The nilpotency of finite groups with a fix-point-free automorphism satisfying an identity

Abstract

We generalize the positive solution of the Frobenius conjecture and refinements thereof by studying the structure of groups that admit a fix-point-free automorphism satisfying an identity. We show, in particular, that for every polynomial r(t) = a0 + a1 · t + ·s + ad · td ∈ Z[t] that is irreducible over Q, there exist (explicit) invariants a,b,c ∈ N with the following property. Consider a finite group with a fix-point-free automorphism α:GG and suppose that for all x ∈ G we have the equality xa0 · α(xa1) · α2(xa2)·s αd(xad) = 1G. Then G is solvable and of the form A · (B (C × D)), where A is an a-group, B is a b-group, C is a nilpotent c-group, and D is a nilpotent group of class at most d2d. Here, a group H is said to be an a-group (resp. b-group or c-group) if the order of every h ∈ H divides some natural power of a (resp. b or c).