Irreversible Circulation of Flux-Fluctuations : Condensed Matter and Statistical Physics
スポンサーリンク
概要
- 論文の詳細を見る
The concept of the irreversible circulation of fluctuations, proposed by Tomita and Tomita [Prog. Theor. Phys. 51 (1974), 1731] is extended to study irreversible phenomena in a so-called second order systems with inertia. The nature of flux-fluctuations is examined in the master equation approach in the extended space of variables which consists of the α- and the β-variables. It is shown that an extended irreversible circulation of flux-fluctuations is related to flux-relaxation times. A simple example is mentioned, the theory grown out of which is the extended irreversible thermodynamics. This paper presents a new and somewhat more general description of transient processes which approach steady states satisfying the detailed balance condition.
- 1997-08-25
著者
-
ICHIYANAGI Masakazu
Gifu University of Economics
-
Ichiyanagi Masakazu
Department of Applied Physics,Osaka University
-
Ichiyanagi Masakazu
Gifu Univ. Of Econ.
-
Ichiyanagi Masakazu
Department Of Applied Physics Osaka University
-
ICHIYANAGI Masakazu
Department of Mathematical Sciences, Gifu University of Economics
関連論文
- Irreversible Circulation of Flux-Fluctuations : Condensed Matter and Statistical Physics
- The Second Law and Boltzmann's H-Theorem
- New Variational Approach in the Theory of Nonequilibrium Stationary Processes
- A Generalized Evolution Criterion in Nonequilibrium Convective Systems
- Comments on the Entropy Differential in Extended Irreversible Thermodynamics
- Time-Dependent Variational Principle for Nonequilibrium Density Matrix
- Superfluid Flow and Analogy to Dirac's Monopole
- Remarks on the Derivation of Langevin Equations for Nonequilibrium States
- On the Nonequilibrium Ensemble of Nakajima and Zubarev
- Variation Principle in Quantum Theory of Transport Processes
- On the Equation of Motion of Superfluid Velocity
- Superfluid Folw and Local Gauge Invariance
- A generalization of Gibbs' Ensemble to Nonequilibrium Statistical Mechanics
- On Statistical Mechanics of Nonequilibrium Fluctuations : Condensed Matter and Statistical Physics
- On the Hydrodynamical Model for a Bose Liquid at T=0
- A Variation Principle and Entropy Production of Nonlinear Irreversible Processes
- Generalized Solutions to the Gross-Pitaevskii Equation
- Hierarchical Structure of Irreversible Processes Deduced from the Dynamical Semi-Group Theory
- Variation Principle of Linear and Nonlinear Irreversible Processes : Condensed Matter and Statistical Physics
- A Projection Operator Approach to Extended Irreversible Thermodynamics : Condensed Matter and Statistical Physics
- Proper-Time Formulation of Barrier Penetration in Quantum Mechanics