Metric adjusted skew information

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Zeitschriftentitel:	Proceedings of the National Academy of Sciences
Personen und Körperschaften:	Hansen, Frank
In:	Proceedings of the National Academy of Sciences, 105, 2008, 29, S. 9909-9916
Format:	E-Article
Sprache:	Englisch
veröffentlicht:	Proceedings of the National Academy of Sciences
Schlagwörter:	Multidisciplinary

author_facet	Hansen, Frank Hansen, Frank
author	Hansen, Frank
spellingShingle	Hansen, Frank Proceedings of the National Academy of Sciences Metric adjusted skew information Multidisciplinary
author_sort	hansen, frank
spelling	Hansen, Frank 0027-8424 1091-6490 Proceedings of the National Academy of Sciences Multidisciplinary http://dx.doi.org/10.1073/pnas.0803323105 <jats:p>We extend the concept of Wigner–Yanase–Dyson skew information to something we call “metric adjusted skew information” (of a state with respect to a conserved observable). This “skew information” is intended to be a non-negative quantity bounded by the variance (of an observable in a state) that vanishes for observables commuting with the state. We show that the skew information is a convex function on the manifold of states. It also satisfies other requirements, proposed by Wigner and Yanase, for an effective measure-of-information content of a state relative to a conserved observable. We establish a connection between the geometrical formulation of quantum statistics as proposed by Chentsov and Morozova and measures of quantum information as introduced by Wigner and Yanase and extended in this article. We show that the set of normalized Morozova–Chentsov functions describing the possible quantum statistics is a Bauer simplex and determine its extreme points. We determine a particularly simple skew information, the “λ-skew information,” parametrized by a λ ∈ (0, 1], and show that the convex cone this family generates coincides with the set of all metric adjusted skew informations.</jats:p> Metric adjusted skew information Proceedings of the National Academy of Sciences
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title	Metric adjusted skew information
title_unstemmed	Metric adjusted skew information
title_full	Metric adjusted skew information
title_fullStr	Metric adjusted skew information
title_full_unstemmed	Metric adjusted skew information
title_short	Metric adjusted skew information
title_sort	metric adjusted skew information
topic	Multidisciplinary
url	http://dx.doi.org/10.1073/pnas.0803323105
publishDate	2008
physical	9909-9916
description	<jats:p>We extend the concept of Wigner–Yanase–Dyson skew information to something we call “metric adjusted skew information” (of a state with respect to a conserved observable). This “skew information” is intended to be a non-negative quantity bounded by the variance (of an observable in a state) that vanishes for observables commuting with the state. We show that the skew information is a convex function on the manifold of states. It also satisfies other requirements, proposed by Wigner and Yanase, for an effective measure-of-information content of a state relative to a conserved observable. We establish a connection between the geometrical formulation of quantum statistics as proposed by Chentsov and Morozova and measures of quantum information as introduced by Wigner and Yanase and extended in this article. We show that the set of normalized Morozova–Chentsov functions describing the possible quantum statistics is a Bauer simplex and determine its extreme points. We determine a particularly simple skew information, the “λ-skew information,” parametrized by a λ ∈ (0, 1], and show that the convex cone this family generates coincides with the set of all metric adjusted skew informations.</jats:p>
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author	Hansen, Frank
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description	<jats:p>We extend the concept of Wigner–Yanase–Dyson skew information to something we call “metric adjusted skew information” (of a state with respect to a conserved observable). This “skew information” is intended to be a non-negative quantity bounded by the variance (of an observable in a state) that vanishes for observables commuting with the state. We show that the skew information is a convex function on the manifold of states. It also satisfies other requirements, proposed by Wigner and Yanase, for an effective measure-of-information content of a state relative to a conserved observable. We establish a connection between the geometrical formulation of quantum statistics as proposed by Chentsov and Morozova and measures of quantum information as introduced by Wigner and Yanase and extended in this article. We show that the set of normalized Morozova–Chentsov functions describing the possible quantum statistics is a Bauer simplex and determine its extreme points. We determine a particularly simple skew information, the “λ-skew information,” parametrized by a λ ∈ (0, 1], and show that the convex cone this family generates coincides with the set of all metric adjusted skew informations.</jats:p>
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imprint_str_mv	Proceedings of the National Academy of Sciences, 2008
institution	DE-L229, DE-D275, DE-Bn3, DE-Brt1, DE-Zwi2, DE-D161, DE-Gla1, DE-Zi4, DE-15, DE-Pl11, DE-Rs1, DE-105, DE-14, DE-Ch1
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spelling	Hansen, Frank 0027-8424 1091-6490 Proceedings of the National Academy of Sciences Multidisciplinary http://dx.doi.org/10.1073/pnas.0803323105 <jats:p>We extend the concept of Wigner–Yanase–Dyson skew information to something we call “metric adjusted skew information” (of a state with respect to a conserved observable). This “skew information” is intended to be a non-negative quantity bounded by the variance (of an observable in a state) that vanishes for observables commuting with the state. We show that the skew information is a convex function on the manifold of states. It also satisfies other requirements, proposed by Wigner and Yanase, for an effective measure-of-information content of a state relative to a conserved observable. We establish a connection between the geometrical formulation of quantum statistics as proposed by Chentsov and Morozova and measures of quantum information as introduced by Wigner and Yanase and extended in this article. We show that the set of normalized Morozova–Chentsov functions describing the possible quantum statistics is a Bauer simplex and determine its extreme points. We determine a particularly simple skew information, the “λ-skew information,” parametrized by a λ ∈ (0, 1], and show that the convex cone this family generates coincides with the set of all metric adjusted skew informations.</jats:p> Metric adjusted skew information Proceedings of the National Academy of Sciences
spellingShingle	Hansen, Frank, Proceedings of the National Academy of Sciences, Metric adjusted skew information, Multidisciplinary
title	Metric adjusted skew information
title_full	Metric adjusted skew information
title_fullStr	Metric adjusted skew information
title_full_unstemmed	Metric adjusted skew information
title_short	Metric adjusted skew information
title_sort	metric adjusted skew information
title_unstemmed	Metric adjusted skew information
topic	Multidisciplinary
url	http://dx.doi.org/10.1073/pnas.0803323105