一类具有渐近\((p,q)\线性条件的\((phi _{1},\phi _{2}))-拉普拉契亚差分系统周期解的存在性

IF 1.7 4区 数学 Q1 Mathematics
Hai-yun Deng, Xiao-yan Lin, Yu-bo He
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引用次数: 0

摘要

在本文中,我们考虑一个 $(\phi _{1},\phi _{2})$ 拉普拉斯系统如下:$$\begin{aligned}\文本风格\Delta \phi _{1} (\Delta u(t-1) )+\nabla _{u} F(t,u(t),v(t))=0, \Delta \phi _{2} (\Delta v(t-1) )+\nabla _{v} F(t,u(t)、v(t))=0, \end{cases}\displaystyle \end{aligned}$$其中 $F(t,u(t),v(t))=-K(t,u(t),v(t))+W(t,u(t),v(t))$在 t 中是 T 周期的。利用山口定理,我们得到,如果 W 在无穷远处渐近为 $(p,q)$ 线性,则 $(\phi _{1},\phi _{2})$ 拉普拉斯系统至少有一个周期解。我们的结果改进并扩展了一些已知工作。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Existence of periodic solutions for a class of \((\phi _{1},\phi _{2})\)-Laplacian difference system with asymptotically \((p,q)\)-linear conditions
In this paper, we consider a $(\phi _{1},\phi _{2})$ -Laplacian system as follows: $$\begin{aligned} \textstyle\begin{cases} \Delta \phi _{1} (\Delta u(t-1) )+\nabla _{u} F(t,u(t),v(t))=0, \\ \Delta \phi _{2} (\Delta v(t-1) )+\nabla _{v} F(t,u(t),v(t))=0, \end{cases}\displaystyle \end{aligned}$$ where $F(t,u(t),v(t))=-K(t,u(t),v(t))+W(t,u(t),v(t))$ is T-periodic in t. By using the mountain pass theorem, we obtain that the $(\phi _{1},\phi _{2})$ -Laplacian system has at least one periodic solution if W is asymptotically $(p,q)$ -linear at infinity. Our results improve and extend some known works.
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来源期刊
Boundary Value Problems
Boundary Value Problems MATHEMATICS, APPLIED-MATHEMATICS
CiteScore
3.00
自引率
5.90%
发文量
83
审稿时长
4 months
期刊介绍: The main aim of Boundary Value Problems is to provide a forum to promote, encourage, and bring together various disciplines which use the theory, methods, and applications of boundary value problems. Boundary Value Problems will publish very high quality research articles on boundary value problems for ordinary, functional, difference, elliptic, parabolic, and hyperbolic differential equations. Articles on singular, free, and ill-posed boundary value problems, and other areas of abstract and concrete analysis are welcome. In addition to regular research articles, Boundary Value Problems will publish review articles.
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