Uncertainty in the dynamics of conservative maps

Author

Junge, Oliver ; Marsden, Jerrold E. ; Mezic, Igor

Author_Institution

Inst. for Math., Paderborn Univ., Germany

Volume

2

fYear

2004

fDate

17-17 Dec. 2004

Firstpage

2225

Abstract

This paper studies the effect of uncertainty, using random perturbations, on area preserving maps of R₂ to itself. We focus on the standard map and a discrete Duffing oscillator as specific examples. We relate the level of uncertainty to the large-scale features in the dynamics in a precise way. We also study the effect of such perturbations on bifurcations in such maps. The main tools used for these investigations are a study of the eigenfunction and eigenvalue structure of the associated Perron-Frobenius operator along with set oriented methods for the numerical computations.

Keywords

bifurcation; eigenvalues and eigenfunctions; large-scale systems; oscillators; perturbation techniques; set theory; uncertain systems; Perron-Frobenius operator; area preserving maps; bifurcations; conservative maps; discrete Duffing oscillator; eigenfunction and eigenvalue structure; large-scale features; numerical computations; random perturbation; set oriented method; uncertainty level; Bifurcation; Centralized control; Control systems; Eigenvalues and eigenfunctions; Large-scale systems; Mathematics; Mechanical systems; Oscillators; Stochastic processes; Uncertainty;

fLanguage

English

Publisher

ieee

Conference_Titel

Decision and Control, 2004. CDC. 43rd IEEE Conference on

Conference_Location

Nassau

ISSN

0191-2216

Print_ISBN

0-7803-8682-5

Type

conf

DOI

10.1109/CDC.2004.1430379

Filename

1430379