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Chaos control in delayed phase space constructed by the Takens embedding theory
Hajiloo, R ; Sharif University of Technology | 2018
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- Type of Document: Article
- DOI: 10.1016/j.cnsns.2017.05.022
- Publisher: Elsevier B.V , 2018
- Abstract:
- In this paper, the problem of chaos control in discrete-time chaotic systems with unknown governing equations and limited measurable states is investigated. Using the time-series of only one measurable state, an algorithm is proposed to stabilize unstable fixed points. The approach consists of three steps: first, using Takens embedding theory, a delayed phase space preserving the topological characteristics of the unknown system is reconstructed. Second, a dynamic model is identified by recursive least squares method to estimate the time-series data in the delayed phase space. Finally, based on the reconstructed model, an appropriate linear delayed feedback controller is obtained for stabilizing unstable fixed points of the system. Controller gains are computed using a systematic approach. The effectiveness of the proposed algorithm is examined by applying it to the generalized hyperchaotic Henon system, prey-predator population map, and the discrete-time Lorenz system. © 2017 Elsevier B.V
- Keywords:
- Chaos ; Delayed phase space ; Reconstructed model ; Time-series ; Chaos theory ; Chaotic systems ; Controllers ; Feedback ; Least squares approximations ; Phase space methods ; Time series ; Delayed feedback ; Discrete-time chaotic systems ; Governing equations ; Linear delayed feedbacks ; Recursive least squares method ; Time-series data ; Topological characteristics ; Unstable fixed point ; Discrete time control systems
- Source: Communications in Nonlinear Science and Numerical Simulation ; Volume 54 , 2018 , Pages 453-465 ; 10075704 (ISSN)
- URL: https://www.sciencedirect.com/science/article/pii/S1007570417301855