Preservation of hyperbolic equilibrium points and synchronization in dynamical systems

C. Miranda-Reyes, G. Fernández-Anaya, J. J. Flores-Godoy

Research output: Chapter in Book/Report/Conference proceedingConference contributionpeer-review

Abstract

Classic results of the dynamical systems theory are extended and used to study the preservation of synchronization in chaotical dynamical systems. This results show that synchronization can be preserved after changes are made to the linear part of the dynamical system. When the jacobian matrix of the system is evaluated in the hyperbolic points, the sign structure of the eigenvalues of this matrix determines if the system is stable or unstable. In this work, we establish the sufficient conditions to preserve the structure of this hyperbolic points. Also, control tools are used to achieve synchronization in dynamical systems. Numerical simulations to very the effectiveness of the method are presented.

Original languageEnglish
Title of host publication2008 5th International Conference on Electrical Engineering, Computing Science and Automatic Control, CCE 2008
Pages108-113
Number of pages6
DOIs
StatePublished - 2008
Externally publishedYes
Event2008 5th International Conference on Electrical Engineering, Computing Science and Automatic Control, CCE 2008 - Mexico City, Mexico
Duration: 12 Nov 200814 Nov 2008

Publication series

Name2008 5th International Conference on Electrical Engineering, Computing Science and Automatic Control, CCE 2008

Conference

Conference2008 5th International Conference on Electrical Engineering, Computing Science and Automatic Control, CCE 2008
Country/TerritoryMexico
CityMexico City
Period12/11/0814/11/08

Keywords

  • Chaotic systems
  • Control theory
  • Convergence and stability

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