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

Abstract: For $k\leq n$, let $E(mn,k)$ be the sum of all multiple zeta values of depth $k$ and weight $mn$ with arguments are multiples of $m\geq 2$. More precisely, $E(mn,k)=\sum_{|\boldsymbol{\alpha}|=n}\zeta(m\alpha_1,m\alpha_2,\ldots, m\alpha_k)$. In this paper, we develop a formula to express $E(mn,k)$ in terms of $\zeta({m}^p)$ and $\zeta^\star({m}^q)$, $0\leq p,q\leq n$. In particular, we settle Gen\v{c}ev's conjecture on the evaluation of $E(4n,k)$ and also evaluate $E(mn,k)$ explicitly for small even $m\leq 8$.