Quantum Violation: Beyond Clauser-Horne-Shimony-Holt Inequality
Abstract
The best upper bound for the violation of the Clauser-Horne-Shimony-Holt (CHSH) inequality was first derived by Tsirelson. For increasing number of 1 valued observables on both sites of the correlation experiment, Tsirelson obtained the Grothendieck's constant (KG≈ 1.730.06) as a limit for the maximal violation. In this paper, we construct a generalization of the CHSH inequality with four 1 valued observables on both sites of a correlation experiment and show that the quantum violation approaching 1.58. Moreover, we estimate the maximal quantum violation of a correlation experiment for large and equal number of 1 valued observables on both sites. In this case, the maximal quantum violation converges to 3≈1.73 for very large n, which coincides with the approximate value of Grothendieck's constant.
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