On w-maximal groups

Abstract

Let w = w(x1,..., xn) be a word, i.e. an element of the free group F =<x1,...,xn> on n generators x1,..., xn. The verbal subgroup w(G) of a group G is the subgroup generated by the set \w (g1,...,gn) 1 | gi ∈ G, 1≤ i≤ n \ of all w-values in G. We say that a (finite) group G is w-maximal if |G:w(G)|> |H:w(H)| for all proper subgroups H of G and that G is hereditarily w-maximal if every subgroup of G is w-maximal. In this text we study w-maximal and hereditarily w-maximal (finite) groups.