Finite groups, commuting probability, and coprime automorphisms

Abstract

Given two subgroups H,K of a finite group G, the probability that a pair of random elements from H and K commutes is denoted by Pr(H,K). Suppose that a finite group G admits a group of coprime automorphisms A and let ε>0. We show that, if for any distinct primes p,q∈π(G) there is an A-invariant Sylow p-subgroup P and an A-invariant Sylow q-subgroup Q of G for which Pr([P,A],[Q,A])ε, then F2([G,A]) has ε-bounded index in [G,A] (Theorem 1.2). Here F2(K) stands for the second term of the upper Fitting seris of a group K. We also show that, if G=[G,A] and for any prime p dividing the order of G there is an A-invariant Sylow p-subgroup P such that ([P,A], [P,A]x)≥ε for all x∈ G, then G is bounded-by-abelian-by-bounded (Theorem 1.4).

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