Phase Transition of Husimi-Temperley Model of Imperfect Gas
スポンサーリンク
概要
- 論文の詳細を見る
The author considers Husimi-Temperley model of the imperfect gas, whose each particle interacts with all other particles. It is shown in this model that the analytic singular point Z_s of Mayer Series by cluster integrals is not the condensation point, and that the isotherm obtained from the canonical partition function has a metastable part, while that from the grand partition function has a horizontal part. It is also shown that this model does not go beyond the scheme of the theories of Mayer, Yang-Lee, and Ikeda. Some remarks in the general case are discussed in connection with this model.
- 理論物理学刊行会の論文
著者
-
Katsura Shigetoshi
Department Of Applied Physics Faculty Of Engineering Tohoku University
-
Katsura Shigetoshi
Department Of Applied Science Tohoku University
-
KATSURA Shigetoshi
Department of Applied Science, Tohoku University
関連論文
- Nonlinear Susceptibility in the Spin Glass
- Tetradics Formulation of the Two-Time Green's Function Method and Its Application to the Heisenberg Ferromagnet
- Ground State and the Magnetization Process of the Body-Centered Tetragonal Lattice with Ising Spins
- The Ground State of the Ising Model of the Simple Cubic Lattice with First, Second and Third Neighbor Interactions
- Ground States of the Ising Model of the Linear Chain of S=1 with J_1 and J_2 and of S=1 / 2 with J_1, J_2 and J_3
- First Order Green Function Theory of Ferromagnetism
- Magnetic Phase Diagram for the Triangular Ising Lattice
- Phase Transitions and Distributions of Zeros of the Partition Functions for an Antiferromagnetic Ising Model and for a Hard Core Lattice Gas
- Diffraction of Electromagnetic Waves by Circular Plate and Circular Hole
- Distribution of Zeros of the Partition Function for the Slater Model of Ferroelectricity
- Asymptotic Form of the Lattice Green's Function of the Simple Cubic Lattice
- Point of Condensation and the Volume Dependency of the Cluster Integrals
- Distribution of Zeros of the Partition Function of the Ising Model
- Critical Field of the Heisenberg Model at Zero Temperature
- Susceptibility and Specific Heat in the Glass-Like Phase : Cumulant Expansion to the Random Bond Ising Model
- Theory of Spin Glass by the Method of the Distribution Function of an Effective Field
- XY-Nature of the Fully Frustrated Ising Model on the Triangular Lattice
- Possibility of the Kosterlitz-Thouless Phase Transition in the Two Dimensional Fully Frustrated Ising Model
- Monte Carlo Simulation of the Antiferromagnetic Ising Model on the Triangular Lattice with the First and Second Neighbour Interactions
- Distribution of Zeros of the Partition Function in the Complex Temperature Plane. II
- Bethe Lattice and the Bethe Approximation
- Some Remarke on the Condensation Phenomena.
- Distribution of Roots of the Partition Function in the Complex Temperature Plane
- Asymptotic Form of the Lattice Green's Function of the Square Lattice in the Diagonal Direction
- Phase Transition of Husimi-Temperley Model of Imperfect Gas
- On the Bose-Einstein Condensation
- Cluster Sums and Related Coefficients of the Ising Model
- Annealed Ising Bond-Mixture on the Pyrite Lattices
- Diffraction of Electromagnetic Waves by Ribbon and Slit. I
- Random Mixture of the Ising Magnets in a Magnetic Field : Quenched Site and Bond Problems
- A Method of Determining the Orderings of the Ising Model with Several Neighbor Interactions under the Magnetic Field and Applications to Hexagonal Lattices