Small probability space formulation of Bell's theorem

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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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Citations of this work

Classicality and Bell’s theorem.Márton Gömöri & Carl Hoefer - 2023 - European Journal for Philosophy of Science 13 (3):1-24.

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References found in this work

Bell’s Theorem: What It Takes.Jeremy Butterfield - 1992 - British Journal for the Philosophy of Science 43 (1):41-83.
The principle of the common cause.Miklós Redei, Gabor Hofer-Szabo & Laszlo Szabo - 2013 - Cambridge, U.K: Cambridge University Press. Edited by Miklós Rédei & László E. Szabó.
Branching space-time analysis of the GHZ theorem.Nuel Belnap & László E. Szabó - 1996 - Foundations of Physics 26 (8):989-1002.

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