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Q: Quantenoptik

Q 50: Quantenkommunikation

Q 50.8: Vortrag

Freitag, 28. März 2003, 15:45–16:00, F102

Optimal unambiguous discrimination between density matrices — •Philippe Raynal¹, Steven van Enk², and Norbert Lütkenhaus¹ — ¹Quantum Information Theory Group, Zentrum für Moderne Optik, Erlangen-Nürnberg Universität, Staudtstr. 7/B2 D-91058 Erlangen — ²Bell Labs, Lucent Technologies 600-700 Mountain Ave, Murray Hill NJ 07974

Bounds on the degree of distinguishability of density matrices are an important tool in the analysis of quatum communications protocols. Here we consider the error free probabilistic discrimination. This problem has been studied so far only for pure states [1], though quite often bounds for mixed states are required. In our analysis, we reduce the general problem of discrimination of two density matrices to that where the two ranks r₁ and r₂ add up to the dimension of the Hilbert space. In that context, we review previously obtained results for pure states (r₁=1, r₂=1) [1] and pure and mixed states (r₁=1 r₂=2) [2]. Furthermore, we summarize our researche towards the solution of higher classes e.g. r₁=1 and r₂=N which builds on the techniques developped in [2].

[1] For review, see A. Chefles, arXiv:quant-ph/0010114 [2] Y. Sun, J.A. Bergou, M. Hillery, to appear in Physical Review A, arXiv:quant-ph/0112051