The Michael-Simon-Sobolev inequality on manifolds for positive symmetric tensor fields

Yuting Wu, Chengyang Yi, Yu Zheng
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Abstract

We prove the Michael-Simon-Sobolev inequality for smooth symmetric uniformly positive definite (0, 2)-tensor fields on compact submanifolds with or without boundary in Riemannian manifolds with nonnegative sectional curvature by the Alexandrov-Bakelman-Pucci (ABP) method. It should be a generalization of S. Brendle in [2].
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流形上正对称张量场的迈克尔-西蒙-索博列夫不等式
我们用亚历山德罗夫-巴克尔曼-普奇(ABP)方法证明了具有非负截面曲率的黎曼流形中紧凑子流形上光滑对称均匀正定(0,2)张量场的迈克尔-西蒙-索博列夫不等式。这应该是 S.Brendle 在 [2] 中的概括。
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