Radial Distribution Function of Fluids I
スポンサーリンク
概要
- 論文の詳細を見る
The consistency of several approximate radial distribution functions of fluids is examined in the sense that the pressure and the internal energy derived from them satisfy the thermodynamical relation ∂/(∂T)(p/T) = ∂/(∂V)(E/(T^2)), where T, p, V and E have the usual meanings. It is found that the original form of Green's linear theory is the only one which satisfies the above relation. It is also shown that Green's theory can be improved further without breaking the above relation.
- 社団法人日本物理学会の論文
- 1957-04-05
著者
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