Convex Spacelike Hypersurfaces of Constant Curvature in de Sitter Space

Abstract

We show that for a very general and natural class of curvature functions (for example the curvature quotients (σn/σl)1n-l) the problem of finding a complete spacelike strictly convex hypersurface in de Sitter space satisfying f() = σ ∈ (1,∞) with a prescribed compact future asymptotic boundary at infinity has at least one smooth solution (if l = 1 or l = 2 there is uniqueness). This is the exact analogue of the asymptotic plateau problem in Hyperbolic space and is in fact a precise dual problem. By using this duality we obtain for free the existence of strictly convex solutions to the asymptotic Plateau problem for σl = σ; 1≤ l < n in both deSitter and Hyperbolic space.