基于弹性观测器的有限时间区间模糊非线性抛物 PDE 系统的统一状态和故障估计

IF 3.5 2区 数学 Q1 MATHEMATICS, APPLIED
V.T. Elayabharath , P. Sozhaeswari , N. Tatar , R. Sakthivel , T. Satheesh
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引用次数: 0

摘要

借助弹性模糊观测器,本研究深入探讨了具有故障和外部扰动的模糊模型所描述的抛物线型非线性 PDE 系统的有限时间状态和故障估计。主要是建立一个模糊依赖观测器,以同时提供状态和故障的精确估计。在此过程中,观测器增益考虑了具有随机特征的波动,从而增强了所配置的模糊观测器的弹性。同时,利用符合伯努利分布的随机变量,可以有效地描述随机发生的增益波动现象。随后,通过利用 Lyapunov 稳定性理论和基于积分的 Wirtinger 不等式,以线性矩阵不等式的形式获得了一组适当的准则,以确定状态和故障估计误差在有限时间内都是稳定的,并具有令人满意的扩展被动性能指标。同时,还可以根据所制定的准则获得观测器增益矩阵。最后,提供了 Fisher 方程的仿真结果,以强调所开发的基于弹性模糊观测器方法的优越性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Resilient observer-based unified state and fault estimation for nonlinear parabolic PDE systems via fuzzy approach over finite-time interval
With the aid of a resilient fuzzy observer, this study delves into the investigation of finite-time state and fault estimation for parabolic-type nonlinear PDE systems described by fuzzy models with faults and external disturbances. Primarily, a fuzzy-dependent observer is built to offer precise estimations of the states and faults simultaneously. Therein, the fluctuations that exhibit random character are taken into account in the observer gain, which enhances the resiliency of the configured fuzzy observer. Meanwhile, the phenomenon of randomly occurring gain fluctuations is effectively characterized by utilizing a random variable that adheres to the Bernoulli distribution. Subsequently, by employing the Lyapunov stability theory and the integral-based Wirtinger's inequality, a set of adequate criteria is obtained in the form of linear matrix inequalities to ascertain that both the state and fault estimation errors are stable in a finite-time with a gratified extended passivity performance index. In the meantime, the observer gain matrices can be obtained by relying on the developed criteria. Ultimately, the simulation results of the Fisher equation are offered to emphasize the superiority of the developed resilient fuzzy observer-based approach.
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来源期刊
CiteScore
7.90
自引率
10.00%
发文量
755
审稿时长
36 days
期刊介绍: Applied Mathematics and Computation addresses work at the interface between applied mathematics, numerical computation, and applications of systems – oriented ideas to the physical, biological, social, and behavioral sciences, and emphasizes papers of a computational nature focusing on new algorithms, their analysis and numerical results. In addition to presenting research papers, Applied Mathematics and Computation publishes review articles and single–topics issues.
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