The path space of a higher-rank graph

Abstract

We construct a locally compact Hausdorff topology on the path space of a finitely aligned k-graph . We identify the boundary-path space ∂ as the spectrum of a commutative C*-subalgebra D of C*(). Then, using a construction similar to that of Farthing, we construct a finitely aligned k-graph with no sources in which is embedded, and show that ∂ is homeomorphic to a subset of ∂ . We show that when is row-finite, we can identify C*() with a full corner of C*(), and deduce that D is isomorphic to a corner of D. Lastly, we show that this isomorphism implements the homeomorphism between the boundary-path spaces.