Recognition and constructive membership for purely hyperbolic groups acting on trees

Abstract

We present an algorithm which takes as input a finite set X of automorphisms of a simplicial tree, and outputs a generating set X' of X such that either X is purely hyperbolic and X' is a free basis of X , or X' contains a non-trivial elliptic element. As a special case, the algorithm decides whether a finitely generated group acting on a locally finite tree is discrete and free. This algorithm, which is based on Nielsen's reduction method, works by repeatedly applying Nielsen transformations to X to minimise the generators of X' with respect to a given pre-well-ordering. We use this algorithm to solve the constructive membership problem for finitely generated purely hyperbolic automorphism groups of trees. We provide a Magma implementation of these algorithms, and report its performance.