English

Quantitative Breuer-Major Theorems

Probability 2010-06-08 v2

Abstract

We consider sequences of random variables of the type Sn=n1/2k=1n{f(Xk)\E[f(Xk)]}S_n= n^{-1/2} \sum_{k=1}^n \{f(X_k)-\E[f(X_k)]\}, n1n\geq 1, where X=(Xk)kZX=(X_k)_{k\in \Z} is a dd-dimensional Gaussian process and f:RdRf: \R^d \rightarrow \R is a measurable function. It is known that, under certain conditions on ff and the covariance function rr of XX, SnS_n converges in distribution to a normal variable SS. In the present paper we derive several explicit upper bounds for quantities of the type \E[h(Sn)]\E[h(S)]|\E[h(S_n)] -\E[h(S)]|, where hh is a sufficiently smooth test function. Our methods are based on Malliavin calculus, on interpolation techniques and on the Stein's method for normal approximation. The bounds deduced in our paper depend only on Var[f2(X1)]Var[f^2(X_1)] and on simple infinite series involving the components of rr. In particular, our results generalize and refine some classic CLTs by Breuer-Major, Giraitis-Surgailis and Arcones, concerning the normal approximation of partial sums associated with Gaussian-subordinated time-series.

Keywords

Cite

@article{arxiv.1005.3107,
  title  = {Quantitative Breuer-Major Theorems},
  author = {Ivan Nourdin and Giovanni Peccati and Mark Podolskij},
  journal= {arXiv preprint arXiv:1005.3107},
  year   = {2010}
}

Comments

24 pages

R2 v1 2026-06-21T15:24:14.149Z