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Entanglement and Nonlocality are Inequivalent for Any Number of Parties

Abstract

Understanding the relation between nonlocality and entanglement is one of the fundamental problems in quantum physics. In the bipartite case, it is known that these two phenomena are inequivalent, as there exist entangled states of two parties that do not violate any Bell inequality. However, except for a single example of an entangled three-qubit state that has a local model, almost nothing is known about such a relation in multipartite systems. We provide a general construction of genuinely multipartite entangled states that do not display genuinely multipartite nonlocality, thus proving that entanglement and nonlocality are inequivalent for any number of parties.

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Authors (4)

  • Photo of  R. Augusiak

    R. Augusiak

    • ICFO—Institut de Ciencies Fotoniques
  • Photo of dr hab. inż. Maciej Demianowicz

    Maciej Demianowicz dr hab. inż.

    • ICFO—Institut de Ciencies Fotoniques
  • Photo of  J. Tura

    J. Tura

    • ICFO—Institut de Ciencies Fotoniques
  • Photo of  A. Acín

    A. Acín

    • ICFO—Institut de Ciencies Fotoniques

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Details

Category:
Articles
Type:
artykuł w czasopiśmie wyróżnionym w JCR
Published in:
PHYSICAL REVIEW LETTERS no. 115, pages 1 - 5,
ISSN: 0031-9007
Language:
English
Publication year:
2015
Bibliographic description:
Augusiak R., Demianowicz M., Tura J., Acín A.: Entanglement and Nonlocality are Inequivalent for Any Number of Parties// PHYSICAL REVIEW LETTERS. -Vol. 115, (2015), s.1-5
DOI:
Digital Object Identifier (open in new tab) 10.1103/physrevlett.115.030404
Verified by:
Gdańsk University of Technology

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