On the rate of convergence in de Finetti's representation theorem

Abstract

A consequence of de Finetti's representation theorem is that for every infinite sequence of exchangeable 0-1 random variables (Xk)k≥1, there exists a probability measure μ on the Borel sets of [0,1] such that Xn = n-1 Σi=1n Xi converges weakly to μ. For a wide class of probability measures μ having smooth density on (0,1), we give bounds of order 1/n with explicit constants for the Wasserstein distance between the law of Xn and μ. This extends a recent result by Goldstein and Reinert goldstein2013stein regarding the distance between the scaled number of white balls drawn in a P\'olya-Eggenberger urn and its limiting distribution. We prove also that, in the most general cases, the distance between the law of Xn and μ is bounded below by 1/n and above by 1/n (up to some multiplicative constants). For every δ ∈ [1/2,1], we give an example of an exchangeable sequence such that this distance is of order 1/nδ.