Reducibility for a Class of Two Dimensional Almost Periodic System with Quintic Real Polynomial

被引:0
|
作者
Wenhua Qiu
Fanhui Meng
Ting Li
机构
[1] Zaozhuang University,School of Mathematics and Statistics
来源
Qualitative Theory of Dynamical Systems | 2022年 / 21卷
关键词
Almost periodic system; KAM method; Degenerate equilibrium point; Reducibility; 37J40; 34C20; 34C27; 34D10;
D O I
暂无
中图分类号
学科分类号
摘要
This paper focuses on the reducibility of almost periodic system with quintic real polynomials. Using the KAM iterative method, the perturbed system can be reduced to a suitable normal form, which has the origin as the equilibrium point, and the transformation is almost periodic. Hence, one proves that the system has almost periodic solutions.
引用
收藏
相关论文
共 50 条
  • [31] Reducibility of a class of 2k-dimensional Hamiltonian systems with quasi-periodic coefficients
    Li, Jia
    Su, Youhui
    Shi, Yanling
    DYNAMICAL SYSTEMS-AN INTERNATIONAL JOURNAL, 2019, 34 (03): : 375 - 384
  • [32] On the reducibility of two-dimensional linear quasi-periodic systems with small parameter
    Xu, Junxiang
    Lu, Xuezhu
    ERGODIC THEORY AND DYNAMICAL SYSTEMS, 2015, 35 : 2334 - 2352
  • [33] Reducibility and quasi-periodic solutions for a two dimensional beam equation with quasi-periodic in time potential
    Zhang, Min
    Wang, Yi
    Li, Yan
    AIMS MATHEMATICS, 2021, 6 (01): : 643 - 674
  • [34] THE EXISTENCE, UNIQUENESS AND STABILITY OF ALMOST PERIODIC SOLUTION FOR A CLASS OF NONLINEAR SYSTEM
    方聪娜
    王全义
    Annals of Differential Equations, 2004, (04) : 349 - 354
  • [35] On the Two-Dimensional Euler Equations with Spatially Almost Periodic Initial Data
    Yasushi Taniuchi
    Tomoya Tashiro
    Tsuyoshi Yoneda
    Journal of Mathematical Fluid Mechanics, 2010, 12 : 594 - 612
  • [36] On the Two-Dimensional Euler Equations with Spatially Almost Periodic Initial Data
    Taniuchi, Yasushi
    Tashiro, Tomoya
    Yoneda, Tsuyoshi
    JOURNAL OF MATHEMATICAL FLUID MECHANICS, 2010, 12 (04) : 594 - 612
  • [37] Pseudo almost periodic solutions for a class of nonlinear Duffing system with a deviating argument
    Liu B.
    Tunç C.
    Journal of Applied Mathematics and Computing, 2015, 49 (1-2) : 233 - 242
  • [38] Two-Dimensional Parametric Polynomial Chaotic System
    Hua, Zhongyun
    Chen, Yongyong
    Bao, Han
    Zhou, Yicong
    IEEE TRANSACTIONS ON SYSTEMS MAN CYBERNETICS-SYSTEMS, 2022, 52 (07): : 4402 - 4414
  • [39] Construction of almost periodic solutions to one quasilinear system with two delays
    B. G. Grebenshchikov
    Russian Mathematics, 2009, 53 (8) : 8 - 14
  • [40] Construction of Almost Periodic Solutions to One Quasilinear System with Two Delays
    Grebenshchikov, B. G.
    RUSSIAN MATHEMATICS, 2009, 53 (08) : 8 - 14
12345