Von Neumann’s ‘No Hidden Variables’ Proof: A Re-Appraisal [Book Review]

Foundations of Physics 40 (9-10):1333-1340 (2010)
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Abstract

Since the analysis by John Bell in 1965, the consensus in the literature is that von Neumann’s ‘no hidden variables’ proof fails to exclude any significant class of hidden variables. Bell raised the question whether it could be shown that any hidden variable theory would have to be nonlocal, and in this sense ‘like Bohm’s theory.’ His seminal result provides a positive answer to the question. I argue that Bell’s analysis misconstrues von Neumann’s argument. What von Neumann proved was the impossibility of recovering the quantum probabilities from a hidden variable theory of dispersion free (deterministic) states in which the quantum observables are represented as the ‘beables’ of the theory, to use Bell’s term. That is, the quantum probabilities could not reflect the distribution of pre-measurement values of beables, but would have to be derived in some other way, e.g., as in Bohm’s theory, where the probabilities are an artefact of a dynamical process that is not in fact a measurement of any beable of the system

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10.1007/s10701-010-9480-9

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Jeffrey Bub
University of Maryland, College Park

Citations of this work

von Neumann’s Theorem Revisited.Pablo Acuña - 2021 - Foundations of Physics 51 (3):1-29.
Hilbert-style axiomatic completion: On von Neumann and hidden variables in quantum mechanics.Chris Mitsch - 2022 - Studies in History and Philosophy of Science Part A 95 (C):84-95.

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References found in this work

Hidden Variables and the Two Theorems of John Bell.N. David Mermin - 1993 - Reviews of Modern Physics 65:803--815.
Beables for quantum field theory.J. S. Bell - 1987 - In Basil J. Hiley & D. Peat (eds.), Quantum Implications: Essays in Honour of David Bohm. Methuen. pp. 227--234.

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