A class of minimal submanifolds in spheres

Abstract

We introduce a class of minimal submanfolds Mn, n≥ 3, in spheres Sn+2 that are ruled by totally geodesic spheres of dimension n-2. If simply-connected, such a submanifold admits a one-parameter associated family of equally ruled minimal isometric deformations that are genuine. As for compact examples, there are plenty of them but only for dimensions n=3 and n=4. In the first case, we have that M3 must be a S1-bundle over a minimal torus T2 in S5 and in the second case M4 has to be a S2-bundle over a minimal sphere S2 in S6. In addition, we provide new examples in relation to the well-known Chern-do Carmo-Kobayashi problem since taking the torus T2 to be flat yields a minimal submanifolds M3 in S5 with constant scalar curvature.