Please use this identifier to cite or link to this item: http://hdl.handle.net/10497/15244
Title: Coincidence Bell inequality for three three-dimensional systems
Authors: Acin, A.
Chen, Jing-Ling
Gisin, N.
Kaszlikowski, Dagomir
Kwek, Leong Chuan
Oh, Choo Hiap
Zukowski, Marek
Issue Date: 2004
Citation: Acin, A., Chen, J. L., Gisin, N., Kaszlikowski, D., Kwek, L. C., Oh, C. H., & ┼╗ukowski, M. (2004). Coincidence Bell inequality for three three-dimensional systems. Physical Review Letters, 92(25), 250404.
Abstract: We construct a Bell inequality for coincidence probabilities on a three three-dimensional (qutrit) system. We show that this inequality is violated when each observer measures two noncommuting observables, defined by the so-called unbiased six-port beam splitter, on a maximally entangled state of two qutrits. The strength of the violation agrees with the numerical results presented by Kaszlikowski et al. , quant-ph/0202019. It is proven that the inequality defines facets of the polytope of local variable models
URI: http://hdl.handle.net/10497/15244
ISSN: 0031-9007
Other Identifiers: 10.1103/PhysRevLett.92.250404
Website: http://dx.doi.org/10.1103/PhysRevLett.92.250404
Appears in Collections:Journal Articles

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