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The structure of sequences with zero-sum subsequences of the same length on finite abelian groups of rank two

Wanzhen Hui, Xue Li Acta Arithmetica MSC: Primary 11B75; Secondary 11P70 DOI: 10.4064/aa251008-9-4 Published online: 3 July 2026

Abstract

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

Authors

  • Wanzhen HuiSchool of Mathematical Sciences
    Sichuan Normal University
    610066 Chengdu, P. R. China
    e-mail
  • Xue LiCollege of Science
    Tianjin University of Commerce
    300134 Tianjin, P. R. China
    e-mail

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