On the existence of periodic solutions for nonlinear evolutions in Hilbert spaces

In this paper, the existence of mild solutions of nonlinear stochastic integrodifferentiai inclusions in a Hilbert space is studied. The results are obtained by using a fixed-point theorem for condensing map due to Martelli. The result is illustrated with an example.

## By using a fixed-point theorem in G-convex spaces due to the first author, an existence result for abstract nonlinear inequalities without any monotonicity assumptions is established. As a consequence of our result, we obtain some further generalizations of recent known results. As application,

Many nonlinear optimal control and estimation problems can be formulated as Tikhonov variational problems in an infinite dimensional reproducing kernel Hilbert space. This paper shows that any closed ball contained in such spaces is compact in the sup-norm topology. This result is exploited to obtai