涉及$\Delta_\lambda$ -拉普拉斯式的Lichnerowicz方程正解的注记

IF 0.7 4区 数学 Q2 MATHEMATICS
Anh Tuan Duong, Thi Quynh Nguyen
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引用次数: 0

摘要

在A.E. Kogoj和E. Lanconelli在《非线性分析》 (2012),no. 1中引入了$\lambda_i$的一些一般假设下,我们研究了含有$\Delta_\lambda$ -拉普拉斯方程$$ v_t-\Delta_\lambda v=v^{-p-2}-v^p,\quad v> 0, \quad \mbox{ in }\mathbb R^N\times\mathbb R, $$的抛物型Lichnerowicz方程,其中$p> 0$和$\Delta_\lambda$是一个形式为$$ \Delta_\lambda=\sum_{i=1}^N\partial_{x_i}\big(\lambda_i^2\partial_{x_i}\big). $$的次椭圆算子。12, 4637-4649,我们将证明方程正解的一致下界,只要{\bf}$p> 0$。此外,在$p> 1$的情况下,我们将证明方程只有平凡解$v=1$。因此,当$v$与时间变量无关时,对于涉及$\Delta_\lambda$ - laplace的椭圆Lichnerowicz方程,我们得到了类似的结果 $$ -\Delta_\lambda u=u^{-p-2}-u^p,\quad u> 0,\quad \mbox{in }\mathbb R^N. $$
本文章由计算机程序翻译,如有差异,请以英文原文为准。
A note on positive solutions of Lichnerowicz equations involving the $\Delta_\lambda$-Laplacian
In this paper, we are concerned with the parabolic Lichnerowicz equation involving the $\Delta_\lambda$-Laplacian $$ v_t-\Delta_\lambda v=v^{-p-2}-v^p,\quad v> 0, \quad \mbox{ in }\mathbb R^N\times\mathbb R, $$ where $p> 0$ and $\Delta_\lambda$ is a sub-elliptic operator of the form $$ \Delta_\lambda=\sum_{i=1}^N\partial_{x_i}\big(\lambda_i^2\partial_{x_i}\big). $$ Under some general assumptions of $\lambda_i$ introduced by A.E. Kogoj and E. Lanconelli in Nonlinear Anal. {\bf 75} (2012), no.\ 12, 4637-4649, we shall prove a uniform lower bound of positive solutions of the equation provided that $p> 0$. Moreover, in the case $p> 1$, we shall show that the equation has only the trivial solution $v=1$. As a consequence, when $v$ is independent of the time variable, we obtain the similar results for the elliptic Lichnerowicz equation involving the $\Delta_\lambda$-Laplacian $$ -\Delta_\lambda u=u^{-p-2}-u^p,\quad u> 0,\quad \mbox{in }\mathbb R^N. $$
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来源期刊
CiteScore
1.00
自引率
0.00%
发文量
57
审稿时长
>12 weeks
期刊介绍: Topological Methods in Nonlinear Analysis (TMNA) publishes research and survey papers on a wide range of nonlinear analysis, giving preference to those that employ topological methods. Papers in topology that are of interest in the treatment of nonlinear problems may also be included.
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