Convex geometry of finite exchangeable laws and de Finetti style representation with universal correlated corrections

Abstract

We present a novel analogue for finite exchangeable sequences of the de Finetti, Hewitt and Savage theorem and investigate its implications for multi-marginal optimal transport (MMOT) and Bayesian statistics. If (Z1,...,ZN) is a finitely exchangeable sequence of N random variables taking values in some Polish space X, we show that the law μk of the first k components has a representation of the form μk=∫ P1N(X) FN,k(λ) \, d α(λ) for some probability measure α on the set of 1/N-quantized probability measures on X and certain universal polynomials FN,k. The latter consist of a leading term Nk-1\! / Πj=1k-1(N\! -\! j)\, λ k and a finite, exponentially decaying series of correlated corrections of order N-j (j=1,...,k). The FN,k(λ) are precisely the extremal such laws, expressed via an explicit polynomial formula in terms of their one-point marginals λ. Applications include novel approximations of MMOT via polynomial convexification and the identification of the remainder which is estimated in the celebrated error bound of Diaconis-Freedman between finite and infinite exchangeable laws.

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