The joint spectral radius (JSR) of a set of matrices characterizes the maximal asymptotic growth rate of an infinite product of matrices of the set. This quantity appears in a number of applications including the stability of switched and hybrid systems. The natural convex problem used for the stability analysis of these systems searches for a Lyapunov function
The study of the stability properties of switched and hybrid systems gives rise to a number of inter...
The study of the stability properties of switched and hybrid systems gives rise to a number of inter...
International audienceStability properties for continuous-time linear switched systems are at first ...
The joint spectral radius (JSR) of a set of matrices characterizes the maximal asymptotic growth rat...
The joint spectral radius (JSR) of a set of matrices characterizes the maximal asymptotic growth rat...
The joint spectral radius of a set of matrices is a measure of the maximal asymptotic growth rate th...
We consider discrete-time homogeneous systems under arbitrary switching and study their growth rate,...
Let Σ be a set of n × n matrices and let us consider the fol-lowing linear iteration: x(t +1) = Atx...
We show that for any positive integer d, there are families of switched linear systems— in fixed dim...
International audienceWe present and develop tools to analyze stability properties of discrete-time ...
International audienceA switching signal for a switched system is said to be shuffled if all modes o...
AbstractIn this note, a common quadratic Lyapunov function is explicitly calculated for a linear hyb...
We describe new methods for computing the joint spectral radius and the joint spectral subradius of ...
AbstractWe provide an asymptotically tight, computationally efficient approximation of the joint spe...
It is wellknown that the stability analysis of step-by-step numerical methods for differential equat...
The study of the stability properties of switched and hybrid systems gives rise to a number of inter...
The study of the stability properties of switched and hybrid systems gives rise to a number of inter...
International audienceStability properties for continuous-time linear switched systems are at first ...
The joint spectral radius (JSR) of a set of matrices characterizes the maximal asymptotic growth rat...
The joint spectral radius (JSR) of a set of matrices characterizes the maximal asymptotic growth rat...
The joint spectral radius of a set of matrices is a measure of the maximal asymptotic growth rate th...
We consider discrete-time homogeneous systems under arbitrary switching and study their growth rate,...
Let Σ be a set of n × n matrices and let us consider the fol-lowing linear iteration: x(t +1) = Atx...
We show that for any positive integer d, there are families of switched linear systems— in fixed dim...
International audienceWe present and develop tools to analyze stability properties of discrete-time ...
International audienceA switching signal for a switched system is said to be shuffled if all modes o...
AbstractIn this note, a common quadratic Lyapunov function is explicitly calculated for a linear hyb...
We describe new methods for computing the joint spectral radius and the joint spectral subradius of ...
AbstractWe provide an asymptotically tight, computationally efficient approximation of the joint spe...
It is wellknown that the stability analysis of step-by-step numerical methods for differential equat...
The study of the stability properties of switched and hybrid systems gives rise to a number of inter...
The study of the stability properties of switched and hybrid systems gives rise to a number of inter...
International audienceStability properties for continuous-time linear switched systems are at first ...