Engel-like conditions in fixed points of automorphisms of profinite groups

Abstract

Let q be a prime and A an elementary abelian q-group acting as a coprime group of automorphisms on a profinite group G. We show that if A is of order q2 and some power of each element in CG(a) is Engel in G for any a∈ A\#, then G is locally virtually nilpotent. Assuming that A is of order q3 we prove that if some power of each element in CG(a) is Engel in CG(a) for any a∈ A\#, then G is locally virtually nilpotent. Some analogues consequences of quantitative nature for finite groups are also obtained.