Controlling Chaos in High Dimensional Systems

D  AUERBACH; C  GREBOGI; E  OTT; J A  YORKE

Controlling Chaos in High Dimensional Systems

D AUERBACH, C GREBOGI, E OTT, J A YORKE

Physics

Research output: Contribution to journal › Article › peer-review

185 Citations (Scopus)

Abstract

Recently formulated techniques for controlling chaotic dynamics face a fundamental problem when the system is high dimensional, and this problem is present even when the chaotic attractor is low dimensional. Here we introduce a procedure for controlling a chaotic time signal of an arbitrarily high dimensional system, without assuming any knowledge of the underlying dynamical equations. Specifically, we formulate a feedback control that requires modeling the local dynamics of only a single or a few of the possibly infinite number of phase-space variables.

Original language	English
Pages (from-to)	3479-3482
Number of pages	4
Journal	Physical Review Letters
Volume	69
Issue number	24
Publication status	Published - 14 Dec 1992

Keywords

INTERTWINED BASIN BOUNDARIES
KICKED DOUBLE ROTOR
ORBITS

Cite this

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abstract = "Recently formulated techniques for controlling chaotic dynamics face a fundamental problem when the system is high dimensional, and this problem is present even when the chaotic attractor is low dimensional. Here we introduce a procedure for controlling a chaotic time signal of an arbitrarily high dimensional system, without assuming any knowledge of the underlying dynamical equations. Specifically, we formulate a feedback control that requires modeling the local dynamics of only a single or a few of the possibly infinite number of phase-space variables.",

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AU - OTT, E

AU - YORKE, J A

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N2 - Recently formulated techniques for controlling chaotic dynamics face a fundamental problem when the system is high dimensional, and this problem is present even when the chaotic attractor is low dimensional. Here we introduce a procedure for controlling a chaotic time signal of an arbitrarily high dimensional system, without assuming any knowledge of the underlying dynamical equations. Specifically, we formulate a feedback control that requires modeling the local dynamics of only a single or a few of the possibly infinite number of phase-space variables.

AB - Recently formulated techniques for controlling chaotic dynamics face a fundamental problem when the system is high dimensional, and this problem is present even when the chaotic attractor is low dimensional. Here we introduce a procedure for controlling a chaotic time signal of an arbitrarily high dimensional system, without assuming any knowledge of the underlying dynamical equations. Specifically, we formulate a feedback control that requires modeling the local dynamics of only a single or a few of the possibly infinite number of phase-space variables.

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KW - KICKED DOUBLE ROTOR

KW - ORBITS

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EP - 3482

JO - Physical Review Letters

JF - Physical Review Letters

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Controlling Chaos in High Dimensional Systems

Abstract

Keywords

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