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The Kochen-Specker theorem and Bell's theorem: An algebraic approach [Book Review]
Foundations of Physics 25 (6):925-949 (1995)
Abstract
In this paper we present a systematic formulation of some recent results concerning the algebraic demonstration of the two major no-hidden-variables theorems for N spin-1/2 particles. We derive explicitly the GHZ states involved and their associated eigenvalues. These eigenvalues turn out to be undefined for N=∞, this fact providing a new proof showing that the nonlocality argument breaks down in the limit of a truly infinite number of particlesOther Versions
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References found in this work
Nonlocality and the Kochen-Specker paradox.Peter Heywood & Michael L. G. Redhead - 1983 - Foundations of Physics 13 (5):481-499.
Quantum logic, realism, and value definiteness.Allen Stairs - 1983 - Philosophy of Science 50 (4):578-602.
Nonlocality and Gleason's lemma. Part I. Deterministic theories.H. R. Brown & G. Svetlichny - 1990 - Foundations of Physics 20 (11):1379-1387.
Nonlocality and Gleason's lemma. Part 2. Stochastic theories.Andrew Elby - 1990 - Foundations of Physics 20 (11):1389-1397.
Going Beyond Bell's Theorem.Daniel M. Greenberger, Michael A. Horne & Anton Zeilenger - 1989 - In Menas Kafatos (ed.), Bell’s Theorem, Quantum Theory and Conceptions of the Universe. Kluwer Academic Publishers. pp. 69--72.
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