Short Zero-Sum Sequences Over Abelian p-Groups of Large Exponent
Abstract
Let G be a finite abelian group with exponent n. Let η(G) denote the smallest integer such that every sequence over G of length at least has a zero-sum subsequence of length at most n. We determine the precise value of η(G) when G is a p-group whose Davenport constant is at most 2n-1. This confirms one of the equalities in a conjecture by Schmid and Zhuang from 2010.
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