A canonical expansion for nonlinear systems

A canonical expansion for nonlinear systems

The importance of differential geometry, in particular, Lie brackets of vector fields, in the study of nonlinear systems is well established. Under very mild assumptions, we show that a real-analytic nonlinear system has an expansion in which the coefficients are computed in terms of Lie brackets. T...

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Veröffentlicht in:IEEE transactions on automatic control 1986-07, Vol.31 (7), p.670-673
Hauptverfasser: Renjeng Su, Hunt, L.
Format: Artikel
Sprache:eng
Schlagworte:
Applied sciences
Automatic control
Computer science
control theory
systems
Contracts
Control systems
Control theory. Systems
Costs
Cybernetics
Distributed control
Exact sciences and technology
Large-scale systems
NASA
Nonlinear systems
Optimal control
Robust stability
System theory
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Beschreibung
Zusammenfassung:The importance of differential geometry, in particular, Lie brackets of vector fields, in the study of nonlinear systems is well established. Under very mild assumptions, we show that a real-analytic nonlinear system has an expansion in which the coefficients are computed in terms of Lie brackets. This expansion occurs in a special coordinate system. We also explain the concept of a pure feedback system. For control design involving a nonlinear system, one approach is to put the system in its canonical expansion and approximate by that part having only feedback paths.
ISSN:0018-9286
1558-2523
DOI:10.1109/TAC.1986.1104358