A Comment on the Sums Σn ∈ Z (-1)nk(an+1)k

Abstract

We recall a proof of Euler's identity Σn=1∞ 1n2=π26 involving the evaluation of a double integral. We extend the method to find Hurwitz Zeta series of the form S(k,a)=Σn ∈ Z (-1)nk(an+1)k, where a ∈ N 1 and k ∈ N. In particular, we consider a general k-dimensional integral over (0,1)k that equals the series representation S(k,a). Then we use an algebraic change of variables that diffeomorphically maps (0,1)k to a k-dimensional hyperbolic polytope. We interpret the integral as a sum of two probabilities, and find explicit representations of such probabilities with combinatorial techniques.