Scattering at the Anderson transition: Power--law banded random matrix model

Abstract

We analyze the scattering properties of a periodic one-dimensional system at criticality represented by the so-called power-law banded random matrix model at the metal insulator transition. We focus on the scaling of Wigner delay times τ and resonance widths . We found that the typical values of τ and (calculated as the geometric mean) scale with the system size L as τ typ LD1 and typ L-(2-D2), where D1 is the information dimension and D2 is the correlation dimension of eigenfunctions of the corresponding closed system.

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