Remarks on a generalization of the Davenport constant

Abstract

A generalization of the Davenport constant is investigated. For a finite abelian group G and a positive integer k, let Dk(G) denote the smallest such that each sequence over G of length at least has k disjoint non-empty zero-sum subsequences. For general G, expanding on known results, upper and lower bounds on these invariants are investigated and it is proved that the sequence (Dk(G))k∈N is eventually an arithmetic progression with difference (G), and several questions arising from this fact are investigated. For elementary 2-groups, Dk(G) is investigated in detail; in particular, the exact values are determined for groups of rank four and five (for rank at most three they were already known).