Optimal control of mixed local-nonlocal parabolic PDE with singular boundary-exterior data

Evolution Equations & Control Theory Pub Date : 2021-02-18 DOI:10.3934/eect.2022015

J. Djida, G. Mophou, M. Warma

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Abstract

We consider parabolic equations on bounded smooth open sets \begin{document}$ {\Omega}\subset \mathbb{R}^N $\end{document} (\begin{document}$ N\ge 1 $\end{document}) with mixed Dirichlet type boundary-exterior conditions associated with the elliptic operator \begin{document}$ \mathscr{L} : = - \Delta + (-\Delta)^{s} $\end{document} (\begin{document}$ 0). Firstly, we prove several well-posedness and regularity results of the associated elliptic and parabolic problems with smooth, and then with singular boundary-exterior data. Secondly, we show the existence of optimal solutions of associated optimal control problems, and we characterize the optimality conditions. This is the first time that such topics have been presented and studied in a unified fashion for mixed local-nonlocal PDEs with singular data.

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具有奇异边界外数据的混合局部-非局部抛物型PDE的最优控制

我们考虑有界光滑开集\begin{document}$ {\Omega}\子集\mathbb{R}^N $\end{document} (\begin{document}$ N\ge 1 $\end{document})上的抛物方程，该方程具有与椭圆算子\begin{document}$ \mathscr{L}相关的混合Dirichlet型边外条件:= -\Delta + (-\Delta)^{s} $\end{document} (\begin{document}$ 0).首先证明了相关椭圆型和抛物型问题在光滑条件下的若干适定性和正则性结果，然后证明了奇异边界外数据的若干适定性和正则性结果。其次，我们证明了关联最优控制问题的最优解的存在性，并刻画了最优性条件。这是第一次以统一的方式提出和研究具有奇异数据的混合局部-非局部偏微分方程。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Evolution Equations & Control Theory

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