Exponent of a finite group admitting a coprime automorphism

Abstract

Let G be a finite group admitting a coprime automorphism φ of order n. Denote by Gφ the centralizer of φ in G and by G-φ the set \ x-1xφ; \ x∈ G\. We prove the following results. 1. If every element from Gφ G-φ is contained in a φ-invariant subgroup of exponent dividing e, then the exponent of G is (e,n)-bounded. 2. Suppose that Gφ is nilpotent of class c. If xe=1 for each x ∈ G-φ and any two elements of G-φ are contained in a φ-invariant soluble subgroup of derived length d, then the exponent of [G,φ] is bounded in terms of c,d,e,n.