English

Finite groups, minimal bases and the intersection number

Group Theory 2021-11-23 v2

Abstract

Let GG be a finite group and recall that the Frattini subgroup Frat(G){\rm Frat}(G) is the intersection of all the maximal subgroups of GG. In this paper, we investigate the intersection number of GG, denoted α(G)\alpha(G), which is the minimal number of maximal subgroups whose intersection coincides with Frat(G){\rm Frat}(G). In earlier work, we studied α(G)\alpha(G) in the special case where GG is simple and here we extend the analysis to almost simple groups. In particular, we prove that α(G)4\alpha(G) \leqslant 4 for every almost simple group GG, which is best possible. We also establish new results on the intersection number of arbitrary finite groups, obtaining upper bounds that are defined in terms of the chief factors of the group. Finally, for almost simple groups GG we present best possible bounds on a related invariant β(G)\beta(G), which we call the base number of GG. In this setting, β(G)\beta(G) is the minimal base size of GG as we range over all faithful primitive actions of the group and we prove that the bound β(G)4\beta(G) \leqslant 4 is optimal. Along the way, we study bases for the primitive action of the symmetric group SabS_{ab} on the set of partitions of [1,ab][1,ab] into aa parts of size bb, determining the exact base size for aba \geqslant b. This extends earlier work of Benbenishty, Cohen and Niemeyer.

Keywords

Cite

@article{arxiv.2009.10137,
  title  = {Finite groups, minimal bases and the intersection number},
  author = {Timothy C. Burness and Martino Garonzi and Andrea Lucchini},
  journal= {arXiv preprint arXiv:2009.10137},
  year   = {2021}
}

Comments

29 pages, to appear in Transactions of the LMS

R2 v1 2026-06-23T18:42:04.578Z