A dual graph construction for higher-rank graphs, and $K$-theory for finite 2-graphs
arXiv:math/0402126
Abstract
Given a $k$-graph $Î$ and an element $p$ of $\NN^k$, we define the dual $k$-graph, $pÎ$. We show that when $Î$ is row-finite and has no sources, the $C^*$-algebras $C^*(Î)$ and $C^*(pÎ)$ coincide. We use this isomorphism to apply Robertson and Steger's results to calculate the $K$-theory of $C^*(Î)$ when $Î$ is finite and strongly connected and satisfies the aperiodicity condition.
9 pages