Double convergence of a family of discrete distributed mixed elliptic optimal control problems with a parameter

Abstract

We consider a bounded domain Ω in Rn whose regular boundary ∂Ω consists of the union of two disjoint portions Γ1 and Γ2 with meas(Γ1)>0. The convergence of a family of continuous distributed mixed elliptic optimal control problems (DMEOCPs) Pα, governed by elliptic variational equalities (EVE), when the parameter α goes to infinity was studied in Gariboldi-Tarzia, Appl. Math. Optim. (2003). It has been proved that the optimal control (OC), and their corresponding system and adjoint system states (SASSs) are strongly convergent, in adequate functional spaces, to the OC, and the SASSs of another CDMEOPC P governed also by an EVE with a different boundary condition on Γ1. We consider the discrete approximations Phα and Ph of the OCPs Pα and P respectively, for each h>0 and α>0, through the finite element method with parameter h. We also discrete the EVEs which define the SASSs, and the corresponding cost functional of the DMEOCPs Pα and P. The goal is to study the double convergence of this family of discrete DMEOCPs Phα when α +∞ and h 0 simultaneously. We prove the convergence of the discrete OCs, the discrete SASSs of the family Phα to the corresponding to the discrete DMEOCP Ph when α +∞, for each h>0,. We study the convergence of the discrete OCPs Phα and Ph when h 0 obtaining a commutative diagram which relates the continuous and discrete DMEOCPs Phα, Ph, Pα and P by taking the limits h 0 and α +∞ respectively. We also study the double convergence of Phα to P when (h,α) (0,+∞).