The rigidity on the second fundamental form of projective manifolds

Abstract

Let M be a complex n-dimensional projective manifold in Pn+r endowed with the Fubini-Study metric of constant holomorphic sectional curvature 1, σ its second fundamental form, and |σ|2 the mean value of the squared length of σ on M. We derive a formula for |σ|2 and classify them when |σ|2≤2n. We present several applications to these results. The first application is to confirm a conjecture of Loi and Zedda, which characterizes the linear subspace and the quadric in terms of the L2-norm of σ. The second application is to improve a result of Cheng solving an old conjecture of Oguie from pointwise case to mean case. The third application is to give an optimal second gap value on |σ|2, which can be viewed as a complex analog to those on minimal submanifolds in the unit spheres.