On the inverse mean curvature flow in warped product manifolds
Abstract
We consider the warped product manifold, R+ ×Id Mn, with Riemannian metric γ d r2 r2 σ, where (Mn, σ) is a smooth closed Riemannian n-manifold. We investigate what sufficient curvature condition is required of σ 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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