Second-order asymptotics on distributions of maxima of bivariate elliptical arrays

Abstract

Let \ (ni, ηni), 1≤ i ≤ n, n≥ 1 \ be a triangular array of independent bivariate elliptical random vectors with the same distribution function as (S1, nS1+1-n2S2), n∈ (0,1), where (S1,S2) is a bivariate spherical random vector. For the distribution function of radius S12+S22 belonging to the max-domain of attraction of the Weibull distribution, Hashorva (2006) derived the limiting distribution of maximum of this triangular array if convergence rate of n to 1 is given. In this paper, under the refinement of the rate of convergence of n to 1 and the second-order regular variation of the distributional tail of radius, precise second-order distributional expansions of the normalized maxima of bivariate elliptical triangular arrays are established.