数学物理学报(英文版) ›› 2020, Vol. 40 ›› Issue (2): 389-411.doi: 10.1007/s10473-020-0207-5

• 论文 • 上一篇    下一篇

INFINITELY MANY SOLUTIONS WITH PEAKS FOR A FRACTIONAL SYSTEM IN $\mathbb{R}^{N}$

何其涵1, 彭艳芳2   

  1. 1. Department of Mathematics and Information Science, Guangxi Center for Mathematical Research, Guangxi University, Nanning 530003, China;
    2. School of Mathematics Science, Guizhou Normal University, Guiyang 550001, China
  • 收稿日期:2018-03-28 修回日期:2019-10-14 出版日期:2020-04-25 发布日期:2020-05-26
  • 作者简介:Qihan HE,E-mail:heqihan277@163.com;Yanfang PENG,E-mail:pyfang2005@sina.com
  • 基金资助:
    The first author is supported by NSF of China (11701107) and NSF of Guangxi Province (2017GXNSFBA198190), and the second author is supported by NSF of China (11501143) and the PhD launch scientific research projects of Guizhou Normal University (2014).

INFINITELY MANY SOLUTIONS WITH PEAKS FOR A FRACTIONAL SYSTEM IN $\mathbb{R}^{N}$

Qihan HE1, Yanfang PENG2   

  1. 1. Department of Mathematics and Information Science, Guangxi Center for Mathematical Research, Guangxi University, Nanning 530003, China;
    2. School of Mathematics Science, Guizhou Normal University, Guiyang 550001, China
  • Received:2018-03-28 Revised:2019-10-14 Online:2020-04-25 Published:2020-05-26
  • Supported by:
    The first author is supported by NSF of China (11701107) and NSF of Guangxi Province (2017GXNSFBA198190), and the second author is supported by NSF of China (11501143) and the PhD launch scientific research projects of Guizhou Normal University (2014).

摘要: In this article, we consider the following coupled fractional nonlinear Schrödinger system in $\mathbb{R}^{N}$ \[\left\{ \begin{array}{l} {\left( { - \Delta } \right)^s}u + P\left( x \right)u = {\mu _1}{\left| u \right|^{2p - 2}}u + \beta {\left| u \right|^p}{\left| u \right|^{p - 2}}u,\;\;\;x \in {{\mathbb{R}}^N},\\{\left( { - \Delta } \right)^s}v + Q\left( x \right)v = {\mu _2}{\left| v \right|^{2p - 2}}v + \beta {\left| v \right|^p}{\left| v \right|^{p - 2}}v,\;\;\;\;\;x \in {{\mathbb{R}}^N},\\u,\;\;v \in {H^s}\left( {{{\mathbb{R}}^N}} \right),\end{array} \right.\] where $N≥2, 0 < s < 1, 1 < p < \frac{N}{N-2s},\mu_1>0, \mu_2>0$ and $\beta \in \mathbb{R}$ is a coupling constant. We prove that it has infinitely many non-radial positive solutions under some additional conditions on $P(x), Q(x), p$ and $\beta$. More precisely, we will show that for the attractive case, it has infinitely many non-radial positive synchronized vector solutions, and for the repulsive case, infinitely many non-radial positive segregated vector solutions can be found, where we assume that $P(x)$ and $Q(x)$ satisfy some algebraic decay at infinity.

关键词: Fractional system, solutions with peaks, synchronized, segregated

Abstract: In this article, we consider the following coupled fractional nonlinear Schrödinger system in $\mathbb{R}^{N}$ \[\left\{ \begin{array}{l} {\left( { - \Delta } \right)^s}u + P\left( x \right)u = {\mu _1}{\left| u \right|^{2p - 2}}u + \beta {\left| u \right|^p}{\left| u \right|^{p - 2}}u,\;\;\;x \in {{\mathbb{R}}^N},\\{\left( { - \Delta } \right)^s}v + Q\left( x \right)v = {\mu _2}{\left| v \right|^{2p - 2}}v + \beta {\left| v \right|^p}{\left| v \right|^{p - 2}}v,\;\;\;\;\;x \in {{\mathbb{R}}^N},\\u,\;\;v \in {H^s}\left( {{{\mathbb{R}}^N}} \right),\end{array} \right.\] where $N≥2, 0 < s < 1, 1 < p < \frac{N}{N-2s},\mu_1>0, \mu_2>0$ and $\beta \in \mathbb{R}$ is a coupling constant. We prove that it has infinitely many non-radial positive solutions under some additional conditions on $P(x), Q(x), p$ and $\beta$. More precisely, we will show that for the attractive case, it has infinitely many non-radial positive synchronized vector solutions, and for the repulsive case, infinitely many non-radial positive segregated vector solutions can be found, where we assume that $P(x)$ and $Q(x)$ satisfy some algebraic decay at infinity.

Key words: Fractional system, solutions with peaks, synchronized, segregated

中图分类号: 

  • 35J15