Null controllability for parabolic systems with dynamic boundary conditions

IF 1.3 4区 数学 Q1 MATHEMATICS Evolution Equations and Control Theory Pub Date : 2023-01-01 DOI:10.3934/eect.2023051
Mariem Jakhoukh, Lahcen Maniar
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Abstract

In this paper, we study the null controllability of systems of $ n $-coupled parabolic equations with dynamic boundary conditions, where the coupling and control matrices $ A $ and $ B $ are constant in time and space. Being different to the case of static boundary conditions, we will show that the Kalman rank condition $ rank[B, AB,\dots, A^{n-1}B ] = n $ is a sufficient condition, we also show that it is necessary for the null controlability under an extra assumption on the boundary coupling. The null controlability result will be proved by proving Carleman and observability inequalities for the corresponding adjoint problem.
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具有动态边界条件的抛物型系统的零可控性
本文研究了具有动态边界条件的n -耦合抛物方程系统的零可控性,其中耦合和控制矩阵A和B在时间和空间上都是恒定的。与静态边界条件的情况不同,我们将证明卡尔曼秩条件$ rank[B, AB,\dots, A^{n-1}B] = n $是一个充分条件,并且在边界耦合的额外假设下证明零可控性是必要的。通过对相应伴随问题的Carleman不等式和可观测不等式的证明,证明了零可控性结果。
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来源期刊
Evolution Equations and Control Theory
Evolution Equations and Control Theory MATHEMATICS, APPLIED-MATHEMATICS
CiteScore
3.10
自引率
6.70%
发文量
5
期刊介绍: EECT is primarily devoted to papers on analysis and control of infinite dimensional systems with emphasis on applications to PDE''s and FDEs. Topics include: * Modeling of physical systems as infinite-dimensional processes * Direct problems such as existence, regularity and well-posedness * Stability, long-time behavior and associated dynamical attractors * Indirect problems such as exact controllability, reachability theory and inverse problems * Optimization - including shape optimization - optimal control, game theory and calculus of variations * Well-posedness, stability and control of coupled systems with an interface. Free boundary problems and problems with moving interface(s) * Applications of the theory to physics, chemistry, engineering, economics, medicine and biology
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