Normalisers of maximal tori and a conjecture of Vdovin

Abstract

Let G = Op'(GF) be a finite simple group of Lie type defined over a field of characteristic p, where F is a Steinberg endomorphism of the ambient simple algebraic group G. Let T be an F-stable maximal torus of G and set N = NG(T). A conjecture due to Vdovin asserts that if G L3(2) then N Nx is a p-group for some x ∈ G. In this paper, we use a combination of probabilistic and computational methods to calculate the base size for the natural action of G on G/N, which allows us to prove a stronger, and suitably modified, version of Vdovin's conjecture.

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