On the commuting probability and supersolvability of finite groups

Abstract

For a finite group G, let d(G) denote the probability that a randomly chosen pair of elements of G commute. We prove that if d(G)>1/s for some integer s>1 and G splits over an abelian normal nontrivial subgroup N, then G has a nontrivial conjugacy class inside N of size at most s-1. We also extend two results of Barry, MacHale, and N\' Sh\'e on the commuting probability in connection with supersolvability of finite groups. In particular, we prove that if d(G)>5/16 then either G is supersolvable, or G isoclinic to A4, or G/(G) is isoclinic to A4.