Extreme Points and Factorizability for New Classes of Unital Quantum Channels

Abstract

We introduce and study two new classes of unital quantum channels. The first class describes a 2-parameter family of channels given by completely positive (CP) maps M3( C) M3( C) which are both unital and trace-preserving. Almost every member of this family is factorizable and extreme in the set of CP maps which are both unital and trace-preserving, but is not extreme in either the set of unital CP maps or the set of trace-preserving CP maps. We also study a large class of maps which generalize the Werner-Holevo channel for d = 3 in the sense that they are defined in terms of partial isometries of rank d-1. Moreover, we extend this to maps whose Kraus operators have the form t |ej ej | V with V ∈ Md-1 ( C) unitary and t ∈ (-1,1). We show that almost every map in this class is extreme in both the set of unital CP maps and the set of trace-preserving CP maps. We analyze in detail a particularly interesting subclass which is extreme unless t = -1/(d-1). For d = 3, this includes a pair of channels which have a dual factorization in the sense that they can be obtained by taking the partial trace over different subspaces after using the same unitary conjugation in M3( C) M3( C).