On the Erd os--Ginzburg--Ziv constant of finite abelian groups of high rank

Abstract

Let G be a finite abelian group. The Erd os--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). If G has rank at most two, then the precise value of s (G) is known (for cyclic groups this is the Theorem of Erd os-Ginzburg-Ziv). Only very little is known for groups of higher rank. In the present paper, we focus on groups of the form G = Cnr, with n, r ∈ and n 2, and we tackle the study of s (G) with a new approach, combining the direct problem with the associated inverse problem.