Degree of Localization for the Eigenstates in One-Dimensional Random Systems

概要

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By solving integral equations, approximate stationary probability densities of some random variables associated with two kinds of random processes are obtained. The degrees of localization L(E) and L(ω) are calculated therefrom analytically over almost whole range of energy or frequency for several models of the one-dimensional random system. It is found that L(E) and L(ω) are always positive as was proved most generally by Matsuda and Ishii and that they are proportional to the variance of the random variables characterizing the random system.
理論物理学刊行会の論文
1973-10-25