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Reformulation of the hidden variable problem using entropic measure of uncertainty
Synthese 73 (2):371 - 379 (1987)
Abstract
Using a recently introduced entropy-like measure of uncertainty of quantum mechanical states, the problem of hidden variables is redefined in operator algebraic framework of quantum mechanics in the following way: if A, , E(A), E() are von Neumann algebras and their state spaces respectively, (, E()) is said to be an entropic hidden theory of (A, E(A)) via a positive map L from onto A if for all states E(A) the composite state ° L E() can be obtained as an average over states in E() that have smaller entropic uncertainty than the entropic uncertainty of . It is shown that if L is a Jordan homomorphism then (, E()) is not an entropic hidden theory of (A, E(A)) via L.Author's Profile
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Citations of this work
Bell's inequalities, relativistic quantum field theory and the problem of hidden variables.Miklós Rédei - 1991 - Philosophy of Science 58 (4):628-638.
References found in this work
On the Einstein Podolsky Rosen paradox.J. S. Bell - 2004 - In John Stewart Bell (ed.), Speakable and unspeakable in quantum mechanics: collected papers on quantum philosophy. New York: Cambridge University Press. pp. 14--21.
On the physical significance of the locality conditions in the bell arguments.Jon P. Jarrett - 1984 - Noûs 18 (4):569-589.
Correlations and Physical Locality.Arthur Fine - 1980 - PSA: Proceedings of the Biennial Meeting of the Philosophy of Science Association 1980:535 - 562.
Stochastic Einstein-locality and the bell theorems.Geoffrey Hellman - 1982 - Synthese 53 (3):461 - 504.
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