具有动态边界条件的抛物线系统的可控性和逆问题

S. E. Chorfi, L. Maniar
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摘要

这篇综述综述了关于具有动态边界条件的抛物线系统的空可控性和逆问题的以往和最新成果。我们旨在证明如何将经典方法(如 Carleman 估计)扩展到证明抛物线系统的空可控性,以及如何证明具有表面扩散类型动态边界条件的逆问题的 Lipschitz 稳定性估计。我们主要关注与静态边界条件相比存在的实质性困难。最后,将提及一些结论和有待解决的问题。
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Controllability and Inverse Problems for Parabolic Systems with Dynamic Boundary Conditions
This review surveys previous and recent results on null controllability and inverse problems for parabolic systems with dynamic boundary conditions. We aim to demonstrate how classical methods such as Carleman estimates can be extended to prove null controllability for parabolic systems and Lipschitz stability estimates for inverse problems with dynamic boundary conditions of surface diffusion type. We mainly focus on the substantial difficulties compared to static boundary conditions. Finally, some conclusions and open problems will be mentioned.
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