Locally convex hypersurfaces immersed in Hn × R
Abstract
We prove a theorem of Hadamard-Stoker type: a connected locally convex complete hypersurface immersed in Hn × R (n>1), where Hn is n-dimensional hyperbolic space, is embedded and homeomorphic either to the n-sphere or to Rn. In the latter case it is either a vertical graph over a convex domain in Hn or has what we call a simple end.
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