Add to ORKGResults obtained previously for controlled invariant subspaces for systems over rings are generalized to stabilizability subspaces. Stability is defined based on an axiomatically introduced concept of convergence. The results are applied to the problem of disturbance decoupling with internal stability for systems over rings
In a paper of E. Emre and the author a polynomial characterization for (A,B-invariant subspaces is g...
Introduction In the present paper a review is given of the important system theoretic concept of (A...
The definition of controlled invariant (i.e. (A,B)-invariant) subspaces of a linear system is extend...
Results obtained previously for controlled invariant subspaces for systems over rings are generalize...
Results obtained previously for controlled invariant subspaces for systems over rings are generalize...
Results obtained previously for controlled invariant subspaces for systems over rings are generalize...
The definition of controlled invariant (i.e. (A,B)-invariant) subspaces of a linear system is extend...
The definition of controlled invariant (i.e. (A,B)-invariant) subspaces of a linear system is extend...
The definition of controlled invariant (i.e. (A,B)-invariant) subspaces of a linear system is extend...
The definition of controlled invariant (i.e. (A,B)-invariant) subspaces of a linear system is extend...
The definition of controlled invariant (i.e. (A,B)-invariant) subspaces of a linear system is extend...
The definition of controlled invariant (i.e. (A,B)-invariant) subspaces of a linear system is extend...
It is demonstrated how the spaces V* and V−, known in the geometric theory of linear systems can be ...
It is demonstrated how the spaces V* and V−, known in the geometric theory of linear systems can be ...
It is demonstrated how the spaces V* and V−, known in the geometric theory of linear systems can be ...
In a paper of E. Emre and the author a polynomial characterization for (A,B-invariant subspaces is g...
Introduction In the present paper a review is given of the important system theoretic concept of (A...
The definition of controlled invariant (i.e. (A,B)-invariant) subspaces of a linear system is extend...
Results obtained previously for controlled invariant subspaces for systems over rings are generalize...
Results obtained previously for controlled invariant subspaces for systems over rings are generalize...
Results obtained previously for controlled invariant subspaces for systems over rings are generalize...
The definition of controlled invariant (i.e. (A,B)-invariant) subspaces of a linear system is extend...
The definition of controlled invariant (i.e. (A,B)-invariant) subspaces of a linear system is extend...
The definition of controlled invariant (i.e. (A,B)-invariant) subspaces of a linear system is extend...
The definition of controlled invariant (i.e. (A,B)-invariant) subspaces of a linear system is extend...
The definition of controlled invariant (i.e. (A,B)-invariant) subspaces of a linear system is extend...
The definition of controlled invariant (i.e. (A,B)-invariant) subspaces of a linear system is extend...
It is demonstrated how the spaces V* and V−, known in the geometric theory of linear systems can be ...
It is demonstrated how the spaces V* and V−, known in the geometric theory of linear systems can be ...
It is demonstrated how the spaces V* and V−, known in the geometric theory of linear systems can be ...
In a paper of E. Emre and the author a polynomial characterization for (A,B-invariant subspaces is g...
Introduction In the present paper a review is given of the important system theoretic concept of (A...
The definition of controlled invariant (i.e. (A,B)-invariant) subspaces of a linear system is extend...