On finite groups containing an element whose Engel sink is small

Abstract

For an element g of a group G, a right Engel sink of g is a subset of G containing all sufficiently long commutators [...[[g ,x],x],… ,x] for all x∈ G. A left Engel sink of g is a subset of G containing all sufficiently long commutators [...[[x ,g ],g ],… ,g] for all x∈ G. Using the classification of finite simple groups we prove that if a finite group G has an element g such that G=[G,g], then the order of G is bounded in terms of a right Engel sink of g, as well as in terms of a left Engel sink of g. Earlier Guralnick and Tracey proved this in the case where g is an involution without using the classification.