Gibbsian statistical mechanics (GSM) is the most widely used version of statistical mechanics among working physicists. Yet a closer look at GSM reveals that it is unclear what the theory actually says and how it bears on experimental\ud practice. The root cause of the difficulties is the status of the Averaging Principle, the proposition that what we observe in an experiment is the ensemble average of a phase function. We review different stances toward this\ud principle, and eventually present a coherent interpretation of GSM that provides an account of the status and scope of the principle
Equilibrium statistical mechanics is a branch of probability theory that has born between the end of...
Gibbs measures are the main object of study in equilibrium statistical mechanics, and are used in ma...
In this paper I propose an interpretation of classical statistical mechanics that centers on taking ...
Gibbsian statistical mechanics (GSM) is the most widely used version of statistical mechanics among ...
Gibbsian statistical mechanics (GSM) is the most widely used version of statistical mechanics among ...
There are two theoretical approaches in statistical mechanics, one associated with Boltzmann and the...
There are two theoretical approaches in statistical mechanics, one associated with Boltzmann and the...
Thermodynamics describes a large class of phenomena we observe in macroscopic systems. The aim of st...
This paper aims to shed light on the relation between Boltzmannian statistical mechanics and Gibbsia...
In discussions of the foundations of statistical mechanics, it is widely held that (a) the Gibbsian ...
I give a brief account of the way in which thermodynamics and statistical mechanics actually work as...
Theoreticians working in statistical mechanics seem to be spoilt for choice. The theory offers two d...
In a recent article, Werndl and Frigg discuss the relationship between the Boltzmannian and Gibbsian...
The relation between the Boltzmannian and the Gibbsian formulations of statistical mechanics is one ...
Equilibrium statistical mechanics is a branch of probability theory that has born between the end of...
Gibbs measures are the main object of study in equilibrium statistical mechanics, and are used in ma...
In this paper I propose an interpretation of classical statistical mechanics that centers on taking ...
Gibbsian statistical mechanics (GSM) is the most widely used version of statistical mechanics among ...
Gibbsian statistical mechanics (GSM) is the most widely used version of statistical mechanics among ...
There are two theoretical approaches in statistical mechanics, one associated with Boltzmann and the...
There are two theoretical approaches in statistical mechanics, one associated with Boltzmann and the...
Thermodynamics describes a large class of phenomena we observe in macroscopic systems. The aim of st...
This paper aims to shed light on the relation between Boltzmannian statistical mechanics and Gibbsia...
In discussions of the foundations of statistical mechanics, it is widely held that (a) the Gibbsian ...
I give a brief account of the way in which thermodynamics and statistical mechanics actually work as...
Theoreticians working in statistical mechanics seem to be spoilt for choice. The theory offers two d...
In a recent article, Werndl and Frigg discuss the relationship between the Boltzmannian and Gibbsian...
The relation between the Boltzmannian and the Gibbsian formulations of statistical mechanics is one ...
Equilibrium statistical mechanics is a branch of probability theory that has born between the end of...
Gibbs measures are the main object of study in equilibrium statistical mechanics, and are used in ma...
In this paper I propose an interpretation of classical statistical mechanics that centers on taking ...