Extremes of Chi triangular array from the Gaussian β-Ensemble at high temperature

Abstract

We study the extreme point process associated to the off-diagonal components in the matrix representation of the Gaussian β-Ensemble and prove its convergence to Poisson point process as n +∞ when the inverse temperature β scales with n and tends to 0. We consider two main high temperature regimes: β 1n and nβ= 2γ ≥ 0. The normalizing sequences are explicitly given in each cases. As a consequence, we estimate the first order asymptotic of the largest eigenvalue of the Gaussian β-Ensemble.