On the rate of convergence in the central limit theorem for hierarchical Laplacian

Abstract

Let (X,d) be a proper ultrametric space. Given a measure m on X and a function C(B) defined on the set of all non-singleton balls B we consider the hierarchical Laplacian L=LC. Choosing a sequence \ (B)\ of i.i.d. random variables we define the perturbed function C(B,ω ) and the perturbed hierarchical Laplacian Lω =LC(ω ). We study the arithmetic means λ (ω ) of the Lω -eigenvalues. Under some mild assumptions the normalized arithmetic means ( λ -Eλ ) /σ ( λ ) converge in law to the standard normal distribution. In this note we study convergence in the total variation distance and estimate the rate of convergence.