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The inverse mean curvature flow in warped cylinders of non-positive radial curvature
Published 19 Dec 2013 in math.DG and math.AP | (1312.5662v2)
Abstract: We consider the inverse mean curvature flow in smooth Riemannian manifolds of the form $([R_{0},\infty)\times Sn,\bar{g})$ with metric $\bar{g}=dr2+{\vartheta}2(r){\sigma}$ and non-positive radial sectional curvature. We prove, that for initial mean-convex graphs over $Sn$ the flow exists for all times and remains a graph over $S{n}$. Under weak further assumptions on the ambient manifold, we prove optimal decay of the gradient and that the flow leaves become umbilic exponentially fast. We prove optimal $C2$ estimates in case that the ambient pinching improves.
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