Cartan subalgebras in self-similar graph C*-algebras

Abstract

For a self-similar graph (G, E), we find a distinguished subgroupoid of the associated path groupoid GG,E -- the symmetric cycline subgroupoid Ssym. If the acting group G is abelian, we show that Ssym is open, abelian, and normal. For G=Z, we describe the dual bundle Ssym of Ssym which can be used to provide a different groupoid model for the self-similar graph C*-algebra OZ, E C*r(GZ,E). For a large class of self-similar graphs (Z, E), we further prove that Ssym is maximal among open abelian subgroupoids of Iso(GZ,E) and closed in GZ,E, so that it gives rise to a Cartan subalgebra of OZ, E. This result seems new even for genuine actions. Our proofs heavily rely on careful studies of dynamical behaviours of cycline triples of (Z, E) and on a dynamical-flavour classification for the vertices of E. Some results hold in more general settings and may be of independent interest.