We obtain an efficient parametrization that ensures stability of switched linear systems under arbitrary switching. Apart from stability analysis, our results are useful for addressing several important system theoretic problems, e.g. designing controllers that ensure robustness against arbitrary combinations of sensor or actuator failure. We illustrate our results by considering control of a distillation column
We address the stabilization of switching linear systems (SLSs) with control inputs under arbitrary ...
We consider the stability of switched linear systems with multiple component systems of the n¡th ord...
We study controllability of switched differential algebraic equations. We are able to establish a co...
We obtain sufficient conditions for stability of switched linear systems described by differential a...
The study of properties of switched and hybrid systems gives rise to a number of interesting and cha...
International audienceA stabilization problem for a switched differential-algebraic system is invest...
This paper studies linear switched differential algebraic equations (DAEs), i.e., systems defined by...
We study the stability of switched systems whose dynamic modes are described by systems of higher-or...
We present a sufficient condition for asymptotic stability of a switched linear system in terms of t...
Abstract — During the last decade, there has been increasing interest in the stability analysis and ...
Hybrid systems are dynamic systems that arise out of the interaction of continuous state dynamics an...
We establish a unified approach to stability analysis for switched linear descriptor systems under a...
Hybrid systems are dynamic systems that arise out of the interaction of continuous state dynamics an...
In this thesis control of dynamical systems with switches is considered. Examples of such systems ar...
a b s t r a c t This paper presents new sufficient conditions for exponential stability of switched ...
We address the stabilization of switching linear systems (SLSs) with control inputs under arbitrary ...
We consider the stability of switched linear systems with multiple component systems of the n¡th ord...
We study controllability of switched differential algebraic equations. We are able to establish a co...
We obtain sufficient conditions for stability of switched linear systems described by differential a...
The study of properties of switched and hybrid systems gives rise to a number of interesting and cha...
International audienceA stabilization problem for a switched differential-algebraic system is invest...
This paper studies linear switched differential algebraic equations (DAEs), i.e., systems defined by...
We study the stability of switched systems whose dynamic modes are described by systems of higher-or...
We present a sufficient condition for asymptotic stability of a switched linear system in terms of t...
Abstract — During the last decade, there has been increasing interest in the stability analysis and ...
Hybrid systems are dynamic systems that arise out of the interaction of continuous state dynamics an...
We establish a unified approach to stability analysis for switched linear descriptor systems under a...
Hybrid systems are dynamic systems that arise out of the interaction of continuous state dynamics an...
In this thesis control of dynamical systems with switches is considered. Examples of such systems ar...
a b s t r a c t This paper presents new sufficient conditions for exponential stability of switched ...
We address the stabilization of switching linear systems (SLSs) with control inputs under arbitrary ...
We consider the stability of switched linear systems with multiple component systems of the n¡th ord...
We study controllability of switched differential algebraic equations. We are able to establish a co...