Optimal W1 and Berry-Esseen bound between the spectral radius of large Chiral non-Hermitian random matrices and Gumbel

Abstract

Consider the chiral non-Hermitian random matrix ensemble with parameters n and v and the non Hermiticity parameter τ=0 and let (ζi)1 i n be its n eigenvalues with positive x-coordinate. Set Xn:= sn(2n 1 i n|ζi|2-2n(n+v)2n+v-a(sn)) with sn=n(n+v)/(2n+v) and a(sn)= sn-(2π sn) sn. It was proved in JQ that Xn converges weakly to the Gumbel distribution . In this paper, we give in further that n∞ sn( sn)2W1(Fn, )=12 and the Berry-Esseen bound n∞ sn( sn)2x∈R|Fn(x)-e-e-x|=12e. Here, Fn is the distribution (function) of Xn.