Placek, Tomasz and Gomori, Marton (2017) Small probability space formulation of Bell's theorem. [Preprint]
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Abstract
A small probability space representation of quantum mechanical probabilities is defined as a collection of Kolmogorovian probability spaces, each of which is associated with a context of a maximal set of compatible measurements, that portrays quantum probabilities as Kolmogorovian probabilities of classical events. Bell's theorem is stated and analyzed in terms of the small probability space formalism.
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Item Type:  Preprint  

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Keywords:  Bell's theorem, Bell's inequalities, Fine, Pitowsky, Kolmogorovian representation, quantum probability, conditional probability, small probability space  
Subjects:  Specific Sciences > Physics > Quantum Mechanics  
Depositing User:  Mr. Marton Gomori  
Date Deposited:  14 Jan 2017 22:13  
Last Modified:  14 Jan 2017 22:13  
Item ID:  12749  
Subjects:  Specific Sciences > Physics > Quantum Mechanics  
Date:  9 January 2017  
URI:  http://philsciarchive.pitt.edu/id/eprint/12749 
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Small probability space formulation of Bell's theorem. (deposited 11 Jan 2017 15:20)
 Small probability space formulation of Bell's theorem. (deposited 14 Jan 2017 22:13) [Currently Displayed]
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