Finite groups with high commuting probability for Sylow subgroups

Abstract

Given two subsets X,Y of a finite group G, we write (X,Y) for the probability that random elements x ∈ X and y ∈ Y commute. If X,Y are subgroups, we denote by *(X,Y) the maximum real number ε with the property that for every pair of distinct primes p∈π(X) and q∈π(Y) there is a Sylow p-subgroup P of X and a Sylow q-subgroup Q of Y such that (P,Q) ≥ ε. In this paper we handle, among other things, finite groups G with high probabilities *(T,G), where T is either a term of the lower central series of G or the generalized Fitting subgroup Fi*(G). Our main results show that the structure of such groups is similar, in some precise sense, to that of nilpotent groups.