English

On the diameter of permutation groups

Group Theory 2014-01-03 v5 Combinatorics Number Theory Probability

Abstract

Given a finite group GG and a set AA of generators, the diameter diam(Γ(G,A))(\Gamma(G,A)) of the Cayley graph Γ(G,A)\Gamma(G,A) is the smallest \ell such that every element of GG can be expressed as a word of length at most \ell in AA1A \cup A^{-1}. We are concerned with bounding diam(G):= maxA\max_A diam(Γ(G,A))(\Gamma(G,A)). It has long been conjectured that the diameter of the symmetric group of degree nn is polynomially bounded in nn, but the best previously known upper bound was exponential in nlogn\sqrt{n \log n}. We give a quasipolynomial upper bound, namely, diam(G)=exp(O((logn)4loglogn))=exp((loglogG)O(1))\text{diam}(G) = \exp(O((\log n)^4 \log\log n)) = \exp((\log \log |G|)^{O(1)}) for G = Sym(n) or G = \Alt(n), where the implied constants are absolute. This addresses a key open case of Babai's conjecture on diameters of simple groups. By standard results, our bound also implies a quasipolynomial upper bound on the diameter of all transitive permutation groups of degree nn.

Keywords

Cite

@article{arxiv.1109.3550,
  title  = {On the diameter of permutation groups},
  author = {Harald A. Helfgott and Akos Seress},
  journal= {arXiv preprint arXiv:1109.3550},
  year   = {2014}
}

Comments

42 pages. Minimal additions. Last version, to appear in Ann. of Math

R2 v1 2026-06-21T19:05:47.450Z