English

An adaptive finite element method for distributed elliptic optimal control problems with variable energy regularization

Numerical Analysis 2023-08-15 v2 Numerical Analysis Optimization and Control

Abstract

We analyze the finite element discretization of distributed elliptic optimal control problems with variable energy regularization, where the usual L2(Ω)L^2(\Omega) norm regularization term with a constant regularization parameter ϱ\varrho is replaced by a suitable representation of the energy norm in H1(Ω)H^{-1}(\Omega) involving a variable, mesh-dependent regularization parameter ϱ(x)\varrho(x). It turns out that the error between the computed finite element state u~ϱh\widetilde{u}_{\varrho h} and the desired state u\overline{u} (target) is optimal in the L2(Ω)L^2(\Omega) norm provided that ϱ(x)\varrho(x) behaves like the local mesh size squared. This is especially important when adaptive meshes are used in order to approximate discontinuous target functions. The adaptive scheme can be driven by the computable and localizable error norm u~ϱhuL2(Ω)\| \widetilde{u}_{\varrho h} - \overline{u}\|_{L^2(\Omega)} between the finite element state u~ϱh\widetilde{u}_{\varrho h} and the target u\overline{u}. The numerical results not only illustrate our theoretical findings, but also show that the iterative solvers for the discretized reduced optimality system are very efficient and robust.

Keywords

Cite

@article{arxiv.2209.08811,
  title  = {An adaptive finite element method for distributed elliptic optimal control problems with variable energy regularization},
  author = {Ulrich Langer and Richard Löscher and Olaf Steinbach and Huidong Yang},
  journal= {arXiv preprint arXiv:2209.08811},
  year   = {2023}
}
R2 v1 2026-06-28T01:34:00.183Z