Mean curvature in manifolds with Ricci curvature bounded from below

Abstract

Let M be a compact Riemannian manifold of nonnegative Ricci curvature and a compact embedded 2-sided minimal hypersurface in M. It is proved that there is a dichotomy: If does not separate M then is totally geodesic and M is isometric to the Riemannian product ×(a,b), and if separates M then the map i*:π1()→ π1(M) induced by inclusion is surjective. This surjectivity is also proved for a compact 2-sided hypersurface with mean curvature H≥(n-1)k in a manifold of Ricci curvature RicM≥-(n-1)k,k>0, and for a free boundary minimal hypersurface in a manifold of nonnegative Ricci curvature with nonempty strictly convex boundary. As an application it is shown that a compact n-dimensional manifold N with the number of generators of π1(N)<n cannot be minimally embedded in the flat torus Tn+1.