Functoriality of the KSGNS Construction for Intertwiners of Strict Positive C*-Correspondences

Abstract

We prove that the KSGNS construction can be viewed as an endofunctor on a category whose objects are positive C*-correspondences from a fixed C*-algebra and morphisms are given by intertwiners which account for automorphisms of the fixed C*-algebra. Using this perspective, we provide a functorial perspective for strict positive equivariant C*-correspondences of C*-dynamical systems and show every strict positive equivariant C*-correspondence of C*-dynamical systems unitarily uniquely dilates under the KSGNS construction to an equivariant C*-correspondence of the dynamical systems.