The Davenport constant of a box

Abstract

Given an additively written abelian group G and a set X⊂eq G, we let B(X) denote the monoid of zero-sum sequences over X and D(X) the Davenport constant of B(X), namely the supremum of the positive integers n for which there exists a sequence x1 ·s xn of B(X) such that Σi ∈ I xi 0 for each non-empty proper subset I of \1, …, n\. In this paper, we mainly investigate the case when G is a power of Z and X is a box (i.e., a product of intervals of G). Some mixed sets (e.g., the product of a group by a box) are studied too, and some inverse results are obtained.