How to simplify -polylog(2, exp_polar(I*pi))/16 + pi**2/96 ?
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Sébastien Labbé
Dec 2, 2016, 4:25:47 AM12/2/16
to sympy
Can SymPy tell me that A = 1/64*pi**2 by simplifying the polylog in below example?
>>> from sympy.abc import n
>>> from sympy import summation, oo
>>> A = summation(1/((2*n+1)^2-4)^2, (n, 0, oo))
>>> A
-polylog(2, exp_polar(I*pi))/16 + pi**2/96
>>> A.simplify()
-polylog(2, exp_polar(I*pi))/16 + pi**2/96
because it seems doable:
sage: from sympy.abc import n
sage: from sympy import summation, oo
sage: A = summation(1/((2*n+1)^2-4)^2, (n, 0, oo))
sage: A._sage_()
1/64*pi^2
This came up in https://ask.sagemath.org/question/35839/sage-incorrectly-evaluates-series/
Sébastien
>>> from sympy.abc import n
>>> from sympy import summation, oo
>>> A = summation(1/((2*n+1)^2-4)^2, (n, 0, oo))
>>> A
-polylog(2, exp_polar(I*pi))/16 + pi**2/96
>>> A.simplify()
-polylog(2, exp_polar(I*pi))/16 + pi**2/96
because it seems doable:
sage: from sympy.abc import n
sage: from sympy import summation, oo
sage: A = summation(1/((2*n+1)^2-4)^2, (n, 0, oo))
sage: A._sage_()
1/64*pi^2
This came up in https://ask.sagemath.org/question/35839/sage-incorrectly-evaluates-series/
Sébastien
Isuru Fernando
Dec 2, 2016, 7:43:00 AM12/2/16
to sy...@googlegroups.com
This is a known bug, https://github.com/sympy/sympy/issues/8404
A._sage_() works because exp_polar(I*pi) is -1 in sage and is unevaluated in SymPy.
A._sage_() works because exp_polar(I*pi) is -1 in sage and is unevaluated in SymPy.
Isuru Fernando
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Sébastien Labbé
Dec 2, 2016, 8:18:16 AM12/2/16
to sympy
Ok, thank you. I see:
>>> from sympy import *
>>> -polylog(2, exp_polar(I*pi))/16 + pi**2/96
-polylog(2, exp_polar(I*pi))/16 + pi**2/96
>>> exp_polar(I*pi)
exp_polar(I*pi)
Then should not this gives me pi**2/64 ?
>>> -polylog(2, -1)/16 + pi**2/96
pi**2/192
>>> from sympy import *
>>> -polylog(2, exp_polar(I*pi))/16 + pi**2/96
-polylog(2, exp_polar(I*pi))/16 + pi**2/96
>>> exp_polar(I*pi)
exp_polar(I*pi)
Then should not this gives me pi**2/64 ?
>>> -polylog(2, -1)/16 + pi**2/96
pi**2/192
Isuru Fernando
Dec 2, 2016, 8:24:25 AM12/2/16
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It does give me the correct answer in the latest master, but I get the same incorrect answer in sympy-1.0. It was fixed here, https://github.com/sympy/sympy/pull/10799
Isuru Fernando
Isuru Fernando
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Sébastien Labbé
Dec 2, 2016, 8:56:27 AM12/2/16
to sympy
Indeed, I am using :
>>> import sympy
>>> sympy.__version__
'1.0'
Thank you,
>>> import sympy
>>> sympy.__version__
'1.0'
Thank you,
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