Title :
A semidefinite program for distillable entanglement
Author_Institution :
AT&T Labs., Florham Park, NJ, USA
fDate :
11/1/2001 12:00:00 AM
Abstract :
We show that the maximum fidelity obtained by a positive partial transpose (p.p.t.) distillation protocol is given by the solution to a certain semidefinite program. This gives a number of new lower and upper bounds on p.p.t. distillable entanglement (and thus new upper bounds on 2-locally distillable entanglement). In the presence of symmetry, the semidefinite program simplifies considerably, becoming a linear program in the case of isotropic and Werner states. Using these techniques, we determine the p.p.t. distillable entanglement of asymmetric Werner states and “maximally correlated” states. We conclude with a discussion of possible applications of semidefinite programming to quantum codes and 1-local distillation
Keywords :
codes; linear programming; protocols; quantum communication; 1-local distillation; asymmetric Werner states; clones; distillable entanglement; hashing lower bound; isotropic states; linear program; maximally correlated states; maximum fidelity; positive partial transpose distillation protocol; quantum codes; semidefinite program; symmetry; upper bounds; Hilbert space; Information theory; Linear programming; Production; Protocols; Quantum entanglement; Quantum mechanics; Rain; Refining; Upper bound;
Journal_Title :
Information Theory, IEEE Transactions on
