Limit Law for the Maximum Interpoint Distance of High Dimensional Dependent Variables

Abstract

In this paper, we considier the limiting distribution of the maximum interpoint Euclidean distance Mn= 1 ≤ i<j ≤ n\|Xi-Xj\|, where X1, X2, …, Xn be a random sample coming from a p-dimensional population with dependent sub-gaussian components. When the dimension tends to infinity with the sample size, we proves that Mn2 under a suitable normalization asymptotically obeys a Gumbel type distribution. The proofs mainly depend on the Stein-Chen Poisson approximation method and high dimensional Gaussian approximation.

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