Fermi Momentum for Free Electron Metals Perturbed by Localized Imperfections
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概要
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The Fermi momentum km and the interior density pl are calculated for free electron metals perturbed by localized imperfections, and the Thomas-Fermi relation pl=km^3/3π^2 is verified up to the higher order. Then it is shown that the Friedel theorem can be based on the above relation. When the Fermi momentum km is expressed interms of the phase shift n of the free electron wave function, the charge neutrality condition in the interior leads to the Friedel sum rule for the case of the plane surface as well as of the point imperfection.
- 社団法人日本物理学会の論文
- 1961-07-05
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