David Bourget (Western Ontario)
David Chalmers (ANU, NYU)
Rafael De Clercq
Jack Alan Reynolds
Learn more about PhilPapers
Contrary to Bell’s theorem it is demonstrated that with the use of classical probability theory the quantum correlation can be approximated. Hence, one may not conclude from experiment that all local hidden variable theories are ruled out by a violation of inequality result.
|Keywords||Quantum mechanics Classical probability theory Bell's theorem Approximate integration (triangle)|
|Categories||categorize this paper)|
Setup an account with your affiliations in order to access resources via your University's proxy server
Configure custom proxy (use this if your affiliation does not provide a proxy)
|Through your library||
References found in this work BETA
No references found.
Citations of this work BETA
No citations found.
Similar books and articles
Leon Cohen (1966). Can Quantum Mechanics Be Formulated as a Classical Probability Theory? Philosophy of Science 33 (4):317-322.
Meir Hemmo (2007). Quantum Probability and Many Worlds. Studies in History and Philosophy of Science Part B 38 (2):333-350.
John F. Halpin (1991). What is the Logical Form of Probability Assignment in Quantum Mechanics? Philosophy of Science 58 (1):36-60.
David Wallace, Implications of Quantum Theory in the Foundations of Statistical Mechanics [2001 Online-Only].
Peter J. Lewis (2010). Probability in Everettian Quantum Mechanics. Manuscrito 33:285--306.
Itamar Pitowsky (2003). Betting on the Outcomes of Measurements: A Bayesian Theory of Quantum Probability. Studies in History and Philosophy of Science Part B 34 (3):395-414.
Guillaume Adenier (ed.) (2007). Quantum Theory, Reconsideration of Foundations 4: Växjö (Sweden), 11-16 June, 2007. American Institute of Physics.
Neal Grossman (1972). Quantum Mechanics and Interpretations of Probability Theory. Philosophy of Science 39 (4):451-460.
Peter Kosso (2000). Quantum Mechanics and Realism. Foundations of Science 5 (1):47-60.
László E. Szabó, The Einstein--Podolsky--Rosen Argument and the Bell Inequalities. Internet Encyclopedia of Philosophy.
Ingemar Nordin (1979). Determinism and Locality in Quantum Mechanics. Synthese 42 (1):71 - 90.
Itamar Pitowsky (2003). Probability and Nonlocality in Many Minds Interpretations of Quantum Mechanics. British Journal for the Philosophy of Science 54 (2):225 - 243.
Added to index2011-06-08
Total downloads63 ( #24,283 of 1,102,846 )
Recent downloads (6 months)1 ( #296,987 of 1,102,846 )
How can I increase my downloads?