Dependence over subgroups of free groups

Abstract

Given a finitely generated subgroup H of a free group F, we present an algorithm which computes g1,…,gm∈ F, such that the set of elements g∈ F, for which there exists a non-trivial H-equation having g as a solution, is, precisely, the disjoint union of the double cosets H Hg1H ·s HgmH. Moreover, we present an algorithm which, given a finitely generated subgroup H≤slant F and an element g∈ F, computes a finite set of elements of H * x that generate (as a normal subgroup) the ``ideal" IH(g) H * x of all ``polynomials" w(x), such that w(g)=1. The algorithms, as well as the proofs, are based on the graph-theory techniques introduced by Stallings and on the more classical combinatorial techniques of Nielsen transformations. The key notion here is that of dependence of an element g∈ F on a subgroup H. We also study the corresponding notions of dependence sequence and dependence closure of a subgroup.