An automata theoretic proof that Out(T) Z/2Z and some embedding results for Out(V)

Abstract

In a seminal paper, Brin demonstrates that the outerautomorphism group of Thompson group T is isomorphic to the cyclic group of order two. In this article, building on characterisation of automorphisms of the Higman-Thompson groups Gn,r and Tn,r as groups of transducers, we give a new proof, automata theoretic in nature, of Brin's result. We also demonstrate that the group of outerautomorphisms of Thompson's group V = G2,1 contains an isomorphic copy of Thompson's group F. This extends a result of the author demonstrating that whenever n 3 and 1 r < n the outerautomorphism groups of Gn,r and Tn,r contain an isomorphic copy of F.