The concept of generalized block diagonal dominance is used to derive robust stability results for additively perturbed interconnected systems. These results characterize the robustness of interconnected systems by putting upper bounds on the spectral norms of the various sub-blocks of admissible perturbations
A class of large-scale, multi-agent systems with decentralized information structures can be represe...
First of all, quadratic stability of a system is introduced where it directly implies global uniform...
We consider large scale systems consisting of a finite number of separate uncertain subsystems which...
The concept of generalized block diagonal dominance is used to derive robust stability results for a...
The concept of generalized block diagonal dominance is used to extend a number of recently developed...
In this paper the concept of block diagonal dominance is used to generalize Rosenbrock's Nyquist arr...
AbstractThe main objective of this paper is to formulate a generalization of block diagonal dominanc...
Stability robustness analysis of a system under parametric perturbations is concerned with character...
[EN] In this paper, the robust stability problem of structured linear systems is analyzed. In order ...
We consider robust stability analysis of a class of large scale interconnected systems. The individu...
We study a class of matrices with a rank-1 interconnection structure, and derive a simple necessary ...
In this paper we study the variation of the spectrum of block-diagonal systems under perturbations o...
Abstract — The class of robust stability problems considered involves structured, repeated, linear t...
The stability robustness of the generalized eigenvalues of matrix pairs with real perturbations is c...
A square matrix F is said to be D-stable if the eigenvalues of DF have negative real parts for any d...
A class of large-scale, multi-agent systems with decentralized information structures can be represe...
First of all, quadratic stability of a system is introduced where it directly implies global uniform...
We consider large scale systems consisting of a finite number of separate uncertain subsystems which...
The concept of generalized block diagonal dominance is used to derive robust stability results for a...
The concept of generalized block diagonal dominance is used to extend a number of recently developed...
In this paper the concept of block diagonal dominance is used to generalize Rosenbrock's Nyquist arr...
AbstractThe main objective of this paper is to formulate a generalization of block diagonal dominanc...
Stability robustness analysis of a system under parametric perturbations is concerned with character...
[EN] In this paper, the robust stability problem of structured linear systems is analyzed. In order ...
We consider robust stability analysis of a class of large scale interconnected systems. The individu...
We study a class of matrices with a rank-1 interconnection structure, and derive a simple necessary ...
In this paper we study the variation of the spectrum of block-diagonal systems under perturbations o...
Abstract — The class of robust stability problems considered involves structured, repeated, linear t...
The stability robustness of the generalized eigenvalues of matrix pairs with real perturbations is c...
A square matrix F is said to be D-stable if the eigenvalues of DF have negative real parts for any d...
A class of large-scale, multi-agent systems with decentralized information structures can be represe...
First of all, quadratic stability of a system is introduced where it directly implies global uniform...
We consider large scale systems consisting of a finite number of separate uncertain subsystems which...