International audienceThe paper deals with duality for dynamical linear time-invariant systems over a ring and more precisely for time delay systems defined over a scalar ring or an operator ring. We analyse relations between different notions of invariance, introducing orthogonal submodules. These logical relations are applied to the disturbance decoupling problem and to the disturbance decoupled estimation problem
International audienceWe extend the notions of conditioned and controlled invariant spaces to linear...
AbstractAn open question in Control Theory over commutative rings is: When does dynamic feedback equ...
Linear delay differential systems can be modeled as systems with coefficients in a suitable ring, so...
A commutative ring with identity is called a full quotient ring if every element of R is either a un...
AbstractThe main result in this paper characterizes those commutative rings R having the property th...
This paper deals with observability properties of realizations of linear esponse maps defined over c...
It is demonstrated how the spaces V* and V−, known in the geometric theory of linear systems can be ...
AbstractIn this paper, some basic characterizations of (A,B)-invariant submodules for linear systems...
The disturbance decoupling problem by state feedback for descriptor systems with a finite number of ...
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...
This paper deals with observability properties of realizations of linear response maps defined over ...
Linear delay differential systems can be modeled as systems with coefficients in a suitable ring, so...
22 pages, 3 figures (6 eps files)We extend the notions of conditioned and controlled invariant space...
International audienceWe extend the notions of conditioned and controlled invariant spaces to linear...
AbstractAn open question in Control Theory over commutative rings is: When does dynamic feedback equ...
Linear delay differential systems can be modeled as systems with coefficients in a suitable ring, so...
A commutative ring with identity is called a full quotient ring if every element of R is either a un...
AbstractThe main result in this paper characterizes those commutative rings R having the property th...
This paper deals with observability properties of realizations of linear esponse maps defined over c...
It is demonstrated how the spaces V* and V−, known in the geometric theory of linear systems can be ...
AbstractIn this paper, some basic characterizations of (A,B)-invariant submodules for linear systems...
The disturbance decoupling problem by state feedback for descriptor systems with a finite number of ...
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...
This paper deals with observability properties of realizations of linear response maps defined over ...
Linear delay differential systems can be modeled as systems with coefficients in a suitable ring, so...
22 pages, 3 figures (6 eps files)We extend the notions of conditioned and controlled invariant space...
International audienceWe extend the notions of conditioned and controlled invariant spaces to linear...
AbstractAn open question in Control Theory over commutative rings is: When does dynamic feedback equ...
Linear delay differential systems can be modeled as systems with coefficients in a suitable ring, so...