Dual spaces of operator systems

Abstract

This article is to give an infinite dimensional analogue of a result of Choi and Effros. We say that an (not necessarily unital) operator system T is dualizable if one can find an equivalent dual matrix norm on the dual space T* such that under this dual matrix norm and the canonical dual matrix cone, T* becomes a dual operator system. We show that "a complete" operator system T is dualizable if and only if M∞(T)sa satisfies a bounded decomposition property. In this case, \|f\|d:= \\|[fi,j(xk,l)]\|: x∈ Mn(T)+; \|x\|≤ 1; n∈ N\, is the largest dual matrix norm that is equivalent to and dominated by the original dual matrix norm on T* that turns it into a dual operator system, denoted by Td. Td is again dualizable. For every completely positive completely bounded map φ:S T between dualizable operator systems, there is a unique weak-*-continuous completely positive completely bounded map φd:Td Sd which is compatible with the dual map φ*. This gives a full and faithful functor from the category of dualizable operator systems to that of dualizable dual operator systems. Moreover, we will verify that that if S is either a C*-algebra or a unital operator system, then S is dualizable and the canonical weak-*-homeomorphism from the unital operator system S** to the operator system (Sd)d is a completely isometric complete order isomorphism. Furthermore, the category of C*-algebras and that of unital "complete" operator systems can be regarded as full subcategories of the category of dual operator systems.