A note on an Lp-Brunn-Minkowski inequality for convex measures in the unconditional case

Abstract

We consider a different Lp-Minkowski combination of compact sets in Rn than the one introduced by Firey and we prove an Lp-Brunn-Minkowski inequality, p ∈ [0,1], for a general class of measures called convex measures that includes log-concave measures, under unconditional assumptions. As a consequence, we derive concavity properties of the function t μ(t1p A), p ∈ (0,1], for unconditional convex measures μ and unconditional convex body A in Rn. We also prove that the (B)-conjecture for all uniform measures is equivalent to the (B)-conjecture for all log-concave measures, completing recent works by Saroglou.