The significance of the ergodic decomposition of stationary measures for the interpretation of probability

Synthese 53 (3):419-432 (1982)
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Abstract

De Finetti's representation theorem is a special case of the ergodic decomposition of stationary probability measures. The problems of the interpretation of probabilities centred around de Finetti's theorem are extended to this more general situation. The ergodic decomposition theorem has a physical background in the ergodic theory of dynamical systems. Thereby the interpretations of probabilities in the cases of de Finetti's theorem and its generalization and in ergodic theory are systematically connected to each other.

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10.1007/bf00486158

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Jan Von Plato
University of Helsinki

Citations of this work

Theories of probability.Colin Howson - 1995 - British Journal for the Philosophy of Science 46 (1):1-32.
The foundational role of ergodic theory.Massimiliano Badino - 2005 - Foundations of Science 11 (4):323-347.
Probabilistic Causality, Randomization and Mixtures.Jan von Plato - 1986 - PSA Proceedings of the Biennial Meeting of the Philosophy of Science Association 1986 (1):432-437.

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