Pure infiniteness and ideal structure of C*-algebras associated to Fell bundles

Abstract

We investigate structural properties of the reduced cross-sectional algebra C*r(B) of a Fell bundle B over a discrete group G. Conditions allowing one to determine the ideal structure of C*r(B) are studied. Notions of aperiodicity, paradoxicality and B-infiniteness for the Fell bundle B are introduced and investigated by themselves and in relation to the partial dynamical system dual to B. Several criteria of pure infiniteness of C*r(B) are given. It is shown that they generalize and unify corresponding results obtained in the context of crossed products, by the following duos: Laca, Spielberg; Jolissaint, Robertson; Sierakowski, Rrdam; Giordano, Sierakowski and Ortega, Pardo. For exact, separable Fell bundles satisfying the residual intersection property primitive ideal space of C*r(B) is determined. The results of the paper are shown to be optimal when applied to graph C*-algebras. Applications to a class of Exel-Larsen crossed products are presented.