A Berry-Esseen bound for the uniform multinomial occupancy model

Abstract

The inductive size bias coupling technique and Stein's method yield a Berry-Esseen theorem for the number of urns having occupancy d 2 when n balls are uniformly distributed over m urns. In particular, there exists a constant C depending only on d such that z ∈ R|P(Wn,m z) -P(Z z)| C ( 1+(nm)3σn,m ) for all n d and m 2, where Wn,m and σn,m2 are the standardized count and variance, respectively, of the number of urns with d balls, and Z is a standard normal random variable. Asymptotically, the bound is optimal up to constants if n and m tend to infinity together in a way such that n/m stays bounded.