Orateur
Dario Cordero Erausquin
Description
In proving inequalities for log-concave measures and convex bodies (often with the extra assumption of symmetry) one is lead to understand Poincaré type inequalities for all (symmetric) measure that are log-concave with respect to some given log-concave measure. When this reference measure is not Gaussian, this family does not belong to a classical $CD(\rho, \infinity)$ family. We will present some results and some questions related to the (B) inequality for dilates of symmetric convex bodies.
