Certain commutator subgroups of free groups

We re-cast in a more combinatorial and computational form the topological approach of J. Stallings to the study of subgroups of free groups.  2002 Elsevier Science (USA) Convention 2.6 (Reduced Words and Reduced Paths). Recall that a word w in the alphabet = X ∪ X -1 is said to be freely reduced if

We introduce the notion of a multiplicity-free subgroup of a reductive algebraic group in arbitrary characteristic. This concept already exists in the work of Kramer for compact connected Lie groups. We give a classification of reductive multiplicity-free subgroups, and as a consequence obtain a sim

Let F be a free group of finite rank m. It is proven that for every n G 2 there m Ž . Ž . Ž . is a non-trivial word w x , . . . , x such that if values w U , w V of n 1 n n n n n Ž . w x , . . . , x on two n-tuples U and V of elements of F are conjugate and n 1 n n n m non-trivial then these n-tuple