On the regularity of irreducible subgroups of finite classical groups

Abstract

Let G be a finite group and let τ= (H1, …, Ht) be a t-tuple of core-free subgroups of G. We say that τ is regular if G contains elements g1, …, gt such that i Higi = 1, which is equivalent to the existence of a regular G-orbit on the Cartesian product G/H1 × ·s × G/Ht. Regular tuples were first investigated by Anagnostopoulou-Merkouri and Burness in a paper from 2024, partly motivated by the aim of seeking a natural generalisation of the classical and widely studied concept of a base for a transitive permutation group, which aligns with the special case where the Hi are pairwise conjugate subgroups. In this paper, we focus on the case where G is a finite almost simple classical group and each Hi is a maximal subgroup contained in Aschbacher's collection S of irreducibly embedded subgroups. Our main theorem determines all the non-regular t-tuples of this form with t ≥slant 2, which extends earlier work by Burness, Guralnick and Saxl in the base size setting. In particular, we deduce that every pair of maximal subgroups in S is regular if n ≥slant 15, where n is the dimension of the natural module for the socle of G, and this lower bound is best possible.

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