We study the stability of switched systems whose dynamic modes are described by systems of higher-order linear differential equations not necessarily sharing the same state space. Concatenability of trajectories at the switching instants is specified by gluing conditions, i.e. algebraic conditions on the trajectories and their derivatives at the switching instants. We provide sufficient conditions for stability based on LMIs for systems with general gluing conditions. We also analyse the role of positive-realness in providing sufficient polynomial-algebraic conditions for stability of two-modes switched systems with special gluing conditions
The study of the stability properties of switched and hybrid systems gives rise to a number of inter...
We present a sufficient condition for asymptotic stability of a switched linear system in terms of t...
Hybrid systems are dynamic systems that arise out of the interaction of continuous state dynamics an...
We study the stability of switched systems whose dynamic modes are described by systems of higher-or...
In this thesis we study systems with switching dynamics and we propose new mathematical tools to ana...
We show new results about Lyapunov stability of switched linear differential systems (SLDS) using th...
We consider a number of questions pertaining to the stability of positive switched linear systems. R...
We consider a number of questions pertaining to the stability of positive switched linear systems. R...
The study of properties of switched and hybrid systems gives rise to a number of interesting and cha...
The dynamical properties of many natural phenomena are traditionally described by smooth differentia...
This paper studies linear switched differential algebraic equations (DAEs), i.e., systems defined by...
The study of the stability properties of switched and hybrid systems gives rise to a number of inter...
We obtain sufficient conditions for stability of switched linear systems described by differential a...
We obtain an efficient parametrization that ensures stability of switched linear systems under arbit...
We develop a dissipativity theory for switched systems whose dynamical modes are described by system...
The study of the stability properties of switched and hybrid systems gives rise to a number of inter...
We present a sufficient condition for asymptotic stability of a switched linear system in terms of t...
Hybrid systems are dynamic systems that arise out of the interaction of continuous state dynamics an...
We study the stability of switched systems whose dynamic modes are described by systems of higher-or...
In this thesis we study systems with switching dynamics and we propose new mathematical tools to ana...
We show new results about Lyapunov stability of switched linear differential systems (SLDS) using th...
We consider a number of questions pertaining to the stability of positive switched linear systems. R...
We consider a number of questions pertaining to the stability of positive switched linear systems. R...
The study of properties of switched and hybrid systems gives rise to a number of interesting and cha...
The dynamical properties of many natural phenomena are traditionally described by smooth differentia...
This paper studies linear switched differential algebraic equations (DAEs), i.e., systems defined by...
The study of the stability properties of switched and hybrid systems gives rise to a number of inter...
We obtain sufficient conditions for stability of switched linear systems described by differential a...
We obtain an efficient parametrization that ensures stability of switched linear systems under arbit...
We develop a dissipativity theory for switched systems whose dynamical modes are described by system...
The study of the stability properties of switched and hybrid systems gives rise to a number of inter...
We present a sufficient condition for asymptotic stability of a switched linear system in terms of t...
Hybrid systems are dynamic systems that arise out of the interaction of continuous state dynamics an...