On the right and left 4-Engel elements

Abstract

In this paper we study left and right 4-Engel elements of a group. In particular, we prove that <a, ab> is nilpotent of class at most 4, whenever a is any element and b 1 are right 4-Engel elements or a 1 are left 4-Engel elements and b is an arbitrary element of G. Furthermore we prove that for any prime p and any element a of finite p-power order in a group G such that a 1∈ L4(G), a4, if p=2, and ap, if p is an odd prime number, is in the Baer radical of G.