Periodic solution for prescribed mean curvature Rayleigh equation with a singularity

被引:0
|
作者
Yun Xin
Guixin Hu
机构
[1] Henan Polytechnic University,College of Computer Science and Technology
[2] Henan Polytechnic University,School of Mathematics and Information Science
来源
Advances in Difference Equations | / 2020卷
关键词
Periodic solution; Prescribed mean curvature; Weak and strong; Attractive and repulsive; Rayleigh equation; 34B16; 34B18; 34C25;
D O I
暂无
中图分类号
学科分类号
摘要
In this paper, we consider the existence of a periodic solution for a prescribed mean curvature Rayleigh equation with singularity (weak and strong singularities of attractive type or weak and strong singularities of repulsive type). Our proof is based on an extension of Mawhin’s continuation theorem.
引用
收藏
相关论文
共 50 条
  • [41] POSITIVE PERIODIC SOLUTIONS FOR A φ-LAPLACIAN GENERALIZED RAYLEIGH EQUATION WITH A SINGULARITY
    Wang, Zhenhui
    Cheng, Zhibo
    JOURNAL OF NONLINEAR FUNCTIONAL ANALYSIS, 2023, 2023
  • [42] Existence and Uniqueness of Homoclinic Solution for a Rayleigh Equation with a Singularity
    Shiping Lu
    Xuewen Jia
    Qualitative Theory of Dynamical Systems, 2020, 19
  • [43] A new result on the existence of periodic solutions for Rayleigh equation with a singularity
    Yuanzhi Guo
    Yajiao Wang
    Dongxue Zhou
    Advances in Difference Equations, 2017
  • [44] A new result on the existence of periodic solutions for Rayleigh equation with a singularity
    Guo, Yuanzhi
    Wang, Yajiao
    Zhou, Dongxue
    ADVANCES IN DIFFERENCE EQUATIONS, 2017,
  • [45] Existence of periodic solutions for a prescribed mean curvature Lienard p-Laplacian equation with two delays
    Li, Zhiyan
    An, Tianqing
    Ge, Weigao
    ADVANCES IN DIFFERENCE EQUATIONS, 2014,
  • [46] Existence and uniqueness of anti-periodic solutions for prescribed mean curvature Rayleigh equations (vol 2012, 109, 2012)
    Li, Jin
    Wang, Zaihong
    BOUNDARY VALUE PROBLEMS, 2014,
  • [47] Positive solutions of the Dirichlet problem for the prescribed mean curvature equation
    Obersnel, Franco
    Omari, Pierpaolo
    JOURNAL OF DIFFERENTIAL EQUATIONS, 2010, 249 (07) : 1674 - 1725
  • [48] Radial solutions for a prescribed mean curvature equation with exponential nonlinearity
    Pan, Hongjing
    Xing, Ruixiang
    NONLINEAR ANALYSIS-THEORY METHODS & APPLICATIONS, 2012, 75 (01) : 103 - 116
  • [49] Ground state solutions for the Henon prescribed mean curvature equation
    Azzollini, Antonio
    ADVANCES IN NONLINEAR ANALYSIS, 2019, 8 (01) : 1227 - 1234
  • [50] Some remarks on the prescribed mean curvature equation on complete manifolds
    Pigola, S
    Rigoli, M
    Setti, AG
    PACIFIC JOURNAL OF MATHEMATICS, 2002, 206 (01) : 195 - 217
12345