Conciseness on normal subgroups and new concise words from lower central and derived words

Abstract

Let w=w(x1,…,xr) be a lower central word or a derived word. We show that the word w(u1,…,ur) is concise whenever u1,…,ur are non-commutator words in disjoint sets of variables, thus proving a generalized version of a conjecture of Azevedo and Shumyatsky. This applies in particular to words of the form w(x1n1,…,xrnr), where the ni are non-zero integers. Our approach is via the study of values of w on normal subgroups, and in this setting we obtain the following result: if N1,…,Nr are normal subgroups of a group G and the set of all values w(g1,…,gr) with gi∈ Ni is finite then also the subgroup generated by these values, i.e. w(N1,…,Nr), is finite.