Separable representations of higher-rank graphs

Abstract

In this monograph we undertake a comprehensive study of separable representations (as well as their unitary equivalence classes) of C*-algebras associated to strongly connected finite k-graphs . We begin with the representations associated to the -semibranching function systems introduced by Farsi, Gillaspy, Kang, and Packer in FGKP, by giving an alternative characterization of these systems which is more easily verified in examples. We present a variety of such examples, one of which we use to construct a new faithful separable representation of any row-finite source-free k-graph. Next, we analyze the monic representations of C*-algebras of finite k-graphs. We completely characterize these representations, generalizing results of Dutkay and Jorgensen dutkay-jorgensen-monic and Bezuglyi and Jorgensen bezuglyi-jorgensen for Cuntz and Cuntz-Krieger algebras respectively. We also describe a universal representation for non-negative monic representations of finite, strongly connected k-graphs. To conclude, we characterize the purely atomic and permutative representations of k-graph C*-algebras, and discuss the relationship between these representations and the classes of representations introduced earlier.