English

On base sizes for almost simple primitive groups

Group Theory 2018-09-07 v2

Abstract

Let GSym(Ω)G \leqslant {\rm Sym}(\Omega) be a finite almost simple primitive permutation group, with socle G0G_0 and point stabilizer HH. A subset of Ω\Omega is a base for GG if its pointwise stabilizer is trivial; the base size of GG, denoted b(G)b(G), is the minimal size of a base. We say that GG is standard if G0=AnG_0 = A_n and Ω\Omega is an orbit of subsets or partitions of {1,,n}\{1, \ldots, n\}, or if G0G_0 is a classical group and Ω\Omega is an orbit of subspaces (or pairs of subspaces) of the natural module for G0G_0. The base size of a standard group can be arbitrarily large, in general, whereas the situation for non-standard groups is rather more restricted. Indeed, we have b(G)7b(G) \leqslant 7 for every non-standard group GG, with equality if and only if GG is the Mathieu group M24{\rm M}_{24} in its natural action on 2424 points. In this paper, we extend this result by classifying the non-standard groups with b(G)=6b(G)=6. The main tools include recent work on bases for actions of simple algebraic groups, together with probabilistic methods and improved fixed point ratio estimates for exceptional groups of Lie type.

Keywords

Cite

@article{arxiv.1803.10955,
  title  = {On base sizes for almost simple primitive groups},
  author = {Timothy C. Burness},
  journal= {arXiv preprint arXiv:1803.10955},
  year   = {2018}
}

Comments

27 pages; to appear in J. Algebra

R2 v1 2026-06-23T01:08:33.494Z