Law of the logarithm for the maximum interpoint distance constructed by high-dimensional random matrix

Abstract

Suppose \ Xi,k; 1 i p, 1 k n \ is an array of i.i.d.~real random variables. Let \ p=pn; n 1 \ be positive integers. Consider the maximum interpoint distance Mn=1 i< j p \| Xi- Xj \|2 where Xi and Xj denote the i-th and j-th rows of the p × n matrix M p,n=( Xi,k )p × n, respectively. This paper shows the laws of the logarithm for Mn under two high-dimensional settings: the polynomial rate and the exponential rate. The proofs rely on the moderation deviation principle of the partial sum of i.i.d.~random variables, the Chen--Stein Poisson approximation method and Gaussian approximation.

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