Infinite dimensional functional differential inclusions and necessary optimization conditions

This paper deals with the optimal control problems for di erential-di erence inclusions subject to endpoint constraints. We follow a twofold goal. First, we develop a method for estimating the generalized gradients of value function in the problems above. Second, we use these estimates for obtaining

In this paper, we derive necessary optimality conditions for optimization problems defined by non-convex differential inclusions with endpoint constraints. We do this in terms of parametrizations of the convexified form of the differential inclusion and, under additional assumptions, in terms of the

This paper is devoted to the study of a general class of optimal control problems described by delay-differential inclusions with equality and inequality endpoint constraints and multivalued initial conditions. We use the method of discrete approximations and advanced tools of variational analysis a