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Connes' embedding problem and Tsirelson's problem

Publikation: Beitrag in FachzeitschriftArtikelForschungPeer-Review

Autorschaft

  • M. Junge
  • M. Navascues
  • C. Palazuelos
  • D. Perez-Garcia
  • R. F. Werner

Organisationseinheiten

Details

OriginalspracheEnglisch
Seiten (von - bis)012102
Seitenumfang1
FachzeitschriftJ. Math. Phys.
Jahrgang52
Ausgabenummer1
PublikationsstatusVeröffentlicht - 2011

Abstract

We show that Tsirelson's problem concerning the set of quantum correlations and Connes' embedding problem on finite approximations in von Neumann algebras (known to be equivalent to Kirchberg's QWEP conjecture) are essentially equivalent. Specifically, Tsirelson's problem asks whether the set of bipartite quantum correlations generated between tensor product separated systems is the same as the set of correlations between commuting C*-algebras. Connes' embedding problem asks whether any separable II$_1$ factor is a subfactor of the ultrapower of the hyperfinite II$_1$ factor. We show that an affirmative answer to Connes' question implies a positive answer to Tsirelson's. Conversely, a positive answer to a matrix valued version of Tsirelson's problem implies a positive one to Connes' problem.

Zitieren

Connes' embedding problem and Tsirelson's problem. / Junge, M.; Navascues, M.; Palazuelos, C. et al.
in: J. Math. Phys., Jahrgang 52, Nr. 1, 2011, S. 012102.

Publikation: Beitrag in FachzeitschriftArtikelForschungPeer-Review

Junge, M, Navascues, M, Palazuelos, C, Perez-Garcia, D, Scholz, VB & Werner, RF 2011, 'Connes' embedding problem and Tsirelson's problem', J. Math. Phys., Jg. 52, Nr. 1, S. 012102. https://doi.org/10.1063/1.3514538
Junge, M., Navascues, M., Palazuelos, C., Perez-Garcia, D., Scholz, V. B., & Werner, R. F. (2011). Connes' embedding problem and Tsirelson's problem. J. Math. Phys., 52(1), 012102. https://doi.org/10.1063/1.3514538
Junge M, Navascues M, Palazuelos C, Perez-Garcia D, Scholz VB, Werner RF. Connes' embedding problem and Tsirelson's problem. J. Math. Phys. 2011;52(1):012102. doi: 10.1063/1.3514538
Junge, M. ; Navascues, M. ; Palazuelos, C. et al. / Connes' embedding problem and Tsirelson's problem. in: J. Math. Phys. 2011 ; Jahrgang 52, Nr. 1. S. 012102.
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abstract = "We show that Tsirelson's problem concerning the set of quantum correlations and Connes' embedding problem on finite approximations in von Neumann algebras (known to be equivalent to Kirchberg's QWEP conjecture) are essentially equivalent. Specifically, Tsirelson's problem asks whether the set of bipartite quantum correlations generated between tensor product separated systems is the same as the set of correlations between commuting C*-algebras. Connes' embedding problem asks whether any separable II$_1$ factor is a subfactor of the ultrapower of the hyperfinite II$_1$ factor. We show that an affirmative answer to Connes' question implies a positive answer to Tsirelson's. Conversely, a positive answer to a matrix valued version of Tsirelson's problem implies a positive one to Connes' problem.",
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AU - Junge, M.

AU - Navascues, M.

AU - Palazuelos, C.

AU - Perez-Garcia, D.

AU - Scholz, V. B.

AU - Werner, R. F.

N1 - Funding information: This work was supported in part by Spanish grants I-MATH, MTM2008-01366, S2009/ESP-1594, the European projects QUEVADIS and CORNER, DFG grant We1240/12-1 and National Science Foundation grant DMS-0901457. VBS would like to thank Fabian Furrer for stimulating discussions.

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N2 - We show that Tsirelson's problem concerning the set of quantum correlations and Connes' embedding problem on finite approximations in von Neumann algebras (known to be equivalent to Kirchberg's QWEP conjecture) are essentially equivalent. Specifically, Tsirelson's problem asks whether the set of bipartite quantum correlations generated between tensor product separated systems is the same as the set of correlations between commuting C*-algebras. Connes' embedding problem asks whether any separable II$_1$ factor is a subfactor of the ultrapower of the hyperfinite II$_1$ factor. We show that an affirmative answer to Connes' question implies a positive answer to Tsirelson's. Conversely, a positive answer to a matrix valued version of Tsirelson's problem implies a positive one to Connes' problem.

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