Large-dimensional Central Limit Theorem with Fourth-moment Error Bounds on Convex Sets and Balls

Abstract

We prove the large-dimensional Gaussian approximation of a sum of n independent random vectors in Rd together with fourth-moment error bounds on convex sets and Euclidean balls. We show that compared with classical third-moment bounds, our bounds have near-optimal dependence on n and can achieve improved dependence on the dimension d. For centered balls, we obtain an additional error bound that has a sub-optimal dependence on n, but recovers the known result of the validity of the Gaussian approximation if and only if d=o(n). We discuss an application to the bootstrap. We prove our main results using Stein's method.