局部耦合波动方程的精确可控性和稳定性:理论结果

IF 0.7 3区数学 Q2 MATHEMATICS

Zeitschrift fur Analysis und ihre Anwendungen Pub Date : 2020-03-31 DOI:10.4171/ZAA/1673

S. Gerbi, Chiraz Kassem, Amina Mortada, A. Wehbe

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引用次数: 9

摘要

在本文中，我们研究了由速度耦合的两个波动方程组的精确可控性和稳定性，该方程组具有仅作用于一个方程的内部局部控制。我们区分两种情况。在第一个例子中，当波以相同的速度传播时：使用频域方法和乘法器技术相结合，我们证明了当耦合区域满足几何控制条件GCC时，系统是指数稳定的。根据Haraux（[11]）的结果，我们建立了主要的间接可观测性不等式。这一结果使得，通过HUM方法，证明了整个系统通过局部分布式控制是完全可控的。在第二种情况下，当波以不同的速度传播时，我们在弱能量空间中建立了指数衰减率。因此，使用[11]的结果，系统是完全可控的。最后，在数值上，我们提供的结果保证了[13]的理论结果。

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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Exact Controllability and Stabilization of Locally Coupled Wave Equations: Theoretical Results

In this paper, we study the exact controllability and stabilization of a system of two wave equations coupled by velocities with an internal, local control acting on only one equation. We distinguish two cases. In the first one, when the waves propagate at the same speed: using a frequency domain approach combined with multiplier technique, we prove that the system is exponentially stable when the coupling region satisfies the geometric control condition GCC. Following a result of Haraux ([11]), we establish the main indirect observability inequality. This results leads, by the HUM method, to prove that the total system is exactly controllable by means of locally distributed control. In the second case, when the waves propagate at different speed, we establish an exponential decay rate in the weak energy space. Consequently, the system is exactly controllable using a result of [11]. Finally, numerically, we provide results that insure the theoretical results of [13].

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来源期刊

Zeitschrift fur Analysis und ihre Anwendungen 数学-数学

CiteScore

1.80

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： The Journal of Analysis and its Applications aims at disseminating theoretical knowledge in the field of analysis and, at the same time, cultivating and extending its applications. To this end, it publishes research articles on differential equations and variational problems, functional analysis and operator theory together with their theoretical foundations and their applications – within mathematics, physics and other disciplines of the exact sciences.