BOOK-CHAPTER
Discontinuous Feedback and Universal Adaptive Stabilization
Abstract
An adaptive stabilizer, universal for a class of nonlinear systems, is described. The stabilizer is of discontinuous feedback form and incorporates gains of Nussbaum type. The framework is that of differential inclusions and the stability analysis draws on an extension, to that framework, of LaSalle's invariance principle for ordinary differential equations.
Keywords:
Stabilizer (aeronautics) Differential inclusion Nonlinear system Invariance principle Mathematics Extension (predicate logic) Control theory (sociology) Ordinary differential equation Class (philosophy) Stability (learning theory) Type (biology) Differential (mechanical device) Applied mathematics Differential equation Computer science Mathematical optimization Mathematical analysis Engineering Physics Artificial intelligence Epistemology Philosophy
Metrics
36
Cited By
8.02
FWCI (Field Weighted Citation Impact)
12
Refs
0.98
Citation Normalized Percentile
Is in top 1%
Is in top 10%
Citation History
Topics
Adaptive Control of Nonlinear Systems
Physical Sciences → Engineering → Control and Systems Engineering
Stability and Control of Uncertain Systems
Physical Sciences → Engineering → Control and Systems Engineering
Advanced Control Systems Optimization
Physical Sciences → Engineering → Control and Systems Engineering
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