English

On short zero-sum subsequences of zero-sum sequences

Number Theory 2011-08-16 v1 Combinatorics

Abstract

Let GG be a finite abelian group, and let η(G)\eta(G) be the smallest integer dd such that every sequence over GG of length at least dd contains a zero-sum subsequence TT with length T[1,exp(G)]|T|\in [1,\exp(G)]. In this paper, we investigate the question whether all non-cyclic finite abelian groups GG share with the following property: There exists at least one integer t[exp(G)+1,η(G)1]t\in [\exp(G)+1,\eta(G)-1] such that every zero-sum sequence of length exactly tt contains a zero-sum subsequence of length in [1,exp(G)][1,\exp(G)]. Previous results showed that the groups Cn2C_n^2 (n3n\geq 3) and C33C_3^3 have the property above. In this paper we show that more groups including the groups CmCnC_m\oplus C_n with 3mn3\leq m\mid n, C3a5b3C_{3^a5^b}^3, C3×2a3C_{3\times 2^a}^3, C3a4C_{3^a}^4 and C2brC_{2^b}^r (b2b\geq 2) have this property. We also determine all t[exp(G)+1,η(G)1]t\in [\exp(G)+1, \eta(G)-1] with the property above for some groups including the groups of rank two, and some special groups with large exponent.

Keywords

Cite

@article{arxiv.1108.2866,
  title  = {On short zero-sum subsequences of zero-sum sequences},
  author = {Yushuang Fan and Weidong Gao and Guoqing Wang and Qinghai Zhong and Jujuan Zhuang},
  journal= {arXiv preprint arXiv:1108.2866},
  year   = {2011}
}

Comments

19 pages

R2 v1 2026-06-21T18:50:17.903Z