Nonexistence of the metric with positive intermediate curvatures on manifolds with boundary
Abstract
We establish curvature obstruction theorems for manifolds with boundary. Our main theorems show that, for dimensions up to 7, a topologically nontrivial compact manifold with boundary cannot have a metric of positive m-intermediate curvature if the boundary is m-convex, and some rigidity result holds if m-intermediate curvature is nonnegative. This non-existence persists after performing a connected sum with an arbitrary manifold. These results generalize results of brendle,chenshuli,ChuKwongLee,Xu to manifold with boundary.
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