Structure preservation via the Wasserstein distance

Abstract

We show that under minimal assumptions on a random vector X∈Rd and with high probability, given m independent copies of X, the coordinate distribution of each vector ( Xi,θ )i=1m is dictated by the distribution of the true marginal X,θ . Specifically, we show that with high probability, \[θ ∈ Sd-1 ( 1mΣi=1m | Xi,θ - λθi |2 )1/2 ≤ c ( dm )1/4,\] where λθi = m∫(i-1m, im] F X,θ -1(u)\,du and a denotes the monotone non-decreasing rearrangement of a. Moreover, this estimate is optimal. The proof follows from a sharp estimate on the worst Wasserstein distance between a marginal of X and its empirical counterpart, 1m Σi=1m δ Xi, θ .