A Note on Liouville Type Theorem of Elliptic Inequality Delta u plus u (sigma) a (c) 1/2 0 on Riemannian Manifolds

Zhang Hui-Chun

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A Note on Liouville Type Theorem of Elliptic Inequality Delta u plus u (sigma) a (c) 1/2 0 on Riemannian Manifolds

机译：关于黎曼流形上椭圆不等式δu加u（sigma）a（c）1/2 0的Liouville型定理的一个注记

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Let sigma > 1 and let M be a complete Riemannian manifold. In a very recent work (Grigor'yan and Sun 2014), Grigor (')yan and Sun proved that a Liouville type theorem holds for nonnegative solutions of elliptic inequality via a pointwise condition of volume growth of geodesic balls. In this note, we improve their result showing that an integral condition on volume growth implies the same uniqueness of solutions to Eq. (*). It is inspired by the well-known Varopoulos-Grigor(')yan's criterion for parabolicity of M.

机译：令sigma> 1，令M为完整的黎曼流形。在最近的工作中（Grigor'yan和Sun，2014年），Grigor（'）yan和Sun证明，通过测地球体积增长的点状条件，Liouville型定理适用于椭圆不等式的非负解。在本说明中，我们改进了他们的结果，表明对数量增长的积分条件意味着方程的解具有相同的唯一性。（*）。它受到著名的Varopoulos-Grigor（'）yan的M抛物线准则的启发。

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《Potential analysis: An international journal devoted to the interactions between potential theory, probability theory, geometry and functional analysis》 |2015年第2期|共8页
作者
Zhang Hui-Chun;
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正文语种 eng
中图分类数学;
关键词
Elliptic inequality; Liouville theorem; Riemannian manifolds; Integral condition;

机译：椭圆不等式;Liouville定理;黎曼流形;积分条件;

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1. A Note on Liouville Type Theorem of Elliptic Inequality Delta u plus u (sigma) a (c) 1/2 0 on Riemannian Manifolds [J] . Zhang Hui-Chun Potential analysis: An international journal devoted to the interactions between potential theory, probability theory, geometry and functional analysis . 2015,第2期

机译：关于黎曼流形上椭圆不等式δu加u（sigma）a（c）1/2 0的Liouville型定理的一个注记
2. Liouville type theorems for systems of elliptic differential inequalities on Riemannian manifolds [J] . Fanheng Xu, Lifei Wang, Yuhua Sun Journal of Mathematical Analysis and Applications . 2018,第1期

机译：瑞马歧木椭圆差分不等式系统的Liouville型定理
3. Liouville-type theorems for some classes of Riemannian almost product manifolds and for special mappings of Riemannian manifolds [J] . Stepanov Sergey E., Mikes Josef Differential geometry and its applications . 2017,第1期

机译：Liouville型定理为某些级别的riemannian几乎产品歧管以及riemannian歧管的特殊映射
4. Positive solutions of semi-linear elliptic problems via Krasnoselskii type theorems in cones and Harnack's inequality [C] . Radu Precup International Conference on Mathematical Analysis and Applications . 2006

机译：锥体克拉斯斯基型定理的半线性椭圆问题正解及哈纳克的不平等问题
5. Liouville and Harnack type theorems for semilinear elliptic equations and Yamabe type equations. [D] . Zhang, Lei. 2001

机译：半线性椭圆方程和Yamabe型方程的Liouville和Harnack型定理。
6. Gradient estimates and Liouville-type theorems for a weighted nonlinear elliptic equation [O] . Bingqing Ma, Yongli Dong -1

机译：加权非线性椭圆方程的梯度估计和Liouville型定理
7. Liouville theorems for fully nonlinear elliptic equations on spherically symmetric Riemannian manifolds [O] . Punzo, Fabio 2013

机译：球对称黎曼流形上完全非线性椭圆方程的Liouville定理
8. Isoperimetric Inequalities for Two- Dimensional Riemannian Manifolds [R] . Hsiung, C. C. 1960

机译：二维黎曼流形的等周不等式

A Note on Liouville Type Theorem of Elliptic Inequality Delta u plus u (sigma) a (c) 1/2 0 on Riemannian Manifolds

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