Asymptotics of commuting probabilities in reductive algebraic groups

Abstract

Let G be an algebraic group. For d≥ 1, we define the commuting probabilities cpd(G) = dim( Cd(G))dim(Gd), where Cd(G) is the variety of commuting d-tuples in G. We prove that for a reductive group G when d is large, cpd(G) αn where n=(G), and α is the maximal dimension of an Abelian subgroup of G. For a finite reductive group G defined over the field Fq, we show that cpd+1(G( Fq)) q(α-n)d, and give several examples.