Distribution of Zeros and the Equation of State. II : Phase Transitions and Singularities in the Case of Circular Distribution
スポンサーリンク
概要
- 論文の詳細を見る
The phase transition of the first order of a system of infinitely large volume is analytically investigated in the case where the zeros of the grand partition function are distributed on a circle with centre at the origin in the complex z(=activity) plane. It is confirmed that the points of discontinuity of the distribution function g^^(θ) of zeros or its derivative of some order on the circle are analytical singularities of the density (and pressure) as a function of complex z. By trpical examples of circular distribution of zeros it is demonstrated that four types of phase transitions exist according to whether the transition point is an analytical singularity or not and whether the gas and liquid are described by the same analytic function or not. The equation of state and the transition point are studied from the standpoint of the theory of function, by using the Riemann surface. The case of existence of infinitely multiple zeros or of an analytical singularity of g^^-(θ) us discussed, The thermodynamical stability condition and the slope of the p-v isotherm at the condensation point are discussed, in reference to circular distributions of zeros.
- 理論物理学刊行会の論文
- 1979-01-25
著者
-
Ikeda Kazuyosi
Department Of Applied Physics Osaka University
-
Ikeda Kazuyosi
Department Of Applied Physics Faculty Of Engineering Osaka University
関連論文
- Statistical Mechanics of One-Dimensional Systems. II : Multicomponent Gas with Intermolecular Potentials of Infinite Range and of Infinitesimal Depth
- Statistical Mechanics of One-Dimensional Systems.I : Phase Transition of a van der Waals Gas
- Statistical Mechanics of One-Dimensional Systems. III : Multicomponent Gas with Kac's Potential
- Statistical-Mechanical Theory of Osmotic Pressure of One-Dimensional Multicomponent Systems.I.Expansion in Terms of the Molar Fractions of the Solutes
- Formal Diagrams Derived from the Prototypes of Eight or Less Points
- Statistical-Mechanical Theory of One-Dimensional Gases with Short-Range and Long-Range Intermolecular Forces.IV.Phase Transitions at Finite Temperatures in the Case of Attractive Short-Range Interaction
- Cluster Sums for Lattice Gases with Second Nearest Neighbour Interactions.II.One-Dimensional Lattice
- On the Theory of Isothermal-Isobaric Ensemble. II : Imperfect Gases and Condensation
- Volume-Dependent Cluster Sums for Lattice Gases. I : Calculation of the Temperley Coefficients
- Generalized Theory of Condensing Systems. VII : An Imperfect Gas Obeying the Perfect-Gas Law in the Gaseous State
- On the Yang-Lee Distribution of Zeros for a Gas Obeying van der Waals' Equation of State. III : Calculations for Low Temperatures
- Volume-Dependent Cluster Sums for Lattice Gases. IV : Behaviour of the Cluster Sums
- Statistical-Mechanical Theory of Osmotic Pressure of One-Dimensional Multicomponent Systems. : II. Expansion in Terms of the Relative Molarities of the Solutes
- Thermodynamical Behaviour of Liquid Water near the Triple Point
- Statistical-Mechanical Theory of Osmotic Pressure of One-Dimensional Multicomponent Systems. III. : Solution Immersed in a Very Large Bath of Pure Solvent
- Distribution of Zeros and the Equation of State. II : Phase Transitions and Singularities in the Case of Circular Distribution
- Statistical-Mechanical Theory of One-Dimensional Gases with Short-Range and Long-Range Intermolecular Forces.III.Phase Transitions at Finite Temperatures in the Case of Repulsive Short-Range Interaction
- Irreducible Cluster Sums and the Virial Coefficients for Lattice Gases
- Cluster Sums for Lattice Gases with Second Nearest Neighbour Interactions.III.Three-Dimensional Simple Cubic Lattice
- Volume-Dependent Cluster Sums and Phase Transition of the Two-Dimensional Triangular Lattice Gas
- Phase Transitions of Lattice Gases : Satisfaction of the G-Condition : Condensed Matter and Statistical Physics
- On the Yang-Lee Distribution of Zeros for a Gas Obeying van der Waals' Equation of State. I : Fundamental Concepts and the Limit of Vanishing Attraction
- Cluster Sums for Lattice Gases with Second Nearest Neighbour Interactions.I.Two-Dimensional Square Lattice
- On the Theory of Isothermal-Isobaric Ensemble. I : Mathematical Treatment of the Partition Function
- Distribution of Zeros and the Equation of State. III : Cluster Series, the Ideal Fermi-Dirac Gas and Other Problems
- Generalized Theory of Condensing Systems. VI : Examples of Systems Satisfying the G-Condition
- Statistical-Mechanical Theory of One-Dimensional Gases with Short-Range and Long-Range Intermolecular Forces.I.Equation of State and the Thermodynamic Functions
- Note on the One-Dimensional Model Describing Liquid Water : Determination of the Interaction Constants
- Generalized Theory of Condensing Systems. II : Description in Terms of Irreducible Cluster Integrals
- Volume-Dependent Irreducible Cluster Sums and Phase Transition of Lattice Gases
- Generalized Theory of Condensing Systems. III : Uniform Convergence of Thermodynamic Functions
- Distribution of Zeros and the Equation of State. I : Fundamental Relations and a Theorem on a Cauchy-Type Integral
- Statistical-Mechanical Theory of One-Dimensional Gases with Short-Range and Long-Range Intermolecular Forces.V.Intersection and Inversion of Isotherms of the Water Type
- Volume-Dependent Cluster Sums for Lattice Gases. III : Patterns of Seven or Eight Particles and Expressions for the Cluster Sums
- Generalized Theory of Condensing Systems. V : Some Remarks on the Validity of the G-Condition
- Statistical Mechanics of One-Dimensional Multicomponent Gases of Molecules with Hard Cores and Weak Long-Range Interactions