Parametric binomial sums involving harmonic numbers

Abstract

We present explicit formulas for the following family of parametric binomial sums involving harmonic numbers for p=0,1,2 and |t|≤1. Σk=1∞Hk-1tkkpn+kk and Σk=1∞tkkpn+kk. We also generalize the following relation between the Stirling numbers of the first kind and the Riemann zeta function to polygamma function and give some applications. ζ(n+1)=Σk=n∞s(k,n)kk!, n=1,2,3,... . As examples, equation* ζ(3)=17Σk=1∞Hk-14kk22kk, and ζ(3)=87+17Σk=1∞Hk-14kk2(2k+1)2kk, equation* which are new series representations for the Ap\'ery constant ζ(3).