Balanced polygamma function

Generalized polygamma function is a function, introduced by Olivier Espinosa and Victor H. Moll^[1] It generalizes the Polygamma function to negative and fractional order, but remains equal to it for integer positive orders.

It is defined as follows:

$\psi (z,q)={\frac {\zeta '(z+1,q)+(\psi (-z)+\gamma )\zeta (z+1,q)}{\Gamma (-z)}}$

or alternatively,

$\psi (z,q)=e^{-\gamma z}{\frac {\partial }{\partial z}}\left(e^{\gamma z}{\frac {\zeta (z+1,q)}{\Gamma (-z)}}\right)$

Several special functions can be expressed in terms of generalized polygamma function.

$\Gamma (x)=e^{\psi (-1,x)+{\frac {1}{2}}\ln(2\pi )}\,\,\,$

$\zeta (z,q)={\frac {\Gamma (1-z)\left(2^{-z}\left(\psi \left(z-1,{\frac {q}{2}}+{\frac {1}{2}}\right)+\psi \left(z-1,{\frac {q}{2}}\right)\right)-\psi (z-1,q)\right)}{\ln(2)}}$

where

\zeta (z,q),

is Hurwitz Zeta function

$B_{n}(q)=-{\frac {n\Gamma (n)\left(2^{n-1}\left(\psi \left(-n,{\frac {q}{2}}+{\frac {1}{2}}\right)+\psi \left(-n,{\frac {q}{2}}\right)\right)-\psi (-n,q)\right)}{\ln(2)}}$

where

B_{n}(q)

are Bernoulli polynomials

$K(z)=\exp \left({\frac {z-z^{2}}{2}}-\psi (-2,z)\right)-\ln A$

where K(z) is K-function ana A is Glaisher constant. It itself can be expressed in terms of generalized polygamma function:

$A={\frac {\sqrt[{36}]{128{\pi }^{30}}}{\pi }}e^{{\frac {1}{3}}+{\frac {2}{3}}\left(\psi (-1,1/2)-{\frac {1}{2}}\ln(2\pi )\right)}.$

References

^ Olivier Espinosa Victor H. Moll. Integral Transforms and Special Functions Vol. 15, No. 2, April 2004, pp. 101–115 [1]

[1] Olivier Espinosa Victor H. Moll. Integral Transforms and Special Functions Vol. 15, No. 2, April 2004, pp. 101–115 [1]

[1]