Stinespring's construction as an adjunction

Abstract

Given a representation of a unital C*-algebra A on a Hilbert space H, together with a bounded linear map V:K from some other Hilbert space, one obtains a completely positive map on A via restriction using the adjoint action associated to V. We show this restriction forms a natural transformation from a functor of C*-algebra representations to a functor of completely positive maps. We exhibit Stinespring's construction as a left adjoint of this restriction. Our Stinespring adjunction provides a universal property associated to minimal Stinespring dilations and morphisms of Stinespring dilations. We use these results to prove the purification postulate for all finite-dimensional C*-algebras.