Topological and differentiable sphere theorems for complete submanifolds

We investigate topological and differentiable structures ofsubmanifolds under extrinsic restrictions. We first obtaina topological sphere theorem for compact submanifolds in aRiemannian manifold. Secondly, we prove an optimaldifferentiable sphere theorem for 4-dimensional completesubmanifolds in a space form, which provides a partialsolution of the smooth Poincaré conjecture. Finally, weprove some new differentiable sphere theorems for$n$-dimensional submanifolds in a Riemannian manifold.

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Published 1 January 2009