The ideal structures of self-similar k-graph C*-algebras

Abstract

Let (G, ) be a self-similar k-graph with a possibly infinite vertex set 0. We associate a universal C*-algebra OG, to (G,). The main purpose of this paper is to investigate the ideal structures of OG,. We prove that there exists a one-to-one correspondence between the set of all G-hereditary and G-saturated subsets of 0 and the set of all gauge-invariant and diagonal-invariant ideals of OG,. Under some conditions, we characterize all primitive ideas of OG,. Moreover, we describe the Jacobson topology of some concrete examples, which includes the C*-algebra of the product of odometers. On the way to our main results, we study self-similar P-graph C*-algebras in depth.