Vanishing of Multiple Zeta Values over Fq[t] at Negative Integers

Abstract

Let Fq be the finite field of q elements. In this paper, we study the vanishing behavior of multizeta values over Fq[t] at negative integers. These values are analogs of the classical multizeta values. At negative integers, they are series of products of power sums Sd(k) which are polynomials in t. By studying the t-valuation of Sd(s) for s < 0, we show that multizeta values at negative integers vanish only at trivial zeros. The proof is inspired by the idea of Sheats in the proof of a statement of "greedy element" by Carlitz.