One-dimensional global attractor for the damped and driven sine-Gordon equation

被引:0
|
作者
Min Qian
Shengfan Zhou
Shu Zhu
机构
[1] Peking University,School of Mathematical Sciences
[2] Sichuan University,Department of Mathematics
来源
Science in China Series A: Mathematics | 1998年 / 41卷
关键词
sine-Gordon equation; global attractor; horizontal carve;
D O I
暂无
中图分类号
学科分类号
摘要
The damped and driven sine-Gordon equation with Neumann boundary conditions is studied. It is shown that it has a one-dimensional global attractor in a suitable functional space when the “damping” and the “diffusing” are not very small.
引用
收藏
页码:113 / 122
页数:9
相关论文
共 50 条
  • [41] CHAOTIC MOTION AND CONTROL OF THE DRIVEN-DAMPED DOUBLE SINE-GORDON EQUATION
    Zheng, Hang
    Xia, Yonghui
    Pinto, Manuel
    [J]. DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS-SERIES B, 2022, 27 (12): : 7151 - 7167
  • [42] On some modified variational iteration methods for solving the one-dimensional sine-Gordon equation
    Shao, Xinping
    Han, Danfu
    [J]. INTERNATIONAL JOURNAL OF COMPUTER MATHEMATICS, 2011, 88 (05) : 969 - 981
  • [43] On the behavior of high-order compact approximations in the one-dimensional sine-Gordon equation
    Golbabai, A.
    Arabshahi, M. M.
    [J]. PHYSICA SCRIPTA, 2011, 83 (01)
  • [44] A posteriori local discontinuous Galerkin error estimates for the one-dimensional sine-Gordon equation
    Baccouch, Mahboub
    [J]. INTERNATIONAL JOURNAL OF COMPUTER MATHEMATICS, 2018, 95 (04) : 815 - 844
  • [45] Solving one-dimensional nonlinear stochastic Sine-Gordon equation with a new meshfree technique
    Mirzaee, Farshid
    Rezaei, Shadi
    Samadyar, Nasrin
    [J]. INTERNATIONAL JOURNAL OF NUMERICAL MODELLING-ELECTRONIC NETWORKS DEVICES AND FIELDS, 2021, 34 (04)
  • [46] Space-Time Spectral Collocation Method for the One-Dimensional Sine-Gordon Equation
    Liu, Wenjie
    Wu, Boying
    Sun, Jiebao
    [J]. NUMERICAL METHODS FOR PARTIAL DIFFERENTIAL EQUATIONS, 2015, 31 (03) : 670 - 690
  • [47] COHERENCE AND CHAOS IN THE DRIVEN, DAMPED SINE-GORDON CHAIN
    BENNETT, D
    BISHOP, AR
    TRULLINGER, SE
    [J]. ZEITSCHRIFT FUR PHYSIK B-CONDENSED MATTER, 1982, 47 (03): : 265 - 277
  • [48] NONLINEAR DYNAMICS IN DRIVEN, DAMPED SINE-GORDON SYSTEMS
    BISHOP, AR
    LOMDAHL, PS
    [J]. PHYSICA D, 1986, 18 (1-3): : 54 - 66
  • [49] ANOMALOUS FLUCTUATIONS IN THE DRIVEN AND DAMPED SINE-GORDON CHAIN
    KRUG, J
    SPOHN, H
    [J]. EUROPHYSICS LETTERS, 1989, 8 (03): : 219 - 224
  • [50] Bound state in a one-dimensional quantum sine-Gordon model
    Yuan, QS
    Chen, YG
    Chen, H
    Zhang, YM
    [J]. PHYSICAL REVIEW B, 1998, 57 (03): : 1324 - 1327
12345