On groupoids and C*-algebras from self-similar actions

Abstract

Given a self-similar groupoid action (G,E) on the path space of a finite graph, we study the associated Exel-Pardo \'etale groupoid G(G,E) and its C*-algebra C*(G,E). We review some facts about groupoid actions, skew products and semi-direct products and generalize a result of Renault about similarity of groupoids which resembles Takai duality. We also describe a general strategy to compute the K-theory of C*(G,E) and the homology of G(G,E) in certain cases and illustrate with an example.