Inverse Zero-Sum Problems III

TL;DR

This paper investigates the structure of minimal zero-sum sequences in rank 2 abelian groups, proving that a key property (Property B) is multiplicative, which simplifies the problem to prime cases.

Contribution

It demonstrates that Property B is multiplicative for rank 2 groups, reducing the problem to prime cases and advancing understanding of zero-sum sequence structures.

Findings

Property B is multiplicative for rank 2 groups with odd parameters

Reduces the problem of Property B to prime cases

Provides structural insights into minimal zero-sum sequences

Abstract

Let $G$ be a finite abeilian group. A sequence $S$ with terms from $G$ is zero-sum if the sum of terms in $S$ equals zero. It is a minimal zero-sum sequence if no proper, nontrivial subsequence is zero-sum. The maximal length of a minimal zero-sum subsequence in $G$ is the Davenport constant, denoted $D(G)$. For a rank 2 group $G=C_n \oplus C_n$, it is known that $D(G)=2n-1$. However, the structure of all maximal length minimal zero-sum sequences remains open. If every such sequence contains a term with multiplicity $n-1$, then $C_n \oplus C_n$ is said to have Property B, and it is conjectured that this is true for all rank 2 groups $C_n \oplus C_n$. In this paper, we show that Property B is multiplicative, namely, if $G=C_n \oplus C_n$ and $G=C_m \oplus C_m$ both satisfy Property B, with $m, n\geq 3$ odd and $mn>9$, then $C_{mn}\oplus C_{mn}$ satisfies Property B also. Combined with previous work in the literature, this reduces the question of establishing Property B to the prime cases, and in such case the complete structural description of the sequence follows.