Hostname: page-component-cd9895bd7-jkksz Total loading time: 0 Render date: 2024-12-26T05:34:25.289Z Has data issue: false hasContentIssue false

Non-local Hidden Variable Theories and Bell's Inequality

Published online by Cambridge University Press:  28 February 2022

Jeffrey Bub
Affiliation:
University of Western Ontario
Vandana Shiva
Affiliation:
University of Western Ontario

Extract

The conceptually puzzling features of quantum mechanics as a statistical theory all have their source in the impossibility of relating the probability assignments defined by the quantum state to distributions over determinate values of the physical magnitudes. While some interpretations of quantum mechanics, as well as “hidden variable” modifications of the theory, have proposed several constructions for assigning values to magnitudes (beyond the value assignments defined by the quantum state alone), a variety of theorems exist which impose severe restrictions on such theoretical constructions.

This note will deal with Bell's proof (in [2]), that any hidden variable theory satisfying a physically reasonable locality condition is characterized by an inequality which is inconsistent with the quantum statistics. Bell's result has initiated a series of experiments designed to refute the entire class of local hidden variable theories. We show that Bell's inequality actually characterizes a feature of hidden variable theories which is much weaker than locality in the sense considered physically motivated.

Type
Part II. Philosophy of Physics
Copyright
Copyright © 1978 by the Philosophy of Science Association

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

Belinfante, F.J. A Survey of Hidden Variable Theories. New York: Pergamon Press, 1973.Google Scholar
Bell, J.S.On the Einstein-Podolsky-Rosen Paradox.Physics 1(1964): 195200.CrossRefGoogle Scholar
Bell, J.S.On the Problem of Hidden Variables in Quantum Mechanics.Reviews of Modern Physics 38(1966): 447452.CrossRefGoogle Scholar
Bohm, D. and Bub, J.A Proposed Solution of the Measurement Problem in Quantum Mechanics by a Hidden Variable Theory.Reviews of Modern Physics 38(1966): 453469.CrossRefGoogle Scholar
Bub, J.Randomness and Locality in Quantum Mechanics.” In Logic and Probability in Quantum Mechanics. (Synthese Library Volume 78). Edited by Suppes, P. Dordrecht: D. Reidel, 1976. Pages 397420.CrossRefGoogle Scholar
Bub, J.Hidden Variables and Locality.Foundations of Physics 6(1976): 511525.CrossRefGoogle Scholar
Bub, J. “The Measurement Problem of Quantum Mechanics.” In Problems in the Foundations of Physics. (Proceedings of the International School of Physics “Enrico Fermi”, Varenna (1977), Course LXVII). Forthcoming.Google Scholar
Clauser, J.F., Horne, M.A., Shimony, A., and Holt, R.A.Proposed Experiment to Test Local Hidden-Variable Theories.Physical Review Letters 23(1969): 880884.CrossRefGoogle Scholar
Fine, A.On the Completeness of Quantum Mechanics.” In Logic and Probability in Quantum Mechanics. (Synthese Library Volume 78). Edited by Suppes, P. Dordrecht: D. Reidel, 1976. Pages 179193.CrossRefGoogle Scholar
Gleason, A.M.Measures on the Closed Subspaces of Hilbert Space.Journal of Mathematics and Mechanics 6(1957): 885893.Google Scholar
Jammer, M. The Philosophy of Quantum Mechanics. New York: Wiley, 1974.Google Scholar
Jauch, J.M. and Piron, C.Can Hidden Variables be Excluded in Quantum Mechanics?Helvetica Physica Acta 36(1963): 827837.Google Scholar
Kochen, S. and Specker, E.P.The Problem of Hidden Variables in Quantum Mechanics.Journal of Mathematics and Mechanics 17(1967): 5987.Google Scholar
Neumann, J. von Mathematical Foundations of Quantum Mechanics. (trans.) Beyer, R.T.. Princeton: Princeton University Press, 1955. (Originally published as Mathematische Grundlagen der Quantenmechanik. Berlin: Julius Springer-Verlag, 1932.).Google Scholar
Tutsch, J.H.Collapse Time for the Bohm-Bub Hidden Variable Theory.Reviews of Modern Physics 40(1968): 232234.CrossRefGoogle Scholar
Tutsch, J.H.Simultaneous Measurement in the Bohm-Bub Hidden Variable Theory.Physical Review 183(1969): 11161131.CrossRefGoogle Scholar
Tutsch, J.H.Mathematics of the Measurement Problem in Quantum Mechanics.Journal of Mathematical Physics 12(1971): 17111718.CrossRefGoogle Scholar
Wiener, N. and Siegel, A. “The Differential-Space Theory of Quantum Systems.” Nuovo Cimento (Supplementary Volume II, Series X). 1955: 982-1003.CrossRefGoogle Scholar
Wigner, E.P.On Hidden Variables and Quantum Mechanical Probabilities.American Journal of Physics. 38(1970): 10051009.CrossRefGoogle Scholar