On p-Brunn-Minkowski and Brascamp-Lieb inequalities

Abstract

We show that a strong version of the Brascamp--Lieb inequality for symmetric log-concave measure with α-homogeneous potential V is equivalent to a p-Brunn--Minkowski inequality for level sets of V with some p(α,n)<0. We establish links between several inequalities of this type on the sphere and the Euclidean space. Exploiting these observations, we prove new sufficient conditions for symmetric p-Brunn--Minkowski inequality with p<1. In particular, we prove the local log-Brunn--Minkowski for Lq-balls for all q≥ 1 in all dimensions, which was previously known only for q≥ 2.