Quantum informational properties of the Landau-Streater channel

Abstract

We study the Landau--Streater quantum channel : B(Hd) B(Hd), whose Kraus operators are proportional to the irreducible unitary representation of SU(2) generators of dimension d. We establish SU(2) covariance for all d and U(3) covariance for d=3. Using the theory of angular momentum, we explicitly find the spectrum and the minimal output entropy of . Negative eigenvalues in the spectrum of indicate that the channel cannot be obtained as a result of Hermitian Markovian quantum dynamics. Degradability and antidegradability of the Landau--Streater channel is fully analyzed. We calculate classical and entanglement-assisted capacities of . Quantum capacity of vanishes if d=2,3 and is strictly positive if d ≥slant 4. We show that the channel does not annihilate entanglement and preserves entanglement of some states with Schmidt rank 2 if d ≥slant 3.