On the rank of a verbal subgroup of a finite group

Abstract

We show that if w is a multilinear commutator word and G a finite group in which every metanilpotent subgroup generated by w-values is of rank at most r, then the rank of the verbal subgroup w(G) is bounded in terms of r and w only. In the case where G is soluble we obtain a better result -- if G is a finite soluble group in which every nilpotent subgroup generated by w-values is of rank at most r, then the rank of w(G) is at most r+1.