partial fraction series for digamma function


Theorem 1
ψ(z)=-γ-1z+k=1(1k-1z+k)=-γ+k=0(1k+1-1z+k)

Proof: Start with

Γ(z)=e-γzzk=1(1+zk)-1ez/k,

so

lnΓ(z)=-γz-lnz+k=1(-ln(1+zk)+zk)

and thus, taking derivatives,

ψ(z)=-γ-1z+k=1(-1/k1+zk+1k)=-γ-1z+k=1(1k-1z+k)

The second formula follows after rearranging terms (the rearrangement is legal since we are simply exchanging adjacent terms, so partial sums remain the same).

Title partial fraction series for digamma function
Canonical name PartialFractionSeriesForDigammaFunction
Date of creation 2013-03-22 16:23:40
Last modified on 2013-03-22 16:23:40
Owner rm50 (10146)
Last modified by rm50 (10146)
Numerical id 6
Author rm50 (10146)
Entry type Theorem
Classification msc 33B15
Classification msc 30D30