Stein kernels for q-moment measures and new bounds for the rate of convergence in the central limit theorem

Abstract

Given an isotropic probability measure μ on Rd with dμ ( x ) = ( ( x ) ) - α dx, where α > d + 1 and : Rd ( 0, + ∞ ) is a continuous function and uniformly convex (∇ 2 0 Id). By using Stein kernels for ( α - d )-moment measures, we prove that the rates of convergence in the central limit theorem with sequence of i.i.d. random variables X1,X2,...,Xn of the law μ, to be of form c_0\, dn . The general case (i.e., is only convex and continuous) remains open.