AbstractSufficient conditions for exact null controllability of the semilinear integrodifferential systems in Hilbert spaces are obtained. It is shown that under some natural conditions exact null controllability of the semilinear integrodifferential system is implied by the exact null controllability of the corresponding linear system with additive term. An application to partial integrodifferential equations is given
By a recent result of Priola and Zabczyk, a null controllable linear system [y'(t) = Ay(t) + Bu(t)] ...
Abstract. By a recent result of Priola and Zabczyk, a null controllable linear system y′(t) = Ay(t)...
AbstractThe question of controlling both linear and nonlinear retarded functional differential equat...
AbstractSufficient conditions for null controllability of semilinear integrodifferential systems wit...
International audienceFor abstract linear systems in Hilbert spaces we revisit the problems of exact...
AbstractIn this paper approximate and complete controllability for semilinear functional differentia...
Abstract. This paper deals with the approximate controllability of semilinear evolution systems in H...
In this paper, approximate controllability of an abstract semilinear control system is proved under ...
AbstractA criterion of exact controllability using the resolvent of the state space operator is give...
In this paper, approximate and complete controllability for semilin-ear stochastic integrodifferenti...
summary:Sufficient conditions for controllability of semilinear functional integrodifferential syste...
A criterion of exact controllabilty using the resolvent of the state space operator is given for lin...
AbstractSufficient conditions for controllability of semilinear integrodifferential systems in a Ban...
Many control systems can be written as a first-order differential equation if the state space enlarg...
AbstractSufficient conditions for controllability of nonlinear neutral evolution integrodifferential...
By a recent result of Priola and Zabczyk, a null controllable linear system [y'(t) = Ay(t) + Bu(t)] ...
Abstract. By a recent result of Priola and Zabczyk, a null controllable linear system y′(t) = Ay(t)...
AbstractThe question of controlling both linear and nonlinear retarded functional differential equat...
AbstractSufficient conditions for null controllability of semilinear integrodifferential systems wit...
International audienceFor abstract linear systems in Hilbert spaces we revisit the problems of exact...
AbstractIn this paper approximate and complete controllability for semilinear functional differentia...
Abstract. This paper deals with the approximate controllability of semilinear evolution systems in H...
In this paper, approximate controllability of an abstract semilinear control system is proved under ...
AbstractA criterion of exact controllability using the resolvent of the state space operator is give...
In this paper, approximate and complete controllability for semilin-ear stochastic integrodifferenti...
summary:Sufficient conditions for controllability of semilinear functional integrodifferential syste...
A criterion of exact controllabilty using the resolvent of the state space operator is given for lin...
AbstractSufficient conditions for controllability of semilinear integrodifferential systems in a Ban...
Many control systems can be written as a first-order differential equation if the state space enlarg...
AbstractSufficient conditions for controllability of nonlinear neutral evolution integrodifferential...
By a recent result of Priola and Zabczyk, a null controllable linear system [y'(t) = Ay(t) + Bu(t)] ...
Abstract. By a recent result of Priola and Zabczyk, a null controllable linear system y′(t) = Ay(t)...
AbstractThe question of controlling both linear and nonlinear retarded functional differential equat...