Regular domains and surfaces of constant Gaussian curvature in three-dimensional affine space

Abstract: Generalizing the notion of domains of dependence in the Minkowski space, we define and study regular domains in the affine space with respect to a proper convex cone. In dimension three, we show that every proper regular domain is uniquely foliated by a particular kind of surfaces with constant affine Gaussian curvature. The result is based on the analysis of a Monge-Amp`ere equation with extended-real-valued lower semicontinuous boundary condition.