Density of states for almost diagonal random matrices
Abstract
We study the density of states (DOS) for disordered systems whose spectral statistics can be described by a Gaussian ensemble of almost diagonal Hermitian random matrices. The matrices have independent random entries Hi ≥ j with small off-diagonal elements: <|Hi ≠ j|2 > <|Hii|2 > 1 . Using the recently suggested method of a virial expansion in the number of interacting energy levels (Journ.Phys.A 36, 8265), we calculate the leading correction to the Poissonian DOS in the cases of the Gaussian Orthogonal and Unitary Ensembles. We apply the general formula to the critical power-law banded random matrices and the unitary Moshe-Neuberger-Shapiro model and compare DOS of these models.
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