It is demonstrated how the spaces V* and V−, known in the geometric theory of linear systems can be generalized to systems over rings and how one can check whether these spaces have the feedback property. Based on these results, the solution of the disturbance-rejection problem is given, with and without internal stability
The definition of controlled invariant (i.e. (A,B)-invariant) subspaces of a linear system is extend...
The aim of this paper is to present an overview of the geometric approach to the study of dynamical ...
The aim of this paper is to present an overview of the geometric approach to the study of dynamical ...
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 ...
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...
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...
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 aim of this paper is to present an overview of the geometric approach to the study of dynamical ...
The aim of this paper is to present an overview of the geometric approach to the study of dynamical ...
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 ...
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...
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...
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 aim of this paper is to present an overview of the geometric approach to the study of dynamical ...
The aim of this paper is to present an overview of the geometric approach to the study of dynamical ...
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