Fell bundles associated to groupoid morphisms
Abstract
Given a continuous open surjective morphism π :G H of \'etale groupoids with amenable kernel, we construct a Fell bundle E over H and prove that its C*-algebra C*r(E) is isomorphic to C*r(G). This is related to results of Fell concerning C*-algebraic bundles over groups. The case H=X, a locally compact space, was treated earlier by Ramazan. We conclude that C*r(G) is strongly Morita equivalent to a crossed product, the C*-algebra of a Fell bundle arising from an action of the groupoid H on a C*-bundle over H0. We apply the theory to groupoid morphisms obtained from extensions of dynamical systems and from morphisms of directed graphs with the path lifting property. We also prove a structure theorem for abelian Fell bundles.
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