Boltzmannian Equilibrium in Stochastic Systems

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Abstract

Equilibrium is a central concept of statistical mechanics. In previous work we introduced the notions of a Boltzmannian alpha-epsilon-equilibrium and a Boltzmannian gamma-epsilon-equilibrium. This was done in a deterministic context. We now consider systems with a stochastic micro-dynamics and transfer these notions from the deterministic to the stochastic context. We then prove stochastic equivalents of the Dominance Theorem and the Prevalence Theorem. This establishes that also in stochastic systems equilibrium macro-regions are large in requisite sense.

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Author Profiles

Charlotte Sophie Werndl
London School of Economics
Roman Frigg
London School of Economics

Citations of this work

Can somebody please say what Gibbsian statistical mechanics says?Roman Frigg & Charlotte Werndl - 2018 - British Journal for the Philosophy of Science:1-27.
When does a Boltzmannian equilibrium exist?Charlotte Werndl & Roman Frigg - 2016 - In Charlotte Werndl & Roman Frigg (eds.).
Philosophy of statistical mechanics.Lawrence Sklar - 2008 - Stanford Encyclopedia of Philosophy.

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Taking Thermodynamics Too Seriously.Craig Callender - 2001 - Studies in History and Philosophy of Science Part B: Studies in History and Philosophy of Modern Physics 32 (4):539-553.

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