Homogenization of quasilinear optimal control problems involving a thick multilevel junction of type 3 : 2 : 1

Furthermore, a stability property of the optimal control process is provided: any optimal solution of the properly scaled problem tends to the optimal solution of the e↵ective

We first penalize the state equation and we obtain an optimization problem with non convex constraints, that we are going to study with mathematical programming methods once again

Energy-optimal drive control under several scenarios (acceleration, decelera- tion, driving between stops, approaching traffic lights, cruise within a speed band) [3] can be treated

(2.6) Most of existence schemes of solutions to quasi-variational inequalities use the recurrent tool : define a suitable set-valued map related to the data of the problem and look

Quasilinear elliptic equations, optimal control problems, finite element approximations, convergence of discretized controls.. ∗ The first author was supported by Spanish Ministry

We are concerned with the asymptotic analysis of optimal control problems for 1-D partial differential equations defined on a periodic planar graph, as the period of the graph tends

We have defined the right and left deterministic hamiltonians and the effective flux limiter A, so to complete the proof of Theorem 2.7, we should prove the convergence result.. This

In the first part, via a reduction dimension method, we derive a one-dimensional minimization problem involving S 2 valued maps for a thin T-shaped multidomain.. In the second one,