The Fitting height of finite groups with a fixed-point-free automorphism satisfying an identity

Abstract

Motivated by classic theorems of Thompson and Berger on the Fitting height of finite groups with a fixed-point-free automorphism of coprime order, we conjecture that, for every non-zero polynomial f(x) = a0 + a1 x + ·s + ad xd ∈ Z[x] , there is an integer k > 0 with the following property. Let G be a finite (solvable) group with a fixed-point-free automorphism α satisfying (|G|,k)= 1 and \ ga0 · α(g)a1 · α2(g)a2 ·s αd(g)ad | g ∈ G \ = \1\. Then the Fitting height of G is at most the number of irreducible factors of f(x). We confirm the conjecture for a large family of polynomials with explicit constants k.

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