JMP  Vol.6 No.13 , October 2015
A Chart of Conversion Supporting EPR Paradox vs. Bell’s Inequalities Violation
Author(s) Olivier Serret
Affiliation(s)
Cugnaux, France.
ABSTRACT
Quantum Mechanics formalism remains difficult to understand and sometimes is confusing, especially in the explanation of ERP paradox and of Bell’s inequalities with entanglement photons. So a chart of conversion, in which elements are named differently, is proposed. Next, experiment about Bell’s inequalities violation is described in another way, and we hope a clearer one. Main result is Bell’s inequalities would not be violated! The explanation would come from confusion between the definition of the correlation function S1, and a property S2. And consequently, Einstein, Podolski and Rosen would be right on the local “hidden” variable.

Cite this paper
Serret, O. (2015) A Chart of Conversion Supporting EPR Paradox vs. Bell’s Inequalities Violation. Journal of Modern Physics, 6, 1950-1960. doi: 10.4236/jmp.2015.613201.
References
[1]   Einstein, A., Podolsky, B. and Rosen, N. (1935) Can Quantum-Mechanical Description of Physical Reality Be Considered Complete?
http://www.drchinese.com/David/EPR.pdf

[2]   Bell, J.S. (1964) On the Einstein Podolsky Rosen Paradox.
https://www.bibnum.education.fr/sites/default/files/texte-bell-epr.pdf

[3]   Moatti, A. (2011) Les indispensables mathématiques et physiques pour tous. Editions Odile Jacob, 208-217.

[4]   Gribbin, J. (2010) Le chat de Schrödinger. Editions Flammarion, Paris.

[5]   Scarani, V. (2006) Initiation à la Physique Quantique. Editions Vuibert, Paris.

[6]   Aspect, A. (1983) Thèse de doctorat” 27 to 36.
http://tel.archives-ouvertes.fr/tel-00011844/

[7]   Serret, O. (2014) And If Bell’s Inequality Were Not Violated. Journal of Modern Physics, 5, 1360-1369.
http://dx.doi.org/10.4236/jmp.2014.514137

 
 
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