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  1. (1 other version)Creating Modern Probability: Its Mathematics, Physics and Philosophy in Historical Perspective.Lawrence Sklar & Jan von Plato - 1994 - Journal of Philosophy 91 (11):622.
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  • Physics and Chance: Philosophical Issues in the Foundations of Statistical Mechanics.Lawrence Sklar - 1993 - New York: Cambridge University Press.
    Statistical mechanics is one of the crucial fundamental theories of physics, and in his new book Lawrence Sklar, one of the pre-eminent philosophers of physics, offers a comprehensive, non-technical introduction to that theory and to attempts to understand its foundational elements. Among the topics treated in detail are: probability and statistical explanation, the basic issues in both equilibrium and non-equilibrium statistical mechanics, the role of cosmology, the reduction of thermodynamics to statistical mechanics, and the alleged foundation of the very notion (...)
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  • A philosophical explanation of the explanatory functions of ergodic theory.S. J. Paul M. Quay - 1978 - Philosophy of Science 45 (1):47-59.
    The purported failures of ergodic theory (seen in its often proved ineptitude to ground a mechanical explanation of thermodynamics) are shown to arise from misconception of the functions served by scientific explanation. In fact, the predictive failures of ergodic theory are precisely its points of greatest physical utility, where genuinely new knowledge about actual physical systems can be obtained, once the links between explanation and reconstructive estimation are recognized.
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  • Why equilibrium statistical mechanics works: Universality and the renormalization group.Robert W. Batterman - 1998 - Philosophy of Science 65 (2):183-208.
    Discussions of the foundations of Classical Equilibrium Statistical Mechanics (SM) typically focus on the problem of justifying the use of a certain probability measure (the microcanonical measure) to compute average values of certain functions. One would like to be able to explain why the equilibrium behavior of a wide variety of distinct systems (different sorts of molecules interacting with different potentials) can be described by the same averaging procedure. A standard approach is to appeal to ergodic theory to justify this (...)
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  • A Philosophical Explanation of the Explanatory Functions of Ergodic Theory.Paul M. Quay - 1978 - Philosophy of Science 45 (1):47-59.
    The purported failures of ergodic theory are shown to arise from misconception of the functions served by scientific explanation. In fact, the predictive failures of ergodic theory are precisely its points of greatest physical utility, where genuinely new knowledge about actual physical systems can be obtained, once the links between explanation and reconstructive estimation are recognized.
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  • Der Massbegriff in der Theorie der kontinuierlichen Gruppen.Alfred Haar - 1933 - Annals of Mathematics 2 (34):147–169.
    Der Massbegriff in der Theorie der kontinuierlichen Gruppen.
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  • The Concept of Probability in Statistical Physics.Y. M. Guttmann - 1999 - Cambridge University Press.
    Foundational issues in statistical mechanics and the more general question of how probability is to be understood in the context of physical theories are both areas that have been neglected by philosophers of physics. This book fills an important gap in the literature by providing a most systematic study of how to interpret probabilistic assertions in the context of statistical mechanics. The book explores both subjectivist and objectivist accounts of probability, and takes full measure of work in the foundations of (...)
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  • Why Gibbs Phase Averages Work—The Role of Ergodic Theory.David B. Malament & Sandy L. Zabell - 1980 - Philosophy of Science 47 (3):339-349.
    We propose an "explanation scheme" for why the Gibbs phase average technique in classical equilibrium statistical mechanics works. Our account emphasizes the importance of the Khinchin-Lanford dispersion theorems. We suggest that ergodicity does play a role, but not the one usually assigned to it.
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  • (1 other version)Physics and Chance.Lawrence Sklar - 1995 - British Journal for the Philosophy of Science 46 (1):145-149.
    Statistical mechanics is one of the crucial fundamental theories of physics, and in his new book Lawrence Sklar, one of the pre-eminent philosophers of physics, offers a comprehensive, non-technical introduction to that theory and to attempts to understand its foundational elements. Among the topics treated in detail are: probability and statistical explanation, the basic issues in both equilibrium and non-equilibrium statistical mechanics, the role of cosmology, the reduction of thermodynamics to statistical mechanics, and the alleged foundation of the very notion (...)
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  • The Significance of the Ergodic Decomposition of Stationary Measures for the Interpretation of Probability.Jan Von Plato - 1982 - Synthese 53 (3):419 - 432.
    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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  • The Concept of Probability in Statistical Physics.Y. M. Guttmann - 2000 - Mind 109 (436):923-926.
    Foundational issues in statistical mechanics and the more general question of how probability is to be understood in the context of physical theories are both areas that have been neglected by philosophers of physics. This book fills an important gap in the literature by providing a most systematic study of how to interpret probabilistic assertions in the context of statistical mechanics. The book explores both subjectivist and objectivist accounts of probability, and takes full measure of work in the foundations of (...)
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  • The significance of the ergodic decomposition of stationary measures for the interpretation of probability.Jan Plato - 1982 - Synthese 53 (3):419-432.
    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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  • A partial vindication of ergodic theory.K. S. Friedman - 1976 - Philosophy of Science 43 (1):151-162.
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  • The Kind of Motion We Call Heat.S. G. Brush - 1982 - British Journal for the Philosophy of Science 33 (2):165-186.
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