On the Erdos-Ginzburg-Ziv constant of groups of the form C2r Cn

Abstract

Let G be a finite abelian group. The Erdos-Ginzburg-Ziv constant s(G) of G is defined as the smallest integer l∈ N such that every sequence S over G of length |S|≥ l has a zero-sum subsequence T of length |T|= (G). The value of this classical invariant for groups with rank at most two is known. But the precise value of s(G) for the groups of rank larger than two is difficult to determine. In this paper we pay our attentions to the groups of the form C2r-1 C2n, where r≥ 3 and n 2. We give a new upper bound of s(C2r-1 C2n) for odd integer n. For r∈ [3,4], we obtain that s(C22 C2n)=4n+3 for n 2 and s(C23 C2n)=4n+5 for n≥ 36.