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A Loophole of All ‘Loophole-Free’ Bell-Type Theorems
Foundations of Science 25 (4):971-985 (2020)
Abstract
Bell’s theorem cannot be proved if complementary measurements have to be represented by random variables which cannot be added or multiplied. One such case occurs if their domains are not identical. The case more directly related to the Einstein–Rosen–Podolsky argument occurs if there exists an ‘element of reality’ but nevertheless addition of complementary results is impossible because they are represented by elements from different arithmetics. A naive mixing of arithmetics leads to contradictions at a much more elementary level than the Clauser–Horne–Shimony–Holt inequality.My notes
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Citations of this work
A Note on Bell’s Theorem Logical Consistency.Justo Pastor Lambare & Rodney Franco - 2021 - Foundations of Physics 51 (4):1-17.
Imitating Quantum Probabilities: Beyond Bell’s Theorem and Tsirelson Bounds.Marek Czachor & Kamil Nalikowski - 2024 - Foundations of Science 29 (2):281-305.
Comment on “A Loophole of All “Loophole-Free” Bell-Type Theorems”.Justo Pastor Lambare - 2020 - Foundations of Science 26 (4):917-924.
Bell-Type Inequalities from the Perspective of Non-Newtonian Calculus.Michał Piotr Piłat - 2024 - Foundations of Science 29 (2):441-457.
References found in this work
On the Einstein Podolsky Rosen paradox.J. S. Bell - 1987 - In John Stewart Bell (ed.), Speakable and unspeakable in quantum mechanics: collected papers on quantum philosophy. New York: Cambridge University Press. pp. 14--21.
Concepts and Their Dynamics: A Quantum‐Theoretic Modeling of Human Thought.Diederik Aerts, Liane Gabora & Sandro Sozzo - 2013 - Topics in Cognitive Science 5 (4):737-772.
The Cellular Automaton Interpretation of Quantum Mechanics.Gerard T. Hooft - 2016 - Cham: Imprint: Springer.
CHSH Inequality: Quantum Probabilities as Classical Conditional Probabilities.Andrei Khrennikov - 2015 - Foundations of Physics 45 (7):711-725.
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