NORMAL APPROXIMATION FOR STABILIZING FUNCTIONALS
成果类型:
Article
署名作者:
Lachieze-Rey, Raphael; Schulte, Matthias; Yukich, J. E.
署名单位:
Universite Paris Cite; University of Bern; Lehigh University
刊物名称:
ANNALS OF APPLIED PROBABILITY
ISSN/ISSBN:
1050-5164
DOI:
10.1214/18-AAP1405
发表日期:
2019
页码:
931-993
关键词:
CENTRAL LIMIT-THEOREMS
gaussian limits
random polytopes
Moderate Deviations
large numbers
bounds
statistics
LAWS
摘要:
We establish presumably optimal rates of normal convergence with respect to the Kolmogorov distance for a large class of geometric functionals of marked Poisson and binomial point processes on general metric spaces. The rates are valid whenever the geometric functional is expressible as a sum of exponentially stabilizing score functions satisfying a moment condition. By incorporating stabilization methods into the Malliavin-Stein theory, we obtain rates of normal approximation for sums of stabilizing score functions which either improve upon existing rates or are the first of their kind. Our general rates hold for functionals of marked input on spaces more general than full-dimensional subsets of R-d, including m-dimensional Riemannian manifolds, m <= d. We use the general results to deduce improved and new rates of normal convergence for several functionals in stochastic geometry, including those whose variances re-scale as the volume or the surface area of an underlying set. In particular, we improve upon rates of normal convergence for the k-face and i th intrinsic volume functionals of the convex hull of Poisson and binomial random samples in a smooth convex body in dimension d >= 2. We also provide improved rates of normal convergence for statistics of nearest neighbors graphs and high-dimensional data sets, the number of maximal points in a random sample, estimators of surface area and volume arising in set approximation via Voronoi tessellations, and clique counts in generalized random geometric graphs.
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