Controllability in infinite-dimensional Hilbert spaces

We analyze here linear multivariable distributed 8ystem8 and synthesis problems for lumped-distributed networks The method8 used center around the invariant subspace theory of Helson-Lax and the theory of vectorial Hardy functions. State space and transfer

The classical theory of controllability for deterministic systems is extended to linear stochastic systems defined on infinite-dimensional Hilbert spaces. Three types of stochastic controllability are studied: approximate, complete, and S-controllability. Tests for complete, approximate, and S-contr

We study the weak approximate and complete controllability properties of semilinear stochastic systems assuming controllability of the associated linear systems. The results are obtained by using the Banach fixed point theorem. Applications to stochastic heat equation are given.