Extremal covariant positive operator valued measures

被引:20
|
作者
Chiribella, G
D'Ariano, GM
机构
[1] Dipartimento Fis A Volta, Unita Pavia, Ist Nazl Fis Mat, QUIT Grp, I-27100 Pavia, Italy
[2] Northwestern Univ, Dept Elect & Comp Engn, Evanston, IL 60208 USA
来源
JOURNAL OF MATHEMATICAL PHYSICS | 2004年 / 45卷 / 12期
关键词
D O I
10.1063/1.1806262
中图分类号
O4 [物理学];
学科分类号
0702 ;
摘要
We consider the convex set of positive operator valued measures (POVM) which are covariant under a finite dimensional unitary projective representation of a group. We derive a general characterization for the extremal points, and provide bounds for the ranks of the corresponding POVM densities, also relating extremality to uniqueness and stability of optimized measurements. Examples of applications are given. (C) 2004 American Institute of Physics.
引用
下载
收藏
页码:4435 / 4447
页数:13
相关论文
共 50 条
  • [31] Positive-Operator-Valued Measures and Projection-Valued Measures of Noncommutative Time Operators
    Harald Atmanspacher
    Anton Amann
    International Journal of Theoretical Physics, 1998, 37 : 629 - 650
  • [32] Positive-operator-valued measures and projection-valued measures of noncommutative time operators
    Atmanspacher, H
    Amann, A
    INTERNATIONAL JOURNAL OF THEORETICAL PHYSICS, 1998, 37 (02) : 629 - 650
  • [33] Positive operator valued measures and the quantum Monty Hall problem
    Zander, Claudia
    Casas, Montserrat
    Plastino, Angel
    Plastino, Angel R.
    ANAIS DA ACADEMIA BRASILEIRA DE CIENCIAS, 2006, 78 (03): : 417 - 422
  • [34] Conditional expectations and dilations of positive operator-valued measures
    Hensz-Cha̧dzyńska E.
    Jajte R.
    Paszkiewicz A.
    Journal of Mathematical Sciences, 1998, 92 (3) : 3896 - 3899
  • [35] Simulating Positive-Operator-Valued Measures with Projective Measurements
    Oszmaniec, Michal
    Guerini, Leonardo
    Wittek, Peter
    Acin, Antonio
    PHYSICAL REVIEW LETTERS, 2017, 119 (19)
  • [36] COMPATIBILITY OF OBSERVABLES REPRESENTED BY POSITIVE OPERATOR-VALUED MEASURES
    KRUSZYNSKI, P
    DEMUYNCK, WM
    JOURNAL OF MATHEMATICAL PHYSICS, 1987, 28 (08) : 1761 - 1763
  • [37] Positive Operator-Valued Measures in Quantum Decision Theory
    Yukalov, Vyacheslav I.
    Sornette, Didier
    QUANTUM INTERACTION (QI 2014), 2015, 8951 : 146 - 161
  • [38] ON OPERATOR VALUED MEASURES
    Mclaren, Darian
    Plosker, Sarah
    Ramsey, Christopher
    HOUSTON JOURNAL OF MATHEMATICS, 2020, 46 (01): : 201 - 226
  • [39] Block-coherence measures and coherence measures based on positive-operator-valued measures
    Liangxue Fu
    Fengli Yan
    Ting Gao
    Communications in Theoretical Physics, 2022, 74 (02) : 55 - 63
  • [40] Block-coherence measures and coherence measures based on positive-operator-valued measures
    Fu, Liangxue
    Yan, Fengli
    Gao, Ting
    COMMUNICATIONS IN THEORETICAL PHYSICS, 2022, 74 (02)
12345