A posteriori error estimation of finite element approximations of pointwise state constrained distributed control problems
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R. H. W. Hoppe
Abstract
We provide an a posteriori error analysis of finite element approximations of pointwise state constrained distributed optimal control problems for second order elliptic boundary value problems. In particular, we derive a residual-type a posteriori error estimator and prove its efficiency and reliability up to oscillations in the data of the problem and a consistency error term. In contrast to the case of pointwise control constraints, the analysis is more complicated, since the multipliers associated with the state constraints live in measure spaces. The analysis essentially makes use of appropriate regularizations of the multipliers both in the continuous and in the discrete regime. Numerical examples are given to illustrate the performance of the error estimator.
© de Gruyter 2009
Articles in the same Issue
- Cell centred discretisation of non linear elliptic problems on general multidimensional polyhedral grids
- Mesh adaptive multiple shooting for partial differential equations. Part I: linear quadratic optimal control problems
- A posteriori error estimation of finite element approximations of pointwise state constrained distributed control problems
Articles in the same Issue
- Cell centred discretisation of non linear elliptic problems on general multidimensional polyhedral grids
- Mesh adaptive multiple shooting for partial differential equations. Part I: linear quadratic optimal control problems
- A posteriori error estimation of finite element approximations of pointwise state constrained distributed control problems
