Revisit on the convergence rate of normal extremes

Abstract

Let (Xi)1 i n be independent and identically distributed (i.i.d.) standard Gaussian random variables, and denote by X(n) = 1 i n Xi the maximum order statistic. It is well-known in extreme value theory that the linearly normalized maximum Yn = an(X(n) - bn), converges weakly to the standard Gumbel distribution as n ∞, where an > 0 and bn are appropriate scaling and centering constants. In this note, choosing an=2 n and bn = 2 n - n + (4π)2 2 n, we provide the exact order of this convergence under several distances including Berry-Esseen bound, W1 distance, total variation distance, Kullback-Leibler divergence and Fisher information. We also show how the orders of these convergence are influenced by the choice of bn and an.