Quantization of A0(K)-Spaces

Abstract

In this paper, we study L1-matrix convex sets \Kn\ in *-locally convex spaces and show that every C*-ordered operator space is complete isometrically, completely isomorphic to \A0(Kn, Mn(V))\ for a suitable L1-matrix convex set \Kn\. Further, we generalize the notion of regular embedding of a compact convex set to L1-regular embedding of L1-matrix convex set. Using L1-regular embedding of L1-convex set, we find conditions under which A0(Kn, Mn(V)) is an abstract operator system.