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The ergodic hierarchy
In Ed Zalta, Stanford Encyclopedia of Philosophy. Stanford, CA: Stanford Encyclopedia of Philosophy (2012)
Abstract
The so-called ergodic hierarchy (EH) is a central part of ergodic theory. It is a hierarchy of properties that dynamical systems can possess. Its five levels are egrodicity, weak mixing, strong mixing, Kolomogorov, and Bernoulli. Although EH is a mathematical theory, its concepts have been widely used in the foundations of statistical physics, accounts of randomness, and discussions about the nature of chaos. We introduce EH and discuss its applications in these fields.Author's Profile
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References found in this work
Physics and Chance: Philosophical Issues in the Foundations of Statistical Mechanics.Lawrence Sklar - 1993 - New York: Cambridge University Press.
A field guide to recent work on the foundations of statistical mechanics.Roman Frigg - 2008 - In Dean Rickles, The Ashgate Companion to Contemporary Philosophy of Physics. Ashgate. pp. 99-196.
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