Partial list of bipartite Bell inequalities with four binary settings
| Authors: | N Brunner, N Gisin |
| Journal: | Physics Letters A 372, 3162–3167 (2008) |
| DOI: | http://dx.doi.org/10.1016/j.physleta.2008.01.052 |
| Abstract: | We give a partial list of 26 tight Bell inequalities for the case where Alice and Bob choose among four two-outcome measurements. All tight Bell inequalities with less settings are reviewed as well. For each inequality we compute numerically the maximal quantum violation, the resistance to noise and the minimal detection efficiency required for closing the detection loophole. Surprisingly, most of these inequalities are outperformed by the CHSH inequality. © 2008 Elsevier B.V. All rights reserved. |
| File: | i4422_pla.pdf |
BibTeX Source
@Article{Brunner2008,
author = "N. Brunner and N. Gisin",
title = "Partial list of bipartite Bell inequalities with four binary settings",
journal = "Physics Letters A",
year = "2008",
volume = "372",
pages = "3162--3167",
number = "18",
abstract = "We give a partial list of 26 tight Bell inequalities for the case where Alice and
Bob choose among four two-outcome measurements. All tight Bell inequalities with
less settings are reviewed as well. For each inequality we compute numerically the
maximal quantum violation, the resistance to noise and the minimal detection
efficiency required for closing the detection loophole. Surprisingly, most of these
inequalities are outperformed by the CHSH inequality. (c) 2008 Elsevier B.V. All
rights reserved.",
doi = "10.1016/j.physleta.2008.01.052",
owner = "cc",
sn = "0375-9601",
timestamp = "2010.08.20",
ut = "WOS:000255621800006",
}
