simpfunc : used to simplify elements and test if they are + zero if ``iszerofunc`` returns `None` + + normalize_last : indicates where all row reduction should + happen in a fraction-free manner and then the rows are + normalized (so that the pivots are 1), or whether + rows should be normalized along the way (like the naive + row reduction algorithm) + + normalize : whether pivot rows should be normalized so that + the pivot value is 1 + + zero_above : whether entries above the pivot should be zeroed. + If ``zero_above=False``, an echelon matrix will be returned. + """ + + def get_col(i): + return mat[i::cols] + + def row_swap(i, j): + mat[i*cols:(i + 1)*cols], mat[j*cols:(j + 1)*cols] = \ + mat[j*cols:(j + 1)*cols], mat[i*cols:(i + 1)*cols] + + def cross_cancel(a, i, b, j): + """Does the row op row[i] = a*row[i] - b*row[j]""" + q = (j - i)*cols + for p in range(i*cols, (i + 1)*cols): + mat[p] = isimp(a*mat[p] - b*mat[p + q]) + + isimp = _get_intermediate_simp(_dotprodsimp) + piv_row, piv_col = 0, 0 + pivot_cols = [] + swaps = [] + + # use a fraction free method to zero above and below each pivot + while piv_col < cols and piv_row < rows: + pivot_offset, pivot_val, \ + assumed_nonzero, newly_determined = _find_reasonable_pivot( + get_col(piv_col)[piv_row:], iszerofunc, simpfunc) + + # _find_reasonable_pivot may have simplified some things + # in the process. Let's not let them go to waste + for (offset, val) in newly_determined: + offset += piv_row + mat[offset*cols + piv_col] = val + + if pivot_offset is None: + piv_col += 1 + continue + + pivot_cols.append(piv_col) + if pivot_offset != 0: + row_swap(piv_row, pivot_offset + piv_row) + swaps.append((piv_row, pivot_offset + piv_row)) + + # if we aren't normalizing last, we normalize + # before we zero the other rows + if normalize_last is False: + i, j = piv_row, piv_col + mat[i*cols + j] = one + for p in range(i*cols + j + 1, (i + 1)*cols): + mat[p] = isimp(mat[p] / pivot_val) + # after normalizing, the pivot value is 1 + pivot_val = one + + # zero above and below the pivot + for row in range(rows): + # don't zero our current row + if row == piv_row: + continue + # don't zero above the pivot unless we're told. + if zero_above is False and row < piv_row: + continue + # if we're already a zero, don't do anything + val = mat[row*cols + piv_col] + if iszerofunc(val): + continue + + cross_cancel(pivot_val, row, val, piv_row) + piv_row += 1 + + # normalize each row + if normalize_last is True and normalize is True: + for piv_i, piv_j in enumerate(pivot_cols): + pivot_val = mat[piv_i*cols + piv_j] + mat[piv_i*cols + piv_j] = one + for p in range(piv_i*cols + piv_j + 1, (piv_i + 1)*cols): + mat[p] = isimp(mat[p] / pivot_val) + + return mat, tuple(pivot_cols), tuple(swaps) + + +# This functions is a candidate for caching if it gets implemented for matrices. +def _row_reduce(M, iszerofunc, simpfunc, normalize_last=True, + normalize=True, zero_above=True): + + mat, pivot_cols, swaps = _row_reduce_list(list(M), M.rows, M.cols, M.one, + iszerofunc, simpfunc, normalize_last=normalize_last, + normalize=normalize, zero_above=zero_above) + + return M._new(M.rows, M.cols, mat), pivot_cols, swaps + + +def _is_echelon(M, iszerofunc=_iszero): + """Returns `True` if the matrix is in echelon form. That is, all rows of + zeros are at the bottom, and below each leading non-zero in a row are + exclusively zeros.""" + + if M.rows <= 0 or M.cols <= 0: + return True + + zeros_below = all(iszerofunc(t) for t in M[1:, 0]) + + if iszerofunc(M[0, 0]): + return zeros_below and _is_echelon(M[:, 1:], iszerofunc) + + return zeros_below and _is_echelon(M[1:, 1:], iszerofunc) + + +def _echelon_form(M, iszerofunc=_iszero, simplify=False, with_pivots=False): + """Returns a matrix row-equivalent to ``M`` that is in echelon form. Note + that echelon form of a matrix is *not* unique, however, properties like the + row space and the null space are preserved. + + Examples + ======== + + >>> from sympy import Matrix + >>> M = Matrix([[1, 2], [3, 4]]) + >>> M.echelon_form() + Matrix([ + [1, 2], + [0, -2]]) + """ + + simpfunc = simplify if isinstance(simplify, FunctionType) else _simplify + + mat, pivots, _ = _row_reduce(M, iszerofunc, simpfunc, + normalize_last=True, normalize=False, zero_above=False) + + if with_pivots: + return mat, pivots + + return mat + + +# This functions is a candidate for caching if it gets implemented for matrices. +def _rank(M, iszerofunc=_iszero, simplify=False): + """Returns the rank of a matrix. + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.abc import x + >>> m = Matrix([[1, 2], [x, 1 - 1/x]]) + >>> m.rank() + 2 + >>> n = Matrix(3, 3, range(1, 10)) + >>> n.rank() + 2 + """ + + def _permute_complexity_right(M, iszerofunc): + """Permute columns with complicated elements as + far right as they can go. Since the ``sympy`` row reduction + algorithms start on the left, having complexity right-shifted + speeds things up. + + Returns a tuple (mat, perm) where perm is a permutation + of the columns to perform to shift the complex columns right, and mat + is the permuted matrix.""" + + def complexity(i): + # the complexity of a column will be judged by how many + # element's zero-ness cannot be determined + return sum(1 if iszerofunc(e) is None else 0 for e in M[:, i]) + + complex = [(complexity(i), i) for i in range(M.cols)] + perm = [j for (i, j) in sorted(complex)] + + return (M.permute(perm, orientation='cols'), perm) + + simpfunc = simplify if isinstance(simplify, FunctionType) else _simplify + + # for small matrices, we compute the rank explicitly + # if is_zero on elements doesn't answer the question + # for small matrices, we fall back to the full routine. + if M.rows <= 0 or M.cols <= 0: + return 0 + + if M.rows <= 1 or M.cols <= 1: + zeros = [iszerofunc(x) for x in M] + + if False in zeros: + return 1 + + if M.rows == 2 and M.cols == 2: + zeros = [iszerofunc(x) for x in M] + + if False not in zeros and None not in zeros: + return 0 + + d = M.det() + + if iszerofunc(d) and False in zeros: + return 1 + if iszerofunc(d) is False: + return 2 + + mat, _ = _permute_complexity_right(M, iszerofunc=iszerofunc) + _, pivots, _ = _row_reduce(mat, iszerofunc, simpfunc, normalize_last=True, + normalize=False, zero_above=False) + + return len(pivots) + + +def _to_DM_ZZ_QQ(M): + # We have to test for _rep here because there are tests that otherwise fail + # with e.g. "AttributeError: 'SubspaceOnlyMatrix' object has no attribute + # '_rep'." There is almost certainly no value in such tests. The + # presumption seems to be that someone could create a new class by + # inheriting some of the Matrix classes and not the full set that is used + # by the standard Matrix class but if anyone tried that it would fail in + # many ways. + if not hasattr(M, '_rep'): + return None + + rep = M._rep + K = rep.domain + + if K.is_ZZ: + return rep + elif K.is_QQ: + try: + return rep.convert_to(ZZ) + except CoercionFailed: + return rep + else: + if not all(e.is_Rational for e in M): + return None + try: + return rep.convert_to(ZZ) + except CoercionFailed: + return rep.convert_to(QQ) + + +def _rref_dm(dM): + """Compute the reduced row echelon form of a DomainMatrix.""" + K = dM.domain + + if K.is_ZZ: + dM_rref, den, pivots = dM.rref_den(keep_domain=False) + dM_rref = dM_rref.to_field() / den + elif K.is_QQ: + dM_rref, pivots = dM.rref() + else: + assert False # pragma: no cover + + M_rref = dM_rref.to_Matrix() + + return M_rref, pivots + + +def _rref(M, iszerofunc=_iszero, simplify=False, pivots=True, + normalize_last=True): + """Return reduced row-echelon form of matrix and indices + of pivot vars. + + Parameters + ========== + + iszerofunc : Function + A function used for detecting whether an element can + act as a pivot. ``lambda x: x.is_zero`` is used by default. + + simplify : Function + A function used to simplify elements when looking for a pivot. + By default SymPy's ``simplify`` is used. + + pivots : True or False + If ``True``, a tuple containing the row-reduced matrix and a tuple + of pivot columns is returned. If ``False`` just the row-reduced + matrix is returned. + + normalize_last : True or False + If ``True``, no pivots are normalized to `1` until after all + entries above and below each pivot are zeroed. This means the row + reduction algorithm is fraction free until the very last step. + If ``False``, the naive row reduction procedure is used where + each pivot is normalized to be `1` before row operations are + used to zero above and below the pivot. + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.abc import x + >>> m = Matrix([[1, 2], [x, 1 - 1/x]]) + >>> m.rref() + (Matrix([ + [1, 0], + [0, 1]]), (0, 1)) + >>> rref_matrix, rref_pivots = m.rref() + >>> rref_matrix + Matrix([ + [1, 0], + [0, 1]]) + >>> rref_pivots + (0, 1) + + ``iszerofunc`` can correct rounding errors in matrices with float + values. In the following example, calling ``rref()`` leads to + floating point errors, incorrectly row reducing the matrix. + ``iszerofunc= lambda x: abs(x) < 1e-9`` sets sufficiently small numbers + to zero, avoiding this error. + + >>> m = Matrix([[0.9, -0.1, -0.2, 0], [-0.8, 0.9, -0.4, 0], [-0.1, -0.8, 0.6, 0]]) + >>> m.rref() + (Matrix([ + [1, 0, 0, 0], + [0, 1, 0, 0], + [0, 0, 1, 0]]), (0, 1, 2)) + >>> m.rref(iszerofunc=lambda x:abs(x)<1e-9) + (Matrix([ + [1, 0, -0.301369863013699, 0], + [0, 1, -0.712328767123288, 0], + [0, 0, 0, 0]]), (0, 1)) + + Notes + ===== + + The default value of ``normalize_last=True`` can provide significant + speedup to row reduction, especially on matrices with symbols. However, + if you depend on the form row reduction algorithm leaves entries + of the matrix, set ``normalize_last=False`` + """ + # Try to use DomainMatrix for ZZ or QQ + dM = _to_DM_ZZ_QQ(M) + + if dM is not None: + # Use DomainMatrix for ZZ or QQ + mat, pivot_cols = _rref_dm(dM) + else: + # Use the generic Matrix routine. + if isinstance(simplify, FunctionType): + simpfunc = simplify + else: + simpfunc = _simplify + + mat, pivot_cols, _ = _row_reduce(M, iszerofunc, simpfunc, + normalize_last, normalize=True, zero_above=True) + + if pivots: + return mat, pivot_cols + else: + return mat diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/repmatrix.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/repmatrix.py new file mode 100644 index 0000000000000000000000000000000000000000..57f32fae34786f68f579fad7de38c9e3cf43e131 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/repmatrix.py @@ -0,0 +1,1034 @@ +from collections import defaultdict + +from operator import index as index_ + +from sympy.core.expr import Expr +from sympy.core.kind import Kind, NumberKind, UndefinedKind +from sympy.core.numbers import Integer, Rational +from sympy.core.sympify import _sympify, SympifyError +from sympy.core.singleton import S +from sympy.polys.domains import ZZ, QQ, GF, EXRAW +from sympy.polys.matrices import DomainMatrix +from sympy.polys.matrices.exceptions import DMNonInvertibleMatrixError +from sympy.polys.polyerrors import CoercionFailed, NotInvertible +from sympy.utilities.exceptions import sympy_deprecation_warning +from sympy.utilities.iterables import is_sequence +from sympy.utilities.misc import filldedent, as_int + +from .exceptions import ShapeError, NonSquareMatrixError, NonInvertibleMatrixError +from .matrixbase import classof, MatrixBase +from .kind import MatrixKind + + +class RepMatrix(MatrixBase): + """Matrix implementation based on DomainMatrix as an internal representation. + + The RepMatrix class is a superclass for Matrix, ImmutableMatrix, + SparseMatrix and ImmutableSparseMatrix which are the main usable matrix + classes in SymPy. Most methods on this class are simply forwarded to + DomainMatrix. + """ + + # + # MatrixBase is the common superclass for all of the usable explicit matrix + # classes in SymPy. The idea is that MatrixBase is an abstract class though + # and that subclasses will implement the lower-level methods. + # + # RepMatrix is a subclass of MatrixBase that uses DomainMatrix as an + # internal representation and delegates lower-level methods to + # DomainMatrix. All of SymPy's standard explicit matrix classes subclass + # RepMatrix and so use DomainMatrix internally. + # + # A RepMatrix uses an internal DomainMatrix with the domain set to ZZ, QQ + # or EXRAW. The EXRAW domain is equivalent to the previous implementation + # of Matrix that used Expr for the elements. The ZZ and QQ domains are used + # when applicable just because they are compatible with the previous + # implementation but are much more efficient. Other domains such as QQ[x] + # are not used because they differ from Expr in some way (e.g. automatic + # expansion of powers and products). + # + + _rep: DomainMatrix + + def __eq__(self, other): + # Skip sympify for mutable matrices... + if not isinstance(other, RepMatrix): + try: + other = _sympify(other) + except SympifyError: + return NotImplemented + if not isinstance(other, RepMatrix): + return NotImplemented + + return self._rep.unify_eq(other._rep) + + def to_DM(self, domain=None, **kwargs): + """Convert to a :class:`~.DomainMatrix`. + + Examples + ======== + + >>> from sympy import Matrix + >>> M = Matrix([[1, 2], [3, 4]]) + >>> M.to_DM() + DomainMatrix({0: {0: 1, 1: 2}, 1: {0: 3, 1: 4}}, (2, 2), ZZ) + + The :meth:`DomainMatrix.to_Matrix` method can be used to convert back: + + >>> M.to_DM().to_Matrix() == M + True + + The domain can be given explicitly or otherwise it will be chosen by + :func:`construct_domain`. Any keyword arguments (besides ``domain``) + are passed to :func:`construct_domain`: + + >>> from sympy import QQ, symbols + >>> x = symbols('x') + >>> M = Matrix([[x, 1], [1, x]]) + >>> M + Matrix([ + [x, 1], + [1, x]]) + >>> M.to_DM().domain + ZZ[x] + >>> M.to_DM(field=True).domain + ZZ(x) + >>> M.to_DM(domain=QQ[x]).domain + QQ[x] + + See Also + ======== + + DomainMatrix + DomainMatrix.to_Matrix + DomainMatrix.convert_to + DomainMatrix.choose_domain + construct_domain + """ + if domain is not None: + if kwargs: + raise TypeError("Options cannot be used with domain parameter") + return self._rep.convert_to(domain) + + rep = self._rep + dom = rep.domain + + # If the internal DomainMatrix is already ZZ or QQ then we can maybe + # bypass calling construct_domain or performing any conversions. Some + # kwargs might affect this though e.g. field=True (not sure if there + # are others). + if not kwargs: + if dom.is_ZZ: + return rep.copy() + elif dom.is_QQ: + # All elements might be integers + try: + return rep.convert_to(ZZ) + except CoercionFailed: + pass + return rep.copy() + + # Let construct_domain choose a domain + rep_dom = rep.choose_domain(**kwargs) + + # XXX: There should be an option to construct_domain to choose EXRAW + # instead of EX. At least converting to EX does not initially trigger + # EX.simplify which is what we want here but should probably be + # considered a bug in EX. Perhaps also this could be handled in + # DomainMatrix.choose_domain rather than here... + if rep_dom.domain.is_EX: + rep_dom = rep_dom.convert_to(EXRAW) + + return rep_dom + + @classmethod + def _unify_element_sympy(cls, rep, element): + domain = rep.domain + element = _sympify(element) + + if domain != EXRAW: + # The domain can only be ZZ, QQ or EXRAW + if element.is_Integer: + new_domain = domain + elif element.is_Rational: + new_domain = QQ + else: + new_domain = EXRAW + + # XXX: This converts the domain for all elements in the matrix + # which can be slow. This happens e.g. if __setitem__ changes one + # element to something that does not fit in the domain + if new_domain != domain: + rep = rep.convert_to(new_domain) + domain = new_domain + + if domain != EXRAW: + element = new_domain.from_sympy(element) + + if domain == EXRAW and not isinstance(element, Expr): + sympy_deprecation_warning( + """ + non-Expr objects in a Matrix is deprecated. Matrix represents + a mathematical matrix. To represent a container of non-numeric + entities, Use a list of lists, TableForm, NumPy array, or some + other data structure instead. + """, + deprecated_since_version="1.9", + active_deprecations_target="deprecated-non-expr-in-matrix", + stacklevel=4, + ) + + return rep, element + + @classmethod + def _dod_to_DomainMatrix(cls, rows, cols, dod, types): + + if not all(issubclass(typ, Expr) for typ in types): + sympy_deprecation_warning( + """ + non-Expr objects in a Matrix is deprecated. Matrix represents + a mathematical matrix. To represent a container of non-numeric + entities, Use a list of lists, TableForm, NumPy array, or some + other data structure instead. + """, + deprecated_since_version="1.9", + active_deprecations_target="deprecated-non-expr-in-matrix", + stacklevel=6, + ) + + rep = DomainMatrix(dod, (rows, cols), EXRAW) + + if all(issubclass(typ, Rational) for typ in types): + if all(issubclass(typ, Integer) for typ in types): + rep = rep.convert_to(ZZ) + else: + rep = rep.convert_to(QQ) + + return rep + + @classmethod + def _flat_list_to_DomainMatrix(cls, rows, cols, flat_list): + + elements_dod = defaultdict(dict) + for n, element in enumerate(flat_list): + if element != 0: + i, j = divmod(n, cols) + elements_dod[i][j] = element + + types = set(map(type, flat_list)) + + rep = cls._dod_to_DomainMatrix(rows, cols, elements_dod, types) + return rep + + @classmethod + def _smat_to_DomainMatrix(cls, rows, cols, smat): + + elements_dod = defaultdict(dict) + for (i, j), element in smat.items(): + if element != 0: + elements_dod[i][j] = element + + types = set(map(type, smat.values())) + + rep = cls._dod_to_DomainMatrix(rows, cols, elements_dod, types) + return rep + + def flat(self): + return self._rep.to_sympy().to_list_flat() + + def _eval_tolist(self): + return self._rep.to_sympy().to_list() + + def _eval_todok(self): + return self._rep.to_sympy().to_dok() + + @classmethod + def _eval_from_dok(cls, rows, cols, dok): + return cls._fromrep(cls._smat_to_DomainMatrix(rows, cols, dok)) + + def _eval_values(self): + return list(self._eval_iter_values()) + + def _eval_iter_values(self): + rep = self._rep + K = rep.domain + values = rep.iter_values() + if not K.is_EXRAW: + values = map(K.to_sympy, values) + return values + + def _eval_iter_items(self): + rep = self._rep + K = rep.domain + to_sympy = K.to_sympy + items = rep.iter_items() + if not K.is_EXRAW: + items = ((i, to_sympy(v)) for i, v in items) + return items + + def copy(self): + return self._fromrep(self._rep.copy()) + + @property + def kind(self) -> MatrixKind: + domain = self._rep.domain + element_kind: Kind + if domain in (ZZ, QQ): + element_kind = NumberKind + elif domain == EXRAW: + kinds = {e.kind for e in self.values()} + if len(kinds) == 1: + [element_kind] = kinds + else: + element_kind = UndefinedKind + else: # pragma: no cover + raise RuntimeError("Domain should only be ZZ, QQ or EXRAW") + return MatrixKind(element_kind) + + def _eval_has(self, *patterns): + # if the matrix has any zeros, see if S.Zero + # has the pattern. If _smat is full length, + # the matrix has no zeros. + zhas = False + dok = self.todok() + if len(dok) != self.rows*self.cols: + zhas = S.Zero.has(*patterns) + return zhas or any(value.has(*patterns) for value in dok.values()) + + def _eval_is_Identity(self): + if not all(self[i, i] == 1 for i in range(self.rows)): + return False + return len(self.todok()) == self.rows + + def _eval_is_symmetric(self, simpfunc): + diff = (self - self.T).applyfunc(simpfunc) + return len(diff.values()) == 0 + + def _eval_transpose(self): + """Returns the transposed SparseMatrix of this SparseMatrix. + + Examples + ======== + + >>> from sympy import SparseMatrix + >>> a = SparseMatrix(((1, 2), (3, 4))) + >>> a + Matrix([ + [1, 2], + [3, 4]]) + >>> a.T + Matrix([ + [1, 3], + [2, 4]]) + """ + return self._fromrep(self._rep.transpose()) + + def _eval_col_join(self, other): + return self._fromrep(self._rep.vstack(other._rep)) + + def _eval_row_join(self, other): + return self._fromrep(self._rep.hstack(other._rep)) + + def _eval_extract(self, rowsList, colsList): + return self._fromrep(self._rep.extract(rowsList, colsList)) + + def __getitem__(self, key): + return _getitem_RepMatrix(self, key) + + @classmethod + def _eval_zeros(cls, rows, cols): + rep = DomainMatrix.zeros((rows, cols), ZZ) + return cls._fromrep(rep) + + @classmethod + def _eval_eye(cls, rows, cols): + rep = DomainMatrix.eye((rows, cols), ZZ) + return cls._fromrep(rep) + + def _eval_add(self, other): + return classof(self, other)._fromrep(self._rep + other._rep) + + def _eval_matrix_mul(self, other): + return classof(self, other)._fromrep(self._rep * other._rep) + + def _eval_matrix_mul_elementwise(self, other): + selfrep, otherrep = self._rep.unify(other._rep) + newrep = selfrep.mul_elementwise(otherrep) + return classof(self, other)._fromrep(newrep) + + def _eval_scalar_mul(self, other): + rep, other = self._unify_element_sympy(self._rep, other) + return self._fromrep(rep.scalarmul(other)) + + def _eval_scalar_rmul(self, other): + rep, other = self._unify_element_sympy(self._rep, other) + return self._fromrep(rep.rscalarmul(other)) + + def _eval_Abs(self): + return self._fromrep(self._rep.applyfunc(abs)) + + def _eval_conjugate(self): + rep = self._rep + domain = rep.domain + if domain in (ZZ, QQ): + return self.copy() + else: + return self._fromrep(rep.applyfunc(lambda e: e.conjugate())) + + def equals(self, other, failing_expression=False): + """Applies ``equals`` to corresponding elements of the matrices, + trying to prove that the elements are equivalent, returning True + if they are, False if any pair is not, and None (or the first + failing expression if failing_expression is True) if it cannot + be decided if the expressions are equivalent or not. This is, in + general, an expensive operation. + + Examples + ======== + + >>> from sympy import Matrix + >>> from sympy.abc import x + >>> A = Matrix([x*(x - 1), 0]) + >>> B = Matrix([x**2 - x, 0]) + >>> A == B + False + >>> A.simplify() == B.simplify() + True + >>> A.equals(B) + True + >>> A.equals(2) + False + + See Also + ======== + sympy.core.expr.Expr.equals + """ + if self.shape != getattr(other, 'shape', None): + return False + + rv = True + for i in range(self.rows): + for j in range(self.cols): + ans = self[i, j].equals(other[i, j], failing_expression) + if ans is False: + return False + elif ans is not True and rv is True: + rv = ans + return rv + + def inv_mod(M, m): + r""" + Returns the inverse of the integer matrix ``M`` modulo ``m``. + + Examples + ======== + + >>> from sympy import Matrix + >>> A = Matrix(2, 2, [1, 2, 3, 4]) + >>> A.inv_mod(5) + Matrix([ + [3, 1], + [4, 2]]) + >>> A.inv_mod(3) + Matrix([ + [1, 1], + [0, 1]]) + + """ + + if not M.is_square: + raise NonSquareMatrixError() + + try: + m = as_int(m) + except ValueError: + raise TypeError("inv_mod: modulus m must be an integer") + + K = GF(m, symmetric=False) + + try: + dM = M.to_DM(K) + except CoercionFailed: + raise ValueError("inv_mod: matrix entries must be integers") + + if K.is_Field: + try: + dMi = dM.inv() + except DMNonInvertibleMatrixError as exc: + msg = f'Matrix is not invertible (mod {m})' + raise NonInvertibleMatrixError(msg) from exc + else: + dMadj, det = dM.adj_det() + try: + detinv = 1 / det + except NotInvertible: + msg = f'Matrix is not invertible (mod {m})' + raise NonInvertibleMatrixError(msg) + dMi = dMadj * detinv + + return dMi.to_Matrix() + + def lll(self, delta=0.75): + """LLL-reduced basis for the rowspace of a matrix of integers. + + Performs the Lenstra–Lenstra–Lovász (LLL) basis reduction algorithm. + + The implementation is provided by :class:`~DomainMatrix`. See + :meth:`~DomainMatrix.lll` for more details. + + Examples + ======== + + >>> from sympy import Matrix + >>> M = Matrix([[1, 0, 0, 0, -20160], + ... [0, 1, 0, 0, 33768], + ... [0, 0, 1, 0, 39578], + ... [0, 0, 0, 1, 47757]]) + >>> M.lll() + Matrix([ + [ 10, -3, -2, 8, -4], + [ 3, -9, 8, 1, -11], + [ -3, 13, -9, -3, -9], + [-12, -7, -11, 9, -1]]) + + See Also + ======== + + lll_transform + sympy.polys.matrices.domainmatrix.DomainMatrix.lll + """ + delta = QQ.from_sympy(_sympify(delta)) + dM = self._rep.convert_to(ZZ) + basis = dM.lll(delta=delta) + return self._fromrep(basis) + + def lll_transform(self, delta=0.75): + """LLL-reduced basis and transformation matrix. + + Performs the Lenstra–Lenstra–Lovász (LLL) basis reduction algorithm. + + The implementation is provided by :class:`~DomainMatrix`. See + :meth:`~DomainMatrix.lll_transform` for more details. + + Examples + ======== + + >>> from sympy import Matrix + >>> M = Matrix([[1, 0, 0, 0, -20160], + ... [0, 1, 0, 0, 33768], + ... [0, 0, 1, 0, 39578], + ... [0, 0, 0, 1, 47757]]) + >>> B, T = M.lll_transform() + >>> B + Matrix([ + [ 10, -3, -2, 8, -4], + [ 3, -9, 8, 1, -11], + [ -3, 13, -9, -3, -9], + [-12, -7, -11, 9, -1]]) + >>> T + Matrix([ + [ 10, -3, -2, 8], + [ 3, -9, 8, 1], + [ -3, 13, -9, -3], + [-12, -7, -11, 9]]) + + The transformation matrix maps the original basis to the LLL-reduced + basis: + + >>> T * M == B + True + + See Also + ======== + + lll + sympy.polys.matrices.domainmatrix.DomainMatrix.lll_transform + """ + delta = QQ.from_sympy(_sympify(delta)) + dM = self._rep.convert_to(ZZ) + basis, transform = dM.lll_transform(delta=delta) + B = self._fromrep(basis) + T = self._fromrep(transform) + return B, T + + +class MutableRepMatrix(RepMatrix): + """Mutable matrix based on DomainMatrix as the internal representation""" + + # + # MutableRepMatrix is a subclass of RepMatrix that adds/overrides methods + # to make the instances mutable. MutableRepMatrix is a superclass for both + # MutableDenseMatrix and MutableSparseMatrix. + # + + is_zero = False + + def __new__(cls, *args, **kwargs): + return cls._new(*args, **kwargs) + + @classmethod + def _new(cls, *args, copy=True, **kwargs): + if copy is False: + # The input was rows, cols, [list]. + # It should be used directly without creating a copy. + if len(args) != 3: + raise TypeError("'copy=False' requires a matrix be initialized as rows,cols,[list]") + rows, cols, flat_list = args + else: + rows, cols, flat_list = cls._handle_creation_inputs(*args, **kwargs) + flat_list = list(flat_list) # create a shallow copy + + rep = cls._flat_list_to_DomainMatrix(rows, cols, flat_list) + + return cls._fromrep(rep) + + @classmethod + def _fromrep(cls, rep): + obj = super().__new__(cls) + obj.rows, obj.cols = rep.shape + obj._rep = rep + return obj + + def copy(self): + return self._fromrep(self._rep.copy()) + + def as_mutable(self): + return self.copy() + + def __setitem__(self, key, value): + """ + + Examples + ======== + + >>> from sympy import Matrix, I, zeros, ones + >>> m = Matrix(((1, 2+I), (3, 4))) + >>> m + Matrix([ + [1, 2 + I], + [3, 4]]) + >>> m[1, 0] = 9 + >>> m + Matrix([ + [1, 2 + I], + [9, 4]]) + >>> m[1, 0] = [[0, 1]] + + To replace row r you assign to position r*m where m + is the number of columns: + + >>> M = zeros(4) + >>> m = M.cols + >>> M[3*m] = ones(1, m)*2; M + Matrix([ + [0, 0, 0, 0], + [0, 0, 0, 0], + [0, 0, 0, 0], + [2, 2, 2, 2]]) + + And to replace column c you can assign to position c: + + >>> M[2] = ones(m, 1)*4; M + Matrix([ + [0, 0, 4, 0], + [0, 0, 4, 0], + [0, 0, 4, 0], + [2, 2, 4, 2]]) + """ + rv = self._setitem(key, value) + if rv is not None: + i, j, value = rv + self._rep, value = self._unify_element_sympy(self._rep, value) + self._rep.rep.setitem(i, j, value) + + def _eval_col_del(self, col): + self._rep = DomainMatrix.hstack(self._rep[:,:col], self._rep[:,col+1:]) + self.cols -= 1 + + def _eval_row_del(self, row): + self._rep = DomainMatrix.vstack(self._rep[:row,:], self._rep[row+1:, :]) + self.rows -= 1 + + def _eval_col_insert(self, col, other): + other = self._new(other) + return self.hstack(self[:,:col], other, self[:,col:]) + + def _eval_row_insert(self, row, other): + other = self._new(other) + return self.vstack(self[:row,:], other, self[row:,:]) + + def col_op(self, j, f): + """In-place operation on col j using two-arg functor whose args are + interpreted as (self[i, j], i). + + Examples + ======== + + >>> from sympy import eye + >>> M = eye(3) + >>> M.col_op(1, lambda v, i: v + 2*M[i, 0]); M + Matrix([ + [1, 2, 0], + [0, 1, 0], + [0, 0, 1]]) + + See Also + ======== + col + row_op + """ + for i in range(self.rows): + self[i, j] = f(self[i, j], i) + + def col_swap(self, i, j): + """Swap the two given columns of the matrix in-place. + + Examples + ======== + + >>> from sympy import Matrix + >>> M = Matrix([[1, 0], [1, 0]]) + >>> M + Matrix([ + [1, 0], + [1, 0]]) + >>> M.col_swap(0, 1) + >>> M + Matrix([ + [0, 1], + [0, 1]]) + + See Also + ======== + + col + row_swap + """ + for k in range(0, self.rows): + self[k, i], self[k, j] = self[k, j], self[k, i] + + def row_op(self, i, f): + """In-place operation on row ``i`` using two-arg functor whose args are + interpreted as ``(self[i, j], j)``. + + Examples + ======== + + >>> from sympy import eye + >>> M = eye(3) + >>> M.row_op(1, lambda v, j: v + 2*M[0, j]); M + Matrix([ + [1, 0, 0], + [2, 1, 0], + [0, 0, 1]]) + + See Also + ======== + row + zip_row_op + col_op + + """ + for j in range(self.cols): + self[i, j] = f(self[i, j], j) + + #The next three methods give direct support for the most common row operations inplace. + def row_mult(self,i,factor): + """Multiply the given row by the given factor in-place. + + Examples + ======== + + >>> from sympy import eye + >>> M = eye(3) + >>> M.row_mult(1,7); M + Matrix([ + [1, 0, 0], + [0, 7, 0], + [0, 0, 1]]) + + """ + for j in range(self.cols): + self[i,j] *= factor + + def row_add(self,s,t,k): + """Add k times row s (source) to row t (target) in place. + + Examples + ======== + + >>> from sympy import eye + >>> M = eye(3) + >>> M.row_add(0, 2,3); M + Matrix([ + [1, 0, 0], + [0, 1, 0], + [3, 0, 1]]) + """ + + for j in range(self.cols): + self[t,j] += k*self[s,j] + + def row_swap(self, i, j): + """Swap the two given rows of the matrix in-place. + + Examples + ======== + + >>> from sympy import Matrix + >>> M = Matrix([[0, 1], [1, 0]]) + >>> M + Matrix([ + [0, 1], + [1, 0]]) + >>> M.row_swap(0, 1) + >>> M + Matrix([ + [1, 0], + [0, 1]]) + + See Also + ======== + + row + col_swap + """ + for k in range(0, self.cols): + self[i, k], self[j, k] = self[j, k], self[i, k] + + def zip_row_op(self, i, k, f): + """In-place operation on row ``i`` using two-arg functor whose args are + interpreted as ``(self[i, j], self[k, j])``. + + Examples + ======== + + >>> from sympy import eye + >>> M = eye(3) + >>> M.zip_row_op(1, 0, lambda v, u: v + 2*u); M + Matrix([ + [1, 0, 0], + [2, 1, 0], + [0, 0, 1]]) + + See Also + ======== + row + row_op + col_op + + """ + for j in range(self.cols): + self[i, j] = f(self[i, j], self[k, j]) + + def copyin_list(self, key, value): + """Copy in elements from a list. + + Parameters + ========== + + key : slice + The section of this matrix to replace. + value : iterable + The iterable to copy values from. + + Examples + ======== + + >>> from sympy import eye + >>> I = eye(3) + >>> I[:2, 0] = [1, 2] # col + >>> I + Matrix([ + [1, 0, 0], + [2, 1, 0], + [0, 0, 1]]) + >>> I[1, :2] = [[3, 4]] + >>> I + Matrix([ + [1, 0, 0], + [3, 4, 0], + [0, 0, 1]]) + + See Also + ======== + + copyin_matrix + """ + if not is_sequence(value): + raise TypeError("`value` must be an ordered iterable, not %s." % type(value)) + return self.copyin_matrix(key, type(self)(value)) + + def copyin_matrix(self, key, value): + """Copy in values from a matrix into the given bounds. + + Parameters + ========== + + key : slice + The section of this matrix to replace. + value : Matrix + The matrix to copy values from. + + Examples + ======== + + >>> from sympy import Matrix, eye + >>> M = Matrix([[0, 1], [2, 3], [4, 5]]) + >>> I = eye(3) + >>> I[:3, :2] = M + >>> I + Matrix([ + [0, 1, 0], + [2, 3, 0], + [4, 5, 1]]) + >>> I[0, 1] = M + >>> I + Matrix([ + [0, 0, 1], + [2, 2, 3], + [4, 4, 5]]) + + See Also + ======== + + copyin_list + """ + rlo, rhi, clo, chi = self.key2bounds(key) + shape = value.shape + dr, dc = rhi - rlo, chi - clo + if shape != (dr, dc): + raise ShapeError(filldedent("The Matrix `value` doesn't have the " + "same dimensions " + "as the in sub-Matrix given by `key`.")) + + for i in range(value.rows): + for j in range(value.cols): + self[i + rlo, j + clo] = value[i, j] + + def fill(self, value): + """Fill self with the given value. + + Notes + ===== + + Unless many values are going to be deleted (i.e. set to zero) + this will create a matrix that is slower than a dense matrix in + operations. + + Examples + ======== + + >>> from sympy import SparseMatrix + >>> M = SparseMatrix.zeros(3); M + Matrix([ + [0, 0, 0], + [0, 0, 0], + [0, 0, 0]]) + >>> M.fill(1); M + Matrix([ + [1, 1, 1], + [1, 1, 1], + [1, 1, 1]]) + + See Also + ======== + + zeros + ones + """ + value = _sympify(value) + if not value: + self._rep = DomainMatrix.zeros(self.shape, EXRAW) + else: + elements_dod = {i: dict.fromkeys(range(self.cols), value) for i in range(self.rows)} + self._rep = DomainMatrix(elements_dod, self.shape, EXRAW) + + +def _getitem_RepMatrix(self, key): + """Return portion of self defined by key. If the key involves a slice + then a list will be returned (if key is a single slice) or a matrix + (if key was a tuple involving a slice). + + Examples + ======== + + >>> from sympy import Matrix, I + >>> m = Matrix([ + ... [1, 2 + I], + ... [3, 4 ]]) + + If the key is a tuple that does not involve a slice then that element + is returned: + + >>> m[1, 0] + 3 + + When a tuple key involves a slice, a matrix is returned. Here, the + first column is selected (all rows, column 0): + + >>> m[:, 0] + Matrix([ + [1], + [3]]) + + If the slice is not a tuple then it selects from the underlying + list of elements that are arranged in row order and a list is + returned if a slice is involved: + + >>> m[0] + 1 + >>> m[::2] + [1, 3] + """ + if isinstance(key, tuple): + i, j = key + try: + return self._rep.getitem_sympy(index_(i), index_(j)) + except (TypeError, IndexError): + if (isinstance(i, Expr) and not i.is_number) or (isinstance(j, Expr) and not j.is_number): + if ((j < 0) is True) or ((j >= self.shape[1]) is True) or\ + ((i < 0) is True) or ((i >= self.shape[0]) is True): + raise ValueError("index out of boundary") + from sympy.matrices.expressions.matexpr import MatrixElement + return MatrixElement(self, i, j) + + if isinstance(i, slice): + i = range(self.rows)[i] + elif is_sequence(i): + pass + else: + i = [i] + if isinstance(j, slice): + j = range(self.cols)[j] + elif is_sequence(j): + pass + else: + j = [j] + return self.extract(i, j) + + else: + # Index/slice like a flattened list + rows, cols = self.shape + + # Raise the appropriate exception: + if not rows * cols: + return [][key] + + rep = self._rep.rep + domain = rep.domain + is_slice = isinstance(key, slice) + + if is_slice: + values = [rep.getitem(*divmod(n, cols)) for n in range(rows * cols)[key]] + else: + values = [rep.getitem(*divmod(index_(key), cols))] + + if domain != EXRAW: + to_sympy = domain.to_sympy + values = [to_sympy(val) for val in values] + + if is_slice: + return values + else: + return values[0] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/solvers.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/solvers.py new file mode 100644 index 0000000000000000000000000000000000000000..1fba990df80dcf46304ecb1412f5382f60948c51 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/solvers.py @@ -0,0 +1,942 @@ +from sympy.core.function import expand_mul +from sympy.core.symbol import Dummy, uniquely_named_symbol, symbols +from sympy.utilities.iterables import numbered_symbols + +from .exceptions import ShapeError, NonSquareMatrixError, NonInvertibleMatrixError +from .eigen import _fuzzy_positive_definite +from .utilities import _get_intermediate_simp, _iszero + + +def _diagonal_solve(M, rhs): + """Solves ``Ax = B`` efficiently, where A is a diagonal Matrix, + with non-zero diagonal entries. + + Examples + ======== + + >>> from sympy import Matrix, eye + >>> A = eye(2)*2 + >>> B = Matrix([[1, 2], [3, 4]]) + >>> A.diagonal_solve(B) == B/2 + True + + See Also + ======== + + sympy.matrices.dense.DenseMatrix.lower_triangular_solve + sympy.matrices.dense.DenseMatrix.upper_triangular_solve + gauss_jordan_solve + cholesky_solve + LDLsolve + LUsolve + QRsolve + pinv_solve + cramer_solve + """ + + if not M.is_diagonal(): + raise TypeError("Matrix should be diagonal") + if rhs.rows != M.rows: + raise TypeError("Size mismatch") + + return M._new( + rhs.rows, rhs.cols, lambda i, j: rhs[i, j] / M[i, i]) + + +def _lower_triangular_solve(M, rhs): + """Solves ``Ax = B``, where A is a lower triangular matrix. + + See Also + ======== + + upper_triangular_solve + gauss_jordan_solve + cholesky_solve + diagonal_solve + LDLsolve + LUsolve + QRsolve + pinv_solve + cramer_solve + """ + + from .dense import MutableDenseMatrix + + if not M.is_square: + raise NonSquareMatrixError("Matrix must be square.") + if rhs.rows != M.rows: + raise ShapeError("Matrices size mismatch.") + if not M.is_lower: + raise ValueError("Matrix must be lower triangular.") + + dps = _get_intermediate_simp() + X = MutableDenseMatrix.zeros(M.rows, rhs.cols) + + for j in range(rhs.cols): + for i in range(M.rows): + if M[i, i] == 0: + raise TypeError("Matrix must be non-singular.") + + X[i, j] = dps((rhs[i, j] - sum(M[i, k]*X[k, j] + for k in range(i))) / M[i, i]) + + return M._new(X) + +def _lower_triangular_solve_sparse(M, rhs): + """Solves ``Ax = B``, where A is a lower triangular matrix. + + See Also + ======== + + upper_triangular_solve + gauss_jordan_solve + cholesky_solve + diagonal_solve + LDLsolve + LUsolve + QRsolve + pinv_solve + cramer_solve + """ + + if not M.is_square: + raise NonSquareMatrixError("Matrix must be square.") + if rhs.rows != M.rows: + raise ShapeError("Matrices size mismatch.") + if not M.is_lower: + raise ValueError("Matrix must be lower triangular.") + + dps = _get_intermediate_simp() + rows = [[] for i in range(M.rows)] + + for i, j, v in M.row_list(): + if i > j: + rows[i].append((j, v)) + + X = rhs.as_mutable() + + for j in range(rhs.cols): + for i in range(rhs.rows): + for u, v in rows[i]: + X[i, j] -= v*X[u, j] + + X[i, j] = dps(X[i, j] / M[i, i]) + + return M._new(X) + + +def _upper_triangular_solve(M, rhs): + """Solves ``Ax = B``, where A is an upper triangular matrix. + + See Also + ======== + + lower_triangular_solve + gauss_jordan_solve + cholesky_solve + diagonal_solve + LDLsolve + LUsolve + QRsolve + pinv_solve + cramer_solve + """ + + from .dense import MutableDenseMatrix + + if not M.is_square: + raise NonSquareMatrixError("Matrix must be square.") + if rhs.rows != M.rows: + raise ShapeError("Matrix size mismatch.") + if not M.is_upper: + raise TypeError("Matrix is not upper triangular.") + + dps = _get_intermediate_simp() + X = MutableDenseMatrix.zeros(M.rows, rhs.cols) + + for j in range(rhs.cols): + for i in reversed(range(M.rows)): + if M[i, i] == 0: + raise ValueError("Matrix must be non-singular.") + + X[i, j] = dps((rhs[i, j] - sum(M[i, k]*X[k, j] + for k in range(i + 1, M.rows))) / M[i, i]) + + return M._new(X) + +def _upper_triangular_solve_sparse(M, rhs): + """Solves ``Ax = B``, where A is an upper triangular matrix. + + See Also + ======== + + lower_triangular_solve + gauss_jordan_solve + cholesky_solve + diagonal_solve + LDLsolve + LUsolve + QRsolve + pinv_solve + cramer_solve + """ + + if not M.is_square: + raise NonSquareMatrixError("Matrix must be square.") + if rhs.rows != M.rows: + raise ShapeError("Matrix size mismatch.") + if not M.is_upper: + raise TypeError("Matrix is not upper triangular.") + + dps = _get_intermediate_simp() + rows = [[] for i in range(M.rows)] + + for i, j, v in M.row_list(): + if i < j: + rows[i].append((j, v)) + + X = rhs.as_mutable() + + for j in range(rhs.cols): + for i in reversed(range(rhs.rows)): + for u, v in reversed(rows[i]): + X[i, j] -= v*X[u, j] + + X[i, j] = dps(X[i, j] / M[i, i]) + + return M._new(X) + + +def _cholesky_solve(M, rhs): + """Solves ``Ax = B`` using Cholesky decomposition, + for a general square non-singular matrix. + For a non-square matrix with rows > cols, + the least squares solution is returned. + + See Also + ======== + + sympy.matrices.dense.DenseMatrix.lower_triangular_solve + sympy.matrices.dense.DenseMatrix.upper_triangular_solve + gauss_jordan_solve + diagonal_solve + LDLsolve + LUsolve + QRsolve + pinv_solve + cramer_solve + """ + + if M.rows < M.cols: + raise NotImplementedError( + 'Under-determined System. Try M.gauss_jordan_solve(rhs)') + + hermitian = True + reform = False + + if M.is_symmetric(): + hermitian = False + elif not M.is_hermitian: + reform = True + + if reform or _fuzzy_positive_definite(M) is False: + H = M.H + M = H.multiply(M) + rhs = H.multiply(rhs) + hermitian = not M.is_symmetric() + + L = M.cholesky(hermitian=hermitian) + Y = L.lower_triangular_solve(rhs) + + if hermitian: + return (L.H).upper_triangular_solve(Y) + else: + return (L.T).upper_triangular_solve(Y) + + +def _LDLsolve(M, rhs): + """Solves ``Ax = B`` using LDL decomposition, + for a general square and non-singular matrix. + + For a non-square matrix with rows > cols, + the least squares solution is returned. + + Examples + ======== + + >>> from sympy import Matrix, eye + >>> A = eye(2)*2 + >>> B = Matrix([[1, 2], [3, 4]]) + >>> A.LDLsolve(B) == B/2 + True + + See Also + ======== + + sympy.matrices.dense.DenseMatrix.LDLdecomposition + sympy.matrices.dense.DenseMatrix.lower_triangular_solve + sympy.matrices.dense.DenseMatrix.upper_triangular_solve + gauss_jordan_solve + cholesky_solve + diagonal_solve + LUsolve + QRsolve + pinv_solve + cramer_solve + """ + + if M.rows < M.cols: + raise NotImplementedError( + 'Under-determined System. Try M.gauss_jordan_solve(rhs)') + + hermitian = True + reform = False + + if M.is_symmetric(): + hermitian = False + elif not M.is_hermitian: + reform = True + + if reform or _fuzzy_positive_definite(M) is False: + H = M.H + M = H.multiply(M) + rhs = H.multiply(rhs) + hermitian = not M.is_symmetric() + + L, D = M.LDLdecomposition(hermitian=hermitian) + Y = L.lower_triangular_solve(rhs) + Z = D.diagonal_solve(Y) + + if hermitian: + return (L.H).upper_triangular_solve(Z) + else: + return (L.T).upper_triangular_solve(Z) + + +def _LUsolve(M, rhs, iszerofunc=_iszero): + """Solve the linear system ``Ax = rhs`` for ``x`` where ``A = M``. + + This is for symbolic matrices, for real or complex ones use + mpmath.lu_solve or mpmath.qr_solve. + + See Also + ======== + + sympy.matrices.dense.DenseMatrix.lower_triangular_solve + sympy.matrices.dense.DenseMatrix.upper_triangular_solve + gauss_jordan_solve + cholesky_solve + diagonal_solve + LDLsolve + QRsolve + pinv_solve + LUdecomposition + cramer_solve + """ + + if rhs.rows != M.rows: + raise ShapeError( + "``M`` and ``rhs`` must have the same number of rows.") + + m = M.rows + n = M.cols + + if m < n: + raise NotImplementedError("Underdetermined systems not supported.") + + try: + A, perm = M.LUdecomposition_Simple( + iszerofunc=iszerofunc, rankcheck=True) + except ValueError: + raise NonInvertibleMatrixError("Matrix det == 0; not invertible.") + + dps = _get_intermediate_simp() + b = rhs.permute_rows(perm).as_mutable() + + # forward substitution, all diag entries are scaled to 1 + for i in range(m): + for j in range(min(i, n)): + scale = A[i, j] + b.zip_row_op(i, j, lambda x, y: dps(x - scale * y)) + + # consistency check for overdetermined systems + if m > n: + for i in range(n, m): + for j in range(b.cols): + if not iszerofunc(b[i, j]): + raise ValueError("The system is inconsistent.") + + b = b[0:n, :] # truncate zero rows if consistent + + # backward substitution + for i in range(n - 1, -1, -1): + for j in range(i + 1, n): + scale = A[i, j] + b.zip_row_op(i, j, lambda x, y: dps(x - scale * y)) + + scale = A[i, i] + b.row_op(i, lambda x, _: dps(scale**-1 * x)) + + return rhs.__class__(b) + + +def _QRsolve(M, b): + """Solve the linear system ``Ax = b``. + + ``M`` is the matrix ``A``, the method argument is the vector + ``b``. The method returns the solution vector ``x``. If ``b`` is a + matrix, the system is solved for each column of ``b`` and the + return value is a matrix of the same shape as ``b``. + + This method is slower (approximately by a factor of 2) but + more stable for floating-point arithmetic than the LUsolve method. + However, LUsolve usually uses an exact arithmetic, so you do not need + to use QRsolve. + + This is mainly for educational purposes and symbolic matrices, for real + (or complex) matrices use mpmath.qr_solve. + + See Also + ======== + + sympy.matrices.dense.DenseMatrix.lower_triangular_solve + sympy.matrices.dense.DenseMatrix.upper_triangular_solve + gauss_jordan_solve + cholesky_solve + diagonal_solve + LDLsolve + LUsolve + pinv_solve + QRdecomposition + cramer_solve + """ + + dps = _get_intermediate_simp(expand_mul, expand_mul) + Q, R = M.QRdecomposition() + y = Q.T * b + + # back substitution to solve R*x = y: + # We build up the result "backwards" in the vector 'x' and reverse it + # only in the end. + x = [] + n = R.rows + + for j in range(n - 1, -1, -1): + tmp = y[j, :] + + for k in range(j + 1, n): + tmp -= R[j, k] * x[n - 1 - k] + + tmp = dps(tmp) + + x.append(tmp / R[j, j]) + + return M.vstack(*x[::-1]) + + +def _gauss_jordan_solve(M, B, freevar=False): + """ + Solves ``Ax = B`` using Gauss Jordan elimination. + + There may be zero, one, or infinite solutions. If one solution + exists, it will be returned. If infinite solutions exist, it will + be returned parametrically. If no solutions exist, It will throw + ValueError. + + Parameters + ========== + + B : Matrix + The right hand side of the equation to be solved for. Must have + the same number of rows as matrix A. + + freevar : boolean, optional + Flag, when set to `True` will return the indices of the free + variables in the solutions (column Matrix), for a system that is + undetermined (e.g. A has more columns than rows), for which + infinite solutions are possible, in terms of arbitrary + values of free variables. Default `False`. + + Returns + ======= + + x : Matrix + The matrix that will satisfy ``Ax = B``. Will have as many rows as + matrix A has columns, and as many columns as matrix B. + + params : Matrix + If the system is underdetermined (e.g. A has more columns than + rows), infinite solutions are possible, in terms of arbitrary + parameters. These arbitrary parameters are returned as params + Matrix. + + free_var_index : List, optional + If the system is underdetermined (e.g. A has more columns than + rows), infinite solutions are possible, in terms of arbitrary + values of free variables. Then the indices of the free variables + in the solutions (column Matrix) are returned by free_var_index, + if the flag `freevar` is set to `True`. + + Examples + ======== + + >>> from sympy import Matrix + >>> A = Matrix([[1, 2, 1, 1], [1, 2, 2, -1], [2, 4, 0, 6]]) + >>> B = Matrix([7, 12, 4]) + >>> sol, params = A.gauss_jordan_solve(B) + >>> sol + Matrix([ + [-2*tau0 - 3*tau1 + 2], + [ tau0], + [ 2*tau1 + 5], + [ tau1]]) + >>> params + Matrix([ + [tau0], + [tau1]]) + >>> taus_zeroes = { tau:0 for tau in params } + >>> sol_unique = sol.xreplace(taus_zeroes) + >>> sol_unique + Matrix([ + [2], + [0], + [5], + [0]]) + + + >>> A = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 10]]) + >>> B = Matrix([3, 6, 9]) + >>> sol, params = A.gauss_jordan_solve(B) + >>> sol + Matrix([ + [-1], + [ 2], + [ 0]]) + >>> params + Matrix(0, 1, []) + + >>> A = Matrix([[2, -7], [-1, 4]]) + >>> B = Matrix([[-21, 3], [12, -2]]) + >>> sol, params = A.gauss_jordan_solve(B) + >>> sol + Matrix([ + [0, -2], + [3, -1]]) + >>> params + Matrix(0, 2, []) + + + >>> from sympy import Matrix + >>> A = Matrix([[1, 2, 1, 1], [1, 2, 2, -1], [2, 4, 0, 6]]) + >>> B = Matrix([7, 12, 4]) + >>> sol, params, freevars = A.gauss_jordan_solve(B, freevar=True) + >>> sol + Matrix([ + [-2*tau0 - 3*tau1 + 2], + [ tau0], + [ 2*tau1 + 5], + [ tau1]]) + >>> params + Matrix([ + [tau0], + [tau1]]) + >>> freevars + [1, 3] + + + See Also + ======== + + sympy.matrices.dense.DenseMatrix.lower_triangular_solve + sympy.matrices.dense.DenseMatrix.upper_triangular_solve + cholesky_solve + diagonal_solve + LDLsolve + LUsolve + QRsolve + pinv + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Gaussian_elimination + + """ + + from sympy.matrices import Matrix, zeros + + cls = M.__class__ + aug = M.hstack(M.copy(), B.copy()) + B_cols = B.cols + row, col = aug[:, :-B_cols].shape + + # solve by reduced row echelon form + A, pivots = aug.rref(simplify=True) + A, v = A[:, :-B_cols], A[:, -B_cols:] + pivots = list(filter(lambda p: p < col, pivots)) + rank = len(pivots) + + # Get index of free symbols (free parameters) + # non-pivots columns are free variables + free_var_index = [c for c in range(A.cols) if c not in pivots] + + # Bring to block form + permutation = Matrix(pivots + free_var_index).T + + # check for existence of solutions + # rank of aug Matrix should be equal to rank of coefficient matrix + if not v[rank:, :].is_zero_matrix: + raise ValueError("Linear system has no solution") + + # Free parameters + # what are current unnumbered free symbol names? + name = uniquely_named_symbol('tau', [aug], + compare=lambda i: str(i).rstrip('1234567890'), + modify=lambda s: '_' + s).name + gen = numbered_symbols(name) + tau = Matrix([next(gen) for k in range((col - rank)*B_cols)]).reshape( + col - rank, B_cols) + + # Full parametric solution + V = A[:rank, free_var_index] + vt = v[:rank, :] + free_sol = tau.vstack(vt - V * tau, tau) + + # Undo permutation + sol = zeros(col, B_cols) + + for k in range(col): + sol[permutation[k], :] = free_sol[k,:] + + sol, tau = cls(sol), cls(tau) + + if freevar: + return sol, tau, free_var_index + else: + return sol, tau + + +def _pinv_solve(M, B, arbitrary_matrix=None): + """Solve ``Ax = B`` using the Moore-Penrose pseudoinverse. + + There may be zero, one, or infinite solutions. If one solution + exists, it will be returned. If infinite solutions exist, one will + be returned based on the value of arbitrary_matrix. If no solutions + exist, the least-squares solution is returned. + + Parameters + ========== + + B : Matrix + The right hand side of the equation to be solved for. Must have + the same number of rows as matrix A. + arbitrary_matrix : Matrix + If the system is underdetermined (e.g. A has more columns than + rows), infinite solutions are possible, in terms of an arbitrary + matrix. This parameter may be set to a specific matrix to use + for that purpose; if so, it must be the same shape as x, with as + many rows as matrix A has columns, and as many columns as matrix + B. If left as None, an appropriate matrix containing dummy + symbols in the form of ``wn_m`` will be used, with n and m being + row and column position of each symbol. + + Returns + ======= + + x : Matrix + The matrix that will satisfy ``Ax = B``. Will have as many rows as + matrix A has columns, and as many columns as matrix B. + + Examples + ======== + + >>> from sympy import Matrix + >>> A = Matrix([[1, 2, 3], [4, 5, 6]]) + >>> B = Matrix([7, 8]) + >>> A.pinv_solve(B) + Matrix([ + [ _w0_0/6 - _w1_0/3 + _w2_0/6 - 55/18], + [-_w0_0/3 + 2*_w1_0/3 - _w2_0/3 + 1/9], + [ _w0_0/6 - _w1_0/3 + _w2_0/6 + 59/18]]) + >>> A.pinv_solve(B, arbitrary_matrix=Matrix([0, 0, 0])) + Matrix([ + [-55/18], + [ 1/9], + [ 59/18]]) + + See Also + ======== + + sympy.matrices.dense.DenseMatrix.lower_triangular_solve + sympy.matrices.dense.DenseMatrix.upper_triangular_solve + gauss_jordan_solve + cholesky_solve + diagonal_solve + LDLsolve + LUsolve + QRsolve + pinv + + Notes + ===== + + This may return either exact solutions or least squares solutions. + To determine which, check ``A * A.pinv() * B == B``. It will be + True if exact solutions exist, and False if only a least-squares + solution exists. Be aware that the left hand side of that equation + may need to be simplified to correctly compare to the right hand + side. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Moore-Penrose_pseudoinverse#Obtaining_all_solutions_of_a_linear_system + + """ + + from sympy.matrices import eye + + A = M + A_pinv = M.pinv() + + if arbitrary_matrix is None: + rows, cols = A.cols, B.cols + w = symbols('w:{}_:{}'.format(rows, cols), cls=Dummy) + arbitrary_matrix = M.__class__(cols, rows, w).T + + return A_pinv.multiply(B) + (eye(A.cols) - + A_pinv.multiply(A)).multiply(arbitrary_matrix) + + +def _cramer_solve(M, rhs, det_method="laplace"): + """Solves system of linear equations using Cramer's rule. + + This method is relatively inefficient compared to other methods. + However it only uses a single division, assuming a division-free determinant + method is provided. This is helpful to minimize the chance of divide-by-zero + cases in symbolic solutions to linear systems. + + Parameters + ========== + M : Matrix + The matrix representing the left hand side of the equation. + rhs : Matrix + The matrix representing the right hand side of the equation. + det_method : str or callable + The method to use to calculate the determinant of the matrix. + The default is ``'laplace'``. If a callable is passed, it should take a + single argument, the matrix, and return the determinant of the matrix. + + Returns + ======= + x : Matrix + The matrix that will satisfy ``Ax = B``. Will have as many rows as + matrix A has columns, and as many columns as matrix B. + + Examples + ======== + + >>> from sympy import Matrix + >>> A = Matrix([[0, -6, 1], [0, -6, -1], [-5, -2, 3]]) + >>> B = Matrix([[-30, -9], [-18, -27], [-26, 46]]) + >>> x = A.cramer_solve(B) + >>> x + Matrix([ + [ 0, -5], + [ 4, 3], + [-6, 9]]) + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Cramer%27s_rule#Explicit_formulas_for_small_systems + + """ + from .dense import zeros + + def entry(i, j): + return rhs[i, sol] if j == col else M[i, j] + + if det_method == "bird": + from .determinant import _det_bird + det = _det_bird + elif det_method == "laplace": + from .determinant import _det_laplace + det = _det_laplace + elif isinstance(det_method, str): + det = lambda matrix: matrix.det(method=det_method) + else: + det = det_method + det_M = det(M) + x = zeros(*rhs.shape) + for sol in range(rhs.shape[1]): + for col in range(rhs.shape[0]): + x[col, sol] = det(M.__class__(*M.shape, entry)) / det_M + return M.__class__(x) + + +def _solve(M, rhs, method='GJ'): + """Solves linear equation where the unique solution exists. + + Parameters + ========== + + rhs : Matrix + Vector representing the right hand side of the linear equation. + + method : string, optional + If set to ``'GJ'`` or ``'GE'``, the Gauss-Jordan elimination will be + used, which is implemented in the routine ``gauss_jordan_solve``. + + If set to ``'LU'``, ``LUsolve`` routine will be used. + + If set to ``'QR'``, ``QRsolve`` routine will be used. + + If set to ``'PINV'``, ``pinv_solve`` routine will be used. + + If set to ``'CRAMER'``, ``cramer_solve`` routine will be used. + + It also supports the methods available for special linear systems + + For positive definite systems: + + If set to ``'CH'``, ``cholesky_solve`` routine will be used. + + If set to ``'LDL'``, ``LDLsolve`` routine will be used. + + To use a different method and to compute the solution via the + inverse, use a method defined in the .inv() docstring. + + Returns + ======= + + solutions : Matrix + Vector representing the solution. + + Raises + ====== + + ValueError + If there is not a unique solution then a ``ValueError`` will be + raised. + + If ``M`` is not square, a ``ValueError`` and a different routine + for solving the system will be suggested. + """ + + if method in ('GJ', 'GE'): + try: + soln, param = M.gauss_jordan_solve(rhs) + + if param: + raise NonInvertibleMatrixError("Matrix det == 0; not invertible. " + "Try ``M.gauss_jordan_solve(rhs)`` to obtain a parametric solution.") + + except ValueError: + raise NonInvertibleMatrixError("Matrix det == 0; not invertible.") + + return soln + + elif method == 'LU': + return M.LUsolve(rhs) + elif method == 'CH': + return M.cholesky_solve(rhs) + elif method == 'QR': + return M.QRsolve(rhs) + elif method == 'LDL': + return M.LDLsolve(rhs) + elif method == 'PINV': + return M.pinv_solve(rhs) + elif method == 'CRAMER': + return M.cramer_solve(rhs) + else: + return M.inv(method=method).multiply(rhs) + + +def _solve_least_squares(M, rhs, method='CH'): + """Return the least-square fit to the data. + + Parameters + ========== + + rhs : Matrix + Vector representing the right hand side of the linear equation. + + method : string or boolean, optional + If set to ``'CH'``, ``cholesky_solve`` routine will be used. + + If set to ``'LDL'``, ``LDLsolve`` routine will be used. + + If set to ``'QR'``, ``QRsolve`` routine will be used. + + If set to ``'PINV'``, ``pinv_solve`` routine will be used. + + Otherwise, the conjugate of ``M`` will be used to create a system + of equations that is passed to ``solve`` along with the hint + defined by ``method``. + + Returns + ======= + + solutions : Matrix + Vector representing the solution. + + Examples + ======== + + >>> from sympy import Matrix, ones + >>> A = Matrix([1, 2, 3]) + >>> B = Matrix([2, 3, 4]) + >>> S = Matrix(A.row_join(B)) + >>> S + Matrix([ + [1, 2], + [2, 3], + [3, 4]]) + + If each line of S represent coefficients of Ax + By + and x and y are [2, 3] then S*xy is: + + >>> r = S*Matrix([2, 3]); r + Matrix([ + [ 8], + [13], + [18]]) + + But let's add 1 to the middle value and then solve for the + least-squares value of xy: + + >>> xy = S.solve_least_squares(Matrix([8, 14, 18])); xy + Matrix([ + [ 5/3], + [10/3]]) + + The error is given by S*xy - r: + + >>> S*xy - r + Matrix([ + [1/3], + [1/3], + [1/3]]) + >>> _.norm().n(2) + 0.58 + + If a different xy is used, the norm will be higher: + + >>> xy += ones(2, 1)/10 + >>> (S*xy - r).norm().n(2) + 1.5 + + """ + + if method == 'CH': + return M.cholesky_solve(rhs) + elif method == 'QR': + return M.QRsolve(rhs) + elif method == 'LDL': + return M.LDLsolve(rhs) + elif method == 'PINV': + return M.pinv_solve(rhs) + else: + t = M.H + return (t * M).solve(t * rhs, method=method) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/sparse.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/sparse.py new file mode 100644 index 0000000000000000000000000000000000000000..95a7b3ca0ac29cf4409ec1eeecd059f9643e9bbc --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/sparse.py @@ -0,0 +1,473 @@ +from collections.abc import Callable + +from sympy.core.containers import Dict +from sympy.utilities.exceptions import sympy_deprecation_warning +from sympy.utilities.iterables import is_sequence +from sympy.utilities.misc import as_int + +from .matrixbase import MatrixBase +from .repmatrix import MutableRepMatrix, RepMatrix + +from .utilities import _iszero + +from .decompositions import ( + _liupc, _row_structure_symbolic_cholesky, _cholesky_sparse, + _LDLdecomposition_sparse) + +from .solvers import ( + _lower_triangular_solve_sparse, _upper_triangular_solve_sparse) + + +class SparseRepMatrix(RepMatrix): + """ + A sparse matrix (a matrix with a large number of zero elements). + + Examples + ======== + + >>> from sympy import SparseMatrix, ones + >>> SparseMatrix(2, 2, range(4)) + Matrix([ + [0, 1], + [2, 3]]) + >>> SparseMatrix(2, 2, {(1, 1): 2}) + Matrix([ + [0, 0], + [0, 2]]) + + A SparseMatrix can be instantiated from a ragged list of lists: + + >>> SparseMatrix([[1, 2, 3], [1, 2], [1]]) + Matrix([ + [1, 2, 3], + [1, 2, 0], + [1, 0, 0]]) + + For safety, one may include the expected size and then an error + will be raised if the indices of any element are out of range or + (for a flat list) if the total number of elements does not match + the expected shape: + + >>> SparseMatrix(2, 2, [1, 2]) + Traceback (most recent call last): + ... + ValueError: List length (2) != rows*columns (4) + + Here, an error is not raised because the list is not flat and no + element is out of range: + + >>> SparseMatrix(2, 2, [[1, 2]]) + Matrix([ + [1, 2], + [0, 0]]) + + But adding another element to the first (and only) row will cause + an error to be raised: + + >>> SparseMatrix(2, 2, [[1, 2, 3]]) + Traceback (most recent call last): + ... + ValueError: The location (0, 2) is out of designated range: (1, 1) + + To autosize the matrix, pass None for rows: + + >>> SparseMatrix(None, [[1, 2, 3]]) + Matrix([[1, 2, 3]]) + >>> SparseMatrix(None, {(1, 1): 1, (3, 3): 3}) + Matrix([ + [0, 0, 0, 0], + [0, 1, 0, 0], + [0, 0, 0, 0], + [0, 0, 0, 3]]) + + Values that are themselves a Matrix are automatically expanded: + + >>> SparseMatrix(4, 4, {(1, 1): ones(2)}) + Matrix([ + [0, 0, 0, 0], + [0, 1, 1, 0], + [0, 1, 1, 0], + [0, 0, 0, 0]]) + + A ValueError is raised if the expanding matrix tries to overwrite + a different element already present: + + >>> SparseMatrix(3, 3, {(0, 0): ones(2), (1, 1): 2}) + Traceback (most recent call last): + ... + ValueError: collision at (1, 1) + + See Also + ======== + DenseMatrix + MutableSparseMatrix + ImmutableSparseMatrix + """ + + @classmethod + def _handle_creation_inputs(cls, *args, **kwargs): + if len(args) == 1 and isinstance(args[0], MatrixBase): + rows = args[0].rows + cols = args[0].cols + smat = args[0].todok() + return rows, cols, smat + + smat = {} + # autosizing + if len(args) == 2 and args[0] is None: + args = [None, None, args[1]] + + if len(args) == 3: + r, c = args[:2] + if r is c is None: + rows = cols = None + elif None in (r, c): + raise ValueError( + 'Pass rows=None and no cols for autosizing.') + else: + rows, cols = as_int(args[0]), as_int(args[1]) + + if isinstance(args[2], Callable): + op = args[2] + + if None in (rows, cols): + raise ValueError( + "{} and {} must be integers for this " + "specification.".format(rows, cols)) + + row_indices = [cls._sympify(i) for i in range(rows)] + col_indices = [cls._sympify(j) for j in range(cols)] + + for i in row_indices: + for j in col_indices: + value = cls._sympify(op(i, j)) + if value != cls.zero: + smat[i, j] = value + + return rows, cols, smat + + elif isinstance(args[2], (dict, Dict)): + def update(i, j, v): + # update smat and make sure there are no collisions + if v: + if (i, j) in smat and v != smat[i, j]: + raise ValueError( + "There is a collision at {} for {} and {}." + .format((i, j), v, smat[i, j]) + ) + smat[i, j] = v + + # manual copy, copy.deepcopy() doesn't work + for (r, c), v in args[2].items(): + if isinstance(v, MatrixBase): + for (i, j), vv in v.todok().items(): + update(r + i, c + j, vv) + elif isinstance(v, (list, tuple)): + _, _, smat = cls._handle_creation_inputs(v, **kwargs) + for i, j in smat: + update(r + i, c + j, smat[i, j]) + else: + v = cls._sympify(v) + update(r, c, cls._sympify(v)) + + elif is_sequence(args[2]): + flat = not any(is_sequence(i) for i in args[2]) + if not flat: + _, _, smat = \ + cls._handle_creation_inputs(args[2], **kwargs) + else: + flat_list = args[2] + if len(flat_list) != rows * cols: + raise ValueError( + "The length of the flat list ({}) does not " + "match the specified size ({} * {})." + .format(len(flat_list), rows, cols) + ) + + for i in range(rows): + for j in range(cols): + value = flat_list[i*cols + j] + value = cls._sympify(value) + if value != cls.zero: + smat[i, j] = value + + if rows is None: # autosizing + keys = smat.keys() + rows = max(r for r, _ in keys) + 1 if keys else 0 + cols = max(c for _, c in keys) + 1 if keys else 0 + + else: + for i, j in smat.keys(): + if i and i >= rows or j and j >= cols: + raise ValueError( + "The location {} is out of the designated range" + "[{}, {}]x[{}, {}]" + .format((i, j), 0, rows - 1, 0, cols - 1) + ) + + return rows, cols, smat + + elif len(args) == 1 and isinstance(args[0], (list, tuple)): + # list of values or lists + v = args[0] + c = 0 + for i, row in enumerate(v): + if not isinstance(row, (list, tuple)): + row = [row] + for j, vv in enumerate(row): + if vv != cls.zero: + smat[i, j] = cls._sympify(vv) + c = max(c, len(row)) + rows = len(v) if c else 0 + cols = c + return rows, cols, smat + + else: + # handle full matrix forms with _handle_creation_inputs + rows, cols, mat = super()._handle_creation_inputs(*args) + for i in range(rows): + for j in range(cols): + value = mat[cols*i + j] + if value != cls.zero: + smat[i, j] = value + + return rows, cols, smat + + @property + def _smat(self): + + sympy_deprecation_warning( + """ + The private _smat attribute of SparseMatrix is deprecated. Use the + .todok() method instead. + """, + deprecated_since_version="1.9", + active_deprecations_target="deprecated-private-matrix-attributes" + ) + + return self.todok() + + def _eval_inverse(self, **kwargs): + return self.inv(method=kwargs.get('method', 'LDL'), + iszerofunc=kwargs.get('iszerofunc', _iszero), + try_block_diag=kwargs.get('try_block_diag', False)) + + def applyfunc(self, f): + """Apply a function to each element of the matrix. + + Examples + ======== + + >>> from sympy import SparseMatrix + >>> m = SparseMatrix(2, 2, lambda i, j: i*2+j) + >>> m + Matrix([ + [0, 1], + [2, 3]]) + >>> m.applyfunc(lambda i: 2*i) + Matrix([ + [0, 2], + [4, 6]]) + + """ + if not callable(f): + raise TypeError("`f` must be callable.") + + # XXX: This only applies the function to the nonzero elements of the + # matrix so is inconsistent with DenseMatrix.applyfunc e.g. + # zeros(2, 2).applyfunc(lambda x: x + 1) + dok = {} + for k, v in self.todok().items(): + fv = f(v) + if fv != 0: + dok[k] = fv + + return self._new(self.rows, self.cols, dok) + + def as_immutable(self): + """Returns an Immutable version of this Matrix.""" + from .immutable import ImmutableSparseMatrix + return ImmutableSparseMatrix(self) + + def as_mutable(self): + """Returns a mutable version of this matrix. + + Examples + ======== + + >>> from sympy import ImmutableMatrix + >>> X = ImmutableMatrix([[1, 2], [3, 4]]) + >>> Y = X.as_mutable() + >>> Y[1, 1] = 5 # Can set values in Y + >>> Y + Matrix([ + [1, 2], + [3, 5]]) + """ + return MutableSparseMatrix(self) + + def col_list(self): + """Returns a column-sorted list of non-zero elements of the matrix. + + Examples + ======== + + >>> from sympy import SparseMatrix + >>> a=SparseMatrix(((1, 2), (3, 4))) + >>> a + Matrix([ + [1, 2], + [3, 4]]) + >>> a.CL + [(0, 0, 1), (1, 0, 3), (0, 1, 2), (1, 1, 4)] + + See Also + ======== + + sympy.matrices.sparse.SparseMatrix.row_list + """ + return [tuple(k + (self[k],)) for k in sorted(self.todok().keys(), key=lambda k: list(reversed(k)))] + + def nnz(self): + """Returns the number of non-zero elements in Matrix.""" + return len(self.todok()) + + def row_list(self): + """Returns a row-sorted list of non-zero elements of the matrix. + + Examples + ======== + + >>> from sympy import SparseMatrix + >>> a = SparseMatrix(((1, 2), (3, 4))) + >>> a + Matrix([ + [1, 2], + [3, 4]]) + >>> a.RL + [(0, 0, 1), (0, 1, 2), (1, 0, 3), (1, 1, 4)] + + See Also + ======== + + sympy.matrices.sparse.SparseMatrix.col_list + """ + return [tuple(k + (self[k],)) for k in + sorted(self.todok().keys(), key=list)] + + def scalar_multiply(self, scalar): + "Scalar element-wise multiplication" + return scalar * self + + def solve_least_squares(self, rhs, method='LDL'): + """Return the least-square fit to the data. + + By default the cholesky_solve routine is used (method='CH'); other + methods of matrix inversion can be used. To find out which are + available, see the docstring of the .inv() method. + + Examples + ======== + + >>> from sympy import SparseMatrix, Matrix, ones + >>> A = Matrix([1, 2, 3]) + >>> B = Matrix([2, 3, 4]) + >>> S = SparseMatrix(A.row_join(B)) + >>> S + Matrix([ + [1, 2], + [2, 3], + [3, 4]]) + + If each line of S represent coefficients of Ax + By + and x and y are [2, 3] then S*xy is: + + >>> r = S*Matrix([2, 3]); r + Matrix([ + [ 8], + [13], + [18]]) + + But let's add 1 to the middle value and then solve for the + least-squares value of xy: + + >>> xy = S.solve_least_squares(Matrix([8, 14, 18])); xy + Matrix([ + [ 5/3], + [10/3]]) + + The error is given by S*xy - r: + + >>> S*xy - r + Matrix([ + [1/3], + [1/3], + [1/3]]) + >>> _.norm().n(2) + 0.58 + + If a different xy is used, the norm will be higher: + + >>> xy += ones(2, 1)/10 + >>> (S*xy - r).norm().n(2) + 1.5 + + """ + t = self.T + return (t*self).inv(method=method)*t*rhs + + def solve(self, rhs, method='LDL'): + """Return solution to self*soln = rhs using given inversion method. + + For a list of possible inversion methods, see the .inv() docstring. + """ + if not self.is_square: + if self.rows < self.cols: + raise ValueError('Under-determined system.') + elif self.rows > self.cols: + raise ValueError('For over-determined system, M, having ' + 'more rows than columns, try M.solve_least_squares(rhs).') + else: + return self.inv(method=method).multiply(rhs) + + RL = property(row_list, None, None, "Alternate faster representation") + CL = property(col_list, None, None, "Alternate faster representation") + + def liupc(self): + return _liupc(self) + + def row_structure_symbolic_cholesky(self): + return _row_structure_symbolic_cholesky(self) + + def cholesky(self, hermitian=True): + return _cholesky_sparse(self, hermitian=hermitian) + + def LDLdecomposition(self, hermitian=True): + return _LDLdecomposition_sparse(self, hermitian=hermitian) + + def lower_triangular_solve(self, rhs): + return _lower_triangular_solve_sparse(self, rhs) + + def upper_triangular_solve(self, rhs): + return _upper_triangular_solve_sparse(self, rhs) + + liupc.__doc__ = _liupc.__doc__ + row_structure_symbolic_cholesky.__doc__ = _row_structure_symbolic_cholesky.__doc__ + cholesky.__doc__ = _cholesky_sparse.__doc__ + LDLdecomposition.__doc__ = _LDLdecomposition_sparse.__doc__ + lower_triangular_solve.__doc__ = lower_triangular_solve.__doc__ + upper_triangular_solve.__doc__ = upper_triangular_solve.__doc__ + + +class MutableSparseMatrix(SparseRepMatrix, MutableRepMatrix): + + @classmethod + def _new(cls, *args, **kwargs): + rows, cols, smat = cls._handle_creation_inputs(*args, **kwargs) + + rep = cls._smat_to_DomainMatrix(rows, cols, smat) + + return cls._fromrep(rep) + + +SparseMatrix = MutableSparseMatrix diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/sparsetools.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/sparsetools.py new file mode 100644 index 0000000000000000000000000000000000000000..50048f6dc7e5cf160366963d16427987616ddce7 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/sparsetools.py @@ -0,0 +1,300 @@ +from sympy.core.containers import Dict +from sympy.core.symbol import Dummy +from sympy.utilities.iterables import is_sequence +from sympy.utilities.misc import as_int, filldedent + +from .sparse import MutableSparseMatrix as SparseMatrix + + +def _doktocsr(dok): + """Converts a sparse matrix to Compressed Sparse Row (CSR) format. + + Parameters + ========== + + A : contains non-zero elements sorted by key (row, column) + JA : JA[i] is the column corresponding to A[i] + IA : IA[i] contains the index in A for the first non-zero element + of row[i]. Thus IA[i+1] - IA[i] gives number of non-zero + elements row[i]. The length of IA is always 1 more than the + number of rows in the matrix. + + Examples + ======== + + >>> from sympy.matrices.sparsetools import _doktocsr + >>> from sympy import SparseMatrix, diag + >>> m = SparseMatrix(diag(1, 2, 3)) + >>> m[2, 0] = -1 + >>> _doktocsr(m) + [[1, 2, -1, 3], [0, 1, 0, 2], [0, 1, 2, 4], [3, 3]] + + """ + row, JA, A = [list(i) for i in zip(*dok.row_list())] + IA = [0]*((row[0] if row else 0) + 1) + for i, r in enumerate(row): + IA.extend([i]*(r - row[i - 1])) # if i = 0 nothing is extended + IA.extend([len(A)]*(dok.rows - len(IA) + 1)) + shape = [dok.rows, dok.cols] + return [A, JA, IA, shape] + + +def _csrtodok(csr): + """Converts a CSR representation to DOK representation. + + Examples + ======== + + >>> from sympy.matrices.sparsetools import _csrtodok + >>> _csrtodok([[5, 8, 3, 6], [0, 1, 2, 1], [0, 0, 2, 3, 4], [4, 3]]) + Matrix([ + [0, 0, 0], + [5, 8, 0], + [0, 0, 3], + [0, 6, 0]]) + + """ + smat = {} + A, JA, IA, shape = csr + for i in range(len(IA) - 1): + indices = slice(IA[i], IA[i + 1]) + for l, m in zip(A[indices], JA[indices]): + smat[i, m] = l + return SparseMatrix(*shape, smat) + + +def banded(*args, **kwargs): + """Returns a SparseMatrix from the given dictionary describing + the diagonals of the matrix. The keys are positive for upper + diagonals and negative for those below the main diagonal. The + values may be: + + * expressions or single-argument functions, + + * lists or tuples of values, + + * matrices + + Unless dimensions are given, the size of the returned matrix will + be large enough to contain the largest non-zero value provided. + + kwargs + ====== + + rows : rows of the resulting matrix; computed if + not given. + + cols : columns of the resulting matrix; computed if + not given. + + Examples + ======== + + >>> from sympy import banded, ones, Matrix + >>> from sympy.abc import x + + If explicit values are given in tuples, + the matrix will autosize to contain all values, otherwise + a single value is filled onto the entire diagonal: + + >>> banded({1: (1, 2, 3), -1: (4, 5, 6), 0: x}) + Matrix([ + [x, 1, 0, 0], + [4, x, 2, 0], + [0, 5, x, 3], + [0, 0, 6, x]]) + + A function accepting a single argument can be used to fill the + diagonal as a function of diagonal index (which starts at 0). + The size (or shape) of the matrix must be given to obtain more + than a 1x1 matrix: + + >>> s = lambda d: (1 + d)**2 + >>> banded(5, {0: s, 2: s, -2: 2}) + Matrix([ + [1, 0, 1, 0, 0], + [0, 4, 0, 4, 0], + [2, 0, 9, 0, 9], + [0, 2, 0, 16, 0], + [0, 0, 2, 0, 25]]) + + The diagonal of matrices placed on a diagonal will coincide + with the indicated diagonal: + + >>> vert = Matrix([1, 2, 3]) + >>> banded({0: vert}, cols=3) + Matrix([ + [1, 0, 0], + [2, 1, 0], + [3, 2, 1], + [0, 3, 2], + [0, 0, 3]]) + + >>> banded(4, {0: ones(2)}) + Matrix([ + [1, 1, 0, 0], + [1, 1, 0, 0], + [0, 0, 1, 1], + [0, 0, 1, 1]]) + + Errors are raised if the designated size will not hold + all values an integral number of times. Here, the rows + are designated as odd (but an even number is required to + hold the off-diagonal 2x2 ones): + + >>> banded({0: 2, 1: ones(2)}, rows=5) + Traceback (most recent call last): + ... + ValueError: + sequence does not fit an integral number of times in the matrix + + And here, an even number of rows is given...but the square + matrix has an even number of columns, too. As we saw + in the previous example, an odd number is required: + + >>> banded(4, {0: 2, 1: ones(2)}) # trying to make 4x4 and cols must be odd + Traceback (most recent call last): + ... + ValueError: + sequence does not fit an integral number of times in the matrix + + A way around having to count rows is to enclosing matrix elements + in a tuple and indicate the desired number of them to the right: + + >>> banded({0: 2, 2: (ones(2),)*3}) + Matrix([ + [2, 0, 1, 1, 0, 0, 0, 0], + [0, 2, 1, 1, 0, 0, 0, 0], + [0, 0, 2, 0, 1, 1, 0, 0], + [0, 0, 0, 2, 1, 1, 0, 0], + [0, 0, 0, 0, 2, 0, 1, 1], + [0, 0, 0, 0, 0, 2, 1, 1]]) + + An error will be raised if more than one value + is written to a given entry. Here, the ones overlap + with the main diagonal if they are placed on the + first diagonal: + + >>> banded({0: (2,)*5, 1: (ones(2),)*3}) + Traceback (most recent call last): + ... + ValueError: collision at (1, 1) + + By placing a 0 at the bottom left of the 2x2 matrix of + ones, the collision is avoided: + + >>> u2 = Matrix([ + ... [1, 1], + ... [0, 1]]) + >>> banded({0: [2]*5, 1: [u2]*3}) + Matrix([ + [2, 1, 1, 0, 0, 0, 0], + [0, 2, 1, 0, 0, 0, 0], + [0, 0, 2, 1, 1, 0, 0], + [0, 0, 0, 2, 1, 0, 0], + [0, 0, 0, 0, 2, 1, 1], + [0, 0, 0, 0, 0, 0, 1]]) + """ + try: + if len(args) not in (1, 2, 3): + raise TypeError + if not isinstance(args[-1], (dict, Dict)): + raise TypeError + if len(args) == 1: + rows = kwargs.get('rows', None) + cols = kwargs.get('cols', None) + if rows is not None: + rows = as_int(rows) + if cols is not None: + cols = as_int(cols) + elif len(args) == 2: + rows = cols = as_int(args[0]) + else: + rows, cols = map(as_int, args[:2]) + # fails with ValueError if any keys are not ints + _ = all(as_int(k) for k in args[-1]) + except (ValueError, TypeError): + raise TypeError(filldedent( + '''unrecognized input to banded: + expecting [[row,] col,] {int: value}''')) + def rc(d): + # return row,col coord of diagonal start + r = -d if d < 0 else 0 + c = 0 if r else d + return r, c + smat = {} + undone = [] + tba = Dummy() + # first handle objects with size + for d, v in args[-1].items(): + r, c = rc(d) + # note: only list and tuple are recognized since this + # will allow other Basic objects like Tuple + # into the matrix if so desired + if isinstance(v, (list, tuple)): + extra = 0 + for i, vi in enumerate(v): + i += extra + if is_sequence(vi): + vi = SparseMatrix(vi) + smat[r + i, c + i] = vi + extra += min(vi.shape) - 1 + else: + smat[r + i, c + i] = vi + elif is_sequence(v): + v = SparseMatrix(v) + rv, cv = v.shape + if rows and cols: + nr, xr = divmod(rows - r, rv) + nc, xc = divmod(cols - c, cv) + x = xr or xc + do = min(nr, nc) + elif rows: + do, x = divmod(rows - r, rv) + elif cols: + do, x = divmod(cols - c, cv) + else: + do = 1 + x = 0 + if x: + raise ValueError(filldedent(''' + sequence does not fit an integral number of times + in the matrix''')) + j = min(v.shape) + for i in range(do): + smat[r, c] = v + r += j + c += j + elif v: + smat[r, c] = tba + undone.append((d, v)) + s = SparseMatrix(None, smat) # to expand matrices + smat = s.todok() + # check for dim errors here + if rows is not None and rows < s.rows: + raise ValueError('Designated rows %s < needed %s' % (rows, s.rows)) + if cols is not None and cols < s.cols: + raise ValueError('Designated cols %s < needed %s' % (cols, s.cols)) + if rows is cols is None: + rows = s.rows + cols = s.cols + elif rows is not None and cols is None: + cols = max(rows, s.cols) + elif cols is not None and rows is None: + rows = max(cols, s.rows) + def update(i, j, v): + # update smat and make sure there are + # no collisions + if v: + if (i, j) in smat and smat[i, j] not in (tba, v): + raise ValueError('collision at %s' % ((i, j),)) + smat[i, j] = v + if undone: + for d, vi in undone: + r, c = rc(d) + v = vi if callable(vi) else lambda _: vi + i = 0 + while r + i < rows and c + i < cols: + update(r + i, c + i, v(i)) + i += 1 + return SparseMatrix(rows, cols, smat) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/subspaces.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/subspaces.py new file mode 100644 index 0000000000000000000000000000000000000000..1ab0b71b4289ebaeb6394059c6a7cd49d3a148a1 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/subspaces.py @@ -0,0 +1,174 @@ +from .utilities import _iszero + + +def _columnspace(M, simplify=False): + """Returns a list of vectors (Matrix objects) that span columnspace of ``M`` + + Examples + ======== + + >>> from sympy import Matrix + >>> M = Matrix(3, 3, [1, 3, 0, -2, -6, 0, 3, 9, 6]) + >>> M + Matrix([ + [ 1, 3, 0], + [-2, -6, 0], + [ 3, 9, 6]]) + >>> M.columnspace() + [Matrix([ + [ 1], + [-2], + [ 3]]), Matrix([ + [0], + [0], + [6]])] + + See Also + ======== + + nullspace + rowspace + """ + + reduced, pivots = M.echelon_form(simplify=simplify, with_pivots=True) + + return [M.col(i) for i in pivots] + + +def _nullspace(M, simplify=False, iszerofunc=_iszero): + """Returns list of vectors (Matrix objects) that span nullspace of ``M`` + + Examples + ======== + + >>> from sympy import Matrix + >>> M = Matrix(3, 3, [1, 3, 0, -2, -6, 0, 3, 9, 6]) + >>> M + Matrix([ + [ 1, 3, 0], + [-2, -6, 0], + [ 3, 9, 6]]) + >>> M.nullspace() + [Matrix([ + [-3], + [ 1], + [ 0]])] + + See Also + ======== + + columnspace + rowspace + """ + + reduced, pivots = M.rref(iszerofunc=iszerofunc, simplify=simplify) + + free_vars = [i for i in range(M.cols) if i not in pivots] + basis = [] + + for free_var in free_vars: + # for each free variable, we will set it to 1 and all others + # to 0. Then, we will use back substitution to solve the system + vec = [M.zero] * M.cols + vec[free_var] = M.one + + for piv_row, piv_col in enumerate(pivots): + vec[piv_col] -= reduced[piv_row, free_var] + + basis.append(vec) + + return [M._new(M.cols, 1, b) for b in basis] + + +def _rowspace(M, simplify=False): + """Returns a list of vectors that span the row space of ``M``. + + Examples + ======== + + >>> from sympy import Matrix + >>> M = Matrix(3, 3, [1, 3, 0, -2, -6, 0, 3, 9, 6]) + >>> M + Matrix([ + [ 1, 3, 0], + [-2, -6, 0], + [ 3, 9, 6]]) + >>> M.rowspace() + [Matrix([[1, 3, 0]]), Matrix([[0, 0, 6]])] + """ + + reduced, pivots = M.echelon_form(simplify=simplify, with_pivots=True) + + return [reduced.row(i) for i in range(len(pivots))] + + +def _orthogonalize(cls, *vecs, normalize=False, rankcheck=False): + """Apply the Gram-Schmidt orthogonalization procedure + to vectors supplied in ``vecs``. + + Parameters + ========== + + vecs + vectors to be made orthogonal + + normalize : bool + If ``True``, return an orthonormal basis. + + rankcheck : bool + If ``True``, the computation does not stop when encountering + linearly dependent vectors. + + If ``False``, it will raise ``ValueError`` when any zero + or linearly dependent vectors are found. + + Returns + ======= + + list + List of orthogonal (or orthonormal) basis vectors. + + Examples + ======== + + >>> from sympy import I, Matrix + >>> v = [Matrix([1, I]), Matrix([1, -I])] + >>> Matrix.orthogonalize(*v) + [Matrix([ + [1], + [I]]), Matrix([ + [ 1], + [-I]])] + + See Also + ======== + + MatrixBase.QRdecomposition + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Gram%E2%80%93Schmidt_process + """ + from .decompositions import _QRdecomposition_optional + + if not vecs: + return [] + + all_row_vecs = (vecs[0].rows == 1) + + vecs = [x.vec() for x in vecs] + M = cls.hstack(*vecs) + Q, R = _QRdecomposition_optional(M, normalize=normalize) + + if rankcheck and Q.cols < len(vecs): + raise ValueError("GramSchmidt: vector set not linearly independent") + + ret = [] + for i in range(Q.cols): + if all_row_vecs: + col = cls(Q[:, i].T) + else: + col = cls(Q[:, i]) + ret.append(col) + return ret diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_commonmatrix.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_commonmatrix.py new file mode 100644 index 0000000000000000000000000000000000000000..6735adc1a9d4f9934a55c7ee70b087a19d3a48b4 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_commonmatrix.py @@ -0,0 +1,1266 @@ +# +# Code for testing deprecated matrix classes. New test code should not be added +# here. Instead, add it to test_matrixbase.py. +# +# This entire test module and the corresponding sympy/matrices/common.py +# module will be removed in a future release. +# +from sympy.testing.pytest import raises, XFAIL, warns_deprecated_sympy + +from sympy.assumptions import Q +from sympy.core.expr import Expr +from sympy.core.add import Add +from sympy.core.function import Function +from sympy.core.kind import NumberKind, UndefinedKind +from sympy.core.numbers import I, Integer, oo, pi, Rational +from sympy.core.singleton import S +from sympy.core.symbol import Symbol, symbols +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.matrices.exceptions import ShapeError, NonSquareMatrixError +from sympy.matrices.kind import MatrixKind +from sympy.matrices.common import ( + _MinimalMatrix, _CastableMatrix, MatrixShaping, MatrixProperties, + MatrixOperations, MatrixArithmetic, MatrixSpecial) +from sympy.matrices.matrices import MatrixCalculus +from sympy.matrices import (Matrix, diag, eye, + matrix_multiply_elementwise, ones, zeros, SparseMatrix, banded, + MutableDenseMatrix, MutableSparseMatrix, ImmutableDenseMatrix, + ImmutableSparseMatrix) +from sympy.polys.polytools import Poly +from sympy.utilities.iterables import flatten +from sympy.tensor.array.dense_ndim_array import ImmutableDenseNDimArray as Array + +from sympy.abc import x, y, z + + +def test_matrix_deprecated_isinstance(): + + # Test that e.g. isinstance(M, MatrixCommon) still gives True when M is a + # Matrix for each of the deprecated matrix classes. + + from sympy.matrices.common import ( + MatrixRequired, + MatrixShaping, + MatrixSpecial, + MatrixProperties, + MatrixOperations, + MatrixArithmetic, + MatrixCommon + ) + from sympy.matrices.matrices import ( + MatrixDeterminant, + MatrixReductions, + MatrixSubspaces, + MatrixEigen, + MatrixCalculus, + MatrixDeprecated + ) + from sympy import ( + Matrix, + ImmutableMatrix, + SparseMatrix, + ImmutableSparseMatrix + ) + all_mixins = ( + MatrixRequired, + MatrixShaping, + MatrixSpecial, + MatrixProperties, + MatrixOperations, + MatrixArithmetic, + MatrixCommon, + MatrixDeterminant, + MatrixReductions, + MatrixSubspaces, + MatrixEigen, + MatrixCalculus, + MatrixDeprecated + ) + all_matrices = ( + Matrix, + ImmutableMatrix, + SparseMatrix, + ImmutableSparseMatrix + ) + + Ms = [M([[1, 2], [3, 4]]) for M in all_matrices] + t = () + + for mixin in all_mixins: + for M in Ms: + with warns_deprecated_sympy(): + assert isinstance(M, mixin) is True + with warns_deprecated_sympy(): + assert isinstance(t, mixin) is False + + +# classes to test the deprecated matrix classes. We use warns_deprecated_sympy +# to suppress the deprecation warnings because subclassing the deprecated +# classes causes a warning to be raised. + +with warns_deprecated_sympy(): + class ShapingOnlyMatrix(_MinimalMatrix, _CastableMatrix, MatrixShaping): + pass + + +def eye_Shaping(n): + return ShapingOnlyMatrix(n, n, lambda i, j: int(i == j)) + + +def zeros_Shaping(n): + return ShapingOnlyMatrix(n, n, lambda i, j: 0) + + +with warns_deprecated_sympy(): + class PropertiesOnlyMatrix(_MinimalMatrix, _CastableMatrix, MatrixProperties): + pass + + +def eye_Properties(n): + return PropertiesOnlyMatrix(n, n, lambda i, j: int(i == j)) + + +def zeros_Properties(n): + return PropertiesOnlyMatrix(n, n, lambda i, j: 0) + + +with warns_deprecated_sympy(): + class OperationsOnlyMatrix(_MinimalMatrix, _CastableMatrix, MatrixOperations): + pass + + +def eye_Operations(n): + return OperationsOnlyMatrix(n, n, lambda i, j: int(i == j)) + + +def zeros_Operations(n): + return OperationsOnlyMatrix(n, n, lambda i, j: 0) + + +with warns_deprecated_sympy(): + class ArithmeticOnlyMatrix(_MinimalMatrix, _CastableMatrix, MatrixArithmetic): + pass + + +def eye_Arithmetic(n): + return ArithmeticOnlyMatrix(n, n, lambda i, j: int(i == j)) + + +def zeros_Arithmetic(n): + return ArithmeticOnlyMatrix(n, n, lambda i, j: 0) + + +with warns_deprecated_sympy(): + class SpecialOnlyMatrix(_MinimalMatrix, _CastableMatrix, MatrixSpecial): + pass + + +with warns_deprecated_sympy(): + class CalculusOnlyMatrix(_MinimalMatrix, _CastableMatrix, MatrixCalculus): + pass + + +def test__MinimalMatrix(): + x = _MinimalMatrix(2, 3, [1, 2, 3, 4, 5, 6]) + assert x.rows == 2 + assert x.cols == 3 + assert x[2] == 3 + assert x[1, 1] == 5 + assert list(x) == [1, 2, 3, 4, 5, 6] + assert list(x[1, :]) == [4, 5, 6] + assert list(x[:, 1]) == [2, 5] + assert list(x[:, :]) == list(x) + assert x[:, :] == x + assert _MinimalMatrix(x) == x + assert _MinimalMatrix([[1, 2, 3], [4, 5, 6]]) == x + assert _MinimalMatrix(([1, 2, 3], [4, 5, 6])) == x + assert _MinimalMatrix([(1, 2, 3), (4, 5, 6)]) == x + assert _MinimalMatrix(((1, 2, 3), (4, 5, 6))) == x + assert not (_MinimalMatrix([[1, 2], [3, 4], [5, 6]]) == x) + + +def test_kind(): + assert Matrix([[1, 2], [3, 4]]).kind == MatrixKind(NumberKind) + assert Matrix([[0, 0], [0, 0]]).kind == MatrixKind(NumberKind) + assert Matrix(0, 0, []).kind == MatrixKind(NumberKind) + assert Matrix([[x]]).kind == MatrixKind(NumberKind) + assert Matrix([[1, Matrix([[1]])]]).kind == MatrixKind(UndefinedKind) + assert SparseMatrix([[1]]).kind == MatrixKind(NumberKind) + assert SparseMatrix([[1, Matrix([[1]])]]).kind == MatrixKind(UndefinedKind) + + +# ShapingOnlyMatrix tests +def test_vec(): + m = ShapingOnlyMatrix(2, 2, [1, 3, 2, 4]) + m_vec = m.vec() + assert m_vec.cols == 1 + for i in range(4): + assert m_vec[i] == i + 1 + + +def test_todok(): + a, b, c, d = symbols('a:d') + m1 = MutableDenseMatrix([[a, b], [c, d]]) + m2 = ImmutableDenseMatrix([[a, b], [c, d]]) + m3 = MutableSparseMatrix([[a, b], [c, d]]) + m4 = ImmutableSparseMatrix([[a, b], [c, d]]) + assert m1.todok() == m2.todok() == m3.todok() == m4.todok() == \ + {(0, 0): a, (0, 1): b, (1, 0): c, (1, 1): d} + + +def test_tolist(): + lst = [[S.One, S.Half, x*y, S.Zero], [x, y, z, x**2], [y, -S.One, z*x, 3]] + flat_lst = [S.One, S.Half, x*y, S.Zero, x, y, z, x**2, y, -S.One, z*x, 3] + m = ShapingOnlyMatrix(3, 4, flat_lst) + assert m.tolist() == lst + +def test_todod(): + m = ShapingOnlyMatrix(3, 2, [[S.One, 0], [0, S.Half], [x, 0]]) + dict = {0: {0: S.One}, 1: {1: S.Half}, 2: {0: x}} + assert m.todod() == dict + +def test_row_col_del(): + e = ShapingOnlyMatrix(3, 3, [1, 2, 3, 4, 5, 6, 7, 8, 9]) + raises(IndexError, lambda: e.row_del(5)) + raises(IndexError, lambda: e.row_del(-5)) + raises(IndexError, lambda: e.col_del(5)) + raises(IndexError, lambda: e.col_del(-5)) + + assert e.row_del(2) == e.row_del(-1) == Matrix([[1, 2, 3], [4, 5, 6]]) + assert e.col_del(2) == e.col_del(-1) == Matrix([[1, 2], [4, 5], [7, 8]]) + + assert e.row_del(1) == e.row_del(-2) == Matrix([[1, 2, 3], [7, 8, 9]]) + assert e.col_del(1) == e.col_del(-2) == Matrix([[1, 3], [4, 6], [7, 9]]) + + +def test_get_diag_blocks1(): + a = Matrix([[1, 2], [2, 3]]) + b = Matrix([[3, x], [y, 3]]) + c = Matrix([[3, x, 3], [y, 3, z], [x, y, z]]) + assert a.get_diag_blocks() == [a] + assert b.get_diag_blocks() == [b] + assert c.get_diag_blocks() == [c] + + +def test_get_diag_blocks2(): + a = Matrix([[1, 2], [2, 3]]) + b = Matrix([[3, x], [y, 3]]) + c = Matrix([[3, x, 3], [y, 3, z], [x, y, z]]) + A, B, C, D = diag(a, b, b), diag(a, b, c), diag(a, c, b), diag(c, c, b) + A = ShapingOnlyMatrix(A.rows, A.cols, A) + B = ShapingOnlyMatrix(B.rows, B.cols, B) + C = ShapingOnlyMatrix(C.rows, C.cols, C) + D = ShapingOnlyMatrix(D.rows, D.cols, D) + + assert A.get_diag_blocks() == [a, b, b] + assert B.get_diag_blocks() == [a, b, c] + assert C.get_diag_blocks() == [a, c, b] + assert D.get_diag_blocks() == [c, c, b] + + +def test_shape(): + m = ShapingOnlyMatrix(1, 2, [0, 0]) + assert m.shape == (1, 2) + + +def test_reshape(): + m0 = eye_Shaping(3) + assert m0.reshape(1, 9) == Matrix(1, 9, (1, 0, 0, 0, 1, 0, 0, 0, 1)) + m1 = ShapingOnlyMatrix(3, 4, lambda i, j: i + j) + assert m1.reshape( + 4, 3) == Matrix(((0, 1, 2), (3, 1, 2), (3, 4, 2), (3, 4, 5))) + assert m1.reshape(2, 6) == Matrix(((0, 1, 2, 3, 1, 2), (3, 4, 2, 3, 4, 5))) + + +def test_row_col(): + m = ShapingOnlyMatrix(3, 3, [1, 2, 3, 4, 5, 6, 7, 8, 9]) + assert m.row(0) == Matrix(1, 3, [1, 2, 3]) + assert m.col(0) == Matrix(3, 1, [1, 4, 7]) + + +def test_row_join(): + assert eye_Shaping(3).row_join(Matrix([7, 7, 7])) == \ + Matrix([[1, 0, 0, 7], + [0, 1, 0, 7], + [0, 0, 1, 7]]) + + +def test_col_join(): + assert eye_Shaping(3).col_join(Matrix([[7, 7, 7]])) == \ + Matrix([[1, 0, 0], + [0, 1, 0], + [0, 0, 1], + [7, 7, 7]]) + + +def test_row_insert(): + r4 = Matrix([[4, 4, 4]]) + for i in range(-4, 5): + l = [1, 0, 0] + l.insert(i, 4) + assert flatten(eye_Shaping(3).row_insert(i, r4).col(0).tolist()) == l + + +def test_col_insert(): + c4 = Matrix([4, 4, 4]) + for i in range(-4, 5): + l = [0, 0, 0] + l.insert(i, 4) + assert flatten(zeros_Shaping(3).col_insert(i, c4).row(0).tolist()) == l + # issue 13643 + assert eye_Shaping(6).col_insert(3, Matrix([[2, 2], [2, 2], [2, 2], [2, 2], [2, 2], [2, 2]])) == \ + Matrix([[1, 0, 0, 2, 2, 0, 0, 0], + [0, 1, 0, 2, 2, 0, 0, 0], + [0, 0, 1, 2, 2, 0, 0, 0], + [0, 0, 0, 2, 2, 1, 0, 0], + [0, 0, 0, 2, 2, 0, 1, 0], + [0, 0, 0, 2, 2, 0, 0, 1]]) + + +def test_extract(): + m = ShapingOnlyMatrix(4, 3, lambda i, j: i*3 + j) + assert m.extract([0, 1, 3], [0, 1]) == Matrix(3, 2, [0, 1, 3, 4, 9, 10]) + assert m.extract([0, 3], [0, 0, 2]) == Matrix(2, 3, [0, 0, 2, 9, 9, 11]) + assert m.extract(range(4), range(3)) == m + raises(IndexError, lambda: m.extract([4], [0])) + raises(IndexError, lambda: m.extract([0], [3])) + + +def test_hstack(): + m = ShapingOnlyMatrix(4, 3, lambda i, j: i*3 + j) + m2 = ShapingOnlyMatrix(3, 4, lambda i, j: i*3 + j) + assert m == m.hstack(m) + assert m.hstack(m, m, m) == ShapingOnlyMatrix.hstack(m, m, m) == Matrix([ + [0, 1, 2, 0, 1, 2, 0, 1, 2], + [3, 4, 5, 3, 4, 5, 3, 4, 5], + [6, 7, 8, 6, 7, 8, 6, 7, 8], + [9, 10, 11, 9, 10, 11, 9, 10, 11]]) + raises(ShapeError, lambda: m.hstack(m, m2)) + assert Matrix.hstack() == Matrix() + + # test regression #12938 + M1 = Matrix.zeros(0, 0) + M2 = Matrix.zeros(0, 1) + M3 = Matrix.zeros(0, 2) + M4 = Matrix.zeros(0, 3) + m = ShapingOnlyMatrix.hstack(M1, M2, M3, M4) + assert m.rows == 0 and m.cols == 6 + + +def test_vstack(): + m = ShapingOnlyMatrix(4, 3, lambda i, j: i*3 + j) + m2 = ShapingOnlyMatrix(3, 4, lambda i, j: i*3 + j) + assert m == m.vstack(m) + assert m.vstack(m, m, m) == ShapingOnlyMatrix.vstack(m, m, m) == Matrix([ + [0, 1, 2], + [3, 4, 5], + [6, 7, 8], + [9, 10, 11], + [0, 1, 2], + [3, 4, 5], + [6, 7, 8], + [9, 10, 11], + [0, 1, 2], + [3, 4, 5], + [6, 7, 8], + [9, 10, 11]]) + raises(ShapeError, lambda: m.vstack(m, m2)) + assert Matrix.vstack() == Matrix() + + +# PropertiesOnlyMatrix tests +def test_atoms(): + m = PropertiesOnlyMatrix(2, 2, [1, 2, x, 1 - 1/x]) + assert m.atoms() == {S.One, S(2), S.NegativeOne, x} + assert m.atoms(Symbol) == {x} + + +def test_free_symbols(): + assert PropertiesOnlyMatrix([[x], [0]]).free_symbols == {x} + + +def test_has(): + A = PropertiesOnlyMatrix(((x, y), (2, 3))) + assert A.has(x) + assert not A.has(z) + assert A.has(Symbol) + + A = PropertiesOnlyMatrix(((2, y), (2, 3))) + assert not A.has(x) + + +def test_is_anti_symmetric(): + x = symbols('x') + assert PropertiesOnlyMatrix(2, 1, [1, 2]).is_anti_symmetric() is False + m = PropertiesOnlyMatrix(3, 3, [0, x**2 + 2*x + 1, y, -(x + 1)**2, 0, x*y, -y, -x*y, 0]) + assert m.is_anti_symmetric() is True + assert m.is_anti_symmetric(simplify=False) is False + assert m.is_anti_symmetric(simplify=lambda x: x) is False + + m = PropertiesOnlyMatrix(3, 3, [x.expand() for x in m]) + assert m.is_anti_symmetric(simplify=False) is True + m = PropertiesOnlyMatrix(3, 3, [x.expand() for x in [S.One] + list(m)[1:]]) + assert m.is_anti_symmetric() is False + + +def test_diagonal_symmetrical(): + m = PropertiesOnlyMatrix(2, 2, [0, 1, 1, 0]) + assert not m.is_diagonal() + assert m.is_symmetric() + assert m.is_symmetric(simplify=False) + + m = PropertiesOnlyMatrix(2, 2, [1, 0, 0, 1]) + assert m.is_diagonal() + + m = PropertiesOnlyMatrix(3, 3, diag(1, 2, 3)) + assert m.is_diagonal() + assert m.is_symmetric() + + m = PropertiesOnlyMatrix(3, 3, [1, 0, 0, 0, 2, 0, 0, 0, 3]) + assert m == diag(1, 2, 3) + + m = PropertiesOnlyMatrix(2, 3, zeros(2, 3)) + assert not m.is_symmetric() + assert m.is_diagonal() + + m = PropertiesOnlyMatrix(((5, 0), (0, 6), (0, 0))) + assert m.is_diagonal() + + m = PropertiesOnlyMatrix(((5, 0, 0), (0, 6, 0))) + assert m.is_diagonal() + + m = Matrix(3, 3, [1, x**2 + 2*x + 1, y, (x + 1)**2, 2, 0, y, 0, 3]) + assert m.is_symmetric() + assert not m.is_symmetric(simplify=False) + assert m.expand().is_symmetric(simplify=False) + + +def test_is_hermitian(): + a = PropertiesOnlyMatrix([[1, I], [-I, 1]]) + assert a.is_hermitian + a = PropertiesOnlyMatrix([[2*I, I], [-I, 1]]) + assert a.is_hermitian is False + a = PropertiesOnlyMatrix([[x, I], [-I, 1]]) + assert a.is_hermitian is None + a = PropertiesOnlyMatrix([[x, 1], [-I, 1]]) + assert a.is_hermitian is False + + +def test_is_Identity(): + assert eye_Properties(3).is_Identity + assert not PropertiesOnlyMatrix(zeros(3)).is_Identity + assert not PropertiesOnlyMatrix(ones(3)).is_Identity + # issue 6242 + assert not PropertiesOnlyMatrix([[1, 0, 0]]).is_Identity + + +def test_is_symbolic(): + a = PropertiesOnlyMatrix([[x, x], [x, x]]) + assert a.is_symbolic() is True + a = PropertiesOnlyMatrix([[1, 2, 3, 4], [5, 6, 7, 8]]) + assert a.is_symbolic() is False + a = PropertiesOnlyMatrix([[1, 2, 3, 4], [5, 6, x, 8]]) + assert a.is_symbolic() is True + a = PropertiesOnlyMatrix([[1, x, 3]]) + assert a.is_symbolic() is True + a = PropertiesOnlyMatrix([[1, 2, 3]]) + assert a.is_symbolic() is False + a = PropertiesOnlyMatrix([[1], [x], [3]]) + assert a.is_symbolic() is True + a = PropertiesOnlyMatrix([[1], [2], [3]]) + assert a.is_symbolic() is False + + +def test_is_upper(): + a = PropertiesOnlyMatrix([[1, 2, 3]]) + assert a.is_upper is True + a = PropertiesOnlyMatrix([[1], [2], [3]]) + assert a.is_upper is False + + +def test_is_lower(): + a = PropertiesOnlyMatrix([[1, 2, 3]]) + assert a.is_lower is False + a = PropertiesOnlyMatrix([[1], [2], [3]]) + assert a.is_lower is True + + +def test_is_square(): + m = PropertiesOnlyMatrix([[1], [1]]) + m2 = PropertiesOnlyMatrix([[2, 2], [2, 2]]) + assert not m.is_square + assert m2.is_square + + +def test_is_symmetric(): + m = PropertiesOnlyMatrix(2, 2, [0, 1, 1, 0]) + assert m.is_symmetric() + m = PropertiesOnlyMatrix(2, 2, [0, 1, 0, 1]) + assert not m.is_symmetric() + + +def test_is_hessenberg(): + A = PropertiesOnlyMatrix([[3, 4, 1], [2, 4, 5], [0, 1, 2]]) + assert A.is_upper_hessenberg + A = PropertiesOnlyMatrix(3, 3, [3, 2, 0, 4, 4, 1, 1, 5, 2]) + assert A.is_lower_hessenberg + A = PropertiesOnlyMatrix(3, 3, [3, 2, -1, 4, 4, 1, 1, 5, 2]) + assert A.is_lower_hessenberg is False + assert A.is_upper_hessenberg is False + + A = PropertiesOnlyMatrix([[3, 4, 1], [2, 4, 5], [3, 1, 2]]) + assert not A.is_upper_hessenberg + + +def test_is_zero(): + assert PropertiesOnlyMatrix(0, 0, []).is_zero_matrix + assert PropertiesOnlyMatrix([[0, 0], [0, 0]]).is_zero_matrix + assert PropertiesOnlyMatrix(zeros(3, 4)).is_zero_matrix + assert not PropertiesOnlyMatrix(eye(3)).is_zero_matrix + assert PropertiesOnlyMatrix([[x, 0], [0, 0]]).is_zero_matrix == None + assert PropertiesOnlyMatrix([[x, 1], [0, 0]]).is_zero_matrix == False + a = Symbol('a', nonzero=True) + assert PropertiesOnlyMatrix([[a, 0], [0, 0]]).is_zero_matrix == False + + +def test_values(): + assert set(PropertiesOnlyMatrix(2, 2, [0, 1, 2, 3] + ).values()) == {1, 2, 3} + x = Symbol('x', real=True) + assert set(PropertiesOnlyMatrix(2, 2, [x, 0, 0, 1] + ).values()) == {x, 1} + + +# OperationsOnlyMatrix tests +def test_applyfunc(): + m0 = OperationsOnlyMatrix(eye(3)) + assert m0.applyfunc(lambda x: 2*x) == eye(3)*2 + assert m0.applyfunc(lambda x: 0) == zeros(3) + assert m0.applyfunc(lambda x: 1) == ones(3) + + +def test_adjoint(): + dat = [[0, I], [1, 0]] + ans = OperationsOnlyMatrix([[0, 1], [-I, 0]]) + assert ans.adjoint() == Matrix(dat) + + +def test_as_real_imag(): + m1 = OperationsOnlyMatrix(2, 2, [1, 2, 3, 4]) + m3 = OperationsOnlyMatrix(2, 2, + [1 + S.ImaginaryUnit, 2 + 2*S.ImaginaryUnit, + 3 + 3*S.ImaginaryUnit, 4 + 4*S.ImaginaryUnit]) + + a, b = m3.as_real_imag() + assert a == m1 + assert b == m1 + + +def test_conjugate(): + M = OperationsOnlyMatrix([[0, I, 5], + [1, 2, 0]]) + + assert M.T == Matrix([[0, 1], + [I, 2], + [5, 0]]) + + assert M.C == Matrix([[0, -I, 5], + [1, 2, 0]]) + assert M.C == M.conjugate() + + assert M.H == M.T.C + assert M.H == Matrix([[ 0, 1], + [-I, 2], + [ 5, 0]]) + + +def test_doit(): + a = OperationsOnlyMatrix([[Add(x, x, evaluate=False)]]) + assert a[0] != 2*x + assert a.doit() == Matrix([[2*x]]) + + +def test_evalf(): + a = OperationsOnlyMatrix(2, 1, [sqrt(5), 6]) + assert all(a.evalf()[i] == a[i].evalf() for i in range(2)) + assert all(a.evalf(2)[i] == a[i].evalf(2) for i in range(2)) + assert all(a.n(2)[i] == a[i].n(2) for i in range(2)) + + +def test_expand(): + m0 = OperationsOnlyMatrix([[x*(x + y), 2], [((x + y)*y)*x, x*(y + x*(x + y))]]) + # Test if expand() returns a matrix + m1 = m0.expand() + assert m1 == Matrix( + [[x*y + x**2, 2], [x*y**2 + y*x**2, x*y + y*x**2 + x**3]]) + + a = Symbol('a', real=True) + + assert OperationsOnlyMatrix(1, 1, [exp(I*a)]).expand(complex=True) == \ + Matrix([cos(a) + I*sin(a)]) + + +def test_refine(): + m0 = OperationsOnlyMatrix([[Abs(x)**2, sqrt(x**2)], + [sqrt(x**2)*Abs(y)**2, sqrt(y**2)*Abs(x)**2]]) + m1 = m0.refine(Q.real(x) & Q.real(y)) + assert m1 == Matrix([[x**2, Abs(x)], [y**2*Abs(x), x**2*Abs(y)]]) + + m1 = m0.refine(Q.positive(x) & Q.positive(y)) + assert m1 == Matrix([[x**2, x], [x*y**2, x**2*y]]) + + m1 = m0.refine(Q.negative(x) & Q.negative(y)) + assert m1 == Matrix([[x**2, -x], [-x*y**2, -x**2*y]]) + + +def test_replace(): + F, G = symbols('F, G', cls=Function) + K = OperationsOnlyMatrix(2, 2, lambda i, j: G(i+j)) + M = OperationsOnlyMatrix(2, 2, lambda i, j: F(i+j)) + N = M.replace(F, G) + assert N == K + + +def test_replace_map(): + F, G = symbols('F, G', cls=Function) + K = OperationsOnlyMatrix(2, 2, [(G(0), {F(0): G(0)}), (G(1), {F(1): G(1)}), (G(1), {F(1) \ + : G(1)}), (G(2), {F(2): G(2)})]) + M = OperationsOnlyMatrix(2, 2, lambda i, j: F(i+j)) + N = M.replace(F, G, True) + assert N == K + + +def test_rot90(): + A = Matrix([[1, 2], [3, 4]]) + assert A == A.rot90(0) == A.rot90(4) + assert A.rot90(2) == A.rot90(-2) == A.rot90(6) == Matrix(((4, 3), (2, 1))) + assert A.rot90(3) == A.rot90(-1) == A.rot90(7) == Matrix(((2, 4), (1, 3))) + assert A.rot90() == A.rot90(-7) == A.rot90(-3) == Matrix(((3, 1), (4, 2))) + +def test_simplify(): + n = Symbol('n') + f = Function('f') + + M = OperationsOnlyMatrix([[ 1/x + 1/y, (x + x*y) / x ], + [ (f(x) + y*f(x))/f(x), 2 * (1/n - cos(n * pi)/n) / pi ]]) + assert M.simplify() == Matrix([[ (x + y)/(x * y), 1 + y ], + [ 1 + y, 2*((1 - 1*cos(pi*n))/(pi*n)) ]]) + eq = (1 + x)**2 + M = OperationsOnlyMatrix([[eq]]) + assert M.simplify() == Matrix([[eq]]) + assert M.simplify(ratio=oo) == Matrix([[eq.simplify(ratio=oo)]]) + + # https://github.com/sympy/sympy/issues/19353 + m = Matrix([[30, 2], [3, 4]]) + assert (1/(m.trace())).simplify() == Rational(1, 34) + + +def test_subs(): + assert OperationsOnlyMatrix([[1, x], [x, 4]]).subs(x, 5) == Matrix([[1, 5], [5, 4]]) + assert OperationsOnlyMatrix([[x, 2], [x + y, 4]]).subs([[x, -1], [y, -2]]) == \ + Matrix([[-1, 2], [-3, 4]]) + assert OperationsOnlyMatrix([[x, 2], [x + y, 4]]).subs([(x, -1), (y, -2)]) == \ + Matrix([[-1, 2], [-3, 4]]) + assert OperationsOnlyMatrix([[x, 2], [x + y, 4]]).subs({x: -1, y: -2}) == \ + Matrix([[-1, 2], [-3, 4]]) + assert OperationsOnlyMatrix([[x*y]]).subs({x: y - 1, y: x - 1}, simultaneous=True) == \ + Matrix([[(x - 1)*(y - 1)]]) + + +def test_trace(): + M = OperationsOnlyMatrix([[1, 0, 0], + [0, 5, 0], + [0, 0, 8]]) + assert M.trace() == 14 + + +def test_xreplace(): + assert OperationsOnlyMatrix([[1, x], [x, 4]]).xreplace({x: 5}) == \ + Matrix([[1, 5], [5, 4]]) + assert OperationsOnlyMatrix([[x, 2], [x + y, 4]]).xreplace({x: -1, y: -2}) == \ + Matrix([[-1, 2], [-3, 4]]) + + +def test_permute(): + a = OperationsOnlyMatrix(3, 4, [1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12]) + + raises(IndexError, lambda: a.permute([[0, 5]])) + raises(ValueError, lambda: a.permute(Symbol('x'))) + b = a.permute_rows([[0, 2], [0, 1]]) + assert a.permute([[0, 2], [0, 1]]) == b == Matrix([ + [5, 6, 7, 8], + [9, 10, 11, 12], + [1, 2, 3, 4]]) + + b = a.permute_cols([[0, 2], [0, 1]]) + assert a.permute([[0, 2], [0, 1]], orientation='cols') == b ==\ + Matrix([ + [ 2, 3, 1, 4], + [ 6, 7, 5, 8], + [10, 11, 9, 12]]) + + b = a.permute_cols([[0, 2], [0, 1]], direction='backward') + assert a.permute([[0, 2], [0, 1]], orientation='cols', direction='backward') == b ==\ + Matrix([ + [ 3, 1, 2, 4], + [ 7, 5, 6, 8], + [11, 9, 10, 12]]) + + assert a.permute([1, 2, 0, 3]) == Matrix([ + [5, 6, 7, 8], + [9, 10, 11, 12], + [1, 2, 3, 4]]) + + from sympy.combinatorics import Permutation + assert a.permute(Permutation([1, 2, 0, 3])) == Matrix([ + [5, 6, 7, 8], + [9, 10, 11, 12], + [1, 2, 3, 4]]) + +def test_upper_triangular(): + + A = OperationsOnlyMatrix([ + [1, 1, 1, 1], + [1, 1, 1, 1], + [1, 1, 1, 1], + [1, 1, 1, 1] + ]) + + R = A.upper_triangular(2) + assert R == OperationsOnlyMatrix([ + [0, 0, 1, 1], + [0, 0, 0, 1], + [0, 0, 0, 0], + [0, 0, 0, 0] + ]) + + R = A.upper_triangular(-2) + assert R == OperationsOnlyMatrix([ + [1, 1, 1, 1], + [1, 1, 1, 1], + [1, 1, 1, 1], + [0, 1, 1, 1] + ]) + + R = A.upper_triangular() + assert R == OperationsOnlyMatrix([ + [1, 1, 1, 1], + [0, 1, 1, 1], + [0, 0, 1, 1], + [0, 0, 0, 1] + ]) + +def test_lower_triangular(): + A = OperationsOnlyMatrix([ + [1, 1, 1, 1], + [1, 1, 1, 1], + [1, 1, 1, 1], + [1, 1, 1, 1] + ]) + + L = A.lower_triangular() + assert L == ArithmeticOnlyMatrix([ + [1, 0, 0, 0], + [1, 1, 0, 0], + [1, 1, 1, 0], + [1, 1, 1, 1]]) + + L = A.lower_triangular(2) + assert L == ArithmeticOnlyMatrix([ + [1, 1, 1, 0], + [1, 1, 1, 1], + [1, 1, 1, 1], + [1, 1, 1, 1] + ]) + + L = A.lower_triangular(-2) + assert L == ArithmeticOnlyMatrix([ + [0, 0, 0, 0], + [0, 0, 0, 0], + [1, 0, 0, 0], + [1, 1, 0, 0] + ]) + + +# ArithmeticOnlyMatrix tests +def test_abs(): + m = ArithmeticOnlyMatrix([[1, -2], [x, y]]) + assert abs(m) == ArithmeticOnlyMatrix([[1, 2], [Abs(x), Abs(y)]]) + + +def test_add(): + m = ArithmeticOnlyMatrix([[1, 2, 3], [x, y, x], [2*y, -50, z*x]]) + assert m + m == ArithmeticOnlyMatrix([[2, 4, 6], [2*x, 2*y, 2*x], [4*y, -100, 2*z*x]]) + n = ArithmeticOnlyMatrix(1, 2, [1, 2]) + raises(ShapeError, lambda: m + n) + + +def test_multiplication(): + a = ArithmeticOnlyMatrix(( + (1, 2), + (3, 1), + (0, 6), + )) + + b = ArithmeticOnlyMatrix(( + (1, 2), + (3, 0), + )) + + raises(ShapeError, lambda: b*a) + raises(TypeError, lambda: a*{}) + + c = a*b + assert c[0, 0] == 7 + assert c[0, 1] == 2 + assert c[1, 0] == 6 + assert c[1, 1] == 6 + assert c[2, 0] == 18 + assert c[2, 1] == 0 + + try: + eval('c = a @ b') + except SyntaxError: + pass + else: + assert c[0, 0] == 7 + assert c[0, 1] == 2 + assert c[1, 0] == 6 + assert c[1, 1] == 6 + assert c[2, 0] == 18 + assert c[2, 1] == 0 + + h = a.multiply_elementwise(c) + assert h == matrix_multiply_elementwise(a, c) + assert h[0, 0] == 7 + assert h[0, 1] == 4 + assert h[1, 0] == 18 + assert h[1, 1] == 6 + assert h[2, 0] == 0 + assert h[2, 1] == 0 + raises(ShapeError, lambda: a.multiply_elementwise(b)) + + c = b * Symbol("x") + assert isinstance(c, ArithmeticOnlyMatrix) + assert c[0, 0] == x + assert c[0, 1] == 2*x + assert c[1, 0] == 3*x + assert c[1, 1] == 0 + + c2 = x * b + assert c == c2 + + c = 5 * b + assert isinstance(c, ArithmeticOnlyMatrix) + assert c[0, 0] == 5 + assert c[0, 1] == 2*5 + assert c[1, 0] == 3*5 + assert c[1, 1] == 0 + + try: + eval('c = 5 @ b') + except SyntaxError: + pass + else: + assert isinstance(c, ArithmeticOnlyMatrix) + assert c[0, 0] == 5 + assert c[0, 1] == 2*5 + assert c[1, 0] == 3*5 + assert c[1, 1] == 0 + + # https://github.com/sympy/sympy/issues/22353 + A = Matrix(ones(3, 1)) + _h = -Rational(1, 2) + B = Matrix([_h, _h, _h]) + assert A.multiply_elementwise(B) == Matrix([ + [_h], + [_h], + [_h]]) + + +def test_matmul(): + a = Matrix([[1, 2], [3, 4]]) + + assert a.__matmul__(2) == NotImplemented + + assert a.__rmatmul__(2) == NotImplemented + + #This is done this way because @ is only supported in Python 3.5+ + #To check 2@a case + try: + eval('2 @ a') + except SyntaxError: + pass + except TypeError: #TypeError is raised in case of NotImplemented is returned + pass + + #Check a@2 case + try: + eval('a @ 2') + except SyntaxError: + pass + except TypeError: #TypeError is raised in case of NotImplemented is returned + pass + + +def test_non_matmul(): + """ + Test that if explicitly specified as non-matrix, mul reverts + to scalar multiplication. + """ + class foo(Expr): + is_Matrix=False + is_MatrixLike=False + shape = (1, 1) + + A = Matrix([[1, 2], [3, 4]]) + b = foo() + assert b*A == Matrix([[b, 2*b], [3*b, 4*b]]) + assert A*b == Matrix([[b, 2*b], [3*b, 4*b]]) + + +def test_power(): + raises(NonSquareMatrixError, lambda: Matrix((1, 2))**2) + + A = ArithmeticOnlyMatrix([[2, 3], [4, 5]]) + assert (A**5)[:] == (6140, 8097, 10796, 14237) + A = ArithmeticOnlyMatrix([[2, 1, 3], [4, 2, 4], [6, 12, 1]]) + assert (A**3)[:] == (290, 262, 251, 448, 440, 368, 702, 954, 433) + assert A**0 == eye(3) + assert A**1 == A + assert (ArithmeticOnlyMatrix([[2]]) ** 100)[0, 0] == 2**100 + assert ArithmeticOnlyMatrix([[1, 2], [3, 4]])**Integer(2) == ArithmeticOnlyMatrix([[7, 10], [15, 22]]) + A = Matrix([[1,2],[4,5]]) + assert A.pow(20, method='cayley') == A.pow(20, method='multiply') + +def test_neg(): + n = ArithmeticOnlyMatrix(1, 2, [1, 2]) + assert -n == ArithmeticOnlyMatrix(1, 2, [-1, -2]) + + +def test_sub(): + n = ArithmeticOnlyMatrix(1, 2, [1, 2]) + assert n - n == ArithmeticOnlyMatrix(1, 2, [0, 0]) + + +def test_div(): + n = ArithmeticOnlyMatrix(1, 2, [1, 2]) + assert n/2 == ArithmeticOnlyMatrix(1, 2, [S.Half, S(2)/2]) + +# SpecialOnlyMatrix tests +def test_eye(): + assert list(SpecialOnlyMatrix.eye(2, 2)) == [1, 0, 0, 1] + assert list(SpecialOnlyMatrix.eye(2)) == [1, 0, 0, 1] + assert type(SpecialOnlyMatrix.eye(2)) == SpecialOnlyMatrix + assert type(SpecialOnlyMatrix.eye(2, cls=Matrix)) == Matrix + + +def test_ones(): + assert list(SpecialOnlyMatrix.ones(2, 2)) == [1, 1, 1, 1] + assert list(SpecialOnlyMatrix.ones(2)) == [1, 1, 1, 1] + assert SpecialOnlyMatrix.ones(2, 3) == Matrix([[1, 1, 1], [1, 1, 1]]) + assert type(SpecialOnlyMatrix.ones(2)) == SpecialOnlyMatrix + assert type(SpecialOnlyMatrix.ones(2, cls=Matrix)) == Matrix + + +def test_zeros(): + assert list(SpecialOnlyMatrix.zeros(2, 2)) == [0, 0, 0, 0] + assert list(SpecialOnlyMatrix.zeros(2)) == [0, 0, 0, 0] + assert SpecialOnlyMatrix.zeros(2, 3) == Matrix([[0, 0, 0], [0, 0, 0]]) + assert type(SpecialOnlyMatrix.zeros(2)) == SpecialOnlyMatrix + assert type(SpecialOnlyMatrix.zeros(2, cls=Matrix)) == Matrix + + +def test_diag_make(): + diag = SpecialOnlyMatrix.diag + a = Matrix([[1, 2], [2, 3]]) + b = Matrix([[3, x], [y, 3]]) + c = Matrix([[3, x, 3], [y, 3, z], [x, y, z]]) + assert diag(a, b, b) == Matrix([ + [1, 2, 0, 0, 0, 0], + [2, 3, 0, 0, 0, 0], + [0, 0, 3, x, 0, 0], + [0, 0, y, 3, 0, 0], + [0, 0, 0, 0, 3, x], + [0, 0, 0, 0, y, 3], + ]) + assert diag(a, b, c) == Matrix([ + [1, 2, 0, 0, 0, 0, 0], + [2, 3, 0, 0, 0, 0, 0], + [0, 0, 3, x, 0, 0, 0], + [0, 0, y, 3, 0, 0, 0], + [0, 0, 0, 0, 3, x, 3], + [0, 0, 0, 0, y, 3, z], + [0, 0, 0, 0, x, y, z], + ]) + assert diag(a, c, b) == Matrix([ + [1, 2, 0, 0, 0, 0, 0], + [2, 3, 0, 0, 0, 0, 0], + [0, 0, 3, x, 3, 0, 0], + [0, 0, y, 3, z, 0, 0], + [0, 0, x, y, z, 0, 0], + [0, 0, 0, 0, 0, 3, x], + [0, 0, 0, 0, 0, y, 3], + ]) + a = Matrix([x, y, z]) + b = Matrix([[1, 2], [3, 4]]) + c = Matrix([[5, 6]]) + # this "wandering diagonal" is what makes this + # a block diagonal where each block is independent + # of the others + assert diag(a, 7, b, c) == Matrix([ + [x, 0, 0, 0, 0, 0], + [y, 0, 0, 0, 0, 0], + [z, 0, 0, 0, 0, 0], + [0, 7, 0, 0, 0, 0], + [0, 0, 1, 2, 0, 0], + [0, 0, 3, 4, 0, 0], + [0, 0, 0, 0, 5, 6]]) + raises(ValueError, lambda: diag(a, 7, b, c, rows=5)) + assert diag(1) == Matrix([[1]]) + assert diag(1, rows=2) == Matrix([[1, 0], [0, 0]]) + assert diag(1, cols=2) == Matrix([[1, 0], [0, 0]]) + assert diag(1, rows=3, cols=2) == Matrix([[1, 0], [0, 0], [0, 0]]) + assert diag(*[2, 3]) == Matrix([ + [2, 0], + [0, 3]]) + assert diag(Matrix([2, 3])) == Matrix([ + [2], + [3]]) + assert diag([1, [2, 3], 4], unpack=False) == \ + diag([[1], [2, 3], [4]], unpack=False) == Matrix([ + [1, 0], + [2, 3], + [4, 0]]) + assert type(diag(1)) == SpecialOnlyMatrix + assert type(diag(1, cls=Matrix)) == Matrix + assert Matrix.diag([1, 2, 3]) == Matrix.diag(1, 2, 3) + assert Matrix.diag([1, 2, 3], unpack=False).shape == (3, 1) + assert Matrix.diag([[1, 2, 3]]).shape == (3, 1) + assert Matrix.diag([[1, 2, 3]], unpack=False).shape == (1, 3) + assert Matrix.diag([[[1, 2, 3]]]).shape == (1, 3) + # kerning can be used to move the starting point + assert Matrix.diag(ones(0, 2), 1, 2) == Matrix([ + [0, 0, 1, 0], + [0, 0, 0, 2]]) + assert Matrix.diag(ones(2, 0), 1, 2) == Matrix([ + [0, 0], + [0, 0], + [1, 0], + [0, 2]]) + + +def test_diagonal(): + m = Matrix(3, 3, range(9)) + d = m.diagonal() + assert d == m.diagonal(0) + assert tuple(d) == (0, 4, 8) + assert tuple(m.diagonal(1)) == (1, 5) + assert tuple(m.diagonal(-1)) == (3, 7) + assert tuple(m.diagonal(2)) == (2,) + assert type(m.diagonal()) == type(m) + s = SparseMatrix(3, 3, {(1, 1): 1}) + assert type(s.diagonal()) == type(s) + assert type(m) != type(s) + raises(ValueError, lambda: m.diagonal(3)) + raises(ValueError, lambda: m.diagonal(-3)) + raises(ValueError, lambda: m.diagonal(pi)) + M = ones(2, 3) + assert banded({i: list(M.diagonal(i)) + for i in range(1-M.rows, M.cols)}) == M + + +def test_jordan_block(): + assert SpecialOnlyMatrix.jordan_block(3, 2) == SpecialOnlyMatrix.jordan_block(3, eigenvalue=2) \ + == SpecialOnlyMatrix.jordan_block(size=3, eigenvalue=2) \ + == SpecialOnlyMatrix.jordan_block(3, 2, band='upper') \ + == SpecialOnlyMatrix.jordan_block( + size=3, eigenval=2, eigenvalue=2) \ + == Matrix([ + [2, 1, 0], + [0, 2, 1], + [0, 0, 2]]) + + assert SpecialOnlyMatrix.jordan_block(3, 2, band='lower') == Matrix([ + [2, 0, 0], + [1, 2, 0], + [0, 1, 2]]) + # missing eigenvalue + raises(ValueError, lambda: SpecialOnlyMatrix.jordan_block(2)) + # non-integral size + raises(ValueError, lambda: SpecialOnlyMatrix.jordan_block(3.5, 2)) + # size not specified + raises(ValueError, lambda: SpecialOnlyMatrix.jordan_block(eigenvalue=2)) + # inconsistent eigenvalue + raises(ValueError, + lambda: SpecialOnlyMatrix.jordan_block( + eigenvalue=2, eigenval=4)) + + # Using alias keyword + assert SpecialOnlyMatrix.jordan_block(size=3, eigenvalue=2) == \ + SpecialOnlyMatrix.jordan_block(size=3, eigenval=2) + + +def test_orthogonalize(): + m = Matrix([[1, 2], [3, 4]]) + assert m.orthogonalize(Matrix([[2], [1]])) == [Matrix([[2], [1]])] + assert m.orthogonalize(Matrix([[2], [1]]), normalize=True) == \ + [Matrix([[2*sqrt(5)/5], [sqrt(5)/5]])] + assert m.orthogonalize(Matrix([[1], [2]]), Matrix([[-1], [4]])) == \ + [Matrix([[1], [2]]), Matrix([[Rational(-12, 5)], [Rational(6, 5)]])] + assert m.orthogonalize(Matrix([[0], [0]]), Matrix([[-1], [4]])) == \ + [Matrix([[-1], [4]])] + assert m.orthogonalize(Matrix([[0], [0]])) == [] + + n = Matrix([[9, 1, 9], [3, 6, 10], [8, 5, 2]]) + vecs = [Matrix([[-5], [1]]), Matrix([[-5], [2]]), Matrix([[-5], [-2]])] + assert n.orthogonalize(*vecs) == \ + [Matrix([[-5], [1]]), Matrix([[Rational(5, 26)], [Rational(25, 26)]])] + + vecs = [Matrix([0, 0, 0]), Matrix([1, 2, 3]), Matrix([1, 4, 5])] + raises(ValueError, lambda: Matrix.orthogonalize(*vecs, rankcheck=True)) + + vecs = [Matrix([1, 2, 3]), Matrix([4, 5, 6]), Matrix([7, 8, 9])] + raises(ValueError, lambda: Matrix.orthogonalize(*vecs, rankcheck=True)) + +def test_wilkinson(): + + wminus, wplus = Matrix.wilkinson(1) + assert wminus == Matrix([ + [-1, 1, 0], + [1, 0, 1], + [0, 1, 1]]) + assert wplus == Matrix([ + [1, 1, 0], + [1, 0, 1], + [0, 1, 1]]) + + wminus, wplus = Matrix.wilkinson(3) + assert wminus == Matrix([ + [-3, 1, 0, 0, 0, 0, 0], + [1, -2, 1, 0, 0, 0, 0], + [0, 1, -1, 1, 0, 0, 0], + [0, 0, 1, 0, 1, 0, 0], + [0, 0, 0, 1, 1, 1, 0], + [0, 0, 0, 0, 1, 2, 1], + + [0, 0, 0, 0, 0, 1, 3]]) + + assert wplus == Matrix([ + [3, 1, 0, 0, 0, 0, 0], + [1, 2, 1, 0, 0, 0, 0], + [0, 1, 1, 1, 0, 0, 0], + [0, 0, 1, 0, 1, 0, 0], + [0, 0, 0, 1, 1, 1, 0], + [0, 0, 0, 0, 1, 2, 1], + [0, 0, 0, 0, 0, 1, 3]]) + + +# CalculusOnlyMatrix tests +@XFAIL +def test_diff(): + x, y = symbols('x y') + m = CalculusOnlyMatrix(2, 1, [x, y]) + # TODO: currently not working as ``_MinimalMatrix`` cannot be sympified: + assert m.diff(x) == Matrix(2, 1, [1, 0]) + + +def test_integrate(): + x, y = symbols('x y') + m = CalculusOnlyMatrix(2, 1, [x, y]) + assert m.integrate(x) == Matrix(2, 1, [x**2/2, y*x]) + + +def test_jacobian2(): + rho, phi = symbols("rho,phi") + X = CalculusOnlyMatrix(3, 1, [rho*cos(phi), rho*sin(phi), rho**2]) + Y = CalculusOnlyMatrix(2, 1, [rho, phi]) + J = Matrix([ + [cos(phi), -rho*sin(phi)], + [sin(phi), rho*cos(phi)], + [ 2*rho, 0], + ]) + assert X.jacobian(Y) == J + + m = CalculusOnlyMatrix(2, 2, [1, 2, 3, 4]) + m2 = CalculusOnlyMatrix(4, 1, [1, 2, 3, 4]) + raises(TypeError, lambda: m.jacobian(Matrix([1, 2]))) + raises(TypeError, lambda: m2.jacobian(m)) + + +def test_limit(): + x, y = symbols('x y') + m = CalculusOnlyMatrix(2, 1, [1/x, y]) + assert m.limit(x, 5) == Matrix(2, 1, [Rational(1, 5), y]) + + +def test_issue_13774(): + M = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + v = [1, 1, 1] + raises(TypeError, lambda: M*v) + raises(TypeError, lambda: v*M) + +def test_companion(): + x = Symbol('x') + y = Symbol('y') + raises(ValueError, lambda: Matrix.companion(1)) + raises(ValueError, lambda: Matrix.companion(Poly([1], x))) + raises(ValueError, lambda: Matrix.companion(Poly([2, 1], x))) + raises(ValueError, lambda: Matrix.companion(Poly(x*y, [x, y]))) + + c0, c1, c2 = symbols('c0:3') + assert Matrix.companion(Poly([1, c0], x)) == Matrix([-c0]) + assert Matrix.companion(Poly([1, c1, c0], x)) == \ + Matrix([[0, -c0], [1, -c1]]) + assert Matrix.companion(Poly([1, c2, c1, c0], x)) == \ + Matrix([[0, 0, -c0], [1, 0, -c1], [0, 1, -c2]]) + +def test_issue_10589(): + x, y, z = symbols("x, y z") + M1 = Matrix([x, y, z]) + M1 = M1.subs(zip([x, y, z], [1, 2, 3])) + assert M1 == Matrix([[1], [2], [3]]) + + M2 = Matrix([[x, x, x, x, x], [x, x, x, x, x], [x, x, x, x, x]]) + M2 = M2.subs(zip([x], [1])) + assert M2 == Matrix([[1, 1, 1, 1, 1], [1, 1, 1, 1, 1], [1, 1, 1, 1, 1]]) + +def test_rmul_pr19860(): + class Foo(ImmutableDenseMatrix): + _op_priority = MutableDenseMatrix._op_priority + 0.01 + + a = Matrix(2, 2, [1, 2, 3, 4]) + b = Foo(2, 2, [1, 2, 3, 4]) + + # This would throw a RecursionError: maximum recursion depth + # since b always has higher priority even after a.as_mutable() + c = a*b + + assert isinstance(c, Foo) + assert c == Matrix([[7, 10], [15, 22]]) + + +def test_issue_18956(): + A = Array([[1, 2], [3, 4]]) + B = Matrix([[1,2],[3,4]]) + raises(TypeError, lambda: B + A) + raises(TypeError, lambda: A + B) + + +def test__eq__(): + class My(object): + def __iter__(self): + yield 1 + yield 2 + return + def __getitem__(self, i): + return list(self)[i] + a = Matrix(2, 1, [1, 2]) + assert a != My() + class My_sympy(My): + def _sympy_(self): + return Matrix(self) + assert a == My_sympy() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_decompositions.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_decompositions.py new file mode 100644 index 0000000000000000000000000000000000000000..d169ec3a8846fed786981e62d932fd860b6d4951 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_decompositions.py @@ -0,0 +1,474 @@ +from sympy.core.function import expand_mul +from sympy.core.numbers import I, Rational +from sympy.core.singleton import S +from sympy.core.symbol import Symbol +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.complexes import Abs +from sympy.simplify.simplify import simplify +from sympy.matrices.exceptions import NonSquareMatrixError +from sympy.matrices import Matrix, zeros, eye, SparseMatrix +from sympy.abc import x, y, z +from sympy.testing.pytest import raises, slow +from sympy.testing.matrices import allclose + + +def test_LUdecomp(): + testmat = Matrix([[0, 2, 5, 3], + [3, 3, 7, 4], + [8, 4, 0, 2], + [-2, 6, 3, 4]]) + L, U, p = testmat.LUdecomposition() + assert L.is_lower + assert U.is_upper + assert (L*U).permute_rows(p, 'backward') - testmat == zeros(4) + + testmat = Matrix([[6, -2, 7, 4], + [0, 3, 6, 7], + [1, -2, 7, 4], + [-9, 2, 6, 3]]) + L, U, p = testmat.LUdecomposition() + assert L.is_lower + assert U.is_upper + assert (L*U).permute_rows(p, 'backward') - testmat == zeros(4) + + # non-square + testmat = Matrix([[1, 2, 3], + [4, 5, 6], + [7, 8, 9], + [10, 11, 12]]) + L, U, p = testmat.LUdecomposition(rankcheck=False) + assert L.is_lower + assert U.is_upper + assert (L*U).permute_rows(p, 'backward') - testmat == zeros(4, 3) + + # square and singular + testmat = Matrix([[1, 2, 3], + [2, 4, 6], + [4, 5, 6]]) + L, U, p = testmat.LUdecomposition(rankcheck=False) + assert L.is_lower + assert U.is_upper + assert (L*U).permute_rows(p, 'backward') - testmat == zeros(3) + + M = Matrix(((1, x, 1), (2, y, 0), (y, 0, z))) + L, U, p = M.LUdecomposition() + assert L.is_lower + assert U.is_upper + assert (L*U).permute_rows(p, 'backward') - M == zeros(3) + + mL = Matrix(( + (1, 0, 0), + (2, 3, 0), + )) + assert mL.is_lower is True + assert mL.is_upper is False + mU = Matrix(( + (1, 2, 3), + (0, 4, 5), + )) + assert mU.is_lower is False + assert mU.is_upper is True + + # test FF LUdecomp + M = Matrix([[1, 3, 3], + [3, 2, 6], + [3, 2, 2]]) + P, L, Dee, U = M.LUdecompositionFF() + assert P*M == L*Dee.inv()*U + + M = Matrix([[1, 2, 3, 4], + [3, -1, 2, 3], + [3, 1, 3, -2], + [6, -1, 0, 2]]) + P, L, Dee, U = M.LUdecompositionFF() + assert P*M == L*Dee.inv()*U + + M = Matrix([[0, 0, 1], + [2, 3, 0], + [3, 1, 4]]) + P, L, Dee, U = M.LUdecompositionFF() + assert P*M == L*Dee.inv()*U + + # issue 15794 + M = Matrix( + [[1, 2, 3], + [4, 5, 6], + [7, 8, 9]] + ) + raises(ValueError, lambda : M.LUdecomposition_Simple(rankcheck=True)) + +def test_singular_value_decompositionD(): + A = Matrix([[1, 2], [2, 1]]) + U, S, V = A.singular_value_decomposition() + assert U * S * V.T == A + assert U.T * U == eye(U.cols) + assert V.T * V == eye(V.cols) + + B = Matrix([[1, 2]]) + U, S, V = B.singular_value_decomposition() + + assert U * S * V.T == B + assert U.T * U == eye(U.cols) + assert V.T * V == eye(V.cols) + + C = Matrix([ + [1, 0, 0, 0, 2], + [0, 0, 3, 0, 0], + [0, 0, 0, 0, 0], + [0, 2, 0, 0, 0], + ]) + + U, S, V = C.singular_value_decomposition() + + assert U * S * V.T == C + assert U.T * U == eye(U.cols) + assert V.T * V == eye(V.cols) + + D = Matrix([[Rational(1, 3), sqrt(2)], [0, Rational(1, 4)]]) + U, S, V = D.singular_value_decomposition() + assert simplify(U.T * U) == eye(U.cols) + assert simplify(V.T * V) == eye(V.cols) + assert simplify(U * S * V.T) == D + + +def test_QR(): + A = Matrix([[1, 2], [2, 3]]) + Q, S = A.QRdecomposition() + R = Rational + assert Q == Matrix([ + [ 5**R(-1, 2), (R(2)/5)*(R(1)/5)**R(-1, 2)], + [2*5**R(-1, 2), (-R(1)/5)*(R(1)/5)**R(-1, 2)]]) + assert S == Matrix([[5**R(1, 2), 8*5**R(-1, 2)], [0, (R(1)/5)**R(1, 2)]]) + assert Q*S == A + assert Q.T * Q == eye(2) + + A = Matrix([[1, 1, 1], [1, 1, 3], [2, 3, 4]]) + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + A = Matrix([[12, 0, -51], [6, 0, 167], [-4, 0, 24]]) + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + x = Symbol('x') + A = Matrix([x]) + Q, R = A.QRdecomposition() + assert Q == Matrix([x / Abs(x)]) + assert R == Matrix([Abs(x)]) + + A = Matrix([[x, 0], [0, x]]) + Q, R = A.QRdecomposition() + assert Q == x / Abs(x) * Matrix([[1, 0], [0, 1]]) + assert R == Abs(x) * Matrix([[1, 0], [0, 1]]) + + +def test_QR_non_square(): + # Narrow (cols < rows) matrices + A = Matrix([[9, 0, 26], [12, 0, -7], [0, 4, 4], [0, -3, -3]]) + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + A = Matrix([[1, -1, 4], [1, 4, -2], [1, 4, 2], [1, -1, 0]]) + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + A = Matrix(2, 1, [1, 2]) + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + # Wide (cols > rows) matrices + A = Matrix([[1, 2, 3], [4, 5, 6]]) + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + A = Matrix([[1, 2, 3, 4], [1, 4, 9, 16], [1, 8, 27, 64]]) + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + A = Matrix(1, 2, [1, 2]) + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + +def test_QR_trivial(): + # Rank deficient matrices + A = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + A = Matrix([[1, 1, 1], [2, 2, 2], [3, 3, 3], [4, 4, 4]]) + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + A = Matrix([[1, 1, 1], [2, 2, 2], [3, 3, 3], [4, 4, 4]]).T + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + # Zero rank matrices + A = Matrix([[0, 0, 0]]) + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + A = Matrix([[0, 0, 0]]).T + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + A = Matrix([[0, 0, 0], [0, 0, 0]]) + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + A = Matrix([[0, 0, 0], [0, 0, 0]]).T + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + # Rank deficient matrices with zero norm from beginning columns + A = Matrix([[0, 0, 0], [1, 2, 3]]).T + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + A = Matrix([[0, 0, 0, 0], [1, 2, 3, 4], [0, 0, 0, 0]]).T + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + A = Matrix([[0, 0, 0, 0], [1, 2, 3, 4], [0, 0, 0, 0], [2, 4, 6, 8]]).T + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + A = Matrix([[0, 0, 0], [0, 0, 0], [0, 0, 0], [1, 2, 3]]).T + Q, R = A.QRdecomposition() + assert Q.T * Q == eye(Q.cols) + assert R.is_upper + assert A == Q*R + + +def test_QR_float(): + A = Matrix([[1, 1], [1, 1.01]]) + Q, R = A.QRdecomposition() + assert allclose(Q * R, A) + assert allclose(Q * Q.T, Matrix.eye(2)) + assert allclose(Q.T * Q, Matrix.eye(2)) + + A = Matrix([[1, 1], [1, 1.001]]) + Q, R = A.QRdecomposition() + assert allclose(Q * R, A) + assert allclose(Q * Q.T, Matrix.eye(2)) + assert allclose(Q.T * Q, Matrix.eye(2)) + + +def test_LUdecomposition_Simple_iszerofunc(): + # Test if callable passed to matrices.LUdecomposition_Simple() as iszerofunc keyword argument is used inside + # matrices.LUdecomposition_Simple() + magic_string = "I got passed in!" + def goofyiszero(value): + raise ValueError(magic_string) + + try: + lu, p = Matrix([[1, 0], [0, 1]]).LUdecomposition_Simple(iszerofunc=goofyiszero) + except ValueError as err: + assert magic_string == err.args[0] + return + + assert False + +def test_LUdecomposition_iszerofunc(): + # Test if callable passed to matrices.LUdecomposition() as iszerofunc keyword argument is used inside + # matrices.LUdecomposition_Simple() + magic_string = "I got passed in!" + def goofyiszero(value): + raise ValueError(magic_string) + + try: + l, u, p = Matrix([[1, 0], [0, 1]]).LUdecomposition(iszerofunc=goofyiszero) + except ValueError as err: + assert magic_string == err.args[0] + return + + assert False + +def test_LDLdecomposition(): + raises(NonSquareMatrixError, lambda: Matrix((1, 2)).LDLdecomposition()) + raises(ValueError, lambda: Matrix(((1, 2), (3, 4))).LDLdecomposition()) + raises(ValueError, lambda: Matrix(((5 + I, 0), (0, 1))).LDLdecomposition()) + raises(ValueError, lambda: Matrix(((1, 5), (5, 1))).LDLdecomposition()) + raises(ValueError, lambda: Matrix(((1, 2), (3, 4))).LDLdecomposition(hermitian=False)) + A = Matrix(((1, 5), (5, 1))) + L, D = A.LDLdecomposition(hermitian=False) + assert L * D * L.T == A + A = Matrix(((25, 15, -5), (15, 18, 0), (-5, 0, 11))) + L, D = A.LDLdecomposition() + assert L * D * L.T == A + assert L.is_lower + assert L == Matrix([[1, 0, 0], [ Rational(3, 5), 1, 0], [Rational(-1, 5), Rational(1, 3), 1]]) + assert D.is_diagonal() + assert D == Matrix([[25, 0, 0], [0, 9, 0], [0, 0, 9]]) + A = Matrix(((4, -2*I, 2 + 2*I), (2*I, 2, -1 + I), (2 - 2*I, -1 - I, 11))) + L, D = A.LDLdecomposition() + assert expand_mul(L * D * L.H) == A + assert L.expand() == Matrix([[1, 0, 0], [I/2, 1, 0], [S.Half - I/2, 0, 1]]) + assert D.expand() == Matrix(((4, 0, 0), (0, 1, 0), (0, 0, 9))) + + raises(NonSquareMatrixError, lambda: SparseMatrix((1, 2)).LDLdecomposition()) + raises(ValueError, lambda: SparseMatrix(((1, 2), (3, 4))).LDLdecomposition()) + raises(ValueError, lambda: SparseMatrix(((5 + I, 0), (0, 1))).LDLdecomposition()) + raises(ValueError, lambda: SparseMatrix(((1, 5), (5, 1))).LDLdecomposition()) + raises(ValueError, lambda: SparseMatrix(((1, 2), (3, 4))).LDLdecomposition(hermitian=False)) + A = SparseMatrix(((1, 5), (5, 1))) + L, D = A.LDLdecomposition(hermitian=False) + assert L * D * L.T == A + A = SparseMatrix(((25, 15, -5), (15, 18, 0), (-5, 0, 11))) + L, D = A.LDLdecomposition() + assert L * D * L.T == A + assert L.is_lower + assert L == Matrix([[1, 0, 0], [ Rational(3, 5), 1, 0], [Rational(-1, 5), Rational(1, 3), 1]]) + assert D.is_diagonal() + assert D == Matrix([[25, 0, 0], [0, 9, 0], [0, 0, 9]]) + A = SparseMatrix(((4, -2*I, 2 + 2*I), (2*I, 2, -1 + I), (2 - 2*I, -1 - I, 11))) + L, D = A.LDLdecomposition() + assert expand_mul(L * D * L.H) == A + assert L == Matrix(((1, 0, 0), (I/2, 1, 0), (S.Half - I/2, 0, 1))) + assert D == Matrix(((4, 0, 0), (0, 1, 0), (0, 0, 9))) + +def test_pinv_succeeds_with_rank_decomposition_method(): + # Test rank decomposition method of pseudoinverse succeeding + As = [Matrix([ + [61, 89, 55, 20, 71, 0], + [62, 96, 85, 85, 16, 0], + [69, 56, 17, 4, 54, 0], + [10, 54, 91, 41, 71, 0], + [ 7, 30, 10, 48, 90, 0], + [0,0,0,0,0,0]])] + for A in As: + A_pinv = A.pinv(method="RD") + AAp = A * A_pinv + ApA = A_pinv * A + assert simplify(AAp * A) == A + assert simplify(ApA * A_pinv) == A_pinv + assert AAp.H == AAp + assert ApA.H == ApA + +def test_rank_decomposition(): + a = Matrix(0, 0, []) + c, f = a.rank_decomposition() + assert f.is_echelon + assert c.cols == f.rows == a.rank() + assert c * f == a + + a = Matrix(1, 1, [5]) + c, f = a.rank_decomposition() + assert f.is_echelon + assert c.cols == f.rows == a.rank() + assert c * f == a + + a = Matrix(3, 3, [1, 2, 3, 1, 2, 3, 1, 2, 3]) + c, f = a.rank_decomposition() + assert f.is_echelon + assert c.cols == f.rows == a.rank() + assert c * f == a + + a = Matrix([ + [0, 0, 1, 2, 2, -5, 3], + [-1, 5, 2, 2, 1, -7, 5], + [0, 0, -2, -3, -3, 8, -5], + [-1, 5, 0, -1, -2, 1, 0]]) + c, f = a.rank_decomposition() + assert f.is_echelon + assert c.cols == f.rows == a.rank() + assert c * f == a + + +@slow +def test_upper_hessenberg_decomposition(): + A = Matrix([ + [1, 0, sqrt(3)], + [sqrt(2), Rational(1, 2), 2], + [1, Rational(1, 4), 3], + ]) + H, P = A.upper_hessenberg_decomposition() + assert simplify(P * P.H) == eye(P.cols) + assert simplify(P.H * P) == eye(P.cols) + assert H.is_upper_hessenberg + assert (simplify(P * H * P.H)) == A + + + B = Matrix([ + [1, 2, 10], + [8, 2, 5], + [3, 12, 34], + ]) + H, P = B.upper_hessenberg_decomposition() + assert simplify(P * P.H) == eye(P.cols) + assert simplify(P.H * P) == eye(P.cols) + assert H.is_upper_hessenberg + assert simplify(P * H * P.H) == B + + C = Matrix([ + [1, sqrt(2), 2, 3], + [0, 5, 3, 4], + [1, 1, 4, sqrt(5)], + [0, 2, 2, 3] + ]) + + H, P = C.upper_hessenberg_decomposition() + assert simplify(P * P.H) == eye(P.cols) + assert simplify(P.H * P) == eye(P.cols) + assert H.is_upper_hessenberg + assert simplify(P * H * P.H) == C + + D = Matrix([ + [1, 2, 3], + [-3, 5, 6], + [4, -8, 9], + ]) + H, P = D.upper_hessenberg_decomposition() + assert simplify(P * P.H) == eye(P.cols) + assert simplify(P.H * P) == eye(P.cols) + assert H.is_upper_hessenberg + assert simplify(P * H * P.H) == D + + E = Matrix([ + [1, 0, 0, 0], + [0, 1, 0, 0], + [1, 1, 0, 1], + [1, 1, 1, 0] + ]) + + H, P = E.upper_hessenberg_decomposition() + assert simplify(P * P.H) == eye(P.cols) + assert simplify(P.H * P) == eye(P.cols) + assert H.is_upper_hessenberg + assert simplify(P * H * P.H) == E diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_determinant.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_determinant.py new file mode 100644 index 0000000000000000000000000000000000000000..82b42ccf67efa4757bf270782bdf1d65e0efa306 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_determinant.py @@ -0,0 +1,280 @@ +import random +import pytest +from sympy.core.numbers import I +from sympy.core.numbers import Rational +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.polys.polytools import Poly +from sympy.matrices import Matrix, eye, ones +from sympy.abc import x, y, z +from sympy.testing.pytest import raises +from sympy.matrices.exceptions import NonSquareMatrixError +from sympy.functions.combinatorial.factorials import factorial, subfactorial + + +@pytest.mark.parametrize("method", [ + # Evaluating these directly because they are never reached via M.det() + Matrix._eval_det_bareiss, Matrix._eval_det_berkowitz, + Matrix._eval_det_bird, Matrix._eval_det_laplace, Matrix._eval_det_lu +]) +@pytest.mark.parametrize("M, sol", [ + (Matrix(), 1), + (Matrix([[0]]), 0), + (Matrix([[5]]), 5), +]) +def test_eval_determinant(method, M, sol): + assert method(M) == sol + + +@pytest.mark.parametrize("method", [ + "domain-ge", "bareiss", "berkowitz", "bird", "laplace", "lu"]) +@pytest.mark.parametrize("M, sol", [ + (Matrix(( (-3, 2), + ( 8, -5) )), -1), + (Matrix(( (x, 1), + (y, 2*y) )), 2*x*y - y), + (Matrix(( (1, 1, 1), + (1, 2, 3), + (1, 3, 6) )), 1), + (Matrix(( ( 3, -2, 0, 5), + (-2, 1, -2, 2), + ( 0, -2, 5, 0), + ( 5, 0, 3, 4) )), -289), + (Matrix(( ( 1, 2, 3, 4), + ( 5, 6, 7, 8), + ( 9, 10, 11, 12), + (13, 14, 15, 16) )), 0), + (Matrix(( (3, 2, 0, 0, 0), + (0, 3, 2, 0, 0), + (0, 0, 3, 2, 0), + (0, 0, 0, 3, 2), + (2, 0, 0, 0, 3) )), 275), + (Matrix(( ( 3, 0, 0, 0), + (-2, 1, 0, 0), + ( 0, -2, 5, 0), + ( 5, 0, 3, 4) )), 60), + (Matrix(( ( 1, 0, 0, 0), + ( 5, 0, 0, 0), + ( 9, 10, 11, 0), + (13, 14, 15, 16) )), 0), + (Matrix(( (3, 2, 0, 0, 0), + (0, 3, 2, 0, 0), + (0, 0, 3, 2, 0), + (0, 0, 0, 3, 2), + (0, 0, 0, 0, 3) )), 243), + (Matrix(( (1, 0, 1, 2, 12), + (2, 0, 1, 1, 4), + (2, 1, 1, -1, 3), + (3, 2, -1, 1, 8), + (1, 1, 1, 0, 6) )), -55), + (Matrix(( (-5, 2, 3, 4, 5), + ( 1, -4, 3, 4, 5), + ( 1, 2, -3, 4, 5), + ( 1, 2, 3, -2, 5), + ( 1, 2, 3, 4, -1) )), 11664), + (Matrix(( ( 2, 7, -1, 3, 2), + ( 0, 0, 1, 0, 1), + (-2, 0, 7, 0, 2), + (-3, -2, 4, 5, 3), + ( 1, 0, 0, 0, 1) )), 123), + (Matrix(( (x, y, z), + (1, 0, 0), + (y, z, x) )), z**2 - x*y), +]) +def test_determinant(method, M, sol): + assert M.det(method=method) == sol + + +def test_issue_13835(): + a = symbols('a') + M = lambda n: Matrix([[i + a*j for i in range(n)] + for j in range(n)]) + assert M(5).det() == 0 + assert M(6).det() == 0 + assert M(7).det() == 0 + + +def test_issue_14517(): + M = Matrix([ + [ 0, 10*I, 10*I, 0], + [10*I, 0, 0, 10*I], + [10*I, 0, 5 + 2*I, 10*I], + [ 0, 10*I, 10*I, 5 + 2*I]]) + ev = M.eigenvals() + # test one random eigenvalue, the computation is a little slow + test_ev = random.choice(list(ev.keys())) + assert (M - test_ev*eye(4)).det() == 0 + + +@pytest.mark.parametrize("method", [ + "bareis", "det_lu", "det_LU", "Bareis", "BAREISS", "BERKOWITZ", "LU"]) +@pytest.mark.parametrize("M, sol", [ + (Matrix(( ( 3, -2, 0, 5), + (-2, 1, -2, 2), + ( 0, -2, 5, 0), + ( 5, 0, 3, 4) )), -289), + (Matrix(( (-5, 2, 3, 4, 5), + ( 1, -4, 3, 4, 5), + ( 1, 2, -3, 4, 5), + ( 1, 2, 3, -2, 5), + ( 1, 2, 3, 4, -1) )), 11664), +]) +def test_legacy_det(method, M, sol): + # Minimal support for legacy keys for 'method' in det() + # Partially copied from test_determinant() + assert M.det(method=method) == sol + + +def eye_Determinant(n): + return Matrix(n, n, lambda i, j: int(i == j)) + +def zeros_Determinant(n): + return Matrix(n, n, lambda i, j: 0) + +def test_det(): + a = Matrix(2, 3, [1, 2, 3, 4, 5, 6]) + raises(NonSquareMatrixError, lambda: a.det()) + + z = zeros_Determinant(2) + ey = eye_Determinant(2) + assert z.det() == 0 + assert ey.det() == 1 + + x = Symbol('x') + a = Matrix(0, 0, []) + b = Matrix(1, 1, [5]) + c = Matrix(2, 2, [1, 2, 3, 4]) + d = Matrix(3, 3, [1, 2, 3, 4, 5, 6, 7, 8, 8]) + e = Matrix(4, 4, + [x, 1, 2, 3, 4, 5, 6, 7, 2, 9, 10, 11, 12, 13, 14, 14]) + from sympy.abc import i, j, k, l, m, n + f = Matrix(3, 3, [i, l, m, 0, j, n, 0, 0, k]) + g = Matrix(3, 3, [i, 0, 0, l, j, 0, m, n, k]) + h = Matrix(3, 3, [x**3, 0, 0, i, x**-1, 0, j, k, x**-2]) + # the method keyword for `det` doesn't kick in until 4x4 matrices, + # so there is no need to test all methods on smaller ones + + assert a.det() == 1 + assert b.det() == 5 + assert c.det() == -2 + assert d.det() == 3 + assert e.det() == 4*x - 24 + assert e.det(method="domain-ge") == 4*x - 24 + assert e.det(method='bareiss') == 4*x - 24 + assert e.det(method='berkowitz') == 4*x - 24 + assert f.det() == i*j*k + assert g.det() == i*j*k + assert h.det() == 1 + raises(ValueError, lambda: e.det(iszerofunc="test")) + +def test_permanent(): + M = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + assert M.per() == 450 + for i in range(1, 12): + assert ones(i, i).per() == ones(i, i).T.per() == factorial(i) + assert (ones(i, i)-eye(i)).per() == (ones(i, i)-eye(i)).T.per() == subfactorial(i) + + a1, a2, a3, a4, a5 = symbols('a_1 a_2 a_3 a_4 a_5') + M = Matrix([a1, a2, a3, a4, a5]) + assert M.per() == M.T.per() == a1 + a2 + a3 + a4 + a5 + +def test_adjugate(): + x = Symbol('x') + e = Matrix(4, 4, + [x, 1, 2, 3, 4, 5, 6, 7, 2, 9, 10, 11, 12, 13, 14, 14]) + + adj = Matrix([ + [ 4, -8, 4, 0], + [ 76, -14*x - 68, 14*x - 8, -4*x + 24], + [-122, 17*x + 142, -21*x + 4, 8*x - 48], + [ 48, -4*x - 72, 8*x, -4*x + 24]]) + assert e.adjugate() == adj + assert e.adjugate(method='bareiss') == adj + assert e.adjugate(method='berkowitz') == adj + assert e.adjugate(method='bird') == adj + assert e.adjugate(method='laplace') == adj + + a = Matrix(2, 3, [1, 2, 3, 4, 5, 6]) + raises(NonSquareMatrixError, lambda: a.adjugate()) + +def test_util(): + R = Rational + + v1 = Matrix(1, 3, [1, 2, 3]) + v2 = Matrix(1, 3, [3, 4, 5]) + assert v1.norm() == sqrt(14) + assert v1.project(v2) == Matrix(1, 3, [R(39)/25, R(52)/25, R(13)/5]) + assert Matrix.zeros(1, 2) == Matrix(1, 2, [0, 0]) + assert ones(1, 2) == Matrix(1, 2, [1, 1]) + assert v1.copy() == v1 + # cofactor + assert eye(3) == eye(3).cofactor_matrix() + test = Matrix([[1, 3, 2], [2, 6, 3], [2, 3, 6]]) + assert test.cofactor_matrix() == \ + Matrix([[27, -6, -6], [-12, 2, 3], [-3, 1, 0]]) + test = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + assert test.cofactor_matrix() == \ + Matrix([[-3, 6, -3], [6, -12, 6], [-3, 6, -3]]) + +def test_cofactor_and_minors(): + x = Symbol('x') + e = Matrix(4, 4, + [x, 1, 2, 3, 4, 5, 6, 7, 2, 9, 10, 11, 12, 13, 14, 14]) + + m = Matrix([ + [ x, 1, 3], + [ 2, 9, 11], + [12, 13, 14]]) + cm = Matrix([ + [ 4, 76, -122, 48], + [-8, -14*x - 68, 17*x + 142, -4*x - 72], + [ 4, 14*x - 8, -21*x + 4, 8*x], + [ 0, -4*x + 24, 8*x - 48, -4*x + 24]]) + sub = Matrix([ + [x, 1, 2], + [4, 5, 6], + [2, 9, 10]]) + + assert e.minor_submatrix(1, 2) == m + assert e.minor_submatrix(-1, -1) == sub + assert e.minor(1, 2) == -17*x - 142 + assert e.cofactor(1, 2) == 17*x + 142 + assert e.cofactor_matrix() == cm + assert e.cofactor_matrix(method="bareiss") == cm + assert e.cofactor_matrix(method="berkowitz") == cm + assert e.cofactor_matrix(method="bird") == cm + assert e.cofactor_matrix(method="laplace") == cm + + raises(ValueError, lambda: e.cofactor(4, 5)) + raises(ValueError, lambda: e.minor(4, 5)) + raises(ValueError, lambda: e.minor_submatrix(4, 5)) + + a = Matrix(2, 3, [1, 2, 3, 4, 5, 6]) + assert a.minor_submatrix(0, 0) == Matrix([[5, 6]]) + + raises(ValueError, lambda: + Matrix(0, 0, []).minor_submatrix(0, 0)) + raises(NonSquareMatrixError, lambda: a.cofactor(0, 0)) + raises(NonSquareMatrixError, lambda: a.minor(0, 0)) + raises(NonSquareMatrixError, lambda: a.cofactor_matrix()) + +def test_charpoly(): + x, y = Symbol('x'), Symbol('y') + z, t = Symbol('z'), Symbol('t') + + from sympy.abc import a,b,c + + m = Matrix(3, 3, [1, 2, 3, 4, 5, 6, 7, 8, 9]) + + assert eye_Determinant(3).charpoly(x) == Poly((x - 1)**3, x) + assert eye_Determinant(3).charpoly(y) == Poly((y - 1)**3, y) + assert m.charpoly() == Poly(x**3 - 15*x**2 - 18*x, x) + raises(NonSquareMatrixError, lambda: Matrix([[1], [2]]).charpoly()) + n = Matrix(4, 4, [0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]) + assert n.charpoly() == Poly(x**4, x) + + n = Matrix(4, 4, [45, 0, 0, 0, 0, 23, 0, 0, 0, 0, 87, 0, 0, 0, 0, 12]) + assert n.charpoly() == Poly(x**4 - 167*x**3 + 8811*x**2 - 173457*x + 1080540, x) + + n = Matrix(3, 3, [x, 0, 0, a, y, 0, b, c, z]) + assert n.charpoly() == Poly(t**3 - (x+y+z)*t**2 + t*(x*y+y*z+x*z) - x*y*z, t) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_domains.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_domains.py new file mode 100644 index 0000000000000000000000000000000000000000..26a54b8879a5c65f3a01b4886d223c08309e733d --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_domains.py @@ -0,0 +1,113 @@ +# Test Matrix/DomainMatrix interaction. + + +from sympy import GF, ZZ, QQ, EXRAW +from sympy.polys.matrices import DomainMatrix, DM + +from sympy import ( + Matrix, + MutableMatrix, + ImmutableMatrix, + SparseMatrix, + MutableDenseMatrix, + ImmutableDenseMatrix, + MutableSparseMatrix, + ImmutableSparseMatrix, +) +from sympy import symbols, S, sqrt + +from sympy.testing.pytest import raises + + +x, y = symbols('x y') + + +MATRIX_TYPES = ( + Matrix, + MutableMatrix, + ImmutableMatrix, + SparseMatrix, + MutableDenseMatrix, + ImmutableDenseMatrix, + MutableSparseMatrix, + ImmutableSparseMatrix, +) +IMMUTABLE = ( + ImmutableMatrix, + ImmutableDenseMatrix, + ImmutableSparseMatrix, +) + + +def DMs(items, domain): + return DM(items, domain).to_sparse() + + +def test_Matrix_rep_domain(): + + for Mat in MATRIX_TYPES: + + M = Mat([[1, 2], [3, 4]]) + assert M._rep == DMs([[1, 2], [3, 4]], ZZ) + assert (M / 2)._rep == DMs([[(1,2), 1], [(3,2), 2]], QQ) + if not isinstance(M, IMMUTABLE): + M[0, 0] = x + assert M._rep == DMs([[x, 2], [3, 4]], EXRAW) + + M = Mat([[S(1)/2, 2], [3, 4]]) + assert M._rep == DMs([[(1,2), 2], [3, 4]], QQ) + if not isinstance(M, IMMUTABLE): + M[0, 0] = x + assert M._rep == DMs([[x, 2], [3, 4]], EXRAW) + + dM = DMs([[1, 2], [3, 4]], ZZ) + assert Mat._fromrep(dM)._rep == dM + + # XXX: This is not intended. Perhaps it should be coerced to EXRAW? + # The private _fromrep method is never called like this but perhaps it + # should be guarded. + # + # It is not clear how to integrate domains other than ZZ, QQ and EXRAW with + # the rest of Matrix or if the public type for this needs to be something + # different from Matrix somehow. + K = QQ.algebraic_field(sqrt(2)) + dM = DM([[1, 2], [3, 4]], K) + assert Mat._fromrep(dM)._rep.domain == K + + +def test_Matrix_to_DM(): + + M = Matrix([[1, 2], [3, 4]]) + assert M.to_DM() == DMs([[1, 2], [3, 4]], ZZ) + assert M.to_DM() is not M._rep + assert M.to_DM(field=True) == DMs([[1, 2], [3, 4]], QQ) + assert M.to_DM(domain=QQ) == DMs([[1, 2], [3, 4]], QQ) + assert M.to_DM(domain=QQ[x]) == DMs([[1, 2], [3, 4]], QQ[x]) + assert M.to_DM(domain=GF(3)) == DMs([[1, 2], [0, 1]], GF(3)) + + M = Matrix([[1, 2], [3, 4]]) + M[0, 0] = x + assert M._rep.domain == EXRAW + M[0, 0] = 1 + assert M.to_DM() == DMs([[1, 2], [3, 4]], ZZ) + + M = Matrix([[S(1)/2, 2], [3, 4]]) + assert M.to_DM() == DMs([[QQ(1,2), 2], [3, 4]], QQ) + + M = Matrix([[x, 2], [3, 4]]) + assert M.to_DM() == DMs([[x, 2], [3, 4]], ZZ[x]) + assert M.to_DM(field=True) == DMs([[x, 2], [3, 4]], ZZ.frac_field(x)) + + M = Matrix([[1/x, 2], [3, 4]]) + assert M.to_DM() == DMs([[1/x, 2], [3, 4]], ZZ.frac_field(x)) + + M = Matrix([[1, sqrt(2)], [3, 4]]) + K = QQ.algebraic_field(sqrt(2)) + sqrt2 = K.from_sympy(sqrt(2)) # XXX: Maybe K(sqrt(2)) should work + M_K = DomainMatrix([[K(1), sqrt2], [K(3), K(4)]], (2, 2), K) + assert M.to_DM() == DMs([[1, sqrt(2)], [3, 4]], EXRAW) + assert M.to_DM(extension=True) == M_K.to_sparse() + + # Options cannot be used with the domain parameter + M = Matrix([[1, 2], [3, 4]]) + raises(TypeError, lambda: M.to_DM(domain=QQ, field=True)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_eigen.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_eigen.py new file mode 100644 index 0000000000000000000000000000000000000000..fcf96325519879e0683d29e2ddc32db7bf83baa4 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_eigen.py @@ -0,0 +1,712 @@ +from sympy.core.evalf import N +from sympy.core.numbers import (Float, I, Rational) +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import Abs +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.matrices import eye, Matrix +from sympy.core.singleton import S +from sympy.testing.pytest import raises, XFAIL +from sympy.matrices.exceptions import NonSquareMatrixError, MatrixError +from sympy.matrices.expressions.fourier import DFT +from sympy.simplify.simplify import simplify +from sympy.matrices.immutable import ImmutableMatrix +from sympy.testing.pytest import slow +from sympy.testing.matrices import allclose + + +def test_eigen(): + R = Rational + M = Matrix.eye(3) + assert M.eigenvals(multiple=False) == {S.One: 3} + assert M.eigenvals(multiple=True) == [1, 1, 1] + + assert M.eigenvects() == ( + [(1, 3, [Matrix([1, 0, 0]), + Matrix([0, 1, 0]), + Matrix([0, 0, 1])])]) + + assert M.left_eigenvects() == ( + [(1, 3, [Matrix([[1, 0, 0]]), + Matrix([[0, 1, 0]]), + Matrix([[0, 0, 1]])])]) + + M = Matrix([[0, 1, 1], + [1, 0, 0], + [1, 1, 1]]) + + assert M.eigenvals() == {2*S.One: 1, -S.One: 1, S.Zero: 1} + + assert M.eigenvects() == ( + [ + (-1, 1, [Matrix([-1, 1, 0])]), + ( 0, 1, [Matrix([0, -1, 1])]), + ( 2, 1, [Matrix([R(2, 3), R(1, 3), 1])]) + ]) + + assert M.left_eigenvects() == ( + [ + (-1, 1, [Matrix([[-2, 1, 1]])]), + (0, 1, [Matrix([[-1, -1, 1]])]), + (2, 1, [Matrix([[1, 1, 1]])]) + ]) + + a = Symbol('a') + M = Matrix([[a, 0], + [0, 1]]) + + assert M.eigenvals() == {a: 1, S.One: 1} + + M = Matrix([[1, -1], + [1, 3]]) + assert M.eigenvects() == ([(2, 2, [Matrix(2, 1, [-1, 1])])]) + assert M.left_eigenvects() == ([(2, 2, [Matrix([[1, 1]])])]) + + M = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + a = R(15, 2) + b = 3*33**R(1, 2) + c = R(13, 2) + d = (R(33, 8) + 3*b/8) + e = (R(33, 8) - 3*b/8) + + def NS(e, n): + return str(N(e, n)) + r = [ + (a - b/2, 1, [Matrix([(12 + 24/(c - b/2))/((c - b/2)*e) + 3/(c - b/2), + (6 + 12/(c - b/2))/e, 1])]), + ( 0, 1, [Matrix([1, -2, 1])]), + (a + b/2, 1, [Matrix([(12 + 24/(c + b/2))/((c + b/2)*d) + 3/(c + b/2), + (6 + 12/(c + b/2))/d, 1])]), + ] + r1 = [(NS(r[i][0], 2), NS(r[i][1], 2), + [NS(j, 2) for j in r[i][2][0]]) for i in range(len(r))] + r = M.eigenvects() + r2 = [(NS(r[i][0], 2), NS(r[i][1], 2), + [NS(j, 2) for j in r[i][2][0]]) for i in range(len(r))] + assert sorted(r1) == sorted(r2) + + eps = Symbol('eps', real=True) + + M = Matrix([[abs(eps), I*eps ], + [-I*eps, abs(eps) ]]) + + assert M.eigenvects() == ( + [ + ( 0, 1, [Matrix([[-I*eps/abs(eps)], [1]])]), + ( 2*abs(eps), 1, [ Matrix([[I*eps/abs(eps)], [1]]) ] ), + ]) + + assert M.left_eigenvects() == ( + [ + (0, 1, [Matrix([[I*eps/Abs(eps), 1]])]), + (2*Abs(eps), 1, [Matrix([[-I*eps/Abs(eps), 1]])]) + ]) + + M = Matrix(3, 3, [1, 2, 0, 0, 3, 0, 2, -4, 2]) + M._eigenvects = M.eigenvects(simplify=False) + assert max(i.q for i in M._eigenvects[0][2][0]) > 1 + M._eigenvects = M.eigenvects(simplify=True) + assert max(i.q for i in M._eigenvects[0][2][0]) == 1 + + M = Matrix([[Rational(1, 4), 1], [1, 1]]) + assert M.eigenvects() == [ + (Rational(5, 8) - sqrt(73)/8, 1, [Matrix([[-sqrt(73)/8 - Rational(3, 8)], [1]])]), + (Rational(5, 8) + sqrt(73)/8, 1, [Matrix([[Rational(-3, 8) + sqrt(73)/8], [1]])])] + + # issue 10719 + assert Matrix([]).eigenvals() == {} + assert Matrix([]).eigenvals(multiple=True) == [] + assert Matrix([]).eigenvects() == [] + + # issue 15119 + raises(NonSquareMatrixError, + lambda: Matrix([[1, 2], [0, 4], [0, 0]]).eigenvals()) + raises(NonSquareMatrixError, + lambda: Matrix([[1, 0], [3, 4], [5, 6]]).eigenvals()) + raises(NonSquareMatrixError, + lambda: Matrix([[1, 2, 3], [0, 5, 6]]).eigenvals()) + raises(NonSquareMatrixError, + lambda: Matrix([[1, 0, 0], [4, 5, 0]]).eigenvals()) + raises(NonSquareMatrixError, + lambda: Matrix([[1, 2, 3], [0, 5, 6]]).eigenvals( + error_when_incomplete = False)) + raises(NonSquareMatrixError, + lambda: Matrix([[1, 0, 0], [4, 5, 0]]).eigenvals( + error_when_incomplete = False)) + + m = Matrix([[1, 2], [3, 4]]) + assert isinstance(m.eigenvals(simplify=True, multiple=False), dict) + assert isinstance(m.eigenvals(simplify=True, multiple=True), list) + assert isinstance(m.eigenvals(simplify=lambda x: x, multiple=False), dict) + assert isinstance(m.eigenvals(simplify=lambda x: x, multiple=True), list) + + +def test_float_eigenvals(): + m = Matrix([[1, .6, .6], [.6, .9, .9], [.9, .6, .6]]) + evals = [ + Rational(5, 4) - sqrt(385)/20, + sqrt(385)/20 + Rational(5, 4), + S.Zero] + + n_evals = m.eigenvals(rational=True, multiple=True) + n_evals = sorted(n_evals) + s_evals = [x.evalf() for x in evals] + s_evals = sorted(s_evals) + + for x, y in zip(n_evals, s_evals): + assert abs(x-y) < 10**-9 + + +@XFAIL +def test_eigen_vects(): + m = Matrix(2, 2, [1, 0, 0, I]) + raises(NotImplementedError, lambda: m.is_diagonalizable(True)) + # !!! bug because of eigenvects() or roots(x**2 + (-1 - I)*x + I, x) + # see issue 5292 + assert not m.is_diagonalizable(True) + raises(MatrixError, lambda: m.diagonalize(True)) + (P, D) = m.diagonalize(True) + +def test_issue_8240(): + # Eigenvalues of large triangular matrices + x, y = symbols('x y') + n = 200 + + diagonal_variables = [Symbol('x%s' % i) for i in range(n)] + M = [[0 for i in range(n)] for j in range(n)] + for i in range(n): + M[i][i] = diagonal_variables[i] + M = Matrix(M) + + eigenvals = M.eigenvals() + assert len(eigenvals) == n + for i in range(n): + assert eigenvals[diagonal_variables[i]] == 1 + + eigenvals = M.eigenvals(multiple=True) + assert set(eigenvals) == set(diagonal_variables) + + # with multiplicity + M = Matrix([[x, 0, 0], [1, y, 0], [2, 3, x]]) + eigenvals = M.eigenvals() + assert eigenvals == {x: 2, y: 1} + + eigenvals = M.eigenvals(multiple=True) + assert len(eigenvals) == 3 + assert eigenvals.count(x) == 2 + assert eigenvals.count(y) == 1 + + +def test_eigenvals(): + M = Matrix([[0, 1, 1], + [1, 0, 0], + [1, 1, 1]]) + assert M.eigenvals() == {2*S.One: 1, -S.One: 1, S.Zero: 1} + + m = Matrix([ + [3, 0, 0, 0, -3], + [0, -3, -3, 0, 3], + [0, 3, 0, 3, 0], + [0, 0, 3, 0, 3], + [3, 0, 0, 3, 0]]) + + # XXX Used dry-run test because arbitrary symbol that appears in + # CRootOf may not be unique. + assert m.eigenvals() + + +def test_eigenvects(): + M = Matrix([[0, 1, 1], + [1, 0, 0], + [1, 1, 1]]) + vecs = M.eigenvects() + for val, mult, vec_list in vecs: + assert len(vec_list) == 1 + assert M*vec_list[0] == val*vec_list[0] + + +def test_left_eigenvects(): + M = Matrix([[0, 1, 1], + [1, 0, 0], + [1, 1, 1]]) + vecs = M.left_eigenvects() + for val, mult, vec_list in vecs: + assert len(vec_list) == 1 + assert vec_list[0]*M == val*vec_list[0] + + +@slow +def test_bidiagonalize(): + M = Matrix([[1, 0, 0], + [0, 1, 0], + [0, 0, 1]]) + assert M.bidiagonalize() == M + assert M.bidiagonalize(upper=False) == M + assert M.bidiagonalize() == M + assert M.bidiagonal_decomposition() == (M, M, M) + assert M.bidiagonal_decomposition(upper=False) == (M, M, M) + assert M.bidiagonalize() == M + + import random + #Real Tests + for real_test in range(2): + test_values = [] + row = 2 + col = 2 + for _ in range(row * col): + value = random.randint(-1000000000, 1000000000) + test_values = test_values + [value] + # L -> Lower Bidiagonalization + # M -> Mutable Matrix + # N -> Immutable Matrix + # 0 -> Bidiagonalized form + # 1,2,3 -> Bidiagonal_decomposition matrices + # 4 -> Product of 1 2 3 + M = Matrix(row, col, test_values) + N = ImmutableMatrix(M) + + N1, N2, N3 = N.bidiagonal_decomposition() + M1, M2, M3 = M.bidiagonal_decomposition() + M0 = M.bidiagonalize() + N0 = N.bidiagonalize() + + N4 = N1 * N2 * N3 + M4 = M1 * M2 * M3 + + N2.simplify() + N4.simplify() + N0.simplify() + + M0.simplify() + M2.simplify() + M4.simplify() + + LM0 = M.bidiagonalize(upper=False) + LM1, LM2, LM3 = M.bidiagonal_decomposition(upper=False) + LN0 = N.bidiagonalize(upper=False) + LN1, LN2, LN3 = N.bidiagonal_decomposition(upper=False) + + LN4 = LN1 * LN2 * LN3 + LM4 = LM1 * LM2 * LM3 + + LN2.simplify() + LN4.simplify() + LN0.simplify() + + LM0.simplify() + LM2.simplify() + LM4.simplify() + + assert M == M4 + assert M2 == M0 + assert N == N4 + assert N2 == N0 + assert M == LM4 + assert LM2 == LM0 + assert N == LN4 + assert LN2 == LN0 + + #Complex Tests + for complex_test in range(2): + test_values = [] + size = 2 + for _ in range(size * size): + real = random.randint(-1000000000, 1000000000) + comp = random.randint(-1000000000, 1000000000) + value = real + comp * I + test_values = test_values + [value] + M = Matrix(size, size, test_values) + N = ImmutableMatrix(M) + # L -> Lower Bidiagonalization + # M -> Mutable Matrix + # N -> Immutable Matrix + # 0 -> Bidiagonalized form + # 1,2,3 -> Bidiagonal_decomposition matrices + # 4 -> Product of 1 2 3 + N1, N2, N3 = N.bidiagonal_decomposition() + M1, M2, M3 = M.bidiagonal_decomposition() + M0 = M.bidiagonalize() + N0 = N.bidiagonalize() + + N4 = N1 * N2 * N3 + M4 = M1 * M2 * M3 + + N2.simplify() + N4.simplify() + N0.simplify() + + M0.simplify() + M2.simplify() + M4.simplify() + + LM0 = M.bidiagonalize(upper=False) + LM1, LM2, LM3 = M.bidiagonal_decomposition(upper=False) + LN0 = N.bidiagonalize(upper=False) + LN1, LN2, LN3 = N.bidiagonal_decomposition(upper=False) + + LN4 = LN1 * LN2 * LN3 + LM4 = LM1 * LM2 * LM3 + + LN2.simplify() + LN4.simplify() + LN0.simplify() + + LM0.simplify() + LM2.simplify() + LM4.simplify() + + assert M == M4 + assert M2 == M0 + assert N == N4 + assert N2 == N0 + assert M == LM4 + assert LM2 == LM0 + assert N == LN4 + assert LN2 == LN0 + + M = Matrix(18, 8, range(1, 145)) + M = M.applyfunc(lambda i: Float(i)) + assert M.bidiagonal_decomposition()[1] == M.bidiagonalize() + assert M.bidiagonal_decomposition(upper=False)[1] == M.bidiagonalize(upper=False) + a, b, c = M.bidiagonal_decomposition() + diff = a * b * c - M + assert abs(max(diff)) < 10**-12 + + +def test_diagonalize(): + m = Matrix(2, 2, [0, -1, 1, 0]) + raises(MatrixError, lambda: m.diagonalize(reals_only=True)) + P, D = m.diagonalize() + assert D.is_diagonal() + assert D == Matrix([ + [-I, 0], + [ 0, I]]) + + # make sure we use floats out if floats are passed in + m = Matrix(2, 2, [0, .5, .5, 0]) + P, D = m.diagonalize() + assert all(isinstance(e, Float) for e in D.values()) + assert all(isinstance(e, Float) for e in P.values()) + + _, D2 = m.diagonalize(reals_only=True) + assert D == D2 + + m = Matrix( + [[0, 1, 0, 0], [1, 0, 0, 0.002], [0.002, 0, 0, 1], [0, 0, 1, 0]]) + P, D = m.diagonalize() + assert allclose(P*D, m*P) + + +def test_is_diagonalizable(): + a, b, c = symbols('a b c') + m = Matrix(2, 2, [a, c, c, b]) + assert m.is_symmetric() + assert m.is_diagonalizable() + assert not Matrix(2, 2, [1, 1, 0, 1]).is_diagonalizable() + + m = Matrix(2, 2, [0, -1, 1, 0]) + assert m.is_diagonalizable() + assert not m.is_diagonalizable(reals_only=True) + + +def test_jordan_form(): + m = Matrix(3, 2, [-3, 1, -3, 20, 3, 10]) + raises(NonSquareMatrixError, lambda: m.jordan_form()) + + # the next two tests test the cases where the old + # algorithm failed due to the fact that the block structure can + # *NOT* be determined from algebraic and geometric multiplicity alone + # This can be seen most easily when one lets compute the J.c.f. of a matrix that + # is in J.c.f already. + m = Matrix(4, 4, [2, 1, 0, 0, + 0, 2, 1, 0, + 0, 0, 2, 0, + 0, 0, 0, 2 + ]) + P, J = m.jordan_form() + assert m == J + + m = Matrix(4, 4, [2, 1, 0, 0, + 0, 2, 0, 0, + 0, 0, 2, 1, + 0, 0, 0, 2 + ]) + P, J = m.jordan_form() + assert m == J + + A = Matrix([[ 2, 4, 1, 0], + [-4, 2, 0, 1], + [ 0, 0, 2, 4], + [ 0, 0, -4, 2]]) + P, J = A.jordan_form() + assert simplify(P*J*P.inv()) == A + + assert Matrix(1, 1, [1]).jordan_form() == (Matrix([1]), Matrix([1])) + assert Matrix(1, 1, [1]).jordan_form(calc_transform=False) == Matrix([1]) + + # If we have eigenvalues in CRootOf form, raise errors + m = Matrix([[3, 0, 0, 0, -3], [0, -3, -3, 0, 3], [0, 3, 0, 3, 0], [0, 0, 3, 0, 3], [3, 0, 0, 3, 0]]) + raises(MatrixError, lambda: m.jordan_form()) + + # make sure that if the input has floats, the output does too + m = Matrix([ + [ 0.6875, 0.125 + 0.1875*sqrt(3)], + [0.125 + 0.1875*sqrt(3), 0.3125]]) + P, J = m.jordan_form() + assert all(isinstance(x, Float) or x == 0 for x in P) + assert all(isinstance(x, Float) or x == 0 for x in J) + + +def test_singular_values(): + x = Symbol('x', real=True) + + A = Matrix([[0, 1*I], [2, 0]]) + # if singular values can be sorted, they should be in decreasing order + assert A.singular_values() == [2, 1] + + A = eye(3) + A[1, 1] = x + A[2, 2] = 5 + vals = A.singular_values() + # since Abs(x) cannot be sorted, test set equality + assert set(vals) == {5, 1, Abs(x)} + + A = Matrix([[sin(x), cos(x)], [-cos(x), sin(x)]]) + vals = [sv.trigsimp() for sv in A.singular_values()] + assert vals == [S.One, S.One] + + A = Matrix([ + [2, 4], + [1, 3], + [0, 0], + [0, 0] + ]) + assert A.singular_values() == \ + [sqrt(sqrt(221) + 15), sqrt(15 - sqrt(221))] + assert A.T.singular_values() == \ + [sqrt(sqrt(221) + 15), sqrt(15 - sqrt(221)), 0, 0] + +def test___eq__(): + assert (Matrix( + [[0, 1, 1], + [1, 0, 0], + [1, 1, 1]]) == {}) is False + + +def test_definite(): + # Examples from Gilbert Strang, "Introduction to Linear Algebra" + # Positive definite matrices + m = Matrix([[2, -1, 0], [-1, 2, -1], [0, -1, 2]]) + assert m.is_positive_definite == True + assert m.is_positive_semidefinite == True + assert m.is_negative_definite == False + assert m.is_negative_semidefinite == False + assert m.is_indefinite == False + + m = Matrix([[5, 4], [4, 5]]) + assert m.is_positive_definite == True + assert m.is_positive_semidefinite == True + assert m.is_negative_definite == False + assert m.is_negative_semidefinite == False + assert m.is_indefinite == False + + # Positive semidefinite matrices + m = Matrix([[2, -1, -1], [-1, 2, -1], [-1, -1, 2]]) + assert m.is_positive_definite == False + assert m.is_positive_semidefinite == True + assert m.is_negative_definite == False + assert m.is_negative_semidefinite == False + assert m.is_indefinite == False + + m = Matrix([[1, 2], [2, 4]]) + assert m.is_positive_definite == False + assert m.is_positive_semidefinite == True + assert m.is_negative_definite == False + assert m.is_negative_semidefinite == False + assert m.is_indefinite == False + + # Examples from Mathematica documentation + # Non-hermitian positive definite matrices + m = Matrix([[2, 3], [4, 8]]) + assert m.is_positive_definite == True + assert m.is_positive_semidefinite == True + assert m.is_negative_definite == False + assert m.is_negative_semidefinite == False + assert m.is_indefinite == False + + # Hermetian matrices + m = Matrix([[1, 2*I], [-I, 4]]) + assert m.is_positive_definite == True + assert m.is_positive_semidefinite == True + assert m.is_negative_definite == False + assert m.is_negative_semidefinite == False + assert m.is_indefinite == False + + # Symbolic matrices examples + a = Symbol('a', positive=True) + b = Symbol('b', negative=True) + m = Matrix([[a, 0, 0], [0, a, 0], [0, 0, a]]) + assert m.is_positive_definite == True + assert m.is_positive_semidefinite == True + assert m.is_negative_definite == False + assert m.is_negative_semidefinite == False + assert m.is_indefinite == False + + m = Matrix([[b, 0, 0], [0, b, 0], [0, 0, b]]) + assert m.is_positive_definite == False + assert m.is_positive_semidefinite == False + assert m.is_negative_definite == True + assert m.is_negative_semidefinite == True + assert m.is_indefinite == False + + m = Matrix([[a, 0], [0, b]]) + assert m.is_positive_definite == False + assert m.is_positive_semidefinite == False + assert m.is_negative_definite == False + assert m.is_negative_semidefinite == False + assert m.is_indefinite == True + + m = Matrix([ + [0.0228202735623867, 0.00518748979085398, + -0.0743036351048907, -0.00709135324903921], + [0.00518748979085398, 0.0349045359786350, + 0.0830317991056637, 0.00233147902806909], + [-0.0743036351048907, 0.0830317991056637, + 1.15859676366277, 0.340359081555988], + [-0.00709135324903921, 0.00233147902806909, + 0.340359081555988, 0.928147644848199] + ]) + assert m.is_positive_definite == True + assert m.is_positive_semidefinite == True + assert m.is_indefinite == False + + # test for issue 19547: https://github.com/sympy/sympy/issues/19547 + m = Matrix([ + [0, 0, 0], + [0, 1, 2], + [0, 2, 1] + ]) + assert not m.is_positive_definite + assert not m.is_positive_semidefinite + + +def test_positive_semidefinite_cholesky(): + from sympy.matrices.eigen import _is_positive_semidefinite_cholesky + + m = Matrix([[0, 0, 0], [0, 0, 0], [0, 0, 0]]) + assert _is_positive_semidefinite_cholesky(m) == True + m = Matrix([[0, 0, 0], [0, 5, -10*I], [0, 10*I, 5]]) + assert _is_positive_semidefinite_cholesky(m) == False + m = Matrix([[1, 0, 0], [0, 0, 0], [0, 0, -1]]) + assert _is_positive_semidefinite_cholesky(m) == False + m = Matrix([[0, 1], [1, 0]]) + assert _is_positive_semidefinite_cholesky(m) == False + + # https://www.value-at-risk.net/cholesky-factorization/ + m = Matrix([[4, -2, -6], [-2, 10, 9], [-6, 9, 14]]) + assert _is_positive_semidefinite_cholesky(m) == True + m = Matrix([[9, -3, 3], [-3, 2, 1], [3, 1, 6]]) + assert _is_positive_semidefinite_cholesky(m) == True + m = Matrix([[4, -2, 2], [-2, 1, -1], [2, -1, 5]]) + assert _is_positive_semidefinite_cholesky(m) == True + m = Matrix([[1, 2, -1], [2, 5, 1], [-1, 1, 9]]) + assert _is_positive_semidefinite_cholesky(m) == False + + +def test_issue_20582(): + A = Matrix([ + [5, -5, -3, 2, -7], + [-2, -5, 0, 2, 1], + [-2, -7, -5, -2, -6], + [7, 10, 3, 9, -2], + [4, -10, 3, -8, -4] + ]) + # XXX Used dry-run test because arbitrary symbol that appears in + # CRootOf may not be unique. + assert A.eigenvects() + +def test_issue_19210(): + t = Symbol('t') + H = Matrix([[3, 0, 0, 0], [0, 1 , 2, 0], [0, 2, 2, 0], [0, 0, 0, 4]]) + A = (-I * H * t).jordan_form() + assert A == (Matrix([ + [0, 1, 0, 0], + [0, 0, -4/(-1 + sqrt(17)), 4/(1 + sqrt(17))], + [0, 0, 1, 1], + [1, 0, 0, 0]]), Matrix([ + [-4*I*t, 0, 0, 0], + [ 0, -3*I*t, 0, 0], + [ 0, 0, t*(-3*I/2 + sqrt(17)*I/2), 0], + [ 0, 0, 0, t*(-sqrt(17)*I/2 - 3*I/2)]])) + + +def test_issue_20275(): + # XXX We use complex expansions because complex exponentials are not + # recognized by polys.domains + A = DFT(3).as_explicit().expand(complex=True) + eigenvects = A.eigenvects() + assert eigenvects[0] == ( + -1, 1, + [Matrix([[1 - sqrt(3)], [1], [1]])] + ) + assert eigenvects[1] == ( + 1, 1, + [Matrix([[1 + sqrt(3)], [1], [1]])] + ) + assert eigenvects[2] == ( + -I, 1, + [Matrix([[0], [-1], [1]])] + ) + + A = DFT(4).as_explicit().expand(complex=True) + eigenvects = A.eigenvects() + assert eigenvects[0] == ( + -1, 1, + [Matrix([[-1], [1], [1], [1]])] + ) + assert eigenvects[1] == ( + 1, 2, + [Matrix([[1], [0], [1], [0]]), Matrix([[2], [1], [0], [1]])] + ) + assert eigenvects[2] == ( + -I, 1, + [Matrix([[0], [-1], [0], [1]])] + ) + + # XXX We skip test for some parts of eigenvectors which are very + # complicated and fragile under expression tree changes + A = DFT(5).as_explicit().expand(complex=True) + eigenvects = A.eigenvects() + assert eigenvects[0] == ( + -1, 1, + [Matrix([[1 - sqrt(5)], [1], [1], [1], [1]])] + ) + assert eigenvects[1] == ( + 1, 2, + [Matrix([[S(1)/2 + sqrt(5)/2], [0], [1], [1], [0]]), + Matrix([[S(1)/2 + sqrt(5)/2], [1], [0], [0], [1]])] + ) + + +def test_issue_20752(): + b = symbols('b', nonzero=True) + m = Matrix([[0, 0, 0], [0, b, 0], [0, 0, b]]) + assert m.is_positive_semidefinite is None + + +def test_issue_25282(): + dd = sd = [0] * 11 + [1] + ds = [2, 0, 1, 0, 0, 0, 1, 0, 1, 0, 1, 0] + ss = ds.copy() + ss[8] = 2 + + def rotate(x, i): + return x[i:] + x[:i] + + mat = [] + for i in range(12): + mat.append(rotate(ss, i) + rotate(sd, i)) + for i in range(12): + mat.append(rotate(ds, i) + rotate(dd, i)) + + assert sum(Matrix(mat).eigenvals().values()) == 24 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_graph.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_graph.py new file mode 100644 index 0000000000000000000000000000000000000000..0bf3c819a9477387f53560a034d7949fd76a654f --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_graph.py @@ -0,0 +1,108 @@ +from sympy.combinatorics import Permutation +from sympy.core.symbol import symbols +from sympy.matrices import Matrix +from sympy.matrices.expressions import ( + PermutationMatrix, BlockDiagMatrix, BlockMatrix) + + +def test_connected_components(): + a, b, c, d, e, f, g, h, i, j, k, l, m = symbols('a:m') + + M = Matrix([ + [a, 0, 0, 0, b, 0, 0, 0, 0, 0, c, 0, 0], + [0, d, 0, 0, 0, e, 0, 0, 0, 0, 0, f, 0], + [0, 0, g, 0, 0, 0, h, 0, 0, 0, 0, 0, i], + [0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [m, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0], + [0, m, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0], + [0, 0, m, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0], + [j, 0, 0, 0, k, 0, 0, 1, 0, 0, l, 0, 0], + [0, j, 0, 0, 0, k, 0, 0, 1, 0, 0, l, 0], + [0, 0, j, 0, 0, 0, k, 0, 0, 1, 0, 0, l], + [0, 0, 0, 0, d, 0, 0, 0, 0, 0, 1, 0, 0], + [0, 0, 0, 0, 0, d, 0, 0, 0, 0, 0, 1, 0], + [0, 0, 0, 0, 0, 0, d, 0, 0, 0, 0, 0, 1]]) + cc = M.connected_components() + assert cc == [[0, 4, 7, 10], [1, 5, 8, 11], [2, 6, 9, 12], [3]] + + P, B = M.connected_components_decomposition() + p = Permutation([0, 4, 7, 10, 1, 5, 8, 11, 2, 6, 9, 12, 3]) + assert P == PermutationMatrix(p) + + B0 = Matrix([ + [a, b, 0, c], + [m, 1, 0, 0], + [j, k, 1, l], + [0, d, 0, 1]]) + B1 = Matrix([ + [d, e, 0, f], + [m, 1, 0, 0], + [j, k, 1, l], + [0, d, 0, 1]]) + B2 = Matrix([ + [g, h, 0, i], + [m, 1, 0, 0], + [j, k, 1, l], + [0, d, 0, 1]]) + B3 = Matrix([[1]]) + assert B == BlockDiagMatrix(B0, B1, B2, B3) + + +def test_strongly_connected_components(): + M = Matrix([ + [11, 14, 10, 0, 15, 0], + [0, 44, 0, 0, 45, 0], + [1, 4, 0, 0, 5, 0], + [0, 0, 0, 22, 0, 23], + [0, 54, 0, 0, 55, 0], + [0, 0, 0, 32, 0, 33]]) + scc = M.strongly_connected_components() + assert scc == [[1, 4], [0, 2], [3, 5]] + + P, B = M.strongly_connected_components_decomposition() + p = Permutation([1, 4, 0, 2, 3, 5]) + assert P == PermutationMatrix(p) + assert B == BlockMatrix([ + [ + Matrix([[44, 45], [54, 55]]), + Matrix.zeros(2, 2), + Matrix.zeros(2, 2) + ], + [ + Matrix([[14, 15], [4, 5]]), + Matrix([[11, 10], [1, 0]]), + Matrix.zeros(2, 2) + ], + [ + Matrix.zeros(2, 2), + Matrix.zeros(2, 2), + Matrix([[22, 23], [32, 33]]) + ] + ]) + P = P.as_explicit() + B = B.as_explicit() + assert P.T * B * P == M + + P, B = M.strongly_connected_components_decomposition(lower=False) + p = Permutation([3, 5, 0, 2, 1, 4]) + assert P == PermutationMatrix(p) + assert B == BlockMatrix([ + [ + Matrix([[22, 23], [32, 33]]), + Matrix.zeros(2, 2), + Matrix.zeros(2, 2) + ], + [ + Matrix.zeros(2, 2), + Matrix([[11, 10], [1, 0]]), + Matrix([[14, 15], [4, 5]]) + ], + [ + Matrix.zeros(2, 2), + Matrix.zeros(2, 2), + Matrix([[44, 45], [54, 55]]) + ] + ]) + P = P.as_explicit() + B = B.as_explicit() + assert P.T * B * P == M diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_immutable.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_immutable.py new file mode 100644 index 0000000000000000000000000000000000000000..2b83c1f9fae7f83be9d5f7dd4b484781dc128faf --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_immutable.py @@ -0,0 +1,136 @@ +from itertools import product + +from sympy.core.relational import (Equality, Unequality) +from sympy.core.singleton import S +from sympy.core.sympify import sympify +from sympy.integrals.integrals import integrate +from sympy.matrices.dense import (Matrix, eye, zeros) +from sympy.matrices.immutable import ImmutableMatrix +from sympy.matrices import SparseMatrix +from sympy.matrices.immutable import \ + ImmutableDenseMatrix, ImmutableSparseMatrix +from sympy.abc import x, y +from sympy.testing.pytest import raises + +IM = ImmutableDenseMatrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) +ISM = ImmutableSparseMatrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) +ieye = ImmutableDenseMatrix(eye(3)) + + +def test_creation(): + assert IM.shape == ISM.shape == (3, 3) + assert IM[1, 2] == ISM[1, 2] == 6 + assert IM[2, 2] == ISM[2, 2] == 9 + + +def test_immutability(): + with raises(TypeError): + IM[2, 2] = 5 + with raises(TypeError): + ISM[2, 2] = 5 + + +def test_slicing(): + assert IM[1, :] == ImmutableDenseMatrix([[4, 5, 6]]) + assert IM[:2, :2] == ImmutableDenseMatrix([[1, 2], [4, 5]]) + assert ISM[1, :] == ImmutableSparseMatrix([[4, 5, 6]]) + assert ISM[:2, :2] == ImmutableSparseMatrix([[1, 2], [4, 5]]) + + +def test_subs(): + A = ImmutableMatrix([[1, 2], [3, 4]]) + B = ImmutableMatrix([[1, 2], [x, 4]]) + C = ImmutableMatrix([[-x, x*y], [-(x + y), y**2]]) + assert B.subs(x, 3) == A + assert (x*B).subs(x, 3) == 3*A + assert (x*eye(2) + B).subs(x, 3) == 3*eye(2) + A + assert C.subs([[x, -1], [y, -2]]) == A + assert C.subs([(x, -1), (y, -2)]) == A + assert C.subs({x: -1, y: -2}) == A + assert C.subs({x: y - 1, y: x - 1}, simultaneous=True) == \ + ImmutableMatrix([[1 - y, (x - 1)*(y - 1)], [2 - x - y, (x - 1)**2]]) + + +def test_as_immutable(): + data = [[1, 2], [3, 4]] + X = Matrix(data) + assert sympify(X) == X.as_immutable() == ImmutableMatrix(data) + + data = {(0, 0): 1, (0, 1): 2, (1, 0): 3, (1, 1): 4} + X = SparseMatrix(2, 2, data) + assert sympify(X) == X.as_immutable() == ImmutableSparseMatrix(2, 2, data) + + +def test_function_return_types(): + # Lets ensure that decompositions of immutable matrices remain immutable + # I.e. do MatrixBase methods return the correct class? + X = ImmutableMatrix([[1, 2], [3, 4]]) + Y = ImmutableMatrix([[1], [0]]) + q, r = X.QRdecomposition() + assert (type(q), type(r)) == (ImmutableMatrix, ImmutableMatrix) + + assert type(X.LUsolve(Y)) == ImmutableMatrix + assert type(X.QRsolve(Y)) == ImmutableMatrix + + X = ImmutableMatrix([[5, 2], [2, 7]]) + assert X.T == X + assert X.is_symmetric + assert type(X.cholesky()) == ImmutableMatrix + L, D = X.LDLdecomposition() + assert (type(L), type(D)) == (ImmutableMatrix, ImmutableMatrix) + + X = ImmutableMatrix([[1, 2], [2, 1]]) + assert X.is_diagonalizable() + assert X.det() == -3 + assert X.norm(2) == 3 + + assert type(X.eigenvects()[0][2][0]) == ImmutableMatrix + + assert type(zeros(3, 3).as_immutable().nullspace()[0]) == ImmutableMatrix + + X = ImmutableMatrix([[1, 0], [2, 1]]) + assert type(X.lower_triangular_solve(Y)) == ImmutableMatrix + assert type(X.T.upper_triangular_solve(Y)) == ImmutableMatrix + + assert type(X.minor_submatrix(0, 0)) == ImmutableMatrix + +# issue 6279 +# https://github.com/sympy/sympy/issues/6279 +# Test that Immutable _op_ Immutable => Immutable and not MatExpr + + +def test_immutable_evaluation(): + X = ImmutableMatrix(eye(3)) + A = ImmutableMatrix(3, 3, range(9)) + assert isinstance(X + A, ImmutableMatrix) + assert isinstance(X * A, ImmutableMatrix) + assert isinstance(X * 2, ImmutableMatrix) + assert isinstance(2 * X, ImmutableMatrix) + assert isinstance(A**2, ImmutableMatrix) + + +def test_deterimant(): + assert ImmutableMatrix(4, 4, lambda i, j: i + j).det() == 0 + + +def test_Equality(): + assert Equality(IM, IM) is S.true + assert Unequality(IM, IM) is S.false + assert Equality(IM, IM.subs(1, 2)) is S.false + assert Unequality(IM, IM.subs(1, 2)) is S.true + assert Equality(IM, 2) is S.false + assert Unequality(IM, 2) is S.true + M = ImmutableMatrix([x, y]) + assert Equality(M, IM) is S.false + assert Unequality(M, IM) is S.true + assert Equality(M, M.subs(x, 2)).subs(x, 2) is S.true + assert Unequality(M, M.subs(x, 2)).subs(x, 2) is S.false + assert Equality(M, M.subs(x, 2)).subs(x, 3) is S.false + assert Unequality(M, M.subs(x, 2)).subs(x, 3) is S.true + + +def test_integrate(): + intIM = integrate(IM, x) + assert intIM.shape == IM.shape + assert all(intIM[i, j] == (1 + j + 3*i)*x for i, j in + product(range(3), range(3))) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_interactions.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_interactions.py new file mode 100644 index 0000000000000000000000000000000000000000..f4fc3268368e8dd632fc0df187d57ea5e845120c --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_interactions.py @@ -0,0 +1,77 @@ +""" +We have a few different kind of Matrices +Matrix, ImmutableMatrix, MatrixExpr + +Here we test the extent to which they cooperate +""" + +from sympy.core.symbol import symbols +from sympy.matrices import (Matrix, MatrixSymbol, eye, Identity, + ImmutableMatrix) +from sympy.matrices.expressions import MatrixExpr, MatAdd +from sympy.matrices.matrixbase import classof +from sympy.testing.pytest import raises + +SM = MatrixSymbol('X', 3, 3) +SV = MatrixSymbol('v', 3, 1) +MM = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) +IM = ImmutableMatrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) +meye = eye(3) +imeye = ImmutableMatrix(eye(3)) +ideye = Identity(3) +a, b, c = symbols('a,b,c') + + +def test_IM_MM(): + assert isinstance(MM + IM, ImmutableMatrix) + assert isinstance(IM + MM, ImmutableMatrix) + assert isinstance(2*IM + MM, ImmutableMatrix) + assert MM.equals(IM) + + +def test_ME_MM(): + assert isinstance(Identity(3) + MM, MatrixExpr) + assert isinstance(SM + MM, MatAdd) + assert isinstance(MM + SM, MatAdd) + assert (Identity(3) + MM)[1, 1] == 6 + + +def test_equality(): + a, b, c = Identity(3), eye(3), ImmutableMatrix(eye(3)) + for x in [a, b, c]: + for y in [a, b, c]: + assert x.equals(y) + + +def test_matrix_symbol_MM(): + X = MatrixSymbol('X', 3, 3) + Y = eye(3) + X + assert Y[1, 1] == 1 + X[1, 1] + + +def test_matrix_symbol_vector_matrix_multiplication(): + A = MM * SV + B = IM * SV + assert A == B + C = (SV.T * MM.T).T + assert B == C + D = (SV.T * IM.T).T + assert C == D + + +def test_indexing_interactions(): + assert (a * IM)[1, 1] == 5*a + assert (SM + IM)[1, 1] == SM[1, 1] + IM[1, 1] + assert (SM * IM)[1, 1] == SM[1, 0]*IM[0, 1] + SM[1, 1]*IM[1, 1] + \ + SM[1, 2]*IM[2, 1] + + +def test_classof(): + A = Matrix(3, 3, range(9)) + B = ImmutableMatrix(3, 3, range(9)) + C = MatrixSymbol('C', 3, 3) + assert classof(A, A) == Matrix + assert classof(B, B) == ImmutableMatrix + assert classof(A, B) == ImmutableMatrix + assert classof(B, A) == ImmutableMatrix + raises(TypeError, lambda: classof(A, C)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_matrices.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_matrices.py new file mode 100644 index 0000000000000000000000000000000000000000..d9d97341de570e078d652dddce58fb8f5cb99e43 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_matrices.py @@ -0,0 +1,3487 @@ +# +# Code for testing deprecated matrix classes. New test code should not be added +# here. Instead, add it to test_matrixbase.py. +# +# This entire test module and the corresponding sympy/matrices/matrices.py +# module will be removed in a future release. +# +import random +import concurrent.futures +from collections.abc import Hashable + +from sympy.core.add import Add +from sympy.core.function import Function, diff, expand +from sympy.core.numbers import (E, Float, I, Integer, Rational, nan, oo, pi) +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.core.sympify import sympify +from sympy.functions.elementary.complexes import Abs +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.miscellaneous import (Max, Min, sqrt) +from sympy.functions.elementary.trigonometric import (cos, sin, tan) +from sympy.integrals.integrals import integrate +from sympy.matrices.expressions.transpose import transpose +from sympy.physics.quantum.operator import HermitianOperator, Operator, Dagger +from sympy.polys.polytools import (Poly, PurePoly) +from sympy.polys.rootoftools import RootOf +from sympy.printing.str import sstr +from sympy.sets.sets import FiniteSet +from sympy.simplify.simplify import (signsimp, simplify) +from sympy.simplify.trigsimp import trigsimp +from sympy.matrices.exceptions import (ShapeError, MatrixError, + NonSquareMatrixError) +from sympy.matrices.matrixbase import DeferredVector +from sympy.matrices.determinant import _find_reasonable_pivot_naive +from sympy.matrices.utilities import _simplify +from sympy.matrices import ( + GramSchmidt, ImmutableMatrix, ImmutableSparseMatrix, Matrix, + SparseMatrix, casoratian, diag, eye, hessian, + matrix_multiply_elementwise, ones, randMatrix, rot_axis1, rot_axis2, + rot_axis3, wronskian, zeros, MutableDenseMatrix, ImmutableDenseMatrix, + MatrixSymbol, dotprodsimp, rot_ccw_axis1, rot_ccw_axis2, rot_ccw_axis3) +from sympy.matrices.utilities import _dotprodsimp_state +from sympy.core import Tuple, Wild +from sympy.functions.special.tensor_functions import KroneckerDelta +from sympy.utilities.iterables import flatten, capture, iterable +from sympy.utilities.exceptions import ignore_warnings +from sympy.testing.pytest import (raises, XFAIL, slow, skip, skip_under_pyodide, + warns_deprecated_sympy) +from sympy.assumptions import Q +from sympy.tensor.array import Array +from sympy.tensor.array.array_derivatives import ArrayDerivative +from sympy.matrices.expressions import MatPow +from sympy.algebras import Quaternion + +from sympy import O + +from sympy.abc import a, b, c, d, x, y, z, t + + +# don't re-order this list +classes = (Matrix, SparseMatrix, ImmutableMatrix, ImmutableSparseMatrix) + + +# Test the deprecated matrixmixins +from sympy.matrices.common import _MinimalMatrix, _CastableMatrix +from sympy.matrices.matrices import MatrixSubspaces, MatrixReductions + + +with warns_deprecated_sympy(): + class SubspaceOnlyMatrix(_MinimalMatrix, _CastableMatrix, MatrixSubspaces): + pass + + +with warns_deprecated_sympy(): + class ReductionsOnlyMatrix(_MinimalMatrix, _CastableMatrix, MatrixReductions): + pass + + +def eye_Reductions(n): + return ReductionsOnlyMatrix(n, n, lambda i, j: int(i == j)) + + +def zeros_Reductions(n): + return ReductionsOnlyMatrix(n, n, lambda i, j: 0) + + +def test_args(): + for n, cls in enumerate(classes): + m = cls.zeros(3, 2) + # all should give back the same type of arguments, e.g. ints for shape + assert m.shape == (3, 2) and all(type(i) is int for i in m.shape) + assert m.rows == 3 and type(m.rows) is int + assert m.cols == 2 and type(m.cols) is int + if not n % 2: + assert type(m.flat()) in (list, tuple, Tuple) + else: + assert type(m.todok()) is dict + + +def test_deprecated_mat_smat(): + for cls in Matrix, ImmutableMatrix: + m = cls.zeros(3, 2) + with warns_deprecated_sympy(): + mat = m._mat + assert mat == m.flat() + for cls in SparseMatrix, ImmutableSparseMatrix: + m = cls.zeros(3, 2) + with warns_deprecated_sympy(): + smat = m._smat + assert smat == m.todok() + + +def test_division(): + v = Matrix(1, 2, [x, y]) + assert v/z == Matrix(1, 2, [x/z, y/z]) + + +def test_sum(): + m = Matrix([[1, 2, 3], [x, y, x], [2*y, -50, z*x]]) + assert m + m == Matrix([[2, 4, 6], [2*x, 2*y, 2*x], [4*y, -100, 2*z*x]]) + n = Matrix(1, 2, [1, 2]) + raises(ShapeError, lambda: m + n) + +def test_abs(): + m = Matrix(1, 2, [-3, x]) + n = Matrix(1, 2, [3, Abs(x)]) + assert abs(m) == n + +def test_addition(): + a = Matrix(( + (1, 2), + (3, 1), + )) + + b = Matrix(( + (1, 2), + (3, 0), + )) + + assert a + b == a.add(b) == Matrix([[2, 4], [6, 1]]) + + +def test_fancy_index_matrix(): + for M in (Matrix, SparseMatrix): + a = M(3, 3, range(9)) + assert a == a[:, :] + assert a[1, :] == Matrix(1, 3, [3, 4, 5]) + assert a[:, 1] == Matrix([1, 4, 7]) + assert a[[0, 1], :] == Matrix([[0, 1, 2], [3, 4, 5]]) + assert a[[0, 1], 2] == a[[0, 1], [2]] + assert a[2, [0, 1]] == a[[2], [0, 1]] + assert a[:, [0, 1]] == Matrix([[0, 1], [3, 4], [6, 7]]) + assert a[0, 0] == 0 + assert a[0:2, :] == Matrix([[0, 1, 2], [3, 4, 5]]) + assert a[:, 0:2] == Matrix([[0, 1], [3, 4], [6, 7]]) + assert a[::2, 1] == a[[0, 2], 1] + assert a[1, ::2] == a[1, [0, 2]] + a = M(3, 3, range(9)) + assert a[[0, 2, 1, 2, 1], :] == Matrix([ + [0, 1, 2], + [6, 7, 8], + [3, 4, 5], + [6, 7, 8], + [3, 4, 5]]) + assert a[:, [0,2,1,2,1]] == Matrix([ + [0, 2, 1, 2, 1], + [3, 5, 4, 5, 4], + [6, 8, 7, 8, 7]]) + + a = SparseMatrix.zeros(3) + a[1, 2] = 2 + a[0, 1] = 3 + a[2, 0] = 4 + assert a.extract([1, 1], [2]) == Matrix([ + [2], + [2]]) + assert a.extract([1, 0], [2, 2, 2]) == Matrix([ + [2, 2, 2], + [0, 0, 0]]) + assert a.extract([1, 0, 1, 2], [2, 0, 1, 0]) == Matrix([ + [2, 0, 0, 0], + [0, 0, 3, 0], + [2, 0, 0, 0], + [0, 4, 0, 4]]) + + +def test_multiplication(): + a = Matrix(( + (1, 2), + (3, 1), + (0, 6), + )) + + b = Matrix(( + (1, 2), + (3, 0), + )) + + c = a*b + assert c[0, 0] == 7 + assert c[0, 1] == 2 + assert c[1, 0] == 6 + assert c[1, 1] == 6 + assert c[2, 0] == 18 + assert c[2, 1] == 0 + + try: + eval('c = a @ b') + except SyntaxError: + pass + else: + assert c[0, 0] == 7 + assert c[0, 1] == 2 + assert c[1, 0] == 6 + assert c[1, 1] == 6 + assert c[2, 0] == 18 + assert c[2, 1] == 0 + + h = matrix_multiply_elementwise(a, c) + assert h == a.multiply_elementwise(c) + assert h[0, 0] == 7 + assert h[0, 1] == 4 + assert h[1, 0] == 18 + assert h[1, 1] == 6 + assert h[2, 0] == 0 + assert h[2, 1] == 0 + raises(ShapeError, lambda: matrix_multiply_elementwise(a, b)) + + c = b * Symbol("x") + assert isinstance(c, Matrix) + assert c[0, 0] == x + assert c[0, 1] == 2*x + assert c[1, 0] == 3*x + assert c[1, 1] == 0 + + c2 = x * b + assert c == c2 + + c = 5 * b + assert isinstance(c, Matrix) + assert c[0, 0] == 5 + assert c[0, 1] == 2*5 + assert c[1, 0] == 3*5 + assert c[1, 1] == 0 + + try: + eval('c = 5 @ b') + except SyntaxError: + pass + else: + assert isinstance(c, Matrix) + assert c[0, 0] == 5 + assert c[0, 1] == 2*5 + assert c[1, 0] == 3*5 + assert c[1, 1] == 0 + + +def test_multiplication_inf_zero(): + + M = Matrix([[oo, 0], [0, oo]]) + assert M ** 2 == M + + M = Matrix([[oo, oo], [0, 0]]) + assert M ** 2 == Matrix([[nan, nan], [nan, nan]]) + + A = Matrix([ + [0, 0, 0, -S(1)/2], + [0, 1, 0, 0], + [0, 0, 1, 0], + [-S(1)/2, 0, 0, 0]]) + + B = Matrix([ + [pi*x**2, 0, pi*b*x**4/8 + pi*a*x**4/8 + O(x**5), pi*x**4/2 + pi*b**2*x**6/32 + pi*a*b*x**6/48 + pi*a**2*x**6/32 + O(x**7)], + [0, pi*x**4/4, O(x**6), O(x**8)], + [pi*b*x**4/8 + pi*a*x**4/8 + O(x**5), O(x**6), pi*b**2*x**6/32 + pi*a*b*x**6/48 + pi*a**2*x**6/32 + O(x**7), pi*b*x**6/12 + pi*a*x**6/12 + O(x**7)], + [pi*x**4/2 + pi*b**2*x**6/32 + pi*a*b*x**6/48 + pi*a**2*x**6/32 + O(x**7), O(x**8), pi*b*x**6/12 + pi*a*x**6/12 + O(x**7), pi*x**6/3 + 3*pi*b**2*x**8/64 + pi*a*b*x**8/32 + 3*pi*a**2*x**8/64 + O(x**9)]]) + + C = Matrix([ + [-pi*x**4/4 - pi*b**2*x**6/64 - pi*a*b*x**6/96 - pi*a**2*x**6/64 + O(x**7), O(x**8), -pi*b*x**6/24 - pi*a*x**6/24 + O(x**7), -pi*x**6/6 - 3*pi*b**2*x**8/128 - pi*a*b*x**8/64 - 3*pi*a**2*x**8/128 + O(x**9)], + [ 0, pi*x**4/4, O(x**6), O(x**8)], + [ pi*b*x**4/8 + pi*a*x**4/8 + O(x**5), O(x**6), pi*b**2*x**6/32 + pi*a*b*x**6/48 + pi*a**2*x**6/32 + O(x**7), pi*b*x**6/12 + pi*a*x**6/12 + O(x**7)], + [ -pi*x**2/2, 0, -pi*b*x**4/16 - pi*a*x**4/16 + O(x**5), -pi*x**4/4 - pi*b**2*x**6/64 - pi*a*b*x**6/96 - pi*a**2*x**6/64 + O(x**7)]]) + + C2 = Matrix(4, 4, lambda i, j: Add(*(A[i,k]*B[k,j] for k in range(4)))) + + assert A*B == C == C2 + + +def test_power(): + raises(NonSquareMatrixError, lambda: Matrix((1, 2))**2) + + R = Rational + A = Matrix([[2, 3], [4, 5]]) + assert (A**-3)[:] == [R(-269)/8, R(153)/8, R(51)/2, R(-29)/2] + assert (A**5)[:] == [6140, 8097, 10796, 14237] + A = Matrix([[2, 1, 3], [4, 2, 4], [6, 12, 1]]) + assert (A**3)[:] == [290, 262, 251, 448, 440, 368, 702, 954, 433] + assert A**0 == eye(3) + assert A**1 == A + assert (Matrix([[2]]) ** 100)[0, 0] == 2**100 + assert eye(2)**10000000 == eye(2) + assert Matrix([[1, 2], [3, 4]])**Integer(2) == Matrix([[7, 10], [15, 22]]) + + A = Matrix([[33, 24], [48, 57]]) + assert (A**S.Half)[:] == [5, 2, 4, 7] + A = Matrix([[0, 4], [-1, 5]]) + assert (A**S.Half)**2 == A + + assert Matrix([[1, 0], [1, 1]])**S.Half == Matrix([[1, 0], [S.Half, 1]]) + assert Matrix([[1, 0], [1, 1]])**0.5 == Matrix([[1, 0], [0.5, 1]]) + from sympy.abc import n + assert Matrix([[1, a], [0, 1]])**n == Matrix([[1, a*n], [0, 1]]) + assert Matrix([[b, a], [0, b]])**n == Matrix([[b**n, a*b**(n-1)*n], [0, b**n]]) + assert Matrix([ + [a**n, a**(n - 1)*n, (a**n*n**2 - a**n*n)/(2*a**2)], + [ 0, a**n, a**(n - 1)*n], + [ 0, 0, a**n]]) + assert Matrix([[a, 1, 0], [0, a, 0], [0, 0, b]])**n == Matrix([ + [a**n, a**(n-1)*n, 0], + [0, a**n, 0], + [0, 0, b**n]]) + + A = Matrix([[1, 0], [1, 7]]) + assert A._matrix_pow_by_jordan_blocks(S(3)) == A._eval_pow_by_recursion(3) + A = Matrix([[2]]) + assert A**10 == Matrix([[2**10]]) == A._matrix_pow_by_jordan_blocks(S(10)) == \ + A._eval_pow_by_recursion(10) + + # testing a matrix that cannot be jordan blocked issue 11766 + m = Matrix([[3, 0, 0, 0, -3], [0, -3, -3, 0, 3], [0, 3, 0, 3, 0], [0, 0, 3, 0, 3], [3, 0, 0, 3, 0]]) + raises(MatrixError, lambda: m._matrix_pow_by_jordan_blocks(S(10))) + + # test issue 11964 + raises(MatrixError, lambda: Matrix([[1, 1], [3, 3]])._matrix_pow_by_jordan_blocks(S(-10))) + A = Matrix([[0, 1, 0], [0, 0, 1], [0, 0, 0]]) # Nilpotent jordan block size 3 + assert A**10.0 == Matrix([[0, 0, 0], [0, 0, 0], [0, 0, 0]]) + raises(ValueError, lambda: A**2.1) + raises(ValueError, lambda: A**Rational(3, 2)) + A = Matrix([[8, 1], [3, 2]]) + assert A**10.0 == Matrix([[1760744107, 272388050], [817164150, 126415807]]) + A = Matrix([[0, 0, 1], [0, 0, 1], [0, 0, 1]]) # Nilpotent jordan block size 1 + assert A**10.0 == Matrix([[0, 0, 1], [0, 0, 1], [0, 0, 1]]) + A = Matrix([[0, 1, 0], [0, 0, 1], [0, 0, 1]]) # Nilpotent jordan block size 2 + assert A**10.0 == Matrix([[0, 0, 1], [0, 0, 1], [0, 0, 1]]) + n = Symbol('n', integer=True) + assert isinstance(A**n, MatPow) + n = Symbol('n', integer=True, negative=True) + raises(ValueError, lambda: A**n) + n = Symbol('n', integer=True, nonnegative=True) + assert A**n == Matrix([ + [KroneckerDelta(0, n), KroneckerDelta(1, n), -KroneckerDelta(0, n) - KroneckerDelta(1, n) + 1], + [ 0, KroneckerDelta(0, n), 1 - KroneckerDelta(0, n)], + [ 0, 0, 1]]) + assert A**(n + 2) == Matrix([[0, 0, 1], [0, 0, 1], [0, 0, 1]]) + raises(ValueError, lambda: A**Rational(3, 2)) + A = Matrix([[0, 0, 1], [3, 0, 1], [4, 3, 1]]) + assert A**5.0 == Matrix([[168, 72, 89], [291, 144, 161], [572, 267, 329]]) + assert A**5.0 == A**5 + A = Matrix([[0, 1, 0],[-1, 0, 0],[0, 0, 0]]) + n = Symbol("n") + An = A**n + assert An.subs(n, 2).doit() == A**2 + raises(ValueError, lambda: An.subs(n, -2).doit()) + assert An * An == A**(2*n) + + # concretizing behavior for non-integer and complex powers + A = Matrix([[0,0,0],[0,0,0],[0,0,0]]) + n = Symbol('n', integer=True, positive=True) + assert A**n == A + n = Symbol('n', integer=True, nonnegative=True) + assert A**n == diag(0**n, 0**n, 0**n) + assert (A**n).subs(n, 0) == eye(3) + assert (A**n).subs(n, 1) == zeros(3) + A = Matrix ([[2,0,0],[0,2,0],[0,0,2]]) + assert A**2.1 == diag (2**2.1, 2**2.1, 2**2.1) + assert A**I == diag (2**I, 2**I, 2**I) + A = Matrix([[0, 1, 0], [0, 0, 1], [0, 0, 1]]) + raises(ValueError, lambda: A**2.1) + raises(ValueError, lambda: A**I) + A = Matrix([[S.Half, S.Half], [S.Half, S.Half]]) + assert A**S.Half == A + A = Matrix([[1, 1],[3, 3]]) + assert A**S.Half == Matrix ([[S.Half, S.Half], [3*S.Half, 3*S.Half]]) + + +def test_issue_17247_expression_blowup_1(): + M = Matrix([[1+x, 1-x], [1-x, 1+x]]) + with dotprodsimp(True): + assert M.exp().expand() == Matrix([ + [ (exp(2*x) + exp(2))/2, (-exp(2*x) + exp(2))/2], + [(-exp(2*x) + exp(2))/2, (exp(2*x) + exp(2))/2]]) + +def test_issue_17247_expression_blowup_2(): + M = Matrix([[1+x, 1-x], [1-x, 1+x]]) + with dotprodsimp(True): + P, J = M.jordan_form () + assert P*J*P.inv() + +def test_issue_17247_expression_blowup_3(): + M = Matrix([[1+x, 1-x], [1-x, 1+x]]) + with dotprodsimp(True): + assert M**100 == Matrix([ + [633825300114114700748351602688*x**100 + 633825300114114700748351602688, 633825300114114700748351602688 - 633825300114114700748351602688*x**100], + [633825300114114700748351602688 - 633825300114114700748351602688*x**100, 633825300114114700748351602688*x**100 + 633825300114114700748351602688]]) + +def test_issue_17247_expression_blowup_4(): +# This matrix takes extremely long on current master even with intermediate simplification so an abbreviated version is used. It is left here for test in case of future optimizations. +# M = Matrix(S('''[ +# [ -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64, 1/4 - 5*I/16, 65/128 + 87*I/64, -9/32 - I/16, 183/256 - 97*I/128, 3/64 + 13*I/64, -23/32 - 59*I/256, 15/128 - 3*I/32, 19/256 + 551*I/1024], +# [-149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128, 85/256 - 33*I/16, 805/128 + 2415*I/512, -219/128 + 115*I/256, 6301/4096 - 6609*I/1024, 119/128 + 143*I/128, -10879/2048 + 4343*I/4096, 129/256 - 549*I/512, 42533/16384 + 29103*I/8192], +# [ 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64, 1/4 - 5*I/16, 65/128 + 87*I/64, -9/32 - I/16, 183/256 - 97*I/128, 3/64 + 13*I/64, -23/32 - 59*I/256], +# [ -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128, 85/256 - 33*I/16, 805/128 + 2415*I/512, -219/128 + 115*I/256, 6301/4096 - 6609*I/1024, 119/128 + 143*I/128, -10879/2048 + 4343*I/4096], +# [ 1 + I, -19/4 + 5*I/4, 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64, 1/4 - 5*I/16, 65/128 + 87*I/64, -9/32 - I/16, 183/256 - 97*I/128], +# [ 21/8 + I, -537/64 + 143*I/16, -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128, 85/256 - 33*I/16, 805/128 + 2415*I/512, -219/128 + 115*I/256, 6301/4096 - 6609*I/1024], +# [ -2, 17/4 - 13*I/2, 1 + I, -19/4 + 5*I/4, 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64, 1/4 - 5*I/16, 65/128 + 87*I/64], +# [ 1/4 + 13*I/4, -825/64 - 147*I/32, 21/8 + I, -537/64 + 143*I/16, -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128, 85/256 - 33*I/16, 805/128 + 2415*I/512], +# [ -4*I, 27/2 + 6*I, -2, 17/4 - 13*I/2, 1 + I, -19/4 + 5*I/4, 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64], +# [ 1/4 + 5*I/2, -23/8 - 57*I/16, 1/4 + 13*I/4, -825/64 - 147*I/32, 21/8 + I, -537/64 + 143*I/16, -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128], +# [ -4, 9 - 5*I, -4*I, 27/2 + 6*I, -2, 17/4 - 13*I/2, 1 + I, -19/4 + 5*I/4, 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16], +# [ -2*I, 119/8 + 29*I/4, 1/4 + 5*I/2, -23/8 - 57*I/16, 1/4 + 13*I/4, -825/64 - 147*I/32, 21/8 + I, -537/64 + 143*I/16, -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128]]''')) +# assert M**10 == Matrix([ +# [ 7*(-221393644768594642173548179825793834595 - 1861633166167425978847110897013541127952*I)/9671406556917033397649408, 15*(31670992489131684885307005100073928751695 + 10329090958303458811115024718207404523808*I)/77371252455336267181195264, 7*(-3710978679372178839237291049477017392703 + 1377706064483132637295566581525806894169*I)/19342813113834066795298816, (9727707023582419994616144751727760051598 - 59261571067013123836477348473611225724433*I)/9671406556917033397649408, (31896723509506857062605551443641668183707 + 54643444538699269118869436271152084599580*I)/38685626227668133590597632, (-2024044860947539028275487595741003997397402 + 130959428791783397562960461903698670485863*I)/309485009821345068724781056, 3*(26190251453797590396533756519358368860907 - 27221191754180839338002754608545400941638*I)/77371252455336267181195264, (1154643595139959842768960128434994698330461 + 3385496216250226964322872072260446072295634*I)/618970019642690137449562112, 3*(-31849347263064464698310044805285774295286 - 11877437776464148281991240541742691164309*I)/77371252455336267181195264, (4661330392283532534549306589669150228040221 - 4171259766019818631067810706563064103956871*I)/1237940039285380274899124224, (9598353794289061833850770474812760144506 + 358027153990999990968244906482319780943983*I)/309485009821345068724781056, (-9755135335127734571547571921702373498554177 - 4837981372692695195747379349593041939686540*I)/2475880078570760549798248448], +# [(-379516731607474268954110071392894274962069 - 422272153179747548473724096872271700878296*I)/77371252455336267181195264, (41324748029613152354787280677832014263339501 - 12715121258662668420833935373453570749288074*I)/1237940039285380274899124224, (-339216903907423793947110742819264306542397 + 494174755147303922029979279454787373566517*I)/77371252455336267181195264, (-18121350839962855576667529908850640619878381 - 37413012454129786092962531597292531089199003*I)/1237940039285380274899124224, (2489661087330511608618880408199633556675926 + 1137821536550153872137379935240732287260863*I)/309485009821345068724781056, (-136644109701594123227587016790354220062972119 + 110130123468183660555391413889600443583585272*I)/4951760157141521099596496896, (1488043981274920070468141664150073426459593 - 9691968079933445130866371609614474474327650*I)/1237940039285380274899124224, 27*(4636797403026872518131756991410164760195942 + 3369103221138229204457272860484005850416533*I)/4951760157141521099596496896, (-8534279107365915284081669381642269800472363 + 2241118846262661434336333368511372725482742*I)/1237940039285380274899124224, (60923350128174260992536531692058086830950875 - 263673488093551053385865699805250505661590126*I)/9903520314283042199192993792, (18520943561240714459282253753348921824172569 + 24846649186468656345966986622110971925703604*I)/4951760157141521099596496896, (-232781130692604829085973604213529649638644431 + 35981505277760667933017117949103953338570617*I)/9903520314283042199192993792], +# [ (8742968295129404279528270438201520488950 + 3061473358639249112126847237482570858327*I)/4835703278458516698824704, (-245657313712011778432792959787098074935273 + 253113767861878869678042729088355086740856*I)/38685626227668133590597632, (1947031161734702327107371192008011621193 - 19462330079296259148177542369999791122762*I)/9671406556917033397649408, (552856485625209001527688949522750288619217 + 392928441196156725372494335248099016686580*I)/77371252455336267181195264, (-44542866621905323121630214897126343414629 + 3265340021421335059323962377647649632959*I)/19342813113834066795298816, (136272594005759723105646069956434264218730 - 330975364731707309489523680957584684763587*I)/38685626227668133590597632, (27392593965554149283318732469825168894401 + 75157071243800133880129376047131061115278*I)/38685626227668133590597632, 7*(-357821652913266734749960136017214096276154 - 45509144466378076475315751988405961498243*I)/309485009821345068724781056, (104485001373574280824835174390219397141149 - 99041000529599568255829489765415726168162*I)/77371252455336267181195264, (1198066993119982409323525798509037696321291 + 4249784165667887866939369628840569844519936*I)/618970019642690137449562112, (-114985392587849953209115599084503853611014 - 52510376847189529234864487459476242883449*I)/77371252455336267181195264, (6094620517051332877965959223269600650951573 - 4683469779240530439185019982269137976201163*I)/1237940039285380274899124224], +# [ (611292255597977285752123848828590587708323 - 216821743518546668382662964473055912169502*I)/77371252455336267181195264, (-1144023204575811464652692396337616594307487 + 12295317806312398617498029126807758490062855*I)/309485009821345068724781056, (-374093027769390002505693378578475235158281 - 573533923565898290299607461660384634333639*I)/77371252455336267181195264, (47405570632186659000138546955372796986832987 - 2837476058950808941605000274055970055096534*I)/1237940039285380274899124224, (-571573207393621076306216726219753090535121 + 533381457185823100878764749236639320783831*I)/77371252455336267181195264, (-7096548151856165056213543560958582513797519 - 24035731898756040059329175131592138642195366*I)/618970019642690137449562112, (2396762128833271142000266170154694033849225 + 1448501087375679588770230529017516492953051*I)/309485009821345068724781056, (-150609293845161968447166237242456473262037053 + 92581148080922977153207018003184520294188436*I)/4951760157141521099596496896, 5*(270278244730804315149356082977618054486347 - 1997830155222496880429743815321662710091562*I)/1237940039285380274899124224, (62978424789588828258068912690172109324360330 + 44803641177219298311493356929537007630129097*I)/2475880078570760549798248448, 19*(-451431106327656743945775812536216598712236 + 114924966793632084379437683991151177407937*I)/1237940039285380274899124224, (63417747628891221594106738815256002143915995 - 261508229397507037136324178612212080871150958*I)/9903520314283042199192993792], +# [ (-2144231934021288786200752920446633703357 + 2305614436009705803670842248131563850246*I)/1208925819614629174706176, (-90720949337459896266067589013987007078153 - 221951119475096403601562347412753844534569*I)/19342813113834066795298816, (11590973613116630788176337262688659880376 + 6514520676308992726483494976339330626159*I)/4835703278458516698824704, 3*(-131776217149000326618649542018343107657237 + 79095042939612668486212006406818285287004*I)/38685626227668133590597632, (10100577916793945997239221374025741184951 - 28631383488085522003281589065994018550748*I)/9671406556917033397649408, 67*(10090295594251078955008130473573667572549 + 10449901522697161049513326446427839676762*I)/77371252455336267181195264, (-54270981296988368730689531355811033930513 - 3413683117592637309471893510944045467443*I)/19342813113834066795298816, (440372322928679910536575560069973699181278 - 736603803202303189048085196176918214409081*I)/77371252455336267181195264, (33220374714789391132887731139763250155295 + 92055083048787219934030779066298919603554*I)/38685626227668133590597632, 5*(-594638554579967244348856981610805281527116 - 82309245323128933521987392165716076704057*I)/309485009821345068724781056, (128056368815300084550013708313312073721955 - 114619107488668120303579745393765245911404*I)/77371252455336267181195264, 21*(59839959255173222962789517794121843393573 + 241507883613676387255359616163487405826334*I)/618970019642690137449562112], +# [ (-13454485022325376674626653802541391955147 + 184471402121905621396582628515905949793486*I)/19342813113834066795298816, (-6158730123400322562149780662133074862437105 - 3416173052604643794120262081623703514107476*I)/154742504910672534362390528, (770558003844914708453618983120686116100419 - 127758381209767638635199674005029818518766*I)/77371252455336267181195264, (-4693005771813492267479835161596671660631703 + 12703585094750991389845384539501921531449948*I)/309485009821345068724781056, (-295028157441149027913545676461260860036601 - 841544569970643160358138082317324743450770*I)/77371252455336267181195264, (56716442796929448856312202561538574275502893 + 7216818824772560379753073185990186711454778*I)/1237940039285380274899124224, 15*(-87061038932753366532685677510172566368387 + 61306141156647596310941396434445461895538*I)/154742504910672534362390528, (-3455315109680781412178133042301025723909347 - 24969329563196972466388460746447646686670670*I)/618970019642690137449562112, (2453418854160886481106557323699250865361849 + 1497886802326243014471854112161398141242514*I)/309485009821345068724781056, (-151343224544252091980004429001205664193082173 + 90471883264187337053549090899816228846836628*I)/4951760157141521099596496896, (1652018205533026103358164026239417416432989 - 9959733619236515024261775397109724431400162*I)/1237940039285380274899124224, 3*(40676374242956907656984876692623172736522006 + 31023357083037817469535762230872667581366205*I)/4951760157141521099596496896], +# [ (-1226990509403328460274658603410696548387 - 4131739423109992672186585941938392788458*I)/1208925819614629174706176, (162392818524418973411975140074368079662703 + 23706194236915374831230612374344230400704*I)/9671406556917033397649408, (-3935678233089814180000602553655565621193 + 2283744757287145199688061892165659502483*I)/1208925819614629174706176, (-2400210250844254483454290806930306285131 - 315571356806370996069052930302295432758205*I)/19342813113834066795298816, (13365917938215281056563183751673390817910 + 15911483133819801118348625831132324863881*I)/4835703278458516698824704, 3*(-215950551370668982657516660700301003897855 + 51684341999223632631602864028309400489378*I)/38685626227668133590597632, (20886089946811765149439844691320027184765 - 30806277083146786592790625980769214361844*I)/9671406556917033397649408, (562180634592713285745940856221105667874855 + 1031543963988260765153550559766662245114916*I)/77371252455336267181195264, (-65820625814810177122941758625652476012867 - 12429918324787060890804395323920477537595*I)/19342813113834066795298816, (319147848192012911298771180196635859221089 - 402403304933906769233365689834404519960394*I)/38685626227668133590597632, (23035615120921026080284733394359587955057 + 115351677687031786114651452775242461310624*I)/38685626227668133590597632, (-3426830634881892756966440108592579264936130 - 1022954961164128745603407283836365128598559*I)/309485009821345068724781056], +# [ (-192574788060137531023716449082856117537757 - 69222967328876859586831013062387845780692*I)/19342813113834066795298816, (2736383768828013152914815341491629299773262 - 2773252698016291897599353862072533475408743*I)/77371252455336267181195264, (-23280005281223837717773057436155921656805 + 214784953368021840006305033048142888879224*I)/19342813113834066795298816, (-3035247484028969580570400133318947903462326 - 2195168903335435855621328554626336958674325*I)/77371252455336267181195264, (984552428291526892214541708637840971548653 - 64006622534521425620714598573494988589378*I)/77371252455336267181195264, (-3070650452470333005276715136041262898509903 + 7286424705750810474140953092161794621989080*I)/154742504910672534362390528, (-147848877109756404594659513386972921139270 - 416306113044186424749331418059456047650861*I)/38685626227668133590597632, (55272118474097814260289392337160619494260781 + 7494019668394781211907115583302403519488058*I)/1237940039285380274899124224, (-581537886583682322424771088996959213068864 + 542191617758465339135308203815256798407429*I)/77371252455336267181195264, (-6422548983676355789975736799494791970390991 - 23524183982209004826464749309156698827737702*I)/618970019642690137449562112, 7*(180747195387024536886923192475064903482083 + 84352527693562434817771649853047924991804*I)/154742504910672534362390528, (-135485179036717001055310712747643466592387031 + 102346575226653028836678855697782273460527608*I)/4951760157141521099596496896], +# [ (3384238362616083147067025892852431152105 + 156724444932584900214919898954874618256*I)/604462909807314587353088, (-59558300950677430189587207338385764871866 + 114427143574375271097298201388331237478857*I)/4835703278458516698824704, (-1356835789870635633517710130971800616227 - 7023484098542340388800213478357340875410*I)/1208925819614629174706176, (234884918567993750975181728413524549575881 + 79757294640629983786895695752733890213506*I)/9671406556917033397649408, (-7632732774935120473359202657160313866419 + 2905452608512927560554702228553291839465*I)/1208925819614629174706176, (52291747908702842344842889809762246649489 - 520996778817151392090736149644507525892649*I)/19342813113834066795298816, (17472406829219127839967951180375981717322 + 23464704213841582137898905375041819568669*I)/4835703278458516698824704, (-911026971811893092350229536132730760943307 + 150799318130900944080399439626714846752360*I)/38685626227668133590597632, (26234457233977042811089020440646443590687 - 45650293039576452023692126463683727692890*I)/9671406556917033397649408, 3*(288348388717468992528382586652654351121357 + 454526517721403048270274049572136109264668*I)/77371252455336267181195264, (-91583492367747094223295011999405657956347 - 12704691128268298435362255538069612411331*I)/19342813113834066795298816, (411208730251327843849027957710164064354221 - 569898526380691606955496789378230959965898*I)/38685626227668133590597632], +# [ (27127513117071487872628354831658811211795 - 37765296987901990355760582016892124833857*I)/4835703278458516698824704, (1741779916057680444272938534338833170625435 + 3083041729779495966997526404685535449810378*I)/77371252455336267181195264, 3*(-60642236251815783728374561836962709533401 - 24630301165439580049891518846174101510744*I)/19342813113834066795298816, 3*(445885207364591681637745678755008757483408 - 350948497734812895032502179455610024541643*I)/38685626227668133590597632, (-47373295621391195484367368282471381775684 + 219122969294089357477027867028071400054973*I)/19342813113834066795298816, (-2801565819673198722993348253876353741520438 - 2250142129822658548391697042460298703335701*I)/77371252455336267181195264, (801448252275607253266997552356128790317119 - 50890367688077858227059515894356594900558*I)/77371252455336267181195264, (-5082187758525931944557763799137987573501207 + 11610432359082071866576699236013484487676124*I)/309485009821345068724781056, (-328925127096560623794883760398247685166830 - 643447969697471610060622160899409680422019*I)/77371252455336267181195264, 15*(2954944669454003684028194956846659916299765 + 33434406416888505837444969347824812608566*I)/1237940039285380274899124224, (-415749104352001509942256567958449835766827 + 479330966144175743357171151440020955412219*I)/77371252455336267181195264, 3*(-4639987285852134369449873547637372282914255 - 11994411888966030153196659207284951579243273*I)/1237940039285380274899124224], +# [ (-478846096206269117345024348666145495601 + 1249092488629201351470551186322814883283*I)/302231454903657293676544, (-17749319421930878799354766626365926894989 - 18264580106418628161818752318217357231971*I)/1208925819614629174706176, (2801110795431528876849623279389579072819 + 363258850073786330770713557775566973248*I)/604462909807314587353088, (-59053496693129013745775512127095650616252 + 78143588734197260279248498898321500167517*I)/4835703278458516698824704, (-283186724922498212468162690097101115349 - 6443437753863179883794497936345437398276*I)/1208925819614629174706176, (188799118826748909206887165661384998787543 + 84274736720556630026311383931055307398820*I)/9671406556917033397649408, (-5482217151670072904078758141270295025989 + 1818284338672191024475557065444481298568*I)/1208925819614629174706176, (56564463395350195513805521309731217952281 - 360208541416798112109946262159695452898431*I)/19342813113834066795298816, 11*(1259539805728870739006416869463689438068 + 1409136581547898074455004171305324917387*I)/4835703278458516698824704, 5*(-123701190701414554945251071190688818343325 + 30997157322590424677294553832111902279712*I)/38685626227668133590597632, (16130917381301373033736295883982414239781 - 32752041297570919727145380131926943374516*I)/9671406556917033397649408, (650301385108223834347093740500375498354925 + 899526407681131828596801223402866051809258*I)/77371252455336267181195264], +# [ (9011388245256140876590294262420614839483 + 8167917972423946282513000869327525382672*I)/1208925819614629174706176, (-426393174084720190126376382194036323028924 + 180692224825757525982858693158209545430621*I)/9671406556917033397649408, (24588556702197802674765733448108154175535 - 45091766022876486566421953254051868331066*I)/4835703278458516698824704, (1872113939365285277373877183750416985089691 + 3030392393733212574744122057679633775773130*I)/77371252455336267181195264, (-222173405538046189185754954524429864167549 - 75193157893478637039381059488387511299116*I)/19342813113834066795298816, (2670821320766222522963689317316937579844558 - 2645837121493554383087981511645435472169191*I)/77371252455336267181195264, 5*(-2100110309556476773796963197283876204940 + 41957457246479840487980315496957337371937*I)/19342813113834066795298816, (-5733743755499084165382383818991531258980593 - 3328949988392698205198574824396695027195732*I)/154742504910672534362390528, (707827994365259025461378911159398206329247 - 265730616623227695108042528694302299777294*I)/77371252455336267181195264, (-1442501604682933002895864804409322823788319 + 11504137805563265043376405214378288793343879*I)/309485009821345068724781056, (-56130472299445561499538726459719629522285 - 61117552419727805035810982426639329818864*I)/9671406556917033397649408, (39053692321126079849054272431599539429908717 - 10209127700342570953247177602860848130710666*I)/1237940039285380274899124224]]) + M = Matrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64, 1/4 - 5*I/16, 65/128 + 87*I/64], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128, 85/256 - 33*I/16, 805/128 + 2415*I/512], + [ 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64], + [ -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128], + [ 1 + I, -19/4 + 5*I/4, 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16], + [ 21/8 + I, -537/64 + 143*I/16, -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M**10 == Matrix(S('''[ + [ 7369525394972778926719607798014571861/604462909807314587353088 - 229284202061790301477392339912557559*I/151115727451828646838272, -19704281515163975949388435612632058035/1208925819614629174706176 + 14319858347987648723768698170712102887*I/302231454903657293676544, -3623281909451783042932142262164941211/604462909807314587353088 - 6039240602494288615094338643452320495*I/604462909807314587353088, 109260497799140408739847239685705357695/2417851639229258349412352 - 7427566006564572463236368211555511431*I/2417851639229258349412352, -16095803767674394244695716092817006641/2417851639229258349412352 + 10336681897356760057393429626719177583*I/1208925819614629174706176, -42207883340488041844332828574359769743/2417851639229258349412352 - 182332262671671273188016400290188468499*I/4835703278458516698824704], + [50566491050825573392726324995779608259/1208925819614629174706176 - 90047007594468146222002432884052362145*I/2417851639229258349412352, 74273703462900000967697427843983822011/1208925819614629174706176 + 265947522682943571171988741842776095421*I/1208925819614629174706176, -116900341394390200556829767923360888429/2417851639229258349412352 - 53153263356679268823910621474478756845*I/2417851639229258349412352, 195407378023867871243426523048612490249/1208925819614629174706176 - 1242417915995360200584837585002906728929*I/9671406556917033397649408, -863597594389821970177319682495878193/302231454903657293676544 + 476936100741548328800725360758734300481*I/9671406556917033397649408, -3154451590535653853562472176601754835575/19342813113834066795298816 - 232909875490506237386836489998407329215*I/2417851639229258349412352], + [ -1715444997702484578716037230949868543/302231454903657293676544 + 5009695651321306866158517287924120777*I/302231454903657293676544, -30551582497996879620371947949342101301/604462909807314587353088 - 7632518367986526187139161303331519629*I/151115727451828646838272, 312680739924495153190604170938220575/18889465931478580854784 - 108664334509328818765959789219208459*I/75557863725914323419136, -14693696966703036206178521686918865509/604462909807314587353088 + 72345386220900843930147151999899692401*I/1208925819614629174706176, -8218872496728882299722894680635296519/1208925819614629174706176 - 16776782833358893712645864791807664983*I/1208925819614629174706176, 143237839169380078671242929143670635137/2417851639229258349412352 + 2883817094806115974748882735218469447*I/2417851639229258349412352], + [ 3087979417831061365023111800749855987/151115727451828646838272 + 34441942370802869368851419102423997089*I/604462909807314587353088, -148309181940158040917731426845476175667/604462909807314587353088 - 263987151804109387844966835369350904919*I/9671406556917033397649408, 50259518594816377378747711930008883165/1208925819614629174706176 - 95713974916869240305450001443767979653*I/2417851639229258349412352, 153466447023875527996457943521467271119/2417851639229258349412352 + 517285524891117105834922278517084871349*I/2417851639229258349412352, -29184653615412989036678939366291205575/604462909807314587353088 - 27551322282526322041080173287022121083*I/1208925819614629174706176, 196404220110085511863671393922447671649/1208925819614629174706176 - 1204712019400186021982272049902206202145*I/9671406556917033397649408], + [ -2632581805949645784625606590600098779/151115727451828646838272 - 589957435912868015140272627522612771*I/37778931862957161709568, 26727850893953715274702844733506310247/302231454903657293676544 - 10825791956782128799168209600694020481*I/302231454903657293676544, -1036348763702366164044671908440791295/151115727451828646838272 + 3188624571414467767868303105288107375*I/151115727451828646838272, -36814959939970644875593411585393242449/604462909807314587353088 - 18457555789119782404850043842902832647*I/302231454903657293676544, 12454491297984637815063964572803058647/604462909807314587353088 - 340489532842249733975074349495329171*I/302231454903657293676544, -19547211751145597258386735573258916681/604462909807314587353088 + 87299583775782199663414539883938008933*I/1208925819614629174706176], + [ -40281994229560039213253423262678393183/604462909807314587353088 - 2939986850065527327299273003299736641*I/604462909807314587353088, 331940684638052085845743020267462794181/2417851639229258349412352 - 284574901963624403933361315517248458969*I/1208925819614629174706176, 6453843623051745485064693628073010961/302231454903657293676544 + 36062454107479732681350914931391590957*I/604462909807314587353088, -147665869053634695632880753646441962067/604462909807314587353088 - 305987938660447291246597544085345123927*I/9671406556917033397649408, 107821369195275772166593879711259469423/2417851639229258349412352 - 11645185518211204108659001435013326687*I/302231454903657293676544, 64121228424717666402009446088588091619/1208925819614629174706176 + 265557133337095047883844369272389762133*I/1208925819614629174706176]]''')) + +def test_issue_17247_expression_blowup_5(): + M = Matrix(6, 6, lambda i, j: 1 + (-1)**(i+j)*I) + with dotprodsimp(True): + assert M.charpoly('x') == PurePoly(x**6 + (-6 - 6*I)*x**5 + 36*I*x**4, x, domain='EX') + +def test_issue_17247_expression_blowup_6(): + M = Matrix(8, 8, [x+i for i in range (64)]) + with dotprodsimp(True): + assert M.det('bareiss') == 0 + +def test_issue_17247_expression_blowup_7(): + M = Matrix(6, 6, lambda i, j: 1 + (-1)**(i+j)*I) + with dotprodsimp(True): + assert M.det('berkowitz') == 0 + +def test_issue_17247_expression_blowup_8(): + M = Matrix(8, 8, [x+i for i in range (64)]) + with dotprodsimp(True): + assert M.det('lu') == 0 + +def test_issue_17247_expression_blowup_9(): + M = Matrix(8, 8, [x+i for i in range (64)]) + with dotprodsimp(True): + assert M.rref() == (Matrix([ + [1, 0, -1, -2, -3, -4, -5, -6], + [0, 1, 2, 3, 4, 5, 6, 7], + [0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0]]), (0, 1)) + +def test_issue_17247_expression_blowup_10(): + M = Matrix(6, 6, lambda i, j: 1 + (-1)**(i+j)*I) + with dotprodsimp(True): + assert M.cofactor(0, 0) == 0 + +def test_issue_17247_expression_blowup_11(): + M = Matrix(6, 6, lambda i, j: 1 + (-1)**(i+j)*I) + with dotprodsimp(True): + assert M.cofactor_matrix() == Matrix(6, 6, [0]*36) + +def test_issue_17247_expression_blowup_12(): + M = Matrix(6, 6, lambda i, j: 1 + (-1)**(i+j)*I) + with dotprodsimp(True): + assert M.eigenvals() == {6: 1, 6*I: 1, 0: 4} + +def test_issue_17247_expression_blowup_13(): + M = Matrix([ + [ 0, 1 - x, x + 1, 1 - x], + [1 - x, x + 1, 0, x + 1], + [ 0, 1 - x, x + 1, 1 - x], + [ 0, 0, 1 - x, 0]]) + + ev = M.eigenvects() + assert ev[0] == (0, 2, [Matrix([0, -1, 0, 1])]) + assert ev[1][0] == x - sqrt(2)*(x - 1) + 1 + assert ev[1][1] == 1 + assert ev[1][2][0].expand(deep=False, numer=True) == Matrix([ + [(-x + sqrt(2)*(x - 1) - 1)/(x - 1)], + [-4*x/(x**2 - 2*x + 1) + (x + 1)*(x - sqrt(2)*(x - 1) + 1)/(x**2 - 2*x + 1)], + [(-x + sqrt(2)*(x - 1) - 1)/(x - 1)], + [1] + ]) + + assert ev[2][0] == x + sqrt(2)*(x - 1) + 1 + assert ev[2][1] == 1 + assert ev[2][2][0].expand(deep=False, numer=True) == Matrix([ + [(-x - sqrt(2)*(x - 1) - 1)/(x - 1)], + [-4*x/(x**2 - 2*x + 1) + (x + 1)*(x + sqrt(2)*(x - 1) + 1)/(x**2 - 2*x + 1)], + [(-x - sqrt(2)*(x - 1) - 1)/(x - 1)], + [1] + ]) + + +def test_issue_17247_expression_blowup_14(): + M = Matrix(8, 8, ([1+x, 1-x]*4 + [1-x, 1+x]*4)*4) + with dotprodsimp(True): + assert M.echelon_form() == Matrix([ + [x + 1, 1 - x, x + 1, 1 - x, x + 1, 1 - x, x + 1, 1 - x], + [ 0, 4*x, 0, 4*x, 0, 4*x, 0, 4*x], + [ 0, 0, 0, 0, 0, 0, 0, 0], + [ 0, 0, 0, 0, 0, 0, 0, 0], + [ 0, 0, 0, 0, 0, 0, 0, 0], + [ 0, 0, 0, 0, 0, 0, 0, 0], + [ 0, 0, 0, 0, 0, 0, 0, 0], + [ 0, 0, 0, 0, 0, 0, 0, 0]]) + +def test_issue_17247_expression_blowup_15(): + M = Matrix(8, 8, ([1+x, 1-x]*4 + [1-x, 1+x]*4)*4) + with dotprodsimp(True): + assert M.rowspace() == [Matrix([[x + 1, 1 - x, x + 1, 1 - x, x + 1, 1 - x, x + 1, 1 - x]]), Matrix([[0, 4*x, 0, 4*x, 0, 4*x, 0, 4*x]])] + +def test_issue_17247_expression_blowup_16(): + M = Matrix(8, 8, ([1+x, 1-x]*4 + [1-x, 1+x]*4)*4) + with dotprodsimp(True): + assert M.columnspace() == [Matrix([[x + 1],[1 - x],[x + 1],[1 - x],[x + 1],[1 - x],[x + 1],[1 - x]]), Matrix([[1 - x],[x + 1],[1 - x],[x + 1],[1 - x],[x + 1],[1 - x],[x + 1]])] + +def test_issue_17247_expression_blowup_17(): + M = Matrix(8, 8, [x+i for i in range (64)]) + with dotprodsimp(True): + assert M.nullspace() == [ + Matrix([[1],[-2],[1],[0],[0],[0],[0],[0]]), + Matrix([[2],[-3],[0],[1],[0],[0],[0],[0]]), + Matrix([[3],[-4],[0],[0],[1],[0],[0],[0]]), + Matrix([[4],[-5],[0],[0],[0],[1],[0],[0]]), + Matrix([[5],[-6],[0],[0],[0],[0],[1],[0]]), + Matrix([[6],[-7],[0],[0],[0],[0],[0],[1]])] + +def test_issue_17247_expression_blowup_18(): + M = Matrix(6, 6, ([1+x, 1-x]*3 + [1-x, 1+x]*3)*3) + with dotprodsimp(True): + assert not M.is_nilpotent() + +def test_issue_17247_expression_blowup_19(): + M = Matrix(S('''[ + [ -3/4, 0, 1/4 + I/2, 0], + [ 0, -177/128 - 1369*I/128, 0, -2063/256 + 541*I/128], + [ 1/2 - I, 0, 0, 0], + [ 0, 0, 0, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert not M.is_diagonalizable() + +def test_issue_17247_expression_blowup_20(): + M = Matrix([ + [x + 1, 1 - x, 0, 0], + [1 - x, x + 1, 0, x + 1], + [ 0, 1 - x, x + 1, 0], + [ 0, 0, 0, x + 1]]) + with dotprodsimp(True): + assert M.diagonalize() == (Matrix([ + [1, 1, 0, (x + 1)/(x - 1)], + [1, -1, 0, 0], + [1, 1, 1, 0], + [0, 0, 0, 1]]), + Matrix([ + [2, 0, 0, 0], + [0, 2*x, 0, 0], + [0, 0, x + 1, 0], + [0, 0, 0, x + 1]])) + +def test_issue_17247_expression_blowup_21(): + M = Matrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 0, 0], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 0, -2063/256 + 541*I/128], + [ 0, 9/4 + 55*I/16, 2473/256 + 137*I/64, 0], + [ 0, 0, 0, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M.inv(method='GE') == Matrix(S('''[ + [-26194832/3470993 - 31733264*I/3470993, 156352/3470993 + 10325632*I/3470993, 0, -7741283181072/3306971225785 + 2999007604624*I/3306971225785], + [4408224/3470993 - 9675328*I/3470993, -2422272/3470993 + 1523712*I/3470993, 0, -1824666489984/3306971225785 - 1401091949952*I/3306971225785], + [-26406945676288/22270005630769 + 10245925485056*I/22270005630769, 7453523312640/22270005630769 + 1601616519168*I/22270005630769, 633088/6416033 - 140288*I/6416033, 872209227109521408/21217636514687010905 + 6066405081802389504*I/21217636514687010905], + [0, 0, 0, -11328/952745 + 87616*I/952745]]''')) + +def test_issue_17247_expression_blowup_22(): + M = Matrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 0, 0], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 0, -2063/256 + 541*I/128], + [ 0, 9/4 + 55*I/16, 2473/256 + 137*I/64, 0], + [ 0, 0, 0, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M.inv(method='LU') == Matrix(S('''[ + [-26194832/3470993 - 31733264*I/3470993, 156352/3470993 + 10325632*I/3470993, 0, -7741283181072/3306971225785 + 2999007604624*I/3306971225785], + [4408224/3470993 - 9675328*I/3470993, -2422272/3470993 + 1523712*I/3470993, 0, -1824666489984/3306971225785 - 1401091949952*I/3306971225785], + [-26406945676288/22270005630769 + 10245925485056*I/22270005630769, 7453523312640/22270005630769 + 1601616519168*I/22270005630769, 633088/6416033 - 140288*I/6416033, 872209227109521408/21217636514687010905 + 6066405081802389504*I/21217636514687010905], + [0, 0, 0, -11328/952745 + 87616*I/952745]]''')) + +def test_issue_17247_expression_blowup_23(): + M = Matrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 0, 0], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 0, -2063/256 + 541*I/128], + [ 0, 9/4 + 55*I/16, 2473/256 + 137*I/64, 0], + [ 0, 0, 0, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M.inv(method='ADJ').expand() == Matrix(S('''[ + [-26194832/3470993 - 31733264*I/3470993, 156352/3470993 + 10325632*I/3470993, 0, -7741283181072/3306971225785 + 2999007604624*I/3306971225785], + [4408224/3470993 - 9675328*I/3470993, -2422272/3470993 + 1523712*I/3470993, 0, -1824666489984/3306971225785 - 1401091949952*I/3306971225785], + [-26406945676288/22270005630769 + 10245925485056*I/22270005630769, 7453523312640/22270005630769 + 1601616519168*I/22270005630769, 633088/6416033 - 140288*I/6416033, 872209227109521408/21217636514687010905 + 6066405081802389504*I/21217636514687010905], + [0, 0, 0, -11328/952745 + 87616*I/952745]]''')) + +def test_issue_17247_expression_blowup_24(): + M = SparseMatrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 0, 0], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 0, -2063/256 + 541*I/128], + [ 0, 9/4 + 55*I/16, 2473/256 + 137*I/64, 0], + [ 0, 0, 0, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M.inv(method='CH') == Matrix(S('''[ + [-26194832/3470993 - 31733264*I/3470993, 156352/3470993 + 10325632*I/3470993, 0, -7741283181072/3306971225785 + 2999007604624*I/3306971225785], + [4408224/3470993 - 9675328*I/3470993, -2422272/3470993 + 1523712*I/3470993, 0, -1824666489984/3306971225785 - 1401091949952*I/3306971225785], + [-26406945676288/22270005630769 + 10245925485056*I/22270005630769, 7453523312640/22270005630769 + 1601616519168*I/22270005630769, 633088/6416033 - 140288*I/6416033, 872209227109521408/21217636514687010905 + 6066405081802389504*I/21217636514687010905], + [0, 0, 0, -11328/952745 + 87616*I/952745]]''')) + +def test_issue_17247_expression_blowup_25(): + M = SparseMatrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 0, 0], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 0, -2063/256 + 541*I/128], + [ 0, 9/4 + 55*I/16, 2473/256 + 137*I/64, 0], + [ 0, 0, 0, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M.inv(method='LDL') == Matrix(S('''[ + [-26194832/3470993 - 31733264*I/3470993, 156352/3470993 + 10325632*I/3470993, 0, -7741283181072/3306971225785 + 2999007604624*I/3306971225785], + [4408224/3470993 - 9675328*I/3470993, -2422272/3470993 + 1523712*I/3470993, 0, -1824666489984/3306971225785 - 1401091949952*I/3306971225785], + [-26406945676288/22270005630769 + 10245925485056*I/22270005630769, 7453523312640/22270005630769 + 1601616519168*I/22270005630769, 633088/6416033 - 140288*I/6416033, 872209227109521408/21217636514687010905 + 6066405081802389504*I/21217636514687010905], + [0, 0, 0, -11328/952745 + 87616*I/952745]]''')) + +def test_issue_17247_expression_blowup_26(): + M = Matrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64, 1/4 - 5*I/16, 65/128 + 87*I/64, -9/32 - I/16, 183/256 - 97*I/128], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128, 85/256 - 33*I/16, 805/128 + 2415*I/512, -219/128 + 115*I/256, 6301/4096 - 6609*I/1024], + [ 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64, 1/4 - 5*I/16, 65/128 + 87*I/64], + [ -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128, 85/256 - 33*I/16, 805/128 + 2415*I/512], + [ 1 + I, -19/4 + 5*I/4, 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64], + [ 21/8 + I, -537/64 + 143*I/16, -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128], + [ -2, 17/4 - 13*I/2, 1 + I, -19/4 + 5*I/4, 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16], + [ 1/4 + 13*I/4, -825/64 - 147*I/32, 21/8 + I, -537/64 + 143*I/16, -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M.rank() == 4 + +def test_issue_17247_expression_blowup_27(): + M = Matrix([ + [ 0, 1 - x, x + 1, 1 - x], + [1 - x, x + 1, 0, x + 1], + [ 0, 1 - x, x + 1, 1 - x], + [ 0, 0, 1 - x, 0]]) + with dotprodsimp(True): + P, J = M.jordan_form() + assert P.expand() == Matrix(S('''[ + [ 0, 4*x/(x**2 - 2*x + 1), -(-17*x**4 + 12*sqrt(2)*x**4 - 4*sqrt(2)*x**3 + 6*x**3 - 6*x - 4*sqrt(2)*x + 12*sqrt(2) + 17)/(-7*x**4 + 5*sqrt(2)*x**4 - 6*sqrt(2)*x**3 + 8*x**3 - 2*x**2 + 8*x + 6*sqrt(2)*x - 5*sqrt(2) - 7), -(12*sqrt(2)*x**4 + 17*x**4 - 6*x**3 - 4*sqrt(2)*x**3 - 4*sqrt(2)*x + 6*x - 17 + 12*sqrt(2))/(7*x**4 + 5*sqrt(2)*x**4 - 6*sqrt(2)*x**3 - 8*x**3 + 2*x**2 - 8*x + 6*sqrt(2)*x - 5*sqrt(2) + 7)], + [x - 1, x/(x - 1) + 1/(x - 1), (-7*x**3 + 5*sqrt(2)*x**3 - x**2 + sqrt(2)*x**2 - sqrt(2)*x - x - 5*sqrt(2) - 7)/(-3*x**3 + 2*sqrt(2)*x**3 - 2*sqrt(2)*x**2 + 3*x**2 + 2*sqrt(2)*x + 3*x - 3 - 2*sqrt(2)), (7*x**3 + 5*sqrt(2)*x**3 + x**2 + sqrt(2)*x**2 - sqrt(2)*x + x - 5*sqrt(2) + 7)/(2*sqrt(2)*x**3 + 3*x**3 - 3*x**2 - 2*sqrt(2)*x**2 - 3*x + 2*sqrt(2)*x - 2*sqrt(2) + 3)], + [ 0, 1, -(-3*x**2 + 2*sqrt(2)*x**2 + 2*x - 3 - 2*sqrt(2))/(-x**2 + sqrt(2)*x**2 - 2*sqrt(2)*x + 1 + sqrt(2)), -(2*sqrt(2)*x**2 + 3*x**2 - 2*x - 2*sqrt(2) + 3)/(x**2 + sqrt(2)*x**2 - 2*sqrt(2)*x - 1 + sqrt(2))], + [1 - x, 0, 1, 1]]''')).expand() + assert J == Matrix(S('''[ + [0, 1, 0, 0], + [0, 0, 0, 0], + [0, 0, x - sqrt(2)*(x - 1) + 1, 0], + [0, 0, 0, x + sqrt(2)*(x - 1) + 1]]''')) + +def test_issue_17247_expression_blowup_28(): + M = Matrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 0, 0], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 0, -2063/256 + 541*I/128], + [ 0, 9/4 + 55*I/16, 2473/256 + 137*I/64, 0], + [ 0, 0, 0, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M.singular_values() == S('''[ + sqrt(14609315/131072 + sqrt(64789115132571/2147483648 - 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3) + 76627253330829751075/(35184372088832*sqrt(64789115132571/4294967296 + 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)) + 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3))) - 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)))/2 + sqrt(64789115132571/4294967296 + 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)) + 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3))/2), + sqrt(14609315/131072 - sqrt(64789115132571/2147483648 - 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3) + 76627253330829751075/(35184372088832*sqrt(64789115132571/4294967296 + 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)) + 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3))) - 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)))/2 + sqrt(64789115132571/4294967296 + 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)) + 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3))/2), + sqrt(14609315/131072 - sqrt(64789115132571/4294967296 + 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)) + 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3))/2 + sqrt(64789115132571/2147483648 - 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3) - 76627253330829751075/(35184372088832*sqrt(64789115132571/4294967296 + 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)) + 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3))) - 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)))/2), + sqrt(14609315/131072 - sqrt(64789115132571/4294967296 + 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)) + 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3))/2 - sqrt(64789115132571/2147483648 - 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3) - 76627253330829751075/(35184372088832*sqrt(64789115132571/4294967296 + 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)) + 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3))) - 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)))/2)]''') + + +def test_issue_16823(): + # This still needs to be fixed if not using dotprodsimp. + M = Matrix(S('''[ + [1+I,-19/4+5/4*I,1/2-I,9/4+55/16*I,-3/4,45/32-37/16*I,1/4+1/2*I,-129/64-9/64*I,1/4-5/16*I,65/128+87/64*I,-9/32-1/16*I,183/256-97/128*I,3/64+13/64*I,-23/32-59/256*I,15/128-3/32*I,19/256+551/1024*I], + [21/8+I,-537/64+143/16*I,-5/8-39/16*I,2473/256+137/64*I,-149/64+49/32*I,-177/128-1369/128*I,125/64+87/64*I,-2063/256+541/128*I,85/256-33/16*I,805/128+2415/512*I,-219/128+115/256*I,6301/4096-6609/1024*I,119/128+143/128*I,-10879/2048+4343/4096*I,129/256-549/512*I,42533/16384+29103/8192*I], + [-2,17/4-13/2*I,1+I,-19/4+5/4*I,1/2-I,9/4+55/16*I,-3/4,45/32-37/16*I,1/4+1/2*I,-129/64-9/64*I,1/4-5/16*I,65/128+87/64*I,-9/32-1/16*I,183/256-97/128*I,3/64+13/64*I,-23/32-59/256*I], + [1/4+13/4*I,-825/64-147/32*I,21/8+I,-537/64+143/16*I,-5/8-39/16*I,2473/256+137/64*I,-149/64+49/32*I,-177/128-1369/128*I,125/64+87/64*I,-2063/256+541/128*I,85/256-33/16*I,805/128+2415/512*I,-219/128+115/256*I,6301/4096-6609/1024*I,119/128+143/128*I,-10879/2048+4343/4096*I], + [-4*I,27/2+6*I,-2,17/4-13/2*I,1+I,-19/4+5/4*I,1/2-I,9/4+55/16*I,-3/4,45/32-37/16*I,1/4+1/2*I,-129/64-9/64*I,1/4-5/16*I,65/128+87/64*I,-9/32-1/16*I,183/256-97/128*I], + [1/4+5/2*I,-23/8-57/16*I,1/4+13/4*I,-825/64-147/32*I,21/8+I,-537/64+143/16*I,-5/8-39/16*I,2473/256+137/64*I,-149/64+49/32*I,-177/128-1369/128*I,125/64+87/64*I,-2063/256+541/128*I,85/256-33/16*I,805/128+2415/512*I,-219/128+115/256*I,6301/4096-6609/1024*I], + [-4,9-5*I,-4*I,27/2+6*I,-2,17/4-13/2*I,1+I,-19/4+5/4*I,1/2-I,9/4+55/16*I,-3/4,45/32-37/16*I,1/4+1/2*I,-129/64-9/64*I,1/4-5/16*I,65/128+87/64*I], + [-2*I,119/8+29/4*I,1/4+5/2*I,-23/8-57/16*I,1/4+13/4*I,-825/64-147/32*I,21/8+I,-537/64+143/16*I,-5/8-39/16*I,2473/256+137/64*I,-149/64+49/32*I,-177/128-1369/128*I,125/64+87/64*I,-2063/256+541/128*I,85/256-33/16*I,805/128+2415/512*I], + [0,-6,-4,9-5*I,-4*I,27/2+6*I,-2,17/4-13/2*I,1+I,-19/4+5/4*I,1/2-I,9/4+55/16*I,-3/4,45/32-37/16*I,1/4+1/2*I,-129/64-9/64*I], + [1,-9/4+3*I,-2*I,119/8+29/4*I,1/4+5/2*I,-23/8-57/16*I,1/4+13/4*I,-825/64-147/32*I,21/8+I,-537/64+143/16*I,-5/8-39/16*I,2473/256+137/64*I,-149/64+49/32*I,-177/128-1369/128*I,125/64+87/64*I,-2063/256+541/128*I], + [0,-4*I,0,-6,-4,9-5*I,-4*I,27/2+6*I,-2,17/4-13/2*I,1+I,-19/4+5/4*I,1/2-I,9/4+55/16*I,-3/4,45/32-37/16*I], + [0,1/4+1/2*I,1,-9/4+3*I,-2*I,119/8+29/4*I,1/4+5/2*I,-23/8-57/16*I,1/4+13/4*I,-825/64-147/32*I,21/8+I,-537/64+143/16*I,-5/8-39/16*I,2473/256+137/64*I,-149/64+49/32*I,-177/128-1369/128*I]]''')) + with dotprodsimp(True): + assert M.rank() == 8 + + +def test_issue_18531(): + # solve_linear_system still needs fixing but the rref works. + M = Matrix([ + [1, 1, 1, 1, 1, 0, 1, 0, 0], + [1 + sqrt(2), -1 + sqrt(2), 1 - sqrt(2), -sqrt(2) - 1, 1, 1, -1, 1, 1], + [-5 + 2*sqrt(2), -5 - 2*sqrt(2), -5 - 2*sqrt(2), -5 + 2*sqrt(2), -7, 2, -7, -2, 0], + [-3*sqrt(2) - 1, 1 - 3*sqrt(2), -1 + 3*sqrt(2), 1 + 3*sqrt(2), -7, -5, 7, -5, 3], + [7 - 4*sqrt(2), 4*sqrt(2) + 7, 4*sqrt(2) + 7, 7 - 4*sqrt(2), 7, -12, 7, 12, 0], + [-1 + 3*sqrt(2), 1 + 3*sqrt(2), -3*sqrt(2) - 1, 1 - 3*sqrt(2), 7, -5, -7, -5, 3], + [-3 + 2*sqrt(2), -3 - 2*sqrt(2), -3 - 2*sqrt(2), -3 + 2*sqrt(2), -1, 2, -1, -2, 0], + [1 - sqrt(2), -sqrt(2) - 1, 1 + sqrt(2), -1 + sqrt(2), -1, 1, 1, 1, 1] + ]) + with dotprodsimp(True): + assert M.rref() == (Matrix([ + [1, 0, 0, 0, 0, 0, 0, 0, S(1)/2], + [0, 1, 0, 0, 0, 0, 0, 0, -S(1)/2], + [0, 0, 1, 0, 0, 0, 0, 0, S(1)/2], + [0, 0, 0, 1, 0, 0, 0, 0, -S(1)/2], + [0, 0, 0, 0, 1, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 1, 0, 0, -S(1)/2], + [0, 0, 0, 0, 0, 0, 1, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 1, -S(1)/2]]), (0, 1, 2, 3, 4, 5, 6, 7)) + + +def test_creation(): + raises(ValueError, lambda: Matrix(5, 5, range(20))) + raises(ValueError, lambda: Matrix(5, -1, [])) + raises(IndexError, lambda: Matrix((1, 2))[2]) + with raises(IndexError): + Matrix((1, 2))[3] = 5 + + assert Matrix() == Matrix([]) == Matrix(0, 0, []) + assert Matrix([[]]) == Matrix(1, 0, []) + assert Matrix([[], []]) == Matrix(2, 0, []) + + # anything used to be allowed in a matrix + with warns_deprecated_sympy(): + assert Matrix([[[1], (2,)]]).tolist() == [[[1], (2,)]] + with warns_deprecated_sympy(): + assert Matrix([[[1], (2,)]]).T.tolist() == [[[1]], [(2,)]] + M = Matrix([[0]]) + with warns_deprecated_sympy(): + M[0, 0] = S.EmptySet + + a = Matrix([[x, 0], [0, 0]]) + m = a + assert m.cols == m.rows + assert m.cols == 2 + assert m[:] == [x, 0, 0, 0] + + b = Matrix(2, 2, [x, 0, 0, 0]) + m = b + assert m.cols == m.rows + assert m.cols == 2 + assert m[:] == [x, 0, 0, 0] + + assert a == b + + assert Matrix(b) == b + + c23 = Matrix(2, 3, range(1, 7)) + c13 = Matrix(1, 3, range(7, 10)) + c = Matrix([c23, c13]) + assert c.cols == 3 + assert c.rows == 3 + assert c[:] == [1, 2, 3, 4, 5, 6, 7, 8, 9] + + assert Matrix(eye(2)) == eye(2) + assert ImmutableMatrix(ImmutableMatrix(eye(2))) == ImmutableMatrix(eye(2)) + assert ImmutableMatrix(c) == c.as_immutable() + assert Matrix(ImmutableMatrix(c)) == ImmutableMatrix(c).as_mutable() + + assert c is not Matrix(c) + + dat = [[ones(3,2), ones(3,3)*2], [ones(2,3)*3, ones(2,2)*4]] + M = Matrix(dat) + assert M == Matrix([ + [1, 1, 2, 2, 2], + [1, 1, 2, 2, 2], + [1, 1, 2, 2, 2], + [3, 3, 3, 4, 4], + [3, 3, 3, 4, 4]]) + assert M.tolist() != dat + # keep block form if evaluate=False + assert Matrix(dat, evaluate=False).tolist() == dat + A = MatrixSymbol("A", 2, 2) + dat = [ones(2), A] + assert Matrix(dat) == Matrix([ + [ 1, 1], + [ 1, 1], + [A[0, 0], A[0, 1]], + [A[1, 0], A[1, 1]]]) + with warns_deprecated_sympy(): + assert Matrix(dat, evaluate=False).tolist() == [[i] for i in dat] + + # 0-dim tolerance + assert Matrix([ones(2), ones(0)]) == Matrix([ones(2)]) + raises(ValueError, lambda: Matrix([ones(2), ones(0, 3)])) + raises(ValueError, lambda: Matrix([ones(2), ones(3, 0)])) + + # mix of Matrix and iterable + M = Matrix([[1, 2], [3, 4]]) + M2 = Matrix([M, (5, 6)]) + assert M2 == Matrix([[1, 2], [3, 4], [5, 6]]) + + +def test_irregular_block(): + assert Matrix.irregular(3, ones(2,1), ones(3,3)*2, ones(2,2)*3, + ones(1,1)*4, ones(2,2)*5, ones(1,2)*6, ones(1,2)*7) == Matrix([ + [1, 2, 2, 2, 3, 3], + [1, 2, 2, 2, 3, 3], + [4, 2, 2, 2, 5, 5], + [6, 6, 7, 7, 5, 5]]) + + +def test_tolist(): + lst = [[S.One, S.Half, x*y, S.Zero], [x, y, z, x**2], [y, -S.One, z*x, 3]] + m = Matrix(lst) + assert m.tolist() == lst + + +def test_as_mutable(): + assert zeros(0, 3).as_mutable() == zeros(0, 3) + assert zeros(0, 3).as_immutable() == ImmutableMatrix(zeros(0, 3)) + assert zeros(3, 0).as_immutable() == ImmutableMatrix(zeros(3, 0)) + + +def test_slicing(): + m0 = eye(4) + assert m0[:3, :3] == eye(3) + assert m0[2:4, 0:2] == zeros(2) + + m1 = Matrix(3, 3, lambda i, j: i + j) + assert m1[0, :] == Matrix(1, 3, (0, 1, 2)) + assert m1[1:3, 1] == Matrix(2, 1, (2, 3)) + + m2 = Matrix([[0, 1, 2, 3], [4, 5, 6, 7], [8, 9, 10, 11], [12, 13, 14, 15]]) + assert m2[:, -1] == Matrix(4, 1, [3, 7, 11, 15]) + assert m2[-2:, :] == Matrix([[8, 9, 10, 11], [12, 13, 14, 15]]) + + +def test_submatrix_assignment(): + m = zeros(4) + m[2:4, 2:4] = eye(2) + assert m == Matrix(((0, 0, 0, 0), + (0, 0, 0, 0), + (0, 0, 1, 0), + (0, 0, 0, 1))) + m[:2, :2] = eye(2) + assert m == eye(4) + m[:, 0] = Matrix(4, 1, (1, 2, 3, 4)) + assert m == Matrix(((1, 0, 0, 0), + (2, 1, 0, 0), + (3, 0, 1, 0), + (4, 0, 0, 1))) + m[:, :] = zeros(4) + assert m == zeros(4) + m[:, :] = [(1, 2, 3, 4), (5, 6, 7, 8), (9, 10, 11, 12), (13, 14, 15, 16)] + assert m == Matrix(((1, 2, 3, 4), + (5, 6, 7, 8), + (9, 10, 11, 12), + (13, 14, 15, 16))) + m[:2, 0] = [0, 0] + assert m == Matrix(((0, 2, 3, 4), + (0, 6, 7, 8), + (9, 10, 11, 12), + (13, 14, 15, 16))) + + +def test_extract(): + m = Matrix(4, 3, lambda i, j: i*3 + j) + assert m.extract([0, 1, 3], [0, 1]) == Matrix(3, 2, [0, 1, 3, 4, 9, 10]) + assert m.extract([0, 3], [0, 0, 2]) == Matrix(2, 3, [0, 0, 2, 9, 9, 11]) + assert m.extract(range(4), range(3)) == m + raises(IndexError, lambda: m.extract([4], [0])) + raises(IndexError, lambda: m.extract([0], [3])) + + +def test_reshape(): + m0 = eye(3) + assert m0.reshape(1, 9) == Matrix(1, 9, (1, 0, 0, 0, 1, 0, 0, 0, 1)) + m1 = Matrix(3, 4, lambda i, j: i + j) + assert m1.reshape( + 4, 3) == Matrix(((0, 1, 2), (3, 1, 2), (3, 4, 2), (3, 4, 5))) + assert m1.reshape(2, 6) == Matrix(((0, 1, 2, 3, 1, 2), (3, 4, 2, 3, 4, 5))) + + +def test_applyfunc(): + m0 = eye(3) + assert m0.applyfunc(lambda x: 2*x) == eye(3)*2 + assert m0.applyfunc(lambda x: 0) == zeros(3) + + +def test_expand(): + m0 = Matrix([[x*(x + y), 2], [((x + y)*y)*x, x*(y + x*(x + y))]]) + # Test if expand() returns a matrix + m1 = m0.expand() + assert m1 == Matrix( + [[x*y + x**2, 2], [x*y**2 + y*x**2, x*y + y*x**2 + x**3]]) + + a = Symbol('a', real=True) + + assert Matrix([exp(I*a)]).expand(complex=True) == \ + Matrix([cos(a) + I*sin(a)]) + + assert Matrix([[0, 1, 2], [0, 0, -1], [0, 0, 0]]).exp() == Matrix([ + [1, 1, Rational(3, 2)], + [0, 1, -1], + [0, 0, 1]] + ) + +def test_refine(): + m0 = Matrix([[Abs(x)**2, sqrt(x**2)], + [sqrt(x**2)*Abs(y)**2, sqrt(y**2)*Abs(x)**2]]) + m1 = m0.refine(Q.real(x) & Q.real(y)) + assert m1 == Matrix([[x**2, Abs(x)], [y**2*Abs(x), x**2*Abs(y)]]) + + m1 = m0.refine(Q.positive(x) & Q.positive(y)) + assert m1 == Matrix([[x**2, x], [x*y**2, x**2*y]]) + + m1 = m0.refine(Q.negative(x) & Q.negative(y)) + assert m1 == Matrix([[x**2, -x], [-x*y**2, -x**2*y]]) + +def test_random(): + M = randMatrix(3, 3) + M = randMatrix(3, 3, seed=3) + assert M == randMatrix(3, 3, seed=3) + + M = randMatrix(3, 4, 0, 150) + M = randMatrix(3, seed=4, symmetric=True) + assert M == randMatrix(3, seed=4, symmetric=True) + + S = M.copy() + S.simplify() + assert S == M # doesn't fail when elements are Numbers, not int + + rng = random.Random(4) + assert M == randMatrix(3, symmetric=True, prng=rng) + + # Ensure symmetry + for size in (10, 11): # Test odd and even + for percent in (100, 70, 30): + M = randMatrix(size, symmetric=True, percent=percent, prng=rng) + assert M == M.T + + M = randMatrix(10, min=1, percent=70) + zero_count = 0 + for i in range(M.shape[0]): + for j in range(M.shape[1]): + if M[i, j] == 0: + zero_count += 1 + assert zero_count == 30 + +def test_inverse(): + A = eye(4) + assert A.inv() == eye(4) + assert A.inv(method="LU") == eye(4) + assert A.inv(method="ADJ") == eye(4) + assert A.inv(method="CH") == eye(4) + assert A.inv(method="LDL") == eye(4) + assert A.inv(method="QR") == eye(4) + A = Matrix([[2, 3, 5], + [3, 6, 2], + [8, 3, 6]]) + Ainv = A.inv() + assert A*Ainv == eye(3) + assert A.inv(method="LU") == Ainv + assert A.inv(method="ADJ") == Ainv + assert A.inv(method="CH") == Ainv + assert A.inv(method="LDL") == Ainv + assert A.inv(method="QR") == Ainv + + AA = Matrix([[0, 0, 0, 0, 1, 0, 0, 1, 0, 1, 1, 1, 0, 0, 0, 1, 1, 0, 0, 0, 0, 1, 1, 0, 0], + [1, 0, 1, 0, 0, 1, 0, 0, 1, 0, 1, 0, 1, 1, 1, 0, 1, 1, 0, 0, 0, 0, 0, 1, 0], + [1, 1, 1, 1, 0, 1, 0, 0, 1, 1, 0, 0, 0, 1, 1, 1, 1, 0, 0, 1, 1, 0, 0, 1, 1], + [1, 0, 0, 0, 0, 0, 1, 1, 0, 0, 1, 1, 1, 0, 0, 0, 0, 0, 0, 1, 0, 0, 1, 0, 0], + [1, 0, 0, 1, 1, 1, 0, 1, 0, 0, 1, 0, 0, 1, 1, 1, 0, 1, 0, 0, 0, 1, 0, 0, 0], + [1, 0, 0, 0, 0, 0, 0, 0, 1, 1, 1, 0, 1, 0, 1, 1, 1, 1, 0, 0, 0, 1, 1, 0, 1], + [0, 1, 1, 1, 0, 0, 0, 0, 1, 1, 1, 0, 1, 0, 1, 0, 1, 0, 1, 0, 1, 0, 0, 1, 0], + [1, 1, 0, 0, 0, 1, 1, 0, 0, 1, 1, 0, 1, 1, 0, 1, 1, 0, 1, 0, 1, 1, 0, 1, 1], + [0, 0, 1, 1, 1, 0, 0, 1, 1, 0, 1, 1, 0, 1, 0, 0, 0, 0, 0, 0, 1, 0, 1, 0, 1], + [1, 0, 1, 1, 1, 0, 1, 0, 0, 1, 1, 0, 1, 1, 0, 1, 1, 1, 1, 0, 1, 1, 1, 0, 0], + [0, 1, 1, 0, 0, 0, 0, 1, 1, 0, 1, 0, 1, 0, 1, 1, 0, 0, 1, 0, 0, 0, 1, 1, 0], + [1, 0, 0, 1, 0, 1, 0, 1, 1, 0, 0, 1, 0, 1, 0, 1, 0, 1, 0, 1, 0, 1, 1, 0, 0], + [0, 1, 1, 0, 0, 1, 1, 0, 0, 1, 1, 0, 1, 0, 0, 0, 1, 0, 0, 1, 0, 1, 1, 0, 1], + [1, 1, 1, 0, 1, 0, 0, 1, 0, 0, 1, 0, 1, 1, 0, 0, 1, 1, 1, 0, 1, 0, 1, 1, 0], + [0, 1, 0, 0, 0, 0, 1, 1, 0, 1, 1, 0, 0, 0, 0, 1, 0, 1, 1, 1, 0, 0, 1, 0, 0], + [1, 1, 1, 1, 0, 1, 1, 1, 1, 1, 1, 0, 0, 0, 1, 0, 1, 0, 1, 0, 0, 1, 0, 0, 0], + [0, 0, 0, 1, 0, 1, 1, 0, 1, 0, 0, 0, 0, 0, 1, 0, 1, 1, 0, 1, 0, 1, 1, 0, 1], + [0, 1, 0, 1, 0, 0, 0, 0, 1, 1, 1, 0, 0, 1, 1, 1, 0, 0, 1, 0, 1, 1, 0, 1, 1], + [1, 0, 1, 1, 0, 1, 0, 1, 1, 0, 1, 1, 1, 0, 1, 0, 0, 0, 0, 1, 0, 0, 1, 0, 1], + [0, 0, 0, 1, 0, 0, 1, 1, 0, 1, 1, 0, 1, 0, 1, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [1, 0, 0, 0, 0, 1, 0, 1, 0, 0, 1, 1, 0, 1, 0, 1, 1, 1, 1, 0, 1, 1, 1, 1, 1], + [0, 0, 1, 1, 0, 1, 0, 0, 0, 1, 0, 0, 1, 0, 0, 1, 0, 0, 0, 1, 0, 1, 0, 1, 1], + [0, 0, 0, 0, 0, 1, 1, 1, 0, 1, 1, 1, 0, 0, 0, 1, 0, 1, 1, 0, 1, 1, 0, 0, 0], + [0, 0, 1, 0, 1, 1, 0, 1, 1, 1, 0, 0, 1, 0, 1, 0, 0, 1, 0, 1, 0, 0, 0, 0, 0], + [0, 0, 0, 1, 1, 0, 1, 1, 1, 0, 0, 1, 0, 1, 0, 1, 1, 0, 1, 1, 1, 0, 0, 1, 0]]) + assert AA.inv(method="BLOCK") * AA == eye(AA.shape[0]) + # test that immutability is not a problem + cls = ImmutableMatrix + m = cls([[48, 49, 31], + [ 9, 71, 94], + [59, 28, 65]]) + assert all(type(m.inv(s)) is cls for s in 'GE ADJ LU CH LDL QR'.split()) + cls = ImmutableSparseMatrix + m = cls([[48, 49, 31], + [ 9, 71, 94], + [59, 28, 65]]) + assert all(type(m.inv(s)) is cls for s in 'GE ADJ LU CH LDL QR'.split()) + + +def test_jacobian_hessian(): + L = Matrix(1, 2, [x**2*y, 2*y**2 + x*y]) + syms = [x, y] + assert L.jacobian(syms) == Matrix([[2*x*y, x**2], [y, 4*y + x]]) + + L = Matrix(1, 2, [x, x**2*y**3]) + assert L.jacobian(syms) == Matrix([[1, 0], [2*x*y**3, x**2*3*y**2]]) + + f = x**2*y + syms = [x, y] + assert hessian(f, syms) == Matrix([[2*y, 2*x], [2*x, 0]]) + + f = x**2*y**3 + assert hessian(f, syms) == \ + Matrix([[2*y**3, 6*x*y**2], [6*x*y**2, 6*x**2*y]]) + + f = z + x*y**2 + g = x**2 + 2*y**3 + ans = Matrix([[0, 2*y], + [2*y, 2*x]]) + assert ans == hessian(f, Matrix([x, y])) + assert ans == hessian(f, Matrix([x, y]).T) + assert hessian(f, (y, x), [g]) == Matrix([ + [ 0, 6*y**2, 2*x], + [6*y**2, 2*x, 2*y], + [ 2*x, 2*y, 0]]) + + +def test_wronskian(): + assert wronskian([cos(x), sin(x)], x) == cos(x)**2 + sin(x)**2 + assert wronskian([exp(x), exp(2*x)], x) == exp(3*x) + assert wronskian([exp(x), x], x) == exp(x) - x*exp(x) + assert wronskian([1, x, x**2], x) == 2 + w1 = -6*exp(x)*sin(x)*x + 6*cos(x)*exp(x)*x**2 - 6*exp(x)*cos(x)*x - \ + exp(x)*cos(x)*x**3 + exp(x)*sin(x)*x**3 + assert wronskian([exp(x), cos(x), x**3], x).expand() == w1 + assert wronskian([exp(x), cos(x), x**3], x, method='berkowitz').expand() \ + == w1 + w2 = -x**3*cos(x)**2 - x**3*sin(x)**2 - 6*x*cos(x)**2 - 6*x*sin(x)**2 + assert wronskian([sin(x), cos(x), x**3], x).expand() == w2 + assert wronskian([sin(x), cos(x), x**3], x, method='berkowitz').expand() \ + == w2 + assert wronskian([], x) == 1 + + +def test_subs(): + assert Matrix([[1, x], [x, 4]]).subs(x, 5) == Matrix([[1, 5], [5, 4]]) + assert Matrix([[x, 2], [x + y, 4]]).subs([[x, -1], [y, -2]]) == \ + Matrix([[-1, 2], [-3, 4]]) + assert Matrix([[x, 2], [x + y, 4]]).subs([(x, -1), (y, -2)]) == \ + Matrix([[-1, 2], [-3, 4]]) + assert Matrix([[x, 2], [x + y, 4]]).subs({x: -1, y: -2}) == \ + Matrix([[-1, 2], [-3, 4]]) + assert Matrix([x*y]).subs({x: y - 1, y: x - 1}, simultaneous=True) == \ + Matrix([(x - 1)*(y - 1)]) + + for cls in classes: + assert Matrix([[2, 0], [0, 2]]) == cls.eye(2).subs(1, 2) + +def test_xreplace(): + assert Matrix([[1, x], [x, 4]]).xreplace({x: 5}) == \ + Matrix([[1, 5], [5, 4]]) + assert Matrix([[x, 2], [x + y, 4]]).xreplace({x: -1, y: -2}) == \ + Matrix([[-1, 2], [-3, 4]]) + for cls in classes: + assert Matrix([[2, 0], [0, 2]]) == cls.eye(2).xreplace({1: 2}) + +def test_simplify(): + n = Symbol('n') + f = Function('f') + + M = Matrix([[ 1/x + 1/y, (x + x*y) / x ], + [ (f(x) + y*f(x))/f(x), 2 * (1/n - cos(n * pi)/n) / pi ]]) + M.simplify() + assert M == Matrix([[ (x + y)/(x * y), 1 + y ], + [ 1 + y, 2*((1 - 1*cos(pi*n))/(pi*n)) ]]) + eq = (1 + x)**2 + M = Matrix([[eq]]) + M.simplify() + assert M == Matrix([[eq]]) + M.simplify(ratio=oo) + assert M == Matrix([[eq.simplify(ratio=oo)]]) + + +def test_transpose(): + M = Matrix([[1, 2, 3, 4, 5, 6, 7, 8, 9, 0], + [1, 2, 3, 4, 5, 6, 7, 8, 9, 0]]) + assert M.T == Matrix( [ [1, 1], + [2, 2], + [3, 3], + [4, 4], + [5, 5], + [6, 6], + [7, 7], + [8, 8], + [9, 9], + [0, 0] ]) + assert M.T.T == M + assert M.T == M.transpose() + + +def test_conjugate(): + M = Matrix([[0, I, 5], + [1, 2, 0]]) + + assert M.T == Matrix([[0, 1], + [I, 2], + [5, 0]]) + + assert M.C == Matrix([[0, -I, 5], + [1, 2, 0]]) + assert M.C == M.conjugate() + + assert M.H == M.T.C + assert M.H == Matrix([[ 0, 1], + [-I, 2], + [ 5, 0]]) + + +def test_conj_dirac(): + raises(AttributeError, lambda: eye(3).D) + + M = Matrix([[1, I, I, I], + [0, 1, I, I], + [0, 0, 1, I], + [0, 0, 0, 1]]) + + assert M.D == Matrix([[ 1, 0, 0, 0], + [-I, 1, 0, 0], + [-I, -I, -1, 0], + [-I, -I, I, -1]]) + + +def test_trace(): + M = Matrix([[1, 0, 0], + [0, 5, 0], + [0, 0, 8]]) + assert M.trace() == 14 + + +def test_shape(): + M = Matrix([[x, 0, 0], + [0, y, 0]]) + assert M.shape == (2, 3) + + +def test_col_row_op(): + M = Matrix([[x, 0, 0], + [0, y, 0]]) + M.row_op(1, lambda r, j: r + j + 1) + assert M == Matrix([[x, 0, 0], + [1, y + 2, 3]]) + + M.col_op(0, lambda c, j: c + y**j) + assert M == Matrix([[x + 1, 0, 0], + [1 + y, y + 2, 3]]) + + # neither row nor slice give copies that allow the original matrix to + # be changed + assert M.row(0) == Matrix([[x + 1, 0, 0]]) + r1 = M.row(0) + r1[0] = 42 + assert M[0, 0] == x + 1 + r1 = M[0, :-1] # also testing negative slice + r1[0] = 42 + assert M[0, 0] == x + 1 + c1 = M.col(0) + assert c1 == Matrix([x + 1, 1 + y]) + c1[0] = 0 + assert M[0, 0] == x + 1 + c1 = M[:, 0] + c1[0] = 42 + assert M[0, 0] == x + 1 + + +def test_row_mult(): + M = Matrix([[1,2,3], + [4,5,6]]) + M.row_mult(1,3) + assert M[1,0] == 12 + assert M[0,0] == 1 + assert M[1,2] == 18 + + +def test_row_add(): + M = Matrix([[1,2,3], + [4,5,6], + [1,1,1]]) + M.row_add(2,0,5) + assert M[0,0] == 6 + assert M[1,0] == 4 + assert M[0,2] == 8 + + +def test_zip_row_op(): + for cls in classes[:2]: # XXX: immutable matrices don't support row ops + M = cls.eye(3) + M.zip_row_op(1, 0, lambda v, u: v + 2*u) + assert M == cls([[1, 0, 0], + [2, 1, 0], + [0, 0, 1]]) + + M = cls.eye(3)*2 + M[0, 1] = -1 + M.zip_row_op(1, 0, lambda v, u: v + 2*u); M + assert M == cls([[2, -1, 0], + [4, 0, 0], + [0, 0, 2]]) + +def test_issue_3950(): + m = Matrix([1, 2, 3]) + a = Matrix([1, 2, 3]) + b = Matrix([2, 2, 3]) + assert not (m in []) + assert not (m in [1]) + assert m != 1 + assert m == a + assert m != b + + +def test_issue_3981(): + class Index1: + def __index__(self): + return 1 + + class Index2: + def __index__(self): + return 2 + index1 = Index1() + index2 = Index2() + + m = Matrix([1, 2, 3]) + + assert m[index2] == 3 + + m[index2] = 5 + assert m[2] == 5 + + m = Matrix([[1, 2, 3], [4, 5, 6]]) + assert m[index1, index2] == 6 + assert m[1, index2] == 6 + assert m[index1, 2] == 6 + + m[index1, index2] = 4 + assert m[1, 2] == 4 + m[1, index2] = 6 + assert m[1, 2] == 6 + m[index1, 2] = 8 + assert m[1, 2] == 8 + + +def test_evalf(): + a = Matrix([sqrt(5), 6]) + assert all(a.evalf()[i] == a[i].evalf() for i in range(2)) + assert all(a.evalf(2)[i] == a[i].evalf(2) for i in range(2)) + assert all(a.n(2)[i] == a[i].n(2) for i in range(2)) + + +def test_is_symbolic(): + a = Matrix([[x, x], [x, x]]) + assert a.is_symbolic() is True + a = Matrix([[1, 2, 3, 4], [5, 6, 7, 8]]) + assert a.is_symbolic() is False + a = Matrix([[1, 2, 3, 4], [5, 6, x, 8]]) + assert a.is_symbolic() is True + a = Matrix([[1, x, 3]]) + assert a.is_symbolic() is True + a = Matrix([[1, 2, 3]]) + assert a.is_symbolic() is False + a = Matrix([[1], [x], [3]]) + assert a.is_symbolic() is True + a = Matrix([[1], [2], [3]]) + assert a.is_symbolic() is False + + +def test_is_upper(): + a = Matrix([[1, 2, 3]]) + assert a.is_upper is True + a = Matrix([[1], [2], [3]]) + assert a.is_upper is False + a = zeros(4, 2) + assert a.is_upper is True + + +def test_is_lower(): + a = Matrix([[1, 2, 3]]) + assert a.is_lower is False + a = Matrix([[1], [2], [3]]) + assert a.is_lower is True + + +def test_is_nilpotent(): + a = Matrix(4, 4, [0, 2, 1, 6, 0, 0, 1, 2, 0, 0, 0, 3, 0, 0, 0, 0]) + assert a.is_nilpotent() + a = Matrix([[1, 0], [0, 1]]) + assert not a.is_nilpotent() + a = Matrix([]) + assert a.is_nilpotent() + + +def test_zeros_ones_fill(): + n, m = 3, 5 + + a = zeros(n, m) + a.fill( 5 ) + + b = 5 * ones(n, m) + + assert a == b + assert a.rows == b.rows == 3 + assert a.cols == b.cols == 5 + assert a.shape == b.shape == (3, 5) + assert zeros(2) == zeros(2, 2) + assert ones(2) == ones(2, 2) + assert zeros(2, 3) == Matrix(2, 3, [0]*6) + assert ones(2, 3) == Matrix(2, 3, [1]*6) + + a.fill(0) + assert a == zeros(n, m) + + +def test_empty_zeros(): + a = zeros(0) + assert a == Matrix() + a = zeros(0, 2) + assert a.rows == 0 + assert a.cols == 2 + a = zeros(2, 0) + assert a.rows == 2 + assert a.cols == 0 + + +def test_issue_3749(): + a = Matrix([[x**2, x*y], [x*sin(y), x*cos(y)]]) + assert a.diff(x) == Matrix([[2*x, y], [sin(y), cos(y)]]) + assert Matrix([ + [x, -x, x**2], + [exp(x), 1/x - exp(-x), x + 1/x]]).limit(x, oo) == \ + Matrix([[oo, -oo, oo], [oo, 0, oo]]) + assert Matrix([ + [(exp(x) - 1)/x, 2*x + y*x, x**x ], + [1/x, abs(x), abs(sin(x + 1))]]).limit(x, 0) == \ + Matrix([[1, 0, 1], [oo, 0, sin(1)]]) + assert a.integrate(x) == Matrix([ + [Rational(1, 3)*x**3, y*x**2/2], + [x**2*sin(y)/2, x**2*cos(y)/2]]) + + +def test_inv_iszerofunc(): + A = eye(4) + A.col_swap(0, 1) + for method in "GE", "LU": + assert A.inv(method=method, iszerofunc=lambda x: x == 0) == \ + A.inv(method="ADJ") + + +def test_jacobian_metrics(): + rho, phi = symbols("rho,phi") + X = Matrix([rho*cos(phi), rho*sin(phi)]) + Y = Matrix([rho, phi]) + J = X.jacobian(Y) + assert J == X.jacobian(Y.T) + assert J == (X.T).jacobian(Y) + assert J == (X.T).jacobian(Y.T) + g = J.T*eye(J.shape[0])*J + g = g.applyfunc(trigsimp) + assert g == Matrix([[1, 0], [0, rho**2]]) + + +def test_jacobian2(): + rho, phi = symbols("rho,phi") + X = Matrix([rho*cos(phi), rho*sin(phi), rho**2]) + Y = Matrix([rho, phi]) + J = Matrix([ + [cos(phi), -rho*sin(phi)], + [sin(phi), rho*cos(phi)], + [ 2*rho, 0], + ]) + assert X.jacobian(Y) == J + + +def test_issue_4564(): + X = Matrix([exp(x + y + z), exp(x + y + z), exp(x + y + z)]) + Y = Matrix([x, y, z]) + for i in range(1, 3): + for j in range(1, 3): + X_slice = X[:i, :] + Y_slice = Y[:j, :] + J = X_slice.jacobian(Y_slice) + assert J.rows == i + assert J.cols == j + for k in range(j): + assert J[:, k] == X_slice + + +def test_nonvectorJacobian(): + X = Matrix([[exp(x + y + z), exp(x + y + z)], + [exp(x + y + z), exp(x + y + z)]]) + raises(TypeError, lambda: X.jacobian(Matrix([x, y, z]))) + X = X[0, :] + Y = Matrix([[x, y], [x, z]]) + raises(TypeError, lambda: X.jacobian(Y)) + raises(TypeError, lambda: X.jacobian(Matrix([ [x, y], [x, z] ]))) + + +def test_vec(): + m = Matrix([[1, 3], [2, 4]]) + m_vec = m.vec() + assert m_vec.cols == 1 + for i in range(4): + assert m_vec[i] == i + 1 + + +def test_vech(): + m = Matrix([[1, 2], [2, 3]]) + m_vech = m.vech() + assert m_vech.cols == 1 + for i in range(3): + assert m_vech[i] == i + 1 + m_vech = m.vech(diagonal=False) + assert m_vech[0] == 2 + + m = Matrix([[1, x*(x + y)], [y*x + x**2, 1]]) + m_vech = m.vech(diagonal=False) + assert m_vech[0] == y*x + x**2 + + m = Matrix([[1, x*(x + y)], [y*x, 1]]) + m_vech = m.vech(diagonal=False, check_symmetry=False) + assert m_vech[0] == y*x + + raises(ShapeError, lambda: Matrix([[1, 3]]).vech()) + raises(ValueError, lambda: Matrix([[1, 3], [2, 4]]).vech()) + raises(ShapeError, lambda: Matrix([[1, 3]]).vech()) + raises(ValueError, lambda: Matrix([[1, 3], [2, 4]]).vech()) + + +def test_diag(): + # mostly tested in testcommonmatrix.py + assert diag([1, 2, 3]) == Matrix([1, 2, 3]) + m = [1, 2, [3]] + raises(ValueError, lambda: diag(m)) + assert diag(m, strict=False) == Matrix([1, 2, 3]) + + +def test_get_diag_blocks1(): + a = Matrix([[1, 2], [2, 3]]) + b = Matrix([[3, x], [y, 3]]) + c = Matrix([[3, x, 3], [y, 3, z], [x, y, z]]) + assert a.get_diag_blocks() == [a] + assert b.get_diag_blocks() == [b] + assert c.get_diag_blocks() == [c] + + +def test_get_diag_blocks2(): + a = Matrix([[1, 2], [2, 3]]) + b = Matrix([[3, x], [y, 3]]) + c = Matrix([[3, x, 3], [y, 3, z], [x, y, z]]) + assert diag(a, b, b).get_diag_blocks() == [a, b, b] + assert diag(a, b, c).get_diag_blocks() == [a, b, c] + assert diag(a, c, b).get_diag_blocks() == [a, c, b] + assert diag(c, c, b).get_diag_blocks() == [c, c, b] + + +def test_inv_block(): + a = Matrix([[1, 2], [2, 3]]) + b = Matrix([[3, x], [y, 3]]) + c = Matrix([[3, x, 3], [y, 3, z], [x, y, z]]) + A = diag(a, b, b) + assert A.inv(try_block_diag=True) == diag(a.inv(), b.inv(), b.inv()) + A = diag(a, b, c) + assert A.inv(try_block_diag=True) == diag(a.inv(), b.inv(), c.inv()) + A = diag(a, c, b) + assert A.inv(try_block_diag=True) == diag(a.inv(), c.inv(), b.inv()) + A = diag(a, a, b, a, c, a) + assert A.inv(try_block_diag=True) == diag( + a.inv(), a.inv(), b.inv(), a.inv(), c.inv(), a.inv()) + assert A.inv(try_block_diag=True, method="ADJ") == diag( + a.inv(method="ADJ"), a.inv(method="ADJ"), b.inv(method="ADJ"), + a.inv(method="ADJ"), c.inv(method="ADJ"), a.inv(method="ADJ")) + + +def test_creation_args(): + """ + Check that matrix dimensions can be specified using any reasonable type + (see issue 4614). + """ + raises(ValueError, lambda: zeros(3, -1)) + raises(TypeError, lambda: zeros(1, 2, 3, 4)) + assert zeros(int(3)) == zeros(3) + assert zeros(Integer(3)) == zeros(3) + raises(ValueError, lambda: zeros(3.)) + assert eye(int(3)) == eye(3) + assert eye(Integer(3)) == eye(3) + raises(ValueError, lambda: eye(3.)) + assert ones(int(3), Integer(4)) == ones(3, 4) + raises(TypeError, lambda: Matrix(5)) + raises(TypeError, lambda: Matrix(1, 2)) + raises(ValueError, lambda: Matrix([1, [2]])) + + +def test_diagonal_symmetrical(): + m = Matrix(2, 2, [0, 1, 1, 0]) + assert not m.is_diagonal() + assert m.is_symmetric() + assert m.is_symmetric(simplify=False) + + m = Matrix(2, 2, [1, 0, 0, 1]) + assert m.is_diagonal() + + m = diag(1, 2, 3) + assert m.is_diagonal() + assert m.is_symmetric() + + m = Matrix(3, 3, [1, 0, 0, 0, 2, 0, 0, 0, 3]) + assert m == diag(1, 2, 3) + + m = Matrix(2, 3, zeros(2, 3)) + assert not m.is_symmetric() + assert m.is_diagonal() + + m = Matrix(((5, 0), (0, 6), (0, 0))) + assert m.is_diagonal() + + m = Matrix(((5, 0, 0), (0, 6, 0))) + assert m.is_diagonal() + + m = Matrix(3, 3, [1, x**2 + 2*x + 1, y, (x + 1)**2, 2, 0, y, 0, 3]) + assert m.is_symmetric() + assert not m.is_symmetric(simplify=False) + assert m.expand().is_symmetric(simplify=False) + + +def test_diagonalization(): + m = Matrix([[1, 2+I], [2-I, 3]]) + assert m.is_diagonalizable() + + m = Matrix(3, 2, [-3, 1, -3, 20, 3, 10]) + assert not m.is_diagonalizable() + assert not m.is_symmetric() + raises(NonSquareMatrixError, lambda: m.diagonalize()) + + # diagonalizable + m = diag(1, 2, 3) + (P, D) = m.diagonalize() + assert P == eye(3) + assert D == m + + m = Matrix(2, 2, [0, 1, 1, 0]) + assert m.is_symmetric() + assert m.is_diagonalizable() + (P, D) = m.diagonalize() + assert P.inv() * m * P == D + + m = Matrix(2, 2, [1, 0, 0, 3]) + assert m.is_symmetric() + assert m.is_diagonalizable() + (P, D) = m.diagonalize() + assert P.inv() * m * P == D + assert P == eye(2) + assert D == m + + m = Matrix(2, 2, [1, 1, 0, 0]) + assert m.is_diagonalizable() + (P, D) = m.diagonalize() + assert P.inv() * m * P == D + + m = Matrix(3, 3, [1, 2, 0, 0, 3, 0, 2, -4, 2]) + assert m.is_diagonalizable() + (P, D) = m.diagonalize() + assert P.inv() * m * P == D + for i in P: + assert i.as_numer_denom()[1] == 1 + + m = Matrix(2, 2, [1, 0, 0, 0]) + assert m.is_diagonal() + assert m.is_diagonalizable() + (P, D) = m.diagonalize() + assert P.inv() * m * P == D + assert P == Matrix([[0, 1], [1, 0]]) + + # diagonalizable, complex only + m = Matrix(2, 2, [0, 1, -1, 0]) + assert not m.is_diagonalizable(True) + raises(MatrixError, lambda: m.diagonalize(True)) + assert m.is_diagonalizable() + (P, D) = m.diagonalize() + assert P.inv() * m * P == D + + # not diagonalizable + m = Matrix(2, 2, [0, 1, 0, 0]) + assert not m.is_diagonalizable() + raises(MatrixError, lambda: m.diagonalize()) + + m = Matrix(3, 3, [-3, 1, -3, 20, 3, 10, 2, -2, 4]) + assert not m.is_diagonalizable() + raises(MatrixError, lambda: m.diagonalize()) + + # symbolic + a, b, c, d = symbols('a b c d') + m = Matrix(2, 2, [a, c, c, b]) + assert m.is_symmetric() + assert m.is_diagonalizable() + + +def test_issue_15887(): + # Mutable matrix should not use cache + a = MutableDenseMatrix([[0, 1], [1, 0]]) + assert a.is_diagonalizable() is True + a[1, 0] = 0 + assert a.is_diagonalizable() is False + + a = MutableDenseMatrix([[0, 1], [1, 0]]) + a.diagonalize() + a[1, 0] = 0 + raises(MatrixError, lambda: a.diagonalize()) + + +def test_jordan_form(): + + m = Matrix(3, 2, [-3, 1, -3, 20, 3, 10]) + raises(NonSquareMatrixError, lambda: m.jordan_form()) + + # diagonalizable + m = Matrix(3, 3, [7, -12, 6, 10, -19, 10, 12, -24, 13]) + Jmust = Matrix(3, 3, [-1, 0, 0, 0, 1, 0, 0, 0, 1]) + P, J = m.jordan_form() + assert Jmust == J + assert Jmust == m.diagonalize()[1] + + # m = Matrix(3, 3, [0, 6, 3, 1, 3, 1, -2, 2, 1]) + # m.jordan_form() # very long + # m.jordan_form() # + + # diagonalizable, complex only + + # Jordan cells + # complexity: one of eigenvalues is zero + m = Matrix(3, 3, [0, 1, 0, -4, 4, 0, -2, 1, 2]) + # The blocks are ordered according to the value of their eigenvalues, + # in order to make the matrix compatible with .diagonalize() + Jmust = Matrix(3, 3, [2, 1, 0, 0, 2, 0, 0, 0, 2]) + P, J = m.jordan_form() + assert Jmust == J + + # complexity: all of eigenvalues are equal + m = Matrix(3, 3, [2, 6, -15, 1, 1, -5, 1, 2, -6]) + # Jmust = Matrix(3, 3, [-1, 0, 0, 0, -1, 1, 0, 0, -1]) + # same here see 1456ff + Jmust = Matrix(3, 3, [-1, 1, 0, 0, -1, 0, 0, 0, -1]) + P, J = m.jordan_form() + assert Jmust == J + + # complexity: two of eigenvalues are zero + m = Matrix(3, 3, [4, -5, 2, 5, -7, 3, 6, -9, 4]) + Jmust = Matrix(3, 3, [0, 1, 0, 0, 0, 0, 0, 0, 1]) + P, J = m.jordan_form() + assert Jmust == J + + m = Matrix(4, 4, [6, 5, -2, -3, -3, -1, 3, 3, 2, 1, -2, -3, -1, 1, 5, 5]) + Jmust = Matrix(4, 4, [2, 1, 0, 0, + 0, 2, 0, 0, + 0, 0, 2, 1, + 0, 0, 0, 2] + ) + P, J = m.jordan_form() + assert Jmust == J + + m = Matrix(4, 4, [6, 2, -8, -6, -3, 2, 9, 6, 2, -2, -8, -6, -1, 0, 3, 4]) + # Jmust = Matrix(4, 4, [2, 0, 0, 0, 0, 2, 1, 0, 0, 0, 2, 0, 0, 0, 0, -2]) + # same here see 1456ff + Jmust = Matrix(4, 4, [-2, 0, 0, 0, + 0, 2, 1, 0, + 0, 0, 2, 0, + 0, 0, 0, 2]) + P, J = m.jordan_form() + assert Jmust == J + + m = Matrix(4, 4, [5, 4, 2, 1, 0, 1, -1, -1, -1, -1, 3, 0, 1, 1, -1, 2]) + assert not m.is_diagonalizable() + Jmust = Matrix(4, 4, [1, 0, 0, 0, 0, 2, 0, 0, 0, 0, 4, 1, 0, 0, 0, 4]) + P, J = m.jordan_form() + assert Jmust == J + + # checking for maximum precision to remain unchanged + m = Matrix([[Float('1.0', precision=110), Float('2.0', precision=110)], + [Float('3.14159265358979323846264338327', precision=110), Float('4.0', precision=110)]]) + P, J = m.jordan_form() + for term in J.values(): + if isinstance(term, Float): + assert term._prec == 110 + + +def test_jordan_form_complex_issue_9274(): + A = Matrix([[ 2, 4, 1, 0], + [-4, 2, 0, 1], + [ 0, 0, 2, 4], + [ 0, 0, -4, 2]]) + p = 2 - 4*I + q = 2 + 4*I + Jmust1 = Matrix([[p, 1, 0, 0], + [0, p, 0, 0], + [0, 0, q, 1], + [0, 0, 0, q]]) + Jmust2 = Matrix([[q, 1, 0, 0], + [0, q, 0, 0], + [0, 0, p, 1], + [0, 0, 0, p]]) + P, J = A.jordan_form() + assert J == Jmust1 or J == Jmust2 + assert simplify(P*J*P.inv()) == A + +def test_issue_10220(): + # two non-orthogonal Jordan blocks with eigenvalue 1 + M = Matrix([[1, 0, 0, 1], + [0, 1, 1, 0], + [0, 0, 1, 1], + [0, 0, 0, 1]]) + P, J = M.jordan_form() + assert P == Matrix([[0, 1, 0, 1], + [1, 0, 0, 0], + [0, 1, 0, 0], + [0, 0, 1, 0]]) + assert J == Matrix([ + [1, 1, 0, 0], + [0, 1, 1, 0], + [0, 0, 1, 0], + [0, 0, 0, 1]]) + +def test_jordan_form_issue_15858(): + A = Matrix([ + [1, 1, 1, 0], + [-2, -1, 0, -1], + [0, 0, -1, -1], + [0, 0, 2, 1]]) + (P, J) = A.jordan_form() + assert P.expand() == Matrix([ + [ -I, -I/2, I, I/2], + [-1 + I, 0, -1 - I, 0], + [ 0, -S(1)/2 - I/2, 0, -S(1)/2 + I/2], + [ 0, 1, 0, 1]]) + assert J == Matrix([ + [-I, 1, 0, 0], + [0, -I, 0, 0], + [0, 0, I, 1], + [0, 0, 0, I]]) + +def test_Matrix_berkowitz_charpoly(): + UA, K_i, K_w = symbols('UA K_i K_w') + + A = Matrix([[-K_i - UA + K_i**2/(K_i + K_w), K_i*K_w/(K_i + K_w)], + [ K_i*K_w/(K_i + K_w), -K_w + K_w**2/(K_i + K_w)]]) + + charpoly = A.charpoly(x) + + assert charpoly == \ + Poly(x**2 + (K_i*UA + K_w*UA + 2*K_i*K_w)/(K_i + K_w)*x + + K_i*K_w*UA/(K_i + K_w), x, domain='ZZ(K_i,K_w,UA)') + + assert type(charpoly) is PurePoly + + A = Matrix([[1, 3], [2, 0]]) + assert A.charpoly() == A.charpoly(x) == PurePoly(x**2 - x - 6) + + A = Matrix([[1, 2], [x, 0]]) + p = A.charpoly(x) + assert p.gen != x + assert p.as_expr().subs(p.gen, x) == x**2 - 3*x + + +def test_exp_jordan_block(): + l = Symbol('lamda') + + m = Matrix.jordan_block(1, l) + assert m._eval_matrix_exp_jblock() == Matrix([[exp(l)]]) + + m = Matrix.jordan_block(3, l) + assert m._eval_matrix_exp_jblock() == \ + Matrix([ + [exp(l), exp(l), exp(l)/2], + [0, exp(l), exp(l)], + [0, 0, exp(l)]]) + + +def test_exp(): + m = Matrix([[3, 4], [0, -2]]) + m_exp = Matrix([[exp(3), -4*exp(-2)/5 + 4*exp(3)/5], [0, exp(-2)]]) + assert m.exp() == m_exp + assert exp(m) == m_exp + + m = Matrix([[1, 0], [0, 1]]) + assert m.exp() == Matrix([[E, 0], [0, E]]) + assert exp(m) == Matrix([[E, 0], [0, E]]) + + m = Matrix([[1, -1], [1, 1]]) + assert m.exp() == Matrix([[E*cos(1), -E*sin(1)], [E*sin(1), E*cos(1)]]) + + +def test_log(): + l = Symbol('lamda') + + m = Matrix.jordan_block(1, l) + assert m._eval_matrix_log_jblock() == Matrix([[log(l)]]) + + m = Matrix.jordan_block(4, l) + assert m._eval_matrix_log_jblock() == \ + Matrix( + [ + [log(l), 1/l, -1/(2*l**2), 1/(3*l**3)], + [0, log(l), 1/l, -1/(2*l**2)], + [0, 0, log(l), 1/l], + [0, 0, 0, log(l)] + ] + ) + + m = Matrix( + [[0, 0, 1], + [0, 0, 0], + [-1, 0, 0]] + ) + raises(MatrixError, lambda: m.log()) + + +def test_has(): + A = Matrix(((x, y), (2, 3))) + assert A.has(x) + assert not A.has(z) + assert A.has(Symbol) + + A = A.subs(x, 2) + assert not A.has(x) + + +def test_find_reasonable_pivot_naive_finds_guaranteed_nonzero1(): + # Test if matrices._find_reasonable_pivot_naive() + # finds a guaranteed non-zero pivot when the + # some of the candidate pivots are symbolic expressions. + # Keyword argument: simpfunc=None indicates that no simplifications + # should be performed during the search. + x = Symbol('x') + column = Matrix(3, 1, [x, cos(x)**2 + sin(x)**2, S.Half]) + pivot_offset, pivot_val, pivot_assumed_nonzero, simplified =\ + _find_reasonable_pivot_naive(column) + assert pivot_val == S.Half + +def test_find_reasonable_pivot_naive_finds_guaranteed_nonzero2(): + # Test if matrices._find_reasonable_pivot_naive() + # finds a guaranteed non-zero pivot when the + # some of the candidate pivots are symbolic expressions. + # Keyword argument: simpfunc=_simplify indicates that the search + # should attempt to simplify candidate pivots. + x = Symbol('x') + column = Matrix(3, 1, + [x, + cos(x)**2+sin(x)**2+x**2, + cos(x)**2+sin(x)**2]) + pivot_offset, pivot_val, pivot_assumed_nonzero, simplified =\ + _find_reasonable_pivot_naive(column, simpfunc=_simplify) + assert pivot_val == 1 + +def test_find_reasonable_pivot_naive_simplifies(): + # Test if matrices._find_reasonable_pivot_naive() + # simplifies candidate pivots, and reports + # their offsets correctly. + x = Symbol('x') + column = Matrix(3, 1, + [x, + cos(x)**2+sin(x)**2+x, + cos(x)**2+sin(x)**2]) + pivot_offset, pivot_val, pivot_assumed_nonzero, simplified =\ + _find_reasonable_pivot_naive(column, simpfunc=_simplify) + + assert len(simplified) == 2 + assert simplified[0][0] == 1 + assert simplified[0][1] == 1+x + assert simplified[1][0] == 2 + assert simplified[1][1] == 1 + +def test_errors(): + raises(ValueError, lambda: Matrix([[1, 2], [1]])) + raises(IndexError, lambda: Matrix([[1, 2]])[1.2, 5]) + raises(IndexError, lambda: Matrix([[1, 2]])[1, 5.2]) + raises(ValueError, lambda: randMatrix(3, c=4, symmetric=True)) + raises(ValueError, lambda: Matrix([1, 2]).reshape(4, 6)) + raises(ShapeError, + lambda: Matrix([[1, 2], [3, 4]]).copyin_matrix([1, 0], Matrix([1, 2]))) + raises(TypeError, lambda: Matrix([[1, 2], [3, 4]]).copyin_list([0, + 1], set())) + raises(NonSquareMatrixError, lambda: Matrix([[1, 2, 3], [2, 3, 0]]).inv()) + raises(ShapeError, + lambda: Matrix(1, 2, [1, 2]).row_join(Matrix([[1, 2], [3, 4]]))) + raises( + ShapeError, lambda: Matrix([1, 2]).col_join(Matrix([[1, 2], [3, 4]]))) + raises(ShapeError, lambda: Matrix([1]).row_insert(1, Matrix([[1, + 2], [3, 4]]))) + raises(ShapeError, lambda: Matrix([1]).col_insert(1, Matrix([[1, + 2], [3, 4]]))) + raises(NonSquareMatrixError, lambda: Matrix([1, 2]).trace()) + raises(TypeError, lambda: Matrix([1]).applyfunc(1)) + raises(ValueError, lambda: Matrix([[1, 2], [3, 4]]).minor(4, 5)) + raises(ValueError, lambda: Matrix([[1, 2], [3, 4]]).minor_submatrix(4, 5)) + raises(TypeError, lambda: Matrix([1, 2, 3]).cross(1)) + raises(TypeError, lambda: Matrix([1, 2, 3]).dot(1)) + raises(ShapeError, lambda: Matrix([1, 2, 3]).dot(Matrix([1, 2]))) + raises(ShapeError, lambda: Matrix([1, 2]).dot([])) + raises(TypeError, lambda: Matrix([1, 2]).dot('a')) + raises(ShapeError, lambda: Matrix([1, 2]).dot([1, 2, 3])) + raises(NonSquareMatrixError, lambda: Matrix([1, 2, 3]).exp()) + raises(ShapeError, lambda: Matrix([[1, 2], [3, 4]]).normalized()) + raises(ValueError, lambda: Matrix([1, 2]).inv(method='not a method')) + raises(NonSquareMatrixError, lambda: Matrix([1, 2]).inverse_GE()) + raises(ValueError, lambda: Matrix([[1, 2], [1, 2]]).inverse_GE()) + raises(NonSquareMatrixError, lambda: Matrix([1, 2]).inverse_ADJ()) + raises(ValueError, lambda: Matrix([[1, 2], [1, 2]]).inverse_ADJ()) + raises(NonSquareMatrixError, lambda: Matrix([1, 2]).inverse_LU()) + raises(NonSquareMatrixError, lambda: Matrix([1, 2]).is_nilpotent()) + raises(NonSquareMatrixError, lambda: Matrix([1, 2]).det()) + raises(ValueError, + lambda: Matrix([[1, 2], [3, 4]]).det(method='Not a real method')) + raises(ValueError, + lambda: Matrix([[1, 2, 3, 4], [5, 6, 7, 8], + [9, 10, 11, 12], [13, 14, 15, 16]]).det(iszerofunc="Not function")) + raises(ValueError, + lambda: Matrix([[1, 2, 3, 4], [5, 6, 7, 8], + [9, 10, 11, 12], [13, 14, 15, 16]]).det(iszerofunc=False)) + raises(ValueError, + lambda: hessian(Matrix([[1, 2], [3, 4]]), Matrix([[1, 2], [2, 1]]))) + raises(ValueError, lambda: hessian(Matrix([[1, 2], [3, 4]]), [])) + raises(ValueError, lambda: hessian(Symbol('x')**2, 'a')) + raises(IndexError, lambda: eye(3)[5, 2]) + raises(IndexError, lambda: eye(3)[2, 5]) + M = Matrix(((1, 2, 3, 4), (5, 6, 7, 8), (9, 10, 11, 12), (13, 14, 15, 16))) + raises(ValueError, lambda: M.det('method=LU_decomposition()')) + V = Matrix([[10, 10, 10]]) + M = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + raises(ValueError, lambda: M.row_insert(4.7, V)) + M = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + raises(ValueError, lambda: M.col_insert(-4.2, V)) + +def test_len(): + assert len(Matrix()) == 0 + assert len(Matrix([[1, 2]])) == len(Matrix([[1], [2]])) == 2 + assert len(Matrix(0, 2, lambda i, j: 0)) == \ + len(Matrix(2, 0, lambda i, j: 0)) == 0 + assert len(Matrix([[0, 1, 2], [3, 4, 5]])) == 6 + assert Matrix([1]) == Matrix([[1]]) + assert not Matrix() + assert Matrix() == Matrix([]) + + +def test_integrate(): + A = Matrix(((1, 4, x), (y, 2, 4), (10, 5, x**2))) + assert A.integrate(x) == \ + Matrix(((x, 4*x, x**2/2), (x*y, 2*x, 4*x), (10*x, 5*x, x**3/3))) + assert A.integrate(y) == \ + Matrix(((y, 4*y, x*y), (y**2/2, 2*y, 4*y), (10*y, 5*y, y*x**2))) + + +def test_limit(): + A = Matrix(((1, 4, sin(x)/x), (y, 2, 4), (10, 5, x**2 + 1))) + assert A.limit(x, 0) == Matrix(((1, 4, 1), (y, 2, 4), (10, 5, 1))) + + +def test_diff(): + A = MutableDenseMatrix(((1, 4, x), (y, 2, 4), (10, 5, x**2 + 1))) + assert isinstance(A.diff(x), type(A)) + assert A.diff(x) == MutableDenseMatrix(((0, 0, 1), (0, 0, 0), (0, 0, 2*x))) + assert A.diff(y) == MutableDenseMatrix(((0, 0, 0), (1, 0, 0), (0, 0, 0))) + + assert diff(A, x) == MutableDenseMatrix(((0, 0, 1), (0, 0, 0), (0, 0, 2*x))) + assert diff(A, y) == MutableDenseMatrix(((0, 0, 0), (1, 0, 0), (0, 0, 0))) + + A_imm = A.as_immutable() + assert isinstance(A_imm.diff(x), type(A_imm)) + assert A_imm.diff(x) == ImmutableDenseMatrix(((0, 0, 1), (0, 0, 0), (0, 0, 2*x))) + assert A_imm.diff(y) == ImmutableDenseMatrix(((0, 0, 0), (1, 0, 0), (0, 0, 0))) + + assert diff(A_imm, x) == ImmutableDenseMatrix(((0, 0, 1), (0, 0, 0), (0, 0, 2*x))) + assert diff(A_imm, y) == ImmutableDenseMatrix(((0, 0, 0), (1, 0, 0), (0, 0, 0))) + + assert A.diff(x, evaluate=False) == ArrayDerivative(A, x, evaluate=False) + assert diff(A, x, evaluate=False) == ArrayDerivative(A, x, evaluate=False) + + +def test_diff_by_matrix(): + + # Derive matrix by matrix: + + A = MutableDenseMatrix([[x, y], [z, t]]) + assert A.diff(A) == Array([[[[1, 0], [0, 0]], [[0, 1], [0, 0]]], [[[0, 0], [1, 0]], [[0, 0], [0, 1]]]]) + assert diff(A, A) == Array([[[[1, 0], [0, 0]], [[0, 1], [0, 0]]], [[[0, 0], [1, 0]], [[0, 0], [0, 1]]]]) + + A_imm = A.as_immutable() + assert A_imm.diff(A_imm) == Array([[[[1, 0], [0, 0]], [[0, 1], [0, 0]]], [[[0, 0], [1, 0]], [[0, 0], [0, 1]]]]) + assert diff(A_imm, A_imm) == Array([[[[1, 0], [0, 0]], [[0, 1], [0, 0]]], [[[0, 0], [1, 0]], [[0, 0], [0, 1]]]]) + + # Derive a constant matrix: + assert A.diff(a) == MutableDenseMatrix([[0, 0], [0, 0]]) + + B = ImmutableDenseMatrix([a, b]) + assert A.diff(B) == Array.zeros(2, 1, 2, 2) + assert A.diff(A) == Array([[[[1, 0], [0, 0]], [[0, 1], [0, 0]]], [[[0, 0], [1, 0]], [[0, 0], [0, 1]]]]) + + # Test diff with tuples: + + dB = B.diff([[a, b]]) + assert dB.shape == (2, 2, 1) + assert dB == Array([[[1], [0]], [[0], [1]]]) + + f = Function("f") + fxyz = f(x, y, z) + assert fxyz.diff([[x, y, z]]) == Array([fxyz.diff(x), fxyz.diff(y), fxyz.diff(z)]) + assert fxyz.diff(([x, y, z], 2)) == Array([ + [fxyz.diff(x, 2), fxyz.diff(x, y), fxyz.diff(x, z)], + [fxyz.diff(x, y), fxyz.diff(y, 2), fxyz.diff(y, z)], + [fxyz.diff(x, z), fxyz.diff(z, y), fxyz.diff(z, 2)], + ]) + + expr = sin(x)*exp(y) + assert expr.diff([[x, y]]) == Array([cos(x)*exp(y), sin(x)*exp(y)]) + assert expr.diff(y, ((x, y),)) == Array([cos(x)*exp(y), sin(x)*exp(y)]) + assert expr.diff(x, ((x, y),)) == Array([-sin(x)*exp(y), cos(x)*exp(y)]) + assert expr.diff(((y, x),), [[x, y]]) == Array([[cos(x)*exp(y), -sin(x)*exp(y)], [sin(x)*exp(y), cos(x)*exp(y)]]) + + # Test different notations: + + assert fxyz.diff(x).diff(y).diff(x) == fxyz.diff(((x, y, z),), 3)[0, 1, 0] + assert fxyz.diff(z).diff(y).diff(x) == fxyz.diff(((x, y, z),), 3)[2, 1, 0] + assert fxyz.diff([[x, y, z]], ((z, y, x),)) == Array([[fxyz.diff(i).diff(j) for i in (x, y, z)] for j in (z, y, x)]) + + # Test scalar derived by matrix remains matrix: + res = x.diff(Matrix([[x, y]])) + assert isinstance(res, ImmutableDenseMatrix) + assert res == Matrix([[1, 0]]) + res = (x**3).diff(Matrix([[x, y]])) + assert isinstance(res, ImmutableDenseMatrix) + assert res == Matrix([[3*x**2, 0]]) + + +def test_getattr(): + A = Matrix(((1, 4, x), (y, 2, 4), (10, 5, x**2 + 1))) + raises(AttributeError, lambda: A.nonexistantattribute) + assert getattr(A, 'diff')(x) == Matrix(((0, 0, 1), (0, 0, 0), (0, 0, 2*x))) + + +def test_hessenberg(): + A = Matrix([[3, 4, 1], [2, 4, 5], [0, 1, 2]]) + assert A.is_upper_hessenberg + A = A.T + assert A.is_lower_hessenberg + A[0, -1] = 1 + assert A.is_lower_hessenberg is False + + A = Matrix([[3, 4, 1], [2, 4, 5], [3, 1, 2]]) + assert not A.is_upper_hessenberg + + A = zeros(5, 2) + assert A.is_upper_hessenberg + + +def test_cholesky(): + raises(NonSquareMatrixError, lambda: Matrix((1, 2)).cholesky()) + raises(ValueError, lambda: Matrix(((1, 2), (3, 4))).cholesky()) + raises(ValueError, lambda: Matrix(((5 + I, 0), (0, 1))).cholesky()) + raises(ValueError, lambda: Matrix(((1, 5), (5, 1))).cholesky()) + raises(ValueError, lambda: Matrix(((1, 2), (3, 4))).cholesky(hermitian=False)) + assert Matrix(((5 + I, 0), (0, 1))).cholesky(hermitian=False) == Matrix([ + [sqrt(5 + I), 0], [0, 1]]) + A = Matrix(((1, 5), (5, 1))) + L = A.cholesky(hermitian=False) + assert L == Matrix([[1, 0], [5, 2*sqrt(6)*I]]) + assert L*L.T == A + A = Matrix(((25, 15, -5), (15, 18, 0), (-5, 0, 11))) + L = A.cholesky() + assert L * L.T == A + assert L.is_lower + assert L == Matrix([[5, 0, 0], [3, 3, 0], [-1, 1, 3]]) + A = Matrix(((4, -2*I, 2 + 2*I), (2*I, 2, -1 + I), (2 - 2*I, -1 - I, 11))) + assert A.cholesky().expand() == Matrix(((2, 0, 0), (I, 1, 0), (1 - I, 0, 3))) + + raises(NonSquareMatrixError, lambda: SparseMatrix((1, 2)).cholesky()) + raises(ValueError, lambda: SparseMatrix(((1, 2), (3, 4))).cholesky()) + raises(ValueError, lambda: SparseMatrix(((5 + I, 0), (0, 1))).cholesky()) + raises(ValueError, lambda: SparseMatrix(((1, 5), (5, 1))).cholesky()) + raises(ValueError, lambda: SparseMatrix(((1, 2), (3, 4))).cholesky(hermitian=False)) + assert SparseMatrix(((5 + I, 0), (0, 1))).cholesky(hermitian=False) == Matrix([ + [sqrt(5 + I), 0], [0, 1]]) + A = SparseMatrix(((1, 5), (5, 1))) + L = A.cholesky(hermitian=False) + assert L == Matrix([[1, 0], [5, 2*sqrt(6)*I]]) + assert L*L.T == A + A = SparseMatrix(((25, 15, -5), (15, 18, 0), (-5, 0, 11))) + L = A.cholesky() + assert L * L.T == A + assert L.is_lower + assert L == Matrix([[5, 0, 0], [3, 3, 0], [-1, 1, 3]]) + A = SparseMatrix(((4, -2*I, 2 + 2*I), (2*I, 2, -1 + I), (2 - 2*I, -1 - I, 11))) + assert A.cholesky() == Matrix(((2, 0, 0), (I, 1, 0), (1 - I, 0, 3))) + + +def test_matrix_norm(): + # Vector Tests + # Test columns and symbols + x = Symbol('x', real=True) + v = Matrix([cos(x), sin(x)]) + assert trigsimp(v.norm(2)) == 1 + assert v.norm(10) == Pow(cos(x)**10 + sin(x)**10, Rational(1, 10)) + + # Test Rows + A = Matrix([[5, Rational(3, 2)]]) + assert A.norm() == Pow(25 + Rational(9, 4), S.Half) + assert A.norm(oo) == max(A) + assert A.norm(-oo) == min(A) + + # Matrix Tests + # Intuitive test + A = Matrix([[1, 1], [1, 1]]) + assert A.norm(2) == 2 + assert A.norm(-2) == 0 + assert A.norm('frobenius') == 2 + assert eye(10).norm(2) == eye(10).norm(-2) == 1 + assert A.norm(oo) == 2 + + # Test with Symbols and more complex entries + A = Matrix([[3, y, y], [x, S.Half, -pi]]) + assert (A.norm('fro') + == sqrt(Rational(37, 4) + 2*abs(y)**2 + pi**2 + x**2)) + + # Check non-square + A = Matrix([[1, 2, -3], [4, 5, Rational(13, 2)]]) + assert A.norm(2) == sqrt(Rational(389, 8) + sqrt(78665)/8) + assert A.norm(-2) is S.Zero + assert A.norm('frobenius') == sqrt(389)/2 + + # Test properties of matrix norms + # https://en.wikipedia.org/wiki/Matrix_norm#Definition + # Two matrices + A = Matrix([[1, 2], [3, 4]]) + B = Matrix([[5, 5], [-2, 2]]) + C = Matrix([[0, -I], [I, 0]]) + D = Matrix([[1, 0], [0, -1]]) + L = [A, B, C, D] + alpha = Symbol('alpha', real=True) + + for order in ['fro', 2, -2]: + # Zero Check + assert zeros(3).norm(order) is S.Zero + # Check Triangle Inequality for all Pairs of Matrices + for X in L: + for Y in L: + dif = (X.norm(order) + Y.norm(order) - + (X + Y).norm(order)) + assert (dif >= 0) + # Scalar multiplication linearity + for M in [A, B, C, D]: + dif = simplify((alpha*M).norm(order) - + abs(alpha) * M.norm(order)) + assert dif == 0 + + # Test Properties of Vector Norms + # https://en.wikipedia.org/wiki/Vector_norm + # Two column vectors + a = Matrix([1, 1 - 1*I, -3]) + b = Matrix([S.Half, 1*I, 1]) + c = Matrix([-1, -1, -1]) + d = Matrix([3, 2, I]) + e = Matrix([Integer(1e2), Rational(1, 1e2), 1]) + L = [a, b, c, d, e] + alpha = Symbol('alpha', real=True) + + for order in [1, 2, -1, -2, S.Infinity, S.NegativeInfinity, pi]: + # Zero Check + if order > 0: + assert Matrix([0, 0, 0]).norm(order) is S.Zero + # Triangle inequality on all pairs + if order >= 1: # Triangle InEq holds only for these norms + for X in L: + for Y in L: + dif = (X.norm(order) + Y.norm(order) - + (X + Y).norm(order)) + assert simplify(dif >= 0) is S.true + # Linear to scalar multiplication + if order in [1, 2, -1, -2, S.Infinity, S.NegativeInfinity]: + for X in L: + dif = simplify((alpha*X).norm(order) - + (abs(alpha) * X.norm(order))) + assert dif == 0 + + # ord=1 + M = Matrix(3, 3, [1, 3, 0, -2, -1, 0, 3, 9, 6]) + assert M.norm(1) == 13 + + +def test_condition_number(): + x = Symbol('x', real=True) + A = eye(3) + A[0, 0] = 10 + A[2, 2] = Rational(1, 10) + assert A.condition_number() == 100 + + A[1, 1] = x + assert A.condition_number() == Max(10, Abs(x)) / Min(Rational(1, 10), Abs(x)) + + M = Matrix([[cos(x), sin(x)], [-sin(x), cos(x)]]) + Mc = M.condition_number() + assert all(Float(1.).epsilon_eq(Mc.subs(x, val).evalf()) for val in + [Rational(1, 5), S.Half, Rational(1, 10), pi/2, pi, pi*Rational(7, 4) ]) + + #issue 10782 + assert Matrix([]).condition_number() == 0 + + +def test_equality(): + A = Matrix(((1, 2, 3), (4, 5, 6), (7, 8, 9))) + B = Matrix(((9, 8, 7), (6, 5, 4), (3, 2, 1))) + assert A == A[:, :] + assert not A != A[:, :] + assert not A == B + assert A != B + assert A != 10 + assert not A == 10 + + # A SparseMatrix can be equal to a Matrix + C = SparseMatrix(((1, 0, 0), (0, 1, 0), (0, 0, 1))) + D = Matrix(((1, 0, 0), (0, 1, 0), (0, 0, 1))) + assert C == D + assert not C != D + + +def test_col_join(): + assert eye(3).col_join(Matrix([[7, 7, 7]])) == \ + Matrix([[1, 0, 0], + [0, 1, 0], + [0, 0, 1], + [7, 7, 7]]) + + +def test_row_insert(): + r4 = Matrix([[4, 4, 4]]) + for i in range(-4, 5): + l = [1, 0, 0] + l.insert(i, 4) + assert flatten(eye(3).row_insert(i, r4).col(0).tolist()) == l + + +def test_col_insert(): + c4 = Matrix([4, 4, 4]) + for i in range(-4, 5): + l = [0, 0, 0] + l.insert(i, 4) + assert flatten(zeros(3).col_insert(i, c4).row(0).tolist()) == l + + +def test_normalized(): + assert Matrix([3, 4]).normalized() == \ + Matrix([Rational(3, 5), Rational(4, 5)]) + + # Zero vector trivial cases + assert Matrix([0, 0, 0]).normalized() == Matrix([0, 0, 0]) + + # Machine precision error truncation trivial cases + m = Matrix([0,0,1.e-100]) + assert m.normalized( + iszerofunc=lambda x: x.evalf(n=10, chop=True).is_zero + ) == Matrix([0, 0, 0]) + + +def test_print_nonzero(): + assert capture(lambda: eye(3).print_nonzero()) == \ + '[X ]\n[ X ]\n[ X]\n' + assert capture(lambda: eye(3).print_nonzero('.')) == \ + '[. ]\n[ . ]\n[ .]\n' + + +def test_zeros_eye(): + assert Matrix.eye(3) == eye(3) + assert Matrix.zeros(3) == zeros(3) + assert ones(3, 4) == Matrix(3, 4, [1]*12) + + i = Matrix([[1, 0], [0, 1]]) + z = Matrix([[0, 0], [0, 0]]) + for cls in classes: + m = cls.eye(2) + assert i == m # but m == i will fail if m is immutable + assert i == eye(2, cls=cls) + assert type(m) == cls + m = cls.zeros(2) + assert z == m + assert z == zeros(2, cls=cls) + assert type(m) == cls + + +def test_is_zero(): + assert Matrix().is_zero_matrix + assert Matrix([[0, 0], [0, 0]]).is_zero_matrix + assert zeros(3, 4).is_zero_matrix + assert not eye(3).is_zero_matrix + assert Matrix([[x, 0], [0, 0]]).is_zero_matrix == None + assert SparseMatrix([[x, 0], [0, 0]]).is_zero_matrix == None + assert ImmutableMatrix([[x, 0], [0, 0]]).is_zero_matrix == None + assert ImmutableSparseMatrix([[x, 0], [0, 0]]).is_zero_matrix == None + assert Matrix([[x, 1], [0, 0]]).is_zero_matrix == False + a = Symbol('a', nonzero=True) + assert Matrix([[a, 0], [0, 0]]).is_zero_matrix == False + + +def test_rotation_matrices(): + # This tests the rotation matrices by rotating about an axis and back. + theta = pi/3 + r3_plus = rot_axis3(theta) + r3_minus = rot_axis3(-theta) + r2_plus = rot_axis2(theta) + r2_minus = rot_axis2(-theta) + r1_plus = rot_axis1(theta) + r1_minus = rot_axis1(-theta) + assert r3_minus*r3_plus*eye(3) == eye(3) + assert r2_minus*r2_plus*eye(3) == eye(3) + assert r1_minus*r1_plus*eye(3) == eye(3) + + # Check the correctness of the trace of the rotation matrix + assert r1_plus.trace() == 1 + 2*cos(theta) + assert r2_plus.trace() == 1 + 2*cos(theta) + assert r3_plus.trace() == 1 + 2*cos(theta) + + # Check that a rotation with zero angle doesn't change anything. + assert rot_axis1(0) == eye(3) + assert rot_axis2(0) == eye(3) + assert rot_axis3(0) == eye(3) + + # Check left-hand convention + # see Issue #24529 + q1 = Quaternion.from_axis_angle([1, 0, 0], pi / 2) + q2 = Quaternion.from_axis_angle([0, 1, 0], pi / 2) + q3 = Quaternion.from_axis_angle([0, 0, 1], pi / 2) + assert rot_axis1(- pi / 2) == q1.to_rotation_matrix() + assert rot_axis2(- pi / 2) == q2.to_rotation_matrix() + assert rot_axis3(- pi / 2) == q3.to_rotation_matrix() + # Check right-hand convention + assert rot_ccw_axis1(+ pi / 2) == q1.to_rotation_matrix() + assert rot_ccw_axis2(+ pi / 2) == q2.to_rotation_matrix() + assert rot_ccw_axis3(+ pi / 2) == q3.to_rotation_matrix() + + +def test_DeferredVector(): + assert str(DeferredVector("vector")[4]) == "vector[4]" + assert sympify(DeferredVector("d")) == DeferredVector("d") + raises(IndexError, lambda: DeferredVector("d")[-1]) + assert str(DeferredVector("d")) == "d" + assert repr(DeferredVector("test")) == "DeferredVector('test')" + +def test_DeferredVector_not_iterable(): + assert not iterable(DeferredVector('X')) + +def test_DeferredVector_Matrix(): + raises(TypeError, lambda: Matrix(DeferredVector("V"))) + +def test_GramSchmidt(): + R = Rational + m1 = Matrix(1, 2, [1, 2]) + m2 = Matrix(1, 2, [2, 3]) + assert GramSchmidt([m1, m2]) == \ + [Matrix(1, 2, [1, 2]), Matrix(1, 2, [R(2)/5, R(-1)/5])] + assert GramSchmidt([m1.T, m2.T]) == \ + [Matrix(2, 1, [1, 2]), Matrix(2, 1, [R(2)/5, R(-1)/5])] + # from wikipedia + assert GramSchmidt([Matrix([3, 1]), Matrix([2, 2])], True) == [ + Matrix([3*sqrt(10)/10, sqrt(10)/10]), + Matrix([-sqrt(10)/10, 3*sqrt(10)/10])] + # https://github.com/sympy/sympy/issues/9488 + L = FiniteSet(Matrix([1])) + assert GramSchmidt(L) == [Matrix([[1]])] + + +def test_casoratian(): + assert casoratian([1, 2, 3, 4], 1) == 0 + assert casoratian([1, 2, 3, 4], 1, zero=False) == 0 + + +def test_zero_dimension_multiply(): + assert (Matrix()*zeros(0, 3)).shape == (0, 3) + assert zeros(3, 0)*zeros(0, 3) == zeros(3, 3) + assert zeros(0, 3)*zeros(3, 0) == Matrix() + + +def test_slice_issue_2884(): + m = Matrix(2, 2, range(4)) + assert m[1, :] == Matrix([[2, 3]]) + assert m[-1, :] == Matrix([[2, 3]]) + assert m[:, 1] == Matrix([[1, 3]]).T + assert m[:, -1] == Matrix([[1, 3]]).T + raises(IndexError, lambda: m[2, :]) + raises(IndexError, lambda: m[2, 2]) + + +def test_slice_issue_3401(): + assert zeros(0, 3)[:, -1].shape == (0, 1) + assert zeros(3, 0)[0, :] == Matrix(1, 0, []) + + +def test_copyin(): + s = zeros(3, 3) + s[3] = 1 + assert s[:, 0] == Matrix([0, 1, 0]) + assert s[3] == 1 + assert s[3: 4] == [1] + s[1, 1] = 42 + assert s[1, 1] == 42 + assert s[1, 1:] == Matrix([[42, 0]]) + s[1, 1:] = Matrix([[5, 6]]) + assert s[1, :] == Matrix([[1, 5, 6]]) + s[1, 1:] = [[42, 43]] + assert s[1, :] == Matrix([[1, 42, 43]]) + s[0, 0] = 17 + assert s[:, :1] == Matrix([17, 1, 0]) + s[0, 0] = [1, 1, 1] + assert s[:, 0] == Matrix([1, 1, 1]) + s[0, 0] = Matrix([1, 1, 1]) + assert s[:, 0] == Matrix([1, 1, 1]) + s[0, 0] = SparseMatrix([1, 1, 1]) + assert s[:, 0] == Matrix([1, 1, 1]) + + +def test_invertible_check(): + # sometimes a singular matrix will have a pivot vector shorter than + # the number of rows in a matrix... + assert Matrix([[1, 2], [1, 2]]).rref() == (Matrix([[1, 2], [0, 0]]), (0,)) + raises(ValueError, lambda: Matrix([[1, 2], [1, 2]]).inv()) + m = Matrix([ + [-1, -1, 0], + [ x, 1, 1], + [ 1, x, -1], + ]) + assert len(m.rref()[1]) != m.rows + # in addition, unless simplify=True in the call to rref, the identity + # matrix will be returned even though m is not invertible + assert m.rref()[0] != eye(3) + assert m.rref(simplify=signsimp)[0] != eye(3) + raises(ValueError, lambda: m.inv(method="ADJ")) + raises(ValueError, lambda: m.inv(method="GE")) + raises(ValueError, lambda: m.inv(method="LU")) + + +def test_issue_3959(): + x, y = symbols('x, y') + e = x*y + assert e.subs(x, Matrix([3, 5, 3])) == Matrix([3, 5, 3])*y + + +def test_issue_5964(): + assert str(Matrix([[1, 2], [3, 4]])) == 'Matrix([[1, 2], [3, 4]])' + + +def test_issue_7604(): + x, y = symbols("x y") + assert sstr(Matrix([[x, 2*y], [y**2, x + 3]])) == \ + 'Matrix([\n[ x, 2*y],\n[y**2, x + 3]])' + + +def test_is_Identity(): + assert eye(3).is_Identity + assert eye(3).as_immutable().is_Identity + assert not zeros(3).is_Identity + assert not ones(3).is_Identity + # issue 6242 + assert not Matrix([[1, 0, 0]]).is_Identity + # issue 8854 + assert SparseMatrix(3,3, {(0,0):1, (1,1):1, (2,2):1}).is_Identity + assert not SparseMatrix(2,3, range(6)).is_Identity + assert not SparseMatrix(3,3, {(0,0):1, (1,1):1}).is_Identity + assert not SparseMatrix(3,3, {(0,0):1, (1,1):1, (2,2):1, (0,1):2, (0,2):3}).is_Identity + + +def test_dot(): + assert ones(1, 3).dot(ones(3, 1)) == 3 + assert ones(1, 3).dot([1, 1, 1]) == 3 + assert Matrix([1, 2, 3]).dot(Matrix([1, 2, 3])) == 14 + assert Matrix([1, 2, 3*I]).dot(Matrix([I, 2, 3*I])) == -5 + I + assert Matrix([1, 2, 3*I]).dot(Matrix([I, 2, 3*I]), hermitian=False) == -5 + I + assert Matrix([1, 2, 3*I]).dot(Matrix([I, 2, 3*I]), hermitian=True) == 13 + I + assert Matrix([1, 2, 3*I]).dot(Matrix([I, 2, 3*I]), hermitian=True, conjugate_convention="physics") == 13 - I + assert Matrix([1, 2, 3*I]).dot(Matrix([4, 5*I, 6]), hermitian=True, conjugate_convention="right") == 4 + 8*I + assert Matrix([1, 2, 3*I]).dot(Matrix([4, 5*I, 6]), hermitian=True, conjugate_convention="left") == 4 - 8*I + assert Matrix([I, 2*I]).dot(Matrix([I, 2*I]), hermitian=False, conjugate_convention="left") == -5 + assert Matrix([I, 2*I]).dot(Matrix([I, 2*I]), conjugate_convention="left") == 5 + raises(ValueError, lambda: Matrix([1, 2]).dot(Matrix([3, 4]), hermitian=True, conjugate_convention="test")) + + +def test_dual(): + B_x, B_y, B_z, E_x, E_y, E_z = symbols( + 'B_x B_y B_z E_x E_y E_z', real=True) + F = Matrix(( + ( 0, E_x, E_y, E_z), + (-E_x, 0, B_z, -B_y), + (-E_y, -B_z, 0, B_x), + (-E_z, B_y, -B_x, 0) + )) + Fd = Matrix(( + ( 0, -B_x, -B_y, -B_z), + (B_x, 0, E_z, -E_y), + (B_y, -E_z, 0, E_x), + (B_z, E_y, -E_x, 0) + )) + assert F.dual().equals(Fd) + assert eye(3).dual().equals(zeros(3)) + assert F.dual().dual().equals(-F) + + +def test_anti_symmetric(): + assert Matrix([1, 2]).is_anti_symmetric() is False + m = Matrix(3, 3, [0, x**2 + 2*x + 1, y, -(x + 1)**2, 0, x*y, -y, -x*y, 0]) + assert m.is_anti_symmetric() is True + assert m.is_anti_symmetric(simplify=False) is None + assert m.is_anti_symmetric(simplify=lambda x: x) is None + + # tweak to fail + m[2, 1] = -m[2, 1] + assert m.is_anti_symmetric() is None + # untweak + m[2, 1] = -m[2, 1] + + m = m.expand() + assert m.is_anti_symmetric(simplify=False) is True + m[0, 0] = 1 + assert m.is_anti_symmetric() is False + + +def test_normalize_sort_diogonalization(): + A = Matrix(((1, 2), (2, 1))) + P, Q = A.diagonalize(normalize=True) + assert P*P.T == P.T*P == eye(P.cols) + P, Q = A.diagonalize(normalize=True, sort=True) + assert P*P.T == P.T*P == eye(P.cols) + assert P*Q*P.inv() == A + + +def test_issue_5321(): + raises(ValueError, lambda: Matrix([[1, 2, 3], Matrix(0, 1, [])])) + + +def test_issue_5320(): + assert Matrix.hstack(eye(2), 2*eye(2)) == Matrix([ + [1, 0, 2, 0], + [0, 1, 0, 2] + ]) + assert Matrix.vstack(eye(2), 2*eye(2)) == Matrix([ + [1, 0], + [0, 1], + [2, 0], + [0, 2] + ]) + cls = SparseMatrix + assert cls.hstack(cls(eye(2)), cls(2*eye(2))) == Matrix([ + [1, 0, 2, 0], + [0, 1, 0, 2] + ]) + +def test_issue_11944(): + A = Matrix([[1]]) + AIm = sympify(A) + assert Matrix.hstack(AIm, A) == Matrix([[1, 1]]) + assert Matrix.vstack(AIm, A) == Matrix([[1], [1]]) + +def test_cross(): + a = [1, 2, 3] + b = [3, 4, 5] + col = Matrix([-2, 4, -2]) + row = col.T + + def test(M, ans): + assert ans == M + assert type(M) == cls + for cls in classes: + A = cls(a) + B = cls(b) + test(A.cross(B), col) + test(A.cross(B.T), col) + test(A.T.cross(B.T), row) + test(A.T.cross(B), row) + raises(ShapeError, lambda: + Matrix(1, 2, [1, 1]).cross(Matrix(1, 2, [1, 1]))) + +def test_hat_vee(): + v1 = Matrix([x, y, z]) + v2 = Matrix([a, b, c]) + assert v1.hat() * v2 == v1.cross(v2) + assert v1.hat().is_anti_symmetric() + assert v1.hat().vee() == v1 + +def test_hash(): + for cls in classes[-2:]: + s = {cls.eye(1), cls.eye(1)} + assert len(s) == 1 and s.pop() == cls.eye(1) + # issue 3979 + for cls in classes[:2]: + assert not isinstance(cls.eye(1), Hashable) + + +@XFAIL +def test_issue_3979(): + # when this passes, delete this and change the [1:2] + # to [:2] in the test_hash above for issue 3979 + cls = classes[0] + raises(AttributeError, lambda: hash(cls.eye(1))) + + +def test_adjoint(): + dat = [[0, I], [1, 0]] + ans = Matrix([[0, 1], [-I, 0]]) + for cls in classes: + assert ans == cls(dat).adjoint() + + +def test_adjoint_with_operator(): + # Regression test for issue 25130: adjoint() should propagate to operators + import sympy.physics.quantum + a = sympy.physics.quantum.operator.Operator('a') + a_dag = sympy.physics.quantum.Dagger(a) + dat = [[0, I * a], [0, a_dag]] + ans = Matrix([[0, 0], [-I * a_dag, a]]) + for cls in classes: + assert ans == cls(dat).adjoint() + + +def test_simplify_immutable(): + assert simplify(ImmutableMatrix([[sin(x)**2 + cos(x)**2]])) == \ + ImmutableMatrix([[1]]) + +def test_replace(): + F, G = symbols('F, G', cls=Function) + K = Matrix(2, 2, lambda i, j: G(i+j)) + M = Matrix(2, 2, lambda i, j: F(i+j)) + N = M.replace(F, G) + assert N == K + + +def test_atoms(): + m = Matrix([[1, 2], [x, 1 - 1/x]]) + assert m.atoms() == {S.One,S(2),S.NegativeOne, x} + assert m.atoms(Symbol) == {x} + + +def test_pinv(): + # Pseudoinverse of an invertible matrix is the inverse. + A1 = Matrix([[a, b], [c, d]]) + assert simplify(A1.pinv(method="RD")) == simplify(A1.inv()) + + # Test the four properties of the pseudoinverse for various matrices. + As = [Matrix([[13, 104], [2212, 3], [-3, 5]]), + Matrix([[1, 7, 9], [11, 17, 19]]), + Matrix([a, b])] + + for A in As: + A_pinv = A.pinv(method="RD") + AAp = A * A_pinv + ApA = A_pinv * A + assert simplify(AAp * A) == A + assert simplify(ApA * A_pinv) == A_pinv + assert AAp.H == AAp + assert ApA.H == ApA + + # XXX Pinv with diagonalization makes expression too complicated. + for A in As: + A_pinv = simplify(A.pinv(method="ED")) + AAp = A * A_pinv + ApA = A_pinv * A + assert simplify(AAp * A) == A + assert simplify(ApA * A_pinv) == A_pinv + assert AAp.H == AAp + assert ApA.H == ApA + + # XXX Computing pinv using diagonalization makes an expression that + # is too complicated to simplify. + # A1 = Matrix([[a, b], [c, d]]) + # assert simplify(A1.pinv(method="ED")) == simplify(A1.inv()) + # so this is tested numerically at a fixed random point + + from sympy.core.numbers import comp + q = A1.pinv(method="ED") + w = A1.inv() + reps = {a: -73633, b: 11362, c: 55486, d: 62570} + assert all( + comp(i.n(), j.n()) + for i, j in zip(q.subs(reps), w.subs(reps)) + ) + + +@slow +def test_pinv_rank_deficient_when_diagonalization_fails(): + # Test the four properties of the pseudoinverse for matrices when + # diagonalization of A.H*A fails. + As = [ + Matrix([ + [61, 89, 55, 20, 71, 0], + [62, 96, 85, 85, 16, 0], + [69, 56, 17, 4, 54, 0], + [10, 54, 91, 41, 71, 0], + [ 7, 30, 10, 48, 90, 0], + [0, 0, 0, 0, 0, 0]]) + ] + for A in As: + A_pinv = A.pinv(method="ED") + AAp = A * A_pinv + ApA = A_pinv * A + assert AAp.H == AAp + + # Here ApA.H and ApA are equivalent expressions but they are very + # complicated expressions involving RootOfs. Using simplify would be + # too slow and so would evalf so we substitute approximate values for + # the RootOfs and then evalf which is less accurate but good enough to + # confirm that these two matrices are equivalent. + # + # assert ApA.H == ApA # <--- would fail (structural equality) + # assert simplify(ApA.H - ApA).is_zero_matrix # <--- too slow + # (ApA.H - ApA).evalf() # <--- too slow + + def allclose(M1, M2): + rootofs = M1.atoms(RootOf) + rootofs_approx = {r: r.evalf() for r in rootofs} + diff_approx = (M1 - M2).xreplace(rootofs_approx).evalf() + return all(abs(e) < 1e-10 for e in diff_approx) + + assert allclose(ApA.H, ApA) + + +def test_issue_7201(): + assert ones(0, 1) + ones(0, 1) == Matrix(0, 1, []) + assert ones(1, 0) + ones(1, 0) == Matrix(1, 0, []) + +def test_free_symbols(): + for M in ImmutableMatrix, ImmutableSparseMatrix, Matrix, SparseMatrix: + assert M([[x], [0]]).free_symbols == {x} + +def test_from_ndarray(): + """See issue 7465.""" + try: + from numpy import array + except ImportError: + skip('NumPy must be available to test creating matrices from ndarrays') + + assert Matrix(array([1, 2, 3])) == Matrix([1, 2, 3]) + assert Matrix(array([[1, 2, 3]])) == Matrix([[1, 2, 3]]) + assert Matrix(array([[1, 2, 3], [4, 5, 6]])) == \ + Matrix([[1, 2, 3], [4, 5, 6]]) + assert Matrix(array([x, y, z])) == Matrix([x, y, z]) + raises(NotImplementedError, + lambda: Matrix(array([[[1, 2], [3, 4]], [[5, 6], [7, 8]]]))) + assert Matrix([array([1, 2]), array([3, 4])]) == Matrix([[1, 2], [3, 4]]) + assert Matrix([array([1, 2]), [3, 4]]) == Matrix([[1, 2], [3, 4]]) + assert Matrix([array([]), array([])]) == Matrix(2, 0, []) != Matrix(0, 0, []) + +def test_17522_numpy(): + from sympy.matrices.common import _matrixify + try: + from numpy import array, matrix + except ImportError: + skip('NumPy must be available to test indexing matrixified NumPy ndarrays and matrices') + + m = _matrixify(array([[1, 2], [3, 4]])) + assert m[3] == 4 + assert list(m) == [1, 2, 3, 4] + + with ignore_warnings(PendingDeprecationWarning): + m = _matrixify(matrix([[1, 2], [3, 4]])) + assert m[3] == 4 + assert list(m) == [1, 2, 3, 4] + +def test_17522_mpmath(): + from sympy.matrices.common import _matrixify + try: + from mpmath import matrix + except ImportError: + skip('mpmath must be available to test indexing matrixified mpmath matrices') + + m = _matrixify(matrix([[1, 2], [3, 4]])) + assert m[3] == 4.0 + assert list(m) == [1.0, 2.0, 3.0, 4.0] + +def test_17522_scipy(): + from sympy.matrices.common import _matrixify + try: + from scipy.sparse import csr_matrix + except ImportError: + skip('SciPy must be available to test indexing matrixified SciPy sparse matrices') + + m = _matrixify(csr_matrix([[1, 2], [3, 4]])) + assert m[3] == 4 + assert list(m) == [1, 2, 3, 4] + +def test_hermitian(): + a = Matrix([[1, I], [-I, 1]]) + assert a.is_hermitian + a[0, 0] = 2*I + assert a.is_hermitian is False + a[0, 0] = x + assert a.is_hermitian is None + a[0, 1] = a[1, 0]*I + assert a.is_hermitian is False + b = HermitianOperator("b") + c = Operator("c") + assert Matrix([[b]]).is_hermitian is True + assert Matrix([[b, c], [Dagger(c), b]]).is_hermitian is True + assert Matrix([[b, c], [c, b]]).is_hermitian is False + assert Matrix([[b, c], [transpose(c), b]]).is_hermitian is False + +def test_doit(): + a = Matrix([[Add(x,x, evaluate=False)]]) + assert a[0] != 2*x + assert a.doit() == Matrix([[2*x]]) + +def test_issue_9457_9467_9876(): + # for row_del(index) + M = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + M.row_del(1) + assert M == Matrix([[1, 2, 3], [3, 4, 5]]) + N = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + N.row_del(-2) + assert N == Matrix([[1, 2, 3], [3, 4, 5]]) + O = Matrix([[1, 2, 3], [5, 6, 7], [9, 10, 11]]) + O.row_del(-1) + assert O == Matrix([[1, 2, 3], [5, 6, 7]]) + P = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + raises(IndexError, lambda: P.row_del(10)) + Q = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + raises(IndexError, lambda: Q.row_del(-10)) + + # for col_del(index) + M = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + M.col_del(1) + assert M == Matrix([[1, 3], [2, 4], [3, 5]]) + N = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + N.col_del(-2) + assert N == Matrix([[1, 3], [2, 4], [3, 5]]) + P = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + raises(IndexError, lambda: P.col_del(10)) + Q = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + raises(IndexError, lambda: Q.col_del(-10)) + +def test_issue_9422(): + x, y = symbols('x y', commutative=False) + a, b = symbols('a b') + M = eye(2) + M1 = Matrix(2, 2, [x, y, y, z]) + assert y*x*M != x*y*M + assert b*a*M == a*b*M + assert x*M1 != M1*x + assert a*M1 == M1*a + assert y*x*M == Matrix([[y*x, 0], [0, y*x]]) + + +def test_issue_10770(): + M = Matrix([]) + a = ['col_insert', 'row_join'], Matrix([9, 6, 3]) + b = ['row_insert', 'col_join'], a[1].T + c = ['row_insert', 'col_insert'], Matrix([[1, 2], [3, 4]]) + for ops, m in (a, b, c): + for op in ops: + f = getattr(M, op) + new = f(m) if 'join' in op else f(42, m) + assert new == m and id(new) != id(m) + + +def test_issue_10658(): + A = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + assert A.extract([0, 1, 2], [True, True, False]) == \ + Matrix([[1, 2], [4, 5], [7, 8]]) + assert A.extract([0, 1, 2], [True, False, False]) == Matrix([[1], [4], [7]]) + assert A.extract([True, False, False], [0, 1, 2]) == Matrix([[1, 2, 3]]) + assert A.extract([True, False, True], [0, 1, 2]) == \ + Matrix([[1, 2, 3], [7, 8, 9]]) + assert A.extract([0, 1, 2], [False, False, False]) == Matrix(3, 0, []) + assert A.extract([False, False, False], [0, 1, 2]) == Matrix(0, 3, []) + assert A.extract([True, False, True], [False, True, False]) == \ + Matrix([[2], [8]]) + +def test_opportunistic_simplification(): + # this test relates to issue #10718, #9480, #11434 + + # issue #9480 + m = Matrix([[-5 + 5*sqrt(2), -5], [-5*sqrt(2)/2 + 5, -5*sqrt(2)/2]]) + assert m.rank() == 1 + + # issue #10781 + m = Matrix([[3+3*sqrt(3)*I, -9],[4,-3+3*sqrt(3)*I]]) + assert simplify(m.rref()[0] - Matrix([[1, -9/(3 + 3*sqrt(3)*I)], [0, 0]])) == zeros(2, 2) + + # issue #11434 + ax,ay,bx,by,cx,cy,dx,dy,ex,ey,t0,t1 = symbols('a_x a_y b_x b_y c_x c_y d_x d_y e_x e_y t_0 t_1') + m = Matrix([[ax,ay,ax*t0,ay*t0,0],[bx,by,bx*t0,by*t0,0],[cx,cy,cx*t0,cy*t0,1],[dx,dy,dx*t0,dy*t0,1],[ex,ey,2*ex*t1-ex*t0,2*ey*t1-ey*t0,0]]) + assert m.rank() == 4 + +def test_partial_pivoting(): + # example from https://en.wikipedia.org/wiki/Pivot_element + # partial pivoting with back substitution gives a perfect result + # naive pivoting give an error ~1e-13, so anything better than + # 1e-15 is good + mm=Matrix([[0.003, 59.14, 59.17], [5.291, -6.13, 46.78]]) + assert (mm.rref()[0] - Matrix([[1.0, 0, 10.0], + [ 0, 1.0, 1.0]])).norm() < 1e-15 + + # issue #11549 + m_mixed = Matrix([[6e-17, 1.0, 4], + [ -1.0, 0, 8], + [ 0, 0, 1]]) + m_float = Matrix([[6e-17, 1.0, 4.], + [ -1.0, 0., 8.], + [ 0., 0., 1.]]) + m_inv = Matrix([[ 0, -1.0, 8.0], + [1.0, 6.0e-17, -4.0], + [ 0, 0, 1]]) + # this example is numerically unstable and involves a matrix with a norm >= 8, + # this comparing the difference of the results with 1e-15 is numerically sound. + assert (m_mixed.inv() - m_inv).norm() < 1e-15 + assert (m_float.inv() - m_inv).norm() < 1e-15 + +def test_iszero_substitution(): + """ When doing numerical computations, all elements that pass + the iszerofunc test should be set to numerically zero if they + aren't already. """ + + # Matrix from issue #9060 + m = Matrix([[0.9, -0.1, -0.2, 0],[-0.8, 0.9, -0.4, 0],[-0.1, -0.8, 0.6, 0]]) + m_rref = m.rref(iszerofunc=lambda x: abs(x)<6e-15)[0] + m_correct = Matrix([[1.0, 0, -0.301369863013699, 0],[ 0, 1.0, -0.712328767123288, 0],[ 0, 0, 0, 0]]) + m_diff = m_rref - m_correct + assert m_diff.norm() < 1e-15 + # if a zero-substitution wasn't made, this entry will be -1.11022302462516e-16 + assert m_rref[2,2] == 0 + +def test_issue_11238(): + from sympy.geometry.point import Point + xx = 8*tan(pi*Rational(13, 45))/(tan(pi*Rational(13, 45)) + sqrt(3)) + yy = (-8*sqrt(3)*tan(pi*Rational(13, 45))**2 + 24*tan(pi*Rational(13, 45)))/(-3 + tan(pi*Rational(13, 45))**2) + p1 = Point(0, 0) + p2 = Point(1, -sqrt(3)) + p0 = Point(xx,yy) + m1 = Matrix([p1 - simplify(p0), p2 - simplify(p0)]) + m2 = Matrix([p1 - p0, p2 - p0]) + m3 = Matrix([simplify(p1 - p0), simplify(p2 - p0)]) + + # This system has expressions which are zero and + # cannot be easily proved to be such, so without + # numerical testing, these assertions will fail. + Z = lambda x: abs(x.n()) < 1e-20 + assert m1.rank(simplify=True, iszerofunc=Z) == 1 + assert m2.rank(simplify=True, iszerofunc=Z) == 1 + assert m3.rank(simplify=True, iszerofunc=Z) == 1 + +def test_as_real_imag(): + m1 = Matrix(2,2,[1,2,3,4]) + m2 = m1*S.ImaginaryUnit + m3 = m1 + m2 + + for kls in classes: + a,b = kls(m3).as_real_imag() + assert list(a) == list(m1) + assert list(b) == list(m1) + +def test_deprecated(): + # Maintain tests for deprecated functions. We must capture + # the deprecation warnings. When the deprecated functionality is + # removed, the corresponding tests should be removed. + + m = Matrix(3, 3, [0, 1, 0, -4, 4, 0, -2, 1, 2]) + P, Jcells = m.jordan_cells() + assert Jcells[1] == Matrix(1, 1, [2]) + assert Jcells[0] == Matrix(2, 2, [2, 1, 0, 2]) + + +def test_issue_14489(): + from sympy.core.mod import Mod + A = Matrix([-1, 1, 2]) + B = Matrix([10, 20, -15]) + + assert Mod(A, 3) == Matrix([2, 1, 2]) + assert Mod(B, 4) == Matrix([2, 0, 1]) + +def test_issue_14943(): + # Test that __array__ accepts the optional dtype argument + try: + from numpy import array + except ImportError: + skip('NumPy must be available to test creating matrices from ndarrays') + + M = Matrix([[1,2], [3,4]]) + assert array(M, dtype=float).dtype.name == 'float64' + +def test_case_6913(): + m = MatrixSymbol('m', 1, 1) + a = Symbol("a") + a = m[0, 0]>0 + assert str(a) == 'm[0, 0] > 0' + +def test_issue_11948(): + A = MatrixSymbol('A', 3, 3) + a = Wild('a') + assert A.match(a) == {a: A} + +def test_gramschmidt_conjugate_dot(): + vecs = [Matrix([1, I]), Matrix([1, -I])] + assert Matrix.orthogonalize(*vecs) == \ + [Matrix([[1], [I]]), Matrix([[1], [-I]])] + + vecs = [Matrix([1, I, 0]), Matrix([I, 0, -I])] + assert Matrix.orthogonalize(*vecs) == \ + [Matrix([[1], [I], [0]]), Matrix([[I/2], [S(1)/2], [-I]])] + + mat = Matrix([[1, I], [1, -I]]) + Q, R = mat.QRdecomposition() + assert Q * Q.H == Matrix.eye(2) + +def test_issue_8207(): + a = Matrix(MatrixSymbol('a', 3, 1)) + b = Matrix(MatrixSymbol('b', 3, 1)) + c = a.dot(b) + d = diff(c, a[0, 0]) + e = diff(d, a[0, 0]) + assert d == b[0, 0] + assert e == 0 + +def test_func(): + from sympy.simplify.simplify import nthroot + + A = Matrix([[1, 2],[0, 3]]) + assert A.analytic_func(sin(x*t), x) == Matrix([[sin(t), sin(3*t) - sin(t)], [0, sin(3*t)]]) + + A = Matrix([[2, 1],[1, 2]]) + assert (pi * A / 6).analytic_func(cos(x), x) == Matrix([[sqrt(3)/4, -sqrt(3)/4], [-sqrt(3)/4, sqrt(3)/4]]) + + + raises(ValueError, lambda : zeros(5).analytic_func(log(x), x)) + raises(ValueError, lambda : (A*x).analytic_func(log(x), x)) + + A = Matrix([[0, -1, -2, 3], [0, -1, -2, 3], [0, 1, 0, -1], [0, 0, -1, 1]]) + assert A.analytic_func(exp(x), x) == A.exp() + raises(ValueError, lambda : A.analytic_func(sqrt(x), x)) + + A = Matrix([[41, 12],[12, 34]]) + assert simplify(A.analytic_func(sqrt(x), x)**2) == A + + A = Matrix([[3, -12, 4], [-1, 0, -2], [-1, 5, -1]]) + assert simplify(A.analytic_func(nthroot(x, 3), x)**3) == A + + A = Matrix([[2, 0, 0, 0], [1, 2, 0, 0], [0, 1, 3, 0], [0, 0, 1, 3]]) + assert A.analytic_func(exp(x), x) == A.exp() + + A = Matrix([[0, 2, 1, 6], [0, 0, 1, 2], [0, 0, 0, 3], [0, 0, 0, 0]]) + assert A.analytic_func(exp(x*t), x) == expand(simplify((A*t).exp())) + + +@skip_under_pyodide("Cannot create threads under pyodide.") +def test_issue_19809(): + + def f(): + assert _dotprodsimp_state.state == None + m = Matrix([[1]]) + m = m * m + return True + + with dotprodsimp(True): + with concurrent.futures.ThreadPoolExecutor() as executor: + future = executor.submit(f) + assert future.result() + + +def test_issue_23276(): + M = Matrix([x, y]) + assert integrate(M, (x, 0, 1), (y, 0, 1)) == Matrix([ + [S.Half], + [S.Half]]) + + +# SubspaceOnlyMatrix tests +def test_columnspace_one(): + m = SubspaceOnlyMatrix([[ 1, 2, 0, 2, 5], + [-2, -5, 1, -1, -8], + [ 0, -3, 3, 4, 1], + [ 3, 6, 0, -7, 2]]) + + basis = m.columnspace() + assert basis[0] == Matrix([1, -2, 0, 3]) + assert basis[1] == Matrix([2, -5, -3, 6]) + assert basis[2] == Matrix([2, -1, 4, -7]) + + assert len(basis) == 3 + assert Matrix.hstack(m, *basis).columnspace() == basis + + +def test_rowspace(): + m = SubspaceOnlyMatrix([[ 1, 2, 0, 2, 5], + [-2, -5, 1, -1, -8], + [ 0, -3, 3, 4, 1], + [ 3, 6, 0, -7, 2]]) + + basis = m.rowspace() + assert basis[0] == Matrix([[1, 2, 0, 2, 5]]) + assert basis[1] == Matrix([[0, -1, 1, 3, 2]]) + assert basis[2] == Matrix([[0, 0, 0, 5, 5]]) + + assert len(basis) == 3 + + +def test_nullspace_one(): + m = SubspaceOnlyMatrix([[ 1, 2, 0, 2, 5], + [-2, -5, 1, -1, -8], + [ 0, -3, 3, 4, 1], + [ 3, 6, 0, -7, 2]]) + + basis = m.nullspace() + assert basis[0] == Matrix([-2, 1, 1, 0, 0]) + assert basis[1] == Matrix([-1, -1, 0, -1, 1]) + # make sure the null space is really gets zeroed + assert all(e.is_zero for e in m*basis[0]) + assert all(e.is_zero for e in m*basis[1]) + + +# ReductionsOnlyMatrix tests +def test_row_op(): + e = eye_Reductions(3) + + raises(ValueError, lambda: e.elementary_row_op("abc")) + raises(ValueError, lambda: e.elementary_row_op()) + raises(ValueError, lambda: e.elementary_row_op('n->kn', row=5, k=5)) + raises(ValueError, lambda: e.elementary_row_op('n->kn', row=-5, k=5)) + raises(ValueError, lambda: e.elementary_row_op('n<->m', row1=1, row2=5)) + raises(ValueError, lambda: e.elementary_row_op('n<->m', row1=5, row2=1)) + raises(ValueError, lambda: e.elementary_row_op('n<->m', row1=-5, row2=1)) + raises(ValueError, lambda: e.elementary_row_op('n<->m', row1=1, row2=-5)) + raises(ValueError, lambda: e.elementary_row_op('n->n+km', row1=1, row2=5, k=5)) + raises(ValueError, lambda: e.elementary_row_op('n->n+km', row1=5, row2=1, k=5)) + raises(ValueError, lambda: e.elementary_row_op('n->n+km', row1=-5, row2=1, k=5)) + raises(ValueError, lambda: e.elementary_row_op('n->n+km', row1=1, row2=-5, k=5)) + raises(ValueError, lambda: e.elementary_row_op('n->n+km', row1=1, row2=1, k=5)) + + # test various ways to set arguments + assert e.elementary_row_op("n->kn", 0, 5) == Matrix([[5, 0, 0], [0, 1, 0], [0, 0, 1]]) + assert e.elementary_row_op("n->kn", 1, 5) == Matrix([[1, 0, 0], [0, 5, 0], [0, 0, 1]]) + assert e.elementary_row_op("n->kn", row=1, k=5) == Matrix([[1, 0, 0], [0, 5, 0], [0, 0, 1]]) + assert e.elementary_row_op("n->kn", row1=1, k=5) == Matrix([[1, 0, 0], [0, 5, 0], [0, 0, 1]]) + assert e.elementary_row_op("n<->m", 0, 1) == Matrix([[0, 1, 0], [1, 0, 0], [0, 0, 1]]) + assert e.elementary_row_op("n<->m", row1=0, row2=1) == Matrix([[0, 1, 0], [1, 0, 0], [0, 0, 1]]) + assert e.elementary_row_op("n<->m", row=0, row2=1) == Matrix([[0, 1, 0], [1, 0, 0], [0, 0, 1]]) + assert e.elementary_row_op("n->n+km", 0, 5, 1) == Matrix([[1, 5, 0], [0, 1, 0], [0, 0, 1]]) + assert e.elementary_row_op("n->n+km", row=0, k=5, row2=1) == Matrix([[1, 5, 0], [0, 1, 0], [0, 0, 1]]) + assert e.elementary_row_op("n->n+km", row1=0, k=5, row2=1) == Matrix([[1, 5, 0], [0, 1, 0], [0, 0, 1]]) + + # make sure the matrix doesn't change size + a = ReductionsOnlyMatrix(2, 3, [0]*6) + assert a.elementary_row_op("n->kn", 1, 5) == Matrix(2, 3, [0]*6) + assert a.elementary_row_op("n<->m", 0, 1) == Matrix(2, 3, [0]*6) + assert a.elementary_row_op("n->n+km", 0, 5, 1) == Matrix(2, 3, [0]*6) + + +def test_col_op(): + e = eye_Reductions(3) + + raises(ValueError, lambda: e.elementary_col_op("abc")) + raises(ValueError, lambda: e.elementary_col_op()) + raises(ValueError, lambda: e.elementary_col_op('n->kn', col=5, k=5)) + raises(ValueError, lambda: e.elementary_col_op('n->kn', col=-5, k=5)) + raises(ValueError, lambda: e.elementary_col_op('n<->m', col1=1, col2=5)) + raises(ValueError, lambda: e.elementary_col_op('n<->m', col1=5, col2=1)) + raises(ValueError, lambda: e.elementary_col_op('n<->m', col1=-5, col2=1)) + raises(ValueError, lambda: e.elementary_col_op('n<->m', col1=1, col2=-5)) + raises(ValueError, lambda: e.elementary_col_op('n->n+km', col1=1, col2=5, k=5)) + raises(ValueError, lambda: e.elementary_col_op('n->n+km', col1=5, col2=1, k=5)) + raises(ValueError, lambda: e.elementary_col_op('n->n+km', col1=-5, col2=1, k=5)) + raises(ValueError, lambda: e.elementary_col_op('n->n+km', col1=1, col2=-5, k=5)) + raises(ValueError, lambda: e.elementary_col_op('n->n+km', col1=1, col2=1, k=5)) + + # test various ways to set arguments + assert e.elementary_col_op("n->kn", 0, 5) == Matrix([[5, 0, 0], [0, 1, 0], [0, 0, 1]]) + assert e.elementary_col_op("n->kn", 1, 5) == Matrix([[1, 0, 0], [0, 5, 0], [0, 0, 1]]) + assert e.elementary_col_op("n->kn", col=1, k=5) == Matrix([[1, 0, 0], [0, 5, 0], [0, 0, 1]]) + assert e.elementary_col_op("n->kn", col1=1, k=5) == Matrix([[1, 0, 0], [0, 5, 0], [0, 0, 1]]) + assert e.elementary_col_op("n<->m", 0, 1) == Matrix([[0, 1, 0], [1, 0, 0], [0, 0, 1]]) + assert e.elementary_col_op("n<->m", col1=0, col2=1) == Matrix([[0, 1, 0], [1, 0, 0], [0, 0, 1]]) + assert e.elementary_col_op("n<->m", col=0, col2=1) == Matrix([[0, 1, 0], [1, 0, 0], [0, 0, 1]]) + assert e.elementary_col_op("n->n+km", 0, 5, 1) == Matrix([[1, 0, 0], [5, 1, 0], [0, 0, 1]]) + assert e.elementary_col_op("n->n+km", col=0, k=5, col2=1) == Matrix([[1, 0, 0], [5, 1, 0], [0, 0, 1]]) + assert e.elementary_col_op("n->n+km", col1=0, k=5, col2=1) == Matrix([[1, 0, 0], [5, 1, 0], [0, 0, 1]]) + + # make sure the matrix doesn't change size + a = ReductionsOnlyMatrix(2, 3, [0]*6) + assert a.elementary_col_op("n->kn", 1, 5) == Matrix(2, 3, [0]*6) + assert a.elementary_col_op("n<->m", 0, 1) == Matrix(2, 3, [0]*6) + assert a.elementary_col_op("n->n+km", 0, 5, 1) == Matrix(2, 3, [0]*6) + + +def test_is_echelon(): + zro = zeros_Reductions(3) + ident = eye_Reductions(3) + + assert zro.is_echelon + assert ident.is_echelon + + a = ReductionsOnlyMatrix(0, 0, []) + assert a.is_echelon + + a = ReductionsOnlyMatrix(2, 3, [3, 2, 1, 0, 0, 6]) + assert a.is_echelon + + a = ReductionsOnlyMatrix(2, 3, [0, 0, 6, 3, 2, 1]) + assert not a.is_echelon + + x = Symbol('x') + a = ReductionsOnlyMatrix(3, 1, [x, 0, 0]) + assert a.is_echelon + + a = ReductionsOnlyMatrix(3, 1, [x, x, 0]) + assert not a.is_echelon + + a = ReductionsOnlyMatrix(3, 3, [0, 0, 0, 1, 2, 3, 0, 0, 0]) + assert not a.is_echelon + + +def test_echelon_form(): + # echelon form is not unique, but the result + # must be row-equivalent to the original matrix + # and it must be in echelon form. + + a = zeros_Reductions(3) + e = eye_Reductions(3) + + # we can assume the zero matrix and the identity matrix shouldn't change + assert a.echelon_form() == a + assert e.echelon_form() == e + + a = ReductionsOnlyMatrix(0, 0, []) + assert a.echelon_form() == a + + a = ReductionsOnlyMatrix(1, 1, [5]) + assert a.echelon_form() == a + + # now we get to the real tests + + def verify_row_null_space(mat, rows, nulls): + for v in nulls: + assert all(t.is_zero for t in a_echelon*v) + for v in rows: + if not all(t.is_zero for t in v): + assert not all(t.is_zero for t in a_echelon*v.transpose()) + + a = ReductionsOnlyMatrix(3, 3, [1, 2, 3, 4, 5, 6, 7, 8, 9]) + nulls = [Matrix([ + [ 1], + [-2], + [ 1]])] + rows = [a[i, :] for i in range(a.rows)] + a_echelon = a.echelon_form() + assert a_echelon.is_echelon + verify_row_null_space(a, rows, nulls) + + + a = ReductionsOnlyMatrix(3, 3, [1, 2, 3, 4, 5, 6, 7, 8, 8]) + nulls = [] + rows = [a[i, :] for i in range(a.rows)] + a_echelon = a.echelon_form() + assert a_echelon.is_echelon + verify_row_null_space(a, rows, nulls) + + a = ReductionsOnlyMatrix(3, 3, [2, 1, 3, 0, 0, 0, 2, 1, 3]) + nulls = [Matrix([ + [Rational(-1, 2)], + [ 1], + [ 0]]), + Matrix([ + [Rational(-3, 2)], + [ 0], + [ 1]])] + rows = [a[i, :] for i in range(a.rows)] + a_echelon = a.echelon_form() + assert a_echelon.is_echelon + verify_row_null_space(a, rows, nulls) + + # this one requires a row swap + a = ReductionsOnlyMatrix(3, 3, [2, 1, 3, 0, 0, 0, 1, 1, 3]) + nulls = [Matrix([ + [ 0], + [ -3], + [ 1]])] + rows = [a[i, :] for i in range(a.rows)] + a_echelon = a.echelon_form() + assert a_echelon.is_echelon + verify_row_null_space(a, rows, nulls) + + a = ReductionsOnlyMatrix(3, 3, [0, 3, 3, 0, 2, 2, 0, 1, 1]) + nulls = [Matrix([ + [1], + [0], + [0]]), + Matrix([ + [ 0], + [-1], + [ 1]])] + rows = [a[i, :] for i in range(a.rows)] + a_echelon = a.echelon_form() + assert a_echelon.is_echelon + verify_row_null_space(a, rows, nulls) + + a = ReductionsOnlyMatrix(2, 3, [2, 2, 3, 3, 3, 0]) + nulls = [Matrix([ + [-1], + [1], + [0]])] + rows = [a[i, :] for i in range(a.rows)] + a_echelon = a.echelon_form() + assert a_echelon.is_echelon + verify_row_null_space(a, rows, nulls) + + +def test_rref(): + e = ReductionsOnlyMatrix(0, 0, []) + assert e.rref(pivots=False) == e + + e = ReductionsOnlyMatrix(1, 1, [1]) + a = ReductionsOnlyMatrix(1, 1, [5]) + assert e.rref(pivots=False) == a.rref(pivots=False) == e + + a = ReductionsOnlyMatrix(3, 1, [1, 2, 3]) + assert a.rref(pivots=False) == Matrix([[1], [0], [0]]) + + a = ReductionsOnlyMatrix(1, 3, [1, 2, 3]) + assert a.rref(pivots=False) == Matrix([[1, 2, 3]]) + + a = ReductionsOnlyMatrix(3, 3, [1, 2, 3, 4, 5, 6, 7, 8, 9]) + assert a.rref(pivots=False) == Matrix([ + [1, 0, -1], + [0, 1, 2], + [0, 0, 0]]) + + a = ReductionsOnlyMatrix(3, 3, [1, 2, 3, 1, 2, 3, 1, 2, 3]) + b = ReductionsOnlyMatrix(3, 3, [1, 2, 3, 0, 0, 0, 0, 0, 0]) + c = ReductionsOnlyMatrix(3, 3, [0, 0, 0, 1, 2, 3, 0, 0, 0]) + d = ReductionsOnlyMatrix(3, 3, [0, 0, 0, 0, 0, 0, 1, 2, 3]) + assert a.rref(pivots=False) == \ + b.rref(pivots=False) == \ + c.rref(pivots=False) == \ + d.rref(pivots=False) == b + + e = eye_Reductions(3) + z = zeros_Reductions(3) + assert e.rref(pivots=False) == e + assert z.rref(pivots=False) == z + + a = ReductionsOnlyMatrix([ + [ 0, 0, 1, 2, 2, -5, 3], + [-1, 5, 2, 2, 1, -7, 5], + [ 0, 0, -2, -3, -3, 8, -5], + [-1, 5, 0, -1, -2, 1, 0]]) + mat, pivot_offsets = a.rref() + assert mat == Matrix([ + [1, -5, 0, 0, 1, 1, -1], + [0, 0, 1, 0, 0, -1, 1], + [0, 0, 0, 1, 1, -2, 1], + [0, 0, 0, 0, 0, 0, 0]]) + assert pivot_offsets == (0, 2, 3) + + a = ReductionsOnlyMatrix([[Rational(1, 19), Rational(1, 5), 2, 3], + [ 4, 5, 6, 7], + [ 8, 9, 10, 11], + [ 12, 13, 14, 15]]) + assert a.rref(pivots=False) == Matrix([ + [1, 0, 0, Rational(-76, 157)], + [0, 1, 0, Rational(-5, 157)], + [0, 0, 1, Rational(238, 157)], + [0, 0, 0, 0]]) + + x = Symbol('x') + a = ReductionsOnlyMatrix(2, 3, [x, 1, 1, sqrt(x), x, 1]) + for i, j in zip(a.rref(pivots=False), + [1, 0, sqrt(x)*(-x + 1)/(-x**Rational(5, 2) + x), + 0, 1, 1/(sqrt(x) + x + 1)]): + assert simplify(i - j).is_zero + + +def test_rref_rhs(): + a, b, c, d = symbols('a b c d') + A = Matrix([[0, 0], [0, 0], [1, 2], [3, 4]]) + B = Matrix([a, b, c, d]) + assert A.rref_rhs(B) == (Matrix([ + [1, 0], + [0, 1], + [0, 0], + [0, 0]]), Matrix([ + [ -2*c + d], + [3*c/2 - d/2], + [ a], + [ b]])) + + +def test_issue_17827(): + C = Matrix([ + [3, 4, -1, 1], + [9, 12, -3, 3], + [0, 2, 1, 3], + [2, 3, 0, -2], + [0, 3, 3, -5], + [8, 15, 0, 6] + ]) + # Tests for row/col within valid range + D = C.elementary_row_op('n<->m', row1=2, row2=5) + E = C.elementary_row_op('n->n+km', row1=5, row2=3, k=-4) + F = C.elementary_row_op('n->kn', row=5, k=2) + assert(D[5, :] == Matrix([[0, 2, 1, 3]])) + assert(E[5, :] == Matrix([[0, 3, 0, 14]])) + assert(F[5, :] == Matrix([[16, 30, 0, 12]])) + # Tests for row/col out of range + raises(ValueError, lambda: C.elementary_row_op('n<->m', row1=2, row2=6)) + raises(ValueError, lambda: C.elementary_row_op('n->kn', row=7, k=2)) + raises(ValueError, lambda: C.elementary_row_op('n->n+km', row1=-1, row2=5, k=2)) + +def test_rank(): + m = Matrix([[1, 2], [x, 1 - 1/x]]) + assert m.rank() == 2 + n = Matrix(3, 3, range(1, 10)) + assert n.rank() == 2 + p = zeros(3) + assert p.rank() == 0 + +def test_issue_11434(): + ax, ay, bx, by, cx, cy, dx, dy, ex, ey, t0, t1 = \ + symbols('a_x a_y b_x b_y c_x c_y d_x d_y e_x e_y t_0 t_1') + M = Matrix([[ax, ay, ax*t0, ay*t0, 0], + [bx, by, bx*t0, by*t0, 0], + [cx, cy, cx*t0, cy*t0, 1], + [dx, dy, dx*t0, dy*t0, 1], + [ex, ey, 2*ex*t1 - ex*t0, 2*ey*t1 - ey*t0, 0]]) + assert M.rank() == 4 + +def test_rank_regression_from_so(): + # see: + # https://stackoverflow.com/questions/19072700/why-does-sympy-give-me-the-wrong-answer-when-i-row-reduce-a-symbolic-matrix + + nu, lamb = symbols('nu, lambda') + A = Matrix([[-3*nu, 1, 0, 0], + [ 3*nu, -2*nu - 1, 2, 0], + [ 0, 2*nu, (-1*nu) - lamb - 2, 3], + [ 0, 0, nu + lamb, -3]]) + expected_reduced = Matrix([[1, 0, 0, 1/(nu**2*(-lamb - nu))], + [0, 1, 0, 3/(nu*(-lamb - nu))], + [0, 0, 1, 3/(-lamb - nu)], + [0, 0, 0, 0]]) + expected_pivots = (0, 1, 2) + + reduced, pivots = A.rref() + + assert simplify(expected_reduced - reduced) == zeros(*A.shape) + assert pivots == expected_pivots + +def test_issue_15872(): + A = Matrix([[1, 1, 1, 0], [-2, -1, 0, -1], [0, 0, -1, -1], [0, 0, 2, 1]]) + B = A - Matrix.eye(4) * I + assert B.rank() == 3 + assert (B**2).rank() == 2 + assert (B**3).rank() == 2 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_matrixbase.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_matrixbase.py new file mode 100644 index 0000000000000000000000000000000000000000..a77f51596c6622dc427feeeb9383214592fab632 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_matrixbase.py @@ -0,0 +1,3795 @@ +import concurrent.futures +import random +from collections.abc import Hashable + +from sympy import ( + Abs, Add, Array, DeferredVector, E, Expr, FiniteSet, Float, Function, + GramSchmidt, I, ImmutableDenseMatrix, ImmutableMatrix, + ImmutableSparseMatrix, Integer, KroneckerDelta, MatPow, Matrix, + MatrixSymbol, Max, Min, MutableDenseMatrix, MutableSparseMatrix, Poly, Pow, + PurePoly, Q, Quaternion, Rational, RootOf, S, SparseMatrix, Symbol, Tuple, + Wild, banded, casoratian, cos, diag, diff, exp, expand, eye, floor, hessian, + integrate, log, matrix_multiply_elementwise, nan, ones, oo, pi, randMatrix, + rot_axis1, rot_axis2, rot_axis3, rot_ccw_axis1, rot_ccw_axis2, + rot_ccw_axis3, signsimp, simplify, sin, sqrt, sstr, symbols, sympify, tan, + trigsimp, wronskian, zeros, cancel) +from sympy.abc import a, b, c, d, t, x, y, z +from sympy.core.kind import NumberKind, UndefinedKind +from sympy.matrices.determinant import _find_reasonable_pivot_naive +from sympy.matrices.exceptions import ( + MatrixError, NonSquareMatrixError, ShapeError) +from sympy.matrices.kind import MatrixKind +from sympy.matrices.utilities import _dotprodsimp_state, _simplify, dotprodsimp +from sympy.tensor.array.array_derivatives import ArrayDerivative +from sympy.testing.pytest import ( + ignore_warnings, raises, skip, skip_under_pyodide, slow, + warns_deprecated_sympy) +from sympy.utilities.iterables import capture, iterable +from importlib.metadata import version + +all_classes = (Matrix, SparseMatrix, ImmutableMatrix, ImmutableSparseMatrix) +mutable_classes = (Matrix, SparseMatrix) +immutable_classes = (ImmutableMatrix, ImmutableSparseMatrix) + + +def test__MinimalMatrix(): + x = Matrix(2, 3, [1, 2, 3, 4, 5, 6]) + assert x.rows == 2 + assert x.cols == 3 + assert x[2] == 3 + assert x[1, 1] == 5 + assert list(x) == [1, 2, 3, 4, 5, 6] + assert list(x[1, :]) == [4, 5, 6] + assert list(x[:, 1]) == [2, 5] + assert list(x[:, :]) == list(x) + assert x[:, :] == x + assert Matrix(x) == x + assert Matrix([[1, 2, 3], [4, 5, 6]]) == x + assert Matrix(([1, 2, 3], [4, 5, 6])) == x + assert Matrix([(1, 2, 3), (4, 5, 6)]) == x + assert Matrix(((1, 2, 3), (4, 5, 6))) == x + assert not (Matrix([[1, 2], [3, 4], [5, 6]]) == x) + + +def test_kind(): + assert Matrix([[1, 2], [3, 4]]).kind == MatrixKind(NumberKind) + assert Matrix([[0, 0], [0, 0]]).kind == MatrixKind(NumberKind) + assert Matrix(0, 0, []).kind == MatrixKind(NumberKind) + assert Matrix([[x]]).kind == MatrixKind(NumberKind) + assert Matrix([[1, Matrix([[1]])]]).kind == MatrixKind(UndefinedKind) + assert SparseMatrix([[1]]).kind == MatrixKind(NumberKind) + assert SparseMatrix([[1, Matrix([[1]])]]).kind == MatrixKind(UndefinedKind) + + +def test_todok(): + a, b, c, d = symbols('a:d') + m1 = MutableDenseMatrix([[a, b], [c, d]]) + m2 = ImmutableDenseMatrix([[a, b], [c, d]]) + m3 = MutableSparseMatrix([[a, b], [c, d]]) + m4 = ImmutableSparseMatrix([[a, b], [c, d]]) + assert m1.todok() == m2.todok() == m3.todok() == m4.todok() == \ + {(0, 0): a, (0, 1): b, (1, 0): c, (1, 1): d} + + +def test_tolist(): + lst = [[S.One, S.Half, x*y, S.Zero], [x, y, z, x**2], [y, -S.One, z*x, 3]] + flat_lst = [S.One, S.Half, x*y, S.Zero, x, y, z, x**2, y, -S.One, z*x, 3] + m = Matrix(3, 4, flat_lst) + assert m.tolist() == lst + + +def test_todod(): + m = Matrix([[S.One, 0], [0, S.Half], [x, 0]]) + dict = {0: {0: S.One}, 1: {1: S.Half}, 2: {0: x}} + assert m.todod() == dict + + +def test_row_col_del(): + e = ImmutableMatrix(3, 3, [1, 2, 3, 4, 5, 6, 7, 8, 9]) + raises(IndexError, lambda: e.row_del(5)) + raises(IndexError, lambda: e.row_del(-5)) + raises(IndexError, lambda: e.col_del(5)) + raises(IndexError, lambda: e.col_del(-5)) + + assert e.row_del(2) == e.row_del(-1) == Matrix([[1, 2, 3], [4, 5, 6]]) + assert e.col_del(2) == e.col_del(-1) == Matrix([[1, 2], [4, 5], [7, 8]]) + + assert e.row_del(1) == e.row_del(-2) == Matrix([[1, 2, 3], [7, 8, 9]]) + assert e.col_del(1) == e.col_del(-2) == Matrix([[1, 3], [4, 6], [7, 9]]) + + +def test_get_diag_blocks1(): + a = Matrix([[1, 2], [2, 3]]) + b = Matrix([[3, x], [y, 3]]) + c = Matrix([[3, x, 3], [y, 3, z], [x, y, z]]) + assert a.get_diag_blocks() == [a] + assert b.get_diag_blocks() == [b] + assert c.get_diag_blocks() == [c] + + +def test_get_diag_blocks2(): + a = Matrix([[1, 2], [2, 3]]) + b = Matrix([[3, x], [y, 3]]) + c = Matrix([[3, x, 3], [y, 3, z], [x, y, z]]) + A, B, C, D = diag(a, b, b), diag(a, b, c), diag(a, c, b), diag(c, c, b) + A = Matrix(A.rows, A.cols, A) + B = Matrix(B.rows, B.cols, B) + C = Matrix(C.rows, C.cols, C) + D = Matrix(D.rows, D.cols, D) + + assert A.get_diag_blocks() == [a, b, b] + assert B.get_diag_blocks() == [a, b, c] + assert C.get_diag_blocks() == [a, c, b] + assert D.get_diag_blocks() == [c, c, b] + + +def test_row_col(): + m = Matrix(3, 3, [1, 2, 3, 4, 5, 6, 7, 8, 9]) + assert m.row(0) == Matrix(1, 3, [1, 2, 3]) + assert m.col(0) == Matrix(3, 1, [1, 4, 7]) + + +def test_row_join(): + assert eye(3).row_join(Matrix([7, 7, 7])) == \ + Matrix([[1, 0, 0, 7], + [0, 1, 0, 7], + [0, 0, 1, 7]]) + + +def test_col_join(): + assert eye(3).col_join(Matrix([[7, 7, 7]])) == \ + Matrix([[1, 0, 0], + [0, 1, 0], + [0, 0, 1], + [7, 7, 7]]) + + +def test_row_insert(): + r4 = Matrix([[4, 4, 4]]) + for i in range(-4, 5): + l = [1, 0, 0] + l.insert(i, 4) + assert eye(3).row_insert(i, r4).col(0).flat() == l + + +def test_col_insert(): + c4 = Matrix([4, 4, 4]) + for i in range(-4, 5): + l = [0, 0, 0] + l.insert(i, 4) + assert zeros(3).col_insert(i, c4).row(0).flat() == l + # issue 13643 + assert eye(6).col_insert(3, Matrix([[2, 2], [2, 2], [2, 2], [2, 2], [2, 2], [2, 2]])) == \ + Matrix([[1, 0, 0, 2, 2, 0, 0, 0], + [0, 1, 0, 2, 2, 0, 0, 0], + [0, 0, 1, 2, 2, 0, 0, 0], + [0, 0, 0, 2, 2, 1, 0, 0], + [0, 0, 0, 2, 2, 0, 1, 0], + [0, 0, 0, 2, 2, 0, 0, 1]]) + + +def test_extract(): + m = Matrix(4, 3, lambda i, j: i*3 + j) + assert m.extract([0, 1, 3], [0, 1]) == Matrix(3, 2, [0, 1, 3, 4, 9, 10]) + assert m.extract([0, 3], [0, 0, 2]) == Matrix(2, 3, [0, 0, 2, 9, 9, 11]) + assert m.extract(range(4), range(3)) == m + raises(IndexError, lambda: m.extract([4], [0])) + raises(IndexError, lambda: m.extract([0], [3])) + + +def test_hstack(): + m = Matrix(4, 3, lambda i, j: i*3 + j) + m2 = Matrix(3, 4, lambda i, j: i*3 + j) + assert m == m.hstack(m) + assert m.hstack(m, m, m) == Matrix.hstack(m, m, m) == Matrix([ + [0, 1, 2, 0, 1, 2, 0, 1, 2], + [3, 4, 5, 3, 4, 5, 3, 4, 5], + [6, 7, 8, 6, 7, 8, 6, 7, 8], + [9, 10, 11, 9, 10, 11, 9, 10, 11]]) + raises(ShapeError, lambda: m.hstack(m, m2)) + assert Matrix.hstack() == Matrix() + + # test regression #12938 + M1 = Matrix.zeros(0, 0) + M2 = Matrix.zeros(0, 1) + M3 = Matrix.zeros(0, 2) + M4 = Matrix.zeros(0, 3) + m = Matrix.hstack(M1, M2, M3, M4) + assert m.rows == 0 and m.cols == 6 + + +def test_vstack(): + m = Matrix(4, 3, lambda i, j: i*3 + j) + m2 = Matrix(3, 4, lambda i, j: i*3 + j) + assert m == m.vstack(m) + assert m.vstack(m, m, m) == Matrix.vstack(m, m, m) == Matrix([ + [0, 1, 2], + [3, 4, 5], + [6, 7, 8], + [9, 10, 11], + [0, 1, 2], + [3, 4, 5], + [6, 7, 8], + [9, 10, 11], + [0, 1, 2], + [3, 4, 5], + [6, 7, 8], + [9, 10, 11]]) + raises(ShapeError, lambda: m.vstack(m, m2)) + assert Matrix.vstack() == Matrix() + + +def test_has(): + A = Matrix(((x, y), (2, 3))) + assert A.has(x) + assert not A.has(z) + assert A.has(Symbol) + + A = Matrix(((2, y), (2, 3))) + assert not A.has(x) + + +def test_is_anti_symmetric(): + x = symbols('x') + assert Matrix(2, 1, [1, 2]).is_anti_symmetric() is False + m = Matrix(3, 3, [0, x**2 + 2*x + 1, y, -(x + 1)**2, 0, x*y, -y, -x*y, 0]) + assert m.is_anti_symmetric() is True + assert m.is_anti_symmetric(simplify=False) is None + assert m.is_anti_symmetric(simplify=lambda x: x) is None + + m = Matrix(3, 3, [x.expand() for x in m]) + assert m.is_anti_symmetric(simplify=False) is True + m = Matrix(3, 3, [x.expand() for x in [S.One] + list(m)[1:]]) + assert m.is_anti_symmetric() is False + + +def test_is_hermitian(): + a = Matrix([[1, I], [-I, 1]]) + assert a.is_hermitian + a = Matrix([[2*I, I], [-I, 1]]) + assert a.is_hermitian is False + a = Matrix([[x, I], [-I, 1]]) + assert a.is_hermitian is None + a = Matrix([[x, 1], [-I, 1]]) + assert a.is_hermitian is False + + +def test_is_symbolic(): + a = Matrix([[x, x], [x, x]]) + assert a.is_symbolic() is True + a = Matrix([[1, 2, 3, 4], [5, 6, 7, 8]]) + assert a.is_symbolic() is False + a = Matrix([[1, 2, 3, 4], [5, 6, x, 8]]) + assert a.is_symbolic() is True + a = Matrix([[1, x, 3]]) + assert a.is_symbolic() is True + a = Matrix([[1, 2, 3]]) + assert a.is_symbolic() is False + a = Matrix([[1], [x], [3]]) + assert a.is_symbolic() is True + a = Matrix([[1], [2], [3]]) + assert a.is_symbolic() is False + + +def test_is_square(): + m = Matrix([[1], [1]]) + m2 = Matrix([[2, 2], [2, 2]]) + assert not m.is_square + assert m2.is_square + + +def test_is_symmetric(): + m = Matrix(2, 2, [0, 1, 1, 0]) + assert m.is_symmetric() + m = Matrix(2, 2, [0, 1, 0, 1]) + assert not m.is_symmetric() + + +def test_is_hessenberg(): + A = Matrix([[3, 4, 1], [2, 4, 5], [0, 1, 2]]) + assert A.is_upper_hessenberg + A = Matrix(3, 3, [3, 2, 0, 4, 4, 1, 1, 5, 2]) + assert A.is_lower_hessenberg + A = Matrix(3, 3, [3, 2, -1, 4, 4, 1, 1, 5, 2]) + assert A.is_lower_hessenberg is False + assert A.is_upper_hessenberg is False + + A = Matrix([[3, 4, 1], [2, 4, 5], [3, 1, 2]]) + assert not A.is_upper_hessenberg + + +def test_values(): + assert set(Matrix(2, 2, [0, 1, 2, 3] + ).values()) == {1, 2, 3} + x = Symbol('x', real=True) + assert set(Matrix(2, 2, [x, 0, 0, 1] + ).values()) == {x, 1} + + +def test_conjugate(): + M = Matrix([[0, I, 5], + [1, 2, 0]]) + + assert M.T == Matrix([[0, 1], + [I, 2], + [5, 0]]) + + assert M.C == Matrix([[0, -I, 5], + [1, 2, 0]]) + assert M.C == M.conjugate() + + assert M.H == M.T.C + assert M.H == Matrix([[ 0, 1], + [-I, 2], + [ 5, 0]]) + + +def test_doit(): + a = Matrix([[Add(x, x, evaluate=False)]]) + assert a[0] != 2*x + assert a.doit() == Matrix([[2*x]]) + + +def test_evalf(): + a = Matrix(2, 1, [sqrt(5), 6]) + assert all(a.evalf()[i] == a[i].evalf() for i in range(2)) + assert all(a.evalf(2)[i] == a[i].evalf(2) for i in range(2)) + assert all(a.n(2)[i] == a[i].n(2) for i in range(2)) + + +def test_replace(): + F, G = symbols('F, G', cls=Function) + K = Matrix(2, 2, lambda i, j: G(i+j)) + M = Matrix(2, 2, lambda i, j: F(i+j)) + N = M.replace(F, G) + assert N == K + + +def test_replace_map(): + F, G = symbols('F, G', cls=Function) + M = Matrix(2, 2, lambda i, j: F(i+j)) + N, d = M.replace(F, G, True) + assert N == Matrix(2, 2, lambda i, j: G(i+j)) + assert d == {F(0): G(0), F(1): G(1), F(2): G(2)} + +def test_numpy_conversion(): + try: + from numpy import array, array_equal + except ImportError: + skip('NumPy must be available to test creating matrices from ndarrays') + A = Matrix([[1,2], [3,4]]) + np_array = array([[1,2], [3,4]]) + assert array_equal(array(A), np_array) + assert array_equal(array(A, copy=True), np_array) + if(int(version('numpy').split('.')[0]) >= 2): #run this test only if numpy is new enough that copy variable is passed properly. + raises(TypeError, lambda: array(A, copy=False)) + +def test_rot90(): + A = Matrix([[1, 2], [3, 4]]) + assert A == A.rot90(0) == A.rot90(4) + assert A.rot90(2) == A.rot90(-2) == A.rot90(6) == Matrix(((4, 3), (2, 1))) + assert A.rot90(3) == A.rot90(-1) == A.rot90(7) == Matrix(((2, 4), (1, 3))) + assert A.rot90() == A.rot90(-7) == A.rot90(-3) == Matrix(((3, 1), (4, 2))) + + +def test_subs(): + assert Matrix([[1, x], [x, 4]]).subs(x, 5) == Matrix([[1, 5], [5, 4]]) + assert Matrix([[x, 2], [x + y, 4]]).subs([[x, -1], [y, -2]]) == \ + Matrix([[-1, 2], [-3, 4]]) + assert Matrix([[x, 2], [x + y, 4]]).subs([(x, -1), (y, -2)]) == \ + Matrix([[-1, 2], [-3, 4]]) + assert Matrix([[x, 2], [x + y, 4]]).subs({x: -1, y: -2}) == \ + Matrix([[-1, 2], [-3, 4]]) + assert Matrix([[x*y]]).subs({x: y - 1, y: x - 1}, simultaneous=True) == \ + Matrix([[(x - 1)*(y - 1)]]) + + +def test_permute(): + a = Matrix(3, 4, [1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12]) + + raises(IndexError, lambda: a.permute([[0, 5]])) + raises(ValueError, lambda: a.permute(Symbol('x'))) + b = a.permute_rows([[0, 2], [0, 1]]) + assert a.permute([[0, 2], [0, 1]]) == b == Matrix([ + [5, 6, 7, 8], + [9, 10, 11, 12], + [1, 2, 3, 4]]) + + b = a.permute_cols([[0, 2], [0, 1]]) + assert a.permute([[0, 2], [0, 1]], orientation='cols') == b ==\ + Matrix([ + [ 2, 3, 1, 4], + [ 6, 7, 5, 8], + [10, 11, 9, 12]]) + + b = a.permute_cols([[0, 2], [0, 1]], direction='backward') + assert a.permute([[0, 2], [0, 1]], orientation='cols', direction='backward') == b ==\ + Matrix([ + [ 3, 1, 2, 4], + [ 7, 5, 6, 8], + [11, 9, 10, 12]]) + + assert a.permute([1, 2, 0, 3]) == Matrix([ + [5, 6, 7, 8], + [9, 10, 11, 12], + [1, 2, 3, 4]]) + + from sympy.combinatorics import Permutation + assert a.permute(Permutation([1, 2, 0, 3])) == Matrix([ + [5, 6, 7, 8], + [9, 10, 11, 12], + [1, 2, 3, 4]]) + +def test_upper_triangular(): + + A = Matrix([ + [1, 1, 1, 1], + [1, 1, 1, 1], + [1, 1, 1, 1], + [1, 1, 1, 1] + ]) + + R = A.upper_triangular(2) + assert R == Matrix([ + [0, 0, 1, 1], + [0, 0, 0, 1], + [0, 0, 0, 0], + [0, 0, 0, 0] + ]) + + R = A.upper_triangular(-2) + assert R == Matrix([ + [1, 1, 1, 1], + [1, 1, 1, 1], + [1, 1, 1, 1], + [0, 1, 1, 1] + ]) + + R = A.upper_triangular() + assert R == Matrix([ + [1, 1, 1, 1], + [0, 1, 1, 1], + [0, 0, 1, 1], + [0, 0, 0, 1] + ]) + + +def test_lower_triangular(): + A = Matrix([ + [1, 1, 1, 1], + [1, 1, 1, 1], + [1, 1, 1, 1], + [1, 1, 1, 1] + ]) + + L = A.lower_triangular() + assert L == Matrix([ + [1, 0, 0, 0], + [1, 1, 0, 0], + [1, 1, 1, 0], + [1, 1, 1, 1]]) + + L = A.lower_triangular(2) + assert L == Matrix([ + [1, 1, 1, 0], + [1, 1, 1, 1], + [1, 1, 1, 1], + [1, 1, 1, 1] + ]) + + L = A.lower_triangular(-2) + assert L == Matrix([ + [0, 0, 0, 0], + [0, 0, 0, 0], + [1, 0, 0, 0], + [1, 1, 0, 0] + ]) + + +def test_add(): + m = Matrix([[1, 2, 3], [x, y, x], [2*y, -50, z*x]]) + assert m + m == Matrix([[2, 4, 6], [2*x, 2*y, 2*x], [4*y, -100, 2*z*x]]) + n = Matrix(1, 2, [1, 2]) + raises(ShapeError, lambda: m + n) + + +def test_matmul(): + a = Matrix([[1, 2], [3, 4]]) + + assert a.__matmul__(2) == NotImplemented + + assert a.__rmatmul__(2) == NotImplemented + + #This is done this way because @ is only supported in Python 3.5+ + #To check 2@a case + try: + eval('2 @ a') + except SyntaxError: + pass + except TypeError: #TypeError is raised in case of NotImplemented is returned + pass + + #Check a@2 case + try: + eval('a @ 2') + except SyntaxError: + pass + except TypeError: #TypeError is raised in case of NotImplemented is returned + pass + + +def test_non_matmul(): + """ + Test that if explicitly specified as non-matrix, mul reverts + to scalar multiplication. + """ + class foo(Expr): + is_Matrix=False + is_MatrixLike=False + shape = (1, 1) + + A = Matrix([[1, 2], [3, 4]]) + b = foo() + assert b*A == Matrix([[b, 2*b], [3*b, 4*b]]) + assert A*b == Matrix([[b, 2*b], [3*b, 4*b]]) + + +def test_neg(): + n = Matrix(1, 2, [1, 2]) + assert -n == Matrix(1, 2, [-1, -2]) + + +def test_sub(): + n = Matrix(1, 2, [1, 2]) + assert n - n == Matrix(1, 2, [0, 0]) + + +def test_div(): + n = Matrix(1, 2, [1, 2]) + assert n/2 == Matrix(1, 2, [S.Half, S(2)/2]) + + +def test_eye(): + assert list(Matrix.eye(2, 2)) == [1, 0, 0, 1] + assert list(Matrix.eye(2)) == [1, 0, 0, 1] + assert type(Matrix.eye(2)) == Matrix + assert type(Matrix.eye(2, cls=Matrix)) == Matrix + + +def test_ones(): + assert list(Matrix.ones(2, 2)) == [1, 1, 1, 1] + assert list(Matrix.ones(2)) == [1, 1, 1, 1] + assert Matrix.ones(2, 3) == Matrix([[1, 1, 1], [1, 1, 1]]) + assert type(Matrix.ones(2)) == Matrix + assert type(Matrix.ones(2, cls=Matrix)) == Matrix + + +def test_zeros(): + assert list(Matrix.zeros(2, 2)) == [0, 0, 0, 0] + assert list(Matrix.zeros(2)) == [0, 0, 0, 0] + assert Matrix.zeros(2, 3) == Matrix([[0, 0, 0], [0, 0, 0]]) + assert type(Matrix.zeros(2)) == Matrix + assert type(Matrix.zeros(2, cls=Matrix)) == Matrix + + +def test_diag_make(): + diag = Matrix.diag + a = Matrix([[1, 2], [2, 3]]) + b = Matrix([[3, x], [y, 3]]) + c = Matrix([[3, x, 3], [y, 3, z], [x, y, z]]) + assert diag(a, b, b) == Matrix([ + [1, 2, 0, 0, 0, 0], + [2, 3, 0, 0, 0, 0], + [0, 0, 3, x, 0, 0], + [0, 0, y, 3, 0, 0], + [0, 0, 0, 0, 3, x], + [0, 0, 0, 0, y, 3], + ]) + assert diag(a, b, c) == Matrix([ + [1, 2, 0, 0, 0, 0, 0], + [2, 3, 0, 0, 0, 0, 0], + [0, 0, 3, x, 0, 0, 0], + [0, 0, y, 3, 0, 0, 0], + [0, 0, 0, 0, 3, x, 3], + [0, 0, 0, 0, y, 3, z], + [0, 0, 0, 0, x, y, z], + ]) + assert diag(a, c, b) == Matrix([ + [1, 2, 0, 0, 0, 0, 0], + [2, 3, 0, 0, 0, 0, 0], + [0, 0, 3, x, 3, 0, 0], + [0, 0, y, 3, z, 0, 0], + [0, 0, x, y, z, 0, 0], + [0, 0, 0, 0, 0, 3, x], + [0, 0, 0, 0, 0, y, 3], + ]) + a = Matrix([x, y, z]) + b = Matrix([[1, 2], [3, 4]]) + c = Matrix([[5, 6]]) + # this "wandering diagonal" is what makes this + # a block diagonal where each block is independent + # of the others + assert diag(a, 7, b, c) == Matrix([ + [x, 0, 0, 0, 0, 0], + [y, 0, 0, 0, 0, 0], + [z, 0, 0, 0, 0, 0], + [0, 7, 0, 0, 0, 0], + [0, 0, 1, 2, 0, 0], + [0, 0, 3, 4, 0, 0], + [0, 0, 0, 0, 5, 6]]) + raises(ValueError, lambda: diag(a, 7, b, c, rows=5)) + assert diag(1) == Matrix([[1]]) + assert diag(1, rows=2) == Matrix([[1, 0], [0, 0]]) + assert diag(1, cols=2) == Matrix([[1, 0], [0, 0]]) + assert diag(1, rows=3, cols=2) == Matrix([[1, 0], [0, 0], [0, 0]]) + assert diag(*[2, 3]) == Matrix([ + [2, 0], + [0, 3]]) + assert diag(Matrix([2, 3])) == Matrix([ + [2], + [3]]) + assert diag([1, [2, 3], 4], unpack=False) == \ + diag([[1], [2, 3], [4]], unpack=False) == Matrix([ + [1, 0], + [2, 3], + [4, 0]]) + assert type(diag(1)) == Matrix + assert type(diag(1, cls=Matrix)) == Matrix + assert Matrix.diag([1, 2, 3]) == Matrix.diag(1, 2, 3) + assert Matrix.diag([1, 2, 3], unpack=False).shape == (3, 1) + assert Matrix.diag([[1, 2, 3]]).shape == (3, 1) + assert Matrix.diag([[1, 2, 3]], unpack=False).shape == (1, 3) + assert Matrix.diag([[[1, 2, 3]]]).shape == (1, 3) + # kerning can be used to move the starting point + assert Matrix.diag(ones(0, 2), 1, 2) == Matrix([ + [0, 0, 1, 0], + [0, 0, 0, 2]]) + assert Matrix.diag(ones(2, 0), 1, 2) == Matrix([ + [0, 0], + [0, 0], + [1, 0], + [0, 2]]) + + +def test_diagonal(): + m = Matrix(3, 3, range(9)) + d = m.diagonal() + assert d == m.diagonal(0) + assert tuple(d) == (0, 4, 8) + assert tuple(m.diagonal(1)) == (1, 5) + assert tuple(m.diagonal(-1)) == (3, 7) + assert tuple(m.diagonal(2)) == (2,) + assert type(m.diagonal()) == type(m) + s = SparseMatrix(3, 3, {(1, 1): 1}) + assert type(s.diagonal()) == type(s) + assert type(m) != type(s) + raises(ValueError, lambda: m.diagonal(3)) + raises(ValueError, lambda: m.diagonal(-3)) + raises(ValueError, lambda: m.diagonal(pi)) + M = ones(2, 3) + assert banded({i: list(M.diagonal(i)) + for i in range(1-M.rows, M.cols)}) == M + + +def test_jordan_block(): + assert Matrix.jordan_block(3, 2) == Matrix.jordan_block(3, eigenvalue=2) \ + == Matrix.jordan_block(size=3, eigenvalue=2) \ + == Matrix.jordan_block(3, 2, band='upper') \ + == Matrix.jordan_block( + size=3, eigenval=2, eigenvalue=2) \ + == Matrix([ + [2, 1, 0], + [0, 2, 1], + [0, 0, 2]]) + + assert Matrix.jordan_block(3, 2, band='lower') == Matrix([ + [2, 0, 0], + [1, 2, 0], + [0, 1, 2]]) + # missing eigenvalue + raises(ValueError, lambda: Matrix.jordan_block(2)) + # non-integral size + raises(ValueError, lambda: Matrix.jordan_block(3.5, 2)) + # size not specified + raises(ValueError, lambda: Matrix.jordan_block(eigenvalue=2)) + # inconsistent eigenvalue + raises(ValueError, + lambda: Matrix.jordan_block( + eigenvalue=2, eigenval=4)) + + # Using alias keyword + assert Matrix.jordan_block(size=3, eigenvalue=2) == \ + Matrix.jordan_block(size=3, eigenval=2) + + +def test_orthogonalize(): + m = Matrix([[1, 2], [3, 4]]) + assert m.orthogonalize(Matrix([[2], [1]])) == [Matrix([[2], [1]])] + assert m.orthogonalize(Matrix([[2], [1]]), normalize=True) == \ + [Matrix([[2*sqrt(5)/5], [sqrt(5)/5]])] + assert m.orthogonalize(Matrix([[1], [2]]), Matrix([[-1], [4]])) == \ + [Matrix([[1], [2]]), Matrix([[Rational(-12, 5)], [Rational(6, 5)]])] + assert m.orthogonalize(Matrix([[0], [0]]), Matrix([[-1], [4]])) == \ + [Matrix([[-1], [4]])] + assert m.orthogonalize(Matrix([[0], [0]])) == [] + + n = Matrix([[9, 1, 9], [3, 6, 10], [8, 5, 2]]) + vecs = [Matrix([[-5], [1]]), Matrix([[-5], [2]]), Matrix([[-5], [-2]])] + assert n.orthogonalize(*vecs) == \ + [Matrix([[-5], [1]]), Matrix([[Rational(5, 26)], [Rational(25, 26)]])] + + vecs = [Matrix([0, 0, 0]), Matrix([1, 2, 3]), Matrix([1, 4, 5])] + raises(ValueError, lambda: Matrix.orthogonalize(*vecs, rankcheck=True)) + + vecs = [Matrix([1, 2, 3]), Matrix([4, 5, 6]), Matrix([7, 8, 9])] + raises(ValueError, lambda: Matrix.orthogonalize(*vecs, rankcheck=True)) + +def test_wilkinson(): + + wminus, wplus = Matrix.wilkinson(1) + assert wminus == Matrix([ + [-1, 1, 0], + [1, 0, 1], + [0, 1, 1]]) + assert wplus == Matrix([ + [1, 1, 0], + [1, 0, 1], + [0, 1, 1]]) + + wminus, wplus = Matrix.wilkinson(3) + assert wminus == Matrix([ + [-3, 1, 0, 0, 0, 0, 0], + [1, -2, 1, 0, 0, 0, 0], + [0, 1, -1, 1, 0, 0, 0], + [0, 0, 1, 0, 1, 0, 0], + [0, 0, 0, 1, 1, 1, 0], + [0, 0, 0, 0, 1, 2, 1], + + [0, 0, 0, 0, 0, 1, 3]]) + + assert wplus == Matrix([ + [3, 1, 0, 0, 0, 0, 0], + [1, 2, 1, 0, 0, 0, 0], + [0, 1, 1, 1, 0, 0, 0], + [0, 0, 1, 0, 1, 0, 0], + [0, 0, 0, 1, 1, 1, 0], + [0, 0, 0, 0, 1, 2, 1], + [0, 0, 0, 0, 0, 1, 3]]) + + +def test_limit(): + x, y = symbols('x y') + m = Matrix(2, 1, [1/x, y]) + assert m.limit(x, 5) == Matrix(2, 1, [Rational(1, 5), y]) + A = Matrix(((1, 4, sin(x)/x), (y, 2, 4), (10, 5, x**2 + 1))) + assert A.limit(x, 0) == Matrix(((1, 4, 1), (y, 2, 4), (10, 5, 1))) + + +def test_issue_13774(): + M = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + v = [1, 1, 1] + raises(TypeError, lambda: M*v) + raises(TypeError, lambda: v*M) + + +def test_companion(): + x = Symbol('x') + y = Symbol('y') + raises(ValueError, lambda: Matrix.companion(1)) + raises(ValueError, lambda: Matrix.companion(Poly([1], x))) + raises(ValueError, lambda: Matrix.companion(Poly([2, 1], x))) + raises(ValueError, lambda: Matrix.companion(Poly(x*y, [x, y]))) + + c0, c1, c2 = symbols('c0:3') + assert Matrix.companion(Poly([1, c0], x)) == Matrix([-c0]) + assert Matrix.companion(Poly([1, c1, c0], x)) == \ + Matrix([[0, -c0], [1, -c1]]) + assert Matrix.companion(Poly([1, c2, c1, c0], x)) == \ + Matrix([[0, 0, -c0], [1, 0, -c1], [0, 1, -c2]]) + + +def test_issue_10589(): + x, y, z = symbols("x, y z") + M1 = Matrix([x, y, z]) + M1 = M1.subs(zip([x, y, z], [1, 2, 3])) + assert M1 == Matrix([[1], [2], [3]]) + + M2 = Matrix([[x, x, x, x, x], [x, x, x, x, x], [x, x, x, x, x]]) + M2 = M2.subs(zip([x], [1])) + assert M2 == Matrix([[1, 1, 1, 1, 1], [1, 1, 1, 1, 1], [1, 1, 1, 1, 1]]) + + +def test_rmul_pr19860(): + class Foo(ImmutableDenseMatrix): + _op_priority = MutableDenseMatrix._op_priority + 0.01 + + a = Matrix(2, 2, [1, 2, 3, 4]) + b = Foo(2, 2, [1, 2, 3, 4]) + + # This would throw a RecursionError: maximum recursion depth + # since b always has higher priority even after a.as_mutable() + c = a*b + + assert isinstance(c, Foo) + assert c == Matrix([[7, 10], [15, 22]]) + + +def test_issue_18956(): + A = Array([[1, 2], [3, 4]]) + B = Matrix([[1,2],[3,4]]) + raises(TypeError, lambda: B + A) + raises(TypeError, lambda: A + B) + + +def test__eq__(): + class My(object): + def __iter__(self): + yield 1 + yield 2 + return + def __getitem__(self, i): + return list(self)[i] + a = Matrix(2, 1, [1, 2]) + assert a != My() + class My_sympy(My): + def _sympy_(self): + return Matrix(self) + assert a == My_sympy() + + +def test_args(): + for n, cls in enumerate(all_classes): + m = cls.zeros(3, 2) + # all should give back the same type of arguments, e.g. ints for shape + assert m.shape == (3, 2) and all(type(i) is int for i in m.shape) + assert m.rows == 3 and type(m.rows) is int + assert m.cols == 2 and type(m.cols) is int + if not n % 2: + assert type(m.flat()) in (list, tuple, Tuple) + else: + assert type(m.todok()) is dict + + +def test_deprecated_mat_smat(): + for cls in Matrix, ImmutableMatrix: + m = cls.zeros(3, 2) + with warns_deprecated_sympy(): + mat = m._mat + assert mat == m.flat() + for cls in SparseMatrix, ImmutableSparseMatrix: + m = cls.zeros(3, 2) + with warns_deprecated_sympy(): + smat = m._smat + assert smat == m.todok() + + +def test_division(): + v = Matrix(1, 2, [x, y]) + assert v/z == Matrix(1, 2, [x/z, y/z]) + + +def test_sum(): + m = Matrix([[1, 2, 3], [x, y, x], [2*y, -50, z*x]]) + assert m + m == Matrix([[2, 4, 6], [2*x, 2*y, 2*x], [4*y, -100, 2*z*x]]) + n = Matrix(1, 2, [1, 2]) + raises(ShapeError, lambda: m + n) + + +def test_abs(): + m = Matrix([[1, -2], [x, y]]) + assert abs(m) == Matrix([[1, 2], [Abs(x), Abs(y)]]) + m = Matrix(1, 2, [-3, x]) + n = Matrix(1, 2, [3, Abs(x)]) + assert abs(m) == n + + +def test_addition(): + a = Matrix(( + (1, 2), + (3, 1), + )) + + b = Matrix(( + (1, 2), + (3, 0), + )) + + assert a + b == a.add(b) == Matrix([[2, 4], [6, 1]]) + + +def test_fancy_index_matrix(): + for M in (Matrix, SparseMatrix): + a = M(3, 3, range(9)) + assert a == a[:, :] + assert a[1, :] == Matrix(1, 3, [3, 4, 5]) + assert a[:, 1] == Matrix([1, 4, 7]) + assert a[[0, 1], :] == Matrix([[0, 1, 2], [3, 4, 5]]) + assert a[[0, 1], 2] == a[[0, 1], [2]] + assert a[2, [0, 1]] == a[[2], [0, 1]] + assert a[:, [0, 1]] == Matrix([[0, 1], [3, 4], [6, 7]]) + assert a[0, 0] == 0 + assert a[0:2, :] == Matrix([[0, 1, 2], [3, 4, 5]]) + assert a[:, 0:2] == Matrix([[0, 1], [3, 4], [6, 7]]) + assert a[::2, 1] == a[[0, 2], 1] + assert a[1, ::2] == a[1, [0, 2]] + a = M(3, 3, range(9)) + assert a[[0, 2, 1, 2, 1], :] == Matrix([ + [0, 1, 2], + [6, 7, 8], + [3, 4, 5], + [6, 7, 8], + [3, 4, 5]]) + assert a[:, [0,2,1,2,1]] == Matrix([ + [0, 2, 1, 2, 1], + [3, 5, 4, 5, 4], + [6, 8, 7, 8, 7]]) + + a = SparseMatrix.zeros(3) + a[1, 2] = 2 + a[0, 1] = 3 + a[2, 0] = 4 + assert a.extract([1, 1], [2]) == Matrix([ + [2], + [2]]) + assert a.extract([1, 0], [2, 2, 2]) == Matrix([ + [2, 2, 2], + [0, 0, 0]]) + assert a.extract([1, 0, 1, 2], [2, 0, 1, 0]) == Matrix([ + [2, 0, 0, 0], + [0, 0, 3, 0], + [2, 0, 0, 0], + [0, 4, 0, 4]]) + + +def test_multiplication(): + a = Matrix(( + (1, 2), + (3, 1), + (0, 6), + )) + + b = Matrix(( + (1, 2), + (3, 0), + )) + + raises(ShapeError, lambda: b*a) + raises(TypeError, lambda: a*{}) + + c = a*b + assert c[0, 0] == 7 + assert c[0, 1] == 2 + assert c[1, 0] == 6 + assert c[1, 1] == 6 + assert c[2, 0] == 18 + assert c[2, 1] == 0 + + c = a @ b + assert c[0, 0] == 7 + assert c[0, 1] == 2 + assert c[1, 0] == 6 + assert c[1, 1] == 6 + assert c[2, 0] == 18 + assert c[2, 1] == 0 + + h = matrix_multiply_elementwise(a, c) + assert h == a.multiply_elementwise(c) + assert h[0, 0] == 7 + assert h[0, 1] == 4 + assert h[1, 0] == 18 + assert h[1, 1] == 6 + assert h[2, 0] == 0 + assert h[2, 1] == 0 + raises(ShapeError, lambda: matrix_multiply_elementwise(a, b)) + + c = b * Symbol("x") + assert isinstance(c, Matrix) + assert c[0, 0] == x + assert c[0, 1] == 2*x + assert c[1, 0] == 3*x + assert c[1, 1] == 0 + + c2 = x * b + assert c == c2 + + c = 5 * b + assert isinstance(c, Matrix) + assert c[0, 0] == 5 + assert c[0, 1] == 2*5 + assert c[1, 0] == 3*5 + assert c[1, 1] == 0 + + M = Matrix([[oo, 0], [0, oo]]) + assert M ** 2 == M + + M = Matrix([[oo, oo], [0, 0]]) + assert M ** 2 == Matrix([[nan, nan], [nan, nan]]) + + # https://github.com/sympy/sympy/issues/22353 + A = Matrix(ones(3, 1)) + _h = -Rational(1, 2) + B = Matrix([_h, _h, _h]) + assert A.multiply_elementwise(B) == Matrix([ + [_h], + [_h], + [_h]]) + + +def test_power(): + raises(NonSquareMatrixError, lambda: Matrix((1, 2))**2) + + A = Matrix([[2, 3], [4, 5]]) + assert A**5 == Matrix([[6140, 8097], [10796, 14237]]) + A = Matrix([[2, 1, 3], [4, 2, 4], [6, 12, 1]]) + assert A**3 == Matrix([[290, 262, 251], [448, 440, 368], [702, 954, 433]]) + assert A**0 == eye(3) + assert A**1 == A + assert (Matrix([[2]]) ** 100)[0, 0] == 2**100 + assert Matrix([[1, 2], [3, 4]])**Integer(2) == Matrix([[7, 10], [15, 22]]) + A = Matrix([[1,2],[4,5]]) + assert A.pow(20, method='cayley') == A.pow(20, method='multiply') + assert A**Integer(2) == Matrix([[9, 12], [24, 33]]) + assert eye(2)**10000000 == eye(2) + + A = Matrix([[33, 24], [48, 57]]) + assert (A**S.Half)[:] == [5, 2, 4, 7] + A = Matrix([[0, 4], [-1, 5]]) + assert (A**S.Half)**2 == A + + assert Matrix([[1, 0], [1, 1]])**S.Half == Matrix([[1, 0], [S.Half, 1]]) + assert Matrix([[1, 0], [1, 1]])**0.5 == Matrix([[1, 0], [0.5, 1]]) + from sympy.abc import n + assert Matrix([[1, a], [0, 1]])**n == Matrix([[1, a*n], [0, 1]]) + assert Matrix([[b, a], [0, b]])**n == Matrix([[b**n, a*b**(n-1)*n], [0, b**n]]) + assert Matrix([ + [a**n, a**(n - 1)*n, (a**n*n**2 - a**n*n)/(2*a**2)], + [ 0, a**n, a**(n - 1)*n], + [ 0, 0, a**n]]) + assert Matrix([[a, 1, 0], [0, a, 0], [0, 0, b]])**n == Matrix([ + [a**n, a**(n-1)*n, 0], + [0, a**n, 0], + [0, 0, b**n]]) + + A = Matrix([[1, 0], [1, 7]]) + assert A._matrix_pow_by_jordan_blocks(S(3)) == A._eval_pow_by_recursion(3) + A = Matrix([[2]]) + assert A**10 == Matrix([[2**10]]) == A._matrix_pow_by_jordan_blocks(S(10)) == \ + A._eval_pow_by_recursion(10) + + # testing a matrix that cannot be jordan blocked issue 11766 + m = Matrix([[3, 0, 0, 0, -3], [0, -3, -3, 0, 3], [0, 3, 0, 3, 0], [0, 0, 3, 0, 3], [3, 0, 0, 3, 0]]) + raises(MatrixError, lambda: m._matrix_pow_by_jordan_blocks(S(10))) + + # test issue 11964 + raises(MatrixError, lambda: Matrix([[1, 1], [3, 3]])._matrix_pow_by_jordan_blocks(S(-10))) + A = Matrix([[0, 1, 0], [0, 0, 1], [0, 0, 0]]) # Nilpotent jordan block size 3 + assert A**10.0 == Matrix([[0, 0, 0], [0, 0, 0], [0, 0, 0]]) + raises(ValueError, lambda: A**2.1) + raises(ValueError, lambda: A**Rational(3, 2)) + A = Matrix([[8, 1], [3, 2]]) + assert A**10.0 == Matrix([[1760744107, 272388050], [817164150, 126415807]]) + A = Matrix([[0, 0, 1], [0, 0, 1], [0, 0, 1]]) # Nilpotent jordan block size 1 + assert A**10.0 == Matrix([[0, 0, 1], [0, 0, 1], [0, 0, 1]]) + A = Matrix([[0, 1, 0], [0, 0, 1], [0, 0, 1]]) # Nilpotent jordan block size 2 + assert A**10.0 == Matrix([[0, 0, 1], [0, 0, 1], [0, 0, 1]]) + n = Symbol('n', integer=True) + assert isinstance(A**n, MatPow) + n = Symbol('n', integer=True, negative=True) + raises(ValueError, lambda: A**n) + n = Symbol('n', integer=True, nonnegative=True) + assert A**n == Matrix([ + [KroneckerDelta(0, n), KroneckerDelta(1, n), -KroneckerDelta(0, n) - KroneckerDelta(1, n) + 1], + [ 0, KroneckerDelta(0, n), 1 - KroneckerDelta(0, n)], + [ 0, 0, 1]]) + assert A**(n + 2) == Matrix([[0, 0, 1], [0, 0, 1], [0, 0, 1]]) + raises(ValueError, lambda: A**Rational(3, 2)) + A = Matrix([[0, 0, 1], [3, 0, 1], [4, 3, 1]]) + assert A**5.0 == Matrix([[168, 72, 89], [291, 144, 161], [572, 267, 329]]) + assert A**5.0 == A**5 + A = Matrix([[0, 1, 0],[-1, 0, 0],[0, 0, 0]]) + n = Symbol("n") + An = A**n + assert An.subs(n, 2).doit() == A**2 + raises(ValueError, lambda: An.subs(n, -2).doit()) + assert An * An == A**(2*n) + + # concretizing behavior for non-integer and complex powers + A = Matrix([[0,0,0],[0,0,0],[0,0,0]]) + n = Symbol('n', integer=True, positive=True) + assert A**n == A + n = Symbol('n', integer=True, nonnegative=True) + assert A**n == diag(0**n, 0**n, 0**n) + assert (A**n).subs(n, 0) == eye(3) + assert (A**n).subs(n, 1) == zeros(3) + A = Matrix ([[2,0,0],[0,2,0],[0,0,2]]) + assert A**2.1 == diag (2**2.1, 2**2.1, 2**2.1) + assert A**I == diag (2**I, 2**I, 2**I) + A = Matrix([[0, 1, 0], [0, 0, 1], [0, 0, 1]]) + raises(ValueError, lambda: A**2.1) + raises(ValueError, lambda: A**I) + A = Matrix([[S.Half, S.Half], [S.Half, S.Half]]) + assert A**S.Half == A + A = Matrix([[1, 1],[3, 3]]) + assert A**S.Half == Matrix ([[S.Half, S.Half], [3*S.Half, 3*S.Half]]) + + +def test_issue_17247_expression_blowup_1(): + M = Matrix([[1+x, 1-x], [1-x, 1+x]]) + with dotprodsimp(True): + assert M.exp().expand() == Matrix([ + [ (exp(2*x) + exp(2))/2, (-exp(2*x) + exp(2))/2], + [(-exp(2*x) + exp(2))/2, (exp(2*x) + exp(2))/2]]) + + +def test_issue_17247_expression_blowup_2(): + M = Matrix([[1+x, 1-x], [1-x, 1+x]]) + with dotprodsimp(True): + P, J = M.jordan_form () + assert P*J*P.inv() + + +def test_issue_17247_expression_blowup_3(): + M = Matrix([[1+x, 1-x], [1-x, 1+x]]) + with dotprodsimp(True): + assert M**100 == Matrix([ + [633825300114114700748351602688*x**100 + 633825300114114700748351602688, 633825300114114700748351602688 - 633825300114114700748351602688*x**100], + [633825300114114700748351602688 - 633825300114114700748351602688*x**100, 633825300114114700748351602688*x**100 + 633825300114114700748351602688]]) + + +def test_issue_17247_expression_blowup_4(): +# This matrix takes extremely long on current master even with intermediate simplification so an abbreviated version is used. It is left here for test in case of future optimizations. +# M = Matrix(S('''[ +# [ -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64, 1/4 - 5*I/16, 65/128 + 87*I/64, -9/32 - I/16, 183/256 - 97*I/128, 3/64 + 13*I/64, -23/32 - 59*I/256, 15/128 - 3*I/32, 19/256 + 551*I/1024], +# [-149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128, 85/256 - 33*I/16, 805/128 + 2415*I/512, -219/128 + 115*I/256, 6301/4096 - 6609*I/1024, 119/128 + 143*I/128, -10879/2048 + 4343*I/4096, 129/256 - 549*I/512, 42533/16384 + 29103*I/8192], +# [ 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64, 1/4 - 5*I/16, 65/128 + 87*I/64, -9/32 - I/16, 183/256 - 97*I/128, 3/64 + 13*I/64, -23/32 - 59*I/256], +# [ -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128, 85/256 - 33*I/16, 805/128 + 2415*I/512, -219/128 + 115*I/256, 6301/4096 - 6609*I/1024, 119/128 + 143*I/128, -10879/2048 + 4343*I/4096], +# [ 1 + I, -19/4 + 5*I/4, 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64, 1/4 - 5*I/16, 65/128 + 87*I/64, -9/32 - I/16, 183/256 - 97*I/128], +# [ 21/8 + I, -537/64 + 143*I/16, -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128, 85/256 - 33*I/16, 805/128 + 2415*I/512, -219/128 + 115*I/256, 6301/4096 - 6609*I/1024], +# [ -2, 17/4 - 13*I/2, 1 + I, -19/4 + 5*I/4, 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64, 1/4 - 5*I/16, 65/128 + 87*I/64], +# [ 1/4 + 13*I/4, -825/64 - 147*I/32, 21/8 + I, -537/64 + 143*I/16, -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128, 85/256 - 33*I/16, 805/128 + 2415*I/512], +# [ -4*I, 27/2 + 6*I, -2, 17/4 - 13*I/2, 1 + I, -19/4 + 5*I/4, 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64], +# [ 1/4 + 5*I/2, -23/8 - 57*I/16, 1/4 + 13*I/4, -825/64 - 147*I/32, 21/8 + I, -537/64 + 143*I/16, -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128], +# [ -4, 9 - 5*I, -4*I, 27/2 + 6*I, -2, 17/4 - 13*I/2, 1 + I, -19/4 + 5*I/4, 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16], +# [ -2*I, 119/8 + 29*I/4, 1/4 + 5*I/2, -23/8 - 57*I/16, 1/4 + 13*I/4, -825/64 - 147*I/32, 21/8 + I, -537/64 + 143*I/16, -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128]]''')) +# assert M**10 == Matrix([ +# [ 7*(-221393644768594642173548179825793834595 - 1861633166167425978847110897013541127952*I)/9671406556917033397649408, 15*(31670992489131684885307005100073928751695 + 10329090958303458811115024718207404523808*I)/77371252455336267181195264, 7*(-3710978679372178839237291049477017392703 + 1377706064483132637295566581525806894169*I)/19342813113834066795298816, (9727707023582419994616144751727760051598 - 59261571067013123836477348473611225724433*I)/9671406556917033397649408, (31896723509506857062605551443641668183707 + 54643444538699269118869436271152084599580*I)/38685626227668133590597632, (-2024044860947539028275487595741003997397402 + 130959428791783397562960461903698670485863*I)/309485009821345068724781056, 3*(26190251453797590396533756519358368860907 - 27221191754180839338002754608545400941638*I)/77371252455336267181195264, (1154643595139959842768960128434994698330461 + 3385496216250226964322872072260446072295634*I)/618970019642690137449562112, 3*(-31849347263064464698310044805285774295286 - 11877437776464148281991240541742691164309*I)/77371252455336267181195264, (4661330392283532534549306589669150228040221 - 4171259766019818631067810706563064103956871*I)/1237940039285380274899124224, (9598353794289061833850770474812760144506 + 358027153990999990968244906482319780943983*I)/309485009821345068724781056, (-9755135335127734571547571921702373498554177 - 4837981372692695195747379349593041939686540*I)/2475880078570760549798248448], +# [(-379516731607474268954110071392894274962069 - 422272153179747548473724096872271700878296*I)/77371252455336267181195264, (41324748029613152354787280677832014263339501 - 12715121258662668420833935373453570749288074*I)/1237940039285380274899124224, (-339216903907423793947110742819264306542397 + 494174755147303922029979279454787373566517*I)/77371252455336267181195264, (-18121350839962855576667529908850640619878381 - 37413012454129786092962531597292531089199003*I)/1237940039285380274899124224, (2489661087330511608618880408199633556675926 + 1137821536550153872137379935240732287260863*I)/309485009821345068724781056, (-136644109701594123227587016790354220062972119 + 110130123468183660555391413889600443583585272*I)/4951760157141521099596496896, (1488043981274920070468141664150073426459593 - 9691968079933445130866371609614474474327650*I)/1237940039285380274899124224, 27*(4636797403026872518131756991410164760195942 + 3369103221138229204457272860484005850416533*I)/4951760157141521099596496896, (-8534279107365915284081669381642269800472363 + 2241118846262661434336333368511372725482742*I)/1237940039285380274899124224, (60923350128174260992536531692058086830950875 - 263673488093551053385865699805250505661590126*I)/9903520314283042199192993792, (18520943561240714459282253753348921824172569 + 24846649186468656345966986622110971925703604*I)/4951760157141521099596496896, (-232781130692604829085973604213529649638644431 + 35981505277760667933017117949103953338570617*I)/9903520314283042199192993792], +# [ (8742968295129404279528270438201520488950 + 3061473358639249112126847237482570858327*I)/4835703278458516698824704, (-245657313712011778432792959787098074935273 + 253113767861878869678042729088355086740856*I)/38685626227668133590597632, (1947031161734702327107371192008011621193 - 19462330079296259148177542369999791122762*I)/9671406556917033397649408, (552856485625209001527688949522750288619217 + 392928441196156725372494335248099016686580*I)/77371252455336267181195264, (-44542866621905323121630214897126343414629 + 3265340021421335059323962377647649632959*I)/19342813113834066795298816, (136272594005759723105646069956434264218730 - 330975364731707309489523680957584684763587*I)/38685626227668133590597632, (27392593965554149283318732469825168894401 + 75157071243800133880129376047131061115278*I)/38685626227668133590597632, 7*(-357821652913266734749960136017214096276154 - 45509144466378076475315751988405961498243*I)/309485009821345068724781056, (104485001373574280824835174390219397141149 - 99041000529599568255829489765415726168162*I)/77371252455336267181195264, (1198066993119982409323525798509037696321291 + 4249784165667887866939369628840569844519936*I)/618970019642690137449562112, (-114985392587849953209115599084503853611014 - 52510376847189529234864487459476242883449*I)/77371252455336267181195264, (6094620517051332877965959223269600650951573 - 4683469779240530439185019982269137976201163*I)/1237940039285380274899124224], +# [ (611292255597977285752123848828590587708323 - 216821743518546668382662964473055912169502*I)/77371252455336267181195264, (-1144023204575811464652692396337616594307487 + 12295317806312398617498029126807758490062855*I)/309485009821345068724781056, (-374093027769390002505693378578475235158281 - 573533923565898290299607461660384634333639*I)/77371252455336267181195264, (47405570632186659000138546955372796986832987 - 2837476058950808941605000274055970055096534*I)/1237940039285380274899124224, (-571573207393621076306216726219753090535121 + 533381457185823100878764749236639320783831*I)/77371252455336267181195264, (-7096548151856165056213543560958582513797519 - 24035731898756040059329175131592138642195366*I)/618970019642690137449562112, (2396762128833271142000266170154694033849225 + 1448501087375679588770230529017516492953051*I)/309485009821345068724781056, (-150609293845161968447166237242456473262037053 + 92581148080922977153207018003184520294188436*I)/4951760157141521099596496896, 5*(270278244730804315149356082977618054486347 - 1997830155222496880429743815321662710091562*I)/1237940039285380274899124224, (62978424789588828258068912690172109324360330 + 44803641177219298311493356929537007630129097*I)/2475880078570760549798248448, 19*(-451431106327656743945775812536216598712236 + 114924966793632084379437683991151177407937*I)/1237940039285380274899124224, (63417747628891221594106738815256002143915995 - 261508229397507037136324178612212080871150958*I)/9903520314283042199192993792], +# [ (-2144231934021288786200752920446633703357 + 2305614436009705803670842248131563850246*I)/1208925819614629174706176, (-90720949337459896266067589013987007078153 - 221951119475096403601562347412753844534569*I)/19342813113834066795298816, (11590973613116630788176337262688659880376 + 6514520676308992726483494976339330626159*I)/4835703278458516698824704, 3*(-131776217149000326618649542018343107657237 + 79095042939612668486212006406818285287004*I)/38685626227668133590597632, (10100577916793945997239221374025741184951 - 28631383488085522003281589065994018550748*I)/9671406556917033397649408, 67*(10090295594251078955008130473573667572549 + 10449901522697161049513326446427839676762*I)/77371252455336267181195264, (-54270981296988368730689531355811033930513 - 3413683117592637309471893510944045467443*I)/19342813113834066795298816, (440372322928679910536575560069973699181278 - 736603803202303189048085196176918214409081*I)/77371252455336267181195264, (33220374714789391132887731139763250155295 + 92055083048787219934030779066298919603554*I)/38685626227668133590597632, 5*(-594638554579967244348856981610805281527116 - 82309245323128933521987392165716076704057*I)/309485009821345068724781056, (128056368815300084550013708313312073721955 - 114619107488668120303579745393765245911404*I)/77371252455336267181195264, 21*(59839959255173222962789517794121843393573 + 241507883613676387255359616163487405826334*I)/618970019642690137449562112], +# [ (-13454485022325376674626653802541391955147 + 184471402121905621396582628515905949793486*I)/19342813113834066795298816, (-6158730123400322562149780662133074862437105 - 3416173052604643794120262081623703514107476*I)/154742504910672534362390528, (770558003844914708453618983120686116100419 - 127758381209767638635199674005029818518766*I)/77371252455336267181195264, (-4693005771813492267479835161596671660631703 + 12703585094750991389845384539501921531449948*I)/309485009821345068724781056, (-295028157441149027913545676461260860036601 - 841544569970643160358138082317324743450770*I)/77371252455336267181195264, (56716442796929448856312202561538574275502893 + 7216818824772560379753073185990186711454778*I)/1237940039285380274899124224, 15*(-87061038932753366532685677510172566368387 + 61306141156647596310941396434445461895538*I)/154742504910672534362390528, (-3455315109680781412178133042301025723909347 - 24969329563196972466388460746447646686670670*I)/618970019642690137449562112, (2453418854160886481106557323699250865361849 + 1497886802326243014471854112161398141242514*I)/309485009821345068724781056, (-151343224544252091980004429001205664193082173 + 90471883264187337053549090899816228846836628*I)/4951760157141521099596496896, (1652018205533026103358164026239417416432989 - 9959733619236515024261775397109724431400162*I)/1237940039285380274899124224, 3*(40676374242956907656984876692623172736522006 + 31023357083037817469535762230872667581366205*I)/4951760157141521099596496896], +# [ (-1226990509403328460274658603410696548387 - 4131739423109992672186585941938392788458*I)/1208925819614629174706176, (162392818524418973411975140074368079662703 + 23706194236915374831230612374344230400704*I)/9671406556917033397649408, (-3935678233089814180000602553655565621193 + 2283744757287145199688061892165659502483*I)/1208925819614629174706176, (-2400210250844254483454290806930306285131 - 315571356806370996069052930302295432758205*I)/19342813113834066795298816, (13365917938215281056563183751673390817910 + 15911483133819801118348625831132324863881*I)/4835703278458516698824704, 3*(-215950551370668982657516660700301003897855 + 51684341999223632631602864028309400489378*I)/38685626227668133590597632, (20886089946811765149439844691320027184765 - 30806277083146786592790625980769214361844*I)/9671406556917033397649408, (562180634592713285745940856221105667874855 + 1031543963988260765153550559766662245114916*I)/77371252455336267181195264, (-65820625814810177122941758625652476012867 - 12429918324787060890804395323920477537595*I)/19342813113834066795298816, (319147848192012911298771180196635859221089 - 402403304933906769233365689834404519960394*I)/38685626227668133590597632, (23035615120921026080284733394359587955057 + 115351677687031786114651452775242461310624*I)/38685626227668133590597632, (-3426830634881892756966440108592579264936130 - 1022954961164128745603407283836365128598559*I)/309485009821345068724781056], +# [ (-192574788060137531023716449082856117537757 - 69222967328876859586831013062387845780692*I)/19342813113834066795298816, (2736383768828013152914815341491629299773262 - 2773252698016291897599353862072533475408743*I)/77371252455336267181195264, (-23280005281223837717773057436155921656805 + 214784953368021840006305033048142888879224*I)/19342813113834066795298816, (-3035247484028969580570400133318947903462326 - 2195168903335435855621328554626336958674325*I)/77371252455336267181195264, (984552428291526892214541708637840971548653 - 64006622534521425620714598573494988589378*I)/77371252455336267181195264, (-3070650452470333005276715136041262898509903 + 7286424705750810474140953092161794621989080*I)/154742504910672534362390528, (-147848877109756404594659513386972921139270 - 416306113044186424749331418059456047650861*I)/38685626227668133590597632, (55272118474097814260289392337160619494260781 + 7494019668394781211907115583302403519488058*I)/1237940039285380274899124224, (-581537886583682322424771088996959213068864 + 542191617758465339135308203815256798407429*I)/77371252455336267181195264, (-6422548983676355789975736799494791970390991 - 23524183982209004826464749309156698827737702*I)/618970019642690137449562112, 7*(180747195387024536886923192475064903482083 + 84352527693562434817771649853047924991804*I)/154742504910672534362390528, (-135485179036717001055310712747643466592387031 + 102346575226653028836678855697782273460527608*I)/4951760157141521099596496896], +# [ (3384238362616083147067025892852431152105 + 156724444932584900214919898954874618256*I)/604462909807314587353088, (-59558300950677430189587207338385764871866 + 114427143574375271097298201388331237478857*I)/4835703278458516698824704, (-1356835789870635633517710130971800616227 - 7023484098542340388800213478357340875410*I)/1208925819614629174706176, (234884918567993750975181728413524549575881 + 79757294640629983786895695752733890213506*I)/9671406556917033397649408, (-7632732774935120473359202657160313866419 + 2905452608512927560554702228553291839465*I)/1208925819614629174706176, (52291747908702842344842889809762246649489 - 520996778817151392090736149644507525892649*I)/19342813113834066795298816, (17472406829219127839967951180375981717322 + 23464704213841582137898905375041819568669*I)/4835703278458516698824704, (-911026971811893092350229536132730760943307 + 150799318130900944080399439626714846752360*I)/38685626227668133590597632, (26234457233977042811089020440646443590687 - 45650293039576452023692126463683727692890*I)/9671406556917033397649408, 3*(288348388717468992528382586652654351121357 + 454526517721403048270274049572136109264668*I)/77371252455336267181195264, (-91583492367747094223295011999405657956347 - 12704691128268298435362255538069612411331*I)/19342813113834066795298816, (411208730251327843849027957710164064354221 - 569898526380691606955496789378230959965898*I)/38685626227668133590597632], +# [ (27127513117071487872628354831658811211795 - 37765296987901990355760582016892124833857*I)/4835703278458516698824704, (1741779916057680444272938534338833170625435 + 3083041729779495966997526404685535449810378*I)/77371252455336267181195264, 3*(-60642236251815783728374561836962709533401 - 24630301165439580049891518846174101510744*I)/19342813113834066795298816, 3*(445885207364591681637745678755008757483408 - 350948497734812895032502179455610024541643*I)/38685626227668133590597632, (-47373295621391195484367368282471381775684 + 219122969294089357477027867028071400054973*I)/19342813113834066795298816, (-2801565819673198722993348253876353741520438 - 2250142129822658548391697042460298703335701*I)/77371252455336267181195264, (801448252275607253266997552356128790317119 - 50890367688077858227059515894356594900558*I)/77371252455336267181195264, (-5082187758525931944557763799137987573501207 + 11610432359082071866576699236013484487676124*I)/309485009821345068724781056, (-328925127096560623794883760398247685166830 - 643447969697471610060622160899409680422019*I)/77371252455336267181195264, 15*(2954944669454003684028194956846659916299765 + 33434406416888505837444969347824812608566*I)/1237940039285380274899124224, (-415749104352001509942256567958449835766827 + 479330966144175743357171151440020955412219*I)/77371252455336267181195264, 3*(-4639987285852134369449873547637372282914255 - 11994411888966030153196659207284951579243273*I)/1237940039285380274899124224], +# [ (-478846096206269117345024348666145495601 + 1249092488629201351470551186322814883283*I)/302231454903657293676544, (-17749319421930878799354766626365926894989 - 18264580106418628161818752318217357231971*I)/1208925819614629174706176, (2801110795431528876849623279389579072819 + 363258850073786330770713557775566973248*I)/604462909807314587353088, (-59053496693129013745775512127095650616252 + 78143588734197260279248498898321500167517*I)/4835703278458516698824704, (-283186724922498212468162690097101115349 - 6443437753863179883794497936345437398276*I)/1208925819614629174706176, (188799118826748909206887165661384998787543 + 84274736720556630026311383931055307398820*I)/9671406556917033397649408, (-5482217151670072904078758141270295025989 + 1818284338672191024475557065444481298568*I)/1208925819614629174706176, (56564463395350195513805521309731217952281 - 360208541416798112109946262159695452898431*I)/19342813113834066795298816, 11*(1259539805728870739006416869463689438068 + 1409136581547898074455004171305324917387*I)/4835703278458516698824704, 5*(-123701190701414554945251071190688818343325 + 30997157322590424677294553832111902279712*I)/38685626227668133590597632, (16130917381301373033736295883982414239781 - 32752041297570919727145380131926943374516*I)/9671406556917033397649408, (650301385108223834347093740500375498354925 + 899526407681131828596801223402866051809258*I)/77371252455336267181195264], +# [ (9011388245256140876590294262420614839483 + 8167917972423946282513000869327525382672*I)/1208925819614629174706176, (-426393174084720190126376382194036323028924 + 180692224825757525982858693158209545430621*I)/9671406556917033397649408, (24588556702197802674765733448108154175535 - 45091766022876486566421953254051868331066*I)/4835703278458516698824704, (1872113939365285277373877183750416985089691 + 3030392393733212574744122057679633775773130*I)/77371252455336267181195264, (-222173405538046189185754954524429864167549 - 75193157893478637039381059488387511299116*I)/19342813113834066795298816, (2670821320766222522963689317316937579844558 - 2645837121493554383087981511645435472169191*I)/77371252455336267181195264, 5*(-2100110309556476773796963197283876204940 + 41957457246479840487980315496957337371937*I)/19342813113834066795298816, (-5733743755499084165382383818991531258980593 - 3328949988392698205198574824396695027195732*I)/154742504910672534362390528, (707827994365259025461378911159398206329247 - 265730616623227695108042528694302299777294*I)/77371252455336267181195264, (-1442501604682933002895864804409322823788319 + 11504137805563265043376405214378288793343879*I)/309485009821345068724781056, (-56130472299445561499538726459719629522285 - 61117552419727805035810982426639329818864*I)/9671406556917033397649408, (39053692321126079849054272431599539429908717 - 10209127700342570953247177602860848130710666*I)/1237940039285380274899124224]]) + M = Matrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64, 1/4 - 5*I/16, 65/128 + 87*I/64], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128, 85/256 - 33*I/16, 805/128 + 2415*I/512], + [ 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64], + [ -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128], + [ 1 + I, -19/4 + 5*I/4, 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16], + [ 21/8 + I, -537/64 + 143*I/16, -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M**10 == Matrix(S('''[ + [ 7369525394972778926719607798014571861/604462909807314587353088 - 229284202061790301477392339912557559*I/151115727451828646838272, -19704281515163975949388435612632058035/1208925819614629174706176 + 14319858347987648723768698170712102887*I/302231454903657293676544, -3623281909451783042932142262164941211/604462909807314587353088 - 6039240602494288615094338643452320495*I/604462909807314587353088, 109260497799140408739847239685705357695/2417851639229258349412352 - 7427566006564572463236368211555511431*I/2417851639229258349412352, -16095803767674394244695716092817006641/2417851639229258349412352 + 10336681897356760057393429626719177583*I/1208925819614629174706176, -42207883340488041844332828574359769743/2417851639229258349412352 - 182332262671671273188016400290188468499*I/4835703278458516698824704], + [50566491050825573392726324995779608259/1208925819614629174706176 - 90047007594468146222002432884052362145*I/2417851639229258349412352, 74273703462900000967697427843983822011/1208925819614629174706176 + 265947522682943571171988741842776095421*I/1208925819614629174706176, -116900341394390200556829767923360888429/2417851639229258349412352 - 53153263356679268823910621474478756845*I/2417851639229258349412352, 195407378023867871243426523048612490249/1208925819614629174706176 - 1242417915995360200584837585002906728929*I/9671406556917033397649408, -863597594389821970177319682495878193/302231454903657293676544 + 476936100741548328800725360758734300481*I/9671406556917033397649408, -3154451590535653853562472176601754835575/19342813113834066795298816 - 232909875490506237386836489998407329215*I/2417851639229258349412352], + [ -1715444997702484578716037230949868543/302231454903657293676544 + 5009695651321306866158517287924120777*I/302231454903657293676544, -30551582497996879620371947949342101301/604462909807314587353088 - 7632518367986526187139161303331519629*I/151115727451828646838272, 312680739924495153190604170938220575/18889465931478580854784 - 108664334509328818765959789219208459*I/75557863725914323419136, -14693696966703036206178521686918865509/604462909807314587353088 + 72345386220900843930147151999899692401*I/1208925819614629174706176, -8218872496728882299722894680635296519/1208925819614629174706176 - 16776782833358893712645864791807664983*I/1208925819614629174706176, 143237839169380078671242929143670635137/2417851639229258349412352 + 2883817094806115974748882735218469447*I/2417851639229258349412352], + [ 3087979417831061365023111800749855987/151115727451828646838272 + 34441942370802869368851419102423997089*I/604462909807314587353088, -148309181940158040917731426845476175667/604462909807314587353088 - 263987151804109387844966835369350904919*I/9671406556917033397649408, 50259518594816377378747711930008883165/1208925819614629174706176 - 95713974916869240305450001443767979653*I/2417851639229258349412352, 153466447023875527996457943521467271119/2417851639229258349412352 + 517285524891117105834922278517084871349*I/2417851639229258349412352, -29184653615412989036678939366291205575/604462909807314587353088 - 27551322282526322041080173287022121083*I/1208925819614629174706176, 196404220110085511863671393922447671649/1208925819614629174706176 - 1204712019400186021982272049902206202145*I/9671406556917033397649408], + [ -2632581805949645784625606590600098779/151115727451828646838272 - 589957435912868015140272627522612771*I/37778931862957161709568, 26727850893953715274702844733506310247/302231454903657293676544 - 10825791956782128799168209600694020481*I/302231454903657293676544, -1036348763702366164044671908440791295/151115727451828646838272 + 3188624571414467767868303105288107375*I/151115727451828646838272, -36814959939970644875593411585393242449/604462909807314587353088 - 18457555789119782404850043842902832647*I/302231454903657293676544, 12454491297984637815063964572803058647/604462909807314587353088 - 340489532842249733975074349495329171*I/302231454903657293676544, -19547211751145597258386735573258916681/604462909807314587353088 + 87299583775782199663414539883938008933*I/1208925819614629174706176], + [ -40281994229560039213253423262678393183/604462909807314587353088 - 2939986850065527327299273003299736641*I/604462909807314587353088, 331940684638052085845743020267462794181/2417851639229258349412352 - 284574901963624403933361315517248458969*I/1208925819614629174706176, 6453843623051745485064693628073010961/302231454903657293676544 + 36062454107479732681350914931391590957*I/604462909807314587353088, -147665869053634695632880753646441962067/604462909807314587353088 - 305987938660447291246597544085345123927*I/9671406556917033397649408, 107821369195275772166593879711259469423/2417851639229258349412352 - 11645185518211204108659001435013326687*I/302231454903657293676544, 64121228424717666402009446088588091619/1208925819614629174706176 + 265557133337095047883844369272389762133*I/1208925819614629174706176]]''')) + + +def test_issue_17247_expression_blowup_5(): + M = Matrix(6, 6, lambda i, j: 1 + (-1)**(i+j)*I) + with dotprodsimp(True): + assert M.charpoly('x') == PurePoly(x**6 + (-6 - 6*I)*x**5 + 36*I*x**4, x, domain='EX') + + +def test_issue_17247_expression_blowup_6(): + M = Matrix(8, 8, [x+i for i in range (64)]) + with dotprodsimp(True): + assert M.det('bareiss') == 0 + + +def test_issue_17247_expression_blowup_7(): + M = Matrix(6, 6, lambda i, j: 1 + (-1)**(i+j)*I) + with dotprodsimp(True): + assert M.det('berkowitz') == 0 + + +def test_issue_17247_expression_blowup_8(): + M = Matrix(8, 8, [x+i for i in range (64)]) + with dotprodsimp(True): + assert M.det('lu') == 0 + + +def test_issue_17247_expression_blowup_9(): + M = Matrix(8, 8, [x+i for i in range (64)]) + with dotprodsimp(True): + assert M.rref() == (Matrix([ + [1, 0, -1, -2, -3, -4, -5, -6], + [0, 1, 2, 3, 4, 5, 6, 7], + [0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0]]), (0, 1)) + + +def test_issue_17247_expression_blowup_10(): + M = Matrix(6, 6, lambda i, j: 1 + (-1)**(i+j)*I) + with dotprodsimp(True): + assert M.cofactor(0, 0) == 0 + + +def test_issue_17247_expression_blowup_11(): + M = Matrix(6, 6, lambda i, j: 1 + (-1)**(i+j)*I) + with dotprodsimp(True): + assert M.cofactor_matrix() == Matrix(6, 6, [0]*36) + + +def test_issue_17247_expression_blowup_12(): + M = Matrix(6, 6, lambda i, j: 1 + (-1)**(i+j)*I) + with dotprodsimp(True): + assert M.eigenvals() == {6: 1, 6*I: 1, 0: 4} + + +def test_issue_17247_expression_blowup_13(): + M = Matrix([ + [ 0, 1 - x, x + 1, 1 - x], + [1 - x, x + 1, 0, x + 1], + [ 0, 1 - x, x + 1, 1 - x], + [ 0, 0, 1 - x, 0]]) + + ev = M.eigenvects() + assert ev[0] == (0, 2, [Matrix([0, -1, 0, 1])]) + assert ev[1][0] == x - sqrt(2)*(x - 1) + 1 + assert ev[1][1] == 1 + assert ev[1][2][0].expand(deep=False, numer=True) == Matrix([ + [(-x + sqrt(2)*(x - 1) - 1)/(x - 1)], + [-4*x/(x**2 - 2*x + 1) + (x + 1)*(x - sqrt(2)*(x - 1) + 1)/(x**2 - 2*x + 1)], + [(-x + sqrt(2)*(x - 1) - 1)/(x - 1)], + [1] + ]) + + assert ev[2][0] == x + sqrt(2)*(x - 1) + 1 + assert ev[2][1] == 1 + assert ev[2][2][0].expand(deep=False, numer=True) == Matrix([ + [(-x - sqrt(2)*(x - 1) - 1)/(x - 1)], + [-4*x/(x**2 - 2*x + 1) + (x + 1)*(x + sqrt(2)*(x - 1) + 1)/(x**2 - 2*x + 1)], + [(-x - sqrt(2)*(x - 1) - 1)/(x - 1)], + [1] + ]) + + +def test_issue_17247_expression_blowup_14(): + M = Matrix(8, 8, ([1+x, 1-x]*4 + [1-x, 1+x]*4)*4) + with dotprodsimp(True): + assert M.echelon_form() == Matrix([ + [x + 1, 1 - x, x + 1, 1 - x, x + 1, 1 - x, x + 1, 1 - x], + [ 0, 4*x, 0, 4*x, 0, 4*x, 0, 4*x], + [ 0, 0, 0, 0, 0, 0, 0, 0], + [ 0, 0, 0, 0, 0, 0, 0, 0], + [ 0, 0, 0, 0, 0, 0, 0, 0], + [ 0, 0, 0, 0, 0, 0, 0, 0], + [ 0, 0, 0, 0, 0, 0, 0, 0], + [ 0, 0, 0, 0, 0, 0, 0, 0]]) + + +def test_issue_17247_expression_blowup_15(): + M = Matrix(8, 8, ([1+x, 1-x]*4 + [1-x, 1+x]*4)*4) + with dotprodsimp(True): + assert M.rowspace() == [Matrix([[x + 1, 1 - x, x + 1, 1 - x, x + 1, 1 - x, x + 1, 1 - x]]), Matrix([[0, 4*x, 0, 4*x, 0, 4*x, 0, 4*x]])] + + +def test_issue_17247_expression_blowup_16(): + M = Matrix(8, 8, ([1+x, 1-x]*4 + [1-x, 1+x]*4)*4) + with dotprodsimp(True): + assert M.columnspace() == [Matrix([[x + 1],[1 - x],[x + 1],[1 - x],[x + 1],[1 - x],[x + 1],[1 - x]]), Matrix([[1 - x],[x + 1],[1 - x],[x + 1],[1 - x],[x + 1],[1 - x],[x + 1]])] + + +def test_issue_17247_expression_blowup_17(): + M = Matrix(8, 8, [x+i for i in range (64)]) + with dotprodsimp(True): + assert M.nullspace() == [ + Matrix([[1],[-2],[1],[0],[0],[0],[0],[0]]), + Matrix([[2],[-3],[0],[1],[0],[0],[0],[0]]), + Matrix([[3],[-4],[0],[0],[1],[0],[0],[0]]), + Matrix([[4],[-5],[0],[0],[0],[1],[0],[0]]), + Matrix([[5],[-6],[0],[0],[0],[0],[1],[0]]), + Matrix([[6],[-7],[0],[0],[0],[0],[0],[1]])] + + +def test_issue_17247_expression_blowup_18(): + M = Matrix(6, 6, ([1+x, 1-x]*3 + [1-x, 1+x]*3)*3) + with dotprodsimp(True): + assert not M.is_nilpotent() + + +def test_issue_17247_expression_blowup_19(): + M = Matrix(S('''[ + [ -3/4, 0, 1/4 + I/2, 0], + [ 0, -177/128 - 1369*I/128, 0, -2063/256 + 541*I/128], + [ 1/2 - I, 0, 0, 0], + [ 0, 0, 0, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert not M.is_diagonalizable() + + +def test_issue_17247_expression_blowup_20(): + M = Matrix([ + [x + 1, 1 - x, 0, 0], + [1 - x, x + 1, 0, x + 1], + [ 0, 1 - x, x + 1, 0], + [ 0, 0, 0, x + 1]]) + with dotprodsimp(True): + assert M.diagonalize() == (Matrix([ + [1, 1, 0, (x + 1)/(x - 1)], + [1, -1, 0, 0], + [1, 1, 1, 0], + [0, 0, 0, 1]]), + Matrix([ + [2, 0, 0, 0], + [0, 2*x, 0, 0], + [0, 0, x + 1, 0], + [0, 0, 0, x + 1]])) + + +def test_issue_17247_expression_blowup_21(): + M = Matrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 0, 0], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 0, -2063/256 + 541*I/128], + [ 0, 9/4 + 55*I/16, 2473/256 + 137*I/64, 0], + [ 0, 0, 0, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M.inv(method='GE') == Matrix(S('''[ + [-26194832/3470993 - 31733264*I/3470993, 156352/3470993 + 10325632*I/3470993, 0, -7741283181072/3306971225785 + 2999007604624*I/3306971225785], + [4408224/3470993 - 9675328*I/3470993, -2422272/3470993 + 1523712*I/3470993, 0, -1824666489984/3306971225785 - 1401091949952*I/3306971225785], + [-26406945676288/22270005630769 + 10245925485056*I/22270005630769, 7453523312640/22270005630769 + 1601616519168*I/22270005630769, 633088/6416033 - 140288*I/6416033, 872209227109521408/21217636514687010905 + 6066405081802389504*I/21217636514687010905], + [0, 0, 0, -11328/952745 + 87616*I/952745]]''')) + + +def test_issue_17247_expression_blowup_22(): + M = Matrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 0, 0], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 0, -2063/256 + 541*I/128], + [ 0, 9/4 + 55*I/16, 2473/256 + 137*I/64, 0], + [ 0, 0, 0, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M.inv(method='LU') == Matrix(S('''[ + [-26194832/3470993 - 31733264*I/3470993, 156352/3470993 + 10325632*I/3470993, 0, -7741283181072/3306971225785 + 2999007604624*I/3306971225785], + [4408224/3470993 - 9675328*I/3470993, -2422272/3470993 + 1523712*I/3470993, 0, -1824666489984/3306971225785 - 1401091949952*I/3306971225785], + [-26406945676288/22270005630769 + 10245925485056*I/22270005630769, 7453523312640/22270005630769 + 1601616519168*I/22270005630769, 633088/6416033 - 140288*I/6416033, 872209227109521408/21217636514687010905 + 6066405081802389504*I/21217636514687010905], + [0, 0, 0, -11328/952745 + 87616*I/952745]]''')) + + +def test_issue_17247_expression_blowup_23(): + M = Matrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 0, 0], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 0, -2063/256 + 541*I/128], + [ 0, 9/4 + 55*I/16, 2473/256 + 137*I/64, 0], + [ 0, 0, 0, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M.inv(method='ADJ').expand() == Matrix(S('''[ + [-26194832/3470993 - 31733264*I/3470993, 156352/3470993 + 10325632*I/3470993, 0, -7741283181072/3306971225785 + 2999007604624*I/3306971225785], + [4408224/3470993 - 9675328*I/3470993, -2422272/3470993 + 1523712*I/3470993, 0, -1824666489984/3306971225785 - 1401091949952*I/3306971225785], + [-26406945676288/22270005630769 + 10245925485056*I/22270005630769, 7453523312640/22270005630769 + 1601616519168*I/22270005630769, 633088/6416033 - 140288*I/6416033, 872209227109521408/21217636514687010905 + 6066405081802389504*I/21217636514687010905], + [0, 0, 0, -11328/952745 + 87616*I/952745]]''')) + + +def test_issue_17247_expression_blowup_24(): + M = SparseMatrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 0, 0], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 0, -2063/256 + 541*I/128], + [ 0, 9/4 + 55*I/16, 2473/256 + 137*I/64, 0], + [ 0, 0, 0, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M.inv(method='CH') == Matrix(S('''[ + [-26194832/3470993 - 31733264*I/3470993, 156352/3470993 + 10325632*I/3470993, 0, -7741283181072/3306971225785 + 2999007604624*I/3306971225785], + [4408224/3470993 - 9675328*I/3470993, -2422272/3470993 + 1523712*I/3470993, 0, -1824666489984/3306971225785 - 1401091949952*I/3306971225785], + [-26406945676288/22270005630769 + 10245925485056*I/22270005630769, 7453523312640/22270005630769 + 1601616519168*I/22270005630769, 633088/6416033 - 140288*I/6416033, 872209227109521408/21217636514687010905 + 6066405081802389504*I/21217636514687010905], + [0, 0, 0, -11328/952745 + 87616*I/952745]]''')) + + +def test_issue_17247_expression_blowup_25(): + M = SparseMatrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 0, 0], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 0, -2063/256 + 541*I/128], + [ 0, 9/4 + 55*I/16, 2473/256 + 137*I/64, 0], + [ 0, 0, 0, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M.inv(method='LDL') == Matrix(S('''[ + [-26194832/3470993 - 31733264*I/3470993, 156352/3470993 + 10325632*I/3470993, 0, -7741283181072/3306971225785 + 2999007604624*I/3306971225785], + [4408224/3470993 - 9675328*I/3470993, -2422272/3470993 + 1523712*I/3470993, 0, -1824666489984/3306971225785 - 1401091949952*I/3306971225785], + [-26406945676288/22270005630769 + 10245925485056*I/22270005630769, 7453523312640/22270005630769 + 1601616519168*I/22270005630769, 633088/6416033 - 140288*I/6416033, 872209227109521408/21217636514687010905 + 6066405081802389504*I/21217636514687010905], + [0, 0, 0, -11328/952745 + 87616*I/952745]]''')) + + +def test_issue_17247_expression_blowup_26(): + M = Matrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64, 1/4 - 5*I/16, 65/128 + 87*I/64, -9/32 - I/16, 183/256 - 97*I/128], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128, 85/256 - 33*I/16, 805/128 + 2415*I/512, -219/128 + 115*I/256, 6301/4096 - 6609*I/1024], + [ 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64, 1/4 - 5*I/16, 65/128 + 87*I/64], + [ -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128, 85/256 - 33*I/16, 805/128 + 2415*I/512], + [ 1 + I, -19/4 + 5*I/4, 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16, 1/4 + I/2, -129/64 - 9*I/64], + [ 21/8 + I, -537/64 + 143*I/16, -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128, 125/64 + 87*I/64, -2063/256 + 541*I/128], + [ -2, 17/4 - 13*I/2, 1 + I, -19/4 + 5*I/4, 1/2 - I, 9/4 + 55*I/16, -3/4, 45/32 - 37*I/16], + [ 1/4 + 13*I/4, -825/64 - 147*I/32, 21/8 + I, -537/64 + 143*I/16, -5/8 - 39*I/16, 2473/256 + 137*I/64, -149/64 + 49*I/32, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M.rank() == 4 + + +def test_issue_17247_expression_blowup_27(): + M = Matrix([ + [ 0, 1 - x, x + 1, 1 - x], + [1 - x, x + 1, 0, x + 1], + [ 0, 1 - x, x + 1, 1 - x], + [ 0, 0, 1 - x, 0]]) + with dotprodsimp(True): + P, J = M.jordan_form() + assert P.expand() == Matrix(S('''[ + [ 0, 4*x/(x**2 - 2*x + 1), -(-17*x**4 + 12*sqrt(2)*x**4 - 4*sqrt(2)*x**3 + 6*x**3 - 6*x - 4*sqrt(2)*x + 12*sqrt(2) + 17)/(-7*x**4 + 5*sqrt(2)*x**4 - 6*sqrt(2)*x**3 + 8*x**3 - 2*x**2 + 8*x + 6*sqrt(2)*x - 5*sqrt(2) - 7), -(12*sqrt(2)*x**4 + 17*x**4 - 6*x**3 - 4*sqrt(2)*x**3 - 4*sqrt(2)*x + 6*x - 17 + 12*sqrt(2))/(7*x**4 + 5*sqrt(2)*x**4 - 6*sqrt(2)*x**3 - 8*x**3 + 2*x**2 - 8*x + 6*sqrt(2)*x - 5*sqrt(2) + 7)], + [x - 1, x/(x - 1) + 1/(x - 1), (-7*x**3 + 5*sqrt(2)*x**3 - x**2 + sqrt(2)*x**2 - sqrt(2)*x - x - 5*sqrt(2) - 7)/(-3*x**3 + 2*sqrt(2)*x**3 - 2*sqrt(2)*x**2 + 3*x**2 + 2*sqrt(2)*x + 3*x - 3 - 2*sqrt(2)), (7*x**3 + 5*sqrt(2)*x**3 + x**2 + sqrt(2)*x**2 - sqrt(2)*x + x - 5*sqrt(2) + 7)/(2*sqrt(2)*x**3 + 3*x**3 - 3*x**2 - 2*sqrt(2)*x**2 - 3*x + 2*sqrt(2)*x - 2*sqrt(2) + 3)], + [ 0, 1, -(-3*x**2 + 2*sqrt(2)*x**2 + 2*x - 3 - 2*sqrt(2))/(-x**2 + sqrt(2)*x**2 - 2*sqrt(2)*x + 1 + sqrt(2)), -(2*sqrt(2)*x**2 + 3*x**2 - 2*x - 2*sqrt(2) + 3)/(x**2 + sqrt(2)*x**2 - 2*sqrt(2)*x - 1 + sqrt(2))], + [1 - x, 0, 1, 1]]''')).expand() + assert J == Matrix(S('''[ + [0, 1, 0, 0], + [0, 0, 0, 0], + [0, 0, x - sqrt(2)*(x - 1) + 1, 0], + [0, 0, 0, x + sqrt(2)*(x - 1) + 1]]''')) + + +def test_issue_17247_expression_blowup_28(): + M = Matrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 0, 0], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 0, -2063/256 + 541*I/128], + [ 0, 9/4 + 55*I/16, 2473/256 + 137*I/64, 0], + [ 0, 0, 0, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M.singular_values() == S('''[ + sqrt(14609315/131072 + sqrt(64789115132571/2147483648 - 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3) + 76627253330829751075/(35184372088832*sqrt(64789115132571/4294967296 + 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)) + 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3))) - 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)))/2 + sqrt(64789115132571/4294967296 + 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)) + 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3))/2), + sqrt(14609315/131072 - sqrt(64789115132571/2147483648 - 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3) + 76627253330829751075/(35184372088832*sqrt(64789115132571/4294967296 + 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)) + 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3))) - 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)))/2 + sqrt(64789115132571/4294967296 + 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)) + 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3))/2), + sqrt(14609315/131072 - sqrt(64789115132571/4294967296 + 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)) + 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3))/2 + sqrt(64789115132571/2147483648 - 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3) - 76627253330829751075/(35184372088832*sqrt(64789115132571/4294967296 + 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)) + 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3))) - 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)))/2), + sqrt(14609315/131072 - sqrt(64789115132571/4294967296 + 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)) + 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3))/2 - sqrt(64789115132571/2147483648 - 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3) - 76627253330829751075/(35184372088832*sqrt(64789115132571/4294967296 + 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)) + 2*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3))) - 3546944054712886603889144627/(110680464442257309696*(25895222463957462655758224991455280215303/633825300114114700748351602688 + sqrt(1213909058710955930446995195883114969038524625997915131236390724543989220134670)*I/22282920707136844948184236032)**(1/3)))/2)]''') + + +def test_issue_16823(): + # This still needs to be fixed if not using dotprodsimp. + M = Matrix(S('''[ + [1+I,-19/4+5/4*I,1/2-I,9/4+55/16*I,-3/4,45/32-37/16*I,1/4+1/2*I,-129/64-9/64*I,1/4-5/16*I,65/128+87/64*I,-9/32-1/16*I,183/256-97/128*I,3/64+13/64*I,-23/32-59/256*I,15/128-3/32*I,19/256+551/1024*I], + [21/8+I,-537/64+143/16*I,-5/8-39/16*I,2473/256+137/64*I,-149/64+49/32*I,-177/128-1369/128*I,125/64+87/64*I,-2063/256+541/128*I,85/256-33/16*I,805/128+2415/512*I,-219/128+115/256*I,6301/4096-6609/1024*I,119/128+143/128*I,-10879/2048+4343/4096*I,129/256-549/512*I,42533/16384+29103/8192*I], + [-2,17/4-13/2*I,1+I,-19/4+5/4*I,1/2-I,9/4+55/16*I,-3/4,45/32-37/16*I,1/4+1/2*I,-129/64-9/64*I,1/4-5/16*I,65/128+87/64*I,-9/32-1/16*I,183/256-97/128*I,3/64+13/64*I,-23/32-59/256*I], + [1/4+13/4*I,-825/64-147/32*I,21/8+I,-537/64+143/16*I,-5/8-39/16*I,2473/256+137/64*I,-149/64+49/32*I,-177/128-1369/128*I,125/64+87/64*I,-2063/256+541/128*I,85/256-33/16*I,805/128+2415/512*I,-219/128+115/256*I,6301/4096-6609/1024*I,119/128+143/128*I,-10879/2048+4343/4096*I], + [-4*I,27/2+6*I,-2,17/4-13/2*I,1+I,-19/4+5/4*I,1/2-I,9/4+55/16*I,-3/4,45/32-37/16*I,1/4+1/2*I,-129/64-9/64*I,1/4-5/16*I,65/128+87/64*I,-9/32-1/16*I,183/256-97/128*I], + [1/4+5/2*I,-23/8-57/16*I,1/4+13/4*I,-825/64-147/32*I,21/8+I,-537/64+143/16*I,-5/8-39/16*I,2473/256+137/64*I,-149/64+49/32*I,-177/128-1369/128*I,125/64+87/64*I,-2063/256+541/128*I,85/256-33/16*I,805/128+2415/512*I,-219/128+115/256*I,6301/4096-6609/1024*I], + [-4,9-5*I,-4*I,27/2+6*I,-2,17/4-13/2*I,1+I,-19/4+5/4*I,1/2-I,9/4+55/16*I,-3/4,45/32-37/16*I,1/4+1/2*I,-129/64-9/64*I,1/4-5/16*I,65/128+87/64*I], + [-2*I,119/8+29/4*I,1/4+5/2*I,-23/8-57/16*I,1/4+13/4*I,-825/64-147/32*I,21/8+I,-537/64+143/16*I,-5/8-39/16*I,2473/256+137/64*I,-149/64+49/32*I,-177/128-1369/128*I,125/64+87/64*I,-2063/256+541/128*I,85/256-33/16*I,805/128+2415/512*I], + [0,-6,-4,9-5*I,-4*I,27/2+6*I,-2,17/4-13/2*I,1+I,-19/4+5/4*I,1/2-I,9/4+55/16*I,-3/4,45/32-37/16*I,1/4+1/2*I,-129/64-9/64*I], + [1,-9/4+3*I,-2*I,119/8+29/4*I,1/4+5/2*I,-23/8-57/16*I,1/4+13/4*I,-825/64-147/32*I,21/8+I,-537/64+143/16*I,-5/8-39/16*I,2473/256+137/64*I,-149/64+49/32*I,-177/128-1369/128*I,125/64+87/64*I,-2063/256+541/128*I], + [0,-4*I,0,-6,-4,9-5*I,-4*I,27/2+6*I,-2,17/4-13/2*I,1+I,-19/4+5/4*I,1/2-I,9/4+55/16*I,-3/4,45/32-37/16*I], + [0,1/4+1/2*I,1,-9/4+3*I,-2*I,119/8+29/4*I,1/4+5/2*I,-23/8-57/16*I,1/4+13/4*I,-825/64-147/32*I,21/8+I,-537/64+143/16*I,-5/8-39/16*I,2473/256+137/64*I,-149/64+49/32*I,-177/128-1369/128*I]]''')) + with dotprodsimp(True): + assert M.rank() == 8 + + +def test_issue_18531(): + # solve_linear_system still needs fixing but the rref works. + M = Matrix([ + [1, 1, 1, 1, 1, 0, 1, 0, 0], + [1 + sqrt(2), -1 + sqrt(2), 1 - sqrt(2), -sqrt(2) - 1, 1, 1, -1, 1, 1], + [-5 + 2*sqrt(2), -5 - 2*sqrt(2), -5 - 2*sqrt(2), -5 + 2*sqrt(2), -7, 2, -7, -2, 0], + [-3*sqrt(2) - 1, 1 - 3*sqrt(2), -1 + 3*sqrt(2), 1 + 3*sqrt(2), -7, -5, 7, -5, 3], + [7 - 4*sqrt(2), 4*sqrt(2) + 7, 4*sqrt(2) + 7, 7 - 4*sqrt(2), 7, -12, 7, 12, 0], + [-1 + 3*sqrt(2), 1 + 3*sqrt(2), -3*sqrt(2) - 1, 1 - 3*sqrt(2), 7, -5, -7, -5, 3], + [-3 + 2*sqrt(2), -3 - 2*sqrt(2), -3 - 2*sqrt(2), -3 + 2*sqrt(2), -1, 2, -1, -2, 0], + [1 - sqrt(2), -sqrt(2) - 1, 1 + sqrt(2), -1 + sqrt(2), -1, 1, 1, 1, 1] + ]) + with dotprodsimp(True): + assert M.rref() == (Matrix([ + [1, 0, 0, 0, 0, 0, 0, 0, S(1)/2], + [0, 1, 0, 0, 0, 0, 0, 0, -S(1)/2], + [0, 0, 1, 0, 0, 0, 0, 0, S(1)/2], + [0, 0, 0, 1, 0, 0, 0, 0, -S(1)/2], + [0, 0, 0, 0, 1, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 1, 0, 0, -S(1)/2], + [0, 0, 0, 0, 0, 0, 1, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 1, -S(1)/2]]), (0, 1, 2, 3, 4, 5, 6, 7)) + + +def test_creation(): + raises(ValueError, lambda: Matrix(5, 5, range(20))) + raises(ValueError, lambda: Matrix(5, -1, [])) + raises(IndexError, lambda: Matrix((1, 2))[2]) + with raises(IndexError): + Matrix((1, 2))[3] = 5 + + assert Matrix() == Matrix([]) == Matrix(0, 0, []) + assert Matrix([[]]) == Matrix(1, 0, []) + assert Matrix([[], []]) == Matrix(2, 0, []) + + # anything used to be allowed in a matrix + with warns_deprecated_sympy(): + assert Matrix([[[1], (2,)]]).tolist() == [[[1], (2,)]] + with warns_deprecated_sympy(): + assert Matrix([[[1], (2,)]]).T.tolist() == [[[1]], [(2,)]] + M = Matrix([[0]]) + with warns_deprecated_sympy(): + M[0, 0] = S.EmptySet + + a = Matrix([[x, 0], [0, 0]]) + m = a + assert m.cols == m.rows + assert m.cols == 2 + assert m[:] == [x, 0, 0, 0] + + b = Matrix(2, 2, [x, 0, 0, 0]) + m = b + assert m.cols == m.rows + assert m.cols == 2 + assert m[:] == [x, 0, 0, 0] + + assert a == b + + assert Matrix(b) == b + + c23 = Matrix(2, 3, range(1, 7)) + c13 = Matrix(1, 3, range(7, 10)) + c = Matrix([c23, c13]) + assert c.cols == 3 + assert c.rows == 3 + assert c[:] == [1, 2, 3, 4, 5, 6, 7, 8, 9] + + assert Matrix(eye(2)) == eye(2) + assert ImmutableMatrix(ImmutableMatrix(eye(2))) == ImmutableMatrix(eye(2)) + assert ImmutableMatrix(c) == c.as_immutable() + assert Matrix(ImmutableMatrix(c)) == ImmutableMatrix(c).as_mutable() + + assert c is not Matrix(c) + + dat = [[ones(3,2), ones(3,3)*2], [ones(2,3)*3, ones(2,2)*4]] + M = Matrix(dat) + assert M == Matrix([ + [1, 1, 2, 2, 2], + [1, 1, 2, 2, 2], + [1, 1, 2, 2, 2], + [3, 3, 3, 4, 4], + [3, 3, 3, 4, 4]]) + assert M.tolist() != dat + # keep block form if evaluate=False + assert Matrix(dat, evaluate=False).tolist() == dat + A = MatrixSymbol("A", 2, 2) + dat = [ones(2), A] + assert Matrix(dat) == Matrix([ + [ 1, 1], + [ 1, 1], + [A[0, 0], A[0, 1]], + [A[1, 0], A[1, 1]]]) + with warns_deprecated_sympy(): + assert Matrix(dat, evaluate=False).tolist() == [[i] for i in dat] + + # 0-dim tolerance + assert Matrix([ones(2), ones(0)]) == Matrix([ones(2)]) + raises(ValueError, lambda: Matrix([ones(2), ones(0, 3)])) + raises(ValueError, lambda: Matrix([ones(2), ones(3, 0)])) + + # mix of Matrix and iterable + M = Matrix([[1, 2], [3, 4]]) + M2 = Matrix([M, (5, 6)]) + assert M2 == Matrix([[1, 2], [3, 4], [5, 6]]) + + +def test_irregular_block(): + assert Matrix.irregular(3, ones(2,1), ones(3,3)*2, ones(2,2)*3, + ones(1,1)*4, ones(2,2)*5, ones(1,2)*6, ones(1,2)*7) == Matrix([ + [1, 2, 2, 2, 3, 3], + [1, 2, 2, 2, 3, 3], + [4, 2, 2, 2, 5, 5], + [6, 6, 7, 7, 5, 5]]) + + +def test_slicing(): + m0 = eye(4) + assert m0[:3, :3] == eye(3) + assert m0[2:4, 0:2] == zeros(2) + + m1 = Matrix(3, 3, lambda i, j: i + j) + assert m1[0, :] == Matrix(1, 3, (0, 1, 2)) + assert m1[1:3, 1] == Matrix(2, 1, (2, 3)) + + m2 = Matrix([[0, 1, 2, 3], [4, 5, 6, 7], [8, 9, 10, 11], [12, 13, 14, 15]]) + assert m2[:, -1] == Matrix(4, 1, [3, 7, 11, 15]) + assert m2[-2:, :] == Matrix([[8, 9, 10, 11], [12, 13, 14, 15]]) + + +def test_submatrix_assignment(): + m = zeros(4) + m[2:4, 2:4] = eye(2) + assert m == Matrix(((0, 0, 0, 0), + (0, 0, 0, 0), + (0, 0, 1, 0), + (0, 0, 0, 1))) + m[:2, :2] = eye(2) + assert m == eye(4) + m[:, 0] = Matrix(4, 1, (1, 2, 3, 4)) + assert m == Matrix(((1, 0, 0, 0), + (2, 1, 0, 0), + (3, 0, 1, 0), + (4, 0, 0, 1))) + m[:, :] = zeros(4) + assert m == zeros(4) + m[:, :] = [(1, 2, 3, 4), (5, 6, 7, 8), (9, 10, 11, 12), (13, 14, 15, 16)] + assert m == Matrix(((1, 2, 3, 4), + (5, 6, 7, 8), + (9, 10, 11, 12), + (13, 14, 15, 16))) + m[:2, 0] = [0, 0] + assert m == Matrix(((0, 2, 3, 4), + (0, 6, 7, 8), + (9, 10, 11, 12), + (13, 14, 15, 16))) + + +def test_reshape(): + m0 = eye(3) + assert m0.reshape(1, 9) == Matrix(1, 9, (1, 0, 0, 0, 1, 0, 0, 0, 1)) + m1 = Matrix(3, 4, lambda i, j: i + j) + assert m1.reshape( + 4, 3) == Matrix(((0, 1, 2), (3, 1, 2), (3, 4, 2), (3, 4, 5))) + assert m1.reshape(2, 6) == Matrix(((0, 1, 2, 3, 1, 2), (3, 4, 2, 3, 4, 5))) + + +def test_applyfunc(): + m0 = eye(3) + assert m0.applyfunc(lambda x: 2*x) == eye(3)*2 + assert m0.applyfunc(lambda x: 0) == zeros(3) + + +def test_expand(): + m0 = Matrix([[x*(x + y), 2], [((x + y)*y)*x, x*(y + x*(x + y))]]) + # Test if expand() returns a matrix + m1 = m0.expand() + assert m1 == Matrix( + [[x*y + x**2, 2], [x*y**2 + y*x**2, x*y + y*x**2 + x**3]]) + + a = Symbol('a', real=True) + + assert Matrix([exp(I*a)]).expand(complex=True) == \ + Matrix([cos(a) + I*sin(a)]) + + assert Matrix([[0, 1, 2], [0, 0, -1], [0, 0, 0]]).exp() == Matrix([ + [1, 1, Rational(3, 2)], + [0, 1, -1], + [0, 0, 1]] + ) + + +def test_refine(): + m0 = Matrix([[Abs(x)**2, sqrt(x**2)], + [sqrt(x**2)*Abs(y)**2, sqrt(y**2)*Abs(x)**2]]) + m1 = m0.refine(Q.real(x) & Q.real(y)) + assert m1 == Matrix([[x**2, Abs(x)], [y**2*Abs(x), x**2*Abs(y)]]) + + m1 = m0.refine(Q.positive(x) & Q.positive(y)) + assert m1 == Matrix([[x**2, x], [x*y**2, x**2*y]]) + + m1 = m0.refine(Q.negative(x) & Q.negative(y)) + assert m1 == Matrix([[x**2, -x], [-x*y**2, -x**2*y]]) + + +def test_random(): + M = randMatrix(3, 3) + M = randMatrix(3, 3, seed=3) + assert M == randMatrix(3, 3, seed=3) + + M = randMatrix(3, 4, 0, 150) + M = randMatrix(3, seed=4, symmetric=True) + assert M == randMatrix(3, seed=4, symmetric=True) + + S = M.copy() + S.simplify() + assert S == M # doesn't fail when elements are Numbers, not int + + rng = random.Random(4) + assert M == randMatrix(3, symmetric=True, prng=rng) + + # Ensure symmetry + for size in (10, 11): # Test odd and even + for percent in (100, 70, 30): + M = randMatrix(size, symmetric=True, percent=percent, prng=rng) + assert M == M.T + + M = randMatrix(10, min=1, percent=70) + zero_count = 0 + for i in range(M.shape[0]): + for j in range(M.shape[1]): + if M[i, j] == 0: + zero_count += 1 + assert zero_count == 30 + + +def test_inverse(): + A = eye(4) + assert A.inv() == eye(4) + assert A.inv(method="LU") == eye(4) + assert A.inv(method="ADJ") == eye(4) + assert A.inv(method="CH") == eye(4) + assert A.inv(method="LDL") == eye(4) + assert A.inv(method="QR") == eye(4) + A = Matrix([[2, 3, 5], + [3, 6, 2], + [8, 3, 6]]) + Ainv = A.inv() + assert A*Ainv == eye(3) + assert A.inv(method="LU") == Ainv + assert A.inv(method="ADJ") == Ainv + assert A.inv(method="CH") == Ainv + assert A.inv(method="LDL") == Ainv + assert A.inv(method="QR") == Ainv + + AA = Matrix([[0, 0, 0, 0, 1, 0, 0, 1, 0, 1, 1, 1, 0, 0, 0, 1, 1, 0, 0, 0, 0, 1, 1, 0, 0], + [1, 0, 1, 0, 0, 1, 0, 0, 1, 0, 1, 0, 1, 1, 1, 0, 1, 1, 0, 0, 0, 0, 0, 1, 0], + [1, 1, 1, 1, 0, 1, 0, 0, 1, 1, 0, 0, 0, 1, 1, 1, 1, 0, 0, 1, 1, 0, 0, 1, 1], + [1, 0, 0, 0, 0, 0, 1, 1, 0, 0, 1, 1, 1, 0, 0, 0, 0, 0, 0, 1, 0, 0, 1, 0, 0], + [1, 0, 0, 1, 1, 1, 0, 1, 0, 0, 1, 0, 0, 1, 1, 1, 0, 1, 0, 0, 0, 1, 0, 0, 0], + [1, 0, 0, 0, 0, 0, 0, 0, 1, 1, 1, 0, 1, 0, 1, 1, 1, 1, 0, 0, 0, 1, 1, 0, 1], + [0, 1, 1, 1, 0, 0, 0, 0, 1, 1, 1, 0, 1, 0, 1, 0, 1, 0, 1, 0, 1, 0, 0, 1, 0], + [1, 1, 0, 0, 0, 1, 1, 0, 0, 1, 1, 0, 1, 1, 0, 1, 1, 0, 1, 0, 1, 1, 0, 1, 1], + [0, 0, 1, 1, 1, 0, 0, 1, 1, 0, 1, 1, 0, 1, 0, 0, 0, 0, 0, 0, 1, 0, 1, 0, 1], + [1, 0, 1, 1, 1, 0, 1, 0, 0, 1, 1, 0, 1, 1, 0, 1, 1, 1, 1, 0, 1, 1, 1, 0, 0], + [0, 1, 1, 0, 0, 0, 0, 1, 1, 0, 1, 0, 1, 0, 1, 1, 0, 0, 1, 0, 0, 0, 1, 1, 0], + [1, 0, 0, 1, 0, 1, 0, 1, 1, 0, 0, 1, 0, 1, 0, 1, 0, 1, 0, 1, 0, 1, 1, 0, 0], + [0, 1, 1, 0, 0, 1, 1, 0, 0, 1, 1, 0, 1, 0, 0, 0, 1, 0, 0, 1, 0, 1, 1, 0, 1], + [1, 1, 1, 0, 1, 0, 0, 1, 0, 0, 1, 0, 1, 1, 0, 0, 1, 1, 1, 0, 1, 0, 1, 1, 0], + [0, 1, 0, 0, 0, 0, 1, 1, 0, 1, 1, 0, 0, 0, 0, 1, 0, 1, 1, 1, 0, 0, 1, 0, 0], + [1, 1, 1, 1, 0, 1, 1, 1, 1, 1, 1, 0, 0, 0, 1, 0, 1, 0, 1, 0, 0, 1, 0, 0, 0], + [0, 0, 0, 1, 0, 1, 1, 0, 1, 0, 0, 0, 0, 0, 1, 0, 1, 1, 0, 1, 0, 1, 1, 0, 1], + [0, 1, 0, 1, 0, 0, 0, 0, 1, 1, 1, 0, 0, 1, 1, 1, 0, 0, 1, 0, 1, 1, 0, 1, 1], + [1, 0, 1, 1, 0, 1, 0, 1, 1, 0, 1, 1, 1, 0, 1, 0, 0, 0, 0, 1, 0, 0, 1, 0, 1], + [0, 0, 0, 1, 0, 0, 1, 1, 0, 1, 1, 0, 1, 0, 1, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [1, 0, 0, 0, 0, 1, 0, 1, 0, 0, 1, 1, 0, 1, 0, 1, 1, 1, 1, 0, 1, 1, 1, 1, 1], + [0, 0, 1, 1, 0, 1, 0, 0, 0, 1, 0, 0, 1, 0, 0, 1, 0, 0, 0, 1, 0, 1, 0, 1, 1], + [0, 0, 0, 0, 0, 1, 1, 1, 0, 1, 1, 1, 0, 0, 0, 1, 0, 1, 1, 0, 1, 1, 0, 0, 0], + [0, 0, 1, 0, 1, 1, 0, 1, 1, 1, 0, 0, 1, 0, 1, 0, 0, 1, 0, 1, 0, 0, 0, 0, 0], + [0, 0, 0, 1, 1, 0, 1, 1, 1, 0, 0, 1, 0, 1, 0, 1, 1, 0, 1, 1, 1, 0, 0, 1, 0]]) + assert AA.inv(method="BLOCK") * AA == eye(AA.shape[0]) + # test that immutability is not a problem + cls = ImmutableMatrix + m = cls([[48, 49, 31], + [ 9, 71, 94], + [59, 28, 65]]) + assert all(type(m.inv(s)) is cls for s in 'GE ADJ LU CH LDL QR'.split()) + cls = ImmutableSparseMatrix + m = cls([[48, 49, 31], + [ 9, 71, 94], + [59, 28, 65]]) + assert all(type(m.inv(s)) is cls for s in 'GE ADJ LU CH LDL QR'.split()) + + +def test_inverse_symbolic_float_issue_26821(): + Tau, Tau_syn_in, Tau_syn_ex, C_m, Tau_syn_gap = symbols("Tau Tau_syn_in Tau_syn_ex C_m Tau_syn_gap") + __h = symbols("__h") + + M = Matrix([ + [0,0,0,0,0,(1.0*Tau*__h-1.0*Tau_syn_in*__h)/(2.0*Tau-1.0*Tau_syn_in),-1.0*Tau*Tau_syn_in/(2.0*Tau-1.0*Tau_syn_in)], + [0,0,0,0,0,(-1.0*Tau*__h+1.0*Tau_syn_in*__h)/(2.0*Tau*Tau_syn_in-1.0*Tau_syn_in**2),1.0], + [0,(1.0*Tau*__h-1.0*Tau_syn_ex*__h)/(2.0*Tau-1.0*Tau_syn_ex),-1.0*Tau*Tau_syn_ex/(2.0*Tau-1.0*Tau_syn_ex),0,0,0,0], + [0,(-1.0*Tau*__h+1.0*Tau_syn_ex*__h)/(2.0*Tau*Tau_syn_ex-1.0*Tau_syn_ex**2),1.0,0,0,0,0], + [0,0,0,(1.0*Tau*__h-1.0*Tau_syn_gap*__h)/(2.0*Tau-1.0*Tau_syn_gap),-1.0*Tau*Tau_syn_gap/(2.0*Tau-1.0*Tau_syn_gap),0,0], + [0,0,0,(-1.0*Tau*__h+1.0*Tau_syn_gap*__h)/(2.0*Tau*Tau_syn_gap-1.0*Tau_syn_gap**2),1.0,0,0], + [1.0,-1.0*Tau*Tau_syn_ex*__h/(2.0*C_m*Tau-1.0*C_m*Tau_syn_ex),0,-1.0*Tau*Tau_syn_gap*__h/(2.0*C_m*Tau-1.0*C_m*Tau_syn_gap),0,-1.0*Tau*Tau_syn_in*__h/(2.0*C_m*Tau-1.0*C_m*Tau_syn_in),0] + ]) + + Mi = M.inv() + + assert (M*Mi - eye(7)).applyfunc(cancel) == zeros(7) + + # https://github.com/sympy/sympy/issues/26821 + # Previously very large floats were in the result. + assert max(abs(f) for f in Mi.atoms(Float)) < 1e3 + + +@slow +def test_matrix_exponential_issue_26821(): + # The symbol names matter in the original bug... + a, b, c, d, e = symbols("Tau, Tau_syn_in, Tau_syn_ex, C_m, Tau_syn_gap") + t = symbols("__h") + M = Matrix([ + [ 0, 1.0, 0, 0, 0, 0, 0], + [-1/b**2, -2/b, 0, 0, 0, 0, 0], + [ 0, 0, 0, 1.0, 0, 0, 0], + [ 0, 0, -1/c**2, -2/c, 0, 0, 0], + [ 0, 0, 0, 0, 0, 1, 0], + [ 0, 0, 0, 0, -1/e**2, -2/e, 0], + [ 1/d, 0, 1/d, 0, 1/d, 0, -1/a] + ]) + + Me = (t*M).exp() + assert (Me.diff(t) - M*Me).applyfunc(cancel) == zeros(7) + # https://github.com/sympy/sympy/issues/26821 + # Previously very large floats were in the result. + assert max(abs(f) for f in Me.atoms(Float)) < 1e3 + + +def test_jacobian_hessian(): + L = Matrix(1, 2, [x**2*y, 2*y**2 + x*y]) + syms = [x, y] + assert L.jacobian(syms) == Matrix([[2*x*y, x**2], [y, 4*y + x]]) + + L = Matrix(1, 2, [x, x**2*y**3]) + assert L.jacobian(syms) == Matrix([[1, 0], [2*x*y**3, x**2*3*y**2]]) + + f = x**2*y + syms = [x, y] + assert hessian(f, syms) == Matrix([[2*y, 2*x], [2*x, 0]]) + + f = x**2*y**3 + assert hessian(f, syms) == \ + Matrix([[2*y**3, 6*x*y**2], [6*x*y**2, 6*x**2*y]]) + + f = z + x*y**2 + g = x**2 + 2*y**3 + ans = Matrix([[0, 2*y], + [2*y, 2*x]]) + assert ans == hessian(f, Matrix([x, y])) + assert ans == hessian(f, Matrix([x, y]).T) + assert hessian(f, (y, x), [g]) == Matrix([ + [ 0, 6*y**2, 2*x], + [6*y**2, 2*x, 2*y], + [ 2*x, 2*y, 0]]) + + +def test_wronskian(): + assert wronskian([cos(x), sin(x)], x) == cos(x)**2 + sin(x)**2 + assert wronskian([exp(x), exp(2*x)], x) == exp(3*x) + assert wronskian([exp(x), x], x) == exp(x) - x*exp(x) + assert wronskian([1, x, x**2], x) == 2 + w1 = -6*exp(x)*sin(x)*x + 6*cos(x)*exp(x)*x**2 - 6*exp(x)*cos(x)*x - \ + exp(x)*cos(x)*x**3 + exp(x)*sin(x)*x**3 + assert wronskian([exp(x), cos(x), x**3], x).expand() == w1 + assert wronskian([exp(x), cos(x), x**3], x, method='berkowitz').expand() \ + == w1 + w2 = -x**3*cos(x)**2 - x**3*sin(x)**2 - 6*x*cos(x)**2 - 6*x*sin(x)**2 + assert wronskian([sin(x), cos(x), x**3], x).expand() == w2 + assert wronskian([sin(x), cos(x), x**3], x, method='berkowitz').expand() \ + == w2 + assert wronskian([], x) == 1 + + +def test_xreplace(): + assert Matrix([[1, x], [x, 4]]).xreplace({x: 5}) == \ + Matrix([[1, 5], [5, 4]]) + assert Matrix([[x, 2], [x + y, 4]]).xreplace({x: -1, y: -2}) == \ + Matrix([[-1, 2], [-3, 4]]) + for cls in all_classes: + assert Matrix([[2, 0], [0, 2]]) == cls.eye(2).xreplace({1: 2}) + + +def test_simplify(): + n = Symbol('n') + f = Function('f') + + M = Matrix([[ 1/x + 1/y, (x + x*y) / x ], + [ (f(x) + y*f(x))/f(x), 2 * (1/n - cos(n * pi)/n) / pi ]]) + M.simplify() + assert M == Matrix([[ (x + y)/(x * y), 1 + y ], + [ 1 + y, 2*((1 - 1*cos(pi*n))/(pi*n)) ]]) + eq = (1 + x)**2 + M = Matrix([[eq]]) + M.simplify() + assert M == Matrix([[eq]]) + M.simplify(ratio=oo) + assert M == Matrix([[eq.simplify(ratio=oo)]]) + + n = Symbol('n') + f = Function('f') + + M = ImmutableMatrix([ + [ 1/x + 1/y, (x + x*y) / x ], + [ (f(x) + y*f(x))/f(x), 2 * (1/n - cos(n * pi)/n) / pi ] + ]) + assert M.simplify() == Matrix([ + [ (x + y)/(x * y), 1 + y ], + [ 1 + y, 2*((1 - 1*cos(pi*n))/(pi*n)) ] + ]) + + eq = (1 + x)**2 + M = ImmutableMatrix([[eq]]) + assert M.simplify() == Matrix([[eq]]) + assert M.simplify(ratio=oo) == Matrix([[eq.simplify(ratio=oo)]]) + + assert simplify(ImmutableMatrix([[sin(x)**2 + cos(x)**2]])) == \ + ImmutableMatrix([[1]]) + + # https://github.com/sympy/sympy/issues/19353 + m = Matrix([[30, 2], [3, 4]]) + assert (1/(m.trace())).simplify() == Rational(1, 34) + +def test_transpose(): + M = Matrix([[1, 2, 3, 4, 5, 6, 7, 8, 9, 0], + [1, 2, 3, 4, 5, 6, 7, 8, 9, 0]]) + assert M.T == Matrix( [ [1, 1], + [2, 2], + [3, 3], + [4, 4], + [5, 5], + [6, 6], + [7, 7], + [8, 8], + [9, 9], + [0, 0] ]) + assert M.T.T == M + assert M.T == M.transpose() + + +def test_conj_dirac(): + raises(AttributeError, lambda: eye(3).D) + + M = Matrix([[1, I, I, I], + [0, 1, I, I], + [0, 0, 1, I], + [0, 0, 0, 1]]) + + assert M.D == Matrix([[ 1, 0, 0, 0], + [-I, 1, 0, 0], + [-I, -I, -1, 0], + [-I, -I, I, -1]]) + + +def test_trace(): + M = Matrix([[1, 0, 0], + [0, 5, 0], + [0, 0, 8]]) + assert M.trace() == 14 + + +def test_shape(): + m = Matrix(1, 2, [0, 0]) + assert m.shape == (1, 2) + M = Matrix([[x, 0, 0], + [0, y, 0]]) + assert M.shape == (2, 3) + + +def test_col_row_op(): + M = Matrix([[x, 0, 0], + [0, y, 0]]) + M.row_op(1, lambda r, j: r + j + 1) + assert M == Matrix([[x, 0, 0], + [1, y + 2, 3]]) + + M.col_op(0, lambda c, j: c + y**j) + assert M == Matrix([[x + 1, 0, 0], + [1 + y, y + 2, 3]]) + + # neither row nor slice give copies that allow the original matrix to + # be changed + assert M.row(0) == Matrix([[x + 1, 0, 0]]) + r1 = M.row(0) + r1[0] = 42 + assert M[0, 0] == x + 1 + r1 = M[0, :-1] # also testing negative slice + r1[0] = 42 + assert M[0, 0] == x + 1 + c1 = M.col(0) + assert c1 == Matrix([x + 1, 1 + y]) + c1[0] = 0 + assert M[0, 0] == x + 1 + c1 = M[:, 0] + c1[0] = 42 + assert M[0, 0] == x + 1 + + +def test_row_mult(): + M = Matrix([[1,2,3], + [4,5,6]]) + M.row_mult(1,3) + assert M[1,0] == 12 + assert M[0,0] == 1 + assert M[1,2] == 18 + + +def test_row_add(): + M = Matrix([[1,2,3], + [4,5,6], + [1,1,1]]) + M.row_add(2,0,5) + assert M[0,0] == 6 + assert M[1,0] == 4 + assert M[0,2] == 8 + + +def test_zip_row_op(): + for cls in mutable_classes: # XXX: immutable matrices don't support row ops + M = cls.eye(3) + M.zip_row_op(1, 0, lambda v, u: v + 2*u) + assert M == cls([[1, 0, 0], + [2, 1, 0], + [0, 0, 1]]) + + M = cls.eye(3)*2 + M[0, 1] = -1 + M.zip_row_op(1, 0, lambda v, u: v + 2*u); M + assert M == cls([[2, -1, 0], + [4, 0, 0], + [0, 0, 2]]) + + +def test_issue_3950(): + m = Matrix([1, 2, 3]) + a = Matrix([1, 2, 3]) + b = Matrix([2, 2, 3]) + assert not (m in []) + assert not (m in [1]) + assert m != 1 + assert m == a + assert m != b + + +def test_issue_3981(): + class Index1: + def __index__(self): + return 1 + + class Index2: + def __index__(self): + return 2 + index1 = Index1() + index2 = Index2() + + m = Matrix([1, 2, 3]) + + assert m[index2] == 3 + + m[index2] = 5 + assert m[2] == 5 + + m = Matrix([[1, 2, 3], [4, 5, 6]]) + assert m[index1, index2] == 6 + assert m[1, index2] == 6 + assert m[index1, 2] == 6 + + m[index1, index2] = 4 + assert m[1, 2] == 4 + m[1, index2] = 6 + assert m[1, 2] == 6 + m[index1, 2] = 8 + assert m[1, 2] == 8 + + +def test_is_upper(): + a = Matrix([[1, 2, 3]]) + assert a.is_upper is True + a = Matrix([[1], [2], [3]]) + assert a.is_upper is False + a = zeros(4, 2) + assert a.is_upper is True + + +def test_is_lower(): + a = Matrix([[1, 2, 3]]) + assert a.is_lower is False + a = Matrix([[1], [2], [3]]) + assert a.is_lower is True + + +def test_is_nilpotent(): + a = Matrix(4, 4, [0, 2, 1, 6, 0, 0, 1, 2, 0, 0, 0, 3, 0, 0, 0, 0]) + assert a.is_nilpotent() + a = Matrix([[1, 0], [0, 1]]) + assert not a.is_nilpotent() + a = Matrix([]) + assert a.is_nilpotent() + + +def test_zeros_ones_fill(): + n, m = 3, 5 + + a = zeros(n, m) + a.fill( 5 ) + + b = 5 * ones(n, m) + + assert a == b + assert a.rows == b.rows == 3 + assert a.cols == b.cols == 5 + assert a.shape == b.shape == (3, 5) + assert zeros(2) == zeros(2, 2) + assert ones(2) == ones(2, 2) + assert zeros(2, 3) == Matrix(2, 3, [0]*6) + assert ones(2, 3) == Matrix(2, 3, [1]*6) + + a.fill(0) + assert a == zeros(n, m) + + +def test_empty_zeros(): + a = zeros(0) + assert a == Matrix() + a = zeros(0, 2) + assert a.rows == 0 + assert a.cols == 2 + a = zeros(2, 0) + assert a.rows == 2 + assert a.cols == 0 + + +def test_issue_3749(): + a = Matrix([[x**2, x*y], [x*sin(y), x*cos(y)]]) + assert a.diff(x) == Matrix([[2*x, y], [sin(y), cos(y)]]) + assert Matrix([ + [x, -x, x**2], + [exp(x), 1/x - exp(-x), x + 1/x]]).limit(x, oo) == \ + Matrix([[oo, -oo, oo], [oo, 0, oo]]) + assert Matrix([ + [(exp(x) - 1)/x, 2*x + y*x, x**x ], + [1/x, abs(x), abs(sin(x + 1))]]).limit(x, 0) == \ + Matrix([[1, 0, 1], [oo, 0, sin(1)]]) + assert a.integrate(x) == Matrix([ + [Rational(1, 3)*x**3, y*x**2/2], + [x**2*sin(y)/2, x**2*cos(y)/2]]) + + +def test_inv_iszerofunc(): + A = eye(4) + A.col_swap(0, 1) + for method in "GE", "LU": + assert A.inv(method=method, iszerofunc=lambda x: x == 0) == \ + A.inv(method="ADJ") + + +def test_jacobian_metrics(): + rho, phi = symbols("rho,phi") + X = Matrix([rho*cos(phi), rho*sin(phi)]) + Y = Matrix([rho, phi]) + J = X.jacobian(Y) + assert J == X.jacobian(Y.T) + assert J == (X.T).jacobian(Y) + assert J == (X.T).jacobian(Y.T) + g = J.T*eye(J.shape[0])*J + g = g.applyfunc(trigsimp) + assert g == Matrix([[1, 0], [0, rho**2]]) + + +def test_jacobian2(): + rho, phi = symbols("rho,phi") + X = Matrix([rho*cos(phi), rho*sin(phi), rho**2]) + Y = Matrix([rho, phi]) + J = Matrix([ + [cos(phi), -rho*sin(phi)], + [sin(phi), rho*cos(phi)], + [ 2*rho, 0], + ]) + assert X.jacobian(Y) == J + + +def test_issue_4564(): + X = Matrix([exp(x + y + z), exp(x + y + z), exp(x + y + z)]) + Y = Matrix([x, y, z]) + for i in range(1, 3): + for j in range(1, 3): + X_slice = X[:i, :] + Y_slice = Y[:j, :] + J = X_slice.jacobian(Y_slice) + assert J.rows == i + assert J.cols == j + for k in range(j): + assert J[:, k] == X_slice + + +def test_nonvectorJacobian(): + X = Matrix([[exp(x + y + z), exp(x + y + z)], + [exp(x + y + z), exp(x + y + z)]]) + raises(TypeError, lambda: X.jacobian(Matrix([x, y, z]))) + X = X[0, :] + Y = Matrix([[x, y], [x, z]]) + raises(TypeError, lambda: X.jacobian(Y)) + raises(TypeError, lambda: X.jacobian(Matrix([ [x, y], [x, z] ]))) + + +def test_vec(): + m = Matrix([[1, 3], [2, 4]]) + m_vec = m.vec() + assert m_vec.cols == 1 + for i in range(4): + assert m_vec[i] == i + 1 + + +def test_vech(): + m = Matrix([[1, 2], [2, 3]]) + m_vech = m.vech() + assert m_vech.cols == 1 + for i in range(3): + assert m_vech[i] == i + 1 + m_vech = m.vech(diagonal=False) + assert m_vech[0] == 2 + + m = Matrix([[1, x*(x + y)], [y*x + x**2, 1]]) + m_vech = m.vech(diagonal=False) + assert m_vech[0] == y*x + x**2 + + m = Matrix([[1, x*(x + y)], [y*x, 1]]) + m_vech = m.vech(diagonal=False, check_symmetry=False) + assert m_vech[0] == y*x + + raises(ShapeError, lambda: Matrix([[1, 3]]).vech()) + raises(ValueError, lambda: Matrix([[1, 3], [2, 4]]).vech()) + raises(ShapeError, lambda: Matrix([[1, 3]]).vech()) + raises(ValueError, lambda: Matrix([[1, 3], [2, 4]]).vech()) + + +def test_diag(): + # mostly tested in testcommonmatrix.py + assert diag([1, 2, 3]) == Matrix([1, 2, 3]) + m = [1, 2, [3]] + raises(ValueError, lambda: diag(m)) + assert diag(m, strict=False) == Matrix([1, 2, 3]) + + +def test_inv_block(): + a = Matrix([[1, 2], [2, 3]]) + b = Matrix([[3, x], [y, 3]]) + c = Matrix([[3, x, 3], [y, 3, z], [x, y, z]]) + A = diag(a, b, b) + assert A.inv(try_block_diag=True) == diag(a.inv(), b.inv(), b.inv()) + A = diag(a, b, c) + assert A.inv(try_block_diag=True) == diag(a.inv(), b.inv(), c.inv()) + A = diag(a, c, b) + assert A.inv(try_block_diag=True) == diag(a.inv(), c.inv(), b.inv()) + A = diag(a, a, b, a, c, a) + assert A.inv(try_block_diag=True) == diag( + a.inv(), a.inv(), b.inv(), a.inv(), c.inv(), a.inv()) + assert A.inv(try_block_diag=True, method="ADJ") == diag( + a.inv(method="ADJ"), a.inv(method="ADJ"), b.inv(method="ADJ"), + a.inv(method="ADJ"), c.inv(method="ADJ"), a.inv(method="ADJ")) + + +def test_creation_args(): + """ + Check that matrix dimensions can be specified using any reasonable type + (see issue 4614). + """ + raises(ValueError, lambda: zeros(3, -1)) + raises(TypeError, lambda: zeros(1, 2, 3, 4)) + assert zeros(int(3)) == zeros(3) + assert zeros(Integer(3)) == zeros(3) + raises(ValueError, lambda: zeros(3.)) + assert eye(int(3)) == eye(3) + assert eye(Integer(3)) == eye(3) + raises(ValueError, lambda: eye(3.)) + assert ones(int(3), Integer(4)) == ones(3, 4) + raises(TypeError, lambda: Matrix(5)) + raises(TypeError, lambda: Matrix(1, 2)) + raises(ValueError, lambda: Matrix([1, [2]])) + + +def test_diagonal_symmetrical(): + m = Matrix(2, 2, [0, 1, 1, 0]) + assert not m.is_diagonal() + assert m.is_symmetric() + assert m.is_symmetric(simplify=False) + + m = Matrix(2, 2, [1, 0, 0, 1]) + assert m.is_diagonal() + + m = diag(1, 2, 3) + assert m.is_diagonal() + assert m.is_symmetric() + + m = Matrix(3, 3, [1, 0, 0, 0, 2, 0, 0, 0, 3]) + assert m == diag(1, 2, 3) + + m = Matrix(2, 3, zeros(2, 3)) + assert not m.is_symmetric() + assert m.is_diagonal() + + m = Matrix(((5, 0), (0, 6), (0, 0))) + assert m.is_diagonal() + + m = Matrix(((5, 0, 0), (0, 6, 0))) + assert m.is_diagonal() + + m = Matrix(3, 3, [1, x**2 + 2*x + 1, y, (x + 1)**2, 2, 0, y, 0, 3]) + assert m.is_symmetric() + assert not m.is_symmetric(simplify=False) + assert m.expand().is_symmetric(simplify=False) + + +def test_diagonalization(): + m = Matrix([[1, 2+I], [2-I, 3]]) + assert m.is_diagonalizable() + + m = Matrix(3, 2, [-3, 1, -3, 20, 3, 10]) + assert not m.is_diagonalizable() + assert not m.is_symmetric() + raises(NonSquareMatrixError, lambda: m.diagonalize()) + + # diagonalizable + m = diag(1, 2, 3) + (P, D) = m.diagonalize() + assert P == eye(3) + assert D == m + + m = Matrix(2, 2, [0, 1, 1, 0]) + assert m.is_symmetric() + assert m.is_diagonalizable() + (P, D) = m.diagonalize() + assert P.inv() * m * P == D + + m = Matrix(2, 2, [1, 0, 0, 3]) + assert m.is_symmetric() + assert m.is_diagonalizable() + (P, D) = m.diagonalize() + assert P.inv() * m * P == D + assert P == eye(2) + assert D == m + + m = Matrix(2, 2, [1, 1, 0, 0]) + assert m.is_diagonalizable() + (P, D) = m.diagonalize() + assert P.inv() * m * P == D + + m = Matrix(3, 3, [1, 2, 0, 0, 3, 0, 2, -4, 2]) + assert m.is_diagonalizable() + (P, D) = m.diagonalize() + assert P.inv() * m * P == D + for i in P: + assert i.as_numer_denom()[1] == 1 + + m = Matrix(2, 2, [1, 0, 0, 0]) + assert m.is_diagonal() + assert m.is_diagonalizable() + (P, D) = m.diagonalize() + assert P.inv() * m * P == D + assert P == Matrix([[0, 1], [1, 0]]) + + # diagonalizable, complex only + m = Matrix(2, 2, [0, 1, -1, 0]) + assert not m.is_diagonalizable(True) + raises(MatrixError, lambda: m.diagonalize(True)) + assert m.is_diagonalizable() + (P, D) = m.diagonalize() + assert P.inv() * m * P == D + + # not diagonalizable + m = Matrix(2, 2, [0, 1, 0, 0]) + assert not m.is_diagonalizable() + raises(MatrixError, lambda: m.diagonalize()) + + m = Matrix(3, 3, [-3, 1, -3, 20, 3, 10, 2, -2, 4]) + assert not m.is_diagonalizable() + raises(MatrixError, lambda: m.diagonalize()) + + # symbolic + a, b, c, d = symbols('a b c d') + m = Matrix(2, 2, [a, c, c, b]) + assert m.is_symmetric() + assert m.is_diagonalizable() + + +def test_issue_15887(): + # Mutable matrix should not use cache + a = MutableDenseMatrix([[0, 1], [1, 0]]) + assert a.is_diagonalizable() is True + a[1, 0] = 0 + assert a.is_diagonalizable() is False + + a = MutableDenseMatrix([[0, 1], [1, 0]]) + a.diagonalize() + a[1, 0] = 0 + raises(MatrixError, lambda: a.diagonalize()) + + +def test_jordan_form(): + + m = Matrix(3, 2, [-3, 1, -3, 20, 3, 10]) + raises(NonSquareMatrixError, lambda: m.jordan_form()) + + # diagonalizable + m = Matrix(3, 3, [7, -12, 6, 10, -19, 10, 12, -24, 13]) + Jmust = Matrix(3, 3, [-1, 0, 0, 0, 1, 0, 0, 0, 1]) + P, J = m.jordan_form() + assert Jmust == J + assert Jmust == m.diagonalize()[1] + + # m = Matrix(3, 3, [0, 6, 3, 1, 3, 1, -2, 2, 1]) + # m.jordan_form() # very long + # m.jordan_form() # + + # diagonalizable, complex only + + # Jordan cells + # complexity: one of eigenvalues is zero + m = Matrix(3, 3, [0, 1, 0, -4, 4, 0, -2, 1, 2]) + # The blocks are ordered according to the value of their eigenvalues, + # in order to make the matrix compatible with .diagonalize() + Jmust = Matrix(3, 3, [2, 1, 0, 0, 2, 0, 0, 0, 2]) + P, J = m.jordan_form() + assert Jmust == J + + # complexity: all of eigenvalues are equal + m = Matrix(3, 3, [2, 6, -15, 1, 1, -5, 1, 2, -6]) + # Jmust = Matrix(3, 3, [-1, 0, 0, 0, -1, 1, 0, 0, -1]) + # same here see 1456ff + Jmust = Matrix(3, 3, [-1, 1, 0, 0, -1, 0, 0, 0, -1]) + P, J = m.jordan_form() + assert Jmust == J + + # complexity: two of eigenvalues are zero + m = Matrix(3, 3, [4, -5, 2, 5, -7, 3, 6, -9, 4]) + Jmust = Matrix(3, 3, [0, 1, 0, 0, 0, 0, 0, 0, 1]) + P, J = m.jordan_form() + assert Jmust == J + + m = Matrix(4, 4, [6, 5, -2, -3, -3, -1, 3, 3, 2, 1, -2, -3, -1, 1, 5, 5]) + Jmust = Matrix(4, 4, [2, 1, 0, 0, + 0, 2, 0, 0, + 0, 0, 2, 1, + 0, 0, 0, 2] + ) + P, J = m.jordan_form() + assert Jmust == J + + m = Matrix(4, 4, [6, 2, -8, -6, -3, 2, 9, 6, 2, -2, -8, -6, -1, 0, 3, 4]) + # Jmust = Matrix(4, 4, [2, 0, 0, 0, 0, 2, 1, 0, 0, 0, 2, 0, 0, 0, 0, -2]) + # same here see 1456ff + Jmust = Matrix(4, 4, [-2, 0, 0, 0, + 0, 2, 1, 0, + 0, 0, 2, 0, + 0, 0, 0, 2]) + P, J = m.jordan_form() + assert Jmust == J + + m = Matrix(4, 4, [5, 4, 2, 1, 0, 1, -1, -1, -1, -1, 3, 0, 1, 1, -1, 2]) + assert not m.is_diagonalizable() + Jmust = Matrix(4, 4, [1, 0, 0, 0, 0, 2, 0, 0, 0, 0, 4, 1, 0, 0, 0, 4]) + P, J = m.jordan_form() + assert Jmust == J + + # checking for maximum precision to remain unchanged + m = Matrix([[Float('1.0', precision=110), Float('2.0', precision=110)], + [Float('3.14159265358979323846264338327', precision=110), Float('4.0', precision=110)]]) + P, J = m.jordan_form() + for term in J.values(): + if isinstance(term, Float): + assert term._prec == 110 + + +def test_jordan_form_complex_issue_9274(): + A = Matrix([[ 2, 4, 1, 0], + [-4, 2, 0, 1], + [ 0, 0, 2, 4], + [ 0, 0, -4, 2]]) + p = 2 - 4*I + q = 2 + 4*I + Jmust1 = Matrix([[p, 1, 0, 0], + [0, p, 0, 0], + [0, 0, q, 1], + [0, 0, 0, q]]) + Jmust2 = Matrix([[q, 1, 0, 0], + [0, q, 0, 0], + [0, 0, p, 1], + [0, 0, 0, p]]) + P, J = A.jordan_form() + assert J == Jmust1 or J == Jmust2 + assert simplify(P*J*P.inv()) == A + + +def test_issue_10220(): + # two non-orthogonal Jordan blocks with eigenvalue 1 + M = Matrix([[1, 0, 0, 1], + [0, 1, 1, 0], + [0, 0, 1, 1], + [0, 0, 0, 1]]) + P, J = M.jordan_form() + assert P == Matrix([[0, 1, 0, 1], + [1, 0, 0, 0], + [0, 1, 0, 0], + [0, 0, 1, 0]]) + assert J == Matrix([ + [1, 1, 0, 0], + [0, 1, 1, 0], + [0, 0, 1, 0], + [0, 0, 0, 1]]) + + +def test_jordan_form_issue_15858(): + A = Matrix([ + [1, 1, 1, 0], + [-2, -1, 0, -1], + [0, 0, -1, -1], + [0, 0, 2, 1]]) + (P, J) = A.jordan_form() + assert P.expand() == Matrix([ + [ -I, -I/2, I, I/2], + [-1 + I, 0, -1 - I, 0], + [ 0, -S(1)/2 - I/2, 0, -S(1)/2 + I/2], + [ 0, 1, 0, 1]]) + assert J == Matrix([ + [-I, 1, 0, 0], + [0, -I, 0, 0], + [0, 0, I, 1], + [0, 0, 0, I]]) + + +def test_Matrix_berkowitz_charpoly(): + UA, K_i, K_w = symbols('UA K_i K_w') + + A = Matrix([[-K_i - UA + K_i**2/(K_i + K_w), K_i*K_w/(K_i + K_w)], + [ K_i*K_w/(K_i + K_w), -K_w + K_w**2/(K_i + K_w)]]) + + charpoly = A.charpoly(x) + + assert charpoly == \ + Poly(x**2 + (K_i*UA + K_w*UA + 2*K_i*K_w)/(K_i + K_w)*x + + K_i*K_w*UA/(K_i + K_w), x, domain='ZZ(K_i,K_w,UA)') + + assert type(charpoly) is PurePoly + + A = Matrix([[1, 3], [2, 0]]) + assert A.charpoly() == A.charpoly(x) == PurePoly(x**2 - x - 6) + + A = Matrix([[1, 2], [x, 0]]) + p = A.charpoly(x) + assert p.gen != x + assert p.as_expr().subs(p.gen, x) == x**2 - 3*x + + +def test_exp_jordan_block(): + l = Symbol('lamda') + + m = Matrix.jordan_block(1, l) + assert m._eval_matrix_exp_jblock() == Matrix([[exp(l)]]) + + m = Matrix.jordan_block(3, l) + assert m._eval_matrix_exp_jblock() == \ + Matrix([ + [exp(l), exp(l), exp(l)/2], + [0, exp(l), exp(l)], + [0, 0, exp(l)]]) + + +def test_exp(): + m = Matrix([[3, 4], [0, -2]]) + m_exp = Matrix([[exp(3), -4*exp(-2)/5 + 4*exp(3)/5], [0, exp(-2)]]) + assert m.exp() == m_exp + assert exp(m) == m_exp + + m = Matrix([[1, 0], [0, 1]]) + assert m.exp() == Matrix([[E, 0], [0, E]]) + assert exp(m) == Matrix([[E, 0], [0, E]]) + + m = Matrix([[1, -1], [1, 1]]) + assert m.exp() == Matrix([[E*cos(1), -E*sin(1)], [E*sin(1), E*cos(1)]]) + + +def test_log(): + l = Symbol('lamda') + + m = Matrix.jordan_block(1, l) + assert m._eval_matrix_log_jblock() == Matrix([[log(l)]]) + + m = Matrix.jordan_block(4, l) + assert m._eval_matrix_log_jblock() == \ + Matrix( + [ + [log(l), 1/l, -1/(2*l**2), 1/(3*l**3)], + [0, log(l), 1/l, -1/(2*l**2)], + [0, 0, log(l), 1/l], + [0, 0, 0, log(l)] + ] + ) + + m = Matrix( + [[0, 0, 1], + [0, 0, 0], + [-1, 0, 0]] + ) + raises(MatrixError, lambda: m.log()) + + +def test_find_reasonable_pivot_naive_finds_guaranteed_nonzero1(): + # Test if matrices._find_reasonable_pivot_naive() + # finds a guaranteed non-zero pivot when the + # some of the candidate pivots are symbolic expressions. + # Keyword argument: simpfunc=None indicates that no simplifications + # should be performed during the search. + x = Symbol('x') + column = Matrix(3, 1, [x, cos(x)**2 + sin(x)**2, S.Half]) + pivot_offset, pivot_val, pivot_assumed_nonzero, simplified =\ + _find_reasonable_pivot_naive(column) + assert pivot_val == S.Half + + +def test_find_reasonable_pivot_naive_finds_guaranteed_nonzero2(): + # Test if matrices._find_reasonable_pivot_naive() + # finds a guaranteed non-zero pivot when the + # some of the candidate pivots are symbolic expressions. + # Keyword argument: simpfunc=_simplify indicates that the search + # should attempt to simplify candidate pivots. + x = Symbol('x') + column = Matrix(3, 1, + [x, + cos(x)**2+sin(x)**2+x**2, + cos(x)**2+sin(x)**2]) + pivot_offset, pivot_val, pivot_assumed_nonzero, simplified =\ + _find_reasonable_pivot_naive(column, simpfunc=_simplify) + assert pivot_val == 1 + + +def test_find_reasonable_pivot_naive_simplifies(): + # Test if matrices._find_reasonable_pivot_naive() + # simplifies candidate pivots, and reports + # their offsets correctly. + x = Symbol('x') + column = Matrix(3, 1, + [x, + cos(x)**2+sin(x)**2+x, + cos(x)**2+sin(x)**2]) + pivot_offset, pivot_val, pivot_assumed_nonzero, simplified =\ + _find_reasonable_pivot_naive(column, simpfunc=_simplify) + + assert len(simplified) == 2 + assert simplified[0][0] == 1 + assert simplified[0][1] == 1+x + assert simplified[1][0] == 2 + assert simplified[1][1] == 1 + + +def test_errors(): + raises(ValueError, lambda: Matrix([[1, 2], [1]])) + raises(IndexError, lambda: Matrix([[1, 2]])[1.2, 5]) + raises(IndexError, lambda: Matrix([[1, 2]])[1, 5.2]) + raises(ValueError, lambda: randMatrix(3, c=4, symmetric=True)) + raises(ValueError, lambda: Matrix([1, 2]).reshape(4, 6)) + raises(ShapeError, + lambda: Matrix([[1, 2], [3, 4]]).copyin_matrix([1, 0], Matrix([1, 2]))) + raises(TypeError, lambda: Matrix([[1, 2], [3, 4]]).copyin_list([0, + 1], set())) + raises(NonSquareMatrixError, lambda: Matrix([[1, 2, 3], [2, 3, 0]]).inv()) + raises(ShapeError, + lambda: Matrix(1, 2, [1, 2]).row_join(Matrix([[1, 2], [3, 4]]))) + raises( + ShapeError, lambda: Matrix([1, 2]).col_join(Matrix([[1, 2], [3, 4]]))) + raises(ShapeError, lambda: Matrix([1]).row_insert(1, Matrix([[1, + 2], [3, 4]]))) + raises(ShapeError, lambda: Matrix([1]).col_insert(1, Matrix([[1, + 2], [3, 4]]))) + raises(NonSquareMatrixError, lambda: Matrix([1, 2]).trace()) + raises(TypeError, lambda: Matrix([1]).applyfunc(1)) + raises(ValueError, lambda: Matrix([[1, 2], [3, 4]]).minor(4, 5)) + raises(ValueError, lambda: Matrix([[1, 2], [3, 4]]).minor_submatrix(4, 5)) + raises(TypeError, lambda: Matrix([1, 2, 3]).cross(1)) + raises(TypeError, lambda: Matrix([1, 2, 3]).dot(1)) + raises(ShapeError, lambda: Matrix([1, 2, 3]).dot(Matrix([1, 2]))) + raises(ShapeError, lambda: Matrix([1, 2]).dot([])) + raises(TypeError, lambda: Matrix([1, 2]).dot('a')) + raises(ShapeError, lambda: Matrix([1, 2]).dot([1, 2, 3])) + raises(NonSquareMatrixError, lambda: Matrix([1, 2, 3]).exp()) + raises(ShapeError, lambda: Matrix([[1, 2], [3, 4]]).normalized()) + raises(ValueError, lambda: Matrix([1, 2]).inv(method='not a method')) + raises(NonSquareMatrixError, lambda: Matrix([1, 2]).inverse_GE()) + raises(ValueError, lambda: Matrix([[1, 2], [1, 2]]).inverse_GE()) + raises(NonSquareMatrixError, lambda: Matrix([1, 2]).inverse_ADJ()) + raises(ValueError, lambda: Matrix([[1, 2], [1, 2]]).inverse_ADJ()) + raises(NonSquareMatrixError, lambda: Matrix([1, 2]).inverse_LU()) + raises(NonSquareMatrixError, lambda: Matrix([1, 2]).is_nilpotent()) + raises(NonSquareMatrixError, lambda: Matrix([1, 2]).det()) + raises(ValueError, + lambda: Matrix([[1, 2], [3, 4]]).det(method='Not a real method')) + raises(ValueError, + lambda: Matrix([[1, 2, 3, 4], [5, 6, 7, 8], + [9, 10, 11, 12], [13, 14, 15, 16]]).det(iszerofunc="Not function")) + raises(ValueError, + lambda: Matrix([[1, 2, 3, 4], [5, 6, 7, 8], + [9, 10, 11, 12], [13, 14, 15, 16]]).det(iszerofunc=False)) + raises(ValueError, + lambda: hessian(Matrix([[1, 2], [3, 4]]), Matrix([[1, 2], [2, 1]]))) + raises(ValueError, lambda: hessian(Matrix([[1, 2], [3, 4]]), [])) + raises(ValueError, lambda: hessian(Symbol('x')**2, 'a')) + raises(IndexError, lambda: eye(3)[5, 2]) + raises(IndexError, lambda: eye(3)[2, 5]) + M = Matrix(((1, 2, 3, 4), (5, 6, 7, 8), (9, 10, 11, 12), (13, 14, 15, 16))) + raises(ValueError, lambda: M.det('method=LU_decomposition()')) + V = Matrix([[10, 10, 10]]) + M = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + raises(ValueError, lambda: M.row_insert(4.7, V)) + M = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + raises(ValueError, lambda: M.col_insert(-4.2, V)) + + +def test_len(): + assert len(Matrix()) == 0 + assert len(Matrix([[1, 2]])) == len(Matrix([[1], [2]])) == 2 + assert len(Matrix(0, 2, lambda i, j: 0)) == \ + len(Matrix(2, 0, lambda i, j: 0)) == 0 + assert len(Matrix([[0, 1, 2], [3, 4, 5]])) == 6 + assert Matrix([1]) == Matrix([[1]]) + assert not Matrix() + assert Matrix() == Matrix([]) + + +def test_integrate(): + A = Matrix(((1, 4, x), (y, 2, 4), (10, 5, x**2))) + assert A.integrate(x) == \ + Matrix(((x, 4*x, x**2/2), (x*y, 2*x, 4*x), (10*x, 5*x, x**3/3))) + assert A.integrate(y) == \ + Matrix(((y, 4*y, x*y), (y**2/2, 2*y, 4*y), (10*y, 5*y, y*x**2))) + m = Matrix(2, 1, [x, y]) + assert m.integrate(x) == Matrix(2, 1, [x**2/2, y*x]) + + +def test_diff(): + A = MutableDenseMatrix(((1, 4, x), (y, 2, 4), (10, 5, x**2 + 1))) + assert isinstance(A.diff(x), type(A)) + assert A.diff(x) == MutableDenseMatrix(((0, 0, 1), (0, 0, 0), (0, 0, 2*x))) + assert A.diff(y) == MutableDenseMatrix(((0, 0, 0), (1, 0, 0), (0, 0, 0))) + + assert diff(A, x) == MutableDenseMatrix(((0, 0, 1), (0, 0, 0), (0, 0, 2*x))) + assert diff(A, y) == MutableDenseMatrix(((0, 0, 0), (1, 0, 0), (0, 0, 0))) + + A_imm = A.as_immutable() + assert isinstance(A_imm.diff(x), type(A_imm)) + assert A_imm.diff(x) == ImmutableDenseMatrix(((0, 0, 1), (0, 0, 0), (0, 0, 2*x))) + assert A_imm.diff(y) == ImmutableDenseMatrix(((0, 0, 0), (1, 0, 0), (0, 0, 0))) + + assert diff(A_imm, x) == ImmutableDenseMatrix(((0, 0, 1), (0, 0, 0), (0, 0, 2*x))) + assert diff(A_imm, y) == ImmutableDenseMatrix(((0, 0, 0), (1, 0, 0), (0, 0, 0))) + + assert A.diff(x, evaluate=False) == ArrayDerivative(A, x, evaluate=False) + assert diff(A, x, evaluate=False) == ArrayDerivative(A, x, evaluate=False) + + +def test_diff_by_matrix(): + + # Derive matrix by matrix: + + A = MutableDenseMatrix([[x, y], [z, t]]) + assert A.diff(A) == Array([[[[1, 0], [0, 0]], [[0, 1], [0, 0]]], [[[0, 0], [1, 0]], [[0, 0], [0, 1]]]]) + assert diff(A, A) == Array([[[[1, 0], [0, 0]], [[0, 1], [0, 0]]], [[[0, 0], [1, 0]], [[0, 0], [0, 1]]]]) + + A_imm = A.as_immutable() + assert A_imm.diff(A_imm) == Array([[[[1, 0], [0, 0]], [[0, 1], [0, 0]]], [[[0, 0], [1, 0]], [[0, 0], [0, 1]]]]) + assert diff(A_imm, A_imm) == Array([[[[1, 0], [0, 0]], [[0, 1], [0, 0]]], [[[0, 0], [1, 0]], [[0, 0], [0, 1]]]]) + + # Derive a constant matrix: + assert A.diff(a) == MutableDenseMatrix([[0, 0], [0, 0]]) + + B = ImmutableDenseMatrix([a, b]) + assert A.diff(B) == Array.zeros(2, 1, 2, 2) + assert A.diff(A) == Array([[[[1, 0], [0, 0]], [[0, 1], [0, 0]]], [[[0, 0], [1, 0]], [[0, 0], [0, 1]]]]) + + # Test diff with tuples: + + dB = B.diff([[a, b]]) + assert dB.shape == (2, 2, 1) + assert dB == Array([[[1], [0]], [[0], [1]]]) + + f = Function("f") + fxyz = f(x, y, z) + assert fxyz.diff([[x, y, z]]) == Array([fxyz.diff(x), fxyz.diff(y), fxyz.diff(z)]) + assert fxyz.diff(([x, y, z], 2)) == Array([ + [fxyz.diff(x, 2), fxyz.diff(x, y), fxyz.diff(x, z)], + [fxyz.diff(x, y), fxyz.diff(y, 2), fxyz.diff(y, z)], + [fxyz.diff(x, z), fxyz.diff(z, y), fxyz.diff(z, 2)], + ]) + + expr = sin(x)*exp(y) + assert expr.diff([[x, y]]) == Array([cos(x)*exp(y), sin(x)*exp(y)]) + assert expr.diff(y, ((x, y),)) == Array([cos(x)*exp(y), sin(x)*exp(y)]) + assert expr.diff(x, ((x, y),)) == Array([-sin(x)*exp(y), cos(x)*exp(y)]) + assert expr.diff(((y, x),), [[x, y]]) == Array([[cos(x)*exp(y), -sin(x)*exp(y)], [sin(x)*exp(y), cos(x)*exp(y)]]) + + # Test different notations: + + assert fxyz.diff(x).diff(y).diff(x) == fxyz.diff(((x, y, z),), 3)[0, 1, 0] + assert fxyz.diff(z).diff(y).diff(x) == fxyz.diff(((x, y, z),), 3)[2, 1, 0] + assert fxyz.diff([[x, y, z]], ((z, y, x),)) == Array([[fxyz.diff(i).diff(j) for i in (x, y, z)] for j in (z, y, x)]) + + # Test scalar derived by matrix remains matrix: + res = x.diff(Matrix([[x, y]])) + assert isinstance(res, ImmutableDenseMatrix) + assert res == Matrix([[1, 0]]) + res = (x**3).diff(Matrix([[x, y]])) + assert isinstance(res, ImmutableDenseMatrix) + assert res == Matrix([[3*x**2, 0]]) + + +def test_getattr(): + A = Matrix(((1, 4, x), (y, 2, 4), (10, 5, x**2 + 1))) + raises(AttributeError, lambda: A.nonexistantattribute) + assert getattr(A, 'diff')(x) == Matrix(((0, 0, 1), (0, 0, 0), (0, 0, 2*x))) + + +def test_hessenberg(): + A = Matrix([[3, 4, 1], [2, 4, 5], [0, 1, 2]]) + assert A.is_upper_hessenberg + A = A.T + assert A.is_lower_hessenberg + A[0, -1] = 1 + assert A.is_lower_hessenberg is False + + A = Matrix([[3, 4, 1], [2, 4, 5], [3, 1, 2]]) + assert not A.is_upper_hessenberg + + A = zeros(5, 2) + assert A.is_upper_hessenberg + + +def test_cholesky(): + raises(NonSquareMatrixError, lambda: Matrix((1, 2)).cholesky()) + raises(ValueError, lambda: Matrix(((1, 2), (3, 4))).cholesky()) + raises(ValueError, lambda: Matrix(((5 + I, 0), (0, 1))).cholesky()) + raises(ValueError, lambda: Matrix(((1, 5), (5, 1))).cholesky()) + raises(ValueError, lambda: Matrix(((1, 2), (3, 4))).cholesky(hermitian=False)) + assert Matrix(((5 + I, 0), (0, 1))).cholesky(hermitian=False) == Matrix([ + [sqrt(5 + I), 0], [0, 1]]) + A = Matrix(((1, 5), (5, 1))) + L = A.cholesky(hermitian=False) + assert L == Matrix([[1, 0], [5, 2*sqrt(6)*I]]) + assert L*L.T == A + A = Matrix(((25, 15, -5), (15, 18, 0), (-5, 0, 11))) + L = A.cholesky() + assert L * L.T == A + assert L.is_lower + assert L == Matrix([[5, 0, 0], [3, 3, 0], [-1, 1, 3]]) + A = Matrix(((4, -2*I, 2 + 2*I), (2*I, 2, -1 + I), (2 - 2*I, -1 - I, 11))) + assert A.cholesky().expand() == Matrix(((2, 0, 0), (I, 1, 0), (1 - I, 0, 3))) + + raises(NonSquareMatrixError, lambda: SparseMatrix((1, 2)).cholesky()) + raises(ValueError, lambda: SparseMatrix(((1, 2), (3, 4))).cholesky()) + raises(ValueError, lambda: SparseMatrix(((5 + I, 0), (0, 1))).cholesky()) + raises(ValueError, lambda: SparseMatrix(((1, 5), (5, 1))).cholesky()) + raises(ValueError, lambda: SparseMatrix(((1, 2), (3, 4))).cholesky(hermitian=False)) + assert SparseMatrix(((5 + I, 0), (0, 1))).cholesky(hermitian=False) == Matrix([ + [sqrt(5 + I), 0], [0, 1]]) + A = SparseMatrix(((1, 5), (5, 1))) + L = A.cholesky(hermitian=False) + assert L == Matrix([[1, 0], [5, 2*sqrt(6)*I]]) + assert L*L.T == A + A = SparseMatrix(((25, 15, -5), (15, 18, 0), (-5, 0, 11))) + L = A.cholesky() + assert L * L.T == A + assert L.is_lower + assert L == Matrix([[5, 0, 0], [3, 3, 0], [-1, 1, 3]]) + A = SparseMatrix(((4, -2*I, 2 + 2*I), (2*I, 2, -1 + I), (2 - 2*I, -1 - I, 11))) + assert A.cholesky() == Matrix(((2, 0, 0), (I, 1, 0), (1 - I, 0, 3))) + + +def test_matrix_norm(): + # Vector Tests + # Test columns and symbols + x = Symbol('x', real=True) + v = Matrix([cos(x), sin(x)]) + assert trigsimp(v.norm(2)) == 1 + assert v.norm(10) == Pow(cos(x)**10 + sin(x)**10, Rational(1, 10)) + + # Test Rows + A = Matrix([[5, Rational(3, 2)]]) + assert A.norm() == Pow(25 + Rational(9, 4), S.Half) + assert A.norm(oo) == max(A) + assert A.norm(-oo) == min(A) + + # Matrix Tests + # Intuitive test + A = Matrix([[1, 1], [1, 1]]) + assert A.norm(2) == 2 + assert A.norm(-2) == 0 + assert A.norm('frobenius') == 2 + assert eye(10).norm(2) == eye(10).norm(-2) == 1 + assert A.norm(oo) == 2 + + # Test with Symbols and more complex entries + A = Matrix([[3, y, y], [x, S.Half, -pi]]) + assert (A.norm('fro') + == sqrt(Rational(37, 4) + 2*abs(y)**2 + pi**2 + x**2)) + + # Check non-square + A = Matrix([[1, 2, -3], [4, 5, Rational(13, 2)]]) + assert A.norm(2) == sqrt(Rational(389, 8) + sqrt(78665)/8) + assert A.norm(-2) is S.Zero + assert A.norm('frobenius') == sqrt(389)/2 + + # Test properties of matrix norms + # https://en.wikipedia.org/wiki/Matrix_norm#Definition + # Two matrices + A = Matrix([[1, 2], [3, 4]]) + B = Matrix([[5, 5], [-2, 2]]) + C = Matrix([[0, -I], [I, 0]]) + D = Matrix([[1, 0], [0, -1]]) + L = [A, B, C, D] + alpha = Symbol('alpha', real=True) + + for order in ['fro', 2, -2]: + # Zero Check + assert zeros(3).norm(order) is S.Zero + # Check Triangle Inequality for all Pairs of Matrices + for X in L: + for Y in L: + dif = (X.norm(order) + Y.norm(order) - + (X + Y).norm(order)) + assert (dif >= 0) + # Scalar multiplication linearity + for M in [A, B, C, D]: + dif = simplify((alpha*M).norm(order) - + abs(alpha) * M.norm(order)) + assert dif == 0 + + # Test Properties of Vector Norms + # https://en.wikipedia.org/wiki/Vector_norm + # Two column vectors + a = Matrix([1, 1 - 1*I, -3]) + b = Matrix([S.Half, 1*I, 1]) + c = Matrix([-1, -1, -1]) + d = Matrix([3, 2, I]) + e = Matrix([Integer(1e2), Rational(1, 1e2), 1]) + L = [a, b, c, d, e] + alpha = Symbol('alpha', real=True) + + for order in [1, 2, -1, -2, S.Infinity, S.NegativeInfinity, pi]: + # Zero Check + if order > 0: + assert Matrix([0, 0, 0]).norm(order) is S.Zero + # Triangle inequality on all pairs + if order >= 1: # Triangle InEq holds only for these norms + for X in L: + for Y in L: + dif = (X.norm(order) + Y.norm(order) - + (X + Y).norm(order)) + assert simplify(dif >= 0) is S.true + # Linear to scalar multiplication + if order in [1, 2, -1, -2, S.Infinity, S.NegativeInfinity]: + for X in L: + dif = simplify((alpha*X).norm(order) - + (abs(alpha) * X.norm(order))) + assert dif == 0 + + # ord=1 + M = Matrix(3, 3, [1, 3, 0, -2, -1, 0, 3, 9, 6]) + assert M.norm(1) == 13 + + +def test_condition_number(): + x = Symbol('x', real=True) + A = eye(3) + A[0, 0] = 10 + A[2, 2] = Rational(1, 10) + assert A.condition_number() == 100 + + A[1, 1] = x + assert A.condition_number() == Max(10, Abs(x)) / Min(Rational(1, 10), Abs(x)) + + M = Matrix([[cos(x), sin(x)], [-sin(x), cos(x)]]) + Mc = M.condition_number() + assert all(Float(1.).epsilon_eq(Mc.subs(x, val).evalf()) for val in + [Rational(1, 5), S.Half, Rational(1, 10), pi/2, pi, pi*Rational(7, 4) ]) + + #issue 10782 + assert Matrix([]).condition_number() == 0 + + +def test_equality(): + A = Matrix(((1, 2, 3), (4, 5, 6), (7, 8, 9))) + B = Matrix(((9, 8, 7), (6, 5, 4), (3, 2, 1))) + assert A == A[:, :] + assert not A != A[:, :] + assert not A == B + assert A != B + assert A != 10 + assert not A == 10 + + # A SparseMatrix can be equal to a Matrix + C = SparseMatrix(((1, 0, 0), (0, 1, 0), (0, 0, 1))) + D = Matrix(((1, 0, 0), (0, 1, 0), (0, 0, 1))) + assert C == D + assert not C != D + + +def test_normalized(): + assert Matrix([3, 4]).normalized() == \ + Matrix([Rational(3, 5), Rational(4, 5)]) + + # Zero vector trivial cases + assert Matrix([0, 0, 0]).normalized() == Matrix([0, 0, 0]) + + # Machine precision error truncation trivial cases + m = Matrix([0,0,1.e-100]) + assert m.normalized( + iszerofunc=lambda x: x.evalf(n=10, chop=True).is_zero + ) == Matrix([0, 0, 0]) + + +def test_print_nonzero(): + assert capture(lambda: eye(3).print_nonzero()) == \ + '[X ]\n[ X ]\n[ X]\n' + assert capture(lambda: eye(3).print_nonzero('.')) == \ + '[. ]\n[ . ]\n[ .]\n' + + +def test_zeros_eye(): + assert Matrix.eye(3) == eye(3) + assert Matrix.zeros(3) == zeros(3) + assert ones(3, 4) == Matrix(3, 4, [1]*12) + + i = Matrix([[1, 0], [0, 1]]) + z = Matrix([[0, 0], [0, 0]]) + for cls in all_classes: + m = cls.eye(2) + assert i == m # but m == i will fail if m is immutable + assert i == eye(2, cls=cls) + assert type(m) == cls + m = cls.zeros(2) + assert z == m + assert z == zeros(2, cls=cls) + assert type(m) == cls + + +def test_is_zero(): + assert Matrix().is_zero_matrix + assert Matrix([[0, 0], [0, 0]]).is_zero_matrix + assert zeros(3, 4).is_zero_matrix + assert not eye(3).is_zero_matrix + assert Matrix([[x, 0], [0, 0]]).is_zero_matrix == None + assert SparseMatrix([[x, 0], [0, 0]]).is_zero_matrix == None + assert ImmutableMatrix([[x, 0], [0, 0]]).is_zero_matrix == None + assert ImmutableSparseMatrix([[x, 0], [0, 0]]).is_zero_matrix == None + assert Matrix([[x, 1], [0, 0]]).is_zero_matrix == False + a = Symbol('a', nonzero=True) + assert Matrix([[a, 0], [0, 0]]).is_zero_matrix == False + + +def test_rotation_matrices(): + # This tests the rotation matrices by rotating about an axis and back. + theta = pi/3 + r3_plus = rot_axis3(theta) + r3_minus = rot_axis3(-theta) + r2_plus = rot_axis2(theta) + r2_minus = rot_axis2(-theta) + r1_plus = rot_axis1(theta) + r1_minus = rot_axis1(-theta) + assert r3_minus*r3_plus*eye(3) == eye(3) + assert r2_minus*r2_plus*eye(3) == eye(3) + assert r1_minus*r1_plus*eye(3) == eye(3) + + # Check the correctness of the trace of the rotation matrix + assert r1_plus.trace() == 1 + 2*cos(theta) + assert r2_plus.trace() == 1 + 2*cos(theta) + assert r3_plus.trace() == 1 + 2*cos(theta) + + # Check that a rotation with zero angle doesn't change anything. + assert rot_axis1(0) == eye(3) + assert rot_axis2(0) == eye(3) + assert rot_axis3(0) == eye(3) + + # Check left-hand convention + # see Issue #24529 + q1 = Quaternion.from_axis_angle([1, 0, 0], pi / 2) + q2 = Quaternion.from_axis_angle([0, 1, 0], pi / 2) + q3 = Quaternion.from_axis_angle([0, 0, 1], pi / 2) + assert rot_axis1(- pi / 2) == q1.to_rotation_matrix() + assert rot_axis2(- pi / 2) == q2.to_rotation_matrix() + assert rot_axis3(- pi / 2) == q3.to_rotation_matrix() + # Check right-hand convention + assert rot_ccw_axis1(+ pi / 2) == q1.to_rotation_matrix() + assert rot_ccw_axis2(+ pi / 2) == q2.to_rotation_matrix() + assert rot_ccw_axis3(+ pi / 2) == q3.to_rotation_matrix() + + +def test_DeferredVector(): + assert str(DeferredVector("vector")[4]) == "vector[4]" + assert sympify(DeferredVector("d")) == DeferredVector("d") + raises(IndexError, lambda: DeferredVector("d")[-1]) + assert str(DeferredVector("d")) == "d" + assert repr(DeferredVector("test")) == "DeferredVector('test')" + + +def test_DeferredVector_not_iterable(): + assert not iterable(DeferredVector('X')) + + +def test_DeferredVector_Matrix(): + raises(TypeError, lambda: Matrix(DeferredVector("V"))) + + +def test_GramSchmidt(): + R = Rational + m1 = Matrix(1, 2, [1, 2]) + m2 = Matrix(1, 2, [2, 3]) + assert GramSchmidt([m1, m2]) == \ + [Matrix(1, 2, [1, 2]), Matrix(1, 2, [R(2)/5, R(-1)/5])] + assert GramSchmidt([m1.T, m2.T]) == \ + [Matrix(2, 1, [1, 2]), Matrix(2, 1, [R(2)/5, R(-1)/5])] + # from wikipedia + assert GramSchmidt([Matrix([3, 1]), Matrix([2, 2])], True) == [ + Matrix([3*sqrt(10)/10, sqrt(10)/10]), + Matrix([-sqrt(10)/10, 3*sqrt(10)/10])] + # https://github.com/sympy/sympy/issues/9488 + L = FiniteSet(Matrix([1])) + assert GramSchmidt(L) == [Matrix([[1]])] + + +def test_casoratian(): + assert casoratian([1, 2, 3, 4], 1) == 0 + assert casoratian([1, 2, 3, 4], 1, zero=False) == 0 + + +def test_zero_dimension_multiply(): + assert (Matrix()*zeros(0, 3)).shape == (0, 3) + assert zeros(3, 0)*zeros(0, 3) == zeros(3, 3) + assert zeros(0, 3)*zeros(3, 0) == Matrix() + + +def test_slice_issue_2884(): + m = Matrix(2, 2, range(4)) + assert m[1, :] == Matrix([[2, 3]]) + assert m[-1, :] == Matrix([[2, 3]]) + assert m[:, 1] == Matrix([[1, 3]]).T + assert m[:, -1] == Matrix([[1, 3]]).T + raises(IndexError, lambda: m[2, :]) + raises(IndexError, lambda: m[2, 2]) + + +def test_slice_issue_3401(): + assert zeros(0, 3)[:, -1].shape == (0, 1) + assert zeros(3, 0)[0, :] == Matrix(1, 0, []) + + +def test_copyin(): + s = zeros(3, 3) + s[3] = 1 + assert s[:, 0] == Matrix([0, 1, 0]) + assert s[3] == 1 + assert s[3: 4] == [1] + s[1, 1] = 42 + assert s[1, 1] == 42 + assert s[1, 1:] == Matrix([[42, 0]]) + s[1, 1:] = Matrix([[5, 6]]) + assert s[1, :] == Matrix([[1, 5, 6]]) + s[1, 1:] = [[42, 43]] + assert s[1, :] == Matrix([[1, 42, 43]]) + s[0, 0] = 17 + assert s[:, :1] == Matrix([17, 1, 0]) + s[0, 0] = [1, 1, 1] + assert s[:, 0] == Matrix([1, 1, 1]) + s[0, 0] = Matrix([1, 1, 1]) + assert s[:, 0] == Matrix([1, 1, 1]) + s[0, 0] = SparseMatrix([1, 1, 1]) + assert s[:, 0] == Matrix([1, 1, 1]) + + +def test_invertible_check(): + # sometimes a singular matrix will have a pivot vector shorter than + # the number of rows in a matrix... + assert Matrix([[1, 2], [1, 2]]).rref() == (Matrix([[1, 2], [0, 0]]), (0,)) + raises(ValueError, lambda: Matrix([[1, 2], [1, 2]]).inv()) + m = Matrix([ + [-1, -1, 0], + [ x, 1, 1], + [ 1, x, -1], + ]) + assert len(m.rref()[1]) != m.rows + # in addition, unless simplify=True in the call to rref, the identity + # matrix will be returned even though m is not invertible + assert m.rref()[0] != eye(3) + assert m.rref(simplify=signsimp)[0] != eye(3) + raises(ValueError, lambda: m.inv(method="ADJ")) + raises(ValueError, lambda: m.inv(method="GE")) + raises(ValueError, lambda: m.inv(method="LU")) + + +def test_issue_3959(): + x, y = symbols('x, y') + e = x*y + assert e.subs(x, Matrix([3, 5, 3])) == Matrix([3, 5, 3])*y + + +def test_issue_5964(): + assert str(Matrix([[1, 2], [3, 4]])) == 'Matrix([[1, 2], [3, 4]])' + + +def test_issue_7604(): + x, y = symbols("x y") + assert sstr(Matrix([[x, 2*y], [y**2, x + 3]])) == \ + 'Matrix([\n[ x, 2*y],\n[y**2, x + 3]])' + + +def test_is_Identity(): + assert eye(3).is_Identity + assert eye(3).as_immutable().is_Identity + assert not zeros(3).is_Identity + assert not ones(3).is_Identity + # issue 6242 + assert not Matrix([[1, 0, 0]]).is_Identity + # issue 8854 + assert SparseMatrix(3,3, {(0,0):1, (1,1):1, (2,2):1}).is_Identity + assert not SparseMatrix(2,3, range(6)).is_Identity + assert not SparseMatrix(3,3, {(0,0):1, (1,1):1}).is_Identity + assert not SparseMatrix(3,3, {(0,0):1, (1,1):1, (2,2):1, (0,1):2, (0,2):3}).is_Identity + + +def test_dot(): + assert ones(1, 3).dot(ones(3, 1)) == 3 + assert ones(1, 3).dot([1, 1, 1]) == 3 + assert Matrix([1, 2, 3]).dot(Matrix([1, 2, 3])) == 14 + assert Matrix([1, 2, 3*I]).dot(Matrix([I, 2, 3*I])) == -5 + I + assert Matrix([1, 2, 3*I]).dot(Matrix([I, 2, 3*I]), hermitian=False) == -5 + I + assert Matrix([1, 2, 3*I]).dot(Matrix([I, 2, 3*I]), hermitian=True) == 13 + I + assert Matrix([1, 2, 3*I]).dot(Matrix([I, 2, 3*I]), hermitian=True, conjugate_convention="physics") == 13 - I + assert Matrix([1, 2, 3*I]).dot(Matrix([4, 5*I, 6]), hermitian=True, conjugate_convention="right") == 4 + 8*I + assert Matrix([1, 2, 3*I]).dot(Matrix([4, 5*I, 6]), hermitian=True, conjugate_convention="left") == 4 - 8*I + assert Matrix([I, 2*I]).dot(Matrix([I, 2*I]), hermitian=False, conjugate_convention="left") == -5 + assert Matrix([I, 2*I]).dot(Matrix([I, 2*I]), conjugate_convention="left") == 5 + raises(ValueError, lambda: Matrix([1, 2]).dot(Matrix([3, 4]), hermitian=True, conjugate_convention="test")) + + +def test_dual(): + B_x, B_y, B_z, E_x, E_y, E_z = symbols( + 'B_x B_y B_z E_x E_y E_z', real=True) + F = Matrix(( + ( 0, E_x, E_y, E_z), + (-E_x, 0, B_z, -B_y), + (-E_y, -B_z, 0, B_x), + (-E_z, B_y, -B_x, 0) + )) + Fd = Matrix(( + ( 0, -B_x, -B_y, -B_z), + (B_x, 0, E_z, -E_y), + (B_y, -E_z, 0, E_x), + (B_z, E_y, -E_x, 0) + )) + assert F.dual().equals(Fd) + assert eye(3).dual().equals(zeros(3)) + assert F.dual().dual().equals(-F) + + +def test_anti_symmetric(): + assert Matrix([1, 2]).is_anti_symmetric() is False + m = Matrix(3, 3, [0, x**2 + 2*x + 1, y, -(x + 1)**2, 0, x*y, -y, -x*y, 0]) + assert m.is_anti_symmetric() is True + assert m.is_anti_symmetric(simplify=False) is None + assert m.is_anti_symmetric(simplify=lambda x: x) is None + + # tweak to fail + m[2, 1] = -m[2, 1] + assert m.is_anti_symmetric() is None + # untweak + m[2, 1] = -m[2, 1] + + m = m.expand() + assert m.is_anti_symmetric(simplify=False) is True + m[0, 0] = 1 + assert m.is_anti_symmetric() is False + + +def test_normalize_sort_diogonalization(): + A = Matrix(((1, 2), (2, 1))) + P, Q = A.diagonalize(normalize=True) + assert P*P.T == P.T*P == eye(P.cols) + P, Q = A.diagonalize(normalize=True, sort=True) + assert P*P.T == P.T*P == eye(P.cols) + assert P*Q*P.inv() == A + + +def test_issue_5321(): + raises(ValueError, lambda: Matrix([[1, 2, 3], Matrix(0, 1, [])])) + + +def test_issue_5320(): + assert Matrix.hstack(eye(2), 2*eye(2)) == Matrix([ + [1, 0, 2, 0], + [0, 1, 0, 2] + ]) + assert Matrix.vstack(eye(2), 2*eye(2)) == Matrix([ + [1, 0], + [0, 1], + [2, 0], + [0, 2] + ]) + cls = SparseMatrix + assert cls.hstack(cls(eye(2)), cls(2*eye(2))) == Matrix([ + [1, 0, 2, 0], + [0, 1, 0, 2] + ]) + + +def test_issue_11944(): + A = Matrix([[1]]) + AIm = sympify(A) + assert Matrix.hstack(AIm, A) == Matrix([[1, 1]]) + assert Matrix.vstack(AIm, A) == Matrix([[1], [1]]) + + +def test_cross(): + a = [1, 2, 3] + b = [3, 4, 5] + col = Matrix([-2, 4, -2]) + row = col.T + + def test(M, ans): + assert ans == M + assert type(M) == cls + for cls in all_classes: + A = cls(a) + B = cls(b) + test(A.cross(B), col) + test(A.cross(B.T), col) + test(A.T.cross(B.T), row) + test(A.T.cross(B), row) + raises(ShapeError, lambda: + Matrix(1, 2, [1, 1]).cross(Matrix(1, 2, [1, 1]))) + + +def test_hat_vee(): + v1 = Matrix([x, y, z]) + v2 = Matrix([a, b, c]) + assert v1.hat() * v2 == v1.cross(v2) + assert v1.hat().is_anti_symmetric() + assert v1.hat().vee() == v1 + + +def test_hash(): + for cls in immutable_classes: + s = {cls.eye(1), cls.eye(1)} + assert len(s) == 1 and s.pop() == cls.eye(1) + # issue 3979 + for cls in mutable_classes: + assert not isinstance(cls.eye(1), Hashable) + + +def test_adjoint(): + dat = [[0, I], [1, 0]] + ans = Matrix([[0, 1], [-I, 0]]) + for cls in all_classes: + assert ans == cls(dat).adjoint() + + +def test_atoms(): + m = Matrix([[1, 2], [x, 1 - 1/x]]) + assert m.atoms() == {S.One,S(2),S.NegativeOne, x} + assert m.atoms(Symbol) == {x} + + +def test_pinv(): + # Pseudoinverse of an invertible matrix is the inverse. + A1 = Matrix([[a, b], [c, d]]) + assert simplify(A1.pinv(method="RD")) == simplify(A1.inv()) + + # Test the four properties of the pseudoinverse for various matrices. + As = [Matrix([[13, 104], [2212, 3], [-3, 5]]), + Matrix([[1, 7, 9], [11, 17, 19]]), + Matrix([a, b])] + + for A in As: + A_pinv = A.pinv(method="RD") + AAp = A * A_pinv + ApA = A_pinv * A + assert simplify(AAp * A) == A + assert simplify(ApA * A_pinv) == A_pinv + assert AAp.H == AAp + assert ApA.H == ApA + + # XXX Pinv with diagonalization makes expression too complicated. + for A in As: + A_pinv = simplify(A.pinv(method="ED")) + AAp = A * A_pinv + ApA = A_pinv * A + assert simplify(AAp * A) == A + assert simplify(ApA * A_pinv) == A_pinv + assert AAp.H == AAp + assert ApA.H == ApA + + # XXX Computing pinv using diagonalization makes an expression that + # is too complicated to simplify. + # A1 = Matrix([[a, b], [c, d]]) + # assert simplify(A1.pinv(method="ED")) == simplify(A1.inv()) + # so this is tested numerically at a fixed random point + + from sympy.core.numbers import comp + q = A1.pinv(method="ED") + w = A1.inv() + reps = {a: -73633, b: 11362, c: 55486, d: 62570} + assert all( + comp(i.n(), j.n()) + for i, j in zip(q.subs(reps), w.subs(reps)) + ) + + +@slow +def test_pinv_rank_deficient_when_diagonalization_fails(): + # Test the four properties of the pseudoinverse for matrices when + # diagonalization of A.H*A fails. + As = [ + Matrix([ + [61, 89, 55, 20, 71, 0], + [62, 96, 85, 85, 16, 0], + [69, 56, 17, 4, 54, 0], + [10, 54, 91, 41, 71, 0], + [ 7, 30, 10, 48, 90, 0], + [0, 0, 0, 0, 0, 0]]) + ] + for A in As: + A_pinv = A.pinv(method="ED") + AAp = A * A_pinv + ApA = A_pinv * A + assert AAp.H == AAp + + # Here ApA.H and ApA are equivalent expressions but they are very + # complicated expressions involving RootOfs. Using simplify would be + # too slow and so would evalf so we substitute approximate values for + # the RootOfs and then evalf which is less accurate but good enough to + # confirm that these two matrices are equivalent. + # + # assert ApA.H == ApA # <--- would fail (structural equality) + # assert simplify(ApA.H - ApA).is_zero_matrix # <--- too slow + # (ApA.H - ApA).evalf() # <--- too slow + + def allclose(M1, M2): + rootofs = M1.atoms(RootOf) + rootofs_approx = {r: r.evalf() for r in rootofs} + diff_approx = (M1 - M2).xreplace(rootofs_approx).evalf() + return all(abs(e) < 1e-10 for e in diff_approx) + + assert allclose(ApA.H, ApA) + + +def test_issue_7201(): + assert ones(0, 1) + ones(0, 1) == Matrix(0, 1, []) + assert ones(1, 0) + ones(1, 0) == Matrix(1, 0, []) + + +def test_free_symbols(): + for M in ImmutableMatrix, ImmutableSparseMatrix, Matrix, SparseMatrix: + assert M([[x], [0]]).free_symbols == {x} + + +def test_from_ndarray(): + """See issue 7465.""" + try: + from numpy import array + except ImportError: + skip('NumPy must be available to test creating matrices from ndarrays') + + assert Matrix(array([1, 2, 3])) == Matrix([1, 2, 3]) + assert Matrix(array([[1, 2, 3]])) == Matrix([[1, 2, 3]]) + assert Matrix(array([[1, 2, 3], [4, 5, 6]])) == \ + Matrix([[1, 2, 3], [4, 5, 6]]) + assert Matrix(array([x, y, z])) == Matrix([x, y, z]) + raises(NotImplementedError, + lambda: Matrix(array([[[1, 2], [3, 4]], [[5, 6], [7, 8]]]))) + assert Matrix([array([1, 2]), array([3, 4])]) == Matrix([[1, 2], [3, 4]]) + assert Matrix([array([1, 2]), [3, 4]]) == Matrix([[1, 2], [3, 4]]) + assert Matrix([array([]), array([])]) == Matrix(2, 0, []) != Matrix([]) + + +def test_17522_numpy(): + from sympy.matrices.common import _matrixify + try: + from numpy import array, matrix + except ImportError: + skip('NumPy must be available to test indexing matrixified NumPy ndarrays and matrices') + + m = _matrixify(array([[1, 2], [3, 4]])) + assert m[3] == 4 + assert list(m) == [1, 2, 3, 4] + + with ignore_warnings(PendingDeprecationWarning): + m = _matrixify(matrix([[1, 2], [3, 4]])) + assert m[3] == 4 + assert list(m) == [1, 2, 3, 4] + + +def test_17522_mpmath(): + from sympy.matrices.common import _matrixify + try: + from mpmath import matrix + except ImportError: + skip('mpmath must be available to test indexing matrixified mpmath matrices') + + m = _matrixify(matrix([[1, 2], [3, 4]])) + assert m[3] == 4.0 + assert list(m) == [1.0, 2.0, 3.0, 4.0] + + +def test_17522_scipy(): + from sympy.matrices.common import _matrixify + try: + from scipy.sparse import csr_matrix + except ImportError: + skip('SciPy must be available to test indexing matrixified SciPy sparse matrices') + + m = _matrixify(csr_matrix([[1, 2], [3, 4]])) + assert m[3] == 4 + assert list(m) == [1, 2, 3, 4] + + +def test_hermitian(): + a = Matrix([[1, I], [-I, 1]]) + assert a.is_hermitian + a[0, 0] = 2*I + assert a.is_hermitian is False + a[0, 0] = x + assert a.is_hermitian is None + a[0, 1] = a[1, 0]*I + assert a.is_hermitian is False + + +def test_issue_9457_9467_9876(): + # for row_del(index) + M = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + M.row_del(1) + assert M == Matrix([[1, 2, 3], [3, 4, 5]]) + N = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + N.row_del(-2) + assert N == Matrix([[1, 2, 3], [3, 4, 5]]) + O = Matrix([[1, 2, 3], [5, 6, 7], [9, 10, 11]]) + O.row_del(-1) + assert O == Matrix([[1, 2, 3], [5, 6, 7]]) + P = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + raises(IndexError, lambda: P.row_del(10)) + Q = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + raises(IndexError, lambda: Q.row_del(-10)) + + # for col_del(index) + M = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + M.col_del(1) + assert M == Matrix([[1, 3], [2, 4], [3, 5]]) + N = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + N.col_del(-2) + assert N == Matrix([[1, 3], [2, 4], [3, 5]]) + P = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + raises(IndexError, lambda: P.col_del(10)) + Q = Matrix([[1, 2, 3], [2, 3, 4], [3, 4, 5]]) + raises(IndexError, lambda: Q.col_del(-10)) + + +def test_issue_9422(): + x, y = symbols('x y', commutative=False) + a, b = symbols('a b') + M = eye(2) + M1 = Matrix(2, 2, [x, y, y, z]) + assert y*x*M != x*y*M + assert b*a*M == a*b*M + assert x*M1 != M1*x + assert a*M1 == M1*a + assert y*x*M == Matrix([[y*x, 0], [0, y*x]]) + + +def test_issue_10770(): + M = Matrix([]) + a = ['col_insert', 'row_join'], Matrix([9, 6, 3]) + b = ['row_insert', 'col_join'], a[1].T + c = ['row_insert', 'col_insert'], Matrix([[1, 2], [3, 4]]) + for ops, m in (a, b, c): + for op in ops: + f = getattr(M, op) + new = f(m) if 'join' in op else f(42, m) + assert new == m and id(new) != id(m) + + +def test_issue_10658(): + A = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + assert A.extract([0, 1, 2], [True, True, False]) == \ + Matrix([[1, 2], [4, 5], [7, 8]]) + assert A.extract([0, 1, 2], [True, False, False]) == Matrix([[1], [4], [7]]) + assert A.extract([True, False, False], [0, 1, 2]) == Matrix([[1, 2, 3]]) + assert A.extract([True, False, True], [0, 1, 2]) == \ + Matrix([[1, 2, 3], [7, 8, 9]]) + assert A.extract([0, 1, 2], [False, False, False]) == Matrix(3, 0, []) + assert A.extract([False, False, False], [0, 1, 2]) == Matrix(0, 3, []) + assert A.extract([True, False, True], [False, True, False]) == \ + Matrix([[2], [8]]) + + +def test_opportunistic_simplification(): + # this test relates to issue #10718, #9480, #11434 + + # issue #9480 + m = Matrix([[-5 + 5*sqrt(2), -5], [-5*sqrt(2)/2 + 5, -5*sqrt(2)/2]]) + assert m.rank() == 1 + + # issue #10781 + m = Matrix([[3+3*sqrt(3)*I, -9],[4,-3+3*sqrt(3)*I]]) + assert simplify(m.rref()[0] - Matrix([[1, -9/(3 + 3*sqrt(3)*I)], [0, 0]])) == zeros(2, 2) + + # issue #11434 + ax,ay,bx,by,cx,cy,dx,dy,ex,ey,t0,t1 = symbols('a_x a_y b_x b_y c_x c_y d_x d_y e_x e_y t_0 t_1') + m = Matrix([[ax,ay,ax*t0,ay*t0,0],[bx,by,bx*t0,by*t0,0],[cx,cy,cx*t0,cy*t0,1],[dx,dy,dx*t0,dy*t0,1],[ex,ey,2*ex*t1-ex*t0,2*ey*t1-ey*t0,0]]) + assert m.rank() == 4 + + +def test_partial_pivoting(): + # example from https://en.wikipedia.org/wiki/Pivot_element + # partial pivoting with back substitution gives a perfect result + # naive pivoting give an error ~1e-13, so anything better than + # 1e-15 is good + mm=Matrix([[0.003, 59.14, 59.17], [5.291, -6.13, 46.78]]) + assert (mm.rref()[0] - Matrix([[1.0, 0, 10.0], + [ 0, 1.0, 1.0]])).norm() < 1e-15 + + # issue #11549 + m_mixed = Matrix([[6e-17, 1.0, 4], + [ -1.0, 0, 8], + [ 0, 0, 1]]) + m_float = Matrix([[6e-17, 1.0, 4.], + [ -1.0, 0., 8.], + [ 0., 0., 1.]]) + m_inv = Matrix([[ 0, -1.0, 8.0], + [1.0, 6.0e-17, -4.0], + [ 0, 0, 1]]) + # this example is numerically unstable and involves a matrix with a norm >= 8, + # this comparing the difference of the results with 1e-15 is numerically sound. + assert (m_mixed.inv() - m_inv).norm() < 1e-15 + assert (m_float.inv() - m_inv).norm() < 1e-15 + + +def test_iszero_substitution(): + """ When doing numerical computations, all elements that pass + the iszerofunc test should be set to numerically zero if they + aren't already. """ + + # Matrix from issue #9060 + m = Matrix([[0.9, -0.1, -0.2, 0],[-0.8, 0.9, -0.4, 0],[-0.1, -0.8, 0.6, 0]]) + m_rref = m.rref(iszerofunc=lambda x: abs(x)<6e-15)[0] + m_correct = Matrix([[1.0, 0, -0.301369863013699, 0],[ 0, 1.0, -0.712328767123288, 0],[ 0, 0, 0, 0]]) + m_diff = m_rref - m_correct + assert m_diff.norm() < 1e-15 + # if a zero-substitution wasn't made, this entry will be -1.11022302462516e-16 + assert m_rref[2,2] == 0 + + +def test_issue_11238(): + from sympy.geometry.point import Point + xx = 8*tan(pi*Rational(13, 45))/(tan(pi*Rational(13, 45)) + sqrt(3)) + yy = (-8*sqrt(3)*tan(pi*Rational(13, 45))**2 + 24*tan(pi*Rational(13, 45)))/(-3 + tan(pi*Rational(13, 45))**2) + p1 = Point(0, 0) + p2 = Point(1, -sqrt(3)) + p0 = Point(xx,yy) + m1 = Matrix([p1 - simplify(p0), p2 - simplify(p0)]) + m2 = Matrix([p1 - p0, p2 - p0]) + m3 = Matrix([simplify(p1 - p0), simplify(p2 - p0)]) + + # This system has expressions which are zero and + # cannot be easily proved to be such, so without + # numerical testing, these assertions will fail. + Z = lambda x: abs(x.n()) < 1e-20 + assert m1.rank(simplify=True, iszerofunc=Z) == 1 + assert m2.rank(simplify=True, iszerofunc=Z) == 1 + assert m3.rank(simplify=True, iszerofunc=Z) == 1 + + +def test_as_real_imag(): + m1 = Matrix(2,2,[1,2,3,4]) + m2 = m1*S.ImaginaryUnit + m3 = m1 + m2 + + for kls in all_classes: + a,b = kls(m3).as_real_imag() + assert list(a) == list(m1) + assert list(b) == list(m1) + + +def test_deprecated(): + # Maintain tests for deprecated functions. We must capture + # the deprecation warnings. When the deprecated functionality is + # removed, the corresponding tests should be removed. + + m = Matrix(3, 3, [0, 1, 0, -4, 4, 0, -2, 1, 2]) + P, Jcells = m.jordan_cells() + assert Jcells[1] == Matrix(1, 1, [2]) + assert Jcells[0] == Matrix(2, 2, [2, 1, 0, 2]) + + +def test_issue_14489(): + from sympy.core.mod import Mod + A = Matrix([-1, 1, 2]) + B = Matrix([10, 20, -15]) + + assert Mod(A, 3) == Matrix([2, 1, 2]) + assert Mod(B, 4) == Matrix([2, 0, 1]) + + +def test_issue_14943(): + # Test that __array__ accepts the optional dtype argument + try: + from numpy import array + except ImportError: + skip('NumPy must be available to test creating matrices from ndarrays') + + M = Matrix([[1,2], [3,4]]) + assert array(M, dtype=float).dtype.name == 'float64' + + +def test_case_6913(): + m = MatrixSymbol('m', 1, 1) + a = Symbol("a") + a = m[0, 0]>0 + assert str(a) == 'm[0, 0] > 0' + + +def test_issue_11948(): + A = MatrixSymbol('A', 3, 3) + a = Wild('a') + assert A.match(a) == {a: A} + + +def test_gramschmidt_conjugate_dot(): + vecs = [Matrix([1, I]), Matrix([1, -I])] + assert Matrix.orthogonalize(*vecs) == \ + [Matrix([[1], [I]]), Matrix([[1], [-I]])] + + vecs = [Matrix([1, I, 0]), Matrix([I, 0, -I])] + assert Matrix.orthogonalize(*vecs) == \ + [Matrix([[1], [I], [0]]), Matrix([[I/2], [S(1)/2], [-I]])] + + mat = Matrix([[1, I], [1, -I]]) + Q, R = mat.QRdecomposition() + assert Q * Q.H == Matrix.eye(2) + + +def test_issue_8207(): + a = Matrix(MatrixSymbol('a', 3, 1)) + b = Matrix(MatrixSymbol('b', 3, 1)) + c = a.dot(b) + d = diff(c, a[0, 0]) + e = diff(d, a[0, 0]) + assert d == b[0, 0] + assert e == 0 + + +def test_func(): + from sympy.simplify.simplify import nthroot + + A = Matrix([[1, 2],[0, 3]]) + assert A.analytic_func(sin(x*t), x) == Matrix([[sin(t), sin(3*t) - sin(t)], [0, sin(3*t)]]) + + A = Matrix([[2, 1],[1, 2]]) + assert (pi * A / 6).analytic_func(cos(x), x) == Matrix([[sqrt(3)/4, -sqrt(3)/4], [-sqrt(3)/4, sqrt(3)/4]]) + + + raises(ValueError, lambda : zeros(5).analytic_func(log(x), x)) + raises(ValueError, lambda : (A*x).analytic_func(log(x), x)) + + A = Matrix([[0, -1, -2, 3], [0, -1, -2, 3], [0, 1, 0, -1], [0, 0, -1, 1]]) + assert A.analytic_func(exp(x), x) == A.exp() + raises(ValueError, lambda : A.analytic_func(sqrt(x), x)) + + A = Matrix([[41, 12],[12, 34]]) + assert simplify(A.analytic_func(sqrt(x), x)**2) == A + + A = Matrix([[3, -12, 4], [-1, 0, -2], [-1, 5, -1]]) + assert simplify(A.analytic_func(nthroot(x, 3), x)**3) == A + + A = Matrix([[2, 0, 0, 0], [1, 2, 0, 0], [0, 1, 3, 0], [0, 0, 1, 3]]) + assert A.analytic_func(exp(x), x) == A.exp() + + A = Matrix([[0, 2, 1, 6], [0, 0, 1, 2], [0, 0, 0, 3], [0, 0, 0, 0]]) + assert A.analytic_func(exp(x*t), x) == expand(simplify((A*t).exp())) + + +@skip_under_pyodide("Cannot create threads under pyodide.") +def test_issue_19809(): + + def f(): + assert _dotprodsimp_state.state == None + m = Matrix([[1]]) + m = m * m + return True + + with dotprodsimp(True): + with concurrent.futures.ThreadPoolExecutor() as executor: + future = executor.submit(f) + assert future.result() + + +def test_issue_23276(): + M = Matrix([x, y]) + assert integrate(M, (x, 0, 1), (y, 0, 1)) == Matrix([ + [S.Half], + [S.Half]]) + + +def test_issue_27225(): + # https://github.com/sympy/sympy/issues/27225 + raises(TypeError, lambda : floor(Matrix([1, 1, 0]))) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_normalforms.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_normalforms.py new file mode 100644 index 0000000000000000000000000000000000000000..47ee52d73539f7fb79295443e1cf7e0a49e30a5e --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_normalforms.py @@ -0,0 +1,111 @@ +from sympy.testing.pytest import warns_deprecated_sympy + +from sympy.core.symbol import Symbol +from sympy.polys.polytools import Poly +from sympy.matrices import Matrix, randMatrix +from sympy.matrices.normalforms import ( + invariant_factors, + smith_normal_form, + smith_normal_decomp, + hermite_normal_form, + is_smith_normal_form, +) +from sympy.polys.domains import ZZ, QQ +from sympy.core.numbers import Integer + +import random + + +def test_smith_normal(): + m = Matrix([[12,6,4,8],[3,9,6,12],[2,16,14,28],[20,10,10,20]]) + smf = Matrix([[1, 0, 0, 0], [0, 10, 0, 0], [0, 0, 30, 0], [0, 0, 0, 0]]) + assert smith_normal_form(m) == smf + + a, s, t = smith_normal_decomp(m) + assert a == s * m * t + + x = Symbol('x') + with warns_deprecated_sympy(): + m = Matrix([[Poly(x-1), Poly(1, x),Poly(-1,x)], + [0, Poly(x), Poly(-1,x)], + [Poly(0,x),Poly(-1,x),Poly(x)]]) + invs = 1, x - 1, x**2 - 1 + assert invariant_factors(m, domain=QQ[x]) == invs + + m = Matrix([[2, 4]]) + smf = Matrix([[2, 0]]) + assert smith_normal_form(m) == smf + + prng = random.Random(0) + for i in range(6): + for j in range(6): + for _ in range(10 if i*j else 1): + m = randMatrix(i, j, max=5, percent=50, prng=prng) + a, s, t = smith_normal_decomp(m) + assert a == s * m * t + assert is_smith_normal_form(a) + s.inv().to_DM(ZZ) + t.inv().to_DM(ZZ) + + a, s, t = smith_normal_decomp(m, QQ) + assert a == s * m * t + assert is_smith_normal_form(a) + s.inv() + t.inv() + + +def test_smith_normal_deprecated(): + from sympy.polys.solvers import RawMatrix as Matrix + + with warns_deprecated_sympy(): + m = Matrix([[12, 6, 4,8],[3,9,6,12],[2,16,14,28],[20,10,10,20]]) + setattr(m, 'ring', ZZ) + with warns_deprecated_sympy(): + smf = Matrix([[1, 0, 0, 0], [0, 10, 0, 0], [0, 0, 30, 0], [0, 0, 0, 0]]) + assert smith_normal_form(m) == smf + + x = Symbol('x') + with warns_deprecated_sympy(): + m = Matrix([[Poly(x-1), Poly(1, x),Poly(-1,x)], + [0, Poly(x), Poly(-1,x)], + [Poly(0,x),Poly(-1,x),Poly(x)]]) + setattr(m, 'ring', QQ[x]) + invs = (Poly(1, x, domain='QQ'), Poly(x - 1, domain='QQ'), Poly(x**2 - 1, domain='QQ')) + assert invariant_factors(m) == invs + + with warns_deprecated_sympy(): + m = Matrix([[2, 4]]) + setattr(m, 'ring', ZZ) + with warns_deprecated_sympy(): + smf = Matrix([[2, 0]]) + assert smith_normal_form(m) == smf + + +def test_hermite_normal(): + m = Matrix([[2, 7, 17, 29, 41], [3, 11, 19, 31, 43], [5, 13, 23, 37, 47]]) + hnf = Matrix([[1, 0, 0], [0, 2, 1], [0, 0, 1]]) + assert hermite_normal_form(m) == hnf + + tr_hnf = Matrix([[37, 0, 19], [222, -6, 113], [48, 0, 25], [0, 2, 1], [0, 0, 1]]) + assert hermite_normal_form(m.transpose()) == tr_hnf + + m = Matrix([[8, 28, 68, 116, 164], [3, 11, 19, 31, 43], [5, 13, 23, 37, 47]]) + hnf = Matrix([[4, 0, 0], [0, 2, 1], [0, 0, 1]]) + assert hermite_normal_form(m) == hnf + assert hermite_normal_form(m, D=8) == hnf + assert hermite_normal_form(m, D=ZZ(8)) == hnf + assert hermite_normal_form(m, D=Integer(8)) == hnf + + m = Matrix([[10, 8, 6, 30, 2], [45, 36, 27, 18, 9], [5, 4, 3, 2, 1]]) + hnf = Matrix([[26, 2], [0, 9], [0, 1]]) + assert hermite_normal_form(m) == hnf + + m = Matrix([[2, 7], [0, 0], [0, 0]]) + hnf = Matrix([[1], [0], [0]]) + assert hermite_normal_form(m) == hnf + + +def test_issue_23410(): + A = Matrix([[1, 12], [0, 8], [0, 5]]) + H = Matrix([[1, 0], [0, 8], [0, 5]]) + assert hermite_normal_form(A) == H diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_reductions.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_reductions.py new file mode 100644 index 0000000000000000000000000000000000000000..32c98c6f249b1afafc8193f4248dc9493bb803e0 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_reductions.py @@ -0,0 +1,351 @@ +from sympy.core.numbers import I +from sympy.core.symbol import symbols +from sympy.testing.pytest import raises +from sympy.matrices import Matrix, zeros, eye +from sympy.core.symbol import Symbol +from sympy.core.numbers import Rational +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.simplify.simplify import simplify +from sympy.abc import x + + +# Matrix tests +def test_row_op(): + e = eye(3) + + raises(ValueError, lambda: e.elementary_row_op("abc")) + raises(ValueError, lambda: e.elementary_row_op()) + raises(ValueError, lambda: e.elementary_row_op('n->kn', row=5, k=5)) + raises(ValueError, lambda: e.elementary_row_op('n->kn', row=-5, k=5)) + raises(ValueError, lambda: e.elementary_row_op('n<->m', row1=1, row2=5)) + raises(ValueError, lambda: e.elementary_row_op('n<->m', row1=5, row2=1)) + raises(ValueError, lambda: e.elementary_row_op('n<->m', row1=-5, row2=1)) + raises(ValueError, lambda: e.elementary_row_op('n<->m', row1=1, row2=-5)) + raises(ValueError, lambda: e.elementary_row_op('n->n+km', row1=1, row2=5, k=5)) + raises(ValueError, lambda: e.elementary_row_op('n->n+km', row1=5, row2=1, k=5)) + raises(ValueError, lambda: e.elementary_row_op('n->n+km', row1=-5, row2=1, k=5)) + raises(ValueError, lambda: e.elementary_row_op('n->n+km', row1=1, row2=-5, k=5)) + raises(ValueError, lambda: e.elementary_row_op('n->n+km', row1=1, row2=1, k=5)) + + # test various ways to set arguments + assert e.elementary_row_op("n->kn", 0, 5) == Matrix([[5, 0, 0], [0, 1, 0], [0, 0, 1]]) + assert e.elementary_row_op("n->kn", 1, 5) == Matrix([[1, 0, 0], [0, 5, 0], [0, 0, 1]]) + assert e.elementary_row_op("n->kn", row=1, k=5) == Matrix([[1, 0, 0], [0, 5, 0], [0, 0, 1]]) + assert e.elementary_row_op("n->kn", row1=1, k=5) == Matrix([[1, 0, 0], [0, 5, 0], [0, 0, 1]]) + assert e.elementary_row_op("n<->m", 0, 1) == Matrix([[0, 1, 0], [1, 0, 0], [0, 0, 1]]) + assert e.elementary_row_op("n<->m", row1=0, row2=1) == Matrix([[0, 1, 0], [1, 0, 0], [0, 0, 1]]) + assert e.elementary_row_op("n<->m", row=0, row2=1) == Matrix([[0, 1, 0], [1, 0, 0], [0, 0, 1]]) + assert e.elementary_row_op("n->n+km", 0, 5, 1) == Matrix([[1, 5, 0], [0, 1, 0], [0, 0, 1]]) + assert e.elementary_row_op("n->n+km", row=0, k=5, row2=1) == Matrix([[1, 5, 0], [0, 1, 0], [0, 0, 1]]) + assert e.elementary_row_op("n->n+km", row1=0, k=5, row2=1) == Matrix([[1, 5, 0], [0, 1, 0], [0, 0, 1]]) + + # make sure the matrix doesn't change size + a = Matrix(2, 3, [0]*6) + assert a.elementary_row_op("n->kn", 1, 5) == Matrix(2, 3, [0]*6) + assert a.elementary_row_op("n<->m", 0, 1) == Matrix(2, 3, [0]*6) + assert a.elementary_row_op("n->n+km", 0, 5, 1) == Matrix(2, 3, [0]*6) + + +def test_col_op(): + e = eye(3) + + raises(ValueError, lambda: e.elementary_col_op("abc")) + raises(ValueError, lambda: e.elementary_col_op()) + raises(ValueError, lambda: e.elementary_col_op('n->kn', col=5, k=5)) + raises(ValueError, lambda: e.elementary_col_op('n->kn', col=-5, k=5)) + raises(ValueError, lambda: e.elementary_col_op('n<->m', col1=1, col2=5)) + raises(ValueError, lambda: e.elementary_col_op('n<->m', col1=5, col2=1)) + raises(ValueError, lambda: e.elementary_col_op('n<->m', col1=-5, col2=1)) + raises(ValueError, lambda: e.elementary_col_op('n<->m', col1=1, col2=-5)) + raises(ValueError, lambda: e.elementary_col_op('n->n+km', col1=1, col2=5, k=5)) + raises(ValueError, lambda: e.elementary_col_op('n->n+km', col1=5, col2=1, k=5)) + raises(ValueError, lambda: e.elementary_col_op('n->n+km', col1=-5, col2=1, k=5)) + raises(ValueError, lambda: e.elementary_col_op('n->n+km', col1=1, col2=-5, k=5)) + raises(ValueError, lambda: e.elementary_col_op('n->n+km', col1=1, col2=1, k=5)) + + # test various ways to set arguments + assert e.elementary_col_op("n->kn", 0, 5) == Matrix([[5, 0, 0], [0, 1, 0], [0, 0, 1]]) + assert e.elementary_col_op("n->kn", 1, 5) == Matrix([[1, 0, 0], [0, 5, 0], [0, 0, 1]]) + assert e.elementary_col_op("n->kn", col=1, k=5) == Matrix([[1, 0, 0], [0, 5, 0], [0, 0, 1]]) + assert e.elementary_col_op("n->kn", col1=1, k=5) == Matrix([[1, 0, 0], [0, 5, 0], [0, 0, 1]]) + assert e.elementary_col_op("n<->m", 0, 1) == Matrix([[0, 1, 0], [1, 0, 0], [0, 0, 1]]) + assert e.elementary_col_op("n<->m", col1=0, col2=1) == Matrix([[0, 1, 0], [1, 0, 0], [0, 0, 1]]) + assert e.elementary_col_op("n<->m", col=0, col2=1) == Matrix([[0, 1, 0], [1, 0, 0], [0, 0, 1]]) + assert e.elementary_col_op("n->n+km", 0, 5, 1) == Matrix([[1, 0, 0], [5, 1, 0], [0, 0, 1]]) + assert e.elementary_col_op("n->n+km", col=0, k=5, col2=1) == Matrix([[1, 0, 0], [5, 1, 0], [0, 0, 1]]) + assert e.elementary_col_op("n->n+km", col1=0, k=5, col2=1) == Matrix([[1, 0, 0], [5, 1, 0], [0, 0, 1]]) + + # make sure the matrix doesn't change size + a = Matrix(2, 3, [0]*6) + assert a.elementary_col_op("n->kn", 1, 5) == Matrix(2, 3, [0]*6) + assert a.elementary_col_op("n<->m", 0, 1) == Matrix(2, 3, [0]*6) + assert a.elementary_col_op("n->n+km", 0, 5, 1) == Matrix(2, 3, [0]*6) + + +def test_is_echelon(): + zro = zeros(3) + ident = eye(3) + + assert zro.is_echelon + assert ident.is_echelon + + a = Matrix(0, 0, []) + assert a.is_echelon + + a = Matrix(2, 3, [3, 2, 1, 0, 0, 6]) + assert a.is_echelon + + a = Matrix(2, 3, [0, 0, 6, 3, 2, 1]) + assert not a.is_echelon + + x = Symbol('x') + a = Matrix(3, 1, [x, 0, 0]) + assert a.is_echelon + + a = Matrix(3, 1, [x, x, 0]) + assert not a.is_echelon + + a = Matrix(3, 3, [0, 0, 0, 1, 2, 3, 0, 0, 0]) + assert not a.is_echelon + + +def test_echelon_form(): + # echelon form is not unique, but the result + # must be row-equivalent to the original matrix + # and it must be in echelon form. + + a = zeros(3) + e = eye(3) + + # we can assume the zero matrix and the identity matrix shouldn't change + assert a.echelon_form() == a + assert e.echelon_form() == e + + a = Matrix(0, 0, []) + assert a.echelon_form() == a + + a = Matrix(1, 1, [5]) + assert a.echelon_form() == a + + # now we get to the real tests + + def verify_row_null_space(mat, rows, nulls): + for v in nulls: + assert all(t.is_zero for t in a_echelon*v) + for v in rows: + if not all(t.is_zero for t in v): + assert not all(t.is_zero for t in a_echelon*v.transpose()) + + a = Matrix(3, 3, [1, 2, 3, 4, 5, 6, 7, 8, 9]) + nulls = [Matrix([ + [ 1], + [-2], + [ 1]])] + rows = [a[i, :] for i in range(a.rows)] + a_echelon = a.echelon_form() + assert a_echelon.is_echelon + verify_row_null_space(a, rows, nulls) + + + a = Matrix(3, 3, [1, 2, 3, 4, 5, 6, 7, 8, 8]) + nulls = [] + rows = [a[i, :] for i in range(a.rows)] + a_echelon = a.echelon_form() + assert a_echelon.is_echelon + verify_row_null_space(a, rows, nulls) + + a = Matrix(3, 3, [2, 1, 3, 0, 0, 0, 2, 1, 3]) + nulls = [Matrix([ + [Rational(-1, 2)], + [ 1], + [ 0]]), + Matrix([ + [Rational(-3, 2)], + [ 0], + [ 1]])] + rows = [a[i, :] for i in range(a.rows)] + a_echelon = a.echelon_form() + assert a_echelon.is_echelon + verify_row_null_space(a, rows, nulls) + + # this one requires a row swap + a = Matrix(3, 3, [2, 1, 3, 0, 0, 0, 1, 1, 3]) + nulls = [Matrix([ + [ 0], + [ -3], + [ 1]])] + rows = [a[i, :] for i in range(a.rows)] + a_echelon = a.echelon_form() + assert a_echelon.is_echelon + verify_row_null_space(a, rows, nulls) + + a = Matrix(3, 3, [0, 3, 3, 0, 2, 2, 0, 1, 1]) + nulls = [Matrix([ + [1], + [0], + [0]]), + Matrix([ + [ 0], + [-1], + [ 1]])] + rows = [a[i, :] for i in range(a.rows)] + a_echelon = a.echelon_form() + assert a_echelon.is_echelon + verify_row_null_space(a, rows, nulls) + + a = Matrix(2, 3, [2, 2, 3, 3, 3, 0]) + nulls = [Matrix([ + [-1], + [1], + [0]])] + rows = [a[i, :] for i in range(a.rows)] + a_echelon = a.echelon_form() + assert a_echelon.is_echelon + verify_row_null_space(a, rows, nulls) + + +def test_rref(): + e = Matrix(0, 0, []) + assert e.rref(pivots=False) == e + + e = Matrix(1, 1, [1]) + a = Matrix(1, 1, [5]) + assert e.rref(pivots=False) == a.rref(pivots=False) == e + + a = Matrix(3, 1, [1, 2, 3]) + assert a.rref(pivots=False) == Matrix([[1], [0], [0]]) + + a = Matrix(1, 3, [1, 2, 3]) + assert a.rref(pivots=False) == Matrix([[1, 2, 3]]) + + a = Matrix(3, 3, [1, 2, 3, 4, 5, 6, 7, 8, 9]) + assert a.rref(pivots=False) == Matrix([ + [1, 0, -1], + [0, 1, 2], + [0, 0, 0]]) + + a = Matrix(3, 3, [1, 2, 3, 1, 2, 3, 1, 2, 3]) + b = Matrix(3, 3, [1, 2, 3, 0, 0, 0, 0, 0, 0]) + c = Matrix(3, 3, [0, 0, 0, 1, 2, 3, 0, 0, 0]) + d = Matrix(3, 3, [0, 0, 0, 0, 0, 0, 1, 2, 3]) + assert a.rref(pivots=False) == \ + b.rref(pivots=False) == \ + c.rref(pivots=False) == \ + d.rref(pivots=False) == b + + e = eye(3) + z = zeros(3) + assert e.rref(pivots=False) == e + assert z.rref(pivots=False) == z + + a = Matrix([ + [ 0, 0, 1, 2, 2, -5, 3], + [-1, 5, 2, 2, 1, -7, 5], + [ 0, 0, -2, -3, -3, 8, -5], + [-1, 5, 0, -1, -2, 1, 0]]) + mat, pivot_offsets = a.rref() + assert mat == Matrix([ + [1, -5, 0, 0, 1, 1, -1], + [0, 0, 1, 0, 0, -1, 1], + [0, 0, 0, 1, 1, -2, 1], + [0, 0, 0, 0, 0, 0, 0]]) + assert pivot_offsets == (0, 2, 3) + + a = Matrix([[Rational(1, 19), Rational(1, 5), 2, 3], + [ 4, 5, 6, 7], + [ 8, 9, 10, 11], + [ 12, 13, 14, 15]]) + assert a.rref(pivots=False) == Matrix([ + [1, 0, 0, Rational(-76, 157)], + [0, 1, 0, Rational(-5, 157)], + [0, 0, 1, Rational(238, 157)], + [0, 0, 0, 0]]) + + x = Symbol('x') + a = Matrix(2, 3, [x, 1, 1, sqrt(x), x, 1]) + for i, j in zip(a.rref(pivots=False), + [1, 0, sqrt(x)*(-x + 1)/(-x**Rational(5, 2) + x), + 0, 1, 1/(sqrt(x) + x + 1)]): + assert simplify(i - j).is_zero + + +def test_rref_rhs(): + a, b, c, d = symbols('a b c d') + A = Matrix([[0, 0], [0, 0], [1, 2], [3, 4]]) + B = Matrix([a, b, c, d]) + assert A.rref_rhs(B) == (Matrix([ + [1, 0], + [0, 1], + [0, 0], + [0, 0]]), Matrix([ + [ -2*c + d], + [3*c/2 - d/2], + [ a], + [ b]])) + + +def test_issue_17827(): + C = Matrix([ + [3, 4, -1, 1], + [9, 12, -3, 3], + [0, 2, 1, 3], + [2, 3, 0, -2], + [0, 3, 3, -5], + [8, 15, 0, 6] + ]) + # Tests for row/col within valid range + D = C.elementary_row_op('n<->m', row1=2, row2=5) + E = C.elementary_row_op('n->n+km', row1=5, row2=3, k=-4) + F = C.elementary_row_op('n->kn', row=5, k=2) + assert(D[5, :] == Matrix([[0, 2, 1, 3]])) + assert(E[5, :] == Matrix([[0, 3, 0, 14]])) + assert(F[5, :] == Matrix([[16, 30, 0, 12]])) + # Tests for row/col out of range + raises(ValueError, lambda: C.elementary_row_op('n<->m', row1=2, row2=6)) + raises(ValueError, lambda: C.elementary_row_op('n->kn', row=7, k=2)) + raises(ValueError, lambda: C.elementary_row_op('n->n+km', row1=-1, row2=5, k=2)) + +def test_rank(): + m = Matrix([[1, 2], [x, 1 - 1/x]]) + assert m.rank() == 2 + n = Matrix(3, 3, range(1, 10)) + assert n.rank() == 2 + p = zeros(3) + assert p.rank() == 0 + +def test_issue_11434(): + ax, ay, bx, by, cx, cy, dx, dy, ex, ey, t0, t1 = \ + symbols('a_x a_y b_x b_y c_x c_y d_x d_y e_x e_y t_0 t_1') + M = Matrix([[ax, ay, ax*t0, ay*t0, 0], + [bx, by, bx*t0, by*t0, 0], + [cx, cy, cx*t0, cy*t0, 1], + [dx, dy, dx*t0, dy*t0, 1], + [ex, ey, 2*ex*t1 - ex*t0, 2*ey*t1 - ey*t0, 0]]) + assert M.rank() == 4 + +def test_rank_regression_from_so(): + # see: + # https://stackoverflow.com/questions/19072700/why-does-sympy-give-me-the-wrong-answer-when-i-row-reduce-a-symbolic-matrix + + nu, lamb = symbols('nu, lambda') + A = Matrix([[-3*nu, 1, 0, 0], + [ 3*nu, -2*nu - 1, 2, 0], + [ 0, 2*nu, (-1*nu) - lamb - 2, 3], + [ 0, 0, nu + lamb, -3]]) + expected_reduced = Matrix([[1, 0, 0, 1/(nu**2*(-lamb - nu))], + [0, 1, 0, 3/(nu*(-lamb - nu))], + [0, 0, 1, 3/(-lamb - nu)], + [0, 0, 0, 0]]) + expected_pivots = (0, 1, 2) + + reduced, pivots = A.rref() + + assert simplify(expected_reduced - reduced) == zeros(*A.shape) + assert pivots == expected_pivots + +def test_issue_15872(): + A = Matrix([[1, 1, 1, 0], [-2, -1, 0, -1], [0, 0, -1, -1], [0, 0, 2, 1]]) + B = A - Matrix.eye(4) * I + assert B.rank() == 3 + assert (B**2).rank() == 2 + assert (B**3).rank() == 2 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_repmatrix.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_repmatrix.py new file mode 100644 index 0000000000000000000000000000000000000000..ee36de004705f29eaa49ea8e06fd65a8a2baa718 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_repmatrix.py @@ -0,0 +1,62 @@ +from sympy.testing.pytest import raises +from sympy.matrices.exceptions import NonSquareMatrixError, NonInvertibleMatrixError + +from sympy import Matrix, Rational + + +def test_lll(): + A = Matrix([[1, 0, 0, 0, -20160], + [0, 1, 0, 0, 33768], + [0, 0, 1, 0, 39578], + [0, 0, 0, 1, 47757]]) + L = Matrix([[ 10, -3, -2, 8, -4], + [ 3, -9, 8, 1, -11], + [ -3, 13, -9, -3, -9], + [-12, -7, -11, 9, -1]]) + T = Matrix([[ 10, -3, -2, 8], + [ 3, -9, 8, 1], + [ -3, 13, -9, -3], + [-12, -7, -11, 9]]) + assert A.lll() == L + assert A.lll_transform() == (L, T) + assert T * A == L + + +def test_matrix_inv_mod(): + A = Matrix(2, 1, [1, 0]) + raises(NonSquareMatrixError, lambda: A.inv_mod(2)) + A = Matrix(2, 2, [1, 0, 0, 0]) + raises(NonInvertibleMatrixError, lambda: A.inv_mod(2)) + A = Matrix(2, 2, [1, 2, 3, 4]) + Ai = Matrix(2, 2, [1, 1, 0, 1]) + assert A.inv_mod(3) == Ai + A = Matrix(2, 2, [1, 0, 0, 1]) + assert A.inv_mod(2) == A + A = Matrix(3, 3, [1, 2, 3, 4, 5, 6, 7, 8, 9]) + raises(NonInvertibleMatrixError, lambda: A.inv_mod(5)) + A = Matrix(3, 3, [5, 1, 3, 2, 6, 0, 2, 1, 1]) + Ai = Matrix(3, 3, [6, 8, 0, 1, 5, 6, 5, 6, 4]) + assert A.inv_mod(9) == Ai + A = Matrix(3, 3, [1, 6, -3, 4, 1, -5, 3, -5, 5]) + Ai = Matrix(3, 3, [4, 3, 3, 1, 2, 5, 1, 5, 1]) + assert A.inv_mod(6) == Ai + A = Matrix(3, 3, [1, 6, 1, 4, 1, 5, 3, 2, 5]) + Ai = Matrix(3, 3, [6, 0, 3, 6, 6, 4, 1, 6, 1]) + assert A.inv_mod(7) == Ai + A = Matrix([[1, 2], [3, Rational(3,4)]]) + raises(ValueError, lambda: A.inv_mod(2)) + A = Matrix([[1, 2], [3, 4]]) + raises(TypeError, lambda: A.inv_mod(Rational(1, 2))) + # https://github.com/sympy/sympy/issues/27663 + M = Matrix([ + [2, 3, 1, 4], + [1, 5, 3, 2], + [3, 2, 4, 1], + [4, 1, 2, 5], + ]) + assert M.inv_mod(26) == Matrix([ + [7, 21, 10, 10], + [1, 7, 19, 3], + [14, 1, 15, 1], + [25, 23, 3, 12], + ]) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_solvers.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_solvers.py new file mode 100644 index 0000000000000000000000000000000000000000..c1347062c0482336affbeb4bb9a95aedfcc0ae53 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_solvers.py @@ -0,0 +1,615 @@ +import pytest +from sympy.core.function import expand_mul +from sympy.core.numbers import (I, Rational) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.core.sympify import sympify +from sympy.simplify.simplify import simplify +from sympy.matrices.exceptions import (ShapeError, NonSquareMatrixError) +from sympy.matrices import ( + ImmutableMatrix, Matrix, eye, ones, ImmutableDenseMatrix, dotprodsimp) +from sympy.matrices.determinant import _det_laplace +from sympy.testing.pytest import raises +from sympy.matrices.exceptions import NonInvertibleMatrixError +from sympy.polys.matrices.exceptions import DMShapeError +from sympy.solvers.solveset import linsolve +from sympy.abc import x, y + +def test_issue_17247_expression_blowup_29(): + M = Matrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 0, 0], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 0, -2063/256 + 541*I/128], + [ 0, 9/4 + 55*I/16, 2473/256 + 137*I/64, 0], + [ 0, 0, 0, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M.gauss_jordan_solve(ones(4, 1)) == (Matrix(S('''[ + [ -32549314808672/3306971225785 - 17397006745216*I/3306971225785], + [ 67439348256/3306971225785 - 9167503335872*I/3306971225785], + [-15091965363354518272/21217636514687010905 + 16890163109293858304*I/21217636514687010905], + [ -11328/952745 + 87616*I/952745]]''')), Matrix(0, 1, [])) + +def test_issue_17247_expression_blowup_30(): + M = Matrix(S('''[ + [ -3/4, 45/32 - 37*I/16, 0, 0], + [-149/64 + 49*I/32, -177/128 - 1369*I/128, 0, -2063/256 + 541*I/128], + [ 0, 9/4 + 55*I/16, 2473/256 + 137*I/64, 0], + [ 0, 0, 0, -177/128 - 1369*I/128]]''')) + with dotprodsimp(True): + assert M.cholesky_solve(ones(4, 1)) == Matrix(S('''[ + [ -32549314808672/3306971225785 - 17397006745216*I/3306971225785], + [ 67439348256/3306971225785 - 9167503335872*I/3306971225785], + [-15091965363354518272/21217636514687010905 + 16890163109293858304*I/21217636514687010905], + [ -11328/952745 + 87616*I/952745]]''')) + +# @XFAIL # This calculation hangs with dotprodsimp. +# def test_issue_17247_expression_blowup_31(): +# M = Matrix([ +# [x + 1, 1 - x, 0, 0], +# [1 - x, x + 1, 0, x + 1], +# [ 0, 1 - x, x + 1, 0], +# [ 0, 0, 0, x + 1]]) +# with dotprodsimp(True): +# assert M.LDLsolve(ones(4, 1)) == Matrix([ +# [(x + 1)/(4*x)], +# [(x - 1)/(4*x)], +# [(x + 1)/(4*x)], +# [ 1/(x + 1)]]) + + +def test_LUsolve_iszerofunc(): + # taken from https://github.com/sympy/sympy/issues/24679 + + M = Matrix([[(x + 1)**2 - (x**2 + 2*x + 1), x], [x, 0]]) + b = Matrix([1, 1]) + is_zero_func = lambda e: False if e._random() else True + + x_exp = Matrix([1/x, (1-(-x**2 - 2*x + (x+1)**2 - 1)/x)/x]) + + assert (x_exp - M.LUsolve(b, iszerofunc=is_zero_func)) == Matrix([0, 0]) + + +def test_issue_17247_expression_blowup_32(): + M = Matrix([ + [x + 1, 1 - x, 0, 0], + [1 - x, x + 1, 0, x + 1], + [ 0, 1 - x, x + 1, 0], + [ 0, 0, 0, x + 1]]) + with dotprodsimp(True): + assert M.LUsolve(ones(4, 1)) == Matrix([ + [(x + 1)/(4*x)], + [(x - 1)/(4*x)], + [(x + 1)/(4*x)], + [ 1/(x + 1)]]) + +def test_LUsolve(): + A = Matrix([[2, 3, 5], + [3, 6, 2], + [8, 3, 6]]) + x = Matrix(3, 1, [3, 7, 5]) + b = A*x + soln = A.LUsolve(b) + assert soln == x + A = Matrix([[0, -1, 2], + [5, 10, 7], + [8, 3, 4]]) + x = Matrix(3, 1, [-1, 2, 5]) + b = A*x + soln = A.LUsolve(b) + assert soln == x + A = Matrix([[2, 1], [1, 0], [1, 0]]) # issue 14548 + b = Matrix([3, 1, 1]) + assert A.LUsolve(b) == Matrix([1, 1]) + b = Matrix([3, 1, 2]) # inconsistent + raises(ValueError, lambda: A.LUsolve(b)) + A = Matrix([[0, -1, 2], + [5, 10, 7], + [8, 3, 4], + [2, 3, 5], + [3, 6, 2], + [8, 3, 6]]) + x = Matrix([2, 1, -4]) + b = A*x + soln = A.LUsolve(b) + assert soln == x + A = Matrix([[0, -1, 2], [5, 10, 7]]) # underdetermined + x = Matrix([-1, 2, 0]) + b = A*x + raises(NotImplementedError, lambda: A.LUsolve(b)) + + A = Matrix(4, 4, lambda i, j: 1/(i+j+1) if i != 3 else 0) + b = Matrix.zeros(4, 1) + raises(NonInvertibleMatrixError, lambda: A.LUsolve(b)) + + +def test_LUsolve_noncommutative(): + a0, a1, a2, a3 = symbols("a:4", commutative=False) + b0, b1 = symbols("b:2", commutative=False) + A = Matrix([[a0, a1], [a2, a3]]) + check = A * A.LUsolve(Matrix([b0, b1])) + assert check[0, 0].expand() == b0 + # Because sympy simplification is very limited with noncommutative expressions, + # perform an explicit check with the second element + assert check[1, 0] == ( + a2*a0**(-1)*(-a1*(-a2*a0**(-1)*a1 + a3)**(-1)*(-a2*a0**(-1)*b0 + b1) + b0) + + a3*(-a2*a0**(-1)*a1 + a3)**(-1)*(-a2*a0**(-1)*b0 + b1) + ) + + +def test_QRsolve(): + A = Matrix([[2, 3, 5], + [3, 6, 2], + [8, 3, 6]]) + x = Matrix(3, 1, [3, 7, 5]) + b = A*x + soln = A.QRsolve(b) + assert soln == x + x = Matrix([[1, 2], [3, 4], [5, 6]]) + b = A*x + soln = A.QRsolve(b) + assert soln == x + + A = Matrix([[0, -1, 2], + [5, 10, 7], + [8, 3, 4]]) + x = Matrix(3, 1, [-1, 2, 5]) + b = A*x + soln = A.QRsolve(b) + assert soln == x + x = Matrix([[7, 8], [9, 10], [11, 12]]) + b = A*x + soln = A.QRsolve(b) + assert soln == x + +def test_errors(): + raises(ShapeError, lambda: Matrix([1]).LUsolve(Matrix([[1, 2], [3, 4]]))) + +def test_cholesky_solve(): + A = Matrix([[2, 3, 5], + [3, 6, 2], + [8, 3, 6]]) + x = Matrix(3, 1, [3, 7, 5]) + b = A*x + soln = A.cholesky_solve(b) + assert soln == x + A = Matrix([[0, -1, 2], + [5, 10, 7], + [8, 3, 4]]) + x = Matrix(3, 1, [-1, 2, 5]) + b = A*x + soln = A.cholesky_solve(b) + assert soln == x + A = Matrix(((1, 5), (5, 1))) + x = Matrix((4, -3)) + b = A*x + soln = A.cholesky_solve(b) + assert soln == x + A = Matrix(((9, 3*I), (-3*I, 5))) + x = Matrix((-2, 1)) + b = A*x + soln = A.cholesky_solve(b) + assert expand_mul(soln) == x + A = Matrix(((9*I, 3), (-3 + I, 5))) + x = Matrix((2 + 3*I, -1)) + b = A*x + soln = A.cholesky_solve(b) + assert expand_mul(soln) == x + a00, a01, a11, b0, b1 = symbols('a00, a01, a11, b0, b1') + A = Matrix(((a00, a01), (a01, a11))) + b = Matrix((b0, b1)) + x = A.cholesky_solve(b) + assert simplify(A*x) == b + + +def test_LDLsolve(): + A = Matrix([[2, 3, 5], + [3, 6, 2], + [8, 3, 6]]) + x = Matrix(3, 1, [3, 7, 5]) + b = A*x + soln = A.LDLsolve(b) + assert soln == x + + A = Matrix([[0, -1, 2], + [5, 10, 7], + [8, 3, 4]]) + x = Matrix(3, 1, [-1, 2, 5]) + b = A*x + soln = A.LDLsolve(b) + assert soln == x + + A = Matrix(((9, 3*I), (-3*I, 5))) + x = Matrix((-2, 1)) + b = A*x + soln = A.LDLsolve(b) + assert expand_mul(soln) == x + + A = Matrix(((9*I, 3), (-3 + I, 5))) + x = Matrix((2 + 3*I, -1)) + b = A*x + soln = A.LDLsolve(b) + assert expand_mul(soln) == x + + A = Matrix(((9, 3), (3, 9))) + x = Matrix((1, 1)) + b = A * x + soln = A.LDLsolve(b) + assert expand_mul(soln) == x + + A = Matrix([[-5, -3, -4], [-3, -7, 7]]) + x = Matrix([[8], [7], [-2]]) + b = A * x + raises(NotImplementedError, lambda: A.LDLsolve(b)) + + +def test_lower_triangular_solve(): + + raises(NonSquareMatrixError, + lambda: Matrix([1, 0]).lower_triangular_solve(Matrix([0, 1]))) + raises(ShapeError, + lambda: Matrix([[1, 0], [0, 1]]).lower_triangular_solve(Matrix([1]))) + raises(ValueError, + lambda: Matrix([[2, 1], [1, 2]]).lower_triangular_solve( + Matrix([[1, 0], [0, 1]]))) + + A = Matrix([[1, 0], [0, 1]]) + B = Matrix([[x, y], [y, x]]) + C = Matrix([[4, 8], [2, 9]]) + + assert A.lower_triangular_solve(B) == B + assert A.lower_triangular_solve(C) == C + + +def test_upper_triangular_solve(): + + raises(NonSquareMatrixError, + lambda: Matrix([1, 0]).upper_triangular_solve(Matrix([0, 1]))) + raises(ShapeError, + lambda: Matrix([[1, 0], [0, 1]]).upper_triangular_solve(Matrix([1]))) + raises(TypeError, + lambda: Matrix([[2, 1], [1, 2]]).upper_triangular_solve( + Matrix([[1, 0], [0, 1]]))) + + A = Matrix([[1, 0], [0, 1]]) + B = Matrix([[x, y], [y, x]]) + C = Matrix([[2, 4], [3, 8]]) + + assert A.upper_triangular_solve(B) == B + assert A.upper_triangular_solve(C) == C + + +def test_diagonal_solve(): + raises(TypeError, lambda: Matrix([1, 1]).diagonal_solve(Matrix([1]))) + A = Matrix([[1, 0], [0, 1]])*2 + B = Matrix([[x, y], [y, x]]) + assert A.diagonal_solve(B) == B/2 + + A = Matrix([[1, 0], [1, 2]]) + raises(TypeError, lambda: A.diagonal_solve(B)) + +def test_pinv_solve(): + # Fully determined system (unique result, identical to other solvers). + A = Matrix([[1, 5], [7, 9]]) + B = Matrix([12, 13]) + assert A.pinv_solve(B) == A.cholesky_solve(B) + assert A.pinv_solve(B) == A.LDLsolve(B) + assert A.pinv_solve(B) == Matrix([sympify('-43/26'), sympify('71/26')]) + assert A * A.pinv() * B == B + # Fully determined, with two-dimensional B matrix. + B = Matrix([[12, 13, 14], [15, 16, 17]]) + assert A.pinv_solve(B) == A.cholesky_solve(B) + assert A.pinv_solve(B) == A.LDLsolve(B) + assert A.pinv_solve(B) == Matrix([[-33, -37, -41], [69, 75, 81]]) / 26 + assert A * A.pinv() * B == B + # Underdetermined system (infinite results). + A = Matrix([[1, 0, 1], [0, 1, 1]]) + B = Matrix([5, 7]) + solution = A.pinv_solve(B) + w = {} + for s in solution.atoms(Symbol): + # Extract dummy symbols used in the solution. + w[s.name] = s + assert solution == Matrix([[w['w0_0']/3 + w['w1_0']/3 - w['w2_0']/3 + 1], + [w['w0_0']/3 + w['w1_0']/3 - w['w2_0']/3 + 3], + [-w['w0_0']/3 - w['w1_0']/3 + w['w2_0']/3 + 4]]) + assert A * A.pinv() * B == B + # Overdetermined system (least squares results). + A = Matrix([[1, 0], [0, 0], [0, 1]]) + B = Matrix([3, 2, 1]) + assert A.pinv_solve(B) == Matrix([3, 1]) + # Proof the solution is not exact. + assert A * A.pinv() * B != B + +def test_pinv_rank_deficient(): + # Test the four properties of the pseudoinverse for various matrices. + As = [Matrix([[1, 1, 1], [2, 2, 2]]), + Matrix([[1, 0], [0, 0]]), + Matrix([[1, 2], [2, 4], [3, 6]])] + + for A in As: + A_pinv = A.pinv(method="RD") + AAp = A * A_pinv + ApA = A_pinv * A + assert simplify(AAp * A) == A + assert simplify(ApA * A_pinv) == A_pinv + assert AAp.H == AAp + assert ApA.H == ApA + + for A in As: + A_pinv = A.pinv(method="ED") + AAp = A * A_pinv + ApA = A_pinv * A + assert simplify(AAp * A) == A + assert simplify(ApA * A_pinv) == A_pinv + assert AAp.H == AAp + assert ApA.H == ApA + + # Test solving with rank-deficient matrices. + A = Matrix([[1, 0], [0, 0]]) + # Exact, non-unique solution. + B = Matrix([3, 0]) + solution = A.pinv_solve(B) + w1 = solution.atoms(Symbol).pop() + assert w1.name == 'w1_0' + assert solution == Matrix([3, w1]) + assert A * A.pinv() * B == B + # Least squares, non-unique solution. + B = Matrix([3, 1]) + solution = A.pinv_solve(B) + w1 = solution.atoms(Symbol).pop() + assert w1.name == 'w1_0' + assert solution == Matrix([3, w1]) + assert A * A.pinv() * B != B + +def test_gauss_jordan_solve(): + + # Square, full rank, unique solution + A = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 10]]) + b = Matrix([3, 6, 9]) + sol, params = A.gauss_jordan_solve(b) + assert sol == Matrix([[-1], [2], [0]]) + assert params == Matrix(0, 1, []) + + # Square, full rank, unique solution, B has more columns than rows + A = eye(3) + B = Matrix([[1, 2, 3, 4], [5, 6, 7, 8], [9, 10, 11, 12]]) + sol, params = A.gauss_jordan_solve(B) + assert sol == B + assert params == Matrix(0, 4, []) + + # Square, reduced rank, parametrized solution + A = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + b = Matrix([3, 6, 9]) + sol, params, freevar = A.gauss_jordan_solve(b, freevar=True) + w = {} + for s in sol.atoms(Symbol): + # Extract dummy symbols used in the solution. + w[s.name] = s + assert sol == Matrix([[w['tau0'] - 1], [-2*w['tau0'] + 2], [w['tau0']]]) + assert params == Matrix([[w['tau0']]]) + assert freevar == [2] + + # Square, reduced rank, parametrized solution, B has two columns + A = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + B = Matrix([[3, 4], [6, 8], [9, 12]]) + sol, params, freevar = A.gauss_jordan_solve(B, freevar=True) + w = {} + for s in sol.atoms(Symbol): + # Extract dummy symbols used in the solution. + w[s.name] = s + assert sol == Matrix([[w['tau0'] - 1, w['tau1'] - Rational(4, 3)], + [-2*w['tau0'] + 2, -2*w['tau1'] + Rational(8, 3)], + [w['tau0'], w['tau1']],]) + assert params == Matrix([[w['tau0'], w['tau1']]]) + assert freevar == [2] + + # Square, reduced rank, parametrized solution + A = Matrix([[1, 2, 3], [2, 4, 6], [3, 6, 9]]) + b = Matrix([0, 0, 0]) + sol, params = A.gauss_jordan_solve(b) + w = {} + for s in sol.atoms(Symbol): + w[s.name] = s + assert sol == Matrix([[-2*w['tau0'] - 3*w['tau1']], + [w['tau0']], [w['tau1']]]) + assert params == Matrix([[w['tau0']], [w['tau1']]]) + + # Square, reduced rank, parametrized solution + A = Matrix([[0, 0, 0], [0, 0, 0], [0, 0, 0]]) + b = Matrix([0, 0, 0]) + sol, params = A.gauss_jordan_solve(b) + w = {} + for s in sol.atoms(Symbol): + w[s.name] = s + assert sol == Matrix([[w['tau0']], [w['tau1']], [w['tau2']]]) + assert params == Matrix([[w['tau0']], [w['tau1']], [w['tau2']]]) + + # Square, reduced rank, no solution + A = Matrix([[1, 2, 3], [2, 4, 6], [3, 6, 9]]) + b = Matrix([0, 0, 1]) + raises(ValueError, lambda: A.gauss_jordan_solve(b)) + + # Rectangular, tall, full rank, unique solution + A = Matrix([[1, 5, 3], [2, 1, 6], [1, 7, 9], [1, 4, 3]]) + b = Matrix([0, 0, 1, 0]) + sol, params = A.gauss_jordan_solve(b) + assert sol == Matrix([[Rational(-1, 2)], [0], [Rational(1, 6)]]) + assert params == Matrix(0, 1, []) + + # Rectangular, tall, full rank, unique solution, B has less columns than rows + A = Matrix([[1, 5, 3], [2, 1, 6], [1, 7, 9], [1, 4, 3]]) + B = Matrix([[0,0], [0, 0], [1, 2], [0, 0]]) + sol, params = A.gauss_jordan_solve(B) + assert sol == Matrix([[Rational(-1, 2), Rational(-2, 2)], [0, 0], [Rational(1, 6), Rational(2, 6)]]) + assert params == Matrix(0, 2, []) + + # Rectangular, tall, full rank, no solution + A = Matrix([[1, 5, 3], [2, 1, 6], [1, 7, 9], [1, 4, 3]]) + b = Matrix([0, 0, 0, 1]) + raises(ValueError, lambda: A.gauss_jordan_solve(b)) + + # Rectangular, tall, full rank, no solution, B has two columns (2nd has no solution) + A = Matrix([[1, 5, 3], [2, 1, 6], [1, 7, 9], [1, 4, 3]]) + B = Matrix([[0,0], [0, 0], [1, 0], [0, 1]]) + raises(ValueError, lambda: A.gauss_jordan_solve(B)) + + # Rectangular, tall, full rank, no solution, B has two columns (1st has no solution) + A = Matrix([[1, 5, 3], [2, 1, 6], [1, 7, 9], [1, 4, 3]]) + B = Matrix([[0,0], [0, 0], [0, 1], [1, 0]]) + raises(ValueError, lambda: A.gauss_jordan_solve(B)) + + # Rectangular, tall, reduced rank, parametrized solution + A = Matrix([[1, 5, 3], [2, 10, 6], [3, 15, 9], [1, 4, 3]]) + b = Matrix([0, 0, 0, 1]) + sol, params = A.gauss_jordan_solve(b) + w = {} + for s in sol.atoms(Symbol): + w[s.name] = s + assert sol == Matrix([[-3*w['tau0'] + 5], [-1], [w['tau0']]]) + assert params == Matrix([[w['tau0']]]) + + # Rectangular, tall, reduced rank, no solution + A = Matrix([[1, 5, 3], [2, 10, 6], [3, 15, 9], [1, 4, 3]]) + b = Matrix([0, 0, 1, 1]) + raises(ValueError, lambda: A.gauss_jordan_solve(b)) + + # Rectangular, wide, full rank, parametrized solution + A = Matrix([[1, 2, 3, 4], [5, 6, 7, 8], [9, 10, 1, 12]]) + b = Matrix([1, 1, 1]) + sol, params = A.gauss_jordan_solve(b) + w = {} + for s in sol.atoms(Symbol): + w[s.name] = s + assert sol == Matrix([[2*w['tau0'] - 1], [-3*w['tau0'] + 1], [0], + [w['tau0']]]) + assert params == Matrix([[w['tau0']]]) + + # Rectangular, wide, reduced rank, parametrized solution + A = Matrix([[1, 2, 3, 4], [5, 6, 7, 8], [2, 4, 6, 8]]) + b = Matrix([0, 1, 0]) + sol, params = A.gauss_jordan_solve(b) + w = {} + for s in sol.atoms(Symbol): + w[s.name] = s + assert sol == Matrix([[w['tau0'] + 2*w['tau1'] + S.Half], + [-2*w['tau0'] - 3*w['tau1'] - Rational(1, 4)], + [w['tau0']], [w['tau1']]]) + assert params == Matrix([[w['tau0']], [w['tau1']]]) + # watch out for clashing symbols + x0, x1, x2, _x0 = symbols('_tau0 _tau1 _tau2 tau1') + M = Matrix([[0, 1, 0, 0, 0, 0], [0, 0, 0, 1, 0, _x0]]) + A = M[:, :-1] + b = M[:, -1:] + sol, params = A.gauss_jordan_solve(b) + assert params == Matrix(3, 1, [x0, x1, x2]) + assert sol == Matrix(5, 1, [x0, 0, x1, _x0, x2]) + + # Rectangular, wide, reduced rank, no solution + A = Matrix([[1, 2, 3, 4], [5, 6, 7, 8], [2, 4, 6, 8]]) + b = Matrix([1, 1, 1]) + raises(ValueError, lambda: A.gauss_jordan_solve(b)) + + # Test for immutable matrix + A = ImmutableMatrix([[1, 0], [0, 1]]) + B = ImmutableMatrix([1, 2]) + sol, params = A.gauss_jordan_solve(B) + assert sol == ImmutableMatrix([1, 2]) + assert params == ImmutableMatrix(0, 1, []) + assert sol.__class__ == ImmutableDenseMatrix + assert params.__class__ == ImmutableDenseMatrix + + # Test placement of free variables + A = Matrix([[1, 0, 0, 0], [0, 0, 0, 1]]) + b = Matrix([1, 1]) + sol, params = A.gauss_jordan_solve(b) + w = {} + for s in sol.atoms(Symbol): + w[s.name] = s + assert sol == Matrix([[1], [w['tau0']], [w['tau1']], [1]]) + assert params == Matrix([[w['tau0']], [w['tau1']]]) + + +def test_linsolve_underdetermined_AND_gauss_jordan_solve(): + #Test placement of free variables as per issue 19815 + A = Matrix([[1, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0], + [1, 1, 1, 1, 1, 1, 0, 0, 0, 0, 0, 0, 0, 0], + [0, 1, 0, 0, 0, 0, 1, 0, 0, 0, 0, 0, 0, 0], + [0, 1, 0, 0, 1, 1, 1, 1, 0, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 1, 0, 1, 0, 0, 0, 0, 0], + [0, 0, 0, 0, 0, 1, 1, 1, 1, 1, 1, 0, 0, 0], + [0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 1, 0], + [0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 1, 1]]) + B = Matrix([1, 2, 1, 1, 1, 1, 1, 2]) + sol, params = A.gauss_jordan_solve(B) + w = {} + for s in sol.atoms(Symbol): + w[s.name] = s + assert params == Matrix([[w['tau0']], [w['tau1']], [w['tau2']], + [w['tau3']], [w['tau4']], [w['tau5']]]) + assert sol == Matrix([[1 - 1*w['tau2']], + [w['tau2']], + [1 - 1*w['tau0'] + w['tau1']], + [w['tau0']], + [w['tau3'] + w['tau4']], + [-1*w['tau3'] - 1*w['tau4'] - 1*w['tau1']], + [1 - 1*w['tau2']], + [w['tau1']], + [w['tau2']], + [w['tau3']], + [w['tau4']], + [1 - 1*w['tau5']], + [w['tau5']], + [1]]) + + from sympy.abc import j,f + # https://github.com/sympy/sympy/issues/20046 + A = Matrix([ + [1, 1, 1, 1, 1, 1, 1, 1, 1], + [0, -1, 0, -1, 0, -1, 0, -1, -j], + [0, 0, 0, 0, 1, 1, 1, 1, f] + ]) + + sol_1=Matrix(list(linsolve(A))[0]) + + tau0, tau1, tau2, tau3, tau4 = symbols('tau:5') + + assert sol_1 == Matrix([[-f - j - tau0 + tau2 + tau4 + 1], + [j - tau1 - tau2 - tau4], + [tau0], + [tau1], + [f - tau2 - tau3 - tau4], + [tau2], + [tau3], + [tau4]]) + + # https://github.com/sympy/sympy/issues/19815 + sol_2 = A[:, : -1 ] * sol_1 - A[:, -1 ] + assert sol_2 == Matrix([[0], [0], [0]]) + + +@pytest.mark.parametrize("det_method", ["bird", "laplace"]) +@pytest.mark.parametrize("M, rhs", [ + (Matrix([[2, 3, 5], [3, 6, 2], [8, 3, 6]]), Matrix(3, 1, [3, 7, 5])), + (Matrix([[2, 3, 5], [3, 6, 2], [8, 3, 6]]), + Matrix([[1, 2], [3, 4], [5, 6]])), + (Matrix(2, 2, symbols("a:4")), Matrix(2, 1, symbols("b:2"))), +]) +def test_cramer_solve(det_method, M, rhs): + assert simplify(M.cramer_solve(rhs, det_method=det_method) - M.LUsolve(rhs) + ) == Matrix.zeros(M.rows, rhs.cols) + + +@pytest.mark.parametrize("det_method, error", [ + ("bird", DMShapeError), (_det_laplace, NonSquareMatrixError)]) +def test_cramer_solve_errors(det_method, error): + # Non-square matrix + A = Matrix([[0, -1, 2], [5, 10, 7]]) + b = Matrix([-2, 15]) + raises(error, lambda: A.cramer_solve(b, det_method=det_method)) + + +def test_solve(): + A = Matrix([[1,2], [2,4]]) + b = Matrix([[3], [4]]) + raises(ValueError, lambda: A.solve(b)) #no solution + b = Matrix([[ 4], [8]]) + raises(ValueError, lambda: A.solve(b)) #infinite solution diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_sparse.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_sparse.py new file mode 100644 index 0000000000000000000000000000000000000000..4d257c8062f220cc06bc0dabdc7ac40ce9dc4adc --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_sparse.py @@ -0,0 +1,745 @@ +from sympy.core.numbers import (Float, I, Rational) +from sympy.core.singleton import S +from sympy.core.symbol import (Symbol, symbols) +from sympy.functions.elementary.complexes import Abs +from sympy.polys.polytools import PurePoly +from sympy.matrices import \ + Matrix, MutableSparseMatrix, ImmutableSparseMatrix, SparseMatrix, eye, \ + ones, zeros, ShapeError, NonSquareMatrixError +from sympy.testing.pytest import raises + + +def test_sparse_creation(): + a = SparseMatrix(2, 2, {(0, 0): [[1, 2], [3, 4]]}) + assert a == SparseMatrix([[1, 2], [3, 4]]) + a = SparseMatrix(2, 2, {(0, 0): [[1, 2]]}) + assert a == SparseMatrix([[1, 2], [0, 0]]) + a = SparseMatrix(2, 2, {(0, 0): [1, 2]}) + assert a == SparseMatrix([[1, 0], [2, 0]]) + + +def test_sparse_matrix(): + def sparse_eye(n): + return SparseMatrix.eye(n) + + def sparse_zeros(n): + return SparseMatrix.zeros(n) + + # creation args + raises(TypeError, lambda: SparseMatrix(1, 2)) + + a = SparseMatrix(( + (1, 0), + (0, 1) + )) + assert SparseMatrix(a) == a + + from sympy.matrices import MutableDenseMatrix + a = MutableSparseMatrix([]) + b = MutableDenseMatrix([1, 2]) + assert a.row_join(b) == b + assert a.col_join(b) == b + assert type(a.row_join(b)) == type(a) + assert type(a.col_join(b)) == type(a) + + # make sure 0 x n matrices get stacked correctly + sparse_matrices = [SparseMatrix.zeros(0, n) for n in range(4)] + assert SparseMatrix.hstack(*sparse_matrices) == Matrix(0, 6, []) + sparse_matrices = [SparseMatrix.zeros(n, 0) for n in range(4)] + assert SparseMatrix.vstack(*sparse_matrices) == Matrix(6, 0, []) + + # test element assignment + a = SparseMatrix(( + (1, 0), + (0, 1) + )) + + a[3] = 4 + assert a[1, 1] == 4 + a[3] = 1 + + a[0, 0] = 2 + assert a == SparseMatrix(( + (2, 0), + (0, 1) + )) + a[1, 0] = 5 + assert a == SparseMatrix(( + (2, 0), + (5, 1) + )) + a[1, 1] = 0 + assert a == SparseMatrix(( + (2, 0), + (5, 0) + )) + assert a.todok() == {(0, 0): 2, (1, 0): 5} + + # test_multiplication + a = SparseMatrix(( + (1, 2), + (3, 1), + (0, 6), + )) + + b = SparseMatrix(( + (1, 2), + (3, 0), + )) + + c = a*b + assert c[0, 0] == 7 + assert c[0, 1] == 2 + assert c[1, 0] == 6 + assert c[1, 1] == 6 + assert c[2, 0] == 18 + assert c[2, 1] == 0 + + try: + eval('c = a @ b') + except SyntaxError: + pass + else: + assert c[0, 0] == 7 + assert c[0, 1] == 2 + assert c[1, 0] == 6 + assert c[1, 1] == 6 + assert c[2, 0] == 18 + assert c[2, 1] == 0 + + x = Symbol("x") + + c = b * Symbol("x") + assert isinstance(c, SparseMatrix) + assert c[0, 0] == x + assert c[0, 1] == 2*x + assert c[1, 0] == 3*x + assert c[1, 1] == 0 + + c = 5 * b + assert isinstance(c, SparseMatrix) + assert c[0, 0] == 5 + assert c[0, 1] == 2*5 + assert c[1, 0] == 3*5 + assert c[1, 1] == 0 + + #test_power + A = SparseMatrix([[2, 3], [4, 5]]) + assert (A**5)[:] == [6140, 8097, 10796, 14237] + A = SparseMatrix([[2, 1, 3], [4, 2, 4], [6, 12, 1]]) + assert (A**3)[:] == [290, 262, 251, 448, 440, 368, 702, 954, 433] + + # test_creation + x = Symbol("x") + a = SparseMatrix([[x, 0], [0, 0]]) + m = a + assert m.cols == m.rows + assert m.cols == 2 + assert m[:] == [x, 0, 0, 0] + b = SparseMatrix(2, 2, [x, 0, 0, 0]) + m = b + assert m.cols == m.rows + assert m.cols == 2 + assert m[:] == [x, 0, 0, 0] + + assert a == b + S = sparse_eye(3) + S.row_del(1) + assert S == SparseMatrix([ + [1, 0, 0], + [0, 0, 1]]) + S = sparse_eye(3) + S.col_del(1) + assert S == SparseMatrix([ + [1, 0], + [0, 0], + [0, 1]]) + S = SparseMatrix.eye(3) + S[2, 1] = 2 + S.col_swap(1, 0) + assert S == SparseMatrix([ + [0, 1, 0], + [1, 0, 0], + [2, 0, 1]]) + S.row_swap(0, 1) + assert S == SparseMatrix([ + [1, 0, 0], + [0, 1, 0], + [2, 0, 1]]) + + a = SparseMatrix(1, 2, [1, 2]) + b = a.copy() + c = a.copy() + assert a[0] == 1 + a.row_del(0) + assert a == SparseMatrix(0, 2, []) + b.col_del(1) + assert b == SparseMatrix(1, 1, [1]) + + assert SparseMatrix([[1, 2, 3], [1, 2], [1]]) == Matrix([ + [1, 2, 3], + [1, 2, 0], + [1, 0, 0]]) + assert SparseMatrix(4, 4, {(1, 1): sparse_eye(2)}) == Matrix([ + [0, 0, 0, 0], + [0, 1, 0, 0], + [0, 0, 1, 0], + [0, 0, 0, 0]]) + raises(ValueError, lambda: SparseMatrix(1, 1, {(1, 1): 1})) + assert SparseMatrix(1, 2, [1, 2]).tolist() == [[1, 2]] + assert SparseMatrix(2, 2, [1, [2, 3]]).tolist() == [[1, 0], [2, 3]] + raises(ValueError, lambda: SparseMatrix(2, 2, [1])) + raises(ValueError, lambda: SparseMatrix(1, 1, [[1, 2]])) + assert SparseMatrix([.1]).has(Float) + # autosizing + assert SparseMatrix(None, {(0, 1): 0}).shape == (0, 0) + assert SparseMatrix(None, {(0, 1): 1}).shape == (1, 2) + assert SparseMatrix(None, None, {(0, 1): 1}).shape == (1, 2) + raises(ValueError, lambda: SparseMatrix(None, 1, [[1, 2]])) + raises(ValueError, lambda: SparseMatrix(1, None, [[1, 2]])) + raises(ValueError, lambda: SparseMatrix(3, 3, {(0, 0): ones(2), (1, 1): 2})) + + # test_determinant + x, y = Symbol('x'), Symbol('y') + + assert SparseMatrix(1, 1, [0]).det() == 0 + + assert SparseMatrix([[1]]).det() == 1 + + assert SparseMatrix(((-3, 2), (8, -5))).det() == -1 + + assert SparseMatrix(((x, 1), (y, 2*y))).det() == 2*x*y - y + + assert SparseMatrix(( (1, 1, 1), + (1, 2, 3), + (1, 3, 6) )).det() == 1 + + assert SparseMatrix(( ( 3, -2, 0, 5), + (-2, 1, -2, 2), + ( 0, -2, 5, 0), + ( 5, 0, 3, 4) )).det() == -289 + + assert SparseMatrix(( ( 1, 2, 3, 4), + ( 5, 6, 7, 8), + ( 9, 10, 11, 12), + (13, 14, 15, 16) )).det() == 0 + + assert SparseMatrix(( (3, 2, 0, 0, 0), + (0, 3, 2, 0, 0), + (0, 0, 3, 2, 0), + (0, 0, 0, 3, 2), + (2, 0, 0, 0, 3) )).det() == 275 + + assert SparseMatrix(( (1, 0, 1, 2, 12), + (2, 0, 1, 1, 4), + (2, 1, 1, -1, 3), + (3, 2, -1, 1, 8), + (1, 1, 1, 0, 6) )).det() == -55 + + assert SparseMatrix(( (-5, 2, 3, 4, 5), + ( 1, -4, 3, 4, 5), + ( 1, 2, -3, 4, 5), + ( 1, 2, 3, -2, 5), + ( 1, 2, 3, 4, -1) )).det() == 11664 + + assert SparseMatrix(( ( 3, 0, 0, 0), + (-2, 1, 0, 0), + ( 0, -2, 5, 0), + ( 5, 0, 3, 4) )).det() == 60 + + assert SparseMatrix(( ( 1, 0, 0, 0), + ( 5, 0, 0, 0), + ( 9, 10, 11, 0), + (13, 14, 15, 16) )).det() == 0 + + assert SparseMatrix(( (3, 2, 0, 0, 0), + (0, 3, 2, 0, 0), + (0, 0, 3, 2, 0), + (0, 0, 0, 3, 2), + (0, 0, 0, 0, 3) )).det() == 243 + + assert SparseMatrix(( ( 2, 7, -1, 3, 2), + ( 0, 0, 1, 0, 1), + (-2, 0, 7, 0, 2), + (-3, -2, 4, 5, 3), + ( 1, 0, 0, 0, 1) )).det() == 123 + + # test_slicing + m0 = sparse_eye(4) + assert m0[:3, :3] == sparse_eye(3) + assert m0[2:4, 0:2] == sparse_zeros(2) + + m1 = SparseMatrix(3, 3, lambda i, j: i + j) + assert m1[0, :] == SparseMatrix(1, 3, (0, 1, 2)) + assert m1[1:3, 1] == SparseMatrix(2, 1, (2, 3)) + + m2 = SparseMatrix( + [[0, 1, 2, 3], [4, 5, 6, 7], [8, 9, 10, 11], [12, 13, 14, 15]]) + assert m2[:, -1] == SparseMatrix(4, 1, [3, 7, 11, 15]) + assert m2[-2:, :] == SparseMatrix([[8, 9, 10, 11], [12, 13, 14, 15]]) + + assert SparseMatrix([[1, 2], [3, 4]])[[1], [1]] == Matrix([[4]]) + + # test_submatrix_assignment + m = sparse_zeros(4) + m[2:4, 2:4] = sparse_eye(2) + assert m == SparseMatrix([(0, 0, 0, 0), + (0, 0, 0, 0), + (0, 0, 1, 0), + (0, 0, 0, 1)]) + assert len(m.todok()) == 2 + m[:2, :2] = sparse_eye(2) + assert m == sparse_eye(4) + m[:, 0] = SparseMatrix(4, 1, (1, 2, 3, 4)) + assert m == SparseMatrix([(1, 0, 0, 0), + (2, 1, 0, 0), + (3, 0, 1, 0), + (4, 0, 0, 1)]) + m[:, :] = sparse_zeros(4) + assert m == sparse_zeros(4) + m[:, :] = ((1, 2, 3, 4), (5, 6, 7, 8), (9, 10, 11, 12), (13, 14, 15, 16)) + assert m == SparseMatrix((( 1, 2, 3, 4), + ( 5, 6, 7, 8), + ( 9, 10, 11, 12), + (13, 14, 15, 16))) + m[:2, 0] = [0, 0] + assert m == SparseMatrix((( 0, 2, 3, 4), + ( 0, 6, 7, 8), + ( 9, 10, 11, 12), + (13, 14, 15, 16))) + + # test_reshape + m0 = sparse_eye(3) + assert m0.reshape(1, 9) == SparseMatrix(1, 9, (1, 0, 0, 0, 1, 0, 0, 0, 1)) + m1 = SparseMatrix(3, 4, lambda i, j: i + j) + assert m1.reshape(4, 3) == \ + SparseMatrix([(0, 1, 2), (3, 1, 2), (3, 4, 2), (3, 4, 5)]) + assert m1.reshape(2, 6) == \ + SparseMatrix([(0, 1, 2, 3, 1, 2), (3, 4, 2, 3, 4, 5)]) + + # test_applyfunc + m0 = sparse_eye(3) + assert m0.applyfunc(lambda x: 2*x) == sparse_eye(3)*2 + assert m0.applyfunc(lambda x: 0 ) == sparse_zeros(3) + + # test__eval_Abs + assert abs(SparseMatrix(((x, 1), (y, 2*y)))) == SparseMatrix(((Abs(x), 1), (Abs(y), 2*Abs(y)))) + + # test_LUdecomp + testmat = SparseMatrix([[ 0, 2, 5, 3], + [ 3, 3, 7, 4], + [ 8, 4, 0, 2], + [-2, 6, 3, 4]]) + L, U, p = testmat.LUdecomposition() + assert L.is_lower + assert U.is_upper + assert (L*U).permute_rows(p, 'backward') - testmat == sparse_zeros(4) + + testmat = SparseMatrix([[ 6, -2, 7, 4], + [ 0, 3, 6, 7], + [ 1, -2, 7, 4], + [-9, 2, 6, 3]]) + L, U, p = testmat.LUdecomposition() + assert L.is_lower + assert U.is_upper + assert (L*U).permute_rows(p, 'backward') - testmat == sparse_zeros(4) + + x, y, z = Symbol('x'), Symbol('y'), Symbol('z') + M = Matrix(((1, x, 1), (2, y, 0), (y, 0, z))) + L, U, p = M.LUdecomposition() + assert L.is_lower + assert U.is_upper + assert (L*U).permute_rows(p, 'backward') - M == sparse_zeros(3) + + # test_LUsolve + A = SparseMatrix([[2, 3, 5], + [3, 6, 2], + [8, 3, 6]]) + x = SparseMatrix(3, 1, [3, 7, 5]) + b = A*x + soln = A.LUsolve(b) + assert soln == x + A = SparseMatrix([[0, -1, 2], + [5, 10, 7], + [8, 3, 4]]) + x = SparseMatrix(3, 1, [-1, 2, 5]) + b = A*x + soln = A.LUsolve(b) + assert soln == x + + # test_inverse + A = sparse_eye(4) + assert A.inv() == sparse_eye(4) + assert A.inv(method="CH") == sparse_eye(4) + assert A.inv(method="LDL") == sparse_eye(4) + + A = SparseMatrix([[2, 3, 5], + [3, 6, 2], + [7, 2, 6]]) + Ainv = SparseMatrix(Matrix(A).inv()) + assert A*Ainv == sparse_eye(3) + assert A.inv(method="CH") == Ainv + assert A.inv(method="LDL") == Ainv + + A = SparseMatrix([[2, 3, 5], + [3, 6, 2], + [5, 2, 6]]) + Ainv = SparseMatrix(Matrix(A).inv()) + assert A*Ainv == sparse_eye(3) + assert A.inv(method="CH") == Ainv + assert A.inv(method="LDL") == Ainv + + # test_cross + v1 = Matrix(1, 3, [1, 2, 3]) + v2 = Matrix(1, 3, [3, 4, 5]) + assert v1.cross(v2) == Matrix(1, 3, [-2, 4, -2]) + assert v1.norm(2)**2 == 14 + + # conjugate + a = SparseMatrix(((1, 2 + I), (3, 4))) + assert a.C == SparseMatrix([ + [1, 2 - I], + [3, 4] + ]) + + # mul + assert a*Matrix(2, 2, [1, 0, 0, 1]) == a + assert a + Matrix(2, 2, [1, 1, 1, 1]) == SparseMatrix([ + [2, 3 + I], + [4, 5] + ]) + + # col join + assert a.col_join(sparse_eye(2)) == SparseMatrix([ + [1, 2 + I], + [3, 4], + [1, 0], + [0, 1] + ]) + + # row insert + assert a.row_insert(2, sparse_eye(2)) == SparseMatrix([ + [1, 2 + I], + [3, 4], + [1, 0], + [0, 1] + ]) + + # col insert + assert a.col_insert(2, SparseMatrix.zeros(2, 1)) == SparseMatrix([ + [1, 2 + I, 0], + [3, 4, 0], + ]) + + # symmetric + assert not a.is_symmetric(simplify=False) + + # col op + M = SparseMatrix.eye(3)*2 + M[1, 0] = -1 + M.col_op(1, lambda v, i: v + 2*M[i, 0]) + assert M == SparseMatrix([ + [ 2, 4, 0], + [-1, 0, 0], + [ 0, 0, 2] + ]) + + # fill + M = SparseMatrix.eye(3) + M.fill(2) + assert M == SparseMatrix([ + [2, 2, 2], + [2, 2, 2], + [2, 2, 2], + ]) + + # test_cofactor + assert sparse_eye(3) == sparse_eye(3).cofactor_matrix() + test = SparseMatrix([[1, 3, 2], [2, 6, 3], [2, 3, 6]]) + assert test.cofactor_matrix() == \ + SparseMatrix([[27, -6, -6], [-12, 2, 3], [-3, 1, 0]]) + test = SparseMatrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]]) + assert test.cofactor_matrix() == \ + SparseMatrix([[-3, 6, -3], [6, -12, 6], [-3, 6, -3]]) + + # test_jacobian + x = Symbol('x') + y = Symbol('y') + L = SparseMatrix(1, 2, [x**2*y, 2*y**2 + x*y]) + syms = [x, y] + assert L.jacobian(syms) == Matrix([[2*x*y, x**2], [y, 4*y + x]]) + + L = SparseMatrix(1, 2, [x, x**2*y**3]) + assert L.jacobian(syms) == SparseMatrix([[1, 0], [2*x*y**3, x**2*3*y**2]]) + + # test_QR + A = Matrix([[1, 2], [2, 3]]) + Q, S = A.QRdecomposition() + R = Rational + assert Q == Matrix([ + [ 5**R(-1, 2), (R(2)/5)*(R(1)/5)**R(-1, 2)], + [2*5**R(-1, 2), (-R(1)/5)*(R(1)/5)**R(-1, 2)]]) + assert S == Matrix([ + [5**R(1, 2), 8*5**R(-1, 2)], + [ 0, (R(1)/5)**R(1, 2)]]) + assert Q*S == A + assert Q.T * Q == sparse_eye(2) + + R = Rational + # test nullspace + # first test reduced row-ech form + + M = SparseMatrix([[5, 7, 2, 1], + [1, 6, 2, -1]]) + out, tmp = M.rref() + assert out == Matrix([[1, 0, -R(2)/23, R(13)/23], + [0, 1, R(8)/23, R(-6)/23]]) + + M = SparseMatrix([[ 1, 3, 0, 2, 6, 3, 1], + [-2, -6, 0, -2, -8, 3, 1], + [ 3, 9, 0, 0, 6, 6, 2], + [-1, -3, 0, 1, 0, 9, 3]]) + + out, tmp = M.rref() + assert out == Matrix([[1, 3, 0, 0, 2, 0, 0], + [0, 0, 0, 1, 2, 0, 0], + [0, 0, 0, 0, 0, 1, R(1)/3], + [0, 0, 0, 0, 0, 0, 0]]) + # now check the vectors + basis = M.nullspace() + assert basis[0] == Matrix([-3, 1, 0, 0, 0, 0, 0]) + assert basis[1] == Matrix([0, 0, 1, 0, 0, 0, 0]) + assert basis[2] == Matrix([-2, 0, 0, -2, 1, 0, 0]) + assert basis[3] == Matrix([0, 0, 0, 0, 0, R(-1)/3, 1]) + + # test eigen + x = Symbol('x') + y = Symbol('y') + sparse_eye3 = sparse_eye(3) + assert sparse_eye3.charpoly(x) == PurePoly((x - 1)**3) + assert sparse_eye3.charpoly(y) == PurePoly((y - 1)**3) + + # test values + M = Matrix([( 0, 1, -1), + ( 1, 1, 0), + (-1, 0, 1)]) + vals = M.eigenvals() + assert sorted(vals.keys()) == [-1, 1, 2] + + R = Rational + M = Matrix([[1, 0, 0], + [0, 1, 0], + [0, 0, 1]]) + assert M.eigenvects() == [(1, 3, [ + Matrix([1, 0, 0]), + Matrix([0, 1, 0]), + Matrix([0, 0, 1])])] + M = Matrix([[5, 0, 2], + [3, 2, 0], + [0, 0, 1]]) + assert M.eigenvects() == [(1, 1, [Matrix([R(-1)/2, R(3)/2, 1])]), + (2, 1, [Matrix([0, 1, 0])]), + (5, 1, [Matrix([1, 1, 0])])] + + assert M.zeros(3, 5) == SparseMatrix(3, 5, {}) + A = SparseMatrix(10, 10, {(0, 0): 18, (0, 9): 12, (1, 4): 18, (2, 7): 16, (3, 9): 12, (4, 2): 19, (5, 7): 16, (6, 2): 12, (9, 7): 18}) + assert A.row_list() == [(0, 0, 18), (0, 9, 12), (1, 4, 18), (2, 7, 16), (3, 9, 12), (4, 2, 19), (5, 7, 16), (6, 2, 12), (9, 7, 18)] + assert A.col_list() == [(0, 0, 18), (4, 2, 19), (6, 2, 12), (1, 4, 18), (2, 7, 16), (5, 7, 16), (9, 7, 18), (0, 9, 12), (3, 9, 12)] + assert SparseMatrix.eye(2).nnz() == 2 + + +def test_scalar_multiply(): + assert SparseMatrix([[1, 2]]).scalar_multiply(3) == SparseMatrix([[3, 6]]) + + +def test_transpose(): + assert SparseMatrix(((1, 2), (3, 4))).transpose() == \ + SparseMatrix(((1, 3), (2, 4))) + + +def test_trace(): + assert SparseMatrix(((1, 2), (3, 4))).trace() == 5 + assert SparseMatrix(((0, 0), (0, 4))).trace() == 4 + + +def test_CL_RL(): + assert SparseMatrix(((1, 2), (3, 4))).row_list() == \ + [(0, 0, 1), (0, 1, 2), (1, 0, 3), (1, 1, 4)] + assert SparseMatrix(((1, 2), (3, 4))).col_list() == \ + [(0, 0, 1), (1, 0, 3), (0, 1, 2), (1, 1, 4)] + + +def test_add(): + assert SparseMatrix(((1, 0), (0, 1))) + SparseMatrix(((0, 1), (1, 0))) == \ + SparseMatrix(((1, 1), (1, 1))) + a = SparseMatrix(100, 100, lambda i, j: int(j != 0 and i % j == 0)) + b = SparseMatrix(100, 100, lambda i, j: int(i != 0 and j % i == 0)) + assert (len(a.todok()) + len(b.todok()) - len((a + b).todok()) > 0) + + +def test_errors(): + raises(ValueError, lambda: SparseMatrix(1.4, 2, lambda i, j: 0)) + raises(TypeError, lambda: SparseMatrix([1, 2, 3], [1, 2])) + raises(ValueError, lambda: SparseMatrix([[1, 2], [3, 4]])[(1, 2, 3)]) + raises(IndexError, lambda: SparseMatrix([[1, 2], [3, 4]])[5]) + raises(ValueError, lambda: SparseMatrix([[1, 2], [3, 4]])[1, 2, 3]) + raises(TypeError, + lambda: SparseMatrix([[1, 2], [3, 4]]).copyin_list([0, 1], set())) + raises( + IndexError, lambda: SparseMatrix([[1, 2], [3, 4]])[1, 2]) + raises(TypeError, lambda: SparseMatrix([1, 2, 3]).cross(1)) + raises(IndexError, lambda: SparseMatrix(1, 2, [1, 2])[3]) + raises(ShapeError, + lambda: SparseMatrix(1, 2, [1, 2]) + SparseMatrix(2, 1, [2, 1])) + + +def test_len(): + assert not SparseMatrix() + assert SparseMatrix() == SparseMatrix([]) + assert SparseMatrix() == SparseMatrix([[]]) + + +def test_sparse_zeros_sparse_eye(): + assert SparseMatrix.eye(3) == eye(3, cls=SparseMatrix) + assert len(SparseMatrix.eye(3).todok()) == 3 + assert SparseMatrix.zeros(3) == zeros(3, cls=SparseMatrix) + assert len(SparseMatrix.zeros(3).todok()) == 0 + + +def test_copyin(): + s = SparseMatrix(3, 3, {}) + s[1, 0] = 1 + assert s[:, 0] == SparseMatrix(Matrix([0, 1, 0])) + assert s[3] == 1 + assert s[3: 4] == [1] + s[1, 1] = 42 + assert s[1, 1] == 42 + assert s[1, 1:] == SparseMatrix([[42, 0]]) + s[1, 1:] = Matrix([[5, 6]]) + assert s[1, :] == SparseMatrix([[1, 5, 6]]) + s[1, 1:] = [[42, 43]] + assert s[1, :] == SparseMatrix([[1, 42, 43]]) + s[0, 0] = 17 + assert s[:, :1] == SparseMatrix([17, 1, 0]) + s[0, 0] = [1, 1, 1] + assert s[:, 0] == SparseMatrix([1, 1, 1]) + s[0, 0] = Matrix([1, 1, 1]) + assert s[:, 0] == SparseMatrix([1, 1, 1]) + s[0, 0] = SparseMatrix([1, 1, 1]) + assert s[:, 0] == SparseMatrix([1, 1, 1]) + + +def test_sparse_solve(): + A = SparseMatrix(((25, 15, -5), (15, 18, 0), (-5, 0, 11))) + assert A.cholesky() == Matrix([ + [ 5, 0, 0], + [ 3, 3, 0], + [-1, 1, 3]]) + assert A.cholesky() * A.cholesky().T == Matrix([ + [25, 15, -5], + [15, 18, 0], + [-5, 0, 11]]) + + A = SparseMatrix(((25, 15, -5), (15, 18, 0), (-5, 0, 11))) + L, D = A.LDLdecomposition() + assert 15*L == Matrix([ + [15, 0, 0], + [ 9, 15, 0], + [-3, 5, 15]]) + assert D == Matrix([ + [25, 0, 0], + [ 0, 9, 0], + [ 0, 0, 9]]) + assert L * D * L.T == A + + A = SparseMatrix(((3, 0, 2), (0, 0, 1), (1, 2, 0))) + assert A.inv() * A == SparseMatrix(eye(3)) + + A = SparseMatrix([ + [ 2, -1, 0], + [-1, 2, -1], + [ 0, 0, 2]]) + ans = SparseMatrix([ + [Rational(2, 3), Rational(1, 3), Rational(1, 6)], + [Rational(1, 3), Rational(2, 3), Rational(1, 3)], + [ 0, 0, S.Half]]) + assert A.inv(method='CH') == ans + assert A.inv(method='LDL') == ans + assert A * ans == SparseMatrix(eye(3)) + + s = A.solve(A[:, 0], 'LDL') + assert A*s == A[:, 0] + s = A.solve(A[:, 0], 'CH') + assert A*s == A[:, 0] + A = A.col_join(A) + s = A.solve_least_squares(A[:, 0], 'CH') + assert A*s == A[:, 0] + s = A.solve_least_squares(A[:, 0], 'LDL') + assert A*s == A[:, 0] + + +def test_lower_triangular_solve(): + raises(NonSquareMatrixError, lambda: + SparseMatrix([[1, 2]]).lower_triangular_solve(Matrix([[1, 2]]))) + raises(ShapeError, lambda: + SparseMatrix([[1, 2], [0, 4]]).lower_triangular_solve(Matrix([1]))) + raises(ValueError, lambda: + SparseMatrix([[1, 2], [3, 4]]).lower_triangular_solve(Matrix([[1, 2], [3, 4]]))) + + a, b, c, d = symbols('a:d') + u, v, w, x = symbols('u:x') + + A = SparseMatrix([[a, 0], [c, d]]) + B = MutableSparseMatrix([[u, v], [w, x]]) + C = ImmutableSparseMatrix([[u, v], [w, x]]) + + sol = Matrix([[u/a, v/a], [(w - c*u/a)/d, (x - c*v/a)/d]]) + assert A.lower_triangular_solve(B) == sol + assert A.lower_triangular_solve(C) == sol + + +def test_upper_triangular_solve(): + raises(NonSquareMatrixError, lambda: + SparseMatrix([[1, 2]]).upper_triangular_solve(Matrix([[1, 2]]))) + raises(ShapeError, lambda: + SparseMatrix([[1, 2], [0, 4]]).upper_triangular_solve(Matrix([1]))) + raises(TypeError, lambda: + SparseMatrix([[1, 2], [3, 4]]).upper_triangular_solve(Matrix([[1, 2], [3, 4]]))) + + a, b, c, d = symbols('a:d') + u, v, w, x = symbols('u:x') + + A = SparseMatrix([[a, b], [0, d]]) + B = MutableSparseMatrix([[u, v], [w, x]]) + C = ImmutableSparseMatrix([[u, v], [w, x]]) + + sol = Matrix([[(u - b*w/d)/a, (v - b*x/d)/a], [w/d, x/d]]) + assert A.upper_triangular_solve(B) == sol + assert A.upper_triangular_solve(C) == sol + + +def test_diagonal_solve(): + a, d = symbols('a d') + u, v, w, x = symbols('u:x') + + A = SparseMatrix([[a, 0], [0, d]]) + B = MutableSparseMatrix([[u, v], [w, x]]) + C = ImmutableSparseMatrix([[u, v], [w, x]]) + + sol = Matrix([[u/a, v/a], [w/d, x/d]]) + assert A.diagonal_solve(B) == sol + assert A.diagonal_solve(C) == sol + + +def test_hermitian(): + x = Symbol('x') + a = SparseMatrix([[0, I], [-I, 0]]) + assert a.is_hermitian + a = SparseMatrix([[1, I], [-I, 1]]) + assert a.is_hermitian + a[0, 0] = 2*I + assert a.is_hermitian is False + a[0, 0] = x + assert a.is_hermitian is None + a[0, 1] = a[1, 0]*I + assert a.is_hermitian is False diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_sparsetools.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_sparsetools.py new file mode 100644 index 0000000000000000000000000000000000000000..244944c31da06460d4bc7beff8bce0f91fea9f14 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_sparsetools.py @@ -0,0 +1,132 @@ +from sympy.matrices.sparsetools import _doktocsr, _csrtodok, banded +from sympy.matrices.dense import (Matrix, eye, ones, zeros) +from sympy.matrices import SparseMatrix +from sympy.testing.pytest import raises + + +def test_doktocsr(): + a = SparseMatrix([[1, 2, 0, 0], [0, 3, 9, 0], [0, 1, 4, 0]]) + b = SparseMatrix(4, 6, [10, 20, 0, 0, 0, 0, 0, 30, 0, 40, 0, 0, 0, 0, 50, + 60, 70, 0, 0, 0, 0, 0, 0, 80]) + c = SparseMatrix(4, 4, [0, 0, 0, 0, 0, 12, 0, 2, 15, 0, 12, 0, 0, 0, 0, 4]) + d = SparseMatrix(10, 10, {(1, 1): 12, (3, 5): 7, (7, 8): 12}) + e = SparseMatrix([[0, 0, 0], [1, 0, 2], [3, 0, 0]]) + f = SparseMatrix(7, 8, {(2, 3): 5, (4, 5):12}) + assert _doktocsr(a) == [[1, 2, 3, 9, 1, 4], [0, 1, 1, 2, 1, 2], + [0, 2, 4, 6], [3, 4]] + assert _doktocsr(b) == [[10, 20, 30, 40, 50, 60, 70, 80], + [0, 1, 1, 3, 2, 3, 4, 5], [0, 2, 4, 7, 8], [4, 6]] + assert _doktocsr(c) == [[12, 2, 15, 12, 4], [1, 3, 0, 2, 3], + [0, 0, 2, 4, 5], [4, 4]] + assert _doktocsr(d) == [[12, 7, 12], [1, 5, 8], + [0, 0, 1, 1, 2, 2, 2, 2, 3, 3, 3], [10, 10]] + assert _doktocsr(e) == [[1, 2, 3], [0, 2, 0], [0, 0, 2, 3], [3, 3]] + assert _doktocsr(f) == [[5, 12], [3, 5], [0, 0, 0, 1, 1, 2, 2, 2], [7, 8]] + + +def test_csrtodok(): + h = [[5, 7, 5], [2, 1, 3], [0, 1, 1, 3], [3, 4]] + g = [[12, 5, 4], [2, 4, 2], [0, 1, 2, 3], [3, 7]] + i = [[1, 3, 12], [0, 2, 4], [0, 2, 3], [2, 5]] + j = [[11, 15, 12, 15], [2, 4, 1, 2], [0, 1, 1, 2, 3, 4], [5, 8]] + k = [[1, 3], [2, 1], [0, 1, 1, 2], [3, 3]] + m = _csrtodok(h) + assert isinstance(m, SparseMatrix) + assert m == SparseMatrix(3, 4, + {(0, 2): 5, (2, 1): 7, (2, 3): 5}) + assert _csrtodok(g) == SparseMatrix(3, 7, + {(0, 2): 12, (1, 4): 5, (2, 2): 4}) + assert _csrtodok(i) == SparseMatrix([[1, 0, 3, 0, 0], [0, 0, 0, 0, 12]]) + assert _csrtodok(j) == SparseMatrix(5, 8, + {(0, 2): 11, (2, 4): 15, (3, 1): 12, (4, 2): 15}) + assert _csrtodok(k) == SparseMatrix(3, 3, {(0, 2): 1, (2, 1): 3}) + + +def test_banded(): + raises(TypeError, lambda: banded()) + raises(TypeError, lambda: banded(1)) + raises(TypeError, lambda: banded(1, 2)) + raises(TypeError, lambda: banded(1, 2, 3)) + raises(TypeError, lambda: banded(1, 2, 3, 4)) + raises(ValueError, lambda: banded({0: (1, 2)}, rows=1)) + raises(ValueError, lambda: banded({0: (1, 2)}, cols=1)) + raises(ValueError, lambda: banded(1, {0: (1, 2)})) + raises(ValueError, lambda: banded(2, 1, {0: (1, 2)})) + raises(ValueError, lambda: banded(1, 2, {0: (1, 2)})) + + assert isinstance(banded(2, 4, {}), SparseMatrix) + assert banded(2, 4, {}) == zeros(2, 4) + assert banded({0: 0, 1: 0}) == zeros(0) + assert banded({0: Matrix([1, 2])}) == Matrix([1, 2]) + assert banded({1: [1, 2, 3, 0], -1: [4, 5, 6]}) == \ + banded({1: (1, 2, 3), -1: (4, 5, 6)}) == \ + Matrix([ + [0, 1, 0, 0], + [4, 0, 2, 0], + [0, 5, 0, 3], + [0, 0, 6, 0]]) + assert banded(3, 4, {-1: 1, 0: 2, 1: 3}) == \ + Matrix([ + [2, 3, 0, 0], + [1, 2, 3, 0], + [0, 1, 2, 3]]) + s = lambda d: (1 + d)**2 + assert banded(5, {0: s, 2: s}) == \ + Matrix([ + [1, 0, 1, 0, 0], + [0, 4, 0, 4, 0], + [0, 0, 9, 0, 9], + [0, 0, 0, 16, 0], + [0, 0, 0, 0, 25]]) + assert banded(2, {0: 1}) == \ + Matrix([ + [1, 0], + [0, 1]]) + assert banded(2, 3, {0: 1}) == \ + Matrix([ + [1, 0, 0], + [0, 1, 0]]) + vert = Matrix([1, 2, 3]) + assert banded({0: vert}, cols=3) == \ + Matrix([ + [1, 0, 0], + [2, 1, 0], + [3, 2, 1], + [0, 3, 2], + [0, 0, 3]]) + assert banded(4, {0: ones(2)}) == \ + Matrix([ + [1, 1, 0, 0], + [1, 1, 0, 0], + [0, 0, 1, 1], + [0, 0, 1, 1]]) + raises(ValueError, lambda: banded({0: 2, 1: ones(2)}, rows=5)) + assert banded({0: 2, 2: (ones(2),)*3}) == \ + Matrix([ + [2, 0, 1, 1, 0, 0, 0, 0], + [0, 2, 1, 1, 0, 0, 0, 0], + [0, 0, 2, 0, 1, 1, 0, 0], + [0, 0, 0, 2, 1, 1, 0, 0], + [0, 0, 0, 0, 2, 0, 1, 1], + [0, 0, 0, 0, 0, 2, 1, 1]]) + raises(ValueError, lambda: banded({0: (2,)*5, 1: (ones(2),)*3})) + u2 = Matrix([[1, 1], [0, 1]]) + assert banded({0: (2,)*5, 1: (u2,)*3}) == \ + Matrix([ + [2, 1, 1, 0, 0, 0, 0], + [0, 2, 1, 0, 0, 0, 0], + [0, 0, 2, 1, 1, 0, 0], + [0, 0, 0, 2, 1, 0, 0], + [0, 0, 0, 0, 2, 1, 1], + [0, 0, 0, 0, 0, 0, 1]]) + assert banded({0:(0, ones(2)), 2: 2}) == \ + Matrix([ + [0, 0, 2], + [0, 1, 1], + [0, 1, 1]]) + raises(ValueError, lambda: banded({0: (0, ones(2)), 1: 2})) + assert banded({0: 1}, cols=3) == banded({0: 1}, rows=3) == eye(3) + assert banded({1: 1}, rows=3) == Matrix([ + [0, 1, 0], + [0, 0, 1], + [0, 0, 0]]) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_subspaces.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_subspaces.py new file mode 100644 index 0000000000000000000000000000000000000000..0bd853e321eb06f754c17e7bd0c11deb870506f5 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/tests/test_subspaces.py @@ -0,0 +1,109 @@ +from sympy.matrices import Matrix +from sympy.core.numbers import Rational +from sympy.core.symbol import symbols +from sympy.solvers import solve + + +def test_columnspace_one(): + m = Matrix([[ 1, 2, 0, 2, 5], + [-2, -5, 1, -1, -8], + [ 0, -3, 3, 4, 1], + [ 3, 6, 0, -7, 2]]) + + basis = m.columnspace() + assert basis[0] == Matrix([1, -2, 0, 3]) + assert basis[1] == Matrix([2, -5, -3, 6]) + assert basis[2] == Matrix([2, -1, 4, -7]) + + assert len(basis) == 3 + assert Matrix.hstack(m, *basis).columnspace() == basis + + +def test_rowspace(): + m = Matrix([[ 1, 2, 0, 2, 5], + [-2, -5, 1, -1, -8], + [ 0, -3, 3, 4, 1], + [ 3, 6, 0, -7, 2]]) + + basis = m.rowspace() + assert basis[0] == Matrix([[1, 2, 0, 2, 5]]) + assert basis[1] == Matrix([[0, -1, 1, 3, 2]]) + assert basis[2] == Matrix([[0, 0, 0, 5, 5]]) + + assert len(basis) == 3 + + +def test_nullspace_one(): + m = Matrix([[ 1, 2, 0, 2, 5], + [-2, -5, 1, -1, -8], + [ 0, -3, 3, 4, 1], + [ 3, 6, 0, -7, 2]]) + + basis = m.nullspace() + assert basis[0] == Matrix([-2, 1, 1, 0, 0]) + assert basis[1] == Matrix([-1, -1, 0, -1, 1]) + # make sure the null space is really gets zeroed + assert all(e.is_zero for e in m*basis[0]) + assert all(e.is_zero for e in m*basis[1]) + +def test_nullspace_second(): + # first test reduced row-ech form + R = Rational + + M = Matrix([[5, 7, 2, 1], + [1, 6, 2, -1]]) + out, tmp = M.rref() + assert out == Matrix([[1, 0, -R(2)/23, R(13)/23], + [0, 1, R(8)/23, R(-6)/23]]) + + M = Matrix([[-5, -1, 4, -3, -1], + [ 1, -1, -1, 1, 0], + [-1, 0, 0, 0, 0], + [ 4, 1, -4, 3, 1], + [-2, 0, 2, -2, -1]]) + assert M*M.nullspace()[0] == Matrix(5, 1, [0]*5) + + M = Matrix([[ 1, 3, 0, 2, 6, 3, 1], + [-2, -6, 0, -2, -8, 3, 1], + [ 3, 9, 0, 0, 6, 6, 2], + [-1, -3, 0, 1, 0, 9, 3]]) + out, tmp = M.rref() + assert out == Matrix([[1, 3, 0, 0, 2, 0, 0], + [0, 0, 0, 1, 2, 0, 0], + [0, 0, 0, 0, 0, 1, R(1)/3], + [0, 0, 0, 0, 0, 0, 0]]) + + # now check the vectors + basis = M.nullspace() + assert basis[0] == Matrix([-3, 1, 0, 0, 0, 0, 0]) + assert basis[1] == Matrix([0, 0, 1, 0, 0, 0, 0]) + assert basis[2] == Matrix([-2, 0, 0, -2, 1, 0, 0]) + assert basis[3] == Matrix([0, 0, 0, 0, 0, R(-1)/3, 1]) + + # issue 4797; just see that we can do it when rows > cols + M = Matrix([[1, 2], [2, 4], [3, 6]]) + assert M.nullspace() + + +def test_columnspace_second(): + M = Matrix([[ 1, 2, 0, 2, 5], + [-2, -5, 1, -1, -8], + [ 0, -3, 3, 4, 1], + [ 3, 6, 0, -7, 2]]) + + # now check the vectors + basis = M.columnspace() + assert basis[0] == Matrix([1, -2, 0, 3]) + assert basis[1] == Matrix([2, -5, -3, 6]) + assert basis[2] == Matrix([2, -1, 4, -7]) + + #check by columnspace definition + a, b, c, d, e = symbols('a b c d e') + X = Matrix([a, b, c, d, e]) + for i in range(len(basis)): + eq=M*X-basis[i] + assert len(solve(eq, X)) != 0 + + #check if rank-nullity theorem holds + assert M.rank() == len(basis) + assert len(M.nullspace()) + len(M.columnspace()) == M.cols diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/utilities.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/utilities.py new file mode 100644 index 0000000000000000000000000000000000000000..b8a680b47e63615e210e561639a192ba47c642d3 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/matrices/utilities.py @@ -0,0 +1,72 @@ +from contextlib import contextmanager +from threading import local + +from sympy.core.function import expand_mul + + +class DotProdSimpState(local): + def __init__(self): + self.state = None + +_dotprodsimp_state = DotProdSimpState() + +@contextmanager +def dotprodsimp(x): + old = _dotprodsimp_state.state + + try: + _dotprodsimp_state.state = x + yield + finally: + _dotprodsimp_state.state = old + + +def _dotprodsimp(expr, withsimp=False): + """Wrapper for simplify.dotprodsimp to avoid circular imports.""" + from sympy.simplify.simplify import dotprodsimp as dps + return dps(expr, withsimp=withsimp) + + +def _get_intermediate_simp(deffunc=lambda x: x, offfunc=lambda x: x, + onfunc=_dotprodsimp, dotprodsimp=None): + """Support function for controlling intermediate simplification. Returns a + simplification function according to the global setting of dotprodsimp + operation. + + ``deffunc`` - Function to be used by default. + ``offfunc`` - Function to be used if dotprodsimp has been turned off. + ``onfunc`` - Function to be used if dotprodsimp has been turned on. + ``dotprodsimp`` - True, False or None. Will be overridden by global + _dotprodsimp_state.state if that is not None. + """ + + if dotprodsimp is False or _dotprodsimp_state.state is False: + return offfunc + if dotprodsimp is True or _dotprodsimp_state.state is True: + return onfunc + + return deffunc # None, None + + +def _get_intermediate_simp_bool(default=False, dotprodsimp=None): + """Same as ``_get_intermediate_simp`` but returns bools instead of functions + by default.""" + + return _get_intermediate_simp(default, False, True, dotprodsimp) + + +def _iszero(x): + """Returns True if x is zero.""" + return getattr(x, 'is_zero', None) + + +def _is_zero_after_expand_mul(x): + """Tests by expand_mul only, suitable for polynomials and rational + functions.""" + return expand_mul(x) == 0 + + +def _simplify(expr): + """ Wrapper to avoid circular imports. """ + from sympy.simplify.simplify import simplify + return simplify(expr) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..5447651645e3e2e92df3002822e87a773ade0df8 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/__init__.py @@ -0,0 +1,11 @@ +from .core import dispatch +from .dispatcher import (Dispatcher, halt_ordering, restart_ordering, + MDNotImplementedError) + +__version__ = '0.4.9' + +__all__ = [ + 'dispatch', + + 'Dispatcher', 'halt_ordering', 'restart_ordering', 'MDNotImplementedError', +] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/conflict.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/conflict.py new file mode 100644 index 0000000000000000000000000000000000000000..98c6742c9c03860233ef0004b241ea3944ac6d4d --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/conflict.py @@ -0,0 +1,68 @@ +from .utils import _toposort, groupby + +class AmbiguityWarning(Warning): + pass + + +def supercedes(a, b): + """ A is consistent and strictly more specific than B """ + return len(a) == len(b) and all(map(issubclass, a, b)) + + +def consistent(a, b): + """ It is possible for an argument list to satisfy both A and B """ + return (len(a) == len(b) and + all(issubclass(aa, bb) or issubclass(bb, aa) + for aa, bb in zip(a, b))) + + +def ambiguous(a, b): + """ A is consistent with B but neither is strictly more specific """ + return consistent(a, b) and not (supercedes(a, b) or supercedes(b, a)) + + +def ambiguities(signatures): + """ All signature pairs such that A is ambiguous with B """ + signatures = list(map(tuple, signatures)) + return {(a, b) for a in signatures for b in signatures + if hash(a) < hash(b) + and ambiguous(a, b) + and not any(supercedes(c, a) and supercedes(c, b) + for c in signatures)} + + +def super_signature(signatures): + """ A signature that would break ambiguities """ + n = len(signatures[0]) + assert all(len(s) == n for s in signatures) + + return [max([type.mro(sig[i]) for sig in signatures], key=len)[0] + for i in range(n)] + + +def edge(a, b, tie_breaker=hash): + """ A should be checked before B + + Tie broken by tie_breaker, defaults to ``hash`` + """ + if supercedes(a, b): + if supercedes(b, a): + return tie_breaker(a) > tie_breaker(b) + else: + return True + return False + + +def ordering(signatures): + """ A sane ordering of signatures to check, first to last + + Topoological sort of edges as given by ``edge`` and ``supercedes`` + """ + signatures = list(map(tuple, signatures)) + edges = [(a, b) for a in signatures for b in signatures if edge(a, b)] + edges = groupby(lambda x: x[0], edges) + for s in signatures: + if s not in edges: + edges[s] = [] + edges = {k: [b for a, b in v] for k, v in edges.items()} + return _toposort(edges) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/core.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/core.py new file mode 100644 index 0000000000000000000000000000000000000000..2856ff728c4eb97c5a59fffabddb4bf3c8b4baf2 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/core.py @@ -0,0 +1,83 @@ +from __future__ import annotations +from typing import Any + +import inspect + +from .dispatcher import Dispatcher, MethodDispatcher, ambiguity_warn + +# XXX: This parameter to dispatch isn't documented and isn't used anywhere in +# sympy. Maybe it should just be removed. +global_namespace: dict[str, Any] = {} + + +def dispatch(*types, namespace=global_namespace, on_ambiguity=ambiguity_warn): + """ Dispatch function on the types of the inputs + + Supports dispatch on all non-keyword arguments. + + Collects implementations based on the function name. Ignores namespaces. + + If ambiguous type signatures occur a warning is raised when the function is + defined suggesting the additional method to break the ambiguity. + + Examples + -------- + + >>> from sympy.multipledispatch import dispatch + >>> @dispatch(int) + ... def f(x): + ... return x + 1 + + >>> @dispatch(float) + ... def f(x): # noqa: F811 + ... return x - 1 + + >>> f(3) + 4 + >>> f(3.0) + 2.0 + + Specify an isolated namespace with the namespace keyword argument + + >>> my_namespace = dict() + >>> @dispatch(int, namespace=my_namespace) + ... def foo(x): + ... return x + 1 + + Dispatch on instance methods within classes + + >>> class MyClass(object): + ... @dispatch(list) + ... def __init__(self, data): + ... self.data = data + ... @dispatch(int) + ... def __init__(self, datum): # noqa: F811 + ... self.data = [datum] + """ + types = tuple(types) + + def _(func): + name = func.__name__ + + if ismethod(func): + dispatcher = inspect.currentframe().f_back.f_locals.get( + name, + MethodDispatcher(name)) + else: + if name not in namespace: + namespace[name] = Dispatcher(name) + dispatcher = namespace[name] + + dispatcher.add(types, func, on_ambiguity=on_ambiguity) + return dispatcher + return _ + + +def ismethod(func): + """ Is func a method? + + Note that this has to work as the method is defined but before the class is + defined. At this stage methods look like functions. + """ + signature = inspect.signature(func) + return signature.parameters.get('self', None) is not None diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/dispatcher.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/dispatcher.py new file mode 100644 index 0000000000000000000000000000000000000000..89471d678e1c330138a91ec6a41a324d29a037d7 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/dispatcher.py @@ -0,0 +1,413 @@ +from __future__ import annotations + +from warnings import warn +import inspect +from .conflict import ordering, ambiguities, super_signature, AmbiguityWarning +from .utils import expand_tuples +import itertools as itl + + +class MDNotImplementedError(NotImplementedError): + """ A NotImplementedError for multiple dispatch """ + + +### Functions for on_ambiguity + +def ambiguity_warn(dispatcher, ambiguities): + """ Raise warning when ambiguity is detected + + Parameters + ---------- + dispatcher : Dispatcher + The dispatcher on which the ambiguity was detected + ambiguities : set + Set of type signature pairs that are ambiguous within this dispatcher + + See Also: + Dispatcher.add + warning_text + """ + warn(warning_text(dispatcher.name, ambiguities), AmbiguityWarning) + + +class RaiseNotImplementedError: + """Raise ``NotImplementedError`` when called.""" + + def __init__(self, dispatcher): + self.dispatcher = dispatcher + + def __call__(self, *args, **kwargs): + types = tuple(type(a) for a in args) + raise NotImplementedError( + "Ambiguous signature for %s: <%s>" % ( + self.dispatcher.name, str_signature(types) + )) + +def ambiguity_register_error_ignore_dup(dispatcher, ambiguities): + """ + If super signature for ambiguous types is duplicate types, ignore it. + Else, register instance of ``RaiseNotImplementedError`` for ambiguous types. + + Parameters + ---------- + dispatcher : Dispatcher + The dispatcher on which the ambiguity was detected + ambiguities : set + Set of type signature pairs that are ambiguous within this dispatcher + + See Also: + Dispatcher.add + ambiguity_warn + """ + for amb in ambiguities: + signature = tuple(super_signature(amb)) + if len(set(signature)) == 1: + continue + dispatcher.add( + signature, RaiseNotImplementedError(dispatcher), + on_ambiguity=ambiguity_register_error_ignore_dup + ) + +### + + +_unresolved_dispatchers: set[Dispatcher] = set() +_resolve = [True] + + +def halt_ordering(): + _resolve[0] = False + + +def restart_ordering(on_ambiguity=ambiguity_warn): + _resolve[0] = True + while _unresolved_dispatchers: + dispatcher = _unresolved_dispatchers.pop() + dispatcher.reorder(on_ambiguity=on_ambiguity) + + +class Dispatcher: + """ Dispatch methods based on type signature + + Use ``dispatch`` to add implementations + + Examples + -------- + + >>> from sympy.multipledispatch import dispatch + >>> @dispatch(int) + ... def f(x): + ... return x + 1 + + >>> @dispatch(float) + ... def f(x): # noqa: F811 + ... return x - 1 + + >>> f(3) + 4 + >>> f(3.0) + 2.0 + """ + __slots__ = '__name__', 'name', 'funcs', 'ordering', '_cache', 'doc' + + def __init__(self, name, doc=None): + self.name = self.__name__ = name + self.funcs = {} + self._cache = {} + self.ordering = [] + self.doc = doc + + def register(self, *types, **kwargs): + """ Register dispatcher with new implementation + + >>> from sympy.multipledispatch.dispatcher import Dispatcher + >>> f = Dispatcher('f') + >>> @f.register(int) + ... def inc(x): + ... return x + 1 + + >>> @f.register(float) + ... def dec(x): + ... return x - 1 + + >>> @f.register(list) + ... @f.register(tuple) + ... def reverse(x): + ... return x[::-1] + + >>> f(1) + 2 + + >>> f(1.0) + 0.0 + + >>> f([1, 2, 3]) + [3, 2, 1] + """ + def _(func): + self.add(types, func, **kwargs) + return func + return _ + + @classmethod + def get_func_params(cls, func): + if hasattr(inspect, "signature"): + sig = inspect.signature(func) + return sig.parameters.values() + + @classmethod + def get_func_annotations(cls, func): + """ Get annotations of function positional parameters + """ + params = cls.get_func_params(func) + if params: + Parameter = inspect.Parameter + + params = (param for param in params + if param.kind in + (Parameter.POSITIONAL_ONLY, + Parameter.POSITIONAL_OR_KEYWORD)) + + annotations = tuple( + param.annotation + for param in params) + + if not any(ann is Parameter.empty for ann in annotations): + return annotations + + def add(self, signature, func, on_ambiguity=ambiguity_warn): + """ Add new types/method pair to dispatcher + + >>> from sympy.multipledispatch import Dispatcher + >>> D = Dispatcher('add') + >>> D.add((int, int), lambda x, y: x + y) + >>> D.add((float, float), lambda x, y: x + y) + + >>> D(1, 2) + 3 + >>> D(1, 2.0) + Traceback (most recent call last): + ... + NotImplementedError: Could not find signature for add: + + When ``add`` detects a warning it calls the ``on_ambiguity`` callback + with a dispatcher/itself, and a set of ambiguous type signature pairs + as inputs. See ``ambiguity_warn`` for an example. + """ + # Handle annotations + if not signature: + annotations = self.get_func_annotations(func) + if annotations: + signature = annotations + + # Handle union types + if any(isinstance(typ, tuple) for typ in signature): + for typs in expand_tuples(signature): + self.add(typs, func, on_ambiguity) + return + + for typ in signature: + if not isinstance(typ, type): + str_sig = ', '.join(c.__name__ if isinstance(c, type) + else str(c) for c in signature) + raise TypeError("Tried to dispatch on non-type: %s\n" + "In signature: <%s>\n" + "In function: %s" % + (typ, str_sig, self.name)) + + self.funcs[signature] = func + self.reorder(on_ambiguity=on_ambiguity) + self._cache.clear() + + def reorder(self, on_ambiguity=ambiguity_warn): + if _resolve[0]: + self.ordering = ordering(self.funcs) + amb = ambiguities(self.funcs) + if amb: + on_ambiguity(self, amb) + else: + _unresolved_dispatchers.add(self) + + def __call__(self, *args, **kwargs): + types = tuple([type(arg) for arg in args]) + try: + func = self._cache[types] + except KeyError: + func = self.dispatch(*types) + if not func: + raise NotImplementedError( + 'Could not find signature for %s: <%s>' % + (self.name, str_signature(types))) + self._cache[types] = func + try: + return func(*args, **kwargs) + + except MDNotImplementedError: + funcs = self.dispatch_iter(*types) + next(funcs) # burn first + for func in funcs: + try: + return func(*args, **kwargs) + except MDNotImplementedError: + pass + raise NotImplementedError("Matching functions for " + "%s: <%s> found, but none completed successfully" + % (self.name, str_signature(types))) + + def __str__(self): + return "" % self.name + __repr__ = __str__ + + def dispatch(self, *types): + """ Deterimine appropriate implementation for this type signature + + This method is internal. Users should call this object as a function. + Implementation resolution occurs within the ``__call__`` method. + + >>> from sympy.multipledispatch import dispatch + >>> @dispatch(int) + ... def inc(x): + ... return x + 1 + + >>> implementation = inc.dispatch(int) + >>> implementation(3) + 4 + + >>> print(inc.dispatch(float)) + None + + See Also: + ``sympy.multipledispatch.conflict`` - module to determine resolution order + """ + + if types in self.funcs: + return self.funcs[types] + + try: + return next(self.dispatch_iter(*types)) + except StopIteration: + return None + + def dispatch_iter(self, *types): + n = len(types) + for signature in self.ordering: + if len(signature) == n and all(map(issubclass, types, signature)): + result = self.funcs[signature] + yield result + + def resolve(self, types): + """ Deterimine appropriate implementation for this type signature + + .. deprecated:: 0.4.4 + Use ``dispatch(*types)`` instead + """ + warn("resolve() is deprecated, use dispatch(*types)", + DeprecationWarning) + + return self.dispatch(*types) + + def __getstate__(self): + return {'name': self.name, + 'funcs': self.funcs} + + def __setstate__(self, d): + self.name = d['name'] + self.funcs = d['funcs'] + self.ordering = ordering(self.funcs) + self._cache = {} + + @property + def __doc__(self): + docs = ["Multiply dispatched method: %s" % self.name] + + if self.doc: + docs.append(self.doc) + + other = [] + for sig in self.ordering[::-1]: + func = self.funcs[sig] + if func.__doc__: + s = 'Inputs: <%s>\n' % str_signature(sig) + s += '-' * len(s) + '\n' + s += func.__doc__.strip() + docs.append(s) + else: + other.append(str_signature(sig)) + + if other: + docs.append('Other signatures:\n ' + '\n '.join(other)) + + return '\n\n'.join(docs) + + def _help(self, *args): + return self.dispatch(*map(type, args)).__doc__ + + def help(self, *args, **kwargs): + """ Print docstring for the function corresponding to inputs """ + print(self._help(*args)) + + def _source(self, *args): + func = self.dispatch(*map(type, args)) + if not func: + raise TypeError("No function found") + return source(func) + + def source(self, *args, **kwargs): + """ Print source code for the function corresponding to inputs """ + print(self._source(*args)) + + +def source(func): + s = 'File: %s\n\n' % inspect.getsourcefile(func) + s = s + inspect.getsource(func) + return s + + +class MethodDispatcher(Dispatcher): + """ Dispatch methods based on type signature + + See Also: + Dispatcher + """ + + @classmethod + def get_func_params(cls, func): + if hasattr(inspect, "signature"): + sig = inspect.signature(func) + return itl.islice(sig.parameters.values(), 1, None) + + def __get__(self, instance, owner): + self.obj = instance + self.cls = owner + return self + + def __call__(self, *args, **kwargs): + types = tuple([type(arg) for arg in args]) + func = self.dispatch(*types) + if not func: + raise NotImplementedError('Could not find signature for %s: <%s>' % + (self.name, str_signature(types))) + return func(self.obj, *args, **kwargs) + + +def str_signature(sig): + """ String representation of type signature + + >>> from sympy.multipledispatch.dispatcher import str_signature + >>> str_signature((int, float)) + 'int, float' + """ + return ', '.join(cls.__name__ for cls in sig) + + +def warning_text(name, amb): + """ The text for ambiguity warnings """ + text = "\nAmbiguities exist in dispatched function %s\n\n" % (name) + text += "The following signatures may result in ambiguous behavior:\n" + for pair in amb: + text += "\t" + \ + ', '.join('[' + str_signature(s) + ']' for s in pair) + "\n" + text += "\n\nConsider making the following additions:\n\n" + text += '\n\n'.join(['@dispatch(' + str_signature(super_signature(s)) + + ')\ndef %s(...)' % name for s in amb]) + return text diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/tests/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_conflict.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_conflict.py new file mode 100644 index 0000000000000000000000000000000000000000..5d2292c460585ae2a65a01795b38499e67706ff0 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_conflict.py @@ -0,0 +1,62 @@ +from sympy.multipledispatch.conflict import (supercedes, ordering, ambiguities, + ambiguous, super_signature, consistent) + + +class A: pass +class B(A): pass +class C: pass + + +def test_supercedes(): + assert supercedes([B], [A]) + assert supercedes([B, A], [A, A]) + assert not supercedes([B, A], [A, B]) + assert not supercedes([A], [B]) + + +def test_consistent(): + assert consistent([A], [A]) + assert consistent([B], [B]) + assert not consistent([A], [C]) + assert consistent([A, B], [A, B]) + assert consistent([B, A], [A, B]) + assert not consistent([B, A], [B]) + assert not consistent([B, A], [B, C]) + + +def test_super_signature(): + assert super_signature([[A]]) == [A] + assert super_signature([[A], [B]]) == [B] + assert super_signature([[A, B], [B, A]]) == [B, B] + assert super_signature([[A, A, B], [A, B, A], [B, A, A]]) == [B, B, B] + + +def test_ambiguous(): + assert not ambiguous([A], [A]) + assert not ambiguous([A], [B]) + assert not ambiguous([B], [B]) + assert not ambiguous([A, B], [B, B]) + assert ambiguous([A, B], [B, A]) + + +def test_ambiguities(): + signatures = [[A], [B], [A, B], [B, A], [A, C]] + expected = {((A, B), (B, A))} + result = ambiguities(signatures) + assert set(map(frozenset, expected)) == set(map(frozenset, result)) + + signatures = [[A], [B], [A, B], [B, A], [A, C], [B, B]] + expected = set() + result = ambiguities(signatures) + assert set(map(frozenset, expected)) == set(map(frozenset, result)) + + +def test_ordering(): + signatures = [[A, A], [A, B], [B, A], [B, B], [A, C]] + ord = ordering(signatures) + assert ord[0] == (B, B) or ord[0] == (A, C) + assert ord[-1] == (A, A) or ord[-1] == (A, C) + + +def test_type_mro(): + assert super_signature([[object], [type]]) == [type] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_core.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_core.py new file mode 100644 index 0000000000000000000000000000000000000000..016270fecc8cda644fc71b5c310b1430b50361f6 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_core.py @@ -0,0 +1,213 @@ +from __future__ import annotations +from typing import Any + +from sympy.multipledispatch import dispatch +from sympy.multipledispatch.conflict import AmbiguityWarning +from sympy.testing.pytest import raises, warns +from functools import partial + +test_namespace: dict[str, Any] = {} + +orig_dispatch = dispatch +dispatch = partial(dispatch, namespace=test_namespace) + + +def test_singledispatch(): + @dispatch(int) + def f(x): # noqa:F811 + return x + 1 + + @dispatch(int) + def g(x): # noqa:F811 + return x + 2 + + @dispatch(float) # noqa:F811 + def f(x): # noqa:F811 + return x - 1 + + assert f(1) == 2 + assert g(1) == 3 + assert f(1.0) == 0 + + assert raises(NotImplementedError, lambda: f('hello')) + + +def test_multipledispatch(): + @dispatch(int, int) + def f(x, y): # noqa:F811 + return x + y + + @dispatch(float, float) # noqa:F811 + def f(x, y): # noqa:F811 + return x - y + + assert f(1, 2) == 3 + assert f(1.0, 2.0) == -1.0 + + +class A: pass +class B: pass +class C(A): pass +class D(C): pass +class E(C): pass + + +def test_inheritance(): + @dispatch(A) + def f(x): # noqa:F811 + return 'a' + + @dispatch(B) # noqa:F811 + def f(x): # noqa:F811 + return 'b' + + assert f(A()) == 'a' + assert f(B()) == 'b' + assert f(C()) == 'a' + + +def test_inheritance_and_multiple_dispatch(): + @dispatch(A, A) + def f(x, y): # noqa:F811 + return type(x), type(y) + + @dispatch(A, B) # noqa:F811 + def f(x, y): # noqa:F811 + return 0 + + assert f(A(), A()) == (A, A) + assert f(A(), C()) == (A, C) + assert f(A(), B()) == 0 + assert f(C(), B()) == 0 + assert raises(NotImplementedError, lambda: f(B(), B())) + + +def test_competing_solutions(): + @dispatch(A) + def h(x): # noqa:F811 + return 1 + + @dispatch(C) # noqa:F811 + def h(x): # noqa:F811 + return 2 + + assert h(D()) == 2 + + +def test_competing_multiple(): + @dispatch(A, B) + def h(x, y): # noqa:F811 + return 1 + + @dispatch(C, B) # noqa:F811 + def h(x, y): # noqa:F811 + return 2 + + assert h(D(), B()) == 2 + + +def test_competing_ambiguous(): + test_namespace = {} + dispatch = partial(orig_dispatch, namespace=test_namespace) + + @dispatch(A, C) + def f(x, y): # noqa:F811 + return 2 + + with warns(AmbiguityWarning, test_stacklevel=False): + @dispatch(C, A) # noqa:F811 + def f(x, y): # noqa:F811 + return 2 + + assert f(A(), C()) == f(C(), A()) == 2 + # assert raises(Warning, lambda : f(C(), C())) + + +def test_caching_correct_behavior(): + @dispatch(A) + def f(x): # noqa:F811 + return 1 + + assert f(C()) == 1 + + @dispatch(C) + def f(x): # noqa:F811 + return 2 + + assert f(C()) == 2 + + +def test_union_types(): + @dispatch((A, C)) + def f(x): # noqa:F811 + return 1 + + assert f(A()) == 1 + assert f(C()) == 1 + + +def test_namespaces(): + ns1 = {} + ns2 = {} + + def foo(x): + return 1 + foo1 = orig_dispatch(int, namespace=ns1)(foo) + + def foo(x): + return 2 + foo2 = orig_dispatch(int, namespace=ns2)(foo) + + assert foo1(0) == 1 + assert foo2(0) == 2 + + +""" +Fails +def test_dispatch_on_dispatch(): + @dispatch(A) + @dispatch(C) + def q(x): # noqa:F811 + return 1 + + assert q(A()) == 1 + assert q(C()) == 1 +""" + + +def test_methods(): + class Foo: + @dispatch(float) + def f(self, x): # noqa:F811 + return x - 1 + + @dispatch(int) # noqa:F811 + def f(self, x): # noqa:F811 + return x + 1 + + @dispatch(int) + def g(self, x): # noqa:F811 + return x + 3 + + + foo = Foo() + assert foo.f(1) == 2 + assert foo.f(1.0) == 0.0 + assert foo.g(1) == 4 + + +def test_methods_multiple_dispatch(): + class Foo: + @dispatch(A, A) + def f(x, y): # noqa:F811 + return 1 + + @dispatch(A, C) # noqa:F811 + def f(x, y): # noqa:F811 + return 2 + + + foo = Foo() + assert foo.f(A(), A()) == 1 + assert foo.f(A(), C()) == 2 + assert foo.f(C(), C()) == 2 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_dispatcher.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_dispatcher.py new file mode 100644 index 0000000000000000000000000000000000000000..e31ca8a5486b87eb43fc5e6f887caf50d6bfbe20 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/tests/test_dispatcher.py @@ -0,0 +1,284 @@ +from sympy.multipledispatch.dispatcher import (Dispatcher, MDNotImplementedError, + MethodDispatcher, halt_ordering, + restart_ordering, + ambiguity_register_error_ignore_dup) +from sympy.testing.pytest import raises, warns + + +def identity(x): + return x + + +def inc(x): + return x + 1 + + +def dec(x): + return x - 1 + + +def test_dispatcher(): + f = Dispatcher('f') + f.add((int,), inc) + f.add((float,), dec) + + with warns(DeprecationWarning, test_stacklevel=False): + assert f.resolve((int,)) == inc + assert f.dispatch(int) is inc + + assert f(1) == 2 + assert f(1.0) == 0.0 + + +def test_union_types(): + f = Dispatcher('f') + f.register((int, float))(inc) + + assert f(1) == 2 + assert f(1.0) == 2.0 + + +def test_dispatcher_as_decorator(): + f = Dispatcher('f') + + @f.register(int) + def inc(x): # noqa:F811 + return x + 1 + + @f.register(float) # noqa:F811 + def inc(x): # noqa:F811 + return x - 1 + + assert f(1) == 2 + assert f(1.0) == 0.0 + + +def test_register_instance_method(): + + class Test: + __init__ = MethodDispatcher('f') + + @__init__.register(list) + def _init_list(self, data): + self.data = data + + @__init__.register(object) + def _init_obj(self, datum): + self.data = [datum] + + a = Test(3) + b = Test([3]) + assert a.data == b.data + + +def test_on_ambiguity(): + f = Dispatcher('f') + + def identity(x): return x + + ambiguities = [False] + + def on_ambiguity(dispatcher, amb): + ambiguities[0] = True + + f.add((object, object), identity, on_ambiguity=on_ambiguity) + assert not ambiguities[0] + f.add((object, float), identity, on_ambiguity=on_ambiguity) + assert not ambiguities[0] + f.add((float, object), identity, on_ambiguity=on_ambiguity) + assert ambiguities[0] + + +def test_raise_error_on_non_class(): + f = Dispatcher('f') + assert raises(TypeError, lambda: f.add((1,), inc)) + + +def test_docstring(): + + def one(x, y): + """ Docstring number one """ + return x + y + + def two(x, y): + """ Docstring number two """ + return x + y + + def three(x, y): + return x + y + + master_doc = 'Doc of the multimethod itself' + + f = Dispatcher('f', doc=master_doc) + f.add((object, object), one) + f.add((int, int), two) + f.add((float, float), three) + + assert one.__doc__.strip() in f.__doc__ + assert two.__doc__.strip() in f.__doc__ + assert f.__doc__.find(one.__doc__.strip()) < \ + f.__doc__.find(two.__doc__.strip()) + assert 'object, object' in f.__doc__ + assert master_doc in f.__doc__ + + +def test_help(): + def one(x, y): + """ Docstring number one """ + return x + y + + def two(x, y): + """ Docstring number two """ + return x + y + + def three(x, y): + """ Docstring number three """ + return x + y + + master_doc = 'Doc of the multimethod itself' + + f = Dispatcher('f', doc=master_doc) + f.add((object, object), one) + f.add((int, int), two) + f.add((float, float), three) + + assert f._help(1, 1) == two.__doc__ + assert f._help(1.0, 2.0) == three.__doc__ + + +def test_source(): + def one(x, y): + """ Docstring number one """ + return x + y + + def two(x, y): + """ Docstring number two """ + return x - y + + master_doc = 'Doc of the multimethod itself' + + f = Dispatcher('f', doc=master_doc) + f.add((int, int), one) + f.add((float, float), two) + + assert 'x + y' in f._source(1, 1) + assert 'x - y' in f._source(1.0, 1.0) + + +def test_source_raises_on_missing_function(): + f = Dispatcher('f') + + assert raises(TypeError, lambda: f.source(1)) + + +def test_halt_method_resolution(): + g = [0] + + def on_ambiguity(a, b): + g[0] += 1 + + f = Dispatcher('f') + + halt_ordering() + + def func(*args): + pass + + f.add((int, object), func) + f.add((object, int), func) + + assert g == [0] + + restart_ordering(on_ambiguity=on_ambiguity) + + assert g == [1] + + assert set(f.ordering) == {(int, object), (object, int)} + + +def test_no_implementations(): + f = Dispatcher('f') + assert raises(NotImplementedError, lambda: f('hello')) + + +def test_register_stacking(): + f = Dispatcher('f') + + @f.register(list) + @f.register(tuple) + def rev(x): + return x[::-1] + + assert f((1, 2, 3)) == (3, 2, 1) + assert f([1, 2, 3]) == [3, 2, 1] + + assert raises(NotImplementedError, lambda: f('hello')) + assert rev('hello') == 'olleh' + + +def test_dispatch_method(): + f = Dispatcher('f') + + @f.register(list) + def rev(x): + return x[::-1] + + @f.register(int, int) + def add(x, y): + return x + y + + class MyList(list): + pass + + assert f.dispatch(list) is rev + assert f.dispatch(MyList) is rev + assert f.dispatch(int, int) is add + + +def test_not_implemented(): + f = Dispatcher('f') + + @f.register(object) + def _(x): + return 'default' + + @f.register(int) + def _(x): + if x % 2 == 0: + return 'even' + else: + raise MDNotImplementedError() + + assert f('hello') == 'default' # default behavior + assert f(2) == 'even' # specialized behavior + assert f(3) == 'default' # fall bac to default behavior + assert raises(NotImplementedError, lambda: f(1, 2)) + + +def test_not_implemented_error(): + f = Dispatcher('f') + + @f.register(float) + def _(a): + raise MDNotImplementedError() + + assert raises(NotImplementedError, lambda: f(1.0)) + +def test_ambiguity_register_error_ignore_dup(): + f = Dispatcher('f') + + class A: + pass + class B(A): + pass + class C(A): + pass + + # suppress warning for registering ambiguous signal + f.add((A, B), lambda x,y: None, ambiguity_register_error_ignore_dup) + f.add((B, A), lambda x,y: None, ambiguity_register_error_ignore_dup) + f.add((A, C), lambda x,y: None, ambiguity_register_error_ignore_dup) + f.add((C, A), lambda x,y: None, ambiguity_register_error_ignore_dup) + + # raises error if ambiguous signal is passed + assert raises(NotImplementedError, lambda: f(B(), C())) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/utils.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/utils.py new file mode 100644 index 0000000000000000000000000000000000000000..11f563772385124c2fc0d285f7aa6e0747b8b412 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/multipledispatch/utils.py @@ -0,0 +1,105 @@ +from collections import OrderedDict + + +def expand_tuples(L): + """ + >>> from sympy.multipledispatch.utils import expand_tuples + >>> expand_tuples([1, (2, 3)]) + [(1, 2), (1, 3)] + + >>> expand_tuples([1, 2]) + [(1, 2)] + """ + if not L: + return [()] + elif not isinstance(L[0], tuple): + rest = expand_tuples(L[1:]) + return [(L[0],) + t for t in rest] + else: + rest = expand_tuples(L[1:]) + return [(item,) + t for t in rest for item in L[0]] + + +# Taken from theano/theano/gof/sched.py +# Avoids licensing issues because this was written by Matthew Rocklin +def _toposort(edges): + """ Topological sort algorithm by Kahn [1] - O(nodes + vertices) + + inputs: + edges - a dict of the form {a: {b, c}} where b and c depend on a + outputs: + L - an ordered list of nodes that satisfy the dependencies of edges + + >>> from sympy.multipledispatch.utils import _toposort + >>> _toposort({1: (2, 3), 2: (3, )}) + [1, 2, 3] + + Closely follows the wikipedia page [2] + + [1] Kahn, Arthur B. (1962), "Topological sorting of large networks", + Communications of the ACM + [2] https://en.wikipedia.org/wiki/Toposort#Algorithms + """ + incoming_edges = reverse_dict(edges) + incoming_edges = {k: set(val) for k, val in incoming_edges.items()} + S = OrderedDict.fromkeys(v for v in edges if v not in incoming_edges) + L = [] + + while S: + n, _ = S.popitem() + L.append(n) + for m in edges.get(n, ()): + assert n in incoming_edges[m] + incoming_edges[m].remove(n) + if not incoming_edges[m]: + S[m] = None + if any(incoming_edges.get(v, None) for v in edges): + raise ValueError("Input has cycles") + return L + + +def reverse_dict(d): + """Reverses direction of dependence dict + + >>> d = {'a': (1, 2), 'b': (2, 3), 'c':()} + >>> reverse_dict(d) # doctest: +SKIP + {1: ('a',), 2: ('a', 'b'), 3: ('b',)} + + :note: dict order are not deterministic. As we iterate on the + input dict, it make the output of this function depend on the + dict order. So this function output order should be considered + as undeterministic. + + """ + result = {} + for key in d: + for val in d[key]: + result[val] = result.get(val, ()) + (key, ) + return result + + +# Taken from toolz +# Avoids licensing issues because this version was authored by Matthew Rocklin +def groupby(func, seq): + """ Group a collection by a key function + + >>> from sympy.multipledispatch.utils import groupby + >>> names = ['Alice', 'Bob', 'Charlie', 'Dan', 'Edith', 'Frank'] + >>> groupby(len, names) # doctest: +SKIP + {3: ['Bob', 'Dan'], 5: ['Alice', 'Edith', 'Frank'], 7: ['Charlie']} + + >>> iseven = lambda x: x % 2 == 0 + >>> groupby(iseven, [1, 2, 3, 4, 5, 6, 7, 8]) # doctest: +SKIP + {False: [1, 3, 5, 7], True: [2, 4, 6, 8]} + + See Also: + ``countby`` + """ + + d = {} + for item in seq: + key = func(item) + if key not in d: + d[key] = [] + d[key].append(item) + return d diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..19576c8935da455743d27f0a263caecca94f59f8 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/__init__.py @@ -0,0 +1,67 @@ +""" +Number theory module (primes, etc) +""" + +from .generate import nextprime, prevprime, prime, primepi, primerange, \ + randprime, Sieve, sieve, primorial, cycle_length, composite, compositepi +from .primetest import isprime, is_gaussian_prime, is_mersenne_prime +from .factor_ import divisors, proper_divisors, factorint, multiplicity, \ + multiplicity_in_factorial, perfect_power, factor_cache, pollard_pm1, \ + pollard_rho, primefactors, totient, \ + divisor_count, proper_divisor_count, divisor_sigma, factorrat, \ + reduced_totient, primenu, primeomega, mersenne_prime_exponent, \ + is_perfect, is_abundant, is_deficient, is_amicable, is_carmichael, \ + abundance, dra, drm + +from .partitions_ import npartitions +from .residue_ntheory import is_primitive_root, is_quad_residue, \ + legendre_symbol, jacobi_symbol, n_order, sqrt_mod, quadratic_residues, \ + primitive_root, nthroot_mod, is_nthpow_residue, sqrt_mod_iter, mobius, \ + discrete_log, quadratic_congruence, polynomial_congruence +from .multinomial import binomial_coefficients, binomial_coefficients_list, \ + multinomial_coefficients +from .continued_fraction import continued_fraction_periodic, \ + continued_fraction_iterator, continued_fraction_reduce, \ + continued_fraction_convergents, continued_fraction +from .digits import count_digits, digits, is_palindromic +from .egyptian_fraction import egyptian_fraction +from .ecm import ecm +from .qs import qs, qs_factor +__all__ = [ + 'nextprime', 'prevprime', 'prime', 'primepi', 'primerange', 'randprime', + 'Sieve', 'sieve', 'primorial', 'cycle_length', 'composite', 'compositepi', + + 'isprime', 'is_gaussian_prime', 'is_mersenne_prime', + + + 'divisors', 'proper_divisors', 'factorint', 'multiplicity', 'perfect_power', + 'pollard_pm1', 'factor_cache', 'pollard_rho', 'primefactors', 'totient', + 'divisor_count', 'proper_divisor_count', 'divisor_sigma', 'factorrat', + 'reduced_totient', 'primenu', 'primeomega', 'mersenne_prime_exponent', + 'is_perfect', 'is_abundant', 'is_deficient', 'is_amicable', + 'is_carmichael', 'abundance', 'dra', 'drm', 'multiplicity_in_factorial', + + 'npartitions', + + 'is_primitive_root', 'is_quad_residue', 'legendre_symbol', + 'jacobi_symbol', 'n_order', 'sqrt_mod', 'quadratic_residues', + 'primitive_root', 'nthroot_mod', 'is_nthpow_residue', 'sqrt_mod_iter', + 'mobius', 'discrete_log', 'quadratic_congruence', 'polynomial_congruence', + + 'binomial_coefficients', 'binomial_coefficients_list', + 'multinomial_coefficients', + + 'continued_fraction_periodic', 'continued_fraction_iterator', + 'continued_fraction_reduce', 'continued_fraction_convergents', + 'continued_fraction', + + 'digits', + 'count_digits', + 'is_palindromic', + + 'egyptian_fraction', + + 'ecm', + + 'qs', 'qs_factor', +] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/bbp_pi.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/bbp_pi.py new file mode 100644 index 0000000000000000000000000000000000000000..e2ff4b755d74d4e075ac7195f991c8182d175693 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/bbp_pi.py @@ -0,0 +1,190 @@ +''' +This implementation is a heavily modified fixed point implementation of +BBP_formula for calculating the nth position of pi. The original hosted +at: https://web.archive.org/web/20151116045029/http://en.literateprograms.org/Pi_with_the_BBP_formula_(Python) + +# Permission is hereby granted, free of charge, to any person obtaining +# a copy of this software and associated documentation files (the +# "Software"), to deal in the Software without restriction, including +# without limitation the rights to use, copy, modify, merge, publish, +# distribute, sub-license, and/or sell copies of the Software, and to +# permit persons to whom the Software is furnished to do so, subject to +# the following conditions: +# +# The above copyright notice and this permission notice shall be +# included in all copies or substantial portions of the Software. +# +# THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, +# EXPRESS OR IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF +# MERCHANTABILITY, FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. +# IN NO EVENT SHALL THE AUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY +# CLAIM, DAMAGES OR OTHER LIABILITY, WHETHER IN AN ACTION OF CONTRACT, +# TORT OR OTHERWISE, ARISING FROM, OUT OF OR IN CONNECTION WITH THE +# SOFTWARE OR THE USE OR OTHER DEALINGS IN THE SOFTWARE. + +Modifications: + +1.Once the nth digit and desired number of digits is selected, the +number of digits of working precision is calculated to ensure that +the hexadecimal digits returned are accurate. This is calculated as + + int(math.log(start + prec)/math.log(16) + prec + 3) + --------------------------------------- -------- + / / + number of hex digits additional digits + +This was checked by the following code which completed without +errors (and dig are the digits included in the test_bbp.py file): + + for i in range(0,1000): + for j in range(1,1000): + a, b = pi_hex_digits(i, j), dig[i:i+j] + if a != b: + print('%s\n%s'%(a,b)) + +Deceasing the additional digits by 1 generated errors, so '3' is +the smallest additional precision needed to calculate the above +loop without errors. The following trailing 10 digits were also +checked to be accurate (and the times were slightly faster with +some of the constant modifications that were made): + + >> from time import time + >> t=time();pi_hex_digits(10**2-10 + 1, 10), time()-t + ('e90c6cc0ac', 0.0) + >> t=time();pi_hex_digits(10**4-10 + 1, 10), time()-t + ('26aab49ec6', 0.17100000381469727) + >> t=time();pi_hex_digits(10**5-10 + 1, 10), time()-t + ('a22673c1a5', 4.7109999656677246) + >> t=time();pi_hex_digits(10**6-10 + 1, 10), time()-t + ('9ffd342362', 59.985999822616577) + >> t=time();pi_hex_digits(10**7-10 + 1, 10), time()-t + ('c1a42e06a1', 689.51800012588501) + +2. The while loop to evaluate whether the series has converged quits +when the addition amount `dt` has dropped to zero. + +3. the formatting string to convert the decimal to hexadecimal is +calculated for the given precision. + +4. pi_hex_digits(n) changed to have coefficient to the formula in an +array (perhaps just a matter of preference). + +''' + +from sympy.utilities.misc import as_int + + +def _series(j, n, prec=14): + + # Left sum from the bbp algorithm + s = 0 + D = _dn(n, prec) + D4 = 4 * D + d = j + for k in range(n + 1): + s += (pow(16, n - k, d) << D4) // d + d += 8 + + # Right sum iterates to infinity for full precision, but we + # stop at the point where one iteration is beyond the precision + # specified. + + t = 0 + k = n + 1 + e = D4 - 4 # 4*(D + n - k) + d = 8 * k + j + while True: + dt = (1 << e) // d + if not dt: + break + t += dt + # k += 1 + e -= 4 + d += 8 + total = s + t + + return total + + +def pi_hex_digits(n, prec=14): + """Returns a string containing ``prec`` (default 14) digits + starting at the nth digit of pi in hex. Counting of digits + starts at 0 and the decimal is not counted, so for n = 0 the + returned value starts with 3; n = 1 corresponds to the first + digit past the decimal point (which in hex is 2). + + Parameters + ========== + + n : non-negative integer + prec : non-negative integer. default = 14 + + Returns + ======= + + str : Returns a string containing ``prec`` digits + starting at the nth digit of pi in hex. + If ``prec`` = 0, returns empty string. + + Raises + ====== + + ValueError + If ``n`` < 0 or ``prec`` < 0. + Or ``n`` or ``prec`` is not an integer. + + Examples + ======== + + >>> from sympy.ntheory.bbp_pi import pi_hex_digits + >>> pi_hex_digits(0) + '3243f6a8885a30' + >>> pi_hex_digits(0, 3) + '324' + + These are consistent with the following results + + >>> import math + >>> hex(int(math.pi * 2**((14-1)*4))) + '0x3243f6a8885a30' + >>> hex(int(math.pi * 2**((3-1)*4))) + '0x324' + + References + ========== + + .. [1] http://www.numberworld.org/digits/Pi/ + """ + n, prec = as_int(n), as_int(prec) + if n < 0: + raise ValueError('n cannot be negative') + if prec < 0: + raise ValueError('prec cannot be negative') + if prec == 0: + return '' + + # main of implementation arrays holding formulae coefficients + n -= 1 + a = [4, 2, 1, 1] + j = [1, 4, 5, 6] + + #formulae + D = _dn(n, prec) + x = + (a[0]*_series(j[0], n, prec) + - a[1]*_series(j[1], n, prec) + - a[2]*_series(j[2], n, prec) + - a[3]*_series(j[3], n, prec)) & (16**D - 1) + + s = ("%0" + "%ix" % prec) % (x // 16**(D - prec)) + return s + + +def _dn(n, prec): + # controller for n dependence on precision + # n = starting digit index + # prec = the number of total digits to compute + n += 1 # because we subtract 1 for _series + + # assert int(math.log(n + prec)/math.log(16)) ==\ + # ((n + prec).bit_length() - 1) // 4 + return ((n + prec).bit_length() - 1) // 4 + prec + 3 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/continued_fraction.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/continued_fraction.py new file mode 100644 index 0000000000000000000000000000000000000000..62f8e2d729ada3414a87d6f0583e06bee2a2b220 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/continued_fraction.py @@ -0,0 +1,369 @@ +from __future__ import annotations +import itertools +from sympy.core.exprtools import factor_terms +from sympy.core.numbers import Integer, Rational +from sympy.core.singleton import S +from sympy.core.symbol import Dummy +from sympy.core.sympify import _sympify +from sympy.utilities.misc import as_int + + +def continued_fraction(a) -> list: + """Return the continued fraction representation of a Rational or + quadratic irrational. + + Examples + ======== + + >>> from sympy.ntheory.continued_fraction import continued_fraction + >>> from sympy import sqrt + >>> continued_fraction((1 + 2*sqrt(3))/5) + [0, 1, [8, 3, 34, 3]] + + See Also + ======== + continued_fraction_periodic, continued_fraction_reduce, continued_fraction_convergents + """ + e = _sympify(a) + if all(i.is_Rational for i in e.atoms()): + if e.is_Integer: + return continued_fraction_periodic(e, 1, 0) + elif e.is_Rational: + return continued_fraction_periodic(e.p, e.q, 0) + elif e.is_Pow and e.exp is S.Half and e.base.is_Integer: + return continued_fraction_periodic(0, 1, e.base) + elif e.is_Mul and len(e.args) == 2 and ( + e.args[0].is_Rational and + e.args[1].is_Pow and + e.args[1].base.is_Integer and + e.args[1].exp is S.Half): + a, b = e.args + return continued_fraction_periodic(0, a.q, b.base, a.p) + else: + # this should not have to work very hard- no + # simplification, cancel, etc... which should be + # done by the user. e.g. This is a fancy 1 but + # the user should simplify it first: + # sqrt(2)*(1 + sqrt(2))/(sqrt(2) + 2) + p, d = e.expand().as_numer_denom() + if d.is_Integer: + if p.is_Rational: + return continued_fraction_periodic(p, d) + # look for a + b*c + # with c = sqrt(s) + if p.is_Add and len(p.args) == 2: + a, bc = p.args + else: + a = S.Zero + bc = p + if a.is_Integer: + b = S.NaN + if bc.is_Mul and len(bc.args) == 2: + b, c = bc.args + elif bc.is_Pow: + b = Integer(1) + c = bc + if b.is_Integer and ( + c.is_Pow and c.exp is S.Half and + c.base.is_Integer): + # (a + b*sqrt(c))/d + c = c.base + return continued_fraction_periodic(a, d, c, b) + raise ValueError( + 'expecting a rational or quadratic irrational, not %s' % e) + + +def continued_fraction_periodic(p, q, d=0, s=1) -> list: + r""" + Find the periodic continued fraction expansion of a quadratic irrational. + + Compute the continued fraction expansion of a rational or a + quadratic irrational number, i.e. `\frac{p + s\sqrt{d}}{q}`, where + `p`, `q \ne 0` and `d \ge 0` are integers. + + Returns the continued fraction representation (canonical form) as + a list of integers, optionally ending (for quadratic irrationals) + with list of integers representing the repeating digits. + + Parameters + ========== + + p : int + the rational part of the number's numerator + q : int + the denominator of the number + d : int, optional + the irrational part (discriminator) of the number's numerator + s : int, optional + the coefficient of the irrational part + + Examples + ======== + + >>> from sympy.ntheory.continued_fraction import continued_fraction_periodic + >>> continued_fraction_periodic(3, 2, 7) + [2, [1, 4, 1, 1]] + + Golden ratio has the simplest continued fraction expansion: + + >>> continued_fraction_periodic(1, 2, 5) + [[1]] + + If the discriminator is zero or a perfect square then the number will be a + rational number: + + >>> continued_fraction_periodic(4, 3, 0) + [1, 3] + >>> continued_fraction_periodic(4, 3, 49) + [3, 1, 2] + + See Also + ======== + + continued_fraction_iterator, continued_fraction_reduce + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Periodic_continued_fraction + .. [2] K. Rosen. Elementary Number theory and its applications. + Addison-Wesley, 3 Sub edition, pages 379-381, January 1992. + + """ + from sympy.functions import sqrt, floor + + p, q, d, s = list(map(as_int, [p, q, d, s])) + + if d < 0: + raise ValueError("expected non-negative for `d` but got %s" % d) + + if q == 0: + raise ValueError("The denominator cannot be 0.") + + if not s: + d = 0 + + # check for rational case + sd = sqrt(d) + if sd.is_Integer: + return list(continued_fraction_iterator(Rational(p + s*sd, q))) + + # irrational case with sd != Integer + if q < 0: + p, q, s = -p, -q, -s + + n = (p + s*sd)/q + if n < 0: + w = floor(-n) + f = -n - w + one_f = continued_fraction(1 - f) # 1-f < 1 so cf is [0 ... [...]] + one_f[0] -= w + 1 + return one_f + + d *= s**2 + sd *= s + + if (d - p**2)%q: + d *= q**2 + sd *= q + p *= q + q *= q + + terms: list[int] = [] + pq = {} + + while (p, q) not in pq: + pq[(p, q)] = len(terms) + terms.append((p + sd)//q) + p = terms[-1]*q - p + q = (d - p**2)//q + + i = pq[(p, q)] + return terms[:i] + [terms[i:]] # type: ignore + + +def continued_fraction_reduce(cf): + """ + Reduce a continued fraction to a rational or quadratic irrational. + + Compute the rational or quadratic irrational number from its + terminating or periodic continued fraction expansion. The + continued fraction expansion (cf) should be supplied as a + terminating iterator supplying the terms of the expansion. For + terminating continued fractions, this is equivalent to + ``list(continued_fraction_convergents(cf))[-1]``, only a little more + efficient. If the expansion has a repeating part, a list of the + repeating terms should be returned as the last element from the + iterator. This is the format returned by + continued_fraction_periodic. + + For quadratic irrationals, returns the largest solution found, + which is generally the one sought, if the fraction is in canonical + form (all terms positive except possibly the first). + + Examples + ======== + + >>> from sympy.ntheory.continued_fraction import continued_fraction_reduce + >>> continued_fraction_reduce([1, 2, 3, 4, 5]) + 225/157 + >>> continued_fraction_reduce([-2, 1, 9, 7, 1, 2]) + -256/233 + >>> continued_fraction_reduce([2, 1, 2, 1, 1, 4, 1, 1, 6, 1, 1, 8]).n(10) + 2.718281835 + >>> continued_fraction_reduce([1, 4, 2, [3, 1]]) + (sqrt(21) + 287)/238 + >>> continued_fraction_reduce([[1]]) + (1 + sqrt(5))/2 + >>> from sympy.ntheory.continued_fraction import continued_fraction_periodic + >>> continued_fraction_reduce(continued_fraction_periodic(8, 5, 13)) + (sqrt(13) + 8)/5 + + See Also + ======== + + continued_fraction_periodic + + """ + from sympy.solvers import solve + + period = [] + x = Dummy('x') + + def untillist(cf): + for nxt in cf: + if isinstance(nxt, list): + period.extend(nxt) + yield x + break + yield nxt + + a = S.Zero + for a in continued_fraction_convergents(untillist(cf)): + pass + + if period: + y = Dummy('y') + solns = solve(continued_fraction_reduce(period + [y]) - y, y) + solns.sort() + pure = solns[-1] + rv = a.subs(x, pure).radsimp() + else: + rv = a + if rv.is_Add: + rv = factor_terms(rv) + if rv.is_Mul and rv.args[0] == -1: + rv = rv.func(*rv.args) + return rv + + +def continued_fraction_iterator(x): + """ + Return continued fraction expansion of x as iterator. + + Examples + ======== + + >>> from sympy import Rational, pi + >>> from sympy.ntheory.continued_fraction import continued_fraction_iterator + + >>> list(continued_fraction_iterator(Rational(3, 8))) + [0, 2, 1, 2] + >>> list(continued_fraction_iterator(Rational(-3, 8))) + [-1, 1, 1, 1, 2] + + >>> for i, v in enumerate(continued_fraction_iterator(pi)): + ... if i > 7: + ... break + ... print(v) + 3 + 7 + 15 + 1 + 292 + 1 + 1 + 1 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Continued_fraction + + """ + from sympy.functions import floor + while True: + i = floor(x) + yield i + x -= i + if not x: + break + x = 1/x + + +def continued_fraction_convergents(cf): + """ + Return an iterator over the convergents of a continued fraction (cf). + + The parameter should be in either of the following to forms: + - A list of partial quotients, possibly with the last element being a list + of repeating partial quotients, such as might be returned by + continued_fraction and continued_fraction_periodic. + - An iterable returning successive partial quotients of the continued + fraction, such as might be returned by continued_fraction_iterator. + + In computing the convergents, the continued fraction need not be strictly + in canonical form (all integers, all but the first positive). + Rational and negative elements may be present in the expansion. + + Examples + ======== + + >>> from sympy.core import pi + >>> from sympy import S + >>> from sympy.ntheory.continued_fraction import \ + continued_fraction_convergents, continued_fraction_iterator + + >>> list(continued_fraction_convergents([0, 2, 1, 2])) + [0, 1/2, 1/3, 3/8] + + >>> list(continued_fraction_convergents([1, S('1/2'), -7, S('1/4')])) + [1, 3, 19/5, 7] + + >>> it = continued_fraction_convergents(continued_fraction_iterator(pi)) + >>> for n in range(7): + ... print(next(it)) + 3 + 22/7 + 333/106 + 355/113 + 103993/33102 + 104348/33215 + 208341/66317 + + >>> it = continued_fraction_convergents([1, [1, 2]]) # sqrt(3) + >>> for n in range(7): + ... print(next(it)) + 1 + 2 + 5/3 + 7/4 + 19/11 + 26/15 + 71/41 + + See Also + ======== + + continued_fraction_iterator, continued_fraction, continued_fraction_periodic + + """ + if isinstance(cf, list) and isinstance(cf[-1], list): + cf = itertools.chain(cf[:-1], itertools.cycle(cf[-1])) + p_2, q_2 = S.Zero, S.One + p_1, q_1 = S.One, S.Zero + for a in cf: + p, q = a*p_1 + p_2, a*q_1 + q_2 + p_2, q_2 = p_1, q_1 + p_1, q_1 = p, q + yield p/q diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/digits.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/digits.py new file mode 100644 index 0000000000000000000000000000000000000000..a0414815871f6f888ccd2823546ab2b0c2c9f515 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/digits.py @@ -0,0 +1,150 @@ +from collections import defaultdict + +from sympy.utilities.iterables import multiset, is_palindromic as _palindromic +from sympy.utilities.misc import as_int + + +def digits(n, b=10, digits=None): + """ + Return a list of the digits of ``n`` in base ``b``. The first + element in the list is ``b`` (or ``-b`` if ``n`` is negative). + + Examples + ======== + + >>> from sympy.ntheory.digits import digits + >>> digits(35) + [10, 3, 5] + + If the number is negative, the negative sign will be placed on the + base (which is the first element in the returned list): + + >>> digits(-35) + [-10, 3, 5] + + Bases other than 10 (and greater than 1) can be selected with ``b``: + + >>> digits(27, b=2) + [2, 1, 1, 0, 1, 1] + + Use the ``digits`` keyword if a certain number of digits is desired: + + >>> digits(35, digits=4) + [10, 0, 0, 3, 5] + + Parameters + ========== + + n: integer + The number whose digits are returned. + + b: integer + The base in which digits are computed. + + digits: integer (or None for all digits) + The number of digits to be returned (padded with zeros, if + necessary). + + See Also + ======== + sympy.core.intfunc.num_digits, count_digits + """ + + b = as_int(b) + n = as_int(n) + if b < 2: + raise ValueError("b must be greater than 1") + else: + x, y = abs(n), [] + while x >= b: + x, r = divmod(x, b) + y.append(r) + y.append(x) + y.append(-b if n < 0 else b) + y.reverse() + ndig = len(y) - 1 + if digits is not None: + if ndig > digits: + raise ValueError( + "For %s, at least %s digits are needed." % (n, ndig)) + elif ndig < digits: + y[1:1] = [0]*(digits - ndig) + return y + + +def count_digits(n, b=10): + """ + Return a dictionary whose keys are the digits of ``n`` in the + given base, ``b``, with keys indicating the digits appearing in the + number and values indicating how many times that digit appeared. + + Examples + ======== + + >>> from sympy.ntheory import count_digits + + >>> count_digits(1111339) + {1: 4, 3: 2, 9: 1} + + The digits returned are always represented in base-10 + but the number itself can be entered in any format that is + understood by Python; the base of the number can also be + given if it is different than 10: + + >>> n = 0xFA; n + 250 + >>> count_digits(_) + {0: 1, 2: 1, 5: 1} + >>> count_digits(n, 16) + {10: 1, 15: 1} + + The default dictionary will return a 0 for any digit that did + not appear in the number. For example, which digits appear 7 + times in ``77!``: + + >>> from sympy import factorial + >>> c77 = count_digits(factorial(77)) + >>> [i for i in range(10) if c77[i] == 7] + [1, 3, 7, 9] + + See Also + ======== + sympy.core.intfunc.num_digits, digits + """ + rv = defaultdict(int, multiset(digits(n, b)).items()) + rv.pop(b) if b in rv else rv.pop(-b) # b or -b is there + return rv + + +def is_palindromic(n, b=10): + """return True if ``n`` is the same when read from left to right + or right to left in the given base, ``b``. + + Examples + ======== + + >>> from sympy.ntheory import is_palindromic + + >>> all(is_palindromic(i) for i in (-11, 1, 22, 121)) + True + + The second argument allows you to test numbers in other + bases. For example, 88 is palindromic in base-10 but not + in base-8: + + >>> is_palindromic(88, 8) + False + + On the other hand, a number can be palindromic in base-8 but + not in base-10: + + >>> 0o121, is_palindromic(0o121) + (81, False) + + Or it might be palindromic in both bases: + + >>> oct(121), is_palindromic(121, 8) and is_palindromic(121) + ('0o171', True) + + """ + return _palindromic(digits(n, b), 1) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/ecm.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/ecm.py new file mode 100644 index 0000000000000000000000000000000000000000..498c0c8fdf8478688465c4bae307818e9685b686 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/ecm.py @@ -0,0 +1,348 @@ +from math import log + +from sympy.core.random import _randint +from sympy.external.gmpy import gcd, invert, sqrt +from sympy.utilities.misc import as_int +from .generate import sieve, primerange +from .primetest import isprime + + +#----------------------------------------------------------------------------# +# # +# Lenstra's Elliptic Curve Factorization # +# # +#----------------------------------------------------------------------------# + + +class Point: + """Montgomery form of Points in an elliptic curve. + In this form, the addition and doubling of points + does not need any y-coordinate information thus + decreasing the number of operations. + Using Montgomery form we try to perform point addition + and doubling in least amount of multiplications. + + The elliptic curve used here is of the form + (E : b*y**2*z = x**3 + a*x**2*z + x*z**2). + The a_24 parameter is equal to (a + 2)/4. + + References + ========== + + .. [1] Kris Gaj, Soonhak Kwon, Patrick Baier, Paul Kohlbrenner, Hoang Le, Mohammed Khaleeluddin, Ramakrishna Bachimanchi, + Implementing the Elliptic Curve Method of Factoring in Reconfigurable Hardware, + Cryptographic Hardware and Embedded Systems - CHES 2006 (2006), pp. 119-133, + https://doi.org/10.1007/11894063_10 + https://www.hyperelliptic.org/tanja/SHARCS/talks06/Gaj.pdf + + """ + + def __init__(self, x_cord, z_cord, a_24, mod): + """ + Initial parameters for the Point class. + + Parameters + ========== + + x_cord : X coordinate of the Point + z_cord : Z coordinate of the Point + a_24 : Parameter of the elliptic curve in Montgomery form + mod : modulus + """ + self.x_cord = x_cord + self.z_cord = z_cord + self.a_24 = a_24 + self.mod = mod + + def __eq__(self, other): + """Two points are equal if X/Z of both points are equal + """ + if self.a_24 != other.a_24 or self.mod != other.mod: + return False + return self.x_cord * other.z_cord % self.mod ==\ + other.x_cord * self.z_cord % self.mod + + def add(self, Q, diff): + """ + Add two points self and Q where diff = self - Q. Moreover the assumption + is self.x_cord*Q.x_cord*(self.x_cord - Q.x_cord) != 0. This algorithm + requires 6 multiplications. Here the difference between the points + is already known and using this algorithm speeds up the addition + by reducing the number of multiplication required. Also in the + mont_ladder algorithm is constructed in a way so that the difference + between intermediate points is always equal to the initial point. + So, we always know what the difference between the point is. + + + Parameters + ========== + + Q : point on the curve in Montgomery form + diff : self - Q + + Examples + ======== + + >>> from sympy.ntheory.ecm import Point + >>> p1 = Point(11, 16, 7, 29) + >>> p2 = Point(13, 10, 7, 29) + >>> p3 = p2.add(p1, p1) + >>> p3.x_cord + 23 + >>> p3.z_cord + 17 + """ + u = (self.x_cord - self.z_cord)*(Q.x_cord + Q.z_cord) + v = (self.x_cord + self.z_cord)*(Q.x_cord - Q.z_cord) + add, subt = u + v, u - v + x_cord = diff.z_cord * add * add % self.mod + z_cord = diff.x_cord * subt * subt % self.mod + return Point(x_cord, z_cord, self.a_24, self.mod) + + def double(self): + """ + Doubles a point in an elliptic curve in Montgomery form. + This algorithm requires 5 multiplications. + + Examples + ======== + + >>> from sympy.ntheory.ecm import Point + >>> p1 = Point(11, 16, 7, 29) + >>> p2 = p1.double() + >>> p2.x_cord + 13 + >>> p2.z_cord + 10 + """ + u = pow(self.x_cord + self.z_cord, 2, self.mod) + v = pow(self.x_cord - self.z_cord, 2, self.mod) + diff = u - v + x_cord = u*v % self.mod + z_cord = diff*(v + self.a_24*diff) % self.mod + return Point(x_cord, z_cord, self.a_24, self.mod) + + def mont_ladder(self, k): + """ + Scalar multiplication of a point in Montgomery form + using Montgomery Ladder Algorithm. + A total of 11 multiplications are required in each step of this + algorithm. + + Parameters + ========== + + k : The positive integer multiplier + + Examples + ======== + + >>> from sympy.ntheory.ecm import Point + >>> p1 = Point(11, 16, 7, 29) + >>> p3 = p1.mont_ladder(3) + >>> p3.x_cord + 23 + >>> p3.z_cord + 17 + """ + Q = self + R = self.double() + for i in bin(k)[3:]: + if i == '1': + Q = R.add(Q, self) + R = R.double() + else: + R = Q.add(R, self) + Q = Q.double() + return Q + + +def _ecm_one_factor(n, B1=10000, B2=100000, max_curve=200, seed=None): + """Returns one factor of n using + Lenstra's 2 Stage Elliptic curve Factorization + with Suyama's Parameterization. Here Montgomery + arithmetic is used for fast computation of addition + and doubling of points in elliptic curve. + + Explanation + =========== + + This ECM method considers elliptic curves in Montgomery + form (E : b*y**2*z = x**3 + a*x**2*z + x*z**2) and involves + elliptic curve operations (mod N), where the elements in + Z are reduced (mod N). Since N is not a prime, E over FF(N) + is not really an elliptic curve but we can still do point additions + and doubling as if FF(N) was a field. + + Stage 1 : The basic algorithm involves taking a random point (P) on an + elliptic curve in FF(N). The compute k*P using Montgomery ladder algorithm. + Let q be an unknown factor of N. Then the order of the curve E, |E(FF(q))|, + might be a smooth number that divides k. Then we have k = l * |E(FF(q))| + for some l. For any point belonging to the curve E, |E(FF(q))|*P = O, + hence k*P = l*|E(FF(q))|*P. Thus kP.z_cord = 0 (mod q), and the unknownn + factor of N (q) can be recovered by taking gcd(kP.z_cord, N). + + Stage 2 : This is a continuation of Stage 1 if k*P != O. The idea utilize + the fact that even if kP != 0, the value of k might miss just one large + prime divisor of |E(FF(q))|. In this case we only need to compute the + scalar multiplication by p to get p*k*P = O. Here a second bound B2 + restrict the size of possible values of p. + + Parameters + ========== + + n : Number to be Factored. Assume that it is a composite number. + B1 : Stage 1 Bound. Must be an even number. + B2 : Stage 2 Bound. Must be an even number. + max_curve : Maximum number of curves generated + + Returns + ======= + + integer | None : a non-trivial divisor of ``n``. ``None`` if not found + + References + ========== + + .. [1] Carl Pomerance, Richard Crandall, Prime Numbers: A Computational Perspective, + 2nd Edition (2005), page 344, ISBN:978-0387252827 + """ + randint = _randint(seed) + + # When calculating T, if (B1 - 2*D) is negative, it cannot be calculated. + D = min(sqrt(B2), B1 // 2 - 1) + sieve.extend(D) + beta = [0] * D + S = [0] * D + k = 1 + for p in primerange(2, B1 + 1): + k *= pow(p, int(log(B1, p))) + + # Pre-calculate the prime numbers to be used in stage 2. + # Using the fact that the x-coordinates of point P and its + # inverse -P coincide, the number of primes to be checked + # in stage 2 can be reduced. + deltas_list = [] + for r in range(B1 + 2*D, B2 + 2*D, 4*D): + # d in deltas iff r+(2d+1) and/or r-(2d+1) is prime + deltas = {abs(q - r) >> 1 for q in primerange(r - 2*D, r + 2*D)} + deltas_list.append(list(deltas)) + + for _ in range(max_curve): + #Suyama's Parametrization + sigma = randint(6, n - 1) + u = (sigma**2 - 5) % n + v = (4*sigma) % n + u_3 = pow(u, 3, n) + + try: + # We use the elliptic curve y**2 = x**3 + a*x**2 + x + # where a = pow(v - u, 3, n)*(3*u + v)*invert(4*u_3*v, n) - 2 + # However, we do not declare a because it is more convenient + # to use a24 = (a + 2)*invert(4, n) in the calculation. + a24 = pow(v - u, 3, n)*(3*u + v)*invert(16*u_3*v, n) % n + except ZeroDivisionError: + #If the invert(16*u_3*v, n) doesn't exist (i.e., g != 1) + g = gcd(2*u_3*v, n) + #If g = n, try another curve + if g == n: + continue + return g + + Q = Point(u_3, pow(v, 3, n), a24, n) + Q = Q.mont_ladder(k) + g = gcd(Q.z_cord, n) + + #Stage 1 factor + if g != 1 and g != n: + return g + #Stage 1 failure. Q.z = 0, Try another curve + elif g == n: + continue + + #Stage 2 - Improved Standard Continuation + S[0] = Q + Q2 = Q.double() + S[1] = Q2.add(Q, Q) + beta[0] = (S[0].x_cord*S[0].z_cord) % n + beta[1] = (S[1].x_cord*S[1].z_cord) % n + for d in range(2, D): + S[d] = S[d - 1].add(Q2, S[d - 2]) + beta[d] = (S[d].x_cord*S[d].z_cord) % n + # i.e., S[i] = Q.mont_ladder(2*i + 1) + + g = 1 + W = Q.mont_ladder(4*D) + T = Q.mont_ladder(B1 - 2*D) + R = Q.mont_ladder(B1 + 2*D) + for deltas in deltas_list: + # R = Q.mont_ladder(r) where r in range(B1 + 2*D, B2 + 2*D, 4*D) + alpha = (R.x_cord*R.z_cord) % n + for delta in deltas: + # We want to calculate + # f = R.x_cord * S[delta].z_cord - S[delta].x_cord * R.z_cord + f = (R.x_cord - S[delta].x_cord)*\ + (R.z_cord + S[delta].z_cord) - alpha + beta[delta] + g = (g*f) % n + T, R = R, R.add(W, T) + g = gcd(n, g) + + #Stage 2 Factor found + if g != 1 and g != n: + return g + + +def ecm(n, B1=10000, B2=100000, max_curve=200, seed=1234): + """Performs factorization using Lenstra's Elliptic curve method. + + This function repeatedly calls ``_ecm_one_factor`` to compute the factors + of n. First all the small factors are taken out using trial division. + Then ``_ecm_one_factor`` is used to compute one factor at a time. + + Parameters + ========== + + n : Number to be Factored + B1 : Stage 1 Bound. Must be an even number. + B2 : Stage 2 Bound. Must be an even number. + max_curve : Maximum number of curves generated + seed : Initialize pseudorandom generator + + Examples + ======== + + >>> from sympy.ntheory import ecm + >>> ecm(25645121643901801) + {5394769, 4753701529} + >>> ecm(9804659461513846513) + {4641991, 2112166839943} + """ + from .factor_ import _perfect_power + n = as_int(n) + if B1 % 2 != 0 or B2 % 2 != 0: + raise ValueError("both bounds must be even") + TF_LIMIT = 100000 + factors = set() + for prime in sieve.primerange(2, TF_LIMIT): + if n % prime == 0: + factors.add(prime) + while(n % prime == 0): + n //= prime + + queue = [] + def check(m): + if isprime(m): + factors.add(m) + return + if result := _perfect_power(m, TF_LIMIT): + return check(result[0]) + queue.append(m) + check(n) + while queue: + n = queue.pop() + factor = _ecm_one_factor(n, B1, B2, max_curve, seed) + if factor is None: + raise ValueError("Increase the bounds") + check(factor) + check(n // factor) + return factors diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/egyptian_fraction.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/egyptian_fraction.py new file mode 100644 index 0000000000000000000000000000000000000000..8a42540b372042f596808684fef8e3fc57935b74 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/egyptian_fraction.py @@ -0,0 +1,223 @@ +from sympy.core.containers import Tuple +from sympy.core.numbers import (Integer, Rational) +from sympy.core.singleton import S +import sympy.polys + +from math import gcd + + +def egyptian_fraction(r, algorithm="Greedy"): + """ + Return the list of denominators of an Egyptian fraction + expansion [1]_ of the said rational `r`. + + Parameters + ========== + + r : Rational or (p, q) + a positive rational number, ``p/q``. + algorithm : { "Greedy", "Graham Jewett", "Takenouchi", "Golomb" }, optional + Denotes the algorithm to be used (the default is "Greedy"). + + Examples + ======== + + >>> from sympy import Rational + >>> from sympy.ntheory.egyptian_fraction import egyptian_fraction + >>> egyptian_fraction(Rational(3, 7)) + [3, 11, 231] + >>> egyptian_fraction((3, 7), "Graham Jewett") + [7, 8, 9, 56, 57, 72, 3192] + >>> egyptian_fraction((3, 7), "Takenouchi") + [4, 7, 28] + >>> egyptian_fraction((3, 7), "Golomb") + [3, 15, 35] + >>> egyptian_fraction((11, 5), "Golomb") + [1, 2, 3, 4, 9, 234, 1118, 2580] + + See Also + ======== + + sympy.core.numbers.Rational + + Notes + ===== + + Currently the following algorithms are supported: + + 1) Greedy Algorithm + + Also called the Fibonacci-Sylvester algorithm [2]_. + At each step, extract the largest unit fraction less + than the target and replace the target with the remainder. + + It has some distinct properties: + + a) Given `p/q` in lowest terms, generates an expansion of maximum + length `p`. Even as the numerators get large, the number of + terms is seldom more than a handful. + + b) Uses minimal memory. + + c) The terms can blow up (standard examples of this are 5/121 and + 31/311). The denominator is at most squared at each step + (doubly-exponential growth) and typically exhibits + singly-exponential growth. + + 2) Graham Jewett Algorithm + + The algorithm suggested by the result of Graham and Jewett. + Note that this has a tendency to blow up: the length of the + resulting expansion is always ``2**(x/gcd(x, y)) - 1``. See [3]_. + + 3) Takenouchi Algorithm + + The algorithm suggested by Takenouchi (1921). + Differs from the Graham-Jewett algorithm only in the handling + of duplicates. See [3]_. + + 4) Golomb's Algorithm + + A method given by Golumb (1962), using modular arithmetic and + inverses. It yields the same results as a method using continued + fractions proposed by Bleicher (1972). See [4]_. + + If the given rational is greater than or equal to 1, a greedy algorithm + of summing the harmonic sequence 1/1 + 1/2 + 1/3 + ... is used, taking + all the unit fractions of this sequence until adding one more would be + greater than the given number. This list of denominators is prefixed + to the result from the requested algorithm used on the remainder. For + example, if r is 8/3, using the Greedy algorithm, we get [1, 2, 3, 4, + 5, 6, 7, 14, 420], where the beginning of the sequence, [1, 2, 3, 4, 5, + 6, 7] is part of the harmonic sequence summing to 363/140, leaving a + remainder of 31/420, which yields [14, 420] by the Greedy algorithm. + The result of egyptian_fraction(Rational(8, 3), "Golomb") is [1, 2, 3, + 4, 5, 6, 7, 14, 574, 2788, 6460, 11590, 33062, 113820], and so on. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Egyptian_fraction + .. [2] https://en.wikipedia.org/wiki/Greedy_algorithm_for_Egyptian_fractions + .. [3] https://www.ics.uci.edu/~eppstein/numth/egypt/conflict.html + .. [4] https://web.archive.org/web/20180413004012/https://ami.ektf.hu/uploads/papers/finalpdf/AMI_42_from129to134.pdf + + """ + + if not isinstance(r, Rational): + if isinstance(r, (Tuple, tuple)) and len(r) == 2: + r = Rational(*r) + else: + raise ValueError("Value must be a Rational or tuple of ints") + if r <= 0: + raise ValueError("Value must be positive") + + # common cases that all methods agree on + x, y = r.as_numer_denom() + if y == 1 and x == 2: + return [Integer(i) for i in [1, 2, 3, 6]] + if x == y + 1: + return [S.One, y] + + prefix, rem = egypt_harmonic(r) + if rem == 0: + return prefix + # work in Python ints + x, y = rem.p, rem.q + # assert x < y and gcd(x, y) = 1 + + if algorithm == "Greedy": + postfix = egypt_greedy(x, y) + elif algorithm == "Graham Jewett": + postfix = egypt_graham_jewett(x, y) + elif algorithm == "Takenouchi": + postfix = egypt_takenouchi(x, y) + elif algorithm == "Golomb": + postfix = egypt_golomb(x, y) + else: + raise ValueError("Entered invalid algorithm") + return prefix + [Integer(i) for i in postfix] + + +def egypt_greedy(x, y): + # assumes gcd(x, y) == 1 + if x == 1: + return [y] + else: + a = (-y) % x + b = y*(y//x + 1) + c = gcd(a, b) + if c > 1: + num, denom = a//c, b//c + else: + num, denom = a, b + return [y//x + 1] + egypt_greedy(num, denom) + + +def egypt_graham_jewett(x, y): + # assumes gcd(x, y) == 1 + l = [y] * x + + # l is now a list of integers whose reciprocals sum to x/y. + # we shall now proceed to manipulate the elements of l without + # changing the reciprocated sum until all elements are unique. + + while len(l) != len(set(l)): + l.sort() # so the list has duplicates. find a smallest pair + for i in range(len(l) - 1): + if l[i] == l[i + 1]: + break + # we have now identified a pair of identical + # elements: l[i] and l[i + 1]. + # now comes the application of the result of graham and jewett: + l[i + 1] = l[i] + 1 + # and we just iterate that until the list has no duplicates. + l.append(l[i]*(l[i] + 1)) + return sorted(l) + + +def egypt_takenouchi(x, y): + # assumes gcd(x, y) == 1 + # special cases for 3/y + if x == 3: + if y % 2 == 0: + return [y//2, y] + i = (y - 1)//2 + j = i + 1 + k = j + i + return [j, k, j*k] + l = [y] * x + while len(l) != len(set(l)): + l.sort() + for i in range(len(l) - 1): + if l[i] == l[i + 1]: + break + k = l[i] + if k % 2 == 0: + l[i] = l[i] // 2 + del l[i + 1] + else: + l[i], l[i + 1] = (k + 1)//2, k*(k + 1)//2 + return sorted(l) + + +def egypt_golomb(x, y): + # assumes x < y and gcd(x, y) == 1 + if x == 1: + return [y] + xp = sympy.polys.ZZ.invert(int(x), int(y)) + rv = [xp*y] + rv.extend(egypt_golomb((x*xp - 1)//y, xp)) + return sorted(rv) + + +def egypt_harmonic(r): + # assumes r is Rational + rv = [] + d = S.One + acc = S.Zero + while acc + 1/d <= r: + acc += 1/d + rv.append(d) + d += 1 + return (rv, r - acc) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/elliptic_curve.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/elliptic_curve.py new file mode 100644 index 0000000000000000000000000000000000000000..c969470a6c19a3d17e637529b6615eeba326e84a --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/elliptic_curve.py @@ -0,0 +1,397 @@ +from sympy.core.numbers import oo +from sympy.core.symbol import symbols +from sympy.polys.domains import FiniteField, QQ, RationalField, FF +from sympy.polys.polytools import Poly +from sympy.solvers.solvers import solve +from sympy.utilities.iterables import is_sequence +from sympy.utilities.misc import as_int +from .factor_ import divisors +from .residue_ntheory import polynomial_congruence + + +class EllipticCurve: + """ + Create the following Elliptic Curve over domain. + + `y^{2} + a_{1} x y + a_{3} y = x^{3} + a_{2} x^{2} + a_{4} x + a_{6}` + + The default domain is ``QQ``. If no coefficient ``a1``, ``a2``, ``a3``, + is given then it creates a curve with the following form: + + `y^{2} = x^{3} + a_{4} x + a_{6}` + + Examples + ======== + + References + ========== + + .. [1] J. Silverman "A Friendly Introduction to Number Theory" Third Edition + .. [2] https://mathworld.wolfram.com/EllipticDiscriminant.html + .. [3] G. Hardy, E. Wright "An Introduction to the Theory of Numbers" Sixth Edition + + """ + + def __init__(self, a4, a6, a1=0, a2=0, a3=0, modulus=0): + if modulus == 0: + domain = QQ + else: + domain = FF(modulus) + a1, a2, a3, a4, a6 = map(domain.convert, (a1, a2, a3, a4, a6)) + self._domain = domain + self.modulus = modulus + # Calculate discriminant + b2 = a1**2 + 4 * a2 + b4 = 2 * a4 + a1 * a3 + b6 = a3**2 + 4 * a6 + b8 = a1**2 * a6 + 4 * a2 * a6 - a1 * a3 * a4 + a2 * a3**2 - a4**2 + self._b2, self._b4, self._b6, self._b8 = b2, b4, b6, b8 + self._discrim = -b2**2 * b8 - 8 * b4**3 - 27 * b6**2 + 9 * b2 * b4 * b6 + self._a1 = a1 + self._a2 = a2 + self._a3 = a3 + self._a4 = a4 + self._a6 = a6 + x, y, z = symbols('x y z') + self.x, self.y, self.z = x, y, z + self._poly = Poly(y**2*z + a1*x*y*z + a3*y*z**2 - x**3 - a2*x**2*z - a4*x*z**2 - a6*z**3, domain=domain) + if isinstance(self._domain, FiniteField): + self._rank = 0 + elif isinstance(self._domain, RationalField): + self._rank = None + + def __call__(self, x, y, z=1): + return EllipticCurvePoint(x, y, z, self) + + def __contains__(self, point): + if is_sequence(point): + if len(point) == 2: + z1 = 1 + else: + z1 = point[2] + x1, y1 = point[:2] + elif isinstance(point, EllipticCurvePoint): + x1, y1, z1 = point.x, point.y, point.z + else: + raise ValueError('Invalid point.') + if self.characteristic == 0 and z1 == 0: + return True + return self._poly.subs({self.x: x1, self.y: y1, self.z: z1}) == 0 + + def __repr__(self): + return self._poly.__repr__() + + def minimal(self): + """ + Return minimal Weierstrass equation. + + Examples + ======== + + >>> from sympy.ntheory.elliptic_curve import EllipticCurve + + >>> e1 = EllipticCurve(-10, -20, 0, -1, 1) + >>> e1.minimal() + Poly(-x**3 + 13392*x*z**2 + y**2*z + 1080432*z**3, x, y, z, domain='QQ') + + """ + char = self.characteristic + if char == 2: + return self + if char == 3: + return EllipticCurve(self._b4/2, self._b6/4, a2=self._b2/4, modulus=self.modulus) + c4 = self._b2**2 - 24*self._b4 + c6 = -self._b2**3 + 36*self._b2*self._b4 - 216*self._b6 + return EllipticCurve(-27*c4, -54*c6, modulus=self.modulus) + + def points(self): + """ + Return points of curve over Finite Field. + + Examples + ======== + + >>> from sympy.ntheory.elliptic_curve import EllipticCurve + >>> e2 = EllipticCurve(1, 1, 1, 1, 1, modulus=5) + >>> e2.points() + {(0, 2), (1, 4), (2, 0), (2, 2), (3, 0), (3, 1), (4, 0)} + + """ + + char = self.characteristic + all_pt = set() + if char >= 1: + for i in range(char): + congruence_eq = self._poly.subs({self.x: i, self.z: 1}).expr + sol = polynomial_congruence(congruence_eq, char) + all_pt.update((i, num) for num in sol) + return all_pt + else: + raise ValueError("Infinitely many points") + + def points_x(self, x): + """Returns points on the curve for the given x-coordinate.""" + pt = [] + if self._domain == QQ: + for y in solve(self._poly.subs(self.x, x)): + pt.append((x, y)) + else: + congruence_eq = self._poly.subs({self.x: x, self.z: 1}).expr + for y in polynomial_congruence(congruence_eq, self.characteristic): + pt.append((x, y)) + return pt + + def torsion_points(self): + """ + Return torsion points of curve over Rational number. + + Return point objects those are finite order. + According to Nagell-Lutz theorem, torsion point p(x, y) + x and y are integers, either y = 0 or y**2 is divisor + of discriminent. According to Mazur's theorem, there are + at most 15 points in torsion collection. + + Examples + ======== + + >>> from sympy.ntheory.elliptic_curve import EllipticCurve + >>> e2 = EllipticCurve(-43, 166) + >>> sorted(e2.torsion_points()) + [(-5, -16), (-5, 16), O, (3, -8), (3, 8), (11, -32), (11, 32)] + + """ + if self.characteristic > 0: + raise ValueError("No torsion point for Finite Field.") + l = [EllipticCurvePoint.point_at_infinity(self)] + for xx in solve(self._poly.subs({self.y: 0, self.z: 1})): + if xx.is_rational: + l.append(self(xx, 0)) + for i in divisors(self.discriminant, generator=True): + j = int(i**.5) + if j**2 == i: + for xx in solve(self._poly.subs({self.y: j, self.z: 1})): + if not xx.is_rational: + continue + p = self(xx, j) + if p.order() != oo: + l.extend([p, -p]) + return l + + @property + def characteristic(self): + """ + Return domain characteristic. + + Examples + ======== + + >>> from sympy.ntheory.elliptic_curve import EllipticCurve + >>> e2 = EllipticCurve(-43, 166) + >>> e2.characteristic + 0 + + """ + return self._domain.characteristic() + + @property + def discriminant(self): + """ + Return curve discriminant. + + Examples + ======== + + >>> from sympy.ntheory.elliptic_curve import EllipticCurve + >>> e2 = EllipticCurve(0, 17) + >>> e2.discriminant + -124848 + + """ + return int(self._discrim) + + @property + def is_singular(self): + """ + Return True if curve discriminant is equal to zero. + """ + return self.discriminant == 0 + + @property + def j_invariant(self): + """ + Return curve j-invariant. + + Examples + ======== + + >>> from sympy.ntheory.elliptic_curve import EllipticCurve + >>> e1 = EllipticCurve(-2, 0, 0, 1, 1) + >>> e1.j_invariant + 1404928/389 + + """ + c4 = self._b2**2 - 24*self._b4 + return self._domain.to_sympy(c4**3 / self._discrim) + + @property + def order(self): + """ + Number of points in Finite field. + + Examples + ======== + + >>> from sympy.ntheory.elliptic_curve import EllipticCurve + >>> e2 = EllipticCurve(1, 0, modulus=19) + >>> e2.order + 19 + + """ + if self.characteristic == 0: + raise NotImplementedError("Still not implemented") + return len(self.points()) + + @property + def rank(self): + """ + Number of independent points of infinite order. + + For Finite field, it must be 0. + """ + if self._rank is not None: + return self._rank + raise NotImplementedError("Still not implemented") + + +class EllipticCurvePoint: + """ + Point of Elliptic Curve + + Examples + ======== + + >>> from sympy.ntheory.elliptic_curve import EllipticCurve + >>> e1 = EllipticCurve(-17, 16) + >>> p1 = e1(0, -4, 1) + >>> p2 = e1(1, 0) + >>> p1 + p2 + (15, -56) + >>> e3 = EllipticCurve(-1, 9) + >>> e3(1, -3) * 3 + (664/169, 17811/2197) + >>> (e3(1, -3) * 3).order() + oo + >>> e2 = EllipticCurve(-2, 0, 0, 1, 1) + >>> p = e2(-1,1) + >>> q = e2(0, -1) + >>> p+q + (4, 8) + >>> p-q + (1, 0) + >>> 3*p-5*q + (328/361, -2800/6859) + """ + + @staticmethod + def point_at_infinity(curve): + return EllipticCurvePoint(0, 1, 0, curve) + + def __init__(self, x, y, z, curve): + dom = curve._domain.convert + self.x = dom(x) + self.y = dom(y) + self.z = dom(z) + self._curve = curve + self._domain = self._curve._domain + if not self._curve.__contains__(self): + raise ValueError("The curve does not contain this point") + + def __add__(self, p): + if self.z == 0: + return p + if p.z == 0: + return self + x1, y1 = self.x/self.z, self.y/self.z + x2, y2 = p.x/p.z, p.y/p.z + a1 = self._curve._a1 + a2 = self._curve._a2 + a3 = self._curve._a3 + a4 = self._curve._a4 + a6 = self._curve._a6 + if x1 != x2: + slope = (y1 - y2) / (x1 - x2) + yint = (y1 * x2 - y2 * x1) / (x2 - x1) + else: + if (y1 + y2) == 0: + return self.point_at_infinity(self._curve) + slope = (3 * x1**2 + 2*a2*x1 + a4 - a1*y1) / (a1 * x1 + a3 + 2 * y1) + yint = (-x1**3 + a4*x1 + 2*a6 - a3*y1) / (a1*x1 + a3 + 2*y1) + x3 = slope**2 + a1*slope - a2 - x1 - x2 + y3 = -(slope + a1) * x3 - yint - a3 + return self._curve(x3, y3, 1) + + def __lt__(self, other): + return (self.x, self.y, self.z) < (other.x, other.y, other.z) + + def __mul__(self, n): + n = as_int(n) + r = self.point_at_infinity(self._curve) + if n == 0: + return r + if n < 0: + return -self * -n + p = self + while n: + if n & 1: + r = r + p + n >>= 1 + p = p + p + return r + + def __rmul__(self, n): + return self * n + + def __neg__(self): + return EllipticCurvePoint(self.x, -self.y - self._curve._a1*self.x - self._curve._a3, self.z, self._curve) + + def __repr__(self): + if self.z == 0: + return 'O' + dom = self._curve._domain + try: + return '({}, {})'.format(dom.to_sympy(self.x), dom.to_sympy(self.y)) + except TypeError: + pass + return '({}, {})'.format(self.x, self.y) + + def __sub__(self, other): + return self.__add__(-other) + + def order(self): + """ + Return point order n where nP = 0. + + """ + if self.z == 0: + return 1 + if self.y == 0: # P = -P + return 2 + p = self * 2 + if p.y == -self.y: # 2P = -P + return 3 + i = 2 + if self._domain != QQ: + while int(p.x) == p.x and int(p.y) == p.y: + p = self + p + i += 1 + if p.z == 0: + return i + return oo + while p.x.numerator == p.x and p.y.numerator == p.y: + p = self + p + i += 1 + if i > 12: + return oo + if p.z == 0: + return i + return oo diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/factor_.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/factor_.py new file mode 100644 index 0000000000000000000000000000000000000000..2dc6ac81c237f000e55014f5e170b27b41335786 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/factor_.py @@ -0,0 +1,2841 @@ +""" +Integer factorization +""" +from __future__ import annotations + +from bisect import bisect_left +from collections import defaultdict, OrderedDict +from collections.abc import MutableMapping +import math + +from sympy.core.containers import Dict +from sympy.core.mul import Mul +from sympy.core.numbers import Rational, Integer +from sympy.core.intfunc import num_digits +from sympy.core.power import Pow +from sympy.core.random import _randint +from sympy.core.singleton import S +from sympy.external.gmpy import (SYMPY_INTS, gcd, sqrt as isqrt, + sqrtrem, iroot, bit_scan1, remove) +from .primetest import isprime, MERSENNE_PRIME_EXPONENTS, is_mersenne_prime +from .generate import sieve, primerange, nextprime +from .digits import digits +from sympy.utilities.decorator import deprecated +from sympy.utilities.iterables import flatten +from sympy.utilities.misc import as_int, filldedent +from .ecm import _ecm_one_factor + + +def smoothness(n): + """ + Return the B-smooth and B-power smooth values of n. + + The smoothness of n is the largest prime factor of n; the power- + smoothness is the largest divisor raised to its multiplicity. + + Examples + ======== + + >>> from sympy.ntheory.factor_ import smoothness + >>> smoothness(2**7*3**2) + (3, 128) + >>> smoothness(2**4*13) + (13, 16) + >>> smoothness(2) + (2, 2) + + See Also + ======== + + factorint, smoothness_p + """ + + if n == 1: + return (1, 1) # not prime, but otherwise this causes headaches + facs = factorint(n) + return max(facs), max(m**facs[m] for m in facs) + + +def smoothness_p(n, m=-1, power=0, visual=None): + """ + Return a list of [m, (p, (M, sm(p + m), psm(p + m)))...] + where: + + 1. p**M is the base-p divisor of n + 2. sm(p + m) is the smoothness of p + m (m = -1 by default) + 3. psm(p + m) is the power smoothness of p + m + + The list is sorted according to smoothness (default) or by power smoothness + if power=1. + + The smoothness of the numbers to the left (m = -1) or right (m = 1) of a + factor govern the results that are obtained from the p +/- 1 type factoring + methods. + + >>> from sympy.ntheory.factor_ import smoothness_p, factorint + >>> smoothness_p(10431, m=1) + (1, [(3, (2, 2, 4)), (19, (1, 5, 5)), (61, (1, 31, 31))]) + >>> smoothness_p(10431) + (-1, [(3, (2, 2, 2)), (19, (1, 3, 9)), (61, (1, 5, 5))]) + >>> smoothness_p(10431, power=1) + (-1, [(3, (2, 2, 2)), (61, (1, 5, 5)), (19, (1, 3, 9))]) + + If visual=True then an annotated string will be returned: + + >>> print(smoothness_p(21477639576571, visual=1)) + p**i=4410317**1 has p-1 B=1787, B-pow=1787 + p**i=4869863**1 has p-1 B=2434931, B-pow=2434931 + + This string can also be generated directly from a factorization dictionary + and vice versa: + + >>> factorint(17*9) + {3: 2, 17: 1} + >>> smoothness_p(_) + 'p**i=3**2 has p-1 B=2, B-pow=2\\np**i=17**1 has p-1 B=2, B-pow=16' + >>> smoothness_p(_) + {3: 2, 17: 1} + + The table of the output logic is: + + ====== ====== ======= ======= + | Visual + ------ ---------------------- + Input True False other + ====== ====== ======= ======= + dict str tuple str + str str tuple dict + tuple str tuple str + n str tuple tuple + mul str tuple tuple + ====== ====== ======= ======= + + See Also + ======== + + factorint, smoothness + """ + + # visual must be True, False or other (stored as None) + if visual in (1, 0): + visual = bool(visual) + elif visual not in (True, False): + visual = None + + if isinstance(n, str): + if visual: + return n + d = {} + for li in n.splitlines(): + k, v = [int(i) for i in + li.split('has')[0].split('=')[1].split('**')] + d[k] = v + if visual is not True and visual is not False: + return d + return smoothness_p(d, visual=False) + elif not isinstance(n, tuple): + facs = factorint(n, visual=False) + + if power: + k = -1 + else: + k = 1 + if isinstance(n, tuple): + rv = n + else: + rv = (m, sorted([(f, + tuple([M] + list(smoothness(f + m)))) + for f, M in list(facs.items())], + key=lambda x: (x[1][k], x[0]))) + + if visual is False or (visual is not True) and (type(n) in [int, Mul]): + return rv + lines = [] + for dat in rv[1]: + dat = flatten(dat) + dat.insert(2, m) + lines.append('p**i=%i**%i has p%+i B=%i, B-pow=%i' % tuple(dat)) + return '\n'.join(lines) + + +def multiplicity(p, n): + """ + Find the greatest integer m such that p**m divides n. + + Examples + ======== + + >>> from sympy import multiplicity, Rational + >>> [multiplicity(5, n) for n in [8, 5, 25, 125, 250]] + [0, 1, 2, 3, 3] + >>> multiplicity(3, Rational(1, 9)) + -2 + + Note: when checking for the multiplicity of a number in a + large factorial it is most efficient to send it as an unevaluated + factorial or to call ``multiplicity_in_factorial`` directly: + + >>> from sympy.ntheory import multiplicity_in_factorial + >>> from sympy import factorial + >>> p = factorial(25) + >>> n = 2**100 + >>> nfac = factorial(n, evaluate=False) + >>> multiplicity(p, nfac) + 52818775009509558395695966887 + >>> _ == multiplicity_in_factorial(p, n) + True + + See Also + ======== + + trailing + + """ + try: + p, n = as_int(p), as_int(n) + except ValueError: + from sympy.functions.combinatorial.factorials import factorial + if all(isinstance(i, (SYMPY_INTS, Rational)) for i in (p, n)): + p = Rational(p) + n = Rational(n) + if p.q == 1: + if n.p == 1: + return -multiplicity(p.p, n.q) + return multiplicity(p.p, n.p) - multiplicity(p.p, n.q) + elif p.p == 1: + return multiplicity(p.q, n.q) + else: + like = min( + multiplicity(p.p, n.p), + multiplicity(p.q, n.q)) + cross = min( + multiplicity(p.q, n.p), + multiplicity(p.p, n.q)) + return like - cross + elif (isinstance(p, (SYMPY_INTS, Integer)) and + isinstance(n, factorial) and + isinstance(n.args[0], Integer) and + n.args[0] >= 0): + return multiplicity_in_factorial(p, n.args[0]) + raise ValueError('expecting ints or fractions, got %s and %s' % (p, n)) + + if n == 0: + raise ValueError('no such integer exists: multiplicity of %s is not-defined' %(n)) + return remove(n, p)[1] + + +def multiplicity_in_factorial(p, n): + """return the largest integer ``m`` such that ``p**m`` divides ``n!`` + without calculating the factorial of ``n``. + + Parameters + ========== + + p : Integer + positive integer + n : Integer + non-negative integer + + Examples + ======== + + >>> from sympy.ntheory import multiplicity_in_factorial + >>> from sympy import factorial + + >>> multiplicity_in_factorial(2, 3) + 1 + + An instructive use of this is to tell how many trailing zeros + a given factorial has. For example, there are 6 in 25!: + + >>> factorial(25) + 15511210043330985984000000 + >>> multiplicity_in_factorial(10, 25) + 6 + + For large factorials, it is much faster/feasible to use + this function rather than computing the actual factorial: + + >>> multiplicity_in_factorial(factorial(25), 2**100) + 52818775009509558395695966887 + + See Also + ======== + + multiplicity + + """ + + p, n = as_int(p), as_int(n) + + if p <= 0: + raise ValueError('expecting positive integer got %s' % p ) + + if n < 0: + raise ValueError('expecting non-negative integer got %s' % n ) + + # keep only the largest of a given multiplicity since those + # of a given multiplicity will be goverened by the behavior + # of the largest factor + f = defaultdict(int) + for k, v in factorint(p).items(): + f[v] = max(k, f[v]) + # multiplicity of p in n! depends on multiplicity + # of prime `k` in p, so we floor divide by `v` + # and keep it if smaller than the multiplicity of p + # seen so far + return min((n + k - sum(digits(n, k)))//(k - 1)//v for v, k in f.items()) + + +def _perfect_power(n, next_p=2): + """ Return integers ``(b, e)`` such that ``n == b**e`` if ``n`` is a unique + perfect power with ``e > 1``, else ``False`` (e.g. 1 is not a perfect power). + + Explanation + =========== + + This is a low-level helper for ``perfect_power``, for internal use. + + Parameters + ========== + + n : int + assume that n is a nonnegative integer + next_p : int + Assume that n has no factor less than next_p. + i.e., all(n % p for p in range(2, next_p)) is True + + Examples + ======== + >>> from sympy.ntheory.factor_ import _perfect_power + >>> _perfect_power(16) + (2, 4) + >>> _perfect_power(17) + False + + """ + if n <= 3: + return False + + factors = {} + g = 0 + multi = 1 + + def done(n, factors, g, multi): + g = gcd(g, multi) + if g == 1: + return False + factors[n] = multi + return math.prod(p**(e//g) for p, e in factors.items()), g + + # If n is small, only trial factoring is faster + if n <= 1_000_000: + n = _factorint_small(factors, n, 1_000, 1_000, next_p)[0] + if n > 1: + return False + g = gcd(*factors.values()) + if g == 1: + return False + return math.prod(p**(e//g) for p, e in factors.items()), g + + # divide by 2 + if next_p < 3: + g = bit_scan1(n) + if g: + if g == 1: + return False + n >>= g + factors[2] = g + if n == 1: + return 2, g + else: + # If `m**g`, then we have found perfect power. + # Otherwise, there is no possibility of perfect power, especially if `g` is prime. + m, _exact = iroot(n, g) + if _exact: + return 2*m, g + elif isprime(g): + return False + next_p = 3 + + # square number? + while n & 7 == 1: # n % 8 == 1: + m, _exact = iroot(n, 2) + if _exact: + n = m + multi <<= 1 + else: + break + if n < next_p**3: + return done(n, factors, g, multi) + + # trial factoring + # Since the maximum value an exponent can take is `log_{next_p}(n)`, + # the number of exponents to be checked can be reduced by performing a trial factoring. + # The value of `tf_max` needs more consideration. + tf_max = n.bit_length()//27 + 24 + if next_p < tf_max: + for p in primerange(next_p, tf_max): + m, t = remove(n, p) + if t: + n = m + t *= multi + _g = gcd(g, t) + if _g == 1: + return False + factors[p] = t + if n == 1: + return math.prod(p**(e//_g) + for p, e in factors.items()), _g + elif g == 0 or _g < g: # If g is updated + g = _g + m, _exact = iroot(n**multi, g) + if _exact: + return m * math.prod(p**(e//g) + for p, e in factors.items()), g + elif isprime(g): + return False + next_p = tf_max + if n < next_p**3: + return done(n, factors, g, multi) + + # check iroot + if g: + # If g is non-zero, the exponent is a divisor of g. + # 2 can be omitted since it has already been checked. + prime_iter = sorted(factorint(g >> bit_scan1(g)).keys()) + else: + # The maximum possible value of the exponent is `log_{next_p}(n)`. + # To compensate for the presence of computational error, 2 is added. + prime_iter = primerange(3, int(math.log(n, next_p)) + 2) + logn = math.log2(n) + threshold = logn / 40 # Threshold for direct calculation + for p in prime_iter: + if threshold < p: + # If p is large, find the power root p directly without `iroot`. + while True: + b = pow(2, logn / p) + rb = int(b + 0.5) + if abs(rb - b) < 0.01 and rb**p == n: + n = rb + multi *= p + logn = math.log2(n) + else: + break + else: + while True: + m, _exact = iroot(n, p) + if _exact: + n = m + multi *= p + logn = math.log2(n) + else: + break + if n < next_p**(p + 2): + break + return done(n, factors, g, multi) + + +def perfect_power(n, candidates=None, big=True, factor=True): + """ + Return ``(b, e)`` such that ``n`` == ``b**e`` if ``n`` is a unique + perfect power with ``e > 1``, else ``False`` (e.g. 1 is not a + perfect power). A ValueError is raised if ``n`` is not Rational. + + By default, the base is recursively decomposed and the exponents + collected so the largest possible ``e`` is sought. If ``big=False`` + then the smallest possible ``e`` (thus prime) will be chosen. + + If ``factor=True`` then simultaneous factorization of ``n`` is + attempted since finding a factor indicates the only possible root + for ``n``. This is True by default since only a few small factors will + be tested in the course of searching for the perfect power. + + The use of ``candidates`` is primarily for internal use; if provided, + False will be returned if ``n`` cannot be written as a power with one + of the candidates as an exponent and factoring (beyond testing for + a factor of 2) will not be attempted. + + Examples + ======== + + >>> from sympy import perfect_power, Rational + >>> perfect_power(16) + (2, 4) + >>> perfect_power(16, big=False) + (4, 2) + + Negative numbers can only have odd perfect powers: + + >>> perfect_power(-4) + False + >>> perfect_power(-8) + (-2, 3) + + Rationals are also recognized: + + >>> perfect_power(Rational(1, 2)**3) + (1/2, 3) + >>> perfect_power(Rational(-3, 2)**3) + (-3/2, 3) + + Notes + ===== + + To know whether an integer is a perfect power of 2 use + + >>> is2pow = lambda n: bool(n and not n & (n - 1)) + >>> [(i, is2pow(i)) for i in range(5)] + [(0, False), (1, True), (2, True), (3, False), (4, True)] + + It is not necessary to provide ``candidates``. When provided + it will be assumed that they are ints. The first one that is + larger than the computed maximum possible exponent will signal + failure for the routine. + + >>> perfect_power(3**8, [9]) + False + >>> perfect_power(3**8, [2, 4, 8]) + (3, 8) + >>> perfect_power(3**8, [4, 8], big=False) + (9, 4) + + See Also + ======== + sympy.core.intfunc.integer_nthroot + sympy.ntheory.primetest.is_square + """ + # negative handling + if n < 0: + if candidates is None: + pp = perfect_power(-n, big=True, factor=factor) + if not pp: + return False + + b, e = pp + e2 = e & (-e) + b, e = b ** e2, e // e2 + + if e <= 1: + return False + + if big or isprime(e): + return -b, e + + for p in primerange(3, e + 1): + if e % p == 0: + return - b ** (e // p), p + + odd_candidates = {i for i in candidates if i % 2} + if not odd_candidates: + return False + + pp = perfect_power(-n, odd_candidates, big, factor) + if pp: + return -pp[0], pp[1] + + return False + + # non-integer handling + if isinstance(n, Rational) and not isinstance(n, Integer): + p, q = n.p, n.q + + if p == 1: + qq = perfect_power(q, candidates, big, factor) + return (S.One / qq[0], qq[1]) if qq is not False else False + + if not (pp:=perfect_power(p, factor=factor)): + return False + if not (qq:=perfect_power(q, factor=factor)): + return False + (num_base, num_exp), (den_base, den_exp) = pp, qq + + def compute_tuple(exponent): + """Helper to compute final result given an exponent""" + new_num = num_base ** (num_exp // exponent) + new_den = den_base ** (den_exp // exponent) + return n.func(new_num, new_den), exponent + + if candidates: + valid_candidates = [i for i in candidates + if num_exp % i == 0 and den_exp % i == 0] + if not valid_candidates: + return False + + e = max(valid_candidates) if big else min(valid_candidates) + return compute_tuple(e) + + g = math.gcd(num_exp, den_exp) + if g == 1: + return False + + if big: + return compute_tuple(g) + + e = next(p for p in primerange(2, g + 1) if g % p == 0) + return compute_tuple(e) + + if candidates is not None: + candidates = set(candidates) + + # positive integer handling + n = as_int(n) + + if candidates is None and big: + return _perfect_power(n) + + if n <= 3: + # no unique exponent for 0, 1 + # 2 and 3 have exponents of 1 + return False + logn = math.log2(n) + max_possible = int(logn) + 2 # only check values less than this + not_square = n % 10 in [2, 3, 7, 8] # squares cannot end in 2, 3, 7, 8 + min_possible = 2 + not_square + if not candidates: + candidates = primerange(min_possible, max_possible) + else: + candidates = sorted([i for i in candidates + if min_possible <= i < max_possible]) + if n%2 == 0: + e = bit_scan1(n) + candidates = [i for i in candidates if e%i == 0] + if big: + candidates = reversed(candidates) + for e in candidates: + r, ok = iroot(n, e) + if ok: + return int(r), e + return False + + def _factors(): + rv = 2 + n % 2 + while True: + yield rv + rv = nextprime(rv) + + for fac, e in zip(_factors(), candidates): + # see if there is a factor present + if factor and n % fac == 0: + # find what the potential power is + e = remove(n, fac)[1] + # if it's a trivial power we are done + if e == 1: + return False + + # maybe the e-th root of n is exact + r, exact = iroot(n, e) + if not exact: + # Having a factor, we know that e is the maximal + # possible value for a root of n. + # If n = fac**e*m can be written as a perfect + # power then see if m can be written as r**E where + # gcd(e, E) != 1 so n = (fac**(e//E)*r)**E + m = n//fac**e + rE = perfect_power(m, candidates=divisors(e, generator=True)) + if not rE: + return False + else: + r, E = rE + r, e = fac**(e//E)*r, E + if not big: + e0 = primefactors(e) + if e0[0] != e: + r, e = r**(e//e0[0]), e0[0] + return int(r), e + + # Weed out downright impossible candidates + if logn/e < 40: + b = 2.0**(logn/e) + if abs(int(b + 0.5) - b) > 0.01: + continue + + # now see if the plausible e makes a perfect power + r, exact = iroot(n, e) + if exact: + if big: + m = perfect_power(r, big=big, factor=factor) + if m: + r, e = m[0], e*m[1] + return int(r), e + + return False + + +class FactorCache(MutableMapping): + """ Provides a cache for prime factors. + ``factor_cache`` is pre-prepared as an instance of ``FactorCache``, + and ``factorint`` internally references it to speed up + the factorization of prime factors. + + While cache is automatically added during the execution of ``factorint``, + users can also manually add prime factors independently. + + >>> from sympy import factor_cache + >>> factor_cache[15] = 5 + + Furthermore, by customizing ``get_external``, + it is also possible to use external databases. + The following is an example using http://factordb.com . + + .. code-block:: python + + import requests + from sympy import factor_cache + + def get_external(self, n: int) -> list[int] | None: + res = requests.get("http://factordb.com/api", params={"query": str(n)}) + if res.status_code != requests.codes.ok: + return None + j = res.json() + if j.get("status") in ["FF", "P"]: + return list(int(p) for p, _ in j.get("factors")) + + factor_cache.get_external = get_external + + Be aware that writing this code will trigger internet access + to factordb.com when calling ``factorint``. + + """ + def __init__(self, maxsize: int | None = None): + self._cache: OrderedDict[int, int] = OrderedDict() + self.maxsize = maxsize + + def __len__(self) -> int: + return len(self._cache) + + def __contains__(self, n) -> bool: + return n in self._cache + + def __getitem__(self, n: int) -> int: + factor = self.get(n) + if factor is None: + raise KeyError(f"{n} does not exist.") + return factor + + def __setitem__(self, n: int, factor: int): + if not (1 < factor <= n and n % factor == 0 and isprime(factor)): + raise ValueError(f"{factor} is not a prime factor of {n}") + self._cache[n] = max(self._cache.get(n, 0), factor) + if self.maxsize is not None and len(self._cache) > self.maxsize: + self._cache.popitem(False) + + def __delitem__(self, n: int): + if n not in self._cache: + raise KeyError(f"{n} does not exist.") + del self._cache[n] + + def __iter__(self): + return self._cache.__iter__() + + def cache_clear(self) -> None: + """ Clear the cache """ + self._cache = OrderedDict() + + @property + def maxsize(self) -> int | None: + """ Returns the maximum cache size; if ``None``, it is unlimited. """ + return self._maxsize + + @maxsize.setter + def maxsize(self, value: int | None) -> None: + if value is not None and value <= 0: + raise ValueError("maxsize must be None or a non-negative integer.") + self._maxsize = value + if value is not None: + while len(self._cache) > value: + self._cache.popitem(False) + + def get(self, n: int, default=None): + """ Return the prime factor of ``n``. + If it does not exist in the cache, return the value of ``default``. + """ + if n <= sieve._list[-1]: + if sieve._list[bisect_left(sieve._list, n)] == n: + return n + if n in self._cache: + self._cache.move_to_end(n) + return self._cache[n] + if factors := self.get_external(n): + self.add(n, factors) + return self._cache[n] + return default + + def add(self, n: int, factors: list[int]) -> None: + for p in sorted(factors, reverse=True): + self[n] = p + n, _ = remove(n, p) + + def get_external(self, n: int) -> list[int] | None: + return None + + +factor_cache = FactorCache(maxsize=1000) + + +def pollard_rho(n, s=2, a=1, retries=5, seed=1234, max_steps=None, F=None): + r""" + Use Pollard's rho method to try to extract a nontrivial factor + of ``n``. The returned factor may be a composite number. If no + factor is found, ``None`` is returned. + + The algorithm generates pseudo-random values of x with a generator + function, replacing x with F(x). If F is not supplied then the + function x**2 + ``a`` is used. The first value supplied to F(x) is ``s``. + Upon failure (if ``retries`` is > 0) a new ``a`` and ``s`` will be + supplied; the ``a`` will be ignored if F was supplied. + + The sequence of numbers generated by such functions generally have a + a lead-up to some number and then loop around back to that number and + begin to repeat the sequence, e.g. 1, 2, 3, 4, 5, 3, 4, 5 -- this leader + and loop look a bit like the Greek letter rho, and thus the name, 'rho'. + + For a given function, very different leader-loop values can be obtained + so it is a good idea to allow for retries: + + >>> from sympy.ntheory.generate import cycle_length + >>> n = 16843009 + >>> F = lambda x:(2048*pow(x, 2, n) + 32767) % n + >>> for s in range(5): + ... print('loop length = %4i; leader length = %3i' % next(cycle_length(F, s))) + ... + loop length = 2489; leader length = 43 + loop length = 78; leader length = 121 + loop length = 1482; leader length = 100 + loop length = 1482; leader length = 286 + loop length = 1482; leader length = 101 + + Here is an explicit example where there is a three element leadup to + a sequence of 3 numbers (11, 14, 4) that then repeat: + + >>> x=2 + >>> for i in range(9): + ... print(x) + ... x=(x**2+12)%17 + ... + 2 + 16 + 13 + 11 + 14 + 4 + 11 + 14 + 4 + >>> next(cycle_length(lambda x: (x**2+12)%17, 2)) + (3, 3) + >>> list(cycle_length(lambda x: (x**2+12)%17, 2, values=True)) + [2, 16, 13, 11, 14, 4] + + Instead of checking the differences of all generated values for a gcd + with n, only the kth and 2*kth numbers are checked, e.g. 1st and 2nd, + 2nd and 4th, 3rd and 6th until it has been detected that the loop has been + traversed. Loops may be many thousands of steps long before rho finds a + factor or reports failure. If ``max_steps`` is specified, the iteration + is cancelled with a failure after the specified number of steps. + + Examples + ======== + + >>> from sympy import pollard_rho + >>> n=16843009 + >>> F=lambda x:(2048*pow(x,2,n) + 32767) % n + >>> pollard_rho(n, F=F) + 257 + + Use the default setting with a bad value of ``a`` and no retries: + + >>> pollard_rho(n, a=n-2, retries=0) + + If retries is > 0 then perhaps the problem will correct itself when + new values are generated for a: + + >>> pollard_rho(n, a=n-2, retries=1) + 257 + + References + ========== + + .. [1] Richard Crandall & Carl Pomerance (2005), "Prime Numbers: + A Computational Perspective", Springer, 2nd edition, 229-231 + + """ + n = int(n) + if n < 5: + raise ValueError('pollard_rho should receive n > 4') + randint = _randint(seed + retries) + V = s + for i in range(retries + 1): + U = V + if not F: + F = lambda x: (pow(x, 2, n) + a) % n + j = 0 + while 1: + if max_steps and (j > max_steps): + break + j += 1 + U = F(U) + V = F(F(V)) # V is 2x further along than U + g = gcd(U - V, n) + if g == 1: + continue + if g == n: + break + return int(g) + V = randint(0, n - 1) + a = randint(1, n - 3) # for x**2 + a, a%n should not be 0 or -2 + F = None + return None + + +def pollard_pm1(n, B=10, a=2, retries=0, seed=1234): + """ + Use Pollard's p-1 method to try to extract a nontrivial factor + of ``n``. Either a divisor (perhaps composite) or ``None`` is returned. + + The value of ``a`` is the base that is used in the test gcd(a**M - 1, n). + The default is 2. If ``retries`` > 0 then if no factor is found after the + first attempt, a new ``a`` will be generated randomly (using the ``seed``) + and the process repeated. + + Note: the value of M is lcm(1..B) = reduce(ilcm, range(2, B + 1)). + + A search is made for factors next to even numbers having a power smoothness + less than ``B``. Choosing a larger B increases the likelihood of finding a + larger factor but takes longer. Whether a factor of n is found or not + depends on ``a`` and the power smoothness of the even number just less than + the factor p (hence the name p - 1). + + Although some discussion of what constitutes a good ``a`` some + descriptions are hard to interpret. At the modular.math site referenced + below it is stated that if gcd(a**M - 1, n) = N then a**M % q**r is 1 + for every prime power divisor of N. But consider the following: + + >>> from sympy.ntheory.factor_ import smoothness_p, pollard_pm1 + >>> n=257*1009 + >>> smoothness_p(n) + (-1, [(257, (1, 2, 256)), (1009, (1, 7, 16))]) + + So we should (and can) find a root with B=16: + + >>> pollard_pm1(n, B=16, a=3) + 1009 + + If we attempt to increase B to 256 we find that it does not work: + + >>> pollard_pm1(n, B=256) + >>> + + But if the value of ``a`` is changed we find that only multiples of + 257 work, e.g.: + + >>> pollard_pm1(n, B=256, a=257) + 1009 + + Checking different ``a`` values shows that all the ones that did not + work had a gcd value not equal to ``n`` but equal to one of the + factors: + + >>> from sympy import ilcm, igcd, factorint, Pow + >>> M = 1 + >>> for i in range(2, 256): + ... M = ilcm(M, i) + ... + >>> set([igcd(pow(a, M, n) - 1, n) for a in range(2, 256) if + ... igcd(pow(a, M, n) - 1, n) != n]) + {1009} + + But does aM % d for every divisor of n give 1? + + >>> aM = pow(255, M, n) + >>> [(d, aM%Pow(*d.args)) for d in factorint(n, visual=True).args] + [(257**1, 1), (1009**1, 1)] + + No, only one of them. So perhaps the principle is that a root will + be found for a given value of B provided that: + + 1) the power smoothness of the p - 1 value next to the root + does not exceed B + 2) a**M % p != 1 for any of the divisors of n. + + By trying more than one ``a`` it is possible that one of them + will yield a factor. + + Examples + ======== + + With the default smoothness bound, this number cannot be cracked: + + >>> from sympy.ntheory import pollard_pm1 + >>> pollard_pm1(21477639576571) + + Increasing the smoothness bound helps: + + >>> pollard_pm1(21477639576571, B=2000) + 4410317 + + Looking at the smoothness of the factors of this number we find: + + >>> from sympy.ntheory.factor_ import smoothness_p, factorint + >>> print(smoothness_p(21477639576571, visual=1)) + p**i=4410317**1 has p-1 B=1787, B-pow=1787 + p**i=4869863**1 has p-1 B=2434931, B-pow=2434931 + + The B and B-pow are the same for the p - 1 factorizations of the divisors + because those factorizations had a very large prime factor: + + >>> factorint(4410317 - 1) + {2: 2, 617: 1, 1787: 1} + >>> factorint(4869863-1) + {2: 1, 2434931: 1} + + Note that until B reaches the B-pow value of 1787, the number is not cracked; + + >>> pollard_pm1(21477639576571, B=1786) + >>> pollard_pm1(21477639576571, B=1787) + 4410317 + + The B value has to do with the factors of the number next to the divisor, + not the divisors themselves. A worst case scenario is that the number next + to the factor p has a large prime divisisor or is a perfect power. If these + conditions apply then the power-smoothness will be about p/2 or p. The more + realistic is that there will be a large prime factor next to p requiring + a B value on the order of p/2. Although primes may have been searched for + up to this level, the p/2 is a factor of p - 1, something that we do not + know. The modular.math reference below states that 15% of numbers in the + range of 10**15 to 15**15 + 10**4 are 10**6 power smooth so a B of 10**6 + will fail 85% of the time in that range. From 10**8 to 10**8 + 10**3 the + percentages are nearly reversed...but in that range the simple trial + division is quite fast. + + References + ========== + + .. [1] Richard Crandall & Carl Pomerance (2005), "Prime Numbers: + A Computational Perspective", Springer, 2nd edition, 236-238 + .. [2] https://web.archive.org/web/20150716201437/http://modular.math.washington.edu/edu/2007/spring/ent/ent-html/node81.html + .. [3] https://www.cs.toronto.edu/~yuvalf/Factorization.pdf + """ + + n = int(n) + if n < 4 or B < 3: + raise ValueError('pollard_pm1 should receive n > 3 and B > 2') + randint = _randint(seed + B) + + # computing a**lcm(1,2,3,..B) % n for B > 2 + # it looks weird, but it's right: primes run [2, B] + # and the answer's not right until the loop is done. + for i in range(retries + 1): + aM = a + for p in sieve.primerange(2, B + 1): + e = int(math.log(B, p)) + aM = pow(aM, pow(p, e), n) + g = gcd(aM - 1, n) + if 1 < g < n: + return int(g) + + # get a new a: + # since the exponent, lcm(1..B), is even, if we allow 'a' to be 'n-1' + # then (n - 1)**even % n will be 1 which will give a g of 0 and 1 will + # give a zero, too, so we set the range as [2, n-2]. Some references + # say 'a' should be coprime to n, but either will detect factors. + a = randint(2, n - 2) + + +def _trial(factors, n, candidates, verbose=False): + """ + Helper function for integer factorization. Trial factors ``n` + against all integers given in the sequence ``candidates`` + and updates the dict ``factors`` in-place. Returns the reduced + value of ``n`` and a flag indicating whether any factors were found. + """ + if verbose: + factors0 = list(factors.keys()) + nfactors = len(factors) + for d in candidates: + if n % d == 0: + if n != d: + factor_cache[n] = d + n, m = remove(n // d, d) + factors[d] = m + 1 + if verbose: + for k in sorted(set(factors).difference(set(factors0))): + print(factor_msg % (k, factors[k])) + return int(n), len(factors) != nfactors + + +def _check_termination(factors, n, limit, use_trial, use_rho, use_pm1, + verbose, next_p): + """ + Helper function for integer factorization. Checks if ``n`` + is a prime or a perfect power, and in those cases updates the factorization. + """ + if verbose: + print('Check for termination') + if n == 1: + if verbose: + print(complete_msg) + return True + if n < next_p**2 or isprime(n): + factor_cache[n] = n + factors[int(n)] = 1 + if verbose: + print(complete_msg) + return True + + # since we've already been factoring there is no need to do + # simultaneous factoring with the power check + p = _perfect_power(n, next_p) + if not p: + return False + base, exp = p + if base < next_p**2 or isprime(base): + factor_cache[n] = base + factors[base] = exp + else: + facs = factorint(base, limit, use_trial, use_rho, use_pm1, + verbose=False) + for b, e in facs.items(): + if verbose: + print(factor_msg % (b, e)) + factors[b] = exp*e + if verbose: + print(complete_msg) + return True + + +trial_int_msg = "Trial division with ints [%i ... %i] and fail_max=%i" +trial_msg = "Trial division with primes [%i ... %i]" +rho_msg = "Pollard's rho with retries %i, max_steps %i and seed %i" +pm1_msg = "Pollard's p-1 with smoothness bound %i and seed %i" +ecm_msg = "Elliptic Curve with B1 bound %i, B2 bound %i, num_curves %i" +factor_msg = '\t%i ** %i' +fermat_msg = 'Close factors satisfying Fermat condition found.' +complete_msg = 'Factorization is complete.' + + +def _factorint_small(factors, n, limit, fail_max, next_p=2): + """ + Return the value of n and either a 0 (indicating that factorization up + to the limit was complete) or else the next near-prime that would have + been tested. + + Factoring stops if there are fail_max unsuccessful tests in a row. + + If factors of n were found they will be in the factors dictionary as + {factor: multiplicity} and the returned value of n will have had those + factors removed. The factors dictionary is modified in-place. + + """ + + def done(n, d): + """return n, d if the sqrt(n) was not reached yet, else + n, 0 indicating that factoring is done. + """ + if d*d <= n: + return n, d + return n, 0 + + limit2 = limit**2 + threshold2 = min(n, limit2) + + if next_p < 3: + if not n & 1: + m = bit_scan1(n) + factors[2] = m + n >>= m + threshold2 = min(n, limit2) + next_p = 3 + if threshold2 < 9: # next_p**2 = 9 + return done(n, next_p) + + if next_p < 5: + if not n % 3: + n //= 3 + m = 1 + while not n % 3: + n //= 3 + m += 1 + if m == 20: + n, mm = remove(n, 3) + m += mm + break + factors[3] = m + threshold2 = min(n, limit2) + next_p = 5 + if threshold2 < 25: # next_p**2 = 25 + return done(n, next_p) + + # Because of the order of checks, starting from `min_p = 6k+5`, + # useless checks are caused. + # We want to calculate + # next_p += [-1, -2, 3, 2, 1, 0][next_p % 6] + p6 = next_p % 6 + next_p += (-1 if p6 < 2 else 5) - p6 + + fails = 0 + while fails < fail_max: + # next_p % 6 == 5 + if n % next_p: + fails += 1 + else: + n //= next_p + m = 1 + while not n % next_p: + n //= next_p + m += 1 + if m == 20: + n, mm = remove(n, next_p) + m += mm + break + factors[next_p] = m + fails = 0 + threshold2 = min(n, limit2) + next_p += 2 + if threshold2 < next_p**2: + return done(n, next_p) + + # next_p % 6 == 1 + if n % next_p: + fails += 1 + else: + n //= next_p + m = 1 + while not n % next_p: + n //= next_p + m += 1 + if m == 20: + n, mm = remove(n, next_p) + m += mm + break + factors[next_p] = m + fails = 0 + threshold2 = min(n, limit2) + next_p += 4 + if threshold2 < next_p**2: + return done(n, next_p) + return done(n, next_p) + + +def factorint(n, limit=None, use_trial=True, use_rho=True, use_pm1=True, + use_ecm=True, verbose=False, visual=None, multiple=False): + r""" + Given a positive integer ``n``, ``factorint(n)`` returns a dict containing + the prime factors of ``n`` as keys and their respective multiplicities + as values. For example: + + >>> from sympy.ntheory import factorint + >>> factorint(2000) # 2000 = (2**4) * (5**3) + {2: 4, 5: 3} + >>> factorint(65537) # This number is prime + {65537: 1} + + For input less than 2, factorint behaves as follows: + + - ``factorint(1)`` returns the empty factorization, ``{}`` + - ``factorint(0)`` returns ``{0:1}`` + - ``factorint(-n)`` adds ``-1:1`` to the factors and then factors ``n`` + + Partial Factorization: + + If ``limit`` (> 3) is specified, the search is stopped after performing + trial division up to (and including) the limit (or taking a + corresponding number of rho/p-1 steps). This is useful if one has + a large number and only is interested in finding small factors (if + any). Note that setting a limit does not prevent larger factors + from being found early; it simply means that the largest factor may + be composite. Since checking for perfect power is relatively cheap, it is + done regardless of the limit setting. + + This number, for example, has two small factors and a huge + semi-prime factor that cannot be reduced easily: + + >>> from sympy.ntheory import isprime + >>> a = 1407633717262338957430697921446883 + >>> f = factorint(a, limit=10000) + >>> f == {991: 1, int(202916782076162456022877024859): 1, 7: 1} + True + >>> isprime(max(f)) + False + + This number has a small factor and a residual perfect power whose + base is greater than the limit: + + >>> factorint(3*101**7, limit=5) + {3: 1, 101: 7} + + List of Factors: + + If ``multiple`` is set to ``True`` then a list containing the + prime factors including multiplicities is returned. + + >>> factorint(24, multiple=True) + [2, 2, 2, 3] + + Visual Factorization: + + If ``visual`` is set to ``True``, then it will return a visual + factorization of the integer. For example: + + >>> from sympy import pprint + >>> pprint(factorint(4200, visual=True)) + 3 1 2 1 + 2 *3 *5 *7 + + Note that this is achieved by using the evaluate=False flag in Mul + and Pow. If you do other manipulations with an expression where + evaluate=False, it may evaluate. Therefore, you should use the + visual option only for visualization, and use the normal dictionary + returned by visual=False if you want to perform operations on the + factors. + + You can easily switch between the two forms by sending them back to + factorint: + + >>> from sympy import Mul + >>> regular = factorint(1764); regular + {2: 2, 3: 2, 7: 2} + >>> pprint(factorint(regular)) + 2 2 2 + 2 *3 *7 + + >>> visual = factorint(1764, visual=True); pprint(visual) + 2 2 2 + 2 *3 *7 + >>> print(factorint(visual)) + {2: 2, 3: 2, 7: 2} + + If you want to send a number to be factored in a partially factored form + you can do so with a dictionary or unevaluated expression: + + >>> factorint(factorint({4: 2, 12: 3})) # twice to toggle to dict form + {2: 10, 3: 3} + >>> factorint(Mul(4, 12, evaluate=False)) + {2: 4, 3: 1} + + The table of the output logic is: + + ====== ====== ======= ======= + Visual + ------ ---------------------- + Input True False other + ====== ====== ======= ======= + dict mul dict mul + n mul dict dict + mul mul dict dict + ====== ====== ======= ======= + + Notes + ===== + + Algorithm: + + The function switches between multiple algorithms. Trial division + quickly finds small factors (of the order 1-5 digits), and finds + all large factors if given enough time. The Pollard rho and p-1 + algorithms are used to find large factors ahead of time; they + will often find factors of the order of 10 digits within a few + seconds: + + >>> factors = factorint(12345678910111213141516) + >>> for base, exp in sorted(factors.items()): + ... print('%s %s' % (base, exp)) + ... + 2 2 + 2507191691 1 + 1231026625769 1 + + Any of these methods can optionally be disabled with the following + boolean parameters: + + - ``use_trial``: Toggle use of trial division + - ``use_rho``: Toggle use of Pollard's rho method + - ``use_pm1``: Toggle use of Pollard's p-1 method + + ``factorint`` also periodically checks if the remaining part is + a prime number or a perfect power, and in those cases stops. + + For unevaluated factorial, it uses Legendre's formula(theorem). + + + If ``verbose`` is set to ``True``, detailed progress is printed. + + See Also + ======== + + smoothness, smoothness_p, divisors + + """ + if isinstance(n, Dict): + n = dict(n) + if multiple: + fac = factorint(n, limit=limit, use_trial=use_trial, + use_rho=use_rho, use_pm1=use_pm1, + verbose=verbose, visual=False, multiple=False) + factorlist = sum(([p] * fac[p] if fac[p] > 0 else [S.One/p]*(-fac[p]) + for p in sorted(fac)), []) + return factorlist + + factordict = {} + if visual and not isinstance(n, (Mul, dict)): + factordict = factorint(n, limit=limit, use_trial=use_trial, + use_rho=use_rho, use_pm1=use_pm1, + verbose=verbose, visual=False) + elif isinstance(n, Mul): + factordict = {int(k): int(v) for k, v in + n.as_powers_dict().items()} + elif isinstance(n, dict): + factordict = n + if factordict and isinstance(n, (Mul, dict)): + # check it + for key in list(factordict.keys()): + if isprime(key): + continue + e = factordict.pop(key) + d = factorint(key, limit=limit, use_trial=use_trial, use_rho=use_rho, + use_pm1=use_pm1, verbose=verbose, visual=False) + for k, v in d.items(): + if k in factordict: + factordict[k] += v*e + else: + factordict[k] = v*e + if visual or (type(n) is dict and + visual is not True and + visual is not False): + if factordict == {}: + return S.One + if -1 in factordict: + factordict.pop(-1) + args = [S.NegativeOne] + else: + args = [] + args.extend([Pow(*i, evaluate=False) + for i in sorted(factordict.items())]) + return Mul(*args, evaluate=False) + elif isinstance(n, (dict, Mul)): + return factordict + + assert use_trial or use_rho or use_pm1 or use_ecm + + from sympy.functions.combinatorial.factorials import factorial + if isinstance(n, factorial): + x = as_int(n.args[0]) + if x >= 20: + factors = {} + m = 2 # to initialize the if condition below + for p in sieve.primerange(2, x + 1): + if m > 1: + m, q = 0, x // p + while q != 0: + m += q + q //= p + factors[p] = m + if factors and verbose: + for k in sorted(factors): + print(factor_msg % (k, factors[k])) + if verbose: + print(complete_msg) + return factors + else: + # if n < 20!, direct computation is faster + # since it uses a lookup table + n = n.func(x) + + n = as_int(n) + if limit: + limit = int(limit) + use_ecm = False + + # special cases + if n < 0: + factors = factorint( + -n, limit=limit, use_trial=use_trial, use_rho=use_rho, + use_pm1=use_pm1, verbose=verbose, visual=False) + factors[-1] = 1 + return factors + + if limit and limit < 2: + if n == 1: + return {} + return {n: 1} + elif n < 10: + # doing this we are assured of getting a limit > 2 + # when we have to compute it later + return [{0: 1}, {}, {2: 1}, {3: 1}, {2: 2}, {5: 1}, + {2: 1, 3: 1}, {7: 1}, {2: 3}, {3: 2}][n] + + factors = {} + + # do simplistic factorization + if verbose: + sn = str(n) + if len(sn) > 50: + print('Factoring %s' % sn[:5] + \ + '..(%i other digits)..' % (len(sn) - 10) + sn[-5:]) + else: + print('Factoring', n) + + # this is the preliminary factorization for small factors + # We want to guarantee that there are no small prime factors, + # so we run even if `use_trial` is False. + small = 2**15 + fail_max = 600 + small = min(small, limit or small) + if verbose: + print(trial_int_msg % (2, small, fail_max)) + n, next_p = _factorint_small(factors, n, small, fail_max) + if factors and verbose: + for k in sorted(factors): + print(factor_msg % (k, factors[k])) + if next_p == 0: + if n > 1: + factors[int(n)] = 1 + if verbose: + print(complete_msg) + return factors + # Check if it exists in the cache + while p := factor_cache.get(n): + n, e = remove(n, p) + factors[int(p)] = int(e) + # first check if the simplistic run didn't finish + # because of the limit and check for a perfect + # power before exiting + if limit and next_p > limit: + if verbose: + print('Exceeded limit:', limit) + if _check_termination(factors, n, limit, use_trial, + use_rho, use_pm1, verbose, next_p): + return factors + if n > 1: + factors[int(n)] = 1 + return factors + if _check_termination(factors, n, limit, use_trial, + use_rho, use_pm1, verbose, next_p): + return factors + + # continue with more advanced factorization methods + # ...do a Fermat test since it's so easy and we need the + # square root anyway. Finding 2 factors is easy if they are + # "close enough." This is the big root equivalent of dividing by + # 2, 3, 5. + sqrt_n = isqrt(n) + a = sqrt_n + 1 + # If `n % 4 == 1`, `a` must be odd for `a**2 - n` to be a square number. + if (n % 4 == 1) ^ (a & 1): + a += 1 + a2 = a**2 + b2 = a2 - n + for _ in range(3): + b, fermat = sqrtrem(b2) + if not fermat: + if verbose: + print(fermat_msg) + for r in [a - b, a + b]: + facs = factorint(r, limit=limit, use_trial=use_trial, + use_rho=use_rho, use_pm1=use_pm1, + verbose=verbose) + for k, v in facs.items(): + factors[k] = factors.get(k, 0) + v + factor_cache.add(n, facs) + if verbose: + print(complete_msg) + return factors + b2 += (a + 1) << 2 # equiv to (a + 2)**2 - n + a += 2 + + # these are the limits for trial division which will + # be attempted in parallel with pollard methods + low, high = next_p, 2*next_p + + # add 1 to make sure limit is reached in primerange calls + _limit = (limit or sqrt_n) + 1 + iteration = 0 + while 1: + high_ = min(high, _limit) + + # Trial division + if use_trial: + if verbose: + print(trial_msg % (low, high_)) + ps = sieve.primerange(low, high_) + n, found_trial = _trial(factors, n, ps, verbose) + next_p = high_ + if found_trial and _check_termination(factors, n, limit, use_trial, + use_rho, use_pm1, verbose, next_p): + return factors + else: + found_trial = False + + if high > _limit: + if verbose: + print('Exceeded limit:', _limit) + if n > 1: + factors[int(n)] = 1 + if verbose: + print(complete_msg) + return factors + + # Only used advanced methods when no small factors were found + if not found_trial: + # Pollard p-1 + if use_pm1: + if verbose: + print(pm1_msg % (low, high_)) + c = pollard_pm1(n, B=low, seed=high_) + if c: + if c < next_p**2 or isprime(c): + ps = [c] + else: + ps = factorint(c, limit=limit, + use_trial=use_trial, + use_rho=use_rho, + use_pm1=use_pm1, + use_ecm=use_ecm, + verbose=verbose) + n, _ = _trial(factors, n, ps, verbose=False) + if _check_termination(factors, n, limit, use_trial, + use_rho, use_pm1, verbose, next_p): + return factors + + # Pollard rho + if use_rho: + if verbose: + print(rho_msg % (1, low, high_)) + c = pollard_rho(n, retries=1, max_steps=low, seed=high_) + if c: + if c < next_p**2 or isprime(c): + ps = [c] + else: + ps = factorint(c, limit=limit, + use_trial=use_trial, + use_rho=use_rho, + use_pm1=use_pm1, + use_ecm=use_ecm, + verbose=verbose) + n, _ = _trial(factors, n, ps, verbose=False) + if _check_termination(factors, n, limit, use_trial, + use_rho, use_pm1, verbose, next_p): + return factors + # Use subexponential algorithms if use_ecm + # Use pollard algorithms for finding small factors for 3 iterations + # if after small factors the number of digits of n >= 25 then use ecm + iteration += 1 + if use_ecm and iteration >= 3 and num_digits(n) >= 24: + break + low, high = high, high*2 + + B1 = 10000 + B2 = 100*B1 + num_curves = 50 + while(1): + if verbose: + print(ecm_msg % (B1, B2, num_curves)) + factor = _ecm_one_factor(n, B1, B2, num_curves, seed=B1) + if factor: + if factor < next_p**2 or isprime(factor): + ps = [factor] + else: + ps = factorint(factor, limit=limit, + use_trial=use_trial, + use_rho=use_rho, + use_pm1=use_pm1, + use_ecm=use_ecm, + verbose=verbose) + n, _ = _trial(factors, n, ps, verbose=False) + if _check_termination(factors, n, limit, use_trial, + use_rho, use_pm1, verbose, next_p): + return factors + B1 *= 5 + B2 = 100*B1 + num_curves *= 4 + + +def factorrat(rat, limit=None, use_trial=True, use_rho=True, use_pm1=True, + verbose=False, visual=None, multiple=False): + r""" + Given a Rational ``r``, ``factorrat(r)`` returns a dict containing + the prime factors of ``r`` as keys and their respective multiplicities + as values. For example: + + >>> from sympy import factorrat, S + >>> factorrat(S(8)/9) # 8/9 = (2**3) * (3**-2) + {2: 3, 3: -2} + >>> factorrat(S(-1)/987) # -1/789 = -1 * (3**-1) * (7**-1) * (47**-1) + {-1: 1, 3: -1, 7: -1, 47: -1} + + Please see the docstring for ``factorint`` for detailed explanations + and examples of the following keywords: + + - ``limit``: Integer limit up to which trial division is done + - ``use_trial``: Toggle use of trial division + - ``use_rho``: Toggle use of Pollard's rho method + - ``use_pm1``: Toggle use of Pollard's p-1 method + - ``verbose``: Toggle detailed printing of progress + - ``multiple``: Toggle returning a list of factors or dict + - ``visual``: Toggle product form of output + """ + if multiple: + fac = factorrat(rat, limit=limit, use_trial=use_trial, + use_rho=use_rho, use_pm1=use_pm1, + verbose=verbose, visual=False, multiple=False) + factorlist = sum(([p] * fac[p] if fac[p] > 0 else [S.One/p]*(-fac[p]) + for p, _ in sorted(fac.items(), + key=lambda elem: elem[0] + if elem[1] > 0 + else 1/elem[0])), []) + return factorlist + + f = factorint(rat.p, limit=limit, use_trial=use_trial, + use_rho=use_rho, use_pm1=use_pm1, + verbose=verbose).copy() + f = defaultdict(int, f) + for p, e in factorint(rat.q, limit=limit, + use_trial=use_trial, + use_rho=use_rho, + use_pm1=use_pm1, + verbose=verbose).items(): + f[p] += -e + + if len(f) > 1 and 1 in f: + del f[1] + if not visual: + return dict(f) + else: + if -1 in f: + f.pop(-1) + args = [S.NegativeOne] + else: + args = [] + args.extend([Pow(*i, evaluate=False) + for i in sorted(f.items())]) + return Mul(*args, evaluate=False) + + +def primefactors(n, limit=None, verbose=False, **kwargs): + """Return a sorted list of n's prime factors, ignoring multiplicity + and any composite factor that remains if the limit was set too low + for complete factorization. Unlike factorint(), primefactors() does + not return -1 or 0. + + Parameters + ========== + + n : integer + limit, verbose, **kwargs : + Additional keyword arguments to be passed to ``factorint``. + Since ``kwargs`` is new in version 1.13, + ``limit`` and ``verbose`` are retained for compatibility purposes. + + Returns + ======= + + list(int) : List of prime numbers dividing ``n`` + + Examples + ======== + + >>> from sympy.ntheory import primefactors, factorint, isprime + >>> primefactors(6) + [2, 3] + >>> primefactors(-5) + [5] + + >>> sorted(factorint(123456).items()) + [(2, 6), (3, 1), (643, 1)] + >>> primefactors(123456) + [2, 3, 643] + + >>> sorted(factorint(10000000001, limit=200).items()) + [(101, 1), (99009901, 1)] + >>> isprime(99009901) + False + >>> primefactors(10000000001, limit=300) + [101] + + See Also + ======== + + factorint, divisors + + """ + n = int(n) + kwargs.update({"visual": None, "multiple": False, + "limit": limit, "verbose": verbose}) + factors = sorted(factorint(n=n, **kwargs).keys()) + # We want to calculate + # s = [f for f in factors if isprime(f)] + s = [f for f in factors[:-1:] if f not in [-1, 0, 1]] + if factors and isprime(factors[-1]): + s += [factors[-1]] + return s + + +def _divisors(n, proper=False): + """Helper function for divisors which generates the divisors. + + Parameters + ========== + + n : int + a nonnegative integer + proper: bool + If `True`, returns the generator that outputs only the proper divisor (i.e., excluding n). + + """ + if n <= 1: + if not proper and n: + yield 1 + return + + factordict = factorint(n) + ps = sorted(factordict.keys()) + + def rec_gen(n=0): + if n == len(ps): + yield 1 + else: + pows = [1] + for _ in range(factordict[ps[n]]): + pows.append(pows[-1] * ps[n]) + yield from (p * q for q in rec_gen(n + 1) for p in pows) + + if proper: + yield from (p for p in rec_gen() if p != n) + else: + yield from rec_gen() + + +def divisors(n, generator=False, proper=False): + r""" + Return all divisors of n sorted from 1..n by default. + If generator is ``True`` an unordered generator is returned. + + The number of divisors of n can be quite large if there are many + prime factors (counting repeated factors). If only the number of + factors is desired use divisor_count(n). + + Examples + ======== + + >>> from sympy import divisors, divisor_count + >>> divisors(24) + [1, 2, 3, 4, 6, 8, 12, 24] + >>> divisor_count(24) + 8 + + >>> list(divisors(120, generator=True)) + [1, 2, 4, 8, 3, 6, 12, 24, 5, 10, 20, 40, 15, 30, 60, 120] + + Notes + ===== + + This is a slightly modified version of Tim Peters referenced at: + https://stackoverflow.com/questions/1010381/python-factorization + + See Also + ======== + + primefactors, factorint, divisor_count + """ + rv = _divisors(as_int(abs(n)), proper) + return rv if generator else sorted(rv) + + +def divisor_count(n, modulus=1, proper=False): + """ + Return the number of divisors of ``n``. If ``modulus`` is not 1 then only + those that are divisible by ``modulus`` are counted. If ``proper`` is True + then the divisor of ``n`` will not be counted. + + Examples + ======== + + >>> from sympy import divisor_count + >>> divisor_count(6) + 4 + >>> divisor_count(6, 2) + 2 + >>> divisor_count(6, proper=True) + 3 + + See Also + ======== + + factorint, divisors, totient, proper_divisor_count + + """ + + if not modulus: + return 0 + elif modulus != 1: + n, r = divmod(n, modulus) + if r: + return 0 + if n == 0: + return 0 + n = Mul(*[v + 1 for k, v in factorint(n).items() if k > 1]) + if n and proper: + n -= 1 + return n + + +def proper_divisors(n, generator=False): + """ + Return all divisors of n except n, sorted by default. + If generator is ``True`` an unordered generator is returned. + + Examples + ======== + + >>> from sympy import proper_divisors, proper_divisor_count + >>> proper_divisors(24) + [1, 2, 3, 4, 6, 8, 12] + >>> proper_divisor_count(24) + 7 + >>> list(proper_divisors(120, generator=True)) + [1, 2, 4, 8, 3, 6, 12, 24, 5, 10, 20, 40, 15, 30, 60] + + See Also + ======== + + factorint, divisors, proper_divisor_count + + """ + return divisors(n, generator=generator, proper=True) + + +def proper_divisor_count(n, modulus=1): + """ + Return the number of proper divisors of ``n``. + + Examples + ======== + + >>> from sympy import proper_divisor_count + >>> proper_divisor_count(6) + 3 + >>> proper_divisor_count(6, modulus=2) + 1 + + See Also + ======== + + divisors, proper_divisors, divisor_count + + """ + return divisor_count(n, modulus=modulus, proper=True) + + +def _udivisors(n): + """Helper function for udivisors which generates the unitary divisors. + + Parameters + ========== + + n : int + a nonnegative integer + + """ + if n <= 1: + if n == 1: + yield 1 + return + + factorpows = [p**e for p, e in factorint(n).items()] + # We want to calculate + # yield from (math.prod(s) for s in powersets(factorpows)) + for i in range(2**len(factorpows)): + d = 1 + for k in range(i.bit_length()): + if i & 1: + d *= factorpows[k] + i >>= 1 + yield d + + +def udivisors(n, generator=False): + r""" + Return all unitary divisors of n sorted from 1..n by default. + If generator is ``True`` an unordered generator is returned. + + The number of unitary divisors of n can be quite large if there are many + prime factors. If only the number of unitary divisors is desired use + udivisor_count(n). + + Examples + ======== + + >>> from sympy.ntheory.factor_ import udivisors, udivisor_count + >>> udivisors(15) + [1, 3, 5, 15] + >>> udivisor_count(15) + 4 + + >>> sorted(udivisors(120, generator=True)) + [1, 3, 5, 8, 15, 24, 40, 120] + + See Also + ======== + + primefactors, factorint, divisors, divisor_count, udivisor_count + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Unitary_divisor + .. [2] https://mathworld.wolfram.com/UnitaryDivisor.html + + """ + rv = _udivisors(as_int(abs(n))) + return rv if generator else sorted(rv) + + +def udivisor_count(n): + """ + Return the number of unitary divisors of ``n``. + + Parameters + ========== + + n : integer + + Examples + ======== + + >>> from sympy.ntheory.factor_ import udivisor_count + >>> udivisor_count(120) + 8 + + See Also + ======== + + factorint, divisors, udivisors, divisor_count, totient + + References + ========== + + .. [1] https://mathworld.wolfram.com/UnitaryDivisorFunction.html + + """ + + if n == 0: + return 0 + return 2**len([p for p in factorint(n) if p > 1]) + + +def _antidivisors(n): + """Helper function for antidivisors which generates the antidivisors. + + Parameters + ========== + + n : int + a nonnegative integer + + """ + if n <= 2: + return + for d in _divisors(n): + y = 2*d + if n > y and n % y: + yield y + for d in _divisors(2*n-1): + if n > d >= 2 and n % d: + yield d + for d in _divisors(2*n+1): + if n > d >= 2 and n % d: + yield d + + +def antidivisors(n, generator=False): + r""" + Return all antidivisors of n sorted from 1..n by default. + + Antidivisors [1]_ of n are numbers that do not divide n by the largest + possible margin. If generator is True an unordered generator is returned. + + Examples + ======== + + >>> from sympy.ntheory.factor_ import antidivisors + >>> antidivisors(24) + [7, 16] + + >>> sorted(antidivisors(128, generator=True)) + [3, 5, 15, 17, 51, 85] + + See Also + ======== + + primefactors, factorint, divisors, divisor_count, antidivisor_count + + References + ========== + + .. [1] definition is described in https://oeis.org/A066272/a066272a.html + + """ + rv = _antidivisors(as_int(abs(n))) + return rv if generator else sorted(rv) + + +def antidivisor_count(n): + """ + Return the number of antidivisors [1]_ of ``n``. + + Parameters + ========== + + n : integer + + Examples + ======== + + >>> from sympy.ntheory.factor_ import antidivisor_count + >>> antidivisor_count(13) + 4 + >>> antidivisor_count(27) + 5 + + See Also + ======== + + factorint, divisors, antidivisors, divisor_count, totient + + References + ========== + + .. [1] formula from https://oeis.org/A066272 + + """ + + n = as_int(abs(n)) + if n <= 2: + return 0 + return divisor_count(2*n - 1) + divisor_count(2*n + 1) + \ + divisor_count(n) - divisor_count(n, 2) - 5 + +@deprecated("""\ +The `sympy.ntheory.factor_.totient` has been moved to `sympy.functions.combinatorial.numbers.totient`.""", +deprecated_since_version="1.13", +active_deprecations_target='deprecated-ntheory-symbolic-functions') +def totient(n): + r""" + Calculate the Euler totient function phi(n) + + .. deprecated:: 1.13 + + The ``totient`` function is deprecated. Use :class:`sympy.functions.combinatorial.numbers.totient` + instead. See its documentation for more information. See + :ref:`deprecated-ntheory-symbolic-functions` for details. + + ``totient(n)`` or `\phi(n)` is the number of positive integers `\leq` n + that are relatively prime to n. + + Parameters + ========== + + n : integer + + Examples + ======== + + >>> from sympy.functions.combinatorial.numbers import totient + >>> totient(1) + 1 + >>> totient(25) + 20 + >>> totient(45) == totient(5)*totient(9) + True + + See Also + ======== + + divisor_count + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Euler%27s_totient_function + .. [2] https://mathworld.wolfram.com/TotientFunction.html + + """ + from sympy.functions.combinatorial.numbers import totient as _totient + return _totient(n) + + +@deprecated("""\ +The `sympy.ntheory.factor_.reduced_totient` has been moved to `sympy.functions.combinatorial.numbers.reduced_totient`.""", +deprecated_since_version="1.13", +active_deprecations_target='deprecated-ntheory-symbolic-functions') +def reduced_totient(n): + r""" + Calculate the Carmichael reduced totient function lambda(n) + + .. deprecated:: 1.13 + + The ``reduced_totient`` function is deprecated. Use :class:`sympy.functions.combinatorial.numbers.reduced_totient` + instead. See its documentation for more information. See + :ref:`deprecated-ntheory-symbolic-functions` for details. + + ``reduced_totient(n)`` or `\lambda(n)` is the smallest m > 0 such that + `k^m \equiv 1 \mod n` for all k relatively prime to n. + + Examples + ======== + + >>> from sympy.functions.combinatorial.numbers import reduced_totient + >>> reduced_totient(1) + 1 + >>> reduced_totient(8) + 2 + >>> reduced_totient(30) + 4 + + See Also + ======== + + totient + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Carmichael_function + .. [2] https://mathworld.wolfram.com/CarmichaelFunction.html + + """ + from sympy.functions.combinatorial.numbers import reduced_totient as _reduced_totient + return _reduced_totient(n) + + +@deprecated("""\ +The `sympy.ntheory.factor_.divisor_sigma` has been moved to `sympy.functions.combinatorial.numbers.divisor_sigma`.""", +deprecated_since_version="1.13", +active_deprecations_target='deprecated-ntheory-symbolic-functions') +def divisor_sigma(n, k=1): + r""" + Calculate the divisor function `\sigma_k(n)` for positive integer n + + .. deprecated:: 1.13 + + The ``divisor_sigma`` function is deprecated. Use :class:`sympy.functions.combinatorial.numbers.divisor_sigma` + instead. See its documentation for more information. See + :ref:`deprecated-ntheory-symbolic-functions` for details. + + ``divisor_sigma(n, k)`` is equal to ``sum([x**k for x in divisors(n)])`` + + If n's prime factorization is: + + .. math :: + n = \prod_{i=1}^\omega p_i^{m_i}, + + then + + .. math :: + \sigma_k(n) = \prod_{i=1}^\omega (1+p_i^k+p_i^{2k}+\cdots + + p_i^{m_ik}). + + Parameters + ========== + + n : integer + + k : integer, optional + power of divisors in the sum + + for k = 0, 1: + ``divisor_sigma(n, 0)`` is equal to ``divisor_count(n)`` + ``divisor_sigma(n, 1)`` is equal to ``sum(divisors(n))`` + + Default for k is 1. + + Examples + ======== + + >>> from sympy.functions.combinatorial.numbers import divisor_sigma + >>> divisor_sigma(18, 0) + 6 + >>> divisor_sigma(39, 1) + 56 + >>> divisor_sigma(12, 2) + 210 + >>> divisor_sigma(37) + 38 + + See Also + ======== + + divisor_count, totient, divisors, factorint + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Divisor_function + + """ + from sympy.functions.combinatorial.numbers import divisor_sigma as func_divisor_sigma + return func_divisor_sigma(n, k) + + +def _divisor_sigma(n:int, k:int=1) -> int: + r""" Calculate the divisor function `\sigma_k(n)` for positive integer n + + Parameters + ========== + + n : int + positive integer + k : int + nonnegative integer + + See Also + ======== + + sympy.functions.combinatorial.numbers.divisor_sigma + + """ + if k == 0: + return math.prod(e + 1 for e in factorint(n).values()) + return math.prod((p**(k*(e + 1)) - 1)//(p**k - 1) for p, e in factorint(n).items()) + + +def core(n, t=2): + r""" + Calculate core(n, t) = `core_t(n)` of a positive integer n + + ``core_2(n)`` is equal to the squarefree part of n + + If n's prime factorization is: + + .. math :: + n = \prod_{i=1}^\omega p_i^{m_i}, + + then + + .. math :: + core_t(n) = \prod_{i=1}^\omega p_i^{m_i \mod t}. + + Parameters + ========== + + n : integer + + t : integer + core(n, t) calculates the t-th power free part of n + + ``core(n, 2)`` is the squarefree part of ``n`` + ``core(n, 3)`` is the cubefree part of ``n`` + + Default for t is 2. + + Examples + ======== + + >>> from sympy.ntheory.factor_ import core + >>> core(24, 2) + 6 + >>> core(9424, 3) + 1178 + >>> core(379238) + 379238 + >>> core(15**11, 10) + 15 + + See Also + ======== + + factorint, sympy.solvers.diophantine.diophantine.square_factor + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Square-free_integer#Squarefree_core + + """ + + n = as_int(n) + t = as_int(t) + if n <= 0: + raise ValueError("n must be a positive integer") + elif t <= 1: + raise ValueError("t must be >= 2") + else: + y = 1 + for p, e in factorint(n).items(): + y *= p**(e % t) + return y + + +@deprecated("""\ +The `sympy.ntheory.factor_.udivisor_sigma` has been moved to `sympy.functions.combinatorial.numbers.udivisor_sigma`.""", +deprecated_since_version="1.13", +active_deprecations_target='deprecated-ntheory-symbolic-functions') +def udivisor_sigma(n, k=1): + r""" + Calculate the unitary divisor function `\sigma_k^*(n)` for positive integer n + + .. deprecated:: 1.13 + + The ``udivisor_sigma`` function is deprecated. Use :class:`sympy.functions.combinatorial.numbers.udivisor_sigma` + instead. See its documentation for more information. See + :ref:`deprecated-ntheory-symbolic-functions` for details. + + ``udivisor_sigma(n, k)`` is equal to ``sum([x**k for x in udivisors(n)])`` + + If n's prime factorization is: + + .. math :: + n = \prod_{i=1}^\omega p_i^{m_i}, + + then + + .. math :: + \sigma_k^*(n) = \prod_{i=1}^\omega (1+ p_i^{m_ik}). + + Parameters + ========== + + k : power of divisors in the sum + + for k = 0, 1: + ``udivisor_sigma(n, 0)`` is equal to ``udivisor_count(n)`` + ``udivisor_sigma(n, 1)`` is equal to ``sum(udivisors(n))`` + + Default for k is 1. + + Examples + ======== + + >>> from sympy.functions.combinatorial.numbers import udivisor_sigma + >>> udivisor_sigma(18, 0) + 4 + >>> udivisor_sigma(74, 1) + 114 + >>> udivisor_sigma(36, 3) + 47450 + >>> udivisor_sigma(111) + 152 + + See Also + ======== + + divisor_count, totient, divisors, udivisors, udivisor_count, divisor_sigma, + factorint + + References + ========== + + .. [1] https://mathworld.wolfram.com/UnitaryDivisorFunction.html + + """ + from sympy.functions.combinatorial.numbers import udivisor_sigma as _udivisor_sigma + return _udivisor_sigma(n, k) + + +@deprecated("""\ +The `sympy.ntheory.factor_.primenu` has been moved to `sympy.functions.combinatorial.numbers.primenu`.""", +deprecated_since_version="1.13", +active_deprecations_target='deprecated-ntheory-symbolic-functions') +def primenu(n): + r""" + Calculate the number of distinct prime factors for a positive integer n. + + .. deprecated:: 1.13 + + The ``primenu`` function is deprecated. Use :class:`sympy.functions.combinatorial.numbers.primenu` + instead. See its documentation for more information. See + :ref:`deprecated-ntheory-symbolic-functions` for details. + + If n's prime factorization is: + + .. math :: + n = \prod_{i=1}^k p_i^{m_i}, + + then ``primenu(n)`` or `\nu(n)` is: + + .. math :: + \nu(n) = k. + + Examples + ======== + + >>> from sympy.functions.combinatorial.numbers import primenu + >>> primenu(1) + 0 + >>> primenu(30) + 3 + + See Also + ======== + + factorint + + References + ========== + + .. [1] https://mathworld.wolfram.com/PrimeFactor.html + + """ + from sympy.functions.combinatorial.numbers import primenu as _primenu + return _primenu(n) + + +@deprecated("""\ +The `sympy.ntheory.factor_.primeomega` has been moved to `sympy.functions.combinatorial.numbers.primeomega`.""", +deprecated_since_version="1.13", +active_deprecations_target='deprecated-ntheory-symbolic-functions') +def primeomega(n): + r""" + Calculate the number of prime factors counting multiplicities for a + positive integer n. + + .. deprecated:: 1.13 + + The ``primeomega`` function is deprecated. Use :class:`sympy.functions.combinatorial.numbers.primeomega` + instead. See its documentation for more information. See + :ref:`deprecated-ntheory-symbolic-functions` for details. + + If n's prime factorization is: + + .. math :: + n = \prod_{i=1}^k p_i^{m_i}, + + then ``primeomega(n)`` or `\Omega(n)` is: + + .. math :: + \Omega(n) = \sum_{i=1}^k m_i. + + Examples + ======== + + >>> from sympy.functions.combinatorial.numbers import primeomega + >>> primeomega(1) + 0 + >>> primeomega(20) + 3 + + See Also + ======== + + factorint + + References + ========== + + .. [1] https://mathworld.wolfram.com/PrimeFactor.html + + """ + from sympy.functions.combinatorial.numbers import primeomega as _primeomega + return _primeomega(n) + + +def mersenne_prime_exponent(nth): + """Returns the exponent ``i`` for the nth Mersenne prime (which + has the form `2^i - 1`). + + Examples + ======== + + >>> from sympy.ntheory.factor_ import mersenne_prime_exponent + >>> mersenne_prime_exponent(1) + 2 + >>> mersenne_prime_exponent(20) + 4423 + """ + n = as_int(nth) + if n < 1: + raise ValueError("nth must be a positive integer; mersenne_prime_exponent(1) == 2") + if n > 51: + raise ValueError("There are only 51 perfect numbers; nth must be less than or equal to 51") + return MERSENNE_PRIME_EXPONENTS[n - 1] + + +def is_perfect(n): + """Returns True if ``n`` is a perfect number, else False. + + A perfect number is equal to the sum of its positive, proper divisors. + + Examples + ======== + + >>> from sympy.functions.combinatorial.numbers import divisor_sigma + >>> from sympy.ntheory.factor_ import is_perfect, divisors + >>> is_perfect(20) + False + >>> is_perfect(6) + True + >>> 6 == divisor_sigma(6) - 6 == sum(divisors(6)[:-1]) + True + + References + ========== + + .. [1] https://mathworld.wolfram.com/PerfectNumber.html + .. [2] https://en.wikipedia.org/wiki/Perfect_number + + """ + n = as_int(n) + if n < 1: + return False + if n % 2 == 0: + m = (n.bit_length() + 1) >> 1 + if (1 << (m - 1)) * ((1 << m) - 1) != n: + # Even perfect numbers must be of the form `2^{m-1}(2^m-1)` + return False + return m in MERSENNE_PRIME_EXPONENTS or is_mersenne_prime(2**m - 1) + + # n is an odd integer + if n < 10**2000: # https://www.lirmm.fr/~ochem/opn/ + return False + if n % 105 == 0: # not divis by 105 + return False + if all(n % m != r for m, r in [(12, 1), (468, 117), (324, 81)]): + return False + # there are many criteria that the factor structure of n + # must meet; since we will have to factor it to test the + # structure we will have the factors and can then check + # to see whether it is a perfect number or not. So we + # skip the structure checks and go straight to the final + # test below. + result = abundance(n) == 0 + if result: + raise ValueError(filldedent('''In 1888, Sylvester stated: " + ...a prolonged meditation on the subject has satisfied + me that the existence of any one such [odd perfect number] + -- its escape, so to say, from the complex web of conditions + which hem it in on all sides -- would be little short of a + miracle." I guess SymPy just found that miracle and it + factors like this: %s''' % factorint(n))) + return result + + +def abundance(n): + """Returns the difference between the sum of the positive + proper divisors of a number and the number. + + Examples + ======== + + >>> from sympy.ntheory import abundance, is_perfect, is_abundant + >>> abundance(6) + 0 + >>> is_perfect(6) + True + >>> abundance(10) + -2 + >>> is_abundant(10) + False + """ + return _divisor_sigma(n) - 2 * n + + +def is_abundant(n): + """Returns True if ``n`` is an abundant number, else False. + + A abundant number is smaller than the sum of its positive proper divisors. + + Examples + ======== + + >>> from sympy.ntheory.factor_ import is_abundant + >>> is_abundant(20) + True + >>> is_abundant(15) + False + + References + ========== + + .. [1] https://mathworld.wolfram.com/AbundantNumber.html + + """ + n = as_int(n) + if is_perfect(n): + return False + return n % 6 == 0 or bool(abundance(n) > 0) + + +def is_deficient(n): + """Returns True if ``n`` is a deficient number, else False. + + A deficient number is greater than the sum of its positive proper divisors. + + Examples + ======== + + >>> from sympy.ntheory.factor_ import is_deficient + >>> is_deficient(20) + False + >>> is_deficient(15) + True + + References + ========== + + .. [1] https://mathworld.wolfram.com/DeficientNumber.html + + """ + n = as_int(n) + if is_perfect(n): + return False + return bool(abundance(n) < 0) + + +def is_amicable(m, n): + """Returns True if the numbers `m` and `n` are "amicable", else False. + + Amicable numbers are two different numbers so related that the sum + of the proper divisors of each is equal to that of the other. + + Examples + ======== + + >>> from sympy.functions.combinatorial.numbers import divisor_sigma + >>> from sympy.ntheory.factor_ import is_amicable + >>> is_amicable(220, 284) + True + >>> divisor_sigma(220) == divisor_sigma(284) + True + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Amicable_numbers + + """ + return m != n and m + n == _divisor_sigma(m) == _divisor_sigma(n) + + +def is_carmichael(n): + """ Returns True if the numbers `n` is Carmichael number, else False. + + Parameters + ========== + + n : Integer + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Carmichael_number + .. [2] https://oeis.org/A002997 + + """ + if n < 561: + return False + return n % 2 and not isprime(n) and \ + all(e == 1 and (n - 1) % (p - 1) == 0 for p, e in factorint(n).items()) + + +def find_carmichael_numbers_in_range(x, y): + """ Returns a list of the number of Carmichael in the range + + See Also + ======== + + is_carmichael + + """ + if 0 <= x <= y: + if x % 2 == 0: + return [i for i in range(x + 1, y, 2) if is_carmichael(i)] + else: + return [i for i in range(x, y, 2) if is_carmichael(i)] + else: + raise ValueError('The provided range is not valid. x and y must be non-negative integers and x <= y') + + +def find_first_n_carmichaels(n): + """ Returns the first n Carmichael numbers. + + Parameters + ========== + + n : Integer + + See Also + ======== + + is_carmichael + + """ + i = 561 + carmichaels = [] + + while len(carmichaels) < n: + if is_carmichael(i): + carmichaels.append(i) + i += 2 + + return carmichaels + + +def dra(n, b): + """ + Returns the additive digital root of a natural number ``n`` in base ``b`` + which is a single digit value obtained by an iterative process of summing + digits, on each iteration using the result from the previous iteration to + compute a digit sum. + + Examples + ======== + + >>> from sympy.ntheory.factor_ import dra + >>> dra(3110, 12) + 8 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Digital_root + + """ + + num = abs(as_int(n)) + b = as_int(b) + if b <= 1: + raise ValueError("Base should be an integer greater than 1") + + if num == 0: + return 0 + + return (1 + (num - 1) % (b - 1)) + + +def drm(n, b): + """ + Returns the multiplicative digital root of a natural number ``n`` in a given + base ``b`` which is a single digit value obtained by an iterative process of + multiplying digits, on each iteration using the result from the previous + iteration to compute the digit multiplication. + + Examples + ======== + + >>> from sympy.ntheory.factor_ import drm + >>> drm(9876, 10) + 0 + + >>> drm(49, 10) + 8 + + References + ========== + + .. [1] https://mathworld.wolfram.com/MultiplicativeDigitalRoot.html + + """ + + n = abs(as_int(n)) + b = as_int(b) + if b <= 1: + raise ValueError("Base should be an integer greater than 1") + while n > b: + mul = 1 + while n > 1: + n, r = divmod(n, b) + if r == 0: + return 0 + mul *= r + n = mul + return n diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/generate.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/generate.py new file mode 100644 index 0000000000000000000000000000000000000000..855bb44acfcb6241e6b0bcb81e7a2cfc8ced861f --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/generate.py @@ -0,0 +1,1157 @@ +""" +Generating and counting primes. + +""" + +from bisect import bisect, bisect_left +from itertools import count +# Using arrays for sieving instead of lists greatly reduces +# memory consumption +from array import array as _array + +from sympy.core.random import randint +from sympy.external.gmpy import sqrt +from .primetest import isprime +from sympy.utilities.decorator import deprecated +from sympy.utilities.misc import as_int + + +def _as_int_ceiling(a): + """ Wrapping ceiling in as_int will raise an error if there was a problem + determining whether the expression was exactly an integer or not.""" + from sympy.functions.elementary.integers import ceiling + return as_int(ceiling(a)) + + +class Sieve: + """A list of prime numbers, implemented as a dynamically + growing sieve of Eratosthenes. When a lookup is requested involving + an odd number that has not been sieved, the sieve is automatically + extended up to that number. Implementation details limit the number of + primes to ``2^32-1``. + + Examples + ======== + + >>> from sympy import sieve + >>> sieve._reset() # this line for doctest only + >>> 25 in sieve + False + >>> sieve._list + array('L', [2, 3, 5, 7, 11, 13, 17, 19, 23]) + """ + + # data shared (and updated) by all Sieve instances + def __init__(self, sieve_interval=1_000_000): + """ Initial parameters for the Sieve class. + + Parameters + ========== + + sieve_interval (int): Amount of memory to be used + + Raises + ====== + + ValueError + If ``sieve_interval`` is not positive. + + """ + self._n = 6 + self._list = _array('L', [2, 3, 5, 7, 11, 13]) # primes + self._tlist = _array('L', [0, 1, 1, 2, 2, 4]) # totient + self._mlist = _array('i', [0, 1, -1, -1, 0, -1]) # mobius + if sieve_interval <= 0: + raise ValueError("sieve_interval should be a positive integer") + self.sieve_interval = sieve_interval + assert all(len(i) == self._n for i in (self._list, self._tlist, self._mlist)) + + def __repr__(self): + return ("<%s sieve (%i): %i, %i, %i, ... %i, %i\n" + "%s sieve (%i): %i, %i, %i, ... %i, %i\n" + "%s sieve (%i): %i, %i, %i, ... %i, %i>") % ( + 'prime', len(self._list), + self._list[0], self._list[1], self._list[2], + self._list[-2], self._list[-1], + 'totient', len(self._tlist), + self._tlist[0], self._tlist[1], + self._tlist[2], self._tlist[-2], self._tlist[-1], + 'mobius', len(self._mlist), + self._mlist[0], self._mlist[1], + self._mlist[2], self._mlist[-2], self._mlist[-1]) + + def _reset(self, prime=None, totient=None, mobius=None): + """Reset all caches (default). To reset one or more set the + desired keyword to True.""" + if all(i is None for i in (prime, totient, mobius)): + prime = totient = mobius = True + if prime: + self._list = self._list[:self._n] + if totient: + self._tlist = self._tlist[:self._n] + if mobius: + self._mlist = self._mlist[:self._n] + + def extend(self, n): + """Grow the sieve to cover all primes <= n. + + Examples + ======== + + >>> from sympy import sieve + >>> sieve._reset() # this line for doctest only + >>> sieve.extend(30) + >>> sieve[10] == 29 + True + """ + n = int(n) + # `num` is even at any point in the function. + # This satisfies the condition required by `self._primerange`. + num = self._list[-1] + 1 + if n < num: + return + num2 = num**2 + while num2 <= n: + self._list += _array('L', self._primerange(num, num2)) + num, num2 = num2, num2**2 + # Merge the sieves + self._list += _array('L', self._primerange(num, n + 1)) + + def _primerange(self, a, b): + """ Generate all prime numbers in the range (a, b). + + Parameters + ========== + + a, b : positive integers assuming the following conditions + * a is an even number + * 2 < self._list[-1] < a < b < nextprime(self._list[-1])**2 + + Yields + ====== + + p (int): prime numbers such that ``a < p < b`` + + Examples + ======== + + >>> from sympy.ntheory.generate import Sieve + >>> s = Sieve() + >>> s._list[-1] + 13 + >>> list(s._primerange(18, 31)) + [19, 23, 29] + + """ + if b % 2: + b -= 1 + while a < b: + block_size = min(self.sieve_interval, (b - a) // 2) + # Create the list such that block[x] iff (a + 2x + 1) is prime. + # Note that even numbers are not considered here. + block = [True] * block_size + for p in self._list[1:bisect(self._list, sqrt(a + 2 * block_size + 1))]: + for t in range((-(a + 1 + p) // 2) % p, block_size, p): + block[t] = False + for idx, p in enumerate(block): + if p: + yield a + 2 * idx + 1 + a += 2 * block_size + + def extend_to_no(self, i): + """Extend to include the ith prime number. + + Parameters + ========== + + i : integer + + Examples + ======== + + >>> from sympy import sieve + >>> sieve._reset() # this line for doctest only + >>> sieve.extend_to_no(9) + >>> sieve._list + array('L', [2, 3, 5, 7, 11, 13, 17, 19, 23]) + + Notes + ===== + + The list is extended by 50% if it is too short, so it is + likely that it will be longer than requested. + """ + i = as_int(i) + while len(self._list) < i: + self.extend(int(self._list[-1] * 1.5)) + + def primerange(self, a, b=None): + """Generate all prime numbers in the range [2, a) or [a, b). + + Examples + ======== + + >>> from sympy import sieve, prime + + All primes less than 19: + + >>> print([i for i in sieve.primerange(19)]) + [2, 3, 5, 7, 11, 13, 17] + + All primes greater than or equal to 7 and less than 19: + + >>> print([i for i in sieve.primerange(7, 19)]) + [7, 11, 13, 17] + + All primes through the 10th prime + + >>> list(sieve.primerange(prime(10) + 1)) + [2, 3, 5, 7, 11, 13, 17, 19, 23, 29] + + """ + if b is None: + b = _as_int_ceiling(a) + a = 2 + else: + a = max(2, _as_int_ceiling(a)) + b = _as_int_ceiling(b) + if a >= b: + return + self.extend(b) + yield from self._list[bisect_left(self._list, a): + bisect_left(self._list, b)] + + def totientrange(self, a, b): + """Generate all totient numbers for the range [a, b). + + Examples + ======== + + >>> from sympy import sieve + >>> print([i for i in sieve.totientrange(7, 18)]) + [6, 4, 6, 4, 10, 4, 12, 6, 8, 8, 16] + """ + a = max(1, _as_int_ceiling(a)) + b = _as_int_ceiling(b) + n = len(self._tlist) + if a >= b: + return + elif b <= n: + for i in range(a, b): + yield self._tlist[i] + else: + self._tlist += _array('L', range(n, b)) + for i in range(1, n): + ti = self._tlist[i] + if ti == i - 1: + startindex = (n + i - 1) // i * i + for j in range(startindex, b, i): + self._tlist[j] -= self._tlist[j] // i + if i >= a: + yield ti + + for i in range(n, b): + ti = self._tlist[i] + if ti == i: + for j in range(i, b, i): + self._tlist[j] -= self._tlist[j] // i + if i >= a: + yield self._tlist[i] + + def mobiusrange(self, a, b): + """Generate all mobius numbers for the range [a, b). + + Parameters + ========== + + a : integer + First number in range + + b : integer + First number outside of range + + Examples + ======== + + >>> from sympy import sieve + >>> print([i for i in sieve.mobiusrange(7, 18)]) + [-1, 0, 0, 1, -1, 0, -1, 1, 1, 0, -1] + """ + a = max(1, _as_int_ceiling(a)) + b = _as_int_ceiling(b) + n = len(self._mlist) + if a >= b: + return + elif b <= n: + for i in range(a, b): + yield self._mlist[i] + else: + self._mlist += _array('i', [0]*(b - n)) + for i in range(1, n): + mi = self._mlist[i] + startindex = (n + i - 1) // i * i + for j in range(startindex, b, i): + self._mlist[j] -= mi + if i >= a: + yield mi + + for i in range(n, b): + mi = self._mlist[i] + for j in range(2 * i, b, i): + self._mlist[j] -= mi + if i >= a: + yield mi + + def search(self, n): + """Return the indices i, j of the primes that bound n. + + If n is prime then i == j. + + Although n can be an expression, if ceiling cannot convert + it to an integer then an n error will be raised. + + Examples + ======== + + >>> from sympy import sieve + >>> sieve.search(25) + (9, 10) + >>> sieve.search(23) + (9, 9) + """ + test = _as_int_ceiling(n) + n = as_int(n) + if n < 2: + raise ValueError("n should be >= 2 but got: %s" % n) + if n > self._list[-1]: + self.extend(n) + b = bisect(self._list, n) + if self._list[b - 1] == test: + return b, b + else: + return b, b + 1 + + def __contains__(self, n): + try: + n = as_int(n) + assert n >= 2 + except (ValueError, AssertionError): + return False + if n % 2 == 0: + return n == 2 + a, b = self.search(n) + return a == b + + def __iter__(self): + for n in count(1): + yield self[n] + + def __getitem__(self, n): + """Return the nth prime number""" + if isinstance(n, slice): + self.extend_to_no(n.stop) + start = n.start if n.start is not None else 0 + if start < 1: + # sieve[:5] would be empty (starting at -1), let's + # just be explicit and raise. + raise IndexError("Sieve indices start at 1.") + return self._list[start - 1:n.stop - 1:n.step] + else: + if n < 1: + # offset is one, so forbid explicit access to sieve[0] + # (would surprisingly return the last one). + raise IndexError("Sieve indices start at 1.") + n = as_int(n) + self.extend_to_no(n) + return self._list[n - 1] + +# Generate a global object for repeated use in trial division etc +sieve = Sieve() + +def prime(nth): + r""" + Return the nth prime number, where primes are indexed starting from 1: + prime(1) = 2, prime(2) = 3, etc. + + Parameters + ========== + + nth : int + The position of the prime number to return (must be a positive integer). + + Returns + ======= + + int + The nth prime number. + + Examples + ======== + + >>> from sympy import prime + >>> prime(10) + 29 + >>> prime(1) + 2 + >>> prime(100000) + 1299709 + + See Also + ======== + + sympy.ntheory.primetest.isprime : Test if a number is prime. + primerange : Generate all primes in a given range. + primepi : Return the number of primes less than or equal to a given number. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Prime_number_theorem + .. [2] https://en.wikipedia.org/wiki/Logarithmic_integral_function + .. [3] https://en.wikipedia.org/wiki/Skewes%27_number + """ + n = as_int(nth) + if n < 1: + raise ValueError("nth must be a positive integer; prime(1) == 2") + + # Check if n is within the sieve range + if n <= len(sieve._list): + return sieve[n] + + from sympy.functions.elementary.exponential import log + from sympy.functions.special.error_functions import li + + if n < 1000: + # Extend sieve up to 8*n as this is empirically sufficient + sieve.extend(8 * n) + return sieve[n] + + a = 2 + # Estimate an upper bound for the nth prime using the prime number theorem + b = int(n * (log(n).evalf() + log(log(n)).evalf())) + + # Binary search for the least m such that li(m) > n + while a < b: + mid = (a + b) >> 1 + if li(mid).evalf() > n: + b = mid + else: + a = mid + 1 + + return nextprime(a - 1, n - _primepi(a - 1)) + + +@deprecated("""\ +The `sympy.ntheory.generate.primepi` has been moved to `sympy.functions.combinatorial.numbers.primepi`.""", +deprecated_since_version="1.13", +active_deprecations_target='deprecated-ntheory-symbolic-functions') +def primepi(n): + r""" Represents the prime counting function pi(n) = the number + of prime numbers less than or equal to n. + + .. deprecated:: 1.13 + + The ``primepi`` function is deprecated. Use :class:`sympy.functions.combinatorial.numbers.primepi` + instead. See its documentation for more information. See + :ref:`deprecated-ntheory-symbolic-functions` for details. + + Algorithm Description: + + In sieve method, we remove all multiples of prime p + except p itself. + + Let phi(i,j) be the number of integers 2 <= k <= i + which remain after sieving from primes less than + or equal to j. + Clearly, pi(n) = phi(n, sqrt(n)) + + If j is not a prime, + phi(i,j) = phi(i, j - 1) + + if j is a prime, + We remove all numbers(except j) whose + smallest prime factor is j. + + Let $x= j \times a$ be such a number, where $2 \le a \le i / j$ + Now, after sieving from primes $\le j - 1$, + a must remain + (because x, and hence a has no prime factor $\le j - 1$) + Clearly, there are phi(i / j, j - 1) such a + which remain on sieving from primes $\le j - 1$ + + Now, if a is a prime less than equal to j - 1, + $x= j \times a$ has smallest prime factor = a, and + has already been removed(by sieving from a). + So, we do not need to remove it again. + (Note: there will be pi(j - 1) such x) + + Thus, number of x, that will be removed are: + phi(i / j, j - 1) - phi(j - 1, j - 1) + (Note that pi(j - 1) = phi(j - 1, j - 1)) + + $\Rightarrow$ phi(i,j) = phi(i, j - 1) - phi(i / j, j - 1) + phi(j - 1, j - 1) + + So,following recursion is used and implemented as dp: + + phi(a, b) = phi(a, b - 1), if b is not a prime + phi(a, b) = phi(a, b-1)-phi(a / b, b-1) + phi(b-1, b-1), if b is prime + + Clearly a is always of the form floor(n / k), + which can take at most $2\sqrt{n}$ values. + Two arrays arr1,arr2 are maintained + arr1[i] = phi(i, j), + arr2[i] = phi(n // i, j) + + Finally the answer is arr2[1] + + Examples + ======== + + >>> from sympy import primepi, prime, prevprime, isprime + >>> primepi(25) + 9 + + So there are 9 primes less than or equal to 25. Is 25 prime? + + >>> isprime(25) + False + + It is not. So the first prime less than 25 must be the + 9th prime: + + >>> prevprime(25) == prime(9) + True + + See Also + ======== + + sympy.ntheory.primetest.isprime : Test if n is prime + primerange : Generate all primes in a given range + prime : Return the nth prime + """ + from sympy.functions.combinatorial.numbers import primepi as func_primepi + return func_primepi(n) + + +def _primepi(n:int) -> int: + r""" Represents the prime counting function pi(n) = the number + of prime numbers less than or equal to n. + + Explanation + =========== + + In sieve method, we remove all multiples of prime p + except p itself. + + Let phi(i,j) be the number of integers 2 <= k <= i + which remain after sieving from primes less than + or equal to j. + Clearly, pi(n) = phi(n, sqrt(n)) + + If j is not a prime, + phi(i,j) = phi(i, j - 1) + + if j is a prime, + We remove all numbers(except j) whose + smallest prime factor is j. + + Let $x= j \times a$ be such a number, where $2 \le a \le i / j$ + Now, after sieving from primes $\le j - 1$, + a must remain + (because x, and hence a has no prime factor $\le j - 1$) + Clearly, there are phi(i / j, j - 1) such a + which remain on sieving from primes $\le j - 1$ + + Now, if a is a prime less than equal to j - 1, + $x= j \times a$ has smallest prime factor = a, and + has already been removed(by sieving from a). + So, we do not need to remove it again. + (Note: there will be pi(j - 1) such x) + + Thus, number of x, that will be removed are: + phi(i / j, j - 1) - phi(j - 1, j - 1) + (Note that pi(j - 1) = phi(j - 1, j - 1)) + + $\Rightarrow$ phi(i,j) = phi(i, j - 1) - phi(i / j, j - 1) + phi(j - 1, j - 1) + + So,following recursion is used and implemented as dp: + + phi(a, b) = phi(a, b - 1), if b is not a prime + phi(a, b) = phi(a, b-1)-phi(a / b, b-1) + phi(b-1, b-1), if b is prime + + Clearly a is always of the form floor(n / k), + which can take at most $2\sqrt{n}$ values. + Two arrays arr1,arr2 are maintained + arr1[i] = phi(i, j), + arr2[i] = phi(n // i, j) + + Finally the answer is arr2[1] + + Parameters + ========== + + n : int + + """ + if n < 2: + return 0 + if n <= sieve._list[-1]: + return sieve.search(n)[0] + lim = sqrt(n) + arr1 = [(i + 1) >> 1 for i in range(lim + 1)] + arr2 = [0] + [(n//i + 1) >> 1 for i in range(1, lim + 1)] + skip = [False] * (lim + 1) + for i in range(3, lim + 1, 2): + # Presently, arr1[k]=phi(k,i - 1), + # arr2[k] = phi(n // k,i - 1) # not all k's do this + if skip[i]: + # skip if i is a composite number + continue + p = arr1[i - 1] + for j in range(i, lim + 1, i): + skip[j] = True + # update arr2 + # phi(n/j, i) = phi(n/j, i-1) - phi(n/(i*j), i-1) + phi(i-1, i-1) + for j in range(1, min(n // (i * i), lim) + 1, 2): + # No need for arr2[j] in j such that skip[j] is True to + # compute the final required arr2[1]. + if skip[j]: + continue + st = i * j + if st <= lim: + arr2[j] -= arr2[st] - p + else: + arr2[j] -= arr1[n // st] - p + # update arr1 + # phi(j, i) = phi(j, i-1) - phi(j/i, i-1) + phi(i-1, i-1) + # where the range below i**2 is fixed and + # does not need to be calculated. + for j in range(lim, min(lim, i*i - 1), -1): + arr1[j] -= arr1[j // i] - p + return arr2[1] + + +def nextprime(n, ith=1): + """ Return the ith prime greater than n. + + Parameters + ========== + + n : integer + ith : positive integer + + Returns + ======= + + int : Return the ith prime greater than n + + Raises + ====== + + ValueError + If ``ith <= 0``. + If ``n`` or ``ith`` is not an integer. + + Notes + ===== + + Potential primes are located at 6*j +/- 1. This + property is used during searching. + + >>> from sympy import nextprime + >>> [(i, nextprime(i)) for i in range(10, 15)] + [(10, 11), (11, 13), (12, 13), (13, 17), (14, 17)] + >>> nextprime(2, ith=2) # the 2nd prime after 2 + 5 + + See Also + ======== + + prevprime : Return the largest prime smaller than n + primerange : Generate all primes in a given range + + """ + n = int(n) + i = as_int(ith) + if i <= 0: + raise ValueError("ith should be positive") + if n < 2: + n = 2 + i -= 1 + if n <= sieve._list[-2]: + l, _ = sieve.search(n) + if l + i - 1 < len(sieve._list): + return sieve._list[l + i - 1] + n = sieve._list[-1] + i += l - len(sieve._list) + nn = 6*(n//6) + if nn == n: + n += 1 + if isprime(n): + i -= 1 + if not i: + return n + n += 4 + elif n - nn == 5: + n += 2 + if isprime(n): + i -= 1 + if not i: + return n + n += 4 + else: + n = nn + 5 + while 1: + if isprime(n): + i -= 1 + if not i: + return n + n += 2 + if isprime(n): + i -= 1 + if not i: + return n + n += 4 + + +def prevprime(n): + """ Return the largest prime smaller than n. + + Notes + ===== + + Potential primes are located at 6*j +/- 1. This + property is used during searching. + + >>> from sympy import prevprime + >>> [(i, prevprime(i)) for i in range(10, 15)] + [(10, 7), (11, 7), (12, 11), (13, 11), (14, 13)] + + See Also + ======== + + nextprime : Return the ith prime greater than n + primerange : Generates all primes in a given range + """ + n = _as_int_ceiling(n) + if n < 3: + raise ValueError("no preceding primes") + if n < 8: + return {3: 2, 4: 3, 5: 3, 6: 5, 7: 5}[n] + if n <= sieve._list[-1]: + l, u = sieve.search(n) + if l == u: + return sieve[l-1] + else: + return sieve[l] + nn = 6*(n//6) + if n - nn <= 1: + n = nn - 1 + if isprime(n): + return n + n -= 4 + else: + n = nn + 1 + while 1: + if isprime(n): + return n + n -= 2 + if isprime(n): + return n + n -= 4 + + +def primerange(a, b=None): + """ Generate a list of all prime numbers in the range [2, a), + or [a, b). + + If the range exists in the default sieve, the values will + be returned from there; otherwise values will be returned + but will not modify the sieve. + + Examples + ======== + + >>> from sympy import primerange, prime + + All primes less than 19: + + >>> list(primerange(19)) + [2, 3, 5, 7, 11, 13, 17] + + All primes greater than or equal to 7 and less than 19: + + >>> list(primerange(7, 19)) + [7, 11, 13, 17] + + All primes through the 10th prime + + >>> list(primerange(prime(10) + 1)) + [2, 3, 5, 7, 11, 13, 17, 19, 23, 29] + + The Sieve method, primerange, is generally faster but it will + occupy more memory as the sieve stores values. The default + instance of Sieve, named sieve, can be used: + + >>> from sympy import sieve + >>> list(sieve.primerange(1, 30)) + [2, 3, 5, 7, 11, 13, 17, 19, 23, 29] + + Notes + ===== + + Some famous conjectures about the occurrence of primes in a given + range are [1]: + + - Twin primes: though often not, the following will give 2 primes + an infinite number of times: + primerange(6*n - 1, 6*n + 2) + - Legendre's: the following always yields at least one prime + primerange(n**2, (n+1)**2+1) + - Bertrand's (proven): there is always a prime in the range + primerange(n, 2*n) + - Brocard's: there are at least four primes in the range + primerange(prime(n)**2, prime(n+1)**2) + + The average gap between primes is log(n) [2]; the gap between + primes can be arbitrarily large since sequences of composite + numbers are arbitrarily large, e.g. the numbers in the sequence + n! + 2, n! + 3 ... n! + n are all composite. + + See Also + ======== + + prime : Return the nth prime + nextprime : Return the ith prime greater than n + prevprime : Return the largest prime smaller than n + randprime : Returns a random prime in a given range + primorial : Returns the product of primes based on condition + Sieve.primerange : return range from already computed primes + or extend the sieve to contain the requested + range. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Prime_number + .. [2] https://primes.utm.edu/notes/gaps.html + """ + if b is None: + a, b = 2, a + if a >= b: + return + # If we already have the range, return it. + largest_known_prime = sieve._list[-1] + if b <= largest_known_prime: + yield from sieve.primerange(a, b) + return + # If we know some of it, return it. + if a <= largest_known_prime: + yield from sieve._list[bisect_left(sieve._list, a):] + a = largest_known_prime + 1 + elif a % 2: + a -= 1 + tail = min(b, (largest_known_prime)**2) + if a < tail: + yield from sieve._primerange(a, tail) + a = tail + if b <= a: + return + # otherwise compute, without storing, the desired range. + while 1: + a = nextprime(a) + if a < b: + yield a + else: + return + + +def randprime(a, b): + """ Return a random prime number in the range [a, b). + + Bertrand's postulate assures that + randprime(a, 2*a) will always succeed for a > 1. + + Note that due to implementation difficulties, + the prime numbers chosen are not uniformly random. + For example, there are two primes in the range [112, 128), + ``113`` and ``127``, but ``randprime(112, 128)`` returns ``127`` + with a probability of 15/17. + + Examples + ======== + + >>> from sympy import randprime, isprime + >>> randprime(1, 30) #doctest: +SKIP + 13 + >>> isprime(randprime(1, 30)) + True + + See Also + ======== + + primerange : Generate all primes in a given range + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Bertrand's_postulate + + """ + if a >= b: + return + a, b = map(int, (a, b)) + n = randint(a - 1, b) + p = nextprime(n) + if p >= b: + p = prevprime(b) + if p < a: + raise ValueError("no primes exist in the specified range") + return p + + +def primorial(n, nth=True): + """ + Returns the product of the first n primes (default) or + the primes less than or equal to n (when ``nth=False``). + + Examples + ======== + + >>> from sympy.ntheory.generate import primorial, primerange + >>> from sympy import factorint, Mul, primefactors, sqrt + >>> primorial(4) # the first 4 primes are 2, 3, 5, 7 + 210 + >>> primorial(4, nth=False) # primes <= 4 are 2 and 3 + 6 + >>> primorial(1) + 2 + >>> primorial(1, nth=False) + 1 + >>> primorial(sqrt(101), nth=False) + 210 + + One can argue that the primes are infinite since if you take + a set of primes and multiply them together (e.g. the primorial) and + then add or subtract 1, the result cannot be divided by any of the + original factors, hence either 1 or more new primes must divide this + product of primes. + + In this case, the number itself is a new prime: + + >>> factorint(primorial(4) + 1) + {211: 1} + + In this case two new primes are the factors: + + >>> factorint(primorial(4) - 1) + {11: 1, 19: 1} + + Here, some primes smaller and larger than the primes multiplied together + are obtained: + + >>> p = list(primerange(10, 20)) + >>> sorted(set(primefactors(Mul(*p) + 1)).difference(set(p))) + [2, 5, 31, 149] + + See Also + ======== + + primerange : Generate all primes in a given range + + """ + if nth: + n = as_int(n) + else: + n = int(n) + if n < 1: + raise ValueError("primorial argument must be >= 1") + p = 1 + if nth: + for i in range(1, n + 1): + p *= prime(i) + else: + for i in primerange(2, n + 1): + p *= i + return p + + +def cycle_length(f, x0, nmax=None, values=False): + """For a given iterated sequence, return a generator that gives + the length of the iterated cycle (lambda) and the length of terms + before the cycle begins (mu); if ``values`` is True then the + terms of the sequence will be returned instead. The sequence is + started with value ``x0``. + + Note: more than the first lambda + mu terms may be returned and this + is the cost of cycle detection with Brent's method; there are, however, + generally less terms calculated than would have been calculated if the + proper ending point were determined, e.g. by using Floyd's method. + + >>> from sympy.ntheory.generate import cycle_length + + This will yield successive values of i <-- func(i): + + >>> def gen(func, i): + ... while 1: + ... yield i + ... i = func(i) + ... + + A function is defined: + + >>> func = lambda i: (i**2 + 1) % 51 + + and given a seed of 4 and the mu and lambda terms calculated: + + >>> next(cycle_length(func, 4)) + (6, 3) + + We can see what is meant by looking at the output: + + >>> iter = cycle_length(func, 4, values=True) + >>> list(iter) + [4, 17, 35, 2, 5, 26, 14, 44, 50, 2, 5, 26, 14] + + There are 6 repeating values after the first 3. + + If a sequence is suspected of being longer than you might wish, ``nmax`` + can be used to exit early (and mu will be returned as None): + + >>> next(cycle_length(func, 4, nmax = 4)) + (4, None) + >>> list(cycle_length(func, 4, nmax = 4, values=True)) + [4, 17, 35, 2] + + Code modified from: + https://en.wikipedia.org/wiki/Cycle_detection. + """ + + nmax = int(nmax or 0) + + # main phase: search successive powers of two + power = lam = 1 + tortoise, hare = x0, f(x0) # f(x0) is the element/node next to x0. + i = 1 + if values: + yield tortoise + while tortoise != hare and (not nmax or i < nmax): + i += 1 + if power == lam: # time to start a new power of two? + tortoise = hare + power *= 2 + lam = 0 + if values: + yield hare + hare = f(hare) + lam += 1 + if nmax and i == nmax: + if values: + return + else: + yield nmax, None + return + if not values: + # Find the position of the first repetition of length lambda + mu = 0 + tortoise = hare = x0 + for i in range(lam): + hare = f(hare) + while tortoise != hare: + tortoise = f(tortoise) + hare = f(hare) + mu += 1 + yield lam, mu + + +def composite(nth): + """ Return the nth composite number, with the composite numbers indexed as + composite(1) = 4, composite(2) = 6, etc.... + + Examples + ======== + + >>> from sympy import composite + >>> composite(36) + 52 + >>> composite(1) + 4 + >>> composite(17737) + 20000 + + See Also + ======== + + sympy.ntheory.primetest.isprime : Test if n is prime + primerange : Generate all primes in a given range + primepi : Return the number of primes less than or equal to n + prime : Return the nth prime + compositepi : Return the number of positive composite numbers less than or equal to n + """ + n = as_int(nth) + if n < 1: + raise ValueError("nth must be a positive integer; composite(1) == 4") + composite_arr = [4, 6, 8, 9, 10, 12, 14, 15, 16, 18] + if n <= 10: + return composite_arr[n - 1] + + a, b = 4, sieve._list[-1] + if n <= b - _primepi(b) - 1: + while a < b - 1: + mid = (a + b) >> 1 + if mid - _primepi(mid) - 1 > n: + b = mid + else: + a = mid + if isprime(a): + a -= 1 + return a + + from sympy.functions.elementary.exponential import log + from sympy.functions.special.error_functions import li + a = 4 # Lower bound for binary search + b = int(n*(log(n) + log(log(n)))) # Upper bound for the search. + + while a < b: + mid = (a + b) >> 1 + if mid - li(mid) - 1 > n: + b = mid + else: + a = mid + 1 + + n_composites = a - _primepi(a) - 1 + while n_composites > n: + if not isprime(a): + n_composites -= 1 + a -= 1 + if isprime(a): + a -= 1 + return a + + +def compositepi(n): + """ Return the number of positive composite numbers less than or equal to n. + The first positive composite is 4, i.e. compositepi(4) = 1. + + Examples + ======== + + >>> from sympy import compositepi + >>> compositepi(25) + 15 + >>> compositepi(1000) + 831 + + See Also + ======== + + sympy.ntheory.primetest.isprime : Test if n is prime + primerange : Generate all primes in a given range + prime : Return the nth prime + primepi : Return the number of primes less than or equal to n + composite : Return the nth composite number + """ + n = int(n) + if n < 4: + return 0 + return n - _primepi(n) - 1 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/modular.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/modular.py new file mode 100644 index 0000000000000000000000000000000000000000..628a3d8c5a7fb4b6c51ad337df66d74f90282496 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/modular.py @@ -0,0 +1,291 @@ +from math import prod + +from sympy.external.gmpy import gcd, gcdext +from sympy.ntheory.primetest import isprime +from sympy.polys.domains import ZZ +from sympy.polys.galoistools import gf_crt, gf_crt1, gf_crt2 +from sympy.utilities.misc import as_int + + +def symmetric_residue(a, m): + """Return the residual mod m such that it is within half of the modulus. + + >>> from sympy.ntheory.modular import symmetric_residue + >>> symmetric_residue(1, 6) + 1 + >>> symmetric_residue(4, 6) + -2 + """ + if a <= m // 2: + return a + return a - m + + +def crt(m, v, symmetric=False, check=True): + r"""Chinese Remainder Theorem. + + The moduli in m are assumed to be pairwise coprime. The output + is then an integer f, such that f = v_i mod m_i for each pair out + of v and m. If ``symmetric`` is False a positive integer will be + returned, else \|f\| will be less than or equal to the LCM of the + moduli, and thus f may be negative. + + If the moduli are not co-prime the correct result will be returned + if/when the test of the result is found to be incorrect. This result + will be None if there is no solution. + + The keyword ``check`` can be set to False if it is known that the moduli + are coprime. + + Examples + ======== + + As an example consider a set of residues ``U = [49, 76, 65]`` + and a set of moduli ``M = [99, 97, 95]``. Then we have:: + + >>> from sympy.ntheory.modular import crt + + >>> crt([99, 97, 95], [49, 76, 65]) + (639985, 912285) + + This is the correct result because:: + + >>> [639985 % m for m in [99, 97, 95]] + [49, 76, 65] + + If the moduli are not co-prime, you may receive an incorrect result + if you use ``check=False``: + + >>> crt([12, 6, 17], [3, 4, 2], check=False) + (954, 1224) + >>> [954 % m for m in [12, 6, 17]] + [6, 0, 2] + >>> crt([12, 6, 17], [3, 4, 2]) is None + True + >>> crt([3, 6], [2, 5]) + (5, 6) + + Note: the order of gf_crt's arguments is reversed relative to crt, + and that solve_congruence takes residue, modulus pairs. + + Programmer's note: rather than checking that all pairs of moduli share + no GCD (an O(n**2) test) and rather than factoring all moduli and seeing + that there is no factor in common, a check that the result gives the + indicated residuals is performed -- an O(n) operation. + + See Also + ======== + + solve_congruence + sympy.polys.galoistools.gf_crt : low level crt routine used by this routine + """ + if check: + m = list(map(as_int, m)) + v = list(map(as_int, v)) + + result = gf_crt(v, m, ZZ) + mm = prod(m) + + if check: + if not all(v % m == result % m for v, m in zip(v, m)): + result = solve_congruence(*list(zip(v, m)), + check=False, symmetric=symmetric) + if result is None: + return result + result, mm = result + + if symmetric: + return int(symmetric_residue(result, mm)), int(mm) + return int(result), int(mm) + + +def crt1(m): + """First part of Chinese Remainder Theorem, for multiple application. + + Examples + ======== + + >>> from sympy.ntheory.modular import crt, crt1, crt2 + >>> m = [99, 97, 95] + >>> v = [49, 76, 65] + + The following two codes have the same result. + + >>> crt(m, v) + (639985, 912285) + + >>> mm, e, s = crt1(m) + >>> crt2(m, v, mm, e, s) + (639985, 912285) + + However, it is faster when we want to fix ``m`` and + compute for multiple ``v``, i.e. the following cases: + + >>> mm, e, s = crt1(m) + >>> vs = [[52, 21, 37], [19, 46, 76]] + >>> for v in vs: + ... print(crt2(m, v, mm, e, s)) + (397042, 912285) + (803206, 912285) + + See Also + ======== + + sympy.polys.galoistools.gf_crt1 : low level crt routine used by this routine + sympy.ntheory.modular.crt + sympy.ntheory.modular.crt2 + + """ + + return gf_crt1(m, ZZ) + + +def crt2(m, v, mm, e, s, symmetric=False): + """Second part of Chinese Remainder Theorem, for multiple application. + + See ``crt1`` for usage. + + Examples + ======== + + >>> from sympy.ntheory.modular import crt1, crt2 + >>> mm, e, s = crt1([18, 42, 6]) + >>> crt2([18, 42, 6], [0, 0, 0], mm, e, s) + (0, 4536) + + See Also + ======== + + sympy.polys.galoistools.gf_crt2 : low level crt routine used by this routine + sympy.ntheory.modular.crt + sympy.ntheory.modular.crt1 + + """ + + result = gf_crt2(v, m, mm, e, s, ZZ) + + if symmetric: + return int(symmetric_residue(result, mm)), int(mm) + return int(result), int(mm) + + +def solve_congruence(*remainder_modulus_pairs, **hint): + """Compute the integer ``n`` that has the residual ``ai`` when it is + divided by ``mi`` where the ``ai`` and ``mi`` are given as pairs to + this function: ((a1, m1), (a2, m2), ...). If there is no solution, + return None. Otherwise return ``n`` and its modulus. + + The ``mi`` values need not be co-prime. If it is known that the moduli are + not co-prime then the hint ``check`` can be set to False (default=True) and + the check for a quicker solution via crt() (valid when the moduli are + co-prime) will be skipped. + + If the hint ``symmetric`` is True (default is False), the value of ``n`` + will be within 1/2 of the modulus, possibly negative. + + Examples + ======== + + >>> from sympy.ntheory.modular import solve_congruence + + What number is 2 mod 3, 3 mod 5 and 2 mod 7? + + >>> solve_congruence((2, 3), (3, 5), (2, 7)) + (23, 105) + >>> [23 % m for m in [3, 5, 7]] + [2, 3, 2] + + If you prefer to work with all remainder in one list and + all moduli in another, send the arguments like this: + + >>> solve_congruence(*zip((2, 3, 2), (3, 5, 7))) + (23, 105) + + The moduli need not be co-prime; in this case there may or + may not be a solution: + + >>> solve_congruence((2, 3), (4, 6)) is None + True + + >>> solve_congruence((2, 3), (5, 6)) + (5, 6) + + The symmetric flag will make the result be within 1/2 of the modulus: + + >>> solve_congruence((2, 3), (5, 6), symmetric=True) + (-1, 6) + + See Also + ======== + + crt : high level routine implementing the Chinese Remainder Theorem + + """ + def combine(c1, c2): + """Return the tuple (a, m) which satisfies the requirement + that n = a + i*m satisfy n = a1 + j*m1 and n = a2 = k*m2. + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Method_of_successive_substitution + """ + a1, m1 = c1 + a2, m2 = c2 + a, b, c = m1, a2 - a1, m2 + g = gcd(a, b, c) + a, b, c = [i//g for i in [a, b, c]] + if a != 1: + g, inv_a, _ = gcdext(a, c) + if g != 1: + return None + b *= inv_a + a, m = a1 + m1*b, m1*c + return a, m + + rm = remainder_modulus_pairs + symmetric = hint.get('symmetric', False) + + if hint.get('check', True): + rm = [(as_int(r), as_int(m)) for r, m in rm] + + # ignore redundant pairs but raise an error otherwise; also + # make sure that a unique set of bases is sent to gf_crt if + # they are all prime. + # + # The routine will work out less-trivial violations and + # return None, e.g. for the pairs (1,3) and (14,42) there + # is no answer because 14 mod 42 (having a gcd of 14) implies + # (14/2) mod (42/2), (14/7) mod (42/7) and (14/14) mod (42/14) + # which, being 0 mod 3, is inconsistent with 1 mod 3. But to + # preprocess the input beyond checking of another pair with 42 + # or 3 as the modulus (for this example) is not necessary. + uniq = {} + for r, m in rm: + r %= m + if m in uniq: + if r != uniq[m]: + return None + continue + uniq[m] = r + rm = [(r, m) for m, r in uniq.items()] + del uniq + + # if the moduli are co-prime, the crt will be significantly faster; + # checking all pairs for being co-prime gets to be slow but a prime + # test is a good trade-off + if all(isprime(m) for r, m in rm): + r, m = list(zip(*rm)) + return crt(m, r, symmetric=symmetric, check=False) + + rv = (0, 1) + for rmi in rm: + rv = combine(rv, rmi) + if rv is None: + break + n, m = rv + n = n % m + else: + if symmetric: + return symmetric_residue(n, m), m + return n, m diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/multinomial.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/multinomial.py new file mode 100644 index 0000000000000000000000000000000000000000..8ec50fdb533be547b9a8e60dc47568965bf89436 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/multinomial.py @@ -0,0 +1,188 @@ +from sympy.utilities.misc import as_int + + +def binomial_coefficients(n): + """Return a dictionary containing pairs :math:`{(k1,k2) : C_kn}` where + :math:`C_kn` are binomial coefficients and :math:`n=k1+k2`. + + Examples + ======== + + >>> from sympy.ntheory import binomial_coefficients + >>> binomial_coefficients(9) + {(0, 9): 1, (1, 8): 9, (2, 7): 36, (3, 6): 84, + (4, 5): 126, (5, 4): 126, (6, 3): 84, (7, 2): 36, (8, 1): 9, (9, 0): 1} + + See Also + ======== + + binomial_coefficients_list, multinomial_coefficients + """ + n = as_int(n) + d = {(0, n): 1, (n, 0): 1} + a = 1 + for k in range(1, n//2 + 1): + a = (a * (n - k + 1))//k + d[k, n - k] = d[n - k, k] = a + return d + + +def binomial_coefficients_list(n): + """ Return a list of binomial coefficients as rows of the Pascal's + triangle. + + Examples + ======== + + >>> from sympy.ntheory import binomial_coefficients_list + >>> binomial_coefficients_list(9) + [1, 9, 36, 84, 126, 126, 84, 36, 9, 1] + + See Also + ======== + + binomial_coefficients, multinomial_coefficients + """ + n = as_int(n) + d = [1] * (n + 1) + a = 1 + for k in range(1, n//2 + 1): + a = (a * (n - k + 1))//k + d[k] = d[n - k] = a + return d + + +def multinomial_coefficients(m, n): + r"""Return a dictionary containing pairs ``{(k1,k2,..,km) : C_kn}`` + where ``C_kn`` are multinomial coefficients such that + ``n=k1+k2+..+km``. + + Examples + ======== + + >>> from sympy.ntheory import multinomial_coefficients + >>> multinomial_coefficients(2, 5) # indirect doctest + {(0, 5): 1, (1, 4): 5, (2, 3): 10, (3, 2): 10, (4, 1): 5, (5, 0): 1} + + Notes + ===== + + The algorithm is based on the following result: + + .. math:: + \binom{n}{k_1, \ldots, k_m} = + \frac{k_1 + 1}{n - k_1} \sum_{i=2}^m \binom{n}{k_1 + 1, \ldots, k_i - 1, \ldots} + + Code contributed to Sage by Yann Laigle-Chapuy, copied with permission + of the author. + + See Also + ======== + + binomial_coefficients_list, binomial_coefficients + """ + m = as_int(m) + n = as_int(n) + if not m: + if n: + return {} + return {(): 1} + if m == 2: + return binomial_coefficients(n) + if m >= 2*n and n > 1: + return dict(multinomial_coefficients_iterator(m, n)) + t = [n] + [0] * (m - 1) + r = {tuple(t): 1} + if n: + j = 0 # j will be the leftmost nonzero position + else: + j = m + # enumerate tuples in co-lex order + while j < m - 1: + # compute next tuple + tj = t[j] + if j: + t[j] = 0 + t[0] = tj + if tj > 1: + t[j + 1] += 1 + j = 0 + start = 1 + v = 0 + else: + j += 1 + start = j + 1 + v = r[tuple(t)] + t[j] += 1 + # compute the value + # NB: the initialization of v was done above + for k in range(start, m): + if t[k]: + t[k] -= 1 + v += r[tuple(t)] + t[k] += 1 + t[0] -= 1 + r[tuple(t)] = (v * tj) // (n - t[0]) + return r + + +def multinomial_coefficients_iterator(m, n, _tuple=tuple): + """multinomial coefficient iterator + + This routine has been optimized for `m` large with respect to `n` by taking + advantage of the fact that when the monomial tuples `t` are stripped of + zeros, their coefficient is the same as that of the monomial tuples from + ``multinomial_coefficients(n, n)``. Therefore, the latter coefficients are + precomputed to save memory and time. + + >>> from sympy.ntheory.multinomial import multinomial_coefficients + >>> m53, m33 = multinomial_coefficients(5,3), multinomial_coefficients(3,3) + >>> m53[(0,0,0,1,2)] == m53[(0,0,1,0,2)] == m53[(1,0,2,0,0)] == m33[(0,1,2)] + True + + Examples + ======== + + >>> from sympy.ntheory.multinomial import multinomial_coefficients_iterator + >>> it = multinomial_coefficients_iterator(20,3) + >>> next(it) + ((3, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0), 1) + """ + m = as_int(m) + n = as_int(n) + if m < 2*n or n == 1: + mc = multinomial_coefficients(m, n) + yield from mc.items() + else: + mc = multinomial_coefficients(n, n) + mc1 = {} + for k, v in mc.items(): + mc1[_tuple(filter(None, k))] = v + mc = mc1 + + t = [n] + [0] * (m - 1) + t1 = _tuple(t) + b = _tuple(filter(None, t1)) + yield (t1, mc[b]) + if n: + j = 0 # j will be the leftmost nonzero position + else: + j = m + # enumerate tuples in co-lex order + while j < m - 1: + # compute next tuple + tj = t[j] + if j: + t[j] = 0 + t[0] = tj + if tj > 1: + t[j + 1] += 1 + j = 0 + else: + j += 1 + t[j] += 1 + + t[0] -= 1 + t1 = _tuple(t) + b = _tuple(filter(None, t1)) + yield (t1, mc[b]) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/partitions_.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/partitions_.py new file mode 100644 index 0000000000000000000000000000000000000000..953fa9e2fef146b0d3a9baad0ec5e1353ad6f237 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/partitions_.py @@ -0,0 +1,277 @@ +from mpmath.libmp import (fzero, from_int, from_rational, + fone, fhalf, bitcount, to_int, mpf_mul, mpf_div, mpf_sub, + mpf_add, mpf_sqrt, mpf_pi, mpf_cosh_sinh, mpf_cos, mpf_sin) +from .residue_ntheory import _sqrt_mod_prime_power, is_quad_residue +from sympy.utilities.decorator import deprecated +from sympy.utilities.memoization import recurrence_memo + +import math +from itertools import count + +def _pre(): + maxn = 10**5 + global _factor, _totient + _factor = [0]*maxn + _totient = [1]*maxn + lim = int(maxn**0.5) + 5 + for i in range(2, lim): + if _factor[i] == 0: + for j in range(i*i, maxn, i): + if _factor[j] == 0: + _factor[j] = i + for i in range(2, maxn): + if _factor[i] == 0: + _factor[i] = i + _totient[i] = i-1 + continue + x = _factor[i] + y = i//x + if y % x == 0: + _totient[i] = _totient[y]*x + else: + _totient[i] = _totient[y]*(x - 1) + +def _a(n, k, prec): + """ Compute the inner sum in HRR formula [1]_ + + References + ========== + + .. [1] https://msp.org/pjm/1956/6-1/pjm-v6-n1-p18-p.pdf + + """ + if k == 1: + return fone + + k1 = k + e = 0 + p = _factor[k] + while k1 % p == 0: + k1 //= p + e += 1 + k2 = k//k1 # k2 = p^e + v = 1 - 24*n + pi = mpf_pi(prec) + + if k1 == 1: + # k = p^e + if p == 2: + mod = 8*k + v = mod + v % mod + v = (v*pow(9, k - 1, mod)) % mod + m = _sqrt_mod_prime_power(v, 2, e + 3)[0] + arg = mpf_div(mpf_mul( + from_int(4*m), pi, prec), from_int(mod), prec) + return mpf_mul(mpf_mul( + from_int((-1)**e*(2 - (m % 4))), + mpf_sqrt(from_int(k), prec), prec), + mpf_sin(arg, prec), prec) + if p == 3: + mod = 3*k + v = mod + v % mod + if e > 1: + v = (v*pow(64, k//3 - 1, mod)) % mod + m = _sqrt_mod_prime_power(v, 3, e + 1)[0] + arg = mpf_div(mpf_mul(from_int(4*m), pi, prec), + from_int(mod), prec) + return mpf_mul(mpf_mul( + from_int(2*(-1)**(e + 1)*(3 - 2*(m % 3))), + mpf_sqrt(from_int(k//3), prec), prec), + mpf_sin(arg, prec), prec) + v = k + v % k + jacobi3 = -1 if k % 12 in [5, 7] else 1 + if v % p == 0: + if e == 1: + return mpf_mul( + from_int(jacobi3), + mpf_sqrt(from_int(k), prec), prec) + return fzero + if not is_quad_residue(v, p): + return fzero + _phi = p**(e - 1)*(p - 1) + v = (v*pow(576, _phi - 1, k)) + m = _sqrt_mod_prime_power(v, p, e)[0] + arg = mpf_div( + mpf_mul(from_int(4*m), pi, prec), + from_int(k), prec) + return mpf_mul(mpf_mul( + from_int(2*jacobi3), + mpf_sqrt(from_int(k), prec), prec), + mpf_cos(arg, prec), prec) + + if p != 2 or e >= 3: + d1, d2 = math.gcd(k1, 24), math.gcd(k2, 24) + e = 24//(d1*d2) + n1 = ((d2*e*n + (k2**2 - 1)//d1)* + pow(e*k2*k2*d2, _totient[k1] - 1, k1)) % k1 + n2 = ((d1*e*n + (k1**2 - 1)//d2)* + pow(e*k1*k1*d1, _totient[k2] - 1, k2)) % k2 + return mpf_mul(_a(n1, k1, prec), _a(n2, k2, prec), prec) + if e == 2: + n1 = ((8*n + 5)*pow(128, _totient[k1] - 1, k1)) % k1 + n2 = (4 + ((n - 2 - (k1**2 - 1)//8)*(k1**2)) % 4) % 4 + return mpf_mul(mpf_mul( + from_int(-1), + _a(n1, k1, prec), prec), + _a(n2, k2, prec)) + n1 = ((8*n + 1)*pow(32, _totient[k1] - 1, k1)) % k1 + n2 = (2 + (n - (k1**2 - 1)//8) % 2) % 2 + return mpf_mul(_a(n1, k1, prec), _a(n2, k2, prec), prec) + +def _d(n, j, prec, sq23pi, sqrt8): + """ + Compute the sinh term in the outer sum of the HRR formula. + The constants sqrt(2/3*pi) and sqrt(8) must be precomputed. + """ + j = from_int(j) + pi = mpf_pi(prec) + a = mpf_div(sq23pi, j, prec) + b = mpf_sub(from_int(n), from_rational(1, 24, prec), prec) + c = mpf_sqrt(b, prec) + ch, sh = mpf_cosh_sinh(mpf_mul(a, c), prec) + D = mpf_div( + mpf_sqrt(j, prec), + mpf_mul(mpf_mul(sqrt8, b), pi), prec) + E = mpf_sub(mpf_mul(a, ch), mpf_div(sh, c, prec), prec) + return mpf_mul(D, E) + + +@recurrence_memo([1, 1]) +def _partition_rec(n: int, prev) -> int: + """ Calculate the partition function P(n) + + Parameters + ========== + + n : int + nonnegative integer + + """ + v = 0 + penta = 0 # pentagonal number: 1, 5, 12, ... + for i in count(): + penta += 3*i + 1 + np = n - penta + if np < 0: + break + s = prev[np] + np -= i + 1 + # np = n - gp where gp = generalized pentagonal: 2, 7, 15, ... + if 0 <= np: + s += prev[np] + v += -s if i % 2 else s + return v + + +def _partition(n: int) -> int: + """ Calculate the partition function P(n) + + Parameters + ========== + + n : int + + """ + if n < 0: + return 0 + if (n <= 200_000 and n - _partition_rec.cache_length() < 70 or + _partition_rec.cache_length() == 2 and n < 14_400): + # There will be 2*10**5 elements created here + # and n elements created by partition, so in case we + # are going to be working with small n, we just + # use partition to calculate (and cache) the values + # since lookup is used there while summation, using + # _factor and _totient, will be used below. But we + # only do so if n is relatively close to the length + # of the cache since doing 1 calculation here is about + # the same as adding 70 elements to the cache. In addition, + # the startup here costs about the same as calculating the first + # 14,400 values via partition, so we delay startup here unless n + # is smaller than that. + return _partition_rec(n) + if '_factor' not in globals(): + _pre() + # Estimate number of bits in p(n). This formula could be tidied + pbits = int(( + math.pi*(2*n/3.)**0.5 - + math.log(4*n))/math.log(10) + 1) * \ + math.log2(10) + prec = p = int(pbits*1.1 + 100) + + # find the number of terms needed so rounded sum will be accurate + # using Rademacher's bound M(n, N) for the remainder after a partial + # sum of N terms (https://arxiv.org/pdf/1205.5991.pdf, (1.8)) + c1 = 44*math.pi**2/(225*math.sqrt(3)) + c2 = math.pi*math.sqrt(2)/75 + c3 = math.pi*math.sqrt(2/3) + def _M(n, N): + sqrt = math.sqrt + return c1/sqrt(N) + c2*sqrt(N/(n - 1))*math.sinh(c3*sqrt(n)/N) + big = max(9, math.ceil(n**0.5)) # should be too large (for n > 65, ceil should work) + assert _M(n, big) < 0.5 # else double big until too large + while big > 40 and _M(n, big) < 0.5: + big //= 2 + small = big + big = small*2 + while big - small > 1: + N = (big + small)//2 + if (er := _M(n, N)) < 0.5: + big = N + elif er >= 0.5: + small = N + M = big # done with function M; now have value + + # sanity check for expected size of answer + if M > 10**5: # i.e. M > maxn + raise ValueError("Input too big") # i.e. n > 149832547102 + + # calculate it + s = fzero + sq23pi = mpf_mul(mpf_sqrt(from_rational(2, 3, p), p), mpf_pi(p), p) + sqrt8 = mpf_sqrt(from_int(8), p) + for q in range(1, M): + a = _a(n, q, p) + d = _d(n, q, p, sq23pi, sqrt8) + s = mpf_add(s, mpf_mul(a, d), prec) + # On average, the terms decrease rapidly in magnitude. + # Dynamically reducing the precision greatly improves + # performance. + p = bitcount(abs(to_int(d))) + 50 + return int(to_int(mpf_add(s, fhalf, prec))) + + +@deprecated("""\ +The `sympy.ntheory.partitions_.npartitions` has been moved to `sympy.functions.combinatorial.numbers.partition`.""", +deprecated_since_version="1.13", +active_deprecations_target='deprecated-ntheory-symbolic-functions') +def npartitions(n, verbose=False): + """ + Calculate the partition function P(n), i.e. the number of ways that + n can be written as a sum of positive integers. + + .. deprecated:: 1.13 + + The ``npartitions`` function is deprecated. Use :class:`sympy.functions.combinatorial.numbers.partition` + instead. See its documentation for more information. See + :ref:`deprecated-ntheory-symbolic-functions` for details. + + P(n) is computed using the Hardy-Ramanujan-Rademacher formula [1]_. + + + The correctness of this implementation has been tested through $10^{10}$. + + Examples + ======== + + >>> from sympy.functions.combinatorial.numbers import partition + >>> partition(25) + 1958 + + References + ========== + + .. [1] https://mathworld.wolfram.com/PartitionFunctionP.html + + """ + from sympy.functions.combinatorial.numbers import partition as func_partition + return func_partition(n) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/primetest.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/primetest.py new file mode 100644 index 0000000000000000000000000000000000000000..ff3cb82cc51bf57ca345a7d72ee715c861f62e2a --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/primetest.py @@ -0,0 +1,830 @@ +""" +Primality testing + +""" + +from itertools import count + +from sympy.core.sympify import sympify +from sympy.external.gmpy import (gmpy as _gmpy, gcd, jacobi, + is_square as gmpy_is_square, + bit_scan1, is_fermat_prp, is_euler_prp, + is_selfridge_prp, is_strong_selfridge_prp, + is_strong_bpsw_prp) +from sympy.external.ntheory import _lucas_sequence +from sympy.utilities.misc import as_int, filldedent + +# Note: This list should be updated whenever new Mersenne primes are found. +# Refer: https://www.mersenne.org/ +MERSENNE_PRIME_EXPONENTS = (2, 3, 5, 7, 13, 17, 19, 31, 61, 89, 107, 127, 521, 607, 1279, 2203, + 2281, 3217, 4253, 4423, 9689, 9941, 11213, 19937, 21701, 23209, 44497, 86243, 110503, 132049, + 216091, 756839, 859433, 1257787, 1398269, 2976221, 3021377, 6972593, 13466917, 20996011, 24036583, + 25964951, 30402457, 32582657, 37156667, 42643801, 43112609, 57885161, 74207281, 77232917, 82589933, + 136279841) + + +def is_fermat_pseudoprime(n, a): + r"""Returns True if ``n`` is prime or is an odd composite integer that + is coprime to ``a`` and satisfy the modular arithmetic congruence relation: + + .. math :: + a^{n-1} \equiv 1 \pmod{n} + + (where mod refers to the modulo operation). + + Parameters + ========== + + n : Integer + ``n`` is a positive integer. + a : Integer + ``a`` is a positive integer. + ``a`` and ``n`` should be relatively prime. + + Returns + ======= + + bool : If ``n`` is prime, it always returns ``True``. + The composite number that returns ``True`` is called an Fermat pseudoprime. + + Examples + ======== + + >>> from sympy.ntheory.primetest import is_fermat_pseudoprime + >>> from sympy.ntheory.factor_ import isprime + >>> for n in range(1, 1000): + ... if is_fermat_pseudoprime(n, 2) and not isprime(n): + ... print(n) + 341 + 561 + 645 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Fermat_pseudoprime + """ + n, a = as_int(n), as_int(a) + if a == 1: + return n == 2 or bool(n % 2) + return is_fermat_prp(n, a) + + +def is_euler_pseudoprime(n, a): + r"""Returns True if ``n`` is prime or is an odd composite integer that + is coprime to ``a`` and satisfy the modular arithmetic congruence relation: + + .. math :: + a^{(n-1)/2} \equiv \pm 1 \pmod{n} + + (where mod refers to the modulo operation). + + Parameters + ========== + + n : Integer + ``n`` is a positive integer. + a : Integer + ``a`` is a positive integer. + ``a`` and ``n`` should be relatively prime. + + Returns + ======= + + bool : If ``n`` is prime, it always returns ``True``. + The composite number that returns ``True`` is called an Euler pseudoprime. + + Examples + ======== + + >>> from sympy.ntheory.primetest import is_euler_pseudoprime + >>> from sympy.ntheory.factor_ import isprime + >>> for n in range(1, 1000): + ... if is_euler_pseudoprime(n, 2) and not isprime(n): + ... print(n) + 341 + 561 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Euler_pseudoprime + """ + n, a = as_int(n), as_int(a) + if a < 1: + raise ValueError("a should be an integer greater than 0") + if n < 1: + raise ValueError("n should be an integer greater than 0") + if n == 1: + return False + if a == 1: + return n == 2 or bool(n % 2) # (prime or odd composite) + if n % 2 == 0: + return n == 2 + if gcd(n, a) != 1: + raise ValueError("The two numbers should be relatively prime") + return pow(a, (n - 1) // 2, n) in [1, n - 1] + + +def is_euler_jacobi_pseudoprime(n, a): + r"""Returns True if ``n`` is prime or is an odd composite integer that + is coprime to ``a`` and satisfy the modular arithmetic congruence relation: + + .. math :: + a^{(n-1)/2} \equiv \left(\frac{a}{n}\right) \pmod{n} + + (where mod refers to the modulo operation). + + Parameters + ========== + + n : Integer + ``n`` is a positive integer. + a : Integer + ``a`` is a positive integer. + ``a`` and ``n`` should be relatively prime. + + Returns + ======= + + bool : If ``n`` is prime, it always returns ``True``. + The composite number that returns ``True`` is called an Euler-Jacobi pseudoprime. + + Examples + ======== + + >>> from sympy.ntheory.primetest import is_euler_jacobi_pseudoprime + >>> from sympy.ntheory.factor_ import isprime + >>> for n in range(1, 1000): + ... if is_euler_jacobi_pseudoprime(n, 2) and not isprime(n): + ... print(n) + 561 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Euler%E2%80%93Jacobi_pseudoprime + """ + n, a = as_int(n), as_int(a) + if a == 1: + return n == 2 or bool(n % 2) + return is_euler_prp(n, a) + + +def is_square(n, prep=True): + """Return True if n == a * a for some integer a, else False. + If n is suspected of *not* being a square then this is a + quick method of confirming that it is not. + + Examples + ======== + + >>> from sympy.ntheory.primetest import is_square + >>> is_square(25) + True + >>> is_square(2) + False + + References + ========== + + .. [1] https://mersenneforum.org/showpost.php?p=110896 + + See Also + ======== + sympy.core.intfunc.isqrt + """ + if prep: + n = as_int(n) + if n < 0: + return False + if n in (0, 1): + return True + return gmpy_is_square(n) + + +def _test(n, base, s, t): + """Miller-Rabin strong pseudoprime test for one base. + Return False if n is definitely composite, True if n is + probably prime, with a probability greater than 3/4. + + """ + # do the Fermat test + b = pow(base, t, n) + if b == 1 or b == n - 1: + return True + for _ in range(s - 1): + b = pow(b, 2, n) + if b == n - 1: + return True + # see I. Niven et al. "An Introduction to Theory of Numbers", page 78 + if b == 1: + return False + return False + + +def mr(n, bases): + """Perform a Miller-Rabin strong pseudoprime test on n using a + given list of bases/witnesses. + + References + ========== + + .. [1] Richard Crandall & Carl Pomerance (2005), "Prime Numbers: + A Computational Perspective", Springer, 2nd edition, 135-138 + + A list of thresholds and the bases they require are here: + https://en.wikipedia.org/wiki/Miller%E2%80%93Rabin_primality_test#Deterministic_variants + + Examples + ======== + + >>> from sympy.ntheory.primetest import mr + >>> mr(1373651, [2, 3]) + False + >>> mr(479001599, [31, 73]) + True + + """ + from sympy.polys.domains import ZZ + + n = as_int(n) + if n < 2 or (n > 2 and n % 2 == 0): + return False + # remove powers of 2 from n-1 (= t * 2**s) + s = bit_scan1(n - 1) + t = n >> s + for base in bases: + # Bases >= n are wrapped, bases < 2 are invalid + if base >= n: + base %= n + if base >= 2: + base = ZZ(base) + if not _test(n, base, s, t): + return False + return True + + +def _lucas_extrastrong_params(n): + """Calculates the "extra strong" parameters (D, P, Q) for n. + + Parameters + ========== + + n : int + positive odd integer + + Returns + ======= + + D, P, Q: "extra strong" parameters. + ``(0, 0, 0)`` if we find a nontrivial divisor of ``n``. + + Examples + ======== + + >>> from sympy.ntheory.primetest import _lucas_extrastrong_params + >>> _lucas_extrastrong_params(101) + (12, 4, 1) + >>> _lucas_extrastrong_params(15) + (0, 0, 0) + + References + ========== + .. [1] OEIS A217719: Extra Strong Lucas Pseudoprimes + https://oeis.org/A217719 + .. [2] https://en.wikipedia.org/wiki/Lucas_pseudoprime + + """ + for P in count(3): + D = P**2 - 4 + j = jacobi(D, n) + if j == -1: + return (D, P, 1) + elif j == 0 and D % n: + return (0, 0, 0) + + +def is_lucas_prp(n): + """Standard Lucas compositeness test with Selfridge parameters. Returns + False if n is definitely composite, and True if n is a Lucas probable + prime. + + This is typically used in combination with the Miller-Rabin test. + + References + ========== + .. [1] Robert Baillie, Samuel S. Wagstaff, Lucas Pseudoprimes, + Math. Comp. Vol 35, Number 152 (1980), pp. 1391-1417, + https://doi.org/10.1090%2FS0025-5718-1980-0583518-6 + http://mpqs.free.fr/LucasPseudoprimes.pdf + .. [2] OEIS A217120: Lucas Pseudoprimes + https://oeis.org/A217120 + .. [3] https://en.wikipedia.org/wiki/Lucas_pseudoprime + + Examples + ======== + + >>> from sympy.ntheory.primetest import isprime, is_lucas_prp + >>> for i in range(10000): + ... if is_lucas_prp(i) and not isprime(i): + ... print(i) + 323 + 377 + 1159 + 1829 + 3827 + 5459 + 5777 + 9071 + 9179 + """ + n = as_int(n) + if n < 2: + return False + return is_selfridge_prp(n) + + +def is_strong_lucas_prp(n): + """Strong Lucas compositeness test with Selfridge parameters. Returns + False if n is definitely composite, and True if n is a strong Lucas + probable prime. + + This is often used in combination with the Miller-Rabin test, and + in particular, when combined with M-R base 2 creates the strong BPSW test. + + References + ========== + .. [1] Robert Baillie, Samuel S. Wagstaff, Lucas Pseudoprimes, + Math. Comp. Vol 35, Number 152 (1980), pp. 1391-1417, + https://doi.org/10.1090%2FS0025-5718-1980-0583518-6 + http://mpqs.free.fr/LucasPseudoprimes.pdf + .. [2] OEIS A217255: Strong Lucas Pseudoprimes + https://oeis.org/A217255 + .. [3] https://en.wikipedia.org/wiki/Lucas_pseudoprime + .. [4] https://en.wikipedia.org/wiki/Baillie-PSW_primality_test + + Examples + ======== + + >>> from sympy.ntheory.primetest import isprime, is_strong_lucas_prp + >>> for i in range(20000): + ... if is_strong_lucas_prp(i) and not isprime(i): + ... print(i) + 5459 + 5777 + 10877 + 16109 + 18971 + """ + n = as_int(n) + if n < 2: + return False + return is_strong_selfridge_prp(n) + + +def is_extra_strong_lucas_prp(n): + """Extra Strong Lucas compositeness test. Returns False if n is + definitely composite, and True if n is an "extra strong" Lucas probable + prime. + + The parameters are selected using P = 3, Q = 1, then incrementing P until + (D|n) == -1. The test itself is as defined in [1]_, from the + Mo and Jones preprint. The parameter selection and test are the same as + used in OEIS A217719, Perl's Math::Prime::Util, and the Lucas pseudoprime + page on Wikipedia. + + It is 20-50% faster than the strong test. + + Because of the different parameters selected, there is no relationship + between the strong Lucas pseudoprimes and extra strong Lucas pseudoprimes. + In particular, one is not a subset of the other. + + References + ========== + .. [1] Jon Grantham, Frobenius Pseudoprimes, + Math. Comp. Vol 70, Number 234 (2001), pp. 873-891, + https://doi.org/10.1090%2FS0025-5718-00-01197-2 + .. [2] OEIS A217719: Extra Strong Lucas Pseudoprimes + https://oeis.org/A217719 + .. [3] https://en.wikipedia.org/wiki/Lucas_pseudoprime + + Examples + ======== + + >>> from sympy.ntheory.primetest import isprime, is_extra_strong_lucas_prp + >>> for i in range(20000): + ... if is_extra_strong_lucas_prp(i) and not isprime(i): + ... print(i) + 989 + 3239 + 5777 + 10877 + """ + # Implementation notes: + # 1) the parameters differ from Thomas R. Nicely's. His parameter + # selection leads to pseudoprimes that overlap M-R tests, and + # contradict Baillie and Wagstaff's suggestion of (D|n) = -1. + # 2) The MathWorld page as of June 2013 specifies Q=-1. The Lucas + # sequence must have Q=1. See Grantham theorem 2.3, any of the + # references on the MathWorld page, or run it and see Q=-1 is wrong. + n = as_int(n) + if n == 2: + return True + if n < 2 or (n % 2) == 0: + return False + if gmpy_is_square(n): + return False + + D, P, Q = _lucas_extrastrong_params(n) + if D == 0: + return False + + # remove powers of 2 from n+1 (= k * 2**s) + s = bit_scan1(n + 1) + k = (n + 1) >> s + + U, V, _ = _lucas_sequence(n, P, Q, k) + + if U == 0 and (V == 2 or V == n - 2): + return True + for _ in range(1, s): + if V == 0: + return True + V = (V*V - 2) % n + return False + + +def proth_test(n): + r""" Test if the Proth number `n = k2^m + 1` is prime. where k is a positive odd number and `2^m > k`. + + Parameters + ========== + + n : Integer + ``n`` is Proth number + + Returns + ======= + + bool : If ``True``, then ``n`` is the Proth prime + + Raises + ====== + + ValueError + If ``n`` is not Proth number. + + Examples + ======== + + >>> from sympy.ntheory.primetest import proth_test + >>> proth_test(41) + True + >>> proth_test(57) + False + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Proth_prime + + """ + n = as_int(n) + if n < 3: + raise ValueError("n is not Proth number") + m = bit_scan1(n - 1) + k = n >> m + if m < k.bit_length(): + raise ValueError("n is not Proth number") + if n % 3 == 0: + return n == 3 + if k % 3: # n % 12 == 5 + return pow(3, n >> 1, n) == n - 1 + # If `n` is a square number, then `jacobi(a, n) = 1` for any `a` + if gmpy_is_square(n): + return False + # `a` may be chosen at random. + # In any case, we want to find `a` such that `jacobi(a, n) = -1`. + for a in range(5, n): + j = jacobi(a, n) + if j == -1: + return pow(a, n >> 1, n) == n - 1 + if j == 0: + return False + + +def _lucas_lehmer_primality_test(p): + r""" Test if the Mersenne number `M_p = 2^p-1` is prime. + + Parameters + ========== + + p : int + ``p`` is an odd prime number + + Returns + ======= + + bool : If ``True``, then `M_p` is the Mersenne prime + + Examples + ======== + + >>> from sympy.ntheory.primetest import _lucas_lehmer_primality_test + >>> _lucas_lehmer_primality_test(5) # 2**5 - 1 = 31 is prime + True + >>> _lucas_lehmer_primality_test(11) # 2**11 - 1 = 2047 is not prime + False + + See Also + ======== + + is_mersenne_prime + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/Lucas%E2%80%93Lehmer_primality_test + + """ + v = 4 + m = 2**p - 1 + for _ in range(p - 2): + v = pow(v, 2, m) - 2 + return v == 0 + + +def is_mersenne_prime(n): + """Returns True if ``n`` is a Mersenne prime, else False. + + A Mersenne prime is a prime number having the form `2^i - 1`. + + Examples + ======== + + >>> from sympy.ntheory.factor_ import is_mersenne_prime + >>> is_mersenne_prime(6) + False + >>> is_mersenne_prime(127) + True + + References + ========== + + .. [1] https://mathworld.wolfram.com/MersennePrime.html + + """ + n = as_int(n) + if n < 1: + return False + if n & (n + 1): + # n is not Mersenne number + return False + p = n.bit_length() + if p in MERSENNE_PRIME_EXPONENTS: + return True + if p < 65_000_000 or not isprime(p): + # According to GIMPS, verification was completed on September 19, 2023 for p less than 65 million. + # https://www.mersenne.org/report_milestones/ + # If p is composite number, then n=2**p-1 is composite number. + return False + result = _lucas_lehmer_primality_test(p) + if result: + raise ValueError(filldedent(''' + This Mersenne Prime, 2^%s - 1, should + be added to SymPy's known values.''' % p)) + return result + + +_MR_BASES_32 = [15591, 2018, 166, 7429, 8064, 16045, 10503, 4399, 1949, 1295, + 2776, 3620, 560, 3128, 5212, 2657, 2300, 2021, 4652, 1471, + 9336, 4018, 2398, 20462, 10277, 8028, 2213, 6219, 620, 3763, + 4852, 5012, 3185, 1333, 6227,5298, 1074, 2391, 5113, 7061, + 803, 1269, 3875, 422, 751, 580, 4729, 10239, 746, 2951, 556, + 2206, 3778, 481, 1522, 3476, 481, 2487, 3266, 5633, 488, 3373, + 6441, 3344, 17, 15105, 1490, 4154, 2036, 1882, 1813, 467, + 3307, 14042, 6371, 658, 1005, 903, 737, 1887, 7447, 1888, + 2848, 1784, 7559, 3400, 951, 13969, 4304, 177, 41, 19875, + 3110, 13221, 8726, 571, 7043, 6943, 1199, 352, 6435, 165, + 1169, 3315, 978, 233, 3003, 2562, 2994, 10587, 10030, 2377, + 1902, 5354, 4447, 1555, 263, 27027, 2283, 305, 669, 1912, 601, + 6186, 429, 1930, 14873, 1784, 1661, 524, 3577, 236, 2360, + 6146, 2850, 55637, 1753, 4178, 8466, 222, 2579, 2743, 2031, + 2226, 2276, 374, 2132, 813, 23788, 1610, 4422, 5159, 1725, + 3597, 3366, 14336, 579, 165, 1375, 10018, 12616, 9816, 1371, + 536, 1867, 10864, 857, 2206, 5788, 434, 8085, 17618, 727, + 3639, 1595, 4944, 2129, 2029, 8195, 8344, 6232, 9183, 8126, + 1870, 3296, 7455, 8947, 25017, 541, 19115, 368, 566, 5674, + 411, 522, 1027, 8215, 2050, 6544, 10049, 614, 774, 2333, 3007, + 35201, 4706, 1152, 1785, 1028, 1540, 3743, 493, 4474, 2521, + 26845, 8354, 864, 18915, 5465, 2447, 42, 4511, 1660, 166, + 1249, 6259, 2553, 304, 272, 7286, 73, 6554, 899, 2816, 5197, + 13330, 7054, 2818, 3199, 811, 922, 350, 7514, 4452, 3449, + 2663, 4708, 418, 1621, 1171, 3471, 88, 11345, 412, 1559, 194] + + +def isprime(n): + """ + Test if n is a prime number (True) or not (False). For n < 2^64 the + answer is definitive; larger n values have a small probability of actually + being pseudoprimes. + + Negative numbers (e.g. -2) are not considered prime. + + The first step is looking for trivial factors, which if found enables + a quick return. Next, if the sieve is large enough, use bisection search + on the sieve. For small numbers, a set of deterministic Miller-Rabin + tests are performed with bases that are known to have no counterexamples + in their range. Finally if the number is larger than 2^64, a strong + BPSW test is performed. While this is a probable prime test and we + believe counterexamples exist, there are no known counterexamples. + + Examples + ======== + + >>> from sympy.ntheory import isprime + >>> isprime(13) + True + >>> isprime(15) + False + + Notes + ===== + + This routine is intended only for integer input, not numerical + expressions which may represent numbers. Floats are also + rejected as input because they represent numbers of limited + precision. While it is tempting to permit 7.0 to represent an + integer there are errors that may "pass silently" if this is + allowed: + + >>> from sympy import Float, S + >>> int(1e3) == 1e3 == 10**3 + True + >>> int(1e23) == 1e23 + True + >>> int(1e23) == 10**23 + False + + >>> near_int = 1 + S(1)/10**19 + >>> near_int == int(near_int) + False + >>> n = Float(near_int, 10) # truncated by precision + >>> n % 1 == 0 + True + >>> n = Float(near_int, 20) + >>> n % 1 == 0 + False + + See Also + ======== + + sympy.ntheory.generate.primerange : Generates all primes in a given range + sympy.functions.combinatorial.numbers.primepi : Return the number of primes less than or equal to n + sympy.ntheory.generate.prime : Return the nth prime + + References + ========== + .. [1] https://en.wikipedia.org/wiki/Strong_pseudoprime + .. [2] Robert Baillie, Samuel S. Wagstaff, Lucas Pseudoprimes, + Math. Comp. Vol 35, Number 152 (1980), pp. 1391-1417, + https://doi.org/10.1090%2FS0025-5718-1980-0583518-6 + http://mpqs.free.fr/LucasPseudoprimes.pdf + .. [3] https://en.wikipedia.org/wiki/Baillie-PSW_primality_test + """ + n = as_int(n) + + # Step 1, do quick composite testing via trial division. The individual + # modulo tests benchmark faster than one or two primorial igcds for me. + # The point here is just to speedily handle small numbers and many + # composites. Step 2 only requires that n <= 2 get handled here. + if n in [2, 3, 5]: + return True + if n < 2 or (n % 2) == 0 or (n % 3) == 0 or (n % 5) == 0: + return False + if n < 49: + return True + if (n % 7) == 0 or (n % 11) == 0 or (n % 13) == 0 or (n % 17) == 0 or \ + (n % 19) == 0 or (n % 23) == 0 or (n % 29) == 0 or (n % 31) == 0 or \ + (n % 37) == 0 or (n % 41) == 0 or (n % 43) == 0 or (n % 47) == 0: + return False + if n < 2809: + return True + if n < 65077: + # There are only five Euler pseudoprimes with a least prime factor greater than 47 + return pow(2, n >> 1, n) in [1, n - 1] and n not in [8321, 31621, 42799, 49141, 49981] + + # bisection search on the sieve if the sieve is large enough + from sympy.ntheory.generate import sieve as s + if n <= s._list[-1]: + l, u = s.search(n) + return l == u + from sympy.ntheory.factor_ import factor_cache + if (ret := factor_cache.get(n)) is not None: + return ret == n + + # If we have GMPY2, skip straight to step 3 and do a strong BPSW test. + # This should be a bit faster than our step 2, and for large values will + # be a lot faster than our step 3 (C+GMP vs. Python). + if _gmpy is not None: + return is_strong_bpsw_prp(n) + + + # Step 2: deterministic Miller-Rabin testing for numbers < 2^64. See: + # https://miller-rabin.appspot.com/ + # for lists. We have made sure the M-R routine will successfully handle + # bases larger than n, so we can use the minimal set. + # In September 2015 deterministic numbers were extended to over 2^81. + # https://arxiv.org/pdf/1509.00864.pdf + # https://oeis.org/A014233 + if n < 341531: + return mr(n, [9345883071009581737]) + if n < 4296595241: + # Michal Forisek and Jakub Jancina, + # Fast Primality Testing for Integers That Fit into a Machine Word + # https://ceur-ws.org/Vol-1326/020-Forisek.pdf + h = ((n >> 16) ^ n) * 0x45d9f3b + h = ((h >> 16) ^ h) * 0x45d9f3b + h = ((h >> 16) ^ h) & 255 + return mr(n, [_MR_BASES_32[h]]) + if n < 350269456337: + return mr(n, [4230279247111683200, 14694767155120705706, 16641139526367750375]) + if n < 55245642489451: + return mr(n, [2, 141889084524735, 1199124725622454117, 11096072698276303650]) + if n < 7999252175582851: + return mr(n, [2, 4130806001517, 149795463772692060, 186635894390467037, 3967304179347715805]) + if n < 585226005592931977: + return mr(n, [2, 123635709730000, 9233062284813009, 43835965440333360, 761179012939631437, 1263739024124850375]) + if n < 18446744073709551616: + return mr(n, [2, 325, 9375, 28178, 450775, 9780504, 1795265022]) + if n < 318665857834031151167461: + return mr(n, [2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37]) + if n < 3317044064679887385961981: + return mr(n, [2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37, 41]) + + # We could do this instead at any point: + #if n < 18446744073709551616: + # return mr(n, [2]) and is_extra_strong_lucas_prp(n) + + # Here are tests that are safe for MR routines that don't understand + # large bases. + #if n < 9080191: + # return mr(n, [31, 73]) + #if n < 19471033: + # return mr(n, [2, 299417]) + #if n < 38010307: + # return mr(n, [2, 9332593]) + #if n < 316349281: + # return mr(n, [11000544, 31481107]) + #if n < 4759123141: + # return mr(n, [2, 7, 61]) + #if n < 105936894253: + # return mr(n, [2, 1005905886, 1340600841]) + #if n < 31858317218647: + # return mr(n, [2, 642735, 553174392, 3046413974]) + #if n < 3071837692357849: + # return mr(n, [2, 75088, 642735, 203659041, 3613982119]) + #if n < 18446744073709551616: + # return mr(n, [2, 325, 9375, 28178, 450775, 9780504, 1795265022]) + + # Step 3: BPSW. + # + # Time for isprime(10**2000 + 4561), no gmpy or gmpy2 installed + # 44.0s old isprime using 46 bases + # 5.3s strong BPSW + one random base + # 4.3s extra strong BPSW + one random base + # 4.1s strong BPSW + # 3.2s extra strong BPSW + + # Classic BPSW from page 1401 of the paper. See alternate ideas below. + return is_strong_bpsw_prp(n) + + # Using extra strong test, which is somewhat faster + #return mr(n, [2]) and is_extra_strong_lucas_prp(n) + + # Add a random M-R base + #import random + #return mr(n, [2, random.randint(3, n-1)]) and is_strong_lucas_prp(n) + + +def is_gaussian_prime(num): + r"""Test if num is a Gaussian prime number. + + References + ========== + + .. [1] https://oeis.org/wiki/Gaussian_primes + """ + + num = sympify(num) + a, b = num.as_real_imag() + a = as_int(a, strict=False) + b = as_int(b, strict=False) + if a == 0: + b = abs(b) + return isprime(b) and b % 4 == 3 + elif b == 0: + a = abs(a) + return isprime(a) and a % 4 == 3 + return isprime(a**2 + b**2) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/qs.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/qs.py new file mode 100644 index 0000000000000000000000000000000000000000..acc9a7b6e0151695538a99a738ef397166497ba5 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/qs.py @@ -0,0 +1,451 @@ +from math import exp, log +from sympy.core.random import _randint +from sympy.external.gmpy import bit_scan1, gcd, invert, sqrt as isqrt +from sympy.ntheory.factor_ import _perfect_power +from sympy.ntheory.primetest import isprime +from sympy.ntheory.residue_ntheory import _sqrt_mod_prime_power + + +class SievePolynomial: + def __init__(self, a, b, N): + """This class denotes the sieve polynomial. + Provide methods to compute `(a*x + b)**2 - N` and + `a*x + b` when given `x`. + + Parameters + ========== + + a : parameter of the sieve polynomial + b : parameter of the sieve polynomial + N : number to be factored + + """ + self.a = a + self.b = b + self.a2 = a**2 + self.ab = 2*a*b + self.b2 = b**2 - N + + def eval_u(self, x): + return self.a*x + self.b + + def eval_v(self, x): + return (self.a2*x + self.ab)*x + self.b2 + + +class FactorBaseElem: + """This class stores an element of the `factor_base`. + """ + def __init__(self, prime, tmem_p, log_p): + """ + Initialization of factor_base_elem. + + Parameters + ========== + + prime : prime number of the factor_base + tmem_p : Integer square root of x**2 = n mod prime + log_p : Compute Natural Logarithm of the prime + """ + self.prime = prime + self.tmem_p = tmem_p + self.log_p = log_p + # `soln1` and `soln2` are solutions to + # the equation `(a*x + b)**2 - N = 0 (mod p)`. + self.soln1 = None + self.soln2 = None + self.b_ainv = None + + +def _generate_factor_base(prime_bound, n): + """Generate `factor_base` for Quadratic Sieve. The `factor_base` + consists of all the points whose ``legendre_symbol(n, p) == 1`` + and ``p < num_primes``. Along with the prime `factor_base` also stores + natural logarithm of prime and the residue n modulo p. + It also returns the of primes numbers in the `factor_base` which are + close to 1000 and 5000. + + Parameters + ========== + + prime_bound : upper prime bound of the factor_base + n : integer to be factored + """ + from sympy.ntheory.generate import sieve + factor_base = [] + idx_1000, idx_5000 = None, None + for prime in sieve.primerange(1, prime_bound): + if pow(n, (prime - 1) // 2, prime) == 1: + if prime > 1000 and idx_1000 is None: + idx_1000 = len(factor_base) - 1 + if prime > 5000 and idx_5000 is None: + idx_5000 = len(factor_base) - 1 + residue = _sqrt_mod_prime_power(n, prime, 1)[0] + log_p = round(log(prime)*2**10) + factor_base.append(FactorBaseElem(prime, residue, log_p)) + return idx_1000, idx_5000, factor_base + + +def _generate_polynomial(N, M, factor_base, idx_1000, idx_5000, randint): + """ Generate sieve polynomials indefinitely. + Information such as `soln1` in the `factor_base` associated with + the polynomial is modified in place. + + Parameters + ========== + + N : Number to be factored + M : sieve interval + factor_base : factor_base primes + idx_1000 : index of prime number in the factor_base near 1000 + idx_5000 : index of prime number in the factor_base near to 5000 + randint : A callable that takes two integers (a, b) and returns a random integer + n such that a <= n <= b, similar to `random.randint`. + """ + approx_val = log(2*N)/2 - log(M) + start = idx_1000 or 0 + end = idx_5000 or (len(factor_base) - 1) + while True: + # Choose `a` that is close to `sqrt(2*N) / M` + best_a, best_q, best_ratio = None, None, None + for _ in range(50): + a = 1 + q = [] + while log(a) < approx_val: + rand_p = 0 + while(rand_p == 0 or rand_p in q): + rand_p = randint(start, end) + p = factor_base[rand_p].prime + a *= p + q.append(rand_p) + ratio = exp(log(a) - approx_val) + if best_ratio is None or abs(ratio - 1) < abs(best_ratio - 1): + best_q = q + best_a = a + best_ratio = ratio + + # Set `b` using the Chinese remainder theorem + a = best_a + q = best_q + B = [] + for val in q: + q_l = factor_base[val].prime + gamma = factor_base[val].tmem_p * invert(a // q_l, q_l) % q_l + if 2*gamma > q_l: + gamma = q_l - gamma + B.append(a//q_l*gamma) + b = sum(B) + g = SievePolynomial(a, b, N) + for fb in factor_base: + if a % fb.prime == 0: + fb.soln1 = None + continue + a_inv = invert(a, fb.prime) + fb.b_ainv = [2*b_elem*a_inv % fb.prime for b_elem in B] + fb.soln1 = (a_inv*(fb.tmem_p - b)) % fb.prime + fb.soln2 = (a_inv*(-fb.tmem_p - b)) % fb.prime + yield g + + # Update `b` with Gray code + for i in range(1, 2**(len(B)-1)): + v = bit_scan1(i) + neg_pow = 2*((i >> (v + 1)) % 2) - 1 + b = g.b + 2*neg_pow*B[v] + a = g.a + g = SievePolynomial(a, b, N) + for fb in factor_base: + if fb.soln1 is None: + continue + fb.soln1 = (fb.soln1 - neg_pow*fb.b_ainv[v]) % fb.prime + fb.soln2 = (fb.soln2 - neg_pow*fb.b_ainv[v]) % fb.prime + yield g + + +def _gen_sieve_array(M, factor_base): + """Sieve Stage of the Quadratic Sieve. For every prime in the factor_base + that does not divide the coefficient `a` we add log_p over the sieve_array + such that ``-M <= soln1 + i*p <= M`` and ``-M <= soln2 + i*p <= M`` where `i` + is an integer. When p = 2 then log_p is only added using + ``-M <= soln1 + i*p <= M``. + + Parameters + ========== + + M : sieve interval + factor_base : factor_base primes + """ + sieve_array = [0]*(2*M + 1) + for factor in factor_base: + if factor.soln1 is None: #The prime does not divides a + continue + for idx in range((M + factor.soln1) % factor.prime, 2*M, factor.prime): + sieve_array[idx] += factor.log_p + if factor.prime == 2: + continue + #if prime is 2 then sieve only with soln_1_p + for idx in range((M + factor.soln2) % factor.prime, 2*M, factor.prime): + sieve_array[idx] += factor.log_p + return sieve_array + + +def _check_smoothness(num, factor_base): + r""" Check if `num` is smooth with respect to the given `factor_base` + and compute its factorization vector. + + Parameters + ========== + + num : integer whose smootheness is to be checked + factor_base : factor_base primes + """ + if num < 0: + num *= -1 + vec = 1 + else: + vec = 0 + for i, fb in enumerate(factor_base, 1): + if num % fb.prime: + continue + e = 1 + num //= fb.prime + while num % fb.prime == 0: + e += 1 + num //= fb.prime + if e % 2: + vec += 1 << i + return vec, num + + +def _trial_division_stage(N, M, factor_base, sieve_array, sieve_poly, partial_relations, ERROR_TERM): + """Trial division stage. Here we trial divide the values generetated + by sieve_poly in the sieve interval and if it is a smooth number then + it is stored in `smooth_relations`. Moreover, if we find two partial relations + with same large prime then they are combined to form a smooth relation. + First we iterate over sieve array and look for values which are greater + than accumulated_val, as these values have a high chance of being smooth + number. Then using these values we find smooth relations. + In general, let ``t**2 = u*p modN`` and ``r**2 = v*p modN`` be two partial relations + with the same large prime p. Then they can be combined ``(t*r/p)**2 = u*v modN`` + to form a smooth relation. + + Parameters + ========== + + N : Number to be factored + M : sieve interval + factor_base : factor_base primes + sieve_array : stores log_p values + sieve_poly : polynomial from which we find smooth relations + partial_relations : stores partial relations with one large prime + ERROR_TERM : error term for accumulated_val + """ + accumulated_val = (log(M) + log(N)/2 - ERROR_TERM) * 2**10 + smooth_relations = [] + proper_factor = set() + partial_relation_upper_bound = 128*factor_base[-1].prime + for x, val in enumerate(sieve_array, -M): + if val < accumulated_val: + continue + v = sieve_poly.eval_v(x) + vec, num = _check_smoothness(v, factor_base) + if num == 1: + smooth_relations.append((sieve_poly.eval_u(x), v, vec)) + elif num < partial_relation_upper_bound and isprime(num): + if N % num == 0: + proper_factor.add(num) + continue + u = sieve_poly.eval_u(x) + if num in partial_relations: + u_prev, v_prev, vec_prev = partial_relations.pop(num) + u = u*u_prev*invert(num, N) % N + v = v*v_prev // num**2 + vec ^= vec_prev + smooth_relations.append((u, v, vec)) + else: + partial_relations[num] = (u, v, vec) + return smooth_relations, proper_factor + + +def _find_factor(N, smooth_relations, col): + """ Finds proper factor of N using fast gaussian reduction for modulo 2 matrix. + + Parameters + ========== + + N : Number to be factored + smooth_relations : Smooth relations vectors matrix + col : Number of columns in the matrix + + Reference + ========== + + .. [1] A fast algorithm for gaussian elimination over GF(2) and + its implementation on the GAPP. Cetin K.Koc, Sarath N.Arachchige + """ + matrix = [s_relation[2] for s_relation in smooth_relations] + row = len(matrix) + mark = [False] * row + for pos in range(col): + m = 1 << pos + for i in range(row): + if p := matrix[i] & m: + add_col = p ^ matrix[i] + matrix[i] = m + mark[i] = True + for j in range(i + 1, row): + if matrix[j] & m: + matrix[j] ^= add_col + break + + for m, mat, rel in zip(mark, matrix, smooth_relations): + if m: + continue + u, v = rel[0], rel[1] + for m1, mat1, rel1 in zip(mark, matrix, smooth_relations): + if m1 and mat & mat1: + u *= rel1[0] + v *= rel1[1] + # assert is_square(v) + v = isqrt(v) + if 1 < (g := gcd(u - v, N)) < N: + yield g + + +def qs(N, prime_bound, M, ERROR_TERM=25, seed=1234): + """Performs factorization using Self-Initializing Quadratic Sieve. + In SIQS, let N be a number to be factored, and this N should not be a + perfect power. If we find two integers such that ``X**2 = Y**2 modN`` and + ``X != +-Y modN``, then `gcd(X + Y, N)` will reveal a proper factor of N. + In order to find these integers X and Y we try to find relations of form + t**2 = u modN where u is a product of small primes. If we have enough of + these relations then we can form ``(t1*t2...ti)**2 = u1*u2...ui modN`` such that + the right hand side is a square, thus we found a relation of ``X**2 = Y**2 modN``. + + Here, several optimizations are done like using multiple polynomials for + sieving, fast changing between polynomials and using partial relations. + The use of partial relations can speeds up the factoring by 2 times. + + Parameters + ========== + + N : Number to be Factored + prime_bound : upper bound for primes in the factor base + M : Sieve Interval + ERROR_TERM : Error term for checking smoothness + seed : seed of random number generator + + Returns + ======= + + set(int) : A set of factors of N without considering multiplicity. + Returns ``{N}`` if factorization fails. + + Examples + ======== + + >>> from sympy.ntheory import qs + >>> qs(25645121643901801, 2000, 10000) + {5394769, 4753701529} + >>> qs(9804659461513846513, 2000, 10000) + {4641991, 2112166839943} + + See Also + ======== + + qs_factor + + References + ========== + + .. [1] https://pdfs.semanticscholar.org/5c52/8a975c1405bd35c65993abf5a4edb667c1db.pdf + .. [2] https://www.rieselprime.de/ziki/Self-initializing_quadratic_sieve + """ + return set(qs_factor(N, prime_bound, M, ERROR_TERM, seed)) + + +def qs_factor(N, prime_bound, M, ERROR_TERM=25, seed=1234): + """ Performs factorization using Self-Initializing Quadratic Sieve. + + Parameters + ========== + + N : Number to be Factored + prime_bound : upper bound for primes in the factor base + M : Sieve Interval + ERROR_TERM : Error term for checking smoothness + seed : seed of random number generator + + Returns + ======= + + dict[int, int] : Factors of N. + Returns ``{N: 1}`` if factorization fails. + Note that the key is not always a prime number. + + Examples + ======== + + >>> from sympy.ntheory import qs_factor + >>> qs_factor(1009 * 100003, 2000, 10000) + {1009: 1, 100003: 1} + + See Also + ======== + + qs + + """ + if N < 2: + raise ValueError("N should be greater than 1") + factors = {} + smooth_relations = [] + partial_relations = {} + # Eliminate the possibility of even numbers, + # prime numbers, and perfect powers. + if N % 2 == 0: + e = 1 + N //= 2 + while N % 2 == 0: + N //= 2 + e += 1 + factors[2] = e + if isprime(N): + factors[N] = 1 + return factors + if result := _perfect_power(N, 3): + n, e = result + factors[n] = e + return factors + N_copy = N + randint = _randint(seed) + idx_1000, idx_5000, factor_base = _generate_factor_base(prime_bound, N) + threshold = len(factor_base) * 105//100 + for g in _generate_polynomial(N, M, factor_base, idx_1000, idx_5000, randint): + sieve_array = _gen_sieve_array(M, factor_base) + s_rel, p_f = _trial_division_stage(N, M, factor_base, sieve_array, g, partial_relations, ERROR_TERM) + smooth_relations += s_rel + for p in p_f: + if N_copy % p: + continue + e = 1 + N_copy //= p + while N_copy % p == 0: + N_copy //= p + e += 1 + factors[p] = e + if threshold <= len(smooth_relations): + break + + for factor in _find_factor(N, smooth_relations, len(factor_base) + 1): + if N_copy % factor == 0: + e = 1 + N_copy //= factor + while N_copy % factor == 0: + N_copy //= factor + e += 1 + factors[factor] = e + if N_copy == 1 or isprime(N_copy): + break + if N_copy != 1: + factors[N_copy] = 1 + return factors diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/residue_ntheory.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/residue_ntheory.py new file mode 100644 index 0000000000000000000000000000000000000000..eba024161194605aabebd10ee30bf09acb90270b --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/residue_ntheory.py @@ -0,0 +1,1963 @@ +from __future__ import annotations + +from sympy.external.gmpy import (gcd, lcm, invert, sqrt, jacobi, + bit_scan1, remove) +from sympy.polys import Poly +from sympy.polys.domains import ZZ +from sympy.polys.galoistools import gf_crt1, gf_crt2, linear_congruence, gf_csolve +from .primetest import isprime +from .generate import primerange +from .factor_ import factorint, _perfect_power +from .modular import crt +from sympy.utilities.decorator import deprecated +from sympy.utilities.memoization import recurrence_memo +from sympy.utilities.misc import as_int +from sympy.utilities.iterables import iproduct +from sympy.core.random import _randint, randint + +from itertools import product + + +def n_order(a, n): + r""" Returns the order of ``a`` modulo ``n``. + + Explanation + =========== + + The order of ``a`` modulo ``n`` is the smallest integer + ``k`` such that `a^k` leaves a remainder of 1 with ``n``. + + Parameters + ========== + + a : integer + n : integer, n > 1. a and n should be relatively prime + + Returns + ======= + + int : the order of ``a`` modulo ``n`` + + Raises + ====== + + ValueError + If `n \le 1` or `\gcd(a, n) \neq 1`. + If ``a`` or ``n`` is not an integer. + + Examples + ======== + + >>> from sympy.ntheory import n_order + >>> n_order(3, 7) + 6 + >>> n_order(4, 7) + 3 + + See Also + ======== + + is_primitive_root + We say that ``a`` is a primitive root of ``n`` + when the order of ``a`` modulo ``n`` equals ``totient(n)`` + + """ + a, n = as_int(a), as_int(n) + if n <= 1: + raise ValueError("n should be an integer greater than 1") + a = a % n + # Trivial + if a == 1: + return 1 + if gcd(a, n) != 1: + raise ValueError("The two numbers should be relatively prime") + a_order = 1 + for p, e in factorint(n).items(): + pe = p**e + pe_order = (p - 1) * p**(e - 1) + factors = factorint(p - 1) + if e > 1: + factors[p] = e - 1 + order = 1 + for px, ex in factors.items(): + x = pow(a, pe_order // px**ex, pe) + while x != 1: + x = pow(x, px, pe) + order *= px + a_order = lcm(a_order, order) + return int(a_order) + + +def _primitive_root_prime_iter(p): + r""" Generates the primitive roots for a prime ``p``. + + Explanation + =========== + + The primitive roots generated are not necessarily sorted. + However, the first one is the smallest primitive root. + + Find the element whose order is ``p-1`` from the smaller one. + If we can find the first primitive root ``g``, we can use the following theorem. + + .. math :: + \operatorname{ord}(g^k) = \frac{\operatorname{ord}(g)}{\gcd(\operatorname{ord}(g), k)} + + From the assumption that `\operatorname{ord}(g)=p-1`, + it is a necessary and sufficient condition for + `\operatorname{ord}(g^k)=p-1` that `\gcd(p-1, k)=1`. + + Parameters + ========== + + p : odd prime + + Yields + ====== + + int + the primitive roots of ``p`` + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import _primitive_root_prime_iter + >>> sorted(_primitive_root_prime_iter(19)) + [2, 3, 10, 13, 14, 15] + + References + ========== + + .. [1] W. Stein "Elementary Number Theory" (2011), page 44 + + """ + if p == 3: + yield 2 + return + # Let p = +-1 (mod 4a). Legendre symbol (a/p) = 1, so `a` is not the primitive root. + # Corollary : If p = +-1 (mod 8), then 2 is not the primitive root of p. + g_min = 3 if p % 8 in [1, 7] else 2 + if p < 41: + # small case + g = 5 if p == 23 else g_min + else: + v = [(p - 1) // i for i in factorint(p - 1).keys()] + for g in range(g_min, p): + if all(pow(g, pw, p) != 1 for pw in v): + break + yield g + # g**k is the primitive root of p iff gcd(p - 1, k) = 1 + for k in range(3, p, 2): + if gcd(p - 1, k) == 1: + yield pow(g, k, p) + + +def _primitive_root_prime_power_iter(p, e): + r""" Generates the primitive roots of `p^e`. + + Explanation + =========== + + Let ``g`` be the primitive root of ``p``. + If `g^{p-1} \not\equiv 1 \pmod{p^2}`, then ``g`` is primitive root of `p^e`. + Thus, if we find a primitive root ``g`` of ``p``, + then `g, g+p, g+2p, \ldots, g+(p-1)p` are primitive roots of `p^2` except one. + That one satisfies `\hat{g}^{p-1} \equiv 1 \pmod{p^2}`. + If ``h`` is the primitive root of `p^2`, + then `h, h+p^2, h+2p^2, \ldots, h+(p^{e-2}-1)p^e` are primitive roots of `p^e`. + + Parameters + ========== + + p : odd prime + e : positive integer + + Yields + ====== + + int + the primitive roots of `p^e` + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import _primitive_root_prime_power_iter + >>> sorted(_primitive_root_prime_power_iter(5, 2)) + [2, 3, 8, 12, 13, 17, 22, 23] + + """ + if e == 1: + yield from _primitive_root_prime_iter(p) + else: + p2 = p**2 + for g in _primitive_root_prime_iter(p): + t = (g - pow(g, 2 - p, p2)) % p2 + for k in range(0, p2, p): + if k != t: + yield from (g + k + m for m in range(0, p**e, p2)) + + +def _primitive_root_prime_power2_iter(p, e): + r""" Generates the primitive roots of `2p^e`. + + Explanation + =========== + + If ``g`` is the primitive root of ``p**e``, + then the odd one of ``g`` and ``g+p**e`` is the primitive root of ``2*p**e``. + + Parameters + ========== + + p : odd prime + e : positive integer + + Yields + ====== + + int + the primitive roots of `2p^e` + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import _primitive_root_prime_power2_iter + >>> sorted(_primitive_root_prime_power2_iter(5, 2)) + [3, 13, 17, 23, 27, 33, 37, 47] + + """ + for g in _primitive_root_prime_power_iter(p, e): + if g % 2 == 1: + yield g + else: + yield g + p**e + + +def primitive_root(p, smallest=True): + r""" Returns a primitive root of ``p`` or None. + + Explanation + =========== + + For the definition of primitive root, + see the explanation of ``is_primitive_root``. + + The primitive root of ``p`` exist only for + `p = 2, 4, q^e, 2q^e` (``q`` is an odd prime). + Now, if we know the primitive root of ``q``, + we can calculate the primitive root of `q^e`, + and if we know the primitive root of `q^e`, + we can calculate the primitive root of `2q^e`. + When there is no need to find the smallest primitive root, + this property can be used to obtain a fast primitive root. + On the other hand, when we want the smallest primitive root, + we naively determine whether it is a primitive root or not. + + Parameters + ========== + + p : integer, p > 1 + smallest : if True the smallest primitive root is returned or None + + Returns + ======= + + int | None : + If the primitive root exists, return the primitive root of ``p``. + If not, return None. + + Raises + ====== + + ValueError + If `p \le 1` or ``p`` is not an integer. + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import primitive_root + >>> primitive_root(19) + 2 + >>> primitive_root(21) is None + True + >>> primitive_root(50, smallest=False) + 27 + + See Also + ======== + + is_primitive_root + + References + ========== + + .. [1] W. Stein "Elementary Number Theory" (2011), page 44 + .. [2] P. Hackman "Elementary Number Theory" (2009), Chapter C + + """ + p = as_int(p) + if p <= 1: + raise ValueError("p should be an integer greater than 1") + if p <= 4: + return p - 1 + p_even = p % 2 == 0 + if not p_even: + q = p # p is odd + elif p % 4: + q = p//2 # p had 1 factor of 2 + else: + return None # p had more than one factor of 2 + if isprime(q): + e = 1 + else: + m = _perfect_power(q, 3) + if not m: + return None + q, e = m + if not isprime(q): + return None + if not smallest: + if p_even: + return next(_primitive_root_prime_power2_iter(q, e)) + return next(_primitive_root_prime_power_iter(q, e)) + if p_even: + for i in range(3, p, 2): + if i % q and is_primitive_root(i, p): + return i + g = next(_primitive_root_prime_iter(q)) + if e == 1 or pow(g, q - 1, q**2) != 1: + return g + for i in range(g + 1, p): + if i % q and is_primitive_root(i, p): + return i + + +def is_primitive_root(a, p): + r""" Returns True if ``a`` is a primitive root of ``p``. + + Explanation + =========== + + ``a`` is said to be the primitive root of ``p`` if `\gcd(a, p) = 1` and + `\phi(p)` is the smallest positive number s.t. + + `a^{\phi(p)} \equiv 1 \pmod{p}`. + + where `\phi(p)` is Euler's totient function. + + The primitive root of ``p`` exist only for + `p = 2, 4, q^e, 2q^e` (``q`` is an odd prime). + Hence, if it is not such a ``p``, it returns False. + To determine the primitive root, we need to know + the prime factorization of ``q-1``. + The hardness of the determination depends on this complexity. + + Parameters + ========== + + a : integer + p : integer, ``p`` > 1. ``a`` and ``p`` should be relatively prime + + Returns + ======= + + bool : If True, ``a`` is the primitive root of ``p``. + + Raises + ====== + + ValueError + If `p \le 1` or `\gcd(a, p) \neq 1`. + If ``a`` or ``p`` is not an integer. + + Examples + ======== + + >>> from sympy.functions.combinatorial.numbers import totient + >>> from sympy.ntheory import is_primitive_root, n_order + >>> is_primitive_root(3, 10) + True + >>> is_primitive_root(9, 10) + False + >>> n_order(3, 10) == totient(10) + True + >>> n_order(9, 10) == totient(10) + False + + See Also + ======== + + primitive_root + + """ + a, p = as_int(a), as_int(p) + if p <= 1: + raise ValueError("p should be an integer greater than 1") + a = a % p + if gcd(a, p) != 1: + raise ValueError("The two numbers should be relatively prime") + # Primitive root of p exist only for + # p = 2, 4, q**e, 2*q**e (q is odd prime) + if p <= 4: + # The primitive root is only p-1. + return a == p - 1 + if p % 2: + q = p # p is odd + elif p % 4: + q = p//2 # p had 1 factor of 2 + else: + return False # p had more than one factor of 2 + if isprime(q): + group_order = q - 1 + factors = factorint(q - 1).keys() + else: + m = _perfect_power(q, 3) + if not m: + return False + q, e = m + if not isprime(q): + return False + group_order = q**(e - 1)*(q - 1) + factors = set(factorint(q - 1).keys()) + factors.add(q) + return all(pow(a, group_order // prime, p) != 1 for prime in factors) + + +def _sqrt_mod_tonelli_shanks(a, p): + """ + Returns the square root in the case of ``p`` prime with ``p == 1 (mod 8)`` + + Assume that the root exists. + + Parameters + ========== + + a : int + p : int + prime number. should be ``p % 8 == 1`` + + Returns + ======= + + int : Generally, there are two roots, but only one is returned. + Which one is returned is random. + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import _sqrt_mod_tonelli_shanks + >>> _sqrt_mod_tonelli_shanks(2, 17) in [6, 11] + True + + References + ========== + + .. [1] Carl Pomerance, Richard Crandall, Prime Numbers: A Computational Perspective, + 2nd Edition (2005), page 101, ISBN:978-0387252827 + + """ + s = bit_scan1(p - 1) + t = p >> s + # find a non-quadratic residue + if p % 12 == 5: + # Legendre symbol (3/p) == -1 if p % 12 in [5, 7] + d = 3 + elif p % 5 in [2, 3]: + # Legendre symbol (5/p) == -1 if p % 5 in [2, 3] + d = 5 + else: + while 1: + d = randint(6, p - 1) + if jacobi(d, p) == -1: + break + #assert legendre_symbol(d, p) == -1 + A = pow(a, t, p) + D = pow(d, t, p) + m = 0 + for i in range(s): + adm = A*pow(D, m, p) % p + adm = pow(adm, 2**(s - 1 - i), p) + if adm % p == p - 1: + m += 2**i + #assert A*pow(D, m, p) % p == 1 + x = pow(a, (t + 1)//2, p)*pow(D, m//2, p) % p + return x + + +def sqrt_mod(a, p, all_roots=False): + """ + Find a root of ``x**2 = a mod p``. + + Parameters + ========== + + a : integer + p : positive integer + all_roots : if True the list of roots is returned or None + + Notes + ===== + + If there is no root it is returned None; else the returned root + is less or equal to ``p // 2``; in general is not the smallest one. + It is returned ``p // 2`` only if it is the only root. + + Use ``all_roots`` only when it is expected that all the roots fit + in memory; otherwise use ``sqrt_mod_iter``. + + Examples + ======== + + >>> from sympy.ntheory import sqrt_mod + >>> sqrt_mod(11, 43) + 21 + >>> sqrt_mod(17, 32, True) + [7, 9, 23, 25] + """ + if all_roots: + return sorted(sqrt_mod_iter(a, p)) + p = abs(as_int(p)) + halfp = p // 2 + x = None + for r in sqrt_mod_iter(a, p): + if r < halfp: + return r + elif r > halfp: + return p - r + else: + x = r + return x + + +def sqrt_mod_iter(a, p, domain=int): + """ + Iterate over solutions to ``x**2 = a mod p``. + + Parameters + ========== + + a : integer + p : positive integer + domain : integer domain, ``int``, ``ZZ`` or ``Integer`` + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import sqrt_mod_iter + >>> list(sqrt_mod_iter(11, 43)) + [21, 22] + + See Also + ======== + + sqrt_mod : Same functionality, but you want a sorted list or only one solution. + + """ + a, p = as_int(a), abs(as_int(p)) + v = [] + pv = [] + _product = product + for px, ex in factorint(p).items(): + if a % px: + # `len(rx)` is at most 4 + rx = _sqrt_mod_prime_power(a, px, ex) + else: + # `len(list(rx))` can be assumed to be large. + # The `itertools.product` is disadvantageous in terms of memory usage. + # It is also inferior to iproduct in speed if not all Cartesian products are needed. + rx = _sqrt_mod1(a, px, ex) + _product = iproduct + if not rx: + return + v.append(rx) + pv.append(px**ex) + if len(v) == 1: + yield from map(domain, v[0]) + else: + mm, e, s = gf_crt1(pv, ZZ) + for vx in _product(*v): + yield domain(gf_crt2(vx, pv, mm, e, s, ZZ)) + + +def _sqrt_mod_prime_power(a, p, k): + """ + Find the solutions to ``x**2 = a mod p**k`` when ``a % p != 0``. + If no solution exists, return ``None``. + Solutions are returned in an ascending list. + + Parameters + ========== + + a : integer + p : prime number + k : positive integer + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import _sqrt_mod_prime_power + >>> _sqrt_mod_prime_power(11, 43, 1) + [21, 22] + + References + ========== + + .. [1] P. Hackman "Elementary Number Theory" (2009), page 160 + .. [2] http://www.numbertheory.org/php/squareroot.html + .. [3] [Gathen99]_ + """ + pk = p**k + a = a % pk + + if p == 2: + # see Ref.[2] + if a % 8 != 1: + return None + # Trivial + if k <= 3: + return list(range(1, pk, 2)) + r = 1 + # r is one of the solutions to x**2 - a = 0 (mod 2**3). + # Hensel lift them to solutions of x**2 - a = 0 (mod 2**k) + # if r**2 - a = 0 mod 2**nx but not mod 2**(nx+1) + # then r + 2**(nx - 1) is a root mod 2**(nx+1) + for nx in range(3, k): + if ((r**2 - a) >> nx) % 2: + r += 1 << (nx - 1) + # r is a solution of x**2 - a = 0 (mod 2**k), and + # there exist other solutions -r, r+h, -(r+h), and these are all solutions. + h = 1 << (k - 1) + return sorted([r, pk - r, (r + h) % pk, -(r + h) % pk]) + + # If the Legendre symbol (a/p) is not 1, no solution exists. + if jacobi(a, p) != 1: + return None + if p % 4 == 3: + res = pow(a, (p + 1) // 4, p) + elif p % 8 == 5: + res = pow(a, (p + 3) // 8, p) + if pow(res, 2, p) != a % p: + res = res * pow(2, (p - 1) // 4, p) % p + else: + res = _sqrt_mod_tonelli_shanks(a, p) + if k > 1: + # Hensel lifting with Newton iteration, see Ref.[3] chapter 9 + # with f(x) = x**2 - a; one has f'(a) != 0 (mod p) for p != 2 + px = p + for _ in range(k.bit_length() - 1): + px = px**2 + frinv = invert(2*res, px) + res = (res - (res**2 - a)*frinv) % px + if k & (k - 1): # If k is not a power of 2 + frinv = invert(2*res, pk) + res = (res - (res**2 - a)*frinv) % pk + return sorted([res, pk - res]) + + +def _sqrt_mod1(a, p, n): + """ + Find solution to ``x**2 == a mod p**n`` when ``a % p == 0``. + If no solution exists, return ``None``. + + Parameters + ========== + + a : integer + p : prime number, p must divide a + n : positive integer + + References + ========== + + .. [1] http://www.numbertheory.org/php/squareroot.html + """ + pn = p**n + a = a % pn + if a == 0: + # case gcd(a, p**k) = p**n + return range(0, pn, p**((n + 1) // 2)) + # case gcd(a, p**k) = p**r, r < n + a, r = remove(a, p) + if r % 2 == 1: + return None + res = _sqrt_mod_prime_power(a, p, n - r) + if res is None: + return None + m = r // 2 + return (x for rx in res for x in range(rx*p**m, pn, p**(n - m))) + + +def is_quad_residue(a, p): + """ + Returns True if ``a`` (mod ``p``) is in the set of squares mod ``p``, + i.e a % p in set([i**2 % p for i in range(p)]). + + Parameters + ========== + + a : integer + p : positive integer + + Returns + ======= + + bool : If True, ``x**2 == a (mod p)`` has solution. + + Raises + ====== + + ValueError + If ``a``, ``p`` is not integer. + If ``p`` is not positive. + + Examples + ======== + + >>> from sympy.ntheory import is_quad_residue + >>> is_quad_residue(21, 100) + True + + Indeed, ``pow(39, 2, 100)`` would be 21. + + >>> is_quad_residue(21, 120) + False + + That is, for any integer ``x``, ``pow(x, 2, 120)`` is not 21. + + If ``p`` is an odd + prime, an iterative method is used to make the determination: + + >>> from sympy.ntheory import is_quad_residue + >>> sorted(set([i**2 % 7 for i in range(7)])) + [0, 1, 2, 4] + >>> [j for j in range(7) if is_quad_residue(j, 7)] + [0, 1, 2, 4] + + See Also + ======== + + legendre_symbol, jacobi_symbol, sqrt_mod + """ + a, p = as_int(a), as_int(p) + if p < 1: + raise ValueError('p must be > 0') + a %= p + if a < 2 or p < 3: + return True + # Since we want to compute the Jacobi symbol, + # we separate p into the odd part and the rest. + t = bit_scan1(p) + if t: + # The existence of a solution to a power of 2 is determined + # using the logic of `p==2` in `_sqrt_mod_prime_power` and `_sqrt_mod1`. + a_ = a % (1 << t) + if a_: + r = bit_scan1(a_) + if r % 2 or (a_ >> r) & 6: + return False + p >>= t + a %= p + if a < 2 or p < 3: + return True + # If Jacobi symbol is -1 or p is prime, can be determined by Jacobi symbol only + j = jacobi(a, p) + if j == -1 or isprime(p): + return j == 1 + # Checks if `x**2 = a (mod p)` has a solution + for px, ex in factorint(p).items(): + if a % px: + if jacobi(a, px) != 1: + return False + else: + a_ = a % px**ex + if a_ == 0: + continue + a_, r = remove(a_, px) + if r % 2 or jacobi(a_, px) != 1: + return False + return True + + +def is_nthpow_residue(a, n, m): + """ + Returns True if ``x**n == a (mod m)`` has solutions. + + References + ========== + + .. [1] P. Hackman "Elementary Number Theory" (2009), page 76 + + """ + a = a % m + a, n, m = as_int(a), as_int(n), as_int(m) + if m <= 0: + raise ValueError('m must be > 0') + if n < 0: + raise ValueError('n must be >= 0') + if n == 0: + if m == 1: + return False + return a == 1 + if a == 0: + return True + if n == 1: + return True + if n == 2: + return is_quad_residue(a, m) + return all(_is_nthpow_residue_bign_prime_power(a, n, p, e) + for p, e in factorint(m).items()) + + +def _is_nthpow_residue_bign_prime_power(a, n, p, k): + r""" + Returns True if `x^n = a \pmod{p^k}` has solutions for `n > 2`. + + Parameters + ========== + + a : positive integer + n : integer, n > 2 + p : prime number + k : positive integer + + """ + while a % p == 0: + a %= pow(p, k) + if not a: + return True + a, mu = remove(a, p) + if mu % n: + return False + k -= mu + if p != 2: + f = p**(k - 1)*(p - 1) # f = totient(p**k) + return pow(a, f // gcd(f, n), pow(p, k)) == 1 + if n & 1: + return True + c = min(bit_scan1(n) + 2, k) + return a % pow(2, c) == 1 + + +def _nthroot_mod1(s, q, p, all_roots): + """ + Root of ``x**q = s mod p``, ``p`` prime and ``q`` divides ``p - 1``. + Assume that the root exists. + + Parameters + ========== + + s : integer + q : integer, n > 2. ``q`` divides ``p - 1``. + p : prime number + all_roots : if False returns the smallest root, else the list of roots + + Returns + ======= + + list[int] | int : + Root of ``x**q = s mod p``. If ``all_roots == True``, + returned ascending list. otherwise, returned an int. + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import _nthroot_mod1 + >>> _nthroot_mod1(5, 3, 13, False) + 7 + >>> _nthroot_mod1(13, 4, 17, True) + [3, 5, 12, 14] + + References + ========== + + .. [1] A. M. Johnston, A Generalized qth Root Algorithm, + ACM-SIAM Symposium on Discrete Algorithms (1999), pp. 929-930 + + """ + g = next(_primitive_root_prime_iter(p)) + r = s + for qx, ex in factorint(q).items(): + f = (p - 1) // qx**ex + while f % qx == 0: + f //= qx + z = f*invert(-f, qx) + x = (1 + z) // qx + t = discrete_log(p, pow(r, f, p), pow(g, f*qx, p)) + for _ in range(ex): + # assert t == discrete_log(p, pow(r, f, p), pow(g, f*qx, p)) + r = pow(r, x, p)*pow(g, -z*t % (p - 1), p) % p + t //= qx + res = [r] + h = pow(g, (p - 1) // q, p) + #assert pow(h, q, p) == 1 + hx = r + for _ in range(q - 1): + hx = (hx*h) % p + res.append(hx) + if all_roots: + res.sort() + return res + return min(res) + + +def _nthroot_mod_prime_power(a, n, p, k): + """ Root of ``x**n = a mod p**k``. + + Parameters + ========== + + a : integer + n : integer, n > 2 + p : prime number + k : positive integer + + Returns + ======= + + list[int] : + Ascending list of roots of ``x**n = a mod p**k``. + If no solution exists, return ``[]``. + + """ + if not _is_nthpow_residue_bign_prime_power(a, n, p, k): + return [] + a_mod_p = a % p + if a_mod_p == 0: + base_roots = [0] + elif (p - 1) % n == 0: + base_roots = _nthroot_mod1(a_mod_p, n, p, all_roots=True) + else: + # The roots of ``x**n - a = 0 (mod p)`` are roots of + # ``gcd(x**n - a, x**(p - 1) - 1) = 0 (mod p)`` + pa = n + pb = p - 1 + b = 1 + if pa < pb: + a_mod_p, pa, b, pb = b, pb, a_mod_p, pa + # gcd(x**pa - a, x**pb - b) = gcd(x**pb - b, x**pc - c) + # where pc = pa % pb; c = b**-q * a mod p + while pb: + q, pc = divmod(pa, pb) + c = pow(b, -q, p) * a_mod_p % p + pa, pb = pb, pc + a_mod_p, b = b, c + if pa == 1: + base_roots = [a_mod_p] + elif pa == 2: + base_roots = sqrt_mod(a_mod_p, p, all_roots=True) + else: + base_roots = _nthroot_mod1(a_mod_p, pa, p, all_roots=True) + if k == 1: + return base_roots + a %= p**k + tot_roots = set() + for root in base_roots: + diff = pow(root, n - 1, p)*n % p + new_base = p + if diff != 0: + m_inv = invert(diff, p) + for _ in range(k - 1): + new_base *= p + tmp = pow(root, n, new_base) - a + tmp *= m_inv + root = (root - tmp) % new_base + tot_roots.add(root) + else: + roots_in_base = {root} + for _ in range(k - 1): + new_base *= p + new_roots = set() + for k_ in roots_in_base: + if pow(k_, n, new_base) != a % new_base: + continue + while k_ not in new_roots: + new_roots.add(k_) + k_ = (k_ + (new_base // p)) % new_base + roots_in_base = new_roots + tot_roots = tot_roots | roots_in_base + return sorted(tot_roots) + + +def nthroot_mod(a, n, p, all_roots=False): + """ + Find the solutions to ``x**n = a mod p``. + + Parameters + ========== + + a : integer + n : positive integer + p : positive integer + all_roots : if False returns the smallest root, else the list of roots + + Returns + ======= + + list[int] | int | None : + solutions to ``x**n = a mod p``. + The table of the output type is: + + ========== ========== ========== + all_roots has roots Returns + ========== ========== ========== + True Yes list[int] + True No [] + False Yes int + False No None + ========== ========== ========== + + Raises + ====== + + ValueError + If ``a``, ``n`` or ``p`` is not integer. + If ``n`` or ``p`` is not positive. + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import nthroot_mod + >>> nthroot_mod(11, 4, 19) + 8 + >>> nthroot_mod(11, 4, 19, True) + [8, 11] + >>> nthroot_mod(68, 3, 109) + 23 + + References + ========== + + .. [1] P. Hackman "Elementary Number Theory" (2009), page 76 + + """ + a = a % p + a, n, p = as_int(a), as_int(n), as_int(p) + + if n < 1: + raise ValueError("n should be positive") + if p < 1: + raise ValueError("p should be positive") + if n == 1: + return [a] if all_roots else a + if n == 2: + return sqrt_mod(a, p, all_roots) + base = [] + prime_power = [] + for q, e in factorint(p).items(): + tot_roots = _nthroot_mod_prime_power(a, n, q, e) + if not tot_roots: + return [] if all_roots else None + prime_power.append(q**e) + base.append(sorted(tot_roots)) + P, E, S = gf_crt1(prime_power, ZZ) + ret = sorted(map(int, {gf_crt2(c, prime_power, P, E, S, ZZ) + for c in product(*base)})) + if all_roots: + return ret + if ret: + return ret[0] + + +def quadratic_residues(p) -> list[int]: + """ + Returns the list of quadratic residues. + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import quadratic_residues + >>> quadratic_residues(7) + [0, 1, 2, 4] + """ + p = as_int(p) + r = {pow(i, 2, p) for i in range(p // 2 + 1)} + return sorted(r) + + +@deprecated("""\ +The `sympy.ntheory.residue_ntheory.legendre_symbol` has been moved to `sympy.functions.combinatorial.numbers.legendre_symbol`.""", +deprecated_since_version="1.13", +active_deprecations_target='deprecated-ntheory-symbolic-functions') +def legendre_symbol(a, p): + r""" + Returns the Legendre symbol `(a / p)`. + + .. deprecated:: 1.13 + + The ``legendre_symbol`` function is deprecated. Use :class:`sympy.functions.combinatorial.numbers.legendre_symbol` + instead. See its documentation for more information. See + :ref:`deprecated-ntheory-symbolic-functions` for details. + + For an integer ``a`` and an odd prime ``p``, the Legendre symbol is + defined as + + .. math :: + \genfrac(){}{}{a}{p} = \begin{cases} + 0 & \text{if } p \text{ divides } a\\ + 1 & \text{if } a \text{ is a quadratic residue modulo } p\\ + -1 & \text{if } a \text{ is a quadratic nonresidue modulo } p + \end{cases} + + Parameters + ========== + + a : integer + p : odd prime + + Examples + ======== + + >>> from sympy.functions.combinatorial.numbers import legendre_symbol + >>> [legendre_symbol(i, 7) for i in range(7)] + [0, 1, 1, -1, 1, -1, -1] + >>> sorted(set([i**2 % 7 for i in range(7)])) + [0, 1, 2, 4] + + See Also + ======== + + is_quad_residue, jacobi_symbol + + """ + from sympy.functions.combinatorial.numbers import legendre_symbol as _legendre_symbol + return _legendre_symbol(a, p) + + +@deprecated("""\ +The `sympy.ntheory.residue_ntheory.jacobi_symbol` has been moved to `sympy.functions.combinatorial.numbers.jacobi_symbol`.""", +deprecated_since_version="1.13", +active_deprecations_target='deprecated-ntheory-symbolic-functions') +def jacobi_symbol(m, n): + r""" + Returns the Jacobi symbol `(m / n)`. + + .. deprecated:: 1.13 + + The ``jacobi_symbol`` function is deprecated. Use :class:`sympy.functions.combinatorial.numbers.jacobi_symbol` + instead. See its documentation for more information. See + :ref:`deprecated-ntheory-symbolic-functions` for details. + + For any integer ``m`` and any positive odd integer ``n`` the Jacobi symbol + is defined as the product of the Legendre symbols corresponding to the + prime factors of ``n``: + + .. math :: + \genfrac(){}{}{m}{n} = + \genfrac(){}{}{m}{p^{1}}^{\alpha_1} + \genfrac(){}{}{m}{p^{2}}^{\alpha_2} + ... + \genfrac(){}{}{m}{p^{k}}^{\alpha_k} + \text{ where } n = + p_1^{\alpha_1} + p_2^{\alpha_2} + ... + p_k^{\alpha_k} + + Like the Legendre symbol, if the Jacobi symbol `\genfrac(){}{}{m}{n} = -1` + then ``m`` is a quadratic nonresidue modulo ``n``. + + But, unlike the Legendre symbol, if the Jacobi symbol + `\genfrac(){}{}{m}{n} = 1` then ``m`` may or may not be a quadratic residue + modulo ``n``. + + Parameters + ========== + + m : integer + n : odd positive integer + + Examples + ======== + + >>> from sympy.functions.combinatorial.numbers import jacobi_symbol, legendre_symbol + >>> from sympy import S + >>> jacobi_symbol(45, 77) + -1 + >>> jacobi_symbol(60, 121) + 1 + + The relationship between the ``jacobi_symbol`` and ``legendre_symbol`` can + be demonstrated as follows: + + >>> L = legendre_symbol + >>> S(45).factors() + {3: 2, 5: 1} + >>> jacobi_symbol(7, 45) == L(7, 3)**2 * L(7, 5)**1 + True + + See Also + ======== + + is_quad_residue, legendre_symbol + """ + from sympy.functions.combinatorial.numbers import jacobi_symbol as _jacobi_symbol + return _jacobi_symbol(m, n) + + +@deprecated("""\ +The `sympy.ntheory.residue_ntheory.mobius` has been moved to `sympy.functions.combinatorial.numbers.mobius`.""", +deprecated_since_version="1.13", +active_deprecations_target='deprecated-ntheory-symbolic-functions') +def mobius(n): + """ + Mobius function maps natural number to {-1, 0, 1} + + .. deprecated:: 1.13 + + The ``mobius`` function is deprecated. Use :class:`sympy.functions.combinatorial.numbers.mobius` + instead. See its documentation for more information. See + :ref:`deprecated-ntheory-symbolic-functions` for details. + + It is defined as follows: + 1) `1` if `n = 1`. + 2) `0` if `n` has a squared prime factor. + 3) `(-1)^k` if `n` is a square-free positive integer with `k` + number of prime factors. + + It is an important multiplicative function in number theory + and combinatorics. It has applications in mathematical series, + algebraic number theory and also physics (Fermion operator has very + concrete realization with Mobius Function model). + + Parameters + ========== + + n : positive integer + + Examples + ======== + + >>> from sympy.functions.combinatorial.numbers import mobius + >>> mobius(13*7) + 1 + >>> mobius(1) + 1 + >>> mobius(13*7*5) + -1 + >>> mobius(13**2) + 0 + + References + ========== + + .. [1] https://en.wikipedia.org/wiki/M%C3%B6bius_function + .. [2] Thomas Koshy "Elementary Number Theory with Applications" + + """ + from sympy.functions.combinatorial.numbers import mobius as _mobius + return _mobius(n) + + +def _discrete_log_trial_mul(n, a, b, order=None): + """ + Trial multiplication algorithm for computing the discrete logarithm of + ``a`` to the base ``b`` modulo ``n``. + + The algorithm finds the discrete logarithm using exhaustive search. This + naive method is used as fallback algorithm of ``discrete_log`` when the + group order is very small. The value ``n`` must be greater than 1. + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import _discrete_log_trial_mul + >>> _discrete_log_trial_mul(41, 15, 7) + 3 + + See Also + ======== + + discrete_log + + References + ========== + + .. [1] "Handbook of applied cryptography", Menezes, A. J., Van, O. P. C., & + Vanstone, S. A. (1997). + """ + a %= n + b %= n + if order is None: + order = n + x = 1 + for i in range(order): + if x == a: + return i + x = x * b % n + raise ValueError("Log does not exist") + + +def _discrete_log_shanks_steps(n, a, b, order=None): + """ + Baby-step giant-step algorithm for computing the discrete logarithm of + ``a`` to the base ``b`` modulo ``n``. + + The algorithm is a time-memory trade-off of the method of exhaustive + search. It uses `O(sqrt(m))` memory, where `m` is the group order. + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import _discrete_log_shanks_steps + >>> _discrete_log_shanks_steps(41, 15, 7) + 3 + + See Also + ======== + + discrete_log + + References + ========== + + .. [1] "Handbook of applied cryptography", Menezes, A. J., Van, O. P. C., & + Vanstone, S. A. (1997). + """ + a %= n + b %= n + if order is None: + order = n_order(b, n) + m = sqrt(order) + 1 + T = {} + x = 1 + for i in range(m): + T[x] = i + x = x * b % n + z = pow(b, -m, n) + x = a + for i in range(m): + if x in T: + return i * m + T[x] + x = x * z % n + raise ValueError("Log does not exist") + + +def _discrete_log_pollard_rho(n, a, b, order=None, retries=10, rseed=None): + """ + Pollard's Rho algorithm for computing the discrete logarithm of ``a`` to + the base ``b`` modulo ``n``. + + It is a randomized algorithm with the same expected running time as + ``_discrete_log_shanks_steps``, but requires a negligible amount of memory. + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import _discrete_log_pollard_rho + >>> _discrete_log_pollard_rho(227, 3**7, 3) + 7 + + See Also + ======== + + discrete_log + + References + ========== + + .. [1] "Handbook of applied cryptography", Menezes, A. J., Van, O. P. C., & + Vanstone, S. A. (1997). + """ + a %= n + b %= n + + if order is None: + order = n_order(b, n) + randint = _randint(rseed) + + for i in range(retries): + aa = randint(1, order - 1) + ba = randint(1, order - 1) + xa = pow(b, aa, n) * pow(a, ba, n) % n + + c = xa % 3 + if c == 0: + xb = a * xa % n + ab = aa + bb = (ba + 1) % order + elif c == 1: + xb = xa * xa % n + ab = (aa + aa) % order + bb = (ba + ba) % order + else: + xb = b * xa % n + ab = (aa + 1) % order + bb = ba + + for j in range(order): + c = xa % 3 + if c == 0: + xa = a * xa % n + ba = (ba + 1) % order + elif c == 1: + xa = xa * xa % n + aa = (aa + aa) % order + ba = (ba + ba) % order + else: + xa = b * xa % n + aa = (aa + 1) % order + + c = xb % 3 + if c == 0: + xb = a * xb % n + bb = (bb + 1) % order + elif c == 1: + xb = xb * xb % n + ab = (ab + ab) % order + bb = (bb + bb) % order + else: + xb = b * xb % n + ab = (ab + 1) % order + + c = xb % 3 + if c == 0: + xb = a * xb % n + bb = (bb + 1) % order + elif c == 1: + xb = xb * xb % n + ab = (ab + ab) % order + bb = (bb + bb) % order + else: + xb = b * xb % n + ab = (ab + 1) % order + + if xa == xb: + r = (ba - bb) % order + try: + e = invert(r, order) * (ab - aa) % order + if (pow(b, e, n) - a) % n == 0: + return e + except ZeroDivisionError: + pass + break + raise ValueError("Pollard's Rho failed to find logarithm") + + +def _discrete_log_is_smooth(n: int, factorbase: list): + """Try to factor n with respect to a given factorbase. + Upon success a list of exponents with respect to the factorbase is returned. + Otherwise None.""" + factors = [0]*len(factorbase) + for i, p in enumerate(factorbase): + while n % p == 0: # divide by p as many times as possible + factors[i] += 1 + n = n // p + if n != 1: + return None # the number factors if at the end nothing is left + return factors + + +def _discrete_log_index_calculus(n, a, b, order, rseed=None): + """ + Index Calculus algorithm for computing the discrete logarithm of ``a`` to + the base ``b`` modulo ``n``. + + The group order must be given and prime. It is not suitable for small orders + and the algorithm might fail to find a solution in such situations. + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import _discrete_log_index_calculus + >>> _discrete_log_index_calculus(24570203447, 23859756228, 2, 12285101723) + 4519867240 + + See Also + ======== + + discrete_log + + References + ========== + + .. [1] "Handbook of applied cryptography", Menezes, A. J., Van, O. P. C., & + Vanstone, S. A. (1997). + """ + randint = _randint(rseed) + from math import sqrt, exp, log + a %= n + b %= n + # assert isprime(order), "The order of the base must be prime." + # First choose a heuristic the bound B for the factorbase. + # We have added an extra term to the asymptotic value which + # is closer to the theoretical optimum for n up to 2^70. + B = int(exp(0.5 * sqrt( log(n) * log(log(n)) )*( 1 + 1/log(log(n)) ))) + max = 5 * B * B # expected number of tries to find a relation + factorbase = list(primerange(B)) # compute the factorbase + lf = len(factorbase) # length of the factorbase + ordermo = order-1 + abx = a + for x in range(order): + if abx == 1: + return (order - x) % order + relationa = _discrete_log_is_smooth(abx, factorbase) + if relationa: + relationa = [r % order for r in relationa] + [x] + break + abx = abx * b % n # abx = a*pow(b, x, n) % n + + else: + raise ValueError("Index Calculus failed") + + relations = [None] * lf + k = 1 # number of relations found + kk = 0 + while k < 3 * lf and kk < max: # find relations for all primes in our factor base + x = randint(1,ordermo) + relation = _discrete_log_is_smooth(pow(b,x,n), factorbase) + if relation is None: + kk += 1 + continue + k += 1 + kk = 0 + relation += [ x ] + index = lf # determine the index of the first nonzero entry + for i in range(lf): + ri = relation[i] % order + if ri> 0 and relations[i] is not None: # make this entry zero if we can + for j in range(lf+1): + relation[j] = (relation[j] - ri*relations[i][j]) % order + else: + relation[i] = ri + if relation[i] > 0 and index == lf: # is this the index of the first nonzero entry? + index = i + if index == lf or relations[index] is not None: # the relation contains no new information + continue + # the relation contains new information + rinv = pow(relation[index],-1,order) # normalize the first nonzero entry + for j in range(index,lf+1): + relation[j] = rinv * relation[j] % order + relations[index] = relation + for i in range(lf): # subtract the new relation from the one for a + if relationa[i] > 0 and relations[i] is not None: + rbi = relationa[i] + for j in range(lf+1): + relationa[j] = (relationa[j] - rbi*relations[i][j]) % order + if relationa[i] > 0: # the index of the first nonzero entry + break # we do not need to reduce further at this point + else: # all unknowns are gone + #print(f"Success after {k} relations out of {lf}") + x = (order -relationa[lf]) % order + if pow(b,x,n) == a: + return x + raise ValueError("Index Calculus failed") + raise ValueError("Index Calculus failed") + + +def _discrete_log_pohlig_hellman(n, a, b, order=None, order_factors=None): + """ + Pohlig-Hellman algorithm for computing the discrete logarithm of ``a`` to + the base ``b`` modulo ``n``. + + In order to compute the discrete logarithm, the algorithm takes advantage + of the factorization of the group order. It is more efficient when the + group order factors into many small primes. + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import _discrete_log_pohlig_hellman + >>> _discrete_log_pohlig_hellman(251, 210, 71) + 197 + + See Also + ======== + + discrete_log + + References + ========== + + .. [1] "Handbook of applied cryptography", Menezes, A. J., Van, O. P. C., & + Vanstone, S. A. (1997). + """ + from .modular import crt + a %= n + b %= n + + if order is None: + order = n_order(b, n) + if order_factors is None: + order_factors = factorint(order) + l = [0] * len(order_factors) + + for i, (pi, ri) in enumerate(order_factors.items()): + for j in range(ri): + aj = pow(a * pow(b, -l[i], n), order // pi**(j + 1), n) + bj = pow(b, order // pi, n) + cj = discrete_log(n, aj, bj, pi, True) + l[i] += cj * pi**j + + d, _ = crt([pi**ri for pi, ri in order_factors.items()], l) + return d + + +def discrete_log(n, a, b, order=None, prime_order=None): + """ + Compute the discrete logarithm of ``a`` to the base ``b`` modulo ``n``. + + This is a recursive function to reduce the discrete logarithm problem in + cyclic groups of composite order to the problem in cyclic groups of prime + order. + + It employs different algorithms depending on the problem (subgroup order + size, prime order or not): + + * Trial multiplication + * Baby-step giant-step + * Pollard's Rho + * Index Calculus + * Pohlig-Hellman + + Examples + ======== + + >>> from sympy.ntheory import discrete_log + >>> discrete_log(41, 15, 7) + 3 + + References + ========== + + .. [1] https://mathworld.wolfram.com/DiscreteLogarithm.html + .. [2] "Handbook of applied cryptography", Menezes, A. J., Van, O. P. C., & + Vanstone, S. A. (1997). + + """ + from math import sqrt, log + n, a, b = as_int(n), as_int(a), as_int(b) + + if n < 1: + raise ValueError("n should be positive") + if n == 1: + return 0 + + if order is None: + # Compute the order and its factoring in one pass + # order = totient(n), factors = factorint(order) + factors = {} + for px, kx in factorint(n).items(): + if kx > 1: + if px in factors: + factors[px] += kx - 1 + else: + factors[px] = kx - 1 + for py, ky in factorint(px - 1).items(): + if py in factors: + factors[py] += ky + else: + factors[py] = ky + order = 1 + for px, kx in factors.items(): + order *= px**kx + # Now the `order` is the order of the group and factors = factorint(order) + # The order of `b` divides the order of the group. + order_factors = {} + for p, e in factors.items(): + i = 0 + for _ in range(e): + if pow(b, order // p, n) == 1: + order //= p + i += 1 + else: + break + if i < e: + order_factors[p] = e - i + + if prime_order is None: + prime_order = isprime(order) + + if order < 1000: + return _discrete_log_trial_mul(n, a, b, order) + elif prime_order: + # Shanks and Pollard rho are O(sqrt(order)) while index calculus is O(exp(2*sqrt(log(n)log(log(n))))) + # we compare the expected running times to determine the algorithm which is expected to be faster + if 4*sqrt(log(n)*log(log(n))) < log(order) - 10: # the number 10 was determined experimental + return _discrete_log_index_calculus(n, a, b, order) + elif order < 1000000000000: + # Shanks seems typically faster, but uses O(sqrt(order)) memory + return _discrete_log_shanks_steps(n, a, b, order) + return _discrete_log_pollard_rho(n, a, b, order) + + return _discrete_log_pohlig_hellman(n, a, b, order, order_factors) + + + +def quadratic_congruence(a, b, c, n): + r""" + Find the solutions to `a x^2 + b x + c \equiv 0 \pmod{n}`. + + Parameters + ========== + + a : int + b : int + c : int + n : int + A positive integer. + + Returns + ======= + + list[int] : + A sorted list of solutions. If no solution exists, ``[]``. + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import quadratic_congruence + >>> quadratic_congruence(2, 5, 3, 7) # 2x^2 + 5x + 3 = 0 (mod 7) + [2, 6] + >>> quadratic_congruence(8, 6, 4, 15) # No solution + [] + + See Also + ======== + + polynomial_congruence : Solve the polynomial congruence + + """ + a = as_int(a) + b = as_int(b) + c = as_int(c) + n = as_int(n) + if n <= 1: + raise ValueError("n should be an integer greater than 1") + a %= n + b %= n + c %= n + + if a == 0: + return linear_congruence(b, -c, n) + if n == 2: + # assert a == 1 + roots = [] + if c == 0: + roots.append(0) + if (b + c) % 2: + roots.append(1) + return roots + if gcd(2*a, n) == 1: + inv_a = invert(a, n) + b *= inv_a + c *= inv_a + if b % 2: + b += n + b >>= 1 + return sorted((i - b) % n for i in sqrt_mod_iter(b**2 - c, n)) + res = set() + for i in sqrt_mod_iter(b**2 - 4*a*c, 4*a*n): + q, rem = divmod(i - b, 2*a) + if rem == 0: + res.add(q % n) + + return sorted(res) + + +def _valid_expr(expr): + """ + return coefficients of expr if it is a univariate polynomial + with integer coefficients else raise a ValueError. + """ + + if not expr.is_polynomial(): + raise ValueError("The expression should be a polynomial") + polynomial = Poly(expr) + if not polynomial.is_univariate: + raise ValueError("The expression should be univariate") + if not polynomial.domain == ZZ: + raise ValueError("The expression should should have integer coefficients") + return polynomial.all_coeffs() + + +def polynomial_congruence(expr, m): + """ + Find the solutions to a polynomial congruence equation modulo m. + + Parameters + ========== + + expr : integer coefficient polynomial + m : positive integer + + Examples + ======== + + >>> from sympy.ntheory import polynomial_congruence + >>> from sympy.abc import x + >>> expr = x**6 - 2*x**5 -35 + >>> polynomial_congruence(expr, 6125) + [3257] + + See Also + ======== + + sympy.polys.galoistools.gf_csolve : low level solving routine used by this routine + + """ + coefficients = _valid_expr(expr) + coefficients = [num % m for num in coefficients] + rank = len(coefficients) + if rank == 3: + return quadratic_congruence(*coefficients, m) + if rank == 2: + return quadratic_congruence(0, *coefficients, m) + if coefficients[0] == 1 and 1 + coefficients[-1] == sum(coefficients): + return nthroot_mod(-coefficients[-1], rank - 1, m, True) + return gf_csolve(coefficients, m) + + +def binomial_mod(n, m, k): + """Compute ``binomial(n, m) % k``. + + Explanation + =========== + + Returns ``binomial(n, m) % k`` using a generalization of Lucas' + Theorem for prime powers given by Granville [1]_, in conjunction with + the Chinese Remainder Theorem. The residue for each prime power + is calculated in time O(log^2(n) + q^4*log(n)log(p) + q^4*p*log^3(p)). + + Parameters + ========== + + n : an integer + m : an integer + k : a positive integer + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import binomial_mod + >>> binomial_mod(10, 2, 6) # binomial(10, 2) = 45 + 3 + >>> binomial_mod(17, 9, 10) # binomial(17, 9) = 24310 + 0 + + References + ========== + + .. [1] Binomial coefficients modulo prime powers, Andrew Granville, + Available: https://web.archive.org/web/20170202003812/http://www.dms.umontreal.ca/~andrew/PDF/BinCoeff.pdf + """ + if k < 1: raise ValueError('k is required to be positive') + # We decompose q into a product of prime powers and apply + # the generalization of Lucas' Theorem given by Granville + # to obtain binomial(n, k) mod p^e, and then use the Chinese + # Remainder Theorem to obtain the result mod q + if n < 0 or m < 0 or m > n: return 0 + factorisation = factorint(k) + residues = [_binomial_mod_prime_power(n, m, p, e) for p, e in factorisation.items()] + return crt([p**pw for p, pw in factorisation.items()], residues, check=False)[0] + + +def _binomial_mod_prime_power(n, m, p, q): + """Compute ``binomial(n, m) % p**q`` for a prime ``p``. + + Parameters + ========== + + n : positive integer + m : a nonnegative integer + p : a prime + q : a positive integer (the prime exponent) + + Examples + ======== + + >>> from sympy.ntheory.residue_ntheory import _binomial_mod_prime_power + >>> _binomial_mod_prime_power(10, 2, 3, 2) # binomial(10, 2) = 45 + 0 + >>> _binomial_mod_prime_power(17, 9, 2, 4) # binomial(17, 9) = 24310 + 6 + + References + ========== + + .. [1] Binomial coefficients modulo prime powers, Andrew Granville, + Available: https://web.archive.org/web/20170202003812/http://www.dms.umontreal.ca/~andrew/PDF/BinCoeff.pdf + """ + # Function/variable naming within this function follows Ref.[1] + # n!_p will be used to denote the product of integers <= n not divisible by + # p, with binomial(n, m)_p the same as binomial(n, m), but defined using + # n!_p in place of n! + modulo = pow(p, q) + + def up_factorial(u): + """Compute (u*p)!_p modulo p^q.""" + r = q // 2 + fac = prod = 1 + if r == 1 and p == 2 or 2*r + 1 in (p, p*p): + if q % 2 == 1: r += 1 + modulo, div = pow(p, 2*r), pow(p, 2*r - q) + else: + modulo, div = pow(p, 2*r + 1), pow(p, (2*r + 1) - q) + for j in range(1, r + 1): + for mul in range((j - 1)*p + 1, j*p): # ignore jp itself + fac *= mul + fac %= modulo + bj_ = bj(u, j, r) + prod *= pow(fac, bj_, modulo) + prod %= modulo + if p == 2: + sm = u // 2 + for j in range(1, r + 1): sm += j//2 * bj(u, j, r) + if sm % 2 == 1: prod *= -1 + prod %= modulo//div + return prod % modulo + + def bj(u, j, r): + """Compute the exponent of (j*p)!_p in the calculation of (u*p)!_p.""" + prod = u + for i in range(1, r + 1): + if i != j: prod *= u*u - i*i + for i in range(1, r + 1): + if i != j: prod //= j*j - i*i + return prod // j + + def up_plus_v_binom(u, v): + """Compute binomial(u*p + v, v)_p modulo p^q.""" + prod = 1 + div = invert(factorial(v), modulo) + for j in range(1, q): + b = div + for v_ in range(j*p + 1, j*p + v + 1): + b *= v_ + b %= modulo + aj = u + for i in range(1, q): + if i != j: aj *= u - i + for i in range(1, q): + if i != j: aj //= j - i + aj //= j + prod *= pow(b, aj, modulo) + prod %= modulo + return prod + + @recurrence_memo([1]) + def factorial(v, prev): + """Compute v! modulo p^q.""" + return v*prev[-1] % modulo + + def factorial_p(n): + """Compute n!_p modulo p^q.""" + u, v = divmod(n, p) + return (factorial(v) * up_factorial(u) * up_plus_v_binom(u, v)) % modulo + + prod = 1 + Nj, Mj, Rj = n, m, n - m + # e0 will be the p-adic valuation of binomial(n, m) at p + e0 = carry = eq_1 = j = 0 + while Nj: + numerator = factorial_p(Nj % modulo) + denominator = factorial_p(Mj % modulo) * factorial_p(Rj % modulo) % modulo + Nj, (Mj, mj), (Rj, rj) = Nj//p, divmod(Mj, p), divmod(Rj, p) + carry = (mj + rj + carry) // p + e0 += carry + if j >= q - 1: eq_1 += carry + prod *= numerator * invert(denominator, modulo) + prod %= modulo + j += 1 + + mul = pow(1 if p == 2 and q >= 3 else -1, eq_1, modulo) + return (pow(p, e0, modulo) * mul * prod) % modulo diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_bbp_pi.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_bbp_pi.py new file mode 100644 index 0000000000000000000000000000000000000000..69c24970239cc45eef4140bf19dfd7d4f6a7e150 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_bbp_pi.py @@ -0,0 +1,134 @@ +from sympy.core.random import randint + +from sympy.ntheory.bbp_pi import pi_hex_digits +from sympy.testing.pytest import raises + + +# http://www.herongyang.com/Cryptography/Blowfish-First-8366-Hex-Digits-of-PI.html +# There are actually 8336 listed there; with the prepended 3 there are 8337 +# below +dig=''.join(''' +3243f6a8885a308d313198a2e03707344a4093822299f31d0082efa98ec4e6c89452821e638d013 +77be5466cf34e90c6cc0ac29b7c97c50dd3f84d5b5b54709179216d5d98979fb1bd1310ba698dfb5 +ac2ffd72dbd01adfb7b8e1afed6a267e96ba7c9045f12c7f9924a19947b3916cf70801f2e2858efc +16636920d871574e69a458fea3f4933d7e0d95748f728eb658718bcd5882154aee7b54a41dc25a59 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+f8abcc5167ccad925f4de817513830dc8e379d58629320f991ea7a90c2fb3e7bce5121ce64774fbe +32a8b6e37ec3293d4648de53696413e680a2ae0810dd6db22469852dfd09072166b39a460a6445c0 +dd586cdecf1c20c8ae5bbef7dd1b588d40ccd2017f6bb4e3bbdda26a7e3a59ff453e350a44bcb4cd +d572eacea8fa6484bb8d6612aebf3c6f47d29be463542f5d9eaec2771bf64e6370740e0d8de75b13 +57f8721671af537d5d4040cb084eb4e2cc34d2466a0115af84e1b0042895983a1d06b89fb4ce6ea0 +486f3f3b823520ab82011a1d4b277227f8611560b1e7933fdcbb3a792b344525bda08839e151ce79 +4b2f32c9b7a01fbac9e01cc87ebcc7d1f6cf0111c3a1e8aac71a908749d44fbd9ad0dadecbd50ada +380339c32ac69136678df9317ce0b12b4ff79e59b743f5bb3af2d519ff27d9459cbf97222c15e6fc +2a0f91fc719b941525fae59361ceb69cebc2a8645912baa8d1b6c1075ee3056a0c10d25065cb03a4 +42e0ec6e0e1698db3b4c98a0be3278e9649f1f9532e0d392dfd3a0342b8971f21e1b0a74414ba334 +8cc5be7120c37632d8df359f8d9b992f2ee60b6f470fe3f11de54cda541edad891ce6279cfcd3e7e +6f1618b166fd2c1d05848fd2c5f6fb2299f523f357a632762393a8353156cccd02acf081625a75eb +b56e16369788d273ccde96629281b949d04c50901b71c65614e6c6c7bd327a140a45e1d006c3f27b +9ac9aa53fd62a80f00bb25bfe235bdd2f671126905b2040222b6cbcf7ccd769c2b53113ec01640e3 +d338abbd602547adf0ba38209cf746ce7677afa1c52075606085cbfe4e8ae88dd87aaaf9b04cf9aa +7e1948c25c02fb8a8c01c36ae4d6ebe1f990d4f869a65cdea03f09252dc208e69fb74e6132ce77e2 +5b578fdfe33ac372e6'''.split()) + + +def test_hex_pi_nth_digits(): + assert pi_hex_digits(0) == '3243f6a8885a30' + assert pi_hex_digits(1) == '243f6a8885a308' + assert pi_hex_digits(10000) == '68ac8fcfb8016c' + assert pi_hex_digits(13) == '08d313198a2e03' + assert pi_hex_digits(0, 3) == '324' + assert pi_hex_digits(0, 0) == '' + raises(ValueError, lambda: pi_hex_digits(-1)) + raises(ValueError, lambda: pi_hex_digits(0, -1)) + raises(ValueError, lambda: pi_hex_digits(3.14)) + + # this will pick a random segment to compute every time + # it is run. If it ever fails, there is an error in the + # computation. + n = randint(0, len(dig)) + prec = randint(0, len(dig) - n) + assert pi_hex_digits(n, prec) == dig[n: n + prec] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_continued_fraction.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_continued_fraction.py new file mode 100644 index 0000000000000000000000000000000000000000..8ca6088507f1d112e9146cd5249b1143f375c2cf --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_continued_fraction.py @@ -0,0 +1,77 @@ +import itertools +from sympy.core import GoldenRatio as phi +from sympy.core.numbers import (Rational, pi) +from sympy.core.singleton import S +from sympy.functions.elementary.miscellaneous import sqrt +from sympy.ntheory.continued_fraction import \ + (continued_fraction_periodic as cf_p, + continued_fraction_iterator as cf_i, + continued_fraction_convergents as cf_c, + continued_fraction_reduce as cf_r, + continued_fraction as cf) +from sympy.testing.pytest import raises + + +def test_continued_fraction(): + assert cf_p(1, 1, 10, 0) == cf_p(1, 1, 0, 1) + assert cf_p(1, -1, 10, 1) == cf_p(-1, 1, 10, -1) + t = sqrt(2) + assert cf((1 + t)*(1 - t)) == cf(-1) + for n in [0, 2, Rational(2, 3), sqrt(2), 3*sqrt(2), 1 + 2*sqrt(3)/5, + (2 - 3*sqrt(5))/7, 1 + sqrt(2), (-5 + sqrt(17))/4]: + assert (cf_r(cf(n)) - n).expand() == 0 + assert (cf_r(cf(-n)) + n).expand() == 0 + raises(ValueError, lambda: cf(sqrt(2 + sqrt(3)))) + raises(ValueError, lambda: cf(sqrt(2) + sqrt(3))) + raises(ValueError, lambda: cf(pi)) + raises(ValueError, lambda: cf(.1)) + + raises(ValueError, lambda: cf_p(1, 0, 0)) + raises(ValueError, lambda: cf_p(1, 1, -1)) + assert cf_p(4, 3, 0) == [1, 3] + assert cf_p(0, 3, 5) == [0, 1, [2, 1, 12, 1, 2, 2]] + assert cf_p(1, 1, 0) == [1] + assert cf_p(3, 4, 0) == [0, 1, 3] + assert cf_p(4, 5, 0) == [0, 1, 4] + assert cf_p(5, 6, 0) == [0, 1, 5] + assert cf_p(11, 13, 0) == [0, 1, 5, 2] + assert cf_p(16, 19, 0) == [0, 1, 5, 3] + assert cf_p(27, 32, 0) == [0, 1, 5, 2, 2] + assert cf_p(1, 2, 5) == [[1]] + assert cf_p(0, 1, 2) == [1, [2]] + assert cf_p(6, 7, 49) == [1, 1, 6] + assert cf_p(3796, 1387, 0) == [2, 1, 2, 1, 4] + assert cf_p(3245, 10000) == [0, 3, 12, 4, 13] + assert cf_p(1932, 2568) == [0, 1, 3, 26, 2] + assert cf_p(6589, 2569) == [2, 1, 1, 3, 2, 1, 3, 1, 23] + + def take(iterator, n=7): + return list(itertools.islice(iterator, n)) + + assert take(cf_i(phi)) == [1, 1, 1, 1, 1, 1, 1] + assert take(cf_i(pi)) == [3, 7, 15, 1, 292, 1, 1] + + assert list(cf_i(Rational(17, 12))) == [1, 2, 2, 2] + assert list(cf_i(Rational(-17, 12))) == [-2, 1, 1, 2, 2] + + assert list(cf_c([1, 6, 1, 8])) == [S.One, Rational(7, 6), Rational(8, 7), Rational(71, 62)] + assert list(cf_c([2])) == [S(2)] + assert list(cf_c([1, 1, 1, 1, 1, 1, 1])) == [S.One, S(2), Rational(3, 2), Rational(5, 3), + Rational(8, 5), Rational(13, 8), Rational(21, 13)] + assert list(cf_c([1, 6, Rational(-1, 2), 4])) == [S.One, Rational(7, 6), Rational(5, 4), Rational(3, 2)] + assert take(cf_c([[1]])) == [S.One, S(2), Rational(3, 2), Rational(5, 3), Rational(8, 5), + Rational(13, 8), Rational(21, 13)] + assert take(cf_c([1, [1, 2]])) == [S.One, S(2), Rational(5, 3), Rational(7, 4), Rational(19, 11), + Rational(26, 15), Rational(71, 41)] + + cf_iter_e = (2 if i == 1 else i // 3 * 2 if i % 3 == 0 else 1 for i in itertools.count(1)) + assert take(cf_c(cf_iter_e)) == [S(2), S(3), Rational(8, 3), Rational(11, 4), Rational(19, 7), + Rational(87, 32), Rational(106, 39)] + + assert cf_r([1, 6, 1, 8]) == Rational(71, 62) + assert cf_r([3]) == S(3) + assert cf_r([-1, 5, 1, 4]) == Rational(-24, 29) + assert (cf_r([0, 1, 1, 7, [24, 8]]) - (sqrt(3) + 2)/7).expand() == 0 + assert cf_r([1, 5, 9]) == Rational(55, 46) + assert (cf_r([[1]]) - (sqrt(5) + 1)/2).expand() == 0 + assert cf_r([-3, 1, 1, [2]]) == -1 - sqrt(2) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_digits.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_digits.py new file mode 100644 index 0000000000000000000000000000000000000000..4284805f4ffe5b9095eacb2e83f2cd8076db3ee4 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_digits.py @@ -0,0 +1,55 @@ +from sympy.ntheory import count_digits, digits, is_palindromic +from sympy.core.intfunc import num_digits + +from sympy.testing.pytest import raises + + +def test_num_digits(): + # depending on whether one rounds up or down or uses log or log10, + # one or more of these will fail if you don't check for the off-by + # one condition + assert num_digits(2, 2) == 2 + assert num_digits(2**48 - 1, 2) == 48 + assert num_digits(1000, 10) == 4 + assert num_digits(125, 5) == 4 + assert num_digits(100, 16) == 2 + assert num_digits(-1000, 10) == 4 + # if changes are made to the function, this structured test over + # this range will expose problems + for base in range(2, 100): + for e in range(1, 100): + n = base**e + assert num_digits(n, base) == e + 1 + assert num_digits(n + 1, base) == e + 1 + assert num_digits(n - 1, base) == e + + +def test_digits(): + assert all(digits(n, 2)[1:] == [int(d) for d in format(n, 'b')] + for n in range(20)) + assert all(digits(n, 8)[1:] == [int(d) for d in format(n, 'o')] + for n in range(20)) + assert all(digits(n, 16)[1:] == [int(d, 16) for d in format(n, 'x')] + for n in range(20)) + assert digits(2345, 34) == [34, 2, 0, 33] + assert digits(384753, 71) == [71, 1, 5, 23, 4] + assert digits(93409, 10) == [10, 9, 3, 4, 0, 9] + assert digits(-92838, 11) == [-11, 6, 3, 8, 2, 9] + assert digits(35, 10) == [10, 3, 5] + assert digits(35, 10, 3) == [10, 0, 3, 5] + assert digits(-35, 10, 4) == [-10, 0, 0, 3, 5] + raises(ValueError, lambda: digits(2, 2, 1)) + + +def test_count_digits(): + assert count_digits(55, 2) == {1: 5, 0: 1} + assert count_digits(55, 10) == {5: 2} + n = count_digits(123) + assert n[4] == 0 and type(n[4]) is int + + +def test_is_palindromic(): + assert is_palindromic(-11) + assert is_palindromic(11) + assert is_palindromic(0o121, 8) + assert not is_palindromic(123) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_ecm.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_ecm.py new file mode 100644 index 0000000000000000000000000000000000000000..7f134e4e1cf68231e9f89242d2b8476b9edeabb8 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_ecm.py @@ -0,0 +1,63 @@ +from sympy.external.gmpy import invert +from sympy.ntheory.ecm import ecm, Point +from sympy.testing.pytest import slow + +@slow +def test_ecm(): + assert ecm(3146531246531241245132451321) == {3, 100327907731, 10454157497791297} + assert ecm(46167045131415113) == {43, 2634823, 407485517} + assert ecm(631211032315670776841) == {9312934919, 67777885039} + assert ecm(398883434337287) == {99476569, 4009823} + assert ecm(64211816600515193) == {281719, 359641, 633767} + assert ecm(4269021180054189416198169786894227) == {184039, 241603, 333331, 477973, 618619, 974123} + assert ecm(4516511326451341281684513) == {3, 39869, 131743543, 95542348571} + assert ecm(4132846513818654136451) == {47, 160343, 2802377, 195692803} + assert ecm(168541512131094651323) == {79, 113, 11011069, 1714635721} + #This takes ~10secs while factorint is not able to factorize this even in ~10mins + assert ecm(7060005655815754299976961394452809, B1=100000, B2=1000000) == {6988699669998001, 1010203040506070809} + + +def test_Point(): + #The curve is of the form y**2 = x**3 + a*x**2 + x + mod = 101 + a = 10 + a_24 = (a + 2)*invert(4, mod) + p1 = Point(10, 17, a_24, mod) + p2 = p1.double() + assert p2 == Point(68, 56, a_24, mod) + p4 = p2.double() + assert p4 == Point(22, 64, a_24, mod) + p8 = p4.double() + assert p8 == Point(71, 95, a_24, mod) + p16 = p8.double() + assert p16 == Point(5, 16, a_24, mod) + p32 = p16.double() + assert p32 == Point(33, 96, a_24, mod) + + # p3 = p2 + p1 + p3 = p2.add(p1, p1) + assert p3 == Point(1, 61, a_24, mod) + # p5 = p3 + p2 or p4 + p1 + p5 = p3.add(p2, p1) + assert p5 == Point(49, 90, a_24, mod) + assert p5 == p4.add(p1, p3) + # p6 = 2*p3 + p6 = p3.double() + assert p6 == Point(87, 43, a_24, mod) + assert p6 == p4.add(p2, p2) + # p7 = p5 + p2 + p7 = p5.add(p2, p3) + assert p7 == Point(69, 23, a_24, mod) + assert p7 == p4.add(p3, p1) + assert p7 == p6.add(p1, p5) + # p9 = p5 + p4 + p9 = p5.add(p4, p1) + assert p9 == Point(56, 99, a_24, mod) + assert p9 == p6.add(p3, p3) + assert p9 == p7.add(p2, p5) + assert p9 == p8.add(p1, p7) + + assert p5 == p1.mont_ladder(5) + assert p9 == p1.mont_ladder(9) + assert p16 == p1.mont_ladder(16) + assert p9 == p3.mont_ladder(3) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_egyptian_fraction.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_egyptian_fraction.py new file mode 100644 index 0000000000000000000000000000000000000000..a9a9fac578d93a88a648bdcf8dc34550cf4a7573 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_egyptian_fraction.py @@ -0,0 +1,49 @@ +from sympy.core.numbers import Rational +from sympy.ntheory.egyptian_fraction import egyptian_fraction +from sympy.core.add import Add +from sympy.testing.pytest import raises +from sympy.core.random import random_complex_number + + +def test_egyptian_fraction(): + def test_equality(r, alg="Greedy"): + return r == Add(*[Rational(1, i) for i in egyptian_fraction(r, alg)]) + + r = random_complex_number(a=0, c=1, b=0, d=0, rational=True) + assert test_equality(r) + + assert egyptian_fraction(Rational(4, 17)) == [5, 29, 1233, 3039345] + assert egyptian_fraction(Rational(7, 13), "Greedy") == [2, 26] + assert egyptian_fraction(Rational(23, 101), "Greedy") == \ + [5, 37, 1438, 2985448, 40108045937720] + assert egyptian_fraction(Rational(18, 23), "Takenouchi") == \ + [2, 6, 12, 35, 276, 2415] + assert egyptian_fraction(Rational(5, 6), "Graham Jewett") == \ + [6, 7, 8, 9, 10, 42, 43, 44, 45, 56, 57, 58, 72, 73, 90, 1806, 1807, + 1808, 1892, 1893, 1980, 3192, 3193, 3306, 5256, 3263442, 3263443, + 3267056, 3581556, 10192056, 10650056950806] + assert egyptian_fraction(Rational(5, 6), "Golomb") == [2, 6, 12, 20, 30] + assert egyptian_fraction(Rational(5, 121), "Golomb") == [25, 1225, 3577, 7081, 11737] + raises(ValueError, lambda: egyptian_fraction(Rational(-4, 9))) + assert egyptian_fraction(Rational(8, 3), "Golomb") == [1, 2, 3, 4, 5, 6, 7, + 14, 574, 2788, 6460, + 11590, 33062, 113820] + assert egyptian_fraction(Rational(355, 113)) == [1, 2, 3, 4, 5, 6, 7, 8, 9, + 10, 11, 12, 27, 744, 893588, + 1251493536607, + 20361068938197002344405230] + + +def test_input(): + r = (2,3), Rational(2, 3), (Rational(2), Rational(3)) + for m in ["Greedy", "Graham Jewett", "Takenouchi", "Golomb"]: + for i in r: + d = egyptian_fraction(i, m) + assert all(i.is_Integer for i in d) + if m == "Graham Jewett": + assert d == [3, 4, 12] + else: + assert d == [2, 6] + # check prefix + d = egyptian_fraction(Rational(5, 3)) + assert d == [1, 2, 6] and all(i.is_Integer for i in d) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_elliptic_curve.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_elliptic_curve.py new file mode 100644 index 0000000000000000000000000000000000000000..7d49d8eac72cc622fb92dfca8c54e5cc6c8dfb8f --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_elliptic_curve.py @@ -0,0 +1,20 @@ +from sympy.ntheory.elliptic_curve import EllipticCurve + + +def test_elliptic_curve(): + # Point addition and multiplication + e3 = EllipticCurve(-1, 9) + p = e3(0, 3) + q = e3(-1, 3) + r = p + q + assert r.x == 1 and r.y == -3 + r = 2*p + q + assert r.x == 35 and r.y == 207 + r = -p + q + assert r.x == 37 and r.y == 225 + # Verify result in http://www.lmfdb.org/EllipticCurve/Q + # Discriminant + assert EllipticCurve(-1, 9).discriminant == -34928 + assert EllipticCurve(-2731, -55146, 1, 0, 1).discriminant == 25088 + # Torsion points + assert len(EllipticCurve(0, 1).torsion_points()) == 6 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_factor_.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_factor_.py new file mode 100644 index 0000000000000000000000000000000000000000..5174b842c49ef0e14c1ad38d2d9ad550c2a2a388 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_factor_.py @@ -0,0 +1,702 @@ +from sympy.core.containers import Dict +from sympy.core.mul import Mul +from sympy.core.power import Pow +from sympy.core.singleton import S +from sympy.functions.combinatorial.factorials import factorial as fac +from sympy.core.numbers import Integer, Rational +from sympy.external.gmpy import gcd + +from sympy.ntheory import (totient, + factorint, primefactors, divisors, nextprime, + pollard_rho, perfect_power, multiplicity, multiplicity_in_factorial, + divisor_count, primorial, pollard_pm1, divisor_sigma, + factorrat, reduced_totient) +from sympy.ntheory.factor_ import (smoothness, smoothness_p, proper_divisors, + antidivisors, antidivisor_count, _divisor_sigma, core, udivisors, udivisor_sigma, + udivisor_count, proper_divisor_count, primenu, primeomega, + mersenne_prime_exponent, is_perfect, is_abundant, + is_deficient, is_amicable, is_carmichael, find_carmichael_numbers_in_range, + find_first_n_carmichaels, dra, drm, _perfect_power, factor_cache) + +from sympy.testing.pytest import raises, slow + +from sympy.utilities.iterables import capture + + +def fac_multiplicity(n, p): + """Return the power of the prime number p in the + factorization of n!""" + if p > n: + return 0 + if p > n//2: + return 1 + q, m = n, 0 + while q >= p: + q //= p + m += q + return m + + +def multiproduct(seq=(), start=1): + """ + Return the product of a sequence of factors with multiplicities, + times the value of the parameter ``start``. The input may be a + sequence of (factor, exponent) pairs or a dict of such pairs. + + >>> multiproduct({3:7, 2:5}, 4) # = 3**7 * 2**5 * 4 + 279936 + + """ + if not seq: + return start + if isinstance(seq, dict): + seq = iter(seq.items()) + units = start + multi = [] + for base, exp in seq: + if not exp: + continue + elif exp == 1: + units *= base + else: + if exp % 2: + units *= base + multi.append((base, exp//2)) + return units * multiproduct(multi)**2 + + +def test_multiplicity(): + for b in range(2, 20): + for i in range(100): + assert multiplicity(b, b**i) == i + assert multiplicity(b, (b**i) * 23) == i + assert multiplicity(b, (b**i) * 1000249) == i + # Should be fast + assert multiplicity(10, 10**10023) == 10023 + # Should exit quickly + assert multiplicity(10**10, 10**10) == 1 + # Should raise errors for bad input + raises(ValueError, lambda: multiplicity(1, 1)) + raises(ValueError, lambda: multiplicity(1, 2)) + raises(ValueError, lambda: multiplicity(1.3, 2)) + raises(ValueError, lambda: multiplicity(2, 0)) + raises(ValueError, lambda: multiplicity(1.3, 0)) + + # handles Rationals + assert multiplicity(10, Rational(30, 7)) == 1 + assert multiplicity(Rational(2, 7), Rational(4, 7)) == 1 + assert multiplicity(Rational(1, 7), Rational(3, 49)) == 2 + assert multiplicity(Rational(2, 7), Rational(7, 2)) == -1 + assert multiplicity(3, Rational(1, 9)) == -2 + + +def test_multiplicity_in_factorial(): + n = fac(1000) + for i in (2, 4, 6, 12, 30, 36, 48, 60, 72, 96): + assert multiplicity(i, n) == multiplicity_in_factorial(i, 1000) + + +def test_private_perfect_power(): + assert _perfect_power(0) is False + assert _perfect_power(1) is False + assert _perfect_power(2) is False + assert _perfect_power(3) is False + for x in [2, 3, 5, 6, 7, 12, 15, 105, 100003]: + for y in range(2, 100): + assert _perfect_power(x**y) == (x, y) + if x & 1: + assert _perfect_power(x**y, next_p=3) == (x, y) + if x == 100003: + assert _perfect_power(x**y, next_p=100003) == (x, y) + assert _perfect_power(101*x**y) == False + # Catalan's conjecture + if x**y not in [8, 9]: + assert _perfect_power(x**y + 1) == False + assert _perfect_power(x**y - 1) == False + for x in range(1, 10): + for y in range(1, 10): + g = gcd(x, y) + if g == 1: + assert _perfect_power(5**x * 101**y) == False + else: + assert _perfect_power(5**x * 101**y) == (5**(x//g) * 101**(y//g), g) + + +def test_perfect_power(): + raises(ValueError, lambda: perfect_power(0.1)) + assert perfect_power(0) is False + assert perfect_power(1) is False + assert perfect_power(2) is False + assert perfect_power(3) is False + assert perfect_power(4) == (2, 2) + assert perfect_power(14) is False + assert perfect_power(25) == (5, 2) + assert perfect_power(22) is False + assert perfect_power(22, [2]) is False + assert perfect_power(137**(3*5*13)) == (137, 3*5*13) + assert perfect_power(137**(3*5*13) + 1) is False + assert perfect_power(137**(3*5*13) - 1) is False + assert perfect_power(103005006004**7) == (103005006004, 7) + assert perfect_power(103005006004**7 + 1) is False + assert perfect_power(103005006004**7 - 1) is False + assert perfect_power(103005006004**12) == (103005006004, 12) + assert perfect_power(103005006004**12 + 1) is False + assert perfect_power(103005006004**12 - 1) is False + assert perfect_power(2**10007) == (2, 10007) + assert perfect_power(2**10007 + 1) is False + assert perfect_power(2**10007 - 1) is False + assert perfect_power((9**99 + 1)**60) == (9**99 + 1, 60) + assert perfect_power((9**99 + 1)**60 + 1) is False + assert perfect_power((9**99 + 1)**60 - 1) is False + assert perfect_power((10**40000)**2, big=False) == (10**40000, 2) + assert perfect_power(10**100000) == (10, 100000) + assert perfect_power(10**100001) == (10, 100001) + assert perfect_power(13**4, [3, 5]) is False + assert perfect_power(3**4, [3, 10], factor=0) is False + assert perfect_power(3**3*5**3) == (15, 3) + assert perfect_power(2**3*5**5) is False + assert perfect_power(2*13**4) is False + assert perfect_power(2**5*3**3) is False + t = 2**24 + for d in divisors(24): + m = perfect_power(t*3**d) + assert m and m[1] == d or d == 1 + m = perfect_power(t*3**d, big=False) + assert m and m[1] == 2 or d == 1 or d == 3, (d, m) + + # negatives and non-integer rationals + assert perfect_power(-4) is False + assert perfect_power(-8) == (-2, 3) + assert perfect_power(-S(1)/8) == (-S(1)/2, 3) + assert perfect_power(S(1)/3) == False + assert perfect_power(-5**15) == (-5, 15) + assert perfect_power(-5**15, big=False) == (-3125, 3) + assert perfect_power(-5**15, [15]) == (-5, 15) + + n = -3 ** 60 + assert perfect_power(n) == (-81, 15) + assert perfect_power(n, big=False) == (-3486784401, 3) + assert perfect_power(n, [3, 5], big=True) == (-531441, 5) + assert perfect_power(n, [3, 5], big=False) == (-3486784401, 3) + assert perfect_power(n, [2]) == False + assert perfect_power(n, [2, 15]) == (-81, 15) + assert perfect_power(n, [2, 13]) == False + assert perfect_power(n, [17]) == False + assert perfect_power(n, [3]) == (-3486784401, 3) + assert perfect_power(n + 1) == False + + r = S(2) ** (2 * 5 * 7) / S(3) ** (2 * 7) + assert perfect_power(r) == (S(32) / 3, 14) + assert perfect_power(-r) == (-S(1024) / 9, 7) + assert perfect_power(r, big=False) == (S(34359738368) / 2187, 2) + assert perfect_power(r, [2, 5]) == (S(34359738368) / 2187, 2) + assert perfect_power(r, [5, 7]) == (S(1024) / 9, 7) + assert perfect_power(r, [5, 7], big=False) == (S(1024) / 9, 7) + assert perfect_power(r, [2, 5, 7], big=False) == (S(34359738368) / 2187, 2) + assert perfect_power(-r, [5, 7], big=False) == (-S(1024) / 9, 7) + + assert perfect_power(-S(1) / 8) == (-S(1) / 2, 3) + + assert perfect_power((-3)**60) == (3, 60) + assert perfect_power((-3)**61) == (-3, 61) + + assert perfect_power(S(2 ** 9) / 3 ** 12) == (S(8)/81, 3) + assert perfect_power(Rational(1, 2)**3) == (S.Half, 3) + assert perfect_power(Rational(-3, 2)**3) == (-3*S.Half, 3) + + +def test_factor_cache(): + factor_cache.cache_clear() + raises(ValueError, lambda: factor_cache.__setitem__(1, 5)) + raises(ValueError, lambda: factor_cache.__setitem__(10, 1)) + raises(ValueError, lambda: factor_cache.__setitem__(10, 10)) + raises(ValueError, lambda: factor_cache.__setitem__(10, 3)) + raises(ValueError, lambda: factor_cache.__setitem__(20, 4)) + factor_cache.maxsize = 3 + for i in range(2, 10): + factor_cache[5*i] = 5 + assert len(factor_cache) == 3 + factor_cache.maxsize = 5 + for i in range(2, 10): + factor_cache[5*i] = 5 + assert len(factor_cache) == 5 + factor_cache.maxsize = 2 + assert len(factor_cache) == 2 + factor_cache.maxsize =1000 + + factor_cache.cache_clear() + factor_cache[40] = 5 + assert factor_cache.get(40) == 5 + assert factor_cache.get(20) is None + assert factor_cache[40] == 5 + raises(KeyError, lambda: factor_cache[10]) + del factor_cache[40] + assert len(factor_cache) == 0 + raises(KeyError, lambda: factor_cache.__delitem__(40)) + factor_cache.add(100, [5, 2]) + assert len(factor_cache) == 2 + assert factor_cache[100] == 5 + + for n in [1000000007, 10000019*20000003]: + factorint(n) + assert n in factor_cache + + # Restore the initial state + factor_cache.cache_clear() + factor_cache.maxsize = 1000 + + +@slow +def test_factorint(): + assert primefactors(123456) == [2, 3, 643] + assert factorint(0) == {0: 1} + assert factorint(1) == {} + assert factorint(-1) == {-1: 1} + assert factorint(-2) == {-1: 1, 2: 1} + assert factorint(-16) == {-1: 1, 2: 4} + assert factorint(2) == {2: 1} + assert factorint(126) == {2: 1, 3: 2, 7: 1} + assert factorint(123456) == {2: 6, 3: 1, 643: 1} + assert factorint(5951757) == {3: 1, 7: 1, 29: 2, 337: 1} + assert factorint(64015937) == {7993: 1, 8009: 1} + assert factorint(2**(2**6) + 1) == {274177: 1, 67280421310721: 1} + #issue 19683 + assert factorint(10**38 - 1) == {3: 2, 11: 1, 909090909090909091: 1, 1111111111111111111: 1} + #issue 17676 + assert factorint(28300421052393658575) == {3: 1, 5: 2, 11: 2, 43: 1, 2063: 2, 4127: 1, 4129: 1} + assert factorint(2063**2 * 4127**1 * 4129**1) == {2063: 2, 4127: 1, 4129: 1} + assert factorint(2347**2 * 7039**1 * 7043**1) == {2347: 2, 7039: 1, 7043: 1} + + assert factorint(0, multiple=True) == [0] + assert factorint(1, multiple=True) == [] + assert factorint(-1, multiple=True) == [-1] + assert factorint(-2, multiple=True) == [-1, 2] + assert factorint(-16, multiple=True) == [-1, 2, 2, 2, 2] + assert factorint(2, multiple=True) == [2] + assert factorint(24, multiple=True) == [2, 2, 2, 3] + assert factorint(126, multiple=True) == [2, 3, 3, 7] + assert factorint(123456, multiple=True) == [2, 2, 2, 2, 2, 2, 3, 643] + assert factorint(5951757, multiple=True) == [3, 7, 29, 29, 337] + assert factorint(64015937, multiple=True) == [7993, 8009] + assert factorint(2**(2**6) + 1, multiple=True) == [274177, 67280421310721] + + assert factorint(fac(1, evaluate=False)) == {} + assert factorint(fac(7, evaluate=False)) == {2: 4, 3: 2, 5: 1, 7: 1} + assert factorint(fac(15, evaluate=False)) == \ + {2: 11, 3: 6, 5: 3, 7: 2, 11: 1, 13: 1} + assert factorint(fac(20, evaluate=False)) == \ + {2: 18, 3: 8, 5: 4, 7: 2, 11: 1, 13: 1, 17: 1, 19: 1} + assert factorint(fac(23, evaluate=False)) == \ + {2: 19, 3: 9, 5: 4, 7: 3, 11: 2, 13: 1, 17: 1, 19: 1, 23: 1} + + assert multiproduct(factorint(fac(200))) == fac(200) + assert multiproduct(factorint(fac(200, evaluate=False))) == fac(200) + for b, e in factorint(fac(150)).items(): + assert e == fac_multiplicity(150, b) + for b, e in factorint(fac(150, evaluate=False)).items(): + assert e == fac_multiplicity(150, b) + assert factorint(103005006059**7) == {103005006059: 7} + assert factorint(31337**191) == {31337: 191} + assert factorint(2**1000 * 3**500 * 257**127 * 383**60) == \ + {2: 1000, 3: 500, 257: 127, 383: 60} + assert len(factorint(fac(10000))) == 1229 + assert len(factorint(fac(10000, evaluate=False))) == 1229 + assert factorint(12932983746293756928584532764589230) == \ + {2: 1, 5: 1, 73: 1, 727719592270351: 1, 63564265087747: 1, 383: 1} + assert factorint(727719592270351) == {727719592270351: 1} + assert factorint(2**64 + 1, use_trial=False) == factorint(2**64 + 1) + for n in range(60000): + assert multiproduct(factorint(n)) == n + assert pollard_rho(2**64 + 1, seed=1) == 274177 + assert pollard_rho(19, seed=1) is None + assert factorint(3, limit=2) == {3: 1} + assert factorint(12345) == {3: 1, 5: 1, 823: 1} + assert factorint( + 12345, limit=3) == {4115: 1, 3: 1} # the 5 is greater than the limit + assert factorint(1, limit=1) == {} + assert factorint(0, 3) == {0: 1} + assert factorint(12, limit=1) == {12: 1} + assert factorint(30, limit=2) == {2: 1, 15: 1} + assert factorint(16, limit=2) == {2: 4} + assert factorint(124, limit=3) == {2: 2, 31: 1} + assert factorint(4*31**2, limit=3) == {2: 2, 31: 2} + p1 = nextprime(2**32) + p2 = nextprime(2**16) + p3 = nextprime(p2) + assert factorint(p1*p2*p3) == {p1: 1, p2: 1, p3: 1} + assert factorint(13*17*19, limit=15) == {13: 1, 17*19: 1} + assert factorint(1951*15013*15053, limit=2000) == {225990689: 1, 1951: 1} + assert factorint(primorial(17) + 1, use_pm1=0) == \ + {int(19026377261): 1, 3467: 1, 277: 1, 105229: 1} + # when prime b is closer than approx sqrt(8*p) to prime p then they are + # "close" and have a trivial factorization + a = nextprime(2**2**8) # 78 digits + b = nextprime(a + 2**2**4) + assert 'Fermat' in capture(lambda: factorint(a*b, verbose=1)) + + raises(ValueError, lambda: pollard_rho(4)) + raises(ValueError, lambda: pollard_pm1(3)) + raises(ValueError, lambda: pollard_pm1(10, B=2)) + # verbose coverage + n = nextprime(2**16)*nextprime(2**17)*nextprime(1901) + assert 'with primes' in capture(lambda: factorint(n, verbose=1)) + capture(lambda: factorint(nextprime(2**16)*1012, verbose=1)) + + n = nextprime(2**17) + capture(lambda: factorint(n**3, verbose=1)) # perfect power termination + capture(lambda: factorint(2*n, verbose=1)) # factoring complete msg + + # exceed 1st + n = nextprime(2**17) + n *= nextprime(n) + assert '1000' in capture(lambda: factorint(n, limit=1000, verbose=1)) + n *= nextprime(n) + assert len(factorint(n)) == 3 + assert len(factorint(n, limit=p1)) == 3 + n *= nextprime(2*n) + # exceed 2nd + assert '2001' in capture(lambda: factorint(n, limit=2000, verbose=1)) + assert capture( + lambda: factorint(n, limit=4000, verbose=1)).count('Pollard') == 2 + # non-prime pm1 result + n = nextprime(8069) + n *= nextprime(2*n)*nextprime(2*n, 2) + capture(lambda: factorint(n, verbose=1)) # non-prime pm1 result + # factor fermat composite + p1 = nextprime(2**17) + p2 = nextprime(2*p1) + assert factorint((p1*p2**2)**3) == {p1: 3, p2: 6} + # Test for non integer input + raises(ValueError, lambda: factorint(4.5)) + # test dict/Dict input + sans = '2**10*3**3' + n = {4: 2, 12: 3} + assert str(factorint(n)) == sans + assert str(factorint(Dict(n))) == sans + + +def test_divisors_and_divisor_count(): + assert divisors(-1) == [1] + assert divisors(0) == [] + assert divisors(1) == [1] + assert divisors(2) == [1, 2] + assert divisors(3) == [1, 3] + assert divisors(17) == [1, 17] + assert divisors(10) == [1, 2, 5, 10] + assert divisors(100) == [1, 2, 4, 5, 10, 20, 25, 50, 100] + assert divisors(101) == [1, 101] + assert type(divisors(2, generator=True)) is not list + + assert divisor_count(0) == 0 + assert divisor_count(-1) == 1 + assert divisor_count(1) == 1 + assert divisor_count(6) == 4 + assert divisor_count(12) == 6 + + assert divisor_count(180, 3) == divisor_count(180//3) + assert divisor_count(2*3*5, 7) == 0 + + +def test_proper_divisors_and_proper_divisor_count(): + assert proper_divisors(-1) == [] + assert proper_divisors(0) == [] + assert proper_divisors(1) == [] + assert proper_divisors(2) == [1] + assert proper_divisors(3) == [1] + assert proper_divisors(17) == [1] + assert proper_divisors(10) == [1, 2, 5] + assert proper_divisors(100) == [1, 2, 4, 5, 10, 20, 25, 50] + assert proper_divisors(1000000007) == [1] + assert type(proper_divisors(2, generator=True)) is not list + + assert proper_divisor_count(0) == 0 + assert proper_divisor_count(-1) == 0 + assert proper_divisor_count(1) == 0 + assert proper_divisor_count(36) == 8 + assert proper_divisor_count(2*3*5) == 7 + + +def test_udivisors_and_udivisor_count(): + assert udivisors(-1) == [1] + assert udivisors(0) == [] + assert udivisors(1) == [1] + assert udivisors(2) == [1, 2] + assert udivisors(3) == [1, 3] + assert udivisors(17) == [1, 17] + assert udivisors(10) == [1, 2, 5, 10] + assert udivisors(100) == [1, 4, 25, 100] + assert udivisors(101) == [1, 101] + assert udivisors(1000) == [1, 8, 125, 1000] + assert type(udivisors(2, generator=True)) is not list + + assert udivisor_count(0) == 0 + assert udivisor_count(-1) == 1 + assert udivisor_count(1) == 1 + assert udivisor_count(6) == 4 + assert udivisor_count(12) == 4 + + assert udivisor_count(180) == 8 + assert udivisor_count(2*3*5*7) == 16 + + +def test_issue_6981(): + S = set(divisors(4)).union(set(divisors(Integer(2)))) + assert S == {1,2,4} + + +def test_issue_4356(): + assert factorint(1030903) == {53: 2, 367: 1} + + +def test_divisors(): + assert divisors(28) == [1, 2, 4, 7, 14, 28] + assert list(divisors(3*5*7, 1)) == [1, 3, 5, 15, 7, 21, 35, 105] + assert divisors(0) == [] + + +def test_divisor_count(): + assert divisor_count(0) == 0 + assert divisor_count(6) == 4 + + +def test_proper_divisors(): + assert proper_divisors(-1) == [] + assert proper_divisors(28) == [1, 2, 4, 7, 14] + assert list(proper_divisors(3*5*7, True)) == [1, 3, 5, 15, 7, 21, 35] + + +def test_proper_divisor_count(): + assert proper_divisor_count(6) == 3 + assert proper_divisor_count(108) == 11 + + +def test_antidivisors(): + assert antidivisors(-1) == [] + assert antidivisors(-3) == [2] + assert antidivisors(14) == [3, 4, 9] + assert antidivisors(237) == [2, 5, 6, 11, 19, 25, 43, 95, 158] + assert antidivisors(12345) == [2, 6, 7, 10, 30, 1646, 3527, 4938, 8230] + assert antidivisors(393216) == [262144] + assert sorted(x for x in antidivisors(3*5*7, 1)) == \ + [2, 6, 10, 11, 14, 19, 30, 42, 70] + assert antidivisors(1) == [] + assert type(antidivisors(2, generator=True)) is not list + +def test_antidivisor_count(): + assert antidivisor_count(0) == 0 + assert antidivisor_count(-1) == 0 + assert antidivisor_count(-4) == 1 + assert antidivisor_count(20) == 3 + assert antidivisor_count(25) == 5 + assert antidivisor_count(38) == 7 + assert antidivisor_count(180) == 6 + assert antidivisor_count(2*3*5) == 3 + + +def test_smoothness_and_smoothness_p(): + assert smoothness(1) == (1, 1) + assert smoothness(2**4*3**2) == (3, 16) + + assert smoothness_p(10431, m=1) == \ + (1, [(3, (2, 2, 4)), (19, (1, 5, 5)), (61, (1, 31, 31))]) + assert smoothness_p(10431) == \ + (-1, [(3, (2, 2, 2)), (19, (1, 3, 9)), (61, (1, 5, 5))]) + assert smoothness_p(10431, power=1) == \ + (-1, [(3, (2, 2, 2)), (61, (1, 5, 5)), (19, (1, 3, 9))]) + assert smoothness_p(21477639576571, visual=1) == \ + 'p**i=4410317**1 has p-1 B=1787, B-pow=1787\n' + \ + 'p**i=4869863**1 has p-1 B=2434931, B-pow=2434931' + + +def test_visual_factorint(): + assert factorint(1, visual=1) == 1 + forty2 = factorint(42, visual=True) + assert type(forty2) == Mul + assert str(forty2) == '2**1*3**1*7**1' + assert factorint(1, visual=True) is S.One + no = {"evaluate": False} + assert factorint(42**2, visual=True) == Mul(Pow(2, 2, **no), + Pow(3, 2, **no), + Pow(7, 2, **no), **no) + assert -1 in factorint(-42, visual=True).args + + +def test_factorrat(): + assert str(factorrat(S(12)/1, visual=True)) == '2**2*3**1' + assert str(factorrat(Rational(1, 1), visual=True)) == '1' + assert str(factorrat(S(25)/14, visual=True)) == '5**2/(2*7)' + assert str(factorrat(Rational(25, 14), visual=True)) == '5**2/(2*7)' + assert str(factorrat(S(-25)/14/9, visual=True)) == '-1*5**2/(2*3**2*7)' + + assert factorrat(S(12)/1, multiple=True) == [2, 2, 3] + assert factorrat(Rational(1, 1), multiple=True) == [] + assert factorrat(S(25)/14, multiple=True) == [Rational(1, 7), S.Half, 5, 5] + assert factorrat(Rational(25, 14), multiple=True) == [Rational(1, 7), S.Half, 5, 5] + assert factorrat(Rational(12, 1), multiple=True) == [2, 2, 3] + assert factorrat(S(-25)/14/9, multiple=True) == \ + [-1, Rational(1, 7), Rational(1, 3), Rational(1, 3), S.Half, 5, 5] + + +def test_visual_io(): + sm = smoothness_p + fi = factorint + # with smoothness_p + n = 124 + d = fi(n) + m = fi(d, visual=True) + t = sm(n) + s = sm(t) + for th in [d, s, t, n, m]: + assert sm(th, visual=True) == s + assert sm(th, visual=1) == s + for th in [d, s, t, n, m]: + assert sm(th, visual=False) == t + assert [sm(th, visual=None) for th in [d, s, t, n, m]] == [s, d, s, t, t] + assert [sm(th, visual=2) for th in [d, s, t, n, m]] == [s, d, s, t, t] + + # with factorint + for th in [d, m, n]: + assert fi(th, visual=True) == m + assert fi(th, visual=1) == m + for th in [d, m, n]: + assert fi(th, visual=False) == d + assert [fi(th, visual=None) for th in [d, m, n]] == [m, d, d] + assert [fi(th, visual=0) for th in [d, m, n]] == [m, d, d] + + # test reevaluation + no = {"evaluate": False} + assert sm({4: 2}, visual=False) == sm(16) + assert sm(Mul(*[Pow(k, v, **no) for k, v in {4: 2, 2: 6}.items()], **no), + visual=False) == sm(2**10) + + assert fi({4: 2}, visual=False) == fi(16) + assert fi(Mul(*[Pow(k, v, **no) for k, v in {4: 2, 2: 6}.items()], **no), + visual=False) == fi(2**10) + + +def test_core(): + assert core(35**13, 10) == 42875 + assert core(210**2) == 1 + assert core(7776, 3) == 36 + assert core(10**27, 22) == 10**5 + assert core(537824) == 14 + assert core(1, 6) == 1 + + +def test__divisor_sigma(): + assert _divisor_sigma(23450) == 50592 + assert _divisor_sigma(23450, 0) == 24 + assert _divisor_sigma(23450, 1) == 50592 + assert _divisor_sigma(23450, 2) == 730747500 + assert _divisor_sigma(23450, 3) == 14666785333344 + A000005 = [1, 2, 2, 3, 2, 4, 2, 4, 3, 4, 2, 6, 2, 4, 4, 5, 2, 6, 2, 6, 4, + 4, 2, 8, 3, 4, 4, 6, 2, 8, 2, 6, 4, 4, 4, 9, 2, 4, 4, 8, 2, 8] + for n, val in enumerate(A000005, 1): + assert _divisor_sigma(n, 0) == val + A000203 = [1, 3, 4, 7, 6, 12, 8, 15, 13, 18, 12, 28, 14, 24, 24, 31, 18, + 39, 20, 42, 32, 36, 24, 60, 31, 42, 40, 56, 30, 72, 32, 63, 48] + for n, val in enumerate(A000203, 1): + assert _divisor_sigma(n, 1) == val + A001157 = [1, 5, 10, 21, 26, 50, 50, 85, 91, 130, 122, 210, 170, 250, 260, + 341, 290, 455, 362, 546, 500, 610, 530, 850, 651, 850, 820, 1050] + for n, val in enumerate(A001157, 1): + assert _divisor_sigma(n, 2) == val + + +def test_mersenne_prime_exponent(): + assert mersenne_prime_exponent(1) == 2 + assert mersenne_prime_exponent(4) == 7 + assert mersenne_prime_exponent(10) == 89 + assert mersenne_prime_exponent(25) == 21701 + raises(ValueError, lambda: mersenne_prime_exponent(52)) + raises(ValueError, lambda: mersenne_prime_exponent(0)) + + +def test_is_perfect(): + assert is_perfect(-6) is False + assert is_perfect(6) is True + assert is_perfect(15) is False + assert is_perfect(28) is True + assert is_perfect(400) is False + assert is_perfect(496) is True + assert is_perfect(8128) is True + assert is_perfect(10000) is False + + +def test_is_abundant(): + assert is_abundant(10) is False + assert is_abundant(12) is True + assert is_abundant(18) is True + assert is_abundant(21) is False + assert is_abundant(945) is True + + +def test_is_deficient(): + assert is_deficient(10) is True + assert is_deficient(22) is True + assert is_deficient(56) is False + assert is_deficient(20) is False + assert is_deficient(36) is False + + +def test_is_amicable(): + assert is_amicable(173, 129) is False + assert is_amicable(220, 284) is True + assert is_amicable(8756, 8756) is False + + +def test_is_carmichael(): + A002997 = [561, 1105, 1729, 2465, 2821, 6601, 8911, 10585, 15841, + 29341, 41041, 46657, 52633, 62745, 63973, 75361, 101101] + for n in range(1, 5000): + assert is_carmichael(n) == (n in A002997) + for n in A002997: + assert is_carmichael(n) + + +def test_find_carmichael_numbers_in_range(): + assert find_carmichael_numbers_in_range(0, 561) == [] + assert find_carmichael_numbers_in_range(561, 562) == [561] + assert find_carmichael_numbers_in_range(561, 1105) == find_carmichael_numbers_in_range(561, 562) + raises(ValueError, lambda: find_carmichael_numbers_in_range(-2, 2)) + raises(ValueError, lambda: find_carmichael_numbers_in_range(22, 2)) + + +def test_find_first_n_carmichaels(): + assert find_first_n_carmichaels(0) == [] + assert find_first_n_carmichaels(1) == [561] + assert find_first_n_carmichaels(2) == [561, 1105] + + +def test_dra(): + assert dra(19, 12) == 8 + assert dra(2718, 10) == 9 + assert dra(0, 22) == 0 + assert dra(23456789, 10) == 8 + raises(ValueError, lambda: dra(24, -2)) + raises(ValueError, lambda: dra(24.2, 5)) + +def test_drm(): + assert drm(19, 12) == 7 + assert drm(2718, 10) == 2 + assert drm(0, 15) == 0 + assert drm(234161, 10) == 6 + raises(ValueError, lambda: drm(24, -2)) + raises(ValueError, lambda: drm(11.6, 9)) + + +def test_deprecated_ntheory_symbolic_functions(): + from sympy.testing.pytest import warns_deprecated_sympy + + with warns_deprecated_sympy(): + assert primenu(3) == 1 + with warns_deprecated_sympy(): + assert primeomega(3) == 1 + with warns_deprecated_sympy(): + assert totient(3) == 2 + with warns_deprecated_sympy(): + assert reduced_totient(3) == 2 + with warns_deprecated_sympy(): + assert divisor_sigma(3) == 4 + with warns_deprecated_sympy(): + assert udivisor_sigma(3) == 4 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_generate.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_generate.py new file mode 100644 index 0000000000000000000000000000000000000000..b0e5918ffefede2e86f3be2b07d6c3a01c02e6e0 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_generate.py @@ -0,0 +1,285 @@ +from bisect import bisect, bisect_left + +from sympy.functions.combinatorial.numbers import mobius, totient +from sympy.ntheory.generate import (sieve, Sieve) + +from sympy.ntheory import isprime, randprime, nextprime, prevprime, \ + primerange, primepi, prime, primorial, composite, compositepi +from sympy.ntheory.generate import cycle_length, _primepi +from sympy.ntheory.primetest import mr +from sympy.testing.pytest import raises + +def test_prime(): + assert prime(1) == 2 + assert prime(2) == 3 + assert prime(5) == 11 + assert prime(11) == 31 + assert prime(57) == 269 + assert prime(296) == 1949 + assert prime(559) == 4051 + assert prime(3000) == 27449 + assert prime(4096) == 38873 + assert prime(9096) == 94321 + assert prime(25023) == 287341 + assert prime(10000000) == 179424673 # issue #20951 + assert prime(99999999) == 2038074739 + raises(ValueError, lambda: prime(0)) + sieve.extend(3000) + assert prime(401) == 2749 + raises(ValueError, lambda: prime(-1)) + + +def test__primepi(): + assert _primepi(-1) == 0 + assert _primepi(1) == 0 + assert _primepi(2) == 1 + assert _primepi(5) == 3 + assert _primepi(11) == 5 + assert _primepi(57) == 16 + assert _primepi(296) == 62 + assert _primepi(559) == 102 + assert _primepi(3000) == 430 + assert _primepi(4096) == 564 + assert _primepi(9096) == 1128 + assert _primepi(25023) == 2763 + assert _primepi(10**8) == 5761455 + assert _primepi(253425253) == 13856396 + assert _primepi(8769575643) == 401464322 + sieve.extend(3000) + assert _primepi(2000) == 303 + + +def test_composite(): + from sympy.ntheory.generate import sieve + sieve._reset() + assert composite(1) == 4 + assert composite(2) == 6 + assert composite(5) == 10 + assert composite(11) == 20 + assert composite(41) == 58 + assert composite(57) == 80 + assert composite(296) == 370 + assert composite(559) == 684 + assert composite(3000) == 3488 + assert composite(4096) == 4736 + assert composite(9096) == 10368 + assert composite(25023) == 28088 + sieve.extend(3000) + assert composite(1957) == 2300 + assert composite(2568) == 2998 + raises(ValueError, lambda: composite(0)) + + +def test_compositepi(): + assert compositepi(1) == 0 + assert compositepi(2) == 0 + assert compositepi(5) == 1 + assert compositepi(11) == 5 + assert compositepi(57) == 40 + assert compositepi(296) == 233 + assert compositepi(559) == 456 + assert compositepi(3000) == 2569 + assert compositepi(4096) == 3531 + assert compositepi(9096) == 7967 + assert compositepi(25023) == 22259 + assert compositepi(10**8) == 94238544 + assert compositepi(253425253) == 239568856 + assert compositepi(8769575643) == 8368111320 + sieve.extend(3000) + assert compositepi(2321) == 1976 + + +def test_generate(): + from sympy.ntheory.generate import sieve + sieve._reset() + assert nextprime(-4) == 2 + assert nextprime(2) == 3 + assert nextprime(5) == 7 + assert nextprime(12) == 13 + assert prevprime(3) == 2 + assert prevprime(7) == 5 + assert prevprime(13) == 11 + assert prevprime(19) == 17 + assert prevprime(20) == 19 + + sieve.extend_to_no(9) + assert sieve._list[-1] == 23 + + assert sieve._list[-1] < 31 + assert 31 in sieve + + assert nextprime(90) == 97 + assert nextprime(10**40) == (10**40 + 121) + primelist = [2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, + 37, 41, 43, 47, 53, 59, 61, 67, 71, 73, + 79, 83, 89, 97, 101, 103, 107, 109, 113, + 127, 131, 137, 139, 149, 151, 157, 163, + 167, 173, 179, 181, 191, 193, 197, 199, + 211, 223, 227, 229, 233, 239, 241, 251, + 257, 263, 269, 271, 277, 281, 283, 293] + for i in range(len(primelist) - 2): + for j in range(2, len(primelist) - i): + assert nextprime(primelist[i], j) == primelist[i + j] + if 3 < i: + assert nextprime(primelist[i] - 1, j) == primelist[i + j - 1] + raises(ValueError, lambda: nextprime(2, 0)) + raises(ValueError, lambda: nextprime(2, -1)) + assert prevprime(97) == 89 + assert prevprime(10**40) == (10**40 - 17) + + raises(ValueError, lambda: Sieve(0)) + raises(ValueError, lambda: Sieve(-1)) + for sieve_interval in [1, 10, 11, 1_000_000]: + s = Sieve(sieve_interval=sieve_interval) + for head in range(s._list[-1] + 1, (s._list[-1] + 1)**2, 2): + for tail in range(head + 1, (s._list[-1] + 1)**2): + A = list(s._primerange(head, tail)) + B = primelist[bisect(primelist, head):bisect_left(primelist, tail)] + assert A == B + for k in range(s._list[-1], primelist[-1] - 1, 2): + s = Sieve(sieve_interval=sieve_interval) + s.extend(k) + assert list(s._list) == primelist[:bisect(primelist, k)] + s.extend(primelist[-1]) + assert list(s._list) == primelist + + assert list(sieve.primerange(10, 1)) == [] + assert list(sieve.primerange(5, 9)) == [5, 7] + sieve._reset(prime=True) + assert list(sieve.primerange(2, 13)) == [2, 3, 5, 7, 11] + assert list(sieve.primerange(13)) == [2, 3, 5, 7, 11] + assert list(sieve.primerange(8)) == [2, 3, 5, 7] + assert list(sieve.primerange(-2)) == [] + assert list(sieve.primerange(29)) == [2, 3, 5, 7, 11, 13, 17, 19, 23] + assert list(sieve.primerange(34)) == [2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31] + + assert list(sieve.totientrange(5, 15)) == [4, 2, 6, 4, 6, 4, 10, 4, 12, 6] + sieve._reset(totient=True) + assert list(sieve.totientrange(3, 13)) == [2, 2, 4, 2, 6, 4, 6, 4, 10, 4] + assert list(sieve.totientrange(900, 1000)) == [totient(x) for x in range(900, 1000)] + assert list(sieve.totientrange(0, 1)) == [] + assert list(sieve.totientrange(1, 2)) == [1] + + assert list(sieve.mobiusrange(5, 15)) == [-1, 1, -1, 0, 0, 1, -1, 0, -1, 1] + sieve._reset(mobius=True) + assert list(sieve.mobiusrange(3, 13)) == [-1, 0, -1, 1, -1, 0, 0, 1, -1, 0] + assert list(sieve.mobiusrange(1050, 1100)) == [mobius(x) for x in range(1050, 1100)] + assert list(sieve.mobiusrange(0, 1)) == [] + assert list(sieve.mobiusrange(1, 2)) == [1] + + assert list(primerange(10, 1)) == [] + assert list(primerange(2, 7)) == [2, 3, 5] + assert list(primerange(2, 10)) == [2, 3, 5, 7] + assert list(primerange(1050, 1100)) == [1051, 1061, + 1063, 1069, 1087, 1091, 1093, 1097] + s = Sieve() + for i in range(30, 2350, 376): + for j in range(2, 5096, 1139): + A = list(s.primerange(i, i + j)) + B = list(primerange(i, i + j)) + assert A == B + s = Sieve() + sieve._reset(prime=True) + sieve.extend(13) + for i in range(200): + for j in range(i, 200): + A = list(s.primerange(i, j)) + B = list(primerange(i, j)) + assert A == B + sieve.extend(1000) + for a, b in [(901, 1103), # a < 1000 < b < 1000**2 + (806, 1002007), # a < 1000 < 1000**2 < b + (2000, 30001), # 1000 < a < b < 1000**2 + (100005, 1010001), # 1000 < a < 1000**2 < b + (1003003, 1005000), # 1000**2 < a < b + ]: + assert list(primerange(a, b)) == list(s.primerange(a, b)) + sieve._reset(prime=True) + sieve.extend(100000) + assert len(sieve._list) == len(set(sieve._list)) + s = Sieve() + assert s[10] == 29 + + assert nextprime(2, 2) == 5 + + raises(ValueError, lambda: totient(0)) + + raises(ValueError, lambda: primorial(0)) + + assert mr(1, [2]) is False + + func = lambda i: (i**2 + 1) % 51 + assert next(cycle_length(func, 4)) == (6, 3) + assert list(cycle_length(func, 4, values=True)) == \ + [4, 17, 35, 2, 5, 26, 14, 44, 50, 2, 5, 26, 14] + assert next(cycle_length(func, 4, nmax=5)) == (5, None) + assert list(cycle_length(func, 4, nmax=5, values=True)) == \ + [4, 17, 35, 2, 5] + sieve.extend(3000) + assert nextprime(2968) == 2969 + assert prevprime(2930) == 2927 + raises(ValueError, lambda: prevprime(1)) + raises(ValueError, lambda: prevprime(-4)) + + +def test_randprime(): + assert randprime(10, 1) is None + assert randprime(3, -3) is None + assert randprime(2, 3) == 2 + assert randprime(1, 3) == 2 + assert randprime(3, 5) == 3 + raises(ValueError, lambda: randprime(-12, -2)) + raises(ValueError, lambda: randprime(-10, 0)) + raises(ValueError, lambda: randprime(20, 22)) + raises(ValueError, lambda: randprime(0, 2)) + raises(ValueError, lambda: randprime(1, 2)) + for a in [100, 300, 500, 250000]: + for b in [100, 300, 500, 250000]: + p = randprime(a, a + b) + assert a <= p < (a + b) and isprime(p) + + +def test_primorial(): + assert primorial(1) == 2 + assert primorial(1, nth=0) == 1 + assert primorial(2) == 6 + assert primorial(2, nth=0) == 2 + assert primorial(4, nth=0) == 6 + + +def test_search(): + assert 2 in sieve + assert 2.1 not in sieve + assert 1 not in sieve + assert 2**1000 not in sieve + raises(ValueError, lambda: sieve.search(1)) + + +def test_sieve_slice(): + assert sieve[5] == 11 + assert list(sieve[5:10]) == [sieve[x] for x in range(5, 10)] + assert list(sieve[5:10:2]) == [sieve[x] for x in range(5, 10, 2)] + assert list(sieve[1:5]) == [2, 3, 5, 7] + raises(IndexError, lambda: sieve[:5]) + raises(IndexError, lambda: sieve[0]) + raises(IndexError, lambda: sieve[0:5]) + +def test_sieve_iter(): + values = [] + for value in sieve: + if value > 7: + break + values.append(value) + assert values == list(sieve[1:5]) + + +def test_sieve_repr(): + assert "sieve" in repr(sieve) + assert "prime" in repr(sieve) + + +def test_deprecated_ntheory_symbolic_functions(): + from sympy.testing.pytest import warns_deprecated_sympy + + with warns_deprecated_sympy(): + assert primepi(0) == 0 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_hypothesis.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_hypothesis.py new file mode 100644 index 0000000000000000000000000000000000000000..a8f4cbecdbb7a6b15b0e323700cda11039c968fb --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_hypothesis.py @@ -0,0 +1,24 @@ +from hypothesis import given +from hypothesis import strategies as st +from sympy import divisors +from sympy.functions.combinatorial.numbers import divisor_sigma, totient +from sympy.ntheory.primetest import is_square + + +@given(n=st.integers(1, 10**10)) +def test_tau_hypothesis(n): + div = divisors(n) + tau_n = len(div) + assert is_square(n) == (tau_n % 2 == 1) + sigmas = [divisor_sigma(i) for i in div] + totients = [totient(n // i) for i in div] + mul = [a * b for a, b in zip(sigmas, totients)] + assert n * tau_n == sum(mul) + + +@given(n=st.integers(1, 10**10)) +def test_totient_hypothesis(n): + assert totient(n) <= n + div = divisors(n) + totients = [totient(i) for i in div] + assert n == sum(totients) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_modular.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_modular.py new file mode 100644 index 0000000000000000000000000000000000000000..10ebb1d3d3bdf5f736a6229579ae4c42a805745e --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_modular.py @@ -0,0 +1,34 @@ +from sympy.ntheory.modular import crt, crt1, crt2, solve_congruence +from sympy.testing.pytest import raises + + +def test_crt(): + def mcrt(m, v, r, symmetric=False): + assert crt(m, v, symmetric)[0] == r + mm, e, s = crt1(m) + assert crt2(m, v, mm, e, s, symmetric) == (r, mm) + + mcrt([2, 3, 5], [0, 0, 0], 0) + mcrt([2, 3, 5], [1, 1, 1], 1) + + mcrt([2, 3, 5], [-1, -1, -1], -1, True) + mcrt([2, 3, 5], [-1, -1, -1], 2*3*5 - 1, False) + + assert crt([656, 350], [811, 133], symmetric=True) == (-56917, 114800) + + +def test_modular(): + assert solve_congruence(*list(zip([3, 4, 2], [12, 35, 17]))) == (1719, 7140) + assert solve_congruence(*list(zip([3, 4, 2], [12, 6, 17]))) is None + assert solve_congruence(*list(zip([3, 4, 2], [13, 7, 17]))) == (172, 1547) + assert solve_congruence(*list(zip([-10, -3, -15], [13, 7, 17]))) == (172, 1547) + assert solve_congruence(*list(zip([-10, -3, 1, -15], [13, 7, 7, 17]))) is None + assert solve_congruence( + *list(zip([-10, -5, 2, -15], [13, 7, 7, 17]))) == (835, 1547) + assert solve_congruence( + *list(zip([-10, -5, 2, -15], [13, 7, 14, 17]))) == (2382, 3094) + assert solve_congruence( + *list(zip([-10, 2, 2, -15], [13, 7, 14, 17]))) == (2382, 3094) + assert solve_congruence(*list(zip((1, 1, 2), (3, 2, 4)))) is None + raises( + ValueError, lambda: solve_congruence(*list(zip([3, 4, 2], [12.1, 35, 17])))) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_multinomial.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_multinomial.py new file mode 100644 index 0000000000000000000000000000000000000000..b455c5cc979b9ba9756c9da88c1694471115cd5d --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_multinomial.py @@ -0,0 +1,48 @@ +from sympy.ntheory.multinomial import (binomial_coefficients, binomial_coefficients_list, multinomial_coefficients) +from sympy.ntheory.multinomial import multinomial_coefficients_iterator + + +def test_binomial_coefficients_list(): + assert binomial_coefficients_list(0) == [1] + assert binomial_coefficients_list(1) == [1, 1] + assert binomial_coefficients_list(2) == [1, 2, 1] + assert binomial_coefficients_list(3) == [1, 3, 3, 1] + assert binomial_coefficients_list(4) == [1, 4, 6, 4, 1] + assert binomial_coefficients_list(5) == [1, 5, 10, 10, 5, 1] + assert binomial_coefficients_list(6) == [1, 6, 15, 20, 15, 6, 1] + + +def test_binomial_coefficients(): + for n in range(15): + c = binomial_coefficients(n) + l = [c[k] for k in sorted(c)] + assert l == binomial_coefficients_list(n) + + +def test_multinomial_coefficients(): + assert multinomial_coefficients(1, 1) == {(1,): 1} + assert multinomial_coefficients(1, 2) == {(2,): 1} + assert multinomial_coefficients(1, 3) == {(3,): 1} + assert multinomial_coefficients(2, 0) == {(0, 0): 1} + assert multinomial_coefficients(2, 1) == {(0, 1): 1, (1, 0): 1} + assert multinomial_coefficients(2, 2) == {(2, 0): 1, (0, 2): 1, (1, 1): 2} + assert multinomial_coefficients(2, 3) == {(3, 0): 1, (1, 2): 3, (0, 3): 1, + (2, 1): 3} + assert multinomial_coefficients(3, 1) == {(1, 0, 0): 1, (0, 1, 0): 1, + (0, 0, 1): 1} + assert multinomial_coefficients(3, 2) == {(0, 1, 1): 2, (0, 0, 2): 1, + (1, 1, 0): 2, (0, 2, 0): 1, (1, 0, 1): 2, (2, 0, 0): 1} + mc = multinomial_coefficients(3, 3) + assert mc == {(2, 1, 0): 3, (0, 3, 0): 1, + (1, 0, 2): 3, (0, 2, 1): 3, (0, 1, 2): 3, (3, 0, 0): 1, + (2, 0, 1): 3, (1, 2, 0): 3, (1, 1, 1): 6, (0, 0, 3): 1} + assert dict(multinomial_coefficients_iterator(2, 0)) == {(0, 0): 1} + assert dict( + multinomial_coefficients_iterator(2, 1)) == {(0, 1): 1, (1, 0): 1} + assert dict(multinomial_coefficients_iterator(2, 2)) == \ + {(2, 0): 1, (0, 2): 1, (1, 1): 2} + assert dict(multinomial_coefficients_iterator(3, 3)) == mc + it = multinomial_coefficients_iterator(7, 2) + assert [next(it) for i in range(4)] == \ + [((2, 0, 0, 0, 0, 0, 0), 1), ((1, 1, 0, 0, 0, 0, 0), 2), + ((0, 2, 0, 0, 0, 0, 0), 1), ((1, 0, 1, 0, 0, 0, 0), 2)] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_partitions.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_partitions.py new file mode 100644 index 0000000000000000000000000000000000000000..8eb7fad3445068ae7ae4033c76c808e3c87347b6 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_partitions.py @@ -0,0 +1,28 @@ +from sympy.ntheory.partitions_ import npartitions, _partition_rec, _partition + + +def test__partition_rec(): + A000041 = [1, 1, 2, 3, 5, 7, 11, 15, 22, 30, 42, 56, 77, 101, 135, + 176, 231, 297, 385, 490, 627, 792, 1002, 1255, 1575] + for n, val in enumerate(A000041): + assert _partition_rec(n) == val + + +def test__partition(): + assert [_partition(k) for k in range(13)] == \ + [1, 1, 2, 3, 5, 7, 11, 15, 22, 30, 42, 56, 77] + assert _partition(100) == 190569292 + assert _partition(200) == 3972999029388 + assert _partition(1000) == 24061467864032622473692149727991 + assert _partition(1001) == 25032297938763929621013218349796 + assert _partition(2000) == 4720819175619413888601432406799959512200344166 + assert _partition(10000) % 10**10 == 6916435144 + assert _partition(100000) % 10**10 == 9421098519 + assert _partition(10000000) % 10**10 == 7677288980 + + +def test_deprecated_ntheory_symbolic_functions(): + from sympy.testing.pytest import warns_deprecated_sympy + + with warns_deprecated_sympy(): + assert npartitions(0) == 1 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_primetest.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_primetest.py new file mode 100644 index 0000000000000000000000000000000000000000..8a56332941d9421bda4d6acc1e4b3406617cee2b --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_primetest.py @@ -0,0 +1,235 @@ +from math import gcd + +from sympy.ntheory.generate import Sieve, sieve +from sympy.ntheory.primetest import (mr, _lucas_extrastrong_params, is_lucas_prp, is_square, + is_strong_lucas_prp, is_extra_strong_lucas_prp, + proth_test, isprime, is_euler_pseudoprime, + is_gaussian_prime, is_fermat_pseudoprime, is_euler_jacobi_pseudoprime, + MERSENNE_PRIME_EXPONENTS, _lucas_lehmer_primality_test, + is_mersenne_prime) + +from sympy.testing.pytest import slow, raises +from sympy.core.numbers import I, Float + + +def test_is_fermat_pseudoprime(): + assert is_fermat_pseudoprime(5, 1) + assert is_fermat_pseudoprime(9, 1) + + +def test_euler_pseudoprimes(): + assert is_euler_pseudoprime(13, 1) + assert is_euler_pseudoprime(15, 1) + assert is_euler_pseudoprime(17, 6) + assert is_euler_pseudoprime(101, 7) + assert is_euler_pseudoprime(1009, 10) + assert is_euler_pseudoprime(11287, 41) + + raises(ValueError, lambda: is_euler_pseudoprime(0, 4)) + raises(ValueError, lambda: is_euler_pseudoprime(3, 0)) + raises(ValueError, lambda: is_euler_pseudoprime(15, 6)) + + # A006970 + euler_prp = [341, 561, 1105, 1729, 1905, 2047, 2465, 3277, + 4033, 4681, 5461, 6601, 8321, 8481, 10261, 10585] + for p in euler_prp: + assert is_euler_pseudoprime(p, 2) + + # A048950 + euler_prp = [121, 703, 1729, 1891, 2821, 3281, 7381, 8401, 8911, 10585, + 12403, 15457, 15841, 16531, 18721, 19345, 23521, 24661, 28009] + for p in euler_prp: + assert is_euler_pseudoprime(p, 3) + + # A033181 + absolute_euler_prp = [1729, 2465, 15841, 41041, 46657, 75361, + 162401, 172081, 399001, 449065, 488881] + for p in absolute_euler_prp: + for a in range(2, p): + if gcd(a, p) != 1: + continue + assert is_euler_pseudoprime(p, a) + + +def test_is_euler_jacobi_pseudoprime(): + assert is_euler_jacobi_pseudoprime(11, 1) + assert is_euler_jacobi_pseudoprime(15, 1) + + +def test_lucas_extrastrong_params(): + assert _lucas_extrastrong_params(3) == (5, 3, 1) + assert _lucas_extrastrong_params(5) == (12, 4, 1) + assert _lucas_extrastrong_params(7) == (5, 3, 1) + assert _lucas_extrastrong_params(9) == (0, 0, 0) + assert _lucas_extrastrong_params(11) == (21, 5, 1) + assert _lucas_extrastrong_params(59) == (32, 6, 1) + assert _lucas_extrastrong_params(479) == (117, 11, 1) + + +def test_is_extra_strong_lucas_prp(): + assert is_extra_strong_lucas_prp(4) == False + assert is_extra_strong_lucas_prp(989) == True + assert is_extra_strong_lucas_prp(10877) == True + assert is_extra_strong_lucas_prp(9) == False + assert is_extra_strong_lucas_prp(16) == False + assert is_extra_strong_lucas_prp(169) == False + +@slow +def test_prps(): + oddcomposites = [n for n in range(1, 10**5) if + n % 2 and not isprime(n)] + # A checksum would be better. + assert sum(oddcomposites) == 2045603465 + assert [n for n in oddcomposites if mr(n, [2])] == [ + 2047, 3277, 4033, 4681, 8321, 15841, 29341, 42799, 49141, + 52633, 65281, 74665, 80581, 85489, 88357, 90751] + assert [n for n in oddcomposites if mr(n, [3])] == [ + 121, 703, 1891, 3281, 8401, 8911, 10585, 12403, 16531, + 18721, 19345, 23521, 31621, 44287, 47197, 55969, 63139, + 74593, 79003, 82513, 87913, 88573, 97567] + assert [n for n in oddcomposites if mr(n, [325])] == [ + 9, 25, 27, 49, 65, 81, 325, 341, 343, 697, 1141, 2059, + 2149, 3097, 3537, 4033, 4681, 4941, 5833, 6517, 7987, 8911, + 12403, 12913, 15043, 16021, 20017, 22261, 23221, 24649, + 24929, 31841, 35371, 38503, 43213, 44173, 47197, 50041, + 55909, 56033, 58969, 59089, 61337, 65441, 68823, 72641, + 76793, 78409, 85879] + assert not any(mr(n, [9345883071009581737]) for n in oddcomposites) + assert [n for n in oddcomposites if is_lucas_prp(n)] == [ + 323, 377, 1159, 1829, 3827, 5459, 5777, 9071, 9179, 10877, + 11419, 11663, 13919, 14839, 16109, 16211, 18407, 18971, + 19043, 22499, 23407, 24569, 25199, 25877, 26069, 27323, + 32759, 34943, 35207, 39059, 39203, 39689, 40309, 44099, + 46979, 47879, 50183, 51983, 53663, 56279, 58519, 60377, + 63881, 69509, 72389, 73919, 75077, 77219, 79547, 79799, + 82983, 84419, 86063, 90287, 94667, 97019, 97439] + assert [n for n in oddcomposites if is_strong_lucas_prp(n)] == [ + 5459, 5777, 10877, 16109, 18971, 22499, 24569, 25199, 40309, + 58519, 75077, 97439] + assert [n for n in oddcomposites if is_extra_strong_lucas_prp(n) + ] == [ + 989, 3239, 5777, 10877, 27971, 29681, 30739, 31631, 39059, + 72389, 73919, 75077] + + +def test_proth_test(): + # Proth number + A080075 = [3, 5, 9, 13, 17, 25, 33, 41, 49, 57, 65, + 81, 97, 113, 129, 145, 161, 177, 193] + # Proth prime + A080076 = [3, 5, 13, 17, 41, 97, 113, 193] + + for n in range(200): + if n in A080075: + assert proth_test(n) == (n in A080076) + else: + raises(ValueError, lambda: proth_test(n)) + + +def test_lucas_lehmer_primality_test(): + for p in sieve.primerange(3, 100): + assert _lucas_lehmer_primality_test(p) == (p in MERSENNE_PRIME_EXPONENTS) + + +def test_is_mersenne_prime(): + assert is_mersenne_prime(-3) is False + assert is_mersenne_prime(3) is True + assert is_mersenne_prime(10) is False + assert is_mersenne_prime(127) is True + assert is_mersenne_prime(511) is False + assert is_mersenne_prime(131071) is True + assert is_mersenne_prime(2147483647) is True + + +def test_isprime(): + s = Sieve() + s.extend(100000) + ps = set(s.primerange(2, 100001)) + for n in range(100001): + # if (n in ps) != isprime(n): print n + assert (n in ps) == isprime(n) + assert isprime(179424673) + assert isprime(20678048681) + assert isprime(1968188556461) + assert isprime(2614941710599) + assert isprime(65635624165761929287) + assert isprime(1162566711635022452267983) + assert isprime(77123077103005189615466924501) + assert isprime(3991617775553178702574451996736229) + assert isprime(273952953553395851092382714516720001799) + assert isprime(int(''' +531137992816767098689588206552468627329593117727031923199444138200403\ +559860852242739162502265229285668889329486246501015346579337652707239\ +409519978766587351943831270835393219031728127''')) + + # Some Mersenne primes + assert isprime(2**61 - 1) + assert isprime(2**89 - 1) + assert isprime(2**607 - 1) + # (but not all Mersenne's are primes + assert not isprime(2**601 - 1) + + # pseudoprimes + #------------- + # to some small bases + assert not isprime(2152302898747) + assert not isprime(3474749660383) + assert not isprime(341550071728321) + assert not isprime(3825123056546413051) + # passes the base set [2, 3, 7, 61, 24251] + assert not isprime(9188353522314541) + # large examples + assert not isprime(877777777777777777777777) + # conjectured psi_12 given at http://mathworld.wolfram.com/StrongPseudoprime.html + assert not isprime(318665857834031151167461) + # conjectured psi_17 given at http://mathworld.wolfram.com/StrongPseudoprime.html + assert not isprime(564132928021909221014087501701) + # Arnault's 1993 number; a factor of it is + # 400958216639499605418306452084546853005188166041132508774506\ + # 204738003217070119624271622319159721973358216316508535816696\ + # 9145233813917169287527980445796800452592031836601 + assert not isprime(int(''' +803837457453639491257079614341942108138837688287558145837488917522297\ +427376533365218650233616396004545791504202360320876656996676098728404\ +396540823292873879185086916685732826776177102938969773947016708230428\ +687109997439976544144845341155872450633409279022275296229414984230688\ +1685404326457534018329786111298960644845216191652872597534901''')) + # Arnault's 1995 number; can be factored as + # p1*(313*(p1 - 1) + 1)*(353*(p1 - 1) + 1) where p1 is + # 296744956686855105501541746429053327307719917998530433509950\ + # 755312768387531717701995942385964281211880336647542183455624\ + # 93168782883 + assert not isprime(int(''' +288714823805077121267142959713039399197760945927972270092651602419743\ +230379915273311632898314463922594197780311092934965557841894944174093\ +380561511397999942154241693397290542371100275104208013496673175515285\ +922696291677532547504444585610194940420003990443211677661994962953925\ +045269871932907037356403227370127845389912612030924484149472897688540\ +6024976768122077071687938121709811322297802059565867''')) + sieve.extend(3000) + assert isprime(2819) + assert not isprime(2931) + raises(ValueError, lambda: isprime(2.0)) + raises(ValueError, lambda: isprime(Float(2))) + + +def test_is_square(): + assert [i for i in range(25) if is_square(i)] == [0, 1, 4, 9, 16] + + # issue #17044 + assert not is_square(60 ** 3) + assert not is_square(60 ** 5) + assert not is_square(84 ** 7) + assert not is_square(105 ** 9) + assert not is_square(120 ** 3) + +def test_is_gaussianprime(): + assert is_gaussian_prime(7*I) + assert is_gaussian_prime(7) + assert is_gaussian_prime(2 + 3*I) + assert not is_gaussian_prime(2 + 2*I) + + +def test_issue_27145(): + #https://github.com/sympy/sympy/issues/27145 + assert [mr(i,[2,3,5,7]) for i in (1, 2, 6)] == [False, True, False] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_qs.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_qs.py new file mode 100644 index 0000000000000000000000000000000000000000..16932dd61badf4a467e67fa52e0f473594fd057b --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_qs.py @@ -0,0 +1,110 @@ +from __future__ import annotations + +import math +from sympy.core.random import _randint +from sympy.ntheory import qs, qs_factor +from sympy.ntheory.qs import SievePolynomial, _generate_factor_base, \ + _generate_polynomial, \ + _gen_sieve_array, _check_smoothness, _trial_division_stage, _find_factor +from sympy.testing.pytest import slow + + +@slow +def test_qs_1(): + assert qs(10009202107, 100, 10000) == {100043, 100049} + assert qs(211107295182713951054568361, 1000, 10000) == \ + {13791315212531, 15307263442931} + assert qs(980835832582657*990377764891511, 2000, 10000) == \ + {980835832582657, 990377764891511} + assert qs(18640889198609*20991129234731, 1000, 50000) == \ + {18640889198609, 20991129234731} + + +def test_qs_2() -> None: + n = 10009202107 + M = 50 + sieve_poly = SievePolynomial(10, 80, n) + assert sieve_poly.eval_v(10) == sieve_poly.eval_u(10)**2 - n == -10009169707 + assert sieve_poly.eval_v(5) == sieve_poly.eval_u(5)**2 - n == -10009185207 + + idx_1000, idx_5000, factor_base = _generate_factor_base(2000, n) + assert idx_1000 == 82 + assert [factor_base[i].prime for i in range(15)] == \ + [2, 3, 7, 11, 17, 19, 29, 31, 43, 59, 61, 67, 71, 73, 79] + assert [factor_base[i].tmem_p for i in range(15)] == \ + [1, 1, 3, 5, 3, 6, 6, 14, 1, 16, 24, 22, 18, 22, 15] + assert [factor_base[i].log_p for i in range(5)] == \ + [710, 1125, 1993, 2455, 2901] + + it = _generate_polynomial( + n, M, factor_base, idx_1000, idx_5000, _randint(0)) + g = next(it) + assert g.a == 1133107 + assert g.b == 682543 + assert [factor_base[i].soln1 for i in range(15)] == \ + [0, 0, 3, 7, 13, 0, 8, 19, 9, 43, 27, 25, 63, 29, 19] + assert [factor_base[i].soln2 for i in range(15)] == \ + [0, 1, 1, 3, 12, 16, 15, 6, 15, 1, 56, 55, 61, 58, 16] + assert [factor_base[i].b_ainv for i in range(5)] == \ + [[0, 0], [0, 2], [3, 0], [3, 9], [13, 13]] + + g_1 = next(it) + assert g_1.a == 1133107 + assert g_1.b == 136765 + + sieve_array = _gen_sieve_array(M, factor_base) + assert sieve_array[0:5] == [8424, 13603, 1835, 5335, 710] + + assert _check_smoothness(9645, factor_base) == (36028797018963972, 5) + assert _check_smoothness(210313, factor_base) == (20992, 1) + + partial_relations: dict[int, tuple[int, int]] = {} + smooth_relation, proper_factor = _trial_division_stage( + n, M, factor_base, sieve_array, sieve_poly, partial_relations, + ERROR_TERM=25*2**10) + + assert partial_relations == { + 8699: (440, -10009008507, 75557863761098695507973), + 166741: (490, -10008962007, 524341), + 131449: (530, -10008921207, 664613997892457936451903530140172325), + 6653: (550, -10008899607, 19342813113834066795307021) + } + assert [smooth_relation[i][0] for i in range(5)] == [ + -250, 1064469, 72819, 231957, 44167] + assert [smooth_relation[i][1] for i in range(5)] == [ + -10009139607, 1133094251961, 5302606761, 53804049849, 1950723889] + assert smooth_relation[0][2] == 89213869829863962596973701078031812362502145 + assert proper_factor == set() + + +def test_qs_3(): + N = 1817 + smooth_relations = [ + (2455024, 637, 8), + (-27993000, 81536, 10), + (11461840, 12544, 0), + (149, 20384, 10), + (-31138074, 19208, 2) + ] + assert next(_find_factor(N, smooth_relations, 4)) == 23 + + +def test_qs_4(): + N = 10007**2 * 10009 * 10037**3 * 10039 + for factor in qs(N, 1000, 2000): + assert N % factor == 0 + N //= factor + + +def test_qs_factor(): + assert qs_factor(1009 * 100003, 2000, 10000) == {1009: 1, 100003: 1} + n = 1009**2 * 2003**2*30011*400009 + factors = qs_factor(n, 2000, 10000) + assert len(factors) > 1 + assert math.prod(p**e for p, e in factors.items()) == n + + +def test_issue_27616(): + #https://github.com/sympy/sympy/issues/27616 + N = 9804659461513846513 + 1 + assert qs(N, 5000, 20000) is not None diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_residue.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_residue.py new file mode 100644 index 0000000000000000000000000000000000000000..4d530905f39b88d8d7cc0e861ac6eadb2fa6f98a --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/ntheory/tests/test_residue.py @@ -0,0 +1,349 @@ +from collections import defaultdict +from sympy.core.containers import Tuple +from sympy.core.singleton import S +from sympy.core.symbol import (Dummy, Symbol) +from sympy.functions.combinatorial.numbers import totient +from sympy.ntheory import n_order, is_primitive_root, is_quad_residue, \ + legendre_symbol, jacobi_symbol, primerange, sqrt_mod, \ + primitive_root, quadratic_residues, is_nthpow_residue, nthroot_mod, \ + sqrt_mod_iter, mobius, discrete_log, quadratic_congruence, \ + polynomial_congruence, sieve +from sympy.ntheory.residue_ntheory import _primitive_root_prime_iter, \ + _primitive_root_prime_power_iter, _primitive_root_prime_power2_iter, \ + _nthroot_mod_prime_power, _discrete_log_trial_mul, _discrete_log_shanks_steps, \ + _discrete_log_pollard_rho, _discrete_log_index_calculus, _discrete_log_pohlig_hellman, \ + _binomial_mod_prime_power, binomial_mod +from sympy.polys.domains import ZZ +from sympy.testing.pytest import raises +from sympy.core.random import randint, choice + + +def test_residue(): + assert n_order(2, 13) == 12 + assert [n_order(a, 7) for a in range(1, 7)] == \ + [1, 3, 6, 3, 6, 2] + assert n_order(5, 17) == 16 + assert n_order(17, 11) == n_order(6, 11) + assert n_order(101, 119) == 6 + assert n_order(11, (10**50 + 151)**2) == 10000000000000000000000000000000000000000000000030100000000000000000000000000000000000000000000022650 + raises(ValueError, lambda: n_order(6, 9)) + + assert is_primitive_root(2, 7) is False + assert is_primitive_root(3, 8) is False + assert is_primitive_root(11, 14) is False + assert is_primitive_root(12, 17) == is_primitive_root(29, 17) + raises(ValueError, lambda: is_primitive_root(3, 6)) + + for p in primerange(3, 100): + li = list(_primitive_root_prime_iter(p)) + assert li[0] == min(li) + for g in li: + assert n_order(g, p) == p - 1 + assert len(li) == totient(totient(p)) + for e in range(1, 4): + li_power = list(_primitive_root_prime_power_iter(p, e)) + li_power2 = list(_primitive_root_prime_power2_iter(p, e)) + assert len(li_power) == len(li_power2) == totient(totient(p**e)) + assert primitive_root(97) == 5 + assert n_order(primitive_root(97, False), 97) == totient(97) + assert primitive_root(97**2) == 5 + assert n_order(primitive_root(97**2, False), 97**2) == totient(97**2) + assert primitive_root(40487) == 5 + assert n_order(primitive_root(40487, False), 40487) == totient(40487) + # note that primitive_root(40487) + 40487 = 40492 is a primitive root + # of 40487**2, but it is not the smallest + assert primitive_root(40487**2) == 10 + assert n_order(primitive_root(40487**2, False), 40487**2) == totient(40487**2) + assert primitive_root(82) == 7 + assert n_order(primitive_root(82, False), 82) == totient(82) + p = 10**50 + 151 + assert primitive_root(p) == 11 + assert n_order(primitive_root(p, False), p) == totient(p) + assert primitive_root(2*p) == 11 + assert n_order(primitive_root(2*p, False), 2*p) == totient(2*p) + assert primitive_root(p**2) == 11 + assert n_order(primitive_root(p**2, False), p**2) == totient(p**2) + assert primitive_root(4 * 11) is None and primitive_root(4 * 11, False) is None + assert primitive_root(15) is None and primitive_root(15, False) is None + raises(ValueError, lambda: primitive_root(-3)) + + assert is_quad_residue(3, 7) is False + assert is_quad_residue(10, 13) is True + assert is_quad_residue(12364, 139) == is_quad_residue(12364 % 139, 139) + assert is_quad_residue(207, 251) is True + assert is_quad_residue(0, 1) is True + assert is_quad_residue(1, 1) is True + assert is_quad_residue(0, 2) == is_quad_residue(1, 2) is True + assert is_quad_residue(1, 4) is True + assert is_quad_residue(2, 27) is False + assert is_quad_residue(13122380800, 13604889600) is True + assert [j for j in range(14) if is_quad_residue(j, 14)] == \ + [0, 1, 2, 4, 7, 8, 9, 11] + raises(ValueError, lambda: is_quad_residue(1.1, 2)) + raises(ValueError, lambda: is_quad_residue(2, 0)) + + assert quadratic_residues(S.One) == [0] + assert quadratic_residues(1) == [0] + assert quadratic_residues(12) == [0, 1, 4, 9] + assert quadratic_residues(13) == [0, 1, 3, 4, 9, 10, 12] + assert [len(quadratic_residues(i)) for i in range(1, 20)] == \ + [1, 2, 2, 2, 3, 4, 4, 3, 4, 6, 6, 4, 7, 8, 6, 4, 9, 8, 10] + + assert list(sqrt_mod_iter(6, 2)) == [0] + assert sqrt_mod(3, 13) == 4 + assert sqrt_mod(3, -13) == 4 + assert sqrt_mod(6, 23) == 11 + assert sqrt_mod(345, 690) == 345 + assert sqrt_mod(67, 101) == None + assert sqrt_mod(1020, 104729) == None + + for p in range(3, 100): + d = defaultdict(list) + for i in range(p): + d[pow(i, 2, p)].append(i) + for i in range(1, p): + it = sqrt_mod_iter(i, p) + v = sqrt_mod(i, p, True) + if v: + v = sorted(v) + assert d[i] == v + else: + assert not d[i] + + assert sqrt_mod(9, 27, True) == [3, 6, 12, 15, 21, 24] + assert sqrt_mod(9, 81, True) == [3, 24, 30, 51, 57, 78] + assert sqrt_mod(9, 3**5, True) == [3, 78, 84, 159, 165, 240] + assert sqrt_mod(81, 3**4, True) == [0, 9, 18, 27, 36, 45, 54, 63, 72] + assert sqrt_mod(81, 3**5, True) == [9, 18, 36, 45, 63, 72, 90, 99, 117,\ + 126, 144, 153, 171, 180, 198, 207, 225, 234] + assert sqrt_mod(81, 3**6, True) == [9, 72, 90, 153, 171, 234, 252, 315,\ + 333, 396, 414, 477, 495, 558, 576, 639, 657, 720] + assert sqrt_mod(81, 3**7, True) == [9, 234, 252, 477, 495, 720, 738, 963,\ + 981, 1206, 1224, 1449, 1467, 1692, 1710, 1935, 1953, 2178] + + for a, p in [(26214400, 32768000000), (26214400, 16384000000), + (262144, 1048576), (87169610025, 163443018796875), + (22315420166400, 167365651248000000)]: + assert pow(sqrt_mod(a, p), 2, p) == a + + n = 70 + a, p = 5**2*3**n*2**n, 5**6*3**(n+1)*2**(n+2) + it = sqrt_mod_iter(a, p) + for i in range(10): + assert pow(next(it), 2, p) == a + a, p = 5**2*3**n*2**n, 5**6*3**(n+1)*2**(n+3) + it = sqrt_mod_iter(a, p) + for i in range(2): + assert pow(next(it), 2, p) == a + n = 100 + a, p = 5**2*3**n*2**n, 5**6*3**(n+1)*2**(n+1) + it = sqrt_mod_iter(a, p) + for i in range(2): + assert pow(next(it), 2, p) == a + + assert type(next(sqrt_mod_iter(9, 27))) is int + assert type(next(sqrt_mod_iter(9, 27, ZZ))) is type(ZZ(1)) + assert type(next(sqrt_mod_iter(1, 7, ZZ))) is type(ZZ(1)) + + assert is_nthpow_residue(2, 1, 5) + + #issue 10816 + assert is_nthpow_residue(1, 0, 1) is False + assert is_nthpow_residue(1, 0, 2) is True + assert is_nthpow_residue(3, 0, 2) is True + assert is_nthpow_residue(0, 1, 8) is True + assert is_nthpow_residue(2, 3, 2) is True + assert is_nthpow_residue(2, 3, 9) is False + assert is_nthpow_residue(3, 5, 30) is True + assert is_nthpow_residue(21, 11, 20) is True + assert is_nthpow_residue(7, 10, 20) is False + assert is_nthpow_residue(5, 10, 20) is True + assert is_nthpow_residue(3, 10, 48) is False + assert is_nthpow_residue(1, 10, 40) is True + assert is_nthpow_residue(3, 10, 24) is False + assert is_nthpow_residue(1, 10, 24) is True + assert is_nthpow_residue(3, 10, 24) is False + assert is_nthpow_residue(2, 10, 48) is False + assert is_nthpow_residue(81, 3, 972) is False + assert is_nthpow_residue(243, 5, 5103) is True + assert is_nthpow_residue(243, 3, 1240029) is False + assert is_nthpow_residue(36010, 8, 87382) is True + assert is_nthpow_residue(28552, 6, 2218) is True + assert is_nthpow_residue(92712, 9, 50026) is True + x = {pow(i, 56, 1024) for i in range(1024)} + assert {a for a in range(1024) if is_nthpow_residue(a, 56, 1024)} == x + x = { pow(i, 256, 2048) for i in range(2048)} + assert {a for a in range(2048) if is_nthpow_residue(a, 256, 2048)} == x + x = { pow(i, 11, 324000) for i in range(1000)} + assert [ is_nthpow_residue(a, 11, 324000) for a in x] + x = { pow(i, 17, 22217575536) for i in range(1000)} + assert [ is_nthpow_residue(a, 17, 22217575536) for a in x] + assert is_nthpow_residue(676, 3, 5364) + assert is_nthpow_residue(9, 12, 36) + assert is_nthpow_residue(32, 10, 41) + assert is_nthpow_residue(4, 2, 64) + assert is_nthpow_residue(31, 4, 41) + assert not is_nthpow_residue(2, 2, 5) + assert is_nthpow_residue(8547, 12, 10007) + assert is_nthpow_residue(Dummy(even=True) + 3, 3, 2) == True + # _nthroot_mod_prime_power + for p in primerange(2, 10): + for a in range(3): + for n in range(3, 5): + ans = _nthroot_mod_prime_power(a, n, p, 1) + assert isinstance(ans, list) + if len(ans) == 0: + for b in range(p): + assert pow(b, n, p) != a % p + for k in range(2, 10): + assert _nthroot_mod_prime_power(a, n, p, k) == [] + else: + for b in range(p): + pred = pow(b, n, p) == a % p + assert not(pred ^ (b in ans)) + for k in range(2, 10): + ans = _nthroot_mod_prime_power(a, n, p, k) + if not ans: + break + for b in ans: + assert pow(b, n , p**k) == a + + assert nthroot_mod(Dummy(odd=True), 3, 2) == 1 + assert nthroot_mod(29, 31, 74) == 45 + assert nthroot_mod(1801, 11, 2663) == 44 + for a, q, p in [(51922, 2, 203017), (43, 3, 109), (1801, 11, 2663), + (26118163, 1303, 33333347), (1499, 7, 2663), (595, 6, 2663), + (1714, 12, 2663), (28477, 9, 33343)]: + r = nthroot_mod(a, q, p) + assert pow(r, q, p) == a + assert nthroot_mod(11, 3, 109) is None + assert nthroot_mod(16, 5, 36, True) == [4, 22] + assert nthroot_mod(9, 16, 36, True) == [3, 9, 15, 21, 27, 33] + assert nthroot_mod(4, 3, 3249000) is None + assert nthroot_mod(36010, 8, 87382, True) == [40208, 47174] + assert nthroot_mod(0, 12, 37, True) == [0] + assert nthroot_mod(0, 7, 100, True) == [0, 10, 20, 30, 40, 50, 60, 70, 80, 90] + assert nthroot_mod(4, 4, 27, True) == [5, 22] + assert nthroot_mod(4, 4, 121, True) == [19, 102] + assert nthroot_mod(2, 3, 7, True) == [] + for p in range(1, 20): + for a in range(p): + for n in range(1, p): + ans = nthroot_mod(a, n, p, True) + assert isinstance(ans, list) + for b in range(p): + pred = pow(b, n, p) == a + assert not(pred ^ (b in ans)) + ans2 = nthroot_mod(a, n, p, False) + if ans2 is None: + assert ans == [] + else: + assert ans2 in ans + + x = Symbol('x', positive=True) + i = Symbol('i', integer=True) + assert _discrete_log_trial_mul(587, 2**7, 2) == 7 + assert _discrete_log_trial_mul(941, 7**18, 7) == 18 + assert _discrete_log_trial_mul(389, 3**81, 3) == 81 + assert _discrete_log_trial_mul(191, 19**123, 19) == 123 + assert _discrete_log_shanks_steps(442879, 7**2, 7) == 2 + assert _discrete_log_shanks_steps(874323, 5**19, 5) == 19 + assert _discrete_log_shanks_steps(6876342, 7**71, 7) == 71 + assert _discrete_log_shanks_steps(2456747, 3**321, 3) == 321 + assert _discrete_log_pollard_rho(6013199, 2**6, 2, rseed=0) == 6 + assert _discrete_log_pollard_rho(6138719, 2**19, 2, rseed=0) == 19 + assert _discrete_log_pollard_rho(36721943, 2**40, 2, rseed=0) == 40 + assert _discrete_log_pollard_rho(24567899, 3**333, 3, rseed=0) == 333 + raises(ValueError, lambda: _discrete_log_pollard_rho(11, 7, 31, rseed=0)) + raises(ValueError, lambda: _discrete_log_pollard_rho(227, 3**7, 5, rseed=0)) + assert _discrete_log_index_calculus(983, 948, 2, 491) == 183 + assert _discrete_log_index_calculus(633383, 21794, 2, 316691) == 68048 + assert _discrete_log_index_calculus(941762639, 68822582, 2, 470881319) == 338029275 + assert _discrete_log_index_calculus(999231337607, 888188918786, 2, 499615668803) == 142811376514 + assert _discrete_log_index_calculus(47747730623, 19410045286, 43425105668, 645239603) == 590504662 + assert _discrete_log_pohlig_hellman(98376431, 11**9, 11) == 9 + assert _discrete_log_pohlig_hellman(78723213, 11**31, 11) == 31 + assert _discrete_log_pohlig_hellman(32942478, 11**98, 11) == 98 + assert _discrete_log_pohlig_hellman(14789363, 11**444, 11) == 444 + assert discrete_log(1, 0, 2) == 0 + raises(ValueError, lambda: discrete_log(-4, 1, 3)) + raises(ValueError, lambda: discrete_log(10, 3, 2)) + assert discrete_log(587, 2**9, 2) == 9 + assert discrete_log(2456747, 3**51, 3) == 51 + assert discrete_log(32942478, 11**127, 11) == 127 + assert discrete_log(432751500361, 7**324, 7) == 324 + assert discrete_log(265390227570863,184500076053622, 2) == 17835221372061 + assert discrete_log(22708823198678103974314518195029102158525052496759285596453269189798311427475159776411276642277139650833937, + 17463946429475485293747680247507700244427944625055089103624311227422110546803452417458985046168310373075327, + 123456) == 2068031853682195777930683306640554533145512201725884603914601918777510185469769997054750835368413389728895 + args = 5779, 3528, 6215 + assert discrete_log(*args) == 687 + assert discrete_log(*Tuple(*args)) == 687 + assert quadratic_congruence(400, 85, 125, 1600) == [295, 615, 935, 1255, 1575] + assert quadratic_congruence(3, 6, 5, 25) == [3, 20] + assert quadratic_congruence(120, 80, 175, 500) == [] + assert quadratic_congruence(15, 14, 7, 2) == [1] + assert quadratic_congruence(8, 15, 7, 29) == [10, 28] + assert quadratic_congruence(160, 200, 300, 461) == [144, 431] + assert quadratic_congruence(100000, 123456, 7415263, 48112959837082048697) == [30417843635344493501, 36001135160550533083] + assert quadratic_congruence(65, 121, 72, 277) == [249, 252] + assert quadratic_congruence(5, 10, 14, 2) == [0] + assert quadratic_congruence(10, 17, 19, 2) == [1] + assert quadratic_congruence(10, 14, 20, 2) == [0, 1] + assert quadratic_congruence(2**48-7, 2**48-1, 4, 2**48) == [8249717183797, 31960993774868] + assert polynomial_congruence(6*x**5 + 10*x**4 + 5*x**3 + x**2 + x + 1, + 972000) == [220999, 242999, 463999, 485999, 706999, 728999, 949999, 971999] + + assert polynomial_congruence(x**3 - 10*x**2 + 12*x - 82, 33075) == [30287] + assert polynomial_congruence(x**2 + x + 47, 2401) == [785, 1615] + assert polynomial_congruence(10*x**2 + 14*x + 20, 2) == [0, 1] + assert polynomial_congruence(x**3 + 3, 16) == [5] + assert polynomial_congruence(65*x**2 + 121*x + 72, 277) == [249, 252] + assert polynomial_congruence(x**4 - 4, 27) == [5, 22] + assert polynomial_congruence(35*x**3 - 6*x**2 - 567*x + 2308, 148225) == [86957, + 111157, 122531, 146731] + assert polynomial_congruence(x**16 - 9, 36) == [3, 9, 15, 21, 27, 33] + assert polynomial_congruence(x**6 - 2*x**5 - 35, 6125) == [3257] + raises(ValueError, lambda: polynomial_congruence(x**x, 6125)) + raises(ValueError, lambda: polynomial_congruence(x**i, 6125)) + raises(ValueError, lambda: polynomial_congruence(0.1*x**2 + 6, 100)) + + assert binomial_mod(-1, 1, 10) == 0 + assert binomial_mod(1, -1, 10) == 0 + raises(ValueError, lambda: binomial_mod(2, 1, -1)) + assert binomial_mod(51, 10, 10) == 0 + assert binomial_mod(10**3, 500, 3**6) == 567 + assert binomial_mod(10**18 - 1, 123456789, 4) == 0 + assert binomial_mod(10**18, 10**12, (10**5 + 3)**2) == 3744312326 + + +def test_binomial_p_pow(): + n, binomials, binomial = 1000, [1], 1 + for i in range(1, n + 1): + binomial *= n - i + 1 + binomial //= i + binomials.append(binomial) + + # Test powers of two, which the algorithm treats slightly differently + trials_2 = 100 + for _ in range(trials_2): + m, power = randint(0, n), randint(1, 20) + assert _binomial_mod_prime_power(n, m, 2, power) == binomials[m] % 2**power + + # Test against other prime powers + primes = list(sieve.primerange(2*n)) + trials = 1000 + for _ in range(trials): + m, prime, power = randint(0, n), choice(primes), randint(1, 10) + assert _binomial_mod_prime_power(n, m, prime, power) == binomials[m] % prime**power + + +def test_deprecated_ntheory_symbolic_functions(): + from sympy.testing.pytest import warns_deprecated_sympy + + with warns_deprecated_sympy(): + assert mobius(3) == -1 + with warns_deprecated_sympy(): + assert legendre_symbol(2, 3) == -1 + with warns_deprecated_sympy(): + assert jacobi_symbol(2, 3) == -1 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..b39d031bca26bc599eb9eb0e12dfe48f7e6db174 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/__init__.py @@ -0,0 +1,4 @@ +"""Used for translating a string into a SymPy expression. """ +__all__ = ['parse_expr'] + +from .sympy_parser import parse_expr diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/ast_parser.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/ast_parser.py new file mode 100644 index 0000000000000000000000000000000000000000..95a773d5bec6e130810b7b7925fdff57270aec17 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/ast_parser.py @@ -0,0 +1,79 @@ +""" +This module implements the functionality to take any Python expression as a +string and fix all numbers and other things before evaluating it, +thus + +1/2 + +returns + +Integer(1)/Integer(2) + +We use the ast module for this. It is well documented at docs.python.org. + +Some tips to understand how this works: use dump() to get a nice +representation of any node. Then write a string of what you want to get, +e.g. "Integer(1)", parse it, dump it and you'll see that you need to do +"Call(Name('Integer', Load()), [node], [], None, None)". You do not need +to bother with lineno and col_offset, just call fix_missing_locations() +before returning the node. +""" + +from sympy.core.basic import Basic +from sympy.core.sympify import SympifyError + +from ast import parse, NodeTransformer, Call, Name, Load, \ + fix_missing_locations, Constant, Tuple + +class Transform(NodeTransformer): + + def __init__(self, local_dict, global_dict): + NodeTransformer.__init__(self) + self.local_dict = local_dict + self.global_dict = global_dict + + def visit_Constant(self, node): + if isinstance(node.value, int): + return fix_missing_locations(Call(func=Name('Integer', Load()), + args=[node], keywords=[])) + elif isinstance(node.value, float): + return fix_missing_locations(Call(func=Name('Float', Load()), + args=[node], keywords=[])) + return node + + def visit_Name(self, node): + if node.id in self.local_dict: + return node + elif node.id in self.global_dict: + name_obj = self.global_dict[node.id] + + if isinstance(name_obj, (Basic, type)) or callable(name_obj): + return node + elif node.id in ['True', 'False']: + return node + return fix_missing_locations(Call(func=Name('Symbol', Load()), + args=[Constant(node.id)], keywords=[])) + + def visit_Lambda(self, node): + args = [self.visit(arg) for arg in node.args.args] + body = self.visit(node.body) + n = Call(func=Name('Lambda', Load()), + args=[Tuple(args, Load()), body], keywords=[]) + return fix_missing_locations(n) + +def parse_expr(s, local_dict): + """ + Converts the string "s" to a SymPy expression, in local_dict. + + It converts all numbers to Integers before feeding it to Python and + automatically creates Symbols. + """ + global_dict = {} + exec('from sympy import *', global_dict) + try: + a = parse(s.strip(), mode="eval") + except SyntaxError: + raise SympifyError("Cannot parse %s." % repr(s)) + a = Transform(local_dict, global_dict).visit(a) + e = compile(a, "", "eval") + return eval(e, global_dict, local_dict) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/Autolev.g4 b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/Autolev.g4 new file mode 100644 index 0000000000000000000000000000000000000000..94feea5fa4f49e9d1054eca2cd60c996aebff7c2 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/Autolev.g4 @@ -0,0 +1,118 @@ +grammar Autolev; + +options { + language = Python3; +} + +prog: stat+; + +stat: varDecl + | functionCall + | codeCommands + | massDecl + | inertiaDecl + | assignment + | settings + ; + +assignment: vec equals expr #vecAssign + | ID '[' index ']' equals expr #indexAssign + | ID diff? equals expr #regularAssign; + +equals: ('='|'+='|'-='|':='|'*='|'/='|'^='); + +index: expr (',' expr)* ; + +diff: ('\'')+; + +functionCall: ID '(' (expr (',' expr)*)? ')' + | (Mass|Inertia) '(' (ID (',' ID)*)? ')'; + +varDecl: varType varDecl2 (',' varDecl2)*; + +varType: Newtonian|Frames|Bodies|Particles|Points|Constants + | Specifieds|Imaginary|Variables ('\'')*|MotionVariables ('\'')*; + +varDecl2: ID ('{' INT ',' INT '}')? (('{' INT ':' INT (',' INT ':' INT)* '}'))? ('{' INT '}')? ('+'|'-')? ('\'')* ('=' expr)?; + +ranges: ('{' INT ':' INT (',' INT ':' INT)* '}'); + +massDecl: Mass massDecl2 (',' massDecl2)*; + +massDecl2: ID '=' expr; + +inertiaDecl: Inertia ID ('(' ID ')')? (',' expr)+; + +matrix: '[' expr ((','|';') expr)* ']'; +matrixInOutput: (ID (ID '=' (FLOAT|INT)?))|FLOAT|INT; + +codeCommands: units + | inputs + | outputs + | codegen + | commands; + +settings: ID (EXP|ID|FLOAT|INT)?; + +units: UnitSystem ID (',' ID)*; +inputs: Input inputs2 (',' inputs2)*; +id_diff: ID diff?; +inputs2: id_diff '=' expr expr?; +outputs: Output outputs2 (',' outputs2)*; +outputs2: expr expr?; +codegen: ID functionCall ('['matrixInOutput (',' matrixInOutput)*']')? ID'.'ID; + +commands: Save ID'.'ID + | Encode ID (',' ID)*; + +vec: ID ('>')+ + | '0>' + | '1>>'; + +expr: expr '^' expr # Exponent + | expr ('*'|'/') expr # MulDiv + | expr ('+'|'-') expr # AddSub + | EXP # exp + | '-' expr # negativeOne + | FLOAT # float + | INT # int + | ID('\'')* # id + | vec # VectorOrDyadic + | ID '['expr (',' expr)* ']' # Indexing + | functionCall # function + | matrix # matrices + | '(' expr ')' # parens + | expr '=' expr # idEqualsExpr + | expr ':' expr # colon + | ID? ranges ('\'')* # rangess + ; + +// These are to take care of the case insensitivity of Autolev. +Mass: ('M'|'m')('A'|'a')('S'|'s')('S'|'s'); +Inertia: ('I'|'i')('N'|'n')('E'|'e')('R'|'r')('T'|'t')('I'|'i')('A'|'a'); +Input: ('I'|'i')('N'|'n')('P'|'p')('U'|'u')('T'|'t')('S'|'s')?; +Output: ('O'|'o')('U'|'u')('T'|'t')('P'|'p')('U'|'u')('T'|'t'); +Save: ('S'|'s')('A'|'a')('V'|'v')('E'|'e'); +UnitSystem: ('U'|'u')('N'|'n')('I'|'i')('T'|'t')('S'|'s')('Y'|'y')('S'|'s')('T'|'t')('E'|'e')('M'|'m'); +Encode: ('E'|'e')('N'|'n')('C'|'c')('O'|'o')('D'|'d')('E'|'e'); +Newtonian: ('N'|'n')('E'|'e')('W'|'w')('T'|'t')('O'|'o')('N'|'n')('I'|'i')('A'|'a')('N'|'n'); +Frames: ('F'|'f')('R'|'r')('A'|'a')('M'|'m')('E'|'e')('S'|'s')?; +Bodies: ('B'|'b')('O'|'o')('D'|'d')('I'|'i')('E'|'e')('S'|'s')?; +Particles: ('P'|'p')('A'|'a')('R'|'r')('T'|'t')('I'|'i')('C'|'c')('L'|'l')('E'|'e')('S'|'s')?; +Points: ('P'|'p')('O'|'o')('I'|'i')('N'|'n')('T'|'t')('S'|'s')?; +Constants: ('C'|'c')('O'|'o')('N'|'n')('S'|'s')('T'|'t')('A'|'a')('N'|'n')('T'|'t')('S'|'s')?; +Specifieds: ('S'|'s')('P'|'p')('E'|'e')('C'|'c')('I'|'i')('F'|'f')('I'|'i')('E'|'e')('D'|'d')('S'|'s')?; +Imaginary: ('I'|'i')('M'|'m')('A'|'a')('G'|'g')('I'|'i')('N'|'n')('A'|'a')('R'|'r')('Y'|'y'); +Variables: ('V'|'v')('A'|'a')('R'|'r')('I'|'i')('A'|'a')('B'|'b')('L'|'l')('E'|'e')('S'|'s')?; +MotionVariables: ('M'|'m')('O'|'o')('T'|'t')('I'|'i')('O'|'o')('N'|'n')('V'|'v')('A'|'a')('R'|'r')('I'|'i')('A'|'a')('B'|'b')('L'|'l')('E'|'e')('S'|'s')?; + +fragment DIFF: ('\'')*; +fragment DIGIT: [0-9]; +INT: [0-9]+ ; // match integers +FLOAT: DIGIT+ '.' DIGIT* + | '.' DIGIT+; +EXP: FLOAT 'E' INT +| FLOAT 'E' '-' INT; +LINE_COMMENT : '%' .*? '\r'? '\n' -> skip ; +ID: [a-zA-Z][a-zA-Z0-9_]*; +WS: [ \t\r\n&]+ -> skip ; // toss out whitespace diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..ec81bb83325d68e1c11b43a1df5ec56846367e9f --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/__init__.py @@ -0,0 +1,97 @@ +from sympy.external import import_module +from sympy.utilities.decorator import doctest_depends_on + +@doctest_depends_on(modules=('antlr4',)) +def parse_autolev(autolev_code, include_numeric=False): + """Parses Autolev code (version 4.1) to SymPy code. + + Parameters + ========= + autolev_code : Can be an str or any object with a readlines() method (such as a file handle or StringIO). + include_numeric : boolean, optional + If True NumPy, PyDy, or other numeric code is included for numeric evaluation lines in the Autolev code. + + Returns + ======= + sympy_code : str + Equivalent SymPy and/or numpy/pydy code as the input code. + + + Example (Double Pendulum) + ========================= + >>> my_al_text = ("MOTIONVARIABLES' Q{2}', U{2}'", + ... "CONSTANTS L,M,G", + ... "NEWTONIAN N", + ... "FRAMES A,B", + ... "SIMPROT(N, A, 3, Q1)", + ... "SIMPROT(N, B, 3, Q2)", + ... "W_A_N>=U1*N3>", + ... "W_B_N>=U2*N3>", + ... "POINT O", + ... "PARTICLES P,R", + ... "P_O_P> = L*A1>", + ... "P_P_R> = L*B1>", + ... "V_O_N> = 0>", + ... "V2PTS(N, A, O, P)", + ... "V2PTS(N, B, P, R)", + ... "MASS P=M, R=M", + ... "Q1' = U1", + ... "Q2' = U2", + ... "GRAVITY(G*N1>)", + ... "ZERO = FR() + FRSTAR()", + ... "KANE()", + ... "INPUT M=1,G=9.81,L=1", + ... "INPUT Q1=.1,Q2=.2,U1=0,U2=0", + ... "INPUT TFINAL=10, INTEGSTP=.01", + ... "CODE DYNAMICS() some_filename.c") + >>> my_al_text = '\\n'.join(my_al_text) + >>> from sympy.parsing.autolev import parse_autolev + >>> print(parse_autolev(my_al_text, include_numeric=True)) + import sympy.physics.mechanics as _me + import sympy as _sm + import math as m + import numpy as _np + + q1, q2, u1, u2 = _me.dynamicsymbols('q1 q2 u1 u2') + q1_d, q2_d, u1_d, u2_d = _me.dynamicsymbols('q1_ q2_ u1_ u2_', 1) + l, m, g = _sm.symbols('l m g', real=True) + frame_n = _me.ReferenceFrame('n') + frame_a = _me.ReferenceFrame('a') + frame_b = _me.ReferenceFrame('b') + frame_a.orient(frame_n, 'Axis', [q1, frame_n.z]) + frame_b.orient(frame_n, 'Axis', [q2, frame_n.z]) + frame_a.set_ang_vel(frame_n, u1*frame_n.z) + frame_b.set_ang_vel(frame_n, u2*frame_n.z) + point_o = _me.Point('o') + particle_p = _me.Particle('p', _me.Point('p_pt'), _sm.Symbol('m')) + particle_r = _me.Particle('r', _me.Point('r_pt'), _sm.Symbol('m')) + particle_p.point.set_pos(point_o, l*frame_a.x) + particle_r.point.set_pos(particle_p.point, l*frame_b.x) + point_o.set_vel(frame_n, 0) + particle_p.point.v2pt_theory(point_o,frame_n,frame_a) + particle_r.point.v2pt_theory(particle_p.point,frame_n,frame_b) + particle_p.mass = m + particle_r.mass = m + force_p = particle_p.mass*(g*frame_n.x) + force_r = particle_r.mass*(g*frame_n.x) + kd_eqs = [q1_d - u1, q2_d - u2] + forceList = [(particle_p.point,particle_p.mass*(g*frame_n.x)), (particle_r.point,particle_r.mass*(g*frame_n.x))] + kane = _me.KanesMethod(frame_n, q_ind=[q1,q2], u_ind=[u1, u2], kd_eqs = kd_eqs) + fr, frstar = kane.kanes_equations([particle_p, particle_r], forceList) + zero = fr+frstar + from pydy.system import System + sys = System(kane, constants = {l:1, m:1, g:9.81}, + specifieds={}, + initial_conditions={q1:.1, q2:.2, u1:0, u2:0}, + times = _np.linspace(0.0, 10, 10/.01)) + + y=sys.integrate() + + """ + + _autolev = import_module( + 'sympy.parsing.autolev._parse_autolev_antlr', + import_kwargs={'fromlist': ['X']}) + + if _autolev is not None: + return _autolev.parse_autolev(autolev_code, include_numeric) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..9b71e9f51fd455558a9eb42dc840604c6c96e4b3 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/__init__.py @@ -0,0 +1,5 @@ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevlexer.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevlexer.py new file mode 100644 index 0000000000000000000000000000000000000000..f3b3b1d27ade809a63d9fd328a1572c17625443e --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevlexer.py @@ -0,0 +1,253 @@ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt +from antlr4 import * +from io import StringIO +import sys +if sys.version_info[1] > 5: + from typing import TextIO +else: + from typing.io import TextIO + + +def serializedATN(): + return [ + 4,0,49,393,6,-1,2,0,7,0,2,1,7,1,2,2,7,2,2,3,7,3,2,4,7,4,2,5,7,5, + 2,6,7,6,2,7,7,7,2,8,7,8,2,9,7,9,2,10,7,10,2,11,7,11,2,12,7,12,2, + 13,7,13,2,14,7,14,2,15,7,15,2,16,7,16,2,17,7,17,2,18,7,18,2,19,7, + 19,2,20,7,20,2,21,7,21,2,22,7,22,2,23,7,23,2,24,7,24,2,25,7,25,2, + 26,7,26,2,27,7,27,2,28,7,28,2,29,7,29,2,30,7,30,2,31,7,31,2,32,7, + 32,2,33,7,33,2,34,7,34,2,35,7,35,2,36,7,36,2,37,7,37,2,38,7,38,2, + 39,7,39,2,40,7,40,2,41,7,41,2,42,7,42,2,43,7,43,2,44,7,44,2,45,7, + 45,2,46,7,46,2,47,7,47,2,48,7,48,2,49,7,49,2,50,7,50,1,0,1,0,1,1, + 1,1,1,2,1,2,1,3,1,3,1,3,1,4,1,4,1,4,1,5,1,5,1,5,1,6,1,6,1,6,1,7, + 1,7,1,7,1,8,1,8,1,8,1,9,1,9,1,10,1,10,1,11,1,11,1,12,1,12,1,13,1, + 13,1,14,1,14,1,15,1,15,1,16,1,16,1,17,1,17,1,18,1,18,1,19,1,19,1, + 20,1,20,1,21,1,21,1,21,1,22,1,22,1,22,1,22,1,23,1,23,1,24,1,24,1, + 25,1,25,1,26,1,26,1,26,1,26,1,26,1,27,1,27,1,27,1,27,1,27,1,27,1, + 27,1,27,1,28,1,28,1,28,1,28,1,28,1,28,3,28,184,8,28,1,29,1,29,1, + 29,1,29,1,29,1,29,1,29,1,30,1,30,1,30,1,30,1,30,1,31,1,31,1,31,1, + 31,1,31,1,31,1,31,1,31,1,31,1,31,1,31,1,32,1,32,1,32,1,32,1,32,1, + 32,1,32,1,33,1,33,1,33,1,33,1,33,1,33,1,33,1,33,1,33,1,33,1,34,1, + 34,1,34,1,34,1,34,1,34,3,34,232,8,34,1,35,1,35,1,35,1,35,1,35,1, + 35,3,35,240,8,35,1,36,1,36,1,36,1,36,1,36,1,36,1,36,1,36,1,36,3, + 36,251,8,36,1,37,1,37,1,37,1,37,1,37,1,37,3,37,259,8,37,1,38,1,38, + 1,38,1,38,1,38,1,38,1,38,1,38,1,38,3,38,270,8,38,1,39,1,39,1,39, + 1,39,1,39,1,39,1,39,1,39,1,39,1,39,3,39,282,8,39,1,40,1,40,1,40, + 1,40,1,40,1,40,1,40,1,40,1,40,1,40,1,41,1,41,1,41,1,41,1,41,1,41, + 1,41,1,41,1,41,3,41,303,8,41,1,42,1,42,1,42,1,42,1,42,1,42,1,42, + 1,42,1,42,1,42,1,42,1,42,1,42,1,42,1,42,3,42,320,8,42,1,43,5,43, + 323,8,43,10,43,12,43,326,9,43,1,44,1,44,1,45,4,45,331,8,45,11,45, + 12,45,332,1,46,4,46,336,8,46,11,46,12,46,337,1,46,1,46,5,46,342, + 8,46,10,46,12,46,345,9,46,1,46,1,46,4,46,349,8,46,11,46,12,46,350, + 3,46,353,8,46,1,47,1,47,1,47,1,47,1,47,1,47,1,47,1,47,1,47,3,47, + 364,8,47,1,48,1,48,5,48,368,8,48,10,48,12,48,371,9,48,1,48,3,48, + 374,8,48,1,48,1,48,1,48,1,48,1,49,1,49,5,49,382,8,49,10,49,12,49, + 385,9,49,1,50,4,50,388,8,50,11,50,12,50,389,1,50,1,50,1,369,0,51, + 1,1,3,2,5,3,7,4,9,5,11,6,13,7,15,8,17,9,19,10,21,11,23,12,25,13, + 27,14,29,15,31,16,33,17,35,18,37,19,39,20,41,21,43,22,45,23,47,24, + 49,25,51,26,53,27,55,28,57,29,59,30,61,31,63,32,65,33,67,34,69,35, + 71,36,73,37,75,38,77,39,79,40,81,41,83,42,85,43,87,0,89,0,91,44, + 93,45,95,46,97,47,99,48,101,49,1,0,24,2,0,77,77,109,109,2,0,65,65, + 97,97,2,0,83,83,115,115,2,0,73,73,105,105,2,0,78,78,110,110,2,0, + 69,69,101,101,2,0,82,82,114,114,2,0,84,84,116,116,2,0,80,80,112, + 112,2,0,85,85,117,117,2,0,79,79,111,111,2,0,86,86,118,118,2,0,89, + 89,121,121,2,0,67,67,99,99,2,0,68,68,100,100,2,0,87,87,119,119,2, + 0,70,70,102,102,2,0,66,66,98,98,2,0,76,76,108,108,2,0,71,71,103, + 103,1,0,48,57,2,0,65,90,97,122,4,0,48,57,65,90,95,95,97,122,4,0, + 9,10,13,13,32,32,38,38,410,0,1,1,0,0,0,0,3,1,0,0,0,0,5,1,0,0,0,0, + 7,1,0,0,0,0,9,1,0,0,0,0,11,1,0,0,0,0,13,1,0,0,0,0,15,1,0,0,0,0,17, + 1,0,0,0,0,19,1,0,0,0,0,21,1,0,0,0,0,23,1,0,0,0,0,25,1,0,0,0,0,27, + 1,0,0,0,0,29,1,0,0,0,0,31,1,0,0,0,0,33,1,0,0,0,0,35,1,0,0,0,0,37, + 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1,0,0,0,71,233,1,0,0,0,73,241,1,0,0,0,75,252,1,0,0,0,77,260,1,0, + 0,0,79,271,1,0,0,0,81,283,1,0,0,0,83,293,1,0,0,0,85,304,1,0,0,0, + 87,324,1,0,0,0,89,327,1,0,0,0,91,330,1,0,0,0,93,352,1,0,0,0,95,363, + 1,0,0,0,97,365,1,0,0,0,99,379,1,0,0,0,101,387,1,0,0,0,103,104,5, + 91,0,0,104,2,1,0,0,0,105,106,5,93,0,0,106,4,1,0,0,0,107,108,5,61, + 0,0,108,6,1,0,0,0,109,110,5,43,0,0,110,111,5,61,0,0,111,8,1,0,0, + 0,112,113,5,45,0,0,113,114,5,61,0,0,114,10,1,0,0,0,115,116,5,58, + 0,0,116,117,5,61,0,0,117,12,1,0,0,0,118,119,5,42,0,0,119,120,5,61, + 0,0,120,14,1,0,0,0,121,122,5,47,0,0,122,123,5,61,0,0,123,16,1,0, + 0,0,124,125,5,94,0,0,125,126,5,61,0,0,126,18,1,0,0,0,127,128,5,44, + 0,0,128,20,1,0,0,0,129,130,5,39,0,0,130,22,1,0,0,0,131,132,5,40, + 0,0,132,24,1,0,0,0,133,134,5,41,0,0,134,26,1,0,0,0,135,136,5,123, + 0,0,136,28,1,0,0,0,137,138,5,125,0,0,138,30,1,0,0,0,139,140,5,58, + 0,0,140,32,1,0,0,0,141,142,5,43,0,0,142,34,1,0,0,0,143,144,5,45, + 0,0,144,36,1,0,0,0,145,146,5,59,0,0,146,38,1,0,0,0,147,148,5,46, + 0,0,148,40,1,0,0,0,149,150,5,62,0,0,150,42,1,0,0,0,151,152,5,48, + 0,0,152,153,5,62,0,0,153,44,1,0,0,0,154,155,5,49,0,0,155,156,5,62, + 0,0,156,157,5,62,0,0,157,46,1,0,0,0,158,159,5,94,0,0,159,48,1,0, + 0,0,160,161,5,42,0,0,161,50,1,0,0,0,162,163,5,47,0,0,163,52,1,0, + 0,0,164,165,7,0,0,0,165,166,7,1,0,0,166,167,7,2,0,0,167,168,7,2, + 0,0,168,54,1,0,0,0,169,170,7,3,0,0,170,171,7,4,0,0,171,172,7,5,0, + 0,172,173,7,6,0,0,173,174,7,7,0,0,174,175,7,3,0,0,175,176,7,1,0, + 0,176,56,1,0,0,0,177,178,7,3,0,0,178,179,7,4,0,0,179,180,7,8,0,0, + 180,181,7,9,0,0,181,183,7,7,0,0,182,184,7,2,0,0,183,182,1,0,0,0, + 183,184,1,0,0,0,184,58,1,0,0,0,185,186,7,10,0,0,186,187,7,9,0,0, + 187,188,7,7,0,0,188,189,7,8,0,0,189,190,7,9,0,0,190,191,7,7,0,0, + 191,60,1,0,0,0,192,193,7,2,0,0,193,194,7,1,0,0,194,195,7,11,0,0, + 195,196,7,5,0,0,196,62,1,0,0,0,197,198,7,9,0,0,198,199,7,4,0,0,199, + 200,7,3,0,0,200,201,7,7,0,0,201,202,7,2,0,0,202,203,7,12,0,0,203, + 204,7,2,0,0,204,205,7,7,0,0,205,206,7,5,0,0,206,207,7,0,0,0,207, + 64,1,0,0,0,208,209,7,5,0,0,209,210,7,4,0,0,210,211,7,13,0,0,211, + 212,7,10,0,0,212,213,7,14,0,0,213,214,7,5,0,0,214,66,1,0,0,0,215, + 216,7,4,0,0,216,217,7,5,0,0,217,218,7,15,0,0,218,219,7,7,0,0,219, + 220,7,10,0,0,220,221,7,4,0,0,221,222,7,3,0,0,222,223,7,1,0,0,223, + 224,7,4,0,0,224,68,1,0,0,0,225,226,7,16,0,0,226,227,7,6,0,0,227, + 228,7,1,0,0,228,229,7,0,0,0,229,231,7,5,0,0,230,232,7,2,0,0,231, + 230,1,0,0,0,231,232,1,0,0,0,232,70,1,0,0,0,233,234,7,17,0,0,234, + 235,7,10,0,0,235,236,7,14,0,0,236,237,7,3,0,0,237,239,7,5,0,0,238, + 240,7,2,0,0,239,238,1,0,0,0,239,240,1,0,0,0,240,72,1,0,0,0,241,242, + 7,8,0,0,242,243,7,1,0,0,243,244,7,6,0,0,244,245,7,7,0,0,245,246, + 7,3,0,0,246,247,7,13,0,0,247,248,7,18,0,0,248,250,7,5,0,0,249,251, + 7,2,0,0,250,249,1,0,0,0,250,251,1,0,0,0,251,74,1,0,0,0,252,253,7, + 8,0,0,253,254,7,10,0,0,254,255,7,3,0,0,255,256,7,4,0,0,256,258,7, + 7,0,0,257,259,7,2,0,0,258,257,1,0,0,0,258,259,1,0,0,0,259,76,1,0, + 0,0,260,261,7,13,0,0,261,262,7,10,0,0,262,263,7,4,0,0,263,264,7, + 2,0,0,264,265,7,7,0,0,265,266,7,1,0,0,266,267,7,4,0,0,267,269,7, + 7,0,0,268,270,7,2,0,0,269,268,1,0,0,0,269,270,1,0,0,0,270,78,1,0, + 0,0,271,272,7,2,0,0,272,273,7,8,0,0,273,274,7,5,0,0,274,275,7,13, + 0,0,275,276,7,3,0,0,276,277,7,16,0,0,277,278,7,3,0,0,278,279,7,5, + 0,0,279,281,7,14,0,0,280,282,7,2,0,0,281,280,1,0,0,0,281,282,1,0, + 0,0,282,80,1,0,0,0,283,284,7,3,0,0,284,285,7,0,0,0,285,286,7,1,0, + 0,286,287,7,19,0,0,287,288,7,3,0,0,288,289,7,4,0,0,289,290,7,1,0, + 0,290,291,7,6,0,0,291,292,7,12,0,0,292,82,1,0,0,0,293,294,7,11,0, + 0,294,295,7,1,0,0,295,296,7,6,0,0,296,297,7,3,0,0,297,298,7,1,0, + 0,298,299,7,17,0,0,299,300,7,18,0,0,300,302,7,5,0,0,301,303,7,2, + 0,0,302,301,1,0,0,0,302,303,1,0,0,0,303,84,1,0,0,0,304,305,7,0,0, + 0,305,306,7,10,0,0,306,307,7,7,0,0,307,308,7,3,0,0,308,309,7,10, + 0,0,309,310,7,4,0,0,310,311,7,11,0,0,311,312,7,1,0,0,312,313,7,6, + 0,0,313,314,7,3,0,0,314,315,7,1,0,0,315,316,7,17,0,0,316,317,7,18, + 0,0,317,319,7,5,0,0,318,320,7,2,0,0,319,318,1,0,0,0,319,320,1,0, + 0,0,320,86,1,0,0,0,321,323,5,39,0,0,322,321,1,0,0,0,323,326,1,0, + 0,0,324,322,1,0,0,0,324,325,1,0,0,0,325,88,1,0,0,0,326,324,1,0,0, + 0,327,328,7,20,0,0,328,90,1,0,0,0,329,331,7,20,0,0,330,329,1,0,0, + 0,331,332,1,0,0,0,332,330,1,0,0,0,332,333,1,0,0,0,333,92,1,0,0,0, + 334,336,3,89,44,0,335,334,1,0,0,0,336,337,1,0,0,0,337,335,1,0,0, + 0,337,338,1,0,0,0,338,339,1,0,0,0,339,343,5,46,0,0,340,342,3,89, + 44,0,341,340,1,0,0,0,342,345,1,0,0,0,343,341,1,0,0,0,343,344,1,0, + 0,0,344,353,1,0,0,0,345,343,1,0,0,0,346,348,5,46,0,0,347,349,3,89, + 44,0,348,347,1,0,0,0,349,350,1,0,0,0,350,348,1,0,0,0,350,351,1,0, + 0,0,351,353,1,0,0,0,352,335,1,0,0,0,352,346,1,0,0,0,353,94,1,0,0, + 0,354,355,3,93,46,0,355,356,5,69,0,0,356,357,3,91,45,0,357,364,1, + 0,0,0,358,359,3,93,46,0,359,360,5,69,0,0,360,361,5,45,0,0,361,362, + 3,91,45,0,362,364,1,0,0,0,363,354,1,0,0,0,363,358,1,0,0,0,364,96, + 1,0,0,0,365,369,5,37,0,0,366,368,9,0,0,0,367,366,1,0,0,0,368,371, + 1,0,0,0,369,370,1,0,0,0,369,367,1,0,0,0,370,373,1,0,0,0,371,369, + 1,0,0,0,372,374,5,13,0,0,373,372,1,0,0,0,373,374,1,0,0,0,374,375, + 1,0,0,0,375,376,5,10,0,0,376,377,1,0,0,0,377,378,6,48,0,0,378,98, + 1,0,0,0,379,383,7,21,0,0,380,382,7,22,0,0,381,380,1,0,0,0,382,385, + 1,0,0,0,383,381,1,0,0,0,383,384,1,0,0,0,384,100,1,0,0,0,385,383, + 1,0,0,0,386,388,7,23,0,0,387,386,1,0,0,0,388,389,1,0,0,0,389,387, + 1,0,0,0,389,390,1,0,0,0,390,391,1,0,0,0,391,392,6,50,0,0,392,102, + 1,0,0,0,21,0,183,231,239,250,258,269,281,302,319,324,332,337,343, + 350,352,363,369,373,383,389,1,6,0,0 + ] + +class AutolevLexer(Lexer): + + atn = ATNDeserializer().deserialize(serializedATN()) + + decisionsToDFA = [ DFA(ds, i) for i, ds in enumerate(atn.decisionToState) ] + + T__0 = 1 + T__1 = 2 + T__2 = 3 + T__3 = 4 + T__4 = 5 + T__5 = 6 + T__6 = 7 + T__7 = 8 + T__8 = 9 + T__9 = 10 + T__10 = 11 + T__11 = 12 + T__12 = 13 + T__13 = 14 + T__14 = 15 + T__15 = 16 + T__16 = 17 + T__17 = 18 + T__18 = 19 + T__19 = 20 + T__20 = 21 + T__21 = 22 + T__22 = 23 + T__23 = 24 + T__24 = 25 + T__25 = 26 + Mass = 27 + Inertia = 28 + Input = 29 + Output = 30 + Save = 31 + UnitSystem = 32 + Encode = 33 + Newtonian = 34 + Frames = 35 + Bodies = 36 + Particles = 37 + Points = 38 + Constants = 39 + Specifieds = 40 + Imaginary = 41 + Variables = 42 + MotionVariables = 43 + INT = 44 + FLOAT = 45 + EXP = 46 + LINE_COMMENT = 47 + ID = 48 + WS = 49 + + channelNames = [ u"DEFAULT_TOKEN_CHANNEL", u"HIDDEN" ] + + modeNames = [ "DEFAULT_MODE" ] + + literalNames = [ "", + "'['", "']'", "'='", "'+='", "'-='", "':='", "'*='", "'/='", + "'^='", "','", "'''", "'('", "')'", "'{'", "'}'", "':'", "'+'", + "'-'", "';'", "'.'", "'>'", "'0>'", "'1>>'", "'^'", "'*'", "'/'" ] + + symbolicNames = [ "", + "Mass", "Inertia", "Input", "Output", "Save", "UnitSystem", + "Encode", "Newtonian", "Frames", "Bodies", "Particles", "Points", + "Constants", "Specifieds", "Imaginary", "Variables", "MotionVariables", + "INT", "FLOAT", "EXP", "LINE_COMMENT", "ID", "WS" ] + + ruleNames = [ "T__0", "T__1", "T__2", "T__3", "T__4", "T__5", "T__6", + "T__7", "T__8", "T__9", "T__10", "T__11", "T__12", "T__13", + "T__14", "T__15", "T__16", "T__17", "T__18", "T__19", + "T__20", "T__21", "T__22", "T__23", "T__24", "T__25", + "Mass", "Inertia", "Input", "Output", "Save", "UnitSystem", + "Encode", "Newtonian", "Frames", "Bodies", "Particles", + "Points", "Constants", "Specifieds", "Imaginary", "Variables", + "MotionVariables", "DIFF", "DIGIT", "INT", "FLOAT", "EXP", + "LINE_COMMENT", "ID", "WS" ] + + grammarFileName = "Autolev.g4" + + def __init__(self, input=None, output:TextIO = sys.stdout): + super().__init__(input, output) + self.checkVersion("4.11.1") + self._interp = LexerATNSimulator(self, self.atn, self.decisionsToDFA, PredictionContextCache()) + self._actions = None + self._predicates = None + + diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevlistener.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevlistener.py new file mode 100644 index 0000000000000000000000000000000000000000..6f391a298a71ecf2d04cf921a919cbb68b181fab --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevlistener.py @@ -0,0 +1,421 @@ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt +from antlr4 import * +if __name__ is not None and "." in __name__: + from .autolevparser import AutolevParser +else: + from autolevparser import AutolevParser + +# This class defines a complete listener for a parse tree produced by AutolevParser. +class AutolevListener(ParseTreeListener): + + # Enter a parse tree produced by AutolevParser#prog. + def enterProg(self, ctx:AutolevParser.ProgContext): + pass + + # Exit a parse tree produced by AutolevParser#prog. + def exitProg(self, ctx:AutolevParser.ProgContext): + pass + + + # Enter a parse tree produced by AutolevParser#stat. + def enterStat(self, ctx:AutolevParser.StatContext): + pass + + # Exit a parse tree produced by AutolevParser#stat. + def exitStat(self, ctx:AutolevParser.StatContext): + pass + + + # Enter a parse tree produced by AutolevParser#vecAssign. + def enterVecAssign(self, ctx:AutolevParser.VecAssignContext): + pass + + # Exit a parse tree produced by AutolevParser#vecAssign. + def exitVecAssign(self, ctx:AutolevParser.VecAssignContext): + pass + + + # Enter a parse tree produced by AutolevParser#indexAssign. + def enterIndexAssign(self, ctx:AutolevParser.IndexAssignContext): + pass + + # Exit a parse tree produced by AutolevParser#indexAssign. + def exitIndexAssign(self, ctx:AutolevParser.IndexAssignContext): + pass + + + # Enter a parse tree produced by AutolevParser#regularAssign. + def enterRegularAssign(self, ctx:AutolevParser.RegularAssignContext): + pass + + # Exit a parse tree produced by AutolevParser#regularAssign. + def exitRegularAssign(self, ctx:AutolevParser.RegularAssignContext): + pass + + + # Enter a parse tree produced by AutolevParser#equals. + def enterEquals(self, ctx:AutolevParser.EqualsContext): + pass + + # Exit a parse tree produced by AutolevParser#equals. + def exitEquals(self, ctx:AutolevParser.EqualsContext): + pass + + + # Enter a parse tree produced by AutolevParser#index. + def enterIndex(self, ctx:AutolevParser.IndexContext): + pass + + # Exit a parse tree produced by AutolevParser#index. + def exitIndex(self, ctx:AutolevParser.IndexContext): + pass + + + # Enter a parse tree produced by AutolevParser#diff. + def enterDiff(self, ctx:AutolevParser.DiffContext): + pass + + # Exit a parse tree produced by AutolevParser#diff. + def exitDiff(self, ctx:AutolevParser.DiffContext): + pass + + + # Enter a parse tree produced by AutolevParser#functionCall. + def enterFunctionCall(self, ctx:AutolevParser.FunctionCallContext): + pass + + # Exit a parse tree produced by AutolevParser#functionCall. + def exitFunctionCall(self, ctx:AutolevParser.FunctionCallContext): + pass + + + # Enter a parse tree produced by AutolevParser#varDecl. + def enterVarDecl(self, ctx:AutolevParser.VarDeclContext): + pass + + # Exit a parse tree produced by AutolevParser#varDecl. + def exitVarDecl(self, ctx:AutolevParser.VarDeclContext): + pass + + + # Enter a parse tree produced by AutolevParser#varType. + def enterVarType(self, ctx:AutolevParser.VarTypeContext): + pass + + # Exit a parse tree produced by AutolevParser#varType. + def exitVarType(self, ctx:AutolevParser.VarTypeContext): + pass + + + # Enter a parse tree produced by AutolevParser#varDecl2. + def enterVarDecl2(self, ctx:AutolevParser.VarDecl2Context): + pass + + # Exit a parse tree produced by AutolevParser#varDecl2. + def exitVarDecl2(self, ctx:AutolevParser.VarDecl2Context): + pass + + + # Enter a parse tree produced by AutolevParser#ranges. + def enterRanges(self, ctx:AutolevParser.RangesContext): + pass + + # Exit a parse tree produced by AutolevParser#ranges. + def exitRanges(self, ctx:AutolevParser.RangesContext): + pass + + + # Enter a parse tree produced by AutolevParser#massDecl. + def enterMassDecl(self, ctx:AutolevParser.MassDeclContext): + pass + + # Exit a parse tree produced by AutolevParser#massDecl. + def exitMassDecl(self, ctx:AutolevParser.MassDeclContext): + pass + + + # Enter a parse tree produced by AutolevParser#massDecl2. + def enterMassDecl2(self, ctx:AutolevParser.MassDecl2Context): + pass + + # Exit a parse tree produced by AutolevParser#massDecl2. + def exitMassDecl2(self, ctx:AutolevParser.MassDecl2Context): + pass + + + # Enter a parse tree produced by AutolevParser#inertiaDecl. + def enterInertiaDecl(self, ctx:AutolevParser.InertiaDeclContext): + pass + + # Exit a parse tree produced by AutolevParser#inertiaDecl. + def exitInertiaDecl(self, ctx:AutolevParser.InertiaDeclContext): + pass + + + # Enter a parse tree produced by AutolevParser#matrix. + def enterMatrix(self, ctx:AutolevParser.MatrixContext): + pass + + # Exit a parse tree produced by AutolevParser#matrix. + def exitMatrix(self, ctx:AutolevParser.MatrixContext): + pass + + + # Enter a parse tree produced by AutolevParser#matrixInOutput. + def enterMatrixInOutput(self, ctx:AutolevParser.MatrixInOutputContext): + pass + + # Exit a parse tree produced by AutolevParser#matrixInOutput. + def exitMatrixInOutput(self, ctx:AutolevParser.MatrixInOutputContext): + pass + + + # Enter a parse tree produced by AutolevParser#codeCommands. + def enterCodeCommands(self, ctx:AutolevParser.CodeCommandsContext): + pass + + # Exit a parse tree produced by AutolevParser#codeCommands. + def exitCodeCommands(self, ctx:AutolevParser.CodeCommandsContext): + pass + + + # Enter a parse tree produced by AutolevParser#settings. + def enterSettings(self, ctx:AutolevParser.SettingsContext): + pass + + # Exit a parse tree produced by AutolevParser#settings. + def exitSettings(self, ctx:AutolevParser.SettingsContext): + pass + + + # Enter a parse tree produced by AutolevParser#units. + def enterUnits(self, ctx:AutolevParser.UnitsContext): + pass + + # Exit a parse tree produced by AutolevParser#units. + def exitUnits(self, ctx:AutolevParser.UnitsContext): + pass + + + # Enter a parse tree produced by AutolevParser#inputs. + def enterInputs(self, ctx:AutolevParser.InputsContext): + pass + + # Exit a parse tree produced by AutolevParser#inputs. + def exitInputs(self, ctx:AutolevParser.InputsContext): + pass + + + # Enter a parse tree produced by AutolevParser#id_diff. + def enterId_diff(self, ctx:AutolevParser.Id_diffContext): + pass + + # Exit a parse tree produced by AutolevParser#id_diff. + def exitId_diff(self, ctx:AutolevParser.Id_diffContext): + pass + + + # Enter a parse tree produced by AutolevParser#inputs2. + def enterInputs2(self, ctx:AutolevParser.Inputs2Context): + pass + + # Exit a parse tree produced by AutolevParser#inputs2. + def exitInputs2(self, ctx:AutolevParser.Inputs2Context): + pass + + + # Enter a parse tree produced by AutolevParser#outputs. + def enterOutputs(self, ctx:AutolevParser.OutputsContext): + pass + + # Exit a parse tree produced by AutolevParser#outputs. + def exitOutputs(self, ctx:AutolevParser.OutputsContext): + pass + + + # Enter a parse tree produced by AutolevParser#outputs2. + def enterOutputs2(self, ctx:AutolevParser.Outputs2Context): + pass + + # Exit a parse tree produced by AutolevParser#outputs2. + def exitOutputs2(self, ctx:AutolevParser.Outputs2Context): + pass + + + # Enter a parse tree produced by AutolevParser#codegen. + def enterCodegen(self, ctx:AutolevParser.CodegenContext): + pass + + # Exit a parse tree produced by AutolevParser#codegen. + def exitCodegen(self, ctx:AutolevParser.CodegenContext): + pass + + + # Enter a parse tree produced by AutolevParser#commands. + def enterCommands(self, ctx:AutolevParser.CommandsContext): + pass + + # Exit a parse tree produced by AutolevParser#commands. + def exitCommands(self, ctx:AutolevParser.CommandsContext): + pass + + + # Enter a parse tree produced by AutolevParser#vec. + def enterVec(self, ctx:AutolevParser.VecContext): + pass + + # Exit a parse tree produced by AutolevParser#vec. + def exitVec(self, ctx:AutolevParser.VecContext): + pass + + + # Enter a parse tree produced by AutolevParser#parens. + def enterParens(self, ctx:AutolevParser.ParensContext): + pass + + # Exit a parse tree produced by AutolevParser#parens. + def exitParens(self, ctx:AutolevParser.ParensContext): + pass + + + # Enter a parse tree produced by AutolevParser#VectorOrDyadic. + def enterVectorOrDyadic(self, ctx:AutolevParser.VectorOrDyadicContext): + pass + + # Exit a parse tree produced by AutolevParser#VectorOrDyadic. + def exitVectorOrDyadic(self, ctx:AutolevParser.VectorOrDyadicContext): + pass + + + # Enter a parse tree produced by AutolevParser#Exponent. + def enterExponent(self, ctx:AutolevParser.ExponentContext): + pass + + # Exit a parse tree produced by AutolevParser#Exponent. + def exitExponent(self, ctx:AutolevParser.ExponentContext): + pass + + + # Enter a parse tree produced by AutolevParser#MulDiv. + def enterMulDiv(self, ctx:AutolevParser.MulDivContext): + pass + + # Exit a parse tree produced by AutolevParser#MulDiv. + def exitMulDiv(self, ctx:AutolevParser.MulDivContext): + pass + + + # Enter a parse tree produced by AutolevParser#AddSub. + def enterAddSub(self, ctx:AutolevParser.AddSubContext): + pass + + # Exit a parse tree produced by AutolevParser#AddSub. + def exitAddSub(self, ctx:AutolevParser.AddSubContext): + pass + + + # Enter a parse tree produced by AutolevParser#float. + def enterFloat(self, ctx:AutolevParser.FloatContext): + pass + + # Exit a parse tree produced by AutolevParser#float. + def exitFloat(self, ctx:AutolevParser.FloatContext): + pass + + + # Enter a parse tree produced by AutolevParser#int. + def enterInt(self, ctx:AutolevParser.IntContext): + pass + + # Exit a parse tree produced by AutolevParser#int. + def exitInt(self, ctx:AutolevParser.IntContext): + pass + + + # Enter a parse tree produced by AutolevParser#idEqualsExpr. + def enterIdEqualsExpr(self, ctx:AutolevParser.IdEqualsExprContext): + pass + + # Exit a parse tree produced by AutolevParser#idEqualsExpr. + def exitIdEqualsExpr(self, ctx:AutolevParser.IdEqualsExprContext): + pass + + + # Enter a parse tree produced by AutolevParser#negativeOne. + def enterNegativeOne(self, ctx:AutolevParser.NegativeOneContext): + pass + + # Exit a parse tree produced by AutolevParser#negativeOne. + def exitNegativeOne(self, ctx:AutolevParser.NegativeOneContext): + pass + + + # Enter a parse tree produced by AutolevParser#function. + def enterFunction(self, ctx:AutolevParser.FunctionContext): + pass + + # Exit a parse tree produced by AutolevParser#function. + def exitFunction(self, ctx:AutolevParser.FunctionContext): + pass + + + # Enter a parse tree produced by AutolevParser#rangess. + def enterRangess(self, ctx:AutolevParser.RangessContext): + pass + + # Exit a parse tree produced by AutolevParser#rangess. + def exitRangess(self, ctx:AutolevParser.RangessContext): + pass + + + # Enter a parse tree produced by AutolevParser#colon. + def enterColon(self, ctx:AutolevParser.ColonContext): + pass + + # Exit a parse tree produced by AutolevParser#colon. + def exitColon(self, ctx:AutolevParser.ColonContext): + pass + + + # Enter a parse tree produced by AutolevParser#id. + def enterId(self, ctx:AutolevParser.IdContext): + pass + + # Exit a parse tree produced by AutolevParser#id. + def exitId(self, ctx:AutolevParser.IdContext): + pass + + + # Enter a parse tree produced by AutolevParser#exp. + def enterExp(self, ctx:AutolevParser.ExpContext): + pass + + # Exit a parse tree produced by AutolevParser#exp. + def exitExp(self, ctx:AutolevParser.ExpContext): + pass + + + # Enter a parse tree produced by AutolevParser#matrices. + def enterMatrices(self, ctx:AutolevParser.MatricesContext): + pass + + # Exit a parse tree produced by AutolevParser#matrices. + def exitMatrices(self, ctx:AutolevParser.MatricesContext): + pass + + + # Enter a parse tree produced by AutolevParser#Indexing. + def enterIndexing(self, ctx:AutolevParser.IndexingContext): + pass + + # Exit a parse tree produced by AutolevParser#Indexing. + def exitIndexing(self, ctx:AutolevParser.IndexingContext): + pass + + + +del AutolevParser diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevparser.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevparser.py new file mode 100644 index 0000000000000000000000000000000000000000..e63ef1c110812580d06291ee7c7ec40b6a076cea --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_antlr/autolevparser.py @@ -0,0 +1,3063 @@ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt +from antlr4 import * +from io import StringIO +import sys +if sys.version_info[1] > 5: + from typing import TextIO +else: + from typing.io import TextIO + +def serializedATN(): + return [ + 4,1,49,431,2,0,7,0,2,1,7,1,2,2,7,2,2,3,7,3,2,4,7,4,2,5,7,5,2,6,7, + 6,2,7,7,7,2,8,7,8,2,9,7,9,2,10,7,10,2,11,7,11,2,12,7,12,2,13,7,13, + 2,14,7,14,2,15,7,15,2,16,7,16,2,17,7,17,2,18,7,18,2,19,7,19,2,20, + 7,20,2,21,7,21,2,22,7,22,2,23,7,23,2,24,7,24,2,25,7,25,2,26,7,26, + 2,27,7,27,1,0,4,0,58,8,0,11,0,12,0,59,1,1,1,1,1,1,1,1,1,1,1,1,1, + 1,3,1,69,8,1,1,2,1,2,1,2,1,2,1,2,1,2,1,2,1,2,1,2,1,2,1,2,1,2,1,2, + 3,2,84,8,2,1,2,1,2,1,2,3,2,89,8,2,1,3,1,3,1,4,1,4,1,4,5,4,96,8,4, + 10,4,12,4,99,9,4,1,5,4,5,102,8,5,11,5,12,5,103,1,6,1,6,1,6,1,6,1, + 6,5,6,111,8,6,10,6,12,6,114,9,6,3,6,116,8,6,1,6,1,6,1,6,1,6,1,6, + 1,6,5,6,124,8,6,10,6,12,6,127,9,6,3,6,129,8,6,1,6,3,6,132,8,6,1, + 7,1,7,1,7,1,7,5,7,138,8,7,10,7,12,7,141,9,7,1,8,1,8,1,8,1,8,1,8, + 1,8,1,8,1,8,1,8,1,8,5,8,153,8,8,10,8,12,8,156,9,8,1,8,1,8,5,8,160, + 8,8,10,8,12,8,163,9,8,3,8,165,8,8,1,9,1,9,1,9,1,9,1,9,1,9,3,9,173, + 8,9,1,9,1,9,1,9,1,9,1,9,1,9,1,9,1,9,5,9,183,8,9,10,9,12,9,186,9, + 9,1,9,3,9,189,8,9,1,9,1,9,1,9,3,9,194,8,9,1,9,3,9,197,8,9,1,9,5, + 9,200,8,9,10,9,12,9,203,9,9,1,9,1,9,3,9,207,8,9,1,10,1,10,1,10,1, + 10,1,10,1,10,1,10,1,10,5,10,217,8,10,10,10,12,10,220,9,10,1,10,1, + 10,1,11,1,11,1,11,1,11,5,11,228,8,11,10,11,12,11,231,9,11,1,12,1, + 12,1,12,1,12,1,13,1,13,1,13,1,13,1,13,3,13,242,8,13,1,13,1,13,4, + 13,246,8,13,11,13,12,13,247,1,14,1,14,1,14,1,14,5,14,254,8,14,10, + 14,12,14,257,9,14,1,14,1,14,1,15,1,15,1,15,1,15,3,15,265,8,15,1, + 15,1,15,3,15,269,8,15,1,16,1,16,1,16,1,16,1,16,3,16,276,8,16,1,17, + 1,17,3,17,280,8,17,1,18,1,18,1,18,1,18,5,18,286,8,18,10,18,12,18, + 289,9,18,1,19,1,19,1,19,1,19,5,19,295,8,19,10,19,12,19,298,9,19, + 1,20,1,20,3,20,302,8,20,1,21,1,21,1,21,1,21,3,21,308,8,21,1,22,1, + 22,1,22,1,22,5,22,314,8,22,10,22,12,22,317,9,22,1,23,1,23,3,23,321, + 8,23,1,24,1,24,1,24,1,24,1,24,1,24,5,24,329,8,24,10,24,12,24,332, + 9,24,1,24,1,24,3,24,336,8,24,1,24,1,24,1,24,1,24,1,25,1,25,1,25, + 1,25,1,25,1,25,1,25,1,25,5,25,350,8,25,10,25,12,25,353,9,25,3,25, + 355,8,25,1,26,1,26,4,26,359,8,26,11,26,12,26,360,1,26,1,26,3,26, + 365,8,26,1,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,5,27,375,8,27,10, + 27,12,27,378,9,27,1,27,1,27,1,27,1,27,1,27,1,27,5,27,386,8,27,10, + 27,12,27,389,9,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,3, + 27,400,8,27,1,27,1,27,5,27,404,8,27,10,27,12,27,407,9,27,3,27,409, + 8,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27,1,27, + 1,27,1,27,1,27,5,27,426,8,27,10,27,12,27,429,9,27,1,27,0,1,54,28, + 0,2,4,6,8,10,12,14,16,18,20,22,24,26,28,30,32,34,36,38,40,42,44, + 46,48,50,52,54,0,7,1,0,3,9,1,0,27,28,1,0,17,18,2,0,10,10,19,19,1, + 0,44,45,2,0,44,46,48,48,1,0,25,26,483,0,57,1,0,0,0,2,68,1,0,0,0, + 4,88,1,0,0,0,6,90,1,0,0,0,8,92,1,0,0,0,10,101,1,0,0,0,12,131,1,0, + 0,0,14,133,1,0,0,0,16,164,1,0,0,0,18,166,1,0,0,0,20,208,1,0,0,0, + 22,223,1,0,0,0,24,232,1,0,0,0,26,236,1,0,0,0,28,249,1,0,0,0,30,268, + 1,0,0,0,32,275,1,0,0,0,34,277,1,0,0,0,36,281,1,0,0,0,38,290,1,0, + 0,0,40,299,1,0,0,0,42,303,1,0,0,0,44,309,1,0,0,0,46,318,1,0,0,0, + 48,322,1,0,0,0,50,354,1,0,0,0,52,364,1,0,0,0,54,408,1,0,0,0,56,58, + 3,2,1,0,57,56,1,0,0,0,58,59,1,0,0,0,59,57,1,0,0,0,59,60,1,0,0,0, + 60,1,1,0,0,0,61,69,3,14,7,0,62,69,3,12,6,0,63,69,3,32,16,0,64,69, + 3,22,11,0,65,69,3,26,13,0,66,69,3,4,2,0,67,69,3,34,17,0,68,61,1, + 0,0,0,68,62,1,0,0,0,68,63,1,0,0,0,68,64,1,0,0,0,68,65,1,0,0,0,68, + 66,1,0,0,0,68,67,1,0,0,0,69,3,1,0,0,0,70,71,3,52,26,0,71,72,3,6, + 3,0,72,73,3,54,27,0,73,89,1,0,0,0,74,75,5,48,0,0,75,76,5,1,0,0,76, + 77,3,8,4,0,77,78,5,2,0,0,78,79,3,6,3,0,79,80,3,54,27,0,80,89,1,0, + 0,0,81,83,5,48,0,0,82,84,3,10,5,0,83,82,1,0,0,0,83,84,1,0,0,0,84, + 85,1,0,0,0,85,86,3,6,3,0,86,87,3,54,27,0,87,89,1,0,0,0,88,70,1,0, + 0,0,88,74,1,0,0,0,88,81,1,0,0,0,89,5,1,0,0,0,90,91,7,0,0,0,91,7, + 1,0,0,0,92,97,3,54,27,0,93,94,5,10,0,0,94,96,3,54,27,0,95,93,1,0, + 0,0,96,99,1,0,0,0,97,95,1,0,0,0,97,98,1,0,0,0,98,9,1,0,0,0,99,97, + 1,0,0,0,100,102,5,11,0,0,101,100,1,0,0,0,102,103,1,0,0,0,103,101, + 1,0,0,0,103,104,1,0,0,0,104,11,1,0,0,0,105,106,5,48,0,0,106,115, + 5,12,0,0,107,112,3,54,27,0,108,109,5,10,0,0,109,111,3,54,27,0,110, + 108,1,0,0,0,111,114,1,0,0,0,112,110,1,0,0,0,112,113,1,0,0,0,113, + 116,1,0,0,0,114,112,1,0,0,0,115,107,1,0,0,0,115,116,1,0,0,0,116, + 117,1,0,0,0,117,132,5,13,0,0,118,119,7,1,0,0,119,128,5,12,0,0,120, + 125,5,48,0,0,121,122,5,10,0,0,122,124,5,48,0,0,123,121,1,0,0,0,124, + 127,1,0,0,0,125,123,1,0,0,0,125,126,1,0,0,0,126,129,1,0,0,0,127, + 125,1,0,0,0,128,120,1,0,0,0,128,129,1,0,0,0,129,130,1,0,0,0,130, + 132,5,13,0,0,131,105,1,0,0,0,131,118,1,0,0,0,132,13,1,0,0,0,133, + 134,3,16,8,0,134,139,3,18,9,0,135,136,5,10,0,0,136,138,3,18,9,0, + 137,135,1,0,0,0,138,141,1,0,0,0,139,137,1,0,0,0,139,140,1,0,0,0, + 140,15,1,0,0,0,141,139,1,0,0,0,142,165,5,34,0,0,143,165,5,35,0,0, + 144,165,5,36,0,0,145,165,5,37,0,0,146,165,5,38,0,0,147,165,5,39, + 0,0,148,165,5,40,0,0,149,165,5,41,0,0,150,154,5,42,0,0,151,153,5, + 11,0,0,152,151,1,0,0,0,153,156,1,0,0,0,154,152,1,0,0,0,154,155,1, + 0,0,0,155,165,1,0,0,0,156,154,1,0,0,0,157,161,5,43,0,0,158,160,5, + 11,0,0,159,158,1,0,0,0,160,163,1,0,0,0,161,159,1,0,0,0,161,162,1, + 0,0,0,162,165,1,0,0,0,163,161,1,0,0,0,164,142,1,0,0,0,164,143,1, + 0,0,0,164,144,1,0,0,0,164,145,1,0,0,0,164,146,1,0,0,0,164,147,1, + 0,0,0,164,148,1,0,0,0,164,149,1,0,0,0,164,150,1,0,0,0,164,157,1, + 0,0,0,165,17,1,0,0,0,166,172,5,48,0,0,167,168,5,14,0,0,168,169,5, + 44,0,0,169,170,5,10,0,0,170,171,5,44,0,0,171,173,5,15,0,0,172,167, + 1,0,0,0,172,173,1,0,0,0,173,188,1,0,0,0,174,175,5,14,0,0,175,176, + 5,44,0,0,176,177,5,16,0,0,177,184,5,44,0,0,178,179,5,10,0,0,179, + 180,5,44,0,0,180,181,5,16,0,0,181,183,5,44,0,0,182,178,1,0,0,0,183, + 186,1,0,0,0,184,182,1,0,0,0,184,185,1,0,0,0,185,187,1,0,0,0,186, + 184,1,0,0,0,187,189,5,15,0,0,188,174,1,0,0,0,188,189,1,0,0,0,189, + 193,1,0,0,0,190,191,5,14,0,0,191,192,5,44,0,0,192,194,5,15,0,0,193, + 190,1,0,0,0,193,194,1,0,0,0,194,196,1,0,0,0,195,197,7,2,0,0,196, + 195,1,0,0,0,196,197,1,0,0,0,197,201,1,0,0,0,198,200,5,11,0,0,199, + 198,1,0,0,0,200,203,1,0,0,0,201,199,1,0,0,0,201,202,1,0,0,0,202, + 206,1,0,0,0,203,201,1,0,0,0,204,205,5,3,0,0,205,207,3,54,27,0,206, + 204,1,0,0,0,206,207,1,0,0,0,207,19,1,0,0,0,208,209,5,14,0,0,209, + 210,5,44,0,0,210,211,5,16,0,0,211,218,5,44,0,0,212,213,5,10,0,0, + 213,214,5,44,0,0,214,215,5,16,0,0,215,217,5,44,0,0,216,212,1,0,0, + 0,217,220,1,0,0,0,218,216,1,0,0,0,218,219,1,0,0,0,219,221,1,0,0, + 0,220,218,1,0,0,0,221,222,5,15,0,0,222,21,1,0,0,0,223,224,5,27,0, + 0,224,229,3,24,12,0,225,226,5,10,0,0,226,228,3,24,12,0,227,225,1, + 0,0,0,228,231,1,0,0,0,229,227,1,0,0,0,229,230,1,0,0,0,230,23,1,0, + 0,0,231,229,1,0,0,0,232,233,5,48,0,0,233,234,5,3,0,0,234,235,3,54, + 27,0,235,25,1,0,0,0,236,237,5,28,0,0,237,241,5,48,0,0,238,239,5, + 12,0,0,239,240,5,48,0,0,240,242,5,13,0,0,241,238,1,0,0,0,241,242, + 1,0,0,0,242,245,1,0,0,0,243,244,5,10,0,0,244,246,3,54,27,0,245,243, + 1,0,0,0,246,247,1,0,0,0,247,245,1,0,0,0,247,248,1,0,0,0,248,27,1, + 0,0,0,249,250,5,1,0,0,250,255,3,54,27,0,251,252,7,3,0,0,252,254, + 3,54,27,0,253,251,1,0,0,0,254,257,1,0,0,0,255,253,1,0,0,0,255,256, + 1,0,0,0,256,258,1,0,0,0,257,255,1,0,0,0,258,259,5,2,0,0,259,29,1, + 0,0,0,260,261,5,48,0,0,261,262,5,48,0,0,262,264,5,3,0,0,263,265, + 7,4,0,0,264,263,1,0,0,0,264,265,1,0,0,0,265,269,1,0,0,0,266,269, + 5,45,0,0,267,269,5,44,0,0,268,260,1,0,0,0,268,266,1,0,0,0,268,267, + 1,0,0,0,269,31,1,0,0,0,270,276,3,36,18,0,271,276,3,38,19,0,272,276, + 3,44,22,0,273,276,3,48,24,0,274,276,3,50,25,0,275,270,1,0,0,0,275, + 271,1,0,0,0,275,272,1,0,0,0,275,273,1,0,0,0,275,274,1,0,0,0,276, + 33,1,0,0,0,277,279,5,48,0,0,278,280,7,5,0,0,279,278,1,0,0,0,279, + 280,1,0,0,0,280,35,1,0,0,0,281,282,5,32,0,0,282,287,5,48,0,0,283, + 284,5,10,0,0,284,286,5,48,0,0,285,283,1,0,0,0,286,289,1,0,0,0,287, + 285,1,0,0,0,287,288,1,0,0,0,288,37,1,0,0,0,289,287,1,0,0,0,290,291, + 5,29,0,0,291,296,3,42,21,0,292,293,5,10,0,0,293,295,3,42,21,0,294, + 292,1,0,0,0,295,298,1,0,0,0,296,294,1,0,0,0,296,297,1,0,0,0,297, + 39,1,0,0,0,298,296,1,0,0,0,299,301,5,48,0,0,300,302,3,10,5,0,301, + 300,1,0,0,0,301,302,1,0,0,0,302,41,1,0,0,0,303,304,3,40,20,0,304, + 305,5,3,0,0,305,307,3,54,27,0,306,308,3,54,27,0,307,306,1,0,0,0, + 307,308,1,0,0,0,308,43,1,0,0,0,309,310,5,30,0,0,310,315,3,46,23, + 0,311,312,5,10,0,0,312,314,3,46,23,0,313,311,1,0,0,0,314,317,1,0, + 0,0,315,313,1,0,0,0,315,316,1,0,0,0,316,45,1,0,0,0,317,315,1,0,0, + 0,318,320,3,54,27,0,319,321,3,54,27,0,320,319,1,0,0,0,320,321,1, + 0,0,0,321,47,1,0,0,0,322,323,5,48,0,0,323,335,3,12,6,0,324,325,5, + 1,0,0,325,330,3,30,15,0,326,327,5,10,0,0,327,329,3,30,15,0,328,326, + 1,0,0,0,329,332,1,0,0,0,330,328,1,0,0,0,330,331,1,0,0,0,331,333, + 1,0,0,0,332,330,1,0,0,0,333,334,5,2,0,0,334,336,1,0,0,0,335,324, + 1,0,0,0,335,336,1,0,0,0,336,337,1,0,0,0,337,338,5,48,0,0,338,339, + 5,20,0,0,339,340,5,48,0,0,340,49,1,0,0,0,341,342,5,31,0,0,342,343, + 5,48,0,0,343,344,5,20,0,0,344,355,5,48,0,0,345,346,5,33,0,0,346, + 351,5,48,0,0,347,348,5,10,0,0,348,350,5,48,0,0,349,347,1,0,0,0,350, + 353,1,0,0,0,351,349,1,0,0,0,351,352,1,0,0,0,352,355,1,0,0,0,353, + 351,1,0,0,0,354,341,1,0,0,0,354,345,1,0,0,0,355,51,1,0,0,0,356,358, + 5,48,0,0,357,359,5,21,0,0,358,357,1,0,0,0,359,360,1,0,0,0,360,358, + 1,0,0,0,360,361,1,0,0,0,361,365,1,0,0,0,362,365,5,22,0,0,363,365, + 5,23,0,0,364,356,1,0,0,0,364,362,1,0,0,0,364,363,1,0,0,0,365,53, + 1,0,0,0,366,367,6,27,-1,0,367,409,5,46,0,0,368,369,5,18,0,0,369, + 409,3,54,27,12,370,409,5,45,0,0,371,409,5,44,0,0,372,376,5,48,0, + 0,373,375,5,11,0,0,374,373,1,0,0,0,375,378,1,0,0,0,376,374,1,0,0, + 0,376,377,1,0,0,0,377,409,1,0,0,0,378,376,1,0,0,0,379,409,3,52,26, + 0,380,381,5,48,0,0,381,382,5,1,0,0,382,387,3,54,27,0,383,384,5,10, + 0,0,384,386,3,54,27,0,385,383,1,0,0,0,386,389,1,0,0,0,387,385,1, + 0,0,0,387,388,1,0,0,0,388,390,1,0,0,0,389,387,1,0,0,0,390,391,5, + 2,0,0,391,409,1,0,0,0,392,409,3,12,6,0,393,409,3,28,14,0,394,395, + 5,12,0,0,395,396,3,54,27,0,396,397,5,13,0,0,397,409,1,0,0,0,398, + 400,5,48,0,0,399,398,1,0,0,0,399,400,1,0,0,0,400,401,1,0,0,0,401, + 405,3,20,10,0,402,404,5,11,0,0,403,402,1,0,0,0,404,407,1,0,0,0,405, + 403,1,0,0,0,405,406,1,0,0,0,406,409,1,0,0,0,407,405,1,0,0,0,408, + 366,1,0,0,0,408,368,1,0,0,0,408,370,1,0,0,0,408,371,1,0,0,0,408, + 372,1,0,0,0,408,379,1,0,0,0,408,380,1,0,0,0,408,392,1,0,0,0,408, + 393,1,0,0,0,408,394,1,0,0,0,408,399,1,0,0,0,409,427,1,0,0,0,410, + 411,10,16,0,0,411,412,5,24,0,0,412,426,3,54,27,17,413,414,10,15, + 0,0,414,415,7,6,0,0,415,426,3,54,27,16,416,417,10,14,0,0,417,418, + 7,2,0,0,418,426,3,54,27,15,419,420,10,3,0,0,420,421,5,3,0,0,421, + 426,3,54,27,4,422,423,10,2,0,0,423,424,5,16,0,0,424,426,3,54,27, + 3,425,410,1,0,0,0,425,413,1,0,0,0,425,416,1,0,0,0,425,419,1,0,0, + 0,425,422,1,0,0,0,426,429,1,0,0,0,427,425,1,0,0,0,427,428,1,0,0, + 0,428,55,1,0,0,0,429,427,1,0,0,0,50,59,68,83,88,97,103,112,115,125, + 128,131,139,154,161,164,172,184,188,193,196,201,206,218,229,241, + 247,255,264,268,275,279,287,296,301,307,315,320,330,335,351,354, + 360,364,376,387,399,405,408,425,427 + ] + +class AutolevParser ( Parser ): + + grammarFileName = "Autolev.g4" + + atn = ATNDeserializer().deserialize(serializedATN()) + + decisionsToDFA = [ DFA(ds, i) for i, ds in enumerate(atn.decisionToState) ] + + sharedContextCache = PredictionContextCache() + + literalNames = [ "", "'['", "']'", "'='", "'+='", "'-='", "':='", + "'*='", "'/='", "'^='", "','", "'''", "'('", "')'", + "'{'", "'}'", "':'", "'+'", "'-'", "';'", "'.'", "'>'", + "'0>'", "'1>>'", "'^'", "'*'", "'/'" ] + + symbolicNames = [ "", "", "", "", + "", "", "", "", + "", "", "", "", + "", "", "", "", + "", "", "", "", + "", "", "", "", + "", "", "", "Mass", "Inertia", + "Input", "Output", "Save", "UnitSystem", "Encode", + "Newtonian", "Frames", "Bodies", "Particles", "Points", + "Constants", "Specifieds", "Imaginary", "Variables", + "MotionVariables", "INT", "FLOAT", "EXP", "LINE_COMMENT", + "ID", "WS" ] + + RULE_prog = 0 + RULE_stat = 1 + RULE_assignment = 2 + RULE_equals = 3 + RULE_index = 4 + RULE_diff = 5 + RULE_functionCall = 6 + RULE_varDecl = 7 + RULE_varType = 8 + RULE_varDecl2 = 9 + RULE_ranges = 10 + RULE_massDecl = 11 + RULE_massDecl2 = 12 + RULE_inertiaDecl = 13 + RULE_matrix = 14 + RULE_matrixInOutput = 15 + RULE_codeCommands = 16 + RULE_settings = 17 + RULE_units = 18 + RULE_inputs = 19 + RULE_id_diff = 20 + RULE_inputs2 = 21 + RULE_outputs = 22 + RULE_outputs2 = 23 + RULE_codegen = 24 + RULE_commands = 25 + RULE_vec = 26 + RULE_expr = 27 + + ruleNames = [ "prog", "stat", "assignment", "equals", "index", "diff", + "functionCall", "varDecl", "varType", "varDecl2", "ranges", + "massDecl", "massDecl2", "inertiaDecl", "matrix", "matrixInOutput", + "codeCommands", "settings", "units", "inputs", "id_diff", + "inputs2", "outputs", "outputs2", "codegen", "commands", + "vec", "expr" ] + + EOF = Token.EOF + T__0=1 + T__1=2 + T__2=3 + T__3=4 + T__4=5 + T__5=6 + T__6=7 + T__7=8 + T__8=9 + T__9=10 + T__10=11 + T__11=12 + T__12=13 + T__13=14 + T__14=15 + T__15=16 + T__16=17 + T__17=18 + T__18=19 + T__19=20 + T__20=21 + T__21=22 + T__22=23 + T__23=24 + T__24=25 + T__25=26 + Mass=27 + Inertia=28 + Input=29 + Output=30 + Save=31 + UnitSystem=32 + Encode=33 + Newtonian=34 + Frames=35 + Bodies=36 + Particles=37 + Points=38 + Constants=39 + Specifieds=40 + Imaginary=41 + Variables=42 + MotionVariables=43 + INT=44 + FLOAT=45 + EXP=46 + LINE_COMMENT=47 + ID=48 + WS=49 + + def __init__(self, input:TokenStream, output:TextIO = sys.stdout): + super().__init__(input, output) + self.checkVersion("4.11.1") + self._interp = ParserATNSimulator(self, self.atn, self.decisionsToDFA, self.sharedContextCache) + self._predicates = None + + + + + class ProgContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def stat(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.StatContext) + else: + return self.getTypedRuleContext(AutolevParser.StatContext,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_prog + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterProg" ): + listener.enterProg(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitProg" ): + listener.exitProg(self) + + + + + def prog(self): + + localctx = AutolevParser.ProgContext(self, self._ctx, self.state) + self.enterRule(localctx, 0, self.RULE_prog) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 57 + self._errHandler.sync(self) + _la = self._input.LA(1) + while True: + self.state = 56 + self.stat() + self.state = 59 + self._errHandler.sync(self) + _la = self._input.LA(1) + if not (((_la) & ~0x3f) == 0 and ((1 << _la) & 299067041120256) != 0): + break + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class StatContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def varDecl(self): + return self.getTypedRuleContext(AutolevParser.VarDeclContext,0) + + + def functionCall(self): + return self.getTypedRuleContext(AutolevParser.FunctionCallContext,0) + + + def codeCommands(self): + return self.getTypedRuleContext(AutolevParser.CodeCommandsContext,0) + + + def massDecl(self): + return self.getTypedRuleContext(AutolevParser.MassDeclContext,0) + + + def inertiaDecl(self): + return self.getTypedRuleContext(AutolevParser.InertiaDeclContext,0) + + + def assignment(self): + return self.getTypedRuleContext(AutolevParser.AssignmentContext,0) + + + def settings(self): + return self.getTypedRuleContext(AutolevParser.SettingsContext,0) + + + def getRuleIndex(self): + return AutolevParser.RULE_stat + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterStat" ): + listener.enterStat(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitStat" ): + listener.exitStat(self) + + + + + def stat(self): + + localctx = AutolevParser.StatContext(self, self._ctx, self.state) + self.enterRule(localctx, 2, self.RULE_stat) + try: + self.state = 68 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,1,self._ctx) + if la_ == 1: + self.enterOuterAlt(localctx, 1) + self.state = 61 + self.varDecl() + pass + + elif la_ == 2: + self.enterOuterAlt(localctx, 2) + self.state = 62 + self.functionCall() + pass + + elif la_ == 3: + self.enterOuterAlt(localctx, 3) + self.state = 63 + self.codeCommands() + pass + + elif la_ == 4: + self.enterOuterAlt(localctx, 4) + self.state = 64 + self.massDecl() + pass + + elif la_ == 5: + self.enterOuterAlt(localctx, 5) + self.state = 65 + self.inertiaDecl() + pass + + elif la_ == 6: + self.enterOuterAlt(localctx, 6) + self.state = 66 + self.assignment() + pass + + elif la_ == 7: + self.enterOuterAlt(localctx, 7) + self.state = 67 + self.settings() + pass + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class AssignmentContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + + def getRuleIndex(self): + return AutolevParser.RULE_assignment + + + def copyFrom(self, ctx:ParserRuleContext): + super().copyFrom(ctx) + + + + class VecAssignContext(AssignmentContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.AssignmentContext + super().__init__(parser) + self.copyFrom(ctx) + + def vec(self): + return self.getTypedRuleContext(AutolevParser.VecContext,0) + + def equals(self): + return self.getTypedRuleContext(AutolevParser.EqualsContext,0) + + def expr(self): + return self.getTypedRuleContext(AutolevParser.ExprContext,0) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterVecAssign" ): + listener.enterVecAssign(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitVecAssign" ): + listener.exitVecAssign(self) + + + class RegularAssignContext(AssignmentContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.AssignmentContext + super().__init__(parser) + self.copyFrom(ctx) + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + def equals(self): + return self.getTypedRuleContext(AutolevParser.EqualsContext,0) + + def expr(self): + return self.getTypedRuleContext(AutolevParser.ExprContext,0) + + def diff(self): + return self.getTypedRuleContext(AutolevParser.DiffContext,0) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterRegularAssign" ): + listener.enterRegularAssign(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitRegularAssign" ): + listener.exitRegularAssign(self) + + + class IndexAssignContext(AssignmentContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.AssignmentContext + super().__init__(parser) + self.copyFrom(ctx) + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + def index(self): + return self.getTypedRuleContext(AutolevParser.IndexContext,0) + + def equals(self): + return self.getTypedRuleContext(AutolevParser.EqualsContext,0) + + def expr(self): + return self.getTypedRuleContext(AutolevParser.ExprContext,0) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterIndexAssign" ): + listener.enterIndexAssign(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitIndexAssign" ): + listener.exitIndexAssign(self) + + + + def assignment(self): + + localctx = AutolevParser.AssignmentContext(self, self._ctx, self.state) + self.enterRule(localctx, 4, self.RULE_assignment) + self._la = 0 # Token type + try: + self.state = 88 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,3,self._ctx) + if la_ == 1: + localctx = AutolevParser.VecAssignContext(self, localctx) + self.enterOuterAlt(localctx, 1) + self.state = 70 + self.vec() + self.state = 71 + self.equals() + self.state = 72 + self.expr(0) + pass + + elif la_ == 2: + localctx = AutolevParser.IndexAssignContext(self, localctx) + self.enterOuterAlt(localctx, 2) + self.state = 74 + self.match(AutolevParser.ID) + self.state = 75 + self.match(AutolevParser.T__0) + self.state = 76 + self.index() + self.state = 77 + self.match(AutolevParser.T__1) + self.state = 78 + self.equals() + self.state = 79 + self.expr(0) + pass + + elif la_ == 3: + localctx = AutolevParser.RegularAssignContext(self, localctx) + self.enterOuterAlt(localctx, 3) + self.state = 81 + self.match(AutolevParser.ID) + self.state = 83 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==11: + self.state = 82 + self.diff() + + + self.state = 85 + self.equals() + self.state = 86 + self.expr(0) + pass + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class EqualsContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + + def getRuleIndex(self): + return AutolevParser.RULE_equals + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterEquals" ): + listener.enterEquals(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitEquals" ): + listener.exitEquals(self) + + + + + def equals(self): + + localctx = AutolevParser.EqualsContext(self, self._ctx, self.state) + self.enterRule(localctx, 6, self.RULE_equals) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 90 + _la = self._input.LA(1) + if not(((_la) & ~0x3f) == 0 and ((1 << _la) & 1016) != 0): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class IndexContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_index + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterIndex" ): + listener.enterIndex(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitIndex" ): + listener.exitIndex(self) + + + + + def index(self): + + localctx = AutolevParser.IndexContext(self, self._ctx, self.state) + self.enterRule(localctx, 8, self.RULE_index) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 92 + self.expr(0) + self.state = 97 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 93 + self.match(AutolevParser.T__9) + self.state = 94 + self.expr(0) + self.state = 99 + self._errHandler.sync(self) + _la = self._input.LA(1) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class DiffContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + + def getRuleIndex(self): + return AutolevParser.RULE_diff + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterDiff" ): + listener.enterDiff(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitDiff" ): + listener.exitDiff(self) + + + + + def diff(self): + + localctx = AutolevParser.DiffContext(self, self._ctx, self.state) + self.enterRule(localctx, 10, self.RULE_diff) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 101 + self._errHandler.sync(self) + _la = self._input.LA(1) + while True: + self.state = 100 + self.match(AutolevParser.T__10) + self.state = 103 + self._errHandler.sync(self) + _la = self._input.LA(1) + if not (_la==11): + break + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class FunctionCallContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def ID(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.ID) + else: + return self.getToken(AutolevParser.ID, i) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def Mass(self): + return self.getToken(AutolevParser.Mass, 0) + + def Inertia(self): + return self.getToken(AutolevParser.Inertia, 0) + + def getRuleIndex(self): + return AutolevParser.RULE_functionCall + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterFunctionCall" ): + listener.enterFunctionCall(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitFunctionCall" ): + listener.exitFunctionCall(self) + + + + + def functionCall(self): + + localctx = AutolevParser.FunctionCallContext(self, self._ctx, self.state) + self.enterRule(localctx, 12, self.RULE_functionCall) + self._la = 0 # Token type + try: + self.state = 131 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [48]: + self.enterOuterAlt(localctx, 1) + self.state = 105 + self.match(AutolevParser.ID) + self.state = 106 + self.match(AutolevParser.T__11) + self.state = 115 + self._errHandler.sync(self) + _la = self._input.LA(1) + if ((_la) & ~0x3f) == 0 and ((1 << _la) & 404620694540290) != 0: + self.state = 107 + self.expr(0) + self.state = 112 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 108 + self.match(AutolevParser.T__9) + self.state = 109 + self.expr(0) + self.state = 114 + self._errHandler.sync(self) + _la = self._input.LA(1) + + + + self.state = 117 + self.match(AutolevParser.T__12) + pass + elif token in [27, 28]: + self.enterOuterAlt(localctx, 2) + self.state = 118 + _la = self._input.LA(1) + if not(_la==27 or _la==28): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 119 + self.match(AutolevParser.T__11) + self.state = 128 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==48: + self.state = 120 + self.match(AutolevParser.ID) + self.state = 125 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 121 + self.match(AutolevParser.T__9) + self.state = 122 + self.match(AutolevParser.ID) + self.state = 127 + self._errHandler.sync(self) + _la = self._input.LA(1) + + + + self.state = 130 + self.match(AutolevParser.T__12) + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class VarDeclContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def varType(self): + return self.getTypedRuleContext(AutolevParser.VarTypeContext,0) + + + def varDecl2(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.VarDecl2Context) + else: + return self.getTypedRuleContext(AutolevParser.VarDecl2Context,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_varDecl + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterVarDecl" ): + listener.enterVarDecl(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitVarDecl" ): + listener.exitVarDecl(self) + + + + + def varDecl(self): + + localctx = AutolevParser.VarDeclContext(self, self._ctx, self.state) + self.enterRule(localctx, 14, self.RULE_varDecl) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 133 + self.varType() + self.state = 134 + self.varDecl2() + self.state = 139 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 135 + self.match(AutolevParser.T__9) + self.state = 136 + self.varDecl2() + self.state = 141 + self._errHandler.sync(self) + _la = self._input.LA(1) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class VarTypeContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def Newtonian(self): + return self.getToken(AutolevParser.Newtonian, 0) + + def Frames(self): + return self.getToken(AutolevParser.Frames, 0) + + def Bodies(self): + return self.getToken(AutolevParser.Bodies, 0) + + def Particles(self): + return self.getToken(AutolevParser.Particles, 0) + + def Points(self): + return self.getToken(AutolevParser.Points, 0) + + def Constants(self): + return self.getToken(AutolevParser.Constants, 0) + + def Specifieds(self): + return self.getToken(AutolevParser.Specifieds, 0) + + def Imaginary(self): + return self.getToken(AutolevParser.Imaginary, 0) + + def Variables(self): + return self.getToken(AutolevParser.Variables, 0) + + def MotionVariables(self): + return self.getToken(AutolevParser.MotionVariables, 0) + + def getRuleIndex(self): + return AutolevParser.RULE_varType + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterVarType" ): + listener.enterVarType(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitVarType" ): + listener.exitVarType(self) + + + + + def varType(self): + + localctx = AutolevParser.VarTypeContext(self, self._ctx, self.state) + self.enterRule(localctx, 16, self.RULE_varType) + self._la = 0 # Token type + try: + self.state = 164 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [34]: + self.enterOuterAlt(localctx, 1) + self.state = 142 + self.match(AutolevParser.Newtonian) + pass + elif token in [35]: + self.enterOuterAlt(localctx, 2) + self.state = 143 + self.match(AutolevParser.Frames) + pass + elif token in [36]: + self.enterOuterAlt(localctx, 3) + self.state = 144 + self.match(AutolevParser.Bodies) + pass + elif token in [37]: + self.enterOuterAlt(localctx, 4) + self.state = 145 + self.match(AutolevParser.Particles) + pass + elif token in [38]: + self.enterOuterAlt(localctx, 5) + self.state = 146 + self.match(AutolevParser.Points) + pass + elif token in [39]: + self.enterOuterAlt(localctx, 6) + self.state = 147 + self.match(AutolevParser.Constants) + pass + elif token in [40]: + self.enterOuterAlt(localctx, 7) + self.state = 148 + self.match(AutolevParser.Specifieds) + pass + elif token in [41]: + self.enterOuterAlt(localctx, 8) + self.state = 149 + self.match(AutolevParser.Imaginary) + pass + elif token in [42]: + self.enterOuterAlt(localctx, 9) + self.state = 150 + self.match(AutolevParser.Variables) + self.state = 154 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==11: + self.state = 151 + self.match(AutolevParser.T__10) + self.state = 156 + self._errHandler.sync(self) + _la = self._input.LA(1) + + pass + elif token in [43]: + self.enterOuterAlt(localctx, 10) + self.state = 157 + self.match(AutolevParser.MotionVariables) + self.state = 161 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==11: + self.state = 158 + self.match(AutolevParser.T__10) + self.state = 163 + self._errHandler.sync(self) + _la = self._input.LA(1) + + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class VarDecl2Context(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + + def INT(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.INT) + else: + return self.getToken(AutolevParser.INT, i) + + def expr(self): + return self.getTypedRuleContext(AutolevParser.ExprContext,0) + + + def getRuleIndex(self): + return AutolevParser.RULE_varDecl2 + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterVarDecl2" ): + listener.enterVarDecl2(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitVarDecl2" ): + listener.exitVarDecl2(self) + + + + + def varDecl2(self): + + localctx = AutolevParser.VarDecl2Context(self, self._ctx, self.state) + self.enterRule(localctx, 18, self.RULE_varDecl2) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 166 + self.match(AutolevParser.ID) + self.state = 172 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,15,self._ctx) + if la_ == 1: + self.state = 167 + self.match(AutolevParser.T__13) + self.state = 168 + self.match(AutolevParser.INT) + self.state = 169 + self.match(AutolevParser.T__9) + self.state = 170 + self.match(AutolevParser.INT) + self.state = 171 + self.match(AutolevParser.T__14) + + + self.state = 188 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,17,self._ctx) + if la_ == 1: + self.state = 174 + self.match(AutolevParser.T__13) + self.state = 175 + self.match(AutolevParser.INT) + self.state = 176 + self.match(AutolevParser.T__15) + self.state = 177 + self.match(AutolevParser.INT) + self.state = 184 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 178 + self.match(AutolevParser.T__9) + self.state = 179 + self.match(AutolevParser.INT) + self.state = 180 + self.match(AutolevParser.T__15) + self.state = 181 + self.match(AutolevParser.INT) + self.state = 186 + self._errHandler.sync(self) + _la = self._input.LA(1) + + self.state = 187 + self.match(AutolevParser.T__14) + + + self.state = 193 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==14: + self.state = 190 + self.match(AutolevParser.T__13) + self.state = 191 + self.match(AutolevParser.INT) + self.state = 192 + self.match(AutolevParser.T__14) + + + self.state = 196 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==17 or _la==18: + self.state = 195 + _la = self._input.LA(1) + if not(_la==17 or _la==18): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + + + self.state = 201 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==11: + self.state = 198 + self.match(AutolevParser.T__10) + self.state = 203 + self._errHandler.sync(self) + _la = self._input.LA(1) + + self.state = 206 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==3: + self.state = 204 + self.match(AutolevParser.T__2) + self.state = 205 + self.expr(0) + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class RangesContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def INT(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.INT) + else: + return self.getToken(AutolevParser.INT, i) + + def getRuleIndex(self): + return AutolevParser.RULE_ranges + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterRanges" ): + listener.enterRanges(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitRanges" ): + listener.exitRanges(self) + + + + + def ranges(self): + + localctx = AutolevParser.RangesContext(self, self._ctx, self.state) + self.enterRule(localctx, 20, self.RULE_ranges) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 208 + self.match(AutolevParser.T__13) + self.state = 209 + self.match(AutolevParser.INT) + self.state = 210 + self.match(AutolevParser.T__15) + self.state = 211 + self.match(AutolevParser.INT) + self.state = 218 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 212 + self.match(AutolevParser.T__9) + self.state = 213 + self.match(AutolevParser.INT) + self.state = 214 + self.match(AutolevParser.T__15) + self.state = 215 + self.match(AutolevParser.INT) + self.state = 220 + self._errHandler.sync(self) + _la = self._input.LA(1) + + self.state = 221 + self.match(AutolevParser.T__14) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class MassDeclContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def Mass(self): + return self.getToken(AutolevParser.Mass, 0) + + def massDecl2(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.MassDecl2Context) + else: + return self.getTypedRuleContext(AutolevParser.MassDecl2Context,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_massDecl + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterMassDecl" ): + listener.enterMassDecl(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitMassDecl" ): + listener.exitMassDecl(self) + + + + + def massDecl(self): + + localctx = AutolevParser.MassDeclContext(self, self._ctx, self.state) + self.enterRule(localctx, 22, self.RULE_massDecl) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 223 + self.match(AutolevParser.Mass) + self.state = 224 + self.massDecl2() + self.state = 229 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 225 + self.match(AutolevParser.T__9) + self.state = 226 + self.massDecl2() + self.state = 231 + self._errHandler.sync(self) + _la = self._input.LA(1) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class MassDecl2Context(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + + def expr(self): + return self.getTypedRuleContext(AutolevParser.ExprContext,0) + + + def getRuleIndex(self): + return AutolevParser.RULE_massDecl2 + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterMassDecl2" ): + listener.enterMassDecl2(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitMassDecl2" ): + listener.exitMassDecl2(self) + + + + + def massDecl2(self): + + localctx = AutolevParser.MassDecl2Context(self, self._ctx, self.state) + self.enterRule(localctx, 24, self.RULE_massDecl2) + try: + self.enterOuterAlt(localctx, 1) + self.state = 232 + self.match(AutolevParser.ID) + self.state = 233 + self.match(AutolevParser.T__2) + self.state = 234 + self.expr(0) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class InertiaDeclContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def Inertia(self): + return self.getToken(AutolevParser.Inertia, 0) + + def ID(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.ID) + else: + return self.getToken(AutolevParser.ID, i) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_inertiaDecl + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterInertiaDecl" ): + listener.enterInertiaDecl(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitInertiaDecl" ): + listener.exitInertiaDecl(self) + + + + + def inertiaDecl(self): + + localctx = AutolevParser.InertiaDeclContext(self, self._ctx, self.state) + self.enterRule(localctx, 26, self.RULE_inertiaDecl) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 236 + self.match(AutolevParser.Inertia) + self.state = 237 + self.match(AutolevParser.ID) + self.state = 241 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==12: + self.state = 238 + self.match(AutolevParser.T__11) + self.state = 239 + self.match(AutolevParser.ID) + self.state = 240 + self.match(AutolevParser.T__12) + + + self.state = 245 + self._errHandler.sync(self) + _la = self._input.LA(1) + while True: + self.state = 243 + self.match(AutolevParser.T__9) + self.state = 244 + self.expr(0) + self.state = 247 + self._errHandler.sync(self) + _la = self._input.LA(1) + if not (_la==10): + break + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class MatrixContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_matrix + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterMatrix" ): + listener.enterMatrix(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitMatrix" ): + listener.exitMatrix(self) + + + + + def matrix(self): + + localctx = AutolevParser.MatrixContext(self, self._ctx, self.state) + self.enterRule(localctx, 28, self.RULE_matrix) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 249 + self.match(AutolevParser.T__0) + self.state = 250 + self.expr(0) + self.state = 255 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10 or _la==19: + self.state = 251 + _la = self._input.LA(1) + if not(_la==10 or _la==19): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 252 + self.expr(0) + self.state = 257 + self._errHandler.sync(self) + _la = self._input.LA(1) + + self.state = 258 + self.match(AutolevParser.T__1) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class MatrixInOutputContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def ID(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.ID) + else: + return self.getToken(AutolevParser.ID, i) + + def FLOAT(self): + return self.getToken(AutolevParser.FLOAT, 0) + + def INT(self): + return self.getToken(AutolevParser.INT, 0) + + def getRuleIndex(self): + return AutolevParser.RULE_matrixInOutput + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterMatrixInOutput" ): + listener.enterMatrixInOutput(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitMatrixInOutput" ): + listener.exitMatrixInOutput(self) + + + + + def matrixInOutput(self): + + localctx = AutolevParser.MatrixInOutputContext(self, self._ctx, self.state) + self.enterRule(localctx, 30, self.RULE_matrixInOutput) + self._la = 0 # Token type + try: + self.state = 268 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [48]: + self.enterOuterAlt(localctx, 1) + self.state = 260 + self.match(AutolevParser.ID) + + self.state = 261 + self.match(AutolevParser.ID) + self.state = 262 + self.match(AutolevParser.T__2) + self.state = 264 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==44 or _la==45: + self.state = 263 + _la = self._input.LA(1) + if not(_la==44 or _la==45): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + + + pass + elif token in [45]: + self.enterOuterAlt(localctx, 2) + self.state = 266 + self.match(AutolevParser.FLOAT) + pass + elif token in [44]: + self.enterOuterAlt(localctx, 3) + self.state = 267 + self.match(AutolevParser.INT) + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class CodeCommandsContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def units(self): + return self.getTypedRuleContext(AutolevParser.UnitsContext,0) + + + def inputs(self): + return self.getTypedRuleContext(AutolevParser.InputsContext,0) + + + def outputs(self): + return self.getTypedRuleContext(AutolevParser.OutputsContext,0) + + + def codegen(self): + return self.getTypedRuleContext(AutolevParser.CodegenContext,0) + + + def commands(self): + return self.getTypedRuleContext(AutolevParser.CommandsContext,0) + + + def getRuleIndex(self): + return AutolevParser.RULE_codeCommands + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterCodeCommands" ): + listener.enterCodeCommands(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitCodeCommands" ): + listener.exitCodeCommands(self) + + + + + def codeCommands(self): + + localctx = AutolevParser.CodeCommandsContext(self, self._ctx, self.state) + self.enterRule(localctx, 32, self.RULE_codeCommands) + try: + self.state = 275 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [32]: + self.enterOuterAlt(localctx, 1) + self.state = 270 + self.units() + pass + elif token in [29]: + self.enterOuterAlt(localctx, 2) + self.state = 271 + self.inputs() + pass + elif token in [30]: + self.enterOuterAlt(localctx, 3) + self.state = 272 + self.outputs() + pass + elif token in [48]: + self.enterOuterAlt(localctx, 4) + self.state = 273 + self.codegen() + pass + elif token in [31, 33]: + self.enterOuterAlt(localctx, 5) + self.state = 274 + self.commands() + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class SettingsContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def ID(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.ID) + else: + return self.getToken(AutolevParser.ID, i) + + def EXP(self): + return self.getToken(AutolevParser.EXP, 0) + + def FLOAT(self): + return self.getToken(AutolevParser.FLOAT, 0) + + def INT(self): + return self.getToken(AutolevParser.INT, 0) + + def getRuleIndex(self): + return AutolevParser.RULE_settings + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterSettings" ): + listener.enterSettings(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitSettings" ): + listener.exitSettings(self) + + + + + def settings(self): + + localctx = AutolevParser.SettingsContext(self, self._ctx, self.state) + self.enterRule(localctx, 34, self.RULE_settings) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 277 + self.match(AutolevParser.ID) + self.state = 279 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,30,self._ctx) + if la_ == 1: + self.state = 278 + _la = self._input.LA(1) + if not(((_la) & ~0x3f) == 0 and ((1 << _la) & 404620279021568) != 0): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class UnitsContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def UnitSystem(self): + return self.getToken(AutolevParser.UnitSystem, 0) + + def ID(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.ID) + else: + return self.getToken(AutolevParser.ID, i) + + def getRuleIndex(self): + return AutolevParser.RULE_units + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterUnits" ): + listener.enterUnits(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitUnits" ): + listener.exitUnits(self) + + + + + def units(self): + + localctx = AutolevParser.UnitsContext(self, self._ctx, self.state) + self.enterRule(localctx, 36, self.RULE_units) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 281 + self.match(AutolevParser.UnitSystem) + self.state = 282 + self.match(AutolevParser.ID) + self.state = 287 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 283 + self.match(AutolevParser.T__9) + self.state = 284 + self.match(AutolevParser.ID) + self.state = 289 + self._errHandler.sync(self) + _la = self._input.LA(1) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class InputsContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def Input(self): + return self.getToken(AutolevParser.Input, 0) + + def inputs2(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.Inputs2Context) + else: + return self.getTypedRuleContext(AutolevParser.Inputs2Context,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_inputs + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterInputs" ): + listener.enterInputs(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitInputs" ): + listener.exitInputs(self) + + + + + def inputs(self): + + localctx = AutolevParser.InputsContext(self, self._ctx, self.state) + self.enterRule(localctx, 38, self.RULE_inputs) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 290 + self.match(AutolevParser.Input) + self.state = 291 + self.inputs2() + self.state = 296 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 292 + self.match(AutolevParser.T__9) + self.state = 293 + self.inputs2() + self.state = 298 + self._errHandler.sync(self) + _la = self._input.LA(1) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Id_diffContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + + def diff(self): + return self.getTypedRuleContext(AutolevParser.DiffContext,0) + + + def getRuleIndex(self): + return AutolevParser.RULE_id_diff + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterId_diff" ): + listener.enterId_diff(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitId_diff" ): + listener.exitId_diff(self) + + + + + def id_diff(self): + + localctx = AutolevParser.Id_diffContext(self, self._ctx, self.state) + self.enterRule(localctx, 40, self.RULE_id_diff) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 299 + self.match(AutolevParser.ID) + self.state = 301 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==11: + self.state = 300 + self.diff() + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Inputs2Context(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def id_diff(self): + return self.getTypedRuleContext(AutolevParser.Id_diffContext,0) + + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_inputs2 + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterInputs2" ): + listener.enterInputs2(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitInputs2" ): + listener.exitInputs2(self) + + + + + def inputs2(self): + + localctx = AutolevParser.Inputs2Context(self, self._ctx, self.state) + self.enterRule(localctx, 42, self.RULE_inputs2) + try: + self.enterOuterAlt(localctx, 1) + self.state = 303 + self.id_diff() + self.state = 304 + self.match(AutolevParser.T__2) + self.state = 305 + self.expr(0) + self.state = 307 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,34,self._ctx) + if la_ == 1: + self.state = 306 + self.expr(0) + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class OutputsContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def Output(self): + return self.getToken(AutolevParser.Output, 0) + + def outputs2(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.Outputs2Context) + else: + return self.getTypedRuleContext(AutolevParser.Outputs2Context,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_outputs + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterOutputs" ): + listener.enterOutputs(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitOutputs" ): + listener.exitOutputs(self) + + + + + def outputs(self): + + localctx = AutolevParser.OutputsContext(self, self._ctx, self.state) + self.enterRule(localctx, 44, self.RULE_outputs) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 309 + self.match(AutolevParser.Output) + self.state = 310 + self.outputs2() + self.state = 315 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 311 + self.match(AutolevParser.T__9) + self.state = 312 + self.outputs2() + self.state = 317 + self._errHandler.sync(self) + _la = self._input.LA(1) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Outputs2Context(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_outputs2 + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterOutputs2" ): + listener.enterOutputs2(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitOutputs2" ): + listener.exitOutputs2(self) + + + + + def outputs2(self): + + localctx = AutolevParser.Outputs2Context(self, self._ctx, self.state) + self.enterRule(localctx, 46, self.RULE_outputs2) + try: + self.enterOuterAlt(localctx, 1) + self.state = 318 + self.expr(0) + self.state = 320 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,36,self._ctx) + if la_ == 1: + self.state = 319 + self.expr(0) + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class CodegenContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def ID(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.ID) + else: + return self.getToken(AutolevParser.ID, i) + + def functionCall(self): + return self.getTypedRuleContext(AutolevParser.FunctionCallContext,0) + + + def matrixInOutput(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.MatrixInOutputContext) + else: + return self.getTypedRuleContext(AutolevParser.MatrixInOutputContext,i) + + + def getRuleIndex(self): + return AutolevParser.RULE_codegen + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterCodegen" ): + listener.enterCodegen(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitCodegen" ): + listener.exitCodegen(self) + + + + + def codegen(self): + + localctx = AutolevParser.CodegenContext(self, self._ctx, self.state) + self.enterRule(localctx, 48, self.RULE_codegen) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 322 + self.match(AutolevParser.ID) + self.state = 323 + self.functionCall() + self.state = 335 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==1: + self.state = 324 + self.match(AutolevParser.T__0) + self.state = 325 + self.matrixInOutput() + self.state = 330 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 326 + self.match(AutolevParser.T__9) + self.state = 327 + self.matrixInOutput() + self.state = 332 + self._errHandler.sync(self) + _la = self._input.LA(1) + + self.state = 333 + self.match(AutolevParser.T__1) + + + self.state = 337 + self.match(AutolevParser.ID) + self.state = 338 + self.match(AutolevParser.T__19) + self.state = 339 + self.match(AutolevParser.ID) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class CommandsContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def Save(self): + return self.getToken(AutolevParser.Save, 0) + + def ID(self, i:int=None): + if i is None: + return self.getTokens(AutolevParser.ID) + else: + return self.getToken(AutolevParser.ID, i) + + def Encode(self): + return self.getToken(AutolevParser.Encode, 0) + + def getRuleIndex(self): + return AutolevParser.RULE_commands + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterCommands" ): + listener.enterCommands(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitCommands" ): + listener.exitCommands(self) + + + + + def commands(self): + + localctx = AutolevParser.CommandsContext(self, self._ctx, self.state) + self.enterRule(localctx, 50, self.RULE_commands) + self._la = 0 # Token type + try: + self.state = 354 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [31]: + self.enterOuterAlt(localctx, 1) + self.state = 341 + self.match(AutolevParser.Save) + self.state = 342 + self.match(AutolevParser.ID) + self.state = 343 + self.match(AutolevParser.T__19) + self.state = 344 + self.match(AutolevParser.ID) + pass + elif token in [33]: + self.enterOuterAlt(localctx, 2) + self.state = 345 + self.match(AutolevParser.Encode) + self.state = 346 + self.match(AutolevParser.ID) + self.state = 351 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 347 + self.match(AutolevParser.T__9) + self.state = 348 + self.match(AutolevParser.ID) + self.state = 353 + self._errHandler.sync(self) + _la = self._input.LA(1) + + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class VecContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + + def getRuleIndex(self): + return AutolevParser.RULE_vec + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterVec" ): + listener.enterVec(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitVec" ): + listener.exitVec(self) + + + + + def vec(self): + + localctx = AutolevParser.VecContext(self, self._ctx, self.state) + self.enterRule(localctx, 52, self.RULE_vec) + try: + self.state = 364 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [48]: + self.enterOuterAlt(localctx, 1) + self.state = 356 + self.match(AutolevParser.ID) + self.state = 358 + self._errHandler.sync(self) + _alt = 1 + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt == 1: + self.state = 357 + self.match(AutolevParser.T__20) + + else: + raise NoViableAltException(self) + self.state = 360 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,41,self._ctx) + + pass + elif token in [22]: + self.enterOuterAlt(localctx, 2) + self.state = 362 + self.match(AutolevParser.T__21) + pass + elif token in [23]: + self.enterOuterAlt(localctx, 3) + self.state = 363 + self.match(AutolevParser.T__22) + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class ExprContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + + def getRuleIndex(self): + return AutolevParser.RULE_expr + + + def copyFrom(self, ctx:ParserRuleContext): + super().copyFrom(ctx) + + + class ParensContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def expr(self): + return self.getTypedRuleContext(AutolevParser.ExprContext,0) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterParens" ): + listener.enterParens(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitParens" ): + listener.exitParens(self) + + + class VectorOrDyadicContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def vec(self): + return self.getTypedRuleContext(AutolevParser.VecContext,0) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterVectorOrDyadic" ): + listener.enterVectorOrDyadic(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitVectorOrDyadic" ): + listener.exitVectorOrDyadic(self) + + + class ExponentContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterExponent" ): + listener.enterExponent(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitExponent" ): + listener.exitExponent(self) + + + class MulDivContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterMulDiv" ): + listener.enterMulDiv(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitMulDiv" ): + listener.exitMulDiv(self) + + + class AddSubContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterAddSub" ): + listener.enterAddSub(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitAddSub" ): + listener.exitAddSub(self) + + + class FloatContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def FLOAT(self): + return self.getToken(AutolevParser.FLOAT, 0) + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterFloat" ): + listener.enterFloat(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitFloat" ): + listener.exitFloat(self) + + + class IntContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def INT(self): + return self.getToken(AutolevParser.INT, 0) + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterInt" ): + listener.enterInt(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitInt" ): + listener.exitInt(self) + + + class IdEqualsExprContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterIdEqualsExpr" ): + listener.enterIdEqualsExpr(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitIdEqualsExpr" ): + listener.exitIdEqualsExpr(self) + + + class NegativeOneContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def expr(self): + return self.getTypedRuleContext(AutolevParser.ExprContext,0) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterNegativeOne" ): + listener.enterNegativeOne(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitNegativeOne" ): + listener.exitNegativeOne(self) + + + class FunctionContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def functionCall(self): + return self.getTypedRuleContext(AutolevParser.FunctionCallContext,0) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterFunction" ): + listener.enterFunction(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitFunction" ): + listener.exitFunction(self) + + + class RangessContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def ranges(self): + return self.getTypedRuleContext(AutolevParser.RangesContext,0) + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterRangess" ): + listener.enterRangess(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitRangess" ): + listener.exitRangess(self) + + + class ColonContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterColon" ): + listener.enterColon(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitColon" ): + listener.exitColon(self) + + + class IdContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterId" ): + listener.enterId(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitId" ): + listener.exitId(self) + + + class ExpContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def EXP(self): + return self.getToken(AutolevParser.EXP, 0) + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterExp" ): + listener.enterExp(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitExp" ): + listener.exitExp(self) + + + class MatricesContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def matrix(self): + return self.getTypedRuleContext(AutolevParser.MatrixContext,0) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterMatrices" ): + listener.enterMatrices(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitMatrices" ): + listener.exitMatrices(self) + + + class IndexingContext(ExprContext): + + def __init__(self, parser, ctx:ParserRuleContext): # actually a AutolevParser.ExprContext + super().__init__(parser) + self.copyFrom(ctx) + + def ID(self): + return self.getToken(AutolevParser.ID, 0) + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(AutolevParser.ExprContext) + else: + return self.getTypedRuleContext(AutolevParser.ExprContext,i) + + + def enterRule(self, listener:ParseTreeListener): + if hasattr( listener, "enterIndexing" ): + listener.enterIndexing(self) + + def exitRule(self, listener:ParseTreeListener): + if hasattr( listener, "exitIndexing" ): + listener.exitIndexing(self) + + + + def expr(self, _p:int=0): + _parentctx = self._ctx + _parentState = self.state + localctx = AutolevParser.ExprContext(self, self._ctx, _parentState) + _prevctx = localctx + _startState = 54 + self.enterRecursionRule(localctx, 54, self.RULE_expr, _p) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 408 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,47,self._ctx) + if la_ == 1: + localctx = AutolevParser.ExpContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + + self.state = 367 + self.match(AutolevParser.EXP) + pass + + elif la_ == 2: + localctx = AutolevParser.NegativeOneContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 368 + self.match(AutolevParser.T__17) + self.state = 369 + self.expr(12) + pass + + elif la_ == 3: + localctx = AutolevParser.FloatContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 370 + self.match(AutolevParser.FLOAT) + pass + + elif la_ == 4: + localctx = AutolevParser.IntContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 371 + self.match(AutolevParser.INT) + pass + + elif la_ == 5: + localctx = AutolevParser.IdContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 372 + self.match(AutolevParser.ID) + self.state = 376 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,43,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + self.state = 373 + self.match(AutolevParser.T__10) + self.state = 378 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,43,self._ctx) + + pass + + elif la_ == 6: + localctx = AutolevParser.VectorOrDyadicContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 379 + self.vec() + pass + + elif la_ == 7: + localctx = AutolevParser.IndexingContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 380 + self.match(AutolevParser.ID) + self.state = 381 + self.match(AutolevParser.T__0) + self.state = 382 + self.expr(0) + self.state = 387 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==10: + self.state = 383 + self.match(AutolevParser.T__9) + self.state = 384 + self.expr(0) + self.state = 389 + self._errHandler.sync(self) + _la = self._input.LA(1) + + self.state = 390 + self.match(AutolevParser.T__1) + pass + + elif la_ == 8: + localctx = AutolevParser.FunctionContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 392 + self.functionCall() + pass + + elif la_ == 9: + localctx = AutolevParser.MatricesContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 393 + self.matrix() + pass + + elif la_ == 10: + localctx = AutolevParser.ParensContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 394 + self.match(AutolevParser.T__11) + self.state = 395 + self.expr(0) + self.state = 396 + self.match(AutolevParser.T__12) + pass + + elif la_ == 11: + localctx = AutolevParser.RangessContext(self, localctx) + self._ctx = localctx + _prevctx = localctx + self.state = 399 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==48: + self.state = 398 + self.match(AutolevParser.ID) + + + self.state = 401 + self.ranges() + self.state = 405 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,46,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + self.state = 402 + self.match(AutolevParser.T__10) + self.state = 407 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,46,self._ctx) + + pass + + + self._ctx.stop = self._input.LT(-1) + self.state = 427 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,49,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + if self._parseListeners is not None: + self.triggerExitRuleEvent() + _prevctx = localctx + self.state = 425 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,48,self._ctx) + if la_ == 1: + localctx = AutolevParser.ExponentContext(self, AutolevParser.ExprContext(self, _parentctx, _parentState)) + self.pushNewRecursionContext(localctx, _startState, self.RULE_expr) + self.state = 410 + if not self.precpred(self._ctx, 16): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 16)") + self.state = 411 + self.match(AutolevParser.T__23) + self.state = 412 + self.expr(17) + pass + + elif la_ == 2: + localctx = AutolevParser.MulDivContext(self, AutolevParser.ExprContext(self, _parentctx, _parentState)) + self.pushNewRecursionContext(localctx, _startState, self.RULE_expr) + self.state = 413 + if not self.precpred(self._ctx, 15): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 15)") + self.state = 414 + _la = self._input.LA(1) + if not(_la==25 or _la==26): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 415 + self.expr(16) + pass + + elif la_ == 3: + localctx = AutolevParser.AddSubContext(self, AutolevParser.ExprContext(self, _parentctx, _parentState)) + self.pushNewRecursionContext(localctx, _startState, self.RULE_expr) + self.state = 416 + if not self.precpred(self._ctx, 14): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 14)") + self.state = 417 + _la = self._input.LA(1) + if not(_la==17 or _la==18): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 418 + self.expr(15) + pass + + elif la_ == 4: + localctx = AutolevParser.IdEqualsExprContext(self, AutolevParser.ExprContext(self, _parentctx, _parentState)) + self.pushNewRecursionContext(localctx, _startState, self.RULE_expr) + self.state = 419 + if not self.precpred(self._ctx, 3): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 3)") + self.state = 420 + self.match(AutolevParser.T__2) + self.state = 421 + self.expr(4) + pass + + elif la_ == 5: + localctx = AutolevParser.ColonContext(self, AutolevParser.ExprContext(self, _parentctx, _parentState)) + self.pushNewRecursionContext(localctx, _startState, self.RULE_expr) + self.state = 422 + if not self.precpred(self._ctx, 2): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 2)") + self.state = 423 + self.match(AutolevParser.T__15) + self.state = 424 + self.expr(3) + pass + + + self.state = 429 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,49,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.unrollRecursionContexts(_parentctx) + return localctx + + + + def sempred(self, localctx:RuleContext, ruleIndex:int, predIndex:int): + if self._predicates == None: + self._predicates = dict() + self._predicates[27] = self.expr_sempred + pred = self._predicates.get(ruleIndex, None) + if pred is None: + raise Exception("No predicate with index:" + str(ruleIndex)) + else: + return pred(localctx, predIndex) + + def expr_sempred(self, localctx:ExprContext, predIndex:int): + if predIndex == 0: + return self.precpred(self._ctx, 16) + + + if predIndex == 1: + return self.precpred(self._ctx, 15) + + + if predIndex == 2: + return self.precpred(self._ctx, 14) + + + if predIndex == 3: + return self.precpred(self._ctx, 3) + + + if predIndex == 4: + return self.precpred(self._ctx, 2) + + + + + diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_build_autolev_antlr.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_build_autolev_antlr.py new file mode 100644 index 0000000000000000000000000000000000000000..8314b2f546c0a18a8e281768b60d66556c852e3b --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_build_autolev_antlr.py @@ -0,0 +1,86 @@ +import os +import subprocess +import glob + +from sympy.utilities.misc import debug + +here = os.path.dirname(__file__) +grammar_file = os.path.abspath(os.path.join(here, "Autolev.g4")) +dir_autolev_antlr = os.path.join(here, "_antlr") + +header = '''\ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt +''' + + +def check_antlr_version(): + debug("Checking antlr4 version...") + + try: + debug(subprocess.check_output(["antlr4"]) + .decode('utf-8').split("\n")[0]) + return True + except (subprocess.CalledProcessError, FileNotFoundError): + debug("The 'antlr4' command line tool is not installed, " + "or not on your PATH.\n" + "> Please refer to the README.md file for more information.") + return False + + +def build_parser(output_dir=dir_autolev_antlr): + check_antlr_version() + + debug("Updating ANTLR-generated code in {}".format(output_dir)) + + if not os.path.exists(output_dir): + os.makedirs(output_dir) + + with open(os.path.join(output_dir, "__init__.py"), "w+") as fp: + fp.write(header) + + args = [ + "antlr4", + grammar_file, + "-o", output_dir, + "-no-visitor", + ] + + debug("Running code generation...\n\t$ {}".format(" ".join(args))) + subprocess.check_output(args, cwd=output_dir) + + debug("Applying headers, removing unnecessary files and renaming...") + # Handle case insensitive file systems. If the files are already + # generated, they will be written to autolev* but Autolev*.* won't match them. + for path in (glob.glob(os.path.join(output_dir, "Autolev*.*")) or + glob.glob(os.path.join(output_dir, "autolev*.*"))): + + # Remove files ending in .interp or .tokens as they are not needed. + if not path.endswith(".py"): + os.unlink(path) + continue + + new_path = os.path.join(output_dir, os.path.basename(path).lower()) + with open(path, 'r') as f: + lines = [line.rstrip().replace('AutolevParser import', 'autolevparser import') +'\n' + for line in f] + + os.unlink(path) + + with open(new_path, "w") as out_file: + offset = 0 + while lines[offset].startswith('#'): + offset += 1 + out_file.write(header) + out_file.writelines(lines[offset:]) + + debug("\t{}".format(new_path)) + + return True + + +if __name__ == "__main__": + build_parser() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_listener_autolev_antlr.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_listener_autolev_antlr.py new file mode 100644 index 0000000000000000000000000000000000000000..9ca2f8af88de18036b90788fd29d02707f098213 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_listener_autolev_antlr.py @@ -0,0 +1,2083 @@ +import collections +import warnings + +from sympy.external import import_module + +autolevparser = import_module('sympy.parsing.autolev._antlr.autolevparser', + import_kwargs={'fromlist': ['AutolevParser']}) +autolevlexer = import_module('sympy.parsing.autolev._antlr.autolevlexer', + import_kwargs={'fromlist': ['AutolevLexer']}) +autolevlistener = import_module('sympy.parsing.autolev._antlr.autolevlistener', + import_kwargs={'fromlist': ['AutolevListener']}) + +AutolevParser = getattr(autolevparser, 'AutolevParser', None) +AutolevLexer = getattr(autolevlexer, 'AutolevLexer', None) +AutolevListener = getattr(autolevlistener, 'AutolevListener', None) + + +def strfunc(z): + if z == 0: + return "" + elif z == 1: + return "_d" + else: + return "_" + "d" * z + +def declare_phy_entities(self, ctx, phy_type, i, j=None): + if phy_type in ("frame", "newtonian"): + declare_frames(self, ctx, i, j) + elif phy_type == "particle": + declare_particles(self, ctx, i, j) + elif phy_type == "point": + declare_points(self, ctx, i, j) + elif phy_type == "bodies": + declare_bodies(self, ctx, i, j) + +def declare_frames(self, ctx, i, j=None): + if "{" in ctx.getText(): + if j: + name1 = ctx.ID().getText().lower() + str(i) + str(j) + else: + name1 = ctx.ID().getText().lower() + str(i) + else: + name1 = ctx.ID().getText().lower() + name2 = "frame_" + name1 + if self.getValue(ctx.parentCtx.varType()) == "newtonian": + self.newtonian = name2 + + self.symbol_table2.update({name1: name2}) + + self.symbol_table.update({name1 + "1>": name2 + ".x"}) + self.symbol_table.update({name1 + "2>": name2 + ".y"}) + self.symbol_table.update({name1 + "3>": name2 + ".z"}) + + self.type2.update({name1: "frame"}) + self.write(name2 + " = " + "_me.ReferenceFrame('" + name1 + "')\n") + +def declare_points(self, ctx, i, j=None): + if "{" in ctx.getText(): + if j: + name1 = ctx.ID().getText().lower() + str(i) + str(j) + else: + name1 = ctx.ID().getText().lower() + str(i) + else: + name1 = ctx.ID().getText().lower() + + name2 = "point_" + name1 + + self.symbol_table2.update({name1: name2}) + self.type2.update({name1: "point"}) + self.write(name2 + " = " + "_me.Point('" + name1 + "')\n") + +def declare_particles(self, ctx, i, j=None): + if "{" in ctx.getText(): + if j: + name1 = ctx.ID().getText().lower() + str(i) + str(j) + else: + name1 = ctx.ID().getText().lower() + str(i) + else: + name1 = ctx.ID().getText().lower() + + name2 = "particle_" + name1 + + self.symbol_table2.update({name1: name2}) + self.type2.update({name1: "particle"}) + self.bodies.update({name1: name2}) + self.write(name2 + " = " + "_me.Particle('" + name1 + "', " + "_me.Point('" + + name1 + "_pt" + "'), " + "_sm.Symbol('m'))\n") + +def declare_bodies(self, ctx, i, j=None): + if "{" in ctx.getText(): + if j: + name1 = ctx.ID().getText().lower() + str(i) + str(j) + else: + name1 = ctx.ID().getText().lower() + str(i) + else: + name1 = ctx.ID().getText().lower() + + name2 = "body_" + name1 + self.bodies.update({name1: name2}) + masscenter = name2 + "_cm" + refFrame = name2 + "_f" + + self.symbol_table2.update({name1: name2}) + self.symbol_table2.update({name1 + "o": masscenter}) + self.symbol_table.update({name1 + "1>": refFrame+".x"}) + self.symbol_table.update({name1 + "2>": refFrame+".y"}) + self.symbol_table.update({name1 + "3>": refFrame+".z"}) + + self.type2.update({name1: "bodies"}) + self.type2.update({name1+"o": "point"}) + + self.write(masscenter + " = " + "_me.Point('" + name1 + "_cm" + "')\n") + if self.newtonian: + self.write(masscenter + ".set_vel(" + self.newtonian + ", " + "0)\n") + self.write(refFrame + " = " + "_me.ReferenceFrame('" + name1 + "_f" + "')\n") + # We set a dummy mass and inertia here. + # They will be reset using the setters later in the code anyway. + self.write(name2 + " = " + "_me.RigidBody('" + name1 + "', " + masscenter + ", " + + refFrame + ", " + "_sm.symbols('m'), (_me.outer(" + refFrame + + ".x," + refFrame + ".x)," + masscenter + "))\n") + +def inertia_func(self, v1, v2, l, frame): + + if self.type2[v1] == "particle": + l.append("_me.inertia_of_point_mass(" + self.bodies[v1] + ".mass, " + self.bodies[v1] + + ".point.pos_from(" + self.symbol_table2[v2] + "), " + frame + ")") + + elif self.type2[v1] == "bodies": + # Inertia has been defined about center of mass. + if self.inertia_point[v1] == v1 + "o": + # Asking point is cm as well + if v2 == self.inertia_point[v1]: + l.append(self.symbol_table2[v1] + ".inertia[0]") + + # Asking point is not cm + else: + l.append(self.bodies[v1] + ".inertia[0]" + " + " + + "_me.inertia_of_point_mass(" + self.bodies[v1] + + ".mass, " + self.bodies[v1] + ".masscenter" + + ".pos_from(" + self.symbol_table2[v2] + + "), " + frame + ")") + + # Inertia has been defined about another point + else: + # Asking point is the defined point + if v2 == self.inertia_point[v1]: + l.append(self.symbol_table2[v1] + ".inertia[0]") + # Asking point is cm + elif v2 == v1 + "o": + l.append(self.bodies[v1] + ".inertia[0]" + " - " + + "_me.inertia_of_point_mass(" + self.bodies[v1] + + ".mass, " + self.bodies[v1] + ".masscenter" + + ".pos_from(" + self.symbol_table2[self.inertia_point[v1]] + + "), " + frame + ")") + # Asking point is some other point + else: + l.append(self.bodies[v1] + ".inertia[0]" + " - " + + "_me.inertia_of_point_mass(" + self.bodies[v1] + + ".mass, " + self.bodies[v1] + ".masscenter" + + ".pos_from(" + self.symbol_table2[self.inertia_point[v1]] + + "), " + frame + ")" + " + " + + "_me.inertia_of_point_mass(" + self.bodies[v1] + + ".mass, " + self.bodies[v1] + ".masscenter" + + ".pos_from(" + self.symbol_table2[v2] + + "), " + frame + ")") + + +def processConstants(self, ctx): + # Process constant declarations of the type: Constants F = 3, g = 9.81 + name = ctx.ID().getText().lower() + if "=" in ctx.getText(): + self.symbol_table.update({name: name}) + # self.inputs.update({self.symbol_table[name]: self.getValue(ctx.getChild(2))}) + self.write(self.symbol_table[name] + " = " + "_sm.S(" + self.getValue(ctx.getChild(2)) + ")\n") + self.type.update({name: "constants"}) + return + + # Constants declarations of the type: Constants A, B + else: + if "{" not in ctx.getText(): + self.symbol_table[name] = name + self.type[name] = "constants" + + # Process constant declarations of the type: Constants C+, D- + if ctx.getChildCount() == 2: + # This is set for declaring nonpositive=True and nonnegative=True + if ctx.getChild(1).getText() == "+": + self.sign[name] = "+" + elif ctx.getChild(1).getText() == "-": + self.sign[name] = "-" + else: + if "{" not in ctx.getText(): + self.sign[name] = "o" + + # Process constant declarations of the type: Constants K{4}, a{1:2, 1:2}, b{1:2} + if "{" in ctx.getText(): + if ":" in ctx.getText(): + num1 = int(ctx.INT(0).getText()) + num2 = int(ctx.INT(1).getText()) + 1 + else: + num1 = 1 + num2 = int(ctx.INT(0).getText()) + 1 + + if ":" in ctx.getText(): + if "," in ctx.getText(): + num3 = int(ctx.INT(2).getText()) + num4 = int(ctx.INT(3).getText()) + 1 + for i in range(num1, num2): + for j in range(num3, num4): + self.symbol_table[name + str(i) + str(j)] = name + str(i) + str(j) + self.type[name + str(i) + str(j)] = "constants" + self.var_list.append(name + str(i) + str(j)) + self.sign[name + str(i) + str(j)] = "o" + else: + for i in range(num1, num2): + self.symbol_table[name + str(i)] = name + str(i) + self.type[name + str(i)] = "constants" + self.var_list.append(name + str(i)) + self.sign[name + str(i)] = "o" + + elif "," in ctx.getText(): + for i in range(1, int(ctx.INT(0).getText()) + 1): + for j in range(1, int(ctx.INT(1).getText()) + 1): + self.symbol_table[name] = name + str(i) + str(j) + self.type[name + str(i) + str(j)] = "constants" + self.var_list.append(name + str(i) + str(j)) + self.sign[name + str(i) + str(j)] = "o" + + else: + for i in range(num1, num2): + self.symbol_table[name + str(i)] = name + str(i) + self.type[name + str(i)] = "constants" + self.var_list.append(name + str(i)) + self.sign[name + str(i)] = "o" + + if "{" not in ctx.getText(): + self.var_list.append(name) + + +def writeConstants(self, ctx): + l1 = list(filter(lambda x: self.sign[x] == "o", self.var_list)) + l2 = list(filter(lambda x: self.sign[x] == "+", self.var_list)) + l3 = list(filter(lambda x: self.sign[x] == "-", self.var_list)) + try: + if self.settings["complex"] == "on": + real = ", real=True" + elif self.settings["complex"] == "off": + real = "" + except Exception: + real = ", real=True" + + if l1: + a = ", ".join(l1) + " = " + "_sm.symbols(" + "'" +\ + " ".join(l1) + "'" + real + ")\n" + self.write(a) + if l2: + a = ", ".join(l2) + " = " + "_sm.symbols(" + "'" +\ + " ".join(l2) + "'" + real + ", nonnegative=True)\n" + self.write(a) + if l3: + a = ", ".join(l3) + " = " + "_sm.symbols(" + "'" + \ + " ".join(l3) + "'" + real + ", nonpositive=True)\n" + self.write(a) + self.var_list = [] + + +def processVariables(self, ctx): + # Specified F = x*N1> + y*N2> + name = ctx.ID().getText().lower() + if "=" in ctx.getText(): + text = name + "'"*(ctx.getChildCount()-3) + self.write(text + " = " + self.getValue(ctx.expr()) + "\n") + return + + # Process variables of the type: Variables qA, qB + if ctx.getChildCount() == 1: + self.symbol_table[name] = name + if self.getValue(ctx.parentCtx.getChild(0)) in ("variable", "specified", "motionvariable", "motionvariable'"): + self.type.update({name: self.getValue(ctx.parentCtx.getChild(0))}) + + self.var_list.append(name) + self.sign[name] = 0 + + # Process variables of the type: Variables x', y'' + elif "'" in ctx.getText() and "{" not in ctx.getText(): + if ctx.getText().count("'") > self.maxDegree: + self.maxDegree = ctx.getText().count("'") + for i in range(ctx.getChildCount()): + self.sign[name + strfunc(i)] = i + self.symbol_table[name + "'"*i] = name + strfunc(i) + if self.getValue(ctx.parentCtx.getChild(0)) in ("variable", "specified", "motionvariable", "motionvariable'"): + self.type.update({name + "'"*i: self.getValue(ctx.parentCtx.getChild(0))}) + self.var_list.append(name + strfunc(i)) + + elif "{" in ctx.getText(): + # Process variables of the type: Variables x{3}, y{2} + + if "'" in ctx.getText(): + dash_count = ctx.getText().count("'") + if dash_count > self.maxDegree: + self.maxDegree = dash_count + + if ":" in ctx.getText(): + # Variables C{1:2, 1:2} + if "," in ctx.getText(): + num1 = int(ctx.INT(0).getText()) + num2 = int(ctx.INT(1).getText()) + 1 + num3 = int(ctx.INT(2).getText()) + num4 = int(ctx.INT(3).getText()) + 1 + # Variables C{1:2} + else: + num1 = int(ctx.INT(0).getText()) + num2 = int(ctx.INT(1).getText()) + 1 + + # Variables C{1,3} + elif "," in ctx.getText(): + num1 = 1 + num2 = int(ctx.INT(0).getText()) + 1 + num3 = 1 + num4 = int(ctx.INT(1).getText()) + 1 + else: + num1 = 1 + num2 = int(ctx.INT(0).getText()) + 1 + + for i in range(num1, num2): + try: + for j in range(num3, num4): + try: + for z in range(dash_count+1): + self.symbol_table.update({name + str(i) + str(j) + "'"*z: name + str(i) + str(j) + strfunc(z)}) + if self.getValue(ctx.parentCtx.getChild(0)) in ("variable", "specified", "motionvariable", "motionvariable'"): + self.type.update({name + str(i) + str(j) + "'"*z: self.getValue(ctx.parentCtx.getChild(0))}) + self.var_list.append(name + str(i) + str(j) + strfunc(z)) + self.sign.update({name + str(i) + str(j) + strfunc(z): z}) + if dash_count > self.maxDegree: + self.maxDegree = dash_count + except Exception: + self.symbol_table.update({name + str(i) + str(j): name + str(i) + str(j)}) + if self.getValue(ctx.parentCtx.getChild(0)) in ("variable", "specified", "motionvariable", "motionvariable'"): + self.type.update({name + str(i) + str(j): self.getValue(ctx.parentCtx.getChild(0))}) + self.var_list.append(name + str(i) + str(j)) + self.sign.update({name + str(i) + str(j): 0}) + except Exception: + try: + for z in range(dash_count+1): + self.symbol_table.update({name + str(i) + "'"*z: name + str(i) + strfunc(z)}) + if self.getValue(ctx.parentCtx.getChild(0)) in ("variable", "specified", "motionvariable", "motionvariable'"): + self.type.update({name + str(i) + "'"*z: self.getValue(ctx.parentCtx.getChild(0))}) + self.var_list.append(name + str(i) + strfunc(z)) + self.sign.update({name + str(i) + strfunc(z): z}) + if dash_count > self.maxDegree: + self.maxDegree = dash_count + except Exception: + self.symbol_table.update({name + str(i): name + str(i)}) + if self.getValue(ctx.parentCtx.getChild(0)) in ("variable", "specified", "motionvariable", "motionvariable'"): + self.type.update({name + str(i): self.getValue(ctx.parentCtx.getChild(0))}) + self.var_list.append(name + str(i)) + self.sign.update({name + str(i): 0}) + +def writeVariables(self, ctx): + #print(self.sign) + #print(self.symbol_table) + if self.var_list: + for i in range(self.maxDegree+1): + if i == 0: + j = "" + t = "" + else: + j = str(i) + t = ", " + l = [] + for k in list(filter(lambda x: self.sign[x] == i, self.var_list)): + if i == 0: + l.append(k) + if i == 1: + l.append(k[:-1]) + if i > 1: + l.append(k[:-2]) + a = ", ".join(list(filter(lambda x: self.sign[x] == i, self.var_list))) + " = " +\ + "_me.dynamicsymbols(" + "'" + " ".join(l) + "'" + t + j + ")\n" + l = [] + self.write(a) + self.maxDegree = 0 + self.var_list = [] + +def processImaginary(self, ctx): + name = ctx.ID().getText().lower() + self.symbol_table[name] = name + self.type[name] = "imaginary" + self.var_list.append(name) + + +def writeImaginary(self, ctx): + a = ", ".join(self.var_list) + " = " + "_sm.symbols(" + "'" + \ + " ".join(self.var_list) + "')\n" + b = ", ".join(self.var_list) + " = " + "_sm.I\n" + self.write(a) + self.write(b) + self.var_list = [] + +if AutolevListener: + class MyListener(AutolevListener): # type: ignore + def __init__(self, include_numeric=False): + # Stores data in tree nodes(tree annotation). Especially useful for expr reconstruction. + self.tree_property = {} + + # Stores the declared variables, constants etc as they are declared in Autolev and SymPy + # {"": ""}. + self.symbol_table = collections.OrderedDict() + + # Similar to symbol_table. Used for storing Physical entities like Frames, Points, + # Particles, Bodies etc + self.symbol_table2 = collections.OrderedDict() + + # Used to store nonpositive, nonnegative etc for constants and number of "'"s (order of diff) + # in variables. + self.sign = {} + + # Simple list used as a store to pass around variables between the 'process' and 'write' + # methods. + self.var_list = [] + + # Stores the type of a declared variable (constants, variables, specifieds etc) + self.type = collections.OrderedDict() + + # Similar to self.type. Used for storing the type of Physical entities like Frames, Points, + # Particles, Bodies etc + self.type2 = collections.OrderedDict() + + # These lists are used to distinguish matrix, numeric and vector expressions. + self.matrix_expr = [] + self.numeric_expr = [] + self.vector_expr = [] + self.fr_expr = [] + + self.output_code = [] + + # Stores the variables and their rhs for substituting upon the Autolev command EXPLICIT. + self.explicit = collections.OrderedDict() + + # Write code to import common dependencies. + self.output_code.append("import sympy.physics.mechanics as _me\n") + self.output_code.append("import sympy as _sm\n") + self.output_code.append("import math as m\n") + self.output_code.append("import numpy as _np\n") + self.output_code.append("\n") + + # Just a store for the max degree variable in a line. + self.maxDegree = 0 + + # Stores the input parameters which are then used for codegen and numerical analysis. + self.inputs = collections.OrderedDict() + # Stores the variables which appear in Output Autolev commands. + self.outputs = [] + # Stores the settings specified by the user. Ex: Complex on/off, Degrees on/off + self.settings = {} + # Boolean which changes the behaviour of some expression reconstruction + # when parsing Input Autolev commands. + self.in_inputs = False + self.in_outputs = False + + # Stores for the physical entities. + self.newtonian = None + self.bodies = collections.OrderedDict() + self.constants = [] + self.forces = collections.OrderedDict() + self.q_ind = [] + self.q_dep = [] + self.u_ind = [] + self.u_dep = [] + self.kd_eqs = [] + self.dependent_variables = [] + self.kd_equivalents = collections.OrderedDict() + self.kd_equivalents2 = collections.OrderedDict() + self.kd_eqs_supplied = None + self.kane_type = "no_args" + self.inertia_point = collections.OrderedDict() + self.kane_parsed = False + self.t = False + + # PyDy ode code will be included only if this flag is set to True. + self.include_numeric = include_numeric + + def write(self, string): + self.output_code.append(string) + + def getValue(self, node): + return self.tree_property[node] + + def setValue(self, node, value): + self.tree_property[node] = value + + def getSymbolTable(self): + return self.symbol_table + + def getType(self): + return self.type + + def exitVarDecl(self, ctx): + # This event method handles variable declarations. The parse tree node varDecl contains + # one or more varDecl2 nodes. Eg varDecl for 'Constants a{1:2, 1:2}, b{1:2}' has two varDecl2 + # nodes(one for a{1:2, 1:2} and one for b{1:2}). + + # Variable declarations are processed and stored in the event method exitVarDecl2. + # This stored information is used to write the final SymPy output code in the exitVarDecl event method. + + # determine the type of declaration + if self.getValue(ctx.varType()) == "constant": + writeConstants(self, ctx) + elif self.getValue(ctx.varType()) in\ + ("variable", "motionvariable", "motionvariable'", "specified"): + writeVariables(self, ctx) + elif self.getValue(ctx.varType()) == "imaginary": + writeImaginary(self, ctx) + + def exitVarType(self, ctx): + # Annotate the varType tree node with the type of the variable declaration. + name = ctx.getChild(0).getText().lower() + if name[-1] == "s" and name != "bodies": + self.setValue(ctx, name[:-1]) + else: + self.setValue(ctx, name) + + def exitVarDecl2(self, ctx): + # Variable declarations are processed and stored in the event method exitVarDecl2. + # This stored information is used to write the final SymPy output code in the exitVarDecl event method. + # This is the case for constants, variables, specifieds etc. + + # This isn't the case for all types of declarations though. For instance + # Frames A, B, C, N cannot be defined on one line in SymPy. So we do not append A, B, C, N + # to a var_list or use exitVarDecl. exitVarDecl2 directly writes out to the file. + + # determine the type of declaration + if self.getValue(ctx.parentCtx.varType()) == "constant": + processConstants(self, ctx) + + elif self.getValue(ctx.parentCtx.varType()) in \ + ("variable", "motionvariable", "motionvariable'", "specified"): + processVariables(self, ctx) + + elif self.getValue(ctx.parentCtx.varType()) == "imaginary": + processImaginary(self, ctx) + + elif self.getValue(ctx.parentCtx.varType()) in ("frame", "newtonian", "point", "particle", "bodies"): + if "{" in ctx.getText(): + if ":" in ctx.getText() and "," not in ctx.getText(): + num1 = int(ctx.INT(0).getText()) + num2 = int(ctx.INT(1).getText()) + 1 + elif ":" not in ctx.getText() and "," in ctx.getText(): + num1 = 1 + num2 = int(ctx.INT(0).getText()) + 1 + num3 = 1 + num4 = int(ctx.INT(1).getText()) + 1 + elif ":" in ctx.getText() and "," in ctx.getText(): + num1 = int(ctx.INT(0).getText()) + num2 = int(ctx.INT(1).getText()) + 1 + num3 = int(ctx.INT(2).getText()) + num4 = int(ctx.INT(3).getText()) + 1 + else: + num1 = 1 + num2 = int(ctx.INT(0).getText()) + 1 + else: + num1 = 1 + num2 = 2 + for i in range(num1, num2): + try: + for j in range(num3, num4): + declare_phy_entities(self, ctx, self.getValue(ctx.parentCtx.varType()), i, j) + except Exception: + declare_phy_entities(self, ctx, self.getValue(ctx.parentCtx.varType()), i) + # ================== Subrules of parser rule expr (Start) ====================== # + + def exitId(self, ctx): + # Tree annotation for ID which is a labeled subrule of the parser rule expr. + # A_C + python_keywords = ["and", "as", "assert", "break", "class", "continue", "def", "del", "elif", "else", "except",\ + "exec", "finally", "for", "from", "global", "if", "import", "in", "is", "lambda", "not", "or", "pass", "print",\ + "raise", "return", "try", "while", "with", "yield"] + + if ctx.ID().getText().lower() in python_keywords: + warnings.warn("Python keywords must not be used as identifiers. Please refer to the list of keywords at https://docs.python.org/2.5/ref/keywords.html", + SyntaxWarning) + + if "_" in ctx.ID().getText() and ctx.ID().getText().count('_') == 1: + e1, e2 = ctx.ID().getText().lower().split('_') + try: + if self.type2[e1] == "frame": + e1 = self.symbol_table2[e1] + elif self.type2[e1] == "bodies": + e1 = self.symbol_table2[e1] + "_f" + if self.type2[e2] == "frame": + e2 = self.symbol_table2[e2] + elif self.type2[e2] == "bodies": + e2 = self.symbol_table2[e2] + "_f" + + self.setValue(ctx, e1 + ".dcm(" + e2 + ")") + except Exception: + self.setValue(ctx, ctx.ID().getText().lower()) + else: + # Reserved constant Pi + if ctx.ID().getText().lower() == "pi": + self.setValue(ctx, "_sm.pi") + self.numeric_expr.append(ctx) + + # Reserved variable T (for time) + elif ctx.ID().getText().lower() == "t": + self.setValue(ctx, "_me.dynamicsymbols._t") + if not self.in_inputs and not self.in_outputs: + self.t = True + + else: + idText = ctx.ID().getText().lower() + "'"*(ctx.getChildCount() - 1) + if idText in self.type.keys() and self.type[idText] == "matrix": + self.matrix_expr.append(ctx) + if self.in_inputs: + try: + self.setValue(ctx, self.symbol_table[idText]) + except Exception: + self.setValue(ctx, idText.lower()) + else: + try: + self.setValue(ctx, self.symbol_table[idText]) + except Exception: + pass + + def exitInt(self, ctx): + # Tree annotation for int which is a labeled subrule of the parser rule expr. + int_text = ctx.INT().getText() + self.setValue(ctx, int_text) + self.numeric_expr.append(ctx) + + def exitFloat(self, ctx): + # Tree annotation for float which is a labeled subrule of the parser rule expr. + floatText = ctx.FLOAT().getText() + self.setValue(ctx, floatText) + self.numeric_expr.append(ctx) + + def exitAddSub(self, ctx): + # Tree annotation for AddSub which is a labeled subrule of the parser rule expr. + # The subrule is expr = expr (+|-) expr + if ctx.expr(0) in self.matrix_expr or ctx.expr(1) in self.matrix_expr: + self.matrix_expr.append(ctx) + if ctx.expr(0) in self.vector_expr or ctx.expr(1) in self.vector_expr: + self.vector_expr.append(ctx) + if ctx.expr(0) in self.numeric_expr and ctx.expr(1) in self.numeric_expr: + self.numeric_expr.append(ctx) + self.setValue(ctx, self.getValue(ctx.expr(0)) + ctx.getChild(1).getText() + + self.getValue(ctx.expr(1))) + + def exitMulDiv(self, ctx): + # Tree annotation for MulDiv which is a labeled subrule of the parser rule expr. + # The subrule is expr = expr (*|/) expr + try: + if ctx.expr(0) in self.vector_expr and ctx.expr(1) in self.vector_expr: + self.setValue(ctx, "_me.outer(" + self.getValue(ctx.expr(0)) + ", " + + self.getValue(ctx.expr(1)) + ")") + else: + if ctx.expr(0) in self.matrix_expr or ctx.expr(1) in self.matrix_expr: + self.matrix_expr.append(ctx) + if ctx.expr(0) in self.vector_expr or ctx.expr(1) in self.vector_expr: + self.vector_expr.append(ctx) + if ctx.expr(0) in self.numeric_expr and ctx.expr(1) in self.numeric_expr: + self.numeric_expr.append(ctx) + self.setValue(ctx, self.getValue(ctx.expr(0)) + ctx.getChild(1).getText() + + self.getValue(ctx.expr(1))) + except Exception: + pass + + def exitNegativeOne(self, ctx): + # Tree annotation for negativeOne which is a labeled subrule of the parser rule expr. + self.setValue(ctx, "-1*" + self.getValue(ctx.getChild(1))) + if ctx.getChild(1) in self.matrix_expr: + self.matrix_expr.append(ctx) + if ctx.getChild(1) in self.numeric_expr: + self.numeric_expr.append(ctx) + + def exitParens(self, ctx): + # Tree annotation for parens which is a labeled subrule of the parser rule expr. + # The subrule is expr = '(' expr ')' + if ctx.expr() in self.matrix_expr: + self.matrix_expr.append(ctx) + if ctx.expr() in self.vector_expr: + self.vector_expr.append(ctx) + if ctx.expr() in self.numeric_expr: + self.numeric_expr.append(ctx) + self.setValue(ctx, "(" + self.getValue(ctx.expr()) + ")") + + def exitExponent(self, ctx): + # Tree annotation for Exponent which is a labeled subrule of the parser rule expr. + # The subrule is expr = expr ^ expr + if ctx.expr(0) in self.matrix_expr or ctx.expr(1) in self.matrix_expr: + self.matrix_expr.append(ctx) + if ctx.expr(0) in self.vector_expr or ctx.expr(1) in self.vector_expr: + self.vector_expr.append(ctx) + if ctx.expr(0) in self.numeric_expr and ctx.expr(1) in self.numeric_expr: + self.numeric_expr.append(ctx) + self.setValue(ctx, self.getValue(ctx.expr(0)) + "**" + self.getValue(ctx.expr(1))) + + def exitExp(self, ctx): + s = ctx.EXP().getText()[ctx.EXP().getText().index('E')+1:] + if "-" in s: + s = s[0] + s[1:].lstrip("0") + else: + s = s.lstrip("0") + self.setValue(ctx, ctx.EXP().getText()[:ctx.EXP().getText().index('E')] + + "*10**(" + s + ")") + + def exitFunction(self, ctx): + # Tree annotation for function which is a labeled subrule of the parser rule expr. + + # The difference between this and FunctionCall is that this is used for non standalone functions + # appearing in expressions and assignments. + # Eg: + # When we come across a standalone function say Expand(E, n:m) then it is categorized as FunctionCall + # which is a parser rule in itself under rule stat. exitFunctionCall() takes care of it and writes to the file. + # + # On the other hand, while we come across E_diff = D(E, y), we annotate the tree node + # of the function D(E, y) with the SymPy equivalent in exitFunction(). + # In this case it is the method exitAssignment() that writes the code to the file and not exitFunction(). + + ch = ctx.getChild(0) + func_name = ch.getChild(0).getText().lower() + + # Expand(y, n:m) * + if func_name == "expand": + expr = self.getValue(ch.expr(0)) + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.matrix_expr.append(ctx) + # _sm.Matrix([i.expand() for i in z]).reshape(z.shape[0], z.shape[1]) + self.setValue(ctx, "_sm.Matrix([i.expand() for i in " + expr + "])" + + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])") + else: + self.setValue(ctx, "(" + expr + ")" + "." + "expand()") + + # Factor(y, x) * + elif func_name == "factor": + expr = self.getValue(ch.expr(0)) + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.matrix_expr.append(ctx) + self.setValue(ctx, "_sm.Matrix([_sm.factor(i, " + self.getValue(ch.expr(1)) + ") for i in " + + expr + "])" + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])") + else: + self.setValue(ctx, "_sm.factor(" + "(" + expr + ")" + + ", " + self.getValue(ch.expr(1)) + ")") + + # D(y, x) + elif func_name == "d": + expr = self.getValue(ch.expr(0)) + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.matrix_expr.append(ctx) + self.setValue(ctx, "_sm.Matrix([i.diff(" + self.getValue(ch.expr(1)) + ") for i in " + + expr + "])" + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])") + else: + if ch.getChildCount() == 8: + frame = self.symbol_table2[ch.expr(2).getText().lower()] + self.setValue(ctx, "(" + expr + ")" + "." + "diff(" + self.getValue(ch.expr(1)) + + ", " + frame + ")") + else: + self.setValue(ctx, "(" + expr + ")" + "." + "diff(" + + self.getValue(ch.expr(1)) + ")") + + # Dt(y) + elif func_name == "dt": + expr = self.getValue(ch.expr(0)) + if ch.expr(0) in self.vector_expr: + text = "dt(" + else: + text = "diff(_sm.Symbol('t')" + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.matrix_expr.append(ctx) + self.setValue(ctx, "_sm.Matrix([i." + text + + ") for i in " + expr + "])" + + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])") + else: + if ch.getChildCount() == 6: + frame = self.symbol_table2[ch.expr(1).getText().lower()] + self.setValue(ctx, "(" + expr + ")" + "." + "dt(" + + frame + ")") + else: + self.setValue(ctx, "(" + expr + ")" + "." + text + ")") + + # Explicit(EXPRESS(IMPLICIT>,C)) + elif func_name == "explicit": + if ch.expr(0) in self.vector_expr: + self.vector_expr.append(ctx) + expr = self.getValue(ch.expr(0)) + if self.explicit.keys(): + explicit_list = [] + for i in self.explicit.keys(): + explicit_list.append(i + ":" + self.explicit[i]) + self.setValue(ctx, "(" + expr + ")" + ".subs({" + ", ".join(explicit_list) + "})") + else: + self.setValue(ctx, expr) + + # Taylor(y, 0:2, w=a, x=0) + # TODO: Currently only works with symbols. Make it work for dynamicsymbols. + elif func_name == "taylor": + exp = self.getValue(ch.expr(0)) + order = self.getValue(ch.expr(1).expr(1)) + x = (ch.getChildCount()-6)//2 + l = [] + for i in range(x): + index = 2 + i + child = ch.expr(index) + l.append(".series(" + self.getValue(child.getChild(0)) + + ", " + self.getValue(child.getChild(2)) + + ", " + order + ").removeO()") + self.setValue(ctx, "(" + exp + ")" + "".join(l)) + + # Evaluate(y, a=x, b=2) + elif func_name == "evaluate": + expr = self.getValue(ch.expr(0)) + l = [] + x = (ch.getChildCount()-4)//2 + for i in range(x): + index = 1 + i + child = ch.expr(index) + l.append(self.getValue(child.getChild(0)) + ":" + + self.getValue(child.getChild(2))) + + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.matrix_expr.append(ctx) + self.setValue(ctx, "_sm.Matrix([i.subs({" + ",".join(l) + "}) for i in " + + expr + "])" + + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])") + else: + if self.explicit: + explicit_list = [] + for i in self.explicit.keys(): + explicit_list.append(i + ":" + self.explicit[i]) + self.setValue(ctx, "(" + expr + ")" + ".subs({" + ",".join(explicit_list) + + "}).subs({" + ",".join(l) + "})") + else: + self.setValue(ctx, "(" + expr + ")" + ".subs({" + ",".join(l) + "})") + + # Polynomial([a, b, c], x) + elif func_name == "polynomial": + self.setValue(ctx, "_sm.Poly(" + self.getValue(ch.expr(0)) + ", " + + self.getValue(ch.expr(1)) + ")") + + # Roots(Poly, x, 2) + # Roots([1; 2; 3; 4]) + elif func_name == "roots": + self.matrix_expr.append(ctx) + expr = self.getValue(ch.expr(0)) + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.setValue(ctx, "[i.evalf() for i in " + "_sm.solve(" + + "_sm.Poly(" + expr + ", " + "x),x)]") + else: + self.setValue(ctx, "[i.evalf() for i in " + "_sm.solve(" + + expr + ", " + self.getValue(ch.expr(1)) + ")]") + + # Transpose(A), Inv(A) + elif func_name in ("transpose", "inv", "inverse"): + self.matrix_expr.append(ctx) + if func_name == "transpose": + e = ".T" + elif func_name in ("inv", "inverse"): + e = "**(-1)" + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + ")" + e) + + # Eig(A) + elif func_name == "eig": + # "_sm.Matrix([i.evalf() for i in " + + self.setValue(ctx, "_sm.Matrix([i.evalf() for i in (" + + self.getValue(ch.expr(0)) + ").eigenvals().keys()])") + + # Diagmat(n, m, x) + # Diagmat(3, 1) + elif func_name == "diagmat": + self.matrix_expr.append(ctx) + if ch.getChildCount() == 6: + l = [] + for i in range(int(self.getValue(ch.expr(0)))): + l.append(self.getValue(ch.expr(1)) + ",") + + self.setValue(ctx, "_sm.diag(" + ("".join(l))[:-1] + ")") + + elif ch.getChildCount() == 8: + # _sm.Matrix([x if i==j else 0 for i in range(n) for j in range(m)]).reshape(n, m) + n = self.getValue(ch.expr(0)) + m = self.getValue(ch.expr(1)) + x = self.getValue(ch.expr(2)) + self.setValue(ctx, "_sm.Matrix([" + x + " if i==j else 0 for i in range(" + + n + ") for j in range(" + m + ")]).reshape(" + n + ", " + m + ")") + + # Cols(A) + # Cols(A, 1) + # Cols(A, 1, 2:4, 3) + elif func_name in ("cols", "rows"): + self.matrix_expr.append(ctx) + if func_name == "cols": + e1 = ".cols" + e2 = ".T." + else: + e1 = ".rows" + e2 = "." + if ch.getChildCount() == 4: + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + ")" + e1) + elif ch.getChildCount() == 6: + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + ")" + + e1[:-1] + "(" + str(int(self.getValue(ch.expr(1))) - 1) + ")") + else: + l = [] + for i in range(4, ch.getChildCount()): + try: + if ch.getChild(i).getChildCount() > 1 and ch.getChild(i).getChild(1).getText() == ":": + for j in range(int(ch.getChild(i).getChild(0).getText()), + int(ch.getChild(i).getChild(2).getText())+1): + l.append("(" + self.getValue(ch.getChild(2)) + ")" + e2 + + "row(" + str(j-1) + ")") + else: + l.append("(" + self.getValue(ch.getChild(2)) + ")" + e2 + + "row(" + str(int(ch.getChild(i).getText())-1) + ")") + except Exception: + pass + self.setValue(ctx, "_sm.Matrix([" + ",".join(l) + "])") + + # Det(A) Trace(A) + elif func_name in ["det", "trace"]: + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + ")" + "." + + func_name + "()") + + # Element(A, 2, 3) + elif func_name == "element": + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + ")" + "[" + + str(int(self.getValue(ch.expr(1)))-1) + "," + + str(int(self.getValue(ch.expr(2)))-1) + "]") + + elif func_name in \ + ["cos", "sin", "tan", "cosh", "sinh", "tanh", "acos", "asin", "atan", + "log", "exp", "sqrt", "factorial", "floor", "sign"]: + self.setValue(ctx, "_sm." + func_name + "(" + self.getValue(ch.expr(0)) + ")") + + elif func_name == "ceil": + self.setValue(ctx, "_sm.ceiling" + "(" + self.getValue(ch.expr(0)) + ")") + + elif func_name == "sqr": + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + + ")" + "**2") + + elif func_name == "log10": + self.setValue(ctx, "_sm.log" + + "(" + self.getValue(ch.expr(0)) + ", 10)") + + elif func_name == "atan2": + self.setValue(ctx, "_sm.atan2" + "(" + self.getValue(ch.expr(0)) + ", " + + self.getValue(ch.expr(1)) + ")") + + elif func_name in ["int", "round"]: + self.setValue(ctx, func_name + + "(" + self.getValue(ch.expr(0)) + ")") + + elif func_name == "abs": + self.setValue(ctx, "_sm.Abs(" + self.getValue(ch.expr(0)) + ")") + + elif func_name in ["max", "min"]: + # max(x, y, z) + l = [] + for i in range(1, ch.getChildCount()): + if ch.getChild(i) in self.tree_property.keys(): + l.append(self.getValue(ch.getChild(i))) + elif ch.getChild(i).getText() in [",", "(", ")"]: + l.append(ch.getChild(i).getText()) + self.setValue(ctx, "_sm." + ch.getChild(0).getText().capitalize() + "".join(l)) + + # Coef(y, x) + elif func_name == "coef": + #A41_A53=COEF([RHS(U4);RHS(U5)],[U1,U2,U3]) + if ch.expr(0) in self.matrix_expr and ch.expr(1) in self.matrix_expr: + icount = jcount = 0 + for i in range(ch.expr(0).getChild(0).getChildCount()): + try: + ch.expr(0).getChild(0).getChild(i).getRuleIndex() + icount+=1 + except Exception: + pass + for j in range(ch.expr(1).getChild(0).getChildCount()): + try: + ch.expr(1).getChild(0).getChild(j).getRuleIndex() + jcount+=1 + except Exception: + pass + l = [] + for i in range(icount): + for j in range(jcount): + # a41_a53[i,j] = u4.expand().coeff(u1) + l.append(self.getValue(ch.expr(0).getChild(0).expr(i)) + ".expand().coeff(" + + self.getValue(ch.expr(1).getChild(0).expr(j)) + ")") + self.setValue(ctx, "_sm.Matrix([" + ", ".join(l) + "]).reshape(" + str(icount) + ", " + str(jcount) + ")") + else: + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + + ")" + ".expand().coeff(" + self.getValue(ch.expr(1)) + ")") + + # Exclude(y, x) Include(y, x) + elif func_name in ("exclude", "include"): + if func_name == "exclude": + e = "0" + else: + e = "1" + expr = self.getValue(ch.expr(0)) + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.matrix_expr.append(ctx) + self.setValue(ctx, "_sm.Matrix([i.collect(" + self.getValue(ch.expr(1)) + "])" + + ".coeff(" + self.getValue(ch.expr(1)) + "," + e + ")" + "for i in " + expr + ")" + + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])") + else: + self.setValue(ctx, "(" + expr + + ")" + ".collect(" + self.getValue(ch.expr(1)) + ")" + + ".coeff(" + self.getValue(ch.expr(1)) + "," + e + ")") + + # RHS(y) + elif func_name == "rhs": + self.setValue(ctx, self.explicit[self.getValue(ch.expr(0))]) + + # Arrange(y, n, x) * + elif func_name == "arrange": + expr = self.getValue(ch.expr(0)) + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.matrix_expr.append(ctx) + self.setValue(ctx, "_sm.Matrix([i.collect(" + self.getValue(ch.expr(2)) + + ")" + "for i in " + expr + "])"+ + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])") + else: + self.setValue(ctx, "(" + expr + + ")" + ".collect(" + self.getValue(ch.expr(2)) + ")") + + # Replace(y, sin(x)=3) + elif func_name == "replace": + l = [] + for i in range(1, ch.getChildCount()): + try: + if ch.getChild(i).getChild(1).getText() == "=": + l.append(self.getValue(ch.getChild(i).getChild(0)) + + ":" + self.getValue(ch.getChild(i).getChild(2))) + except Exception: + pass + expr = self.getValue(ch.expr(0)) + if ch.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.matrix_expr.append(ctx) + self.setValue(ctx, "_sm.Matrix([i.subs({" + ",".join(l) + "}) for i in " + + expr + "])" + + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])") + else: + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + ")" + + ".subs({" + ",".join(l) + "})") + + # Dot(Loop>, N1>) + elif func_name == "dot": + l = [] + num = (ch.expr(1).getChild(0).getChildCount()-1)//2 + if ch.expr(1) in self.matrix_expr: + for i in range(num): + l.append("_me.dot(" + self.getValue(ch.expr(0)) + ", " + self.getValue(ch.expr(1).getChild(0).expr(i)) + ")") + self.setValue(ctx, "_sm.Matrix([" + ",".join(l) + "]).reshape(" + str(num) + ", " + "1)") + else: + self.setValue(ctx, "_me.dot(" + self.getValue(ch.expr(0)) + ", " + self.getValue(ch.expr(1)) + ")") + # Cross(w_A_N>, P_NA_AB>) + elif func_name == "cross": + self.vector_expr.append(ctx) + self.setValue(ctx, "_me.cross(" + self.getValue(ch.expr(0)) + ", " + self.getValue(ch.expr(1)) + ")") + + # Mag(P_O_Q>) + elif func_name == "mag": + self.setValue(ctx, self.getValue(ch.expr(0)) + "." + "magnitude()") + + # MATRIX(A, I_R>>) + elif func_name == "matrix": + if self.type2[ch.expr(0).getText().lower()] == "frame": + text = "" + elif self.type2[ch.expr(0).getText().lower()] == "bodies": + text = "_f" + self.setValue(ctx, "(" + self.getValue(ch.expr(1)) + ")" + ".to_matrix(" + + self.symbol_table2[ch.expr(0).getText().lower()] + text + ")") + + # VECTOR(A, ROWS(EIGVECS,1)) + elif func_name == "vector": + if self.type2[ch.expr(0).getText().lower()] == "frame": + text = "" + elif self.type2[ch.expr(0).getText().lower()] == "bodies": + text = "_f" + v = self.getValue(ch.expr(1)) + f = self.symbol_table2[ch.expr(0).getText().lower()] + text + self.setValue(ctx, v + "[0]*" + f + ".x +" + v + "[1]*" + f + ".y +" + + v + "[2]*" + f + ".z") + + # Express(A2>, B) + # Here I am dealing with all the Inertia commands as I expect the users to use Inertia + # commands only with Express because SymPy needs the Reference frame to be specified unlike Autolev. + elif func_name == "express": + self.vector_expr.append(ctx) + if self.type2[ch.expr(1).getText().lower()] == "frame": + frame = self.symbol_table2[ch.expr(1).getText().lower()] + else: + frame = self.symbol_table2[ch.expr(1).getText().lower()] + "_f" + if ch.expr(0).getText().lower() == "1>>": + self.setValue(ctx, "_me.inertia(" + frame + ", 1, 1, 1)") + + elif '_' in ch.expr(0).getText().lower() and ch.expr(0).getText().lower().count('_') == 2\ + and ch.expr(0).getText().lower()[0] == "i" and ch.expr(0).getText().lower()[-2:] == ">>": + v1 = ch.expr(0).getText().lower()[:-2].split('_')[1] + v2 = ch.expr(0).getText().lower()[:-2].split('_')[2] + l = [] + inertia_func(self, v1, v2, l, frame) + self.setValue(ctx, " + ".join(l)) + + elif ch.expr(0).getChild(0).getChild(0).getText().lower() == "inertia": + if ch.expr(0).getChild(0).getChildCount() == 4: + l = [] + v2 = ch.expr(0).getChild(0).ID(0).getText().lower() + for v1 in self.bodies: + inertia_func(self, v1, v2, l, frame) + self.setValue(ctx, " + ".join(l)) + + else: + l = [] + l2 = [] + v2 = ch.expr(0).getChild(0).ID(0).getText().lower() + for i in range(1, (ch.expr(0).getChild(0).getChildCount()-2)//2): + l2.append(ch.expr(0).getChild(0).ID(i).getText().lower()) + for v1 in l2: + inertia_func(self, v1, v2, l, frame) + self.setValue(ctx, " + ".join(l)) + + else: + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + ")" + ".express(" + + self.symbol_table2[ch.expr(1).getText().lower()] + ")") + # CM(P) + elif func_name == "cm": + if self.type2[ch.expr(0).getText().lower()] == "point": + text = "" + else: + text = ".point" + if ch.getChildCount() == 4: + self.setValue(ctx, "_me.functions.center_of_mass(" + self.symbol_table2[ch.expr(0).getText().lower()] + + text + "," + ", ".join(self.bodies.values()) + ")") + else: + bodies = [] + for i in range(1, (ch.getChildCount()-1)//2): + bodies.append(self.symbol_table2[ch.expr(i).getText().lower()]) + self.setValue(ctx, "_me.functions.center_of_mass(" + self.symbol_table2[ch.expr(0).getText().lower()] + + text + "," + ", ".join(bodies) + ")") + + # PARTIALS(V_P1_E>,U1) + elif func_name == "partials": + speeds = [] + for i in range(1, (ch.getChildCount()-1)//2): + if self.kd_equivalents2: + speeds.append(self.kd_equivalents2[self.symbol_table[ch.expr(i).getText().lower()]]) + else: + speeds.append(self.symbol_table[ch.expr(i).getText().lower()]) + v1, v2, v3 = ch.expr(0).getText().lower().replace(">","").split('_') + if self.type2[v2] == "point": + point = self.symbol_table2[v2] + elif self.type2[v2] == "particle": + point = self.symbol_table2[v2] + ".point" + frame = self.symbol_table2[v3] + self.setValue(ctx, point + ".partial_velocity(" + frame + ", " + ",".join(speeds) + ")") + + # UnitVec(A1>+A2>+A3>) + elif func_name == "unitvec": + self.setValue(ctx, "(" + self.getValue(ch.expr(0)) + ")" + ".normalize()") + + # Units(deg, rad) + elif func_name == "units": + if ch.expr(0).getText().lower() == "deg" and ch.expr(1).getText().lower() == "rad": + factor = 0.0174533 + elif ch.expr(0).getText().lower() == "rad" and ch.expr(1).getText().lower() == "deg": + factor = 57.2958 + self.setValue(ctx, str(factor)) + # Mass(A) + elif func_name == "mass": + l = [] + try: + ch.ID(0).getText().lower() + for i in range((ch.getChildCount()-1)//2): + l.append(self.symbol_table2[ch.ID(i).getText().lower()] + ".mass") + self.setValue(ctx, "+".join(l)) + except Exception: + for i in self.bodies.keys(): + l.append(self.bodies[i] + ".mass") + self.setValue(ctx, "+".join(l)) + + # Fr() FrStar() + # _me.KanesMethod(n, q_ind, u_ind, kd, velocity_constraints).kanes_equations(pl, fl)[0] + elif func_name in ["fr", "frstar"]: + if not self.kane_parsed: + if self.kd_eqs: + for i in self.kd_eqs: + self.q_ind.append(self.symbol_table[i.strip().split('-')[0].replace("'","")]) + self.u_ind.append(self.symbol_table[i.strip().split('-')[1].replace("'","")]) + + for i in range(len(self.kd_eqs)): + self.kd_eqs[i] = self.symbol_table[self.kd_eqs[i].strip().split('-')[0]] + " - " +\ + self.symbol_table[self.kd_eqs[i].strip().split('-')[1]] + + # Do all of this if kd_eqs are not specified + if not self.kd_eqs: + self.kd_eqs_supplied = False + self.matrix_expr.append(ctx) + for i in self.type.keys(): + if self.type[i] == "motionvariable": + if self.sign[self.symbol_table[i.lower()]] == 0: + self.q_ind.append(self.symbol_table[i.lower()]) + elif self.sign[self.symbol_table[i.lower()]] == 1: + name = "u_" + self.symbol_table[i.lower()] + self.symbol_table.update({name: name}) + self.write(name + " = " + "_me.dynamicsymbols('" + name + "')\n") + if self.symbol_table[i.lower()] not in self.dependent_variables: + self.u_ind.append(name) + self.kd_equivalents.update({name: self.symbol_table[i.lower()]}) + else: + self.u_dep.append(name) + self.kd_equivalents.update({name: self.symbol_table[i.lower()]}) + + for i in self.kd_equivalents.keys(): + self.kd_eqs.append(self.kd_equivalents[i] + "-" + i) + + if not self.u_ind and not self.kd_eqs: + self.u_ind = self.q_ind.copy() + self.q_ind = [] + + # deal with velocity constraints + if self.dependent_variables: + for i in self.dependent_variables: + self.u_dep.append(i) + if i in self.u_ind: + self.u_ind.remove(i) + + + self.u_dep[:] = [i for i in self.u_dep if i not in self.kd_equivalents.values()] + + force_list = [] + for i in self.forces.keys(): + force_list.append("(" + i + "," + self.forces[i] + ")") + if self.u_dep: + u_dep_text = ", u_dependent=[" + ", ".join(self.u_dep) + "]" + else: + u_dep_text = "" + if self.dependent_variables: + velocity_constraints_text = ", velocity_constraints = velocity_constraints" + else: + velocity_constraints_text = "" + if ctx.parentCtx not in self.fr_expr: + self.write("kd_eqs = [" + ", ".join(self.kd_eqs) + "]\n") + self.write("forceList = " + "[" + ", ".join(force_list) + "]\n") + self.write("kane = _me.KanesMethod(" + self.newtonian + ", " + "q_ind=[" + + ",".join(self.q_ind) + "], " + "u_ind=[" + + ", ".join(self.u_ind) + "]" + u_dep_text + ", " + + "kd_eqs = kd_eqs" + velocity_constraints_text + ")\n") + self.write("fr, frstar = kane." + "kanes_equations([" + + ", ".join(self.bodies.values()) + "], forceList)\n") + self.fr_expr.append(ctx.parentCtx) + self.kane_parsed = True + self.setValue(ctx, func_name) + + def exitMatrices(self, ctx): + # Tree annotation for Matrices which is a labeled subrule of the parser rule expr. + + # MO = [a, b; c, d] + # we generate _sm.Matrix([a, b, c, d]).reshape(2, 2) + # The reshape values are determined by counting the "," and ";" in the Autolev matrix + + # Eg: + # [1, 2, 3; 4, 5, 6; 7, 8, 9; 10, 11, 12] + # semicolon_count = 3 and rows = 3+1 = 4 + # comma_count = 8 and cols = 8/rows + 1 = 8/4 + 1 = 3 + + # TODO** Parse block matrices + self.matrix_expr.append(ctx) + l = [] + semicolon_count = 0 + comma_count = 0 + for i in range(ctx.matrix().getChildCount()): + child = ctx.matrix().getChild(i) + if child == AutolevParser.ExprContext: + l.append(self.getValue(child)) + elif child.getText() == ";": + semicolon_count += 1 + l.append(",") + elif child.getText() == ",": + comma_count += 1 + l.append(",") + else: + try: + try: + l.append(self.getValue(child)) + except Exception: + l.append(self.symbol_table[child.getText().lower()]) + except Exception: + l.append(child.getText().lower()) + num_of_rows = semicolon_count + 1 + num_of_cols = (comma_count//num_of_rows) + 1 + + self.setValue(ctx, "_sm.Matrix(" + "".join(l) + ")" + ".reshape(" + + str(num_of_rows) + ", " + str(num_of_cols) + ")") + + def exitVectorOrDyadic(self, ctx): + self.vector_expr.append(ctx) + ch = ctx.vec() + + if ch.getChild(0).getText() == "0>": + self.setValue(ctx, "0") + + elif ch.getChild(0).getText() == "1>>": + self.setValue(ctx, "1>>") + + elif "_" in ch.ID().getText() and ch.ID().getText().count('_') == 2: + vec_text = ch.getText().lower() + v1, v2, v3 = ch.ID().getText().lower().split('_') + + if v1 == "p": + if self.type2[v2] == "point": + e2 = self.symbol_table2[v2] + elif self.type2[v2] == "particle": + e2 = self.symbol_table2[v2] + ".point" + if self.type2[v3] == "point": + e3 = self.symbol_table2[v3] + elif self.type2[v3] == "particle": + e3 = self.symbol_table2[v3] + ".point" + get_vec = e3 + ".pos_from(" + e2 + ")" + self.setValue(ctx, get_vec) + + elif v1 in ("w", "alf"): + if v1 == "w": + text = ".ang_vel_in(" + elif v1 == "alf": + text = ".ang_acc_in(" + if self.type2[v2] == "bodies": + e2 = self.symbol_table2[v2] + "_f" + elif self.type2[v2] == "frame": + e2 = self.symbol_table2[v2] + if self.type2[v3] == "bodies": + e3 = self.symbol_table2[v3] + "_f" + elif self.type2[v3] == "frame": + e3 = self.symbol_table2[v3] + get_vec = e2 + text + e3 + ")" + self.setValue(ctx, get_vec) + + elif v1 in ("v", "a"): + if v1 == "v": + text = ".vel(" + elif v1 == "a": + text = ".acc(" + if self.type2[v2] == "point": + e2 = self.symbol_table2[v2] + elif self.type2[v2] == "particle": + e2 = self.symbol_table2[v2] + ".point" + get_vec = e2 + text + self.symbol_table2[v3] + ")" + self.setValue(ctx, get_vec) + + else: + self.setValue(ctx, vec_text.replace(">", "")) + + else: + vec_text = ch.getText().lower() + name = self.symbol_table[vec_text] + self.setValue(ctx, name) + + def exitIndexing(self, ctx): + if ctx.getChildCount() == 4: + try: + int_text = str(int(self.getValue(ctx.getChild(2))) - 1) + except Exception: + int_text = self.getValue(ctx.getChild(2)) + " - 1" + self.setValue(ctx, ctx.ID().getText().lower() + "[" + int_text + "]") + elif ctx.getChildCount() == 6: + try: + int_text1 = str(int(self.getValue(ctx.getChild(2))) - 1) + except Exception: + int_text1 = self.getValue(ctx.getChild(2)) + " - 1" + try: + int_text2 = str(int(self.getValue(ctx.getChild(4))) - 1) + except Exception: + int_text2 = self.getValue(ctx.getChild(2)) + " - 1" + self.setValue(ctx, ctx.ID().getText().lower() + "[" + int_text1 + ", " + int_text2 + "]") + + + # ================== Subrules of parser rule expr (End) ====================== # + + def exitRegularAssign(self, ctx): + # Handle assignments of type ID = expr + if ctx.equals().getText() in ["=", "+=", "-=", "*=", "/="]: + equals = ctx.equals().getText() + elif ctx.equals().getText() == ":=": + equals = " = " + elif ctx.equals().getText() == "^=": + equals = "**=" + + try: + a = ctx.ID().getText().lower() + "'"*ctx.diff().getText().count("'") + except Exception: + a = ctx.ID().getText().lower() + + if a in self.type.keys() and self.type[a] in ("motionvariable", "motionvariable'") and\ + self.type[ctx.expr().getText().lower()] in ("motionvariable", "motionvariable'"): + b = ctx.expr().getText().lower() + if "'" in b and "'" not in a: + a, b = b, a + if not self.kane_parsed: + self.kd_eqs.append(a + "-" + b) + self.kd_equivalents.update({self.symbol_table[a]: + self.symbol_table[b]}) + self.kd_equivalents2.update({self.symbol_table[b]: + self.symbol_table[a]}) + + if a in self.symbol_table.keys() and a in self.type.keys() and self.type[a] in ("variable", "motionvariable"): + self.explicit.update({self.symbol_table[a]: self.getValue(ctx.expr())}) + + else: + if ctx.expr() in self.matrix_expr: + self.type.update({a: "matrix"}) + + try: + b = self.symbol_table[a] + except KeyError: + self.symbol_table[a] = a + + if "_" in a and a.count("_") == 1: + e1, e2 = a.split('_') + if e1 in self.type2.keys() and self.type2[e1] in ("frame", "bodies")\ + and e2 in self.type2.keys() and self.type2[e2] in ("frame", "bodies"): + if self.type2[e1] == "bodies": + t1 = "_f" + else: + t1 = "" + if self.type2[e2] == "bodies": + t2 = "_f" + else: + t2 = "" + + self.write(self.symbol_table2[e2] + t2 + ".orient(" + self.symbol_table2[e1] + + t1 + ", 'DCM', " + self.getValue(ctx.expr()) + ")\n") + else: + self.write(self.symbol_table[a] + " " + equals + " " + + self.getValue(ctx.expr()) + "\n") + else: + self.write(self.symbol_table[a] + " " + equals + " " + + self.getValue(ctx.expr()) + "\n") + + def exitIndexAssign(self, ctx): + # Handle assignments of type ID[index] = expr + if ctx.equals().getText() in ["=", "+=", "-=", "*=", "/="]: + equals = ctx.equals().getText() + elif ctx.equals().getText() == ":=": + equals = " = " + elif ctx.equals().getText() == "^=": + equals = "**=" + + text = ctx.ID().getText().lower() + self.type.update({text: "matrix"}) + # Handle assignments of type ID[2] = expr + if ctx.index().getChildCount() == 1: + if ctx.index().getChild(0).getText() == "1": + self.type.update({text: "matrix"}) + self.symbol_table.update({text: text}) + self.write(text + " = " + "_sm.Matrix([[0]])\n") + self.write(text + "[0] = " + self.getValue(ctx.expr()) + "\n") + else: + # m = m.row_insert(m.shape[0], _sm.Matrix([[0]])) + self.write(text + " = " + text + + ".row_insert(" + text + ".shape[0]" + ", " + "_sm.Matrix([[0]])" + ")\n") + self.write(text + "[" + text + ".shape[0]-1" + "] = " + self.getValue(ctx.expr()) + "\n") + + # Handle assignments of type ID[2, 2] = expr + elif ctx.index().getChildCount() == 3: + l = [] + try: + l.append(str(int(self.getValue(ctx.index().getChild(0)))-1)) + except Exception: + l.append(self.getValue(ctx.index().getChild(0)) + "-1") + l.append(",") + try: + l.append(str(int(self.getValue(ctx.index().getChild(2)))-1)) + except Exception: + l.append(self.getValue(ctx.index().getChild(2)) + "-1") + self.write(self.symbol_table[ctx.ID().getText().lower()] + + "[" + "".join(l) + "]" + " " + equals + " " + self.getValue(ctx.expr()) + "\n") + + def exitVecAssign(self, ctx): + # Handle assignments of the type vec = expr + ch = ctx.vec() + vec_text = ch.getText().lower() + + if "_" in ch.ID().getText(): + num = ch.ID().getText().count('_') + + if num == 2: + v1, v2, v3 = ch.ID().getText().lower().split('_') + + if v1 == "p": + if self.type2[v2] == "point": + e2 = self.symbol_table2[v2] + elif self.type2[v2] == "particle": + e2 = self.symbol_table2[v2] + ".point" + if self.type2[v3] == "point": + e3 = self.symbol_table2[v3] + elif self.type2[v3] == "particle": + e3 = self.symbol_table2[v3] + ".point" + # ab.set_pos(na, la*a.x) + self.write(e3 + ".set_pos(" + e2 + ", " + self.getValue(ctx.expr()) + ")\n") + + elif v1 in ("w", "alf"): + if v1 == "w": + text = ".set_ang_vel(" + elif v1 == "alf": + text = ".set_ang_acc(" + # a.set_ang_vel(n, qad*a.z) + if self.type2[v2] == "bodies": + e2 = self.symbol_table2[v2] + "_f" + else: + e2 = self.symbol_table2[v2] + if self.type2[v3] == "bodies": + e3 = self.symbol_table2[v3] + "_f" + else: + e3 = self.symbol_table2[v3] + self.write(e2 + text + e3 + ", " + self.getValue(ctx.expr()) + ")\n") + + elif v1 in ("v", "a"): + if v1 == "v": + text = ".set_vel(" + elif v1 == "a": + text = ".set_acc(" + if self.type2[v2] == "point": + e2 = self.symbol_table2[v2] + elif self.type2[v2] == "particle": + e2 = self.symbol_table2[v2] + ".point" + self.write(e2 + text + self.symbol_table2[v3] + + ", " + self.getValue(ctx.expr()) + ")\n") + elif v1 == "i": + if v2 in self.type2.keys() and self.type2[v2] == "bodies": + self.write(self.symbol_table2[v2] + ".inertia = (" + self.getValue(ctx.expr()) + + ", " + self.symbol_table2[v3] + ")\n") + self.inertia_point.update({v2: v3}) + elif v2 in self.type2.keys() and self.type2[v2] == "particle": + self.write(ch.ID().getText().lower() + " = " + self.getValue(ctx.expr()) + "\n") + else: + self.write(ch.ID().getText().lower() + " = " + self.getValue(ctx.expr()) + "\n") + else: + self.write(ch.ID().getText().lower() + " = " + self.getValue(ctx.expr()) + "\n") + + elif num == 1: + v1, v2 = ch.ID().getText().lower().split('_') + + if v1 in ("force", "torque"): + if self.type2[v2] in ("point", "frame"): + e2 = self.symbol_table2[v2] + elif self.type2[v2] == "particle": + e2 = self.symbol_table2[v2] + ".point" + self.symbol_table.update({vec_text: ch.ID().getText().lower()}) + + if e2 in self.forces.keys(): + self.forces[e2] = self.forces[e2] + " + " + self.getValue(ctx.expr()) + else: + self.forces.update({e2: self.getValue(ctx.expr())}) + self.write(ch.ID().getText().lower() + " = " + self.forces[e2] + "\n") + + else: + name = ch.ID().getText().lower() + self.symbol_table.update({vec_text: name}) + self.write(ch.ID().getText().lower() + " = " + self.getValue(ctx.expr()) + "\n") + else: + name = ch.ID().getText().lower() + self.symbol_table.update({vec_text: name}) + self.write(name + " " + ctx.getChild(1).getText() + " " + self.getValue(ctx.expr()) + "\n") + else: + name = ch.ID().getText().lower() + self.symbol_table.update({vec_text: name}) + self.write(name + " " + ctx.getChild(1).getText() + " " + self.getValue(ctx.expr()) + "\n") + + def enterInputs2(self, ctx): + self.in_inputs = True + + # Inputs + def exitInputs2(self, ctx): + # Stores numerical values given by the input command which + # are used for codegen and numerical analysis. + if ctx.getChildCount() == 3: + try: + self.inputs.update({self.symbol_table[ctx.id_diff().getText().lower()]: self.getValue(ctx.expr(0))}) + except Exception: + self.inputs.update({ctx.id_diff().getText().lower(): self.getValue(ctx.expr(0))}) + elif ctx.getChildCount() == 4: + try: + self.inputs.update({self.symbol_table[ctx.id_diff().getText().lower()]: + (self.getValue(ctx.expr(0)), self.getValue(ctx.expr(1)))}) + except Exception: + self.inputs.update({ctx.id_diff().getText().lower(): + (self.getValue(ctx.expr(0)), self.getValue(ctx.expr(1)))}) + + self.in_inputs = False + + def enterOutputs(self, ctx): + self.in_outputs = True + def exitOutputs(self, ctx): + self.in_outputs = False + + def exitOutputs2(self, ctx): + try: + if "[" in ctx.expr(1).getText(): + self.outputs.append(self.symbol_table[ctx.expr(0).getText().lower()] + + ctx.expr(1).getText().lower()) + else: + self.outputs.append(self.symbol_table[ctx.expr(0).getText().lower()]) + + except Exception: + pass + + # Code commands + def exitCodegen(self, ctx): + # Handles the CODE() command ie the solvers and the codgen part. + # Uses linsolve for the algebraic solvers and nsolve for non linear solvers. + + if ctx.functionCall().getChild(0).getText().lower() == "algebraic": + matrix_name = self.getValue(ctx.functionCall().expr(0)) + e = [] + d = [] + for i in range(1, (ctx.functionCall().getChildCount()-2)//2): + a = self.getValue(ctx.functionCall().expr(i)) + e.append(a) + + for i in self.inputs.keys(): + d.append(i + ":" + self.inputs[i]) + self.write(matrix_name + "_list" + " = " + "[]\n") + self.write("for i in " + matrix_name + ": " + matrix_name + + "_list" + ".append(i.subs({" + ", ".join(d) + "}))\n") + self.write("print(_sm.linsolve(" + matrix_name + "_list" + ", " + ",".join(e) + "))\n") + + elif ctx.functionCall().getChild(0).getText().lower() == "nonlinear": + e = [] + d = [] + guess = [] + for i in range(1, (ctx.functionCall().getChildCount()-2)//2): + a = self.getValue(ctx.functionCall().expr(i)) + e.append(a) + #print(self.inputs) + for i in self.inputs.keys(): + if i in self.symbol_table.keys(): + if type(self.inputs[i]) is tuple: + j, z = self.inputs[i] + else: + j = self.inputs[i] + z = "" + if i not in e: + if z == "deg": + d.append(i + ":" + "_np.deg2rad(" + j + ")") + else: + d.append(i + ":" + j) + else: + if z == "deg": + guess.append("_np.deg2rad(" + j + ")") + else: + guess.append(j) + + self.write("matrix_list" + " = " + "[]\n") + self.write("for i in " + self.getValue(ctx.functionCall().expr(0)) + ":") + self.write("matrix_list" + ".append(i.subs({" + ", ".join(d) + "}))\n") + self.write("print(_sm.nsolve(matrix_list," + "(" + ",".join(e) + ")" + + ",(" + ",".join(guess) + ")" + "))\n") + + elif ctx.functionCall().getChild(0).getText().lower() in ["ode", "dynamics"] and self.include_numeric: + if self.kane_type == "no_args": + for i in self.symbol_table.keys(): + try: + if self.type[i] == "constants" or self.type[self.symbol_table[i]] == "constants": + self.constants.append(self.symbol_table[i]) + except Exception: + pass + q_add_u = self.q_ind + self.q_dep + self.u_ind + self.u_dep + x0 = [] + for i in q_add_u: + try: + if i in self.inputs.keys(): + if type(self.inputs[i]) is tuple: + if self.inputs[i][1] == "deg": + x0.append(i + ":" + "_np.deg2rad(" + self.inputs[i][0] + ")") + else: + x0.append(i + ":" + self.inputs[i][0]) + else: + x0.append(i + ":" + self.inputs[i]) + elif self.kd_equivalents[i] in self.inputs.keys(): + if type(self.inputs[self.kd_equivalents[i]]) is tuple: + x0.append(i + ":" + self.inputs[self.kd_equivalents[i]][0]) + else: + x0.append(i + ":" + self.inputs[self.kd_equivalents[i]]) + except Exception: + pass + + # numerical constants + numerical_constants = [] + for i in self.constants: + if i in self.inputs.keys(): + if type(self.inputs[i]) is tuple: + numerical_constants.append(self.inputs[i][0]) + else: + numerical_constants.append(self.inputs[i]) + + # t = linspace + t_final = self.inputs["tfinal"] + integ_stp = self.inputs["integstp"] + + self.write("from pydy.system import System\n") + const_list = [] + if numerical_constants: + for i in range(len(self.constants)): + const_list.append(self.constants[i] + ":" + numerical_constants[i]) + specifieds = [] + if self.t: + specifieds.append("_me.dynamicsymbols('t')" + ":" + "lambda x, t: t") + + for i in self.inputs: + if i in self.symbol_table.keys() and self.symbol_table[i] not in\ + self.constants + self.q_ind + self.q_dep + self.u_ind + self.u_dep: + specifieds.append(self.symbol_table[i] + ":" + self.inputs[i]) + + self.write("sys = System(kane, constants = {" + ", ".join(const_list) + "},\n" + + "specifieds={" + ", ".join(specifieds) + "},\n" + + "initial_conditions={" + ", ".join(x0) + "},\n" + + "times = _np.linspace(0.0, " + str(t_final) + ", " + str(t_final) + + "/" + str(integ_stp) + "))\n\ny=sys.integrate()\n") + + # For outputs other than qs and us. + other_outputs = [] + for i in self.outputs: + if i not in q_add_u: + if "[" in i: + other_outputs.append((i[:-3] + i[-2], i[:-3] + "[" + str(int(i[-2])-1) + "]")) + else: + other_outputs.append((i, i)) + + for i in other_outputs: + self.write(i[0] + "_out" + " = " + "[]\n") + if other_outputs: + self.write("for i in y:\n") + self.write(" q_u_dict = dict(zip(sys.coordinates+sys.speeds, i))\n") + for i in other_outputs: + self.write(" "*4 + i[0] + "_out" + ".append(" + i[1] + ".subs(q_u_dict)" + + ".subs(sys.constants).evalf())\n") + + # Standalone function calls (used for dual functions) + def exitFunctionCall(self, ctx): + # Basically deals with standalone function calls ie functions which are not a part of + # expressions and assignments. Autolev Dual functions can both appear in standalone + # function calls and also on the right hand side as part of expr or assignment. + + # Dual functions are indicated by a * in the comments below + + # Checks if the function is a statement on its own + if ctx.parentCtx.getRuleIndex() == AutolevParser.RULE_stat: + func_name = ctx.getChild(0).getText().lower() + # Expand(E, n:m) * + if func_name == "expand": + # If the first argument is a pre declared variable. + expr = self.getValue(ctx.expr(0)) + symbol = self.symbol_table[ctx.expr(0).getText().lower()] + if ctx.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.write(symbol + " = " + "_sm.Matrix([i.expand() for i in " + expr + "])" + + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])\n") + else: + self.write(symbol + " = " + symbol + "." + "expand()\n") + + # Factor(E, x) * + elif func_name == "factor": + expr = self.getValue(ctx.expr(0)) + symbol = self.symbol_table[ctx.expr(0).getText().lower()] + if ctx.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.write(symbol + " = " + "_sm.Matrix([_sm.factor(i," + self.getValue(ctx.expr(1)) + + ") for i in " + expr + "])" + + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])\n") + else: + self.write(expr + " = " + "_sm.factor(" + expr + ", " + + self.getValue(ctx.expr(1)) + ")\n") + + # Solve(Zero, x, y) + elif func_name == "solve": + l = [] + l2 = [] + num = 0 + for i in range(1, ctx.getChildCount()): + if ctx.getChild(i).getText() == ",": + num+=1 + try: + l.append(self.getValue(ctx.getChild(i))) + except Exception: + l.append(ctx.getChild(i).getText()) + + if i != 2: + try: + l2.append(self.getValue(ctx.getChild(i))) + except Exception: + pass + + for i in l2: + self.explicit.update({i: "_sm.solve" + "".join(l) + "[" + i + "]"}) + + self.write("print(_sm.solve" + "".join(l) + ")\n") + + # Arrange(y, n, x) * + elif func_name == "arrange": + expr = self.getValue(ctx.expr(0)) + symbol = self.symbol_table[ctx.expr(0).getText().lower()] + + if ctx.expr(0) in self.matrix_expr or (expr in self.type.keys() and self.type[expr] == "matrix"): + self.write(symbol + " = " + "_sm.Matrix([i.collect(" + self.getValue(ctx.expr(2)) + + ")" + "for i in " + expr + "])" + + ".reshape((" + expr + ").shape[0], " + "(" + expr + ").shape[1])\n") + else: + self.write(self.getValue(ctx.expr(0)) + ".collect(" + + self.getValue(ctx.expr(2)) + ")\n") + + # Eig(M, EigenValue, EigenVec) + elif func_name == "eig": + self.symbol_table.update({ctx.expr(1).getText().lower(): ctx.expr(1).getText().lower()}) + self.symbol_table.update({ctx.expr(2).getText().lower(): ctx.expr(2).getText().lower()}) + # _sm.Matrix([i.evalf() for i in (i_s_so).eigenvals().keys()]) + self.write(ctx.expr(1).getText().lower() + " = " + + "_sm.Matrix([i.evalf() for i in " + + "(" + self.getValue(ctx.expr(0)) + ")" + ".eigenvals().keys()])\n") + # _sm.Matrix([i[2][0].evalf() for i in (i_s_o).eigenvects()]).reshape(i_s_o.shape[0], i_s_o.shape[1]) + self.write(ctx.expr(2).getText().lower() + " = " + + "_sm.Matrix([i[2][0].evalf() for i in " + "(" + self.getValue(ctx.expr(0)) + ")" + + ".eigenvects()]).reshape(" + self.getValue(ctx.expr(0)) + ".shape[0], " + + self.getValue(ctx.expr(0)) + ".shape[1])\n") + + # Simprot(N, A, 3, qA) + elif func_name == "simprot": + # A.orient(N, 'Axis', qA, N.z) + if self.type2[ctx.expr(0).getText().lower()] == "frame": + frame1 = self.symbol_table2[ctx.expr(0).getText().lower()] + elif self.type2[ctx.expr(0).getText().lower()] == "bodies": + frame1 = self.symbol_table2[ctx.expr(0).getText().lower()] + "_f" + if self.type2[ctx.expr(1).getText().lower()] == "frame": + frame2 = self.symbol_table2[ctx.expr(1).getText().lower()] + elif self.type2[ctx.expr(1).getText().lower()] == "bodies": + frame2 = self.symbol_table2[ctx.expr(1).getText().lower()] + "_f" + e2 = "" + if ctx.expr(2).getText()[0] == "-": + e2 = "-1*" + if ctx.expr(2).getText() in ("1", "-1"): + e = frame1 + ".x" + elif ctx.expr(2).getText() in ("2", "-2"): + e = frame1 + ".y" + elif ctx.expr(2).getText() in ("3", "-3"): + e = frame1 + ".z" + else: + e = self.getValue(ctx.expr(2)) + e2 = "" + + if "degrees" in self.settings.keys() and self.settings["degrees"] == "off": + value = self.getValue(ctx.expr(3)) + else: + if ctx.expr(3) in self.numeric_expr: + value = "_np.deg2rad(" + self.getValue(ctx.expr(3)) + ")" + else: + value = self.getValue(ctx.expr(3)) + self.write(frame2 + ".orient(" + frame1 + + ", " + "'Axis'" + ", " + "[" + value + + ", " + e2 + e + "]" + ")\n") + + # Express(A2>, B) * + elif func_name == "express": + if self.type2[ctx.expr(1).getText().lower()] == "bodies": + f = "_f" + else: + f = "" + + if '_' in ctx.expr(0).getText().lower() and ctx.expr(0).getText().count('_') == 2: + vec = ctx.expr(0).getText().lower().replace(">", "").split('_') + v1 = self.symbol_table2[vec[1]] + v2 = self.symbol_table2[vec[2]] + if vec[0] == "p": + self.write(v2 + ".set_pos(" + v1 + ", " + "(" + self.getValue(ctx.expr(0)) + + ")" + ".express(" + self.symbol_table2[ctx.expr(1).getText().lower()] + f + "))\n") + elif vec[0] == "v": + self.write(v1 + ".set_vel(" + v2 + ", " + "(" + self.getValue(ctx.expr(0)) + + ")" + ".express(" + self.symbol_table2[ctx.expr(1).getText().lower()] + f + "))\n") + elif vec[0] == "a": + self.write(v1 + ".set_acc(" + v2 + ", " + "(" + self.getValue(ctx.expr(0)) + + ")" + ".express(" + self.symbol_table2[ctx.expr(1).getText().lower()] + f + "))\n") + else: + self.write(self.getValue(ctx.expr(0)) + " = " + "(" + self.getValue(ctx.expr(0)) + ")" + ".express(" + + self.symbol_table2[ctx.expr(1).getText().lower()] + f + ")\n") + else: + self.write(self.getValue(ctx.expr(0)) + " = " + "(" + self.getValue(ctx.expr(0)) + ")" + ".express(" + + self.symbol_table2[ctx.expr(1).getText().lower()] + f + ")\n") + + # Angvel(A, B) + elif func_name == "angvel": + self.write("print(" + self.symbol_table2[ctx.expr(1).getText().lower()] + + ".ang_vel_in(" + self.symbol_table2[ctx.expr(0).getText().lower()] + "))\n") + + # v2pts(N, A, O, P) + elif func_name in ("v2pts", "a2pts", "v2pt", "a1pt"): + if func_name == "v2pts": + text = ".v2pt_theory(" + elif func_name == "a2pts": + text = ".a2pt_theory(" + elif func_name == "v1pt": + text = ".v1pt_theory(" + elif func_name == "a1pt": + text = ".a1pt_theory(" + if self.type2[ctx.expr(1).getText().lower()] == "frame": + frame = self.symbol_table2[ctx.expr(1).getText().lower()] + elif self.type2[ctx.expr(1).getText().lower()] == "bodies": + frame = self.symbol_table2[ctx.expr(1).getText().lower()] + "_f" + expr_list = [] + for i in range(2, 4): + if self.type2[ctx.expr(i).getText().lower()] == "point": + expr_list.append(self.symbol_table2[ctx.expr(i).getText().lower()]) + elif self.type2[ctx.expr(i).getText().lower()] == "particle": + expr_list.append(self.symbol_table2[ctx.expr(i).getText().lower()] + ".point") + + self.write(expr_list[1] + text + expr_list[0] + + "," + self.symbol_table2[ctx.expr(0).getText().lower()] + "," + + frame + ")\n") + + # Gravity(g*N1>) + elif func_name == "gravity": + for i in self.bodies.keys(): + if self.type2[i] == "bodies": + e = self.symbol_table2[i] + ".masscenter" + elif self.type2[i] == "particle": + e = self.symbol_table2[i] + ".point" + if e in self.forces.keys(): + self.forces[e] = self.forces[e] + self.symbol_table2[i] +\ + ".mass*(" + self.getValue(ctx.expr(0)) + ")" + else: + self.forces.update({e: self.symbol_table2[i] + + ".mass*(" + self.getValue(ctx.expr(0)) + ")"}) + self.write("force_" + i + " = " + self.forces[e] + "\n") + + # Explicit(EXPRESS(IMPLICIT>,C)) + elif func_name == "explicit": + if ctx.expr(0) in self.vector_expr: + self.vector_expr.append(ctx) + expr = self.getValue(ctx.expr(0)) + if self.explicit.keys(): + explicit_list = [] + for i in self.explicit.keys(): + explicit_list.append(i + ":" + self.explicit[i]) + if '_' in ctx.expr(0).getText().lower() and ctx.expr(0).getText().count('_') == 2: + vec = ctx.expr(0).getText().lower().replace(">", "").split('_') + v1 = self.symbol_table2[vec[1]] + v2 = self.symbol_table2[vec[2]] + if vec[0] == "p": + self.write(v2 + ".set_pos(" + v1 + ", " + "(" + expr + + ")" + ".subs({" + ", ".join(explicit_list) + "}))\n") + elif vec[0] == "v": + self.write(v2 + ".set_vel(" + v1 + ", " + "(" + expr + + ")" + ".subs({" + ", ".join(explicit_list) + "}))\n") + elif vec[0] == "a": + self.write(v2 + ".set_acc(" + v1 + ", " + "(" + expr + + ")" + ".subs({" + ", ".join(explicit_list) + "}))\n") + else: + self.write(expr + " = " + "(" + expr + ")" + ".subs({" + ", ".join(explicit_list) + "})\n") + else: + self.write(expr + " = " + "(" + expr + ")" + ".subs({" + ", ".join(explicit_list) + "})\n") + + # Force(O/Q, -k*Stretch*Uvec>) + elif func_name in ("force", "torque"): + + if "/" in ctx.expr(0).getText().lower(): + p1 = ctx.expr(0).getText().lower().split('/')[0] + p2 = ctx.expr(0).getText().lower().split('/')[1] + if self.type2[p1] in ("point", "frame"): + pt1 = self.symbol_table2[p1] + elif self.type2[p1] == "particle": + pt1 = self.symbol_table2[p1] + ".point" + if self.type2[p2] in ("point", "frame"): + pt2 = self.symbol_table2[p2] + elif self.type2[p2] == "particle": + pt2 = self.symbol_table2[p2] + ".point" + if pt1 in self.forces.keys(): + self.forces[pt1] = self.forces[pt1] + " + -1*("+self.getValue(ctx.expr(1)) + ")" + self.write("force_" + p1 + " = " + self.forces[pt1] + "\n") + else: + self.forces.update({pt1: "-1*("+self.getValue(ctx.expr(1)) + ")"}) + self.write("force_" + p1 + " = " + self.forces[pt1] + "\n") + if pt2 in self.forces.keys(): + self.forces[pt2] = self.forces[pt2] + "+ " + self.getValue(ctx.expr(1)) + self.write("force_" + p2 + " = " + self.forces[pt2] + "\n") + else: + self.forces.update({pt2: self.getValue(ctx.expr(1))}) + self.write("force_" + p2 + " = " + self.forces[pt2] + "\n") + + elif ctx.expr(0).getChildCount() == 1: + p1 = ctx.expr(0).getText().lower() + if self.type2[p1] in ("point", "frame"): + pt1 = self.symbol_table2[p1] + elif self.type2[p1] == "particle": + pt1 = self.symbol_table2[p1] + ".point" + if pt1 in self.forces.keys(): + self.forces[pt1] = self.forces[pt1] + "+ -1*(" + self.getValue(ctx.expr(1)) + ")" + else: + self.forces.update({pt1: "-1*(" + self.getValue(ctx.expr(1)) + ")"}) + + # Constrain(Dependent[qB]) + elif func_name == "constrain": + if ctx.getChild(2).getChild(0).getText().lower() == "dependent": + self.write("velocity_constraints = [i for i in dependent]\n") + x = (ctx.expr(0).getChildCount()-2)//2 + for i in range(x): + self.dependent_variables.append(self.getValue(ctx.expr(0).expr(i))) + + # Kane() + elif func_name == "kane": + if ctx.getChildCount() == 3: + self.kane_type = "no_args" + + # Settings + def exitSettings(self, ctx): + # Stores settings like Complex on/off, Degrees on/off etc in self.settings. + try: + self.settings.update({ctx.getChild(0).getText().lower(): + ctx.getChild(1).getText().lower()}) + except Exception: + pass + + def exitMassDecl2(self, ctx): + # Used for declaring the masses of particles and rigidbodies. + particle = self.symbol_table2[ctx.getChild(0).getText().lower()] + if ctx.getText().count("=") == 2: + if ctx.expr().expr(1) in self.numeric_expr: + e = "_sm.S(" + self.getValue(ctx.expr().expr(1)) + ")" + else: + e = self.getValue(ctx.expr().expr(1)) + self.symbol_table.update({ctx.expr().expr(0).getText().lower(): ctx.expr().expr(0).getText().lower()}) + self.write(ctx.expr().expr(0).getText().lower() + " = " + e + "\n") + mass = ctx.expr().expr(0).getText().lower() + else: + try: + if ctx.expr() in self.numeric_expr: + mass = "_sm.S(" + self.getValue(ctx.expr()) + ")" + else: + mass = self.getValue(ctx.expr()) + except Exception: + a_text = ctx.expr().getText().lower() + self.symbol_table.update({a_text: a_text}) + self.type.update({a_text: "constants"}) + self.write(a_text + " = " + "_sm.symbols('" + a_text + "')\n") + mass = a_text + + self.write(particle + ".mass = " + mass + "\n") + + def exitInertiaDecl(self, ctx): + inertia_list = [] + try: + ctx.ID(1).getText() + num = 5 + except Exception: + num = 2 + for i in range((ctx.getChildCount()-num)//2): + try: + if ctx.expr(i) in self.numeric_expr: + inertia_list.append("_sm.S(" + self.getValue(ctx.expr(i)) + ")") + else: + inertia_list.append(self.getValue(ctx.expr(i))) + except Exception: + a_text = ctx.expr(i).getText().lower() + self.symbol_table.update({a_text: a_text}) + self.type.update({a_text: "constants"}) + self.write(a_text + " = " + "_sm.symbols('" + a_text + "')\n") + inertia_list.append(a_text) + + if len(inertia_list) < 6: + for i in range(6-len(inertia_list)): + inertia_list.append("0") + # body_a.inertia = (_me.inertia(body_a, I1, I2, I3, 0, 0, 0), body_a_cm) + try: + frame = self.symbol_table2[ctx.ID(1).getText().lower()] + point = self.symbol_table2[ctx.ID(0).getText().lower().split('_')[1]] + body = self.symbol_table2[ctx.ID(0).getText().lower().split('_')[0]] + self.inertia_point.update({ctx.ID(0).getText().lower().split('_')[0] + : ctx.ID(0).getText().lower().split('_')[1]}) + self.write(body + ".inertia" + " = " + "(_me.inertia(" + frame + ", " + + ", ".join(inertia_list) + "), " + point + ")\n") + + except Exception: + body_name = self.symbol_table2[ctx.ID(0).getText().lower()] + body_name_cm = body_name + "_cm" + self.inertia_point.update({ctx.ID(0).getText().lower(): ctx.ID(0).getText().lower() + "o"}) + self.write(body_name + ".inertia" + " = " + "(_me.inertia(" + body_name + "_f" + ", " + + ", ".join(inertia_list) + "), " + body_name_cm + ")\n") diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_parse_autolev_antlr.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_parse_autolev_antlr.py new file mode 100644 index 0000000000000000000000000000000000000000..e43924aac30903ade996b31921d3960afae90284 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/_parse_autolev_antlr.py @@ -0,0 +1,38 @@ +from importlib.metadata import version +from sympy.external import import_module + + +autolevparser = import_module('sympy.parsing.autolev._antlr.autolevparser', + import_kwargs={'fromlist': ['AutolevParser']}) +autolevlexer = import_module('sympy.parsing.autolev._antlr.autolevlexer', + import_kwargs={'fromlist': ['AutolevLexer']}) +autolevlistener = import_module('sympy.parsing.autolev._antlr.autolevlistener', + import_kwargs={'fromlist': ['AutolevListener']}) + +AutolevParser = getattr(autolevparser, 'AutolevParser', None) +AutolevLexer = getattr(autolevlexer, 'AutolevLexer', None) +AutolevListener = getattr(autolevlistener, 'AutolevListener', None) + + +def parse_autolev(autolev_code, include_numeric): + antlr4 = import_module('antlr4') + if not antlr4 or not version('antlr4-python3-runtime').startswith('4.11'): + raise ImportError("Autolev parsing requires the antlr4 Python package," + " provided by pip (antlr4-python3-runtime)" + " conda (antlr-python-runtime), version 4.11") + try: + l = autolev_code.readlines() + input_stream = antlr4.InputStream("".join(l)) + except Exception: + input_stream = antlr4.InputStream(autolev_code) + + if AutolevListener: + from ._listener_autolev_antlr import MyListener + lexer = AutolevLexer(input_stream) + token_stream = antlr4.CommonTokenStream(lexer) + parser = AutolevParser(token_stream) + tree = parser.prog() + my_listener = MyListener(include_numeric) + walker = antlr4.ParseTreeWalker() + walker.walk(my_listener, tree) + return "".join(my_listener.output_code) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/README.txt b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/README.txt new file mode 100644 index 0000000000000000000000000000000000000000..946b006bac33544fadd2dc6d24c22240c8fbc8e4 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/README.txt @@ -0,0 +1,9 @@ +# parsing/tests/test_autolev.py uses the .al files in this directory as inputs and checks +# the equivalence of the parser generated codes and the respective .py files. + +# By default, this directory contains tests for all rules of the parser. + +# Additional tests consisting of full physics examples shall be made available soon in +# the form of another repository. One shall be able to copy the contents of that repo +# to this folder and use those tests after uncommenting the respective code in +# parsing/tests/test_autolev.py. diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/chaos_pendulum.al b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/chaos_pendulum.al new file mode 100644 index 0000000000000000000000000000000000000000..3bbb4d51b853bfd759df38d666a42adc1cbea190 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/chaos_pendulum.al @@ -0,0 +1,33 @@ +CONSTANTS G,LB,W,H +MOTIONVARIABLES' THETA'',PHI'',OMEGA',ALPHA' +NEWTONIAN N +BODIES A,B +SIMPROT(N,A,2,THETA) +SIMPROT(A,B,3,PHI) +POINT O +LA = (LB-H/2)/2 +P_O_AO> = LA*A3> +P_O_BO> = LB*A3> +OMEGA = THETA' +ALPHA = PHI' +W_A_N> = OMEGA*N2> +W_B_A> = ALPHA*A3> +V_O_N> = 0> +V2PTS(N, A, O, AO) +V2PTS(N, A, O, BO) +MASS A=MA, B=MB +IAXX = 1/12*MA*(2*LA)^2 +IAYY = IAXX +IAZZ = 0 +IBXX = 1/12*MB*H^2 +IBYY = 1/12*MB*(W^2+H^2) +IBZZ = 1/12*MB*W^2 +INERTIA A, IAXX, IAYY, IAZZ +INERTIA B, IBXX, IBYY, IBZZ +GRAVITY(G*N3>) +ZERO = FR() + FRSTAR() +KANE() +INPUT LB=0.2,H=0.1,W=0.2,MA=0.01,MB=0.1,G=9.81 +INPUT THETA = 90 DEG, PHI = 0.5 DEG, OMEGA=0, ALPHA=0 +INPUT TFINAL=10, INTEGSTP=0.02 +CODE DYNAMICS() some_filename.c diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/chaos_pendulum.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/chaos_pendulum.py new file mode 100644 index 0000000000000000000000000000000000000000..4435635720bb38f40366f55bb3ace0f6f6899284 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/chaos_pendulum.py @@ -0,0 +1,55 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +g, lb, w, h = _sm.symbols('g lb w h', real=True) +theta, phi, omega, alpha = _me.dynamicsymbols('theta phi omega alpha') +theta_d, phi_d, omega_d, alpha_d = _me.dynamicsymbols('theta_ phi_ omega_ alpha_', 1) +theta_dd, phi_dd = _me.dynamicsymbols('theta_ phi_', 2) +frame_n = _me.ReferenceFrame('n') +body_a_cm = _me.Point('a_cm') +body_a_cm.set_vel(frame_n, 0) +body_a_f = _me.ReferenceFrame('a_f') +body_a = _me.RigidBody('a', body_a_cm, body_a_f, _sm.symbols('m'), (_me.outer(body_a_f.x,body_a_f.x),body_a_cm)) +body_b_cm = _me.Point('b_cm') +body_b_cm.set_vel(frame_n, 0) +body_b_f = _me.ReferenceFrame('b_f') +body_b = _me.RigidBody('b', body_b_cm, body_b_f, _sm.symbols('m'), (_me.outer(body_b_f.x,body_b_f.x),body_b_cm)) +body_a_f.orient(frame_n, 'Axis', [theta, frame_n.y]) +body_b_f.orient(body_a_f, 'Axis', [phi, body_a_f.z]) +point_o = _me.Point('o') +la = (lb-h/2)/2 +body_a_cm.set_pos(point_o, la*body_a_f.z) +body_b_cm.set_pos(point_o, lb*body_a_f.z) +body_a_f.set_ang_vel(frame_n, omega*frame_n.y) +body_b_f.set_ang_vel(body_a_f, alpha*body_a_f.z) +point_o.set_vel(frame_n, 0) +body_a_cm.v2pt_theory(point_o,frame_n,body_a_f) +body_b_cm.v2pt_theory(point_o,frame_n,body_a_f) +ma = _sm.symbols('ma') +body_a.mass = ma +mb = _sm.symbols('mb') +body_b.mass = mb +iaxx = 1/12*ma*(2*la)**2 +iayy = iaxx +iazz = 0 +ibxx = 1/12*mb*h**2 +ibyy = 1/12*mb*(w**2+h**2) +ibzz = 1/12*mb*w**2 +body_a.inertia = (_me.inertia(body_a_f, iaxx, iayy, iazz, 0, 0, 0), body_a_cm) +body_b.inertia = (_me.inertia(body_b_f, ibxx, ibyy, ibzz, 0, 0, 0), body_b_cm) +force_a = body_a.mass*(g*frame_n.z) +force_b = body_b.mass*(g*frame_n.z) +kd_eqs = [theta_d - omega, phi_d - alpha] +forceList = [(body_a.masscenter,body_a.mass*(g*frame_n.z)), (body_b.masscenter,body_b.mass*(g*frame_n.z))] +kane = _me.KanesMethod(frame_n, q_ind=[theta,phi], u_ind=[omega, alpha], kd_eqs = kd_eqs) +fr, frstar = kane.kanes_equations([body_a, body_b], forceList) +zero = fr+frstar +from pydy.system import System +sys = System(kane, constants = {g:9.81, lb:0.2, w:0.2, h:0.1, ma:0.01, mb:0.1}, +specifieds={}, +initial_conditions={theta:_np.deg2rad(90), phi:_np.deg2rad(0.5), omega:0, alpha:0}, +times = _np.linspace(0.0, 10, 10/0.02)) + +y=sys.integrate() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/double_pendulum.al b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/double_pendulum.al new file mode 100644 index 0000000000000000000000000000000000000000..0b6d72a072e093a6cb048a0b7976041ee9c2f4f3 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/double_pendulum.al @@ -0,0 +1,25 @@ +MOTIONVARIABLES' Q{2}', U{2}' +CONSTANTS L,M,G +NEWTONIAN N +FRAMES A,B +SIMPROT(N, A, 3, Q1) +SIMPROT(N, B, 3, Q2) +W_A_N>=U1*N3> +W_B_N>=U2*N3> +POINT O +PARTICLES P,R +P_O_P> = L*A1> +P_P_R> = L*B1> +V_O_N> = 0> +V2PTS(N, A, O, P) +V2PTS(N, B, P, R) +MASS P=M, R=M +Q1' = U1 +Q2' = U2 +GRAVITY(G*N1>) +ZERO = FR() + FRSTAR() +KANE() +INPUT M=1,G=9.81,L=1 +INPUT Q1=.1,Q2=.2,U1=0,U2=0 +INPUT TFINAL=10, INTEGSTP=.01 +CODE DYNAMICS() some_filename.c diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/double_pendulum.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/double_pendulum.py new file mode 100644 index 0000000000000000000000000000000000000000..12c73c3b4b198399f4c45f5e00d556c859caff74 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/double_pendulum.py @@ -0,0 +1,39 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +q1, q2, u1, u2 = _me.dynamicsymbols('q1 q2 u1 u2') +q1_d, q2_d, u1_d, u2_d = _me.dynamicsymbols('q1_ q2_ u1_ u2_', 1) +l, m, g = _sm.symbols('l m g', real=True) +frame_n = _me.ReferenceFrame('n') +frame_a = _me.ReferenceFrame('a') +frame_b = _me.ReferenceFrame('b') +frame_a.orient(frame_n, 'Axis', [q1, frame_n.z]) +frame_b.orient(frame_n, 'Axis', [q2, frame_n.z]) +frame_a.set_ang_vel(frame_n, u1*frame_n.z) +frame_b.set_ang_vel(frame_n, u2*frame_n.z) +point_o = _me.Point('o') +particle_p = _me.Particle('p', _me.Point('p_pt'), _sm.Symbol('m')) +particle_r = _me.Particle('r', _me.Point('r_pt'), _sm.Symbol('m')) +particle_p.point.set_pos(point_o, l*frame_a.x) +particle_r.point.set_pos(particle_p.point, l*frame_b.x) +point_o.set_vel(frame_n, 0) +particle_p.point.v2pt_theory(point_o,frame_n,frame_a) +particle_r.point.v2pt_theory(particle_p.point,frame_n,frame_b) +particle_p.mass = m +particle_r.mass = m +force_p = particle_p.mass*(g*frame_n.x) +force_r = particle_r.mass*(g*frame_n.x) +kd_eqs = [q1_d - u1, q2_d - u2] +forceList = [(particle_p.point,particle_p.mass*(g*frame_n.x)), (particle_r.point,particle_r.mass*(g*frame_n.x))] +kane = _me.KanesMethod(frame_n, q_ind=[q1,q2], u_ind=[u1, u2], kd_eqs = kd_eqs) +fr, frstar = kane.kanes_equations([particle_p, particle_r], forceList) +zero = fr+frstar +from pydy.system import System +sys = System(kane, constants = {l:1, m:1, g:9.81}, +specifieds={}, +initial_conditions={q1:.1, q2:.2, u1:0, u2:0}, +times = _np.linspace(0.0, 10, 10/.01)) + +y=sys.integrate() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/mass_spring_damper.al b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/mass_spring_damper.al new file mode 100644 index 0000000000000000000000000000000000000000..4892e5ca8cb18cad6b14a2a37cbdc1f7fb8217ac --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/mass_spring_damper.al @@ -0,0 +1,19 @@ +CONSTANTS M,K,B,G +MOTIONVARIABLES' POSITION',SPEED' +VARIABLES O +FORCE = O*SIN(T) +NEWTONIAN CEILING +POINTS ORIGIN +V_ORIGIN_CEILING> = 0> +PARTICLES BLOCK +P_ORIGIN_BLOCK> = POSITION*CEILING1> +MASS BLOCK=M +V_BLOCK_CEILING>=SPEED*CEILING1> +POSITION' = SPEED +FORCE_MAGNITUDE = M*G-K*POSITION-B*SPEED+FORCE +FORCE_BLOCK>=EXPLICIT(FORCE_MAGNITUDE*CEILING1>) +ZERO = FR() + FRSTAR() +KANE() +INPUT TFINAL=10.0, INTEGSTP=0.01 +INPUT M=1.0, K=1.0, B=0.2, G=9.8, POSITION=0.1, SPEED=-1.0, O=2 +CODE DYNAMICS() dummy_file.c diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/mass_spring_damper.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/mass_spring_damper.py new file mode 100644 index 0000000000000000000000000000000000000000..8a5baab9642ff140e0ee81027a1e8f9152d7050c --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/mass_spring_damper.py @@ -0,0 +1,31 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +m, k, b, g = _sm.symbols('m k b g', real=True) +position, speed = _me.dynamicsymbols('position speed') +position_d, speed_d = _me.dynamicsymbols('position_ speed_', 1) +o = _me.dynamicsymbols('o') +force = o*_sm.sin(_me.dynamicsymbols._t) +frame_ceiling = _me.ReferenceFrame('ceiling') +point_origin = _me.Point('origin') +point_origin.set_vel(frame_ceiling, 0) +particle_block = _me.Particle('block', _me.Point('block_pt'), _sm.Symbol('m')) +particle_block.point.set_pos(point_origin, position*frame_ceiling.x) +particle_block.mass = m +particle_block.point.set_vel(frame_ceiling, speed*frame_ceiling.x) +force_magnitude = m*g-k*position-b*speed+force +force_block = (force_magnitude*frame_ceiling.x).subs({position_d:speed}) +kd_eqs = [position_d - speed] +forceList = [(particle_block.point,(force_magnitude*frame_ceiling.x).subs({position_d:speed}))] +kane = _me.KanesMethod(frame_ceiling, q_ind=[position], u_ind=[speed], kd_eqs = kd_eqs) +fr, frstar = kane.kanes_equations([particle_block], forceList) +zero = fr+frstar +from pydy.system import System +sys = System(kane, constants = {m:1.0, k:1.0, b:0.2, g:9.8}, +specifieds={_me.dynamicsymbols('t'):lambda x, t: t, o:2}, +initial_conditions={position:0.1, speed:-1*1.0}, +times = _np.linspace(0.0, 10.0, 10.0/0.01)) + +y=sys.integrate() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/non_min_pendulum.al b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/non_min_pendulum.al new file mode 100644 index 0000000000000000000000000000000000000000..74f5062d80926db7acd634a04759abce857087e5 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/non_min_pendulum.al @@ -0,0 +1,20 @@ +MOTIONVARIABLES' Q{2}'' +CONSTANTS L,M,G +NEWTONIAN N +POINT PN +V_PN_N> = 0> +THETA1 = ATAN(Q2/Q1) +FRAMES A +SIMPROT(N, A, 3, THETA1) +PARTICLES P +P_PN_P> = Q1*N1>+Q2*N2> +MASS P=M +V_P_N>=DT(P_P_PN>, N) +F_V = DOT(EXPRESS(V_P_N>,A), A1>) +GRAVITY(G*N1>) +DEPENDENT[1] = F_V +CONSTRAIN(DEPENDENT[Q1']) +ZERO=FR()+FRSTAR() +F_C = MAG(P_P_PN>)-L +CONFIG[1]=F_C +ZERO[2]=CONFIG[1] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/non_min_pendulum.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/non_min_pendulum.py new file mode 100644 index 0000000000000000000000000000000000000000..fc972ebd518e77da5e1902c149f2699979865e7f --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/pydy-example-repo/non_min_pendulum.py @@ -0,0 +1,36 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +q1, q2 = _me.dynamicsymbols('q1 q2') +q1_d, q2_d = _me.dynamicsymbols('q1_ q2_', 1) +q1_dd, q2_dd = _me.dynamicsymbols('q1_ q2_', 2) +l, m, g = _sm.symbols('l m g', real=True) +frame_n = _me.ReferenceFrame('n') +point_pn = _me.Point('pn') +point_pn.set_vel(frame_n, 0) +theta1 = _sm.atan(q2/q1) +frame_a = _me.ReferenceFrame('a') +frame_a.orient(frame_n, 'Axis', [theta1, frame_n.z]) +particle_p = _me.Particle('p', _me.Point('p_pt'), _sm.Symbol('m')) +particle_p.point.set_pos(point_pn, q1*frame_n.x+q2*frame_n.y) +particle_p.mass = m +particle_p.point.set_vel(frame_n, (point_pn.pos_from(particle_p.point)).dt(frame_n)) +f_v = _me.dot((particle_p.point.vel(frame_n)).express(frame_a), frame_a.x) +force_p = particle_p.mass*(g*frame_n.x) +dependent = _sm.Matrix([[0]]) +dependent[0] = f_v +velocity_constraints = [i for i in dependent] +u_q1_d = _me.dynamicsymbols('u_q1_d') +u_q2_d = _me.dynamicsymbols('u_q2_d') +kd_eqs = [q1_d-u_q1_d, q2_d-u_q2_d] +forceList = [(particle_p.point,particle_p.mass*(g*frame_n.x))] +kane = _me.KanesMethod(frame_n, q_ind=[q1,q2], u_ind=[u_q2_d], u_dependent=[u_q1_d], kd_eqs = kd_eqs, velocity_constraints = velocity_constraints) +fr, frstar = kane.kanes_equations([particle_p], forceList) +zero = fr+frstar +f_c = point_pn.pos_from(particle_p.point).magnitude()-l +config = _sm.Matrix([[0]]) +config[0] = f_c +zero = zero.row_insert(zero.shape[0], _sm.Matrix([[0]])) +zero[zero.shape[0]-1] = config[0] diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest1.al b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest1.al new file mode 100644 index 0000000000000000000000000000000000000000..457e79fd646677c0decdc69f921bc05e9e0dcf51 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest1.al @@ -0,0 +1,8 @@ +% ruletest1.al +CONSTANTS F = 3, G = 9.81 +CONSTANTS A, B +CONSTANTS S, S1, S2+, S3+, S4- +CONSTANTS K{4}, L{1:3}, P{1:2,1:3} +CONSTANTS C{2,3} +E1 = A*F + S2 - G +E2 = F^2 + K3*K2*G diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest1.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest1.py new file mode 100644 index 0000000000000000000000000000000000000000..8466392ac930f13f2419c9c04eef9dcc2884e9bd --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest1.py @@ -0,0 +1,15 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +f = _sm.S(3) +g = _sm.S(9.81) +a, b = _sm.symbols('a b', real=True) +s, s1 = _sm.symbols('s s1', real=True) +s2, s3 = _sm.symbols('s2 s3', real=True, nonnegative=True) +s4 = _sm.symbols('s4', real=True, nonpositive=True) +k1, k2, k3, k4, l1, l2, l3, p11, p12, p13, p21, p22, p23 = _sm.symbols('k1 k2 k3 k4 l1 l2 l3 p11 p12 p13 p21 p22 p23', real=True) +c11, c12, c13, c21, c22, c23 = _sm.symbols('c11 c12 c13 c21 c22 c23', real=True) +e1 = a*f+s2-g +e2 = f**2+k3*k2*g diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest10.al b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest10.al new file mode 100644 index 0000000000000000000000000000000000000000..9d5f76f063c43bcb5e2a8d4f29619a6952abf9e5 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest10.al @@ -0,0 +1,58 @@ +% ruletest10.al + +VARIABLES X,Y +COMPLEX ON +CONSTANTS A,B +E = A*(B*X+Y)^2 +M = [E;E] +EXPAND(E) +EXPAND(M) +FACTOR(E,X) +FACTOR(M,X) + +EQN[1] = A*X + B*Y +EQN[2] = 2*A*X - 3*B*Y +SOLVE(EQN, X, Y) +RHS_Y = RHS(Y) +E = (X+Y)^2 + 2*X^2 +ARRANGE(E, 2, X) + +CONSTANTS A,B,C +M = [A,B;C,0] +M2 = EVALUATE(M,A=1,B=2,C=3) +EIG(M2, EIGVALUE, EIGVEC) + +NEWTONIAN N +FRAMES A +SIMPROT(N, A, N1>, X) +DEGREES OFF +SIMPROT(N, A, N1>, PI/2) + +CONSTANTS C{3} +V> = C1*A1> + C2*A2> + C3*A3> +POINTS O, P +P_P_O> = C1*A1> +EXPRESS(V>,N) +EXPRESS(P_P_O>,N) +W_A_N> = C3*A3> +ANGVEL(A,N) + +V2PTS(N,A,O,P) +PARTICLES P{2} +V2PTS(N,A,P1,P2) +A2PTS(N,A,P1,P) + +BODIES B{2} +CONSTANT G +GRAVITY(G*N1>) + +VARIABLE Z +V> = X*A1> + Y*A3> +P_P_O> = X*A1> + Y*A2> +X = 2*Z +Y = Z +EXPLICIT(V>) +EXPLICIT(P_P_O>) + +FORCE(O/P1, X*Y*A1>) +FORCE(P2, X*Y*A1>) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest10.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest10.py new file mode 100644 index 0000000000000000000000000000000000000000..2b9674e47d5f6132c5a79a33b9d8d55a131942d6 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest10.py @@ -0,0 +1,64 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +x, y = _me.dynamicsymbols('x y') +a, b = _sm.symbols('a b', real=True) +e = a*(b*x+y)**2 +m = _sm.Matrix([e,e]).reshape(2, 1) +e = e.expand() +m = _sm.Matrix([i.expand() for i in m]).reshape((m).shape[0], (m).shape[1]) +e = _sm.factor(e, x) +m = _sm.Matrix([_sm.factor(i,x) for i in m]).reshape((m).shape[0], (m).shape[1]) +eqn = _sm.Matrix([[0]]) +eqn[0] = a*x+b*y +eqn = eqn.row_insert(eqn.shape[0], _sm.Matrix([[0]])) +eqn[eqn.shape[0]-1] = 2*a*x-3*b*y +print(_sm.solve(eqn,x,y)) +rhs_y = _sm.solve(eqn,x,y)[y] +e = (x+y)**2+2*x**2 +e.collect(x) +a, b, c = _sm.symbols('a b c', real=True) +m = _sm.Matrix([a,b,c,0]).reshape(2, 2) +m2 = _sm.Matrix([i.subs({a:1,b:2,c:3}) for i in m]).reshape((m).shape[0], (m).shape[1]) +eigvalue = _sm.Matrix([i.evalf() for i in (m2).eigenvals().keys()]) +eigvec = _sm.Matrix([i[2][0].evalf() for i in (m2).eigenvects()]).reshape(m2.shape[0], m2.shape[1]) +frame_n = _me.ReferenceFrame('n') +frame_a = _me.ReferenceFrame('a') +frame_a.orient(frame_n, 'Axis', [x, frame_n.x]) +frame_a.orient(frame_n, 'Axis', [_sm.pi/2, frame_n.x]) +c1, c2, c3 = _sm.symbols('c1 c2 c3', real=True) +v = c1*frame_a.x+c2*frame_a.y+c3*frame_a.z +point_o = _me.Point('o') +point_p = _me.Point('p') +point_o.set_pos(point_p, c1*frame_a.x) +v = (v).express(frame_n) +point_o.set_pos(point_p, (point_o.pos_from(point_p)).express(frame_n)) +frame_a.set_ang_vel(frame_n, c3*frame_a.z) +print(frame_n.ang_vel_in(frame_a)) +point_p.v2pt_theory(point_o,frame_n,frame_a) +particle_p1 = _me.Particle('p1', _me.Point('p1_pt'), _sm.Symbol('m')) +particle_p2 = _me.Particle('p2', _me.Point('p2_pt'), _sm.Symbol('m')) +particle_p2.point.v2pt_theory(particle_p1.point,frame_n,frame_a) +point_p.a2pt_theory(particle_p1.point,frame_n,frame_a) +body_b1_cm = _me.Point('b1_cm') +body_b1_cm.set_vel(frame_n, 0) +body_b1_f = _me.ReferenceFrame('b1_f') +body_b1 = _me.RigidBody('b1', body_b1_cm, body_b1_f, _sm.symbols('m'), (_me.outer(body_b1_f.x,body_b1_f.x),body_b1_cm)) +body_b2_cm = _me.Point('b2_cm') +body_b2_cm.set_vel(frame_n, 0) +body_b2_f = _me.ReferenceFrame('b2_f') +body_b2 = _me.RigidBody('b2', body_b2_cm, body_b2_f, _sm.symbols('m'), (_me.outer(body_b2_f.x,body_b2_f.x),body_b2_cm)) +g = _sm.symbols('g', real=True) +force_p1 = particle_p1.mass*(g*frame_n.x) +force_p2 = particle_p2.mass*(g*frame_n.x) +force_b1 = body_b1.mass*(g*frame_n.x) +force_b2 = body_b2.mass*(g*frame_n.x) +z = _me.dynamicsymbols('z') +v = x*frame_a.x+y*frame_a.z +point_o.set_pos(point_p, x*frame_a.x+y*frame_a.y) +v = (v).subs({x:2*z, y:z}) +point_o.set_pos(point_p, (point_o.pos_from(point_p)).subs({x:2*z, y:z})) +force_o = -1*(x*y*frame_a.x) +force_p1 = particle_p1.mass*(g*frame_n.x)+ x*y*frame_a.x diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest11.al b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest11.al new file mode 100644 index 0000000000000000000000000000000000000000..60934c1ca563024828110bfe984a90d5686b89e4 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest11.al @@ -0,0 +1,6 @@ +VARIABLES X, Y +CONSTANTS A{1:2, 1:2}, B{1:2} +EQN[1] = A11*x + A12*y - B1 +EQN[2] = A21*x + A22*y - B2 +INPUT A11=2, A12=5, A21=3, A22=4, B1=7, B2=6 +CODE ALGEBRAIC(EQN, X, Y) some_filename.c diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest11.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest11.py new file mode 100644 index 0000000000000000000000000000000000000000..4ec2397ea96261d7b582d1f699e3897caae88f20 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest11.py @@ -0,0 +1,14 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +x, y = _me.dynamicsymbols('x y') +a11, a12, a21, a22, b1, b2 = _sm.symbols('a11 a12 a21 a22 b1 b2', real=True) +eqn = _sm.Matrix([[0]]) +eqn[0] = a11*x+a12*y-b1 +eqn = eqn.row_insert(eqn.shape[0], _sm.Matrix([[0]])) +eqn[eqn.shape[0]-1] = a21*x+a22*y-b2 +eqn_list = [] +for i in eqn: eqn_list.append(i.subs({a11:2, a12:5, a21:3, a22:4, b1:7, b2:6})) +print(_sm.linsolve(eqn_list, x,y)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest12.al b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest12.al new file mode 100644 index 0000000000000000000000000000000000000000..f147f55afd1438436767960e0487d5d9e7161c8f --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest12.al @@ -0,0 +1,7 @@ +VARIABLES X,Y +CONSTANTS A,B,R +EQN[1] = A*X^3+B*Y^2-R +EQN[2] = A*SIN(X)^2 + B*COS(2*Y) - R^2 +INPUT A=2.0, B=3.0, R=1.0 +INPUT X = 30 DEG, Y = 3.14 +CODE NONLINEAR(EQN,X,Y) some_filename.c diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest12.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest12.py new file mode 100644 index 0000000000000000000000000000000000000000..3d7d996fa649f796a536dba20c1a36554acd8046 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest12.py @@ -0,0 +1,14 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +x, y = _me.dynamicsymbols('x y') +a, b, r = _sm.symbols('a b r', real=True) +eqn = _sm.Matrix([[0]]) +eqn[0] = a*x**3+b*y**2-r +eqn = eqn.row_insert(eqn.shape[0], _sm.Matrix([[0]])) +eqn[eqn.shape[0]-1] = a*_sm.sin(x)**2+b*_sm.cos(2*y)-r**2 +matrix_list = [] +for i in eqn:matrix_list.append(i.subs({a:2.0, b:3.0, r:1.0})) +print(_sm.nsolve(matrix_list,(x,y),(_np.deg2rad(30),3.14))) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest2.al b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest2.al new file mode 100644 index 0000000000000000000000000000000000000000..17937e58bd20a9fb82f44ccd05f0c081a1aa6c9b --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest2.al @@ -0,0 +1,12 @@ +% ruletest2.al +VARIABLES X1,X2 +SPECIFIED F1 = X1*X2 + 3*X1^2 +SPECIFIED F2=X1*T+X2*T^2 +VARIABLE X', Y'' +MOTIONVARIABLES Q{3}, U{2} +VARIABLES P{2}' +VARIABLE W{3}', R{2}'' +VARIABLES C{1:2, 1:2} +VARIABLES D{1,3} +VARIABLES J{1:2} +IMAGINARY N diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest2.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest2.py new file mode 100644 index 0000000000000000000000000000000000000000..31c1d9974c2292466b805b91f8254bffaa94e2ac --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest2.py @@ -0,0 +1,22 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +x1, x2 = _me.dynamicsymbols('x1 x2') +f1 = x1*x2+3*x1**2 +f2 = x1*_me.dynamicsymbols._t+x2*_me.dynamicsymbols._t**2 +x, y = _me.dynamicsymbols('x y') +x_d, y_d = _me.dynamicsymbols('x_ y_', 1) +y_dd = _me.dynamicsymbols('y_', 2) +q1, q2, q3, u1, u2 = _me.dynamicsymbols('q1 q2 q3 u1 u2') +p1, p2 = _me.dynamicsymbols('p1 p2') +p1_d, p2_d = _me.dynamicsymbols('p1_ p2_', 1) +w1, w2, w3, r1, r2 = _me.dynamicsymbols('w1 w2 w3 r1 r2') +w1_d, w2_d, w3_d, r1_d, r2_d = _me.dynamicsymbols('w1_ w2_ w3_ r1_ r2_', 1) +r1_dd, r2_dd = _me.dynamicsymbols('r1_ r2_', 2) +c11, c12, c21, c22 = _me.dynamicsymbols('c11 c12 c21 c22') +d11, d12, d13 = _me.dynamicsymbols('d11 d12 d13') +j1, j2 = _me.dynamicsymbols('j1 j2') +n = _sm.symbols('n') +n = _sm.I diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest3.al b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest3.al new file mode 100644 index 0000000000000000000000000000000000000000..f263f1802ebca2725481dd5fdd3540bf8e9f11bf --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest3.al @@ -0,0 +1,25 @@ +% ruletest3.al +FRAMES A, B +NEWTONIAN N + +VARIABLES X{3} +CONSTANTS L + +V1> = X1*A1> + X2*A2> + X3*A3> +V2> = X1*B1> + X2*B2> + X3*B3> +V3> = X1*N1> + X2*N2> + X3*N3> + +V> = V1> + V2> + V3> + +POINTS C, D +POINTS PO{3} + +PARTICLES L +PARTICLES P{3} + +BODIES S +BODIES R{2} + +V4> = X1*S1> + X2*S2> + X3*S3> + +P_C_SO> = L*N1> diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest3.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest3.py new file mode 100644 index 0000000000000000000000000000000000000000..23f79aa571337f200b3ff4d56b5747f7704985c0 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest3.py @@ -0,0 +1,37 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +frame_a = _me.ReferenceFrame('a') +frame_b = _me.ReferenceFrame('b') +frame_n = _me.ReferenceFrame('n') +x1, x2, x3 = _me.dynamicsymbols('x1 x2 x3') +l = _sm.symbols('l', real=True) +v1 = x1*frame_a.x+x2*frame_a.y+x3*frame_a.z +v2 = x1*frame_b.x+x2*frame_b.y+x3*frame_b.z +v3 = x1*frame_n.x+x2*frame_n.y+x3*frame_n.z +v = v1+v2+v3 +point_c = _me.Point('c') +point_d = _me.Point('d') +point_po1 = _me.Point('po1') +point_po2 = _me.Point('po2') +point_po3 = _me.Point('po3') +particle_l = _me.Particle('l', _me.Point('l_pt'), _sm.Symbol('m')) +particle_p1 = _me.Particle('p1', _me.Point('p1_pt'), _sm.Symbol('m')) +particle_p2 = _me.Particle('p2', _me.Point('p2_pt'), _sm.Symbol('m')) +particle_p3 = _me.Particle('p3', _me.Point('p3_pt'), _sm.Symbol('m')) +body_s_cm = _me.Point('s_cm') +body_s_cm.set_vel(frame_n, 0) +body_s_f = _me.ReferenceFrame('s_f') +body_s = _me.RigidBody('s', body_s_cm, body_s_f, _sm.symbols('m'), (_me.outer(body_s_f.x,body_s_f.x),body_s_cm)) +body_r1_cm = _me.Point('r1_cm') +body_r1_cm.set_vel(frame_n, 0) +body_r1_f = _me.ReferenceFrame('r1_f') +body_r1 = _me.RigidBody('r1', body_r1_cm, body_r1_f, _sm.symbols('m'), (_me.outer(body_r1_f.x,body_r1_f.x),body_r1_cm)) +body_r2_cm = _me.Point('r2_cm') +body_r2_cm.set_vel(frame_n, 0) +body_r2_f = _me.ReferenceFrame('r2_f') +body_r2 = _me.RigidBody('r2', body_r2_cm, body_r2_f, _sm.symbols('m'), (_me.outer(body_r2_f.x,body_r2_f.x),body_r2_cm)) +v4 = x1*body_s_f.x+x2*body_s_f.y+x3*body_s_f.z +body_s_cm.set_pos(point_c, l*frame_n.x) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest4.al b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest4.al new file mode 100644 index 0000000000000000000000000000000000000000..7302bd7724bad9b763c75fe4230faa42b5070408 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest4.al @@ -0,0 +1,20 @@ +% ruletest4.al + +FRAMES A, B +MOTIONVARIABLES Q{3} +SIMPROT(A, B, 1, Q3) +DCM = A_B +M = DCM*3 - A_B + +VARIABLES R +CIRCLE_AREA = PI*R^2 + +VARIABLES U, A +VARIABLES X, Y +S = U*T - 1/2*A*T^2 + +EXPR1 = 2*A*0.5 - 1.25 + 0.25 +EXPR2 = -X^2 + Y^2 + 0.25*(X+Y)^2 +EXPR3 = 0.5E-10 + +DYADIC>> = A1>*A1> + A2>*A2> + A3>*A3> diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest4.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest4.py new file mode 100644 index 0000000000000000000000000000000000000000..74b18543e04d6c9e42dd569d2152040c13ae0899 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest4.py @@ -0,0 +1,20 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +frame_a = _me.ReferenceFrame('a') +frame_b = _me.ReferenceFrame('b') +q1, q2, q3 = _me.dynamicsymbols('q1 q2 q3') +frame_b.orient(frame_a, 'Axis', [q3, frame_a.x]) +dcm = frame_a.dcm(frame_b) +m = dcm*3-frame_a.dcm(frame_b) +r = _me.dynamicsymbols('r') +circle_area = _sm.pi*r**2 +u, a = _me.dynamicsymbols('u a') +x, y = _me.dynamicsymbols('x y') +s = u*_me.dynamicsymbols._t-1/2*a*_me.dynamicsymbols._t**2 +expr1 = 2*a*0.5-1.25+0.25 +expr2 = -1*x**2+y**2+0.25*(x+y)**2 +expr3 = 0.5*10**(-10) +dyadic = _me.outer(frame_a.x, frame_a.x)+_me.outer(frame_a.y, frame_a.y)+_me.outer(frame_a.z, frame_a.z) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest5.al b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest5.al new file mode 100644 index 0000000000000000000000000000000000000000..a859dc8bb1f0251af14809681d995c59b31377ba --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest5.al @@ -0,0 +1,32 @@ +% ruletest5.al +VARIABLES X', Y' + +E1 = (X+Y)^2 + (X-Y)^3 +E2 = (X-Y)^2 +E3 = X^2 + Y^2 + 2*X*Y + +M1 = [E1;E2] +M2 = [(X+Y)^2,(X-Y)^2] +M3 = M1 + [X;Y] + +AM = EXPAND(M1) +CM = EXPAND([(X+Y)^2,(X-Y)^2]) +EM = EXPAND(M1 + [X;Y]) +F = EXPAND(E1) +G = EXPAND(E2) + +A = FACTOR(E3, X) +BM = FACTOR(M1, X) +CM = FACTOR(M1 + [X;Y], X) + +A = D(E3, X) +B = D(E3, Y) +CM = D(M2, X) +DM = D(M1 + [X;Y], X) +FRAMES A, B +A_B = [1,0,0;1,0,0;1,0,0] +V1> = X*A1> + Y*A2> + X*Y*A3> +E> = D(V1>, X, B) +FM = DT(M1) +GM = DT([(X+Y)^2,(X-Y)^2]) +H> = DT(V1>, B) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest5.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest5.py new file mode 100644 index 0000000000000000000000000000000000000000..93684435b402f5b56e2f4a5c3c81500208556423 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest5.py @@ -0,0 +1,33 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +x, y = _me.dynamicsymbols('x y') +x_d, y_d = _me.dynamicsymbols('x_ y_', 1) +e1 = (x+y)**2+(x-y)**3 +e2 = (x-y)**2 +e3 = x**2+y**2+2*x*y +m1 = _sm.Matrix([e1,e2]).reshape(2, 1) +m2 = _sm.Matrix([(x+y)**2,(x-y)**2]).reshape(1, 2) +m3 = m1+_sm.Matrix([x,y]).reshape(2, 1) +am = _sm.Matrix([i.expand() for i in m1]).reshape((m1).shape[0], (m1).shape[1]) +cm = _sm.Matrix([i.expand() for i in _sm.Matrix([(x+y)**2,(x-y)**2]).reshape(1, 2)]).reshape((_sm.Matrix([(x+y)**2,(x-y)**2]).reshape(1, 2)).shape[0], (_sm.Matrix([(x+y)**2,(x-y)**2]).reshape(1, 2)).shape[1]) +em = _sm.Matrix([i.expand() for i in m1+_sm.Matrix([x,y]).reshape(2, 1)]).reshape((m1+_sm.Matrix([x,y]).reshape(2, 1)).shape[0], (m1+_sm.Matrix([x,y]).reshape(2, 1)).shape[1]) +f = (e1).expand() +g = (e2).expand() +a = _sm.factor((e3), x) +bm = _sm.Matrix([_sm.factor(i, x) for i in m1]).reshape((m1).shape[0], (m1).shape[1]) +cm = _sm.Matrix([_sm.factor(i, x) for i in m1+_sm.Matrix([x,y]).reshape(2, 1)]).reshape((m1+_sm.Matrix([x,y]).reshape(2, 1)).shape[0], (m1+_sm.Matrix([x,y]).reshape(2, 1)).shape[1]) +a = (e3).diff(x) +b = (e3).diff(y) +cm = _sm.Matrix([i.diff(x) for i in m2]).reshape((m2).shape[0], (m2).shape[1]) +dm = _sm.Matrix([i.diff(x) for i in m1+_sm.Matrix([x,y]).reshape(2, 1)]).reshape((m1+_sm.Matrix([x,y]).reshape(2, 1)).shape[0], (m1+_sm.Matrix([x,y]).reshape(2, 1)).shape[1]) +frame_a = _me.ReferenceFrame('a') +frame_b = _me.ReferenceFrame('b') +frame_b.orient(frame_a, 'DCM', _sm.Matrix([1,0,0,1,0,0,1,0,0]).reshape(3, 3)) +v1 = x*frame_a.x+y*frame_a.y+x*y*frame_a.z +e = (v1).diff(x, frame_b) +fm = _sm.Matrix([i.diff(_sm.Symbol('t')) for i in m1]).reshape((m1).shape[0], (m1).shape[1]) +gm = _sm.Matrix([i.diff(_sm.Symbol('t')) for i in _sm.Matrix([(x+y)**2,(x-y)**2]).reshape(1, 2)]).reshape((_sm.Matrix([(x+y)**2,(x-y)**2]).reshape(1, 2)).shape[0], (_sm.Matrix([(x+y)**2,(x-y)**2]).reshape(1, 2)).shape[1]) +h = (v1).dt(frame_b) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest6.al b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest6.al new file mode 100644 index 0000000000000000000000000000000000000000..7ec3ba61590e77772ae631237df048b932fe778c --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest6.al @@ -0,0 +1,41 @@ +% ruletest6.al +VARIABLES Q{2} +VARIABLES X,Y,Z +Q1 = X^2 + Y^2 +Q2 = X-Y +E = Q1 + Q2 +A = EXPLICIT(E) +E2 = COS(X) +E3 = COS(X*Y) +A = TAYLOR(E2, 0:2, X=0) +B = TAYLOR(E3, 0:2, X=0, Y=0) + +E = EXPAND((X+Y)^2) +A = EVALUATE(E, X=1, Y=Z) +BM = EVALUATE([E;2*E], X=1, Y=Z) + +E = Q1 + Q2 +A = EVALUATE(E, X=2, Y=Z^2) + +CONSTANTS J,K,L +P1 = POLYNOMIAL([J,K,L],X) +P2 = POLYNOMIAL(J*X+K,X,1) + +ROOT1 = ROOTS(P1, X, 2) +ROOT2 = ROOTS([1;2;3]) + +M = [1,2,3,4;5,6,7,8;9,10,11,12;13,14,15,16] + +AM = TRANSPOSE(M) + M +BM = EIG(M) +C1 = DIAGMAT(4, 1) +C2 = DIAGMAT(3, 4, 2) +DM = INV(M+C1) +E = DET(M+C1) + TRACE([1,0;0,1]) +F = ELEMENT(M, 2, 3) + +A = COLS(M) +BM = COLS(M, 1) +CM = COLS(M, 1, 2:4, 3) +DM = ROWS(M, 1) +EM = ROWS(M, 1, 2:4, 3) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest6.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest6.py new file mode 100644 index 0000000000000000000000000000000000000000..85f1a0b49518bb0ae5766cbe91b9c24a1b8e9c20 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest6.py @@ -0,0 +1,36 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +q1, q2 = _me.dynamicsymbols('q1 q2') +x, y, z = _me.dynamicsymbols('x y z') +e = q1+q2 +a = (e).subs({q1:x**2+y**2, q2:x-y}) +e2 = _sm.cos(x) +e3 = _sm.cos(x*y) +a = (e2).series(x, 0, 2).removeO() +b = (e3).series(x, 0, 2).removeO().series(y, 0, 2).removeO() +e = ((x+y)**2).expand() +a = (e).subs({q1:x**2+y**2,q2:x-y}).subs({x:1,y:z}) +bm = _sm.Matrix([i.subs({x:1,y:z}) for i in _sm.Matrix([e,2*e]).reshape(2, 1)]).reshape((_sm.Matrix([e,2*e]).reshape(2, 1)).shape[0], (_sm.Matrix([e,2*e]).reshape(2, 1)).shape[1]) +e = q1+q2 +a = (e).subs({q1:x**2+y**2,q2:x-y}).subs({x:2,y:z**2}) +j, k, l = _sm.symbols('j k l', real=True) +p1 = _sm.Poly(_sm.Matrix([j,k,l]).reshape(1, 3), x) +p2 = _sm.Poly(j*x+k, x) +root1 = [i.evalf() for i in _sm.solve(p1, x)] +root2 = [i.evalf() for i in _sm.solve(_sm.Poly(_sm.Matrix([1,2,3]).reshape(3, 1), x),x)] +m = _sm.Matrix([1,2,3,4,5,6,7,8,9,10,11,12,13,14,15,16]).reshape(4, 4) +am = (m).T+m +bm = _sm.Matrix([i.evalf() for i in (m).eigenvals().keys()]) +c1 = _sm.diag(1,1,1,1) +c2 = _sm.Matrix([2 if i==j else 0 for i in range(3) for j in range(4)]).reshape(3, 4) +dm = (m+c1)**(-1) +e = (m+c1).det()+(_sm.Matrix([1,0,0,1]).reshape(2, 2)).trace() +f = (m)[1,2] +a = (m).cols +bm = (m).col(0) +cm = _sm.Matrix([(m).T.row(0),(m).T.row(1),(m).T.row(2),(m).T.row(3),(m).T.row(2)]) +dm = (m).row(0) +em = _sm.Matrix([(m).row(0),(m).row(1),(m).row(2),(m).row(3),(m).row(2)]) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest7.al b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest7.al new file mode 100644 index 0000000000000000000000000000000000000000..2904a602f589645d22e1d3d378d077dd6a1ec27e --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest7.al @@ -0,0 +1,39 @@ +% ruletest7.al +VARIABLES X', Y' +E = COS(X) + SIN(X) + TAN(X)& ++ COSH(X) + SINH(X) + TANH(X)& ++ ACOS(X) + ASIN(X) + ATAN(X)& ++ LOG(X) + EXP(X) + SQRT(X)& ++ FACTORIAL(X) + CEIL(X) +& +FLOOR(X) + SIGN(X) + +E = SQR(X) + LOG10(X) + +A = ABS(-1) + INT(1.5) + ROUND(1.9) + +E1 = 2*X + 3*Y +E2 = X + Y + +AM = COEF([E1;E2], [X,Y]) +B = COEF(E1, X) +C = COEF(E2, Y) +D1 = EXCLUDE(E1, X) +D2 = INCLUDE(E1, X) +FM = ARRANGE([E1,E2],2,X) +F = ARRANGE(E1, 2, Y) +G = REPLACE(E1, X=2*X) +GM = REPLACE([E1;E2], X=3) + +FRAMES A, B +VARIABLES THETA +SIMPROT(A,B,3,THETA) +V1> = 2*A1> - 3*A2> + A3> +V2> = B1> + B2> + B3> +A = DOT(V1>, V2>) +BM = DOT(V1>, [V2>;2*V2>]) +C> = CROSS(V1>,V2>) +D = MAG(2*V1>) + MAG(3*V1>) +DYADIC>> = 3*A1>*A1> + A2>*A2> + 2*A3>*A3> +AM = MATRIX(B, DYADIC>>) +M = [1;2;3] +V> = VECTOR(A, M) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest7.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest7.py new file mode 100644 index 0000000000000000000000000000000000000000..19147856dc3b0d451184a6bb539c1c331f61a6d2 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest7.py @@ -0,0 +1,35 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +x, y = _me.dynamicsymbols('x y') +x_d, y_d = _me.dynamicsymbols('x_ y_', 1) +e = _sm.cos(x)+_sm.sin(x)+_sm.tan(x)+_sm.cosh(x)+_sm.sinh(x)+_sm.tanh(x)+_sm.acos(x)+_sm.asin(x)+_sm.atan(x)+_sm.log(x)+_sm.exp(x)+_sm.sqrt(x)+_sm.factorial(x)+_sm.ceiling(x)+_sm.floor(x)+_sm.sign(x) +e = (x)**2+_sm.log(x, 10) +a = _sm.Abs(-1*1)+int(1.5)+round(1.9) +e1 = 2*x+3*y +e2 = x+y +am = _sm.Matrix([e1.expand().coeff(x), e1.expand().coeff(y), e2.expand().coeff(x), e2.expand().coeff(y)]).reshape(2, 2) +b = (e1).expand().coeff(x) +c = (e2).expand().coeff(y) +d1 = (e1).collect(x).coeff(x,0) +d2 = (e1).collect(x).coeff(x,1) +fm = _sm.Matrix([i.collect(x)for i in _sm.Matrix([e1,e2]).reshape(1, 2)]).reshape((_sm.Matrix([e1,e2]).reshape(1, 2)).shape[0], (_sm.Matrix([e1,e2]).reshape(1, 2)).shape[1]) +f = (e1).collect(y) +g = (e1).subs({x:2*x}) +gm = _sm.Matrix([i.subs({x:3}) for i in _sm.Matrix([e1,e2]).reshape(2, 1)]).reshape((_sm.Matrix([e1,e2]).reshape(2, 1)).shape[0], (_sm.Matrix([e1,e2]).reshape(2, 1)).shape[1]) +frame_a = _me.ReferenceFrame('a') +frame_b = _me.ReferenceFrame('b') +theta = _me.dynamicsymbols('theta') +frame_b.orient(frame_a, 'Axis', [theta, frame_a.z]) +v1 = 2*frame_a.x-3*frame_a.y+frame_a.z +v2 = frame_b.x+frame_b.y+frame_b.z +a = _me.dot(v1, v2) +bm = _sm.Matrix([_me.dot(v1, v2),_me.dot(v1, 2*v2)]).reshape(2, 1) +c = _me.cross(v1, v2) +d = 2*v1.magnitude()+3*v1.magnitude() +dyadic = _me.outer(3*frame_a.x, frame_a.x)+_me.outer(frame_a.y, frame_a.y)+_me.outer(2*frame_a.z, frame_a.z) +am = (dyadic).to_matrix(frame_b) +m = _sm.Matrix([1,2,3]).reshape(3, 1) +v = m[0]*frame_a.x +m[1]*frame_a.y +m[2]*frame_a.z diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest8.al b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest8.al new file mode 100644 index 0000000000000000000000000000000000000000..4b2462c51e6730f46bf60b4b21ab6cfbf1993640 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest8.al @@ -0,0 +1,38 @@ +% ruletest8.al +FRAMES A +CONSTANTS C{3} +A>> = EXPRESS(1>>,A) +PARTICLES P1, P2 +BODIES R +R_A = [1,1,1;1,1,0;0,0,1] +POINT O +MASS P1=M1, P2=M2, R=MR +INERTIA R, I1, I2, I3 +P_P1_O> = C1*A1> +P_P2_O> = C2*A2> +P_RO_O> = C3*A3> +A>> = EXPRESS(I_P1_O>>, A) +A>> = EXPRESS(I_P2_O>>, A) +A>> = EXPRESS(I_R_O>>, A) +A>> = EXPRESS(INERTIA(O), A) +A>> = EXPRESS(INERTIA(O, P1, R), A) +A>> = EXPRESS(I_R_O>>, A) +A>> = EXPRESS(I_R_RO>>, A) + +P_P1_P2> = C1*A1> + C2*A2> +P_P1_RO> = C3*A1> +P_P2_RO> = C3*A2> + +B> = CM(O) +B> = CM(O, P1, R) +B> = CM(P1) + +MOTIONVARIABLES U{3} +V> = U1*A1> + U2*A2> + U3*A3> +U> = UNITVEC(V> + C1*A1>) +V_P1_A> = U1*A1> +A> = PARTIALS(V_P1_A>, U1) + +M = MASS(P1,R) +M = MASS(P2) +M = MASS() \ No newline at end of file diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest8.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest8.py new file mode 100644 index 0000000000000000000000000000000000000000..6809c47138e40027c700536e807ca7cfa5f468d7 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest8.py @@ -0,0 +1,49 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +frame_a = _me.ReferenceFrame('a') +c1, c2, c3 = _sm.symbols('c1 c2 c3', real=True) +a = _me.inertia(frame_a, 1, 1, 1) +particle_p1 = _me.Particle('p1', _me.Point('p1_pt'), _sm.Symbol('m')) +particle_p2 = _me.Particle('p2', _me.Point('p2_pt'), _sm.Symbol('m')) +body_r_cm = _me.Point('r_cm') +body_r_f = _me.ReferenceFrame('r_f') +body_r = _me.RigidBody('r', body_r_cm, body_r_f, _sm.symbols('m'), (_me.outer(body_r_f.x,body_r_f.x),body_r_cm)) +frame_a.orient(body_r_f, 'DCM', _sm.Matrix([1,1,1,1,1,0,0,0,1]).reshape(3, 3)) +point_o = _me.Point('o') +m1 = _sm.symbols('m1') +particle_p1.mass = m1 +m2 = _sm.symbols('m2') +particle_p2.mass = m2 +mr = _sm.symbols('mr') +body_r.mass = mr +i1 = _sm.symbols('i1') +i2 = _sm.symbols('i2') +i3 = _sm.symbols('i3') +body_r.inertia = (_me.inertia(body_r_f, i1, i2, i3, 0, 0, 0), body_r_cm) +point_o.set_pos(particle_p1.point, c1*frame_a.x) +point_o.set_pos(particle_p2.point, c2*frame_a.y) +point_o.set_pos(body_r_cm, c3*frame_a.z) +a = _me.inertia_of_point_mass(particle_p1.mass, particle_p1.point.pos_from(point_o), frame_a) +a = _me.inertia_of_point_mass(particle_p2.mass, particle_p2.point.pos_from(point_o), frame_a) +a = body_r.inertia[0] + _me.inertia_of_point_mass(body_r.mass, body_r.masscenter.pos_from(point_o), frame_a) +a = _me.inertia_of_point_mass(particle_p1.mass, particle_p1.point.pos_from(point_o), frame_a) + _me.inertia_of_point_mass(particle_p2.mass, particle_p2.point.pos_from(point_o), frame_a) + body_r.inertia[0] + _me.inertia_of_point_mass(body_r.mass, body_r.masscenter.pos_from(point_o), frame_a) +a = _me.inertia_of_point_mass(particle_p1.mass, particle_p1.point.pos_from(point_o), frame_a) + body_r.inertia[0] + _me.inertia_of_point_mass(body_r.mass, body_r.masscenter.pos_from(point_o), frame_a) +a = body_r.inertia[0] + _me.inertia_of_point_mass(body_r.mass, body_r.masscenter.pos_from(point_o), frame_a) +a = body_r.inertia[0] +particle_p2.point.set_pos(particle_p1.point, c1*frame_a.x+c2*frame_a.y) +body_r_cm.set_pos(particle_p1.point, c3*frame_a.x) +body_r_cm.set_pos(particle_p2.point, c3*frame_a.y) +b = _me.functions.center_of_mass(point_o,particle_p1, particle_p2, body_r) +b = _me.functions.center_of_mass(point_o,particle_p1, body_r) +b = _me.functions.center_of_mass(particle_p1.point,particle_p1, particle_p2, body_r) +u1, u2, u3 = _me.dynamicsymbols('u1 u2 u3') +v = u1*frame_a.x+u2*frame_a.y+u3*frame_a.z +u = (v+c1*frame_a.x).normalize() +particle_p1.point.set_vel(frame_a, u1*frame_a.x) +a = particle_p1.point.partial_velocity(frame_a, u1) +m = particle_p1.mass+body_r.mass +m = particle_p2.mass +m = particle_p1.mass+particle_p2.mass+body_r.mass diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest9.al b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest9.al new file mode 100644 index 0000000000000000000000000000000000000000..df5c70f05b76fc215f829672e281491b0c96c6a6 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest9.al @@ -0,0 +1,54 @@ +% ruletest9.al +NEWTONIAN N +FRAMES A +A> = 0> +D>> = EXPRESS(1>>, A) + +POINTS PO{2} +PARTICLES P{2} +MOTIONVARIABLES' C{3}' +BODIES R +P_P1_PO2> = C1*A1> +V> = 2*P_P1_PO2> + C2*A2> + +W_A_N> = C3*A3> +V> = 2*W_A_N> + C2*A2> +W_R_N> = C3*A3> +V> = 2*W_R_N> + C2*A2> + +ALF_A_N> = DT(W_A_N>, A) +V> = 2*ALF_A_N> + C2*A2> + +V_P1_A> = C1*A1> + C3*A2> +A_RO_N> = C2*A2> +V_A> = CROSS(A_RO_N>, V_P1_A>) + +X_B_C> = V_A> +X_B_D> = 2*X_B_C> +A_B_C_D_E> = X_B_D>*2 + +A_B_C = 2*C1*C2*C3 +A_B_C += 2*C1 +A_B_C := 3*C1 + +MOTIONVARIABLES' Q{2}', U{2}' +Q1' = U1 +Q2' = U2 + +VARIABLES X'', Y'' +SPECIFIED YY +Y'' = X*X'^2 + 1 +YY = X*X'^2 + 1 + +M[1] = 2*X +M[2] = 2*Y +A = 2*M[1] + +M = [1,2,3;4,5,6;7,8,9] +M[1, 2] = 5 +A = M[1, 2]*2 + +FORCE_RO> = Q1*N1> +TORQUE_A> = Q2*N3> +FORCE_RO> = Q2*N2> +F> = FORCE_RO>*2 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest9.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest9.py new file mode 100644 index 0000000000000000000000000000000000000000..09d8ae4ee8385bde5c38b946458a43c8ffdaa9b8 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/autolev/test-examples/ruletest9.py @@ -0,0 +1,55 @@ +import sympy.physics.mechanics as _me +import sympy as _sm +import math as m +import numpy as _np + +frame_n = _me.ReferenceFrame('n') +frame_a = _me.ReferenceFrame('a') +a = 0 +d = _me.inertia(frame_a, 1, 1, 1) +point_po1 = _me.Point('po1') +point_po2 = _me.Point('po2') +particle_p1 = _me.Particle('p1', _me.Point('p1_pt'), _sm.Symbol('m')) +particle_p2 = _me.Particle('p2', _me.Point('p2_pt'), _sm.Symbol('m')) +c1, c2, c3 = _me.dynamicsymbols('c1 c2 c3') +c1_d, c2_d, c3_d = _me.dynamicsymbols('c1_ c2_ c3_', 1) +body_r_cm = _me.Point('r_cm') +body_r_cm.set_vel(frame_n, 0) +body_r_f = _me.ReferenceFrame('r_f') +body_r = _me.RigidBody('r', body_r_cm, body_r_f, _sm.symbols('m'), (_me.outer(body_r_f.x,body_r_f.x),body_r_cm)) +point_po2.set_pos(particle_p1.point, c1*frame_a.x) +v = 2*point_po2.pos_from(particle_p1.point)+c2*frame_a.y +frame_a.set_ang_vel(frame_n, c3*frame_a.z) +v = 2*frame_a.ang_vel_in(frame_n)+c2*frame_a.y +body_r_f.set_ang_vel(frame_n, c3*frame_a.z) +v = 2*body_r_f.ang_vel_in(frame_n)+c2*frame_a.y +frame_a.set_ang_acc(frame_n, (frame_a.ang_vel_in(frame_n)).dt(frame_a)) +v = 2*frame_a.ang_acc_in(frame_n)+c2*frame_a.y +particle_p1.point.set_vel(frame_a, c1*frame_a.x+c3*frame_a.y) +body_r_cm.set_acc(frame_n, c2*frame_a.y) +v_a = _me.cross(body_r_cm.acc(frame_n), particle_p1.point.vel(frame_a)) +x_b_c = v_a +x_b_d = 2*x_b_c +a_b_c_d_e = x_b_d*2 +a_b_c = 2*c1*c2*c3 +a_b_c += 2*c1 +a_b_c = 3*c1 +q1, q2, u1, u2 = _me.dynamicsymbols('q1 q2 u1 u2') +q1_d, q2_d, u1_d, u2_d = _me.dynamicsymbols('q1_ q2_ u1_ u2_', 1) +x, y = _me.dynamicsymbols('x y') +x_d, y_d = _me.dynamicsymbols('x_ y_', 1) +x_dd, y_dd = _me.dynamicsymbols('x_ y_', 2) +yy = _me.dynamicsymbols('yy') +yy = x*x_d**2+1 +m = _sm.Matrix([[0]]) +m[0] = 2*x +m = m.row_insert(m.shape[0], _sm.Matrix([[0]])) +m[m.shape[0]-1] = 2*y +a = 2*m[0] +m = _sm.Matrix([1,2,3,4,5,6,7,8,9]).reshape(3, 3) +m[0,1] = 5 +a = m[0, 1]*2 +force_ro = q1*frame_n.x +torque_a = q2*frame_n.z +force_ro = q1*frame_n.x + q2*frame_n.y +f = force_ro*2 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/c/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/c/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..18d3d5301cb001c78fc4a9bc04b25aa36f282a93 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/c/__init__.py @@ -0,0 +1 @@ +"""Used for translating C source code into a SymPy expression""" diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/c/c_parser.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/c/c_parser.py new file mode 100644 index 0000000000000000000000000000000000000000..9e7223f8351205272e803773589649fcf1902f15 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/c/c_parser.py @@ -0,0 +1,1059 @@ +from sympy.external import import_module +import os + +cin = import_module('clang.cindex', import_kwargs = {'fromlist': ['cindex']}) + +""" +This module contains all the necessary Classes and Function used to Parse C and +C++ code into SymPy expression +The module serves as a backend for SymPyExpression to parse C code +It is also dependent on Clang's AST and SymPy's Codegen AST. +The module only supports the features currently supported by the Clang and +codegen AST which will be updated as the development of codegen AST and this +module progresses. +You might find unexpected bugs and exceptions while using the module, feel free +to report them to the SymPy Issue Tracker + +Features Supported +================== + +- Variable Declarations (integers and reals) +- Assignment (using integer & floating literal and function calls) +- Function Definitions and Declaration +- Function Calls +- Compound statements, Return statements + +Notes +===== + +The module is dependent on an external dependency which needs to be installed +to use the features of this module. + +Clang: The C and C++ compiler which is used to extract an AST from the provided +C source code. + +References +========== + +.. [1] https://github.com/sympy/sympy/issues +.. [2] https://clang.llvm.org/docs/ +.. [3] https://clang.llvm.org/docs/IntroductionToTheClangAST.html + +""" + +if cin: + from sympy.codegen.ast import (Variable, Integer, Float, + FunctionPrototype, FunctionDefinition, FunctionCall, + none, Return, Assignment, intc, int8, int16, int64, + uint8, uint16, uint32, uint64, float32, float64, float80, + aug_assign, bool_, While, CodeBlock) + from sympy.codegen.cnodes import (PreDecrement, PostDecrement, + PreIncrement, PostIncrement) + from sympy.core import Add, Mod, Mul, Pow, Rel + from sympy.logic.boolalg import And, as_Boolean, Not, Or + from sympy.core.symbol import Symbol + from sympy.core.sympify import sympify + from sympy.logic.boolalg import (false, true) + import sys + import tempfile + + class BaseParser: + """Base Class for the C parser""" + + def __init__(self): + """Initializes the Base parser creating a Clang AST index""" + self.index = cin.Index.create() + + def diagnostics(self, out): + """Diagostics function for the Clang AST""" + for diag in self.tu.diagnostics: + # tu = translation unit + print('%s %s (line %s, col %s) %s' % ( + { + 4: 'FATAL', + 3: 'ERROR', + 2: 'WARNING', + 1: 'NOTE', + 0: 'IGNORED', + }[diag.severity], + diag.location.file, + diag.location.line, + diag.location.column, + diag.spelling + ), file=out) + + class CCodeConverter(BaseParser): + """The Code Convereter for Clang AST + + The converter object takes the C source code or file as input and + converts them to SymPy Expressions. + """ + + def __init__(self): + """Initializes the code converter""" + super().__init__() + self._py_nodes = [] + self._data_types = { + "void": { + cin.TypeKind.VOID: none + }, + "bool": { + cin.TypeKind.BOOL: bool_ + }, + "int": { + cin.TypeKind.SCHAR: int8, + cin.TypeKind.SHORT: int16, + cin.TypeKind.INT: intc, + cin.TypeKind.LONG: int64, + cin.TypeKind.UCHAR: uint8, + cin.TypeKind.USHORT: uint16, + cin.TypeKind.UINT: uint32, + cin.TypeKind.ULONG: uint64 + }, + "float": { + cin.TypeKind.FLOAT: float32, + cin.TypeKind.DOUBLE: float64, + cin.TypeKind.LONGDOUBLE: float80 + } + } + + def parse(self, filename, flags): + """Function to parse a file with C source code + + It takes the filename as an attribute and creates a Clang AST + Translation Unit parsing the file. + Then the transformation function is called on the translation unit, + whose results are collected into a list which is returned by the + function. + + Parameters + ========== + + filename : string + Path to the C file to be parsed + + flags: list + Arguments to be passed to Clang while parsing the C code + + Returns + ======= + + py_nodes: list + A list of SymPy AST nodes + + """ + filepath = os.path.abspath(filename) + self.tu = self.index.parse( + filepath, + args=flags, + options=cin.TranslationUnit.PARSE_DETAILED_PROCESSING_RECORD + ) + for child in self.tu.cursor.get_children(): + if child.kind == cin.CursorKind.VAR_DECL or child.kind == cin.CursorKind.FUNCTION_DECL: + self._py_nodes.append(self.transform(child)) + return self._py_nodes + + def parse_str(self, source, flags): + """Function to parse a string with C source code + + It takes the source code as an attribute, stores it in a temporary + file and creates a Clang AST Translation Unit parsing the file. + Then the transformation function is called on the translation unit, + whose results are collected into a list which is returned by the + function. + + Parameters + ========== + + source : string + A string containing the C source code to be parsed + + flags: list + Arguments to be passed to Clang while parsing the C code + + Returns + ======= + + py_nodes: list + A list of SymPy AST nodes + + """ + file = tempfile.NamedTemporaryFile(mode = 'w+', suffix = '.cpp') + file.write(source) + file.flush() + file.seek(0) + self.tu = self.index.parse( + file.name, + args=flags, + options=cin.TranslationUnit.PARSE_DETAILED_PROCESSING_RECORD + ) + file.close() + for child in self.tu.cursor.get_children(): + if child.kind == cin.CursorKind.VAR_DECL or child.kind == cin.CursorKind.FUNCTION_DECL: + self._py_nodes.append(self.transform(child)) + return self._py_nodes + + def transform(self, node): + """Transformation Function for Clang AST nodes + + It determines the kind of node and calls the respective + transformation function for that node. + + Raises + ====== + + NotImplementedError : if the transformation for the provided node + is not implemented + + """ + handler = getattr(self, 'transform_%s' % node.kind.name.lower(), None) + + if handler is None: + print( + "Ignoring node of type %s (%s)" % ( + node.kind, + ' '.join( + t.spelling for t in node.get_tokens()) + ), + file=sys.stderr + ) + + return handler(node) + + def transform_var_decl(self, node): + """Transformation Function for Variable Declaration + + Used to create nodes for variable declarations and assignments with + values or function call for the respective nodes in the clang AST + + Returns + ======= + + A variable node as Declaration, with the initial value if given + + Raises + ====== + + NotImplementedError : if called for data types not currently + implemented + + Notes + ===== + + The function currently supports following data types: + + Boolean: + bool, _Bool + + Integer: + 8-bit: signed char and unsigned char + 16-bit: short, short int, signed short, + signed short int, unsigned short, unsigned short int + 32-bit: int, signed int, unsigned int + 64-bit: long, long int, signed long, + signed long int, unsigned long, unsigned long int + + Floating point: + Single Precision: float + Double Precision: double + Extended Precision: long double + + """ + if node.type.kind in self._data_types["int"]: + type = self._data_types["int"][node.type.kind] + elif node.type.kind in self._data_types["float"]: + type = self._data_types["float"][node.type.kind] + elif node.type.kind in self._data_types["bool"]: + type = self._data_types["bool"][node.type.kind] + else: + raise NotImplementedError("Only bool, int " + "and float are supported") + try: + children = node.get_children() + child = next(children) + + #ignoring namespace and type details for the variable + while child.kind == cin.CursorKind.NAMESPACE_REF or child.kind == cin.CursorKind.TYPE_REF: + child = next(children) + + val = self.transform(child) + + supported_rhs = [ + cin.CursorKind.INTEGER_LITERAL, + cin.CursorKind.FLOATING_LITERAL, + cin.CursorKind.UNEXPOSED_EXPR, + cin.CursorKind.BINARY_OPERATOR, + cin.CursorKind.PAREN_EXPR, + cin.CursorKind.UNARY_OPERATOR, + cin.CursorKind.CXX_BOOL_LITERAL_EXPR + ] + + if child.kind in supported_rhs: + if isinstance(val, str): + value = Symbol(val) + elif isinstance(val, bool): + if node.type.kind in self._data_types["int"]: + value = Integer(0) if val == False else Integer(1) + elif node.type.kind in self._data_types["float"]: + value = Float(0.0) if val == False else Float(1.0) + elif node.type.kind in self._data_types["bool"]: + value = sympify(val) + elif isinstance(val, (Integer, int, Float, float)): + if node.type.kind in self._data_types["int"]: + value = Integer(val) + elif node.type.kind in self._data_types["float"]: + value = Float(val) + elif node.type.kind in self._data_types["bool"]: + value = sympify(bool(val)) + else: + value = val + + return Variable( + node.spelling + ).as_Declaration( + type = type, + value = value + ) + + elif child.kind == cin.CursorKind.CALL_EXPR: + return Variable( + node.spelling + ).as_Declaration( + value = val + ) + + else: + raise NotImplementedError("Given " + "variable declaration \"{}\" " + "is not possible to parse yet!" + .format(" ".join( + t.spelling for t in node.get_tokens() + ) + )) + + except StopIteration: + return Variable( + node.spelling + ).as_Declaration( + type = type + ) + + def transform_function_decl(self, node): + """Transformation Function For Function Declaration + + Used to create nodes for function declarations and definitions for + the respective nodes in the clang AST + + Returns + ======= + + function : Codegen AST node + - FunctionPrototype node if function body is not present + - FunctionDefinition node if the function body is present + + + """ + + if node.result_type.kind in self._data_types["int"]: + ret_type = self._data_types["int"][node.result_type.kind] + elif node.result_type.kind in self._data_types["float"]: + ret_type = self._data_types["float"][node.result_type.kind] + elif node.result_type.kind in self._data_types["bool"]: + ret_type = self._data_types["bool"][node.result_type.kind] + elif node.result_type.kind in self._data_types["void"]: + ret_type = self._data_types["void"][node.result_type.kind] + else: + raise NotImplementedError("Only void, bool, int " + "and float are supported") + body = [] + param = [] + + # Subsequent nodes will be the parameters for the function. + for child in node.get_children(): + decl = self.transform(child) + if child.kind == cin.CursorKind.PARM_DECL: + param.append(decl) + elif child.kind == cin.CursorKind.COMPOUND_STMT: + for val in decl: + body.append(val) + else: + body.append(decl) + + if body == []: + function = FunctionPrototype( + return_type = ret_type, + name = node.spelling, + parameters = param + ) + else: + function = FunctionDefinition( + return_type = ret_type, + name = node.spelling, + parameters = param, + body = body + ) + return function + + def transform_parm_decl(self, node): + """Transformation function for Parameter Declaration + + Used to create parameter nodes for the required functions for the + respective nodes in the clang AST + + Returns + ======= + + param : Codegen AST Node + Variable node with the value and type of the variable + + Raises + ====== + + ValueError if multiple children encountered in the parameter node + + """ + if node.type.kind in self._data_types["int"]: + type = self._data_types["int"][node.type.kind] + elif node.type.kind in self._data_types["float"]: + type = self._data_types["float"][node.type.kind] + elif node.type.kind in self._data_types["bool"]: + type = self._data_types["bool"][node.type.kind] + else: + raise NotImplementedError("Only bool, int " + "and float are supported") + try: + children = node.get_children() + child = next(children) + + # Any namespace nodes can be ignored + while child.kind in [cin.CursorKind.NAMESPACE_REF, + cin.CursorKind.TYPE_REF, + cin.CursorKind.TEMPLATE_REF]: + child = next(children) + + # If there is a child, it is the default value of the parameter. + lit = self.transform(child) + if node.type.kind in self._data_types["int"]: + val = Integer(lit) + elif node.type.kind in self._data_types["float"]: + val = Float(lit) + elif node.type.kind in self._data_types["bool"]: + val = sympify(bool(lit)) + else: + raise NotImplementedError("Only bool, int " + "and float are supported") + + param = Variable( + node.spelling + ).as_Declaration( + type = type, + value = val + ) + except StopIteration: + param = Variable( + node.spelling + ).as_Declaration( + type = type + ) + + try: + self.transform(next(children)) + raise ValueError("Can't handle multiple children on parameter") + except StopIteration: + pass + + return param + + def transform_integer_literal(self, node): + """Transformation function for integer literal + + Used to get the value and type of the given integer literal. + + Returns + ======= + + val : list + List with two arguments type and Value + type contains the type of the integer + value contains the value stored in the variable + + Notes + ===== + + Only Base Integer type supported for now + + """ + try: + value = next(node.get_tokens()).spelling + except StopIteration: + # No tokens + value = node.literal + return int(value) + + def transform_floating_literal(self, node): + """Transformation function for floating literal + + Used to get the value and type of the given floating literal. + + Returns + ======= + + val : list + List with two arguments type and Value + type contains the type of float + value contains the value stored in the variable + + Notes + ===== + + Only Base Float type supported for now + + """ + try: + value = next(node.get_tokens()).spelling + except (StopIteration, ValueError): + # No tokens + value = node.literal + return float(value) + + def transform_string_literal(self, node): + #TODO: No string type in AST + #type = + #try: + # value = next(node.get_tokens()).spelling + #except (StopIteration, ValueError): + # No tokens + # value = node.literal + #val = [type, value] + #return val + pass + + def transform_character_literal(self, node): + """Transformation function for character literal + + Used to get the value of the given character literal. + + Returns + ======= + + val : int + val contains the ascii value of the character literal + + Notes + ===== + + Only for cases where character is assigned to a integer value, + since character literal is not in SymPy AST + + """ + try: + value = next(node.get_tokens()).spelling + except (StopIteration, ValueError): + # No tokens + value = node.literal + return ord(str(value[1])) + + def transform_cxx_bool_literal_expr(self, node): + """Transformation function for boolean literal + + Used to get the value of the given boolean literal. + + Returns + ======= + + value : bool + value contains the boolean value of the variable + + """ + try: + value = next(node.get_tokens()).spelling + except (StopIteration, ValueError): + value = node.literal + return True if value == 'true' else False + + def transform_unexposed_decl(self,node): + """Transformation function for unexposed declarations""" + pass + + def transform_unexposed_expr(self, node): + """Transformation function for unexposed expression + + Unexposed expressions are used to wrap float, double literals and + expressions + + Returns + ======= + + expr : Codegen AST Node + the result from the wrapped expression + + None : NoneType + No children are found for the node + + Raises + ====== + + ValueError if the expression contains multiple children + + """ + # Ignore unexposed nodes; pass whatever is the first + # (and should be only) child unaltered. + try: + children = node.get_children() + expr = self.transform(next(children)) + except StopIteration: + return None + + try: + next(children) + raise ValueError("Unexposed expression has > 1 children.") + except StopIteration: + pass + + return expr + + def transform_decl_ref_expr(self, node): + """Returns the name of the declaration reference""" + return node.spelling + + def transform_call_expr(self, node): + """Transformation function for a call expression + + Used to create function call nodes for the function calls present + in the C code + + Returns + ======= + + FunctionCall : Codegen AST Node + FunctionCall node with parameters if any parameters are present + + """ + param = [] + children = node.get_children() + child = next(children) + + while child.kind == cin.CursorKind.NAMESPACE_REF: + child = next(children) + while child.kind == cin.CursorKind.TYPE_REF: + child = next(children) + + first_child = self.transform(child) + try: + for child in children: + arg = self.transform(child) + if child.kind == cin.CursorKind.INTEGER_LITERAL: + param.append(Integer(arg)) + elif child.kind == cin.CursorKind.FLOATING_LITERAL: + param.append(Float(arg)) + else: + param.append(arg) + return FunctionCall(first_child, param) + + except StopIteration: + return FunctionCall(first_child) + + def transform_return_stmt(self, node): + """Returns the Return Node for a return statement""" + return Return(next(node.get_children()).spelling) + + def transform_compound_stmt(self, node): + """Transformation function for compound statements + + Returns + ======= + + expr : list + list of Nodes for the expressions present in the statement + + None : NoneType + if the compound statement is empty + + """ + expr = [] + children = node.get_children() + + for child in children: + expr.append(self.transform(child)) + return expr + + def transform_decl_stmt(self, node): + """Transformation function for declaration statements + + These statements are used to wrap different kinds of declararions + like variable or function declaration + The function calls the transformer function for the child of the + given node + + Returns + ======= + + statement : Codegen AST Node + contains the node returned by the children node for the type of + declaration + + Raises + ====== + + ValueError if multiple children present + + """ + try: + children = node.get_children() + statement = self.transform(next(children)) + except StopIteration: + pass + + try: + self.transform(next(children)) + raise ValueError("Don't know how to handle multiple statements") + except StopIteration: + pass + + return statement + + def transform_paren_expr(self, node): + """Transformation function for Parenthesized expressions + + Returns the result from its children nodes + + """ + return self.transform(next(node.get_children())) + + def transform_compound_assignment_operator(self, node): + """Transformation function for handling shorthand operators + + Returns + ======= + + augmented_assignment_expression: Codegen AST node + shorthand assignment expression represented as Codegen AST + + Raises + ====== + + NotImplementedError + If the shorthand operator for bitwise operators + (~=, ^=, &=, |=, <<=, >>=) is encountered + + """ + return self.transform_binary_operator(node) + + def transform_unary_operator(self, node): + """Transformation function for handling unary operators + + Returns + ======= + + unary_expression: Codegen AST node + simplified unary expression represented as Codegen AST + + Raises + ====== + + NotImplementedError + If dereferencing operator(*), address operator(&) or + bitwise NOT operator(~) is encountered + + """ + # supported operators list + operators_list = ['+', '-', '++', '--', '!'] + tokens = list(node.get_tokens()) + + # it can be either pre increment/decrement or any other operator from the list + if tokens[0].spelling in operators_list: + child = self.transform(next(node.get_children())) + # (decl_ref) e.g.; int a = ++b; or simply ++b; + if isinstance(child, str): + if tokens[0].spelling == '+': + return Symbol(child) + if tokens[0].spelling == '-': + return Mul(Symbol(child), -1) + if tokens[0].spelling == '++': + return PreIncrement(Symbol(child)) + if tokens[0].spelling == '--': + return PreDecrement(Symbol(child)) + if tokens[0].spelling == '!': + return Not(Symbol(child)) + # e.g.; int a = -1; or int b = -(1 + 2); + else: + if tokens[0].spelling == '+': + return child + if tokens[0].spelling == '-': + return Mul(child, -1) + if tokens[0].spelling == '!': + return Not(sympify(bool(child))) + + # it can be either post increment/decrement + # since variable name is obtained in token[0].spelling + elif tokens[1].spelling in ['++', '--']: + child = self.transform(next(node.get_children())) + if tokens[1].spelling == '++': + return PostIncrement(Symbol(child)) + if tokens[1].spelling == '--': + return PostDecrement(Symbol(child)) + else: + raise NotImplementedError("Dereferencing operator, " + "Address operator and bitwise NOT operator " + "have not been implemented yet!") + + def transform_binary_operator(self, node): + """Transformation function for handling binary operators + + Returns + ======= + + binary_expression: Codegen AST node + simplified binary expression represented as Codegen AST + + Raises + ====== + + NotImplementedError + If a bitwise operator or + unary operator(which is a child of any binary + operator in Clang AST) is encountered + + """ + # get all the tokens of assignment + # and store it in the tokens list + tokens = list(node.get_tokens()) + + # supported operators list + operators_list = ['+', '-', '*', '/', '%','=', + '>', '>=', '<', '<=', '==', '!=', '&&', '||', '+=', '-=', + '*=', '/=', '%='] + + # this stack will contain variable content + # and type of variable in the rhs + combined_variables_stack = [] + + # this stack will contain operators + # to be processed in the rhs + operators_stack = [] + + # iterate through every token + for token in tokens: + # token is either '(', ')' or + # any of the supported operators from the operator list + if token.kind == cin.TokenKind.PUNCTUATION: + + # push '(' to the operators stack + if token.spelling == '(': + operators_stack.append('(') + + elif token.spelling == ')': + # keep adding the expression to the + # combined variables stack unless + # '(' is found + while (operators_stack + and operators_stack[-1] != '('): + if len(combined_variables_stack) < 2: + raise NotImplementedError( + "Unary operators as a part of " + "binary operators is not " + "supported yet!") + rhs = combined_variables_stack.pop() + lhs = combined_variables_stack.pop() + operator = operators_stack.pop() + combined_variables_stack.append( + self.perform_operation( + lhs, rhs, operator)) + + # pop '(' + operators_stack.pop() + + # token is an operator (supported) + elif token.spelling in operators_list: + while (operators_stack + and self.priority_of(token.spelling) + <= self.priority_of( + operators_stack[-1])): + if len(combined_variables_stack) < 2: + raise NotImplementedError( + "Unary operators as a part of " + "binary operators is not " + "supported yet!") + rhs = combined_variables_stack.pop() + lhs = combined_variables_stack.pop() + operator = operators_stack.pop() + combined_variables_stack.append( + self.perform_operation( + lhs, rhs, operator)) + + # push current operator + operators_stack.append(token.spelling) + + # token is a bitwise operator + elif token.spelling in ['&', '|', '^', '<<', '>>']: + raise NotImplementedError( + "Bitwise operator has not been " + "implemented yet!") + + # token is a shorthand bitwise operator + elif token.spelling in ['&=', '|=', '^=', '<<=', + '>>=']: + raise NotImplementedError( + "Shorthand bitwise operator has not been " + "implemented yet!") + else: + raise NotImplementedError( + "Given token {} is not implemented yet!" + .format(token.spelling)) + + # token is an identifier(variable) + elif token.kind == cin.TokenKind.IDENTIFIER: + combined_variables_stack.append( + [token.spelling, 'identifier']) + + # token is a literal + elif token.kind == cin.TokenKind.LITERAL: + combined_variables_stack.append( + [token.spelling, 'literal']) + + # token is a keyword, either true or false + elif (token.kind == cin.TokenKind.KEYWORD + and token.spelling in ['true', 'false']): + combined_variables_stack.append( + [token.spelling, 'boolean']) + else: + raise NotImplementedError( + "Given token {} is not implemented yet!" + .format(token.spelling)) + + # process remaining operators + while operators_stack: + if len(combined_variables_stack) < 2: + raise NotImplementedError( + "Unary operators as a part of " + "binary operators is not " + "supported yet!") + rhs = combined_variables_stack.pop() + lhs = combined_variables_stack.pop() + operator = operators_stack.pop() + combined_variables_stack.append( + self.perform_operation(lhs, rhs, operator)) + + return combined_variables_stack[-1][0] + + def priority_of(self, op): + """To get the priority of given operator""" + if op in ['=', '+=', '-=', '*=', '/=', '%=']: + return 1 + if op in ['&&', '||']: + return 2 + if op in ['<', '<=', '>', '>=', '==', '!=']: + return 3 + if op in ['+', '-']: + return 4 + if op in ['*', '/', '%']: + return 5 + return 0 + + def perform_operation(self, lhs, rhs, op): + """Performs operation supported by the SymPy core + + Returns + ======= + + combined_variable: list + contains variable content and type of variable + + """ + lhs_value = self.get_expr_for_operand(lhs) + rhs_value = self.get_expr_for_operand(rhs) + if op == '+': + return [Add(lhs_value, rhs_value), 'expr'] + if op == '-': + return [Add(lhs_value, -rhs_value), 'expr'] + if op == '*': + return [Mul(lhs_value, rhs_value), 'expr'] + if op == '/': + return [Mul(lhs_value, Pow(rhs_value, Integer(-1))), 'expr'] + if op == '%': + return [Mod(lhs_value, rhs_value), 'expr'] + if op in ['<', '<=', '>', '>=', '==', '!=']: + return [Rel(lhs_value, rhs_value, op), 'expr'] + if op == '&&': + return [And(as_Boolean(lhs_value), as_Boolean(rhs_value)), 'expr'] + if op == '||': + return [Or(as_Boolean(lhs_value), as_Boolean(rhs_value)), 'expr'] + if op == '=': + return [Assignment(Variable(lhs_value), rhs_value), 'expr'] + if op in ['+=', '-=', '*=', '/=', '%=']: + return [aug_assign(Variable(lhs_value), op[0], rhs_value), 'expr'] + + def get_expr_for_operand(self, combined_variable): + """Gives out SymPy Codegen AST node + + AST node returned is corresponding to + combined variable passed.Combined variable contains + variable content and type of variable + + """ + if combined_variable[1] == 'identifier': + return Symbol(combined_variable[0]) + if combined_variable[1] == 'literal': + if '.' in combined_variable[0]: + return Float(float(combined_variable[0])) + else: + return Integer(int(combined_variable[0])) + if combined_variable[1] == 'expr': + return combined_variable[0] + if combined_variable[1] == 'boolean': + return true if combined_variable[0] == 'true' else false + + def transform_null_stmt(self, node): + """Handles Null Statement and returns None""" + return none + + def transform_while_stmt(self, node): + """Transformation function for handling while statement + + Returns + ======= + + while statement : Codegen AST Node + contains the while statement node having condition and + statement block + + """ + children = node.get_children() + + condition = self.transform(next(children)) + statements = self.transform(next(children)) + + if isinstance(statements, list): + statement_block = CodeBlock(*statements) + else: + statement_block = CodeBlock(statements) + + return While(condition, statement_block) + + + +else: + class CCodeConverter(): # type: ignore + def __init__(self, *args, **kwargs): + raise ImportError("Module not Installed") + + +def parse_c(source): + """Function for converting a C source code + + The function reads the source code present in the given file and parses it + to give out SymPy Expressions + + Returns + ======= + + src : list + List of Python expression strings + + """ + converter = CCodeConverter() + if os.path.exists(source): + src = converter.parse(source, flags = []) + else: + src = converter.parse_str(source, flags = []) + return src diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/fortran/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/fortran/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..c65e37cf3de2dddbcee0fa5c7eeac2fdc9f685db --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/fortran/__init__.py @@ -0,0 +1 @@ +"""Used for translating Fortran source code into a SymPy expression. """ diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/fortran/fortran_parser.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/fortran/fortran_parser.py new file mode 100644 index 0000000000000000000000000000000000000000..504249f6119a59a90d91c5e989f893cffe20e643 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/fortran/fortran_parser.py @@ -0,0 +1,347 @@ +from sympy.external import import_module + +lfortran = import_module('lfortran') + +if lfortran: + from sympy.codegen.ast import (Variable, IntBaseType, FloatBaseType, String, + Return, FunctionDefinition, Assignment) + from sympy.core import Add, Mul, Integer, Float + from sympy.core.symbol import Symbol + + asr_mod = lfortran.asr + asr = lfortran.asr.asr + src_to_ast = lfortran.ast.src_to_ast + ast_to_asr = lfortran.semantic.ast_to_asr.ast_to_asr + + """ + This module contains all the necessary Classes and Function used to Parse + Fortran code into SymPy expression + + The module and its API are currently under development and experimental. + It is also dependent on LFortran for the ASR that is converted to SymPy syntax + which is also under development. + The module only supports the features currently supported by the LFortran ASR + which will be updated as the development of LFortran and this module progresses + + You might find unexpected bugs and exceptions while using the module, feel free + to report them to the SymPy Issue Tracker + + The API for the module might also change while in development if better and + more effective ways are discovered for the process + + Features Supported + ================== + + - Variable Declarations (integers and reals) + - Function Definitions + - Assignments and Basic Binary Operations + + + Notes + ===== + + The module depends on an external dependency + + LFortran : Required to parse Fortran source code into ASR + + + References + ========== + + .. [1] https://github.com/sympy/sympy/issues + .. [2] https://gitlab.com/lfortran/lfortran + .. [3] https://docs.lfortran.org/ + + """ + + + class ASR2PyVisitor(asr.ASTVisitor): # type: ignore + """ + Visitor Class for LFortran ASR + + It is a Visitor class derived from asr.ASRVisitor which visits all the + nodes of the LFortran ASR and creates corresponding AST node for each + ASR node + + """ + + def __init__(self): + """Initialize the Parser""" + self._py_ast = [] + + def visit_TranslationUnit(self, node): + """ + Function to visit all the elements of the Translation Unit + created by LFortran ASR + """ + for s in node.global_scope.symbols: + sym = node.global_scope.symbols[s] + self.visit(sym) + for item in node.items: + self.visit(item) + + def visit_Assignment(self, node): + """Visitor Function for Assignment + + Visits each Assignment is the LFortran ASR and creates corresponding + assignment for SymPy. + + Notes + ===== + + The function currently only supports variable assignment and binary + operation assignments of varying multitudes. Any type of numberS or + array is not supported. + + Raises + ====== + + NotImplementedError() when called for Numeric assignments or Arrays + + """ + # TODO: Arithmetic Assignment + if isinstance(node.target, asr.Variable): + target = node.target + value = node.value + if isinstance(value, asr.Variable): + new_node = Assignment( + Variable( + target.name + ), + Variable( + value.name + ) + ) + elif (type(value) == asr.BinOp): + exp_ast = call_visitor(value) + for expr in exp_ast: + new_node = Assignment( + Variable(target.name), + expr + ) + else: + raise NotImplementedError("Numeric assignments not supported") + else: + raise NotImplementedError("Arrays not supported") + self._py_ast.append(new_node) + + def visit_BinOp(self, node): + """Visitor Function for Binary Operations + + Visits each binary operation present in the LFortran ASR like addition, + subtraction, multiplication, division and creates the corresponding + operation node in SymPy's AST + + In case of more than one binary operations, the function calls the + call_visitor() function on the child nodes of the binary operations + recursively until all the operations have been processed. + + Notes + ===== + + The function currently only supports binary operations with Variables + or other binary operations. Numerics are not supported as of yet. + + Raises + ====== + + NotImplementedError() when called for Numeric assignments + + """ + # TODO: Integer Binary Operations + op = node.op + lhs = node.left + rhs = node.right + + if (type(lhs) == asr.Variable): + left_value = Symbol(lhs.name) + elif(type(lhs) == asr.BinOp): + l_exp_ast = call_visitor(lhs) + for exp in l_exp_ast: + left_value = exp + else: + raise NotImplementedError("Numbers Currently not supported") + + if (type(rhs) == asr.Variable): + right_value = Symbol(rhs.name) + elif(type(rhs) == asr.BinOp): + r_exp_ast = call_visitor(rhs) + for exp in r_exp_ast: + right_value = exp + else: + raise NotImplementedError("Numbers Currently not supported") + + if isinstance(op, asr.Add): + new_node = Add(left_value, right_value) + elif isinstance(op, asr.Sub): + new_node = Add(left_value, -right_value) + elif isinstance(op, asr.Div): + new_node = Mul(left_value, 1/right_value) + elif isinstance(op, asr.Mul): + new_node = Mul(left_value, right_value) + + self._py_ast.append(new_node) + + def visit_Variable(self, node): + """Visitor Function for Variable Declaration + + Visits each variable declaration present in the ASR and creates a + Symbol declaration for each variable + + Notes + ===== + + The functions currently only support declaration of integer and + real variables. Other data types are still under development. + + Raises + ====== + + NotImplementedError() when called for unsupported data types + + """ + if isinstance(node.type, asr.Integer): + var_type = IntBaseType(String('integer')) + value = Integer(0) + elif isinstance(node.type, asr.Real): + var_type = FloatBaseType(String('real')) + value = Float(0.0) + else: + raise NotImplementedError("Data type not supported") + + if not (node.intent == 'in'): + new_node = Variable( + node.name + ).as_Declaration( + type = var_type, + value = value + ) + self._py_ast.append(new_node) + + def visit_Sequence(self, seq): + """Visitor Function for code sequence + + Visits a code sequence/ block and calls the visitor function on all the + children of the code block to create corresponding code in python + + """ + if seq is not None: + for node in seq: + self._py_ast.append(call_visitor(node)) + + def visit_Num(self, node): + """Visitor Function for Numbers in ASR + + This function is currently under development and will be updated + with improvements in the LFortran ASR + + """ + # TODO:Numbers when the LFortran ASR is updated + # self._py_ast.append(Integer(node.n)) + pass + + def visit_Function(self, node): + """Visitor Function for function Definitions + + Visits each function definition present in the ASR and creates a + function definition node in the Python AST with all the elements of the + given function + + The functions declare all the variables required as SymPy symbols in + the function before the function definition + + This function also the call_visior_function to parse the contents of + the function body + + """ + # TODO: Return statement, variable declaration + fn_args = [Variable(arg_iter.name) for arg_iter in node.args] + fn_body = [] + fn_name = node.name + for i in node.body: + fn_ast = call_visitor(i) + try: + fn_body_expr = fn_ast + except UnboundLocalError: + fn_body_expr = [] + for sym in node.symtab.symbols: + decl = call_visitor(node.symtab.symbols[sym]) + for symbols in decl: + fn_body.append(symbols) + for elem in fn_body_expr: + fn_body.append(elem) + fn_body.append( + Return( + Variable( + node.return_var.name + ) + ) + ) + if isinstance(node.return_var.type, asr.Integer): + ret_type = IntBaseType(String('integer')) + elif isinstance(node.return_var.type, asr.Real): + ret_type = FloatBaseType(String('real')) + else: + raise NotImplementedError("Data type not supported") + new_node = FunctionDefinition( + return_type = ret_type, + name = fn_name, + parameters = fn_args, + body = fn_body + ) + self._py_ast.append(new_node) + + def ret_ast(self): + """Returns the AST nodes""" + return self._py_ast +else: + class ASR2PyVisitor(): # type: ignore + def __init__(self, *args, **kwargs): + raise ImportError('lfortran not available') + +def call_visitor(fort_node): + """Calls the AST Visitor on the Module + + This function is used to call the AST visitor for a program or module + It imports all the required modules and calls the visit() function + on the given node + + Parameters + ========== + + fort_node : LFortran ASR object + Node for the operation for which the NodeVisitor is called + + Returns + ======= + + res_ast : list + list of SymPy AST Nodes + + """ + v = ASR2PyVisitor() + v.visit(fort_node) + res_ast = v.ret_ast() + return res_ast + + +def src_to_sympy(src): + """Wrapper function to convert the given Fortran source code to SymPy Expressions + + Parameters + ========== + + src : string + A string with the Fortran source code + + Returns + ======= + + py_src : string + A string with the Python source code compatible with SymPy + + """ + a_ast = src_to_ast(src, translation_unit=False) + a = ast_to_asr(a_ast) + py_src = call_visitor(a) + return py_src diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/LICENSE.txt b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/LICENSE.txt new file mode 100644 index 0000000000000000000000000000000000000000..6bbfda911b2afada41a568218e31a6502dc68f44 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/LICENSE.txt @@ -0,0 +1,21 @@ +The MIT License (MIT) + +Copyright 2016, latex2sympy + +Permission is hereby granted, free of charge, to any person obtaining a copy +of this software and associated documentation files (the "Software"), to deal +in the Software without restriction, including without limitation the rights +to use, copy, modify, merge, publish, distribute, sublicense, and/or sell +copies of the Software, and to permit persons to whom the Software is +furnished to do so, subject to the following conditions: + +The above copyright notice and this permission notice shall be included in all +copies or substantial portions of the Software. + +THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, EXPRESS OR +IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF MERCHANTABILITY, +FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. IN NO EVENT SHALL THE +AUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY CLAIM, DAMAGES OR OTHER +LIABILITY, WHETHER IN AN ACTION OF CONTRACT, TORT OR OTHERWISE, ARISING FROM, +OUT OF OR IN CONNECTION WITH THE SOFTWARE OR THE USE OR OTHER DEALINGS IN THE +SOFTWARE. diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/LaTeX.g4 b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/LaTeX.g4 new file mode 100644 index 0000000000000000000000000000000000000000..fc2c30f9817931e2060b549a39f98a6a4f9cb1f7 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/LaTeX.g4 @@ -0,0 +1,312 @@ +/* + ANTLR4 LaTeX Math Grammar + + Ported from latex2sympy by @augustt198 https://github.com/augustt198/latex2sympy See license in + LICENSE.txt + */ + +/* + After changing this file, it is necessary to run `python setup.py antlr` in the root directory of + the repository. This will regenerate the code in `sympy/parsing/latex/_antlr/*.py`. + */ + +grammar LaTeX; + +options { + language = Python3; +} + +WS: [ \t\r\n]+ -> skip; +THINSPACE: ('\\,' | '\\thinspace') -> skip; +MEDSPACE: ('\\:' | '\\medspace') -> skip; +THICKSPACE: ('\\;' | '\\thickspace') -> skip; +QUAD: '\\quad' -> skip; +QQUAD: '\\qquad' -> skip; +NEGTHINSPACE: ('\\!' | '\\negthinspace') -> skip; +NEGMEDSPACE: '\\negmedspace' -> skip; +NEGTHICKSPACE: '\\negthickspace' -> skip; +CMD_LEFT: '\\left' -> skip; +CMD_RIGHT: '\\right' -> skip; + +IGNORE: + ( + '\\vrule' + | '\\vcenter' + | '\\vbox' + | '\\vskip' + | '\\vspace' + | '\\hfil' + | '\\*' + | '\\-' + | '\\.' + | '\\/' + | '\\"' + | '\\(' + | '\\=' + ) -> skip; + +ADD: '+'; +SUB: '-'; +MUL: '*'; +DIV: '/'; + +L_PAREN: '('; +R_PAREN: ')'; +L_BRACE: '{'; +R_BRACE: '}'; +L_BRACE_LITERAL: '\\{'; +R_BRACE_LITERAL: '\\}'; +L_BRACKET: '['; +R_BRACKET: ']'; + +BAR: '|'; + +R_BAR: '\\right|'; +L_BAR: '\\left|'; + +L_ANGLE: '\\langle'; +R_ANGLE: '\\rangle'; +FUNC_LIM: '\\lim'; +LIM_APPROACH_SYM: + '\\to' + | '\\rightarrow' + | '\\Rightarrow' + | '\\longrightarrow' + | '\\Longrightarrow'; +FUNC_INT: + '\\int' + | '\\int\\limits'; +FUNC_SUM: '\\sum'; +FUNC_PROD: '\\prod'; + +FUNC_EXP: '\\exp'; +FUNC_LOG: '\\log'; +FUNC_LG: '\\lg'; +FUNC_LN: '\\ln'; +FUNC_SIN: '\\sin'; +FUNC_COS: '\\cos'; +FUNC_TAN: '\\tan'; +FUNC_CSC: '\\csc'; +FUNC_SEC: '\\sec'; +FUNC_COT: '\\cot'; + +FUNC_ARCSIN: '\\arcsin'; +FUNC_ARCCOS: '\\arccos'; +FUNC_ARCTAN: '\\arctan'; +FUNC_ARCCSC: '\\arccsc'; +FUNC_ARCSEC: '\\arcsec'; +FUNC_ARCCOT: '\\arccot'; + +FUNC_SINH: '\\sinh'; +FUNC_COSH: '\\cosh'; +FUNC_TANH: '\\tanh'; +FUNC_ARSINH: '\\arsinh'; +FUNC_ARCOSH: '\\arcosh'; +FUNC_ARTANH: '\\artanh'; + +L_FLOOR: '\\lfloor'; +R_FLOOR: '\\rfloor'; +L_CEIL: '\\lceil'; +R_CEIL: '\\rceil'; + +FUNC_SQRT: '\\sqrt'; +FUNC_OVERLINE: '\\overline'; + +CMD_TIMES: '\\times'; +CMD_CDOT: '\\cdot'; +CMD_DIV: '\\div'; +CMD_FRAC: + '\\frac' + | '\\dfrac' + | '\\tfrac'; +CMD_BINOM: '\\binom'; +CMD_DBINOM: '\\dbinom'; +CMD_TBINOM: '\\tbinom'; + +CMD_MATHIT: '\\mathit'; + +UNDERSCORE: '_'; +CARET: '^'; +COLON: ':'; + +fragment WS_CHAR: [ \t\r\n]; +DIFFERENTIAL: 'd' WS_CHAR*? ([a-zA-Z] | '\\' [a-zA-Z]+); + +LETTER: [a-zA-Z]; +DIGIT: [0-9]; + +EQUAL: (('&' WS_CHAR*?)? '=') | ('=' (WS_CHAR*? '&')?); +NEQ: '\\neq'; + +LT: '<'; +LTE: ('\\leq' | '\\le' | LTE_Q | LTE_S); +LTE_Q: '\\leqq'; +LTE_S: '\\leqslant'; + +GT: '>'; +GTE: ('\\geq' | '\\ge' | GTE_Q | GTE_S); +GTE_Q: '\\geqq'; +GTE_S: '\\geqslant'; + +BANG: '!'; + +SINGLE_QUOTES: '\''+; + +SYMBOL: '\\' [a-zA-Z]+; + +math: relation; + +relation: + relation (EQUAL | LT | LTE | GT | GTE | NEQ) relation + | expr; + +equality: expr EQUAL expr; + +expr: additive; + +additive: additive (ADD | SUB) additive | mp; + +// mult part +mp: + mp (MUL | CMD_TIMES | CMD_CDOT | DIV | CMD_DIV | COLON) mp + | unary; + +mp_nofunc: + mp_nofunc ( + MUL + | CMD_TIMES + | CMD_CDOT + | DIV + | CMD_DIV + | COLON + ) mp_nofunc + | unary_nofunc; + +unary: (ADD | SUB) unary | postfix+; + +unary_nofunc: + (ADD | SUB) unary_nofunc + | postfix postfix_nofunc*; + +postfix: exp postfix_op*; +postfix_nofunc: exp_nofunc postfix_op*; +postfix_op: BANG | eval_at; + +eval_at: + BAR (eval_at_sup | eval_at_sub | eval_at_sup eval_at_sub); + +eval_at_sub: UNDERSCORE L_BRACE (expr | equality) R_BRACE; + +eval_at_sup: CARET L_BRACE (expr | equality) R_BRACE; + +exp: exp CARET (atom | L_BRACE expr R_BRACE) subexpr? | comp; + +exp_nofunc: + exp_nofunc CARET (atom | L_BRACE expr R_BRACE) subexpr? + | comp_nofunc; + +comp: + group + | abs_group + | func + | atom + | floor + | ceil; + +comp_nofunc: + group + | abs_group + | atom + | floor + | ceil; + +group: + L_PAREN expr R_PAREN + | L_BRACKET expr R_BRACKET + | L_BRACE expr R_BRACE + | L_BRACE_LITERAL expr R_BRACE_LITERAL; + +abs_group: BAR expr BAR; + +number: DIGIT+ (',' DIGIT DIGIT DIGIT)* ('.' DIGIT+)?; + +atom: (LETTER | SYMBOL) (subexpr? SINGLE_QUOTES? | SINGLE_QUOTES? subexpr?) + | number + | DIFFERENTIAL + | mathit + | frac + | binom + | bra + | ket; + +bra: L_ANGLE expr (R_BAR | BAR); +ket: (L_BAR | BAR) expr R_ANGLE; + +mathit: CMD_MATHIT L_BRACE mathit_text R_BRACE; +mathit_text: LETTER*; + +frac: CMD_FRAC (upperd = DIGIT | L_BRACE upper = expr R_BRACE) + (lowerd = DIGIT | L_BRACE lower = expr R_BRACE); + +binom: + (CMD_BINOM | CMD_DBINOM | CMD_TBINOM) L_BRACE n = expr R_BRACE L_BRACE k = expr R_BRACE; + +floor: L_FLOOR val = expr R_FLOOR; +ceil: L_CEIL val = expr R_CEIL; + +func_normal: + FUNC_EXP + | FUNC_LOG + | FUNC_LG + | FUNC_LN + | FUNC_SIN + | FUNC_COS + | FUNC_TAN + | FUNC_CSC + | FUNC_SEC + | FUNC_COT + | FUNC_ARCSIN + | FUNC_ARCCOS + | FUNC_ARCTAN + | FUNC_ARCCSC + | FUNC_ARCSEC + | FUNC_ARCCOT + | FUNC_SINH + | FUNC_COSH + | FUNC_TANH + | FUNC_ARSINH + | FUNC_ARCOSH + | FUNC_ARTANH; + +func: + func_normal (subexpr? supexpr? | supexpr? subexpr?) ( + L_PAREN func_arg R_PAREN + | func_arg_noparens + ) + | (LETTER | SYMBOL) (subexpr? SINGLE_QUOTES? | SINGLE_QUOTES? subexpr?) // e.g. f(x), f_1'(x) + L_PAREN args R_PAREN + | FUNC_INT (subexpr supexpr | supexpr subexpr)? ( + additive? DIFFERENTIAL + | frac + | additive + ) + | FUNC_SQRT (L_BRACKET root = expr R_BRACKET)? L_BRACE base = expr R_BRACE + | FUNC_OVERLINE L_BRACE base = expr R_BRACE + | (FUNC_SUM | FUNC_PROD) (subeq supexpr | supexpr subeq) mp + | FUNC_LIM limit_sub mp; + +args: (expr ',' args) | expr; + +limit_sub: + UNDERSCORE L_BRACE (LETTER | SYMBOL) LIM_APPROACH_SYM expr ( + CARET ((L_BRACE (ADD | SUB) R_BRACE) | ADD | SUB) + )? R_BRACE; + +func_arg: expr | (expr ',' func_arg); +func_arg_noparens: mp_nofunc; + +subexpr: UNDERSCORE (atom | L_BRACE expr R_BRACE); +supexpr: CARET (atom | L_BRACE expr R_BRACE); + +subeq: UNDERSCORE L_BRACE equality R_BRACE; +supeq: UNDERSCORE L_BRACE equality R_BRACE; diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..9466d37b8b06f1f292c73f975e44d21c96da10d1 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/__init__.py @@ -0,0 +1,204 @@ +from sympy.external import import_module +from sympy.utilities.decorator import doctest_depends_on +from re import compile as rcompile + +from sympy.parsing.latex.lark import LarkLaTeXParser, TransformToSymPyExpr, parse_latex_lark # noqa + +from .errors import LaTeXParsingError # noqa + + +IGNORE_L = r"\s*[{]*\s*" +IGNORE_R = r"\s*[}]*\s*" +NO_LEFT = r"(? len(latex_str): + e = len(latex_str) + eellipsis = "" + + if x[3] in END_DELIM_REPR: + err = (f"Extra '{x[2]}' at index {x[0]} or " + "missing corresponding " + f"'{BEGIN_DELIM_REPR[MATRIX_DELIMS_INV[x[3]]]}' " + f"in LaTeX string: {sellipsis}{latex_str[s:e]}" + f"{eellipsis}") + raise LaTeXParsingError(err) + + if x[7] is None: + err = (f"Extra '{x[2]}' at index {x[0]} or " + "missing corresponding " + f"'{END_DELIM_REPR[MATRIX_DELIMS[x[3]]]}' " + f"in LaTeX string: {sellipsis}{latex_str[s:e]}" + f"{eellipsis}") + raise LaTeXParsingError(err) + + correct_end_regex = MATRIX_DELIMS[x[3]] + sellipsis = "..." if x[0] > 0 else "" + eellipsis = "..." if x[5] < len(latex_str) else "" + if x[7] != correct_end_regex: + err = ("Expected " + f"'{END_DELIM_REPR[correct_end_regex]}' " + f"to close the '{x[2]}' at index {x[0]} but " + f"found '{x[6]}' at index {x[4]} of LaTeX " + f"string instead: {sellipsis}{latex_str[x[0]:x[5]]}" + f"{eellipsis}") + raise LaTeXParsingError(err) + +__doctest_requires__ = {('parse_latex',): ['antlr4', 'lark']} + + +@doctest_depends_on(modules=('antlr4', 'lark')) +def parse_latex(s, strict=False, backend="antlr"): + r"""Converts the input LaTeX string ``s`` to a SymPy ``Expr``. + + Parameters + ========== + + s : str + The LaTeX string to parse. In Python source containing LaTeX, + *raw strings* (denoted with ``r"``, like this one) are preferred, + as LaTeX makes liberal use of the ``\`` character, which would + trigger escaping in normal Python strings. + backend : str, optional + Currently, there are two backends supported: ANTLR, and Lark. + The default setting is to use the ANTLR backend, which can be + changed to Lark if preferred. + + Use ``backend="antlr"`` for the ANTLR-based parser, and + ``backend="lark"`` for the Lark-based parser. + + The ``backend`` option is case-sensitive, and must be in + all lowercase. + strict : bool, optional + This option is only available with the ANTLR backend. + + If True, raise an exception if the string cannot be parsed as + valid LaTeX. If False, try to recover gracefully from common + mistakes. + + Examples + ======== + + >>> from sympy.parsing.latex import parse_latex + >>> expr = parse_latex(r"\frac {1 + \sqrt {\a}} {\b}") + >>> expr + (sqrt(a) + 1)/b + >>> expr.evalf(4, subs=dict(a=5, b=2)) + 1.618 + >>> func = parse_latex(r"\int_1^\alpha \dfrac{\mathrm{d}t}{t}", backend="lark") + >>> func.evalf(subs={"alpha": 2}) + 0.693147180559945 + """ + + check_matrix_delimiters(s) + + if backend == "antlr": + _latex = import_module( + 'sympy.parsing.latex._parse_latex_antlr', + import_kwargs={'fromlist': ['X']}) + + if _latex is not None: + return _latex.parse_latex(s, strict) + elif backend == "lark": + return parse_latex_lark(s) + else: + raise NotImplementedError(f"Using the '{backend}' backend in the LaTeX" \ + " parser is not supported.") diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..2d690e1eb8631ee7731fc1875769d3a4704a1743 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/__init__.py @@ -0,0 +1,9 @@ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated from ../LaTeX.g4, derived from latex2sympy +# latex2sympy is licensed under the MIT license +# https://github.com/augustt198/latex2sympy/blob/master/LICENSE.txt +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/latexlexer.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/latexlexer.py new file mode 100644 index 0000000000000000000000000000000000000000..46ca959736c967782eef360b9b3268ccd0be0979 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/latexlexer.py @@ -0,0 +1,512 @@ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated from ../LaTeX.g4, derived from latex2sympy +# latex2sympy is licensed under the MIT license +# https://github.com/augustt198/latex2sympy/blob/master/LICENSE.txt +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt +from antlr4 import * +from io import StringIO +import sys +if sys.version_info[1] > 5: + from typing import TextIO +else: + from typing.io import TextIO + + +def serializedATN(): + return [ + 4,0,91,911,6,-1,2,0,7,0,2,1,7,1,2,2,7,2,2,3,7,3,2,4,7,4,2,5,7,5, + 2,6,7,6,2,7,7,7,2,8,7,8,2,9,7,9,2,10,7,10,2,11,7,11,2,12,7,12,2, + 13,7,13,2,14,7,14,2,15,7,15,2,16,7,16,2,17,7,17,2,18,7,18,2,19,7, + 19,2,20,7,20,2,21,7,21,2,22,7,22,2,23,7,23,2,24,7,24,2,25,7,25,2, + 26,7,26,2,27,7,27,2,28,7,28,2,29,7,29,2,30,7,30,2,31,7,31,2,32,7, + 32,2,33,7,33,2,34,7,34,2,35,7,35,2,36,7,36,2,37,7,37,2,38,7,38,2, + 39,7,39,2,40,7,40,2,41,7,41,2,42,7,42,2,43,7,43,2,44,7,44,2,45,7, + 45,2,46,7,46,2,47,7,47,2,48,7,48,2,49,7,49,2,50,7,50,2,51,7,51,2, + 52,7,52,2,53,7,53,2,54,7,54,2,55,7,55,2,56,7,56,2,57,7,57,2,58,7, + 58,2,59,7,59,2,60,7,60,2,61,7,61,2,62,7,62,2,63,7,63,2,64,7,64,2, + 65,7,65,2,66,7,66,2,67,7,67,2,68,7,68,2,69,7,69,2,70,7,70,2,71,7, + 71,2,72,7,72,2,73,7,73,2,74,7,74,2,75,7,75,2,76,7,76,2,77,7,77,2, + 78,7,78,2,79,7,79,2,80,7,80,2,81,7,81,2,82,7,82,2,83,7,83,2,84,7, + 84,2,85,7,85,2,86,7,86,2,87,7,87,2,88,7,88,2,89,7,89,2,90,7,90,2, + 91,7,91,1,0,1,0,1,1,1,1,1,2,4,2,191,8,2,11,2,12,2,192,1,2,1,2,1, + 3,1,3,1,3,1,3,1,3,1,3,1,3,1,3,1,3,1,3,1,3,1,3,3,3,209,8,3,1,3,1, + 3,1,4,1,4,1,4,1,4,1,4,1,4,1,4,1,4,1,4,1,4,1,4,3,4,224,8,4,1,4,1, + 4,1,5,1,5,1,5,1,5,1,5,1,5,1,5,1,5,1,5,1,5,1,5,1,5,1,5,3,5,241,8, + 5,1,5,1,5,1,6,1,6,1,6,1,6,1,6,1,6,1,6,1,6,1,7,1,7,1,7,1,7,1,7,1, + 7,1,7,1,7,1,7,1,8,1,8,1,8,1,8,1,8,1,8,1,8,1,8,1,8,1,8,1,8,1,8,1, + 8,1,8,1,8,3,8,277,8,8,1,8,1,8,1,9,1,9,1,9,1,9,1,9,1,9,1,9,1,9,1, + 9,1,9,1,9,1,9,1,9,1,9,1,9,1,10,1,10,1,10,1,10,1,10,1,10,1,10,1,10, + 1,10,1,10,1,10,1,10,1,10,1,10,1,10,1,10,1,10,1,11,1,11,1,11,1,11, + 1,11,1,11,1,11,1,11,1,12,1,12,1,12,1,12,1,12,1,12,1,12,1,12,1,12, + 1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13, + 1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13, + 1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13, + 1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,1,13,3,13, + 381,8,13,1,13,1,13,1,14,1,14,1,15,1,15,1,16,1,16,1,17,1,17,1,18, + 1,18,1,19,1,19,1,20,1,20,1,21,1,21,1,22,1,22,1,22,1,23,1,23,1,23, + 1,24,1,24,1,25,1,25,1,26,1,26,1,27,1,27,1,27,1,27,1,27,1,27,1,27, + 1,27,1,28,1,28,1,28,1,28,1,28,1,28,1,28,1,29,1,29,1,29,1,29,1,29, + 1,29,1,29,1,29,1,30,1,30,1,30,1,30,1,30,1,30,1,30,1,30,1,31,1,31, + 1,31,1,31,1,31,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32, + 1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32, + 1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32, + 1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32, + 1,32,1,32,1,32,1,32,1,32,1,32,3,32,504,8,32,1,33,1,33,1,33,1,33, + 1,33,1,33,1,33,1,33,1,33,1,33,1,33,1,33,1,33,1,33,1,33,3,33,521, + 8,33,1,34,1,34,1,34,1,34,1,34,1,35,1,35,1,35,1,35,1,35,1,35,1,36, + 1,36,1,36,1,36,1,36,1,37,1,37,1,37,1,37,1,37,1,38,1,38,1,38,1,38, + 1,39,1,39,1,39,1,39,1,40,1,40,1,40,1,40,1,40,1,41,1,41,1,41,1,41, + 1,41,1,42,1,42,1,42,1,42,1,42,1,43,1,43,1,43,1,43,1,43,1,44,1,44, + 1,44,1,44,1,44,1,45,1,45,1,45,1,45,1,45,1,46,1,46,1,46,1,46,1,46, + 1,46,1,46,1,46,1,47,1,47,1,47,1,47,1,47,1,47,1,47,1,47,1,48,1,48, + 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170,1,0,0,0,869,870,5,62,0,0,870,172,1,0,0,0,871,872,5,92,0,0,872, + 873,5,103,0,0,873,874,5,101,0,0,874,881,5,113,0,0,875,876,5,92,0, + 0,876,877,5,103,0,0,877,881,5,101,0,0,878,881,3,175,87,0,879,881, + 3,177,88,0,880,871,1,0,0,0,880,875,1,0,0,0,880,878,1,0,0,0,880,879, + 1,0,0,0,881,174,1,0,0,0,882,883,5,92,0,0,883,884,5,103,0,0,884,885, + 5,101,0,0,885,886,5,113,0,0,886,887,5,113,0,0,887,176,1,0,0,0,888, + 889,5,92,0,0,889,890,5,103,0,0,890,891,5,101,0,0,891,892,5,113,0, + 0,892,893,5,115,0,0,893,894,5,108,0,0,894,895,5,97,0,0,895,896,5, + 110,0,0,896,897,5,116,0,0,897,178,1,0,0,0,898,899,5,33,0,0,899,180, + 1,0,0,0,900,902,5,39,0,0,901,900,1,0,0,0,902,903,1,0,0,0,903,901, + 1,0,0,0,903,904,1,0,0,0,904,182,1,0,0,0,905,907,5,92,0,0,906,908, + 7,1,0,0,907,906,1,0,0,0,908,909,1,0,0,0,909,907,1,0,0,0,909,910, + 1,0,0,0,910,184,1,0,0,0,22,0,192,208,223,240,276,380,503,520,752, + 797,805,807,817,820,827,831,833,851,880,903,909,1,6,0,0 + ] + +class LaTeXLexer(Lexer): + + atn = ATNDeserializer().deserialize(serializedATN()) + + decisionsToDFA = [ DFA(ds, i) for i, ds in enumerate(atn.decisionToState) ] + + T__0 = 1 + T__1 = 2 + WS = 3 + THINSPACE = 4 + MEDSPACE = 5 + THICKSPACE = 6 + QUAD = 7 + QQUAD = 8 + NEGTHINSPACE = 9 + NEGMEDSPACE = 10 + NEGTHICKSPACE = 11 + CMD_LEFT = 12 + CMD_RIGHT = 13 + IGNORE = 14 + ADD = 15 + SUB = 16 + MUL = 17 + DIV = 18 + L_PAREN = 19 + R_PAREN = 20 + L_BRACE = 21 + R_BRACE = 22 + L_BRACE_LITERAL = 23 + R_BRACE_LITERAL = 24 + L_BRACKET = 25 + R_BRACKET = 26 + BAR = 27 + R_BAR = 28 + L_BAR = 29 + L_ANGLE = 30 + R_ANGLE = 31 + FUNC_LIM = 32 + LIM_APPROACH_SYM = 33 + FUNC_INT = 34 + FUNC_SUM = 35 + FUNC_PROD = 36 + FUNC_EXP = 37 + FUNC_LOG = 38 + FUNC_LG = 39 + FUNC_LN = 40 + FUNC_SIN = 41 + FUNC_COS = 42 + FUNC_TAN = 43 + FUNC_CSC = 44 + FUNC_SEC = 45 + FUNC_COT = 46 + FUNC_ARCSIN = 47 + FUNC_ARCCOS = 48 + FUNC_ARCTAN = 49 + FUNC_ARCCSC = 50 + FUNC_ARCSEC = 51 + FUNC_ARCCOT = 52 + FUNC_SINH = 53 + FUNC_COSH = 54 + FUNC_TANH = 55 + FUNC_ARSINH = 56 + FUNC_ARCOSH = 57 + FUNC_ARTANH = 58 + L_FLOOR = 59 + R_FLOOR = 60 + L_CEIL = 61 + R_CEIL = 62 + FUNC_SQRT = 63 + FUNC_OVERLINE = 64 + CMD_TIMES = 65 + CMD_CDOT = 66 + CMD_DIV = 67 + CMD_FRAC = 68 + CMD_BINOM = 69 + CMD_DBINOM = 70 + CMD_TBINOM = 71 + CMD_MATHIT = 72 + UNDERSCORE = 73 + CARET = 74 + COLON = 75 + DIFFERENTIAL = 76 + LETTER = 77 + DIGIT = 78 + EQUAL = 79 + NEQ = 80 + LT = 81 + LTE = 82 + LTE_Q = 83 + LTE_S = 84 + GT = 85 + GTE = 86 + GTE_Q = 87 + GTE_S = 88 + BANG = 89 + SINGLE_QUOTES = 90 + SYMBOL = 91 + + channelNames = [ u"DEFAULT_TOKEN_CHANNEL", u"HIDDEN" ] + + modeNames = [ "DEFAULT_MODE" ] + + literalNames = [ "", + "','", "'.'", "'\\quad'", "'\\qquad'", "'\\negmedspace'", "'\\negthickspace'", + "'\\left'", "'\\right'", "'+'", "'-'", "'*'", "'/'", "'('", + "')'", "'{'", "'}'", "'\\{'", "'\\}'", "'['", "']'", "'|'", + "'\\right|'", "'\\left|'", "'\\langle'", "'\\rangle'", "'\\lim'", + "'\\sum'", "'\\prod'", "'\\exp'", "'\\log'", "'\\lg'", "'\\ln'", + "'\\sin'", "'\\cos'", "'\\tan'", "'\\csc'", "'\\sec'", "'\\cot'", + "'\\arcsin'", "'\\arccos'", "'\\arctan'", "'\\arccsc'", "'\\arcsec'", + "'\\arccot'", "'\\sinh'", "'\\cosh'", "'\\tanh'", "'\\arsinh'", + "'\\arcosh'", "'\\artanh'", "'\\lfloor'", "'\\rfloor'", "'\\lceil'", + "'\\rceil'", "'\\sqrt'", "'\\overline'", "'\\times'", "'\\cdot'", + "'\\div'", "'\\binom'", "'\\dbinom'", "'\\tbinom'", "'\\mathit'", + "'_'", "'^'", "':'", "'\\neq'", "'<'", "'\\leqq'", "'\\leqslant'", + "'>'", "'\\geqq'", "'\\geqslant'", "'!'" ] + + symbolicNames = [ "", + "WS", "THINSPACE", "MEDSPACE", "THICKSPACE", "QUAD", "QQUAD", + "NEGTHINSPACE", "NEGMEDSPACE", "NEGTHICKSPACE", "CMD_LEFT", + "CMD_RIGHT", "IGNORE", "ADD", "SUB", "MUL", "DIV", "L_PAREN", + "R_PAREN", "L_BRACE", "R_BRACE", "L_BRACE_LITERAL", "R_BRACE_LITERAL", + "L_BRACKET", "R_BRACKET", "BAR", "R_BAR", "L_BAR", "L_ANGLE", + "R_ANGLE", "FUNC_LIM", "LIM_APPROACH_SYM", "FUNC_INT", "FUNC_SUM", + "FUNC_PROD", "FUNC_EXP", "FUNC_LOG", "FUNC_LG", "FUNC_LN", "FUNC_SIN", + "FUNC_COS", "FUNC_TAN", "FUNC_CSC", "FUNC_SEC", "FUNC_COT", + "FUNC_ARCSIN", "FUNC_ARCCOS", "FUNC_ARCTAN", "FUNC_ARCCSC", + "FUNC_ARCSEC", "FUNC_ARCCOT", "FUNC_SINH", "FUNC_COSH", "FUNC_TANH", + "FUNC_ARSINH", "FUNC_ARCOSH", "FUNC_ARTANH", "L_FLOOR", "R_FLOOR", + "L_CEIL", "R_CEIL", "FUNC_SQRT", "FUNC_OVERLINE", "CMD_TIMES", + "CMD_CDOT", "CMD_DIV", "CMD_FRAC", "CMD_BINOM", "CMD_DBINOM", + "CMD_TBINOM", "CMD_MATHIT", "UNDERSCORE", "CARET", "COLON", + "DIFFERENTIAL", "LETTER", "DIGIT", "EQUAL", "NEQ", "LT", "LTE", + "LTE_Q", "LTE_S", "GT", "GTE", "GTE_Q", "GTE_S", "BANG", "SINGLE_QUOTES", + "SYMBOL" ] + + ruleNames = [ "T__0", "T__1", "WS", "THINSPACE", "MEDSPACE", "THICKSPACE", + "QUAD", "QQUAD", "NEGTHINSPACE", "NEGMEDSPACE", "NEGTHICKSPACE", + "CMD_LEFT", "CMD_RIGHT", "IGNORE", "ADD", "SUB", "MUL", + "DIV", "L_PAREN", "R_PAREN", "L_BRACE", "R_BRACE", "L_BRACE_LITERAL", + "R_BRACE_LITERAL", "L_BRACKET", "R_BRACKET", "BAR", "R_BAR", + "L_BAR", "L_ANGLE", "R_ANGLE", "FUNC_LIM", "LIM_APPROACH_SYM", + "FUNC_INT", "FUNC_SUM", "FUNC_PROD", "FUNC_EXP", "FUNC_LOG", + "FUNC_LG", "FUNC_LN", "FUNC_SIN", "FUNC_COS", "FUNC_TAN", + "FUNC_CSC", "FUNC_SEC", "FUNC_COT", "FUNC_ARCSIN", "FUNC_ARCCOS", + "FUNC_ARCTAN", "FUNC_ARCCSC", "FUNC_ARCSEC", "FUNC_ARCCOT", + "FUNC_SINH", "FUNC_COSH", "FUNC_TANH", "FUNC_ARSINH", + "FUNC_ARCOSH", "FUNC_ARTANH", "L_FLOOR", "R_FLOOR", "L_CEIL", + "R_CEIL", "FUNC_SQRT", "FUNC_OVERLINE", "CMD_TIMES", "CMD_CDOT", + "CMD_DIV", "CMD_FRAC", "CMD_BINOM", "CMD_DBINOM", "CMD_TBINOM", + "CMD_MATHIT", "UNDERSCORE", "CARET", "COLON", "WS_CHAR", + "DIFFERENTIAL", "LETTER", "DIGIT", "EQUAL", "NEQ", "LT", + "LTE", "LTE_Q", "LTE_S", "GT", "GTE", "GTE_Q", "GTE_S", + "BANG", "SINGLE_QUOTES", "SYMBOL" ] + + grammarFileName = "LaTeX.g4" + + def __init__(self, input=None, output:TextIO = sys.stdout): + super().__init__(input, output) + self.checkVersion("4.11.1") + self._interp = LexerATNSimulator(self, self.atn, self.decisionsToDFA, PredictionContextCache()) + self._actions = None + self._predicates = None + + diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/latexparser.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/latexparser.py new file mode 100644 index 0000000000000000000000000000000000000000..f6f58119055ded8f77380bbef52c77ddd6a01cfe --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/_antlr/latexparser.py @@ -0,0 +1,3652 @@ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated from ../LaTeX.g4, derived from latex2sympy +# latex2sympy is licensed under the MIT license +# https://github.com/augustt198/latex2sympy/blob/master/LICENSE.txt +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt +from antlr4 import * +from io import StringIO +import sys +if sys.version_info[1] > 5: + from typing import TextIO +else: + from typing.io import TextIO + +def serializedATN(): + return [ + 4,1,91,522,2,0,7,0,2,1,7,1,2,2,7,2,2,3,7,3,2,4,7,4,2,5,7,5,2,6,7, + 6,2,7,7,7,2,8,7,8,2,9,7,9,2,10,7,10,2,11,7,11,2,12,7,12,2,13,7,13, + 2,14,7,14,2,15,7,15,2,16,7,16,2,17,7,17,2,18,7,18,2,19,7,19,2,20, + 7,20,2,21,7,21,2,22,7,22,2,23,7,23,2,24,7,24,2,25,7,25,2,26,7,26, + 2,27,7,27,2,28,7,28,2,29,7,29,2,30,7,30,2,31,7,31,2,32,7,32,2,33, + 7,33,2,34,7,34,2,35,7,35,2,36,7,36,2,37,7,37,2,38,7,38,2,39,7,39, + 2,40,7,40,1,0,1,0,1,1,1,1,1,1,1,1,1,1,1,1,5,1,91,8,1,10,1,12,1,94, + 9,1,1,2,1,2,1,2,1,2,1,3,1,3,1,4,1,4,1,4,1,4,1,4,1,4,5,4,108,8,4, + 10,4,12,4,111,9,4,1,5,1,5,1,5,1,5,1,5,1,5,5,5,119,8,5,10,5,12,5, + 122,9,5,1,6,1,6,1,6,1,6,1,6,1,6,5,6,130,8,6,10,6,12,6,133,9,6,1, + 7,1,7,1,7,4,7,138,8,7,11,7,12,7,139,3,7,142,8,7,1,8,1,8,1,8,1,8, + 5,8,148,8,8,10,8,12,8,151,9,8,3,8,153,8,8,1,9,1,9,5,9,157,8,9,10, + 9,12,9,160,9,9,1,10,1,10,5,10,164,8,10,10,10,12,10,167,9,10,1,11, + 1,11,3,11,171,8,11,1,12,1,12,1,12,1,12,1,12,1,12,3,12,179,8,12,1, + 13,1,13,1,13,1,13,3,13,185,8,13,1,13,1,13,1,14,1,14,1,14,1,14,3, + 14,193,8,14,1,14,1,14,1,15,1,15,1,15,1,15,1,15,1,15,1,15,1,15,1, + 15,1,15,3,15,207,8,15,1,15,3,15,210,8,15,5,15,212,8,15,10,15,12, + 15,215,9,15,1,16,1,16,1,16,1,16,1,16,1,16,1,16,1,16,1,16,1,16,3, + 16,227,8,16,1,16,3,16,230,8,16,5,16,232,8,16,10,16,12,16,235,9,16, + 1,17,1,17,1,17,1,17,1,17,1,17,3,17,243,8,17,1,18,1,18,1,18,1,18, + 1,18,3,18,250,8,18,1,19,1,19,1,19,1,19,1,19,1,19,1,19,1,19,1,19, + 1,19,1,19,1,19,1,19,1,19,1,19,1,19,3,19,268,8,19,1,20,1,20,1,20, + 1,20,1,21,4,21,275,8,21,11,21,12,21,276,1,21,1,21,1,21,1,21,5,21, + 283,8,21,10,21,12,21,286,9,21,1,21,1,21,4,21,290,8,21,11,21,12,21, + 291,3,21,294,8,21,1,22,1,22,3,22,298,8,22,1,22,3,22,301,8,22,1,22, + 3,22,304,8,22,1,22,3,22,307,8,22,3,22,309,8,22,1,22,1,22,1,22,1, + 22,1,22,1,22,1,22,3,22,318,8,22,1,23,1,23,1,23,1,23,1,24,1,24,1, + 24,1,24,1,25,1,25,1,25,1,25,1,25,1,26,5,26,334,8,26,10,26,12,26, + 337,9,26,1,27,1,27,1,27,1,27,1,27,1,27,3,27,345,8,27,1,27,1,27,1, + 27,1,27,1,27,3,27,352,8,27,1,28,1,28,1,28,1,28,1,28,1,28,1,28,1, + 28,1,29,1,29,1,29,1,29,1,30,1,30,1,30,1,30,1,31,1,31,1,32,1,32,3, + 32,374,8,32,1,32,3,32,377,8,32,1,32,3,32,380,8,32,1,32,3,32,383, + 8,32,3,32,385,8,32,1,32,1,32,1,32,1,32,1,32,3,32,392,8,32,1,32,1, + 32,3,32,396,8,32,1,32,3,32,399,8,32,1,32,3,32,402,8,32,1,32,3,32, + 405,8,32,3,32,407,8,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1, + 32,1,32,1,32,3,32,420,8,32,1,32,3,32,423,8,32,1,32,1,32,1,32,3,32, + 428,8,32,1,32,1,32,1,32,1,32,1,32,3,32,435,8,32,1,32,1,32,1,32,1, + 32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,1,32,3, + 32,453,8,32,1,32,1,32,1,32,1,32,1,32,1,32,3,32,461,8,32,1,33,1,33, + 1,33,1,33,1,33,3,33,468,8,33,1,34,1,34,1,34,1,34,1,34,1,34,1,34, + 1,34,1,34,1,34,1,34,3,34,481,8,34,3,34,483,8,34,1,34,1,34,1,35,1, + 35,1,35,1,35,1,35,3,35,492,8,35,1,36,1,36,1,37,1,37,1,37,1,37,1, + 37,1,37,3,37,502,8,37,1,38,1,38,1,38,1,38,1,38,1,38,3,38,510,8,38, + 1,39,1,39,1,39,1,39,1,39,1,40,1,40,1,40,1,40,1,40,1,40,0,6,2,8,10, + 12,30,32,41,0,2,4,6,8,10,12,14,16,18,20,22,24,26,28,30,32,34,36, + 38,40,42,44,46,48,50,52,54,56,58,60,62,64,66,68,70,72,74,76,78,80, + 0,9,2,0,79,82,85,86,1,0,15,16,3,0,17,18,65,67,75,75,2,0,77,77,91, + 91,1,0,27,28,2,0,27,27,29,29,1,0,69,71,1,0,37,58,1,0,35,36,563,0, + 82,1,0,0,0,2,84,1,0,0,0,4,95,1,0,0,0,6,99,1,0,0,0,8,101,1,0,0,0, + 10,112,1,0,0,0,12,123,1,0,0,0,14,141,1,0,0,0,16,152,1,0,0,0,18,154, + 1,0,0,0,20,161,1,0,0,0,22,170,1,0,0,0,24,172,1,0,0,0,26,180,1,0, + 0,0,28,188,1,0,0,0,30,196,1,0,0,0,32,216,1,0,0,0,34,242,1,0,0,0, + 36,249,1,0,0,0,38,267,1,0,0,0,40,269,1,0,0,0,42,274,1,0,0,0,44,317, + 1,0,0,0,46,319,1,0,0,0,48,323,1,0,0,0,50,327,1,0,0,0,52,335,1,0, + 0,0,54,338,1,0,0,0,56,353,1,0,0,0,58,361,1,0,0,0,60,365,1,0,0,0, + 62,369,1,0,0,0,64,460,1,0,0,0,66,467,1,0,0,0,68,469,1,0,0,0,70,491, + 1,0,0,0,72,493,1,0,0,0,74,495,1,0,0,0,76,503,1,0,0,0,78,511,1,0, + 0,0,80,516,1,0,0,0,82,83,3,2,1,0,83,1,1,0,0,0,84,85,6,1,-1,0,85, + 86,3,6,3,0,86,92,1,0,0,0,87,88,10,2,0,0,88,89,7,0,0,0,89,91,3,2, + 1,3,90,87,1,0,0,0,91,94,1,0,0,0,92,90,1,0,0,0,92,93,1,0,0,0,93,3, + 1,0,0,0,94,92,1,0,0,0,95,96,3,6,3,0,96,97,5,79,0,0,97,98,3,6,3,0, + 98,5,1,0,0,0,99,100,3,8,4,0,100,7,1,0,0,0,101,102,6,4,-1,0,102,103, + 3,10,5,0,103,109,1,0,0,0,104,105,10,2,0,0,105,106,7,1,0,0,106,108, + 3,8,4,3,107,104,1,0,0,0,108,111,1,0,0,0,109,107,1,0,0,0,109,110, + 1,0,0,0,110,9,1,0,0,0,111,109,1,0,0,0,112,113,6,5,-1,0,113,114,3, + 14,7,0,114,120,1,0,0,0,115,116,10,2,0,0,116,117,7,2,0,0,117,119, + 3,10,5,3,118,115,1,0,0,0,119,122,1,0,0,0,120,118,1,0,0,0,120,121, + 1,0,0,0,121,11,1,0,0,0,122,120,1,0,0,0,123,124,6,6,-1,0,124,125, + 3,16,8,0,125,131,1,0,0,0,126,127,10,2,0,0,127,128,7,2,0,0,128,130, + 3,12,6,3,129,126,1,0,0,0,130,133,1,0,0,0,131,129,1,0,0,0,131,132, + 1,0,0,0,132,13,1,0,0,0,133,131,1,0,0,0,134,135,7,1,0,0,135,142,3, + 14,7,0,136,138,3,18,9,0,137,136,1,0,0,0,138,139,1,0,0,0,139,137, + 1,0,0,0,139,140,1,0,0,0,140,142,1,0,0,0,141,134,1,0,0,0,141,137, + 1,0,0,0,142,15,1,0,0,0,143,144,7,1,0,0,144,153,3,16,8,0,145,149, + 3,18,9,0,146,148,3,20,10,0,147,146,1,0,0,0,148,151,1,0,0,0,149,147, + 1,0,0,0,149,150,1,0,0,0,150,153,1,0,0,0,151,149,1,0,0,0,152,143, + 1,0,0,0,152,145,1,0,0,0,153,17,1,0,0,0,154,158,3,30,15,0,155,157, + 3,22,11,0,156,155,1,0,0,0,157,160,1,0,0,0,158,156,1,0,0,0,158,159, + 1,0,0,0,159,19,1,0,0,0,160,158,1,0,0,0,161,165,3,32,16,0,162,164, + 3,22,11,0,163,162,1,0,0,0,164,167,1,0,0,0,165,163,1,0,0,0,165,166, + 1,0,0,0,166,21,1,0,0,0,167,165,1,0,0,0,168,171,5,89,0,0,169,171, + 3,24,12,0,170,168,1,0,0,0,170,169,1,0,0,0,171,23,1,0,0,0,172,178, + 5,27,0,0,173,179,3,28,14,0,174,179,3,26,13,0,175,176,3,28,14,0,176, + 177,3,26,13,0,177,179,1,0,0,0,178,173,1,0,0,0,178,174,1,0,0,0,178, + 175,1,0,0,0,179,25,1,0,0,0,180,181,5,73,0,0,181,184,5,21,0,0,182, + 185,3,6,3,0,183,185,3,4,2,0,184,182,1,0,0,0,184,183,1,0,0,0,185, + 186,1,0,0,0,186,187,5,22,0,0,187,27,1,0,0,0,188,189,5,74,0,0,189, + 192,5,21,0,0,190,193,3,6,3,0,191,193,3,4,2,0,192,190,1,0,0,0,192, + 191,1,0,0,0,193,194,1,0,0,0,194,195,5,22,0,0,195,29,1,0,0,0,196, + 197,6,15,-1,0,197,198,3,34,17,0,198,213,1,0,0,0,199,200,10,2,0,0, + 200,206,5,74,0,0,201,207,3,44,22,0,202,203,5,21,0,0,203,204,3,6, + 3,0,204,205,5,22,0,0,205,207,1,0,0,0,206,201,1,0,0,0,206,202,1,0, + 0,0,207,209,1,0,0,0,208,210,3,74,37,0,209,208,1,0,0,0,209,210,1, + 0,0,0,210,212,1,0,0,0,211,199,1,0,0,0,212,215,1,0,0,0,213,211,1, + 0,0,0,213,214,1,0,0,0,214,31,1,0,0,0,215,213,1,0,0,0,216,217,6,16, + -1,0,217,218,3,36,18,0,218,233,1,0,0,0,219,220,10,2,0,0,220,226, + 5,74,0,0,221,227,3,44,22,0,222,223,5,21,0,0,223,224,3,6,3,0,224, + 225,5,22,0,0,225,227,1,0,0,0,226,221,1,0,0,0,226,222,1,0,0,0,227, + 229,1,0,0,0,228,230,3,74,37,0,229,228,1,0,0,0,229,230,1,0,0,0,230, + 232,1,0,0,0,231,219,1,0,0,0,232,235,1,0,0,0,233,231,1,0,0,0,233, + 234,1,0,0,0,234,33,1,0,0,0,235,233,1,0,0,0,236,243,3,38,19,0,237, + 243,3,40,20,0,238,243,3,64,32,0,239,243,3,44,22,0,240,243,3,58,29, + 0,241,243,3,60,30,0,242,236,1,0,0,0,242,237,1,0,0,0,242,238,1,0, + 0,0,242,239,1,0,0,0,242,240,1,0,0,0,242,241,1,0,0,0,243,35,1,0,0, + 0,244,250,3,38,19,0,245,250,3,40,20,0,246,250,3,44,22,0,247,250, + 3,58,29,0,248,250,3,60,30,0,249,244,1,0,0,0,249,245,1,0,0,0,249, + 246,1,0,0,0,249,247,1,0,0,0,249,248,1,0,0,0,250,37,1,0,0,0,251,252, + 5,19,0,0,252,253,3,6,3,0,253,254,5,20,0,0,254,268,1,0,0,0,255,256, + 5,25,0,0,256,257,3,6,3,0,257,258,5,26,0,0,258,268,1,0,0,0,259,260, + 5,21,0,0,260,261,3,6,3,0,261,262,5,22,0,0,262,268,1,0,0,0,263,264, + 5,23,0,0,264,265,3,6,3,0,265,266,5,24,0,0,266,268,1,0,0,0,267,251, + 1,0,0,0,267,255,1,0,0,0,267,259,1,0,0,0,267,263,1,0,0,0,268,39,1, + 0,0,0,269,270,5,27,0,0,270,271,3,6,3,0,271,272,5,27,0,0,272,41,1, + 0,0,0,273,275,5,78,0,0,274,273,1,0,0,0,275,276,1,0,0,0,276,274,1, + 0,0,0,276,277,1,0,0,0,277,284,1,0,0,0,278,279,5,1,0,0,279,280,5, + 78,0,0,280,281,5,78,0,0,281,283,5,78,0,0,282,278,1,0,0,0,283,286, + 1,0,0,0,284,282,1,0,0,0,284,285,1,0,0,0,285,293,1,0,0,0,286,284, + 1,0,0,0,287,289,5,2,0,0,288,290,5,78,0,0,289,288,1,0,0,0,290,291, + 1,0,0,0,291,289,1,0,0,0,291,292,1,0,0,0,292,294,1,0,0,0,293,287, + 1,0,0,0,293,294,1,0,0,0,294,43,1,0,0,0,295,308,7,3,0,0,296,298,3, + 74,37,0,297,296,1,0,0,0,297,298,1,0,0,0,298,300,1,0,0,0,299,301, + 5,90,0,0,300,299,1,0,0,0,300,301,1,0,0,0,301,309,1,0,0,0,302,304, + 5,90,0,0,303,302,1,0,0,0,303,304,1,0,0,0,304,306,1,0,0,0,305,307, + 3,74,37,0,306,305,1,0,0,0,306,307,1,0,0,0,307,309,1,0,0,0,308,297, + 1,0,0,0,308,303,1,0,0,0,309,318,1,0,0,0,310,318,3,42,21,0,311,318, + 5,76,0,0,312,318,3,50,25,0,313,318,3,54,27,0,314,318,3,56,28,0,315, + 318,3,46,23,0,316,318,3,48,24,0,317,295,1,0,0,0,317,310,1,0,0,0, + 317,311,1,0,0,0,317,312,1,0,0,0,317,313,1,0,0,0,317,314,1,0,0,0, + 317,315,1,0,0,0,317,316,1,0,0,0,318,45,1,0,0,0,319,320,5,30,0,0, + 320,321,3,6,3,0,321,322,7,4,0,0,322,47,1,0,0,0,323,324,7,5,0,0,324, + 325,3,6,3,0,325,326,5,31,0,0,326,49,1,0,0,0,327,328,5,72,0,0,328, + 329,5,21,0,0,329,330,3,52,26,0,330,331,5,22,0,0,331,51,1,0,0,0,332, + 334,5,77,0,0,333,332,1,0,0,0,334,337,1,0,0,0,335,333,1,0,0,0,335, + 336,1,0,0,0,336,53,1,0,0,0,337,335,1,0,0,0,338,344,5,68,0,0,339, + 345,5,78,0,0,340,341,5,21,0,0,341,342,3,6,3,0,342,343,5,22,0,0,343, + 345,1,0,0,0,344,339,1,0,0,0,344,340,1,0,0,0,345,351,1,0,0,0,346, + 352,5,78,0,0,347,348,5,21,0,0,348,349,3,6,3,0,349,350,5,22,0,0,350, + 352,1,0,0,0,351,346,1,0,0,0,351,347,1,0,0,0,352,55,1,0,0,0,353,354, + 7,6,0,0,354,355,5,21,0,0,355,356,3,6,3,0,356,357,5,22,0,0,357,358, + 5,21,0,0,358,359,3,6,3,0,359,360,5,22,0,0,360,57,1,0,0,0,361,362, + 5,59,0,0,362,363,3,6,3,0,363,364,5,60,0,0,364,59,1,0,0,0,365,366, + 5,61,0,0,366,367,3,6,3,0,367,368,5,62,0,0,368,61,1,0,0,0,369,370, + 7,7,0,0,370,63,1,0,0,0,371,384,3,62,31,0,372,374,3,74,37,0,373,372, + 1,0,0,0,373,374,1,0,0,0,374,376,1,0,0,0,375,377,3,76,38,0,376,375, + 1,0,0,0,376,377,1,0,0,0,377,385,1,0,0,0,378,380,3,76,38,0,379,378, + 1,0,0,0,379,380,1,0,0,0,380,382,1,0,0,0,381,383,3,74,37,0,382,381, + 1,0,0,0,382,383,1,0,0,0,383,385,1,0,0,0,384,373,1,0,0,0,384,379, + 1,0,0,0,385,391,1,0,0,0,386,387,5,19,0,0,387,388,3,70,35,0,388,389, + 5,20,0,0,389,392,1,0,0,0,390,392,3,72,36,0,391,386,1,0,0,0,391,390, + 1,0,0,0,392,461,1,0,0,0,393,406,7,3,0,0,394,396,3,74,37,0,395,394, + 1,0,0,0,395,396,1,0,0,0,396,398,1,0,0,0,397,399,5,90,0,0,398,397, + 1,0,0,0,398,399,1,0,0,0,399,407,1,0,0,0,400,402,5,90,0,0,401,400, + 1,0,0,0,401,402,1,0,0,0,402,404,1,0,0,0,403,405,3,74,37,0,404,403, + 1,0,0,0,404,405,1,0,0,0,405,407,1,0,0,0,406,395,1,0,0,0,406,401, + 1,0,0,0,407,408,1,0,0,0,408,409,5,19,0,0,409,410,3,66,33,0,410,411, + 5,20,0,0,411,461,1,0,0,0,412,419,5,34,0,0,413,414,3,74,37,0,414, + 415,3,76,38,0,415,420,1,0,0,0,416,417,3,76,38,0,417,418,3,74,37, + 0,418,420,1,0,0,0,419,413,1,0,0,0,419,416,1,0,0,0,419,420,1,0,0, + 0,420,427,1,0,0,0,421,423,3,8,4,0,422,421,1,0,0,0,422,423,1,0,0, + 0,423,424,1,0,0,0,424,428,5,76,0,0,425,428,3,54,27,0,426,428,3,8, + 4,0,427,422,1,0,0,0,427,425,1,0,0,0,427,426,1,0,0,0,428,461,1,0, + 0,0,429,434,5,63,0,0,430,431,5,25,0,0,431,432,3,6,3,0,432,433,5, + 26,0,0,433,435,1,0,0,0,434,430,1,0,0,0,434,435,1,0,0,0,435,436,1, + 0,0,0,436,437,5,21,0,0,437,438,3,6,3,0,438,439,5,22,0,0,439,461, + 1,0,0,0,440,441,5,64,0,0,441,442,5,21,0,0,442,443,3,6,3,0,443,444, + 5,22,0,0,444,461,1,0,0,0,445,452,7,8,0,0,446,447,3,78,39,0,447,448, + 3,76,38,0,448,453,1,0,0,0,449,450,3,76,38,0,450,451,3,78,39,0,451, + 453,1,0,0,0,452,446,1,0,0,0,452,449,1,0,0,0,453,454,1,0,0,0,454, + 455,3,10,5,0,455,461,1,0,0,0,456,457,5,32,0,0,457,458,3,68,34,0, + 458,459,3,10,5,0,459,461,1,0,0,0,460,371,1,0,0,0,460,393,1,0,0,0, + 460,412,1,0,0,0,460,429,1,0,0,0,460,440,1,0,0,0,460,445,1,0,0,0, + 460,456,1,0,0,0,461,65,1,0,0,0,462,463,3,6,3,0,463,464,5,1,0,0,464, + 465,3,66,33,0,465,468,1,0,0,0,466,468,3,6,3,0,467,462,1,0,0,0,467, + 466,1,0,0,0,468,67,1,0,0,0,469,470,5,73,0,0,470,471,5,21,0,0,471, + 472,7,3,0,0,472,473,5,33,0,0,473,482,3,6,3,0,474,480,5,74,0,0,475, + 476,5,21,0,0,476,477,7,1,0,0,477,481,5,22,0,0,478,481,5,15,0,0,479, + 481,5,16,0,0,480,475,1,0,0,0,480,478,1,0,0,0,480,479,1,0,0,0,481, + 483,1,0,0,0,482,474,1,0,0,0,482,483,1,0,0,0,483,484,1,0,0,0,484, + 485,5,22,0,0,485,69,1,0,0,0,486,492,3,6,3,0,487,488,3,6,3,0,488, + 489,5,1,0,0,489,490,3,70,35,0,490,492,1,0,0,0,491,486,1,0,0,0,491, + 487,1,0,0,0,492,71,1,0,0,0,493,494,3,12,6,0,494,73,1,0,0,0,495,501, + 5,73,0,0,496,502,3,44,22,0,497,498,5,21,0,0,498,499,3,6,3,0,499, + 500,5,22,0,0,500,502,1,0,0,0,501,496,1,0,0,0,501,497,1,0,0,0,502, + 75,1,0,0,0,503,509,5,74,0,0,504,510,3,44,22,0,505,506,5,21,0,0,506, + 507,3,6,3,0,507,508,5,22,0,0,508,510,1,0,0,0,509,504,1,0,0,0,509, + 505,1,0,0,0,510,77,1,0,0,0,511,512,5,73,0,0,512,513,5,21,0,0,513, + 514,3,4,2,0,514,515,5,22,0,0,515,79,1,0,0,0,516,517,5,73,0,0,517, + 518,5,21,0,0,518,519,3,4,2,0,519,520,5,22,0,0,520,81,1,0,0,0,59, + 92,109,120,131,139,141,149,152,158,165,170,178,184,192,206,209,213, + 226,229,233,242,249,267,276,284,291,293,297,300,303,306,308,317, + 335,344,351,373,376,379,382,384,391,395,398,401,404,406,419,422, + 427,434,452,460,467,480,482,491,501,509 + ] + +class LaTeXParser ( Parser ): + + grammarFileName = "LaTeX.g4" + + atn = ATNDeserializer().deserialize(serializedATN()) + + decisionsToDFA = [ DFA(ds, i) for i, ds in enumerate(atn.decisionToState) ] + + sharedContextCache = PredictionContextCache() + + literalNames = [ "", "','", "'.'", "", "", + "", "", "'\\quad'", "'\\qquad'", + "", "'\\negmedspace'", "'\\negthickspace'", + "'\\left'", "'\\right'", "", "'+'", "'-'", + "'*'", "'/'", "'('", "')'", "'{'", "'}'", "'\\{'", + "'\\}'", "'['", "']'", "'|'", "'\\right|'", "'\\left|'", + "'\\langle'", "'\\rangle'", "'\\lim'", "", + "", "'\\sum'", "'\\prod'", "'\\exp'", "'\\log'", + "'\\lg'", "'\\ln'", "'\\sin'", "'\\cos'", "'\\tan'", + "'\\csc'", "'\\sec'", "'\\cot'", "'\\arcsin'", "'\\arccos'", + "'\\arctan'", "'\\arccsc'", "'\\arcsec'", "'\\arccot'", + "'\\sinh'", "'\\cosh'", "'\\tanh'", "'\\arsinh'", "'\\arcosh'", + "'\\artanh'", "'\\lfloor'", "'\\rfloor'", "'\\lceil'", + "'\\rceil'", "'\\sqrt'", "'\\overline'", "'\\times'", + "'\\cdot'", "'\\div'", "", "'\\binom'", "'\\dbinom'", + "'\\tbinom'", "'\\mathit'", "'_'", "'^'", "':'", "", + "", "", "", "'\\neq'", "'<'", + "", "'\\leqq'", "'\\leqslant'", "'>'", "", + "'\\geqq'", "'\\geqslant'", "'!'" ] + + symbolicNames = [ "", "", "", "WS", "THINSPACE", + "MEDSPACE", "THICKSPACE", "QUAD", "QQUAD", "NEGTHINSPACE", + "NEGMEDSPACE", "NEGTHICKSPACE", "CMD_LEFT", "CMD_RIGHT", + "IGNORE", "ADD", "SUB", "MUL", "DIV", "L_PAREN", "R_PAREN", + "L_BRACE", "R_BRACE", "L_BRACE_LITERAL", "R_BRACE_LITERAL", + "L_BRACKET", "R_BRACKET", "BAR", "R_BAR", "L_BAR", + "L_ANGLE", "R_ANGLE", "FUNC_LIM", "LIM_APPROACH_SYM", + "FUNC_INT", "FUNC_SUM", "FUNC_PROD", "FUNC_EXP", "FUNC_LOG", + "FUNC_LG", "FUNC_LN", "FUNC_SIN", "FUNC_COS", "FUNC_TAN", + "FUNC_CSC", "FUNC_SEC", "FUNC_COT", "FUNC_ARCSIN", + "FUNC_ARCCOS", "FUNC_ARCTAN", "FUNC_ARCCSC", "FUNC_ARCSEC", + "FUNC_ARCCOT", "FUNC_SINH", "FUNC_COSH", "FUNC_TANH", + "FUNC_ARSINH", "FUNC_ARCOSH", "FUNC_ARTANH", "L_FLOOR", + "R_FLOOR", "L_CEIL", "R_CEIL", "FUNC_SQRT", "FUNC_OVERLINE", + "CMD_TIMES", "CMD_CDOT", "CMD_DIV", "CMD_FRAC", "CMD_BINOM", + "CMD_DBINOM", "CMD_TBINOM", "CMD_MATHIT", "UNDERSCORE", + "CARET", "COLON", "DIFFERENTIAL", "LETTER", "DIGIT", + "EQUAL", "NEQ", "LT", "LTE", "LTE_Q", "LTE_S", "GT", + "GTE", "GTE_Q", "GTE_S", "BANG", "SINGLE_QUOTES", + "SYMBOL" ] + + RULE_math = 0 + RULE_relation = 1 + RULE_equality = 2 + RULE_expr = 3 + RULE_additive = 4 + RULE_mp = 5 + RULE_mp_nofunc = 6 + RULE_unary = 7 + RULE_unary_nofunc = 8 + RULE_postfix = 9 + RULE_postfix_nofunc = 10 + RULE_postfix_op = 11 + RULE_eval_at = 12 + RULE_eval_at_sub = 13 + RULE_eval_at_sup = 14 + RULE_exp = 15 + RULE_exp_nofunc = 16 + RULE_comp = 17 + RULE_comp_nofunc = 18 + RULE_group = 19 + RULE_abs_group = 20 + RULE_number = 21 + RULE_atom = 22 + RULE_bra = 23 + RULE_ket = 24 + RULE_mathit = 25 + RULE_mathit_text = 26 + RULE_frac = 27 + RULE_binom = 28 + RULE_floor = 29 + RULE_ceil = 30 + RULE_func_normal = 31 + RULE_func = 32 + RULE_args = 33 + RULE_limit_sub = 34 + RULE_func_arg = 35 + RULE_func_arg_noparens = 36 + RULE_subexpr = 37 + RULE_supexpr = 38 + RULE_subeq = 39 + RULE_supeq = 40 + + ruleNames = [ "math", "relation", "equality", "expr", "additive", "mp", + "mp_nofunc", "unary", "unary_nofunc", "postfix", "postfix_nofunc", + "postfix_op", "eval_at", "eval_at_sub", "eval_at_sup", + "exp", "exp_nofunc", "comp", "comp_nofunc", "group", + "abs_group", "number", "atom", "bra", "ket", "mathit", + "mathit_text", "frac", "binom", "floor", "ceil", "func_normal", + "func", "args", "limit_sub", "func_arg", "func_arg_noparens", + "subexpr", "supexpr", "subeq", "supeq" ] + + EOF = Token.EOF + T__0=1 + T__1=2 + WS=3 + THINSPACE=4 + MEDSPACE=5 + THICKSPACE=6 + QUAD=7 + QQUAD=8 + NEGTHINSPACE=9 + NEGMEDSPACE=10 + NEGTHICKSPACE=11 + CMD_LEFT=12 + CMD_RIGHT=13 + IGNORE=14 + ADD=15 + SUB=16 + MUL=17 + DIV=18 + L_PAREN=19 + R_PAREN=20 + L_BRACE=21 + R_BRACE=22 + L_BRACE_LITERAL=23 + R_BRACE_LITERAL=24 + L_BRACKET=25 + R_BRACKET=26 + BAR=27 + R_BAR=28 + L_BAR=29 + L_ANGLE=30 + R_ANGLE=31 + FUNC_LIM=32 + LIM_APPROACH_SYM=33 + FUNC_INT=34 + FUNC_SUM=35 + FUNC_PROD=36 + FUNC_EXP=37 + FUNC_LOG=38 + FUNC_LG=39 + FUNC_LN=40 + FUNC_SIN=41 + FUNC_COS=42 + FUNC_TAN=43 + FUNC_CSC=44 + FUNC_SEC=45 + FUNC_COT=46 + FUNC_ARCSIN=47 + FUNC_ARCCOS=48 + FUNC_ARCTAN=49 + FUNC_ARCCSC=50 + FUNC_ARCSEC=51 + FUNC_ARCCOT=52 + FUNC_SINH=53 + FUNC_COSH=54 + FUNC_TANH=55 + FUNC_ARSINH=56 + FUNC_ARCOSH=57 + FUNC_ARTANH=58 + L_FLOOR=59 + R_FLOOR=60 + L_CEIL=61 + R_CEIL=62 + FUNC_SQRT=63 + FUNC_OVERLINE=64 + CMD_TIMES=65 + CMD_CDOT=66 + CMD_DIV=67 + CMD_FRAC=68 + CMD_BINOM=69 + CMD_DBINOM=70 + CMD_TBINOM=71 + CMD_MATHIT=72 + UNDERSCORE=73 + CARET=74 + COLON=75 + DIFFERENTIAL=76 + LETTER=77 + DIGIT=78 + EQUAL=79 + NEQ=80 + LT=81 + LTE=82 + LTE_Q=83 + LTE_S=84 + GT=85 + GTE=86 + GTE_Q=87 + GTE_S=88 + BANG=89 + SINGLE_QUOTES=90 + SYMBOL=91 + + def __init__(self, input:TokenStream, output:TextIO = sys.stdout): + super().__init__(input, output) + self.checkVersion("4.11.1") + self._interp = ParserATNSimulator(self, self.atn, self.decisionsToDFA, self.sharedContextCache) + self._predicates = None + + + + + class MathContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def relation(self): + return self.getTypedRuleContext(LaTeXParser.RelationContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_math + + + + + def math(self): + + localctx = LaTeXParser.MathContext(self, self._ctx, self.state) + self.enterRule(localctx, 0, self.RULE_math) + try: + self.enterOuterAlt(localctx, 1) + self.state = 82 + self.relation(0) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class RelationContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def relation(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.RelationContext) + else: + return self.getTypedRuleContext(LaTeXParser.RelationContext,i) + + + def EQUAL(self): + return self.getToken(LaTeXParser.EQUAL, 0) + + def LT(self): + return self.getToken(LaTeXParser.LT, 0) + + def LTE(self): + return self.getToken(LaTeXParser.LTE, 0) + + def GT(self): + return self.getToken(LaTeXParser.GT, 0) + + def GTE(self): + return self.getToken(LaTeXParser.GTE, 0) + + def NEQ(self): + return self.getToken(LaTeXParser.NEQ, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_relation + + + + def relation(self, _p:int=0): + _parentctx = self._ctx + _parentState = self.state + localctx = LaTeXParser.RelationContext(self, self._ctx, _parentState) + _prevctx = localctx + _startState = 2 + self.enterRecursionRule(localctx, 2, self.RULE_relation, _p) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 85 + self.expr() + self._ctx.stop = self._input.LT(-1) + self.state = 92 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,0,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + if self._parseListeners is not None: + self.triggerExitRuleEvent() + _prevctx = localctx + localctx = LaTeXParser.RelationContext(self, _parentctx, _parentState) + self.pushNewRecursionContext(localctx, _startState, self.RULE_relation) + self.state = 87 + if not self.precpred(self._ctx, 2): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 2)") + self.state = 88 + _la = self._input.LA(1) + if not((((_la - 79)) & ~0x3f) == 0 and ((1 << (_la - 79)) & 207) != 0): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 89 + self.relation(3) + self.state = 94 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,0,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.unrollRecursionContexts(_parentctx) + return localctx + + + class EqualityContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.ExprContext) + else: + return self.getTypedRuleContext(LaTeXParser.ExprContext,i) + + + def EQUAL(self): + return self.getToken(LaTeXParser.EQUAL, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_equality + + + + + def equality(self): + + localctx = LaTeXParser.EqualityContext(self, self._ctx, self.state) + self.enterRule(localctx, 4, self.RULE_equality) + try: + self.enterOuterAlt(localctx, 1) + self.state = 95 + self.expr() + self.state = 96 + self.match(LaTeXParser.EQUAL) + self.state = 97 + self.expr() + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class ExprContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def additive(self): + return self.getTypedRuleContext(LaTeXParser.AdditiveContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_expr + + + + + def expr(self): + + localctx = LaTeXParser.ExprContext(self, self._ctx, self.state) + self.enterRule(localctx, 6, self.RULE_expr) + try: + self.enterOuterAlt(localctx, 1) + self.state = 99 + self.additive(0) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class AdditiveContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def mp(self): + return self.getTypedRuleContext(LaTeXParser.MpContext,0) + + + def additive(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.AdditiveContext) + else: + return self.getTypedRuleContext(LaTeXParser.AdditiveContext,i) + + + def ADD(self): + return self.getToken(LaTeXParser.ADD, 0) + + def SUB(self): + return self.getToken(LaTeXParser.SUB, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_additive + + + + def additive(self, _p:int=0): + _parentctx = self._ctx + _parentState = self.state + localctx = LaTeXParser.AdditiveContext(self, self._ctx, _parentState) + _prevctx = localctx + _startState = 8 + self.enterRecursionRule(localctx, 8, self.RULE_additive, _p) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 102 + self.mp(0) + self._ctx.stop = self._input.LT(-1) + self.state = 109 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,1,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + if self._parseListeners is not None: + self.triggerExitRuleEvent() + _prevctx = localctx + localctx = LaTeXParser.AdditiveContext(self, _parentctx, _parentState) + self.pushNewRecursionContext(localctx, _startState, self.RULE_additive) + self.state = 104 + if not self.precpred(self._ctx, 2): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 2)") + self.state = 105 + _la = self._input.LA(1) + if not(_la==15 or _la==16): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 106 + self.additive(3) + self.state = 111 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,1,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.unrollRecursionContexts(_parentctx) + return localctx + + + class MpContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def unary(self): + return self.getTypedRuleContext(LaTeXParser.UnaryContext,0) + + + def mp(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.MpContext) + else: + return self.getTypedRuleContext(LaTeXParser.MpContext,i) + + + def MUL(self): + return self.getToken(LaTeXParser.MUL, 0) + + def CMD_TIMES(self): + return self.getToken(LaTeXParser.CMD_TIMES, 0) + + def CMD_CDOT(self): + return self.getToken(LaTeXParser.CMD_CDOT, 0) + + def DIV(self): + return self.getToken(LaTeXParser.DIV, 0) + + def CMD_DIV(self): + return self.getToken(LaTeXParser.CMD_DIV, 0) + + def COLON(self): + return self.getToken(LaTeXParser.COLON, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_mp + + + + def mp(self, _p:int=0): + _parentctx = self._ctx + _parentState = self.state + localctx = LaTeXParser.MpContext(self, self._ctx, _parentState) + _prevctx = localctx + _startState = 10 + self.enterRecursionRule(localctx, 10, self.RULE_mp, _p) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 113 + self.unary() + self._ctx.stop = self._input.LT(-1) + self.state = 120 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,2,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + if self._parseListeners is not None: + self.triggerExitRuleEvent() + _prevctx = localctx + localctx = LaTeXParser.MpContext(self, _parentctx, _parentState) + self.pushNewRecursionContext(localctx, _startState, self.RULE_mp) + self.state = 115 + if not self.precpred(self._ctx, 2): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 2)") + self.state = 116 + _la = self._input.LA(1) + if not((((_la - 17)) & ~0x3f) == 0 and ((1 << (_la - 17)) & 290200700988686339) != 0): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 117 + self.mp(3) + self.state = 122 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,2,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.unrollRecursionContexts(_parentctx) + return localctx + + + class Mp_nofuncContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def unary_nofunc(self): + return self.getTypedRuleContext(LaTeXParser.Unary_nofuncContext,0) + + + def mp_nofunc(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.Mp_nofuncContext) + else: + return self.getTypedRuleContext(LaTeXParser.Mp_nofuncContext,i) + + + def MUL(self): + return self.getToken(LaTeXParser.MUL, 0) + + def CMD_TIMES(self): + return self.getToken(LaTeXParser.CMD_TIMES, 0) + + def CMD_CDOT(self): + return self.getToken(LaTeXParser.CMD_CDOT, 0) + + def DIV(self): + return self.getToken(LaTeXParser.DIV, 0) + + def CMD_DIV(self): + return self.getToken(LaTeXParser.CMD_DIV, 0) + + def COLON(self): + return self.getToken(LaTeXParser.COLON, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_mp_nofunc + + + + def mp_nofunc(self, _p:int=0): + _parentctx = self._ctx + _parentState = self.state + localctx = LaTeXParser.Mp_nofuncContext(self, self._ctx, _parentState) + _prevctx = localctx + _startState = 12 + self.enterRecursionRule(localctx, 12, self.RULE_mp_nofunc, _p) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 124 + self.unary_nofunc() + self._ctx.stop = self._input.LT(-1) + self.state = 131 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,3,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + if self._parseListeners is not None: + self.triggerExitRuleEvent() + _prevctx = localctx + localctx = LaTeXParser.Mp_nofuncContext(self, _parentctx, _parentState) + self.pushNewRecursionContext(localctx, _startState, self.RULE_mp_nofunc) + self.state = 126 + if not self.precpred(self._ctx, 2): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 2)") + self.state = 127 + _la = self._input.LA(1) + if not((((_la - 17)) & ~0x3f) == 0 and ((1 << (_la - 17)) & 290200700988686339) != 0): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 128 + self.mp_nofunc(3) + self.state = 133 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,3,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.unrollRecursionContexts(_parentctx) + return localctx + + + class UnaryContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def unary(self): + return self.getTypedRuleContext(LaTeXParser.UnaryContext,0) + + + def ADD(self): + return self.getToken(LaTeXParser.ADD, 0) + + def SUB(self): + return self.getToken(LaTeXParser.SUB, 0) + + def postfix(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.PostfixContext) + else: + return self.getTypedRuleContext(LaTeXParser.PostfixContext,i) + + + def getRuleIndex(self): + return LaTeXParser.RULE_unary + + + + + def unary(self): + + localctx = LaTeXParser.UnaryContext(self, self._ctx, self.state) + self.enterRule(localctx, 14, self.RULE_unary) + self._la = 0 # Token type + try: + self.state = 141 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [15, 16]: + self.enterOuterAlt(localctx, 1) + self.state = 134 + _la = self._input.LA(1) + if not(_la==15 or _la==16): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 135 + self.unary() + pass + elif token in [19, 21, 23, 25, 27, 29, 30, 32, 34, 35, 36, 37, 38, 39, 40, 41, 42, 43, 44, 45, 46, 47, 48, 49, 50, 51, 52, 53, 54, 55, 56, 57, 58, 59, 61, 63, 64, 68, 69, 70, 71, 72, 76, 77, 78, 91]: + self.enterOuterAlt(localctx, 2) + self.state = 137 + self._errHandler.sync(self) + _alt = 1 + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt == 1: + self.state = 136 + self.postfix() + + else: + raise NoViableAltException(self) + self.state = 139 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,4,self._ctx) + + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Unary_nofuncContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def unary_nofunc(self): + return self.getTypedRuleContext(LaTeXParser.Unary_nofuncContext,0) + + + def ADD(self): + return self.getToken(LaTeXParser.ADD, 0) + + def SUB(self): + return self.getToken(LaTeXParser.SUB, 0) + + def postfix(self): + return self.getTypedRuleContext(LaTeXParser.PostfixContext,0) + + + def postfix_nofunc(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.Postfix_nofuncContext) + else: + return self.getTypedRuleContext(LaTeXParser.Postfix_nofuncContext,i) + + + def getRuleIndex(self): + return LaTeXParser.RULE_unary_nofunc + + + + + def unary_nofunc(self): + + localctx = LaTeXParser.Unary_nofuncContext(self, self._ctx, self.state) + self.enterRule(localctx, 16, self.RULE_unary_nofunc) + self._la = 0 # Token type + try: + self.state = 152 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [15, 16]: + self.enterOuterAlt(localctx, 1) + self.state = 143 + _la = self._input.LA(1) + if not(_la==15 or _la==16): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 144 + self.unary_nofunc() + pass + elif token in [19, 21, 23, 25, 27, 29, 30, 32, 34, 35, 36, 37, 38, 39, 40, 41, 42, 43, 44, 45, 46, 47, 48, 49, 50, 51, 52, 53, 54, 55, 56, 57, 58, 59, 61, 63, 64, 68, 69, 70, 71, 72, 76, 77, 78, 91]: + self.enterOuterAlt(localctx, 2) + self.state = 145 + self.postfix() + self.state = 149 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,6,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + self.state = 146 + self.postfix_nofunc() + self.state = 151 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,6,self._ctx) + + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class PostfixContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def exp(self): + return self.getTypedRuleContext(LaTeXParser.ExpContext,0) + + + def postfix_op(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.Postfix_opContext) + else: + return self.getTypedRuleContext(LaTeXParser.Postfix_opContext,i) + + + def getRuleIndex(self): + return LaTeXParser.RULE_postfix + + + + + def postfix(self): + + localctx = LaTeXParser.PostfixContext(self, self._ctx, self.state) + self.enterRule(localctx, 18, self.RULE_postfix) + try: + self.enterOuterAlt(localctx, 1) + self.state = 154 + self.exp(0) + self.state = 158 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,8,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + self.state = 155 + self.postfix_op() + self.state = 160 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,8,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Postfix_nofuncContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def exp_nofunc(self): + return self.getTypedRuleContext(LaTeXParser.Exp_nofuncContext,0) + + + def postfix_op(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.Postfix_opContext) + else: + return self.getTypedRuleContext(LaTeXParser.Postfix_opContext,i) + + + def getRuleIndex(self): + return LaTeXParser.RULE_postfix_nofunc + + + + + def postfix_nofunc(self): + + localctx = LaTeXParser.Postfix_nofuncContext(self, self._ctx, self.state) + self.enterRule(localctx, 20, self.RULE_postfix_nofunc) + try: + self.enterOuterAlt(localctx, 1) + self.state = 161 + self.exp_nofunc(0) + self.state = 165 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,9,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + self.state = 162 + self.postfix_op() + self.state = 167 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,9,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Postfix_opContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def BANG(self): + return self.getToken(LaTeXParser.BANG, 0) + + def eval_at(self): + return self.getTypedRuleContext(LaTeXParser.Eval_atContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_postfix_op + + + + + def postfix_op(self): + + localctx = LaTeXParser.Postfix_opContext(self, self._ctx, self.state) + self.enterRule(localctx, 22, self.RULE_postfix_op) + try: + self.state = 170 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [89]: + self.enterOuterAlt(localctx, 1) + self.state = 168 + self.match(LaTeXParser.BANG) + pass + elif token in [27]: + self.enterOuterAlt(localctx, 2) + self.state = 169 + self.eval_at() + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Eval_atContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def BAR(self): + return self.getToken(LaTeXParser.BAR, 0) + + def eval_at_sup(self): + return self.getTypedRuleContext(LaTeXParser.Eval_at_supContext,0) + + + def eval_at_sub(self): + return self.getTypedRuleContext(LaTeXParser.Eval_at_subContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_eval_at + + + + + def eval_at(self): + + localctx = LaTeXParser.Eval_atContext(self, self._ctx, self.state) + self.enterRule(localctx, 24, self.RULE_eval_at) + try: + self.enterOuterAlt(localctx, 1) + self.state = 172 + self.match(LaTeXParser.BAR) + self.state = 178 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,11,self._ctx) + if la_ == 1: + self.state = 173 + self.eval_at_sup() + pass + + elif la_ == 2: + self.state = 174 + self.eval_at_sub() + pass + + elif la_ == 3: + self.state = 175 + self.eval_at_sup() + self.state = 176 + self.eval_at_sub() + pass + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Eval_at_subContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def UNDERSCORE(self): + return self.getToken(LaTeXParser.UNDERSCORE, 0) + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def equality(self): + return self.getTypedRuleContext(LaTeXParser.EqualityContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_eval_at_sub + + + + + def eval_at_sub(self): + + localctx = LaTeXParser.Eval_at_subContext(self, self._ctx, self.state) + self.enterRule(localctx, 26, self.RULE_eval_at_sub) + try: + self.enterOuterAlt(localctx, 1) + self.state = 180 + self.match(LaTeXParser.UNDERSCORE) + self.state = 181 + self.match(LaTeXParser.L_BRACE) + self.state = 184 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,12,self._ctx) + if la_ == 1: + self.state = 182 + self.expr() + pass + + elif la_ == 2: + self.state = 183 + self.equality() + pass + + + self.state = 186 + self.match(LaTeXParser.R_BRACE) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Eval_at_supContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def CARET(self): + return self.getToken(LaTeXParser.CARET, 0) + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def equality(self): + return self.getTypedRuleContext(LaTeXParser.EqualityContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_eval_at_sup + + + + + def eval_at_sup(self): + + localctx = LaTeXParser.Eval_at_supContext(self, self._ctx, self.state) + self.enterRule(localctx, 28, self.RULE_eval_at_sup) + try: + self.enterOuterAlt(localctx, 1) + self.state = 188 + self.match(LaTeXParser.CARET) + self.state = 189 + self.match(LaTeXParser.L_BRACE) + self.state = 192 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,13,self._ctx) + if la_ == 1: + self.state = 190 + self.expr() + pass + + elif la_ == 2: + self.state = 191 + self.equality() + pass + + + self.state = 194 + self.match(LaTeXParser.R_BRACE) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class ExpContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def comp(self): + return self.getTypedRuleContext(LaTeXParser.CompContext,0) + + + def exp(self): + return self.getTypedRuleContext(LaTeXParser.ExpContext,0) + + + def CARET(self): + return self.getToken(LaTeXParser.CARET, 0) + + def atom(self): + return self.getTypedRuleContext(LaTeXParser.AtomContext,0) + + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def subexpr(self): + return self.getTypedRuleContext(LaTeXParser.SubexprContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_exp + + + + def exp(self, _p:int=0): + _parentctx = self._ctx + _parentState = self.state + localctx = LaTeXParser.ExpContext(self, self._ctx, _parentState) + _prevctx = localctx + _startState = 30 + self.enterRecursionRule(localctx, 30, self.RULE_exp, _p) + try: + self.enterOuterAlt(localctx, 1) + self.state = 197 + self.comp() + self._ctx.stop = self._input.LT(-1) + self.state = 213 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,16,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + if self._parseListeners is not None: + self.triggerExitRuleEvent() + _prevctx = localctx + localctx = LaTeXParser.ExpContext(self, _parentctx, _parentState) + self.pushNewRecursionContext(localctx, _startState, self.RULE_exp) + self.state = 199 + if not self.precpred(self._ctx, 2): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 2)") + self.state = 200 + self.match(LaTeXParser.CARET) + self.state = 206 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [27, 29, 30, 68, 69, 70, 71, 72, 76, 77, 78, 91]: + self.state = 201 + self.atom() + pass + elif token in [21]: + self.state = 202 + self.match(LaTeXParser.L_BRACE) + self.state = 203 + self.expr() + self.state = 204 + self.match(LaTeXParser.R_BRACE) + pass + else: + raise NoViableAltException(self) + + self.state = 209 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,15,self._ctx) + if la_ == 1: + self.state = 208 + self.subexpr() + + + self.state = 215 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,16,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.unrollRecursionContexts(_parentctx) + return localctx + + + class Exp_nofuncContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def comp_nofunc(self): + return self.getTypedRuleContext(LaTeXParser.Comp_nofuncContext,0) + + + def exp_nofunc(self): + return self.getTypedRuleContext(LaTeXParser.Exp_nofuncContext,0) + + + def CARET(self): + return self.getToken(LaTeXParser.CARET, 0) + + def atom(self): + return self.getTypedRuleContext(LaTeXParser.AtomContext,0) + + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def subexpr(self): + return self.getTypedRuleContext(LaTeXParser.SubexprContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_exp_nofunc + + + + def exp_nofunc(self, _p:int=0): + _parentctx = self._ctx + _parentState = self.state + localctx = LaTeXParser.Exp_nofuncContext(self, self._ctx, _parentState) + _prevctx = localctx + _startState = 32 + self.enterRecursionRule(localctx, 32, self.RULE_exp_nofunc, _p) + try: + self.enterOuterAlt(localctx, 1) + self.state = 217 + self.comp_nofunc() + self._ctx.stop = self._input.LT(-1) + self.state = 233 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,19,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + if self._parseListeners is not None: + self.triggerExitRuleEvent() + _prevctx = localctx + localctx = LaTeXParser.Exp_nofuncContext(self, _parentctx, _parentState) + self.pushNewRecursionContext(localctx, _startState, self.RULE_exp_nofunc) + self.state = 219 + if not self.precpred(self._ctx, 2): + from antlr4.error.Errors import FailedPredicateException + raise FailedPredicateException(self, "self.precpred(self._ctx, 2)") + self.state = 220 + self.match(LaTeXParser.CARET) + self.state = 226 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [27, 29, 30, 68, 69, 70, 71, 72, 76, 77, 78, 91]: + self.state = 221 + self.atom() + pass + elif token in [21]: + self.state = 222 + self.match(LaTeXParser.L_BRACE) + self.state = 223 + self.expr() + self.state = 224 + self.match(LaTeXParser.R_BRACE) + pass + else: + raise NoViableAltException(self) + + self.state = 229 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,18,self._ctx) + if la_ == 1: + self.state = 228 + self.subexpr() + + + self.state = 235 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,19,self._ctx) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.unrollRecursionContexts(_parentctx) + return localctx + + + class CompContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def group(self): + return self.getTypedRuleContext(LaTeXParser.GroupContext,0) + + + def abs_group(self): + return self.getTypedRuleContext(LaTeXParser.Abs_groupContext,0) + + + def func(self): + return self.getTypedRuleContext(LaTeXParser.FuncContext,0) + + + def atom(self): + return self.getTypedRuleContext(LaTeXParser.AtomContext,0) + + + def floor(self): + return self.getTypedRuleContext(LaTeXParser.FloorContext,0) + + + def ceil(self): + return self.getTypedRuleContext(LaTeXParser.CeilContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_comp + + + + + def comp(self): + + localctx = LaTeXParser.CompContext(self, self._ctx, self.state) + self.enterRule(localctx, 34, self.RULE_comp) + try: + self.state = 242 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,20,self._ctx) + if la_ == 1: + self.enterOuterAlt(localctx, 1) + self.state = 236 + self.group() + pass + + elif la_ == 2: + self.enterOuterAlt(localctx, 2) + self.state = 237 + self.abs_group() + pass + + elif la_ == 3: + self.enterOuterAlt(localctx, 3) + self.state = 238 + self.func() + pass + + elif la_ == 4: + self.enterOuterAlt(localctx, 4) + self.state = 239 + self.atom() + pass + + elif la_ == 5: + self.enterOuterAlt(localctx, 5) + self.state = 240 + self.floor() + pass + + elif la_ == 6: + self.enterOuterAlt(localctx, 6) + self.state = 241 + self.ceil() + pass + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Comp_nofuncContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def group(self): + return self.getTypedRuleContext(LaTeXParser.GroupContext,0) + + + def abs_group(self): + return self.getTypedRuleContext(LaTeXParser.Abs_groupContext,0) + + + def atom(self): + return self.getTypedRuleContext(LaTeXParser.AtomContext,0) + + + def floor(self): + return self.getTypedRuleContext(LaTeXParser.FloorContext,0) + + + def ceil(self): + return self.getTypedRuleContext(LaTeXParser.CeilContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_comp_nofunc + + + + + def comp_nofunc(self): + + localctx = LaTeXParser.Comp_nofuncContext(self, self._ctx, self.state) + self.enterRule(localctx, 36, self.RULE_comp_nofunc) + try: + self.state = 249 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,21,self._ctx) + if la_ == 1: + self.enterOuterAlt(localctx, 1) + self.state = 244 + self.group() + pass + + elif la_ == 2: + self.enterOuterAlt(localctx, 2) + self.state = 245 + self.abs_group() + pass + + elif la_ == 3: + self.enterOuterAlt(localctx, 3) + self.state = 246 + self.atom() + pass + + elif la_ == 4: + self.enterOuterAlt(localctx, 4) + self.state = 247 + self.floor() + pass + + elif la_ == 5: + self.enterOuterAlt(localctx, 5) + self.state = 248 + self.ceil() + pass + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class GroupContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def L_PAREN(self): + return self.getToken(LaTeXParser.L_PAREN, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def R_PAREN(self): + return self.getToken(LaTeXParser.R_PAREN, 0) + + def L_BRACKET(self): + return self.getToken(LaTeXParser.L_BRACKET, 0) + + def R_BRACKET(self): + return self.getToken(LaTeXParser.R_BRACKET, 0) + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def L_BRACE_LITERAL(self): + return self.getToken(LaTeXParser.L_BRACE_LITERAL, 0) + + def R_BRACE_LITERAL(self): + return self.getToken(LaTeXParser.R_BRACE_LITERAL, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_group + + + + + def group(self): + + localctx = LaTeXParser.GroupContext(self, self._ctx, self.state) + self.enterRule(localctx, 38, self.RULE_group) + try: + self.state = 267 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [19]: + self.enterOuterAlt(localctx, 1) + self.state = 251 + self.match(LaTeXParser.L_PAREN) + self.state = 252 + self.expr() + self.state = 253 + self.match(LaTeXParser.R_PAREN) + pass + elif token in [25]: + self.enterOuterAlt(localctx, 2) + self.state = 255 + self.match(LaTeXParser.L_BRACKET) + self.state = 256 + self.expr() + self.state = 257 + self.match(LaTeXParser.R_BRACKET) + pass + elif token in [21]: + self.enterOuterAlt(localctx, 3) + self.state = 259 + self.match(LaTeXParser.L_BRACE) + self.state = 260 + self.expr() + self.state = 261 + self.match(LaTeXParser.R_BRACE) + pass + elif token in [23]: + self.enterOuterAlt(localctx, 4) + self.state = 263 + self.match(LaTeXParser.L_BRACE_LITERAL) + self.state = 264 + self.expr() + self.state = 265 + self.match(LaTeXParser.R_BRACE_LITERAL) + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Abs_groupContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def BAR(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.BAR) + else: + return self.getToken(LaTeXParser.BAR, i) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_abs_group + + + + + def abs_group(self): + + localctx = LaTeXParser.Abs_groupContext(self, self._ctx, self.state) + self.enterRule(localctx, 40, self.RULE_abs_group) + try: + self.enterOuterAlt(localctx, 1) + self.state = 269 + self.match(LaTeXParser.BAR) + self.state = 270 + self.expr() + self.state = 271 + self.match(LaTeXParser.BAR) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class NumberContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def DIGIT(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.DIGIT) + else: + return self.getToken(LaTeXParser.DIGIT, i) + + def getRuleIndex(self): + return LaTeXParser.RULE_number + + + + + def number(self): + + localctx = LaTeXParser.NumberContext(self, self._ctx, self.state) + self.enterRule(localctx, 42, self.RULE_number) + try: + self.enterOuterAlt(localctx, 1) + self.state = 274 + self._errHandler.sync(self) + _alt = 1 + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt == 1: + self.state = 273 + self.match(LaTeXParser.DIGIT) + + else: + raise NoViableAltException(self) + self.state = 276 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,23,self._ctx) + + self.state = 284 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,24,self._ctx) + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt==1: + self.state = 278 + self.match(LaTeXParser.T__0) + self.state = 279 + self.match(LaTeXParser.DIGIT) + self.state = 280 + self.match(LaTeXParser.DIGIT) + self.state = 281 + self.match(LaTeXParser.DIGIT) + self.state = 286 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,24,self._ctx) + + self.state = 293 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,26,self._ctx) + if la_ == 1: + self.state = 287 + self.match(LaTeXParser.T__1) + self.state = 289 + self._errHandler.sync(self) + _alt = 1 + while _alt!=2 and _alt!=ATN.INVALID_ALT_NUMBER: + if _alt == 1: + self.state = 288 + self.match(LaTeXParser.DIGIT) + + else: + raise NoViableAltException(self) + self.state = 291 + self._errHandler.sync(self) + _alt = self._interp.adaptivePredict(self._input,25,self._ctx) + + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class AtomContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def LETTER(self): + return self.getToken(LaTeXParser.LETTER, 0) + + def SYMBOL(self): + return self.getToken(LaTeXParser.SYMBOL, 0) + + def subexpr(self): + return self.getTypedRuleContext(LaTeXParser.SubexprContext,0) + + + def SINGLE_QUOTES(self): + return self.getToken(LaTeXParser.SINGLE_QUOTES, 0) + + def number(self): + return self.getTypedRuleContext(LaTeXParser.NumberContext,0) + + + def DIFFERENTIAL(self): + return self.getToken(LaTeXParser.DIFFERENTIAL, 0) + + def mathit(self): + return self.getTypedRuleContext(LaTeXParser.MathitContext,0) + + + def frac(self): + return self.getTypedRuleContext(LaTeXParser.FracContext,0) + + + def binom(self): + return self.getTypedRuleContext(LaTeXParser.BinomContext,0) + + + def bra(self): + return self.getTypedRuleContext(LaTeXParser.BraContext,0) + + + def ket(self): + return self.getTypedRuleContext(LaTeXParser.KetContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_atom + + + + + def atom(self): + + localctx = LaTeXParser.AtomContext(self, self._ctx, self.state) + self.enterRule(localctx, 44, self.RULE_atom) + self._la = 0 # Token type + try: + self.state = 317 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [77, 91]: + self.enterOuterAlt(localctx, 1) + self.state = 295 + _la = self._input.LA(1) + if not(_la==77 or _la==91): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 308 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,31,self._ctx) + if la_ == 1: + self.state = 297 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,27,self._ctx) + if la_ == 1: + self.state = 296 + self.subexpr() + + + self.state = 300 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,28,self._ctx) + if la_ == 1: + self.state = 299 + self.match(LaTeXParser.SINGLE_QUOTES) + + + pass + + elif la_ == 2: + self.state = 303 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,29,self._ctx) + if la_ == 1: + self.state = 302 + self.match(LaTeXParser.SINGLE_QUOTES) + + + self.state = 306 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,30,self._ctx) + if la_ == 1: + self.state = 305 + self.subexpr() + + + pass + + + pass + elif token in [78]: + self.enterOuterAlt(localctx, 2) + self.state = 310 + self.number() + pass + elif token in [76]: + self.enterOuterAlt(localctx, 3) + self.state = 311 + self.match(LaTeXParser.DIFFERENTIAL) + pass + elif token in [72]: + self.enterOuterAlt(localctx, 4) + self.state = 312 + self.mathit() + pass + elif token in [68]: + self.enterOuterAlt(localctx, 5) + self.state = 313 + self.frac() + pass + elif token in [69, 70, 71]: + self.enterOuterAlt(localctx, 6) + self.state = 314 + self.binom() + pass + elif token in [30]: + self.enterOuterAlt(localctx, 7) + self.state = 315 + self.bra() + pass + elif token in [27, 29]: + self.enterOuterAlt(localctx, 8) + self.state = 316 + self.ket() + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class BraContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def L_ANGLE(self): + return self.getToken(LaTeXParser.L_ANGLE, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def R_BAR(self): + return self.getToken(LaTeXParser.R_BAR, 0) + + def BAR(self): + return self.getToken(LaTeXParser.BAR, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_bra + + + + + def bra(self): + + localctx = LaTeXParser.BraContext(self, self._ctx, self.state) + self.enterRule(localctx, 46, self.RULE_bra) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 319 + self.match(LaTeXParser.L_ANGLE) + self.state = 320 + self.expr() + self.state = 321 + _la = self._input.LA(1) + if not(_la==27 or _la==28): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class KetContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def R_ANGLE(self): + return self.getToken(LaTeXParser.R_ANGLE, 0) + + def L_BAR(self): + return self.getToken(LaTeXParser.L_BAR, 0) + + def BAR(self): + return self.getToken(LaTeXParser.BAR, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_ket + + + + + def ket(self): + + localctx = LaTeXParser.KetContext(self, self._ctx, self.state) + self.enterRule(localctx, 48, self.RULE_ket) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 323 + _la = self._input.LA(1) + if not(_la==27 or _la==29): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 324 + self.expr() + self.state = 325 + self.match(LaTeXParser.R_ANGLE) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class MathitContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def CMD_MATHIT(self): + return self.getToken(LaTeXParser.CMD_MATHIT, 0) + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def mathit_text(self): + return self.getTypedRuleContext(LaTeXParser.Mathit_textContext,0) + + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_mathit + + + + + def mathit(self): + + localctx = LaTeXParser.MathitContext(self, self._ctx, self.state) + self.enterRule(localctx, 50, self.RULE_mathit) + try: + self.enterOuterAlt(localctx, 1) + self.state = 327 + self.match(LaTeXParser.CMD_MATHIT) + self.state = 328 + self.match(LaTeXParser.L_BRACE) + self.state = 329 + self.mathit_text() + self.state = 330 + self.match(LaTeXParser.R_BRACE) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Mathit_textContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def LETTER(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.LETTER) + else: + return self.getToken(LaTeXParser.LETTER, i) + + def getRuleIndex(self): + return LaTeXParser.RULE_mathit_text + + + + + def mathit_text(self): + + localctx = LaTeXParser.Mathit_textContext(self, self._ctx, self.state) + self.enterRule(localctx, 52, self.RULE_mathit_text) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 335 + self._errHandler.sync(self) + _la = self._input.LA(1) + while _la==77: + self.state = 332 + self.match(LaTeXParser.LETTER) + self.state = 337 + self._errHandler.sync(self) + _la = self._input.LA(1) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class FracContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + self.upperd = None # Token + self.upper = None # ExprContext + self.lowerd = None # Token + self.lower = None # ExprContext + + def CMD_FRAC(self): + return self.getToken(LaTeXParser.CMD_FRAC, 0) + + def L_BRACE(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.L_BRACE) + else: + return self.getToken(LaTeXParser.L_BRACE, i) + + def R_BRACE(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.R_BRACE) + else: + return self.getToken(LaTeXParser.R_BRACE, i) + + def DIGIT(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.DIGIT) + else: + return self.getToken(LaTeXParser.DIGIT, i) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.ExprContext) + else: + return self.getTypedRuleContext(LaTeXParser.ExprContext,i) + + + def getRuleIndex(self): + return LaTeXParser.RULE_frac + + + + + def frac(self): + + localctx = LaTeXParser.FracContext(self, self._ctx, self.state) + self.enterRule(localctx, 54, self.RULE_frac) + try: + self.enterOuterAlt(localctx, 1) + self.state = 338 + self.match(LaTeXParser.CMD_FRAC) + self.state = 344 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [78]: + self.state = 339 + localctx.upperd = self.match(LaTeXParser.DIGIT) + pass + elif token in [21]: + self.state = 340 + self.match(LaTeXParser.L_BRACE) + self.state = 341 + localctx.upper = self.expr() + self.state = 342 + self.match(LaTeXParser.R_BRACE) + pass + else: + raise NoViableAltException(self) + + self.state = 351 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [78]: + self.state = 346 + localctx.lowerd = self.match(LaTeXParser.DIGIT) + pass + elif token in [21]: + self.state = 347 + self.match(LaTeXParser.L_BRACE) + self.state = 348 + localctx.lower = self.expr() + self.state = 349 + self.match(LaTeXParser.R_BRACE) + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class BinomContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + self.n = None # ExprContext + self.k = None # ExprContext + + def L_BRACE(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.L_BRACE) + else: + return self.getToken(LaTeXParser.L_BRACE, i) + + def R_BRACE(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.R_BRACE) + else: + return self.getToken(LaTeXParser.R_BRACE, i) + + def CMD_BINOM(self): + return self.getToken(LaTeXParser.CMD_BINOM, 0) + + def CMD_DBINOM(self): + return self.getToken(LaTeXParser.CMD_DBINOM, 0) + + def CMD_TBINOM(self): + return self.getToken(LaTeXParser.CMD_TBINOM, 0) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.ExprContext) + else: + return self.getTypedRuleContext(LaTeXParser.ExprContext,i) + + + def getRuleIndex(self): + return LaTeXParser.RULE_binom + + + + + def binom(self): + + localctx = LaTeXParser.BinomContext(self, self._ctx, self.state) + self.enterRule(localctx, 56, self.RULE_binom) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 353 + _la = self._input.LA(1) + if not((((_la - 69)) & ~0x3f) == 0 and ((1 << (_la - 69)) & 7) != 0): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 354 + self.match(LaTeXParser.L_BRACE) + self.state = 355 + localctx.n = self.expr() + self.state = 356 + self.match(LaTeXParser.R_BRACE) + self.state = 357 + self.match(LaTeXParser.L_BRACE) + self.state = 358 + localctx.k = self.expr() + self.state = 359 + self.match(LaTeXParser.R_BRACE) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class FloorContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + self.val = None # ExprContext + + def L_FLOOR(self): + return self.getToken(LaTeXParser.L_FLOOR, 0) + + def R_FLOOR(self): + return self.getToken(LaTeXParser.R_FLOOR, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_floor + + + + + def floor(self): + + localctx = LaTeXParser.FloorContext(self, self._ctx, self.state) + self.enterRule(localctx, 58, self.RULE_floor) + try: + self.enterOuterAlt(localctx, 1) + self.state = 361 + self.match(LaTeXParser.L_FLOOR) + self.state = 362 + localctx.val = self.expr() + self.state = 363 + self.match(LaTeXParser.R_FLOOR) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class CeilContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + self.val = None # ExprContext + + def L_CEIL(self): + return self.getToken(LaTeXParser.L_CEIL, 0) + + def R_CEIL(self): + return self.getToken(LaTeXParser.R_CEIL, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_ceil + + + + + def ceil(self): + + localctx = LaTeXParser.CeilContext(self, self._ctx, self.state) + self.enterRule(localctx, 60, self.RULE_ceil) + try: + self.enterOuterAlt(localctx, 1) + self.state = 365 + self.match(LaTeXParser.L_CEIL) + self.state = 366 + localctx.val = self.expr() + self.state = 367 + self.match(LaTeXParser.R_CEIL) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Func_normalContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def FUNC_EXP(self): + return self.getToken(LaTeXParser.FUNC_EXP, 0) + + def FUNC_LOG(self): + return self.getToken(LaTeXParser.FUNC_LOG, 0) + + def FUNC_LG(self): + return self.getToken(LaTeXParser.FUNC_LG, 0) + + def FUNC_LN(self): + return self.getToken(LaTeXParser.FUNC_LN, 0) + + def FUNC_SIN(self): + return self.getToken(LaTeXParser.FUNC_SIN, 0) + + def FUNC_COS(self): + return self.getToken(LaTeXParser.FUNC_COS, 0) + + def FUNC_TAN(self): + return self.getToken(LaTeXParser.FUNC_TAN, 0) + + def FUNC_CSC(self): + return self.getToken(LaTeXParser.FUNC_CSC, 0) + + def FUNC_SEC(self): + return self.getToken(LaTeXParser.FUNC_SEC, 0) + + def FUNC_COT(self): + return self.getToken(LaTeXParser.FUNC_COT, 0) + + def FUNC_ARCSIN(self): + return self.getToken(LaTeXParser.FUNC_ARCSIN, 0) + + def FUNC_ARCCOS(self): + return self.getToken(LaTeXParser.FUNC_ARCCOS, 0) + + def FUNC_ARCTAN(self): + return self.getToken(LaTeXParser.FUNC_ARCTAN, 0) + + def FUNC_ARCCSC(self): + return self.getToken(LaTeXParser.FUNC_ARCCSC, 0) + + def FUNC_ARCSEC(self): + return self.getToken(LaTeXParser.FUNC_ARCSEC, 0) + + def FUNC_ARCCOT(self): + return self.getToken(LaTeXParser.FUNC_ARCCOT, 0) + + def FUNC_SINH(self): + return self.getToken(LaTeXParser.FUNC_SINH, 0) + + def FUNC_COSH(self): + return self.getToken(LaTeXParser.FUNC_COSH, 0) + + def FUNC_TANH(self): + return self.getToken(LaTeXParser.FUNC_TANH, 0) + + def FUNC_ARSINH(self): + return self.getToken(LaTeXParser.FUNC_ARSINH, 0) + + def FUNC_ARCOSH(self): + return self.getToken(LaTeXParser.FUNC_ARCOSH, 0) + + def FUNC_ARTANH(self): + return self.getToken(LaTeXParser.FUNC_ARTANH, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_func_normal + + + + + def func_normal(self): + + localctx = LaTeXParser.Func_normalContext(self, self._ctx, self.state) + self.enterRule(localctx, 62, self.RULE_func_normal) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 369 + _la = self._input.LA(1) + if not(((_la) & ~0x3f) == 0 and ((1 << _la) & 576460614864470016) != 0): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class FuncContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + self.root = None # ExprContext + self.base = None # ExprContext + + def func_normal(self): + return self.getTypedRuleContext(LaTeXParser.Func_normalContext,0) + + + def L_PAREN(self): + return self.getToken(LaTeXParser.L_PAREN, 0) + + def func_arg(self): + return self.getTypedRuleContext(LaTeXParser.Func_argContext,0) + + + def R_PAREN(self): + return self.getToken(LaTeXParser.R_PAREN, 0) + + def func_arg_noparens(self): + return self.getTypedRuleContext(LaTeXParser.Func_arg_noparensContext,0) + + + def subexpr(self): + return self.getTypedRuleContext(LaTeXParser.SubexprContext,0) + + + def supexpr(self): + return self.getTypedRuleContext(LaTeXParser.SupexprContext,0) + + + def args(self): + return self.getTypedRuleContext(LaTeXParser.ArgsContext,0) + + + def LETTER(self): + return self.getToken(LaTeXParser.LETTER, 0) + + def SYMBOL(self): + return self.getToken(LaTeXParser.SYMBOL, 0) + + def SINGLE_QUOTES(self): + return self.getToken(LaTeXParser.SINGLE_QUOTES, 0) + + def FUNC_INT(self): + return self.getToken(LaTeXParser.FUNC_INT, 0) + + def DIFFERENTIAL(self): + return self.getToken(LaTeXParser.DIFFERENTIAL, 0) + + def frac(self): + return self.getTypedRuleContext(LaTeXParser.FracContext,0) + + + def additive(self): + return self.getTypedRuleContext(LaTeXParser.AdditiveContext,0) + + + def FUNC_SQRT(self): + return self.getToken(LaTeXParser.FUNC_SQRT, 0) + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def expr(self, i:int=None): + if i is None: + return self.getTypedRuleContexts(LaTeXParser.ExprContext) + else: + return self.getTypedRuleContext(LaTeXParser.ExprContext,i) + + + def L_BRACKET(self): + return self.getToken(LaTeXParser.L_BRACKET, 0) + + def R_BRACKET(self): + return self.getToken(LaTeXParser.R_BRACKET, 0) + + def FUNC_OVERLINE(self): + return self.getToken(LaTeXParser.FUNC_OVERLINE, 0) + + def mp(self): + return self.getTypedRuleContext(LaTeXParser.MpContext,0) + + + def FUNC_SUM(self): + return self.getToken(LaTeXParser.FUNC_SUM, 0) + + def FUNC_PROD(self): + return self.getToken(LaTeXParser.FUNC_PROD, 0) + + def subeq(self): + return self.getTypedRuleContext(LaTeXParser.SubeqContext,0) + + + def FUNC_LIM(self): + return self.getToken(LaTeXParser.FUNC_LIM, 0) + + def limit_sub(self): + return self.getTypedRuleContext(LaTeXParser.Limit_subContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_func + + + + + def func(self): + + localctx = LaTeXParser.FuncContext(self, self._ctx, self.state) + self.enterRule(localctx, 64, self.RULE_func) + self._la = 0 # Token type + try: + self.state = 460 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [37, 38, 39, 40, 41, 42, 43, 44, 45, 46, 47, 48, 49, 50, 51, 52, 53, 54, 55, 56, 57, 58]: + self.enterOuterAlt(localctx, 1) + self.state = 371 + self.func_normal() + self.state = 384 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,40,self._ctx) + if la_ == 1: + self.state = 373 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==73: + self.state = 372 + self.subexpr() + + + self.state = 376 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==74: + self.state = 375 + self.supexpr() + + + pass + + elif la_ == 2: + self.state = 379 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==74: + self.state = 378 + self.supexpr() + + + self.state = 382 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==73: + self.state = 381 + self.subexpr() + + + pass + + + self.state = 391 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,41,self._ctx) + if la_ == 1: + self.state = 386 + self.match(LaTeXParser.L_PAREN) + self.state = 387 + self.func_arg() + self.state = 388 + self.match(LaTeXParser.R_PAREN) + pass + + elif la_ == 2: + self.state = 390 + self.func_arg_noparens() + pass + + + pass + elif token in [77, 91]: + self.enterOuterAlt(localctx, 2) + self.state = 393 + _la = self._input.LA(1) + if not(_la==77 or _la==91): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 406 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,46,self._ctx) + if la_ == 1: + self.state = 395 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==73: + self.state = 394 + self.subexpr() + + + self.state = 398 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==90: + self.state = 397 + self.match(LaTeXParser.SINGLE_QUOTES) + + + pass + + elif la_ == 2: + self.state = 401 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==90: + self.state = 400 + self.match(LaTeXParser.SINGLE_QUOTES) + + + self.state = 404 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==73: + self.state = 403 + self.subexpr() + + + pass + + + self.state = 408 + self.match(LaTeXParser.L_PAREN) + self.state = 409 + self.args() + self.state = 410 + self.match(LaTeXParser.R_PAREN) + pass + elif token in [34]: + self.enterOuterAlt(localctx, 3) + self.state = 412 + self.match(LaTeXParser.FUNC_INT) + self.state = 419 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [73]: + self.state = 413 + self.subexpr() + self.state = 414 + self.supexpr() + pass + elif token in [74]: + self.state = 416 + self.supexpr() + self.state = 417 + self.subexpr() + pass + elif token in [15, 16, 19, 21, 23, 25, 27, 29, 30, 32, 34, 35, 36, 37, 38, 39, 40, 41, 42, 43, 44, 45, 46, 47, 48, 49, 50, 51, 52, 53, 54, 55, 56, 57, 58, 59, 61, 63, 64, 68, 69, 70, 71, 72, 76, 77, 78, 91]: + pass + else: + pass + self.state = 427 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,49,self._ctx) + if la_ == 1: + self.state = 422 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,48,self._ctx) + if la_ == 1: + self.state = 421 + self.additive(0) + + + self.state = 424 + self.match(LaTeXParser.DIFFERENTIAL) + pass + + elif la_ == 2: + self.state = 425 + self.frac() + pass + + elif la_ == 3: + self.state = 426 + self.additive(0) + pass + + + pass + elif token in [63]: + self.enterOuterAlt(localctx, 4) + self.state = 429 + self.match(LaTeXParser.FUNC_SQRT) + self.state = 434 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==25: + self.state = 430 + self.match(LaTeXParser.L_BRACKET) + self.state = 431 + localctx.root = self.expr() + self.state = 432 + self.match(LaTeXParser.R_BRACKET) + + + self.state = 436 + self.match(LaTeXParser.L_BRACE) + self.state = 437 + localctx.base = self.expr() + self.state = 438 + self.match(LaTeXParser.R_BRACE) + pass + elif token in [64]: + self.enterOuterAlt(localctx, 5) + self.state = 440 + self.match(LaTeXParser.FUNC_OVERLINE) + self.state = 441 + self.match(LaTeXParser.L_BRACE) + self.state = 442 + localctx.base = self.expr() + self.state = 443 + self.match(LaTeXParser.R_BRACE) + pass + elif token in [35, 36]: + self.enterOuterAlt(localctx, 6) + self.state = 445 + _la = self._input.LA(1) + if not(_la==35 or _la==36): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 452 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [73]: + self.state = 446 + self.subeq() + self.state = 447 + self.supexpr() + pass + elif token in [74]: + self.state = 449 + self.supexpr() + self.state = 450 + self.subeq() + pass + else: + raise NoViableAltException(self) + + self.state = 454 + self.mp(0) + pass + elif token in [32]: + self.enterOuterAlt(localctx, 7) + self.state = 456 + self.match(LaTeXParser.FUNC_LIM) + self.state = 457 + self.limit_sub() + self.state = 458 + self.mp(0) + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class ArgsContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def args(self): + return self.getTypedRuleContext(LaTeXParser.ArgsContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_args + + + + + def args(self): + + localctx = LaTeXParser.ArgsContext(self, self._ctx, self.state) + self.enterRule(localctx, 66, self.RULE_args) + try: + self.state = 467 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,53,self._ctx) + if la_ == 1: + self.enterOuterAlt(localctx, 1) + self.state = 462 + self.expr() + self.state = 463 + self.match(LaTeXParser.T__0) + self.state = 464 + self.args() + pass + + elif la_ == 2: + self.enterOuterAlt(localctx, 2) + self.state = 466 + self.expr() + pass + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Limit_subContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def UNDERSCORE(self): + return self.getToken(LaTeXParser.UNDERSCORE, 0) + + def L_BRACE(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.L_BRACE) + else: + return self.getToken(LaTeXParser.L_BRACE, i) + + def LIM_APPROACH_SYM(self): + return self.getToken(LaTeXParser.LIM_APPROACH_SYM, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def R_BRACE(self, i:int=None): + if i is None: + return self.getTokens(LaTeXParser.R_BRACE) + else: + return self.getToken(LaTeXParser.R_BRACE, i) + + def LETTER(self): + return self.getToken(LaTeXParser.LETTER, 0) + + def SYMBOL(self): + return self.getToken(LaTeXParser.SYMBOL, 0) + + def CARET(self): + return self.getToken(LaTeXParser.CARET, 0) + + def ADD(self): + return self.getToken(LaTeXParser.ADD, 0) + + def SUB(self): + return self.getToken(LaTeXParser.SUB, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_limit_sub + + + + + def limit_sub(self): + + localctx = LaTeXParser.Limit_subContext(self, self._ctx, self.state) + self.enterRule(localctx, 68, self.RULE_limit_sub) + self._la = 0 # Token type + try: + self.enterOuterAlt(localctx, 1) + self.state = 469 + self.match(LaTeXParser.UNDERSCORE) + self.state = 470 + self.match(LaTeXParser.L_BRACE) + self.state = 471 + _la = self._input.LA(1) + if not(_la==77 or _la==91): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 472 + self.match(LaTeXParser.LIM_APPROACH_SYM) + self.state = 473 + self.expr() + self.state = 482 + self._errHandler.sync(self) + _la = self._input.LA(1) + if _la==74: + self.state = 474 + self.match(LaTeXParser.CARET) + self.state = 480 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [21]: + self.state = 475 + self.match(LaTeXParser.L_BRACE) + self.state = 476 + _la = self._input.LA(1) + if not(_la==15 or _la==16): + self._errHandler.recoverInline(self) + else: + self._errHandler.reportMatch(self) + self.consume() + self.state = 477 + self.match(LaTeXParser.R_BRACE) + pass + elif token in [15]: + self.state = 478 + self.match(LaTeXParser.ADD) + pass + elif token in [16]: + self.state = 479 + self.match(LaTeXParser.SUB) + pass + else: + raise NoViableAltException(self) + + + + self.state = 484 + self.match(LaTeXParser.R_BRACE) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Func_argContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def func_arg(self): + return self.getTypedRuleContext(LaTeXParser.Func_argContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_func_arg + + + + + def func_arg(self): + + localctx = LaTeXParser.Func_argContext(self, self._ctx, self.state) + self.enterRule(localctx, 70, self.RULE_func_arg) + try: + self.state = 491 + self._errHandler.sync(self) + la_ = self._interp.adaptivePredict(self._input,56,self._ctx) + if la_ == 1: + self.enterOuterAlt(localctx, 1) + self.state = 486 + self.expr() + pass + + elif la_ == 2: + self.enterOuterAlt(localctx, 2) + self.state = 487 + self.expr() + self.state = 488 + self.match(LaTeXParser.T__0) + self.state = 489 + self.func_arg() + pass + + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class Func_arg_noparensContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def mp_nofunc(self): + return self.getTypedRuleContext(LaTeXParser.Mp_nofuncContext,0) + + + def getRuleIndex(self): + return LaTeXParser.RULE_func_arg_noparens + + + + + def func_arg_noparens(self): + + localctx = LaTeXParser.Func_arg_noparensContext(self, self._ctx, self.state) + self.enterRule(localctx, 72, self.RULE_func_arg_noparens) + try: + self.enterOuterAlt(localctx, 1) + self.state = 493 + self.mp_nofunc(0) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class SubexprContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def UNDERSCORE(self): + return self.getToken(LaTeXParser.UNDERSCORE, 0) + + def atom(self): + return self.getTypedRuleContext(LaTeXParser.AtomContext,0) + + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_subexpr + + + + + def subexpr(self): + + localctx = LaTeXParser.SubexprContext(self, self._ctx, self.state) + self.enterRule(localctx, 74, self.RULE_subexpr) + try: + self.enterOuterAlt(localctx, 1) + self.state = 495 + self.match(LaTeXParser.UNDERSCORE) + self.state = 501 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [27, 29, 30, 68, 69, 70, 71, 72, 76, 77, 78, 91]: + self.state = 496 + self.atom() + pass + elif token in [21]: + self.state = 497 + self.match(LaTeXParser.L_BRACE) + self.state = 498 + self.expr() + self.state = 499 + self.match(LaTeXParser.R_BRACE) + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class SupexprContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def CARET(self): + return self.getToken(LaTeXParser.CARET, 0) + + def atom(self): + return self.getTypedRuleContext(LaTeXParser.AtomContext,0) + + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def expr(self): + return self.getTypedRuleContext(LaTeXParser.ExprContext,0) + + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_supexpr + + + + + def supexpr(self): + + localctx = LaTeXParser.SupexprContext(self, self._ctx, self.state) + self.enterRule(localctx, 76, self.RULE_supexpr) + try: + self.enterOuterAlt(localctx, 1) + self.state = 503 + self.match(LaTeXParser.CARET) + self.state = 509 + self._errHandler.sync(self) + token = self._input.LA(1) + if token in [27, 29, 30, 68, 69, 70, 71, 72, 76, 77, 78, 91]: + self.state = 504 + self.atom() + pass + elif token in [21]: + self.state = 505 + self.match(LaTeXParser.L_BRACE) + self.state = 506 + self.expr() + self.state = 507 + self.match(LaTeXParser.R_BRACE) + pass + else: + raise NoViableAltException(self) + + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class SubeqContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def UNDERSCORE(self): + return self.getToken(LaTeXParser.UNDERSCORE, 0) + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def equality(self): + return self.getTypedRuleContext(LaTeXParser.EqualityContext,0) + + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_subeq + + + + + def subeq(self): + + localctx = LaTeXParser.SubeqContext(self, self._ctx, self.state) + self.enterRule(localctx, 78, self.RULE_subeq) + try: + self.enterOuterAlt(localctx, 1) + self.state = 511 + self.match(LaTeXParser.UNDERSCORE) + self.state = 512 + self.match(LaTeXParser.L_BRACE) + self.state = 513 + self.equality() + self.state = 514 + self.match(LaTeXParser.R_BRACE) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + class SupeqContext(ParserRuleContext): + __slots__ = 'parser' + + def __init__(self, parser, parent:ParserRuleContext=None, invokingState:int=-1): + super().__init__(parent, invokingState) + self.parser = parser + + def UNDERSCORE(self): + return self.getToken(LaTeXParser.UNDERSCORE, 0) + + def L_BRACE(self): + return self.getToken(LaTeXParser.L_BRACE, 0) + + def equality(self): + return self.getTypedRuleContext(LaTeXParser.EqualityContext,0) + + + def R_BRACE(self): + return self.getToken(LaTeXParser.R_BRACE, 0) + + def getRuleIndex(self): + return LaTeXParser.RULE_supeq + + + + + def supeq(self): + + localctx = LaTeXParser.SupeqContext(self, self._ctx, self.state) + self.enterRule(localctx, 80, self.RULE_supeq) + try: + self.enterOuterAlt(localctx, 1) + self.state = 516 + self.match(LaTeXParser.UNDERSCORE) + self.state = 517 + self.match(LaTeXParser.L_BRACE) + self.state = 518 + self.equality() + self.state = 519 + self.match(LaTeXParser.R_BRACE) + except RecognitionException as re: + localctx.exception = re + self._errHandler.reportError(self, re) + self._errHandler.recover(self, re) + finally: + self.exitRule() + return localctx + + + + def sempred(self, localctx:RuleContext, ruleIndex:int, predIndex:int): + if self._predicates == None: + self._predicates = dict() + self._predicates[1] = self.relation_sempred + self._predicates[4] = self.additive_sempred + self._predicates[5] = self.mp_sempred + self._predicates[6] = self.mp_nofunc_sempred + self._predicates[15] = self.exp_sempred + self._predicates[16] = self.exp_nofunc_sempred + pred = self._predicates.get(ruleIndex, None) + if pred is None: + raise Exception("No predicate with index:" + str(ruleIndex)) + else: + return pred(localctx, predIndex) + + def relation_sempred(self, localctx:RelationContext, predIndex:int): + if predIndex == 0: + return self.precpred(self._ctx, 2) + + + def additive_sempred(self, localctx:AdditiveContext, predIndex:int): + if predIndex == 1: + return self.precpred(self._ctx, 2) + + + def mp_sempred(self, localctx:MpContext, predIndex:int): + if predIndex == 2: + return self.precpred(self._ctx, 2) + + + def mp_nofunc_sempred(self, localctx:Mp_nofuncContext, predIndex:int): + if predIndex == 3: + return self.precpred(self._ctx, 2) + + + def exp_sempred(self, localctx:ExpContext, predIndex:int): + if predIndex == 4: + return self.precpred(self._ctx, 2) + + + def exp_nofunc_sempred(self, localctx:Exp_nofuncContext, predIndex:int): + if predIndex == 5: + return self.precpred(self._ctx, 2) + + + + + diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/_build_latex_antlr.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/_build_latex_antlr.py new file mode 100644 index 0000000000000000000000000000000000000000..ee50da5b7861154823812c7773360b53dfd29ff6 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/_build_latex_antlr.py @@ -0,0 +1,91 @@ +import os +import subprocess +import glob + +from sympy.utilities.misc import debug + +here = os.path.dirname(__file__) +grammar_file = os.path.abspath(os.path.join(here, "LaTeX.g4")) +dir_latex_antlr = os.path.join(here, "_antlr") + +header = '''\ +# *** GENERATED BY `setup.py antlr`, DO NOT EDIT BY HAND *** +# +# Generated from ../LaTeX.g4, derived from latex2sympy +# latex2sympy is licensed under the MIT license +# https://github.com/augustt198/latex2sympy/blob/master/LICENSE.txt +# +# Generated with antlr4 +# antlr4 is licensed under the BSD-3-Clause License +# https://github.com/antlr/antlr4/blob/master/LICENSE.txt +''' + + +def check_antlr_version(): + debug("Checking antlr4 version...") + + try: + debug(subprocess.check_output(["antlr4"]) + .decode('utf-8').split("\n")[0]) + return True + except (subprocess.CalledProcessError, FileNotFoundError): + debug("The 'antlr4' command line tool is not installed, " + "or not on your PATH.\n" + "> Please refer to the README.md file for more information.") + return False + + +def build_parser(output_dir=dir_latex_antlr): + check_antlr_version() + + debug("Updating ANTLR-generated code in {}".format(output_dir)) + + if not os.path.exists(output_dir): + os.makedirs(output_dir) + + with open(os.path.join(output_dir, "__init__.py"), "w+") as fp: + fp.write(header) + + args = [ + "antlr4", + grammar_file, + "-o", output_dir, + # for now, not generating these as latex2sympy did not use them + "-no-visitor", + "-no-listener", + ] + + debug("Running code generation...\n\t$ {}".format(" ".join(args))) + subprocess.check_output(args, cwd=output_dir) + + debug("Applying headers, removing unnecessary files and renaming...") + # Handle case insensitive file systems. If the files are already + # generated, they will be written to latex* but LaTeX*.* won't match them. + for path in (glob.glob(os.path.join(output_dir, "LaTeX*.*")) or + glob.glob(os.path.join(output_dir, "latex*.*"))): + + # Remove files ending in .interp or .tokens as they are not needed. + if not path.endswith(".py"): + os.unlink(path) + continue + + new_path = os.path.join(output_dir, os.path.basename(path).lower()) + with open(path, 'r') as f: + lines = [line.rstrip() + '\n' for line in f] + + os.unlink(path) + + with open(new_path, "w") as out_file: + offset = 0 + while lines[offset].startswith('#'): + offset += 1 + out_file.write(header) + out_file.writelines(lines[offset:]) + + debug("\t{}".format(new_path)) + + return True + + +if __name__ == "__main__": + build_parser() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/_parse_latex_antlr.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/_parse_latex_antlr.py new file mode 100644 index 0000000000000000000000000000000000000000..26604375b3a9622f8c1dacdb1d678d09c2c3ad41 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/_parse_latex_antlr.py @@ -0,0 +1,607 @@ +# Ported from latex2sympy by @augustt198 +# https://github.com/augustt198/latex2sympy +# See license in LICENSE.txt +from importlib.metadata import version +import sympy +from sympy.external import import_module +from sympy.printing.str import StrPrinter +from sympy.physics.quantum.state import Bra, Ket + +from .errors import LaTeXParsingError + + +LaTeXParser = LaTeXLexer = MathErrorListener = None + +try: + LaTeXParser = import_module('sympy.parsing.latex._antlr.latexparser', + import_kwargs={'fromlist': ['LaTeXParser']}).LaTeXParser + LaTeXLexer = import_module('sympy.parsing.latex._antlr.latexlexer', + import_kwargs={'fromlist': ['LaTeXLexer']}).LaTeXLexer +except Exception: + pass + +ErrorListener = import_module('antlr4.error.ErrorListener', + warn_not_installed=True, + import_kwargs={'fromlist': ['ErrorListener']} + ) + + + +if ErrorListener: + class MathErrorListener(ErrorListener.ErrorListener): # type:ignore # noqa:F811 + def __init__(self, src): + super(ErrorListener.ErrorListener, self).__init__() + self.src = src + + def syntaxError(self, recog, symbol, line, col, msg, e): + fmt = "%s\n%s\n%s" + marker = "~" * col + "^" + + if msg.startswith("missing"): + err = fmt % (msg, self.src, marker) + elif msg.startswith("no viable"): + err = fmt % ("I expected something else here", self.src, marker) + elif msg.startswith("mismatched"): + names = LaTeXParser.literalNames + expected = [ + names[i] for i in e.getExpectedTokens() if i < len(names) + ] + if len(expected) < 10: + expected = " ".join(expected) + err = (fmt % ("I expected one of these: " + expected, self.src, + marker)) + else: + err = (fmt % ("I expected something else here", self.src, + marker)) + else: + err = fmt % ("I don't understand this", self.src, marker) + raise LaTeXParsingError(err) + + +def parse_latex(sympy, strict=False): + antlr4 = import_module('antlr4') + + if None in [antlr4, MathErrorListener] or \ + not version('antlr4-python3-runtime').startswith('4.11'): + raise ImportError("LaTeX parsing requires the antlr4 Python package," + " provided by pip (antlr4-python3-runtime) or" + " conda (antlr-python-runtime), version 4.11") + + sympy = sympy.strip() + matherror = MathErrorListener(sympy) + + stream = antlr4.InputStream(sympy) + lex = LaTeXLexer(stream) + lex.removeErrorListeners() + lex.addErrorListener(matherror) + + tokens = antlr4.CommonTokenStream(lex) + parser = LaTeXParser(tokens) + + # remove default console error listener + parser.removeErrorListeners() + parser.addErrorListener(matherror) + + relation = parser.math().relation() + if strict and (relation.start.start != 0 or relation.stop.stop != len(sympy) - 1): + raise LaTeXParsingError("Invalid LaTeX") + expr = convert_relation(relation) + + return expr + + +def convert_relation(rel): + if rel.expr(): + return convert_expr(rel.expr()) + + lh = convert_relation(rel.relation(0)) + rh = convert_relation(rel.relation(1)) + if rel.LT(): + return sympy.StrictLessThan(lh, rh) + elif rel.LTE(): + return sympy.LessThan(lh, rh) + elif rel.GT(): + return sympy.StrictGreaterThan(lh, rh) + elif rel.GTE(): + return sympy.GreaterThan(lh, rh) + elif rel.EQUAL(): + return sympy.Eq(lh, rh) + elif rel.NEQ(): + return sympy.Ne(lh, rh) + + +def convert_expr(expr): + return convert_add(expr.additive()) + + +def convert_add(add): + if add.ADD(): + lh = convert_add(add.additive(0)) + rh = convert_add(add.additive(1)) + return sympy.Add(lh, rh, evaluate=False) + elif add.SUB(): + lh = convert_add(add.additive(0)) + rh = convert_add(add.additive(1)) + if hasattr(rh, "is_Atom") and rh.is_Atom: + return sympy.Add(lh, -1 * rh, evaluate=False) + return sympy.Add(lh, sympy.Mul(-1, rh, evaluate=False), evaluate=False) + else: + return convert_mp(add.mp()) + + +def convert_mp(mp): + if hasattr(mp, 'mp'): + mp_left = mp.mp(0) + mp_right = mp.mp(1) + else: + mp_left = mp.mp_nofunc(0) + mp_right = mp.mp_nofunc(1) + + if mp.MUL() or mp.CMD_TIMES() or mp.CMD_CDOT(): + lh = convert_mp(mp_left) + rh = convert_mp(mp_right) + return sympy.Mul(lh, rh, evaluate=False) + elif mp.DIV() or mp.CMD_DIV() or mp.COLON(): + lh = convert_mp(mp_left) + rh = convert_mp(mp_right) + return sympy.Mul(lh, sympy.Pow(rh, -1, evaluate=False), evaluate=False) + else: + if hasattr(mp, 'unary'): + return convert_unary(mp.unary()) + else: + return convert_unary(mp.unary_nofunc()) + + +def convert_unary(unary): + if hasattr(unary, 'unary'): + nested_unary = unary.unary() + else: + nested_unary = unary.unary_nofunc() + if hasattr(unary, 'postfix_nofunc'): + first = unary.postfix() + tail = unary.postfix_nofunc() + postfix = [first] + tail + else: + postfix = unary.postfix() + + if unary.ADD(): + return convert_unary(nested_unary) + elif unary.SUB(): + numabs = convert_unary(nested_unary) + # Use Integer(-n) instead of Mul(-1, n) + return -numabs + elif postfix: + return convert_postfix_list(postfix) + + +def convert_postfix_list(arr, i=0): + if i >= len(arr): + raise LaTeXParsingError("Index out of bounds") + + res = convert_postfix(arr[i]) + if isinstance(res, sympy.Expr): + if i == len(arr) - 1: + return res # nothing to multiply by + else: + if i > 0: + left = convert_postfix(arr[i - 1]) + right = convert_postfix(arr[i + 1]) + if isinstance(left, sympy.Expr) and isinstance( + right, sympy.Expr): + left_syms = convert_postfix(arr[i - 1]).atoms(sympy.Symbol) + right_syms = convert_postfix(arr[i + 1]).atoms( + sympy.Symbol) + # if the left and right sides contain no variables and the + # symbol in between is 'x', treat as multiplication. + if not (left_syms or right_syms) and str(res) == 'x': + return convert_postfix_list(arr, i + 1) + # multiply by next + return sympy.Mul( + res, convert_postfix_list(arr, i + 1), evaluate=False) + else: # must be derivative + wrt = res[0] + if i == len(arr) - 1: + raise LaTeXParsingError("Expected expression for derivative") + else: + expr = convert_postfix_list(arr, i + 1) + return sympy.Derivative(expr, wrt) + + +def do_subs(expr, at): + if at.expr(): + at_expr = convert_expr(at.expr()) + syms = at_expr.atoms(sympy.Symbol) + if len(syms) == 0: + return expr + elif len(syms) > 0: + sym = next(iter(syms)) + return expr.subs(sym, at_expr) + elif at.equality(): + lh = convert_expr(at.equality().expr(0)) + rh = convert_expr(at.equality().expr(1)) + return expr.subs(lh, rh) + + +def convert_postfix(postfix): + if hasattr(postfix, 'exp'): + exp_nested = postfix.exp() + else: + exp_nested = postfix.exp_nofunc() + + exp = convert_exp(exp_nested) + for op in postfix.postfix_op(): + if op.BANG(): + if isinstance(exp, list): + raise LaTeXParsingError("Cannot apply postfix to derivative") + exp = sympy.factorial(exp, evaluate=False) + elif op.eval_at(): + ev = op.eval_at() + at_b = None + at_a = None + if ev.eval_at_sup(): + at_b = do_subs(exp, ev.eval_at_sup()) + if ev.eval_at_sub(): + at_a = do_subs(exp, ev.eval_at_sub()) + if at_b is not None and at_a is not None: + exp = sympy.Add(at_b, -1 * at_a, evaluate=False) + elif at_b is not None: + exp = at_b + elif at_a is not None: + exp = at_a + + return exp + + +def convert_exp(exp): + if hasattr(exp, 'exp'): + exp_nested = exp.exp() + else: + exp_nested = exp.exp_nofunc() + + if exp_nested: + base = convert_exp(exp_nested) + if isinstance(base, list): + raise LaTeXParsingError("Cannot raise derivative to power") + if exp.atom(): + exponent = convert_atom(exp.atom()) + elif exp.expr(): + exponent = convert_expr(exp.expr()) + return sympy.Pow(base, exponent, evaluate=False) + else: + if hasattr(exp, 'comp'): + return convert_comp(exp.comp()) + else: + return convert_comp(exp.comp_nofunc()) + + +def convert_comp(comp): + if comp.group(): + return convert_expr(comp.group().expr()) + elif comp.abs_group(): + return sympy.Abs(convert_expr(comp.abs_group().expr()), evaluate=False) + elif comp.atom(): + return convert_atom(comp.atom()) + elif comp.floor(): + return convert_floor(comp.floor()) + elif comp.ceil(): + return convert_ceil(comp.ceil()) + elif comp.func(): + return convert_func(comp.func()) + + +def convert_atom(atom): + if atom.LETTER(): + sname = atom.LETTER().getText() + if atom.subexpr(): + if atom.subexpr().expr(): # subscript is expr + subscript = convert_expr(atom.subexpr().expr()) + else: # subscript is atom + subscript = convert_atom(atom.subexpr().atom()) + sname += '_{' + StrPrinter().doprint(subscript) + '}' + if atom.SINGLE_QUOTES(): + sname += atom.SINGLE_QUOTES().getText() # put after subscript for easy identify + return sympy.Symbol(sname) + elif atom.SYMBOL(): + s = atom.SYMBOL().getText()[1:] + if s == "infty": + return sympy.oo + else: + if atom.subexpr(): + subscript = None + if atom.subexpr().expr(): # subscript is expr + subscript = convert_expr(atom.subexpr().expr()) + else: # subscript is atom + subscript = convert_atom(atom.subexpr().atom()) + subscriptName = StrPrinter().doprint(subscript) + s += '_{' + subscriptName + '}' + return sympy.Symbol(s) + elif atom.number(): + s = atom.number().getText().replace(",", "") + return sympy.Number(s) + elif atom.DIFFERENTIAL(): + var = get_differential_var(atom.DIFFERENTIAL()) + return sympy.Symbol('d' + var.name) + elif atom.mathit(): + text = rule2text(atom.mathit().mathit_text()) + return sympy.Symbol(text) + elif atom.frac(): + return convert_frac(atom.frac()) + elif atom.binom(): + return convert_binom(atom.binom()) + elif atom.bra(): + val = convert_expr(atom.bra().expr()) + return Bra(val) + elif atom.ket(): + val = convert_expr(atom.ket().expr()) + return Ket(val) + + +def rule2text(ctx): + stream = ctx.start.getInputStream() + # starting index of starting token + startIdx = ctx.start.start + # stopping index of stopping token + stopIdx = ctx.stop.stop + + return stream.getText(startIdx, stopIdx) + + +def convert_frac(frac): + diff_op = False + partial_op = False + if frac.lower and frac.upper: + lower_itv = frac.lower.getSourceInterval() + lower_itv_len = lower_itv[1] - lower_itv[0] + 1 + if (frac.lower.start == frac.lower.stop + and frac.lower.start.type == LaTeXLexer.DIFFERENTIAL): + wrt = get_differential_var_str(frac.lower.start.text) + diff_op = True + elif (lower_itv_len == 2 and frac.lower.start.type == LaTeXLexer.SYMBOL + and frac.lower.start.text == '\\partial' + and (frac.lower.stop.type == LaTeXLexer.LETTER + or frac.lower.stop.type == LaTeXLexer.SYMBOL)): + partial_op = True + wrt = frac.lower.stop.text + if frac.lower.stop.type == LaTeXLexer.SYMBOL: + wrt = wrt[1:] + + if diff_op or partial_op: + wrt = sympy.Symbol(wrt) + if (diff_op and frac.upper.start == frac.upper.stop + and frac.upper.start.type == LaTeXLexer.LETTER + and frac.upper.start.text == 'd'): + return [wrt] + elif (partial_op and frac.upper.start == frac.upper.stop + and frac.upper.start.type == LaTeXLexer.SYMBOL + and frac.upper.start.text == '\\partial'): + return [wrt] + upper_text = rule2text(frac.upper) + + expr_top = None + if diff_op and upper_text.startswith('d'): + expr_top = parse_latex(upper_text[1:]) + elif partial_op and frac.upper.start.text == '\\partial': + expr_top = parse_latex(upper_text[len('\\partial'):]) + if expr_top: + return sympy.Derivative(expr_top, wrt) + if frac.upper: + expr_top = convert_expr(frac.upper) + else: + expr_top = sympy.Number(frac.upperd.text) + if frac.lower: + expr_bot = convert_expr(frac.lower) + else: + expr_bot = sympy.Number(frac.lowerd.text) + inverse_denom = sympy.Pow(expr_bot, -1, evaluate=False) + if expr_top == 1: + return inverse_denom + else: + return sympy.Mul(expr_top, inverse_denom, evaluate=False) + +def convert_binom(binom): + expr_n = convert_expr(binom.n) + expr_k = convert_expr(binom.k) + return sympy.binomial(expr_n, expr_k, evaluate=False) + +def convert_floor(floor): + val = convert_expr(floor.val) + return sympy.floor(val, evaluate=False) + +def convert_ceil(ceil): + val = convert_expr(ceil.val) + return sympy.ceiling(val, evaluate=False) + +def convert_func(func): + if func.func_normal(): + if func.L_PAREN(): # function called with parenthesis + arg = convert_func_arg(func.func_arg()) + else: + arg = convert_func_arg(func.func_arg_noparens()) + + name = func.func_normal().start.text[1:] + + # change arc -> a + if name in [ + "arcsin", "arccos", "arctan", "arccsc", "arcsec", "arccot" + ]: + name = "a" + name[3:] + expr = getattr(sympy.functions, name)(arg, evaluate=False) + if name in ["arsinh", "arcosh", "artanh"]: + name = "a" + name[2:] + expr = getattr(sympy.functions, name)(arg, evaluate=False) + + if name == "exp": + expr = sympy.exp(arg, evaluate=False) + + if name in ("log", "lg", "ln"): + if func.subexpr(): + if func.subexpr().expr(): + base = convert_expr(func.subexpr().expr()) + else: + base = convert_atom(func.subexpr().atom()) + elif name == "lg": # ISO 80000-2:2019 + base = 10 + elif name in ("ln", "log"): # SymPy's latex printer prints ln as log by default + base = sympy.E + expr = sympy.log(arg, base, evaluate=False) + + func_pow = None + should_pow = True + if func.supexpr(): + if func.supexpr().expr(): + func_pow = convert_expr(func.supexpr().expr()) + else: + func_pow = convert_atom(func.supexpr().atom()) + + if name in [ + "sin", "cos", "tan", "csc", "sec", "cot", "sinh", "cosh", + "tanh" + ]: + if func_pow == -1: + name = "a" + name + should_pow = False + expr = getattr(sympy.functions, name)(arg, evaluate=False) + + if func_pow and should_pow: + expr = sympy.Pow(expr, func_pow, evaluate=False) + + return expr + elif func.LETTER() or func.SYMBOL(): + if func.LETTER(): + fname = func.LETTER().getText() + elif func.SYMBOL(): + fname = func.SYMBOL().getText()[1:] + fname = str(fname) # can't be unicode + if func.subexpr(): + if func.subexpr().expr(): # subscript is expr + subscript = convert_expr(func.subexpr().expr()) + else: # subscript is atom + subscript = convert_atom(func.subexpr().atom()) + subscriptName = StrPrinter().doprint(subscript) + fname += '_{' + subscriptName + '}' + if func.SINGLE_QUOTES(): + fname += func.SINGLE_QUOTES().getText() + input_args = func.args() + output_args = [] + while input_args.args(): # handle multiple arguments to function + output_args.append(convert_expr(input_args.expr())) + input_args = input_args.args() + output_args.append(convert_expr(input_args.expr())) + return sympy.Function(fname)(*output_args) + elif func.FUNC_INT(): + return handle_integral(func) + elif func.FUNC_SQRT(): + expr = convert_expr(func.base) + if func.root: + r = convert_expr(func.root) + return sympy.root(expr, r, evaluate=False) + else: + return sympy.sqrt(expr, evaluate=False) + elif func.FUNC_OVERLINE(): + expr = convert_expr(func.base) + return sympy.conjugate(expr, evaluate=False) + elif func.FUNC_SUM(): + return handle_sum_or_prod(func, "summation") + elif func.FUNC_PROD(): + return handle_sum_or_prod(func, "product") + elif func.FUNC_LIM(): + return handle_limit(func) + + +def convert_func_arg(arg): + if hasattr(arg, 'expr'): + return convert_expr(arg.expr()) + else: + return convert_mp(arg.mp_nofunc()) + + +def handle_integral(func): + if func.additive(): + integrand = convert_add(func.additive()) + elif func.frac(): + integrand = convert_frac(func.frac()) + else: + integrand = 1 + + int_var = None + if func.DIFFERENTIAL(): + int_var = get_differential_var(func.DIFFERENTIAL()) + else: + for sym in integrand.atoms(sympy.Symbol): + s = str(sym) + if len(s) > 1 and s[0] == 'd': + if s[1] == '\\': + int_var = sympy.Symbol(s[2:]) + else: + int_var = sympy.Symbol(s[1:]) + int_sym = sym + if int_var: + integrand = integrand.subs(int_sym, 1) + else: + # Assume dx by default + int_var = sympy.Symbol('x') + + if func.subexpr(): + if func.subexpr().atom(): + lower = convert_atom(func.subexpr().atom()) + else: + lower = convert_expr(func.subexpr().expr()) + if func.supexpr().atom(): + upper = convert_atom(func.supexpr().atom()) + else: + upper = convert_expr(func.supexpr().expr()) + return sympy.Integral(integrand, (int_var, lower, upper)) + else: + return sympy.Integral(integrand, int_var) + + +def handle_sum_or_prod(func, name): + val = convert_mp(func.mp()) + iter_var = convert_expr(func.subeq().equality().expr(0)) + start = convert_expr(func.subeq().equality().expr(1)) + if func.supexpr().expr(): # ^{expr} + end = convert_expr(func.supexpr().expr()) + else: # ^atom + end = convert_atom(func.supexpr().atom()) + + if name == "summation": + return sympy.Sum(val, (iter_var, start, end)) + elif name == "product": + return sympy.Product(val, (iter_var, start, end)) + + +def handle_limit(func): + sub = func.limit_sub() + if sub.LETTER(): + var = sympy.Symbol(sub.LETTER().getText()) + elif sub.SYMBOL(): + var = sympy.Symbol(sub.SYMBOL().getText()[1:]) + else: + var = sympy.Symbol('x') + if sub.SUB(): + direction = "-" + elif sub.ADD(): + direction = "+" + else: + direction = "+-" + approaching = convert_expr(sub.expr()) + content = convert_mp(func.mp()) + + return sympy.Limit(content, var, approaching, direction) + + +def get_differential_var(d): + text = get_differential_var_str(d.getText()) + return sympy.Symbol(text) + + +def get_differential_var_str(text): + for i in range(1, len(text)): + c = text[i] + if not (c == " " or c == "\r" or c == "\n" or c == "\t"): + idx = i + break + text = text[idx:] + if text[0] == "\\": + text = text[1:] + return text diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/errors.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/errors.py new file mode 100644 index 0000000000000000000000000000000000000000..d8c3ef9f06279df42d4b2054acc4cfe39b6682a5 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/errors.py @@ -0,0 +1,2 @@ +class LaTeXParsingError(Exception): + pass diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/lark/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/lark/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..92e58d3172e100cc376d0b416b3835d164bd5647 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/lark/__init__.py @@ -0,0 +1,2 @@ +from .latex_parser import parse_latex_lark, LarkLaTeXParser # noqa +from .transformer import TransformToSymPyExpr # noqa diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/lark/grammar/greek_symbols.lark b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/lark/grammar/greek_symbols.lark new file mode 100644 index 0000000000000000000000000000000000000000..7439fab9dcac284dc3c9b5fbfa4fc6db8b29dfd2 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/lark/grammar/greek_symbols.lark @@ -0,0 +1,28 @@ +// Greek symbols +// TODO: Shouold we include the uppercase variants for the symbols where the uppercase variant doesn't have a separate meaning? +ALPHA: "\\alpha" +BETA: "\\beta" +GAMMA: "\\gamma" +DELTA: "\\delta" // TODO: Should this be included? Delta usually denotes other things. +EPSILON: "\\epsilon" | "\\varepsilon" +ZETA: "\\zeta" +ETA: "\\eta" +THETA: "\\theta" | "\\vartheta" +// TODO: Should I add iota to the list? +KAPPA: "\\kappa" +LAMBDA: "\\lambda" // TODO: What about the uppercase variant? +MU: "\\mu" +NU: "\\nu" +XI: "\\xi" +// TODO: Should there be a separate note for transforming \pi into sympy.pi? +RHO: "\\rho" | "\\varrho" +// TODO: What should we do about sigma? +TAU: "\\tau" +UPSILON: "\\upsilon" +PHI: "\\phi" | "\\varphi" +CHI: "\\chi" +PSI: "\\psi" +OMEGA: "\\omega" + +GREEK_SYMBOL: ALPHA | BETA | GAMMA | DELTA | EPSILON | ZETA | ETA | THETA | KAPPA + | LAMBDA | MU | NU | XI | RHO | TAU | UPSILON | PHI | CHI | PSI | OMEGA diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/lark/grammar/latex.lark b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/lark/grammar/latex.lark new file mode 100644 index 0000000000000000000000000000000000000000..43e8d0e9105fa4da9bcdd2c0fa6111f6d523c9a9 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/lark/grammar/latex.lark @@ -0,0 +1,403 @@ +%ignore /[ \t\n\r]+/ + +%ignore "\\," | "\\thinspace" | "\\:" | "\\medspace" | "\\;" | "\\thickspace" +%ignore "\\quad" | "\\qquad" +%ignore "\\!" | "\\negthinspace" | "\\negmedspace" | "\\negthickspace" +%ignore "\\vrule" | "\\vcenter" | "\\vbox" | "\\vskip" | "\\vspace" | "\\hfill" +%ignore "\\*" | "\\-" | "\\." | "\\/" | "\\(" | "\\=" + +%ignore "\\left" | "\\right" +%ignore "\\limits" | "\\nolimits" +%ignore "\\displaystyle" + +///////////////////// tokens /////////////////////// + +// basic binary operators +ADD: "+" +SUB: "-" +MUL: "*" +DIV: "/" + +// tokens with distinct left and right symbols +L_BRACE: "{" +R_BRACE: "}" +L_BRACE_LITERAL: "\\{" +R_BRACE_LITERAL: "\\}" +L_BRACKET: "[" +R_BRACKET: "]" +L_CEIL: "\\lceil" +R_CEIL: "\\rceil" +L_FLOOR: "\\lfloor" +R_FLOOR: "\\rfloor" +L_PAREN: "(" +R_PAREN: ")" + +// limit, integral, sum, and product symbols +FUNC_LIM: "\\lim" +LIM_APPROACH_SYM: "\\to" | "\\rightarrow" | "\\Rightarrow" | "\\longrightarrow" | "\\Longrightarrow" +FUNC_INT: "\\int" | "\\intop" +FUNC_SUM: "\\sum" +FUNC_PROD: "\\prod" + +// common functions +FUNC_EXP: "\\exp" +FUNC_LOG: "\\log" +FUNC_LN: "\\ln" +FUNC_LG: "\\lg" +FUNC_MIN: "\\min" +FUNC_MAX: "\\max" + +// trigonometric functions +FUNC_SIN: "\\sin" +FUNC_COS: "\\cos" +FUNC_TAN: "\\tan" +FUNC_CSC: "\\csc" +FUNC_SEC: "\\sec" +FUNC_COT: "\\cot" + +// inverse trigonometric functions +FUNC_ARCSIN: "\\arcsin" +FUNC_ARCCOS: "\\arccos" +FUNC_ARCTAN: "\\arctan" +FUNC_ARCCSC: "\\arccsc" +FUNC_ARCSEC: "\\arcsec" +FUNC_ARCCOT: "\\arccot" + +// hyperbolic trigonometric functions +FUNC_SINH: "\\sinh" +FUNC_COSH: "\\cosh" +FUNC_TANH: "\\tanh" +FUNC_ARSINH: "\\arsinh" +FUNC_ARCOSH: "\\arcosh" +FUNC_ARTANH: "\\artanh" + +FUNC_SQRT: "\\sqrt" + +// miscellaneous symbols +CMD_TIMES: "\\times" +CMD_CDOT: "\\cdot" +CMD_DIV: "\\div" +CMD_FRAC: "\\frac" | "\\dfrac" | "\\tfrac" | "\\nicefrac" +CMD_BINOM: "\\binom" | "\\dbinom" | "\\tbinom" +CMD_OVERLINE: "\\overline" +CMD_LANGLE: "\\langle" +CMD_RANGLE: "\\rangle" + +CMD_MATHIT: "\\mathit" + +CMD_INFTY: "\\infty" + +BANG: "!" +BAR: "|" +CARET: "^" +COLON: ":" +UNDERSCORE: "_" + +// relational symbols +EQUAL: "=" +NOT_EQUAL: "\\neq" | "\\ne" +LT: "<" +LTE: "\\leq" | "\\le" | "\\leqslant" +GT: ">" +GTE: "\\geq" | "\\ge" | "\\geqslant" + +DIV_SYMBOL: CMD_DIV | DIV +MUL_SYMBOL: MUL | CMD_TIMES | CMD_CDOT + +%import .greek_symbols.GREEK_SYMBOL + +UPRIGHT_DIFFERENTIAL_SYMBOL: "\\text{d}" | "\\mathrm{d}" +DIFFERENTIAL_SYMBOL: "d" | UPRIGHT_DIFFERENTIAL_SYMBOL + +// disallow "d" as a variable name because we want to parse "d" as a differential symbol. +SYMBOL: /[a-zA-Z]'*/ +GREEK_SYMBOL_WITH_PRIMES: GREEK_SYMBOL "'"* +LATIN_SYMBOL_WITH_LATIN_SUBSCRIPT: /([a-zA-Z]'*)_(([A-Za-z0-9]|[a-zA-Z]+)|\{([A-Za-z0-9]|[a-zA-Z]+'*)\})/ +LATIN_SYMBOL_WITH_GREEK_SUBSCRIPT: /([a-zA-Z]'*)_/ GREEK_SYMBOL | /([a-zA-Z]'*)_/ L_BRACE GREEK_SYMBOL_WITH_PRIMES R_BRACE +// best to define the variant with braces like that instead of shoving it all into one case like in +// /([a-zA-Z])_/ L_BRACE? GREEK_SYMBOL R_BRACE? because then we can easily error out on input like +// r"h_{\theta" +GREEK_SYMBOL_WITH_LATIN_SUBSCRIPT: GREEK_SYMBOL_WITH_PRIMES /_(([A-Za-z0-9]|[a-zA-Z]+)|\{([A-Za-z0-9]|[a-zA-Z]+'*)\})/ +GREEK_SYMBOL_WITH_GREEK_SUBSCRIPT: GREEK_SYMBOL_WITH_PRIMES /_/ (GREEK_SYMBOL | L_BRACE GREEK_SYMBOL_WITH_PRIMES R_BRACE) +MULTI_LETTER_SYMBOL: /[a-zA-Z]+(\s+[a-zA-Z]+)*'*/ + +%import common.DIGIT -> DIGIT + +CMD_PRIME: "\\prime" +CMD_ASTERISK: "\\ast" + +PRIMES: "'"+ +STARS: "*"+ +PRIMES_VIA_CMD: CMD_PRIME+ +STARS_VIA_CMD: CMD_ASTERISK+ + +CMD_IMAGINARY_UNIT: "\\imaginaryunit" + +CMD_BEGIN: "\\begin" +CMD_END: "\\end" + +// matrices +IGNORE_L: /[ \t\n\r]*/ L_BRACE* /[ \t\n\r]*/ +IGNORE_R: /[ \t\n\r]*/ R_BRACE* /[ \t\n\r]*/ +ARRAY_MATRIX_BEGIN: L_BRACE "array" R_BRACE L_BRACE /[^}]*/ R_BRACE +ARRAY_MATRIX_END: L_BRACE "array" R_BRACE +AMSMATH_MATRIX: L_BRACE "matrix" R_BRACE +AMSMATH_PMATRIX: L_BRACE "pmatrix" R_BRACE +AMSMATH_BMATRIX: L_BRACE "bmatrix" R_BRACE +// Without the (L|R)_PARENs and (L|R)_BRACKETs, a matrix defined using +// \begin{array}...\end{array} or \begin{matrix}...\end{matrix} must +// not qualify as a complete matrix expression; this is done so that +// if we have \begin{array}...\end{array} or \begin{matrix}...\end{matrix} +// between BAR pairs, then they should be interpreted as determinants as +// opposed to sympy.Abs (absolute value) applied to a matrix. +CMD_BEGIN_AMSPMATRIX_AMSBMATRIX: CMD_BEGIN (AMSMATH_PMATRIX | AMSMATH_BMATRIX) +CMD_BEGIN_ARRAY_AMSMATRIX: (L_PAREN | L_BRACKET) IGNORE_L CMD_BEGIN (ARRAY_MATRIX_BEGIN | AMSMATH_MATRIX) +CMD_MATRIX_BEGIN: CMD_BEGIN_AMSPMATRIX_AMSBMATRIX | CMD_BEGIN_ARRAY_AMSMATRIX +CMD_END_AMSPMATRIX_AMSBMATRIX: CMD_END (AMSMATH_PMATRIX | AMSMATH_BMATRIX) +CMD_END_ARRAY_AMSMATRIX: CMD_END (ARRAY_MATRIX_END | AMSMATH_MATRIX) IGNORE_R "\\right"? (R_PAREN | R_BRACKET) +CMD_MATRIX_END: CMD_END_AMSPMATRIX_AMSBMATRIX | CMD_END_ARRAY_AMSMATRIX +MATRIX_COL_DELIM: "&" +MATRIX_ROW_DELIM: "\\\\" +FUNC_MATRIX_TRACE: "\\trace" +FUNC_MATRIX_ADJUGATE: "\\adjugate" + +// determinants +AMSMATH_VMATRIX: L_BRACE "vmatrix" R_BRACE +CMD_DETERMINANT_BEGIN_SIMPLE: CMD_BEGIN AMSMATH_VMATRIX +CMD_DETERMINANT_BEGIN_VARIANT: BAR IGNORE_L CMD_BEGIN (ARRAY_MATRIX_BEGIN | AMSMATH_MATRIX) +CMD_DETERMINANT_BEGIN: CMD_DETERMINANT_BEGIN_SIMPLE | CMD_DETERMINANT_BEGIN_VARIANT +CMD_DETERMINANT_END_SIMPLE: CMD_END AMSMATH_VMATRIX +CMD_DETERMINANT_END_VARIANT: CMD_END (ARRAY_MATRIX_END | AMSMATH_MATRIX) IGNORE_R "\\right"? BAR +CMD_DETERMINANT_END: CMD_DETERMINANT_END_SIMPLE | CMD_DETERMINANT_END_VARIANT +FUNC_DETERMINANT: "\\det" + +//////////////////// grammar ////////////////////// + +latex_string: _relation | _expression + +_one_letter_symbol: SYMBOL + | LATIN_SYMBOL_WITH_LATIN_SUBSCRIPT + | LATIN_SYMBOL_WITH_GREEK_SUBSCRIPT + | GREEK_SYMBOL_WITH_LATIN_SUBSCRIPT + | GREEK_SYMBOL_WITH_GREEK_SUBSCRIPT + | GREEK_SYMBOL_WITH_PRIMES +// LuaTeX-generated outputs of \mathit{foo'} and \mathit{foo}' +// seem to be the same on the surface. We allow both styles. +multi_letter_symbol: CMD_MATHIT L_BRACE MULTI_LETTER_SYMBOL R_BRACE + | CMD_MATHIT L_BRACE MULTI_LETTER_SYMBOL R_BRACE /'+/ +number: /\d+(\.\d*)?/ | CMD_IMAGINARY_UNIT + +_atomic_expr: _one_letter_symbol + | multi_letter_symbol + | number + | CMD_INFTY + +group_round_parentheses: L_PAREN _expression R_PAREN +group_square_brackets: L_BRACKET _expression R_BRACKET +group_curly_parentheses: L_BRACE _expression R_BRACE + +_relation: eq | ne | lt | lte | gt | gte + +eq: _expression EQUAL _expression +ne: _expression NOT_EQUAL _expression +lt: _expression LT _expression +lte: _expression LTE _expression +gt: _expression GT _expression +gte: _expression GTE _expression + +_expression_core: _atomic_expr | group_curly_parentheses + +add: _expression ADD _expression_mul + | ADD _expression_mul +sub: _expression SUB _expression_mul + | SUB _expression_mul +mul: _expression_mul MUL_SYMBOL _expression_power +div: _expression_mul DIV_SYMBOL _expression_power + +adjacent_expressions: (_one_letter_symbol | number) _expression_mul + | group_round_parentheses (group_round_parentheses | _one_letter_symbol) + | _function _function + | fraction _expression_mul + +_expression_func: _expression_core + | group_round_parentheses + | fraction + | binomial + | _function + | _integral// | derivative + | limit + | matrix + +_expression_power: _expression_func | superscript | matrix_prime | symbol_prime + +_expression_mul: _expression_power + | mul | div | adjacent_expressions + | summation | product + +_expression: _expression_mul | add | sub + +_limit_dir: "+" | "-" | L_BRACE ("+" | "-") R_BRACE + +limit_dir_expr: _expression CARET _limit_dir + +group_curly_parentheses_lim: L_BRACE _expression LIM_APPROACH_SYM (limit_dir_expr | _expression) R_BRACE + +limit: FUNC_LIM UNDERSCORE group_curly_parentheses_lim _expression + +differential: DIFFERENTIAL_SYMBOL _one_letter_symbol + +//_derivative_operator: CMD_FRAC L_BRACE DIFFERENTIAL_SYMBOL R_BRACE L_BRACE differential R_BRACE + +//derivative: _derivative_operator _expression + +_integral: normal_integral | integral_with_special_fraction + +normal_integral: FUNC_INT _expression DIFFERENTIAL_SYMBOL _one_letter_symbol + | FUNC_INT (CARET _expression_core UNDERSCORE _expression_core)? _expression? DIFFERENTIAL_SYMBOL _one_letter_symbol + | FUNC_INT (UNDERSCORE _expression_core CARET _expression_core)? _expression? DIFFERENTIAL_SYMBOL _one_letter_symbol + +group_curly_parentheses_int: L_BRACE _expression? differential R_BRACE + +special_fraction: CMD_FRAC group_curly_parentheses_int group_curly_parentheses + +integral_with_special_fraction: FUNC_INT special_fraction + | FUNC_INT (CARET _expression_core UNDERSCORE _expression_core)? special_fraction + | FUNC_INT (UNDERSCORE _expression_core CARET _expression_core)? special_fraction + +group_curly_parentheses_special: UNDERSCORE L_BRACE _atomic_expr EQUAL _atomic_expr R_BRACE CARET _expression_core + | CARET _expression_core UNDERSCORE L_BRACE _atomic_expr EQUAL _atomic_expr R_BRACE + +summation: FUNC_SUM group_curly_parentheses_special _expression + | FUNC_SUM group_curly_parentheses_special _expression + +product: FUNC_PROD group_curly_parentheses_special _expression + | FUNC_PROD group_curly_parentheses_special _expression + +superscript: _expression_func CARET (_expression_power | CMD_PRIME | CMD_ASTERISK) + | _expression_func CARET L_BRACE (PRIMES | STARS | PRIMES_VIA_CMD | STARS_VIA_CMD) R_BRACE + +matrix_prime: (matrix | group_round_parentheses) PRIMES + +symbol_prime: (LATIN_SYMBOL_WITH_LATIN_SUBSCRIPT + | LATIN_SYMBOL_WITH_GREEK_SUBSCRIPT + | GREEK_SYMBOL_WITH_LATIN_SUBSCRIPT + | GREEK_SYMBOL_WITH_GREEK_SUBSCRIPT) PRIMES + +fraction: _basic_fraction + | _simple_fraction + | _general_fraction + +_basic_fraction: CMD_FRAC DIGIT (DIGIT | SYMBOL | GREEK_SYMBOL_WITH_PRIMES) + +_simple_fraction: CMD_FRAC DIGIT group_curly_parentheses + | CMD_FRAC group_curly_parentheses (DIGIT | SYMBOL | GREEK_SYMBOL_WITH_PRIMES) + +_general_fraction: CMD_FRAC group_curly_parentheses group_curly_parentheses + +binomial: _basic_binomial + | _simple_binomial + | _general_binomial + +_basic_binomial: CMD_BINOM DIGIT (DIGIT | SYMBOL | GREEK_SYMBOL_WITH_PRIMES) + +_simple_binomial: CMD_BINOM DIGIT group_curly_parentheses + | CMD_BINOM group_curly_parentheses (DIGIT | SYMBOL | GREEK_SYMBOL_WITH_PRIMES) + +_general_binomial: CMD_BINOM group_curly_parentheses group_curly_parentheses + +list_of_expressions: _expression ("," _expression)* + +function_applied: _one_letter_symbol L_PAREN list_of_expressions R_PAREN + +min: FUNC_MIN L_PAREN list_of_expressions R_PAREN + +max: FUNC_MAX L_PAREN list_of_expressions R_PAREN + +bra: CMD_LANGLE _expression BAR + +ket: BAR _expression CMD_RANGLE + +inner_product: CMD_LANGLE _expression BAR _expression CMD_RANGLE + +_function: function_applied + | abs | floor | ceil + | _trigonometric_function | _inverse_trigonometric_function + | _trigonometric_function_power + | _hyperbolic_trigonometric_function | _inverse_hyperbolic_trigonometric_function + | exponential + | log + | square_root + | factorial + | conjugate + | max | min + | bra | ket | inner_product + | determinant + | trace + | adjugate + +exponential: FUNC_EXP _expression + +log: FUNC_LOG _expression + | FUNC_LN _expression + | FUNC_LG _expression + | FUNC_LOG UNDERSCORE (DIGIT | _one_letter_symbol) _expression + | FUNC_LOG UNDERSCORE group_curly_parentheses _expression + +square_root: FUNC_SQRT group_curly_parentheses + | FUNC_SQRT group_square_brackets group_curly_parentheses + +factorial: _expression_func BANG + +conjugate: CMD_OVERLINE group_curly_parentheses + | CMD_OVERLINE DIGIT + +_trigonometric_function: sin | cos | tan | csc | sec | cot + +sin: FUNC_SIN _expression +cos: FUNC_COS _expression +tan: FUNC_TAN _expression +csc: FUNC_CSC _expression +sec: FUNC_SEC _expression +cot: FUNC_COT _expression + +_trigonometric_function_power: sin_power | cos_power | tan_power | csc_power | sec_power | cot_power + +sin_power: FUNC_SIN CARET _expression_core _expression +cos_power: FUNC_COS CARET _expression_core _expression +tan_power: FUNC_TAN CARET _expression_core _expression +csc_power: FUNC_CSC CARET _expression_core _expression +sec_power: FUNC_SEC CARET _expression_core _expression +cot_power: FUNC_COT CARET _expression_core _expression + +_hyperbolic_trigonometric_function: sinh | cosh | tanh + +sinh: FUNC_SINH _expression +cosh: FUNC_COSH _expression +tanh: FUNC_TANH _expression + +_inverse_trigonometric_function: arcsin | arccos | arctan | arccsc | arcsec | arccot + +arcsin: FUNC_ARCSIN _expression +arccos: FUNC_ARCCOS _expression +arctan: FUNC_ARCTAN _expression +arccsc: FUNC_ARCCSC _expression +arcsec: FUNC_ARCSEC _expression +arccot: FUNC_ARCCOT _expression + +_inverse_hyperbolic_trigonometric_function: asinh | acosh | atanh + +asinh: FUNC_ARSINH _expression +acosh: FUNC_ARCOSH _expression +atanh: FUNC_ARTANH _expression + +abs: BAR _expression BAR +floor: L_FLOOR _expression R_FLOOR +ceil: L_CEIL _expression R_CEIL + +matrix: CMD_MATRIX_BEGIN matrix_body CMD_MATRIX_END +matrix_body: matrix_row (MATRIX_ROW_DELIM matrix_row)* (MATRIX_ROW_DELIM)? +matrix_row: _expression (MATRIX_COL_DELIM _expression)* +determinant: (CMD_DETERMINANT_BEGIN matrix_body CMD_DETERMINANT_END) + | FUNC_DETERMINANT _expression +trace: FUNC_MATRIX_TRACE _expression +adjugate: FUNC_MATRIX_ADJUGATE _expression diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/lark/latex_parser.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/lark/latex_parser.py new file mode 100644 index 0000000000000000000000000000000000000000..29f594b0de4bfd4648df1554d5863a37afff035f --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/lark/latex_parser.py @@ -0,0 +1,145 @@ +import os +import logging +import re +from pathlib import Path + +from sympy.external import import_module +from sympy.parsing.latex.lark.transformer import TransformToSymPyExpr + +_lark = import_module("lark") + + +class LarkLaTeXParser: + r"""Class for converting input `\mathrm{\LaTeX}` strings into SymPy Expressions. + It holds all the necessary internal data for doing so, and exposes hooks for + customizing its behavior. + + Parameters + ========== + + print_debug_output : bool, optional + + If set to ``True``, prints debug output to the logger. Defaults to ``False``. + + transform : bool, optional + + If set to ``True``, the class runs the Transformer class on the parse tree + generated by running ``Lark.parse`` on the input string. Defaults to ``True``. + + Setting it to ``False`` can help with debugging the `\mathrm{\LaTeX}` grammar. + + grammar_file : str, optional + + The path to the grammar file that the parser should use. If set to ``None``, + it uses the default grammar, which is in ``grammar/latex.lark``, relative to + the ``sympy/parsing/latex/lark/`` directory. + + transformer : str, optional + + The name of the Transformer class to use. If set to ``None``, it uses the + default transformer class, which is :py:func:`TransformToSymPyExpr`. + + """ + def __init__(self, print_debug_output=False, transform=True, grammar_file=None, transformer=None): + grammar_dir_path = os.path.join(os.path.dirname(__file__), "grammar/") + + if grammar_file is None: + latex_grammar = Path(os.path.join(grammar_dir_path, "latex.lark")).read_text(encoding="utf-8") + else: + latex_grammar = Path(grammar_file).read_text(encoding="utf-8") + + self.parser = _lark.Lark( + latex_grammar, + source_path=grammar_dir_path, + parser="earley", + start="latex_string", + lexer="auto", + ambiguity="explicit", + propagate_positions=False, + maybe_placeholders=False, + keep_all_tokens=True) + + self.print_debug_output = print_debug_output + self.transform_expr = transform + + if transformer is None: + self.transformer = TransformToSymPyExpr() + else: + self.transformer = transformer() + + def doparse(self, s: str): + if self.print_debug_output: + _lark.logger.setLevel(logging.DEBUG) + + parse_tree = self.parser.parse(s) + + if not self.transform_expr: + # exit early and return the parse tree + _lark.logger.debug("expression = %s", s) + _lark.logger.debug(parse_tree) + _lark.logger.debug(parse_tree.pretty()) + return parse_tree + + if self.print_debug_output: + # print this stuff before attempting to run the transformer + _lark.logger.debug("expression = %s", s) + # print the `parse_tree` variable + _lark.logger.debug(parse_tree.pretty()) + + sympy_expression = self.transformer.transform(parse_tree) + + if self.print_debug_output: + _lark.logger.debug("SymPy expression = %s", sympy_expression) + + return sympy_expression + + +if _lark is not None: + _lark_latex_parser = LarkLaTeXParser() + + +def parse_latex_lark(s: str): + """ + Experimental LaTeX parser using Lark. + + This function is still under development and its API may change with the + next releases of SymPy. + """ + if _lark is None: + raise ImportError("Lark is probably not installed") + return _lark_latex_parser.doparse(s) + + +def _pretty_print_lark_trees(tree, indent=0, show_expr=True): + if isinstance(tree, _lark.Token): + return tree.value + + data = str(tree.data) + + is_expr = data.startswith("expression") + + if is_expr: + data = re.sub(r"^expression", "E", data) + + is_ambig = (data == "_ambig") + + if is_ambig: + new_indent = indent + 2 + else: + new_indent = indent + + output = "" + show_node = not is_expr or show_expr + + if show_node: + output += str(data) + "(" + + if is_ambig: + output += "\n" + "\n".join([" " * new_indent + _pretty_print_lark_trees(i, new_indent, show_expr) for i in tree.children]) + else: + output += ",".join([_pretty_print_lark_trees(i, new_indent, show_expr) for i in tree.children]) + + if show_node: + output += ")" + + return output diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/lark/transformer.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/lark/transformer.py new file mode 100644 index 0000000000000000000000000000000000000000..cbd514b6517336207a57de6d28bcce25858071dc --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/latex/lark/transformer.py @@ -0,0 +1,730 @@ +import re + +import sympy +from sympy.external import import_module +from sympy.parsing.latex.errors import LaTeXParsingError + +lark = import_module("lark") + +if lark: + from lark import Transformer, Token, Tree # type: ignore +else: + class Transformer: # type: ignore + def transform(self, *args): + pass + + + class Token: # type: ignore + pass + + + class Tree: # type: ignore + pass + + +# noinspection PyPep8Naming,PyMethodMayBeStatic +class TransformToSymPyExpr(Transformer): + """Returns a SymPy expression that is generated by traversing the ``lark.Tree`` + passed to the ``.transform()`` function. + + Notes + ===== + + **This class is never supposed to be used directly.** + + In order to tweak the behavior of this class, it has to be subclassed and then after + the required modifications are made, the name of the new class should be passed to + the :py:class:`LarkLaTeXParser` class by using the ``transformer`` argument in the + constructor. + + Parameters + ========== + + visit_tokens : bool, optional + For information about what this option does, see `here + `_. + + Note that the option must be set to ``True`` for the default parser to work. + """ + + SYMBOL = sympy.Symbol + DIGIT = sympy.core.numbers.Integer + + def CMD_INFTY(self, tokens): + return sympy.oo + + def GREEK_SYMBOL_WITH_PRIMES(self, tokens): + # we omit the first character because it is a backslash. Also, if the variable name has "var" in it, + # like "varphi" or "varepsilon", we remove that too + variable_name = re.sub("var", "", tokens[1:]) + + return sympy.Symbol(variable_name) + + def LATIN_SYMBOL_WITH_LATIN_SUBSCRIPT(self, tokens): + base, sub = tokens.value.split("_") + if sub.startswith("{"): + return sympy.Symbol("%s_{%s}" % (base, sub[1:-1])) + else: + return sympy.Symbol("%s_{%s}" % (base, sub)) + + def GREEK_SYMBOL_WITH_LATIN_SUBSCRIPT(self, tokens): + base, sub = tokens.value.split("_") + greek_letter = re.sub("var", "", base[1:]) + + if sub.startswith("{"): + return sympy.Symbol("%s_{%s}" % (greek_letter, sub[1:-1])) + else: + return sympy.Symbol("%s_{%s}" % (greek_letter, sub)) + + def LATIN_SYMBOL_WITH_GREEK_SUBSCRIPT(self, tokens): + base, sub = tokens.value.split("_") + if sub.startswith("{"): + greek_letter = sub[2:-1] + else: + greek_letter = sub[1:] + + greek_letter = re.sub("var", "", greek_letter) + return sympy.Symbol("%s_{%s}" % (base, greek_letter)) + + + def GREEK_SYMBOL_WITH_GREEK_SUBSCRIPT(self, tokens): + base, sub = tokens.value.split("_") + greek_base = re.sub("var", "", base[1:]) + + if sub.startswith("{"): + greek_sub = sub[2:-1] + else: + greek_sub = sub[1:] + + greek_sub = re.sub("var", "", greek_sub) + return sympy.Symbol("%s_{%s}" % (greek_base, greek_sub)) + + def multi_letter_symbol(self, tokens): + if len(tokens) == 4: # no primes (single quotes) on symbol + return sympy.Symbol(tokens[2]) + if len(tokens) == 5: # there are primes on the symbol + return sympy.Symbol(tokens[2] + tokens[4]) + + def number(self, tokens): + if tokens[0].type == "CMD_IMAGINARY_UNIT": + return sympy.I + + if "." in tokens[0]: + return sympy.core.numbers.Float(tokens[0]) + else: + return sympy.core.numbers.Integer(tokens[0]) + + def latex_string(self, tokens): + return tokens[0] + + def group_round_parentheses(self, tokens): + return tokens[1] + + def group_square_brackets(self, tokens): + return tokens[1] + + def group_curly_parentheses(self, tokens): + return tokens[1] + + def eq(self, tokens): + return sympy.Eq(tokens[0], tokens[2]) + + def ne(self, tokens): + return sympy.Ne(tokens[0], tokens[2]) + + def lt(self, tokens): + return sympy.Lt(tokens[0], tokens[2]) + + def lte(self, tokens): + return sympy.Le(tokens[0], tokens[2]) + + def gt(self, tokens): + return sympy.Gt(tokens[0], tokens[2]) + + def gte(self, tokens): + return sympy.Ge(tokens[0], tokens[2]) + + def add(self, tokens): + if len(tokens) == 2: # +a + return tokens[1] + if len(tokens) == 3: # a + b + lh = tokens[0] + rh = tokens[2] + + if self._obj_is_sympy_Matrix(lh) or self._obj_is_sympy_Matrix(rh): + return sympy.MatAdd(lh, rh) + + return sympy.Add(lh, rh) + + def sub(self, tokens): + if len(tokens) == 2: # -a + x = tokens[1] + + if self._obj_is_sympy_Matrix(x): + return sympy.MatMul(-1, x) + + return -x + if len(tokens) == 3: # a - b + lh = tokens[0] + rh = tokens[2] + + if self._obj_is_sympy_Matrix(lh) or self._obj_is_sympy_Matrix(rh): + return sympy.MatAdd(lh, sympy.MatMul(-1, rh)) + + return sympy.Add(lh, -rh) + + def mul(self, tokens): + lh = tokens[0] + rh = tokens[2] + + if self._obj_is_sympy_Matrix(lh) or self._obj_is_sympy_Matrix(rh): + return sympy.MatMul(lh, rh) + + return sympy.Mul(lh, rh) + + def div(self, tokens): + return self._handle_division(tokens[0], tokens[2]) + + def adjacent_expressions(self, tokens): + # Most of the time, if two expressions are next to each other, it means implicit multiplication, + # but not always + from sympy.physics.quantum import Bra, Ket + if isinstance(tokens[0], Ket) and isinstance(tokens[1], Bra): + from sympy.physics.quantum import OuterProduct + return OuterProduct(tokens[0], tokens[1]) + elif tokens[0] == sympy.Symbol("d"): + # If the leftmost token is a "d", then it is highly likely that this is a differential + return tokens[0], tokens[1] + elif isinstance(tokens[0], tuple): + # then we have a derivative + return sympy.Derivative(tokens[1], tokens[0][1]) + else: + return sympy.Mul(tokens[0], tokens[1]) + + def superscript(self, tokens): + def isprime(x): + return isinstance(x, Token) and x.type == "PRIMES" + + def iscmdprime(x): + return isinstance(x, Token) and (x.type == "PRIMES_VIA_CMD" + or x.type == "CMD_PRIME") + + def isstar(x): + return isinstance(x, Token) and x.type == "STARS" + + def iscmdstar(x): + return isinstance(x, Token) and (x.type == "STARS_VIA_CMD" + or x.type == "CMD_ASTERISK") + + base = tokens[0] + if len(tokens) == 3: # a^b OR a^\prime OR a^\ast + sup = tokens[2] + if len(tokens) == 5: + # a^{'}, a^{''}, ... OR + # a^{*}, a^{**}, ... OR + # a^{\prime}, a^{\prime\prime}, ... OR + # a^{\ast}, a^{\ast\ast}, ... + sup = tokens[3] + + if self._obj_is_sympy_Matrix(base): + if sup == sympy.Symbol("T"): + return sympy.Transpose(base) + if sup == sympy.Symbol("H"): + return sympy.adjoint(base) + if isprime(sup): + sup = sup.value + if len(sup) % 2 == 0: + return base + return sympy.Transpose(base) + if iscmdprime(sup): + sup = sup.value + if (len(sup)/len(r"\prime")) % 2 == 0: + return base + return sympy.Transpose(base) + if isstar(sup): + sup = sup.value + # need .doit() in order to be consistent with + # sympy.adjoint() which returns the evaluated adjoint + # of a matrix + if len(sup) % 2 == 0: + return base.doit() + return sympy.adjoint(base) + if iscmdstar(sup): + sup = sup.value + # need .doit() for same reason as above + if (len(sup)/len(r"\ast")) % 2 == 0: + return base.doit() + return sympy.adjoint(base) + + if isprime(sup) or iscmdprime(sup) or isstar(sup) or iscmdstar(sup): + raise LaTeXParsingError(f"{base} with superscript {sup} is not understood.") + + return sympy.Pow(base, sup) + + def matrix_prime(self, tokens): + base = tokens[0] + primes = tokens[1].value + + if not self._obj_is_sympy_Matrix(base): + raise LaTeXParsingError(f"({base}){primes} is not understood.") + + if len(primes) % 2 == 0: + return base + + return sympy.Transpose(base) + + def symbol_prime(self, tokens): + base = tokens[0] + primes = tokens[1].value + + return sympy.Symbol(f"{base.name}{primes}") + + def fraction(self, tokens): + numerator = tokens[1] + if isinstance(tokens[2], tuple): + # we only need the variable w.r.t. which we are differentiating + _, variable = tokens[2] + + # we will pass this information upwards + return "derivative", variable + else: + denominator = tokens[2] + return self._handle_division(numerator, denominator) + + def binomial(self, tokens): + return sympy.binomial(tokens[1], tokens[2]) + + def normal_integral(self, tokens): + underscore_index = None + caret_index = None + + if "_" in tokens: + # we need to know the index because the next item in the list is the + # arguments for the lower bound of the integral + underscore_index = tokens.index("_") + + if "^" in tokens: + # we need to know the index because the next item in the list is the + # arguments for the upper bound of the integral + caret_index = tokens.index("^") + + lower_bound = tokens[underscore_index + 1] if underscore_index else None + upper_bound = tokens[caret_index + 1] if caret_index else None + + differential_symbol = self._extract_differential_symbol(tokens) + + if differential_symbol is None: + raise LaTeXParsingError("Differential symbol was not found in the expression." + "Valid differential symbols are \"d\", \"\\text{d}, and \"\\mathrm{d}\".") + + # else we can assume that a differential symbol was found + differential_variable_index = tokens.index(differential_symbol) + 1 + differential_variable = tokens[differential_variable_index] + + # we can't simply do something like `if (lower_bound and not upper_bound) ...` because this would + # evaluate to `True` if the `lower_bound` is 0 and upper bound is non-zero + if lower_bound is not None and upper_bound is None: + # then one was given and the other wasn't + raise LaTeXParsingError("Lower bound for the integral was found, but upper bound was not found.") + + if upper_bound is not None and lower_bound is None: + # then one was given and the other wasn't + raise LaTeXParsingError("Upper bound for the integral was found, but lower bound was not found.") + + # check if any expression was given or not. If it wasn't, then set the integrand to 1. + if underscore_index is not None and underscore_index == differential_variable_index - 3: + # The Token at differential_variable_index - 2 should be the integrand. However, if going one more step + # backwards after that gives us the underscore, then that means that there _was_ no integrand. + # Example: \int^7_0 dx + integrand = 1 + elif caret_index is not None and caret_index == differential_variable_index - 3: + # The Token at differential_variable_index - 2 should be the integrand. However, if going one more step + # backwards after that gives us the caret, then that means that there _was_ no integrand. + # Example: \int_0^7 dx + integrand = 1 + elif differential_variable_index == 2: + # this means we have something like "\int dx", because the "\int" symbol will always be + # at index 0 in `tokens` + integrand = 1 + else: + # The Token at differential_variable_index - 1 is the differential symbol itself, so we need to go one + # more step before that. + integrand = tokens[differential_variable_index - 2] + + if lower_bound is not None: + # then we have a definite integral + + # we can assume that either both the lower and upper bounds are given, or + # neither of them are + return sympy.Integral(integrand, (differential_variable, lower_bound, upper_bound)) + else: + # we have an indefinite integral + return sympy.Integral(integrand, differential_variable) + + def group_curly_parentheses_int(self, tokens): + # return signature is a tuple consisting of the expression in the numerator, along with the variable of + # integration + if len(tokens) == 3: + return 1, tokens[1] + elif len(tokens) == 4: + return tokens[1], tokens[2] + # there are no other possibilities + + def special_fraction(self, tokens): + numerator, variable = tokens[1] + denominator = tokens[2] + + # We pass the integrand, along with information about the variable of integration, upw + return sympy.Mul(numerator, sympy.Pow(denominator, -1)), variable + + def integral_with_special_fraction(self, tokens): + underscore_index = None + caret_index = None + + if "_" in tokens: + # we need to know the index because the next item in the list is the + # arguments for the lower bound of the integral + underscore_index = tokens.index("_") + + if "^" in tokens: + # we need to know the index because the next item in the list is the + # arguments for the upper bound of the integral + caret_index = tokens.index("^") + + lower_bound = tokens[underscore_index + 1] if underscore_index else None + upper_bound = tokens[caret_index + 1] if caret_index else None + + # we can't simply do something like `if (lower_bound and not upper_bound) ...` because this would + # evaluate to `True` if the `lower_bound` is 0 and upper bound is non-zero + if lower_bound is not None and upper_bound is None: + # then one was given and the other wasn't + raise LaTeXParsingError("Lower bound for the integral was found, but upper bound was not found.") + + if upper_bound is not None and lower_bound is None: + # then one was given and the other wasn't + raise LaTeXParsingError("Upper bound for the integral was found, but lower bound was not found.") + + integrand, differential_variable = tokens[-1] + + if lower_bound is not None: + # then we have a definite integral + + # we can assume that either both the lower and upper bounds are given, or + # neither of them are + return sympy.Integral(integrand, (differential_variable, lower_bound, upper_bound)) + else: + # we have an indefinite integral + return sympy.Integral(integrand, differential_variable) + + def group_curly_parentheses_special(self, tokens): + underscore_index = tokens.index("_") + caret_index = tokens.index("^") + + # given the type of expressions we are parsing, we can assume that the lower limit + # will always use braces around its arguments. This is because we don't support + # converting unconstrained sums into SymPy expressions. + + # first we isolate the bottom limit + left_brace_index = tokens.index("{", underscore_index) + right_brace_index = tokens.index("}", underscore_index) + + bottom_limit = tokens[left_brace_index + 1: right_brace_index] + + # next, we isolate the upper limit + top_limit = tokens[caret_index + 1:] + + # the code below will be useful for supporting things like `\sum_{n = 0}^{n = 5} n^2` + # if "{" in top_limit: + # left_brace_index = tokens.index("{", caret_index) + # if left_brace_index != -1: + # # then there's a left brace in the string, and we need to find the closing right brace + # right_brace_index = tokens.index("}", caret_index) + # top_limit = tokens[left_brace_index + 1: right_brace_index] + + # print(f"top limit = {top_limit}") + + index_variable = bottom_limit[0] + lower_limit = bottom_limit[-1] + upper_limit = top_limit[0] # for now, the index will always be 0 + + # print(f"return value = ({index_variable}, {lower_limit}, {upper_limit})") + + return index_variable, lower_limit, upper_limit + + def summation(self, tokens): + return sympy.Sum(tokens[2], tokens[1]) + + def product(self, tokens): + return sympy.Product(tokens[2], tokens[1]) + + def limit_dir_expr(self, tokens): + caret_index = tokens.index("^") + + if "{" in tokens: + left_curly_brace_index = tokens.index("{", caret_index) + direction = tokens[left_curly_brace_index + 1] + else: + direction = tokens[caret_index + 1] + + if direction == "+": + return tokens[0], "+" + elif direction == "-": + return tokens[0], "-" + else: + return tokens[0], "+-" + + def group_curly_parentheses_lim(self, tokens): + limit_variable = tokens[1] + if isinstance(tokens[3], tuple): + destination, direction = tokens[3] + else: + destination = tokens[3] + direction = "+-" + + return limit_variable, destination, direction + + def limit(self, tokens): + limit_variable, destination, direction = tokens[2] + + return sympy.Limit(tokens[-1], limit_variable, destination, direction) + + def differential(self, tokens): + return tokens[1] + + def derivative(self, tokens): + return sympy.Derivative(tokens[-1], tokens[5]) + + def list_of_expressions(self, tokens): + if len(tokens) == 1: + # we return it verbatim because the function_applied node expects + # a list + return tokens + else: + def remove_tokens(args): + if isinstance(args, Token): + if args.type != "COMMA": + # An unexpected token was encountered + raise LaTeXParsingError("A comma token was expected, but some other token was encountered.") + return False + return True + + return filter(remove_tokens, tokens) + + def function_applied(self, tokens): + return sympy.Function(tokens[0])(*tokens[2]) + + def min(self, tokens): + return sympy.Min(*tokens[2]) + + def max(self, tokens): + return sympy.Max(*tokens[2]) + + def bra(self, tokens): + from sympy.physics.quantum import Bra + return Bra(tokens[1]) + + def ket(self, tokens): + from sympy.physics.quantum import Ket + return Ket(tokens[1]) + + def inner_product(self, tokens): + from sympy.physics.quantum import Bra, Ket, InnerProduct + return InnerProduct(Bra(tokens[1]), Ket(tokens[3])) + + def sin(self, tokens): + return sympy.sin(tokens[1]) + + def cos(self, tokens): + return sympy.cos(tokens[1]) + + def tan(self, tokens): + return sympy.tan(tokens[1]) + + def csc(self, tokens): + return sympy.csc(tokens[1]) + + def sec(self, tokens): + return sympy.sec(tokens[1]) + + def cot(self, tokens): + return sympy.cot(tokens[1]) + + def sin_power(self, tokens): + exponent = tokens[2] + if exponent == -1: + return sympy.asin(tokens[-1]) + else: + return sympy.Pow(sympy.sin(tokens[-1]), exponent) + + def cos_power(self, tokens): + exponent = tokens[2] + if exponent == -1: + return sympy.acos(tokens[-1]) + else: + return sympy.Pow(sympy.cos(tokens[-1]), exponent) + + def tan_power(self, tokens): + exponent = tokens[2] + if exponent == -1: + return sympy.atan(tokens[-1]) + else: + return sympy.Pow(sympy.tan(tokens[-1]), exponent) + + def csc_power(self, tokens): + exponent = tokens[2] + if exponent == -1: + return sympy.acsc(tokens[-1]) + else: + return sympy.Pow(sympy.csc(tokens[-1]), exponent) + + def sec_power(self, tokens): + exponent = tokens[2] + if exponent == -1: + return sympy.asec(tokens[-1]) + else: + return sympy.Pow(sympy.sec(tokens[-1]), exponent) + + def cot_power(self, tokens): + exponent = tokens[2] + if exponent == -1: + return sympy.acot(tokens[-1]) + else: + return sympy.Pow(sympy.cot(tokens[-1]), exponent) + + def arcsin(self, tokens): + return sympy.asin(tokens[1]) + + def arccos(self, tokens): + return sympy.acos(tokens[1]) + + def arctan(self, tokens): + return sympy.atan(tokens[1]) + + def arccsc(self, tokens): + return sympy.acsc(tokens[1]) + + def arcsec(self, tokens): + return sympy.asec(tokens[1]) + + def arccot(self, tokens): + return sympy.acot(tokens[1]) + + def sinh(self, tokens): + return sympy.sinh(tokens[1]) + + def cosh(self, tokens): + return sympy.cosh(tokens[1]) + + def tanh(self, tokens): + return sympy.tanh(tokens[1]) + + def asinh(self, tokens): + return sympy.asinh(tokens[1]) + + def acosh(self, tokens): + return sympy.acosh(tokens[1]) + + def atanh(self, tokens): + return sympy.atanh(tokens[1]) + + def abs(self, tokens): + return sympy.Abs(tokens[1]) + + def floor(self, tokens): + return sympy.floor(tokens[1]) + + def ceil(self, tokens): + return sympy.ceiling(tokens[1]) + + def factorial(self, tokens): + return sympy.factorial(tokens[0]) + + def conjugate(self, tokens): + return sympy.conjugate(tokens[1]) + + def square_root(self, tokens): + if len(tokens) == 2: + # then there was no square bracket argument + return sympy.sqrt(tokens[1]) + elif len(tokens) == 3: + # then there _was_ a square bracket argument + return sympy.root(tokens[2], tokens[1]) + + def exponential(self, tokens): + return sympy.exp(tokens[1]) + + def log(self, tokens): + if tokens[0].type == "FUNC_LG": + # we don't need to check if there's an underscore or not because having one + # in this case would be meaningless + # TODO: ANTLR refers to ISO 80000-2:2019. should we keep base 10 or base 2? + return sympy.log(tokens[1], 10) + elif tokens[0].type == "FUNC_LN": + return sympy.log(tokens[1]) + elif tokens[0].type == "FUNC_LOG": + # we check if a base was specified or not + if "_" in tokens: + # then a base was specified + return sympy.log(tokens[3], tokens[2]) + else: + # a base was not specified + return sympy.log(tokens[1]) + + def _extract_differential_symbol(self, s: str): + differential_symbols = {"d", r"\text{d}", r"\mathrm{d}"} + + differential_symbol = next((symbol for symbol in differential_symbols if symbol in s), None) + + return differential_symbol + + def matrix(self, tokens): + def is_matrix_row(x): + return (isinstance(x, Tree) and x.data == "matrix_row") + + def is_not_col_delim(y): + return (not isinstance(y, Token) or y.type != "MATRIX_COL_DELIM") + + matrix_body = tokens[1].children + return sympy.Matrix([[y for y in x.children if is_not_col_delim(y)] + for x in matrix_body if is_matrix_row(x)]) + + def determinant(self, tokens): + if len(tokens) == 2: # \det A + if not self._obj_is_sympy_Matrix(tokens[1]): + raise LaTeXParsingError("Cannot take determinant of non-matrix.") + + return tokens[1].det() + + if len(tokens) == 3: # | A | + return self.matrix(tokens).det() + + def trace(self, tokens): + if not self._obj_is_sympy_Matrix(tokens[1]): + raise LaTeXParsingError("Cannot take trace of non-matrix.") + + return sympy.Trace(tokens[1]) + + def adjugate(self, tokens): + if not self._obj_is_sympy_Matrix(tokens[1]): + raise LaTeXParsingError("Cannot take adjugate of non-matrix.") + + # need .doit() since MatAdd does not support .adjugate() method + return tokens[1].doit().adjugate() + + def _obj_is_sympy_Matrix(self, obj): + if hasattr(obj, "is_Matrix"): + return obj.is_Matrix + + return isinstance(obj, sympy.Matrix) + + def _handle_division(self, numerator, denominator): + if self._obj_is_sympy_Matrix(denominator): + raise LaTeXParsingError("Cannot divide by matrices like this since " + "it is not clear if left or right multiplication " + "by the inverse is intended. Try explicitly " + "multiplying by the inverse instead.") + + if self._obj_is_sympy_Matrix(numerator): + return sympy.MatMul(numerator, sympy.Pow(denominator, -1)) + + return sympy.Mul(numerator, sympy.Pow(denominator, -1)) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/mathematica.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/mathematica.py new file mode 100644 index 0000000000000000000000000000000000000000..b5824a8c33ee402d03e6c5617eeeea21d4a457d1 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/mathematica.py @@ -0,0 +1,1085 @@ +from __future__ import annotations +import re +import typing +from itertools import product +from typing import Any, Callable + +import sympy +from sympy import Mul, Add, Pow, Rational, log, exp, sqrt, cos, sin, tan, asin, acos, acot, asec, acsc, sinh, cosh, tanh, asinh, \ + acosh, atanh, acoth, asech, acsch, expand, im, flatten, polylog, cancel, expand_trig, sign, simplify, \ + UnevaluatedExpr, S, atan, atan2, Mod, Max, Min, rf, Ei, Si, Ci, airyai, airyaiprime, airybi, primepi, prime, \ + isprime, cot, sec, csc, csch, sech, coth, Function, I, pi, Tuple, GreaterThan, StrictGreaterThan, StrictLessThan, \ + LessThan, Equality, Or, And, Lambda, Integer, Dummy, symbols +from sympy.core.sympify import sympify, _sympify +from sympy.functions.special.bessel import airybiprime +from sympy.functions.special.error_functions import li +from sympy.utilities.exceptions import sympy_deprecation_warning + + +def mathematica(s, additional_translations=None): + sympy_deprecation_warning( + """The ``mathematica`` function for the Mathematica parser is now +deprecated. Use ``parse_mathematica`` instead. +The parameter ``additional_translation`` can be replaced by SymPy's +.replace( ) or .subs( ) methods on the output expression instead.""", + deprecated_since_version="1.11", + active_deprecations_target="mathematica-parser-new", + ) + parser = MathematicaParser(additional_translations) + return sympify(parser._parse_old(s)) + + +def parse_mathematica(s): + """ + Translate a string containing a Wolfram Mathematica expression to a SymPy + expression. + + If the translator is unable to find a suitable SymPy expression, the + ``FullForm`` of the Mathematica expression will be output, using SymPy + ``Function`` objects as nodes of the syntax tree. + + Examples + ======== + + >>> from sympy.parsing.mathematica import parse_mathematica + >>> parse_mathematica("Sin[x]^2 Tan[y]") + sin(x)**2*tan(y) + >>> e = parse_mathematica("F[7,5,3]") + >>> e + F(7, 5, 3) + >>> from sympy import Function, Max, Min + >>> e.replace(Function("F"), lambda *x: Max(*x)*Min(*x)) + 21 + + Both standard input form and Mathematica full form are supported: + + >>> parse_mathematica("x*(a + b)") + x*(a + b) + >>> parse_mathematica("Times[x, Plus[a, b]]") + x*(a + b) + + To get a matrix from Wolfram's code: + + >>> m = parse_mathematica("{{a, b}, {c, d}}") + >>> m + ((a, b), (c, d)) + >>> from sympy import Matrix + >>> Matrix(m) + Matrix([ + [a, b], + [c, d]]) + + If the translation into equivalent SymPy expressions fails, an SymPy + expression equivalent to Wolfram Mathematica's "FullForm" will be created: + + >>> parse_mathematica("x_.") + Optional(Pattern(x, Blank())) + >>> parse_mathematica("Plus @@ {x, y, z}") + Apply(Plus, (x, y, z)) + >>> parse_mathematica("f[x_, 3] := x^3 /; x > 0") + SetDelayed(f(Pattern(x, Blank()), 3), Condition(x**3, x > 0)) + """ + parser = MathematicaParser() + return parser.parse(s) + + +def _parse_Function(*args): + if len(args) == 1: + arg = args[0] + Slot = Function("Slot") + slots = arg.atoms(Slot) + numbers = [a.args[0] for a in slots] + number_of_arguments = max(numbers) + if isinstance(number_of_arguments, Integer): + variables = symbols(f"dummy0:{number_of_arguments}", cls=Dummy) + return Lambda(variables, arg.xreplace({Slot(i+1): v for i, v in enumerate(variables)})) + return Lambda((), arg) + elif len(args) == 2: + variables = args[0] + body = args[1] + return Lambda(variables, body) + else: + raise SyntaxError("Function node expects 1 or 2 arguments") + + +def _deco(cls): + cls._initialize_class() + return cls + + +@_deco +class MathematicaParser: + """ + An instance of this class converts a string of a Wolfram Mathematica + expression to a SymPy expression. + + The main parser acts internally in three stages: + + 1. tokenizer: tokenizes the Mathematica expression and adds the missing * + operators. Handled by ``_from_mathematica_to_tokens(...)`` + 2. full form list: sort the list of strings output by the tokenizer into a + syntax tree of nested lists and strings, equivalent to Mathematica's + ``FullForm`` expression output. This is handled by the function + ``_from_tokens_to_fullformlist(...)``. + 3. SymPy expression: the syntax tree expressed as full form list is visited + and the nodes with equivalent classes in SymPy are replaced. Unknown + syntax tree nodes are cast to SymPy ``Function`` objects. This is + handled by ``_from_fullformlist_to_sympy(...)``. + + """ + + # left: Mathematica, right: SymPy + CORRESPONDENCES = { + 'Sqrt[x]': 'sqrt(x)', + 'Rational[x,y]': 'Rational(x,y)', + 'Exp[x]': 'exp(x)', + 'Log[x]': 'log(x)', + 'Log[x,y]': 'log(y,x)', + 'Log2[x]': 'log(x,2)', + 'Log10[x]': 'log(x,10)', + 'Mod[x,y]': 'Mod(x,y)', + 'Max[*x]': 'Max(*x)', + 'Min[*x]': 'Min(*x)', + 'Pochhammer[x,y]':'rf(x,y)', + 'ArcTan[x,y]':'atan2(y,x)', + 'ExpIntegralEi[x]': 'Ei(x)', + 'SinIntegral[x]': 'Si(x)', + 'CosIntegral[x]': 'Ci(x)', + 'AiryAi[x]': 'airyai(x)', + 'AiryAiPrime[x]': 'airyaiprime(x)', + 'AiryBi[x]' :'airybi(x)', + 'AiryBiPrime[x]' :'airybiprime(x)', + 'LogIntegral[x]':' li(x)', + 'PrimePi[x]': 'primepi(x)', + 'Prime[x]': 'prime(x)', + 'PrimeQ[x]': 'isprime(x)' + } + + # trigonometric, e.t.c. + for arc, tri, h in product(('', 'Arc'), ( + 'Sin', 'Cos', 'Tan', 'Cot', 'Sec', 'Csc'), ('', 'h')): + fm = arc + tri + h + '[x]' + if arc: # arc func + fs = 'a' + tri.lower() + h + '(x)' + else: # non-arc func + fs = tri.lower() + h + '(x)' + CORRESPONDENCES.update({fm: fs}) + + REPLACEMENTS = { + ' ': '', + '^': '**', + '{': '[', + '}': ']', + } + + RULES = { + # a single whitespace to '*' + 'whitespace': ( + re.compile(r''' + (?:(?<=[a-zA-Z\d])|(?<=\d\.)) # a letter or a number + \s+ # any number of whitespaces + (?:(?=[a-zA-Z\d])|(?=\.\d)) # a letter or a number + ''', re.VERBOSE), + '*'), + + # add omitted '*' character + 'add*_1': ( + re.compile(r''' + (?:(?<=[])\d])|(?<=\d\.)) # ], ) or a number + # '' + (?=[(a-zA-Z]) # ( or a single letter + ''', re.VERBOSE), + '*'), + + # add omitted '*' character (variable letter preceding) + 'add*_2': ( + re.compile(r''' + (?<=[a-zA-Z]) # a letter + \( # ( as a character + (?=.) # any characters + ''', re.VERBOSE), + '*('), + + # convert 'Pi' to 'pi' + 'Pi': ( + re.compile(r''' + (?: + \A|(?<=[^a-zA-Z]) + ) + Pi # 'Pi' is 3.14159... in Mathematica + (?=[^a-zA-Z]) + ''', re.VERBOSE), + 'pi'), + } + + # Mathematica function name pattern + FM_PATTERN = re.compile(r''' + (?: + \A|(?<=[^a-zA-Z]) # at the top or a non-letter + ) + [A-Z][a-zA-Z\d]* # Function + (?=\[) # [ as a character + ''', re.VERBOSE) + + # list or matrix pattern (for future usage) + ARG_MTRX_PATTERN = re.compile(r''' + \{.*\} + ''', re.VERBOSE) + + # regex string for function argument pattern + ARGS_PATTERN_TEMPLATE = r''' + (?: + \A|(?<=[^a-zA-Z]) + ) + {arguments} # model argument like x, y,... + (?=[^a-zA-Z]) + ''' + + # will contain transformed CORRESPONDENCES dictionary + TRANSLATIONS: dict[tuple[str, int], dict[str, Any]] = {} + + # cache for a raw users' translation dictionary + cache_original: dict[tuple[str, int], dict[str, Any]] = {} + + # cache for a compiled users' translation dictionary + cache_compiled: dict[tuple[str, int], dict[str, Any]] = {} + + @classmethod + def _initialize_class(cls): + # get a transformed CORRESPONDENCES dictionary + d = cls._compile_dictionary(cls.CORRESPONDENCES) + cls.TRANSLATIONS.update(d) + + def __init__(self, additional_translations=None): + self.translations = {} + + # update with TRANSLATIONS (class constant) + self.translations.update(self.TRANSLATIONS) + + if additional_translations is None: + additional_translations = {} + + # check the latest added translations + if self.__class__.cache_original != additional_translations: + if not isinstance(additional_translations, dict): + raise ValueError('The argument must be dict type') + + # get a transformed additional_translations dictionary + d = self._compile_dictionary(additional_translations) + + # update cache + self.__class__.cache_original = additional_translations + self.__class__.cache_compiled = d + + # merge user's own translations + self.translations.update(self.__class__.cache_compiled) + + @classmethod + def _compile_dictionary(cls, dic): + # for return + d = {} + + for fm, fs in dic.items(): + # check function form + cls._check_input(fm) + cls._check_input(fs) + + # uncover '*' hiding behind a whitespace + fm = cls._apply_rules(fm, 'whitespace') + fs = cls._apply_rules(fs, 'whitespace') + + # remove whitespace(s) + fm = cls._replace(fm, ' ') + fs = cls._replace(fs, ' ') + + # search Mathematica function name + m = cls.FM_PATTERN.search(fm) + + # if no-hit + if m is None: + err = "'{f}' function form is invalid.".format(f=fm) + raise ValueError(err) + + # get Mathematica function name like 'Log' + fm_name = m.group() + + # get arguments of Mathematica function + args, end = cls._get_args(m) + + # function side check. (e.g.) '2*Func[x]' is invalid. + if m.start() != 0 or end != len(fm): + err = "'{f}' function form is invalid.".format(f=fm) + raise ValueError(err) + + # check the last argument's 1st character + if args[-1][0] == '*': + key_arg = '*' + else: + key_arg = len(args) + + key = (fm_name, key_arg) + + # convert '*x' to '\\*x' for regex + re_args = [x if x[0] != '*' else '\\' + x for x in args] + + # for regex. Example: (?:(x|y|z)) + xyz = '(?:(' + '|'.join(re_args) + '))' + + # string for regex compile + patStr = cls.ARGS_PATTERN_TEMPLATE.format(arguments=xyz) + + pat = re.compile(patStr, re.VERBOSE) + + # update dictionary + d[key] = {} + d[key]['fs'] = fs # SymPy function template + d[key]['args'] = args # args are ['x', 'y'] for example + d[key]['pat'] = pat + + return d + + def _convert_function(self, s): + '''Parse Mathematica function to SymPy one''' + + # compiled regex object + pat = self.FM_PATTERN + + scanned = '' # converted string + cur = 0 # position cursor + while True: + m = pat.search(s) + + if m is None: + # append the rest of string + scanned += s + break + + # get Mathematica function name + fm = m.group() + + # get arguments, and the end position of fm function + args, end = self._get_args(m) + + # the start position of fm function + bgn = m.start() + + # convert Mathematica function to SymPy one + s = self._convert_one_function(s, fm, args, bgn, end) + + # update cursor + cur = bgn + + # append converted part + scanned += s[:cur] + + # shrink s + s = s[cur:] + + return scanned + + def _convert_one_function(self, s, fm, args, bgn, end): + # no variable-length argument + if (fm, len(args)) in self.translations: + key = (fm, len(args)) + + # x, y,... model arguments + x_args = self.translations[key]['args'] + + # make CORRESPONDENCES between model arguments and actual ones + d = dict(zip(x_args, args)) + + # with variable-length argument + elif (fm, '*') in self.translations: + key = (fm, '*') + + # x, y,..*args (model arguments) + x_args = self.translations[key]['args'] + + # make CORRESPONDENCES between model arguments and actual ones + d = {} + for i, x in enumerate(x_args): + if x[0] == '*': + d[x] = ','.join(args[i:]) + break + d[x] = args[i] + + # out of self.translations + else: + err = "'{f}' is out of the whitelist.".format(f=fm) + raise ValueError(err) + + # template string of converted function + template = self.translations[key]['fs'] + + # regex pattern for x_args + pat = self.translations[key]['pat'] + + scanned = '' + cur = 0 + while True: + m = pat.search(template) + + if m is None: + scanned += template + break + + # get model argument + x = m.group() + + # get a start position of the model argument + xbgn = m.start() + + # add the corresponding actual argument + scanned += template[:xbgn] + d[x] + + # update cursor to the end of the model argument + cur = m.end() + + # shrink template + template = template[cur:] + + # update to swapped string + s = s[:bgn] + scanned + s[end:] + + return s + + @classmethod + def _get_args(cls, m): + '''Get arguments of a Mathematica function''' + + s = m.string # whole string + anc = m.end() + 1 # pointing the first letter of arguments + square, curly = [], [] # stack for brackets + args = [] + + # current cursor + cur = anc + for i, c in enumerate(s[anc:], anc): + # extract one argument + if c == ',' and (not square) and (not curly): + args.append(s[cur:i]) # add an argument + cur = i + 1 # move cursor + + # handle list or matrix (for future usage) + if c == '{': + curly.append(c) + elif c == '}': + curly.pop() + + # seek corresponding ']' with skipping irrevant ones + if c == '[': + square.append(c) + elif c == ']': + if square: + square.pop() + else: # empty stack + args.append(s[cur:i]) + break + + # the next position to ']' bracket (the function end) + func_end = i + 1 + + return args, func_end + + @classmethod + def _replace(cls, s, bef): + aft = cls.REPLACEMENTS[bef] + s = s.replace(bef, aft) + return s + + @classmethod + def _apply_rules(cls, s, bef): + pat, aft = cls.RULES[bef] + return pat.sub(aft, s) + + @classmethod + def _check_input(cls, s): + for bracket in (('[', ']'), ('{', '}'), ('(', ')')): + if s.count(bracket[0]) != s.count(bracket[1]): + err = "'{f}' function form is invalid.".format(f=s) + raise ValueError(err) + + if '{' in s: + err = "Currently list is not supported." + raise ValueError(err) + + def _parse_old(self, s): + # input check + self._check_input(s) + + # uncover '*' hiding behind a whitespace + s = self._apply_rules(s, 'whitespace') + + # remove whitespace(s) + s = self._replace(s, ' ') + + # add omitted '*' character + s = self._apply_rules(s, 'add*_1') + s = self._apply_rules(s, 'add*_2') + + # translate function + s = self._convert_function(s) + + # '^' to '**' + s = self._replace(s, '^') + + # 'Pi' to 'pi' + s = self._apply_rules(s, 'Pi') + + # '{', '}' to '[', ']', respectively +# s = cls._replace(s, '{') # currently list is not taken into account +# s = cls._replace(s, '}') + + return s + + def parse(self, s): + s2 = self._from_mathematica_to_tokens(s) + s3 = self._from_tokens_to_fullformlist(s2) + s4 = self._from_fullformlist_to_sympy(s3) + return s4 + + INFIX = "Infix" + PREFIX = "Prefix" + POSTFIX = "Postfix" + FLAT = "Flat" + RIGHT = "Right" + LEFT = "Left" + + _mathematica_op_precedence: list[tuple[str, str | None, dict[str, str | Callable]]] = [ + (POSTFIX, None, {";": lambda x: x + ["Null"] if isinstance(x, list) and x and x[0] == "CompoundExpression" else ["CompoundExpression", x, "Null"]}), + (INFIX, FLAT, {";": "CompoundExpression"}), + (INFIX, RIGHT, {"=": "Set", ":=": "SetDelayed", "+=": "AddTo", "-=": "SubtractFrom", "*=": "TimesBy", "/=": "DivideBy"}), + (INFIX, LEFT, {"//": lambda x, y: [x, y]}), + (POSTFIX, None, {"&": "Function"}), + (INFIX, LEFT, {"/.": "ReplaceAll"}), + (INFIX, RIGHT, {"->": "Rule", ":>": "RuleDelayed"}), + (INFIX, LEFT, {"/;": "Condition"}), + (INFIX, FLAT, {"|": "Alternatives"}), + (POSTFIX, None, {"..": "Repeated", "...": "RepeatedNull"}), + (INFIX, FLAT, {"||": "Or"}), + (INFIX, FLAT, {"&&": "And"}), + (PREFIX, None, {"!": "Not"}), + (INFIX, FLAT, {"===": "SameQ", "=!=": "UnsameQ"}), + (INFIX, FLAT, {"==": "Equal", "!=": "Unequal", "<=": "LessEqual", "<": "Less", ">=": "GreaterEqual", ">": "Greater"}), + (INFIX, None, {";;": "Span"}), + (INFIX, FLAT, {"+": "Plus", "-": "Plus"}), + (INFIX, FLAT, {"*": "Times", "/": "Times"}), + (INFIX, FLAT, {".": "Dot"}), + (PREFIX, None, {"-": lambda x: MathematicaParser._get_neg(x), + "+": lambda x: x}), + (INFIX, RIGHT, {"^": "Power"}), + (INFIX, RIGHT, {"@@": "Apply", "/@": "Map", "//@": "MapAll", "@@@": lambda x, y: ["Apply", x, y, ["List", "1"]]}), + (POSTFIX, None, {"'": "Derivative", "!": "Factorial", "!!": "Factorial2", "--": "Decrement"}), + (INFIX, None, {"[": lambda x, y: [x, *y], "[[": lambda x, y: ["Part", x, *y]}), + (PREFIX, None, {"{": lambda x: ["List", *x], "(": lambda x: x[0]}), + (INFIX, None, {"?": "PatternTest"}), + (POSTFIX, None, { + "_": lambda x: ["Pattern", x, ["Blank"]], + "_.": lambda x: ["Optional", ["Pattern", x, ["Blank"]]], + "__": lambda x: ["Pattern", x, ["BlankSequence"]], + "___": lambda x: ["Pattern", x, ["BlankNullSequence"]], + }), + (INFIX, None, {"_": lambda x, y: ["Pattern", x, ["Blank", y]]}), + (PREFIX, None, {"#": "Slot", "##": "SlotSequence"}), + ] + + _missing_arguments_default = { + "#": lambda: ["Slot", "1"], + "##": lambda: ["SlotSequence", "1"], + } + + _literal = r"[A-Za-z][A-Za-z0-9]*" + _number = r"(?:[0-9]+(?:\.[0-9]*)?|\.[0-9]+)" + + _enclosure_open = ["(", "[", "[[", "{"] + _enclosure_close = [")", "]", "]]", "}"] + + @classmethod + def _get_neg(cls, x): + return f"-{x}" if isinstance(x, str) and re.match(MathematicaParser._number, x) else ["Times", "-1", x] + + @classmethod + def _get_inv(cls, x): + return ["Power", x, "-1"] + + _regex_tokenizer = None + + def _get_tokenizer(self): + if self._regex_tokenizer is not None: + # Check if the regular expression has already been compiled: + return self._regex_tokenizer + tokens = [self._literal, self._number] + tokens_escape = self._enclosure_open[:] + self._enclosure_close[:] + for typ, strat, symdict in self._mathematica_op_precedence: + for k in symdict: + tokens_escape.append(k) + tokens_escape.sort(key=lambda x: -len(x)) + tokens.extend(map(re.escape, tokens_escape)) + tokens.append(",") + tokens.append("\n") + tokenizer = re.compile("(" + "|".join(tokens) + ")") + self._regex_tokenizer = tokenizer + return self._regex_tokenizer + + def _from_mathematica_to_tokens(self, code: str): + tokenizer = self._get_tokenizer() + + # Find strings: + code_splits: list[str | list] = [] + while True: + string_start = code.find("\"") + if string_start == -1: + if len(code) > 0: + code_splits.append(code) + break + match_end = re.search(r'(? 0: + code_splits.append(code[:string_start]) + code_splits.append(["_Str", code[string_start+1:string_end].replace('\\"', '"')]) + code = code[string_end+1:] + + # Remove comments: + for i, code_split in enumerate(code_splits): + if isinstance(code_split, list): + continue + while True: + pos_comment_start = code_split.find("(*") + if pos_comment_start == -1: + break + pos_comment_end = code_split.find("*)") + if pos_comment_end == -1 or pos_comment_end < pos_comment_start: + raise SyntaxError("mismatch in comment (* *) code") + code_split = code_split[:pos_comment_start] + code_split[pos_comment_end+2:] + code_splits[i] = code_split + + # Tokenize the input strings with a regular expression: + token_lists = [tokenizer.findall(i) if isinstance(i, str) and i.isascii() else [i] for i in code_splits] + tokens = [j for i in token_lists for j in i] + + # Remove newlines at the beginning + while tokens and tokens[0] == "\n": + tokens.pop(0) + # Remove newlines at the end + while tokens and tokens[-1] == "\n": + tokens.pop(-1) + + return tokens + + def _is_op(self, token: str | list) -> bool: + if isinstance(token, list): + return False + if re.match(self._literal, token): + return False + if re.match("-?" + self._number, token): + return False + return True + + def _is_valid_star1(self, token: str | list) -> bool: + if token in (")", "}"): + return True + return not self._is_op(token) + + def _is_valid_star2(self, token: str | list) -> bool: + if token in ("(", "{"): + return True + return not self._is_op(token) + + def _from_tokens_to_fullformlist(self, tokens: list): + stack: list[list] = [[]] + open_seq = [] + pointer: int = 0 + while pointer < len(tokens): + token = tokens[pointer] + if token in self._enclosure_open: + stack[-1].append(token) + open_seq.append(token) + stack.append([]) + elif token == ",": + if len(stack[-1]) == 0 and stack[-2][-1] == open_seq[-1]: + raise SyntaxError("%s cannot be followed by comma ," % open_seq[-1]) + stack[-1] = self._parse_after_braces(stack[-1]) + stack.append([]) + elif token in self._enclosure_close: + ind = self._enclosure_close.index(token) + if self._enclosure_open[ind] != open_seq[-1]: + unmatched_enclosure = SyntaxError("unmatched enclosure") + if token == "]]" and open_seq[-1] == "[": + if open_seq[-2] == "[": + # These two lines would be logically correct, but are + # unnecessary: + # token = "]" + # tokens[pointer] = "]" + tokens.insert(pointer+1, "]") + elif open_seq[-2] == "[[": + if tokens[pointer+1] == "]": + tokens[pointer+1] = "]]" + elif tokens[pointer+1] == "]]": + tokens[pointer+1] = "]]" + tokens.insert(pointer+2, "]") + else: + raise unmatched_enclosure + else: + raise unmatched_enclosure + if len(stack[-1]) == 0 and stack[-2][-1] == "(": + raise SyntaxError("( ) not valid syntax") + last_stack = self._parse_after_braces(stack[-1], True) + stack[-1] = last_stack + new_stack_element = [] + while stack[-1][-1] != open_seq[-1]: + new_stack_element.append(stack.pop()) + new_stack_element.reverse() + if open_seq[-1] == "(" and len(new_stack_element) != 1: + raise SyntaxError("( must be followed by one expression, %i detected" % len(new_stack_element)) + stack[-1].append(new_stack_element) + open_seq.pop(-1) + else: + stack[-1].append(token) + pointer += 1 + if len(stack) != 1: + raise RuntimeError("Stack should have only one element") + return self._parse_after_braces(stack[0]) + + def _util_remove_newlines(self, lines: list, tokens: list, inside_enclosure: bool): + pointer = 0 + size = len(tokens) + while pointer < size: + token = tokens[pointer] + if token == "\n": + if inside_enclosure: + # Ignore newlines inside enclosures + tokens.pop(pointer) + size -= 1 + continue + if pointer == 0: + tokens.pop(0) + size -= 1 + continue + if pointer > 1: + try: + prev_expr = self._parse_after_braces(tokens[:pointer], inside_enclosure) + except SyntaxError: + tokens.pop(pointer) + size -= 1 + continue + else: + prev_expr = tokens[0] + if len(prev_expr) > 0 and prev_expr[0] == "CompoundExpression": + lines.extend(prev_expr[1:]) + else: + lines.append(prev_expr) + for i in range(pointer): + tokens.pop(0) + size -= pointer + pointer = 0 + continue + pointer += 1 + + def _util_add_missing_asterisks(self, tokens: list): + size: int = len(tokens) + pointer: int = 0 + while pointer < size: + if (pointer > 0 and + self._is_valid_star1(tokens[pointer - 1]) and + self._is_valid_star2(tokens[pointer])): + # This is a trick to add missing * operators in the expression, + # `"*" in op_dict` makes sure the precedence level is the same as "*", + # while `not self._is_op( ... )` makes sure this and the previous + # expression are not operators. + if tokens[pointer] == "(": + # ( has already been processed by now, replace: + tokens[pointer] = "*" + tokens[pointer + 1] = tokens[pointer + 1][0] + else: + tokens.insert(pointer, "*") + pointer += 1 + size += 1 + pointer += 1 + + def _parse_after_braces(self, tokens: list, inside_enclosure: bool = False): + op_dict: dict + changed: bool = False + lines: list = [] + + self._util_remove_newlines(lines, tokens, inside_enclosure) + + for op_type, grouping_strat, op_dict in reversed(self._mathematica_op_precedence): + if "*" in op_dict: + self._util_add_missing_asterisks(tokens) + size: int = len(tokens) + pointer: int = 0 + while pointer < size: + token = tokens[pointer] + if isinstance(token, str) and token in op_dict: + op_name: str | Callable = op_dict[token] + node: list + first_index: int + if isinstance(op_name, str): + node = [op_name] + first_index = 1 + else: + node = [] + first_index = 0 + if token in ("+", "-") and op_type == self.PREFIX and pointer > 0 and not self._is_op(tokens[pointer - 1]): + # Make sure that PREFIX + - don't match expressions like a + b or a - b, + # the INFIX + - are supposed to match that expression: + pointer += 1 + continue + if op_type == self.INFIX: + if pointer == 0 or pointer == size - 1 or self._is_op(tokens[pointer - 1]) or self._is_op(tokens[pointer + 1]): + pointer += 1 + continue + changed = True + tokens[pointer] = node + if op_type == self.INFIX: + arg1 = tokens.pop(pointer-1) + arg2 = tokens.pop(pointer) + if token == "/": + arg2 = self._get_inv(arg2) + elif token == "-": + arg2 = self._get_neg(arg2) + pointer -= 1 + size -= 2 + node.append(arg1) + node_p = node + if grouping_strat == self.FLAT: + while pointer + 2 < size and self._check_op_compatible(tokens[pointer+1], token): + node_p.append(arg2) + other_op = tokens.pop(pointer+1) + arg2 = tokens.pop(pointer+1) + if other_op == "/": + arg2 = self._get_inv(arg2) + elif other_op == "-": + arg2 = self._get_neg(arg2) + size -= 2 + node_p.append(arg2) + elif grouping_strat == self.RIGHT: + while pointer + 2 < size and tokens[pointer+1] == token: + node_p.append([op_name, arg2]) + node_p = node_p[-1] + tokens.pop(pointer+1) + arg2 = tokens.pop(pointer+1) + size -= 2 + node_p.append(arg2) + elif grouping_strat == self.LEFT: + while pointer + 1 < size and tokens[pointer+1] == token: + if isinstance(op_name, str): + node_p[first_index] = [op_name, node_p[first_index], arg2] + else: + node_p[first_index] = op_name(node_p[first_index], arg2) + tokens.pop(pointer+1) + arg2 = tokens.pop(pointer+1) + size -= 2 + node_p.append(arg2) + else: + node.append(arg2) + elif op_type == self.PREFIX: + if grouping_strat is not None: + raise TypeError("'Prefix' op_type should not have a grouping strat") + if pointer == size - 1 or self._is_op(tokens[pointer + 1]): + tokens[pointer] = self._missing_arguments_default[token]() + else: + node.append(tokens.pop(pointer+1)) + size -= 1 + elif op_type == self.POSTFIX: + if grouping_strat is not None: + raise TypeError("'Prefix' op_type should not have a grouping strat") + if pointer == 0 or self._is_op(tokens[pointer - 1]): + tokens[pointer] = self._missing_arguments_default[token]() + else: + node.append(tokens.pop(pointer-1)) + pointer -= 1 + size -= 1 + if isinstance(op_name, Callable): # type: ignore + op_call: Callable = typing.cast(Callable, op_name) + new_node = op_call(*node) + node.clear() + if isinstance(new_node, list): + node.extend(new_node) + else: + tokens[pointer] = new_node + pointer += 1 + if len(tokens) > 1 or (len(lines) == 0 and len(tokens) == 0): + if changed: + # Trick to deal with cases in which an operator with lower + # precedence should be transformed before an operator of higher + # precedence. Such as in the case of `#&[x]` (that is + # equivalent to `Lambda(d_, d_)(x)` in SymPy). In this case the + # operator `&` has lower precedence than `[`, but needs to be + # evaluated first because otherwise `# (&[x])` is not a valid + # expression: + return self._parse_after_braces(tokens, inside_enclosure) + raise SyntaxError("unable to create a single AST for the expression") + if len(lines) > 0: + if tokens[0] and tokens[0][0] == "CompoundExpression": + tokens = tokens[0][1:] + compound_expression = ["CompoundExpression", *lines, *tokens] + return compound_expression + return tokens[0] + + def _check_op_compatible(self, op1: str, op2: str): + if op1 == op2: + return True + muldiv = {"*", "/"} + addsub = {"+", "-"} + if op1 in muldiv and op2 in muldiv: + return True + if op1 in addsub and op2 in addsub: + return True + return False + + def _from_fullform_to_fullformlist(self, wmexpr: str): + """ + Parses FullForm[Downvalues[]] generated by Mathematica + """ + out: list = [] + stack = [out] + generator = re.finditer(r'[\[\],]', wmexpr) + last_pos = 0 + for match in generator: + if match is None: + break + position = match.start() + last_expr = wmexpr[last_pos:position].replace(',', '').replace(']', '').replace('[', '').strip() + + if match.group() == ',': + if last_expr != '': + stack[-1].append(last_expr) + elif match.group() == ']': + if last_expr != '': + stack[-1].append(last_expr) + stack.pop() + elif match.group() == '[': + stack[-1].append([last_expr]) + stack.append(stack[-1][-1]) + last_pos = match.end() + return out[0] + + def _from_fullformlist_to_fullformsympy(self, pylist: list): + from sympy import Function, Symbol + + def converter(expr): + if isinstance(expr, list): + if len(expr) > 0: + head = expr[0] + args = [converter(arg) for arg in expr[1:]] + return Function(head)(*args) + else: + raise ValueError("Empty list of expressions") + elif isinstance(expr, str): + return Symbol(expr) + else: + return _sympify(expr) + + return converter(pylist) + + _node_conversions = { + "Times": Mul, + "Plus": Add, + "Power": Pow, + "Rational": Rational, + "Log": lambda *a: log(*reversed(a)), + "Log2": lambda x: log(x, 2), + "Log10": lambda x: log(x, 10), + "Exp": exp, + "Sqrt": sqrt, + + "Sin": sin, + "Cos": cos, + "Tan": tan, + "Cot": cot, + "Sec": sec, + "Csc": csc, + + "ArcSin": asin, + "ArcCos": acos, + "ArcTan": lambda *a: atan2(*reversed(a)) if len(a) == 2 else atan(*a), + "ArcCot": acot, + "ArcSec": asec, + "ArcCsc": acsc, + + "Sinh": sinh, + "Cosh": cosh, + "Tanh": tanh, + "Coth": coth, + "Sech": sech, + "Csch": csch, + + "ArcSinh": asinh, + "ArcCosh": acosh, + "ArcTanh": atanh, + "ArcCoth": acoth, + "ArcSech": asech, + "ArcCsch": acsch, + + "Expand": expand, + "Im": im, + "Re": sympy.re, + "Flatten": flatten, + "Polylog": polylog, + "Cancel": cancel, + # Gamma=gamma, + "TrigExpand": expand_trig, + "Sign": sign, + "Simplify": simplify, + "Defer": UnevaluatedExpr, + "Identity": S, + # Sum=Sum_doit, + # Module=With, + # Block=With, + "Null": lambda *a: S.Zero, + "Mod": Mod, + "Max": Max, + "Min": Min, + "Pochhammer": rf, + "ExpIntegralEi": Ei, + "SinIntegral": Si, + "CosIntegral": Ci, + "AiryAi": airyai, + "AiryAiPrime": airyaiprime, + "AiryBi": airybi, + "AiryBiPrime": airybiprime, + "LogIntegral": li, + "PrimePi": primepi, + "Prime": prime, + "PrimeQ": isprime, + + "List": Tuple, + "Greater": StrictGreaterThan, + "GreaterEqual": GreaterThan, + "Less": StrictLessThan, + "LessEqual": LessThan, + "Equal": Equality, + "Or": Or, + "And": And, + + "Function": _parse_Function, + } + + _atom_conversions = { + "I": I, + "Pi": pi, + } + + def _from_fullformlist_to_sympy(self, full_form_list): + + def recurse(expr): + if isinstance(expr, list): + if isinstance(expr[0], list): + head = recurse(expr[0]) + else: + head = self._node_conversions.get(expr[0], Function(expr[0])) + return head(*[recurse(arg) for arg in expr[1:]]) + else: + return self._atom_conversions.get(expr, sympify(expr)) + + return recurse(full_form_list) + + def _from_fullformsympy_to_sympy(self, mform): + + expr = mform + for mma_form, sympy_node in self._node_conversions.items(): + expr = expr.replace(Function(mma_form), sympy_node) + return expr diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/maxima.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/maxima.py new file mode 100644 index 0000000000000000000000000000000000000000..7a8ee5b17bb03a36e338803cb10f9ebf22763c2c --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/maxima.py @@ -0,0 +1,71 @@ +import re +from sympy.concrete.products import product +from sympy.concrete.summations import Sum +from sympy.core.sympify import sympify +from sympy.functions.elementary.trigonometric import (cos, sin) + + +class MaximaHelpers: + def maxima_expand(expr): + return expr.expand() + + def maxima_float(expr): + return expr.evalf() + + def maxima_trigexpand(expr): + return expr.expand(trig=True) + + def maxima_sum(a1, a2, a3, a4): + return Sum(a1, (a2, a3, a4)).doit() + + def maxima_product(a1, a2, a3, a4): + return product(a1, (a2, a3, a4)) + + def maxima_csc(expr): + return 1/sin(expr) + + def maxima_sec(expr): + return 1/cos(expr) + +sub_dict = { + 'pi': re.compile(r'%pi'), + 'E': re.compile(r'%e'), + 'I': re.compile(r'%i'), + '**': re.compile(r'\^'), + 'oo': re.compile(r'\binf\b'), + '-oo': re.compile(r'\bminf\b'), + "'-'": re.compile(r'\bminus\b'), + 'maxima_expand': re.compile(r'\bexpand\b'), + 'maxima_float': re.compile(r'\bfloat\b'), + 'maxima_trigexpand': re.compile(r'\btrigexpand'), + 'maxima_sum': re.compile(r'\bsum\b'), + 'maxima_product': re.compile(r'\bproduct\b'), + 'cancel': re.compile(r'\bratsimp\b'), + 'maxima_csc': re.compile(r'\bcsc\b'), + 'maxima_sec': re.compile(r'\bsec\b') +} + +var_name = re.compile(r'^\s*(\w+)\s*:') + + +def parse_maxima(str, globals=None, name_dict={}): + str = str.strip() + str = str.rstrip('; ') + + for k, v in sub_dict.items(): + str = v.sub(k, str) + + assign_var = None + var_match = var_name.search(str) + if var_match: + assign_var = var_match.group(1) + str = str[var_match.end():].strip() + + dct = MaximaHelpers.__dict__.copy() + dct.update(name_dict) + obj = sympify(str, locals=dct) + + if assign_var and globals: + globals[assign_var] = obj + + return obj diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/sym_expr.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/sym_expr.py new file mode 100644 index 0000000000000000000000000000000000000000..9dbd0e94eb51147b51825fcf15cbec5ae18bb1b6 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/sym_expr.py @@ -0,0 +1,279 @@ +from sympy.printing import pycode, ccode, fcode +from sympy.external import import_module +from sympy.utilities.decorator import doctest_depends_on + +lfortran = import_module('lfortran') +cin = import_module('clang.cindex', import_kwargs = {'fromlist': ['cindex']}) + +if lfortran: + from sympy.parsing.fortran.fortran_parser import src_to_sympy +if cin: + from sympy.parsing.c.c_parser import parse_c + +@doctest_depends_on(modules=['lfortran', 'clang.cindex']) +class SymPyExpression: # type: ignore + """Class to store and handle SymPy expressions + + This class will hold SymPy Expressions and handle the API for the + conversion to and from different languages. + + It works with the C and the Fortran Parser to generate SymPy expressions + which are stored here and which can be converted to multiple language's + source code. + + Notes + ===== + + The module and its API are currently under development and experimental + and can be changed during development. + + The Fortran parser does not support numeric assignments, so all the + variables have been Initialized to zero. + + The module also depends on external dependencies: + + - LFortran which is required to use the Fortran parser + - Clang which is required for the C parser + + Examples + ======== + + Example of parsing C code: + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src = ''' + ... int a,b; + ... float c = 2, d =4; + ... ''' + >>> a = SymPyExpression(src, 'c') + >>> a.return_expr() + [Declaration(Variable(a, type=intc)), + Declaration(Variable(b, type=intc)), + Declaration(Variable(c, type=float32, value=2.0)), + Declaration(Variable(d, type=float32, value=4.0))] + + An example of variable definition: + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src2 = ''' + ... integer :: a, b, c, d + ... real :: p, q, r, s + ... ''' + >>> p = SymPyExpression() + >>> p.convert_to_expr(src2, 'f') + >>> p.convert_to_c() + ['int a = 0', 'int b = 0', 'int c = 0', 'int d = 0', 'double p = 0.0', 'double q = 0.0', 'double r = 0.0', 'double s = 0.0'] + + An example of Assignment: + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src3 = ''' + ... integer :: a, b, c, d, e + ... d = a + b - c + ... e = b * d + c * e / a + ... ''' + >>> p = SymPyExpression(src3, 'f') + >>> p.convert_to_python() + ['a = 0', 'b = 0', 'c = 0', 'd = 0', 'e = 0', 'd = a + b - c', 'e = b*d + c*e/a'] + + An example of function definition: + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src = ''' + ... integer function f(a,b) + ... integer, intent(in) :: a, b + ... integer :: r + ... end function + ... ''' + >>> a = SymPyExpression(src, 'f') + >>> a.convert_to_python() + ['def f(a, b):\\n f = 0\\n r = 0\\n return f'] + + """ + + def __init__(self, source_code = None, mode = None): + """Constructor for SymPyExpression class""" + super().__init__() + if not(mode or source_code): + self._expr = [] + elif mode: + if source_code: + if mode.lower() == 'f': + if lfortran: + self._expr = src_to_sympy(source_code) + else: + raise ImportError("LFortran is not installed, cannot parse Fortran code") + elif mode.lower() == 'c': + if cin: + self._expr = parse_c(source_code) + else: + raise ImportError("Clang is not installed, cannot parse C code") + else: + raise NotImplementedError( + 'Parser for specified language is not implemented' + ) + else: + raise ValueError('Source code not present') + else: + raise ValueError('Please specify a mode for conversion') + + def convert_to_expr(self, src_code, mode): + """Converts the given source code to SymPy Expressions + + Attributes + ========== + + src_code : String + the source code or filename of the source code that is to be + converted + + mode: String + the mode to determine which parser is to be used according to + the language of the source code + f or F for Fortran + c or C for C/C++ + + Examples + ======== + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src3 = ''' + ... integer function f(a,b) result(r) + ... integer, intent(in) :: a, b + ... integer :: x + ... r = a + b -x + ... end function + ... ''' + >>> p = SymPyExpression() + >>> p.convert_to_expr(src3, 'f') + >>> p.return_expr() + [FunctionDefinition(integer, name=f, parameters=(Variable(a), Variable(b)), body=CodeBlock( + Declaration(Variable(r, type=integer, value=0)), + Declaration(Variable(x, type=integer, value=0)), + Assignment(Variable(r), a + b - x), + Return(Variable(r)) + ))] + + + + + """ + if mode.lower() == 'f': + if lfortran: + self._expr = src_to_sympy(src_code) + else: + raise ImportError("LFortran is not installed, cannot parse Fortran code") + elif mode.lower() == 'c': + if cin: + self._expr = parse_c(src_code) + else: + raise ImportError("Clang is not installed, cannot parse C code") + else: + raise NotImplementedError( + "Parser for specified language has not been implemented" + ) + + def convert_to_python(self): + """Returns a list with Python code for the SymPy expressions + + Examples + ======== + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src2 = ''' + ... integer :: a, b, c, d + ... real :: p, q, r, s + ... c = a/b + ... d = c/a + ... s = p/q + ... r = q/p + ... ''' + >>> p = SymPyExpression(src2, 'f') + >>> p.convert_to_python() + ['a = 0', 'b = 0', 'c = 0', 'd = 0', 'p = 0.0', 'q = 0.0', 'r = 0.0', 's = 0.0', 'c = a/b', 'd = c/a', 's = p/q', 'r = q/p'] + + """ + self._pycode = [] + for iter in self._expr: + self._pycode.append(pycode(iter)) + return self._pycode + + def convert_to_c(self): + """Returns a list with the c source code for the SymPy expressions + + + Examples + ======== + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src2 = ''' + ... integer :: a, b, c, d + ... real :: p, q, r, s + ... c = a/b + ... d = c/a + ... s = p/q + ... r = q/p + ... ''' + >>> p = SymPyExpression() + >>> p.convert_to_expr(src2, 'f') + >>> p.convert_to_c() + ['int a = 0', 'int b = 0', 'int c = 0', 'int d = 0', 'double p = 0.0', 'double q = 0.0', 'double r = 0.0', 'double s = 0.0', 'c = a/b;', 'd = c/a;', 's = p/q;', 'r = q/p;'] + + """ + self._ccode = [] + for iter in self._expr: + self._ccode.append(ccode(iter)) + return self._ccode + + def convert_to_fortran(self): + """Returns a list with the fortran source code for the SymPy expressions + + Examples + ======== + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src2 = ''' + ... integer :: a, b, c, d + ... real :: p, q, r, s + ... c = a/b + ... d = c/a + ... s = p/q + ... r = q/p + ... ''' + >>> p = SymPyExpression(src2, 'f') + >>> p.convert_to_fortran() + [' integer*4 a', ' integer*4 b', ' integer*4 c', ' integer*4 d', ' real*8 p', ' real*8 q', ' real*8 r', ' real*8 s', ' c = a/b', ' d = c/a', ' s = p/q', ' r = q/p'] + + """ + self._fcode = [] + for iter in self._expr: + self._fcode.append(fcode(iter)) + return self._fcode + + def return_expr(self): + """Returns the expression list + + Examples + ======== + + >>> from sympy.parsing.sym_expr import SymPyExpression + >>> src3 = ''' + ... integer function f(a,b) + ... integer, intent(in) :: a, b + ... integer :: r + ... r = a+b + ... f = r + ... end function + ... ''' + >>> p = SymPyExpression() + >>> p.convert_to_expr(src3, 'f') + >>> p.return_expr() + [FunctionDefinition(integer, name=f, parameters=(Variable(a), Variable(b)), body=CodeBlock( + Declaration(Variable(f, type=integer, value=0)), + Declaration(Variable(r, type=integer, value=0)), + Assignment(Variable(f), Variable(r)), + Return(Variable(f)) + ))] + + """ + return self._expr diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/sympy_parser.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/sympy_parser.py new file mode 100644 index 0000000000000000000000000000000000000000..9cfda9ce0f73ffa3773031c48b9e9c245f69fe0b --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/sympy_parser.py @@ -0,0 +1,1270 @@ +"""Transform a string with Python-like source code into SymPy expression. """ +from __future__ import annotations +from tokenize import (generate_tokens, untokenize, TokenError, + NUMBER, STRING, NAME, OP, ENDMARKER, ERRORTOKEN, NEWLINE) + +from keyword import iskeyword + +import ast +import unicodedata +from io import StringIO +import builtins +import types +from typing import Any, Callable +from functools import reduce +from sympy.assumptions.ask import AssumptionKeys +from sympy.core.basic import Basic +from sympy.core import Symbol +from sympy.core.function import Function +from sympy.utilities.misc import func_name +from sympy.functions.elementary.miscellaneous import Max, Min + + +null = '' + +TOKEN = tuple[int, str] +DICT = dict[str, Any] +TRANS = Callable[[list[TOKEN], DICT, DICT], list[TOKEN]] + +def _token_splittable(token_name: str) -> bool: + """ + Predicate for whether a token name can be split into multiple tokens. + + A token is splittable if it does not contain an underscore character and + it is not the name of a Greek letter. This is used to implicitly convert + expressions like 'xyz' into 'x*y*z'. + """ + if '_' in token_name: + return False + try: + return not unicodedata.lookup('GREEK SMALL LETTER ' + token_name) + except KeyError: + return len(token_name) > 1 + + +def _token_callable(token: TOKEN, local_dict: DICT, global_dict: DICT, nextToken=None): + """ + Predicate for whether a token name represents a callable function. + + Essentially wraps ``callable``, but looks up the token name in the + locals and globals. + """ + func = local_dict.get(token[1]) + if not func: + func = global_dict.get(token[1]) + return callable(func) and not isinstance(func, Symbol) + + +def _add_factorial_tokens(name: str, result: list[TOKEN]) -> list[TOKEN]: + if result == [] or result[-1][1] == '(': + raise TokenError() + + beginning = [(NAME, name), (OP, '(')] + end = [(OP, ')')] + + diff = 0 + length = len(result) + + for index, token in enumerate(result[::-1]): + toknum, tokval = token + i = length - index - 1 + + if tokval == ')': + diff += 1 + elif tokval == '(': + diff -= 1 + + if diff == 0: + if i - 1 >= 0 and result[i - 1][0] == NAME: + return result[:i - 1] + beginning + result[i - 1:] + end + else: + return result[:i] + beginning + result[i:] + end + + return result + + +class ParenthesisGroup(list[TOKEN]): + """List of tokens representing an expression in parentheses.""" + pass + + +class AppliedFunction: + """ + A group of tokens representing a function and its arguments. + + `exponent` is for handling the shorthand sin^2, ln^2, etc. + """ + def __init__(self, function: TOKEN, args: ParenthesisGroup, exponent=None): + if exponent is None: + exponent = [] + self.function = function + self.args = args + self.exponent = exponent + self.items = ['function', 'args', 'exponent'] + + def expand(self) -> list[TOKEN]: + """Return a list of tokens representing the function""" + return [self.function, *self.args] + + def __getitem__(self, index): + return getattr(self, self.items[index]) + + def __repr__(self): + return "AppliedFunction(%s, %s, %s)" % (self.function, self.args, + self.exponent) + + +def _flatten(result: list[TOKEN | AppliedFunction]): + result2: list[TOKEN] = [] + for tok in result: + if isinstance(tok, AppliedFunction): + result2.extend(tok.expand()) + else: + result2.append(tok) + return result2 + + +def _group_parentheses(recursor: TRANS): + def _inner(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """Group tokens between parentheses with ParenthesisGroup. + + Also processes those tokens recursively. + + """ + result: list[TOKEN | ParenthesisGroup] = [] + stacks: list[ParenthesisGroup] = [] + stacklevel = 0 + for token in tokens: + if token[0] == OP: + if token[1] == '(': + stacks.append(ParenthesisGroup([])) + stacklevel += 1 + elif token[1] == ')': + stacks[-1].append(token) + stack = stacks.pop() + + if len(stacks) > 0: + # We don't recurse here since the upper-level stack + # would reprocess these tokens + stacks[-1].extend(stack) + else: + # Recurse here to handle nested parentheses + # Strip off the outer parentheses to avoid an infinite loop + inner = stack[1:-1] + inner = recursor(inner, + local_dict, + global_dict) + parenGroup = [stack[0]] + inner + [stack[-1]] + result.append(ParenthesisGroup(parenGroup)) + stacklevel -= 1 + continue + if stacklevel: + stacks[-1].append(token) + else: + result.append(token) + if stacklevel: + raise TokenError("Mismatched parentheses") + return result + return _inner + + +def _apply_functions(tokens: list[TOKEN | ParenthesisGroup], local_dict: DICT, global_dict: DICT): + """Convert a NAME token + ParenthesisGroup into an AppliedFunction. + + Note that ParenthesisGroups, if not applied to any function, are + converted back into lists of tokens. + + """ + result: list[TOKEN | AppliedFunction] = [] + symbol = None + for tok in tokens: + if isinstance(tok, ParenthesisGroup): + if symbol and _token_callable(symbol, local_dict, global_dict): + result[-1] = AppliedFunction(symbol, tok) + symbol = None + else: + result.extend(tok) + elif tok[0] == NAME: + symbol = tok + result.append(tok) + else: + symbol = None + result.append(tok) + return result + + +def _implicit_multiplication(tokens: list[TOKEN | AppliedFunction], local_dict: DICT, global_dict: DICT): + """Implicitly adds '*' tokens. + + Cases: + + - Two AppliedFunctions next to each other ("sin(x)cos(x)") + + - AppliedFunction next to an open parenthesis ("sin x (cos x + 1)") + + - A close parenthesis next to an AppliedFunction ("(x+2)sin x")\ + + - A close parenthesis next to an open parenthesis ("(x+2)(x+3)") + + - AppliedFunction next to an implicitly applied function ("sin(x)cos x") + + """ + result: list[TOKEN | AppliedFunction] = [] + skip = False + for tok, nextTok in zip(tokens, tokens[1:]): + result.append(tok) + if skip: + skip = False + continue + if tok[0] == OP and tok[1] == '.' and nextTok[0] == NAME: + # Dotted name. Do not do implicit multiplication + skip = True + continue + if isinstance(tok, AppliedFunction): + if isinstance(nextTok, AppliedFunction): + result.append((OP, '*')) + elif nextTok == (OP, '('): + # Applied function followed by an open parenthesis + if tok.function[1] == "Function": + tok.function = (tok.function[0], 'Symbol') + result.append((OP, '*')) + elif nextTok[0] == NAME: + # Applied function followed by implicitly applied function + result.append((OP, '*')) + else: + if tok == (OP, ')'): + if isinstance(nextTok, AppliedFunction): + # Close parenthesis followed by an applied function + result.append((OP, '*')) + elif nextTok[0] == NAME: + # Close parenthesis followed by an implicitly applied function + result.append((OP, '*')) + elif nextTok == (OP, '('): + # Close parenthesis followed by an open parenthesis + result.append((OP, '*')) + elif tok[0] == NAME and not _token_callable(tok, local_dict, global_dict): + if isinstance(nextTok, AppliedFunction) or \ + (nextTok[0] == NAME and _token_callable(nextTok, local_dict, global_dict)): + # Constant followed by (implicitly applied) function + result.append((OP, '*')) + elif nextTok == (OP, '('): + # Constant followed by parenthesis + result.append((OP, '*')) + elif nextTok[0] == NAME: + # Constant followed by constant + result.append((OP, '*')) + if tokens: + result.append(tokens[-1]) + return result + + +def _implicit_application(tokens: list[TOKEN | AppliedFunction], local_dict: DICT, global_dict: DICT): + """Adds parentheses as needed after functions.""" + result: list[TOKEN | AppliedFunction] = [] + appendParen = 0 # number of closing parentheses to add + skip = 0 # number of tokens to delay before adding a ')' (to + # capture **, ^, etc.) + exponentSkip = False # skipping tokens before inserting parentheses to + # work with function exponentiation + for tok, nextTok in zip(tokens, tokens[1:]): + result.append(tok) + if (tok[0] == NAME and nextTok[0] not in [OP, ENDMARKER, NEWLINE]): + if _token_callable(tok, local_dict, global_dict, nextTok): # type: ignore + result.append((OP, '(')) + appendParen += 1 + # name followed by exponent - function exponentiation + elif (tok[0] == NAME and nextTok[0] == OP and nextTok[1] == '**'): + if _token_callable(tok, local_dict, global_dict): # type: ignore + exponentSkip = True + elif exponentSkip: + # if the last token added was an applied function (i.e. the + # power of the function exponent) OR a multiplication (as + # implicit multiplication would have added an extraneous + # multiplication) + if (isinstance(tok, AppliedFunction) + or (tok[0] == OP and tok[1] == '*')): + # don't add anything if the next token is a multiplication + # or if there's already a parenthesis (if parenthesis, still + # stop skipping tokens) + if not (nextTok[0] == OP and nextTok[1] == '*'): + if not(nextTok[0] == OP and nextTok[1] == '('): + result.append((OP, '(')) + appendParen += 1 + exponentSkip = False + elif appendParen: + if nextTok[0] == OP and nextTok[1] in ('^', '**', '*'): + skip = 1 + continue + if skip: + skip -= 1 + continue + result.append((OP, ')')) + appendParen -= 1 + + if tokens: + result.append(tokens[-1]) + + if appendParen: + result.extend([(OP, ')')] * appendParen) + return result + + +def function_exponentiation(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """Allows functions to be exponentiated, e.g. ``cos**2(x)``. + + Examples + ======== + + >>> from sympy.parsing.sympy_parser import (parse_expr, + ... standard_transformations, function_exponentiation) + >>> transformations = standard_transformations + (function_exponentiation,) + >>> parse_expr('sin**4(x)', transformations=transformations) + sin(x)**4 + """ + result: list[TOKEN] = [] + exponent: list[TOKEN] = [] + consuming_exponent = False + level = 0 + for tok, nextTok in zip(tokens, tokens[1:]): + if tok[0] == NAME and nextTok[0] == OP and nextTok[1] == '**': + if _token_callable(tok, local_dict, global_dict): + consuming_exponent = True + elif consuming_exponent: + if tok[0] == NAME and tok[1] == 'Function': + tok = (NAME, 'Symbol') + exponent.append(tok) + + # only want to stop after hitting ) + if tok[0] == nextTok[0] == OP and tok[1] == ')' and nextTok[1] == '(': + consuming_exponent = False + # if implicit multiplication was used, we may have )*( instead + if tok[0] == nextTok[0] == OP and tok[1] == '*' and nextTok[1] == '(': + consuming_exponent = False + del exponent[-1] + continue + elif exponent and not consuming_exponent: + if tok[0] == OP: + if tok[1] == '(': + level += 1 + elif tok[1] == ')': + level -= 1 + if level == 0: + result.append(tok) + result.extend(exponent) + exponent = [] + continue + result.append(tok) + if tokens: + result.append(tokens[-1]) + if exponent: + result.extend(exponent) + return result + + +def split_symbols_custom(predicate: Callable[[str], bool]): + """Creates a transformation that splits symbol names. + + ``predicate`` should return True if the symbol name is to be split. + + For instance, to retain the default behavior but avoid splitting certain + symbol names, a predicate like this would work: + + + >>> from sympy.parsing.sympy_parser import (parse_expr, _token_splittable, + ... standard_transformations, implicit_multiplication, + ... split_symbols_custom) + >>> def can_split(symbol): + ... if symbol not in ('list', 'of', 'unsplittable', 'names'): + ... return _token_splittable(symbol) + ... return False + ... + >>> transformation = split_symbols_custom(can_split) + >>> parse_expr('unsplittable', transformations=standard_transformations + + ... (transformation, implicit_multiplication)) + unsplittable + """ + def _split_symbols(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + result: list[TOKEN] = [] + split = False + split_previous=False + + for tok in tokens: + if split_previous: + # throw out closing parenthesis of Symbol that was split + split_previous=False + continue + split_previous=False + + if tok[0] == NAME and tok[1] in ['Symbol', 'Function']: + split = True + + elif split and tok[0] == NAME: + symbol = tok[1][1:-1] + + if predicate(symbol): + tok_type = result[-2][1] # Symbol or Function + del result[-2:] # Get rid of the call to Symbol + + i = 0 + while i < len(symbol): + char = symbol[i] + if char in local_dict or char in global_dict: + result.append((NAME, "%s" % char)) + elif char.isdigit(): + chars = [char] + for i in range(i + 1, len(symbol)): + if not symbol[i].isdigit(): + i -= 1 + break + chars.append(symbol[i]) + char = ''.join(chars) + result.extend([(NAME, 'Number'), (OP, '('), + (NAME, "'%s'" % char), (OP, ')')]) + else: + use = tok_type if i == len(symbol) else 'Symbol' + result.extend([(NAME, use), (OP, '('), + (NAME, "'%s'" % char), (OP, ')')]) + i += 1 + + # Set split_previous=True so will skip + # the closing parenthesis of the original Symbol + split = False + split_previous = True + continue + + else: + split = False + + result.append(tok) + + return result + + return _split_symbols + + +#: Splits symbol names for implicit multiplication. +#: +#: Intended to let expressions like ``xyz`` be parsed as ``x*y*z``. Does not +#: split Greek character names, so ``theta`` will *not* become +#: ``t*h*e*t*a``. Generally this should be used with +#: ``implicit_multiplication``. +split_symbols = split_symbols_custom(_token_splittable) + + +def implicit_multiplication(tokens: list[TOKEN], local_dict: DICT, + global_dict: DICT) -> list[TOKEN]: + """Makes the multiplication operator optional in most cases. + + Use this before :func:`implicit_application`, otherwise expressions like + ``sin 2x`` will be parsed as ``x * sin(2)`` rather than ``sin(2*x)``. + + Examples + ======== + + >>> from sympy.parsing.sympy_parser import (parse_expr, + ... standard_transformations, implicit_multiplication) + >>> transformations = standard_transformations + (implicit_multiplication,) + >>> parse_expr('3 x y', transformations=transformations) + 3*x*y + """ + # These are interdependent steps, so we don't expose them separately + res1 = _group_parentheses(implicit_multiplication)(tokens, local_dict, global_dict) + res2 = _apply_functions(res1, local_dict, global_dict) + res3 = _implicit_multiplication(res2, local_dict, global_dict) + result = _flatten(res3) + return result + + +def implicit_application(tokens: list[TOKEN], local_dict: DICT, + global_dict: DICT) -> list[TOKEN]: + """Makes parentheses optional in some cases for function calls. + + Use this after :func:`implicit_multiplication`, otherwise expressions + like ``sin 2x`` will be parsed as ``x * sin(2)`` rather than + ``sin(2*x)``. + + Examples + ======== + + >>> from sympy.parsing.sympy_parser import (parse_expr, + ... standard_transformations, implicit_application) + >>> transformations = standard_transformations + (implicit_application,) + >>> parse_expr('cot z + csc z', transformations=transformations) + cot(z) + csc(z) + """ + res1 = _group_parentheses(implicit_application)(tokens, local_dict, global_dict) + res2 = _apply_functions(res1, local_dict, global_dict) + res3 = _implicit_application(res2, local_dict, global_dict) + result = _flatten(res3) + return result + + +def implicit_multiplication_application(result: list[TOKEN], local_dict: DICT, + global_dict: DICT) -> list[TOKEN]: + """Allows a slightly relaxed syntax. + + - Parentheses for single-argument method calls are optional. + + - Multiplication is implicit. + + - Symbol names can be split (i.e. spaces are not needed between + symbols). + + - Functions can be exponentiated. + + Examples + ======== + + >>> from sympy.parsing.sympy_parser import (parse_expr, + ... standard_transformations, implicit_multiplication_application) + >>> parse_expr("10sin**2 x**2 + 3xyz + tan theta", + ... transformations=(standard_transformations + + ... (implicit_multiplication_application,))) + 3*x*y*z + 10*sin(x**2)**2 + tan(theta) + + """ + for step in (split_symbols, implicit_multiplication, + implicit_application, function_exponentiation): + result = step(result, local_dict, global_dict) + + return result + + +def auto_symbol(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """Inserts calls to ``Symbol``/``Function`` for undefined variables.""" + result: list[TOKEN] = [] + prevTok = (-1, '') + + tokens.append((-1, '')) # so zip traverses all tokens + for tok, nextTok in zip(tokens, tokens[1:]): + tokNum, tokVal = tok + nextTokNum, nextTokVal = nextTok + if tokNum == NAME: + name = tokVal + + if (name in ['True', 'False', 'None'] + or iskeyword(name) + # Don't convert attribute access + or (prevTok[0] == OP and prevTok[1] == '.') + # Don't convert keyword arguments + or (prevTok[0] == OP and prevTok[1] in ('(', ',') + and nextTokNum == OP and nextTokVal == '=') + # the name has already been defined + or name in local_dict and local_dict[name] is not null): + result.append((NAME, name)) + continue + elif name in local_dict: + local_dict.setdefault(null, set()).add(name) + if nextTokVal == '(': + local_dict[name] = Function(name) + else: + local_dict[name] = Symbol(name) + result.append((NAME, name)) + continue + elif name in global_dict: + obj = global_dict[name] + if isinstance(obj, (AssumptionKeys, Basic, type)) or callable(obj): + result.append((NAME, name)) + continue + + result.extend([ + (NAME, 'Symbol' if nextTokVal != '(' else 'Function'), + (OP, '('), + (NAME, repr(str(name))), + (OP, ')'), + ]) + else: + result.append((tokNum, tokVal)) + + prevTok = (tokNum, tokVal) + + return result + + +def lambda_notation(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """Substitutes "lambda" with its SymPy equivalent Lambda(). + However, the conversion does not take place if only "lambda" + is passed because that is a syntax error. + + """ + result: list[TOKEN] = [] + flag = False + toknum, tokval = tokens[0] + tokLen = len(tokens) + + if toknum == NAME and tokval == 'lambda': + if tokLen == 2 or tokLen == 3 and tokens[1][0] == NEWLINE: + # In Python 3.6.7+, inputs without a newline get NEWLINE added to + # the tokens + result.extend(tokens) + elif tokLen > 2: + result.extend([ + (NAME, 'Lambda'), + (OP, '('), + (OP, '('), + (OP, ')'), + (OP, ')'), + ]) + for tokNum, tokVal in tokens[1:]: + if tokNum == OP and tokVal == ':': + tokVal = ',' + flag = True + if not flag and tokNum == OP and tokVal in ('*', '**'): + raise TokenError("Starred arguments in lambda not supported") + if flag: + result.insert(-1, (tokNum, tokVal)) + else: + result.insert(-2, (tokNum, tokVal)) + else: + result.extend(tokens) + + return result + + +def factorial_notation(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """Allows standard notation for factorial.""" + result: list[TOKEN] = [] + nfactorial = 0 + for toknum, tokval in tokens: + if toknum == OP and tokval == "!": + # In Python 3.12 "!" are OP instead of ERRORTOKEN + nfactorial += 1 + elif toknum == ERRORTOKEN: + op = tokval + if op == '!': + nfactorial += 1 + else: + nfactorial = 0 + result.append((OP, op)) + else: + if nfactorial == 1: + result = _add_factorial_tokens('factorial', result) + elif nfactorial == 2: + result = _add_factorial_tokens('factorial2', result) + elif nfactorial > 2: + raise TokenError + nfactorial = 0 + result.append((toknum, tokval)) + return result + + +def convert_xor(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """Treats XOR, ``^``, as exponentiation, ``**``.""" + result: list[TOKEN] = [] + for toknum, tokval in tokens: + if toknum == OP: + if tokval == '^': + result.append((OP, '**')) + else: + result.append((toknum, tokval)) + else: + result.append((toknum, tokval)) + + return result + + +def repeated_decimals(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """ + Allows 0.2[1] notation to represent the repeated decimal 0.2111... (19/90) + + Run this before auto_number. + + """ + result: list[TOKEN] = [] + + def is_digit(s): + return all(i in '0123456789_' for i in s) + + # num will running match any DECIMAL [ INTEGER ] + num: list[TOKEN] = [] + for toknum, tokval in tokens: + if toknum == NUMBER: + if (not num and '.' in tokval and 'e' not in tokval.lower() and + 'j' not in tokval.lower()): + num.append((toknum, tokval)) + elif is_digit(tokval) and (len(num) == 2 or + len(num) == 3 and is_digit(num[-1][1])): + num.append((toknum, tokval)) + else: + num = [] + elif toknum == OP: + if tokval == '[' and len(num) == 1: + num.append((OP, tokval)) + elif tokval == ']' and len(num) >= 3: + num.append((OP, tokval)) + elif tokval == '.' and not num: + # handle .[1] + num.append((NUMBER, '0.')) + else: + num = [] + else: + num = [] + + result.append((toknum, tokval)) + + if num and num[-1][1] == ']': + # pre.post[repetend] = a + b/c + d/e where a = pre, b/c = post, + # and d/e = repetend + result = result[:-len(num)] + pre, post = num[0][1].split('.') + repetend = num[2][1] + if len(num) == 5: + repetend += num[3][1] + + pre = pre.replace('_', '') + post = post.replace('_', '') + repetend = repetend.replace('_', '') + + zeros = '0'*len(post) + post, repetends = [w.lstrip('0') for w in [post, repetend]] + # or else interpreted as octal + + a = pre or '0' + b, c = post or '0', '1' + zeros + d, e = repetends, ('9'*len(repetend)) + zeros + + seq = [ + (OP, '('), + (NAME, 'Integer'), + (OP, '('), + (NUMBER, a), + (OP, ')'), + (OP, '+'), + (NAME, 'Rational'), + (OP, '('), + (NUMBER, b), + (OP, ','), + (NUMBER, c), + (OP, ')'), + (OP, '+'), + (NAME, 'Rational'), + (OP, '('), + (NUMBER, d), + (OP, ','), + (NUMBER, e), + (OP, ')'), + (OP, ')'), + ] + result.extend(seq) + num = [] + + return result + + +def auto_number(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """ + Converts numeric literals to use SymPy equivalents. + + Complex numbers use ``I``, integer literals use ``Integer``, and float + literals use ``Float``. + + """ + result: list[TOKEN] = [] + + for toknum, tokval in tokens: + if toknum == NUMBER: + number = tokval + postfix = [] + + if number.endswith(('j', 'J')): + number = number[:-1] + postfix = [(OP, '*'), (NAME, 'I')] + + if '.' in number or (('e' in number or 'E' in number) and + not (number.startswith(('0x', '0X')))): + seq = [(NAME, 'Float'), (OP, '('), + (NUMBER, repr(str(number))), (OP, ')')] + else: + seq = [(NAME, 'Integer'), (OP, '('), ( + NUMBER, number), (OP, ')')] + + result.extend(seq + postfix) + else: + result.append((toknum, tokval)) + + return result + + +def rationalize(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """Converts floats into ``Rational``. Run AFTER ``auto_number``.""" + result: list[TOKEN] = [] + passed_float = False + for toknum, tokval in tokens: + if toknum == NAME: + if tokval == 'Float': + passed_float = True + tokval = 'Rational' + result.append((toknum, tokval)) + elif passed_float == True and toknum == NUMBER: + passed_float = False + result.append((STRING, tokval)) + else: + result.append((toknum, tokval)) + + return result + + +def _transform_equals_sign(tokens: list[TOKEN], local_dict: DICT, global_dict: DICT): + """Transforms the equals sign ``=`` to instances of Eq. + + This is a helper function for ``convert_equals_signs``. + Works with expressions containing one equals sign and no + nesting. Expressions like ``(1=2)=False`` will not work with this + and should be used with ``convert_equals_signs``. + + Examples: 1=2 to Eq(1,2) + 1*2=x to Eq(1*2, x) + + This does not deal with function arguments yet. + + """ + result: list[TOKEN] = [] + if (OP, "=") in tokens: + result.append((NAME, "Eq")) + result.append((OP, "(")) + for token in tokens: + if token == (OP, "="): + result.append((OP, ",")) + continue + result.append(token) + result.append((OP, ")")) + else: + result = tokens + return result + + +def convert_equals_signs(tokens: list[TOKEN], local_dict: DICT, + global_dict: DICT) -> list[TOKEN]: + """ Transforms all the equals signs ``=`` to instances of Eq. + + Parses the equals signs in the expression and replaces them with + appropriate Eq instances. Also works with nested equals signs. + + Does not yet play well with function arguments. + For example, the expression ``(x=y)`` is ambiguous and can be interpreted + as x being an argument to a function and ``convert_equals_signs`` will not + work for this. + + See also + ======== + convert_equality_operators + + Examples + ======== + + >>> from sympy.parsing.sympy_parser import (parse_expr, + ... standard_transformations, convert_equals_signs) + >>> parse_expr("1*2=x", transformations=( + ... standard_transformations + (convert_equals_signs,))) + Eq(2, x) + >>> parse_expr("(1*2=x)=False", transformations=( + ... standard_transformations + (convert_equals_signs,))) + Eq(Eq(2, x), False) + + """ + res1 = _group_parentheses(convert_equals_signs)(tokens, local_dict, global_dict) + res2 = _apply_functions(res1, local_dict, global_dict) + res3 = _transform_equals_sign(res2, local_dict, global_dict) + result = _flatten(res3) + return result + + +#: Standard transformations for :func:`parse_expr`. +#: Inserts calls to :class:`~.Symbol`, :class:`~.Integer`, and other SymPy +#: datatypes and allows the use of standard factorial notation (e.g. ``x!``). +standard_transformations: tuple[TRANS, ...] \ + = (lambda_notation, auto_symbol, repeated_decimals, auto_number, + factorial_notation) + + +def stringify_expr(s: str, local_dict: DICT, global_dict: DICT, + transformations: tuple[TRANS, ...]) -> str: + """ + Converts the string ``s`` to Python code, in ``local_dict`` + + Generally, ``parse_expr`` should be used. + """ + + tokens = [] + input_code = StringIO(s.strip()) + for toknum, tokval, _, _, _ in generate_tokens(input_code.readline): + tokens.append((toknum, tokval)) + + for transform in transformations: + tokens = transform(tokens, local_dict, global_dict) + + return untokenize(tokens) + + +def eval_expr(code, local_dict: DICT, global_dict: DICT): + """ + Evaluate Python code generated by ``stringify_expr``. + + Generally, ``parse_expr`` should be used. + """ + expr = eval( + code, global_dict, local_dict) # take local objects in preference + return expr + + +def parse_expr(s: str, local_dict: DICT | None = None, + transformations: tuple[TRANS, ...] | str \ + = standard_transformations, + global_dict: DICT | None = None, evaluate=True): + """Converts the string ``s`` to a SymPy expression, in ``local_dict``. + + .. warning:: + Note that this function uses ``eval``, and thus shouldn't be used on + unsanitized input. + + Parameters + ========== + + s : str + The string to parse. + + local_dict : dict, optional + A dictionary of local variables to use when parsing. + + global_dict : dict, optional + A dictionary of global variables. By default, this is initialized + with ``from sympy import *``; provide this parameter to override + this behavior (for instance, to parse ``"Q & S"``). + + transformations : tuple or str + A tuple of transformation functions used to modify the tokens of the + parsed expression before evaluation. The default transformations + convert numeric literals into their SymPy equivalents, convert + undefined variables into SymPy symbols, and allow the use of standard + mathematical factorial notation (e.g. ``x!``). Selection via + string is available (see below). + + evaluate : bool, optional + When False, the order of the arguments will remain as they were in the + string and automatic simplification that would normally occur is + suppressed. (see examples) + + Examples + ======== + + >>> from sympy.parsing.sympy_parser import parse_expr + >>> parse_expr("1/2") + 1/2 + >>> type(_) + + >>> from sympy.parsing.sympy_parser import standard_transformations,\\ + ... implicit_multiplication_application + >>> transformations = (standard_transformations + + ... (implicit_multiplication_application,)) + >>> parse_expr("2x", transformations=transformations) + 2*x + + When evaluate=False, some automatic simplifications will not occur: + + >>> parse_expr("2**3"), parse_expr("2**3", evaluate=False) + (8, 2**3) + + In addition the order of the arguments will not be made canonical. + This feature allows one to tell exactly how the expression was entered: + + >>> a = parse_expr('1 + x', evaluate=False) + >>> b = parse_expr('x + 1', evaluate=False) + >>> a == b + False + >>> a.args + (1, x) + >>> b.args + (x, 1) + + Note, however, that when these expressions are printed they will + appear the same: + + >>> assert str(a) == str(b) + + As a convenience, transformations can be seen by printing ``transformations``: + + >>> from sympy.parsing.sympy_parser import transformations + + >>> print(transformations) + 0: lambda_notation + 1: auto_symbol + 2: repeated_decimals + 3: auto_number + 4: factorial_notation + 5: implicit_multiplication_application + 6: convert_xor + 7: implicit_application + 8: implicit_multiplication + 9: convert_equals_signs + 10: function_exponentiation + 11: rationalize + + The ``T`` object provides a way to select these transformations: + + >>> from sympy.parsing.sympy_parser import T + + If you print it, you will see the same list as shown above. + + >>> str(T) == str(transformations) + True + + Standard slicing will return a tuple of transformations: + + >>> T[:5] == standard_transformations + True + + So ``T`` can be used to specify the parsing transformations: + + >>> parse_expr("2x", transformations=T[:5]) + Traceback (most recent call last): + ... + SyntaxError: invalid syntax + >>> parse_expr("2x", transformations=T[:6]) + 2*x + >>> parse_expr('.3', transformations=T[3, 11]) + 3/10 + >>> parse_expr('.3x', transformations=T[:]) + 3*x/10 + + As a further convenience, strings 'implicit' and 'all' can be used + to select 0-5 and all the transformations, respectively. + + >>> parse_expr('.3x', transformations='all') + 3*x/10 + + See Also + ======== + + stringify_expr, eval_expr, standard_transformations, + implicit_multiplication_application + + """ + + if local_dict is None: + local_dict = {} + elif not isinstance(local_dict, dict): + raise TypeError('expecting local_dict to be a dict') + elif null in local_dict: + raise ValueError('cannot use "" in local_dict') + + if global_dict is None: + global_dict = {} + exec('from sympy import *', global_dict) + + builtins_dict = vars(builtins) + for name, obj in builtins_dict.items(): + if isinstance(obj, types.BuiltinFunctionType): + global_dict[name] = obj + global_dict['max'] = Max + global_dict['min'] = Min + + elif not isinstance(global_dict, dict): + raise TypeError('expecting global_dict to be a dict') + + transformations = transformations or () + if isinstance(transformations, str): + if transformations == 'all': + _transformations = T[:] + elif transformations == 'implicit': + _transformations = T[:6] + else: + raise ValueError('unknown transformation group name') + else: + _transformations = transformations + + code = stringify_expr(s, local_dict, global_dict, _transformations) + + if not evaluate: + code = compile(evaluateFalse(code), '', 'eval') # type: ignore + + try: + rv = eval_expr(code, local_dict, global_dict) + # restore neutral definitions for names + for i in local_dict.pop(null, ()): + local_dict[i] = null + return rv + except Exception as e: + # restore neutral definitions for names + for i in local_dict.pop(null, ()): + local_dict[i] = null + raise e from ValueError(f"Error from parse_expr with transformed code: {code!r}") + + +def evaluateFalse(s: str): + """ + Replaces operators with the SymPy equivalent and sets evaluate=False. + """ + node = ast.parse(s) + transformed_node = EvaluateFalseTransformer().visit(node) + # node is a Module, we want an Expression + transformed_node = ast.Expression(transformed_node.body[0].value) + + return ast.fix_missing_locations(transformed_node) + + +class EvaluateFalseTransformer(ast.NodeTransformer): + operators = { + ast.Add: 'Add', + ast.Mult: 'Mul', + ast.Pow: 'Pow', + ast.Sub: 'Add', + ast.Div: 'Mul', + ast.BitOr: 'Or', + ast.BitAnd: 'And', + ast.BitXor: 'Not', + } + functions = ( + 'Abs', 'im', 're', 'sign', 'arg', 'conjugate', + 'acos', 'acot', 'acsc', 'asec', 'asin', 'atan', + 'acosh', 'acoth', 'acsch', 'asech', 'asinh', 'atanh', + 'cos', 'cot', 'csc', 'sec', 'sin', 'tan', + 'cosh', 'coth', 'csch', 'sech', 'sinh', 'tanh', + 'exp', 'ln', 'log', 'sqrt', 'cbrt', + ) + + relational_operators = { + ast.NotEq: 'Ne', + ast.Lt: 'Lt', + ast.LtE: 'Le', + ast.Gt: 'Gt', + ast.GtE: 'Ge', + ast.Eq: 'Eq' + } + def visit_Compare(self, node): + def reducer(acc, op_right): + result, left = acc + op, right = op_right + if op.__class__ not in self.relational_operators: + raise ValueError("Only equation or inequality operators are supported") + new = ast.Call( + func=ast.Name( + id=self.relational_operators[op.__class__], ctx=ast.Load() + ), + args=[self.visit(left), self.visit(right)], + keywords=[ast.keyword(arg="evaluate", value=ast.Constant(value=False))], + ) + return result + [new], right + + args, _ = reduce( + reducer, zip(node.ops, node.comparators), ([], node.left) + ) + if len(args) == 1: + return args[0] + return ast.Call( + func=ast.Name(id=self.operators[ast.BitAnd], ctx=ast.Load()), + args=args, + keywords=[ast.keyword(arg="evaluate", value=ast.Constant(value=False))], + ) + + def flatten(self, args, func): + result = [] + for arg in args: + if isinstance(arg, ast.Call): + arg_func = arg.func + if isinstance(arg_func, ast.Call): + arg_func = arg_func.func + if arg_func.id == func: + result.extend(self.flatten(arg.args, func)) + else: + result.append(arg) + else: + result.append(arg) + return result + + def visit_BinOp(self, node): + if node.op.__class__ in self.operators: + sympy_class = self.operators[node.op.__class__] + right = self.visit(node.right) + left = self.visit(node.left) + + rev = False + if isinstance(node.op, ast.Sub): + right = ast.Call( + func=ast.Name(id='Mul', ctx=ast.Load()), + args=[ast.UnaryOp(op=ast.USub(), operand=ast.Constant(1)), right], + keywords=[ast.keyword(arg='evaluate', value=ast.Constant(value=False))] + ) + elif isinstance(node.op, ast.Div): + if isinstance(node.left, ast.UnaryOp): + left, right = right, left + rev = True + left = ast.Call( + func=ast.Name(id='Pow', ctx=ast.Load()), + args=[left, ast.UnaryOp(op=ast.USub(), operand=ast.Constant(1))], + keywords=[ast.keyword(arg='evaluate', value=ast.Constant(value=False))] + ) + else: + right = ast.Call( + func=ast.Name(id='Pow', ctx=ast.Load()), + args=[right, ast.UnaryOp(op=ast.USub(), operand=ast.Constant(1))], + keywords=[ast.keyword(arg='evaluate', value=ast.Constant(value=False))] + ) + + if rev: # undo reversal + left, right = right, left + new_node = ast.Call( + func=ast.Name(id=sympy_class, ctx=ast.Load()), + args=[left, right], + keywords=[ast.keyword(arg='evaluate', value=ast.Constant(value=False))] + ) + + if sympy_class in ('Add', 'Mul'): + # Denest Add or Mul as appropriate + new_node.args = self.flatten(new_node.args, sympy_class) + + return new_node + return node + + def visit_Call(self, node): + new_node = self.generic_visit(node) + if isinstance(node.func, ast.Name) and node.func.id in self.functions: + new_node.keywords.append(ast.keyword(arg='evaluate', value=ast.Constant(value=False))) + return new_node + + +_transformation = { # items can be added but never re-ordered +0: lambda_notation, +1: auto_symbol, +2: repeated_decimals, +3: auto_number, +4: factorial_notation, +5: implicit_multiplication_application, +6: convert_xor, +7: implicit_application, +8: implicit_multiplication, +9: convert_equals_signs, +10: function_exponentiation, +11: rationalize} + +transformations = '\n'.join('%s: %s' % (i, func_name(f)) for i, f in _transformation.items()) + + +class _T(): + """class to retrieve transformations from a given slice + + EXAMPLES + ======== + + >>> from sympy.parsing.sympy_parser import T, standard_transformations + >>> assert T[:5] == standard_transformations + """ + def __init__(self): + self.N = len(_transformation) + + def __str__(self): + return transformations + + def __getitem__(self, t): + if not type(t) is tuple: + t = (t,) + i = [] + for ti in t: + if type(ti) is int: + i.append(range(self.N)[ti]) + elif type(ti) is slice: + i.extend(range(*ti.indices(self.N))) + else: + raise TypeError('unexpected slice arg') + return tuple([_transformation[_] for _ in i]) + +T = _T() diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/__init__.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/__init__.py new file mode 100644 index 0000000000000000000000000000000000000000..e69de29bb2d1d6434b8b29ae775ad8c2e48c5391 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_ast_parser.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_ast_parser.py new file mode 100644 index 0000000000000000000000000000000000000000..24572190df72f9be11b5830355b0d6b9e3bb53ad --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_ast_parser.py @@ -0,0 +1,25 @@ +from sympy.core.singleton import S +from sympy.core.symbol import symbols +from sympy.parsing.ast_parser import parse_expr +from sympy.testing.pytest import raises +from sympy.core.sympify import SympifyError +import warnings + +def test_parse_expr(): + a, b = symbols('a, b') + # tests issue_16393 + assert parse_expr('a + b', {}) == a + b + raises(SympifyError, lambda: parse_expr('a + ', {})) + + # tests Transform.visit_Constant + assert parse_expr('1 + 2', {}) == S(3) + assert parse_expr('1 + 2.0', {}) == S(3.0) + + # tests Transform.visit_Name + assert parse_expr('Rational(1, 2)', {}) == S(1)/2 + assert parse_expr('a', {'a': a}) == a + + # tests issue_23092 + with warnings.catch_warnings(): + warnings.simplefilter('error') + assert parse_expr('6 * 7', {}) == S(42) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_autolev.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_autolev.py new file mode 100644 index 0000000000000000000000000000000000000000..dfcaef13565c5e2187dc6e90113b407a7967c331 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_autolev.py @@ -0,0 +1,178 @@ +import os + +from sympy.functions.elementary.trigonometric import (cos, sin) +from sympy.external import import_module +from sympy.testing.pytest import skip +from sympy.parsing.autolev import parse_autolev + +antlr4 = import_module("antlr4") + +if not antlr4: + disabled = True + +FILE_DIR = os.path.dirname( + os.path.dirname(os.path.abspath(os.path.realpath(__file__)))) + + +def _test_examples(in_filename, out_filename, test_name=""): + + in_file_path = os.path.join(FILE_DIR, 'autolev', 'test-examples', + in_filename) + correct_file_path = os.path.join(FILE_DIR, 'autolev', 'test-examples', + out_filename) + with open(in_file_path) as f: + generated_code = parse_autolev(f, include_numeric=True) + + with open(correct_file_path) as f: + for idx, line1 in enumerate(f): + if line1.startswith("#"): + break + try: + line2 = generated_code.split('\n')[idx] + assert line1.rstrip() == line2.rstrip() + except Exception: + msg = 'mismatch in ' + test_name + ' in line no: {0}' + raise AssertionError(msg.format(idx+1)) + + +def test_rule_tests(): + + l = ["ruletest1", "ruletest2", "ruletest3", "ruletest4", "ruletest5", + "ruletest6", "ruletest7", "ruletest8", "ruletest9", "ruletest10", + "ruletest11", "ruletest12"] + + for i in l: + in_filepath = i + ".al" + out_filepath = i + ".py" + _test_examples(in_filepath, out_filepath, i) + + +def test_pydy_examples(): + + l = ["mass_spring_damper", "chaos_pendulum", "double_pendulum", + "non_min_pendulum"] + + for i in l: + in_filepath = os.path.join("pydy-example-repo", i + ".al") + out_filepath = os.path.join("pydy-example-repo", i + ".py") + _test_examples(in_filepath, out_filepath, i) + + +def test_autolev_tutorial(): + + dir_path = os.path.join(FILE_DIR, 'autolev', 'test-examples', + 'autolev-tutorial') + + if os.path.isdir(dir_path): + l = ["tutor1", "tutor2", "tutor3", "tutor4", "tutor5", "tutor6", + "tutor7"] + for i in l: + in_filepath = os.path.join("autolev-tutorial", i + ".al") + out_filepath = os.path.join("autolev-tutorial", i + ".py") + _test_examples(in_filepath, out_filepath, i) + + +def test_dynamics_online(): + + dir_path = os.path.join(FILE_DIR, 'autolev', 'test-examples', + 'dynamics-online') + + if os.path.isdir(dir_path): + ch1 = ["1-4", "1-5", "1-6", "1-7", "1-8", "1-9_1", "1-9_2", "1-9_3"] + ch2 = ["2-1", "2-2", "2-3", "2-4", "2-5", "2-6", "2-7", "2-8", "2-9", + "circular"] + ch3 = ["3-1_1", "3-1_2", "3-2_1", "3-2_2", "3-2_3", "3-2_4", "3-2_5", + "3-3"] + ch4 = ["4-1_1", "4-2_1", "4-4_1", "4-4_2", "4-5_1", "4-5_2"] + chapters = [(ch1, "ch1"), (ch2, "ch2"), (ch3, "ch3"), (ch4, "ch4")] + for ch, name in chapters: + for i in ch: + in_filepath = os.path.join("dynamics-online", name, i + ".al") + out_filepath = os.path.join("dynamics-online", name, i + ".py") + _test_examples(in_filepath, out_filepath, i) + + +def test_output_01(): + """Autolev example calculates the position, velocity, and acceleration of a + point and expresses in a single reference frame:: + + (1) FRAMES C,D,F + (2) VARIABLES FD'',DC'' + (3) CONSTANTS R,L + (4) POINTS O,E + (5) SIMPROT(F,D,1,FD) + -> (6) F_D = [1, 0, 0; 0, COS(FD), -SIN(FD); 0, SIN(FD), COS(FD)] + (7) SIMPROT(D,C,2,DC) + -> (8) D_C = [COS(DC), 0, SIN(DC); 0, 1, 0; -SIN(DC), 0, COS(DC)] + (9) W_C_F> = EXPRESS(W_C_F>, F) + -> (10) W_C_F> = FD'*F1> + COS(FD)*DC'*F2> + SIN(FD)*DC'*F3> + (11) P_O_E>=R*D2>-L*C1> + (12) P_O_E>=EXPRESS(P_O_E>, D) + -> (13) P_O_E> = -L*COS(DC)*D1> + R*D2> + L*SIN(DC)*D3> + (14) V_E_F>=EXPRESS(DT(P_O_E>,F),D) + -> (15) V_E_F> = L*SIN(DC)*DC'*D1> - L*SIN(DC)*FD'*D2> + (R*FD'+L*COS(DC)*DC')*D3> + (16) A_E_F>=EXPRESS(DT(V_E_F>,F),D) + -> (17) A_E_F> = L*(COS(DC)*DC'^2+SIN(DC)*DC'')*D1> + (-R*FD'^2-2*L*COS(DC)*DC'*FD'-L*SIN(DC)*FD'')*D2> + (R*FD''+L*COS(DC)*DC''-L*SIN(DC)*DC'^2-L*SIN(DC)*FD'^2)*D3> + + """ + + if not antlr4: + skip('Test skipped: antlr4 is not installed.') + + autolev_input = """\ +FRAMES C,D,F +VARIABLES FD'',DC'' +CONSTANTS R,L +POINTS O,E +SIMPROT(F,D,1,FD) +SIMPROT(D,C,2,DC) +W_C_F>=EXPRESS(W_C_F>,F) +P_O_E>=R*D2>-L*C1> +P_O_E>=EXPRESS(P_O_E>,D) +V_E_F>=EXPRESS(DT(P_O_E>,F),D) +A_E_F>=EXPRESS(DT(V_E_F>,F),D)\ +""" + + sympy_input = parse_autolev(autolev_input) + + g = {} + l = {} + exec(sympy_input, g, l) + + w_c_f = l['frame_c'].ang_vel_in(l['frame_f']) + # P_O_E> means "the position of point E wrt to point O" + p_o_e = l['point_e'].pos_from(l['point_o']) + v_e_f = l['point_e'].vel(l['frame_f']) + a_e_f = l['point_e'].acc(l['frame_f']) + + # NOTE : The Autolev outputs above were manually transformed into + # equivalent SymPy physics vector expressions. Would be nice to automate + # this transformation. + expected_w_c_f = (l['fd'].diff()*l['frame_f'].x + + cos(l['fd'])*l['dc'].diff()*l['frame_f'].y + + sin(l['fd'])*l['dc'].diff()*l['frame_f'].z) + + assert (w_c_f - expected_w_c_f).simplify() == 0 + + expected_p_o_e = (-l['l']*cos(l['dc'])*l['frame_d'].x + + l['r']*l['frame_d'].y + + l['l']*sin(l['dc'])*l['frame_d'].z) + + assert (p_o_e - expected_p_o_e).simplify() == 0 + + expected_v_e_f = (l['l']*sin(l['dc'])*l['dc'].diff()*l['frame_d'].x - + l['l']*sin(l['dc'])*l['fd'].diff()*l['frame_d'].y + + (l['r']*l['fd'].diff() + + l['l']*cos(l['dc'])*l['dc'].diff())*l['frame_d'].z) + assert (v_e_f - expected_v_e_f).simplify() == 0 + + expected_a_e_f = (l['l']*(cos(l['dc'])*l['dc'].diff()**2 + + sin(l['dc'])*l['dc'].diff().diff())*l['frame_d'].x + + (-l['r']*l['fd'].diff()**2 - + 2*l['l']*cos(l['dc'])*l['dc'].diff()*l['fd'].diff() - + l['l']*sin(l['dc'])*l['fd'].diff().diff())*l['frame_d'].y + + (l['r']*l['fd'].diff().diff() + + l['l']*cos(l['dc'])*l['dc'].diff().diff() - + l['l']*sin(l['dc'])*l['dc'].diff()**2 - + l['l']*sin(l['dc'])*l['fd'].diff()**2)*l['frame_d'].z) + assert (a_e_f - expected_a_e_f).simplify() == 0 diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_c_parser.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_c_parser.py new file mode 100644 index 0000000000000000000000000000000000000000..b74622e40030cba180cb4fc354216ccca119baec --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_c_parser.py @@ -0,0 +1,5248 @@ +from sympy.parsing.sym_expr import SymPyExpression +from sympy.testing.pytest import raises, XFAIL +from sympy.external import import_module + +cin = import_module('clang.cindex', import_kwargs = {'fromlist': ['cindex']}) + +if cin: + from sympy.codegen.ast import (Variable, String, Return, + FunctionDefinition, Integer, Float, Declaration, CodeBlock, + FunctionPrototype, FunctionCall, NoneToken, Assignment, Type, + IntBaseType, SignedIntType, UnsignedIntType, FloatType, + AddAugmentedAssignment, SubAugmentedAssignment, + MulAugmentedAssignment, DivAugmentedAssignment, + ModAugmentedAssignment, While) + from sympy.codegen.cnodes import (PreDecrement, PostDecrement, + PreIncrement, PostIncrement) + from sympy.core import (Add, Mul, Mod, Pow, Rational, + StrictLessThan, LessThan, StrictGreaterThan, GreaterThan, + Equality, Unequality) + from sympy.logic.boolalg import And, Not, Or + from sympy.core.symbol import Symbol + from sympy.logic.boolalg import (false, true) + import os + + def test_variable(): + c_src1 = ( + 'int a;' + '\n' + + 'int b;' + '\n' + ) + c_src2 = ( + 'float a;' + '\n' + + 'float b;' + '\n' + ) + c_src3 = ( + 'int a;' + '\n' + + 'float b;' + '\n' + + 'int c;' + ) + c_src4 = ( + 'int x = 1, y = 6.78;' + '\n' + + 'float p = 2, q = 9.67;' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + + assert res1[0] == Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')) + ) + ) + + assert res1[1] == Declaration( + Variable( + Symbol('b'), + type=IntBaseType(String('intc')) + ) + ) + + assert res2[0] == Declaration( + Variable( + Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ) + assert res2[1] == Declaration( + Variable( + Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ) + + assert res3[0] == Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')) + ) + ) + + assert res3[1] == Declaration( + Variable( + Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ) + + assert res3[2] == Declaration( + Variable( + Symbol('c'), + type=IntBaseType(String('intc')) + ) + ) + + assert res4[0] == Declaration( + Variable( + Symbol('x'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res4[1] == Declaration( + Variable( + Symbol('y'), + type=IntBaseType(String('intc')), + value=Integer(6) + ) + ) + + assert res4[2] == Declaration( + Variable( + Symbol('p'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('2.0', precision=53) + ) + ) + + assert res4[3] == Declaration( + Variable( + Symbol('q'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('9.67', precision=53) + ) + ) + + + def test_int(): + c_src1 = 'int a = 1;' + c_src2 = ( + 'int a = 1;' + '\n' + + 'int b = 2;' + '\n' + ) + c_src3 = 'int a = 2.345, b = 5.67;' + c_src4 = 'int p = 6, q = 23.45;' + c_src5 = "int x = '0', y = 'a';" + c_src6 = "int r = true, s = false;" + + # cin.TypeKind.UCHAR + c_src_type1 = ( + "signed char a = 1, b = 5.1;" + ) + + # cin.TypeKind.SHORT + c_src_type2 = ( + "short a = 1, b = 5.1;" + "signed short c = 1, d = 5.1;" + "short int e = 1, f = 5.1;" + "signed short int g = 1, h = 5.1;" + ) + + # cin.TypeKind.INT + c_src_type3 = ( + "signed int a = 1, b = 5.1;" + "int c = 1, d = 5.1;" + ) + + # cin.TypeKind.LONG + c_src_type4 = ( + "long a = 1, b = 5.1;" + "long int c = 1, d = 5.1;" + ) + + # cin.TypeKind.UCHAR + c_src_type5 = "unsigned char a = 1, b = 5.1;" + + # cin.TypeKind.USHORT + c_src_type6 = ( + "unsigned short a = 1, b = 5.1;" + "unsigned short int c = 1, d = 5.1;" + ) + + # cin.TypeKind.UINT + c_src_type7 = "unsigned int a = 1, b = 5.1;" + + # cin.TypeKind.ULONG + c_src_type8 = ( + "unsigned long a = 1, b = 5.1;" + "unsigned long int c = 1, d = 5.1;" + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + res5 = SymPyExpression(c_src5, 'c').return_expr() + res6 = SymPyExpression(c_src6, 'c').return_expr() + + res_type1 = SymPyExpression(c_src_type1, 'c').return_expr() + res_type2 = SymPyExpression(c_src_type2, 'c').return_expr() + res_type3 = SymPyExpression(c_src_type3, 'c').return_expr() + res_type4 = SymPyExpression(c_src_type4, 'c').return_expr() + res_type5 = SymPyExpression(c_src_type5, 'c').return_expr() + res_type6 = SymPyExpression(c_src_type6, 'c').return_expr() + res_type7 = SymPyExpression(c_src_type7, 'c').return_expr() + res_type8 = SymPyExpression(c_src_type8, 'c').return_expr() + + assert res1[0] == Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res2[0] == Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res2[1] == Declaration( + Variable( + Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res3[0] == Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res3[1] == Declaration( + Variable( + Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(5) + ) + ) + + assert res4[0] == Declaration( + Variable( + Symbol('p'), + type=IntBaseType(String('intc')), + value=Integer(6) + ) + ) + + assert res4[1] == Declaration( + Variable( + Symbol('q'), + type=IntBaseType(String('intc')), + value=Integer(23) + ) + ) + + assert res5[0] == Declaration( + Variable( + Symbol('x'), + type=IntBaseType(String('intc')), + value=Integer(48) + ) + ) + + assert res5[1] == Declaration( + Variable( + Symbol('y'), + type=IntBaseType(String('intc')), + value=Integer(97) + ) + ) + + assert res6[0] == Declaration( + Variable( + Symbol('r'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res6[1] == Declaration( + Variable( + Symbol('s'), + type=IntBaseType(String('intc')), + value=Integer(0) + ) + ) + + assert res_type1[0] == Declaration( + Variable( + Symbol('a'), + type=SignedIntType( + String('int8'), + nbits=Integer(8) + ), + value=Integer(1) + ) + ) + + assert res_type1[1] == Declaration( + Variable( + Symbol('b'), + type=SignedIntType( + String('int8'), + nbits=Integer(8) + ), + value=Integer(5) + ) + ) + + assert res_type2[0] == Declaration( + Variable( + Symbol('a'), + type=SignedIntType( + String('int16'), + nbits=Integer(16) + ), + value=Integer(1) + ) + ) + + assert res_type2[1] == Declaration( + Variable( + Symbol('b'), + type=SignedIntType( + String('int16'), + nbits=Integer(16) + ), + value=Integer(5) + ) + ) + + assert res_type2[2] == Declaration( + Variable(Symbol('c'), + type=SignedIntType( + String('int16'), + nbits=Integer(16) + ), + value=Integer(1) + ) + ) + + assert res_type2[3] == Declaration( + Variable( + Symbol('d'), + type=SignedIntType( + String('int16'), + nbits=Integer(16) + ), + value=Integer(5) + ) + ) + + assert res_type2[4] == Declaration( + Variable( + Symbol('e'), + type=SignedIntType( + String('int16'), + nbits=Integer(16) + ), + value=Integer(1) + ) + ) + + assert res_type2[5] == Declaration( + Variable( + Symbol('f'), + type=SignedIntType( + String('int16'), + nbits=Integer(16) + ), + value=Integer(5) + ) + ) + + assert res_type2[6] == Declaration( + Variable( + Symbol('g'), + type=SignedIntType( + String('int16'), + nbits=Integer(16) + ), + value=Integer(1) + ) + ) + + assert res_type2[7] == Declaration( + Variable( + Symbol('h'), + type=SignedIntType( + String('int16'), + nbits=Integer(16) + ), + value=Integer(5) + ) + ) + + assert res_type3[0] == Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res_type3[1] == Declaration( + Variable( + Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(5) + ) + ) + + assert res_type3[2] == Declaration( + Variable( + Symbol('c'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res_type3[3] == Declaration( + Variable( + Symbol('d'), + type=IntBaseType(String('intc')), + value=Integer(5) + ) + ) + + assert res_type4[0] == Declaration( + Variable( + Symbol('a'), + type=SignedIntType( + String('int64'), + nbits=Integer(64) + ), + value=Integer(1) + ) + ) + + assert res_type4[1] == Declaration( + Variable( + Symbol('b'), + type=SignedIntType( + String('int64'), + nbits=Integer(64) + ), + value=Integer(5) + ) + ) + + assert res_type4[2] == Declaration( + Variable( + Symbol('c'), + type=SignedIntType( + String('int64'), + nbits=Integer(64) + ), + value=Integer(1) + ) + ) + + assert res_type4[3] == Declaration( + Variable( + Symbol('d'), + type=SignedIntType( + String('int64'), + nbits=Integer(64) + ), + value=Integer(5) + ) + ) + + assert res_type5[0] == Declaration( + Variable( + Symbol('a'), + type=UnsignedIntType( + String('uint8'), + nbits=Integer(8) + ), + value=Integer(1) + ) + ) + + assert res_type5[1] == Declaration( + Variable( + Symbol('b'), + type=UnsignedIntType( + String('uint8'), + nbits=Integer(8) + ), + value=Integer(5) + ) + ) + + assert res_type6[0] == Declaration( + Variable( + Symbol('a'), + type=UnsignedIntType( + String('uint16'), + nbits=Integer(16) + ), + value=Integer(1) + ) + ) + + assert res_type6[1] == Declaration( + Variable( + Symbol('b'), + type=UnsignedIntType( + String('uint16'), + nbits=Integer(16) + ), + value=Integer(5) + ) + ) + + assert res_type6[2] == Declaration( + Variable( + Symbol('c'), + type=UnsignedIntType( + String('uint16'), + nbits=Integer(16) + ), + value=Integer(1) + ) + ) + + assert res_type6[3] == Declaration( + Variable( + Symbol('d'), + type=UnsignedIntType( + String('uint16'), + nbits=Integer(16) + ), + value=Integer(5) + ) + ) + + assert res_type7[0] == Declaration( + Variable( + Symbol('a'), + type=UnsignedIntType( + String('uint32'), + nbits=Integer(32) + ), + value=Integer(1) + ) + ) + + assert res_type7[1] == Declaration( + Variable( + Symbol('b'), + type=UnsignedIntType( + String('uint32'), + nbits=Integer(32) + ), + value=Integer(5) + ) + ) + + assert res_type8[0] == Declaration( + Variable( + Symbol('a'), + type=UnsignedIntType( + String('uint64'), + nbits=Integer(64) + ), + value=Integer(1) + ) + ) + + assert res_type8[1] == Declaration( + Variable( + Symbol('b'), + type=UnsignedIntType( + String('uint64'), + nbits=Integer(64) + ), + value=Integer(5) + ) + ) + + assert res_type8[2] == Declaration( + Variable( + Symbol('c'), + type=UnsignedIntType( + String('uint64'), + nbits=Integer(64) + ), + value=Integer(1) + ) + ) + + assert res_type8[3] == Declaration( + Variable( + Symbol('d'), + type=UnsignedIntType( + String('uint64'), + nbits=Integer(64) + ), + value=Integer(5) + ) + ) + + + def test_float(): + c_src1 = 'float a = 1.0;' + c_src2 = ( + 'float a = 1.25;' + '\n' + + 'float b = 2.39;' + '\n' + ) + c_src3 = 'float x = 1, y = 2;' + c_src4 = 'float p = 5, e = 7.89;' + c_src5 = 'float r = true, s = false;' + + # cin.TypeKind.FLOAT + c_src_type1 = 'float x = 1, y = 2.5;' + + # cin.TypeKind.DOUBLE + c_src_type2 = 'double x = 1, y = 2.5;' + + # cin.TypeKind.LONGDOUBLE + c_src_type3 = 'long double x = 1, y = 2.5;' + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + res5 = SymPyExpression(c_src5, 'c').return_expr() + + res_type1 = SymPyExpression(c_src_type1, 'c').return_expr() + res_type2 = SymPyExpression(c_src_type2, 'c').return_expr() + res_type3 = SymPyExpression(c_src_type3, 'c').return_expr() + + assert res1[0] == Declaration( + Variable( + Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('1.0', precision=53) + ) + ) + + assert res2[0] == Declaration( + Variable( + Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('1.25', precision=53) + ) + ) + + assert res2[1] == Declaration( + Variable( + Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('2.3900000000000001', precision=53) + ) + ) + + assert res3[0] == Declaration( + Variable( + Symbol('x'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('1.0', precision=53) + ) + ) + + assert res3[1] == Declaration( + Variable( + Symbol('y'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('2.0', precision=53) + ) + ) + + assert res4[0] == Declaration( + Variable( + Symbol('p'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('5.0', precision=53) + ) + ) + + assert res4[1] == Declaration( + Variable( + Symbol('e'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('7.89', precision=53) + ) + ) + + assert res5[0] == Declaration( + Variable( + Symbol('r'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('1.0', precision=53) + ) + ) + + assert res5[1] == Declaration( + Variable( + Symbol('s'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('0.0', precision=53) + ) + ) + + assert res_type1[0] == Declaration( + Variable( + Symbol('x'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('1.0', precision=53) + ) + ) + + assert res_type1[1] == Declaration( + Variable( + Symbol('y'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('2.5', precision=53) + ) + ) + assert res_type2[0] == Declaration( + Variable( + Symbol('x'), + type=FloatType( + String('float64'), + nbits=Integer(64), + nmant=Integer(52), + nexp=Integer(11) + ), + value=Float('1.0', precision=53) + ) + ) + + assert res_type2[1] == Declaration( + Variable( + Symbol('y'), + type=FloatType( + String('float64'), + nbits=Integer(64), + nmant=Integer(52), + nexp=Integer(11) + ), + value=Float('2.5', precision=53) + ) + ) + + assert res_type3[0] == Declaration( + Variable( + Symbol('x'), + type=FloatType( + String('float80'), + nbits=Integer(80), + nmant=Integer(63), + nexp=Integer(15) + ), + value=Float('1.0', precision=53) + ) + ) + + assert res_type3[1] == Declaration( + Variable( + Symbol('y'), + type=FloatType( + String('float80'), + nbits=Integer(80), + nmant=Integer(63), + nexp=Integer(15) + ), + value=Float('2.5', precision=53) + ) + ) + + + def test_bool(): + c_src1 = ( + 'bool a = true, b = false;' + ) + + c_src2 = ( + 'bool a = 1, b = 0;' + ) + + c_src3 = ( + 'bool a = 10, b = 20;' + ) + + c_src4 = ( + 'bool a = 19.1, b = 9.0, c = 0.0;' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + + assert res1[0] == Declaration( + Variable(Symbol('a'), + type=Type(String('bool')), + value=true + ) + ) + + assert res1[1] == Declaration( + Variable(Symbol('b'), + type=Type(String('bool')), + value=false + ) + ) + + assert res2[0] == Declaration( + Variable(Symbol('a'), + type=Type(String('bool')), + value=true) + ) + + assert res2[1] == Declaration( + Variable(Symbol('b'), + type=Type(String('bool')), + value=false + ) + ) + + assert res3[0] == Declaration( + Variable(Symbol('a'), + type=Type(String('bool')), + value=true + ) + ) + + assert res3[1] == Declaration( + Variable(Symbol('b'), + type=Type(String('bool')), + value=true + ) + ) + + assert res4[0] == Declaration( + Variable(Symbol('a'), + type=Type(String('bool')), + value=true) + ) + + assert res4[1] == Declaration( + Variable(Symbol('b'), + type=Type(String('bool')), + value=true + ) + ) + + assert res4[2] == Declaration( + Variable(Symbol('c'), + type=Type(String('bool')), + value=false + ) + ) + + @XFAIL # this is expected to fail because of a bug in the C parser. + def test_function(): + c_src1 = ( + 'void fun1()' + '\n' + + '{' + '\n' + + 'int a;' + '\n' + + '}' + ) + c_src2 = ( + 'int fun2()' + '\n' + + '{'+ '\n' + + 'int a;' + '\n' + + 'return a;' + '\n' + + '}' + ) + c_src3 = ( + 'float fun3()' + '\n' + + '{' + '\n' + + 'float b;' + '\n' + + 'return b;' + '\n' + + '}' + ) + c_src4 = ( + 'float fun4()' + '\n' + + '{}' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + + assert res1[0] == FunctionDefinition( + NoneToken(), + name=String('fun1'), + parameters=(), + body=CodeBlock( + Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')) + ) + ) + ) + ) + + assert res2[0] == FunctionDefinition( + IntBaseType(String('intc')), + name=String('fun2'), + parameters=(), + body=CodeBlock( + Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Return('a') + ) + ) + + assert res3[0] == FunctionDefinition( + FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + name=String('fun3'), + parameters=(), + body=CodeBlock( + Declaration( + Variable( + Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Return('b') + ) + ) + + assert res4[0] == FunctionPrototype( + FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + name=String('fun4'), + parameters=() + ) + + @XFAIL # this is expected to fail because of a bug in the C parser. + def test_parameters(): + c_src1 = ( + 'void fun1( int a)' + '\n' + + '{' + '\n' + + 'int i;' + '\n' + + '}' + ) + c_src2 = ( + 'int fun2(float x, float y)' + '\n' + + '{'+ '\n' + + 'int a;' + '\n' + + 'return a;' + '\n' + + '}' + ) + c_src3 = ( + 'float fun3(int p, float q, int r)' + '\n' + + '{' + '\n' + + 'float b;' + '\n' + + 'return b;' + '\n' + + '}' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + + assert res1[0] == FunctionDefinition( + NoneToken(), + name=String('fun1'), + parameters=( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')) + ), + ), + body=CodeBlock( + Declaration( + Variable( + Symbol('i'), + type=IntBaseType(String('intc')) + ) + ) + ) + ) + + assert res2[0] == FunctionDefinition( + IntBaseType(String('intc')), + name=String('fun2'), + parameters=( + Variable( + Symbol('x'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ), + Variable( + Symbol('y'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + body=CodeBlock( + Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Return('a') + ) + ) + + assert res3[0] == FunctionDefinition( + FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + name=String('fun3'), + parameters=( + Variable( + Symbol('p'), + type=IntBaseType(String('intc')) + ), + Variable( + Symbol('q'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ), + Variable( + Symbol('r'), + type=IntBaseType(String('intc')) + ) + ), + body=CodeBlock( + Declaration( + Variable( + Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Return('b') + ) + ) + + @XFAIL # this is expected to fail because of a bug in the C parser. + def test_function_call(): + c_src1 = ( + 'int fun1(int x)' + '\n' + + '{' + '\n' + + 'return x;' + '\n' + + '}' + '\n' + + 'void caller()' + '\n' + + '{' + '\n' + + 'int x = fun1(2);' + '\n' + + '}' + ) + + c_src2 = ( + 'int fun2(int a, int b, int c)' + '\n' + + '{' + '\n' + + 'return a;' + '\n' + + '}' + '\n' + + 'void caller()' + '\n' + + '{' + '\n' + + 'int y = fun2(2, 3, 4);' + '\n' + + '}' + ) + + c_src3 = ( + 'int fun3(int a, int b, int c)' + '\n' + + '{' + '\n' + + 'return b;' + '\n' + + '}' + '\n' + + 'void caller()' + '\n' + + '{' + '\n' + + 'int p;' + '\n' + + 'int q;' + '\n' + + 'int r;' + '\n' + + 'int z = fun3(p, q, r);' + '\n' + + '}' + ) + + c_src4 = ( + 'int fun4(float a, float b, int c)' + '\n' + + '{' + '\n' + + 'return c;' + '\n' + + '}' + '\n' + + 'void caller()' + '\n' + + '{' + '\n' + + 'float x;' + '\n' + + 'float y;' + '\n' + + 'int z;' + '\n' + + 'int i = fun4(x, y, z)' + '\n' + + '}' + ) + + c_src5 = ( + 'int fun()' + '\n' + + '{' + '\n' + + 'return 1;' + '\n' + + '}' + '\n' + + 'void caller()' + '\n' + + '{' + '\n' + + 'int a = fun()' + '\n' + + '}' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + res5 = SymPyExpression(c_src5, 'c').return_expr() + + + assert res1[0] == FunctionDefinition( + IntBaseType(String('intc')), + name=String('fun1'), + parameters=(Variable(Symbol('x'), + type=IntBaseType(String('intc')) + ), + ), + body=CodeBlock( + Return('x') + ) + ) + + assert res1[1] == FunctionDefinition( + NoneToken(), + name=String('caller'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('x'), + value=FunctionCall(String('fun1'), + function_args=( + Integer(2), + ) + ) + ) + ) + ) + ) + + assert res2[0] == FunctionDefinition( + IntBaseType(String('intc')), + name=String('fun2'), + parameters=(Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ), + Variable(Symbol('b'), + type=IntBaseType(String('intc')) + ), + Variable(Symbol('c'), + type=IntBaseType(String('intc')) + ) + ), + body=CodeBlock( + Return('a') + ) + ) + + assert res2[1] == FunctionDefinition( + NoneToken(), + name=String('caller'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('y'), + value=FunctionCall( + String('fun2'), + function_args=( + Integer(2), + Integer(3), + Integer(4) + ) + ) + ) + ) + ) + ) + + assert res3[0] == FunctionDefinition( + IntBaseType(String('intc')), + name=String('fun3'), + parameters=( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ), + Variable(Symbol('b'), + type=IntBaseType(String('intc')) + ), + Variable(Symbol('c'), + type=IntBaseType(String('intc')) + ) + ), + body=CodeBlock( + Return('b') + ) + ) + + assert res3[1] == FunctionDefinition( + NoneToken(), + name=String('caller'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('p'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('q'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('r'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('z'), + value=FunctionCall( + String('fun3'), + function_args=( + Symbol('p'), + Symbol('q'), + Symbol('r') + ) + ) + ) + ) + ) + ) + + assert res4[0] == FunctionDefinition( + IntBaseType(String('intc')), + name=String('fun4'), + parameters=(Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ), + Variable(Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ), + Variable(Symbol('c'), + type=IntBaseType(String('intc')) + ) + ), + body=CodeBlock( + Return('c') + ) + ) + + assert res4[1] == FunctionDefinition( + NoneToken(), + name=String('caller'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('x'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Declaration( + Variable(Symbol('y'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Declaration( + Variable(Symbol('z'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('i'), + value=FunctionCall(String('fun4'), + function_args=( + Symbol('x'), + Symbol('y'), + Symbol('z') + ) + ) + ) + ) + ) + ) + + assert res5[0] == FunctionDefinition( + IntBaseType(String('intc')), + name=String('fun'), + parameters=(), + body=CodeBlock( + Return('') + ) + ) + + assert res5[1] == FunctionDefinition( + NoneToken(), + name=String('caller'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + value=FunctionCall(String('fun'), + function_args=() + ) + ) + ) + ) + ) + + + def test_parse(): + c_src1 = ( + 'int a;' + '\n' + + 'int b;' + '\n' + ) + c_src2 = ( + 'void fun1()' + '\n' + + '{' + '\n' + + 'int a;' + '\n' + + '}' + ) + + f1 = open('..a.h', 'w') + f2 = open('..b.h', 'w') + + f1.write(c_src1) + f2. write(c_src2) + + f1.close() + f2.close() + + res1 = SymPyExpression('..a.h', 'c').return_expr() + res2 = SymPyExpression('..b.h', 'c').return_expr() + + os.remove('..a.h') + os.remove('..b.h') + + assert res1[0] == Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')) + ) + ) + assert res1[1] == Declaration( + Variable( + Symbol('b'), + type=IntBaseType(String('intc')) + ) + ) + assert res2[0] == FunctionDefinition( + NoneToken(), + name=String('fun1'), + parameters=(), + body=CodeBlock( + Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')) + ) + ) + ) + ) + + + def test_binary_operators(): + c_src1 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = 1;' + '\n' + + '}' + ) + c_src2 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 0;' + '\n' + + 'a = a + 1;' + '\n' + + 'a = 3*a - 10;' + '\n' + + '}' + ) + c_src3 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 10;' + '\n' + + 'a = 1 + a - 3 * 6;' + '\n' + + '}' + ) + c_src4 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'int b;' + '\n' + + 'a = 100;' + '\n' + + 'b = a*a + a*a + a + 19*a + 1 + 24;' + '\n' + + '}' + ) + c_src5 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'int b;' + '\n' + + 'int c;' + '\n' + + 'int d;' + '\n' + + 'a = 1;' + '\n' + + 'b = 2;' + '\n' + + 'c = b;' + '\n' + + 'd = ((a+b)*(a+c))*((c-d)*(a+c));' + '\n' + + '}' + ) + c_src6 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'int b;' + '\n' + + 'int c;' + '\n' + + 'int d;' + '\n' + + 'a = 1;' + '\n' + + 'b = 2;' + '\n' + + 'c = 3;' + '\n' + + 'd = (a*a*a*a + 3*b*b + b + b + c*d);' + '\n' + + '}' + ) + c_src7 = ( + 'void func()'+ + '{' + '\n' + + 'float a;' + '\n' + + 'a = 1.01;' + '\n' + + '}' + ) + + c_src8 = ( + 'void func()'+ + '{' + '\n' + + 'float a;' + '\n' + + 'a = 10.0 + 2.5;' + '\n' + + '}' + ) + + c_src9 = ( + 'void func()'+ + '{' + '\n' + + 'float a;' + '\n' + + 'a = 10.0 / 2.5;' + '\n' + + '}' + ) + + c_src10 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = 100 / 4;' + '\n' + + '}' + ) + + c_src11 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = 20 - 100 / 4 * 5 + 10;' + '\n' + + '}' + ) + + c_src12 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = (20 - 100) / 4 * (5 + 10);' + '\n' + + '}' + ) + + c_src13 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'int b;' + '\n' + + 'float c;' + '\n' + + 'c = b/a;' + '\n' + + '}' + ) + + c_src14 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 2;' + '\n' + + 'int d = 5;' + '\n' + + 'int n = 10;' + '\n' + + 'int s;' + '\n' + + 's = (a/2)*(2*a + (n-1)*d);' + '\n' + + '}' + ) + + c_src15 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = 1 % 2;' + '\n' + + '}' + ) + + c_src16 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 2;' + '\n' + + 'int b;' + '\n' + + 'b = a % 3;' + '\n' + + '}' + ) + + c_src17 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 100;' + '\n' + + 'int b = 3;' + '\n' + + 'int c;' + '\n' + + 'c = a % b;' + '\n' + + '}' + ) + + c_src18 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 100;' + '\n' + + 'int b = 3;' + '\n' + + 'int mod = 1000000007;' + '\n' + + 'int c;' + '\n' + + 'c = (a + b * (100/a)) % mod;' + '\n' + + '}' + ) + + c_src19 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 100;' + '\n' + + 'int b = 3;' + '\n' + + 'int mod = 1000000007;' + '\n' + + 'int c;' + '\n' + + 'c = ((a % mod + b % mod) % mod' \ + '* (a % mod - b % mod) % mod) % mod;' + '\n' + + '}' + ) + + c_src20 = ( + 'void func()'+ + '{' + '\n' + + 'bool a' + '\n' + + 'bool b;' + '\n' + + 'a = 1 == 2;' + '\n' + + 'b = 1 != 2;' + '\n' + + '}' + ) + + c_src21 = ( + 'void func()'+ + '{' + '\n' + + 'bool a;' + '\n' + + 'bool b;' + '\n' + + 'bool c;' + '\n' + + 'bool d;' + '\n' + + 'a = 1 == 2;' + '\n' + + 'b = 1 <= 2;' + '\n' + + 'c = 1 > 2;' + '\n' + + 'd = 1 >= 2;' + '\n' + + '}' + ) + + c_src22 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 1;' + '\n' + + 'int b = 2;' + '\n' + + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + 'bool c5;' + '\n' + + 'bool c6;' + '\n' + + 'bool c7;' + '\n' + + 'bool c8;' + '\n' + + + 'c1 = a == 1;' + '\n' + + 'c2 = b == 2;' + '\n' + + + 'c3 = 1 != a;' + '\n' + + 'c4 = 1 != b;' + '\n' + + + 'c5 = a < 0;' + '\n' + + 'c6 = b <= 10;' + '\n' + + 'c7 = a > 0;' + '\n' + + 'c8 = b >= 11;' + '\n' + + '}' + ) + + c_src23 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 3;' + '\n' + + 'int b = 4;' + '\n' + + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + 'bool c5;' + '\n' + + 'bool c6;' + '\n' + + + 'c1 = a == b;' + '\n' + + 'c2 = a != b;' + '\n' + + 'c3 = a < b;' + '\n' + + 'c4 = a <= b;' + '\n' + + 'c5 = a > b;' + '\n' + + 'c6 = a >= b;' + '\n' + + '}' + ) + + c_src24 = ( + 'void func()'+ + '{' + '\n' + + 'float a = 1.25' + 'float b = 2.5;' + '\n' + + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + + 'c1 = a == 1.25;' + '\n' + + 'c2 = b == 2.54;' + '\n' + + + 'c3 = 1.2 != a;' + '\n' + + 'c4 = 1.5 != b;' + '\n' + + '}' + ) + + c_src25 = ( + 'void func()'+ + '{' + '\n' + + 'float a = 1.25' + '\n' + + 'float b = 2.5;' + '\n' + + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + 'bool c5;' + '\n' + + 'bool c6;' + '\n' + + + 'c1 = a == b;' + '\n' + + 'c2 = a != b;' + '\n' + + 'c3 = a < b;' + '\n' + + 'c4 = a <= b;' + '\n' + + 'c5 = a > b;' + '\n' + + 'c6 = a >= b;' + '\n' + + '}' + ) + + c_src26 = ( + 'void func()'+ + '{' + '\n' + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + 'bool c5;' + '\n' + + 'bool c6;' + '\n' + + + 'c1 = true == true;' + '\n' + + 'c2 = true == false;' + '\n' + + 'c3 = false == false;' + '\n' + + + 'c4 = true != true;' + '\n' + + 'c5 = true != false;' + '\n' + + 'c6 = false != false;' + '\n' + + '}' + ) + + c_src27 = ( + 'void func()'+ + '{' + '\n' + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + 'bool c5;' + '\n' + + 'bool c6;' + '\n' + + + 'c1 = true && true;' + '\n' + + 'c2 = true && false;' + '\n' + + 'c3 = false && false;' + '\n' + + + 'c4 = true || true;' + '\n' + + 'c5 = true || false;' + '\n' + + 'c6 = false || false;' + '\n' + + '}' + ) + + c_src28 = ( + 'void func()'+ + '{' + '\n' + + 'bool a;' + '\n' + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + + 'c1 = a && true;' + '\n' + + 'c2 = false && a;' + '\n' + + + 'c3 = true || a;' + '\n' + + 'c4 = a || false;' + '\n' + + '}' + ) + + c_src29 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + + 'c1 = a && 1;' + '\n' + + 'c2 = a && 0;' + '\n' + + + 'c3 = a || 1;' + '\n' + + 'c4 = 0 || a;' + '\n' + + '}' + ) + + c_src30 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'int b;' + '\n' + + 'bool c;'+ '\n' + + 'bool d;'+ '\n' + + + 'bool c1;' + '\n' + + 'bool c2;' + '\n' + + 'bool c3;' + '\n' + + 'bool c4;' + '\n' + + 'bool c5;' + '\n' + + 'bool c6;' + '\n' + + + 'c1 = a && b;' + '\n' + + 'c2 = a && c;' + '\n' + + 'c3 = c && d;' + '\n' + + + 'c4 = a || b;' + '\n' + + 'c5 = a || c;' + '\n' + + 'c6 = c || d;' + '\n' + + '}' + ) + + c_src_raise1 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = -1;' + '\n' + + '}' + ) + + c_src_raise2 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = -+1;' + '\n' + + '}' + ) + + c_src_raise3 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = 2*-2;' + '\n' + + '}' + ) + + c_src_raise4 = ( + 'void func()'+ + '{' + '\n' + + 'int a;' + '\n' + + 'a = (int)2.0;' + '\n' + + '}' + ) + + c_src_raise5 = ( + 'void func()'+ + '{' + '\n' + + 'int a=100;' + '\n' + + 'a = (a==100)?(1):(0);' + '\n' + + '}' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + res5 = SymPyExpression(c_src5, 'c').return_expr() + res6 = SymPyExpression(c_src6, 'c').return_expr() + res7 = SymPyExpression(c_src7, 'c').return_expr() + res8 = SymPyExpression(c_src8, 'c').return_expr() + res9 = SymPyExpression(c_src9, 'c').return_expr() + res10 = SymPyExpression(c_src10, 'c').return_expr() + res11 = SymPyExpression(c_src11, 'c').return_expr() + res12 = SymPyExpression(c_src12, 'c').return_expr() + res13 = SymPyExpression(c_src13, 'c').return_expr() + res14 = SymPyExpression(c_src14, 'c').return_expr() + res15 = SymPyExpression(c_src15, 'c').return_expr() + res16 = SymPyExpression(c_src16, 'c').return_expr() + res17 = SymPyExpression(c_src17, 'c').return_expr() + res18 = SymPyExpression(c_src18, 'c').return_expr() + res19 = SymPyExpression(c_src19, 'c').return_expr() + res20 = SymPyExpression(c_src20, 'c').return_expr() + res21 = SymPyExpression(c_src21, 'c').return_expr() + res22 = SymPyExpression(c_src22, 'c').return_expr() + res23 = SymPyExpression(c_src23, 'c').return_expr() + res24 = SymPyExpression(c_src24, 'c').return_expr() + res25 = SymPyExpression(c_src25, 'c').return_expr() + res26 = SymPyExpression(c_src26, 'c').return_expr() + res27 = SymPyExpression(c_src27, 'c').return_expr() + res28 = SymPyExpression(c_src28, 'c').return_expr() + res29 = SymPyExpression(c_src29, 'c').return_expr() + res30 = SymPyExpression(c_src30, 'c').return_expr() + + assert res1[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Assignment(Variable(Symbol('a')), Integer(1)) + ) + ) + + assert res2[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(0))), + Assignment( + Variable(Symbol('a')), + Add(Symbol('a'), + Integer(1)) + ), + Assignment(Variable(Symbol('a')), + Add( + Mul( + Integer(3), + Symbol('a')), + Integer(-10) + ) + ) + ) + ) + + assert res3[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(10) + ) + ), + Assignment( + Variable(Symbol('a')), + Add( + Symbol('a'), + Integer(-17) + ) + ) + ) + ) + + assert res4[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('a')), + Integer(100)), + Assignment( + Variable(Symbol('b')), + Add( + Mul( + Integer(2), + Pow( + Symbol('a'), + Integer(2)) + ), + Mul( + Integer(20), + Symbol('a')), + Integer(25) + ) + ) + ) + ) + + assert res5[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('d'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('a')), + Integer(1)), + Assignment( + Variable(Symbol('b')), + Integer(2) + ), + Assignment( + Variable(Symbol('c')), + Symbol('b')), + Assignment( + Variable(Symbol('d')), + Mul( + Add( + Symbol('a'), + Symbol('b')), + Pow( + Add( + Symbol('a'), + Symbol('c') + ), + Integer(2) + ), + Add( + Symbol('c'), + Mul( + Integer(-1), + Symbol('d') + ) + ) + ) + ) + ) + ) + + assert res6[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('d'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('a')), + Integer(1) + ), + Assignment( + Variable(Symbol('b')), + Integer(2) + ), + Assignment( + Variable(Symbol('c')), + Integer(3) + ), + Assignment( + Variable(Symbol('d')), + Add( + Pow( + Symbol('a'), + Integer(4) + ), + Mul( + Integer(3), + Pow( + Symbol('b'), + Integer(2) + ) + ), + Mul( + Integer(2), + Symbol('b') + ), + Mul( + Symbol('c'), + Symbol('d') + ) + ) + ) + ) + ) + + assert res7[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Assignment( + Variable(Symbol('a')), + Float('1.01', precision=53) + ) + ) + ) + + assert res8[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Assignment( + Variable(Symbol('a')), + Float('12.5', precision=53) + ) + ) + ) + + assert res9[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Assignment( + Variable(Symbol('a')), + Float('4.0', precision=53) + ) + ) + ) + + assert res10[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('a')), + Integer(25) + ) + ) + ) + + assert res11[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('a')), + Integer(-95) + ) + ) + ) + + assert res12[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('a')), + Integer(-300) + ) + ) + ) + + assert res13[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('c'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Assignment( + Variable(Symbol('c')), + Mul( + Pow( + Symbol('a'), + Integer(-1) + ), + Symbol('b') + ) + ) + ) + ) + + assert res14[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ), + Declaration( + Variable(Symbol('d'), + type=IntBaseType(String('intc')), + value=Integer(5) + ) + ), + Declaration( + Variable(Symbol('n'), + type=IntBaseType(String('intc')), + value=Integer(10) + ) + ), + Declaration( + Variable(Symbol('s'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('s')), + Mul( + Rational(1, 2), + Symbol('a'), + Add( + Mul( + Integer(2), + Symbol('a') + ), + Mul( + Symbol('d'), + Add( + Symbol('n'), + Integer(-1) + ) + ) + ) + ) + ) + ) + ) + + assert res15[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('a')), + Integer(1) + ) + ) + ) + + assert res16[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('b')), + Mod( + Symbol('a'), + Integer(3) + ) + ) + ) + ) + + assert res17[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(100) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ), + Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('c')), + Mod( + Symbol('a'), + Symbol('b') + ) + ) + ) + ) + + assert res18[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(100) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ), + Declaration( + Variable(Symbol('mod'), + type=IntBaseType(String('intc')), + value=Integer(1000000007) + ) + ), + Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('c')), + Mod( + Add( + Symbol('a'), + Mul( + Integer(100), + Pow( + Symbol('a'), + Integer(-1) + ), + Symbol('b') + ) + ), + Symbol('mod') + ) + ) + ) + ) + + assert res19[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(100) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ), + Declaration( + Variable(Symbol('mod'), + type=IntBaseType(String('intc')), + value=Integer(1000000007) + ) + ), + Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')) + ) + ), + Assignment( + Variable(Symbol('c')), + Mod( + Mul( + Add( + Mod( + Symbol('a'), + Symbol('mod') + ), + Mul( + Integer(-1), + Mod( + Symbol('b'), + Symbol('mod') + ) + ) + ), + Mod( + Add( + Symbol('a'), + Symbol('b') + ), + Symbol('mod') + ) + ), + Symbol('mod') + ) + ) + ) + ) + + assert res20[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('b'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('a')), + false + ), + Assignment( + Variable(Symbol('b')), + true + ) + ) + ) + + assert res21[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('b'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('d'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('a')), + false + ), + Assignment( + Variable(Symbol('b')), + true + ), + Assignment( + Variable(Symbol('c')), + false + ), + Assignment( + Variable(Symbol('d')), + false + ) + ) + ) + + assert res22[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ), + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c7'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c8'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + Equality( + Symbol('a'), + Integer(1) + ) + ), + Assignment( + Variable(Symbol('c2')), + Equality( + Symbol('b'), + Integer(2) + ) + ), + Assignment( + Variable(Symbol('c3')), + Unequality( + Integer(1), + Symbol('a') + ) + ), + Assignment( + Variable(Symbol('c4')), + Unequality( + Integer(1), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c5')), + StrictLessThan( + Symbol('a'), + Integer(0) + ) + ), + Assignment( + Variable(Symbol('c6')), + LessThan( + Symbol('b'), + Integer(10) + ) + ), + Assignment( + Variable(Symbol('c7')), + StrictGreaterThan( + Symbol('a'), + Integer(0) + ) + ), + Assignment( + Variable(Symbol('c8')), + GreaterThan( + Symbol('b'), + Integer(11) + ) + ) + ) + ) + + assert res23[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(4) + ) + ), + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + Equality( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c2')), + Unequality( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c3')), + StrictLessThan( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c4')), + LessThan( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c5')), + StrictGreaterThan( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c6')), + GreaterThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + ) + + assert res24[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ) + ) + ), + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + Equality( + Symbol('a'), + Float('1.25', precision=53) + ) + ), + Assignment( + Variable(Symbol('c3')), + Unequality( + Float('1.2', precision=53), + Symbol('a') + ) + ) + ) + ) + + + assert res25[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('1.25', precision=53) + ) + ), + Declaration( + Variable(Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('2.5', precision=53) + ) + ), + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool') + ) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + Equality( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c2')), + Unequality( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c3')), + StrictLessThan( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c4')), + LessThan( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c5')), + StrictGreaterThan( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c6')), + GreaterThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + ) + + assert res26[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), body=CodeBlock( + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + true + ), + Assignment( + Variable(Symbol('c2')), + false + ), + Assignment( + Variable(Symbol('c3')), + true + ), + Assignment( + Variable(Symbol('c4')), + false + ), + Assignment( + Variable(Symbol('c5')), + true + ), + Assignment( + Variable(Symbol('c6')), + false + ) + ) + ) + + assert res27[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + true + ), + Assignment( + Variable(Symbol('c2')), + false + ), + Assignment( + Variable(Symbol('c3')), + false + ), + Assignment( + Variable(Symbol('c4')), + true + ), + Assignment( + Variable(Symbol('c5')), + true + ), + Assignment( + Variable(Symbol('c6')), + false) + ) + ) + + assert res28[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + Symbol('a') + ), + Assignment( + Variable(Symbol('c2')), + false + ), + Assignment( + Variable(Symbol('c3')), + true + ), + Assignment( + Variable(Symbol('c4')), + Symbol('a') + ) + ) + ) + + assert res29[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + Symbol('a') + ), + Assignment( + Variable(Symbol('c2')), + false + ), + Assignment( + Variable(Symbol('c3')), + true + ), + Assignment( + Variable(Symbol('c4')), + Symbol('a') + ) + ) + ) + + assert res30[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')) + ) + ), + Declaration( + Variable(Symbol('c'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('d'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')) + ) + ), + Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')) + ) + ), + Assignment( + Variable(Symbol('c1')), + And( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c2')), + And( + Symbol('a'), + Symbol('c') + ) + ), + Assignment( + Variable(Symbol('c3')), + And( + Symbol('c'), + Symbol('d') + ) + ), + Assignment( + Variable(Symbol('c4')), + Or( + Symbol('a'), + Symbol('b') + ) + ), + Assignment( + Variable(Symbol('c5')), + Or( + Symbol('a'), + Symbol('c') + ) + ), + Assignment( + Variable(Symbol('c6')), + Or( + Symbol('c'), + Symbol('d') + ) + ) + ) + ) + + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise1, 'c')) + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise2, 'c')) + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise3, 'c')) + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise4, 'c')) + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise5, 'c')) + + + @XFAIL + def test_var_decl(): + c_src1 = ( + 'int b = 100;' + '\n' + + 'int a = b;' + '\n' + ) + + c_src2 = ( + 'int a = 1;' + '\n' + + 'int b = a + 1;' + '\n' + ) + + c_src3 = ( + 'float a = 10.0 + 2.5;' + '\n' + + 'float b = a * 20.0;' + '\n' + ) + + c_src4 = ( + 'int a = 1 + 100 - 3 * 6;' + '\n' + ) + + c_src5 = ( + 'int a = (((1 + 100) * 12) - 3) * (6 - 10);' + '\n' + ) + + c_src6 = ( + 'int b = 2;' + '\n' + + 'int c = 3;' + '\n' + + 'int a = b + c * 4;' + '\n' + ) + + c_src7 = ( + 'int b = 1;' + '\n' + + 'int c = b + 2;' + '\n' + + 'int a = 10 * b * b * c;' + '\n' + ) + + c_src8 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 1;' + '\n' + + 'int b = 2;' + '\n' + + 'int temp = a;' + '\n' + + 'a = b;' + '\n' + + 'b = temp;' + '\n' + + '}' + ) + + c_src9 = ( + 'int a = 1;' + '\n' + + 'int b = 2;' + '\n' + + 'int c = a;' + '\n' + + 'int d = a + b + c;' + '\n' + + 'int e = a*a*a + 3*a*a*b + 3*a*b*b + b*b*b;' + '\n' + 'int f = (a + b + c) * (a + b - c);' + '\n' + + 'int g = (a + b + c + d)*(a + b + c + d)*(a * (b - c));' + + '\n' + ) + + c_src10 = ( + 'float a = 10.0;' + '\n' + + 'float b = 2.5;' + '\n' + + 'float c = a*a + 2*a*b + b*b;' + '\n' + ) + + c_src11 = ( + 'float a = 10.0 / 2.5;' + '\n' + ) + + c_src12 = ( + 'int a = 100 / 4;' + '\n' + ) + + c_src13 = ( + 'int a = 20 - 100 / 4 * 5 + 10;' + '\n' + ) + + c_src14 = ( + 'int a = (20 - 100) / 4 * (5 + 10);' + '\n' + ) + + c_src15 = ( + 'int a = 4;' + '\n' + + 'int b = 2;' + '\n' + + 'float c = b/a;' + '\n' + ) + + c_src16 = ( + 'int a = 2;' + '\n' + + 'int d = 5;' + '\n' + + 'int n = 10;' + '\n' + + 'int s = (a/2)*(2*a + (n-1)*d);' + '\n' + ) + + c_src17 = ( + 'int a = 1 % 2;' + '\n' + ) + + c_src18 = ( + 'int a = 2;' + '\n' + + 'int b = a % 3;' + '\n' + ) + + c_src19 = ( + 'int a = 100;' + '\n' + + 'int b = 3;' + '\n' + + 'int c = a % b;' + '\n' + ) + + c_src20 = ( + 'int a = 100;' + '\n' + + 'int b = 3;' + '\n' + + 'int mod = 1000000007;' + '\n' + + 'int c = (a + b * (100/a)) % mod;' + '\n' + ) + + c_src21 = ( + 'int a = 100;' + '\n' + + 'int b = 3;' + '\n' + + 'int mod = 1000000007;' + '\n' + + 'int c = ((a % mod + b % mod) % mod *' \ + '(a % mod - b % mod) % mod) % mod;' + '\n' + ) + + c_src22 = ( + 'bool a = 1 == 2, b = 1 != 2;' + ) + + c_src23 = ( + 'bool a = 1 < 2, b = 1 <= 2, c = 1 > 2, d = 1 >= 2;' + ) + + c_src24 = ( + 'int a = 1, b = 2;' + '\n' + + + 'bool c1 = a == 1;' + '\n' + + 'bool c2 = b == 2;' + '\n' + + + 'bool c3 = 1 != a;' + '\n' + + 'bool c4 = 1 != b;' + '\n' + + + 'bool c5 = a < 0;' + '\n' + + 'bool c6 = b <= 10;' + '\n' + + 'bool c7 = a > 0;' + '\n' + + 'bool c8 = b >= 11;' + + ) + + c_src25 = ( + 'int a = 3, b = 4;' + '\n' + + + 'bool c1 = a == b;' + '\n' + + 'bool c2 = a != b;' + '\n' + + 'bool c3 = a < b;' + '\n' + + 'bool c4 = a <= b;' + '\n' + + 'bool c5 = a > b;' + '\n' + + 'bool c6 = a >= b;' + ) + + c_src26 = ( + 'float a = 1.25, b = 2.5;' + '\n' + + + 'bool c1 = a == 1.25;' + '\n' + + 'bool c2 = b == 2.54;' + '\n' + + + 'bool c3 = 1.2 != a;' + '\n' + + 'bool c4 = 1.5 != b;' + ) + + c_src27 = ( + 'float a = 1.25, b = 2.5;' + '\n' + + + 'bool c1 = a == b;' + '\n' + + 'bool c2 = a != b;' + '\n' + + 'bool c3 = a < b;' + '\n' + + 'bool c4 = a <= b;' + '\n' + + 'bool c5 = a > b;' + '\n' + + 'bool c6 = a >= b;' + ) + + c_src28 = ( + 'bool c1 = true == true;' + '\n' + + 'bool c2 = true == false;' + '\n' + + 'bool c3 = false == false;' + '\n' + + + 'bool c4 = true != true;' + '\n' + + 'bool c5 = true != false;' + '\n' + + 'bool c6 = false != false;' + ) + + c_src29 = ( + 'bool c1 = true && true;' + '\n' + + 'bool c2 = true && false;' + '\n' + + 'bool c3 = false && false;' + '\n' + + + 'bool c4 = true || true;' + '\n' + + 'bool c5 = true || false;' + '\n' + + 'bool c6 = false || false;' + ) + + c_src30 = ( + 'bool a = false;' + '\n' + + + 'bool c1 = a && true;' + '\n' + + 'bool c2 = false && a;' + '\n' + + + 'bool c3 = true || a;' + '\n' + + 'bool c4 = a || false;' + ) + + c_src31 = ( + 'int a = 1;' + '\n' + + + 'bool c1 = a && 1;' + '\n' + + 'bool c2 = a && 0;' + '\n' + + + 'bool c3 = a || 1;' + '\n' + + 'bool c4 = 0 || a;' + ) + + c_src32 = ( + 'int a = 1, b = 0;' + '\n' + + 'bool c = false, d = true;'+ '\n' + + + 'bool c1 = a && b;' + '\n' + + 'bool c2 = a && c;' + '\n' + + 'bool c3 = c && d;' + '\n' + + + 'bool c4 = a || b;' + '\n' + + 'bool c5 = a || c;' + '\n' + + 'bool c6 = c || d;' + ) + + c_src_raise1 = ( + "char a = 'b';" + ) + + c_src_raise2 = ( + 'int a[] = {10, 20};' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + res5 = SymPyExpression(c_src5, 'c').return_expr() + res6 = SymPyExpression(c_src6, 'c').return_expr() + res7 = SymPyExpression(c_src7, 'c').return_expr() + res8 = SymPyExpression(c_src8, 'c').return_expr() + res9 = SymPyExpression(c_src9, 'c').return_expr() + res10 = SymPyExpression(c_src10, 'c').return_expr() + res11 = SymPyExpression(c_src11, 'c').return_expr() + res12 = SymPyExpression(c_src12, 'c').return_expr() + res13 = SymPyExpression(c_src13, 'c').return_expr() + res14 = SymPyExpression(c_src14, 'c').return_expr() + res15 = SymPyExpression(c_src15, 'c').return_expr() + res16 = SymPyExpression(c_src16, 'c').return_expr() + res17 = SymPyExpression(c_src17, 'c').return_expr() + res18 = SymPyExpression(c_src18, 'c').return_expr() + res19 = SymPyExpression(c_src19, 'c').return_expr() + res20 = SymPyExpression(c_src20, 'c').return_expr() + res21 = SymPyExpression(c_src21, 'c').return_expr() + res22 = SymPyExpression(c_src22, 'c').return_expr() + res23 = SymPyExpression(c_src23, 'c').return_expr() + res24 = SymPyExpression(c_src24, 'c').return_expr() + res25 = SymPyExpression(c_src25, 'c').return_expr() + res26 = SymPyExpression(c_src26, 'c').return_expr() + res27 = SymPyExpression(c_src27, 'c').return_expr() + res28 = SymPyExpression(c_src28, 'c').return_expr() + res29 = SymPyExpression(c_src29, 'c').return_expr() + res30 = SymPyExpression(c_src30, 'c').return_expr() + res31 = SymPyExpression(c_src31, 'c').return_expr() + res32 = SymPyExpression(c_src32, 'c').return_expr() + + assert res1[0] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(100) + ) + ) + + assert res1[1] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Symbol('b') + ) + ) + + assert res2[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res2[1] == Declaration(Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Add( + Symbol('a'), + Integer(1) + ) + ) + ) + + assert res3[0] == Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('12.5', precision=53) + ) + ) + + assert res3[1] == Declaration( + Variable(Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Mul( + Float('20.0', precision=53), + Symbol('a') + ) + ) + ) + + assert res4[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(83) + ) + ) + + assert res5[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(-4836) + ) + ) + + assert res6[0] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res6[1] == Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ) + + assert res6[2] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Add( + Symbol('b'), + Mul( + Integer(4), + Symbol('c') + ) + ) + ) + ) + + assert res7[0] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res7[1] == Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')), + value=Add( + Symbol('b'), + Integer(2) + ) + ) + ) + + assert res7[2] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Mul( + Integer(10), + Pow( + Symbol('b'), + Integer(2) + ), + Symbol('c') + ) + ) + ) + + assert res8[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ), + Declaration( + Variable(Symbol('temp'), + type=IntBaseType(String('intc')), + value=Symbol('a') + ) + ), + Assignment( + Variable(Symbol('a')), + Symbol('b') + ), + Assignment( + Variable(Symbol('b')), + Symbol('temp') + ) + ) + ) + + assert res9[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res9[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res9[2] == Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')), + value=Symbol('a') + ) + ) + + assert res9[3] == Declaration( + Variable(Symbol('d'), + type=IntBaseType(String('intc')), + value=Add( + Symbol('a'), + Symbol('b'), + Symbol('c') + ) + ) + ) + + assert res9[4] == Declaration( + Variable(Symbol('e'), + type=IntBaseType(String('intc')), + value=Add( + Pow( + Symbol('a'), + Integer(3) + ), + Mul( + Integer(3), + Pow( + Symbol('a'), + Integer(2) + ), + Symbol('b') + ), + Mul( + Integer(3), + Symbol('a'), + Pow( + Symbol('b'), + Integer(2) + ) + ), + Pow( + Symbol('b'), + Integer(3) + ) + ) + ) + ) + + assert res9[5] == Declaration( + Variable(Symbol('f'), + type=IntBaseType(String('intc')), + value=Mul( + Add( + Symbol('a'), + Symbol('b'), + Mul( + Integer(-1), + Symbol('c') + ) + ), + Add( + Symbol('a'), + Symbol('b'), + Symbol('c') + ) + ) + ) + ) + + assert res9[6] == Declaration( + Variable(Symbol('g'), + type=IntBaseType(String('intc')), + value=Mul( + Symbol('a'), + Add( + Symbol('b'), + Mul( + Integer(-1), + Symbol('c') + ) + ), + Pow( + Add( + Symbol('a'), + Symbol('b'), + Symbol('c'), + Symbol('d') + ), + Integer(2) + ) + ) + ) + ) + + assert res10[0] == Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('10.0', precision=53) + ) + ) + + assert res10[1] == Declaration( + Variable(Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('2.5', precision=53) + ) + ) + + assert res10[2] == Declaration( + Variable(Symbol('c'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Add( + Pow( + Symbol('a'), + Integer(2) + ), + Mul( + Integer(2), + Symbol('a'), + Symbol('b') + ), + Pow( + Symbol('b'), + Integer(2) + ) + ) + ) + ) + + assert res11[0] == Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('4.0', precision=53) + ) + ) + + assert res12[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(25) + ) + ) + + assert res13[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(-95) + ) + ) + + assert res14[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(-300) + ) + ) + + assert res15[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(4) + ) + ) + + assert res15[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res15[2] == Declaration( + Variable(Symbol('c'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Mul( + Pow( + Symbol('a'), + Integer(-1) + ), + Symbol('b') + ) + ) + ) + + assert res16[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res16[1] == Declaration( + Variable(Symbol('d'), + type=IntBaseType(String('intc')), + value=Integer(5) + ) + ) + + assert res16[2] == Declaration( + Variable(Symbol('n'), + type=IntBaseType(String('intc')), + value=Integer(10) + ) + ) + + assert res16[3] == Declaration( + Variable(Symbol('s'), + type=IntBaseType(String('intc')), + value=Mul( + Rational(1, 2), + Symbol('a'), + Add( + Mul( + Integer(2), + Symbol('a') + ), + Mul( + Symbol('d'), + Add( + Symbol('n'), + Integer(-1) + ) + ) + ) + ) + ) + ) + + assert res17[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res18[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res18[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Mod( + Symbol('a'), + Integer(3) + ) + ) + ) + + assert res19[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(100) + ) + ) + assert res19[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ) + + assert res19[2] == Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')), + value=Mod( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res20[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(100) + ) + ) + + assert res20[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ) + + assert res20[2] == Declaration( + Variable(Symbol('mod'), + type=IntBaseType(String('intc')), + value=Integer(1000000007) + ) + ) + + assert res20[3] == Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')), + value=Mod( + Add( + Symbol('a'), + Mul( + Integer(100), + Pow( + Symbol('a'), + Integer(-1) + ), + Symbol('b') + ) + ), + Symbol('mod') + ) + ) + ) + + assert res21[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(100) + ) + ) + + assert res21[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ) + + assert res21[2] == Declaration( + Variable(Symbol('mod'), + type=IntBaseType(String('intc')), + value=Integer(1000000007) + ) + ) + + assert res21[3] == Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')), + value=Mod( + Mul( + Add( + Symbol('a'), + Mul( + Integer(-1), + Symbol('b') + ) + ), + Add( + Symbol('a'), + Symbol('b') + ) + ), + Symbol('mod') + ) + ) + ) + + assert res22[0] == Declaration( + Variable(Symbol('a'), + type=Type(String('bool')), + value=false + ) + ) + + assert res22[1] == Declaration( + Variable(Symbol('b'), + type=Type(String('bool')), + value=true + ) + ) + + assert res23[0] == Declaration( + Variable(Symbol('a'), + type=Type(String('bool')), + value=true + ) + ) + + assert res23[1] == Declaration( + Variable(Symbol('b'), + type=Type(String('bool')), + value=true + ) + ) + + assert res23[2] == Declaration( + Variable(Symbol('c'), + type=Type(String('bool')), + value=false + ) + ) + + assert res23[3] == Declaration( + Variable(Symbol('d'), + type=Type(String('bool')), + value=false + ) + ) + + assert res24[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res24[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res24[2] == Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')), + value=Equality( + Symbol('a'), + Integer(1) + ) + ) + ) + + assert res24[3] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=Equality( + Symbol('b'), + Integer(2) + ) + ) + ) + + assert res24[4] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=Unequality( + Integer(1), + Symbol('a') + ) + ) + ) + + assert res24[5] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=Unequality( + Integer(1), + Symbol('b') + ) + ) + ) + + assert res24[6] == Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')), + value=StrictLessThan(Symbol('a'), + Integer(0) + ) + ) + ) + + assert res24[7] == Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')), + value=LessThan( + Symbol('b'), + Integer(10) + ) + ) + ) + + assert res24[8] == Declaration( + Variable(Symbol('c7'), + type=Type(String('bool')), + value=StrictGreaterThan( + Symbol('a'), + Integer(0) + ) + ) + ) + + assert res24[9] == Declaration( + Variable(Symbol('c8'), + type=Type(String('bool')), + value=GreaterThan( + Symbol('b'), + Integer(11) + ) + ) + ) + + assert res25[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ) + + assert res25[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(4) + ) + ) + + assert res25[2] == Declaration(Variable(Symbol('c1'), + type=Type(String('bool')), + value=Equality( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res25[3] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=Unequality( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res25[4] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=StrictLessThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res25[5] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=LessThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res25[6] == Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')), + value=StrictGreaterThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res25[7] == Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')), + value=GreaterThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res26[0] == Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('1.25', precision=53) + ) + ) + + assert res26[1] == Declaration( + Variable(Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('2.5', precision=53) + ) + ) + + assert res26[2] == Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')), + value=Equality( + Symbol('a'), + Float('1.25', precision=53) + ) + ) + ) + + assert res26[3] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=Equality( + Symbol('b'), + Float('2.54', precision=53) + ) + ) + ) + + assert res26[4] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=Unequality( + Float('1.2', precision=53), + Symbol('a') + ) + ) + ) + + assert res26[5] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=Unequality( + Float('1.5', precision=53), + Symbol('b') + ) + ) + ) + + assert res27[0] == Declaration( + Variable(Symbol('a'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('1.25', precision=53) + ) + ) + + assert res27[1] == Declaration( + Variable(Symbol('b'), + type=FloatType( + String('float32'), + nbits=Integer(32), + nmant=Integer(23), + nexp=Integer(8) + ), + value=Float('2.5', precision=53) + ) + ) + + assert res27[2] == Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')), + value=Equality( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res27[3] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=Unequality( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res27[4] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=StrictLessThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res27[5] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=LessThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res27[6] == Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')), + value=StrictGreaterThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res27[7] == Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')), + value=GreaterThan( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res28[0] == Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')), + value=true + ) + ) + + assert res28[1] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=false + ) + ) + + assert res28[2] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=true + ) + ) + + assert res28[3] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=false + ) + ) + + assert res28[4] == Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')), + value=true + ) + ) + + assert res28[5] == Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')), + value=false + ) + ) + + assert res29[0] == Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')), + value=true + ) + ) + + assert res29[1] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=false + ) + ) + + assert res29[2] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=false + ) + ) + + assert res29[3] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=true + ) + ) + + assert res29[4] == Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')), + value=true + ) + ) + + assert res29[5] == Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')), + value=false + ) + ) + + assert res30[0] == Declaration( + Variable(Symbol('a'), + type=Type(String('bool')), + value=false + ) + ) + + assert res30[1] == Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')), + value=Symbol('a') + ) + ) + + assert res30[2] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=false + ) + ) + + assert res30[3] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=true + ) + ) + + assert res30[4] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=Symbol('a') + ) + ) + + assert res31[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res31[1] == Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')), + value=Symbol('a') + ) + ) + + assert res31[2] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=false + ) + ) + + assert res31[3] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=true + ) + ) + + assert res31[4] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=Symbol('a') + ) + ) + + assert res32[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res32[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(0) + ) + ) + + assert res32[2] == Declaration( + Variable(Symbol('c'), + type=Type(String('bool')), + value=false + ) + ) + + assert res32[3] == Declaration( + Variable(Symbol('d'), + type=Type(String('bool')), + value=true + ) + ) + + assert res32[4] == Declaration( + Variable(Symbol('c1'), + type=Type(String('bool')), + value=And( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res32[5] == Declaration( + Variable(Symbol('c2'), + type=Type(String('bool')), + value=And( + Symbol('a'), + Symbol('c') + ) + ) + ) + + assert res32[6] == Declaration( + Variable(Symbol('c3'), + type=Type(String('bool')), + value=And( + Symbol('c'), + Symbol('d') + ) + ) + ) + + assert res32[7] == Declaration( + Variable(Symbol('c4'), + type=Type(String('bool')), + value=Or( + Symbol('a'), + Symbol('b') + ) + ) + ) + + assert res32[8] == Declaration( + Variable(Symbol('c5'), + type=Type(String('bool')), + value=Or( + Symbol('a'), + Symbol('c') + ) + ) + ) + + assert res32[9] == Declaration( + Variable(Symbol('c6'), + type=Type(String('bool')), + value=Or( + Symbol('c'), + Symbol('d') + ) + ) + ) + + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise1, 'c')) + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise2, 'c')) + + + def test_paren_expr(): + c_src1 = ( + 'int a = (1);' + 'int b = (1 + 2 * 3);' + ) + + c_src2 = ( + 'int a = 1, b = 2, c = 3;' + 'int d = (a);' + 'int e = (a + 1);' + 'int f = (a + b * c - d / e);' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + + assert res1[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res1[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(7) + ) + ) + + assert res2[0] == Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(1) + ) + ) + + assert res2[1] == Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(2) + ) + ) + + assert res2[2] == Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')), + value=Integer(3) + ) + ) + + assert res2[3] == Declaration( + Variable(Symbol('d'), + type=IntBaseType(String('intc')), + value=Symbol('a') + ) + ) + + assert res2[4] == Declaration( + Variable(Symbol('e'), + type=IntBaseType(String('intc')), + value=Add( + Symbol('a'), + Integer(1) + ) + ) + ) + + assert res2[5] == Declaration( + Variable(Symbol('f'), + type=IntBaseType(String('intc')), + value=Add( + Symbol('a'), + Mul( + Symbol('b'), + Symbol('c') + ), + Mul( + Integer(-1), + Symbol('d'), + Pow( + Symbol('e'), + Integer(-1) + ) + ) + ) + ) + ) + + + def test_unary_operators(): + c_src1 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 10;' + '\n' + + 'int b = 20;' + '\n' + + '++a;' + '\n' + + '--b;' + '\n' + + 'a++;' + '\n' + + 'b--;' + '\n' + + '}' + ) + + c_src2 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 10;' + '\n' + + 'int b = -100;' + '\n' + + 'int c = +19;' + '\n' + + 'int d = ++a;' + '\n' + + 'int e = --b;' + '\n' + + 'int f = a++;' + '\n' + + 'int g = b--;' + '\n' + + 'bool h = !false;' + '\n' + + 'bool i = !d;' + '\n' + + 'bool j = !0;' + '\n' + + 'bool k = !10.0;' + '\n' + + '}' + ) + + c_src_raise1 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 10;' + '\n' + + 'int b = ~a;' + '\n' + + '}' + ) + + c_src_raise2 = ( + 'void func()'+ + '{' + '\n' + + 'int a = 10;' + '\n' + + 'int b = *&a;' + '\n' + + '}' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + + assert res1[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(10) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(20) + ) + ), + PreIncrement(Symbol('a')), + PreDecrement(Symbol('b')), + PostIncrement(Symbol('a')), + PostDecrement(Symbol('b')) + ) + ) + + assert res2[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(10) + ) + ), + Declaration( + Variable(Symbol('b'), + type=IntBaseType(String('intc')), + value=Integer(-100) + ) + ), + Declaration( + Variable(Symbol('c'), + type=IntBaseType(String('intc')), + value=Integer(19) + ) + ), + Declaration( + Variable(Symbol('d'), + type=IntBaseType(String('intc')), + value=PreIncrement(Symbol('a')) + ) + ), + Declaration( + Variable(Symbol('e'), + type=IntBaseType(String('intc')), + value=PreDecrement(Symbol('b')) + ) + ), + Declaration( + Variable(Symbol('f'), + type=IntBaseType(String('intc')), + value=PostIncrement(Symbol('a')) + ) + ), + Declaration( + Variable(Symbol('g'), + type=IntBaseType(String('intc')), + value=PostDecrement(Symbol('b')) + ) + ), + Declaration( + Variable(Symbol('h'), + type=Type(String('bool')), + value=true + ) + ), + Declaration( + Variable(Symbol('i'), + type=Type(String('bool')), + value=Not(Symbol('d')) + ) + ), + Declaration( + Variable(Symbol('j'), + type=Type(String('bool')), + value=true + ) + ), + Declaration( + Variable(Symbol('k'), + type=Type(String('bool')), + value=false + ) + ) + ) + ) + + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise1, 'c')) + raises(NotImplementedError, lambda: SymPyExpression(c_src_raise2, 'c')) + + + def test_compound_assignment_operator(): + c_src = ( + 'void func()'+ + '{' + '\n' + + 'int a = 100;' + '\n' + + 'a += 10;' + '\n' + + 'a -= 10;' + '\n' + + 'a *= 10;' + '\n' + + 'a /= 10;' + '\n' + + 'a %= 10;' + '\n' + + '}' + ) + + res = SymPyExpression(c_src, 'c').return_expr() + + assert res[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('intc')), + value=Integer(100) + ) + ), + AddAugmentedAssignment( + Variable(Symbol('a')), + Integer(10) + ), + SubAugmentedAssignment( + Variable(Symbol('a')), + Integer(10) + ), + MulAugmentedAssignment( + Variable(Symbol('a')), + Integer(10) + ), + DivAugmentedAssignment( + Variable(Symbol('a')), + Integer(10) + ), + ModAugmentedAssignment( + Variable(Symbol('a')), + Integer(10) + ) + ) + ) + + @XFAIL # this is expected to fail because of a bug in the C parser. + def test_while_stmt(): + c_src1 = ( + 'void func()'+ + '{' + '\n' + + 'int i = 0;' + '\n' + + 'while(i < 10)' + '\n' + + '{' + '\n' + + 'i++;' + '\n' + + '}' + '}' + ) + + c_src2 = ( + 'void func()'+ + '{' + '\n' + + 'int i = 0;' + '\n' + + 'while(i < 10)' + '\n' + + 'i++;' + '\n' + + '}' + ) + + c_src3 = ( + 'void func()'+ + '{' + '\n' + + 'int i = 10;' + '\n' + + 'int cnt = 0;' + '\n' + + 'while(i > 0)' + '\n' + + '{' + '\n' + + 'i--;' + '\n' + + 'cnt++;' + '\n' + + '}' + '\n' + + '}' + ) + + c_src4 = ( + 'int digit_sum(int n)'+ + '{' + '\n' + + 'int sum = 0;' + '\n' + + 'while(n > 0)' + '\n' + + '{' + '\n' + + 'sum += (n % 10);' + '\n' + + 'n /= 10;' + '\n' + + '}' + '\n' + + 'return sum;' + '\n' + + '}' + ) + + c_src5 = ( + 'void func()'+ + '{' + '\n' + + 'while(1);' + '\n' + + '}' + ) + + res1 = SymPyExpression(c_src1, 'c').return_expr() + res2 = SymPyExpression(c_src2, 'c').return_expr() + res3 = SymPyExpression(c_src3, 'c').return_expr() + res4 = SymPyExpression(c_src4, 'c').return_expr() + res5 = SymPyExpression(c_src5, 'c').return_expr() + + assert res1[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable(Symbol('i'), + type=IntBaseType(String('intc')), + value=Integer(0) + ) + ), + While( + StrictLessThan( + Symbol('i'), + Integer(10) + ), + body=CodeBlock( + PostIncrement( + Symbol('i') + ) + ) + ) + ) + ) + + assert res2[0] == res1[0] + + assert res3[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + Declaration( + Variable( + Symbol('i'), + type=IntBaseType(String('intc')), + value=Integer(10) + ) + ), + Declaration( + Variable( + Symbol('cnt'), + type=IntBaseType(String('intc')), + value=Integer(0) + ) + ), + While( + StrictGreaterThan( + Symbol('i'), + Integer(0) + ), + body=CodeBlock( + PostDecrement( + Symbol('i') + ), + PostIncrement( + Symbol('cnt') + ) + ) + ) + ) + ) + + assert res4[0] == FunctionDefinition( + IntBaseType(String('intc')), + name=String('digit_sum'), + parameters=( + Variable( + Symbol('n'), + type=IntBaseType(String('intc')) + ), + ), + body=CodeBlock( + Declaration( + Variable( + Symbol('sum'), + type=IntBaseType(String('intc')), + value=Integer(0) + ) + ), + While( + StrictGreaterThan( + Symbol('n'), + Integer(0) + ), + body=CodeBlock( + AddAugmentedAssignment( + Variable( + Symbol('sum') + ), + Mod( + Symbol('n'), + Integer(10) + ) + ), + DivAugmentedAssignment( + Variable( + Symbol('n') + ), + Integer(10) + ) + ) + ), + Return('sum') + ) + ) + + assert res5[0] == FunctionDefinition( + NoneToken(), + name=String('func'), + parameters=(), + body=CodeBlock( + While( + Integer(1), + body=CodeBlock( + NoneToken() + ) + ) + ) + ) + + +else: + def test_raise(): + from sympy.parsing.c.c_parser import CCodeConverter + raises(ImportError, lambda: CCodeConverter()) + raises(ImportError, lambda: SymPyExpression(' ', mode = 'c')) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_custom_latex.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_custom_latex.py new file mode 100644 index 0000000000000000000000000000000000000000..f5eff1c9ec79528c7f9e3a06cf9e2f84c86091ee --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_custom_latex.py @@ -0,0 +1,69 @@ +import os +import tempfile +from pathlib import Path + +import sympy +from sympy.testing.pytest import raises +from sympy.parsing.latex.lark import LarkLaTeXParser, TransformToSymPyExpr, parse_latex_lark +from sympy.external import import_module + +lark = import_module("lark") + +# disable tests if lark is not present +disabled = lark is None + +grammar_file = os.path.join(os.path.dirname(__file__), "../latex/lark/grammar/latex.lark") + +modification1 = """ +%override DIV_SYMBOL: DIV +%override MUL_SYMBOL: MUL | CMD_TIMES +""" + +modification2 = r""" +%override number: /\d+(,\d*)?/ +""" + +def init_custom_parser(modification, transformer=None): + latex_grammar = Path(grammar_file).read_text(encoding="utf-8") + latex_grammar += modification + + with tempfile.NamedTemporaryFile() as f: + f.write(bytes(latex_grammar, encoding="utf8")) + f.flush() + + parser = LarkLaTeXParser(grammar_file=f.name, transformer=transformer) + + return parser + +def test_custom1(): + # Removes the parser's ability to understand \cdot and \div. + + parser = init_custom_parser(modification1) + + with raises(lark.exceptions.UnexpectedCharacters): + parser.doparse(r"a \cdot b") + parser.doparse(r"x \div y") + +class CustomTransformer(TransformToSymPyExpr): + def number(self, tokens): + if "," in tokens[0]: + # The Float constructor expects a dot as the decimal separator + return sympy.core.numbers.Float(tokens[0].replace(",", ".")) + else: + return sympy.core.numbers.Integer(tokens[0]) + +def test_custom2(): + # Makes the parser parse commas as the decimal separator instead of dots + + parser = init_custom_parser(modification2, CustomTransformer) + + with raises(lark.exceptions.UnexpectedCharacters): + # Asserting that the default parser cannot parse numbers which have commas as + # the decimal separator + parse_latex_lark("100,1") + parse_latex_lark("0,009") + + parser.doparse("100,1") + parser.doparse("0,009") + parser.doparse("2,71828") + parser.doparse("3,14159") diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_fortran_parser.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_fortran_parser.py new file mode 100644 index 0000000000000000000000000000000000000000..9bcd54533ef231dd0a116910453dff0e993bc727 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_fortran_parser.py @@ -0,0 +1,406 @@ +from sympy.testing.pytest import raises +from sympy.parsing.sym_expr import SymPyExpression +from sympy.external import import_module + +lfortran = import_module('lfortran') + +if lfortran: + from sympy.codegen.ast import (Variable, IntBaseType, FloatBaseType, String, + Return, FunctionDefinition, Assignment, + Declaration, CodeBlock) + from sympy.core import Integer, Float, Add + from sympy.core.symbol import Symbol + + + expr1 = SymPyExpression() + expr2 = SymPyExpression() + src = """\ + integer :: a, b, c, d + real :: p, q, r, s + """ + + + def test_sym_expr(): + src1 = ( + src + + """\ + d = a + b -c + """ + ) + expr3 = SymPyExpression(src,'f') + expr4 = SymPyExpression(src1,'f') + ls1 = expr3.return_expr() + ls2 = expr4.return_expr() + for i in range(0, 7): + assert isinstance(ls1[i], Declaration) + assert isinstance(ls2[i], Declaration) + assert isinstance(ls2[8], Assignment) + assert ls1[0] == Declaration( + Variable( + Symbol('a'), + type = IntBaseType(String('integer')), + value = Integer(0) + ) + ) + assert ls1[1] == Declaration( + Variable( + Symbol('b'), + type = IntBaseType(String('integer')), + value = Integer(0) + ) + ) + assert ls1[2] == Declaration( + Variable( + Symbol('c'), + type = IntBaseType(String('integer')), + value = Integer(0) + ) + ) + assert ls1[3] == Declaration( + Variable( + Symbol('d'), + type = IntBaseType(String('integer')), + value = Integer(0) + ) + ) + assert ls1[4] == Declaration( + Variable( + Symbol('p'), + type = FloatBaseType(String('real')), + value = Float(0.0) + ) + ) + assert ls1[5] == Declaration( + Variable( + Symbol('q'), + type = FloatBaseType(String('real')), + value = Float(0.0) + ) + ) + assert ls1[6] == Declaration( + Variable( + Symbol('r'), + type = FloatBaseType(String('real')), + value = Float(0.0) + ) + ) + assert ls1[7] == Declaration( + Variable( + Symbol('s'), + type = FloatBaseType(String('real')), + value = Float(0.0) + ) + ) + assert ls2[8] == Assignment( + Variable(Symbol('d')), + Symbol('a') + Symbol('b') - Symbol('c') + ) + + def test_assignment(): + src1 = ( + src + + """\ + a = b + c = d + p = q + r = s + """ + ) + expr1.convert_to_expr(src1, 'f') + ls1 = expr1.return_expr() + for iter in range(0, 12): + if iter < 8: + assert isinstance(ls1[iter], Declaration) + else: + assert isinstance(ls1[iter], Assignment) + assert ls1[8] == Assignment( + Variable(Symbol('a')), + Variable(Symbol('b')) + ) + assert ls1[9] == Assignment( + Variable(Symbol('c')), + Variable(Symbol('d')) + ) + assert ls1[10] == Assignment( + Variable(Symbol('p')), + Variable(Symbol('q')) + ) + assert ls1[11] == Assignment( + Variable(Symbol('r')), + Variable(Symbol('s')) + ) + + + def test_binop_add(): + src1 = ( + src + + """\ + c = a + b + d = a + c + s = p + q + r + """ + ) + expr1.convert_to_expr(src1, 'f') + ls1 = expr1.return_expr() + for iter in range(8, 11): + assert isinstance(ls1[iter], Assignment) + assert ls1[8] == Assignment( + Variable(Symbol('c')), + Symbol('a') + Symbol('b') + ) + assert ls1[9] == Assignment( + Variable(Symbol('d')), + Symbol('a') + Symbol('c') + ) + assert ls1[10] == Assignment( + Variable(Symbol('s')), + Symbol('p') + Symbol('q') + Symbol('r') + ) + + + def test_binop_sub(): + src1 = ( + src + + """\ + c = a - b + d = a - c + s = p - q - r + """ + ) + expr1.convert_to_expr(src1, 'f') + ls1 = expr1.return_expr() + for iter in range(8, 11): + assert isinstance(ls1[iter], Assignment) + assert ls1[8] == Assignment( + Variable(Symbol('c')), + Symbol('a') - Symbol('b') + ) + assert ls1[9] == Assignment( + Variable(Symbol('d')), + Symbol('a') - Symbol('c') + ) + assert ls1[10] == Assignment( + Variable(Symbol('s')), + Symbol('p') - Symbol('q') - Symbol('r') + ) + + + def test_binop_mul(): + src1 = ( + src + + """\ + c = a * b + d = a * c + s = p * q * r + """ + ) + expr1.convert_to_expr(src1, 'f') + ls1 = expr1.return_expr() + for iter in range(8, 11): + assert isinstance(ls1[iter], Assignment) + assert ls1[8] == Assignment( + Variable(Symbol('c')), + Symbol('a') * Symbol('b') + ) + assert ls1[9] == Assignment( + Variable(Symbol('d')), + Symbol('a') * Symbol('c') + ) + assert ls1[10] == Assignment( + Variable(Symbol('s')), + Symbol('p') * Symbol('q') * Symbol('r') + ) + + + def test_binop_div(): + src1 = ( + src + + """\ + c = a / b + d = a / c + s = p / q + r = q / p + """ + ) + expr1.convert_to_expr(src1, 'f') + ls1 = expr1.return_expr() + for iter in range(8, 12): + assert isinstance(ls1[iter], Assignment) + assert ls1[8] == Assignment( + Variable(Symbol('c')), + Symbol('a') / Symbol('b') + ) + assert ls1[9] == Assignment( + Variable(Symbol('d')), + Symbol('a') / Symbol('c') + ) + assert ls1[10] == Assignment( + Variable(Symbol('s')), + Symbol('p') / Symbol('q') + ) + assert ls1[11] == Assignment( + Variable(Symbol('r')), + Symbol('q') / Symbol('p') + ) + + def test_mul_binop(): + src1 = ( + src + + """\ + d = a + b - c + c = a * b + d + s = p * q / r + r = p * s + q / p + """ + ) + expr1.convert_to_expr(src1, 'f') + ls1 = expr1.return_expr() + for iter in range(8, 12): + assert isinstance(ls1[iter], Assignment) + assert ls1[8] == Assignment( + Variable(Symbol('d')), + Symbol('a') + Symbol('b') - Symbol('c') + ) + assert ls1[9] == Assignment( + Variable(Symbol('c')), + Symbol('a') * Symbol('b') + Symbol('d') + ) + assert ls1[10] == Assignment( + Variable(Symbol('s')), + Symbol('p') * Symbol('q') / Symbol('r') + ) + assert ls1[11] == Assignment( + Variable(Symbol('r')), + Symbol('p') * Symbol('s') + Symbol('q') / Symbol('p') + ) + + + def test_function(): + src1 = """\ + integer function f(a,b) + integer :: x, y + f = x + y + end function + """ + expr1.convert_to_expr(src1, 'f') + for iter in expr1.return_expr(): + assert isinstance(iter, FunctionDefinition) + assert iter == FunctionDefinition( + IntBaseType(String('integer')), + name=String('f'), + parameters=( + Variable(Symbol('a')), + Variable(Symbol('b')) + ), + body=CodeBlock( + Declaration( + Variable( + Symbol('a'), + type=IntBaseType(String('integer')), + value=Integer(0) + ) + ), + Declaration( + Variable( + Symbol('b'), + type=IntBaseType(String('integer')), + value=Integer(0) + ) + ), + Declaration( + Variable( + Symbol('f'), + type=IntBaseType(String('integer')), + value=Integer(0) + ) + ), + Declaration( + Variable( + Symbol('x'), + type=IntBaseType(String('integer')), + value=Integer(0) + ) + ), + Declaration( + Variable( + Symbol('y'), + type=IntBaseType(String('integer')), + value=Integer(0) + ) + ), + Assignment( + Variable(Symbol('f')), + Add(Symbol('x'), Symbol('y')) + ), + Return(Variable(Symbol('f'))) + ) + ) + + + def test_var(): + expr1.convert_to_expr(src, 'f') + ls = expr1.return_expr() + for iter in expr1.return_expr(): + assert isinstance(iter, Declaration) + assert ls[0] == Declaration( + Variable( + Symbol('a'), + type = IntBaseType(String('integer')), + value = Integer(0) + ) + ) + assert ls[1] == Declaration( + Variable( + Symbol('b'), + type = IntBaseType(String('integer')), + value = Integer(0) + ) + ) + assert ls[2] == Declaration( + Variable( + Symbol('c'), + type = IntBaseType(String('integer')), + value = Integer(0) + ) + ) + assert ls[3] == Declaration( + Variable( + Symbol('d'), + type = IntBaseType(String('integer')), + value = Integer(0) + ) + ) + assert ls[4] == Declaration( + Variable( + Symbol('p'), + type = FloatBaseType(String('real')), + value = Float(0.0) + ) + ) + assert ls[5] == Declaration( + Variable( + Symbol('q'), + type = FloatBaseType(String('real')), + value = Float(0.0) + ) + ) + assert ls[6] == Declaration( + Variable( + Symbol('r'), + type = FloatBaseType(String('real')), + value = Float(0.0) + ) + ) + assert ls[7] == Declaration( + Variable( + Symbol('s'), + type = FloatBaseType(String('real')), + value = Float(0.0) + ) + ) + +else: + def test_raise(): + from sympy.parsing.fortran.fortran_parser import ASR2PyVisitor + raises(ImportError, lambda: ASR2PyVisitor()) + raises(ImportError, lambda: SymPyExpression(' ', mode = 'f')) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_implicit_multiplication_application.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_implicit_multiplication_application.py new file mode 100644 index 0000000000000000000000000000000000000000..56df361e77b0c0f94bdb53b03e0dc30a8a10899f --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_implicit_multiplication_application.py @@ -0,0 +1,195 @@ +import sympy +from sympy.parsing.sympy_parser import ( + parse_expr, + standard_transformations, + convert_xor, + implicit_multiplication_application, + implicit_multiplication, + implicit_application, + function_exponentiation, + split_symbols, + split_symbols_custom, + _token_splittable +) +from sympy.testing.pytest import raises + + +def test_implicit_multiplication(): + cases = { + '5x': '5*x', + 'abc': 'a*b*c', + '3sin(x)': '3*sin(x)', + '(x+1)(x+2)': '(x+1)*(x+2)', + '(5 x**2)sin(x)': '(5*x**2)*sin(x)', + '2 sin(x) cos(x)': '2*sin(x)*cos(x)', + 'pi x': 'pi*x', + 'x pi': 'x*pi', + 'E x': 'E*x', + 'EulerGamma y': 'EulerGamma*y', + 'E pi': 'E*pi', + 'pi (x + 2)': 'pi*(x+2)', + '(x + 2) pi': '(x+2)*pi', + 'pi sin(x)': 'pi*sin(x)', + } + transformations = standard_transformations + (convert_xor,) + transformations2 = transformations + (split_symbols, + implicit_multiplication) + for case in cases: + implicit = parse_expr(case, transformations=transformations2) + normal = parse_expr(cases[case], transformations=transformations) + assert(implicit == normal) + + application = ['sin x', 'cos 2*x', 'sin cos x'] + for case in application: + raises(SyntaxError, + lambda: parse_expr(case, transformations=transformations2)) + raises(TypeError, + lambda: parse_expr('sin**2(x)', transformations=transformations2)) + + +def test_implicit_application(): + cases = { + 'factorial': 'factorial', + 'sin x': 'sin(x)', + 'tan y**3': 'tan(y**3)', + 'cos 2*x': 'cos(2*x)', + '(cot)': 'cot', + 'sin cos tan x': 'sin(cos(tan(x)))' + } + transformations = standard_transformations + (convert_xor,) + transformations2 = transformations + (implicit_application,) + for case in cases: + implicit = parse_expr(case, transformations=transformations2) + normal = parse_expr(cases[case], transformations=transformations) + assert(implicit == normal), (implicit, normal) + + multiplication = ['x y', 'x sin x', '2x'] + for case in multiplication: + raises(SyntaxError, + lambda: parse_expr(case, transformations=transformations2)) + raises(TypeError, + lambda: parse_expr('sin**2(x)', transformations=transformations2)) + + +def test_function_exponentiation(): + cases = { + 'sin**2(x)': 'sin(x)**2', + 'exp^y(z)': 'exp(z)^y', + 'sin**2(E^(x))': 'sin(E^(x))**2' + } + transformations = standard_transformations + (convert_xor,) + transformations2 = transformations + (function_exponentiation,) + for case in cases: + implicit = parse_expr(case, transformations=transformations2) + normal = parse_expr(cases[case], transformations=transformations) + assert(implicit == normal) + + other_implicit = ['x y', 'x sin x', '2x', 'sin x', + 'cos 2*x', 'sin cos x'] + for case in other_implicit: + raises(SyntaxError, + lambda: parse_expr(case, transformations=transformations2)) + + assert parse_expr('x**2', local_dict={ 'x': sympy.Symbol('x') }, + transformations=transformations2) == parse_expr('x**2') + + +def test_symbol_splitting(): + # By default Greek letter names should not be split (lambda is a keyword + # so skip it) + transformations = standard_transformations + (split_symbols,) + greek_letters = ('alpha', 'beta', 'gamma', 'delta', 'epsilon', 'zeta', + 'eta', 'theta', 'iota', 'kappa', 'mu', 'nu', 'xi', + 'omicron', 'pi', 'rho', 'sigma', 'tau', 'upsilon', + 'phi', 'chi', 'psi', 'omega') + + for letter in greek_letters: + assert(parse_expr(letter, transformations=transformations) == + parse_expr(letter)) + + # Make sure symbol splitting resolves names + transformations += (implicit_multiplication,) + local_dict = { 'e': sympy.E } + cases = { + 'xe': 'E*x', + 'Iy': 'I*y', + 'ee': 'E*E', + } + for case, expected in cases.items(): + assert(parse_expr(case, local_dict=local_dict, + transformations=transformations) == + parse_expr(expected)) + + # Make sure custom splitting works + def can_split(symbol): + if symbol not in ('unsplittable', 'names'): + return _token_splittable(symbol) + return False + transformations = standard_transformations + transformations += (split_symbols_custom(can_split), + implicit_multiplication) + + assert(parse_expr('unsplittable', transformations=transformations) == + parse_expr('unsplittable')) + assert(parse_expr('names', transformations=transformations) == + parse_expr('names')) + assert(parse_expr('xy', transformations=transformations) == + parse_expr('x*y')) + for letter in greek_letters: + assert(parse_expr(letter, transformations=transformations) == + parse_expr(letter)) + + +def test_all_implicit_steps(): + cases = { + '2x': '2*x', # implicit multiplication + 'x y': 'x*y', + 'xy': 'x*y', + 'sin x': 'sin(x)', # add parentheses + '2sin x': '2*sin(x)', + 'x y z': 'x*y*z', + 'sin(2 * 3x)': 'sin(2 * 3 * x)', + 'sin(x) (1 + cos(x))': 'sin(x) * (1 + cos(x))', + '(x + 2) sin(x)': '(x + 2) * sin(x)', + '(x + 2) sin x': '(x + 2) * sin(x)', + 'sin(sin x)': 'sin(sin(x))', + 'sin x!': 'sin(factorial(x))', + 'sin x!!': 'sin(factorial2(x))', + 'factorial': 'factorial', # don't apply a bare function + 'x sin x': 'x * sin(x)', # both application and multiplication + 'xy sin x': 'x * y * sin(x)', + '(x+2)(x+3)': '(x + 2) * (x+3)', + 'x**2 + 2xy + y**2': 'x**2 + 2 * x * y + y**2', # split the xy + 'pi': 'pi', # don't mess with constants + 'None': 'None', + 'ln sin x': 'ln(sin(x))', # multiple implicit function applications + 'sin x**2': 'sin(x**2)', # implicit application to an exponential + 'alpha': 'Symbol("alpha")', # don't split Greek letters/subscripts + 'x_2': 'Symbol("x_2")', + 'sin^2 x**2': 'sin(x**2)**2', # function raised to a power + 'sin**3(x)': 'sin(x)**3', + '(factorial)': 'factorial', + 'tan 3x': 'tan(3*x)', + 'sin^2(3*E^(x))': 'sin(3*E**(x))**2', + 'sin**2(E^(3x))': 'sin(E**(3*x))**2', + 'sin^2 (3x*E^(x))': 'sin(3*x*E^x)**2', + 'pi sin x': 'pi*sin(x)', + } + transformations = standard_transformations + (convert_xor,) + transformations2 = transformations + (implicit_multiplication_application,) + for case in cases: + implicit = parse_expr(case, transformations=transformations2) + normal = parse_expr(cases[case], transformations=transformations) + assert(implicit == normal) + + +def test_no_methods_implicit_multiplication(): + # Issue 21020 + u = sympy.Symbol('u') + transformations = standard_transformations + \ + (implicit_multiplication,) + expr = parse_expr('x.is_polynomial(x)', transformations=transformations) + assert expr == True + expr = parse_expr('(exp(x) / (1 + exp(2x))).subs(exp(x), u)', + transformations=transformations) + assert expr == u/(u**2 + 1) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_latex.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_latex.py new file mode 100644 index 0000000000000000000000000000000000000000..49a48966eacaa1cd7a242dcd0e7699c992bb1268 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_latex.py @@ -0,0 +1,358 @@ +from sympy.testing.pytest import raises, XFAIL +from sympy.external import import_module + +from sympy.concrete.products import Product +from sympy.concrete.summations import Sum +from sympy.core.add import Add +from sympy.core.function import (Derivative, Function) +from sympy.core.mul import Mul +from sympy.core.numbers import (E, oo) +from sympy.core.power import Pow +from sympy.core.relational import (GreaterThan, LessThan, StrictGreaterThan, StrictLessThan, Unequality) +from sympy.core.symbol import Symbol +from sympy.functions.combinatorial.factorials import (binomial, factorial) +from sympy.functions.elementary.complexes import (Abs, conjugate) +from sympy.functions.elementary.exponential import (exp, log) +from sympy.functions.elementary.integers import (ceiling, floor) +from sympy.functions.elementary.miscellaneous import (root, sqrt) +from sympy.functions.elementary.trigonometric import (asin, cos, csc, sec, sin, tan) +from sympy.integrals.integrals import Integral +from sympy.series.limits import Limit + +from sympy.core.relational import Eq, Ne, Lt, Le, Gt, Ge +from sympy.physics.quantum.state import Bra, Ket +from sympy.abc import x, y, z, a, b, c, t, k, n +antlr4 = import_module("antlr4") + +# disable tests if antlr4-python3-runtime is not present +disabled = antlr4 is None + +theta = Symbol('theta') +f = Function('f') + + +# shorthand definitions +def _Add(a, b): + return Add(a, b, evaluate=False) + + +def _Mul(a, b): + return Mul(a, b, evaluate=False) + + +def _Pow(a, b): + return Pow(a, b, evaluate=False) + + +def _Sqrt(a): + return sqrt(a, evaluate=False) + + +def _Conjugate(a): + return conjugate(a, evaluate=False) + + +def _Abs(a): + return Abs(a, evaluate=False) + + +def _factorial(a): + return factorial(a, evaluate=False) + + +def _exp(a): + return exp(a, evaluate=False) + + +def _log(a, b): + return log(a, b, evaluate=False) + + +def _binomial(n, k): + return binomial(n, k, evaluate=False) + + +def test_import(): + from sympy.parsing.latex._build_latex_antlr import ( + build_parser, + check_antlr_version, + dir_latex_antlr + ) + # XXX: It would be better to come up with a test for these... + del build_parser, check_antlr_version, dir_latex_antlr + + +# These LaTeX strings should parse to the corresponding SymPy expression +GOOD_PAIRS = [ + (r"0", 0), + (r"1", 1), + (r"-3.14", -3.14), + (r"(-7.13)(1.5)", _Mul(-7.13, 1.5)), + (r"x", x), + (r"2x", 2*x), + (r"x^2", x**2), + (r"x^\frac{1}{2}", _Pow(x, _Pow(2, -1))), + (r"x^{3 + 1}", x**_Add(3, 1)), + (r"-c", -c), + (r"a \cdot b", a * b), + (r"a / b", a / b), + (r"a \div b", a / b), + (r"a + b", a + b), + (r"a + b - a", _Add(a+b, -a)), + (r"a^2 + b^2 = c^2", Eq(a**2 + b**2, c**2)), + (r"(x + y) z", _Mul(_Add(x, y), z)), + (r"a'b+ab'", _Add(_Mul(Symbol("a'"), b), _Mul(a, Symbol("b'")))), + (r"y''_1", Symbol("y_{1}''")), + (r"y_1''", Symbol("y_{1}''")), + (r"\left(x + y\right) z", _Mul(_Add(x, y), z)), + (r"\left( x + y\right ) z", _Mul(_Add(x, y), z)), + (r"\left( x + y\right ) z", _Mul(_Add(x, y), z)), + (r"\left[x + y\right] z", _Mul(_Add(x, y), z)), + (r"\left\{x + y\right\} z", _Mul(_Add(x, y), z)), + (r"1+1", _Add(1, 1)), + (r"0+1", _Add(0, 1)), + (r"1*2", _Mul(1, 2)), + (r"0*1", _Mul(0, 1)), + (r"1 \times 2 ", _Mul(1, 2)), + (r"x = y", Eq(x, y)), + (r"x \neq y", Ne(x, y)), + (r"x < y", Lt(x, y)), + (r"x > y", Gt(x, y)), + (r"x \leq y", Le(x, y)), + (r"x \geq y", Ge(x, y)), + (r"x \le y", Le(x, y)), + (r"x \ge y", Ge(x, y)), + (r"\lfloor x \rfloor", floor(x)), + (r"\lceil x \rceil", ceiling(x)), + (r"\langle x |", Bra('x')), + (r"| x \rangle", Ket('x')), + (r"\sin \theta", sin(theta)), + (r"\sin(\theta)", sin(theta)), + (r"\sin^{-1} a", asin(a)), + (r"\sin a \cos b", _Mul(sin(a), cos(b))), + (r"\sin \cos \theta", sin(cos(theta))), + (r"\sin(\cos \theta)", sin(cos(theta))), + (r"\frac{a}{b}", a / b), + (r"\dfrac{a}{b}", a / b), + (r"\tfrac{a}{b}", a / b), + (r"\frac12", _Pow(2, -1)), + (r"\frac12y", _Mul(_Pow(2, -1), y)), + (r"\frac1234", _Mul(_Pow(2, -1), 34)), + (r"\frac2{3}", _Mul(2, _Pow(3, -1))), + (r"\frac{\sin{x}}2", _Mul(sin(x), _Pow(2, -1))), + (r"\frac{a + b}{c}", _Mul(a + b, _Pow(c, -1))), + (r"\frac{7}{3}", _Mul(7, _Pow(3, -1))), + (r"(\csc x)(\sec y)", csc(x)*sec(y)), + (r"\lim_{x \to 3} a", Limit(a, x, 3, dir='+-')), + (r"\lim_{x \rightarrow 3} a", Limit(a, x, 3, dir='+-')), + (r"\lim_{x \Rightarrow 3} a", Limit(a, x, 3, dir='+-')), + (r"\lim_{x \longrightarrow 3} a", Limit(a, x, 3, dir='+-')), + (r"\lim_{x \Longrightarrow 3} a", Limit(a, x, 3, dir='+-')), + (r"\lim_{x \to 3^{+}} a", Limit(a, x, 3, dir='+')), + (r"\lim_{x \to 3^{-}} a", Limit(a, x, 3, dir='-')), + (r"\lim_{x \to 3^+} a", Limit(a, x, 3, dir='+')), + (r"\lim_{x \to 3^-} a", Limit(a, x, 3, dir='-')), + (r"\infty", oo), + (r"\lim_{x \to \infty} \frac{1}{x}", Limit(_Pow(x, -1), x, oo)), + (r"\frac{d}{dx} x", Derivative(x, x)), + (r"\frac{d}{dt} x", Derivative(x, t)), + (r"f(x)", f(x)), + (r"f(x, y)", f(x, y)), + (r"f(x, y, z)", f(x, y, z)), + (r"f'_1(x)", Function("f_{1}'")(x)), + (r"f_{1}''(x+y)", Function("f_{1}''")(x+y)), + (r"\frac{d f(x)}{dx}", Derivative(f(x), x)), + (r"\frac{d\theta(x)}{dx}", Derivative(Function('theta')(x), x)), + (r"x \neq y", Unequality(x, y)), + (r"|x|", _Abs(x)), + (r"||x||", _Abs(Abs(x))), + (r"|x||y|", _Abs(x)*_Abs(y)), + (r"||x||y||", _Abs(_Abs(x)*_Abs(y))), + (r"\pi^{|xy|}", Symbol('pi')**_Abs(x*y)), + (r"\int x dx", Integral(x, x)), + (r"\int x d\theta", Integral(x, theta)), + (r"\int (x^2 - y)dx", Integral(x**2 - y, x)), + (r"\int x + a dx", Integral(_Add(x, a), x)), + (r"\int da", Integral(1, a)), + (r"\int_0^7 dx", Integral(1, (x, 0, 7))), + (r"\int\limits_{0}^{1} x dx", Integral(x, (x, 0, 1))), + (r"\int_a^b x dx", Integral(x, (x, a, b))), + (r"\int^b_a x dx", Integral(x, (x, a, b))), + (r"\int_{a}^b x dx", Integral(x, (x, a, b))), + (r"\int^{b}_a x dx", Integral(x, (x, a, b))), + (r"\int_{a}^{b} x dx", Integral(x, (x, a, b))), + (r"\int^{b}_{a} x dx", Integral(x, (x, a, b))), + (r"\int_{f(a)}^{f(b)} f(z) dz", Integral(f(z), (z, f(a), f(b)))), + (r"\int (x+a)", Integral(_Add(x, a), x)), + (r"\int a + b + c dx", Integral(_Add(_Add(a, b), c), x)), + (r"\int \frac{dz}{z}", Integral(Pow(z, -1), z)), + (r"\int \frac{3 dz}{z}", Integral(3*Pow(z, -1), z)), + (r"\int \frac{1}{x} dx", Integral(Pow(x, -1), x)), + (r"\int \frac{1}{a} + \frac{1}{b} dx", + Integral(_Add(_Pow(a, -1), Pow(b, -1)), x)), + (r"\int \frac{3 \cdot d\theta}{\theta}", + Integral(3*_Pow(theta, -1), theta)), + (r"\int \frac{1}{x} + 1 dx", Integral(_Add(_Pow(x, -1), 1), x)), + (r"x_0", Symbol('x_{0}')), + (r"x_{1}", Symbol('x_{1}')), + (r"x_a", Symbol('x_{a}')), + (r"x_{b}", Symbol('x_{b}')), + (r"h_\theta", Symbol('h_{theta}')), + (r"h_{\theta}", Symbol('h_{theta}')), + (r"h_{\theta}(x_0, x_1)", + Function('h_{theta}')(Symbol('x_{0}'), Symbol('x_{1}'))), + (r"x!", _factorial(x)), + (r"100!", _factorial(100)), + (r"\theta!", _factorial(theta)), + (r"(x + 1)!", _factorial(_Add(x, 1))), + (r"(x!)!", _factorial(_factorial(x))), + (r"x!!!", _factorial(_factorial(_factorial(x)))), + (r"5!7!", _Mul(_factorial(5), _factorial(7))), + (r"\sqrt{x}", sqrt(x)), + (r"\sqrt{x + b}", sqrt(_Add(x, b))), + (r"\sqrt[3]{\sin x}", root(sin(x), 3)), + (r"\sqrt[y]{\sin x}", root(sin(x), y)), + (r"\sqrt[\theta]{\sin x}", root(sin(x), theta)), + (r"\sqrt{\frac{12}{6}}", _Sqrt(_Mul(12, _Pow(6, -1)))), + (r"\overline{z}", _Conjugate(z)), + (r"\overline{\overline{z}}", _Conjugate(_Conjugate(z))), + (r"\overline{x + y}", _Conjugate(_Add(x, y))), + (r"\overline{x} + \overline{y}", _Conjugate(x) + _Conjugate(y)), + (r"x < y", StrictLessThan(x, y)), + (r"x \leq y", LessThan(x, y)), + (r"x > y", StrictGreaterThan(x, y)), + (r"x \geq y", GreaterThan(x, y)), + (r"\mathit{x}", Symbol('x')), + (r"\mathit{test}", Symbol('test')), + (r"\mathit{TEST}", Symbol('TEST')), + (r"\mathit{HELLO world}", Symbol('HELLO world')), + (r"\sum_{k = 1}^{3} c", Sum(c, (k, 1, 3))), + (r"\sum_{k = 1}^3 c", Sum(c, (k, 1, 3))), + (r"\sum^{3}_{k = 1} c", Sum(c, (k, 1, 3))), + (r"\sum^3_{k = 1} c", Sum(c, (k, 1, 3))), + (r"\sum_{k = 1}^{10} k^2", Sum(k**2, (k, 1, 10))), + (r"\sum_{n = 0}^{\infty} \frac{1}{n!}", + Sum(_Pow(_factorial(n), -1), (n, 0, oo))), + (r"\prod_{a = b}^{c} x", Product(x, (a, b, c))), + (r"\prod_{a = b}^c x", Product(x, (a, b, c))), + (r"\prod^{c}_{a = b} x", Product(x, (a, b, c))), + (r"\prod^c_{a = b} x", Product(x, (a, b, c))), + (r"\exp x", _exp(x)), + (r"\exp(x)", _exp(x)), + (r"\lg x", _log(x, 10)), + (r"\ln x", _log(x, E)), + (r"\ln xy", _log(x*y, E)), + (r"\log x", _log(x, E)), + (r"\log xy", _log(x*y, E)), + (r"\log_{2} x", _log(x, 2)), + (r"\log_{a} x", _log(x, a)), + (r"\log_{11} x", _log(x, 11)), + (r"\log_{a^2} x", _log(x, _Pow(a, 2))), + (r"[x]", x), + (r"[a + b]", _Add(a, b)), + (r"\frac{d}{dx} [ \tan x ]", Derivative(tan(x), x)), + (r"\binom{n}{k}", _binomial(n, k)), + (r"\tbinom{n}{k}", _binomial(n, k)), + (r"\dbinom{n}{k}", _binomial(n, k)), + (r"\binom{n}{0}", _binomial(n, 0)), + (r"x^\binom{n}{k}", _Pow(x, _binomial(n, k))), + (r"a \, b", _Mul(a, b)), + (r"a \thinspace b", _Mul(a, b)), + (r"a \: b", _Mul(a, b)), + (r"a \medspace b", _Mul(a, b)), + (r"a \; b", _Mul(a, b)), + (r"a \thickspace b", _Mul(a, b)), + (r"a \quad b", _Mul(a, b)), + (r"a \qquad b", _Mul(a, b)), + (r"a \! b", _Mul(a, b)), + (r"a \negthinspace b", _Mul(a, b)), + (r"a \negmedspace b", _Mul(a, b)), + (r"a \negthickspace b", _Mul(a, b)), + (r"\int x \, dx", Integral(x, x)), + (r"\log_2 x", _log(x, 2)), + (r"\log_a x", _log(x, a)), + (r"5^0 - 4^0", _Add(_Pow(5, 0), _Mul(-1, _Pow(4, 0)))), + (r"3x - 1", _Add(_Mul(3, x), -1)) +] + + +def test_parseable(): + from sympy.parsing.latex import parse_latex + for latex_str, sympy_expr in GOOD_PAIRS: + assert parse_latex(latex_str) == sympy_expr, latex_str + +# These bad LaTeX strings should raise a LaTeXParsingError when parsed +BAD_STRINGS = [ + r"(", + r")", + r"\frac{d}{dx}", + r"(\frac{d}{dx})", + r"\sqrt{}", + r"\sqrt", + r"\overline{}", + r"\overline", + r"{", + r"}", + r"\mathit{x + y}", + r"\mathit{21}", + r"\frac{2}{}", + r"\frac{}{2}", + r"\int", + r"!", + r"!0", + r"_", + r"^", + r"|", + r"||x|", + r"()", + r"((((((((((((((((()))))))))))))))))", + r"-", + r"\frac{d}{dx} + \frac{d}{dt}", + r"f(x,,y)", + r"f(x,y,", + r"\sin^x", + r"\cos^2", + r"@", + r"#", + r"$", + r"%", + r"&", + r"*", + r"" "\\", + r"~", + r"\frac{(2 + x}{1 - x)}", +] + +def test_not_parseable(): + from sympy.parsing.latex import parse_latex, LaTeXParsingError + for latex_str in BAD_STRINGS: + with raises(LaTeXParsingError): + parse_latex(latex_str) + +# At time of migration from latex2sympy, should fail but doesn't +FAILING_BAD_STRINGS = [ + r"\cos 1 \cos", + r"f(,", + r"f()", + r"a \div \div b", + r"a \cdot \cdot b", + r"a // b", + r"a +", + r"1.1.1", + r"1 +", + r"a / b /", +] + +@XFAIL +def test_failing_not_parseable(): + from sympy.parsing.latex import parse_latex, LaTeXParsingError + for latex_str in FAILING_BAD_STRINGS: + with raises(LaTeXParsingError): + parse_latex(latex_str) + +# In strict mode, FAILING_BAD_STRINGS would fail +def test_strict_mode(): + from sympy.parsing.latex import parse_latex, LaTeXParsingError + for latex_str in FAILING_BAD_STRINGS: + with raises(LaTeXParsingError): + parse_latex(latex_str, strict=True) diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_latex_deps.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_latex_deps.py new file mode 100644 index 0000000000000000000000000000000000000000..7df44c2b19e34024db6e898f7c4eac962dcaa1c9 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_latex_deps.py @@ -0,0 +1,16 @@ +from sympy.external import import_module +from sympy.testing.pytest import ignore_warnings, raises + +antlr4 = import_module("antlr4", warn_not_installed=False) + +# disable tests if antlr4-python3-runtime is not present +if antlr4: + disabled = True + + +def test_no_import(): + from sympy.parsing.latex import parse_latex + + with ignore_warnings(UserWarning): + with raises(ImportError): + parse_latex('1 + 1') diff --git a/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_latex_lark.py b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_latex_lark.py new file mode 100644 index 0000000000000000000000000000000000000000..dd1f72a66c788ac41d923005ea988664d05a16c1 --- /dev/null +++ b/miniconda3/envs/ladir/lib/python3.10/site-packages/sympy/parsing/tests/test_latex_lark.py @@ -0,0 +1,872 @@ +from sympy.testing.pytest import XFAIL +from sympy.parsing.latex.lark import parse_latex_lark +from sympy.external import import_module + +from sympy.concrete.products import Product +from sympy.concrete.summations import Sum +from sympy.core.function import Derivative, Function +from sympy.core.numbers import E, oo, Rational +from sympy.core.power import Pow +from sympy.core.parameters import evaluate +from sympy.core.relational import GreaterThan, LessThan, StrictGreaterThan, StrictLessThan, Unequality +from sympy.core.symbol import Symbol +from sympy.functions.combinatorial.factorials import binomial, factorial +from sympy.functions.elementary.complexes import Abs, conjugate +from sympy.functions.elementary.exponential import exp, log +from sympy.functions.elementary.integers import ceiling, floor +from sympy.functions.elementary.miscellaneous import root, sqrt, Min, Max +from sympy.functions.elementary.trigonometric import asin, cos, csc, sec, sin, tan +from sympy.integrals.integrals import Integral +from sympy.series.limits import Limit +from sympy import Matrix, MatAdd, MatMul, Transpose, Trace +from sympy import I + +from sympy.core.relational import Eq, Ne, Lt, Le, Gt, Ge +from sympy.physics.quantum import Bra, Ket, InnerProduct +from sympy.abc import x, y, z, a, b, c, d, t, k, n + +from .test_latex import theta, f, _Add, _Mul, _Pow, _Sqrt, _Conjugate, _Abs, _factorial, _exp, _binomial + +lark = import_module("lark") + +# disable tests if lark is not present +disabled = lark is None + +# shorthand definitions that are only needed for the Lark LaTeX parser +def _Min(*args): + return Min(*args, evaluate=False) + + +def _Max(*args): + return Max(*args, evaluate=False) + + +def _log(a, b=E): + if b == E: + return log(a, evaluate=False) + else: + return log(a, b, evaluate=False) + + +def _MatAdd(a, b): + return MatAdd(a, b, evaluate=False) + + +def _MatMul(a, b): + return MatMul(a, b, evaluate=False) + + +# These LaTeX strings should parse to the corresponding SymPy expression +SYMBOL_EXPRESSION_PAIRS = [ + (r"x_0", Symbol('x_{0}')), + (r"x_{1}", Symbol('x_{1}')), + (r"x_a", Symbol('x_{a}')), + (r"x_{b}", Symbol('x_{b}')), + (r"h_\theta", Symbol('h_{theta}')), + (r"h_{\theta}", Symbol('h_{theta}')), + (r"y''_1", Symbol("y''_{1}")), + (r"y_1''", Symbol("y_{1}''")), + (r"\mathit{x}", Symbol('x')), + (r"\mathit{test}", Symbol('test')), + (r"\mathit{TEST}", Symbol('TEST')), + (r"\mathit{HELLO world}", Symbol('HELLO world')), + (r"a'", Symbol("a'")), + (r"a''", Symbol("a''")), + (r"\alpha'", Symbol("alpha'")), + (r"\alpha''", Symbol("alpha''")), + (r"a_b", Symbol("a_{b}")), + (r"a_b'", Symbol("a_{b}'")), + (r"a'_b", Symbol("a'_{b}")), + (r"a'_b'", Symbol("a'_{b}'")), + (r"a_{b'}", Symbol("a_{b'}")), + (r"a_{b'}'", Symbol("a_{b'}'")), + (r"a'_{b'}", Symbol("a'_{b'}")), + (r"a'_{b'}'", Symbol("a'_{b'}'")), + (r"\mathit{foo}'", Symbol("foo'")), + (r"\mathit{foo'}", Symbol("foo'")), + (r"\mathit{foo'}'", Symbol("foo''")), + (r"a_b''", Symbol("a_{b}''")), + (r"a''_b", Symbol("a''_{b}")), + (r"a''_b'''", Symbol("a''_{b}'''")), + (r"a_{b''}", Symbol("a_{b''}")), + (r"a_{b''}''", Symbol("a_{b''}''")), + (r"a''_{b''}", Symbol("a''_{b''}")), + (r"a''_{b''}'''", Symbol("a''_{b''}'''")), + (r"\mathit{foo}''", Symbol("foo''")), + (r"\mathit{foo''}", Symbol("foo''")), + (r"\mathit{foo''}'''", Symbol("foo'''''")), + (r"a_\alpha", Symbol("a_{alpha}")), + (r"a_\alpha'", Symbol("a_{alpha}'")), + (r"a'_\alpha", Symbol("a'_{alpha}")), + (r"a'_\alpha'", Symbol("a'_{alpha}'")), + (r"a_{\alpha'}", Symbol("a_{alpha'}")), + (r"a_{\alpha'}'", Symbol("a_{alpha'}'")), + (r"a'_{\alpha'}", Symbol("a'_{alpha'}")), + (r"a'_{\alpha'}'", Symbol("a'_{alpha'}'")), + (r"a_\alpha''", Symbol("a_{alpha}''")), + (r"a''_\alpha", Symbol("a''_{alpha}")), + (r"a''_\alpha'''", Symbol("a''_{alpha}'''")), + (r"a_{\alpha''}", Symbol("a_{alpha''}")), + (r"a_{\alpha''}''", Symbol("a_{alpha''}''")), + (r"a''_{\alpha''}", Symbol("a''_{alpha''}")), + (r"a''_{\alpha''}'''", Symbol("a''_{alpha''}'''")), + (r"\alpha_b", Symbol("alpha_{b}")), + (r"\alpha_b'", Symbol("alpha_{b}'")), + (r"\alpha'_b", Symbol("alpha'_{b}")), + (r"\alpha'_b'", Symbol("alpha'_{b}'")), + (r"\alpha_{b'}", Symbol("alpha_{b'}")), + (r"\alpha_{b'}'", Symbol("alpha_{b'}'")), + (r"\alpha'_{b'}", Symbol("alpha'_{b'}")), + (r"\alpha'_{b'}'", Symbol("alpha'_{b'}'")), + (r"\alpha_b''", Symbol("alpha_{b}''")), + (r"\alpha''_b", Symbol("alpha''_{b}")), + (r"\alpha''_b'''", Symbol("alpha''_{b}'''")), + (r"\alpha_{b''}", Symbol("alpha_{b''}")), + (r"\alpha_{b''}''", Symbol("alpha_{b''}''")), + (r"\alpha''_{b''}", Symbol("alpha''_{b''}")), + (r"\alpha''_{b''}'''", Symbol("alpha''_{b''}'''")), + (r"\alpha_\beta", Symbol("alpha_{beta}")), + (r"\alpha_{\beta}", Symbol("alpha_{beta}")), + (r"\alpha_{\beta'}", Symbol("alpha_{beta'}")), + (r"\alpha_{\beta''}", Symbol("alpha_{beta''}")), + (r"\alpha'_\beta", Symbol("alpha'_{beta}")), + (r"\alpha'_{\beta}", Symbol("alpha'_{beta}")), + (r"\alpha'_{\beta'}", Symbol("alpha'_{beta'}")), + (r"\alpha'_{\beta''}", Symbol("alpha'_{beta''}")), + (r"\alpha''_\beta", Symbol("alpha''_{beta}")), + (r"\alpha''_{\beta}", Symbol("alpha''_{beta}")), + (r"\alpha''_{\beta'}", Symbol("alpha''_{beta'}")), + (r"\alpha''_{\beta''}", Symbol("alpha''_{beta''}")), + (r"\alpha_\beta'", Symbol("alpha_{beta}'")), + (r"\alpha_{\beta}'", Symbol("alpha_{beta}'")), + (r"\alpha_{\beta'}'", Symbol("alpha_{beta'}'")), + (r"\alpha_{\beta''}'", Symbol("alpha_{beta''}'")), + (r"\alpha'_\beta'", Symbol("alpha'_{beta}'")), + (r"\alpha'_{\beta}'", Symbol("alpha'_{beta}'")), + (r"\alpha'_{\beta'}'", Symbol("alpha'_{beta'}'")), + (r"\alpha'_{\beta''}'", Symbol("alpha'_{beta''}'")), + (r"\alpha''_\beta'", Symbol("alpha''_{beta}'")), + (r"\alpha''_{\beta}'", Symbol("alpha''_{beta}'")), + (r"\alpha''_{\beta'}'", Symbol("alpha''_{beta'}'")), + (r"\alpha''_{\beta''}'", Symbol("alpha''_{beta''}'")), + (r"\alpha_\beta''", Symbol("alpha_{beta}''")), + (r"\alpha_{\beta}''", Symbol("alpha_{beta}''")), + (r"\alpha_{\beta'}''", Symbol("alpha_{beta'}''")), + (r"\alpha_{\beta''}''", Symbol("alpha_{beta''}''")), + (r"\alpha'_\beta''", Symbol("alpha'_{beta}''")), + (r"\alpha'_{\beta}''", Symbol("alpha'_{beta}''")), + (r"\alpha'_{\beta'}''", Symbol("alpha'_{beta'}''")), + (r"\alpha'_{\beta''}''", Symbol("alpha'_{beta''}''")), + (r"\alpha''_\beta''", Symbol("alpha''_{beta}''")), + (r"\alpha''_{\beta}''", Symbol("alpha''_{beta}''")), + (r"\alpha''_{\beta'}''", Symbol("alpha''_{beta'}''")), + (r"\alpha''_{\beta''}''", Symbol("alpha''_{beta''}''")) + +] + +UNEVALUATED_SIMPLE_EXPRESSION_PAIRS = [ + (r"0", 0), + (r"1", 1), + (r"-3.14", -3.14), + (r"(-7.13)(1.5)", _Mul(-7.13, 1.5)), + (r"1+1", _Add(1, 1)), + (r"0+1", _Add(0, 1)), + (r"1*2", _Mul(1, 2)), + (r"0*1", _Mul(0, 1)), + (r"x", x), + (r"2x", 2 * x), + (r"3x - 1", _Add(_Mul(3, x), -1)), + (r"-c", -c), + (r"\infty", oo), + (r"a \cdot b", a * b), + (r"1 \times 2 ", _Mul(1, 2)), + (r"a / b", a / b), + (r"a \div b", a / b), + (r"a + b", a + b), + (r"a + b - a", _Add(a + b, -a)), + (r"(x + y) z", _Mul(_Add(x, y), z)), + (r"a'b+ab'", _Add(_Mul(Symbol("a'"), b), _Mul(a, Symbol("b'")))) +] + +EVALUATED_SIMPLE_EXPRESSION_PAIRS = [ + (r"(-7.13)(1.5)", -10.695), + (r"1+1", 2), + (r"0+1", 1), + (r"1*2", 2), + (r"0*1", 0), + (r"2x", 2 * x), + (r"3x - 1", 3 * x - 1), + (r"-c", -c), + (r"a \cdot b", a * b), + (r"1 \times 2 ", 2), + (r"a / b", a / b), + (r"a \div b", a / b), + (r"a + b", a + b), + (r"a + b - a", b), + (r"(x + y) z", (x + y) * z), +] + +UNEVALUATED_FRACTION_EXPRESSION_PAIRS = [ + (r"\frac{a}{b}", a / b), + (r"\dfrac{a}{b}", a / b), + (r"\tfrac{a}{b}", a / b), + (r"\frac12", _Mul(1, _Pow(2, -1))), + (r"\frac12y", _Mul(_Mul(1, _Pow(2, -1)), y)), + (r"\frac1234", _Mul(_Mul(1, _Pow(2, -1)), 34)), + (r"\frac2{3}", _Mul(2, _Pow(3, -1))), + (r"\frac{a + b}{c}", _Mul(a + b, _Pow(c, -1))), + (r"\frac{7}{3}", _Mul(7, _Pow(3, -1))) +] + +EVALUATED_FRACTION_EXPRESSION_PAIRS = [ + (r"\frac{a}{b}", a / b), + (r"\dfrac{a}{b}", a / b), + (r"\tfrac{a}{b}", a / b), + (r"\frac12", Rational(1, 2)), + (r"\frac12y", y / 2), + (r"\frac1234", 17), + (r"\frac2{3}", Rational(2, 3)), + (r"\frac{a + b}{c}", (a + b) / c), + (r"\frac{7}{3}", Rational(7, 3)) +] + +RELATION_EXPRESSION_PAIRS = [ + (r"x = y", Eq(x, y)), + (r"x \neq y", Ne(x, y)), + (r"x < y", Lt(x, y)), + (r"x > y", Gt(x, y)), + (r"x \leq y", Le(x, y)), + (r"x \geq y", Ge(x, y)), + (r"x \le y", Le(x, y)), + (r"x \ge y", Ge(x, y)), + (r"x < y", StrictLessThan(x, y)), + (r"x \leq y", LessThan(x, y)), + (r"x > y", StrictGreaterThan(x, y)), + (r"x \geq y", GreaterThan(x, y)), + (r"x \neq y", Unequality(x, y)), # same as 2nd one in the list + (r"a^2 + b^2 = c^2", Eq(a**2 + b**2, c**2)) +] + +UNEVALUATED_POWER_EXPRESSION_PAIRS = [ + (r"x^2", x ** 2), + (r"x^\frac{1}{2}", _Pow(x, _Mul(1, _Pow(2, -1)))), + (r"x^{3 + 1}", x ** _Add(3, 1)), + (r"\pi^{|xy|}", Symbol('pi') ** _Abs(x * y)), + (r"5^0 - 4^0", _Add(_Pow(5, 0), _Mul(-1, _Pow(4, 0)))) +] + +EVALUATED_POWER_EXPRESSION_PAIRS = [ + (r"x^2", x ** 2), + (r"x^\frac{1}{2}", sqrt(x)), + (r"x^{3 + 1}", x ** 4), + (r"\pi^{|xy|}", Symbol('pi') ** _Abs(x * y)), + (r"5^0 - 4^0", 0) +] + +UNEVALUATED_INTEGRAL_EXPRESSION_PAIRS = [ + (r"\int x dx", Integral(_Mul(1, x), x)), + (r"\int x \, dx", Integral(_Mul(1, x), x)), + (r"\int x d\theta", Integral(_Mul(1, x), theta)), + (r"\int (x^2 - y)dx", Integral(_Mul(1, x ** 2 - y), x)), + (r"\int x + a dx", Integral(_Mul(1, _Add(x, a)), x)), + (r"\int da", Integral(_Mul(1, 1), a)), + (r"\int_0^7 dx", Integral(_Mul(1, 1), (x, 0, 7))), + (r"\int\limits_{0}^{1} x dx", Integral(_Mul(1, x), (x, 0, 1))), + (r"\int_a^b x dx", Integral(_Mul(1, x), (x, a, b))), + (r"\int^b_a x dx", Integral(_Mul(1, x), (x, a, b))), + (r"\int_{a}^b x dx", Integral(_Mul(1, x), (x, a, b))), + (r"\int^{b}_a x dx", Integral(_Mul(1, x), (x, a, b))), + (r"\int_{a}^{b} x dx", Integral(_Mul(1, x), (x, a, b))), + (r"\int^{b}_{a} x dx", Integral(_Mul(1, x), (x, a, b))), + (r"\int_{f(a)}^{f(b)} f(z) dz", Integral(f(z), (z, f(a), f(b)))), + (r"\int a + b + c dx", Integral(_Mul(1, _Add(_Add(a, b), c)), x)), + (r"\int \frac{dz}{z}", Integral(_Mul(1, _Mul(1, Pow(z, -1))), z)), + (r"\int \frac{3 dz}{z}", Integral(_Mul(1, _Mul(3, _Pow(z, -1))), z)), + (r"\int \frac{1}{x} dx", Integral(_Mul(1, _Mul(1, Pow(x, -1))), x)), + (r"\int \frac{1}{a} + \frac{1}{b} dx", + Integral(_Mul(1, _Add(_Mul(1, _Pow(a, -1)), _Mul(1, Pow(b, -1)))), x)), + (r"\int \frac{1}{x} + 1 dx", Integral(_Mul(1, _Add(_Mul(1, _Pow(x, -1)), 1)), x)) +] + +EVALUATED_INTEGRAL_EXPRESSION_PAIRS = [ + (r"\int x dx", Integral(x, x)), + (r"\int x \, dx", Integral(x, x)), + (r"\int x d\theta", Integral(x, theta)), + (r"\int (x^2 - y)dx", Integral(x ** 2 - y, x)), + (r"\int x + a dx", Integral(x + a, x)), + (r"\int da", Integral(1, a)), + (r"\int_0^7 dx", Integral(1, (x, 0, 7))), + (r"\int\limits_{0}^{1} x dx", Integral(x, (x, 0, 1))), + (r"\int_a^b x dx", Integral(x, (x, a, b))), + (r"\int^b_a x dx", Integral(x, (x, a, b))), + (r"\int_{a}^b x dx", Integral(x, (x, a, b))), + (r"\int^{b}_a x dx", Integral(x, (x, a, b))), + (r"\int_{a}^{b} x dx", Integral(x, (x, a, b))), + (r"\int^{b}_{a} x dx", Integral(x, (x, a, b))), + (r"\int_{f(a)}^{f(b)} f(z) dz", Integral(f(z), (z, f(a), f(b)))), + (r"\int a + b + c dx", Integral(a + b + c, x)), + (r"\int \frac{dz}{z}", Integral(Pow(z, -1), z)), + (r"\int \frac{3 dz}{z}", Integral(3 * Pow(z, -1), z)), + (r"\int \frac{1}{x} dx", Integral(1 / x, x)), + (r"\int \frac{1}{a} + \frac{1}{b} dx", Integral(1 / a + 1 / b, x)), + (r"\int \frac{1}{a} - \frac{1}{b} dx", Integral(1 / a - 1 / b, x)), + (r"\int \frac{1}{x} + 1 dx", Integral(1 / x + 1, x)) +] + +DERIVATIVE_EXPRESSION_PAIRS = [ + (r"\frac{d}{dx} x", Derivative(x, x)), + (r"\frac{d}{dt} x", Derivative(x, t)), + (r"\frac{d}{dx} ( \tan x )", Derivative(tan(x), x)), + (r"\frac{d f(x)}{dx}", Derivative(f(x), x)), + (r"\frac{d\theta(x)}{dx}", Derivative(Function('theta')(x), x)) +] + +TRIGONOMETRIC_EXPRESSION_PAIRS = [ + (r"\sin \theta", sin(theta)), + (r"\sin(\theta)", sin(theta)), + (r"\sin^{-1} a", asin(a)), + (r"\sin a \cos b", _Mul(sin(a), cos(b))), + (r"\sin \cos \theta", sin(cos(theta))), + (r"\sin(\cos \theta)", sin(cos(theta))), + (r"(\csc x)(\sec y)", csc(x) * sec(y)), + (r"\frac{\sin{x}}2", _Mul(sin(x), _Pow(2, -1))) +] + +UNEVALUATED_LIMIT_EXPRESSION_PAIRS = [ + (r"\lim_{x \to 3} a", Limit(a, x, 3, dir="+-")), + (r"\lim_{x \rightarrow 3} a", Limit(a, x, 3, dir="+-")), + (r"\lim_{x \Rightarrow 3} a", Limit(a, x, 3, dir="+-")), + (r"\lim_{x \longrightarrow 3} a", Limit(a, x, 3, dir="+-")), + (r"\lim_{x \Longrightarrow 3} a", Limit(a, x, 3, dir="+-")), + (r"\lim_{x \to 3^{+}} a", Limit(a, x, 3, dir="+")), + (r"\lim_{x \to 3^{-}} a", Limit(a, x, 3, dir="-")), + (r"\lim_{x \to 3^+} a", Limit(a, x, 3, dir="+")), + (r"\lim_{x \to 3^-} a", Limit(a, x, 3, dir="-")), + (r"\lim_{x \to \infty} \frac{1}{x}", Limit(_Mul(1, _Pow(x, -1)), x, oo)) +] + +EVALUATED_LIMIT_EXPRESSION_PAIRS = [ + (r"\lim_{x \to \infty} \frac{1}{x}", Limit(1 / x, x, oo)) +] + +UNEVALUATED_SQRT_EXPRESSION_PAIRS = [ + (r"\sqrt{x}", sqrt(x)), + (r"\sqrt{x + b}", sqrt(_Add(x, b))), + (r"\sqrt[3]{\sin x}", _Pow(sin(x), _Pow(3, -1))), + # the above test needed to be handled differently than the ones below because root + # acts differently if its second argument is a number + (r"\sqrt[y]{\sin x}", root(sin(x), y)), + (r"\sqrt[\theta]{\sin x}", root(sin(x), theta)), + (r"\sqrt{\frac{12}{6}}", _Sqrt(_Mul(12, _Pow(6, -1)))) +] + +EVALUATED_SQRT_EXPRESSION_PAIRS = [ + (r"\sqrt{x}", sqrt(x)), + (r"\sqrt{x + b}", sqrt(x + b)), + (r"\sqrt[3]{\sin x}", root(sin(x), 3)), + (r"\sqrt[y]{\sin x}", root(sin(x), y)), + (r"\sqrt[\theta]{\sin x}", root(sin(x), theta)), + (r"\sqrt{\frac{12}{6}}", sqrt(2)) +] + +UNEVALUATED_FACTORIAL_EXPRESSION_PAIRS = [ + (r"x!", _factorial(x)), + (r"100!", _factorial(100)), + (r"\theta!", _factorial(theta)), + (r"(x + 1)!", _factorial(_Add(x, 1))), + (r"(x!)!", _factorial(_factorial(x))), + (r"x!!!", _factorial(_factorial(_factorial(x)))), + (r"5!7!", _Mul(_factorial(5), _factorial(7))) +] + +EVALUATED_FACTORIAL_EXPRESSION_PAIRS = [ + (r"x!", factorial(x)), + (r"100!", factorial(100)), + (r"\theta!", factorial(theta)), + (r"(x + 1)!", factorial(x + 1)), + (r"(x!)!", factorial(factorial(x))), + (r"x!!!", factorial(factorial(factorial(x)))), + (r"5!7!", factorial(5) * factorial(7)), + (r"24! \times 24!", factorial(24) * factorial(24)) +] + +UNEVALUATED_SUM_EXPRESSION_PAIRS = [ + (r"\sum_{k = 1}^{3} c", Sum(_Mul(1, c), (k, 1, 3))), + (r"\sum_{k = 1}^3 c", Sum(_Mul(1, c), (k, 1, 3))), + (r"\sum^{3}_{k = 1} c", Sum(_Mul(1, c), (k, 1, 3))), + (r"\sum^3_{k = 1} c", Sum(_Mul(1, c), (k, 1, 3))), + (r"\sum_{k = 1}^{10} k^2", Sum(_Mul(1, k ** 2), (k, 1, 10))), + (r"\sum_{n = 0}^{\infty} \frac{1}{n!}", + Sum(_Mul(1, _Mul(1, _Pow(_factorial(n), -1))), (n, 0, oo))) +] + +EVALUATED_SUM_EXPRESSION_PAIRS = [ + (r"\sum_{k = 1}^{3} c", Sum(c, (k, 1, 3))), + (r"\sum_{k = 1}^3 c", Sum(c, (k, 1, 3))), + (r"\sum^{3}_{k = 1} c", Sum(c, (k, 1, 3))), + (r"\sum^3_{k = 1} c", Sum(c, (k, 1, 3))), + (r"\sum_{k = 1}^{10} k^2", Sum(k ** 2, (k, 1, 10))), + (r"\sum_{n = 0}^{\infty} \frac{1}{n!}", Sum(1 / factorial(n), (n, 0, oo))) +] + +UNEVALUATED_PRODUCT_EXPRESSION_PAIRS = [ + (r"\prod_{a = b}^{c} x", Product(x, (a, b, c))), + (r"\prod_{a = b}^c x", Product(x, (a, b, c))), + (r"\prod^{c}_{a = b} x", Product(x, (a, b, c))), + (r"\prod^c_{a = b} x", Product(x, (a, b, c))) +] + +APPLIED_FUNCTION_EXPRESSION_PAIRS = [ + (r"f(x)", f(x)), + (r"f(x, y)", f(x, y)), + (r"f(x, y, z)", f(x, y, z)), + (r"f'_1(x)", Function("f_{1}'")(x)), + (r"f_{1}''(x+y)", Function("f_{1}''")(x + y)), + (r"h_{\theta}(x_0, x_1)", + Function('h_{theta}')(Symbol('x_{0}'), Symbol('x_{1}'))) +] + +UNEVALUATED_COMMON_FUNCTION_EXPRESSION_PAIRS = [ + (r"|x|", _Abs(x)), + (r"||x||", _Abs(Abs(x))), + (r"|x||y|", _Abs(x) * _Abs(y)), + (r"||x||y||", _Abs(_Abs(x) * _Abs(y))), + (r"\lfloor x \rfloor", floor(x)), + (r"\lceil x \rceil", ceiling(x)), + (r"\exp x", _exp(x)), + (r"\exp(x)", _exp(x)), + (r"\lg x", _log(x, 10)), + (r"\ln x", _log(x)), + (r"\ln xy", _log(x * y)), + (r"\log x", _log(x)), + (r"\log xy", _log(x * y)), + (r"\log_{2} x", _log(x, 2)), + (r"\log_{a} x", _log(x, a)), + (r"\log_{11} x", _log(x, 11)), + (r"\log_{a^2} x", _log(x, _Pow(a, 2))), + (r"\log_2 x", _log(x, 2)), + (r"\log_a x", _log(x, a)), + (r"\overline{z}", _Conjugate(z)), + (r"\overline{\overline{z}}", _Conjugate(_Conjugate(z))), + (r"\overline{x + y}", _Conjugate(_Add(x, y))), + (r"\overline{x} + \overline{y}", _Conjugate(x) + _Conjugate(y)), + (r"\min(a, b)", _Min(a, b)), + (r"\min(a, b, c - d, xy)", _Min(a, b, c - d, x * y)), + (r"\max(a, b)", _Max(a, b)), + (r"\max(a, b, c - d, xy)", _Max(a, b, c - d, x * y)), + # physics things don't have an `evaluate=False` variant + (r"\langle x |", Bra('x')), + (r"| x \rangle", Ket('x')), + (r"\langle x | y \rangle", InnerProduct(Bra('x'), Ket('y'))), +] + +EVALUATED_COMMON_FUNCTION_EXPRESSION_PAIRS = [ + (r"|x|", Abs(x)), + (r"||x||", Abs(Abs(x))), + (r"|x||y|", Abs(x) * Abs(y)), + (r"||x||y||", Abs(Abs(x) * Abs(y))), + (r"\lfloor x \rfloor", floor(x)), + (r"\lceil x \rceil", ceiling(x)), + (r"\exp x", exp(x)), + (r"\exp(x)", exp(x)), + (r"\lg x", log(x, 10)), + (r"\ln x", log(x)), + (r"\ln xy", log(x * y)), + (r"\log x", log(x)), + (r"\log xy", log(x * y)), + (r"\log_{2} x", log(x, 2)), + (r"\log_{a} x", log(x, a)), + (r"\log_{11} x", log(x, 11)), + (r"\log_{a^2} x", log(x, _Pow(a, 2))), + (r"\log_2 x", log(x, 2)), + (r"\log_a x", log(x, a)), + (r"\overline{z}", conjugate(z)), + (r"\overline{\overline{z}}", conjugate(conjugate(z))), + (r"\overline{x + y}", conjugate(x + y)), + (r"\overline{x} + \overline{y}", conjugate(x) + conjugate(y)), + (r"\min(a, b)", Min(a, b)), + (r"\min(a, b, c - d, xy)", Min(a, b, c - d, x * y)), + (r"\max(a, b)", Max(a, b)), + (r"\max(a, b, c - d, xy)", Max(a, b, c - d, x * y)), + (r"\langle x |", Bra('x')), + (r"| x \rangle", Ket('x')), + (r"\langle x | y \rangle", InnerProduct(Bra('x'), Ket('y'))), +] + +SPACING_RELATED_EXPRESSION_PAIRS = [ + (r"a \, b", _Mul(a, b)), + (r"a \thinspace b", _Mul(a, b)), + (r"a \: b", _Mul(a, b)), + (r"a \medspace b", _Mul(a, b)), + (r"a \; b", _Mul(a, b)), + (r"a \thickspace b", _Mul(a, b)), + (r"a \quad b", _Mul(a, b)), + (r"a \qquad b", _Mul(a, b)), + (r"a \! b", _Mul(a, b)), + (r"a \negthinspace b", _Mul(a, b)), + (r"a \negmedspace b", _Mul(a, b)), + (r"a \negthickspace b", _Mul(a, b)) +] + +UNEVALUATED_BINOMIAL_EXPRESSION_PAIRS = [ + (r"\binom{n}{k}", _binomial(n, k)), + (r"\tbinom{n}{k}", _binomial(n, k)), + (r"\dbinom{n}{k}", _binomial(n, k)), + (r"\binom{n}{0}", _binomial(n, 0)), + (r"x^\binom{n}{k}", _Pow(x, _binomial(n, k))) +] + +EVALUATED_BINOMIAL_EXPRESSION_PAIRS = [ + (r"\binom{n}{k}", binomial(n, k)), + (r"\tbinom{n}{k}", binomial(n, k)), + (r"\dbinom{n}{k}", binomial(n, k)), + (r"\binom{n}{0}", binomial(n, 0)), + (r"x^\binom{n}{k}", x ** binomial(n, k)) +] + +MISCELLANEOUS_EXPRESSION_PAIRS = [ + (r"\left(x + y\right) z", _Mul(_Add(x, y), z)), + (r"\left( x + y\right ) z", _Mul(_Add(x, y), z)), + (r"\left( x + y\right ) z", _Mul(_Add(x, y), z)), +] + +UNEVALUATED_LITERAL_COMPLEX_NUMBER_EXPRESSION_PAIRS = [ + (r"\imaginaryunit^2", _Pow(I, 2)), + (r"|\imaginaryunit|", _Abs(I)), + (r"\overline{\imaginaryunit}", _Conjugate(I)), + (r"\imaginaryunit+\imaginaryunit", _Add(I, I)), + (r"\imaginaryunit-\imaginaryunit", _Add(I, -I)), + (r"\imaginaryunit*\imaginaryunit", _Mul(I, I)), + (r"\imaginaryunit/\imaginaryunit", _Mul(I, _Pow(I, -1))), + (r"(1+\imaginaryunit)/|1+\imaginaryunit|", _Mul(_Add(1, I), _Pow(_Abs(_Add(1, I)), -1))) +] + +UNEVALUATED_MATRIX_EXPRESSION_PAIRS = [ + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}", + Matrix([[a, b], [x, y]])), + (r"\begin{pmatrix}a & b \\x & y\\\end{pmatrix}", + Matrix([[a, b], [x, y]])), + (r"\begin{bmatrix}a & b \\x & y\end{bmatrix}", + Matrix([[a, b], [x, y]])), + (r"\left(\begin{matrix}a & b \\x & y\end{matrix}\right)", + Matrix([[a, b], [x, y]])), + (r"\left[\begin{matrix}a & b \\x & y\end{matrix}\right]", + Matrix([[a, b], [x, y]])), + (r"\left[\begin{array}{cc}a & b \\x & y\end{array}\right]", + Matrix([[a, b], [x, y]])), + (r"\left(\begin{array}{cc}a & b \\x & y\end{array}\right)", + Matrix([[a, b], [x, y]])), + (r"\left( { \begin{array}{cc}a & b \\x & y\end{array} } \right)", + Matrix([[a, b], [x, y]])), + (r"+\begin{pmatrix}a & b \\x & y\end{pmatrix}", + Matrix([[a, b], [x, y]])), + ((r"\begin{pmatrix}x & y \\a & b\end{pmatrix}+" + r"\begin{pmatrix}a & b \\x & y\end{pmatrix}"), + _MatAdd(Matrix([[x, y], [a, b]]), Matrix([[a, b], [x, y]]))), + (r"-\begin{pmatrix}a & b \\x & y\end{pmatrix}", + _MatMul(-1, Matrix([[a, b], [x, y]]))), + ((r"\begin{pmatrix}x & y \\a & b\end{pmatrix}-" + r"\begin{pmatrix}a & b \\x & y\end{pmatrix}"), + _MatAdd(Matrix([[x, y], [a, b]]), _MatMul(-1, Matrix([[a, b], [x, y]])))), + ((r"\begin{pmatrix}a & b & c \\x & y & z \\a & b & c \end{pmatrix}*" + r"\begin{pmatrix}x & y & z \\a & b & c \\a & b & c \end{pmatrix}*" + r"\begin{pmatrix}a & b & c \\x & y & z \\x & y & z \end{pmatrix}"), + _MatMul(_MatMul(Matrix([[a, b, c], [x, y, z], [a, b, c]]), + Matrix([[x, y, z], [a, b, c], [a, b, c]])), + Matrix([[a, b, c], [x, y, z], [x, y, z]]))), + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}/2", + _MatMul(Matrix([[a, b], [x, y]]), _Pow(2, -1))), + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}^2", + _Pow(Matrix([[a, b], [x, y]]), 2)), + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}^{-1}", + _Pow(Matrix([[a, b], [x, y]]), -1)), + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}^T", + Transpose(Matrix([[a, b], [x, y]]))), + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}^{T}", + Transpose(Matrix([[a, b], [x, y]]))), + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}^\mathit{T}", + Transpose(Matrix([[a, b], [x, y]]))), + (r"\begin{pmatrix}1 & 2 \\3 & 4\end{pmatrix}^T", + Transpose(Matrix([[1, 2], [3, 4]]))), + ((r"(\begin{pmatrix}1 & 2 \\3 & 4\end{pmatrix}+" + r"\begin{pmatrix}1 & 2 \\3 & 4\end{pmatrix}^T)*" + r"\begin{bmatrix}1\\0\end{bmatrix}"), + _MatMul(_MatAdd(Matrix([[1, 2], [3, 4]]), + Transpose(Matrix([[1, 2], [3, 4]]))), + Matrix([[1], [0]]))), + ((r"(\begin{pmatrix}a & b \\x & y\end{pmatrix}+" + r"\begin{pmatrix}x & y \\a & b\end{pmatrix})^2"), + _Pow(_MatAdd(Matrix([[a, b], [x, y]]), + Matrix([[x, y], [a, b]])), 2)), + ((r"(\begin{pmatrix}a & b \\x & y\end{pmatrix}+" + r"\begin{pmatrix}x & y \\a & b\end{pmatrix})^T"), + Transpose(_MatAdd(Matrix([[a, b], [x, y]]), + Matrix([[x, y], [a, b]])))), + (r"\overline{\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}}", + _Conjugate(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))) +] + +EVALUATED_MATRIX_EXPRESSION_PAIRS = [ + (r"\det\left(\left[ { \begin{array}{cc}a&b\\x&y\end{array} } \right]\right)", + Matrix([[a, b], [x, y]]).det()), + (r"\det \begin{pmatrix}1&2\\3&4\end{pmatrix}", -2), + (r"\det{\begin{pmatrix}1&2\\3&4\end{pmatrix}}", -2), + (r"\det(\begin{pmatrix}1&2\\3&4\end{pmatrix})", -2), + (r"\det\left(\begin{pmatrix}1&2\\3&4\end{pmatrix}\right)", -2), + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}/\begin{vmatrix}a & b \\x & y\end{vmatrix}", + _MatMul(Matrix([[a, b], [x, y]]), _Pow(Matrix([[a, b], [x, y]]).det(), -1))), + (r"\begin{pmatrix}a & b \\x & y\end{pmatrix}/|\begin{matrix}a & b \\x & y\end{matrix}|", + _MatMul(Matrix([[a, b], [x, y]]), _Pow(Matrix([[a, b], [x, y]]).det(), -1))), + (r"\frac{\begin{pmatrix}a & b \\x & y\end{pmatrix}}{| { \begin{matrix}a & b \\x & y\end{matrix} } |}", + _MatMul(Matrix([[a, b], [x, y]]), _Pow(Matrix([[a, b], [x, y]]).det(), -1))), + (r"\overline{\begin{pmatrix}\imaginaryunit & 1+\imaginaryunit \\-\imaginaryunit & 4\end{pmatrix}}", + Matrix([[-I, 1-I], [I, 4]])), + (r"\begin{pmatrix}\imaginaryunit & 1+\imaginaryunit \\-\imaginaryunit & 4\end{pmatrix}^H", + Matrix([[-I, I], [1-I, 4]])), + (r"\trace(\begin{pmatrix}\imaginaryunit & 1+\imaginaryunit \\-\imaginaryunit & 4\end{pmatrix})", + Trace(Matrix([[I, 1+I], [-I, 4]]))), + (r"\adjugate(\begin{pmatrix}1 & 2 \\3 & 4\end{pmatrix})", + Matrix([[4, -2], [-3, 1]])), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^\ast", + Matrix([[-2*I, 6], [4, 8]])), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{\ast}", + Matrix([[-2*I, 6], [4, 8]])), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{\ast\ast}", + Matrix([[2*I, 4], [6, 8]])), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{\ast\ast\ast}", + Matrix([[-2*I, 6], [4, 8]])), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{*}", + Matrix([[-2*I, 6], [4, 8]])), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{**}", + Matrix([[2*I, 4], [6, 8]])), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{***}", + Matrix([[-2*I, 6], [4, 8]])), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^\prime", + Transpose(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{\prime}", + Transpose(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{\prime\prime}", + _MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]]))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{\prime\prime\prime}", + Transpose(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{'}", + Transpose(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{''}", + _MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]]))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^{'''}", + Transpose(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})'", + Transpose(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})''", + _MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]]))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})'''", + Transpose(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"\det(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})", + (_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]]))).det()), + (r"\trace(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})", + Trace(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"\adjugate(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})", + (Matrix([[8, -4], [-6, 2*I]]))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^T", + Transpose(_MatAdd(Matrix([[I, 2], [3, 4]]), + Matrix([[I, 2], [3, 4]])))), + (r"(\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix}+\begin{pmatrix}\imaginaryunit&2\\3&4\end{pmatrix})^H", + (Matrix([[-2*I, 6], [4, 8]]))) +] + + +def test_symbol_expressions(): + expected_failures = {6, 7} + for i, (latex_str, sympy_expr) in enumerate(SYMBOL_EXPRESSION_PAIRS): + if i in expected_failures: + continue + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_simple_expressions(): + expected_failures = {20} + for i, (latex_str, sympy_expr) in enumerate(UNEVALUATED_SIMPLE_EXPRESSION_PAIRS): + if i in expected_failures: + continue + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for i, (latex_str, sympy_expr) in enumerate(EVALUATED_SIMPLE_EXPRESSION_PAIRS): + if i in expected_failures: + continue + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_fraction_expressions(): + for latex_str, sympy_expr in UNEVALUATED_FRACTION_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for latex_str, sympy_expr in EVALUATED_FRACTION_EXPRESSION_PAIRS: + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_relation_expressions(): + for latex_str, sympy_expr in RELATION_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + +def test_power_expressions(): + expected_failures = {3} + for i, (latex_str, sympy_expr) in enumerate(UNEVALUATED_POWER_EXPRESSION_PAIRS): + if i in expected_failures: + continue + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for i, (latex_str, sympy_expr) in enumerate(EVALUATED_POWER_EXPRESSION_PAIRS): + if i in expected_failures: + continue + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_integral_expressions(): + expected_failures = {14} + for i, (latex_str, sympy_expr) in enumerate(UNEVALUATED_INTEGRAL_EXPRESSION_PAIRS): + if i in expected_failures: + continue + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, i + + for i, (latex_str, sympy_expr) in enumerate(EVALUATED_INTEGRAL_EXPRESSION_PAIRS): + if i in expected_failures: + continue + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_derivative_expressions(): + expected_failures = {3, 4} + for i, (latex_str, sympy_expr) in enumerate(DERIVATIVE_EXPRESSION_PAIRS): + if i in expected_failures: + continue + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for i, (latex_str, sympy_expr) in enumerate(DERIVATIVE_EXPRESSION_PAIRS): + if i in expected_failures: + continue + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_trigonometric_expressions(): + expected_failures = {3} + for i, (latex_str, sympy_expr) in enumerate(TRIGONOMETRIC_EXPRESSION_PAIRS): + if i in expected_failures: + continue + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_limit_expressions(): + for latex_str, sympy_expr in UNEVALUATED_LIMIT_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_square_root_expressions(): + for latex_str, sympy_expr in UNEVALUATED_SQRT_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for latex_str, sympy_expr in EVALUATED_SQRT_EXPRESSION_PAIRS: + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_factorial_expressions(): + for latex_str, sympy_expr in UNEVALUATED_FACTORIAL_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for latex_str, sympy_expr in EVALUATED_FACTORIAL_EXPRESSION_PAIRS: + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_sum_expressions(): + for latex_str, sympy_expr in UNEVALUATED_SUM_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for latex_str, sympy_expr in EVALUATED_SUM_EXPRESSION_PAIRS: + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_product_expressions(): + for latex_str, sympy_expr in UNEVALUATED_PRODUCT_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + +@XFAIL +def test_applied_function_expressions(): + expected_failures = {0, 3, 4} # 0 is ambiguous, and the others require not-yet-added features + # not sure why 1, and 2 are failing + for i, (latex_str, sympy_expr) in enumerate(APPLIED_FUNCTION_EXPRESSION_PAIRS): + if i in expected_failures: + continue + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_common_function_expressions(): + for latex_str, sympy_expr in UNEVALUATED_COMMON_FUNCTION_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for latex_str, sympy_expr in EVALUATED_COMMON_FUNCTION_EXPRESSION_PAIRS: + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +# unhandled bug causing these to fail +@XFAIL +def test_spacing(): + for latex_str, sympy_expr in SPACING_RELATED_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_binomial_expressions(): + for latex_str, sympy_expr in UNEVALUATED_BINOMIAL_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for latex_str, sympy_expr in EVALUATED_BINOMIAL_EXPRESSION_PAIRS: + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_miscellaneous_expressions(): + for latex_str, sympy_expr in MISCELLANEOUS_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_literal_complex_number_expressions(): + for latex_str, sympy_expr in UNEVALUATED_LITERAL_COMPLEX_NUMBER_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + +def test_matrix_expressions(): + for latex_str, sympy_expr in UNEVALUATED_MATRIX_EXPRESSION_PAIRS: + with evaluate(False): + assert parse_latex_lark(latex_str) == sympy_expr, latex_str + + for latex_str, sympy_expr in EVALUATED_MATRIX_EXPRESSION_PAIRS: + assert parse_latex_lark(latex_str) == sympy_expr, latex_str