Limit theory for point processes in manifolds

Abstract

Let Yi,i≥1, be i.i.d. random variables having values in an m-dimensional manifold M⊂ Rd and consider sums Σi=1n(n1/mYi,\n1/mYj\j=1n), where is a real valued function defined on pairs (y, Y), with y∈ Rd and Y⊂ Rd locally finite. Subject to satisfying a weak spatial dependence and continuity condition, we show that such sums satisfy weak laws of large numbers, variance asymptotics and central limit theorems. We show that the limit behavior is controlled by the value of on homogeneous Poisson point processes on m-dimensional hyperplanes tangent to M. We apply the general results to establish the limit theory of dimension and volume content estimators, R\'enyi and Shannon entropy estimators and clique counts in the Vietoris-Rips complex on \Yi\i=1n.