Bounds to the mean curvature of leaves of CMC foliations

Abstract

The main goal of this present paper is to bring the results proved by Barbosa, Kenmotsu and Oshikiri (1991) and its ideas to a perspective where the Ricci curvature is bounded from below. For instance, for a foliation by CMC hypersurfaces on a compact (without boundary) Riemannian manifold Mn+1 with Ricci curvature bounded from below by -nK0≤ 0 and such that the mean curvature H of the leaves of the foliation satisfies |H|≥ K0, we prove that |H| K0 and all the leaves are totally umbilical. This gives, in particular, a generalization for the result proved by Barbosa, Kenmotsu and Oshikiri (1991), where the above result was proved in the case K0=0. We also obtain a proof of the following: for a foliation by CMC hypersurfaces on a compact (without boundary) Riemannian manifold M with Ricci curvature bounded from below by -nK0≤ 0, the mean curvature H of the leaves of the foliation satisfies |H|≤ K0. Furthermore, if the foliation contains a leaf L whose absolute mean curvature is |HL|=K0, then either K0=0 and all the leaves of F are totally geodesic, or K0>0 and there is a totally umbilical leaf.

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