Weighted Minkowski's Existence Theorem and Projection Bodies

Abstract

The Brunn-Minkowski Theory has seen several generalizations over the past century. Many of the core ideas have been generalized to measures. With the goal of framing these generalizations as a weighted Brunn-Minkowski theory, we prove the Minkowski existence theorem for a large class of Borel measures with continuous density, denoted by n: for a finite, even Borel measure on the unit sphere and even μ∈n, there exists a symmetric convex body K such that d(u)=cμ,KdSμK(u), where cμ,K is a quantity that depends on μ and K and dSμK(u) is the surface area-measure of K with respect to μ. Examples of measures in n are homogeneous measures (with cμ,K=1) and probability measures with radially decreasing densities (e.g. the Gaussian measure). We will also consider weighted projection bodies μ K by classifying them and studying the isomorphic Shephard problem: if μ and are even, homogeneous measures with density and K and L are symmetric convex bodies such that μ K ⊂ L, then can one find an optimal quantity A>0 such that μ(K)≤ A(L)? Among other things, we show that, in the case where μ= and L is a projection body, A=1.