H∞ control for networked semi-Markovian jump systems with generally incomplete transition probabilities and distributed delays

Wei Sun, Mengyu Zhu, Xiaoqing Li, Peng Tao, Kaibo Shi
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Abstract

The H $$ {H}_{\infty } $$ control problem for networked semi-Markovian jump systems (S-MJSs) with generally incomplete time-varying transition probabilities (GITTPs) and distributed delays is addressed in this article. Firstly, the TPs considered herein may be exactly known, merely known with lower and upper bounds, or unknown, meanwhile the distributed delays own a probability density function as its kernel. Secondly, the closed-loop networked S-MJSs is established with GITTPSs and distributed delays. Thirdly, to make full use of the characteristic of delay probability distribution, a generalized discrete-Bessel summation inequality and a Lyapunov–Krasovskii functional (LKF) are developed by distributed kernel. Then, by applying the Lyapunov method with generalized summation inequality and utilizing an equivalent transformation method to deal with the unknown TPs, several sufficient conditions that guarantee a prescribed H $$ {H}_{\infty } $$ performance for networked S-MJSs are established. Eventually, two simulation examples including a single machine infinite bus power systems are presented to illustrate the effectiveness of the proposed theoretical findings.

Abstract Image

具有一般不完全转移概率和分布时滞的网络半马尔可夫跳跃系统的H∞控制
H∞$${H}_本文研究了具有一般不完全时变转移概率(GITTP)和分布时滞的网络半马尔可夫跳跃系统(S-MJS)的控制问题。首先,本文所考虑的TP可能是完全已知的,只知道有下界和上界,或者是未知的,同时分布式延迟拥有作为其核的概率密度函数。其次,利用GITTPS和分布式时延建立了闭环网络化的S-MJS。第三,为了充分利用延迟概率分布的特点,利用分布核建立了广义离散贝塞尔求和不等式和Lyapunov–Krasovskii泛函。然后应用具有广义求和不等式的Lyapunov方法并利用等价变换方法处理未知的TP,保证给定H~∞$$的几个充分条件{H}_{\f5\f5$$}为联网的S-MJS建立了性能。最后,给出了包括单机无穷大母线电力系统在内的两个仿真实例,以说明所提理论结果的有效性。
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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