The bicategory of topological correspondences

Abstract

It is known that a topological correspondence \((X,λ)\) from a locally compact groupoid with a Haar system \((G,α)\) to another one, \((H,β)\), produces a \(C*\)-correspondence \(H(X,λ)\) from \(C*(G,α)\) to \(C*(H,β)\). In one of our earlier article we described composition two topological correspondences. In the present article, we prove that second countable locally compact Hausdorff topological groupoids with Haar systems form a bicategory \(T\) when equipped with a topological correspondences as 1-arrows. The equivariant homeomorphisms of topological correspondences preserving the families of measures are the 2-arrows in~\(T\). One the other hand, it well-known that \(C*\)-algebras form a bicateogry \(C\) with \(C*\)-correspondences as 1-arrows. The 2-arrows in \(C\) are unitaries of Hilbert \(C*\)-modules that intertwine the representations. In this article, we show that a topological correspondence going to a \(C*\)-one is a bifunctor~\(TC\).