The Minkowski problem, new constant curvature surfaces in R3, and some applications

Abstract

Let m∈N, m≥ 2, and let \pj\j=1m be a finite subset of S2 such that 0∈R3 lies in its positive convex hull. In this paper we make use of the classical Minkowski problem, to show the complete family of smooth convex bodies K in R3 whose boundary surface consists of an open surface S with constant Gauss curvature (respectively, constant mean curvature) and m planar compact discs D1,...,Dm, such that the Gauss map of S is a homeomorphism onto S2-\pj\j=1m and Dj pj, for all j. We derive applications to the generalized Minkowski problem, existence of harmonic diffeomorphisms between domains of S2, existence of capillary surfaces in R3, and a Hessian equation of Monge-Ampere type.