In the theory control systems, there are many various qualitative control problems that can be considered. In our previous work, we have analyzed the approximate controllability and observability of the nonautonomous Riesz-spectral systems including the nonautonomous Sturm-Liouville systems. As a continuation of the work, we are concerned with the analysis of stability, stabilizability, detectability, exact null controllability, and complete stabilizability of linear non-autonomous control systems in Banach spaces. The used analysis is a quasisemigroup approach. In this paper, the stability is identified by uniform exponential stability of the associated C0-quasisemigroup. The results show that, in the linear nonautonomous control systems, ...
AbstractSufficient conditions for null controllability of semilinear integrodifferential systems wit...
This paper establishes sufficient conditions for the controllability and null controllability of li...
By a recent result of Priola and Zabczyk, a null controllable linear system [y'(t) = Ay(t) + Bu(t)] ...
Stability of a state linear system can be identified by controllability, observability, stabilizabil...
Stability of a state linear system can be identified by controllability, observability, stabilizabil...
International audienceFor abstract linear systems in Hilbert spaces we revisit the problems of exact...
A criterion of exact controllabilty using the resolvent of the state space operator is given for lin...
AbstractA criterion of exact controllability using the resolvent of the state space operator is give...
International audienceThis paper concerns the relation between exact controllability and stabilizabi...
Abstract. In this paper the theory of evolution semigroups is developed and used to provide a framew...
By extending the Lyapunov equation A∗Q+QA=−P to an arbitrary infinite-dimensional Banach space, we g...
In this paper the theory of evolution semigroups is developed and used to provide a framework to stu...
The paper is devoted to the stabilization problem of nonlin-ear controllable systems. It has been pr...
Inthis paper we study some stability concepts for linear systems the evolution which can be describe...
Abstract. The paper contains systems descriptions and fundamental results concerning the solution of...
AbstractSufficient conditions for null controllability of semilinear integrodifferential systems wit...
This paper establishes sufficient conditions for the controllability and null controllability of li...
By a recent result of Priola and Zabczyk, a null controllable linear system [y'(t) = Ay(t) + Bu(t)] ...
Stability of a state linear system can be identified by controllability, observability, stabilizabil...
Stability of a state linear system can be identified by controllability, observability, stabilizabil...
International audienceFor abstract linear systems in Hilbert spaces we revisit the problems of exact...
A criterion of exact controllabilty using the resolvent of the state space operator is given for lin...
AbstractA criterion of exact controllability using the resolvent of the state space operator is give...
International audienceThis paper concerns the relation between exact controllability and stabilizabi...
Abstract. In this paper the theory of evolution semigroups is developed and used to provide a framew...
By extending the Lyapunov equation A∗Q+QA=−P to an arbitrary infinite-dimensional Banach space, we g...
In this paper the theory of evolution semigroups is developed and used to provide a framework to stu...
The paper is devoted to the stabilization problem of nonlin-ear controllable systems. It has been pr...
Inthis paper we study some stability concepts for linear systems the evolution which can be describe...
Abstract. The paper contains systems descriptions and fundamental results concerning the solution of...
AbstractSufficient conditions for null controllability of semilinear integrodifferential systems wit...
This paper establishes sufficient conditions for the controllability and null controllability of li...
By a recent result of Priola and Zabczyk, a null controllable linear system [y'(t) = Ay(t) + Bu(t)] ...