Tensor functors between Morita duals of fusion categories

Abstract

Given a fusion category C and an indecomposable C-module category M, the fusion category C*M of C-module endofunctors of M is called the (Morita) dual fusion category of C with respect to M. We describe tensor functors between two arbitrary duals C*M and D*N in terms of data associated to C and D. We apply the results to G-equivariantizations of fusion categories and group-theoretical fusion categories. We describe the orbits of the action of the Brauer-Picard group on the set of module categories and we propose a categorification of the Rosenberg-Zelinsky sequence for fusion categories.