一类周期离散非线性Schr-dinger系统的无穷多解

吉林大学学报(理学版)

一类周期离散非线性Schr-dinger系统的无穷多解

买阿丽, 孙国伟

运城学院应用数学系, 山西运城 044000

收稿日期:2015-11-09 出版日期:2016-07-26 发布日期:2016-07-20
通讯作者: 买阿丽 E-mail:maialiy@126.com

Infinitely Many Solutions for a Class of PeriodicDiscrete Nonlinear Schr-dinger Systems

MAI Ali, SUN Guowei

Department of Applied Mathematics, Yuncheng University, Yuncheng 044000, Shanxi Province, China

Received:2015-11-09 Online:2016-07-26 Published:2016-07-20
Contact: MAI Ali E-mail:maialiy@126.com

摘要/Abstract

摘要：

利用临界点理论和广义Nehari流形方法, 考虑一类周期离散非线性Schrdinger系统, 得到了该类系统无穷多个几何不同解的存在性, 并用该方法得到了单个周期离散Schrdinger方程解的多重性.

关键词: 离散向量Schrdinger方程, 广义Nehari流形, 临界点理论, 驻波

Abstract:

By using critical point theory and the generalized Nehari manifold method, we considered a class of periodic discrete nonlinear Schrdinger systems
and obtained the existence of infinitely many geometrically distinct solutions of the systems. Moreover, we used this method to obtain the multiplicity of solutions for single periodic discrete nonlinear Schrdinger equation.

Key words: discrete vector Schrdinger equation, generalized Nehari manifold, critical point theory, standing wave

中图分类号:

O175.1

买阿丽, 孙国伟. 一类周期离散非线性Schr-dinger系统的无穷多解[J]. 吉林大学学报(理学版), 2016, 54(04): 797-800.

MAI Ali, SUN Guowei. Infinitely Many Solutions for a Class of PeriodicDiscrete Nonlinear Schr-dinger Systems[J]. Journal of Jilin University Science Edition, 2016, 54(04): 797-800.

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