Exponent of a finite group of odd order with an involutory automorphism

Abstract

Let G be a finite group of odd order admitting an involutory automorphism φ. We obtain two results bounding the exponent of [G,φ]. Denote by G-φ the set \[g,φ]\,\, g∈ G\ and by Gφ the centralizer of φ, that is, the subgroup of fixed points of φ. The obtained results are as follows.1. Assume that the subgroup x,y has derived length at most d and xe=1 for every x,y∈ G-φ. Suppose that Gφ is nilpotent of class c. Then the exponent of [G,φ] is (c,d,e)-bounded.2. Assume that Gφ has rank r and xe=1 for each x∈ G-φ. Then the exponent of [G,φ] is (e,r)-bounded.