A stronger form of Neumann's BFC-theorem

Abstract

Given a group G, we write xG for the conjugacy class of G containing the element x. A famous theorem of B. H. Neumann states that if G is a group in which all conjugacy classes are finite with bounded size, then the derived group G' is finite. We establish the following result. Let n be a positive integer and K a subgroup of a group G such that |xG|≤ n for each x∈ K. Let H= KG be the normal closure of K. Then the order of the derived group H' is finite and n-bounded. Some corollaries of this result are also discussed.