On the Brunn-Minkowski inequality for general measures with applications to new isoperimetric-type inequalities

Abstract

In this paper we present new versions of the classical Brunn-Minkowski inequality for different classes of measures and sets. We show that the inequality \[ μ(λ A + (1-λ)B)1/n ≥ λ μ(A)1/n + (1-λ)μ(B)1/n \] holds true for an unconditional product measure μ with decreasing density and a pair of unconditional convex bodies A,B ⊂ Rn. We also show that the above inequality is true for any unconditional -concave measure μ and unconditional convex bodies A,B ⊂ Rn. Finally, we prove that the inequality is true for a symmetric -concave measure μ and a pair of symmetric convex sets A,B ⊂ R2, which, in particular, settles two-dimensional case of the conjecture for Gaussian measure proposed by R. Gardner and the fourth named author. In addition, we deduce the 1/n-concavity of the parallel volume t μ(A+tB), Brunn's type theorem and certain analogues of Minkowski first inequality.