From Super Poincar\'e to Weighted Log-Sobolev and Entropy-Cost Inequalities

Abstract

We derive weighted log-Sobolev inequalities from a class of super Poincar\'e inequalities. As an application, the Talagrand inequality with larger distances are obtained. In particular, on a complete connected Riemannian manifold, we prove that the -Sobolev inequality with ∈ (1,2) implies the L2/(2-)-transportation cost inequality W2/(2-)(fμ,μ)2/(2-) Cμ(f f), μ(f)=1, f 0 for some constant C>0, and they are equivalent if the curvature of the corresponding generator is bounded below. Weighted log-Sobolev and entropy-cost inequalities are also derived for a large class of probability measures on d.