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Main Author: Sutherland, Roderick
Format: Preprint
Published: 2021
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Online Access:https://arxiv.org/abs/2112.10022
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author Sutherland, Roderick
author_facet Sutherland, Roderick
contents This paper is concerned with the causally symmetric version of the familiar de Broglie-Bohm interpretation, this version allowing the spacelike nonlocality and the configuration space ontology of the original model to be avoided via the addition of retrocausality. Two different features of this alternative formulation are considered here. With regard to probabilities, it is shown that the model provides a derivation of the Born rule identical to that in Bohm's original formulation. This derivation holds just as well for a many-particle, entangled state as for a single particle. With regard to "certainties", the description of a particles spin is examined within the model and it is seen that a statistical description is no longer necessary once final boundary conditions are specified in addition to the usual initial state, with the particle then possessing a definite (but hidden) value for every spin component at intermediate times. These values are consistent with being the components of a single, underlying spin vector. The case of a two-particle entangled spin state is also examined and it is found that, due to the retrocausal aspect, each particle possesses its own definite spin during the entanglement, independent of the other particle. In formulating this picture, it is demonstrated how such a realistic model can preserve Lorentz invariance in the face of Bell's theorem and avoid the need for a preferred reference frame.
format Preprint
id arxiv_https___arxiv_org_abs_2112_10022
institution arXiv
publishDate 2021
record_format arxiv
spellingShingle Probabilities and certainties within a causally symmetric model
Sutherland, Roderick
Quantum Physics
History and Philosophy of Physics
This paper is concerned with the causally symmetric version of the familiar de Broglie-Bohm interpretation, this version allowing the spacelike nonlocality and the configuration space ontology of the original model to be avoided via the addition of retrocausality. Two different features of this alternative formulation are considered here. With regard to probabilities, it is shown that the model provides a derivation of the Born rule identical to that in Bohm's original formulation. This derivation holds just as well for a many-particle, entangled state as for a single particle. With regard to "certainties", the description of a particles spin is examined within the model and it is seen that a statistical description is no longer necessary once final boundary conditions are specified in addition to the usual initial state, with the particle then possessing a definite (but hidden) value for every spin component at intermediate times. These values are consistent with being the components of a single, underlying spin vector. The case of a two-particle entangled spin state is also examined and it is found that, due to the retrocausal aspect, each particle possesses its own definite spin during the entanglement, independent of the other particle. In formulating this picture, it is demonstrated how such a realistic model can preserve Lorentz invariance in the face of Bell's theorem and avoid the need for a preferred reference frame.
title Probabilities and certainties within a causally symmetric model
topic Quantum Physics
History and Philosophy of Physics
url https://arxiv.org/abs/2112.10022