具有马尔可夫切换的非线性反应扩散系统的指数输入到状态稳定性

IF 3.7 2区 计算机科学 Q2 AUTOMATION & CONTROL SYSTEMS
Zhuo Xue , Xin-Xin Han , Kai-Ning Wu
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引用次数: 0

摘要

研究了具有部分未知转换概率的马尔可夫反应扩散系统(MRDS)的均方指数输入到状态稳定性(MSEISS)。首先,推导了具有马尔可夫切换的偏微分系统的弱无穷小算子的表示。当过渡概率部分未知时,利用 Lyapunov 函数方法、自由常数和 Wirtinger 型不等式,建立了一个充分条件,以获得同时考虑边界输入和域内输入的 MRDS 的 MSEISS。然后,考虑了 MRDS 的边界控制器,建立了确保 MSEISS 的控制增益相关充要条件,并说明了控制器的有效性。此外,还研究了不确定 MRDS 的鲁棒 MSEISS。最后,通过电池温度管理系统说明了得出的结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Exponential input-to-state stability of non-linear reaction–diffusion systems with Markovian switching

Mean square exponential input-to-state stability (MSEISS) is studied for Markovian reaction–diffusion systems (MRDSs) with partial unknown transition probabilities. Firstly, the representation of the weak infinitesimal operator is derived for the partial differential system with Markovian switching. When transition probabilities are partially unknown, with the Lyapunov functional method, free constants and Wirtinger-type inequality, a sufficient condition is established to obtain the MSEISS for MRDSs where both the boundary input and in-domain input are considered. Then, the boundary controller is considered for MRDSs, and a sufficient criterion related to control gain is established to ensure the MSEISS and the effectiveness of controller is illustrated. In addition, the robust MSEISS is investigated for uncertain MRDSs. Finally, the derived results are illustrated via battery temperature management systems.

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来源期刊
Nonlinear Analysis-Hybrid Systems
Nonlinear Analysis-Hybrid Systems AUTOMATION & CONTROL SYSTEMS-MATHEMATICS, APPLIED
CiteScore
8.30
自引率
9.50%
发文量
65
审稿时长
>12 weeks
期刊介绍: Nonlinear Analysis: Hybrid Systems welcomes all important research and expository papers in any discipline. Papers that are principally concerned with the theory of hybrid systems should contain significant results indicating relevant applications. Papers that emphasize applications should consist of important real world models and illuminating techniques. Papers that interrelate various aspects of hybrid systems will be most welcome.
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