Limit laws for large kth-nearest neighbor balls
Abstract
Let X1,…,Xn be a sequence of independent random points in Rd with common Lebesgue density f. Under some conditions on f, we obtain a Poisson limit theorem, as n ∞, for the number of large probability kth-nearest neighbor balls of X1,…,Xn. Our result generalizes Theorem 2. of [10], which refers to the special case k=1. Our proof is completely different since it employs the Chen-Stein method instead of the method of moments. Moreover, we obtain a rate of convergence for the Poisson approximation.
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