Higman-Thompson Like Groups of Higher Rank Graph C*-Algebras

Abstract

Let be a row-finite and source-free higher rank graph with finitely many vertices. In this paper, we define the Higman-Thompson like group of the graph C*-algebra O to be a special subgroup of the unitary group in . It is shown that is closely related to the topological full groups of the groupoid associated with . Some properties of are also investigated. We show that its commutator group is simple and that has only one nontrivial uniformly recurrent subgroup if is aperiodic and strongly connected. Furthermore, if is single-vertex, then we prove that is C*-simple and also provide an explicit description on the stabilizer uniformly recurrent subgroup of under a natural action on the infinite path space of .