One-Particle Distribution Function for a System of Hard Rods
スポンサーリンク
概要
- 論文の詳細を見る
A rigorous equation for the one-particle distribution function is studied for a system of hard rods. When the fugacity z is less than or equal to e (the base of the natural logarithm) divided by the diameter σ of the hard rods, it is proved that the only solution of the equation is spatially uniform. It is also proved that the equation has neither a solution corresponding to a perfect crystalline structure nor a solution bifurcating continuously from the uniform solution.
- 理論物理学刊行会の論文
- 1983-10-25
著者
-
HIROIKE Kazuo
Department of Physics, Jadavpur University
-
Hiroike Kazuo
Department Of Applied Science Faculty Of Engineering Tohoku University
-
Hiroike Kazuo
Department Of Engineering Science Faculty Of Engineering Tohoku University
関連論文
- Correlation Functions of a One-Dimensional Lattice Gas with Nearest-Neighbor and Next-Nearest-Neighbor Interactions : Condensed Matter and Statistical Physics
- Correlation Functions of a One-Dimensional Lattice Gas with Interactions Up to Third-Nearest Neighbors
- Ornstein-Zernike Relation for a Fluid Mixture
- Ground-State Energy of a Bose System in the Weak Coupling Limit
- On the Theory of Fluids
- Ornstein-Zernike Relation for a Fluid Mixture with Direct Correlation Functions of Finite Range
- Radial Distribution Function of Fluids II
- Variational Study of the Ground State of a Bose-Einstein Fluid
- Radial Distribution Function of Fluids, III
- Transformation of the Ornstein-Zernike Relation for Fluid Mixtures
- On the Method of "Auxiliary Variables"
- Long-Range Correlations of the Distribution Functions in the Canonical Ensemble
- One-Particle Distribution Function for a System of Hard Rods
- Radial Distribution Function of Fluids I
- A New Approach to the Theory of Classical Fluids. II : Multicomponent Systems
- Virial Theorem for the Jastrow-Type Ground State of a Bose Fluid