The prescribed curvature problem for entire hypersurfaces in Minkowski space

Abstract

We prove three results in this paper. First, we prove for a wide class of functions ∈ C2(Sn-1) and (X, )∈ C2(Rn+1×Hn), there exists a unique, entire, strictly convex, spacelike hypersurface Mu satisfying σk([Mu])=(X, ) and u(x)→ |x|+(x|x|) as |x|→∞. Second, when k=n-1, n-2, we show the existence and uniqueness of entire, k-convex, spacelike hypersurface Mu satisfying σk([Mu])=(x, u(x)) and u(x)→ |x|+(x|x|) as |x|→∞. Last, we obtain the existence and uniqueness of entire, strictly convex, downward translating solitons Mu with prescribed asymptotic behavior at infinity for σk curvature flow equations. Moreover, we prove that the downward translating solitons Mu have bounded principal curvatures.