The Imprimitivity Fell Bundle
Abstract
Given a full right-Hilbert C*-module X over a C*-algebra A, the set KA(X) of A-compact operators on X is the (up to isomorphism) unique C*-algebra that is strongly Morita equivalent to the coefficient algebra A via X. As bimodule, KA(X) can also be thought of as the balanced tensor product XA Xop, and so the latter naturally becomes a C*-algebra. We generalize both of these facts to the world of Fell bundles over groupoids: Suppose B is a Fell bundle over a groupoid H and M an upper semi-continuous Banach bundle over a principal right H-space X. If M carries a right-action of B and a sufficiently nice B-valued inner product, then its imprimitivity Fell bundle KB(M)=MB Mop is a Fell bundle over the imprimitivity groupoid of X, and it is the unique Fell bundle that is equivalent to B via M. We show that KB(M) generalizes the 'higher order' compact operators of Abadie and Ferraro in the case of saturated bundles over groups, and that the theorem recovers results such as Kumjian's Stabilization trick.
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