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【答案】应助回帖
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感谢参与,应助指数 +1
diaton: 金币+5, ★★★★★最佳答案 2015-07-08 19:45:00
心静_依然: LS-EPI+1, 感谢应助 2015-07-08 19:46:50
Accession number: 20151500738082
Title: Nonlinear control chuas chaotic system
Authors: Guo, Weiping1; Liu, Diantong1
Author affiliation: 1 School of Computer and Control Engineering, Yantai University, Yantai, China
Corresponding author: Liu, Diantong
Source title: Open Automation and Control Systems Journal
Abbreviated source title: Open Autom. Control Syst. J.
Volume: 6
Issue: 1
Issue date: July 8, 2014
Publication year: 2014
Pages: 124-128
Language: English
E-ISSN: 18744443
Document type: Journal article (JA)
Publisher: Bentham Science Publishers B.V., P.O. Box 294, Bussum, 1400 AG, Netherlands
Abstract: The Chua’s chaotic system is modeled as a nonlinear feedback cascade system and a nonlinear controller is proposed with the nonlinear recursive algorithm. The design process for the proposed controller is given in detail and the system stability is proved with the Lyapunov stability theory. Simulation results show that the Chua’s chaotic system in any state can be asymptotically stabilized to the origin and the validity of the proposed control algorithm. © Guo and Liu; LicenseeBentham Open.
Number of references: 19
Main heading: Chaotic systems
Controlled terms: Algorithms - Controllers - Nonlinear feedback - System stability
Uncontrolled terms: Cascade systems - Chaos control - Design process - Lyapunov stability theory - Non linear control - Non-linear controllers - Recursive - Recursive algorithms
Classification code: 723 Computer Software, Data Handling and Applications - 731.1 Control Systems - 732.1 Control Equipment - 921 Mathematics - 931 Classical Physics; Quantum Theory; Relativity - 961 Systems Science
Database: Compendex
Compilation and indexing terms, © 2015 Elsevier Inc. |
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