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

Abstract

Let 1 r < n be integers. We give a proof that the group Aut(XnN, σn) of automorphisms of the one-sided shift on n letters embeds naturally as a subgroup Hn of the outer automorphism group Out(Gn,r) of the Higman-Thompson group Gn,r. From this, we can represent the elements of Aut(XnN, σn) by finite state non-initial transducers admitting a very strong synchronizing condition. Let H ∈ Hn and write |H| for the number of states of the minimal transducer representing H. We show that H can be written as a product of at most |H| torsion elements. This result strengthens a similar result of Boyle, Franks and Kitchens, where the decomposition involves more complex torsion elements and also does not support practical a priori estimates of the length of the resulting product. We also explore the number of foldings of de Bruijn graphs and give a counting result for these for word length 2 and alphabet size n. Finally, we offer new proofs of some known results about Aut(XnN, σn).