Rigidity of riemannian manifolds containing an equator
Abstract
In this paper, we prove that a Riemannian n-manifold M with sectional curvature bounded above by 1 that contains a minimal 2-sphere of area 4π which has index at least n-2 has constant sectional curvature 1. The proof uses the construction of ancient mean curvature flows that flow out of a minimal submanifold. As a consequence we also prove a rigidity result for the Simon-Smith minimal spheres.
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