On zero-sum subsequences of length exp(G)

Abstract

Let G be a finite abelian group. Let g(G) be the smallest positive integer t such that every subset of cardinality t of the group G contains a subset of cardinality exp(G) whose sum is zero. In this paper, we show that if X is a subset of Z22n with cardinality 4n+1 and 2n or 2n-1 elements of X have the same first coordintes, then X contains a zero sum subset. As an application of our results we prove that g(Z26) = 13. This settles Gao-Thangaduri's conjecture for the case n=6. We also prove some results towards the general even n cases of the conjecture.