De Finetti's theorem: rate of convergence in Kolmogorov distance

Abstract

This paper provides a quantitative version of de Finetti law of large numbers. Given an infinite sequence \Xn\n ≥ 1 of exchangeable Bernoulli variables, it is well-known that 1n Σi = 1n Xi a.s. Y, for a suitable random variable Y taking values in [0,1]. Here, we consider the rate of convergence in law of 1n Σi = 1n Xi towards Y, with respect to the Kolmogorov distance. After showing that any rate of the type of 1/nα can be obtained for any α ∈ (0,1], we find a sufficient condition on the probability distribution of Y for the achievement of the optimal rate of convergence, that is 1/n. Our main result improve on existing literature: in particular, with respect to MPS, we study a stronger metric while, with respect to Mna, we weaken the regularity hypothesis on the probability distribution of Y.