Pinching rigidity theorems for normal scalar curvature

Abstract

Let Mn be an n-dimensional closed minimal submanifold immersed in the unit sphere Sn+m. Denote by S and the squared norm of the second fundamental form and the normal scalar curvature of Mn, respectively. Let \Aα\α=n+1n+m be the shape operators of Mn with respect to a local orthonormal normal frame. Denote by λ1 the largest eigenvalue of the positive semi-definite symmetric matrix A=( Aα,Aβ)m× m. We show that if λ1≤slant n and ≤slant [2n(n-1)]-1 ∈fp∈ M(n-λ1)(p), then 0, which means the normal bundle of Mn is flat, and further we give the classification of Mn.

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