Local semicircle law at the spectral edge for Gaussian β-ensembles

Abstract

We study the local semicircle law for Gaussian β-ensembles at the edge of the spectrum. We prove that at the almost optimal level of n-2/3+ε, the local semicircle law holds for all β ≥ 1 at the edge. The proof of the main theorem relies on the calculation of the moments of the tridiagonal model of Gaussian β-ensembles up to the pn-moment where pn = O(n2/3-ε). The result is the analogous to the result of Sinai and Soshnikov for Wigner matrices, but the combinatorics involved in the calculations are different.