Bounded conjugacy classes, commutators, and approximate subgroups

Abstract

Given a group G, we write gG for the conjugacy class of G containing the element g. A theorem of B. H. Neumann states that if G is a group in which all conjugacy classes are finite with bounded size, then the commutator subgroup G' is finite. We establish the following results. Let K,n be positive integers and G a group having a K-approximate subgroup A. If |aG|≤ n for each a∈ A, then the commutator subgroup of AG has finite (K,n)-bounded order. If |[g,a]G|≤ n for all g∈ G and a∈ A, then the commutator subgroup of [G,A] has finite (K,n)-bounded order.