Multivariate spatial central limit theorems with applications to percolation and spatial graphs
Abstract
Suppose in is a family of i.i.d. variables in some measurable space, is a bounded set in , and for , is a measure on determined by the restriction of to lattice sites in or adjacent to . We prove convergence to a white noise process for the random measure on given by for subsets of , as becomes large,subject to satisfying a ``stabilization'' condition (whereby the effect of changing at a single site is local) but with no assumptions on the rate of decay of correlations. We also give a multivariate central limit theorem for the joint distributions of two or more such measures , and adapt the result to measures based on Poisson and binomial point processes. Applications given include a white noise limit for the measure which counts clusters of critical percolation, a functional central limit theorem for the empirical process of the edge lengths of the minimal spanning tree on random points, and central limit theorems for the on-line nearest neighbour graph.
Cite
@article{arxiv.math/0410021,
title = {Multivariate spatial central limit theorems with applications to percolation and spatial graphs},
author = {Mathew D Penrose},
journal= {arXiv preprint arXiv:math/0410021},
year = {2007}
}
Comments
46 pages. 1 diagram