Notes on the dimension dependence in high-dimensional central limit theorems for hyperrectangles

Abstract

Let X1,…,Xn be independent centered random vectors in Rd. This paper shows that, even when d may grow with n, the probability P(n-1/2Σi=1nXi∈ A) can be approximated by its Gaussian analog uniformly in hyperrectangles A in Rd as n∞ under appropriate moment assumptions, as long as ( d)5/n0. This improves a result of Chernozhukov, Chetverikov & Kato [Ann. Probab. 45 (2017) 2309-2353] in terms of the dimension growth condition. When n-1/2Σi=1nXi has a common factor across the components, this condition can be further improved to ( d)3/n0. The corresponding bootstrap approximation results are also developed. These results serve as a theoretical foundation of simultaneous inference for high-dimensional models.