A simple proof of Bell's inequality

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Abstract

Bell's theorem is a fundamental result in quantum mechanics: it discriminates between quantum mechanics and all theories where probabilities in measurement results arise from the ignorance of pre-existing local properties. We give an extremely simple proof of Bell's inequality: a single figure suffices. This simplicity may be useful in the unending debate of what exactly the Bell inequality means, since the hypothesis at the basis of the proof become extremely transparent. It is also a useful didactic tool, as the Bell inequality can be explained in a single intuitive lecture.

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Hidden-Variable Example Based upon Data Rejection

Philip M. Pearle (1970)

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Ultra-bright source of polarization-entangled photons

Andrew White, Edo Waks, Paul Kwiat … (1998)

Using the process of spontaneous parametric down conversion in a novel two-crystal geometry, one can generate a source of polarization-entangled photon pairs which is orders of magnitude brighter than previous sources. We have measured a high level of entanglement between photons emitted over a relatively large collection angle, and over a 10-nm bandwidth. As a demonstration of the source intensity, we obtained a 242-

$\sigma$ violation of Bell's inequalities in less than three minutes.

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Hidden Variables and the Two Theorems of John Bell

N. Mermin (2018)

Although skeptical of the prohibitive power of no-hidden-variables theorems, John Bell was himself responsible for the two most important ones. I describe some recent versions of the lesser known of the two (familar to experts as the "Kochen-Specker theorem") which have transparently simple proofs. One of the new versions can be converted without additional analysis into a powerful form of the very much better known "Bell's Theorem", thereby clarifying the conceptual link between these two results of Bell.

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Publication date Created: 20 December 2012

Publication date Updated: 2013-06-01

Article

DOI: 10.1119/1.4823600

ArXiV ID: 1212.5214

SO-VID: f750c36a-45fd-4b94-b3b4-2d059159f828

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http://arxiv.org/licenses/nonexclusive-distrib/1.0/

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Journal reference L. Maccone, Am. J. Phys. 81, 854 (2013)

Comments Version accepted for publication on American Journal of Physics. Appendix B added, along with various clarifications on the nomenclature

Categories quant-ph physics.hist-ph

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A simple proof of Bell's inequality

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Most cited references 8

Hidden-Variable Example Based upon Data Rejection

Ultra-bright source of polarization-entangled photons

Hidden Variables and the Two Theorems of John Bell

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