Slow Convergence in Generalized Central Limit Theorems

Abstract

We study the central limit theorem in the non-normal domain of attraction to symmetric α-stable laws for 0<α≤2. We show that for i.i.d. random variables Xi, the convergence rate in L∞ of both the densities and distributions of Σin Xi/(n1/αL(n)) is at best logarithmic if L is a non-trivial slowly varying function. Asymptotic laws for several physical processes have been derived using central limit theorems with n n scaling and Gaussian limiting distributions. Our result implies that such asymptotic laws are accurate only for exponentially large n.