On the Renormalized Random Phase Approximation for Dilute Magnetic Alloys
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概要
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The Anderson model for dilute magnetic alloys is studied in the renormalized random phase approximation which has recently been applied to the Wolff model by Suhl and his co-workers. The resulting integral equations are solved approximately with a suitable trial function which becomes asymptotically self-consistent in the limit U/πΔ→∞, where U is the Coulomb interaction and Δ the d-level width. The solution is proved to give incorrect temperature dependence of the resistivity and the zero-frequency susceptibility in comparison with the rigorous results obtained by other methods.
- 理論物理学刊行会の論文
- 1970-04-25
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