Difference between revisions of "A Counter-Example to Bell's Theorem with a 'Softened' Singularity"
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The present paper gives a counter-example to Bell's theorem based on the common probability densities such as standard normal (Gaussian) and uniform. The reason for violating the Bell inequalities lies in the ?softening? of functions similar to the Dirac delta such that they can be 'hidden' inside a sign function. | The present paper gives a counter-example to Bell's theorem based on the common probability densities such as standard normal (Gaussian) and uniform. The reason for violating the Bell inequalities lies in the ?softening? of functions similar to the Dirac delta such that they can be 'hidden' inside a sign function. | ||
− | [[Category:Scientific Paper]] | + | [[Category:Scientific Paper|counter-example bell 's theorem 'softened ' singularity]] |
Latest revision as of 09:54, 1 January 2017
Scientific Paper | |
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Title | A Counter-Example to Bell\'s Theorem with a \'Softened\' Singularity |
Author(s) | J F Geurdes |
Keywords | Einstein, Podolsky and Rosen paradox, Bell's theorem, probability theory |
Published | 2006 |
Journal | Galilean Electrodynamics |
Volume | 17 |
Number | 1 |
Pages | 16-20 |
Abstract
The present paper gives a counter-example to Bell's theorem based on the common probability densities such as standard normal (Gaussian) and uniform. The reason for violating the Bell inequalities lies in the ?softening? of functions similar to the Dirac delta such that they can be 'hidden' inside a sign function.