On finite groups with an automorphism of prime order whose fixed points have bounded Engel sinks

Abstract

A left Engel sink of an element g of a group G is a set E(g) such that for every x∈ G all sufficiently long commutators [...[[x,g],g],… ,g] belong to E(g). (Thus, g is a left Engel element precisely when we can choose E(g)=\ 1\.) We prove that if a finite group G admits an automorphism of prime order coprime to |G| such that for some positive integer m every element of the centralizer CG( ) has a left Engel sink of cardinality at most m, then the index of the second Fitting subgroup F2(G) is bounded in terms of m. A right Engel sink of an element g of a group G is a set R(g) such that for every x∈ G all sufficiently long commutators [...[[g,x],x],… ,x] belong to R(g). (Thus, g is a right Engel element precisely when we can choose R(g)=\ 1\.) We prove that if a finite group G admits an automorphism of prime order coprime to |G| such that for some positive integer m every element of the centralizer CG( ) has a right Engel sink of cardinality at most m, then the index of the Fitting subgroup F1(G) is bounded in terms of m.