On the intersection of minimal hypersurfaces of Sk

Abstract

It is known since the work of Frankel that two compactly immersed minimal hypersurfaces in a manifold with positive Ricci curvature must have an intersection point. Several generalizations of this result can be found in the literature, for example in the works of Lawson, Petersen and Wilhelm, among others. In the special case of minimal hypersurfaces of Sk, we prove a stronger version of Frankel's theorem. Namely, we show that if two compact minimal hypersurfaces M1, M2 of Sk and a point p∈ Sk are given, then M1 and M2 have an intersection point in the hemisphere with respect to p. As a corollary of this result, we give an alternative proof to Ros' two-piece property of minimal surfaces of S3, for the general dimension case.