Poincar\'e inequality for non euclidean metrics and transportation cost inequalities on Rd

Abstract

In this paper, we consider Poincar\'e inequalities for non euclidean metrics on Rd. These inequalities enable us to derive precise dimension free concentration inequalities for product measures. This technique is appropriate for a large scope of concentration rate: between exponential and gaussian and beyond. We give different equivalent functional forms of these Poincar\'e type inequalities in terms of transportation-cost inequalities and infimum convolution inequalities. Workable sufficient conditions are given and a comparison is made with generalized Beckner-Latala-Oleszkiewicz inequalities.