Discrimination of two mixed quantum states with maximum confidence and minimum probability of inconclusive results

We study an optimized measurement that discriminates two mixed quantum states with maximum confidence for each conclusive result, thereby keeping the overall probability of inconclusive results as small as possible. When the rank of the detection operators associated with the two different conclusive outcomes does not exceed unity we obtain a general solution. As an application, we consider the discrimination of two mixed qubit states. Moreover, for the case of higher-rank detection operators we give a solution for particular states. The relation of the optimized measurement to other discrimination schemes is also discussed.

[1]  H. Yuen Quantum detection and estimation theory , 1978, Proceedings of the IEEE.

[2]  I. D. Ivanović How to differentiate between non-orthogonal states , 1987 .

[3]  D. Dieks Overlap and distinguishability of quantum states , 1988 .

[4]  A. Peres How to differentiate between non-orthogonal states , 1988 .

[5]  A. Shimony,et al.  Optimal distinction between two non-orthogonal quantum states , 1995 .

[6]  S. Barnett,et al.  Strategies for discriminating between non-orthogonal quantum states , 1998 .

[7]  Anthony Chefles Quantum state discrimination , 2000 .

[8]  J. Bergou,et al.  Optimum unambiguous discrimination between subsets of nonorthogonal quantum states , 2001, quant-ph/0112051.

[9]  U. Herzog,et al.  Minimum-error discrimination between subsets of linearly dependent quantum states , 2001, quant-ph/0112171.

[10]  J. Fiurášek,et al.  Optimal discrimination of mixed quantum states involving inconclusive results , 2002, quant-ph/0208126.

[11]  K. Hunter Measurement does not always aid state discrimination , 2002, quant-ph/0211148.

[12]  N. Lutkenhaus,et al.  Reduction theorems for optimal unambiguous state discrimination of density matrices , 2003, quant-ph/0304179.

[13]  Yonina C. Eldar,et al.  Optimal quantum detectors for unambiguous detection of mixed states (9 pages) , 2003, quant-ph/0312061.

[14]  Mark Hillery,et al.  Quantum filtering and discrimination between sets of Boolean functions. , 2003, Physical review letters.

[15]  T. Rudolph,et al.  Unambiguous discrimination of mixed states , 2003, quant-ph/0303071.

[16]  Ulrike Herzog Minimum-error discrimination between a pure and a mixed two-qubit state , 2004 .

[17]  Ulrike Herzog,et al.  Distinguishing mixed quantum states: Minimum-error discrimination versus optimum unambiguous discrimination , 2004 .

[18]  M. Ying,et al.  Unambiguous discrimination between mixed quantum states , 2004, quant-ph/0403147.

[19]  U. Herzog,et al.  Optimum unambiguous discrimination of two mixed quantum states , 2005, quant-ph/0502117.

[20]  Mark Hillery,et al.  Optimal unambiguous filtering of a quantum state : An instance in mixed state discrimination , 2005 .

[21]  S. Barnett,et al.  Maximum confidence quantum measurements. , 2006, Physical review letters.

[22]  J. Bergou,et al.  Optimal unambiguous discrimination of two subspaces as a case in mixed-state discrimination , 2006, quant-ph/0602093.

[23]  Xiang-Fa Zhou,et al.  Unambiguous discrimination of mixed states: A description based on system-ancilla coupling , 2006, quant-ph/0611095.

[24]  U. Herzog Optimum unambiguous discrimination of two mixed states and application to a class of similar states , 2006, quant-ph/0611087.

[25]  N. Lutkenhaus,et al.  Optimal unambiguous state discrimination of two density matrices: A second class of exact solutions , 2007, quant-ph/0702022.

[26]  Stephen M. Barnett,et al.  No-signaling bound on quantum state discrimination , 2008 .

[27]  S. Barnett,et al.  Quantum state discrimination , 2008, 0810.1970.