Matthias Makowski, Julian Scheuer
Published 2013-07-22, updated 2015-11-05Version 3
We prove a rigidity result in the sphere which allows us to generalize a result about smooth convex hypersurfaces in the sphere by Do Carmo-Warner to convex $C^2$-hypersurfaces. We apply these results to prove $C^{1,\beta}$-convergence of inverse F-curvature flows in the sphere to an equator in \mathbb{S}^{n+1} for embedded, closed, strictly convex initial hypersurfaces. The result holds for large classes of curvature functions including the mean curvature and arbitrary powers of the Gauss curvature. We use this result to prove Alexandrov-Fenchel type inequalities in the sphere.
Comments: 23 pages. Compared to version 2, we removed the statement about the isoperimetric inequality since it turned out to be false. Several typos were corrected
Isoperimetric type problems and Alexandrov-Fenchel type inequalities in the hyperbolic space
A class of inverse curvature flows for star-shaped hypersurfaces evolving in a cone
Monotone quantities involving a weighted $σ_k$ integral along inverse curvature flows
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