The probability that a pair of elements of a finite group are conjugate

Abstract

Let G be a finite group, and let (G) be the probability that elements g, h∈ G are conjugate, when g and h are chosen independently and uniformly at random. The paper classifies those groups G such that (G) ≥ 1/4, and shows that G is abelian whenever (G)|G| < 7/4. It is also shown that (G)|G| depends only on the isoclinism class of G. Specialising to the symmetric group Sn, the paper shows that (Sn) ≤ C/n2 for an explicitly determined constant C. This bound leads to an elementary proof of a result of Flajolet et al, that (Sn) A/n2 as n→ ∞ for some constant A. The same techniques provide analogous results for (Sn), the probability that two elements of the symmetric group have conjugates that commute.