The structure of sequences with zero-sum subsequences of the same length on finite abelian groups of rank two
Abstract
Let G be an additive finite abelian group, and let disc(G) denote the smallest positive integer t with the property that every sequence S over G with length |S|≥ t contains two nonempty zero-sum subsequences of distinct lengths. In recent years, Gao et al. established the exact value of disc(G) for all finite abelian groups of rank 2 and resolved the corresponding inverse problem for the group Cn Cn. In this paper, we characterize the structure of sequences S over G = Cn Cnm (where m≥ 2) when |S| = disc(G)- 1 and all nonempty zero-sum subsequences of S have the same length.
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