On the Width of Verbal Subgroups of the Groups of Triangular Matrices over a Field of Arbitrary Characteristic

Abstract

The width (G,W) of the verbal subgroup v(G,W) of a group G defined by a collection of group words W is the smallest number m in N +∞ such that every element of v(G,W) is can be represented as the product of at most m words in W evaluated on the group G and their inverses. Recall that every verbal subgroup of the group Tn (K) of triangular matrices over an arbitrary field K can be defined by just one word: an outer commutator word or a power word. We prove that for every outer commutator word w the equality (Tn (K),w)=1 holds on the group Tn (K) and that if w=xs then (Tn(K),w)=1 except in two cases: (1) the field K is finite and s is divisible by the characteristic p of K but not by |K|-1; (2) the field K is finite and s=pt (|K|-1)u r for r,t,u∈ N with n pt +3, while r not divisible by p. In these cases the width equals 2. For finitary triangular groups the situation is similar, but in the second case the restriction n pt +3 is superfluous.