A categorical interpretation of Morita equivalence for dynamical von Neumann algebras

Abstract

GRep CorrLet be a locally compact quantum group and (M, α) a -W*-algebra. The object of study of this paper is the W*-category (M) of normal, unital -representations of M on Hilbert spaces endowed with a unitary -representation. This category has a right action of the category ()= (C) for which it becomes a right ()-module W*-category. Given another -W*-algebra (N, β), we denote the category of normal *-functors (N) (M) compatible with the ()-module structure by Fun()((N), (M)) and we denote the category of -M-N-correspondences by Corr(M,N). We prove that there are canonical functors P: (M,N) Fun()((N), (M)) and Q: Fun()((N), (M)) Corr(M,N) such that Q P id. We use these functors to show that the -dynamical von Neumann algebras (M, α) and (N, β) are equivariantly Morita equivalent if and only if (N) and (M) are equivalent as ()-module-W*-categories. Specializing to the case where is a compact quantum group, we prove that moreover P Q id, so that the categories (M,N) and Fun()((N), (M)) are equivalent. This is an equivariant version of the Eilenberg-Watts theorem for actions of compact quantum groups on von Neumann algebras.