An ultimate bound on the trajectories of the Lorenz system and its applications

被引:67
|
作者
Pogromsky, AY
Santoboni, G
Nijmeijer, H
机构
[1] Eindhoven Univ Technol, Dept Elect Engn, NL-5600 MB Eindhoven, Netherlands
[2] Univ Cagliari, Dipartimento Fis, I-09042 Cagliari, Italy
来源
NONLINEARITY | 2003年 / 16卷 / 05期
关键词
D O I
10.1088/0951-7715/16/5/303
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
In this paper, a new bound on the trajectories of the Lorenz system is derived. This result is useful to show that the transverse stability of the origin in two Lorenz systems coupled in a drive-response manner is a necessary and sufficient condition for global asymptotic synchrony of the two systems, and to simplify the derivation of the upper bound to the Hausdorff dimension of the Lorenz attractor.
引用
收藏
页码:1597 / 1605
页数:9
相关论文
共 50 条
  • [31] The Ultimate Bound of a Sampled-Data System with Sliding Mode Controller
    Son, Moon-Ho
    Park, Hum Young
    Park, Kang-Bak
    2008 PROCEEDINGS OF SICE ANNUAL CONFERENCE, VOLS 1-7, 2008, : 2245 - 2248
  • [32] Estimating ultimate bound and finding topological horseshoe for a new chaotic system
    Deng, Kuibiao
    Yu, Simin
    OPTIK, 2014, 125 (20): : 6044 - 6048
  • [33] Ultimate bound estimation set and chaos synchronization for a financial risk system
    Gao, Wei
    Yan, Li
    Saeedi, Mohammadhossein
    Nik, Hassan Saberi
    MATHEMATICS AND COMPUTERS IN SIMULATION, 2018, 154 : 19 - 33
  • [34] The influence of the Lorenz system fractionality on its recurrensivity<bold> </bold>
    Gregorczyk, Magdalena
    Rysak, Andrzej
    III INTERNATIONAL CONFERENCE OF COMPUTATIONAL METHODS IN ENGINEERING SCIENCE (CMES 18), 2019, 252
  • [35] CHAOS IN DIFFUSIONLESS LORENZ SYSTEM WITH A FRACTIONAL ORDER AND ITS CONTROL
    Xu, Yong
    Gu, Rencai
    Zhang, Huiqing
    Li, Dongxi
    INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS, 2012, 22 (04):
  • [36] A unified Lorenz-type system and its canonical form
    Yang, Qigui
    Chen, Guangrong
    Zhou, Tianshou
    INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS, 2006, 16 (10): : 2855 - 2871
  • [37] A Unified Lorenz-Like System and Its Tracking Control
    李春来
    赵益波
    CommunicationsinTheoreticalPhysics, 2015, 63 (03) : 317 - 324
  • [38] Chaos in fractional conjugate Lorenz system and its scaling attractors
    Yang, Qigui
    Zeng, Caibin
    COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION, 2010, 15 (12) : 4041 - 4051
  • [39] Tangent bundle viewpoint of the Lorenz system and its chaotic behavior
    Yajima, Takahiro
    Nagahama, Hiroyuki
    PHYSICS LETTERS A, 2010, 374 (11-12) : 1315 - 1319
  • [40] Dynamical Behavior of a Generalized Lorenz System Model and its Simulation
    Zhang, Fuchen
    Liao, Xiaofeng
    Zhang, Guangyun
    COMPLEXITY, 2016, 21 (S1) : 99 - 105
12345