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Main Author: Gzyl, Henryk
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2512.00497
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author Gzyl, Henryk
author_facet Gzyl, Henryk
contents In this work we reexamine the EPR paradox for composite systems with a finite number of levels. The analysis emphasizes the connection between measurements and conditional probabilities. This connection implies that when a measurement is performed, the microscopic states compatible with the measurement is different from the class of all possible microscopic states, therefore the new quantum state and the probability distribution change and become a function of the observable being measured. Therefore, the predictions that one can make given the knowledge of the result of a measurement change. Systems with finitely many levels are simpler to describe because the analysis is not encumbered by the mathematical technicalities of the continuous case, the underlying physical interpretations are the same and the experimental setups used to test quantum mechanics with the paradox in mind finitely many levels.e same.
format Preprint
id arxiv_https___arxiv_org_abs_2512_00497
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle On the EPR paradox in systems with finite number of levels (Revised)
Gzyl, Henryk
Quantum Physics
In this work we reexamine the EPR paradox for composite systems with a finite number of levels. The analysis emphasizes the connection between measurements and conditional probabilities. This connection implies that when a measurement is performed, the microscopic states compatible with the measurement is different from the class of all possible microscopic states, therefore the new quantum state and the probability distribution change and become a function of the observable being measured. Therefore, the predictions that one can make given the knowledge of the result of a measurement change. Systems with finitely many levels are simpler to describe because the analysis is not encumbered by the mathematical technicalities of the continuous case, the underlying physical interpretations are the same and the experimental setups used to test quantum mechanics with the paradox in mind finitely many levels.e same.
title On the EPR paradox in systems with finite number of levels (Revised)
topic Quantum Physics
url https://arxiv.org/abs/2512.00497