Aperiodicity and the primitive ideal space of a row-finite $k$-graph $C^*$-algebra
arXiv:1105.1208
Abstract
We describe the primitive ideal space of the $C^{\ast}$-algebra of a row-finite $k$-graph with no sources when every ideal is gauge invariant. We characterize which spectral spaces can occur, and compute the primitive ideal space of two examples. In order to do this we prove some new results on aperiodicity. Our computations indicate that when every ideal is gauge invariant, the primitive ideal space only depends on the 1-skeleton of the $k$-graph in question.
23 pages. Updated 30th June, 2012