On the invariant E(G) for groups of odd order

Abstract

Let G be a multiplicatively written finite group. We denote by E(G) the smallest integer t such that every sequence of t elements in G contains a product-one subsequence of length |G|. In 1961, Erdos, Ginzburg and Ziv proved that E(G)≤ 2|G|-1 for every finite solvable group G and this result is well known as the Erdos-Ginzburg-Ziv Theorem. In 2010, Gao and Li improved this result to E(G)≤7|G|4-1 and they conjectured that E(G)≤ 3|G|2 holds for any finite non-cyclic group. In this paper, we confirm the conjecture for all finite non-cyclic groups of odd order.