Density of States for Random Band Matrices in two dimensions
Abstract
We consider a two dimensional random band matrix ensemble, in the limit of infinite volume and fixed but large band width W. For this model we rigorously prove smoothness of the averaged density of states. We also prove that the resulting expression coincides with Wigner's semicircle law with a precision W-2+δ , where δ 0 when W ∞. The proof uses the supersymmetric approach and extends results by Disertori, Pinson and Spencer from three to two dimensions.
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