Optimal Control Problems with Final Observation Governed by Explosive Parabolic Equations

Optimal Control Problems with Final Observation Governed by Explosive Parabolic Equations

We study optimal control problems with final observation. The governing parabolic equations or systems involve superlinear nonlinearities, and their solutions may blow up in finite time. Our proof of the existence, regularity, and optimality conditions for an optimal pair is based on uniform a prior...

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Veröffentlicht in:SIAM journal on control and optimization 2005-01, Vol.44 (4), p.1215-1238
Hauptverfasser: Amann, H., Quittner, P.
Format: Artikel
Sprache:eng
Schlagworte:
Applied mathematics
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Zusammenfassung:We study optimal control problems with final observation. The governing parabolic equations or systems involve superlinear nonlinearities, and their solutions may blow up in finite time. Our proof of the existence, regularity, and optimality conditions for an optimal pair is based on uniform a priori estimates for the approximating solutions. Our conditions on the growth of the nonlinearity are essentially optimal. In particular, we also solve a long-standing open problem of Lions concerning singular systems.
ISSN:0363-0129
1095-7138
DOI:10.1137/S0363012903433450