Linear stochastic evolution equations in Hilbert space

In the paper it is shown that weak solutions of linear deterministic and stochastic retarded equations in HILBERT spaces are given by a variation of constants formula. Also, in the deterministic case, a characterization of the unbounded operator appearing in the term without delay is given. ') The

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 give an existence theorem for an abstract nonlinear stochastic evolution equation in a Hilbert space. The result is applicable to the stochastic Navier-Stokes equation in any dimension with a nonlinear noise term. Cl 1994 Academic Press, Inc.