In this paper a modified Euler transformation is introduced and studied. The main merit of this transformation is to outperform stability preservation (with respect to the traditional Euler transformation) besides preserving the matrix sparseness. This is particular appealing in the analysis of positive systems since it is shown that stability is preserved independent of the sampling period. A brief collection of results for switched systems has been also provided
It was recently conjectured that the Hurwitz stability of the convex hull of a set of Metzler matric...
Abstract|In this paper exponential stabilizability of continuous-time positive switched systems is i...
We give a new theoretical tool to solve sparse systems with finitely many solutions. It is based on ...
In this paper a modified Euler transformation is introduced and studied. The main merit of this tran...
This paper presents an approximate discretization method, named Mixed Euler-ZOH (mE-ZOH), which can...
Abstract This paper addresses the discretisation problem for sparse linear systems. Classical method...
In this paper the discretisation of switched and non-switched linear positive systems using Padé ap...
In this paper the discretisation of switched and non-switched linear positive systems using Padé app...
Also appeared as Lapack Working Note 285We consider the solution of sparse linear systems using dire...
AbstractIn this paper the discretisation of switched and non-switched linear positive systems using ...
International audienceThis paper deals with the issue of dynamical left-invertibility for linear con...
We analyse the problem of stability of a continuous time linear switching system (LSS) versus the st...
The computational complexity of partitioning sparse matrices is developed graph-theoretically. The r...
Several results concerning asymptotical mean square stability of the null solution of specific linea...
Conditions for the existence of positive stable realizations with system Metzler matrices for linear...
It was recently conjectured that the Hurwitz stability of the convex hull of a set of Metzler matric...
Abstract|In this paper exponential stabilizability of continuous-time positive switched systems is i...
We give a new theoretical tool to solve sparse systems with finitely many solutions. It is based on ...
In this paper a modified Euler transformation is introduced and studied. The main merit of this tran...
This paper presents an approximate discretization method, named Mixed Euler-ZOH (mE-ZOH), which can...
Abstract This paper addresses the discretisation problem for sparse linear systems. Classical method...
In this paper the discretisation of switched and non-switched linear positive systems using Padé ap...
In this paper the discretisation of switched and non-switched linear positive systems using Padé app...
Also appeared as Lapack Working Note 285We consider the solution of sparse linear systems using dire...
AbstractIn this paper the discretisation of switched and non-switched linear positive systems using ...
International audienceThis paper deals with the issue of dynamical left-invertibility for linear con...
We analyse the problem of stability of a continuous time linear switching system (LSS) versus the st...
The computational complexity of partitioning sparse matrices is developed graph-theoretically. The r...
Several results concerning asymptotical mean square stability of the null solution of specific linea...
Conditions for the existence of positive stable realizations with system Metzler matrices for linear...
It was recently conjectured that the Hurwitz stability of the convex hull of a set of Metzler matric...
Abstract|In this paper exponential stabilizability of continuous-time positive switched systems is i...
We give a new theoretical tool to solve sparse systems with finitely many solutions. It is based on ...