Conjugacy growth of commutators

Abstract

For the free group Fr on r>1 generators (respectively, the free product G1 * G2 of two nontrivial finite groups G1 and G2), we obtain the asymptotic for the number of conjugacy classes of commutators in Fr (respectively, G1 * G2) with a given word length in a fixed set of free generators (respectively, the set of generators given by the nontrivial elements of G1 and G2). Our result is proven by using the classification of commutators in free groups and in free products by Wicks, and builds on the works of Rivin and Sharp, who asymptotically counted the conjugacy classes of commutator-subgroup elements in Fr with a given word length.