Feng-Yu Wang

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Feng-Yu Wang

机译：Fe ng-Y u Wang

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Let $M$ be a compact Riemannian manifold with boundary $∂M$ and $L= delta+Z$ for a $C^1$-vector field $Z$ on $M$. Several equivalent statements, including the gradient and Poincaré/log-Sobolev type inequalities of the Neumann semigroup generated by $L$, are presented for lower bound conditions on the curvature of $L$ and the second fundamental form of $∂M$. The main result not only generalizes the corresponding known ones on manifolds without boundary, but also clarifies the role of the second fundamental form in the analysis of the Neumann semigroup. Moreover, the Lévy-Gromov isoperimetric inequality is also studied on manifolds with boundary.

机译：假设$ M $是一个紧致的黎曼流形，边界为$$ M $，对于$ M $上的$ C ^ 1 $-向量字段$ Z $，$ L = delta + Z $。针对$ L $的曲率和$∂M$的第二种基本形式的下界条件，给出了一些等效的陈述，包括由$ L $生成的Neumann半群的梯度和Poincaré/ log-Sobolev型不等式。主要结果不仅在无边界的流形上泛化了相应的已知泛函，而且阐明了第二基本形式在Neumann半群分析中的作用。此外，还在带边界的流形上研究了Lévy-Gromov等距不等式。

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《DOCUMENTA MATHEMATICA》 |2010年第8期|共18页
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