Add to ORKGWe present a novel derivation of the constraints required to obtain the underlying principles of statistical mechanics using a maximum entropy framework. We derive the mean value constraints by use of the central limit theorem and the scaling properties of Lagrange multipliers. We then arrive at the same result using a quantum free field theory and the Ward identities. The work provides a principled footing for maximum entropy methods in statistical physics, adding the body of work aligned to Jaynes’s vision of statistical mechanics as a form of inference rather than a physical theory dependent on ergodicity, metric transitivity and equal a priori probabilities [1]. We show that statistical independence, in the macroscopic limit, is the uni...
The principle of maximum entropy is a method for assigning values to probability distributions on th...
International audienceWe consider the maximum entropy problems associated with Rényi $Q$-entropy, su...
Forte's characterization of the entropy of a grand canonical ensemble in statistical mechanics has a...
We present a novel derivation of the constraints required to obtain the underlying principles of sta...
In this paper an alternative approach to statistical mechanics based on the maximum inform...
The two existing versions of the fundamental postulate of statistical mechanics (the "traditional" o...
The two existing versions of the fundamental postulate of statistical mechanics (the "traditional" o...
The two existing versions of the fundamental postulate of statistical mechanics (the "traditional" o...
As shown by Jaynes, the canonical and grand canonical probability distributions of equilibrium stati...
The first six chapters of this volume present the author's 'predictive' or information theoretic' ap...
This paper is a review of a particular approach to the method of maximum entropy as a general framew...
We approach the subject of Statistical Mechanics from two different perspectives. In Part I we adopt...
In this thesis we start by providing some detail regarding how we arrived at our present understandi...
International audienceWe consider the maximum entropy problems associated with Rényi $Q$-entropy, su...
In this letter, we elaborate on some of the issues raised by a recent paper by Neapolitan and Jiang ...
The principle of maximum entropy is a method for assigning values to probability distributions on th...
International audienceWe consider the maximum entropy problems associated with Rényi $Q$-entropy, su...
Forte's characterization of the entropy of a grand canonical ensemble in statistical mechanics has a...
We present a novel derivation of the constraints required to obtain the underlying principles of sta...
In this paper an alternative approach to statistical mechanics based on the maximum inform...
The two existing versions of the fundamental postulate of statistical mechanics (the "traditional" o...
The two existing versions of the fundamental postulate of statistical mechanics (the "traditional" o...
The two existing versions of the fundamental postulate of statistical mechanics (the "traditional" o...
As shown by Jaynes, the canonical and grand canonical probability distributions of equilibrium stati...
The first six chapters of this volume present the author's 'predictive' or information theoretic' ap...
This paper is a review of a particular approach to the method of maximum entropy as a general framew...
We approach the subject of Statistical Mechanics from two different perspectives. In Part I we adopt...
In this thesis we start by providing some detail regarding how we arrived at our present understandi...
International audienceWe consider the maximum entropy problems associated with Rényi $Q$-entropy, su...
In this letter, we elaborate on some of the issues raised by a recent paper by Neapolitan and Jiang ...
The principle of maximum entropy is a method for assigning values to probability distributions on th...
International audienceWe consider the maximum entropy problems associated with Rényi $Q$-entropy, su...
Forte's characterization of the entropy of a grand canonical ensemble in statistical mechanics has a...