Inverse mean curvature flows in warped product manifolds

Abstract

We study inverse mean curvature flows of starshaped, mean convex hypersurfaces in warped product manifolds with a positive warping factor (r). If '(r)>0 and ''(r)≥ 0, we show that these flows exist for all times, remain starshaped and mean convex. Plus the positivity of ''(r) and a curvature condition we obtain a lower positive bound of mean curvature along these flows independent of the initial mean curvature. We also give a sufficient condition to extend the asymptotic behavior of these flows in Euclidean spaces into some more general warped product manifolds.