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Quantum Sufficiency in the Operator Algebra Framework

dc.contributor.authorŁuczak, Andrzej
dc.date.accessioned2015-04-11T13:38:09Z
dc.date.available2015-04-11T13:38:09Z
dc.date.issued2013-08-01
dc.identifier.issn1572-9575
dc.identifier.urihttp://hdl.handle.net/11089/7866
dc.description.abstractThe paper is devoted to the investigation of the notion of sufficiency in quantum statistics. Three kinds of this notion are considered: plain sufficiency (called simply: sufficiency), Petz’s sufficiency, and Umegaki’s sufficiency. The problem of the existence and structure of the minimal sufficient subalgebra is analyzed in some detail, conditions yielding equivalence of the three modes of sufficiency are considered, and quantum Basu’s theorem is obtained. Moreover, it is shown that an interesting “factorization theorem” of Jenčová and Petz needs some corrections to hold true.pl_PL
dc.language.isoenpl_PL
dc.publisherSpringerpl_PL
dc.relation.ispartofseriesInternational Journal of Theoretical Physics;Volume 53, Issue 10
dc.rightsUznanie autorstwa 3.0 Polska*
dc.rights.urihttp://creativecommons.org/licenses/by/3.0/pl/*
dc.titleQuantum Sufficiency in the Operator Algebra Frameworkpl_PL
dc.typeArticlepl_PL
dc.page.number3423-3433pl_PL
dc.contributor.authorAffiliationŁódz University, Faculty of Mathematics and Computer Sciencepl_PL
dc.referencesJenčová, A., Petz, D. (2006) Sufficiency in quantum statistical inference. Commun. Math. Phys. 263: pp. 259-276pl_PL
dc.referencesJenčová, A., Petz, D. (2006) Sufficiency in quantum statistical inference. A survey with examples. Infin. Dimens. Anal. Quantum Probab. Relat. Top. 9: pp. 331-352pl_PL
dc.referencesOhya, M., Petz, D. (1993) Quantum Theory and Its Use. Springer, Berlinpl_PL
dc.referencesPetz, D. (1986) Sufficient subalgebras and the relative entropy of states of a von Neumann algebra. Commun. Math. Phys. 105: pp. 123-131pl_PL
dc.referencesPetz, D. (1988) Sufficiency of channels over von Neumann algebras. Q. J. Math. 39: pp. 907-1008pl_PL
dc.referencesKümmerer, B., Nagel, R. (1979) Mean ergodic semigroups on W ∗-algebras. Acta Sci. Math. 41: pp. 151-159pl_PL
dc.referencesThomsen, K.E. (1985) Invariant states for positive operator semigroups. Stud. Math. 81: pp. 285-291pl_PL
dc.referencesUmegaki, H. (1959) Conditional expectation in an operator algebra, III. Kodai Math. Semin. Rep. 11: pp. 51-64pl_PL
dc.referencesUmegaki, H. (1962) Conditional expectation in an operator algebra, IV (entropy and information). Kodai Math. Semin. Rep. 14: pp. 59-85pl_PL
dc.contributor.authorEmailanluczak@math.uni.lodz.plpl_PL


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