Automorphisms of shift spaces and the Higman-Thompson groups: the two-sided case

Abstract

In this article, we further explore the nature of a connection between the groups of automorphisms of full shift spaces and the groups of outer automorphisms of the Higman--Thompson groups \Gn,r\. We show that the quotient of the group of automorphisms of the (two-sided) shift dynamical system Aut(XnN, σn) by its centre embeds as a particular subgroup Ln of the outer automorphism group Out(Gn,n-1) of Gn,n-1. It follows by a result of Ryan that we have the following central extension: σn Aut(XnN, σn) Ln where here, σn Z. We prove that this short exact sequence splits if and only if n is not a proper power, and, in all cases, we compute the 2-cocycles and 2-coboundaries for the extension. We also use this central extension to prove that for 1 r < n, the groups Out(Gn,r) are centreless and have undecidable order problem. Note that the group Out(Gn,n-1) consists of finite transducers (combinatorial objects arising in automata theory), and elements of the group Ln are easily characterised within Out(Gn,n-1) by a simple combinatorial property. In particular, the short exact sequence allows us to determine a new and efficient purely combinatorial representation of elements of Aut(XnN, σn), and we demonstrate how to compute products using this new representation.