Shintani descent, simple groups and spread
Abstract
The spread of a group , written , is the largest such that for any nontrivial elements there exists such that for all . Burness, Guralnick and Harper recently classified the finite groups such that , which involved a reduction to almost simple groups. In this paper, we prove an asymptotic result that determines exactly when for a sequence of almost simple groups . We apply probabilistic and geometric ideas, but the key tool is Shintani descent, a technique from the theory of algebraic groups that provides a bijection, the Shintani map, between conjugacy classes of almost simple groups. We provide a self-contained presentation of a general version of Shintani descent, and we prove that the Shintani map preserves information about maximal overgroups. This is suited to further applications. Indeed, we also use it to study , the minimal number of maximal overgroups of an element of . We show that if is almost simple, then when has an alternating or sporadic socle, but in general, unlike when is simple, can be arbitrarily large.
Cite
@article{arxiv.2008.02558,
title = {Shintani descent, simple groups and spread},
author = {Scott Harper},
journal= {arXiv preprint arXiv:2008.02558},
year = {2021}
}
Comments
30 pages; to appear in Journal of Algebra