Exact convergence rate of spectral radius of complex Ginibre to Gumbel distribution
Abstract
Consider the complex Ginibre ensemble, whose eigenvalues are (λi)1 i n and the spectral radius Rn=1 i n|λi|. Set Xn=4 γn(Rn-n-12γn) and Fn be its distribution function, where γn= n-2(2π n). It was proved in Rider 2003 that Fn converges weakly to the Gumbel distribution . We prove in further in this paper that n∞ n n\, W1(Fn, )=2 and the Berry-Esseen bound n ∞ n nx∈ R|Fn(x)-e-e-x|=2e.
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