Controlling chaotic dynamical systems

Filipe J. Romeiras*, Edward Ott, Celso Grebogi, W. P. Dayawansa

*Corresponding author for this work

Research output: Chapter in Book/Report/Conference proceedingConference contribution

6 Citations (Scopus)

Abstract

A method is discussed whereby motion on a chaotic attractor can be converted to a desired attracting time-periodic motion by applying a small control. The method is illustrated numerically using a periodically driven dissipative four dimensional system.

Original languageEnglish
Title of host publicationProceedings of the American Control Conference
Editors Anon
PublisherPubl by American Automatic Control Council
Pages1113-1119
Number of pages7
Volume2
ISBN (Print)0879425652
Publication statusPublished - 1991
EventProceedings of the 1991 American Control Conference - Boston, MA, USA
Duration: 26 Jun 199128 Jun 1991

Conference

ConferenceProceedings of the 1991 American Control Conference
CityBoston, MA, USA
Period26/06/9128/06/91

Fingerprint

Dynamical systems

Keywords

  • Chaos Theory
  • Dynamics
  • Mathematical Techniques--Numerical Analysis
  • Chaotic Attractors
  • Time Periodic Motion
  • Control Systems

ASJC Scopus subject areas

  • Control and Systems Engineering

Cite this

Romeiras, F. J., Ott, E., Grebogi, C., & Dayawansa, W. P. (1991). Controlling chaotic dynamical systems. In Anon (Ed.), Proceedings of the American Control Conference (Vol. 2, pp. 1113-1119). Publ by American Automatic Control Council.

Controlling chaotic dynamical systems. / Romeiras, Filipe J.; Ott, Edward; Grebogi, Celso; Dayawansa, W. P.

Proceedings of the American Control Conference. ed. / Anon. Vol. 2 Publ by American Automatic Control Council, 1991. p. 1113-1119.

Research output: Chapter in Book/Report/Conference proceedingConference contribution

Romeiras, FJ, Ott, E, Grebogi, C & Dayawansa, WP 1991, Controlling chaotic dynamical systems. in Anon (ed.), Proceedings of the American Control Conference. vol. 2, Publ by American Automatic Control Council, pp. 1113-1119, Proceedings of the 1991 American Control Conference, Boston, MA, USA, 26/06/91.
Romeiras FJ, Ott E, Grebogi C, Dayawansa WP. Controlling chaotic dynamical systems. In Anon, editor, Proceedings of the American Control Conference. Vol. 2. Publ by American Automatic Control Council. 1991. p. 1113-1119
Romeiras, Filipe J. ; Ott, Edward ; Grebogi, Celso ; Dayawansa, W. P. / Controlling chaotic dynamical systems. Proceedings of the American Control Conference. editor / Anon. Vol. 2 Publ by American Automatic Control Council, 1991. pp. 1113-1119
@inproceedings{1a9178df4363442194441859ce8fff8a,
title = "Controlling chaotic dynamical systems",
abstract = "A method is discussed whereby motion on a chaotic attractor can be converted to a desired attracting time-periodic motion by applying a small control. The method is illustrated numerically using a periodically driven dissipative four dimensional system.",
keywords = "Chaos Theory, Dynamics, Mathematical Techniques--Numerical Analysis, Chaotic Attractors, Time Periodic Motion, Control Systems",
author = "Romeiras, {Filipe J.} and Edward Ott and Celso Grebogi and Dayawansa, {W. P.}",
year = "1991",
language = "English",
isbn = "0879425652",
volume = "2",
pages = "1113--1119",
editor = "Anon",
booktitle = "Proceedings of the American Control Conference",
publisher = "Publ by American Automatic Control Council",

}

TY - GEN

T1 - Controlling chaotic dynamical systems

AU - Romeiras, Filipe J.

AU - Ott, Edward

AU - Grebogi, Celso

AU - Dayawansa, W. P.

PY - 1991

Y1 - 1991

N2 - A method is discussed whereby motion on a chaotic attractor can be converted to a desired attracting time-periodic motion by applying a small control. The method is illustrated numerically using a periodically driven dissipative four dimensional system.

AB - A method is discussed whereby motion on a chaotic attractor can be converted to a desired attracting time-periodic motion by applying a small control. The method is illustrated numerically using a periodically driven dissipative four dimensional system.

KW - Chaos Theory

KW - Dynamics

KW - Mathematical Techniques--Numerical Analysis

KW - Chaotic Attractors

KW - Time Periodic Motion

KW - Control Systems

UR - http://www.scopus.com/inward/record.url?scp=0026390610&partnerID=8YFLogxK

M3 - Conference contribution

SN - 0879425652

VL - 2

SP - 1113

EP - 1119

BT - Proceedings of the American Control Conference

A2 - Anon, null

PB - Publ by American Automatic Control Council

ER -

Access to Document