Entire spacelike constant σk curvature hypersurfaces with prescribed boundary data at infinity

Abstract

In this paper, we investigate the existence and uniqueness of convex, entire, spacelike hypersurfaces of constant σk curvature with prescribed set of lightlike directions F⊂Sn-1 and perturbation q on F. We prove that given a closed set F in the ideal boundary at infinity of hyperbolic space and a perturbation q that satisfies some mild conditions, there exists a complete entire spacelike constant σk curvature hypersurface Mu with prescribed set of lightlike directions F satisfying when x|x|∈F, as |x|→∞, u(x)-|x|→ q(x|x|). This result is new even for the case of constant Gauss curvature. We also prove that when the Gauss map image is a half disc B1+ and the perturbation q 0, if a CMC hypersurface Mu satisfies |u(x)-VB+(x)| is bounded, then u(x) is unique.