English

Shintani descent, simple groups and spread

Group Theory 2021-03-16 v2

Abstract

The spread of a group GG, written s(G)s(G), is the largest kk such that for any nontrivial elements x1,,xkGx_1, \dots, x_k \in G there exists yGy \in G such that G=xi,yG = \langle x_i, y \rangle for all ii. Burness, Guralnick and Harper recently classified the finite groups GG such that s(G)>0s(G) > 0, which involved a reduction to almost simple groups. In this paper, we prove an asymptotic result that determines exactly when s(Gn)s(G_n) \to \infty for a sequence of almost simple groups (Gn)(G_n). 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 μ(G)\mu(G), the minimal number of maximal overgroups of an element of GG. We show that if GG is almost simple, then μ(G)3\mu(G) \leqslant 3 when GG has an alternating or sporadic socle, but in general, unlike when GG is simple, μ(G)\mu(G) can be arbitrarily large.

Keywords

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

R2 v1 2026-06-23T17:40:41.813Z