Mean Curvature Rigidity and Non-rigidity Results on Spherical Caps

Abstract

We prove that a hemisphere in the Euclidean space Rn+1, viewed as the graph of a function, admits no smooth perturbations as graphs with mean curvature H 1 whose boundary equator is fixed up to C2. This is an extension of the Mean Curvature Rigidity phenomenon discovered by Gromov and Souam on non-compact totally umbilic hypersurfaces in space forms. The proof uses a Tangency Principle. On the other hand, we show that there exist nontrivial smooth perturbations with H 1 on a great spherical cap whose boundary is fixed up to C2. Similar results hold true for perturbations decreasing H, and for the r mean curvature function Hr. This contrast between rigidity and non-rigidity is even true in the 1-dimensional case for circles and for discrete objects (polygons inscribed in a circle).