Deformations of unbounded convex bodies and hypersurfaces

Abstract

We study the topology of the space n of complete convex hypersurfaces of n which are homeomorphic to n-1. In particular, using Minkowski sums, we construct a deformation retraction of n onto the Grassmannian space of hyperplanes. So every hypersurface in n may be flattened in a canonical way. Further, the total curvature of each hypersurface evolves continuously and monotonically under this deformation. We also show that, modulo proper rotations, the subspaces of n consisting of smooth, strictly convex, or positively curved hypersurfaces are each contractible, which settles a question of H. Rosenberg.