论文信息 - Tight Bell inequality for d-outcome measurements correlations

Tight Bell inequality for d-outcome measurements correlations

In this paper we prove that the inequality introduced by Collins, Gisin, Linden, Massar and Popescu [11] is tight, or in other words, it is a facet of the convex polytope generated by all local-realistic joint probabilities of d outcomes. This means that this inequality is optimal. We also show that, for correlation functions generalized to deal with three-outcome measurements, the satisfyability of this inequality is a necessary and sufficient condition for the existence of a local-realistic model accounting for them.

Ll Masanes

[1] J. Latorre,et al. Quantum nonlocality in two three-level systems , 2001, quant-ph/0111143.

[2] Jose L. Cereceda. ON THE EQUIVALENCE OF THE CH AND CHSH INEQUALITIES FOR TWO THREE-LEVEL SYSTEMS , 2002 .

[3] M. Wolf,et al. All-multipartite Bell-correlation inequalities for two dichotomic observables per site , 2001, quant-ph/0102024.

[4] A. Peres. All the Bell Inequalities , 1998, quant-ph/9807017.

[5] S. Massar,et al. Bell inequalities for arbitrarily high-dimensional systems. , 2001, Physical review letters.

[6] G. Ziegler. Lectures on Polytopes , 1994 .

[7] K. Svozil,et al. Optimal tests of quantum nonlocality , 2000, quant-ph/0011060.