English

Solubilizers in profinite groups

Group Theory 2024-10-18 v2

Abstract

The solubilizer of an element xx of a profinite group GG is the set of the elements yy of GG such that the subgroup of GG generated by xx and yy is prosoluble. We propose the following conjecture: the solubilizer of xx in GG has positive Haar measure if and only if gg centralizes "almost all" the non-abelian chief factors of GG. We reduce the proof of this conjecture to another conjecture concerning finite almost simple groups: there exists a positive cc such that, for every finite simple group SS and every (a,b)(Aut(S){1})×Aut(S)(a,b)\in (Aut(S)\setminus \{1\}) \times Aut(S), the number of ss is SS such that a,bs\langle a, bs\rangle is insoluble is at least cSc|S|. Work in progress by Fulman, Garzoni and Guralnick is leading to prove the conjecture when SS is a simple group of Lie type. In this paper we prove the conjecture for alternating groups.

Keywords

Cite

@article{arxiv.2310.02034,
  title  = {Solubilizers in profinite groups},
  author = {Andrea Lucchini},
  journal= {arXiv preprint arXiv:2310.02034},
  year   = {2024}
}
R2 v1 2026-06-28T12:39:24.488Z