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Long zero-free sequences in finite cyclic groups

Combinatorics 2007-05-23 v1 Number Theory

Abstract

A sequence in an additively written abelian group is called zero-free if each of its nonempty subsequences has sum different from the zero element of the group. The article determines the structure of the zero-free sequences with lengths greater than n/2n/2 in the additive group \Zn/\Zn/ of integers modulo nn. The main result states that for each zero-free sequence (ai)i=1(a_i)_{i=1}^\ell of length >n/2\ell>n/2 in \Zn/\Zn/ there is an integer gg coprime to nn such that if gaiˉ\bar{ga_i} denotes the least positive integer in the congruence class gaiga_i (modulo nn), then Σi=1gaiˉ<n\Sigma_{i=1}^\ell\bar{ga_i}<n. The answers to a number of frequently asked zero-sum questions for cyclic groups follow as immediate consequences. Among other applications, best possible lower bounds are established for the maximum multiplicity of a term in a zero-free sequence with length greater than n/2n/2, as well as for the maximum multiplicity of a generator. The approach is combinatorial and does not appeal to previously known nontrivial facts.

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Cite

@article{arxiv.math/0602568,
  title  = {Long zero-free sequences in finite cyclic groups},
  author = {Svetoslav Savchev and Fang Chen},
  journal= {arXiv preprint arXiv:math/0602568},
  year   = {2007}
}

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13 pages