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Space-Time Finite Element Discretization of Parabolic Optimal Control Problems with Energy Regularization

Ulrich Langer, Olaf Steinbach, Fredi Tröltzsch, Huidong Yang

2021SIAM Journal on Numerical Analysis24 citationsDOI

Abstract

In this paper, we analyze space-time finite element methods for the numerical solution of distributed parabolic optimal control problems with energy regularization in the Bochner space $L^2(0,T;H^{-1}(\Omega))$. By duality, the related norm can be evaluated by means of the solution of an elliptic quasi-stationary boundary value problem. When eliminating the control, we end up with the reduced optimality system that is nothing but the variational formulation of the coupled forward-backward primal and adjoint equations. Using Babuška's theorem, we prove unique solvability in the continuous case. Furthermore, we establish the discrete inf-sup condition for any conforming space-time finite element discretization yielding quasi-optimal discretization error estimates. Various numerical examples confirm the theoretical findings. We emphasize that the energy regularization results in a more localized control with sharper contours for discontinuous target functions, which is demonstrated by a comparison with an $L^2$-regularization and with a sparse optimal control approach.

Topics & Concepts

MathematicsDiscretizationFinite element methodRegularization (linguistics)Optimal controlMathematical analysisNorm (philosophy)Applied mathematicsMathematical optimizationComputer sciencePhysicsThermodynamicsArtificial intelligenceLawPolitical scienceAdvanced Numerical Methods in Computational MathematicsAdvanced Mathematical Modeling in EngineeringNumerical methods in inverse problems
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