Publikation:

Model reduction techniques with a-posteriori error analysis for linear-quadratic optimal control problems

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VossenVolkwein.pdf
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2012

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Vossen, Georg

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http://nbn-resolving.de/urn:nbn:de:bsz:352-184658
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Zusammenfassung

The main focus of this paper is on an a-posteriori analysis for different model-order strategies applied to optimal control problems governed by linear parabolic partial differential equations. Based on a perturbation method it is deduced how far the suboptimal control, computed on the basis of the reduced-order model, is from the (unknown) exact one. For the model-order reduction, H_(2,alpha)-norm optimal model reduction (H2), balanced truncation (BT), and proper orthogonal decomposition (POD) are studied.

The proposed approach is based on semi-discretization of the underlying dynamics for the state and the adjoint equations as a large scale linear time-invariant (LTI) system. This system is reduced to a lower-dimensional one using Galerkin (POD) or Petrov-Galerkin (H2, BT) projection. The size of the reduced-order system is iteratively increased until the error in the optimal control, computed with the a-posteriori error estimator, satisfies
a given accuracy. The method is illustrated with numerical tests.

Zusammenfassung in einer weiteren Sprache

Fachgebiet (DDC)
510 Mathematik

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Model reduction, linear-quadratic optimal control, a-posteriori error

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ISO 690VOSSEN, Georg, Stefan VOLKWEIN, 2012. Model reduction techniques with a-posteriori error analysis for linear-quadratic optimal control problems
BibTex
@unpublished{Vossen2012Model-18465,
  year={2012},
  title={Model reduction techniques with a-posteriori error analysis for linear-quadratic optimal control problems},
  author={Vossen, Georg and Volkwein, Stefan}
}
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