一类二阶Duffing方程反周期解的存在性和多重性

数学物理学报 ›› 2022, Vol. 42 ›› Issue (2): 463-469.

一类二阶Duffing方程反周期解的存在性和多重性

兰军*()

武汉纺织大学管理学院武汉 430200

收稿日期:2021-03-03 出版日期:2022-04-26 发布日期:2022-04-18
通讯作者: 兰军 E-mail:379362996@qq.com

Existence and Multiplicity of Anti-Periodic Solutions for a Class of Second Order Duffing Equation

Jun Lan*()

School of Management, Wuhan Textile University, Wuhan 430200

Received:2021-03-03 Online:2022-04-26 Published:2022-04-18
Contact: Jun Lan E-mail:379362996@qq.com

摘要/Abstract

摘要：

采用变分方法证明了一类带反周期边界条件的二阶Duffing方程解的存在性和多重性.

关键词: 反周期解, Duffing方程, 变分方法

Abstract:

In this paper, we establish the existence and multiplicity of solutions for second order Duffing equations with anti-periodic boundary conditions through using variational approach.

Key words: Anti-periodic solution, Duffing equation, Variational approach

中图分类号:

O175.12

兰军. 一类二阶Duffing方程反周期解的存在性和多重性[J]. 数学物理学报, 2022, 42(2): 463-469.

Jun Lan. Existence and Multiplicity of Anti-Periodic Solutions for a Class of Second Order Duffing Equation[J]. Acta mathematica scientia,Series A, 2022, 42(2): 463-469.

参考文献

1	Mawhin J, Willem M. Critical Point Theory and Hamiltonian Systems. New York: Springer-Verlag, 1989
2	Rabinowitz P H. Minimax Methods in Critical Point Theory with Applications to Differential Equations. Providence, RI: American Mathematical Society, 1986
3	Brezis H. Functional Analysis, Sobolev Spaces and Partial Differential Equations. Berlin: Springer, 2011
4	Brezis H , Nirengerg L . Remarks on finding critical points. Commmn Pure Appl Math, 1991, 44: 939- 963
5	Tang C , Wu X . Some critical point theorems and their applications to periodic solution for second order Hamiltonian systems. J Diff Equs, 2010, 248: 660- 692
6	Okochi H . On the existence of periodic solutions to nonlinear abstract parabolic equations. J Math Soc Japan, 1988, 40: 541- 553
7	Aizicovici S , Pavel N H . Anti-periodic solutions to a class of nonlinear differential equations in Hilbert space. J Func Anal, 1991, 99: 387- 408
8	Ahmad B , Nieto J J . Anti-periodic fractional boundary value problems. Comput Math Appl, 2011, 62: 1150- 1156
9	Chen Y , O'Regan D , Agarwal R P . Anti-periodic solutions for evolution equations associated with monotone type mappings. Appl Math Lett, 2010, 23: 1320- 1325
10	Park J Y , Ha T G . Existence of antiperiodic solutions for hemivariational inequalities. Nonlinear Anal, 2008, 68: 747- 767
11	Wu R , Cong F , Li Y . Anti-periodic solutions for second order differential equations. Appl Math Letters, 2011, 24: 860- 863
12	Zhao X, Chang X. Existence of anti-periodic solutions for second order differential equations invovling the Fu?ík spectrum. Boundary Value Problems, 2012, 2012, Article number: 149
13	Wang W , Shen J . Existence of solutions for anti-periodic boundary value problems. Nonlinear Anal, 2009, 70: 598- 605
14	Chen T , Lin W , Zhang J . The existence of anti-periodic solutions for high order Duffing equations. J Appl Math Comput, 2008, 27: 271- 280
15	Tian Y , Henderson J . Three anti-periodic solutions for second-order impulsive differential inclusions via nonsmooth critical point theory. Nonlinear Anal: TMA, 2012, 75: 6496- 6505
16	Tian Y , Henderson J . Anti-periodic solutions for a gradient system with resonance via a variational approach. Math Nachr, 2013, 286 (14/15): 1537- 1547
17	Iannizzotto A . Three critical points for perturbed nonsmooth functionals and applications. Nonlinear Anal, 2010, 72: 1319- 1338

[1]	姚旺进, 张慧萍. 一类具有瞬时和非瞬时脉冲的 $\psi$-Caputo 型分数阶微分方程的多解性[J]. 数学物理学报, 2025, 45(3): 807-823.
[2]	陈征艳,张家锋. $ \mathbb{R}^4 $ 中一类带陡峭位势的临界 Kirchhoff 型方程的基态解[J]. 数学物理学报, 2025, 45(2): 450-464.
[3]	陈尚杰. $\mathbf{R}^3$上具有一般凹凸非线性项的Klein-Gordon-Born-Infeld方程无穷多解的存在性[J]. 数学物理学报, 2024, 44(3): 637-649.
[4]	常金华, 魏娜. 带有渐近线性项和库伦位势的薛定谔-泊松系统[J]. 数学物理学报, 2024, 44(3): 650-660.
[5]	李仁华, 王征平. 含强制位势的分数阶薛定谔泊松方程的正规化解[J]. 数学物理学报, 2023, 43(6): 1723-1730.
[6]	李易娴,张正杰. 一类与 Klein-Gordon-Maxwell 问题有关的方程组的基态解的存在性[J]. 数学物理学报, 2023, 43(3): 680-690.
[7]	葛斌, 袁文硕. 全空间$\mathbb{R} ^N$上双相问题径向解的多解性[J]. 数学物理学报, 2023, 43(2): 433-446.
[8]	廖丹, 张慧萍, 姚旺进. 基于变分方法的脉冲微分方程 Neumann 边值问题多重解的存在性[J]. 数学物理学报, 2023, 43(2): 447-457.
[9]	夏晨阳,王振辉,程志波. 一类带阻尼的吸引型奇性Duffing方程周期正解的存在性[J]. 数学物理学报, 2022, 42(1): 131-138.
[10]	储昌木,蒙璐. 一类带有变指数增长的半线性椭圆方程正解的存在性[J]. 数学物理学报, 2021, 41(6): 1779-1790.
[11]	张清业,徐斌. 一类带局部非线性项的静态狄拉克方程的多重周期解[J]. 数学物理学报, 2021, 41(4): 1013-1023.
[12]	邓义华. ${\mathbb R}$^$N$上一类Kirchhoff型方程径向对称正解的存在性[J]. 数学物理学报, 2021, 41(1): 142-148.
[13]	冯晓晶. 带有双临界项的薛定谔-泊松系统非平凡解的存在性[J]. 数学物理学报, 2020, 40(6): 1590-1598.
[14]	魏娜. $\mathbb{R}$²上对偶Minkowski问题的可解性[J]. 数学物理学报, 2019, 39(6): 1314-1322.
[15]	张申贵. 带类p(x)-拉普拉斯算子的双非局部问题的无穷多解[J]. 数学物理学报, 2018, 38(3): 514-526.

一类二阶Duffing方程反周期解的存在性和多重性

Existence and Multiplicity of Anti-Periodic Solutions for a Class of Second Order Duffing Equation

RichHTML

PDF (PC)

摘要/Abstract

引用本文

使用本文

参考文献

相关文章 15

Metrics

本文评价

推荐阅读 0