English

Multivariate second order Poincar\'e inequalities for Poisson functionals

Probability 2019-11-01 v3

Abstract

Given a vector F=(F1,,Fm)F=(F_1,\dots,F_m) of Poisson functionals F1,,FmF_1,\dots,F_m, we investigate the proximity between FF and an mm-dimensional centered Gaussian random vector NΣN_\Sigma with covariance matrix ΣRm×m\Sigma\in\mathbb{R}^{m\times m}. Apart from finding proximity bounds for the d2d_2- and d3d_3-distances, based on classes of smooth test functions, we obtain proximity bounds for the dconvexd_{convex}-distance, based on the less tractable test functions comprised of indicators of convex sets. The bounds for all three distances are shown to be of the same order, which is presumably optimal. The bounds are multivariate counterparts of the univariate second order Poincar\'e inequalities and, as such, are expressed in terms of integrated moments of first and second order difference operators. The derived second order Poincar\'e inequalities for indicators of convex sets are made possible by a new bound on the second derivatives of the solution to the Stein equation for the multivariate normal distribution. We present applications to the multivariate normal approximation of first order Poisson integrals and of statistics of Boolean models.

Keywords

Cite

@article{arxiv.1803.11059,
  title  = {Multivariate second order Poincar\'e inequalities for Poisson functionals},
  author = {Matthias Schulte and J. E. Yukich},
  journal= {arXiv preprint arXiv:1803.11059},
  year   = {2019}
}

Comments

42 pages. Theorem 1.2 and its applications were corrected to include $\gamma_3$

R2 v1 2026-06-23T01:08:48.700Z