Tranport estimates for random measures in dimension one

Abstract

We show that there is a sharp threshold in dimension one for the transport cost between the Lebesgue measure λ and an invariant random measure μ of unit intensity to be finite. We show that for any such random measure the L1 cost are infinite provided that the first central moments E[|n-μ([0,n))|] diverge. Furthermore, we establish simple and sharp criteria, based on the variance of μ([0,n)], for the Lp cost to be finite for 0<p<1.