On the inverse problem of the k-th Davenport constants for groups of rank 2

Abstract

For a finite abelian group G and a positive integer k, let Dk(G) denote the smallest integer such that each sequence over G of length at least has k disjoint nontrivial zero-sum subsequences. It is known that Dk(G)=n1+kn2-1 if G Cn1 Cn2 is a rank 2 group, where 1<n1 n2. We investigate the associated inverse problem for rank 2 groups, that is, characterizing the structure of zero-sum sequences of length Dk(G) that can not be partitioned into k+1 nontrivial zero-sum subsequences.

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