C*-extreme entanglement breaking maps on operator systems

Abstract

Let E denote the set of all unital entanglement breaking (UEB) linear maps defined on an operator system S ⊂ Md and, mapping into Mn. As it turns out, the set E is not only convex in the classical sense but also in a quantum sense, namely it is C*-convex. The main objective of this article is to describe the C*-extreme points of this set E. By observing that every EB map defined on the operator system S dilates to a positive map with commutative range and also extends to an EB map on Md, we show that the C*-extreme points of the set E are precisely the UEB maps that are maximal in the sense of Arveson (A and A69) and that they are also exactly the linear extreme points of the set E with commutative range. We also determine their explicit structure, thereby obtaining operator system generalizations of the analogous structure theorem and the Krein-Milman type theorem given in BDMS. As a consequence, we show that C*-extreme (UEB) maps in E extend to C*-extreme UEB maps on the full algebra. Finally, we obtain an improved version of the main result in BDMS, which contains various characterizations of C*-extreme UEB maps between the algebras Md and Mn.