Quantitative bounds in the central limit theorem for m-dependent random variables

Abstract

For each n 1, let Xn,1,…,Xn,Nn be real random variables and Sn=Σi=1NnXn,i. Let mn 1 be an integer. Suppose (Xn,1,…,Xn,Nn) is mn-dependent, E(Xni)=0, E(Xni2)<∞ and σn2:=E(Sn2)>0 for all n and i. Then, gather* dW(Snσn,\,Z) 30\,\c1/3+12\,Un(c/2)1/2\ all n 1 and c>0, gather* where dW is Wasserstein distance, Z a standard normal random variable and Un(c)=mnσn2\,Σi=1NnE[Xn,i2\,1\Xn,i>c\,σn/mn\]. Among other things, this estimate of dW(Sn/σn,\,Z) yields a similar estimate of dTV(Sn/σn,\,Z) where dTV is total variation distance.