Existence of $W_0^{1,1}(\Omega)$ solutions to nonlinear elliptic equation with singular natural growth term
In this paper, we investigate the existence of $W_0^{1,1}(\Omega)$ solutions to the following elliptic equation with principal part having noncoercivity and singular quadratic term \begin{equation*} \left \{ \begin{array}{rl} -\text{div}\left(\frac{\nabla u}{(1+|u|)^{\gamma}}\right)+\frac{|\nabla u|...
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AIMS Press
2020-07-01
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| Series: | AIMS Mathematics |
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| Online Access: | https://www.aimspress.com/article/10.3934/math.2020371/fulltext.html |
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doaj-995190dc3acf4fd8a1a38290b69eabbf2020-11-25T03:04:12ZengAIMS PressAIMS Mathematics2473-69882020-07-01565791580010.3934/math.2020371Existence of $W_0^{1,1}(\Omega)$ solutions to nonlinear elliptic equation with singular natural growth termMaoji Ri0Shuibo Huang1Qiaoyu Tian2Zhan-Ping Ma31 School of Mathematics and Computer Science, Northwest Minzu University, Lanzhou, Gansu 730030, P. R. China1 School of Mathematics and Computer Science, Northwest Minzu University, Lanzhou, Gansu 730030, P. R. China 2 Key Laboratory of Streaming Data Computing Technologies and Application, Northwest Minzu University, Lanzhou, Gansu 730030, P. R. China1 School of Mathematics and Computer Science, Northwest Minzu University, Lanzhou, Gansu 730030, P. R. China3 School of Mathematics and Information Science, Henan Polytechnic University, Jiaozuo, 454003 Henan, P. R. ChinaIn this paper, we investigate the existence of $W_0^{1,1}(\Omega)$ solutions to the following elliptic equation with principal part having noncoercivity and singular quadratic term \begin{equation*} \left \{ \begin{array}{rl} -\text{div}\left(\frac{\nabla u}{(1+|u|)^{\gamma}}\right)+\frac{|\nabla u|^2}{u^{\theta}}=f,&x\in\Omega,\\ u=0,&x\in\partial\Omega, \end{array} \right. \end{equation*} where $\Omega$ is a bounded smooth domain of $\mathbb{R}^N(N\geq3)$, $\gamma>0$, $\frac{N}{N-1}\leq\theta<2$, $f\in L^m(\Omega)(m\geq1)$ is a nonnegative function.https://www.aimspress.com/article/10.3934/math.2020371/fulltext.htmlnoncoercivityexistencenonlinear elliptic equation |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Maoji Ri Shuibo Huang Qiaoyu Tian Zhan-Ping Ma |
| spellingShingle |
Maoji Ri Shuibo Huang Qiaoyu Tian Zhan-Ping Ma Existence of $W_0^{1,1}(\Omega)$ solutions to nonlinear elliptic equation with singular natural growth term AIMS Mathematics noncoercivity existence nonlinear elliptic equation |
| author_facet |
Maoji Ri Shuibo Huang Qiaoyu Tian Zhan-Ping Ma |
| author_sort |
Maoji Ri |
| title |
Existence of $W_0^{1,1}(\Omega)$ solutions to nonlinear elliptic equation with singular natural growth term |
| title_short |
Existence of $W_0^{1,1}(\Omega)$ solutions to nonlinear elliptic equation with singular natural growth term |
| title_full |
Existence of $W_0^{1,1}(\Omega)$ solutions to nonlinear elliptic equation with singular natural growth term |
| title_fullStr |
Existence of $W_0^{1,1}(\Omega)$ solutions to nonlinear elliptic equation with singular natural growth term |
| title_full_unstemmed |
Existence of $W_0^{1,1}(\Omega)$ solutions to nonlinear elliptic equation with singular natural growth term |
| title_sort |
existence of $w_0^{1,1}(\omega)$ solutions to nonlinear elliptic equation with singular natural growth term |
| publisher |
AIMS Press |
| series |
AIMS Mathematics |
| issn |
2473-6988 |
| publishDate |
2020-07-01 |
| description |
In this paper, we investigate the existence of $W_0^{1,1}(\Omega)$ solutions to the following elliptic equation with principal part having noncoercivity and singular quadratic term \begin{equation*} \left \{ \begin{array}{rl} -\text{div}\left(\frac{\nabla u}{(1+|u|)^{\gamma}}\right)+\frac{|\nabla u|^2}{u^{\theta}}=f,&x\in\Omega,\\ u=0,&x\in\partial\Omega, \end{array} \right. \end{equation*} where $\Omega$ is a bounded smooth domain of $\mathbb{R}^N(N\geq3)$, $\gamma>0$, $\frac{N}{N-1}\leq\theta<2$, $f\in L^m(\Omega)(m\geq1)$ is a nonnegative function. |
| topic |
noncoercivity existence nonlinear elliptic equation |
| url |
https://www.aimspress.com/article/10.3934/math.2020371/fulltext.html |
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