Nontraditional models of -Cartan pairs

Abstract

This paper explores the tension between multiple models and rigidity for groupoid C*-algebras. We begin by identifying -Cartan subalgebras D inside twisted groupoid C*-algebras C*r(G, ω), using similar techniques to those developed in [DGN+20]. When D = C0(G(0)), [BFPR21, Theorem 4.19] then gives another groupoid H, and a twist over H, so that D C0(H(0)) and C*r(G, ω) C*r(H; ). However, there is a close relationship between G and H. In addition to showing how to construct H and in terms of G and ω, we also show how to reconstruct G from H if we assume the 2-cocycle ω is trivial. This latter construction involves a new type of twisting datum, which may be of independent interest.