Convergence rate of extreme eigenvalue of Ginibre ensembles to Gumbel distribution

Abstract

Let X be a real (β=1) or complex (β=2) Ginibre ensemble. Let \σi\1 i n be the eigenvalues of X, and Zn be some rescaled version of i σi. It was proved that Zn converges weakly to the Gumbel distribution β with distribution function e-β2e-x. We further prove that x∈ R|P(Zn ≤ x)-e-β2e-x|=25 n4e n(1+o(1)) and W1(L(Zn), β)=25 n4 n(1+o(1)) for sufficiently large n, where L(Zn) is the distribution of Zn and W1 is the Wasserstein distance. Similar results hold for i |σi|. Furthermore, the convergence rates of the complex Ginibre ensemble are universal for complex iid random matrices under certain moment conditions on entries.