Sufficient and Necessary Condition of Admissibility for Fractional-order Singular System 被引量：15

Sufficient and Necessary Condition of Admissibility for Fractional-order Singular System

在线阅读下载PDF

导出

摘要这份报纸与顺序为部分顺序的单个系统集中于考虑条件吗？(0， 1 ) 。整齐的定义，没有推动并且考虑被给第一，然后，为部分顺序的单个系统的考虑的一个足够、必要的条件被建立。一个数字例子被包括说明建议条件。 This paper focuses on the admissibility condition for fractional-order singular system with order α∈ （0, 1）. The definitions of regularity, impulse-free and admissibility are given first, then a sufficient and necessary condition of admissibility for fractional-order singular system is established. A numerical example is included to illustrate the proposed condition.

作者 YU Yao JIAO Zhuang SUN Chang-Yin

机构地区 School of Automation Electrical Engineering Key Laboratory of Advanced Control of Iron and Steel Process Beijing Institute of Elec- tronic System Engineering

出处《自动化学报》 EI CSCD 北大核心 2013年第12期2160-2164,共5页 Acta Automatica Sinica

基金 Supported by National Outstanding Youth Science Foundation （61125306）, Major Research Plan of National Natural Science Foundation of China （91016004）, National Natural Science Foundation （61203071）, Fundamental Research Funds for the Central Universities （FRF-TP-13-017A）, and Specialized Research Fund for the Doctoral Program of Higher Education （20130006120027, 20110092110020）

关键词奇异系统分数阶充要条件可容许充分必要条件 Fractional-order singular systems, regularity,impulse-free, admissibility

分类号 O231 [理学—运筹学与控制论] TN911.6 [电子电信—通信与信息系统]

作者简介 YU Yao Received the B. Sc. degree from Department of Con- trol Science and Engineering, Huazhong University of Science ＆ Technology in 2004, the M.S. and Ph.D. degrees from Depart- ment of Automation, Tsinghua University in 2010. She was a postdoctor with Tsinghua University. Currently, she is a lecturer with the School of Automation ~z Electrical Engineering, Uni- versity of Science and Technology Beijing. Her research interest covers nonlinear control, robust control, and time-delay systems. E-maih yuyao@ustb.edu.cn JIAO Zhuang Received the B. Sc. degree from Northeast- ern University in 2007, the M.S. and Ph. D. degrees from De- partment of Automation, Tsinghua University in 2012. He cur- rently is an engineer at Beijing Institute of Electronic System Engineering. His research interest covers nonlinear control and fractional-order systems. E-marl： jaoz07@foxmail.com SUN Chang-Yin Received the B. Sc. degree in mathematics from Sichuan University, the M.S. and Ph.D. degrees in elec- trical engineering from Southeast University, in 1996, 2001, and 2003, respectively. He worked as a postdoctor at Chinese Uni- versity of Hong Kong in 2004. He joined Hohai University in 2006 as a professor and then worked at Southeast University as a professor since 2007. He is also a distinguished professor of University of Science and Technology Beijing. His research interest covers intelligent control, optimization algorithms, and pattern recognition. Corresponding author of this paper. E-mail： cys~ustb.edu.cn

引文网络
相关文献

参考文献3

1朱呈祥,邹云.基于信息压缩矩阵交替变换的分数阶系统结构、阶次与参数的同时辨识方法[J].自动化学报,2012,38(8):1280-1287. 被引量：2
2高哲,廖晓钟.一种线性分数阶系统稳定性的频域判别准则[J].自动化学报,2011,37(11):1387-1394. 被引量：4
3高哲,廖晓钟.区间分数阶系统的鲁棒稳定性判别准则:0<α<1情况[J].自动化学报,2012,38(2):175-182. 被引量：6

二级参考文献27

1王宏伟,王洪斌,黄柯棣.基于模糊聚类和矩阵分解的模糊辨识方法[J].控制理论与应用,2001,18(z1):44-46. 被引量：2
2王振滨,曹广益,朱新坚.分数阶线性系统的内部和外部稳定性研究[J].控制与决策,2004,19(10):1171-1174. 被引量：7
3王振滨,曹广益,朱新坚.分数阶线性定常系统的稳定性及其判据[J].控制理论与应用,2004,21(6):922-926. 被引量：22
4牛绍华,肖德云.一种能同时获得模型阶次和参数的递推辨识算法[J].自动化学报,1989,15(5):423-427. 被引量：1
5李远禄,于盛林.非整数阶系统的频域辨识法[J].自动化学报,2007,33(8):882-884. 被引量：15
6Machado J T, Kiryakova V, Mainardi F. Recent history of fractional calculus. Communications in Nonlinear Science and Numerical Simulation, 2011, 16(3): 1140-1153.
7Jesus I S, Mac hado J A T. Fractional control of heat diffusion systems. Nonlinear Dynamics, 2008, 54(3): 263-282.
8Valerio D, Costa J S. Time-domain implementation of fractional order controllers. lEE Proceedings - Control Theory and Applications, 2005, 152(5): 539-552.
9Zamani M, Karimi-Ghartemani M, Sadati N, Parniani M. Design of a fractional order PID controller for an AVR using particle swarm optimization. Control Engineering Practice, 2009, 17(12): 1380-1387.
10Merrikh-Bayat F, Karimi-Ghartemani M. Method for designing PIA DP. stabilisers for minimum-phase fractionalorder systems. lET Control Theory and Applications, 2010, 4(1): 61-70.

共引文献8

1朱呈祥,邹云.基于信息压缩矩阵交替变换的分数阶系统结构、阶次与参数的同时辨识方法[J].自动化学报,2012,38(8):1280-1287. 被引量：2
2梁舒,彭程,王永.分数阶系统线性矩阵不等式稳定判据的改进与鲁棒镇定：0＜α＜1的情况[J].控制理论与应用,2013,30(4):531-535. 被引量：6
3宋维堂,陈志旺.分数阶线性系统的稳定性证明[J].计算机应用研究,2013,30(7):1961-1963. 被引量：3
4赵志诚,李明杰,张井岗.基于伯德理想传递函数的分数阶PID控制器[J].华中科技大学学报（自然科学版）,2014,42(9):10-13. 被引量：6
5王东风,孟丽.基于粒子群和辅助变量法的分数阶系统辨识[J].信息与控制,2016,45(3):287-293. 被引量：8
6文成林,吕菲亚,包哲静,刘妹琴.基于数据驱动的微小故障诊断方法综述[J].自动化学报,2016,42(9):1285-1299. 被引量：192
7高哲.一类采用分数阶PI~λ控制器的分数阶系统可镇定性判定准则[J].自动化学报,2017,43(11):1993-2002. 被引量：6
8兰永红,刘潇.分数阶线性系统二阶P型迭代学习控制收敛性分析[J].控制工程,2016,23(3):341-345. 被引量：10

同被引文献28

1Jocelyn Sabatier,Mathieu Moze,Christophe Farges.LMI stability conditions for fractional order systems[J]. Computers and Mathematics with Applications . 2009 (5)
2J.C. Trigeassou,N. Maamri,J. Sabatier,A. Oustaloup.A Lyapunov approach to the stability of fractional differential equations[J]. Signal Processing . 2010 (3)
3余瑶,焦壮,孙长银.??分数阶奇异系统容许性的充分必要条件(英文)(J)自动化学报. 2013(12)
4SABATIER J,MOZE M,FARGES C.On stability of fractional order systems. Processing of the Third IFAC Workshop on Functional Differentiation and its Application . 2008
5HILFER R.Application of fractional calculus in physics. . 2000
6N. Ibrahima,Z. Michel,D. Mohamed,N. E. Radhy.Observer-based control for fractional-order continuous-time systems. IEEE Conference on Decision and Control . 2009
7I N Doye,M Darouach,M Zasadzinski,N Radhy.Regularization and Robust stabilization of uncertain Singular fractional-order systems. IFAC . 2011
8I. N’’Doye,M. Zasadzinski,M. Darouach,N. Radhy.Stabilization of singular fractional-order systems:an LMI approach. Proceedings of the 18th IEEE Mediterranean Conference on Control and Automation . 2010
9M. Axtell,E. M. Bise.Fractional calculus applications in control systems. Proceedings of the IEEE 1990 National Aerospace and Electronics Conference . 1990
10Y. -H. Lan,H. -X. Huang,Y. Zhou.Observer-based robust control of a (1 <= a < 2) fractional-order uncertain systems: a linear matrix inequality approach. IET CONTROL THEORY AND APPLICATIONS . 2012

引证文献15

1马瑞兰,林崇,杨志宏.分数阶广义不确定系统稳定性及可镇定性[J].青岛大学学报（工程技术版）,2017,32(3):46-50. 被引量：1
2张会珍,刘宝江,邵克勇,任伟建.不确定分数阶奇异系统鲁棒控制及稳定性分析[J].吉林大学学报（信息科学版）,2017,35(4):392-397. 被引量：3
3张会珍,刘宝江,邵克勇,任伟建.奇异分数阶复杂动态网络的鲁棒同步:LMI法[J].吉林大学学报（信息科学版）,2018,36(1):26-33.
4刘焕霞,赵鑫,林崇,马瑞兰.广义分数阶混沌系统的鲁棒同步研究[J].青岛大学学报（工程技术版）,2018,33(2):21-25.
5潘欢,胡钢墩,薛丽.基于输出反馈的分数阶奇异线性多智能体系统领导者-跟随一致性[J].南京信息工程大学学报（自然科学版）,2018,10(4):422-427. 被引量：4
6刘婷婷,杨礼昌,蒋威,盛家乐.分数阶退化系统的可容许性分析[J].淮北师范大学学报（自然科学版）,2018,39(3):6-11.
7Saliha Marir,Mohammed Chadli.Robust Admissibility and Stabilization of Uncertain Singular Fractional-Order Linear Time-Invariant Systems[J].IEEE/CAA Journal of Automatica Sinica,2019,6(3):685-692. 被引量：6
8李路路,吴保卫,曹晔,马亚静.分数阶不确定奇异系统的镇定[J].纺织高校基础科学学报,2016,29(2):190-196. 被引量：1
9Bo MENG,Xinhe WANG,Ziye ZHANG,Zhen WANG.Necessary and sufficient conditions for normalization and sliding mode control of singular fractional-order systems with uncertainties[J].Science China(Information Sciences),2020,63(5):183-192. 被引量：4
10冯再勇,陈宁,台永鹏,向峥嵘.分数阶广义线性系统观测器设计[J].数学物理学报（A辑）,2021,41(5):1529-1544.

二级引证文献22

1张会珍,刘宝江,邵克勇,任伟建.奇异分数阶复杂动态网络的鲁棒同步:LMI法[J].吉林大学学报（信息科学版）,2018,36(1):26-33.
2袁奥杰,李海涛.基于广义观测器的汽车侧向动力学系统容错控制[J].湘南学院学报,2018,39(2):19-28.
3刘焕霞,赵鑫,林崇,马瑞兰.广义分数阶混沌系统的鲁棒同步研究[J].青岛大学学报（工程技术版）,2018,33(2):21-25.
4张会珍,刘宝江,任伟建,邵克勇.线性时变周期分数阶系统鲁棒控制及稳定性分析[J].自动化技术与应用,2018,37(11):6-10.
5王誉达,查利娟,刘金良,费树岷.基于事件触发和欺骗攻击的多智能体一致性控制[J].南京信息工程大学学报（自然科学版）,2019,11(4):380-389. 被引量：14
6Reza Mohsenipour,Xinzhi Liu.Robust D-Stability Test of LTI General Fractional Order Control Systems[J].IEEE/CAA Journal of Automatica Sinica,2020,7(3):853-864.
7李井,寇春海,蔡锐阳.一类非线性分数阶三角系统的反馈控制设计[J].上海师范大学学报（自然科学版）,2020,49(3):245-260.
8张雪峰,靳凯净.不确定广义分数阶系统的鲁棒镇定性[J].曲阜师范大学学报（自然科学版）,2020,46(3):55-62.
9吴冰,武静,杨翠,魏文英.分数阶多智能体系统一致性的自适应控制[J].城市建设理论研究（电子版）,2020(16):116-116.
10刘太德,贺新光.分数阶非线性系统Mittag-Leffler稳定性研究进展[J].滨州学院学报,2020,36(6):53-58.

1谢民育.ADMISSIBILITY　FOR　LINEAR　ESTIMATES　ON　REGRESSION　COEFFICIENTS　IN　A　GENERAL　MULTIVARIATE　LINEAR　MODEL[J].Acta Mathematica Scientia,1994,14(3):329-337. 被引量：4
2吴启光.QUADRATIC　ESTIMATORS　OF　QUADRATIC　FUNCTIONS　WITH　PARAMETERS　IN　NORMAL　LINEAR　MODELS[J].Acta Mathematicae Applicatae Sinica,1995,11(4):378-388.
3WANG Jin-hua XIANG Hong-jun.Existence of Positive Solution to a Singular System of Nonlinear Fractional Differential Equation[J].Chinese Quarterly Journal of Mathematics,2010,25(4):582-588.
4Heping Jiang (Dept. of Math., Huangshan University, Huangshan 245041, Anhui) Wei Jiang (School of Mathematical Science, Anhui University, Hefei 230039).ASYMPTOTIC STABILITY OF A SINGULAR SYSTEM WITH DISTRIBUTED DELAYS[J].Annals of Differential Equations,2010,26(1):24-29.
5陈清平,代立新.NOTE OF ADMISSIBILITY IN LINEAR ESTIMATION[J].荆州师专学报,1998,21(2):11-12.
6蒋庆堂,彭立中.Admissible wavelets on the Siegel domain of type one[J].Science China Mathematics,1998,41(9):897-909.
7陈向炜,李彦敏.Perturbation to symmetries and adiabatic invariants of a type of nonholonomic singular system[J].Chinese Physics B,2003,12(12):1349-1353. 被引量：6
8邓起荣,陈建宝,陈希镇.ALL ADMISSIBLE LINEAR ESTIMATORS UNDER MATRIX LOSS IN MULTIVARIATE MODEL[J].Acta Mathematica Scientia,1998,18(S1):16-24.
9艾明要,刘敬敏.Admissibilty for Nonhomogeneous Linear Estimates on Multivariate Random Regression Coefficients and Parameters[J].Chinese Quarterly Journal of Mathematics,1997,12(3):63-70.
10TrenchFET功率MOSFET实现极低导通电阻[J].今日电子,2009(2):112-112.

自动化学报

2013年第12期

浏览历史

内容加载中请稍等...