Evaluation of binomial double sums involving absolute values

Abstract

We show that double sums of the form Σi,j=-n n |isjt(ik-jk)β| 2n n+i 2n n+j can always be expressed in terms of a linear combination of just four functions, namely 4n2n, 2nn2, 4n 2nn, and 16n, with coefficients that are rational in n. We provide two different proofs: one is algorithmic and uses the second author's computer algebra package Sigma; the second is based on complex contour integrals. In many instances, these results are extended to double sums of the above form where 2nn+j is replaced by 2mm+j with independent parameter m.