On Yau rigidity theorem for minimal submanifolds in spheres

Abstract

In this note, we investigate the well-known Yau rigidity theorem for minimal submanifolds in spheres. Using the parameter method of Yau and the DDVV inequality verified by Lu, Ge and Tang, we prove that if M is an n-dimensional oriented compact minimal submanifold in the unit sphere Sn+p(1), and if KM≥sgn(p-1)p2(p+1), then M is either a totally geodesic sphere, the standard immersion of the product of two spheres, or the Veronese surface in S4(1). Here sgn(·) is the standard sign function. We also extend the rigidity theorem above to the case where M is a compact submanifold with parallel mean curvature in a space form.