Thomas-Fermi Function for Impurity Atom Dissolved in a Matrix Metal
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概要
- 論文の詳細を見る
The scale transformation keeping invariant the TF equation for an impurity atom dissolved with infinite dilution in a matrix metal of very large size was established. It enabled us to reduce the double sequence of solutions of the TF equation specified by two parameters to a single sequence of master solutions specified by one parameter only. Starting from the asymptotic expansion of solution derived here anew the inward numerical integration of the TF equation was carried out. The screened Coulomb potential was compared with our numerical solutions to measure its degree of approximation.
- 社団法人日本物理学会の論文
- 1958-02-05
著者
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Umeda Kwai
Department Of Physics Faculty Of Science Okayama University
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KOBAYASHI Shigehiro
Department of Physics, Kagawa University
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Kobayashi Shigehiro
Department Of Physics Kagawa University
関連論文
- On the Influence of the Packing on the Atomic Scattering Factor Based on the Thomas-Fermi Theory
- The Inverse Solution of the TFD Equation
- Thomas-Fermi Function for Impurity Atom Dissolved in a Matrix Metal
- On the Approximate TF Function for Compressed Neutral Atom
- Accurate Value of the Initial Slope of the Ordinary TF Function
- Systematization of the Approximate Solutions of the Thomas-Fermi Equation
- Thomas-Fermi Model of Positive Ion
- Some Coeflicients of the Series Expansion of the TFD Function
- A Measure for Approximation Degree of the Approximate TF Function for Free Neutral Atom
- Hartree-Fock Values of Diamagnetic Susceptibilities of Neon-like Ions
- Elongated Lichtenberg Figure
- An Application of the FA-Modified TF Model to the Singly Ionized Negative Ion
- Thomas-Fermi Model of Compressed Positive Ion
- TFD Functions for Non-zero Temperatures and Equations of State Based on Them