The generalized canonical ensemble and its universal equivalence with the microcanonical ensemble
From MaRDI portal
Publication:2574166
DOI10.1007/s10955-005-4407-0zbMath1079.82003arXivcond-mat/0408681OpenAlexW2113916214MaRDI QIDQ2574166
Richard S. Ellis, Marius Costeniuc, Bruce Turkington, Hugo Touchette
Publication date: 18 November 2005
Published in: Journal of Statistical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/cond-mat/0408681
large deviation principleequivalence of ensemblegeneralized canonical ensemblemikrocanonical entropy
Related Items (17)
Superstatistics and the quest of generalized ensembles equivalence in a system with long-range interactions ⋮ Nonconcave entropies in multifractals and the thermodynamic formalism ⋮ Thermodynamics of the rupture in a Morse lattice ⋮ Extended Gaussian ensemble solution and tricritical points of a system with long-range interactions ⋮ Equivalence and nonequivalence of ensembles: thermodynamic, macrostate, and measure levels ⋮ Statistical ensembles for phase coexistence states specified by noncommutative additive observables ⋮ Onsager's ensemble for point vortices with random circulations on the sphere ⋮ Grand canonical versus canonical ensemble: universal structure of statistics and thermodynamics in a critical region of Bose-Einstein condensation of an ideal gas in arbitrary trap ⋮ Hot and heavy matters in the foundations of statistical mechanics ⋮ Methods for calculating nonconcave entropies ⋮ Typicality analysis for the NewtonianN-body problem on \mathbb {S}^2 in the N\to \infty limit ⋮ Geometric aspects in extended approach of equilibrium classical fluctuation theory ⋮ THERMODYNAMIC LIMIT IN STATISTICAL PHYSICS ⋮ Asymptotic equivalence of probability measures and stochastic processes ⋮ THE VLASOV CONTINUUM LIMIT FOR THE CLASSICAL MICROCANONICAL ENSEMBLE ⋮ TSALLIS ENTROPY COMPOSITION AND THE HEISENBERG GROUP ⋮ Instantons for rare events in heavy-tailed distributions
Cites Work
- Microcanonical distributions for lattice gases
- Large deviations for the empirical field of a Gibbs measure
- Statistical mechanics of the nonlinear Schrödinger equation. II: Mean field approximation
- A special class of stationary flows for two-dimensional Euler equations: A statistical mechanics description
- Negative-temperature states and large-scale, long-lived vortices in two-dimensional turbulence
- A maximum-entropy principle for two-dimensional perfect fluid dynamics
- Large deviations and maximum entropy principle for interacting random fields on \(\mathbb{Z}^ d\)
- The micro-canonical point vortex ensemble: Beyond equivalence
- Analysis of statistical equilibrium models of geostrophic turbulence
- A statistical approach to the asymptotic behavior of a class of generalized nonlinear Schrödinger equations
- Derivation of maximum entropy principles in two-dimensional turbulence via large deviations
- The equivalence of ensembles for lattice systems: Some examples and a counterexample
- A mean-field statistical theory for the nonlinear Schrödinger equation
- Analysis of phase transitions in the mean-field Blume-Emery-Griffiths model
- Complete analysis of phase transitions and ensemble equivalence for the Curie–Weiss–Potts model
- Statistical equilibrium states for two-dimensional flows
- Statistical mechanics of Euler equations in two dimensions
- Nonequivalent statistical equilibrium ensembles and refined stability theorems for most probable flows
- Negative specific heat of a magnetically self-confined plasma torus
- Large deviations for Gibbs random fields
- Large deviation principles and complete equivalence and nonequivalence results for pure and mixed ensembles
- Negative specific heat in a Lennard-Jones-like gas with long-range interactions
This page was built for publication: The generalized canonical ensemble and its universal equivalence with the microcanonical ensemble
