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Topological and differentiable rigidity of submanifolds in space forms

Abstract

Let Fn+p(c)F^{n+p}(c) be an (n+p)(n+p)-dimensional simply connected space form with nonnegative constant curvature cc. We prove that if Mn(nβ‰₯4)M^n(n\geq4) is a compact submanifold in Fn+p(c)F^{n+p}(c), and if RicM>(nβˆ’2)(c+H2),Ric_M>(n-2)(c+H^2), where HH is the mean curvature of MM, then MM is homeomorphic to a sphere. We also show that the pinching condition above is sharp. Moreover, we obtain a new differentiable sphere theorem for submanifolds with positive Ricci curvature.Comment: 12 page

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