Sum formulas of mltiple zeta values with arguments are multiple of a positive integer

Abstract

For k≤ n, let E(mn,k) be the sum of all multiple zeta values of depth k and weight mn with arguments are multiples of m≥ 2. More precisely, E(mn,k)=Σ|α|=nζ(mα1,mα2,…, mαk). In this paper, we develop a formula to express E(mn,k) in terms of ζ(\m\p) and ζ(\m\q), 0≤ p,q≤ n. In particular, we settle Gencev's conjecture on the evaluation of E(4n,k) and also evaluate E(mn,k) explicitly for small even m≤ 8.