On an extension of homogeneity notion for ...
Document type :
Communication dans un congrès avec actes
Title :
On an extension of homogeneity notion for differential inclusions
Author(s) :
Bernuau, Emmanuel [Auteur]
Laboratoire d'Automatique, Génie Informatique et Signal [LAGIS]
Efimov, Denis [Auteur]
Non-Asymptotic estimation for online systems [NON-A]
Systèmes Non Linéaires et à Retards [SyNeR]
Perruquetti, Wilfrid [Auteur]
Non-Asymptotic estimation for online systems [NON-A]
Systèmes Non Linéaires et à Retards [SyNeR]
Polyakov, Andrey [Auteur]
Non-Asymptotic estimation for online systems [NON-A]
Laboratoire d'Automatique, Génie Informatique et Signal [LAGIS]
Efimov, Denis [Auteur]

Non-Asymptotic estimation for online systems [NON-A]
Systèmes Non Linéaires et à Retards [SyNeR]
Perruquetti, Wilfrid [Auteur]

Non-Asymptotic estimation for online systems [NON-A]
Systèmes Non Linéaires et à Retards [SyNeR]
Polyakov, Andrey [Auteur]

Non-Asymptotic estimation for online systems [NON-A]
Conference title :
European Control Conference 2013
City :
Zurich
Country :
Suisse
Start date of the conference :
2013-07-17
Publication date :
2013-07-17
HAL domain(s) :
Sciences de l'ingénieur [physics]/Automatique / Robotique
English abstract : [en]
The notion of geometric homogeneity is extended for differential inclusions. This kind of homogeneity provides the most advanced coordinate-free framework for analysis and synthesis of nonlinear discontinuous systems. ...
Show more >The notion of geometric homogeneity is extended for differential inclusions. This kind of homogeneity provides the most advanced coordinate-free framework for analysis and synthesis of nonlinear discontinuous systems. Theorem of L. Rosier [1] on a homogeneous Lyapunov function existence and an equivalent notion of global asymptotic stability for differential inclusions are presented.Show less >
Show more >The notion of geometric homogeneity is extended for differential inclusions. This kind of homogeneity provides the most advanced coordinate-free framework for analysis and synthesis of nonlinear discontinuous systems. Theorem of L. Rosier [1] on a homogeneous Lyapunov function existence and an equivalent notion of global asymptotic stability for differential inclusions are presented.Show less >
Language :
Anglais
Peer reviewed article :
Oui
Audience :
Internationale
Popular science :
Non
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