English

How long does it take to generate a group?

Group Theory 2009-11-17 v1 Number Theory

Abstract

The diameter of a finite group GG with respect to a generating set AA is the smallest non-negative integer nn such that every element of GG can be written as a product of at most nn elements of AA1A \cup A^{-1}. We denote this invariant by \diamA(G)\diam_A(G). It can be interpreted as the diameter of the Cayley graph induced by AA on GG and arises, for instance, in the context of efficient communication networks. In this paper we study the diameters of a finite abelian group GG with respect to its various generating sets AA. We determine the maximum possible value of \diamA(G)\diam_A(G) and classify all generating sets for which this maximum value is attained. Also, we determine the maximum possible cardinality of AA subject to the condition that \diamA(G)\diam_A(G) is "not too small". Connections with caps, sum-free sets, and quasi-perfect codes are discussed.

Keywords

Cite

@article{arxiv.0911.2908,
  title  = {How long does it take to generate a group?},
  author = {Benjamin Klopsch and Vsevolod F. Lev},
  journal= {arXiv preprint arXiv:0911.2908},
  year   = {2009}
}
R2 v1 2026-06-21T14:11:52.870Z