Publication detail

A note on chaos localization in general class of dynamical systems

PETRŽELA, J. PIROCHTA, O.

Original Title

A note on chaos localization in general class of dynamical systems

English Title

A note on chaos localization in general class of dynamical systems

Type

journal article - other

Language

en

Original Abstract

It is well known that many real physical systems can be loosely described by a system of first-order differential equations. Considering the autonomous deterministic dynamical systems with at least three degrees of freedom, the so-called chaotic solution can be observed for some initial conditions and internal system parameters. One possible way how to distinguish the regions of chaos from the trivial fixed points, limit cycles or unbounded solution is suggested in this contribution.

English abstract

It is well known that many real physical systems can be loosely described by a system of first-order differential equations. Considering the autonomous deterministic dynamical systems with at least three degrees of freedom, the so-called chaotic solution can be observed for some initial conditions and internal system parameters. One possible way how to distinguish the regions of chaos from the trivial fixed points, limit cycles or unbounded solution is suggested in this contribution.

Keywords

Chaos, stochastic optimization, genetic algortihm

RIV year

2007

Released

24.09.2007

Publisher

IEEE Slovenian section

Location

Portorož, Slovinsko

ISBN

1581-4572

Book

Proceedings of the 16th International Electrotechnical and Computer Conference ERK 2007

Pages from

39

Pages to

41

Pages count

3

Documents

BibTex


@article{BUT23879,
  author="Jiří {Petržela} and Ondřej {Pirochta}",
  title="A note on chaos localization in general class of dynamical systems",
  annote="It is well known that many real physical systems can be loosely described by a system of first-order differential equations. Considering the autonomous deterministic dynamical systems with at least three degrees of freedom, the so-called chaotic solution can be observed for some initial conditions and internal system parameters. One possible way how to distinguish the regions of chaos from the trivial fixed points, limit cycles or unbounded solution is suggested in this contribution.",
  address="IEEE Slovenian section",
  booktitle="Proceedings of the 16th International Electrotechnical and Computer Conference ERK 2007",
  chapter="23879",
  howpublished="print",
  institution="IEEE Slovenian section",
  number="1",
  volume="16",
  year="2007",
  month="september",
  pages="39--41",
  publisher="IEEE Slovenian section",
  type="journal article - other"
}