Engel sinks of fixed points in finite groups

Abstract

For an element g of a group G, an Engel sink is a subset E(g) such that for every x∈ G all sufficiently long commutators [x,g,g,…,g] belong to E(g). Let q be a prime, let m be a positive integer and A an elementary abelian group of order q2 acting coprimely on a finite group G. We show that if for each nontrivial element a in A and every element g∈ CG(a) the cardinality of the smallest Engel sink E(g) is at most m, then the order of γ∞(G) is bounded in terms of m only. Moreover we prove that if for each a∈ A \1\ and every element g∈ CG(a), the smallest Engel sink E(g) generates a subgroup of rank at most m, then the rank of γ∞(G) is bounded in terms of m and q only.