A tautological continuous field of Roe bimodules

Abstract

We generalize the notion of a continuous field of C*-algebras to that of Hilbert C*-bimodules. Given a partially ordered set P and a monotonically non-decreasing family of ternary rings of operators (TROs) assigned to the points of P, we equip P with a certain zero-dimensional Hausdorff topology and use a certain compactification γ P to get the base space for a continuous field of Hilbert C*-bimodules over γ P. As a motivating example, we consider the set D(X,Y) of coarse equivalence classes of metrics on the disjoint union of two metric spaces, X and Y. Each such class gives rise to a uniform Roe bimodule, a TRO linking the uniform Roe algebras of X and Y. The resulting family of TROs is non-decreasing with respect to the natural partial order on D(X,Y) and thus yields a tautological continuous field of Hilbert C*-bimodules over γ D(X,Y).

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