- 08-217 Laszlo Erdos, Benjamin Schlein, Horng-Tzer Yau
- Wegner estimate and level repulsion for Wigner random matrices
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Nov 16, 08
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Abstract. We consider $N\times N$ Hermitian random matrices with
independent identically distributed entries (Wigner matrices). The matrices are normalized so that the average spacing between consecutive eigenvalues is of order $1/N$. Under suitable assumptions on the distribution of the single matrix element, we first prove that, away from the spectral edges, the empirical density of eigenvalues concentrates around the Wigner semicircle law on energy scales $\eta \gg N^{-1}$. This result establishes the semicircle law on the optimal scale and it removes a logarithmic factor from our previous result \cite{ESY2}. We then show a Wegner estimate, i.e. that the averaged
density of states is bounded. Finally, we prove that the eigenvalues of
a Wigner matrix repel each other, in agreement with the universality conjecture.
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