On groups with automorphisms whose fixed points are Engel

Abstract

We complete the study of finite and profinite groups admitting an action by an elementary abelian group under which the centralizers of automorphisms consist of Engel elements. In particular, we prove the following theorems. Let q be a prime and A an elementary abelian q-group of order at least q2 acting coprimely on a profinite group G. Assume that all elements in CG(a) are Engel in G for each a∈ A\#. Then G is locally nilpotent (Theorem B2). Let q be a prime, n a positive integer and A an elementary abelian group of order q3 acting coprimely on a finite group G. Assume that for each a∈ A\# every element of CG(a) is n-Engel in CG(a). Then the group G is k-Engel for some \n,q\-bounded number k (Theorem A3).