Detail publikace

4D Volume Conserving Autonomous Chaotic Oscillator

Originální název

4D Volume Conserving Autonomous Chaotic Oscillator

Anglický název

4D Volume Conserving Autonomous Chaotic Oscillator

Jazyk

en

Originální abstrakt

Recently, the possibility to associate a dynamical system with solvable and semisimple groups in terms of Lie algebra theory has been demonstrated. In this paper, the new chaotic system based on Nosé-Hoover dynamics is derived by using a matrix Levi decomposition. The circuitry realization is experimentally tested via PSpice simulator.

Anglický abstrakt

Recently, the possibility to associate a dynamical system with solvable and semisimple groups in terms of Lie algebra theory has been demonstrated. In this paper, the new chaotic system based on Nosé-Hoover dynamics is derived by using a matrix Levi decomposition. The circuitry realization is experimentally tested via PSpice simulator.

BibTex


@inproceedings{BUT14126,
  author="Jiří {Petržela}",
  title="4D Volume Conserving Autonomous Chaotic Oscillator",
  annote="Recently, the possibility to associate a dynamical system with solvable and semisimple groups in terms of Lie algebra theory has been demonstrated. In this paper, the new chaotic system based on Nosé-Hoover dynamics is derived by using a matrix Levi decomposition. The circuitry realization is experimentally tested via PSpice simulator.",
  address="FEEC BUT",
  booktitle="Proceedings of the 10th conference Student EEICT 2004",
  chapter="14126",
  edition="Vol. 3",
  howpublished="print",
  institution="FEEC BUT",
  year="2004",
  month="april",
  pages="423--427",
  publisher="FEEC BUT",
  type="conference paper"
}