Finite groups admitting a coprime automorphism satisfying an additional polynomial identity

Abstract

It is known that a finite group with an automorphism of coprime order has a soluble radical of (||,|CG()|)-bounded Fitting height and index. We extend this classic result as follows. Let f(x) = a0 + a1 · x + ·s + ad · xd ∈ Z[x] be a primitive polynomial and let G be a finite group with an automorphism of coprime order satisfying ga0 · (g)a1 ·s d(g)ad = 1 , for all g ∈ G. Then the soluble radical of G has (d,|CG()|)-boundex Fitting height and index. The bounds are made explicit and are particularly good for small values of the degree d.