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Let X1, …, Xn be a random sample from a p-dimensional population distribution. Assume that c1nα≤p≤c2nα for some positive constants c1, c2 and α. In this paper we introduce a new statistic for testing independence of the p-variates of the population and prove that the limiting distribution is the extreme distribution of type I with a rate of convergence O ( (n) ^5/2/n). This is much faster than O (1/log n), a typical convergence rate for this type of extreme distribution. A simulation study and application to stochastic optimization are discussed.
Liu et al. (Wed,) studied this question.