A nilpotency criterion for some verbal subgroups

Abstract

The word w=[xi1,xi2,…,xik] is a simple commutator word if k≥ 2, i1≠ i2 and ij∈ \1,…,m\, for some m>1. For a finite group G, we prove that if i1 ≠ ij for every j≠ 1, then the verbal subgroup corresponding to w is nilpotent if and only if |ab|=|a||b| for any w-values a,b∈ G of coprime orders. We also extend the result to a residually finite group G, provided that the set of all w-values in G is finite.