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from sympy.integrals.transforms import ( |
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mellin_transform, inverse_mellin_transform, |
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fourier_transform, inverse_fourier_transform, |
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sine_transform, inverse_sine_transform, |
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cosine_transform, inverse_cosine_transform, |
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hankel_transform, inverse_hankel_transform, |
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FourierTransform, SineTransform, CosineTransform, InverseFourierTransform, |
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InverseSineTransform, InverseCosineTransform, IntegralTransformError) |
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from sympy.integrals.laplace import ( |
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laplace_transform, inverse_laplace_transform) |
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from sympy.core.function import Function, expand_mul |
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from sympy.core import EulerGamma |
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from sympy.core.numbers import I, Rational, oo, pi |
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from sympy.core.singleton import S |
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from sympy.core.symbol import Symbol, symbols |
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from sympy.functions.combinatorial.factorials import factorial |
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from sympy.functions.elementary.complexes import re, unpolarify |
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from sympy.functions.elementary.exponential import exp, exp_polar, log |
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from sympy.functions.elementary.miscellaneous import sqrt |
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from sympy.functions.elementary.trigonometric import atan, cos, sin, tan |
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from sympy.functions.special.bessel import besseli, besselj, besselk, bessely |
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from sympy.functions.special.delta_functions import Heaviside |
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from sympy.functions.special.error_functions import erf, expint |
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from sympy.functions.special.gamma_functions import gamma |
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from sympy.functions.special.hyper import meijerg |
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from sympy.simplify.gammasimp import gammasimp |
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from sympy.simplify.hyperexpand import hyperexpand |
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from sympy.simplify.trigsimp import trigsimp |
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from sympy.testing.pytest import XFAIL, slow, skip, raises |
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from sympy.abc import x, s, a, b, c, d |
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nu, beta, rho = symbols('nu beta rho') |
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def test_undefined_function(): |
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from sympy.integrals.transforms import MellinTransform |
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f = Function('f') |
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assert mellin_transform(f(x), x, s) == MellinTransform(f(x), x, s) |
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assert mellin_transform(f(x) + exp(-x), x, s) == \ |
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(MellinTransform(f(x), x, s) + gamma(s + 1)/s, (0, oo), True) |
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def test_free_symbols(): |
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f = Function('f') |
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assert mellin_transform(f(x), x, s).free_symbols == {s} |
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assert mellin_transform(f(x)*a, x, s).free_symbols == {s, a} |
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def test_as_integral(): |
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from sympy.integrals.integrals import Integral |
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f = Function('f') |
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assert mellin_transform(f(x), x, s).rewrite('Integral') == \ |
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Integral(x**(s - 1)*f(x), (x, 0, oo)) |
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assert fourier_transform(f(x), x, s).rewrite('Integral') == \ |
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Integral(f(x)*exp(-2*I*pi*s*x), (x, -oo, oo)) |
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assert laplace_transform(f(x), x, s, noconds=True).rewrite('Integral') == \ |
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Integral(f(x)*exp(-s*x), (x, 0, oo)) |
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assert str(2*pi*I*inverse_mellin_transform(f(s), s, x, (a, b)).rewrite('Integral')) \ |
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== "Integral(f(s)/x**s, (s, _c - oo*I, _c + oo*I))" |
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assert str(2*pi*I*inverse_laplace_transform(f(s), s, x).rewrite('Integral')) == \ |
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"Integral(f(s)*exp(s*x), (s, _c - oo*I, _c + oo*I))" |
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assert inverse_fourier_transform(f(s), s, x).rewrite('Integral') == \ |
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Integral(f(s)*exp(2*I*pi*s*x), (s, -oo, oo)) |
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@slow |
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@XFAIL |
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def test_mellin_transform_fail(): |
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skip("Risch takes forever.") |
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MT = mellin_transform |
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bpos = symbols('b', positive=True) |
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expr = (sqrt(x + b**2) + b)**a/sqrt(x + b**2) |
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assert MT(expr.subs(b, -bpos), x, s) == \ |
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((-1)**(a + 1)*2**(a + 2*s)*bpos**(a + 2*s - 1)*gamma(a + s) |
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*gamma(1 - a - 2*s)/gamma(1 - s), |
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(-re(a), -re(a)/2 + S.Half), True) |
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expr = (sqrt(x + b**2) + b)**a |
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assert MT(expr.subs(b, -bpos), x, s) == \ |
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( |
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2**(a + 2*s)*a*bpos**(a + 2*s)*gamma(-a - 2* |
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s)*gamma(a + s)/gamma(-s + 1), |
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(-re(a), -re(a)/2), True) |
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assert MT(expr.subs({b: -bpos, a: 1}), x, s) == \ |
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(-bpos**(2*s + 1)*gamma(s)*gamma(-s - S.Half)/(2*sqrt(pi)), |
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(-1, Rational(-1, 2)), True) |
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def test_mellin_transform(): |
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from sympy.functions.elementary.miscellaneous import (Max, Min) |
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MT = mellin_transform |
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bpos = symbols('b', positive=True) |
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assert MT(x**nu*Heaviside(x - 1), x, s) == \ |
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(-1/(nu + s), (-oo, -re(nu)), True) |
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assert MT(x**nu*Heaviside(1 - x), x, s) == \ |
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(1/(nu + s), (-re(nu), oo), True) |
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assert MT((1 - x)**(beta - 1)*Heaviside(1 - x), x, s) == \ |
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(gamma(beta)*gamma(s)/gamma(beta + s), (0, oo), re(beta) > 0) |
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assert MT((x - 1)**(beta - 1)*Heaviside(x - 1), x, s) == \ |
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(gamma(beta)*gamma(1 - beta - s)/gamma(1 - s), |
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(-oo, 1 - re(beta)), re(beta) > 0) |
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assert MT((1 + x)**(-rho), x, s) == \ |
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(gamma(s)*gamma(rho - s)/gamma(rho), (0, re(rho)), True) |
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assert MT(abs(1 - x)**(-rho), x, s) == ( |
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2*sin(pi*rho/2)*gamma(1 - rho)* |
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cos(pi*(s - rho/2))*gamma(s)*gamma(rho-s)/pi, |
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(0, re(rho)), re(rho) < 1) |
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mt = MT((1 - x)**(beta - 1)*Heaviside(1 - x) |
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+ a*(x - 1)**(beta - 1)*Heaviside(x - 1), x, s) |
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assert mt[1], mt[2] == ((0, -re(beta) + 1), re(beta) > 0) |
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assert MT((x**a - b**a)/(x - b), x, s)[0] == \ |
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pi*b**(a + s - 1)*sin(pi*a)/(sin(pi*s)*sin(pi*(a + s))) |
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assert MT((x**a - bpos**a)/(x - bpos), x, s) == \ |
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(pi*bpos**(a + s - 1)*sin(pi*a)/(sin(pi*s)*sin(pi*(a + s))), |
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(Max(0, -re(a)), Min(1, 1 - re(a))), True) |
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expr = (sqrt(x + b**2) + b)**a |
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assert MT(expr.subs(b, bpos), x, s) == \ |
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(-a*(2*bpos)**(a + 2*s)*gamma(s)*gamma(-a - 2*s)/gamma(-a - s + 1), |
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(0, -re(a)/2), True) |
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expr = (sqrt(x + b**2) + b)**a/sqrt(x + b**2) |
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assert MT(expr.subs(b, bpos), x, s) == \ |
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(2**(a + 2*s)*bpos**(a + 2*s - 1)*gamma(s) |
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*gamma(1 - a - 2*s)/gamma(1 - a - s), |
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(0, -re(a)/2 + S.Half), True) |
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assert MT(exp(-x), x, s) == (gamma(s), (0, oo), True) |
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assert MT(exp(-1/x), x, s) == (gamma(-s), (-oo, 0), True) |
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assert MT(log(x)**4*Heaviside(1 - x), x, s) == (24/s**5, (0, oo), True) |
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assert MT(log(x)**3*Heaviside(x - 1), x, s) == (6/s**4, (-oo, 0), True) |
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assert MT(log(x + 1), x, s) == (pi/(s*sin(pi*s)), (-1, 0), True) |
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assert MT(log(1/x + 1), x, s) == (pi/(s*sin(pi*s)), (0, 1), True) |
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assert MT(log(abs(1 - x)), x, s) == (pi/(s*tan(pi*s)), (-1, 0), True) |
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assert MT(log(abs(1 - 1/x)), x, s) == (pi/(s*tan(pi*s)), (0, 1), True) |
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assert MT(erf(sqrt(x)), x, s) == \ |
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(-gamma(s + S.Half)/(sqrt(pi)*s), (Rational(-1, 2), 0), True) |
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def test_mellin_transform2(): |
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MT = mellin_transform |
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mt = MT(log(x)/(x + 1), x, s) |
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assert mt[1:] == ((0, 1), True) |
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assert not hyperexpand(mt[0], allow_hyper=True).has(meijerg) |
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mt = MT(log(x)**2/(x + 1), x, s) |
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assert mt[1:] == ((0, 1), True) |
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assert not hyperexpand(mt[0], allow_hyper=True).has(meijerg) |
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mt = MT(log(x)/(x + 1)**2, x, s) |
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assert mt[1:] == ((0, 2), True) |
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assert not hyperexpand(mt[0], allow_hyper=True).has(meijerg) |
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@slow |
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def test_mellin_transform_bessel(): |
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from sympy.functions.elementary.miscellaneous import Max |
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MT = mellin_transform |
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assert MT(besselj(a, 2*sqrt(x)), x, s) == \ |
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(gamma(a/2 + s)/gamma(a/2 - s + 1), (-re(a)/2, Rational(3, 4)), True) |
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assert MT(sin(sqrt(x))*besselj(a, sqrt(x)), x, s) == \ |
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(2**a*gamma(-2*s + S.Half)*gamma(a/2 + s + S.Half)/( |
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gamma(-a/2 - s + 1)*gamma(a - 2*s + 1)), ( |
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-re(a)/2 - S.Half, Rational(1, 4)), True) |
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assert MT(cos(sqrt(x))*besselj(a, sqrt(x)), x, s) == \ |
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(2**a*gamma(a/2 + s)*gamma(-2*s + S.Half)/( |
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gamma(-a/2 - s + S.Half)*gamma(a - 2*s + 1)), ( |
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-re(a)/2, Rational(1, 4)), True) |
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assert MT(besselj(a, sqrt(x))**2, x, s) == \ |
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(gamma(a + s)*gamma(S.Half - s) |
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/ (sqrt(pi)*gamma(1 - s)*gamma(1 + a - s)), |
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(-re(a), S.Half), True) |
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assert MT(besselj(a, sqrt(x))*besselj(-a, sqrt(x)), x, s) == \ |
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(gamma(s)*gamma(S.Half - s) |
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/ (sqrt(pi)*gamma(1 - a - s)*gamma(1 + a - s)), |
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(0, S.Half), True) |
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assert MT(besselj(a - 1, sqrt(x))*besselj(a, sqrt(x)), x, s) == \ |
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(gamma(1 - s)*gamma(a + s - S.Half) |
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/ (sqrt(pi)*gamma(Rational(3, 2) - s)*gamma(a - s + S.Half)), |
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(S.Half - re(a), S.Half), True) |
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assert MT(besselj(a, sqrt(x))*besselj(b, sqrt(x)), x, s) == \ |
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(4**s*gamma(1 - 2*s)*gamma((a + b)/2 + s) |
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/ (gamma(1 - s + (b - a)/2)*gamma(1 - s + (a - b)/2) |
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*gamma( 1 - s + (a + b)/2)), |
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(-(re(a) + re(b))/2, S.Half), True) |
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assert MT(besselj(a, sqrt(x))**2 + besselj(-a, sqrt(x))**2, x, s)[1:] == \ |
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((Max(re(a), -re(a)), S.Half), True) |
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assert MT(bessely(a, 2*sqrt(x)), x, s) == \ |
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(-cos(pi*(a/2 - s))*gamma(s - a/2)*gamma(s + a/2)/pi, |
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(Max(-re(a)/2, re(a)/2), Rational(3, 4)), True) |
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assert MT(sin(sqrt(x))*bessely(a, sqrt(x)), x, s) == \ |
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(-4**s*sin(pi*(a/2 - s))*gamma(S.Half - 2*s) |
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* gamma((1 - a)/2 + s)*gamma((1 + a)/2 + s) |
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/ (sqrt(pi)*gamma(1 - s - a/2)*gamma(1 - s + a/2)), |
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(Max(-(re(a) + 1)/2, (re(a) - 1)/2), Rational(1, 4)), True) |
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assert MT(cos(sqrt(x))*bessely(a, sqrt(x)), x, s) == \ |
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(-4**s*cos(pi*(a/2 - s))*gamma(s - a/2)*gamma(s + a/2)*gamma(S.Half - 2*s) |
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/ (sqrt(pi)*gamma(S.Half - s - a/2)*gamma(S.Half - s + a/2)), |
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(Max(-re(a)/2, re(a)/2), Rational(1, 4)), True) |
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assert MT(besselj(a, sqrt(x))*bessely(a, sqrt(x)), x, s) == \ |
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(-cos(pi*s)*gamma(s)*gamma(a + s)*gamma(S.Half - s) |
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/ (pi**S('3/2')*gamma(1 + a - s)), |
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(Max(-re(a), 0), S.Half), True) |
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assert MT(besselj(a, sqrt(x))*bessely(b, sqrt(x)), x, s) == \ |
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(-4**s*cos(pi*(a/2 - b/2 + s))*gamma(1 - 2*s) |
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* gamma(a/2 - b/2 + s)*gamma(a/2 + b/2 + s) |
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/ (pi*gamma(a/2 - b/2 - s + 1)*gamma(a/2 + b/2 - s + 1)), |
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(Max((-re(a) + re(b))/2, (-re(a) - re(b))/2), S.Half), True) |
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assert MT(bessely(a, sqrt(x))**2, x, s)[1:] == \ |
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((Max(-re(a), 0, re(a)), S.Half), True) |
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assert MT(besselk(a, 2*sqrt(x)), x, s) == \ |
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(gamma( |
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s - a/2)*gamma(s + a/2)/2, (Max(-re(a)/2, re(a)/2), oo), True) |
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assert MT(besselj(a, 2*sqrt(2*sqrt(x)))*besselk( |
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a, 2*sqrt(2*sqrt(x))), x, s) == (4**(-s)*gamma(2*s)* |
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gamma(a/2 + s)/(2*gamma(a/2 - s + 1)), (Max(0, -re(a)/2), oo), True) |
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assert MT(besseli(a, sqrt(x))*besselk(a, sqrt(x)), x, s) == \ |
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(gamma(s)*gamma( |
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a + s)*gamma(-s + S.Half)/(2*sqrt(pi)*gamma(a - s + 1)), |
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(Max(-re(a), 0), S.Half), True) |
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assert MT(besseli(b, sqrt(x))*besselk(a, sqrt(x)), x, s) == \ |
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(2**(2*s - 1)*gamma(-2*s + 1)*gamma(-a/2 + b/2 + s)* \ |
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gamma(a/2 + b/2 + s)/(gamma(-a/2 + b/2 - s + 1)* \ |
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gamma(a/2 + b/2 - s + 1)), (Max(-re(a)/2 - re(b)/2, \ |
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re(a)/2 - re(b)/2), S.Half), True) |
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mt = MT(exp(-x/2)*besselk(a, x/2), x, s) |
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mt0 = gammasimp(trigsimp(gammasimp(mt[0].expand(func=True)))) |
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assert mt0 == 2*pi**Rational(3, 2)*cos(pi*s)*gamma(S.Half - s)/( |
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(cos(2*pi*a) - cos(2*pi*s))*gamma(-a - s + 1)*gamma(a - s + 1)) |
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assert mt[1:] == ((Max(-re(a), re(a)), oo), True) |
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@slow |
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def test_expint(): |
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from sympy.functions.elementary.miscellaneous import Max |
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from sympy.functions.special.error_functions import Ci, E1, Si |
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from sympy.simplify.simplify import simplify |
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aneg = Symbol('a', negative=True) |
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u = Symbol('u', polar=True) |
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assert mellin_transform(E1(x), x, s) == (gamma(s)/s, (0, oo), True) |
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assert inverse_mellin_transform(gamma(s)/s, s, x, |
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(0, oo)).rewrite(expint).expand() == E1(x) |
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assert mellin_transform(expint(a, x), x, s) == \ |
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(gamma(s)/(a + s - 1), (Max(1 - re(a), 0), oo), True) |
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assert simplify(unpolarify( |
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inverse_mellin_transform(gamma(s)/(aneg + s - 1), s, x, |
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(1 - aneg, oo)).rewrite(expint).expand(func=True))) == \ |
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expint(aneg, x) |
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assert mellin_transform(Si(x), x, s) == \ |
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(-2**s*sqrt(pi)*gamma(s/2 + S.Half)/( |
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2*s*gamma(-s/2 + 1)), (-1, 0), True) |
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assert inverse_mellin_transform(-2**s*sqrt(pi)*gamma((s + 1)/2) |
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/(2*s*gamma(-s/2 + 1)), s, x, (-1, 0)) \ |
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== Si(x) |
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assert mellin_transform(Ci(sqrt(x)), x, s) == \ |
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(-2**(2*s - 1)*sqrt(pi)*gamma(s)/(s*gamma(-s + S.Half)), (0, 1), True) |
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assert inverse_mellin_transform( |
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-4**s*sqrt(pi)*gamma(s)/(2*s*gamma(-s + S.Half)), |
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s, u, (0, 1)).expand() == Ci(sqrt(u)) |
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@slow |
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def test_inverse_mellin_transform(): |
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from sympy.core.function import expand |
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from sympy.functions.elementary.miscellaneous import (Max, Min) |
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from sympy.functions.elementary.trigonometric import cot |
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from sympy.simplify.powsimp import powsimp |
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from sympy.simplify.simplify import simplify |
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IMT = inverse_mellin_transform |
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assert IMT(gamma(s), s, x, (0, oo)) == exp(-x) |
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assert IMT(gamma(-s), s, x, (-oo, 0)) == exp(-1/x) |
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assert simplify(IMT(s/(2*s**2 - 2), s, x, (2, oo))) == \ |
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(x**2 + 1)*Heaviside(1 - x)/(4*x) |
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assert IMT(1/(s**2 - 1), s, x, (-1, None)) == \ |
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-x*Heaviside(-x + 1)/2 - Heaviside(x - 1)/(2*x) |
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assert IMT(1/(s**2 - 1), s, x, (None, 1)) == \ |
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-x*Heaviside(-x + 1)/2 - Heaviside(x - 1)/(2*x) |
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assert IMT(gamma(s) + gamma(s - 1), s, x, (1, oo)) == (x + 1)*exp(-x)/x |
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r = symbols('r', real=True) |
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assert IMT(1/(s**2 + 1), s, exp(-x), (None, oo) |
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).subs(x, r).rewrite(sin).simplify() \ |
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== sin(r)*Heaviside(1 - exp(-r)) |
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_a, _b = symbols('a b', positive=True) |
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assert IMT(_b**(-s/_a)*factorial(s/_a)/s, s, x, (0, oo)) == exp(-_b*x**_a) |
|
|
assert IMT(factorial(_a/_b + s/_b)/(_a + s), s, x, (-_a, oo)) == x**_a*exp(-x**_b) |
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|
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def simp_pows(expr): |
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return simplify(powsimp(expand_mul(expr, deep=False), force=True)).replace(exp_polar, exp) |
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nu = symbols('nu', real=True) |
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assert IMT(-1/(nu + s), s, x, (-oo, None)) == x**nu*Heaviside(x - 1) |
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|
assert IMT(1/(nu + s), s, x, (None, oo)) == x**nu*Heaviside(1 - x) |
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|
assert simp_pows(IMT(gamma(beta)*gamma(s)/gamma(s + beta), s, x, (0, oo))) \ |
|
|
== (1 - x)**(beta - 1)*Heaviside(1 - x) |
|
|
assert simp_pows(IMT(gamma(beta)*gamma(1 - beta - s)/gamma(1 - s), |
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|
s, x, (-oo, None))) \ |
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== (x - 1)**(beta - 1)*Heaviside(x - 1) |
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assert simp_pows(IMT(gamma(s)*gamma(rho - s)/gamma(rho), s, x, (0, None))) \ |
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|
== (1/(x + 1))**rho |
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expr = IMT(d**c*d**(s - 1)*sin(pi*c) |
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|
*gamma(s)*gamma(s + c)*gamma(1 - s)*gamma(1 - s - c)/pi, |
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|
s, x, (Max(-re(c), 0), Min(1 - re(c), 1))) |
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assert powsimp(expand_mul(expr, deep=False)).replace(exp_polar, exp).simplify() \ |
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== (-d**c + x**c)/(-d + x) |
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assert simplify(IMT(1/sqrt(pi)*(-c/2)*gamma(s)*gamma((1 - c)/2 - s) |
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*gamma(-c/2 - s)/gamma(1 - c - s), |
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s, x, (0, -re(c)/2))) == \ |
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(1 + sqrt(x + 1))**c |
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assert simplify(IMT(2**(a + 2*s)*b**(a + 2*s - 1)*gamma(s)*gamma(1 - a - 2*s) |
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|
/gamma(1 - a - s), s, x, (0, (-re(a) + 1)/2))) == \ |
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b**(a - 1)*(b**2*(sqrt(1 + x/b**2) + 1)**a + x*(sqrt(1 + x/b**2) + 1 |
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|
)**(a - 1))/(b**2 + x) |
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assert simplify(IMT(-2**(c + 2*s)*c*b**(c + 2*s)*gamma(s)*gamma(-c - 2*s) |
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/ gamma(-c - s + 1), s, x, (0, -re(c)/2))) == \ |
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b**c*(sqrt(1 + x/b**2) + 1)**c |
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assert IMT(24/s**5, s, x, (0, oo)) == log(x)**4*Heaviside(1 - x) |
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assert expand(IMT(6/s**4, s, x, (-oo, 0)), force=True) == \ |
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log(x)**3*Heaviside(x - 1) |
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assert IMT(pi/(s*sin(pi*s)), s, x, (-1, 0)) == log(x + 1) |
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assert IMT(pi/(s*sin(pi*s/2)), s, x, (-2, 0)) == log(x**2 + 1) |
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assert IMT(pi/(s*sin(2*pi*s)), s, x, (Rational(-1, 2), 0)) == log(sqrt(x) + 1) |
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assert IMT(pi/(s*sin(pi*s)), s, x, (0, 1)) == log(1 + 1/x) |
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def mysimp(expr): |
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from sympy.core.function import expand |
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from sympy.simplify.powsimp import powsimp |
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|
from sympy.simplify.simplify import logcombine |
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|
return expand( |
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|
powsimp(logcombine(expr, force=True), force=True, deep=True), |
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|
force=True).replace(exp_polar, exp) |
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assert mysimp(mysimp(IMT(pi/(s*tan(pi*s)), s, x, (-1, 0)))) in [ |
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|
log(1 - x)*Heaviside(1 - x) + log(x - 1)*Heaviside(x - 1), |
|
|
log(x)*Heaviside(x - 1) + log(1 - 1/x)*Heaviside(x - 1) + log(-x + |
|
|
1)*Heaviside(-x + 1)] |
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|
|
|
assert mysimp(IMT(pi*cot(pi*s)/s, s, x, (0, 1))) in [ |
|
|
log(1/x - 1)*Heaviside(1 - x) + log(1 - 1/x)*Heaviside(x - 1), |
|
|
-log(x)*Heaviside(-x + 1) + log(1 - 1/x)*Heaviside(x - 1) + log(-x + |
|
|
1)*Heaviside(-x + 1), ] |
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|
assert IMT(-gamma(s + S.Half)/(sqrt(pi)*s), s, x, (Rational(-1, 2), 0)) == \ |
|
|
erf(sqrt(x)) |
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|
assert simplify(IMT(gamma(a/2 + s)/gamma(a/2 - s + 1), s, x, (-re(a)/2, Rational(3, 4)))) \ |
|
|
== besselj(a, 2*sqrt(x)) |
|
|
assert simplify(IMT(2**a*gamma(S.Half - 2*s)*gamma(s + (a + 1)/2) |
|
|
/ (gamma(1 - s - a/2)*gamma(1 - 2*s + a)), |
|
|
s, x, (-(re(a) + 1)/2, Rational(1, 4)))) == \ |
|
|
sin(sqrt(x))*besselj(a, sqrt(x)) |
|
|
assert simplify(IMT(2**a*gamma(a/2 + s)*gamma(S.Half - 2*s) |
|
|
/ (gamma(S.Half - s - a/2)*gamma(1 - 2*s + a)), |
|
|
s, x, (-re(a)/2, Rational(1, 4)))) == \ |
|
|
cos(sqrt(x))*besselj(a, sqrt(x)) |
|
|
|
|
|
assert simplify(IMT(gamma(a + s)*gamma(S.Half - s) |
|
|
/ (sqrt(pi)*gamma(1 - s)*gamma(1 + a - s)), |
|
|
s, x, (-re(a), S.Half))) == \ |
|
|
besselj(a, sqrt(x))**2 |
|
|
assert simplify(IMT(gamma(s)*gamma(S.Half - s) |
|
|
/ (sqrt(pi)*gamma(1 - s - a)*gamma(1 + a - s)), |
|
|
s, x, (0, S.Half))) == \ |
|
|
besselj(-a, sqrt(x))*besselj(a, sqrt(x)) |
|
|
assert simplify(IMT(4**s*gamma(-2*s + 1)*gamma(a/2 + b/2 + s) |
|
|
/ (gamma(-a/2 + b/2 - s + 1)*gamma(a/2 - b/2 - s + 1) |
|
|
*gamma(a/2 + b/2 - s + 1)), |
|
|
s, x, (-(re(a) + re(b))/2, S.Half))) == \ |
|
|
besselj(a, sqrt(x))*besselj(b, sqrt(x)) |
|
|
|
|
|
|
|
|
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|
|
assert simplify(IMT(-2**(2*s)*cos(pi*a/2 - pi*b/2 + pi*s)*gamma(-2*s + 1) * |
|
|
gamma(a/2 - b/2 + s)*gamma(a/2 + b/2 + s) / |
|
|
(pi*gamma(a/2 - b/2 - s + 1)*gamma(a/2 + b/2 - s + 1)), |
|
|
s, x, |
|
|
(Max(-re(a)/2 - re(b)/2, -re(a)/2 + re(b)/2), S.Half))) == \ |
|
|
besselj(a, sqrt(x))*-(besselj(-b, sqrt(x)) - |
|
|
besselj(b, sqrt(x))*cos(pi*b))/sin(pi*b) |
|
|
|
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|
|
|
|
|
|
|
|
|
|
assert IMT(pi/cos(pi*s), s, x, (0, S.Half)) == sqrt(x)/(x + 1) |
|
|
|
|
|
|
|
|
def test_fourier_transform(): |
|
|
from sympy.core.function import (expand, expand_complex, expand_trig) |
|
|
from sympy.polys.polytools import factor |
|
|
from sympy.simplify.simplify import simplify |
|
|
FT = fourier_transform |
|
|
IFT = inverse_fourier_transform |
|
|
|
|
|
def simp(x): |
|
|
return simplify(expand_trig(expand_complex(expand(x)))) |
|
|
|
|
|
def sinc(x): |
|
|
return sin(pi*x)/(pi*x) |
|
|
k = symbols('k', real=True) |
|
|
f = Function("f") |
|
|
|
|
|
|
|
|
a = symbols('a', positive=True) |
|
|
b = symbols('b', positive=True) |
|
|
|
|
|
posk = symbols('posk', positive=True) |
|
|
|
|
|
|
|
|
assert fourier_transform(f(x), x, k) == FourierTransform(f(x), x, k) |
|
|
assert inverse_fourier_transform( |
|
|
f(k), k, x) == InverseFourierTransform(f(k), k, x) |
|
|
|
|
|
|
|
|
assert simp(FT(Heaviside(1 - abs(2*a*x)), x, k)) == sinc(k/a)/a |
|
|
|
|
|
assert simp(FT(Heaviside(1 - abs(a*x))*(1 - abs(a*x)), x, k)) == sinc(k/a)**2/a |
|
|
|
|
|
|
|
|
assert factor(FT(exp(-a*x)*Heaviside(x), x, k), extension=I) == \ |
|
|
1/(a + 2*pi*I*k) |
|
|
|
|
|
assert IFT(1/(a + 2*pi*I*x), x, posk, |
|
|
noconds=False) == (exp(-a*posk), True) |
|
|
assert IFT(1/(a + 2*pi*I*x), x, -posk, |
|
|
noconds=False) == (0, True) |
|
|
assert IFT(1/(a + 2*pi*I*x), x, symbols('k', negative=True), |
|
|
noconds=False) == (0, True) |
|
|
|
|
|
|
|
|
assert factor(FT(x*exp(-a*x)*Heaviside(x), x, k), extension=I) == \ |
|
|
1/(a + 2*pi*I*k)**2 |
|
|
assert FT(exp(-a*x)*sin(b*x)*Heaviside(x), x, k) == \ |
|
|
b/(b**2 + (a + 2*I*pi*k)**2) |
|
|
|
|
|
assert FT(exp(-a*x**2), x, k) == sqrt(pi)*exp(-pi**2*k**2/a)/sqrt(a) |
|
|
assert IFT(sqrt(pi/a)*exp(-(pi*k)**2/a), k, x) == exp(-a*x**2) |
|
|
assert FT(exp(-a*abs(x)), x, k) == 2*a/(a**2 + 4*pi**2*k**2) |
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
def test_sine_transform(): |
|
|
t = symbols("t") |
|
|
w = symbols("w") |
|
|
a = symbols("a") |
|
|
f = Function("f") |
|
|
|
|
|
|
|
|
assert sine_transform(f(t), t, w) == SineTransform(f(t), t, w) |
|
|
assert inverse_sine_transform( |
|
|
f(w), w, t) == InverseSineTransform(f(w), w, t) |
|
|
|
|
|
assert sine_transform(1/sqrt(t), t, w) == 1/sqrt(w) |
|
|
assert inverse_sine_transform(1/sqrt(w), w, t) == 1/sqrt(t) |
|
|
|
|
|
assert sine_transform((1/sqrt(t))**3, t, w) == 2*sqrt(w) |
|
|
|
|
|
assert sine_transform(t**(-a), t, w) == 2**( |
|
|
-a + S.Half)*w**(a - 1)*gamma(-a/2 + 1)/gamma((a + 1)/2) |
|
|
assert inverse_sine_transform(2**(-a + S( |
|
|
1)/2)*w**(a - 1)*gamma(-a/2 + 1)/gamma(a/2 + S.Half), w, t) == t**(-a) |
|
|
|
|
|
assert sine_transform( |
|
|
exp(-a*t), t, w) == sqrt(2)*w/(sqrt(pi)*(a**2 + w**2)) |
|
|
assert inverse_sine_transform( |
|
|
sqrt(2)*w/(sqrt(pi)*(a**2 + w**2)), w, t) == exp(-a*t) |
|
|
|
|
|
assert sine_transform( |
|
|
log(t)/t, t, w) == sqrt(2)*sqrt(pi)*-(log(w**2) + 2*EulerGamma)/4 |
|
|
|
|
|
assert sine_transform( |
|
|
t*exp(-a*t**2), t, w) == sqrt(2)*w*exp(-w**2/(4*a))/(4*a**Rational(3, 2)) |
|
|
assert inverse_sine_transform( |
|
|
sqrt(2)*w*exp(-w**2/(4*a))/(4*a**Rational(3, 2)), w, t) == t*exp(-a*t**2) |
|
|
|
|
|
|
|
|
def test_cosine_transform(): |
|
|
from sympy.functions.special.error_functions import (Ci, Si) |
|
|
|
|
|
t = symbols("t") |
|
|
w = symbols("w") |
|
|
a = symbols("a") |
|
|
f = Function("f") |
|
|
|
|
|
|
|
|
assert cosine_transform(f(t), t, w) == CosineTransform(f(t), t, w) |
|
|
assert inverse_cosine_transform( |
|
|
f(w), w, t) == InverseCosineTransform(f(w), w, t) |
|
|
|
|
|
assert cosine_transform(1/sqrt(t), t, w) == 1/sqrt(w) |
|
|
assert inverse_cosine_transform(1/sqrt(w), w, t) == 1/sqrt(t) |
|
|
|
|
|
assert cosine_transform(1/( |
|
|
a**2 + t**2), t, w) == sqrt(2)*sqrt(pi)*exp(-a*w)/(2*a) |
|
|
|
|
|
assert cosine_transform(t**( |
|
|
-a), t, w) == 2**(-a + S.Half)*w**(a - 1)*gamma((-a + 1)/2)/gamma(a/2) |
|
|
assert inverse_cosine_transform(2**(-a + S( |
|
|
1)/2)*w**(a - 1)*gamma(-a/2 + S.Half)/gamma(a/2), w, t) == t**(-a) |
|
|
|
|
|
assert cosine_transform( |
|
|
exp(-a*t), t, w) == sqrt(2)*a/(sqrt(pi)*(a**2 + w**2)) |
|
|
assert inverse_cosine_transform( |
|
|
sqrt(2)*a/(sqrt(pi)*(a**2 + w**2)), w, t) == exp(-a*t) |
|
|
|
|
|
assert cosine_transform(exp(-a*sqrt(t))*cos(a*sqrt( |
|
|
t)), t, w) == a*exp(-a**2/(2*w))/(2*w**Rational(3, 2)) |
|
|
|
|
|
assert cosine_transform(1/(a + t), t, w) == sqrt(2)*( |
|
|
(-2*Si(a*w) + pi)*sin(a*w)/2 - cos(a*w)*Ci(a*w))/sqrt(pi) |
|
|
assert inverse_cosine_transform(sqrt(2)*meijerg(((S.Half, 0), ()), ( |
|
|
(S.Half, 0, 0), (S.Half,)), a**2*w**2/4)/(2*pi), w, t) == 1/(a + t) |
|
|
|
|
|
assert cosine_transform(1/sqrt(a**2 + t**2), t, w) == sqrt(2)*meijerg( |
|
|
((S.Half,), ()), ((0, 0), (S.Half,)), a**2*w**2/4)/(2*sqrt(pi)) |
|
|
assert inverse_cosine_transform(sqrt(2)*meijerg(((S.Half,), ()), ((0, 0), (S.Half,)), a**2*w**2/4)/(2*sqrt(pi)), w, t) == 1/(t*sqrt(a**2/t**2 + 1)) |
|
|
|
|
|
|
|
|
def test_hankel_transform(): |
|
|
r = Symbol("r") |
|
|
k = Symbol("k") |
|
|
nu = Symbol("nu") |
|
|
m = Symbol("m") |
|
|
a = symbols("a") |
|
|
|
|
|
assert hankel_transform(1/r, r, k, 0) == 1/k |
|
|
assert inverse_hankel_transform(1/k, k, r, 0) == 1/r |
|
|
|
|
|
assert hankel_transform( |
|
|
1/r**m, r, k, 0) == 2**(-m + 1)*k**(m - 2)*gamma(-m/2 + 1)/gamma(m/2) |
|
|
assert inverse_hankel_transform( |
|
|
2**(-m + 1)*k**(m - 2)*gamma(-m/2 + 1)/gamma(m/2), k, r, 0) == r**(-m) |
|
|
|
|
|
assert hankel_transform(1/r**m, r, k, nu) == ( |
|
|
2*2**(-m)*k**(m - 2)*gamma(-m/2 + nu/2 + 1)/gamma(m/2 + nu/2)) |
|
|
assert inverse_hankel_transform(2**(-m + 1)*k**( |
|
|
m - 2)*gamma(-m/2 + nu/2 + 1)/gamma(m/2 + nu/2), k, r, nu) == r**(-m) |
|
|
|
|
|
assert hankel_transform(r**nu*exp(-a*r), r, k, nu) == \ |
|
|
2**(nu + 1)*a*k**(-nu - 3)*(a**2/k**2 + 1)**(-nu - S( |
|
|
3)/2)*gamma(nu + Rational(3, 2))/sqrt(pi) |
|
|
assert inverse_hankel_transform( |
|
|
2**(nu + 1)*a*k**(-nu - 3)*(a**2/k**2 + 1)**(-nu - Rational(3, 2))*gamma( |
|
|
nu + Rational(3, 2))/sqrt(pi), k, r, nu) == r**nu*exp(-a*r) |
|
|
|
|
|
|
|
|
def test_issue_7181(): |
|
|
assert mellin_transform(1/(1 - x), x, s) != None |
|
|
|
|
|
|
|
|
def test_issue_8882(): |
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
F = -a**(-s + 1)*(4 + 1/a**2)**(-s/2)*sqrt(1/a**2)*exp(-s*I*pi)* \ |
|
|
sin(s*atan(sqrt(1/a**2)/2))*gamma(s) |
|
|
raises(IntegralTransformError, lambda: |
|
|
inverse_mellin_transform(F, s, x, (-1, oo), |
|
|
**{'as_meijerg': True, 'needeval': True})) |
|
|
|
|
|
|
|
|
def test_issue_12591(): |
|
|
x, y = symbols("x y", real=True) |
|
|
assert fourier_transform(exp(x), x, y) == FourierTransform(exp(x), x, y) |
|
|
|
