The soluble radical and orbits of certain maps on finite groups

Abstract

For each element u in a finite group G define a map θu G G by θu(g)=[g-u,g] and set G(u)=\g∈ G θun(g)=g for some n>0\. Then θu induces a permutation of G(u); let βG(u) be the number of orbits apart from \1\. Building on work of J.N. Bray, R.A. Wilson and the second author, we show that the index of the soluble radical of a finite group G is bounded in terms of the values of βG(u) for 2-elements u.