Non-simple purely infinite Steinberg Algebras with applications to Kumjian-Pask algebras

Abstract

In this paper, we characterize properly purely infinite Steinberg algebras AK(G) for strongly effective, ample Hausdorff groupoids G. As an application, when is a strongly aperiodic k-graph, we show that the notions of pure infiniteness and proper pure infiniteness are equivalent for the Kumjian-Pask algebra KPK(), which may be determined by the proper infiniteness of vertex idempotents. In particular, for unital cases, we give simple graph-theoretic criteria for the (proper) pure infiniteness of KPK(). Furthermore, since the complex Steinberg algebra AC(G) is a dense subalgebra of the reduced groupoid C*-algebra C*r(G), we focus on the problem that "when does the proper pure infiniteness of AC(G) imply that of C*r(G) in the C*-sense?". In particular, we show that if the Kumjian-Pask algebra KPC() is purely infinite, then so is C*() in the sense of Kirchberg-Rrdam.