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On locally convex hypersurfaces with boundary

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Trudinger, Neil
Wang, Xu-Jia

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Walter de Gruyter

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In this paper we give some geometric characterizations of locally convex hypersurfaces. In particular, we prove that for a given locally convex hypersurface M with boundary, there exists r > 0 depending only on the diameter of M and the principal curvatures of M on its boundary, such that the r-neighbourhood of any given point on M is convex. As an application we prove an existence theorem for a Plateau problem for locally convex hypersurfaces of constant Gauss curvature.

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Journal fur Reine und Angewandte Mathematik

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