Convex hypersurfaces of prescribed curvatures in hyperbolic space

Abstract

For a smooth, closed and uniformly h-convex hypersurface M in Hn+1, the horospherical Gauss map G: M → Sn is a diffeomorphism. We consider the problem of finding a smooth, closed and uniformly h-convex hypersurface M⊂ Hn+1 whose k-th shifted mean curvature Hk (1≤ k≤ n) is prescribed as a positive function f(x) defined on Sn, i.e. eqnarray* Hk(G-1(x))=f(x). eqnarray* We can prove the existence of solution to this problem if the given function f is even. The similar problem has been considered by Guan-Guan for convex hypersurfaces in Euclidean space two decades ago.