| """Tests for algorithms for partial fraction decomposition of rational |
| functions. """ |
|
|
| from sympy.polys.partfrac import ( |
| apart_undetermined_coeffs, |
| apart, |
| apart_list, assemble_partfrac_list |
| ) |
|
|
| from sympy.core.expr import Expr |
| from sympy.core.function import Lambda |
| from sympy.core.numbers import (E, I, Rational, pi, all_close) |
| from sympy.core.relational import Eq |
| from sympy.core.singleton import S |
| from sympy.core.symbol import (Dummy, Symbol) |
| from sympy.functions.elementary.miscellaneous import sqrt |
| from sympy.matrices.dense import Matrix |
| from sympy.polys.polytools import (Poly, factor) |
| from sympy.polys.rationaltools import together |
| from sympy.polys.rootoftools import RootSum |
| from sympy.testing.pytest import raises, XFAIL |
| from sympy.abc import x, y, a, b, c |
|
|
|
|
| def test_apart(): |
| assert apart(1) == 1 |
| assert apart(1, x) == 1 |
|
|
| f, g = (x**2 + 1)/(x + 1), 2/(x + 1) + x - 1 |
|
|
| assert apart(f, full=False) == g |
| assert apart(f, full=True) == g |
|
|
| f, g = 1/(x + 2)/(x + 1), 1/(1 + x) - 1/(2 + x) |
|
|
| assert apart(f, full=False) == g |
| assert apart(f, full=True) == g |
|
|
| f, g = 1/(x + 1)/(x + 5), -1/(5 + x)/4 + 1/(1 + x)/4 |
|
|
| assert apart(f, full=False) == g |
| assert apart(f, full=True) == g |
|
|
| assert apart((E*x + 2)/(x - pi)*(x - 1), x) == \ |
| 2 - E + E*pi + E*x + (E*pi + 2)*(pi - 1)/(x - pi) |
|
|
| assert apart(Eq((x**2 + 1)/(x + 1), x), x) == Eq(x - 1 + 2/(x + 1), x) |
|
|
| assert apart(x/2, y) == x/2 |
|
|
| f, g = (x+y)/(2*x - y), Rational(3, 2)*y/(2*x - y) + S.Half |
|
|
| assert apart(f, x, full=False) == g |
| assert apart(f, x, full=True) == g |
|
|
| f, g = (x+y)/(2*x - y), 3*x/(2*x - y) - 1 |
|
|
| assert apart(f, y, full=False) == g |
| assert apart(f, y, full=True) == g |
|
|
| raises(NotImplementedError, lambda: apart(1/(x + 1)/(y + 2))) |
|
|
|
|
| def test_apart_matrix(): |
| M = Matrix(2, 2, lambda i, j: 1/(x + i + 1)/(x + j)) |
|
|
| assert apart(M) == Matrix([ |
| [1/x - 1/(x + 1), (x + 1)**(-2)], |
| [1/(2*x) - (S.Half)/(x + 2), 1/(x + 1) - 1/(x + 2)], |
| ]) |
|
|
|
|
| def test_apart_symbolic(): |
| f = a*x**4 + (2*b + 2*a*c)*x**3 + (4*b*c - a**2 + a*c**2)*x**2 + \ |
| (-2*a*b + 2*b*c**2)*x - b**2 |
| g = a**2*x**4 + (2*a*b + 2*c*a**2)*x**3 + (4*a*b*c + b**2 + |
| a**2*c**2)*x**2 + (2*c*b**2 + 2*a*b*c**2)*x + b**2*c**2 |
|
|
| assert apart(f/g, x) == 1/a - 1/(x + c)**2 - b**2/(a*(a*x + b)**2) |
|
|
| assert apart(1/((x + a)*(x + b)*(x + c)), x) == \ |
| 1/((a - c)*(b - c)*(c + x)) - 1/((a - b)*(b - c)*(b + x)) + \ |
| 1/((a - b)*(a - c)*(a + x)) |
|
|
|
|
| def _make_extension_example(): |
| |
| from sympy.core import Mul |
| def mul2(expr): |
| |
| return Mul(2, expr, evaluate=False) |
|
|
| f = ((x**2 + 1)**3/((x - 1)**2*(x + 1)**2*(-x**2 + 2*x + 1)*(x**2 + 2*x - 1))) |
| g = (1/mul2(x - sqrt(2) + 1) |
| - 1/mul2(x - sqrt(2) - 1) |
| + 1/mul2(x + 1 + sqrt(2)) |
| - 1/mul2(x - 1 + sqrt(2)) |
| + 1/mul2((x + 1)**2) |
| + 1/mul2((x - 1)**2)) |
| return f, g |
|
|
|
|
| def test_apart_extension(): |
| f = 2/(x**2 + 1) |
| g = I/(x + I) - I/(x - I) |
|
|
| assert apart(f, extension=I) == g |
| assert apart(f, gaussian=True) == g |
|
|
| f = x/((x - 2)*(x + I)) |
|
|
| assert factor(together(apart(f)).expand()) == f |
|
|
| f, g = _make_extension_example() |
|
|
| |
| from sympy.matrices import dotprodsimp |
| with dotprodsimp(True): |
| assert apart(f, x, extension={sqrt(2)}) == g |
|
|
|
|
| def test_apart_extension_xfail(): |
| f, g = _make_extension_example() |
| assert apart(f, x, extension={sqrt(2)}) == g |
|
|
|
|
| def test_apart_full(): |
| f = 1/(x**2 + 1) |
|
|
| assert apart(f, full=False) == f |
| assert apart(f, full=True).dummy_eq( |
| -RootSum(x**2 + 1, Lambda(a, a/(x - a)), auto=False)/2) |
|
|
| f = 1/(x**3 + x + 1) |
|
|
| assert apart(f, full=False) == f |
| assert apart(f, full=True).dummy_eq( |
| RootSum(x**3 + x + 1, |
| Lambda(a, (a**2*Rational(6, 31) - a*Rational(9, 31) + Rational(4, 31))/(x - a)), auto=False)) |
|
|
| f = 1/(x**5 + 1) |
|
|
| assert apart(f, full=False) == \ |
| (Rational(-1, 5))*((x**3 - 2*x**2 + 3*x - 4)/(x**4 - x**3 + x**2 - |
| x + 1)) + (Rational(1, 5))/(x + 1) |
| assert apart(f, full=True).dummy_eq( |
| -RootSum(x**4 - x**3 + x**2 - x + 1, |
| Lambda(a, a/(x - a)), auto=False)/5 + (Rational(1, 5))/(x + 1)) |
|
|
|
|
| def test_apart_full_floats(): |
| |
| f = ( |
| 6.43369157032015e-9*x**3 + 1.35203404799555e-5*x**2 |
| + 0.00357538393743079*x + 0.085 |
| )/( |
| 4.74334912634438e-11*x**4 + 4.09576274286244e-6*x**3 |
| + 0.00334241812250921*x**2 + 0.15406018058983*x + 1.0 |
| ) |
|
|
| expected = ( |
| 133.599202650992/(x + 85524.0054884464) |
| + 1.07757928431867/(x + 774.88576677949) |
| + 0.395006955518971/(x + 40.7977016133126) |
| + 0.564264854137341/(x + 7.79746609204661) |
| ) |
|
|
| f_apart = apart(f, full=True).evalf() |
|
|
| |
| assert all_close(f_apart, expected, rtol=1e-3, atol=1e-5) |
|
|
|
|
| def test_apart_undetermined_coeffs(): |
| p = Poly(2*x - 3) |
| q = Poly(x**9 - x**8 - x**6 + x**5 - 2*x**2 + 3*x - 1) |
| r = (-x**7 - x**6 - x**5 + 4)/(x**8 - x**5 - 2*x + 1) + 1/(x - 1) |
|
|
| assert apart_undetermined_coeffs(p, q) == r |
|
|
| p = Poly(1, x, domain='ZZ[a,b]') |
| q = Poly((x + a)*(x + b), x, domain='ZZ[a,b]') |
| r = 1/((a - b)*(b + x)) - 1/((a - b)*(a + x)) |
|
|
| assert apart_undetermined_coeffs(p, q) == r |
|
|
|
|
| def test_apart_list(): |
| from sympy.utilities.iterables import numbered_symbols |
| def dummy_eq(i, j): |
| if type(i) in (list, tuple): |
| return all(dummy_eq(i, j) for i, j in zip(i, j)) |
| return i == j or i.dummy_eq(j) |
|
|
| w0, w1, w2 = Symbol("w0"), Symbol("w1"), Symbol("w2") |
| _a = Dummy("a") |
|
|
| f = (-2*x - 2*x**2) / (3*x**2 - 6*x) |
| got = apart_list(f, x, dummies=numbered_symbols("w")) |
| ans = (-1, Poly(Rational(2, 3), x, domain='QQ'), |
| [(Poly(w0 - 2, w0, domain='ZZ'), Lambda(_a, 2), Lambda(_a, -_a + x), 1)]) |
| assert dummy_eq(got, ans) |
|
|
| got = apart_list(2/(x**2-2), x, dummies=numbered_symbols("w")) |
| ans = (1, Poly(0, x, domain='ZZ'), [(Poly(w0**2 - 2, w0, domain='ZZ'), |
| Lambda(_a, _a/2), |
| Lambda(_a, -_a + x), 1)]) |
| assert dummy_eq(got, ans) |
|
|
| f = 36 / (x**5 - 2*x**4 - 2*x**3 + 4*x**2 + x - 2) |
| got = apart_list(f, x, dummies=numbered_symbols("w")) |
| ans = (1, Poly(0, x, domain='ZZ'), |
| [(Poly(w0 - 2, w0, domain='ZZ'), Lambda(_a, 4), Lambda(_a, -_a + x), 1), |
| (Poly(w1**2 - 1, w1, domain='ZZ'), Lambda(_a, -3*_a - 6), Lambda(_a, -_a + x), 2), |
| (Poly(w2 + 1, w2, domain='ZZ'), Lambda(_a, -4), Lambda(_a, -_a + x), 1)]) |
| assert dummy_eq(got, ans) |
|
|
|
|
| def test_assemble_partfrac_list(): |
| f = 36 / (x**5 - 2*x**4 - 2*x**3 + 4*x**2 + x - 2) |
| pfd = apart_list(f) |
| assert assemble_partfrac_list(pfd) == -4/(x + 1) - 3/(x + 1)**2 - 9/(x - 1)**2 + 4/(x - 2) |
|
|
| a = Dummy("a") |
| pfd = (1, Poly(0, x, domain='ZZ'), [([sqrt(2),-sqrt(2)], Lambda(a, a/2), Lambda(a, -a + x), 1)]) |
| assert assemble_partfrac_list(pfd) == -1/(sqrt(2)*(x + sqrt(2))) + 1/(sqrt(2)*(x - sqrt(2))) |
|
|
|
|
| @XFAIL |
| def test_noncommutative_pseudomultivariate(): |
| |
| class foo(Expr): |
| is_commutative=False |
| e = x/(x + x*y) |
| c = 1/(1 + y) |
| assert apart(e + foo(e)) == c + foo(c) |
| assert apart(e*foo(e)) == c*foo(c) |
|
|
| def test_noncommutative(): |
| class foo(Expr): |
| is_commutative=False |
| e = x/(x + x*y) |
| c = 1/(1 + y) |
| assert apart(e + foo()) == c + foo() |
|
|
| def test_issue_5798(): |
| assert apart( |
| 2*x/(x**2 + 1) - (x - 1)/(2*(x**2 + 1)) + 1/(2*(x + 1)) - 2/x) == \ |
| (3*x + 1)/(x**2 + 1)/2 + 1/(x + 1)/2 - 2/x |
|
|
