Non-unital operator systems that are dual spaces

Abstract

We will give an abstract characterization of an arbitrary self-adjoint weak*-closed subspace of L(H) (equipped with the induced matrix norm, the induced matrix cone and the induced weak*-topology). In order to do this, we obtain a matrix analogues of a result of Bonsall for *-operator spaces equipped with closed matrix cones. On our way, we observe that for a *-vector X equipped with a matrix cone (in particular, when X is an operator system or the dual space of an operator system), a linear map φ:X Mn is completely positive if and only if linear functional [xi,j]i,j Σi,j=1n φ(xi,j)i,j on Mn(X) is positive.