On the mixed-unitary rank of quantum channels

Abstract

In the theory of quantum information, the mixed-unitary quantum channels, for any positive integer dimension n, are those linear maps that can be expressed as a convex combination of conjugations by n× n complex unitary matrices. We consider the mixed-unitary rank of any such channel, which is the minimum number of distinct unitary conjugations required for an expression of this form. We identify several new relationships between the mixed-unitary rank~N and the Choi rank~r of mixed-unitary channels, the Choi rank being equal to the minimum number of nonzero terms required for a Kraus representation of that channel. Most notably, we prove that the inequality N≤ r2-r+1 is satisfied for every mixed-unitary channel (as is the equality N=2 when r=2), and we exhibit the first known examples of mixed-unitary channels for which N>r. Specifically, we prove that there exist mixed-unitary channels having Choi rank d+1 and mixed-unitary rank 2d for infinitely many positive integers d, including every prime power d. We also examine the mixed-unitary ranks of the mixed-unitary Werner--Holevo channels.