The Uniqueness of the Gauss Image Measure

Abstract

We show that if the Gauss Image Measure of submeasure λ via convex body K agrees with the Gauss Image Measure of λ via convex body L, then the radial Gauss Image maps of their duals, are equal to each other almost everywhere as multivalued maps with respect to λ. As an application of this result, we establish that, in this case, dual bodies, K* and L*, are equal up to a dilation on each rectifiable path connected component of the support of λ. Additionally, we provide many previously unknown properties of the radial Gauss Image map, most notably its variational Lipschitz behavior, establish some measure theory concepts for multivalued maps and, as a supplement, show how the main uniqueness statement neatly follows from the Hopf Theorem under additional smooth assumptions on K and L.