Abstract
Quantum mechanics is both a new mechanics and a new probability theory. The probabilities obtained as an output of quantum theoretical computations are interpreted by the physicists exactly in the same way as the probabilities computed with more traditional tools (namely, in most cases, as expected relative frequencies).
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Bibliography
L. Accardi, Non commutative Markov chains, Proceedings, School in Math. Phys., Camerino 1974.
L. Accardi, Non relativistic quantum mechanics as a noncommutative Markov process, Advances in Math. 20 (1976), 32 9–366.
L. Accardi, Non commutative Markov chains with a preassigned evolution: an application to the quantum theory of measurement, Advances in Math. 1978.
L. Accardi, Quantum Markov processes, Proceedings, Symp. “Mathematical problems in the quantum theory of irreversible processes”, Arco Felice, 1978.
L. Accardi, On the quantum Feynman-Kec formula, Rendiconti Seminario Matematico e Fisico, Università di Milano, 1978.
L. Accardi, On the non-commutative Markov property. Functional Anal. and its appl. 1 (1975), 1–6.
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© 1980 Springer-Verlag Wien
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Accardi, L. (1980). Quantum Markov Processes. In: Blaquiére, A., Fer, F., Marzollo, A. (eds) Dynamical Systems and Microphysics. International Centre for Mechanical Sciences, vol 261. Springer, Vienna. https://doi.org/10.1007/978-3-7091-4330-8_5
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DOI: https://doi.org/10.1007/978-3-7091-4330-8_5
Publisher Name: Springer, Vienna
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