The classical limit of quantum theory

Synthese 50 (2):167 - 212 (1982)
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Abstract

Both physicists and philosophers claim that quantum mechanics reduces to classical mechanics as 0, that classical mechanics is a limiting case of quantum mechanics. If so, several formal and non-formal conditions must be satisfied. These conditions are satisfied in a reduction using the Wigner transformation to map quantum mechanics onto the classical phase plane. This reduction does not, however, assist in providing an adequate metaphysical interpretation of quantum theory.

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10.1007/bf00416901

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Citations of this work

Non-integrability and mixing in quantum systems: On the way to quantum chaos.Mario Castagnino & Olimpia Lombardi - 2007 - Studies in History and Philosophy of Science Part B: Studies in History and Philosophy of Modern Physics 38 (3):482-513.
Non-integrability and mixing in quantum systems: On the way to quantum chaos.Mario Castagnino & Olimpia Lombardi - 2007 - Studies in History and Philosophy of Science Part B: Studies in History and Philosophy of Modern Physics 38 (3):482-513.
¿Qué tan cuántica es la química cuántica?Hernán Accorinti & Juan Camilo Martínez González - 2019 - Metatheoria – Revista de Filosofía E Historia de la Ciencia 9:5--18.

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References found in this work

The Structure of Scientific Revolutions.Thomas S. Kuhn - 1962 - Chicago, IL: University of Chicago Press. Edited by Ian Hacking.
The Structure of Scientific Revolutions.Thomas Samuel Kuhn - 1962 - Chicago: University of Chicago Press. Edited by Otto Neurath.
Explanation and scientific understanding.Michael Friedman - 1974 - Journal of Philosophy 71 (1):5-19.
The Problem of Hidden Variables in Quantum Mechanics.Simon Kochen & E. P. Specker - 1967 - Journal of Mathematics and Mechanics 17:59--87.
Approaches to reduction.Kenneth F. Schaffner - 1967 - Philosophy of Science 34 (2):137-147.

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