On Sobolev regularity of mass transport and transportation inequalities

Abstract

We study Sobolev a priori estimates for the optimal transportation T = ∇ between probability measures μ=e-V \ dx and =e-W \ dx on d. Assuming uniform convexity of the potential W we show that ∫ \| D2 \|2HS \ dμ, where \|·\|HS is the Hilbert-Schmidt norm, is controlled by the Fisher information of μ. In addition, we prove similar estimate for the Lp(μ)-norms of \|D2 \| and obtain some Lp-generalizations of the well-known Caffarelli contraction theorem. We establish a connection of our results with the Talagrand transportation inequality. We also prove a corresponding dimension-free version for the relative Fisher information with respect to a Gaussian measure.