Biharmonic PNMC Submanifolds in Spheres

Abstract

We obtain several rigidity results for biharmonic submanifolds in Sn with parallel normalized mean curvature vector field. We classify biharmonic submanifolds in Sn with parallel normalized mean curvature vector field and with at most two distinct principal curvatures. In particular, we determine all biharmonic surfaces with parallel normalized mean curvature vector field in Sn. Then we investigate, for (not necessarily compact) proper biharmonic submanifolds in Sn, their type in the sense of B-Y. Chen. We prove: (i) a proper biharmonic submanifold in Sn is of 1-type or 2-type if and only if it has constant mean curvature =1 or ∈(0,1), respectively; (ii) there are no proper biharmonic 3-type submanifolds with parallel normalized mean curvature vector field in Sn.