完全和部分可观察模糊离散事件系统的状态反馈控制
State Feedback Control of Fully and Partially Observable Fuzzy Discrete Event Systems
摘要: 本文主要讨论完全和部分可观察模糊离散事件系统的状态反馈控制。首先,给出了模糊谓词可观察的定义,并证明了对于预先给定的模糊谓词存在合理的控制器使得闭环系统的可达模糊谓词等于所给定模糊谓词的充要条件是给定模糊谓词可控且可观察;其次,在一定条件下,将部分可观察模糊离散事件系统转化为完全可观察模糊离散事件系统,并讨论了模糊谓词在两类系统之间的控制不变性和可控性。
Abstract: In this paper, we discuss the state feedback control of fully and partially observable fuzzy discrete event systems. Firstly, the definition of observable fuzzy predicate is given, and we construct a reasonable controller for a specified target fuzzy predicate such that the reachable fuzzy predicate of the closed-loop system equals to the specified fuzzy predicates if and only if the fuzzy predicate is controllable and observable. Secondly, under certain conditions, we transform a partially observable fuzzy discrete event system into a fully observable fuzzy discrete event system, and discuss the control invariance and controllability of fuzzy predicates of two types of systems.
文章引用:张月慧, 李桂莲. 完全和部分可观察模糊离散事件系统的状态反馈控制[J]. 运筹与模糊学, 2020, 10(4): 296-302. https://doi.org/10.12677/ORF.2020.104031

参考文献

[1] 徐国华, 胡奇英. 离散事件动态系统的监控方法[M]. 郑州: 河南科学技术出版社, 1996.
[2] Ushio, T. (1989) On Controllable Predicates and Languages in Discrete Event Systems. Proc. 28th on Decision and Control, Tampa, December 1989, 123-124.
[3] Li, Y. and Wonham, W.M. (1998) Controllability and Observability in the State-Feedback Control of Discrete Event Systems. Proceedings of the 27th IEEE Conference on Decision and Control, Austin, 7-9 December 1988, 203-208.
[4] Yin, X. and Lafortune, S. (2016) Synthesis of Maximally Permissive Su-pervisors for Partially-Observed Discrete-Event Systems. IEEE Transactions on Automatic Control, 61, 1239-1254. [Google Scholar] [CrossRef
[5] Mei, L., Liu, R., Lu, J., et al. (2020) Matrix Approach for Veri-fication of Opacity of Partially Observed Discrete Event Systems. Circuits Systems and Signal Processing. [Google Scholar] [CrossRef
[6] Lin, F. and Ying, H. (2001) Fuzzy Discrete Event Systems and Their Observability. Proceedings Joint 9th IFSA World Congress and 20th NAFIPS International Conference, Van-couver, 25-28 July 2001, 1271-1276.
[7] Lin, F. and Ying, H. (2002) Modeling and Control of Fuzzy Discrete Event Systems. IEEE Transactions on Systems, Man, and Cybernetics Part B: Cybernetics, 32, 408-415. [Google Scholar] [CrossRef
[8] Cao, Y.Z., Ying, M.S. and Chen, G.Q. (2007) State-Based Control of Fuzzy Discrete Event Systems. IEEE Transactions on Systems, Man, and Cybernetics Part B: Cybernetics, 37, 410-424. [Google Scholar] [CrossRef
[9] Mekki, A.O., Feng, L., et al. (2017) Fuzzy Detectabilities for Fuzzy Discrete Event Systems. 2017 IEEE International Conference on Fuzzy Systems, Naples, 9-12 July 2017, 1-6. [Google Scholar] [CrossRef
[10] Benmessahel, B., Touahria, M. and Nouioua, F. (2017) Predictability of Fuzzy Discrete Event Systems. Discrete Event Dynamic Systems, 27, 21-33. [Google Scholar] [CrossRef
[11] Kilic, E. (2008) Diagnosability of Fuzzy Discrete Event Systems. Information Sciences, 178, 858-870. [Google Scholar] [CrossRef
[12] Liu, F. and Wu, L. (2018) Decentralized Safe Diagnosis of Fuzzy Discrete-Event Systems. 37th Chinese Control Conference (CCC), Wuhan, 25-27 July 2018, 270-275.
[13] Ying, H., Lin, F. and Sherwin, R. (2019) Fuzzy Discrete Event Systems with Gradient-Based Online Learning. IEEE International Conference on Fuzzy Systems (FUZZ-IEEE), New Orleans, 23-26 June 2019, 1-6. [Google Scholar] [CrossRef
[14] 王雅楠. 模糊离散事件系统中的控制不变度[J]. 太原理工大学学报, 2016, 47(6): 818-820.
[15] 王文荣. 模糊离散事件系统的状态反馈控制[J]. 模糊系统与数学, 2019, 33(5): 67.

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