Estimates of transport distance in the central limit theorem
Abstract
Let X1,…,Xn be d-dimensional independent random vectors bounded with probability one. For simplicity, we assume that they have zero mean values: equation P\\|Xj\|τ\=1,E\,Xj=0, j=1,…, n. equation We study the distribution behavior of the sum S=X1+·s+Xn as a function of the bounding value τ. From the non-uniform Bikelis estimate in the one-dimensional central limit theorem it follows that W1(F,σ) cτ. with an absolute constant c, where W1 is the Kantorovich--Rubinstein--Wasserstein transport distance, F is the distribution of the sum S, and σ is the corresponding normal distribution. The main result of the paper is significantly stronger and more precise. It is claimed that (F,σ) =∈f∫(|x-y|/cτ)\,dπ(x,y) c, where the infimum is taken over all bivariate probability distributions π with marginal distributions F and σ. The result has also been generalized to distributions with sufficiently slowly growing cumulants from the class A1(τ ), introduced in the author's 1986 paper. The possibility of generalizing the result to the multivariate case is discussed.
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