On Faces of the set of Quantum Channels

Abstract

A linear map L from Cn × n into Cn × n is called a quantum channel if it is completely positive and trace preserving. The set Ln of all such quantum channels is known to be a compact convex set. While the extreme points of Ln can be characterized, not much is known about the structure of its higher dimensional faces. Using the so called Choi matrix Z(L) associated with the quantum channel L, we compute the maximum dimension of a proper face of Ln, and in addition the possible dimensions of faces generated by L when rank \ Z(L)=2 .