K-theory and homotopies of 2-cocycles on higher-rank graphs

Abstract

This paper continues our investigation into the question of when a homotopy ω = \ωt\t ∈ [0,1] of 2-cocycles on a locally compact Hausdorff groupoid G gives rise to an isomorphism of the K-theory groups of the twisted groupoid C*-algebras: K*(C*(G, ω0)) K*(C*(G, ω1)). In particular, we build on work by Kumjian, Pask, and Sims to show that if G = G is the infinite path groupoid associated to a row-finite higher-rank graph with no sources, and \ct\t ∈ [0,1] is a homotopy of 2-cocycles on , then K*(C*(G, σc0)) K*(C*(G, σc1)), where σct denotes the 2-cocycle on G associated to the 2-cocycle ct on . We also prove a technical result (Theorem 3.3), namely that a homotopy of 2-cocycles on a locally compact Hausdorff groupoid G gives rise to an upper semi-continuous C*-bundle.