The Thomas-Fermi Theory at Finite Temperature Including Weizsacker and Correlation Corrections:Temperature Green's Function Formalism
スポンサーリンク
概要
- 論文の詳細を見る
The Thomas-Fermi theory of an atom at finite temperatures is developed withthe help of the temperature Green's function. The electron density and theHelmholtz free energy density of the atom in equilibrium is expressed as a func-Lion of the self-consistent potential energy.The inhomogeneity correction to the kinetic free energy is proved to be thesame as that given by Perrot. The exchange and the correlation energy in ringdiagram approximation is also incorpolated in the statistical model.
- 社団法人日本物理学会の論文
- 1985-04-15
著者
-
TOMISHIMA Yasuo
Department of Physics, Okayama University
-
Tomishima Yasuo
Department Of Physics Faculty Of Science Okayama University
-
Tomishima Yasuo
Department Of Physics Faculty Of Science Okayama
関連論文
- Monte Carlo Solutions of Schrodinger's Equation for H^+_2 Ion in Strong Magnetic Fields.II
- Monte Carlo Solutions of Schrodinger's Equation for H^+_2 Ion in Strong Magnetic Fields
- A Remark on the Monte-Carlo Solution of the Schrodinger Equation for Molecular Systems
- Solution of the Temperature-Dependent Thomas-Fermi-Dirac-Weizsacker Equation with a Correlation Correction
- A Remark on the Kinetic Energy Density Functional for Atoms : Condensed Matter and Statistical Physics
- Inhomogeneity Correction to the Thomas-Fermi Atom in a Strong Magnetic Field
- On the Weizsacker Correction to the Thomas-Fermi Theory of the Atom
- Solution with of the Thomas-Fermi-Dirac Equation with a Modified Weizsacker Correction
- Thomas Fermi-Theory for Atoms in a Strong Magnetic Field
- Energy Levels in the Thomas-Fermi-Dirac Atom
- Rotational Lattice Vibration in Complex Crystals Part III. Vibrational Frequencies in Cubic NaClO_4 Crystals
- Calculation of Photoabsorption Cross Section of an Extended Thomas-Fermi Atom
- On the Influence of the Packing on the Atomic Scattering Factor Based on the Thomas-Fermi Theory
- The Thomas-Fermi Theory at Finite Temperature Including Weizsacker and Correlation Corrections:Temperature Green's Function Formalism
- Rotational Lattice Vibration in Complex Crystals Part II. Vibrational Modes in Optical Branches and Interaction with a Conduction Electron
- Rotational Lrttice Vibration in Complex Crystals : Part I. Vicrational Modes and Specific Heat
- Calculation of the Cohesive Energy of Zincblende
- The Inverse Solution of the TFD Equation
- Lattice Defects in Zincblende : Part II. Formation Energy of Lattice Defects
- Lattice Defects in Zincblende : Part I. Phenomenological Expressions of Interionic Potentials
- A Relativistic Thomas-Fermi Theory
- TFD Functions for Non-zero Temperatures and Equations of State Based on Them