On Chern's Conjecture for Minimal Submanifolds with Flat Normal Bundle in Spheres
Abstract
Let Mn (n≥slant3) be a closed minimal submanifold in the unit sphere Sn+m (m≥slant2) with flat normal bundle, and let S denote the squared norm of its second fundamental form. We prove an explicit second-gap rigidity theorem for S. More precisely, if S is constant and \[ 0≤slant S≤slant n+δ, \] where δ is an explicit constant satisfying δ≥slant n87, then either S0 and M is a totally geodesic sphere, or S n and M is a Clifford torus contained in a totally geodesic Sn+1⊂ Sn+m. %We observe that the flat-normal-bundle assumption is necessary here. The flat-normal-bundle condition is essential in the general higher-codimensional setting: without it, the corresponding rigidity statement already fails in dimension two. This theorem provides positive evidence for Chern's conjecture in higher codimension.
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