Differential stability in optimal control problems

We consider optimal control problems governed by elliptic equations depending on parameters and give sufficient conditions for the continuous dependence of the solutions on the parameters. The techniques are based on variational methods. (~) 2001 Elsevier Science Ltd. All rights reserved.

We present new results on direct methods of the calculus of variations for nonlocal optimal control problems involving functional-differential equations with argument deviation \[ \begin{aligned} & \min I(y, u) \\ & \dot{y}=f(t, y(g(t)), u(h(t))), \quad y(0)=y_{0}, \quad t \in[0,1] \end{aligned} \]

## Communicated by B. Brosowski A method for the differential stability of solutions to a class of parametric optimization problems is proposed. Any solution of the parametric optimization problem is given as a fixed point of the metric projection onto the set of admissible coefficients. A new res