Systematization of the Approximate Solutions of the Thomas-Fermi Equation
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概要
- 論文の詳細を見る
Based on the generalized Brinkman's remark that x^σφ can be treated as a constant over the whole range of x, three homologues of the approximate TF solutions, i.e. 1. Brinkman, 2. Kerner-Tietz-Umeda and 3. Sommerfeld-March, are systematically established under either of two different guiding principles, the linearization of the TF equation in regard to φ and the elimination of the explicit x in the TF equation.
- 社団法人日本物理学会の論文
- 1955-09-05
著者
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Umeda Kwai
Department Of Physics Okayama University
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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