Symmetry of hypersurfaces with ordered mean curvature in one direction

Abstract

For a connected n-dimensional compact smooth hypersurface M without boundary embedded in Rn+1, a classical result of Aleksandrov shows that it must be a sphere if it has constant mean curvature. Li and Nirenberg studied a one-directional analog of this result: if every pair of points (x',a), (x',b)∈ M with a<b has ordered mean curvature H(x',b)≤ H(x',a), then M is symmetric about some hyperplane xn+1=c under some additional conditions. Their proof was done by the moving plane method and some variations of the Hopf Lemma. We obtain the symmetry of M under some weaker assumptions using a variational argument, giving a positive answer to the conjecture given by Li and Nirenberg.