ENTANGLEMENT MAPPING VS. QUANTUM CONDITIONAL PROBABILITY OPERATOR
2011; World Scientific; Linguagem: Italiano
10.1142/9789814343763_0018
ISSN1793-5121
AutoresDariusz Chruściński, Andrzej Kossakowski, Takashi Matsuoka, Masanori Ohya,
Tópico(s)Quantum Computing Algorithms and Architecture
ResumoQP-PQ: Quantum Probability and White Noise AnalysisQuantum Bio-Informatics IV, pp. 223-236 (2011) No AccessENTANGLEMENT MAPPING VS. QUANTUM CONDITIONAL PROBABILITY OPERATORDARIUSZ CHRUŚCIŃSKI, ANDRZEJ KOSSAKOWSKI, TAKASHI MATSUOKA, and MASANORI OHYADARIUSZ CHRUŚCIŃSKIInstitute of Physics, Nicolaus Copernicus University, Grudziadzka 5/7, 87-100 Torun, Poland, ANDRZEJ KOSSAKOWSKIInstitute of Physics, Nicolaus Copernicus University, Grudziadzka 5/7, 87-100 Torun, Poland, TAKASHI MATSUOKAFaculty of Management of Administration and Information, Tokyo University of Science, Suwa, Toyohira 5000-1, Chino City, Nagano 391-0292, Japan, and MASANORI OHYADepartment of Information Science, Tokyo University of Science, Yamazaki 2641, Noda City, Chiba 278-8501, Japanhttps://doi.org/10.1142/9789814343763_0018Cited by:1 PreviousNext AboutSectionsPDF/EPUB ToolsAdd to favoritesDownload CitationsTrack CitationsRecommend to Library ShareShare onFacebookTwitterLinked InRedditEmail Abstract: The relation between two methods which construct the density operator on composite system is shown. One of them is called an entanglement mapping and another one is called a quantum conditional probability operator. On the base of this relation we discuss the quantum correlation by means of some types of quantum entropy. FiguresReferencesRelatedDetailsCited By 1Quantum correlation with entanglement and mutual entropyTakashi Matsuoka4 August 2011 | P-Adic Numbers, Ultrametric Analysis, and Applications, Vol. 3, No. 3 Quantum Bio-Informatics IVMetrics History PDF download
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