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On the inverse mean curvature flow in warped product manifolds

Published 17 Oct 2016 in math.DG | (1610.05234v1)

Abstract: We consider the warped product manifold, $\mathbb{R}+ \times{\bf{Id}} Mn$, with Riemannian metric $\gamma\equiv \mathrm{d} r2 \oplus r2 \sigma$, where $(Mn, \sigma)$ is a smooth closed Riemannian $n$-manifold. We investigate what sufficient curvature condition is required of $\sigma$ to ensure that a solution to the inverse mean curvature flow - commencing with a star-shaped surface - exists for all times $t>0$.

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