弹性弦Dirichlet边界反馈控制的镇定与Riesz基生成被引量：4

Dirichlet Boundary Stabilization and Riesz Basis Property of One-Dimensional String Equation

导出

摘要本文通过一端固定 ,一端 Dirichlet边界控制的一维波动方程说明系统是 Salamon- W eiss意义下适定和正则的 .由此说明 ,由 J.L.Lions引入的用于研究双曲方程精确可控性的 H ilbert唯一性方法是控制论中著名的对偶原理 .我们讨论了系统的指数镇定及闭环系统的广义本征函数生成 Riesz基和谱确定增长条件 .我们希望通过本文使读者对目前线性偏微分控制理论的一个新动向有一基本的了解 . This paper studies a one-dimensional wave equation with one end fixed and Dirichlet boundary feedback control at another. The system is shown to be well-posed and regular in the class of Salamon-Weiss system theory. This explains rigorously that the Hilbert-Uniqueness-Method introduced by J.L.lions in studying the exact controllability of hyperbolic systems is the well-known Duality-Principle in control theory. The Riesz basis property, spectrum-determined growth condition and exponential stability for the closed-loop system are concluded. Through this example, one can catch a glimpse of a new trend appeared very recently in Partial Differential Equation control theory.

作者谢宇郭宝珠

机构地区中国科学院数学与系统科学研究院

出处《数学的实践与认识》 CSCD 北大核心 2003年第3期99-108,共10页 Mathematics in Practice and Theory

基金国家自然科学基金项目资助 (60 174 0 0 8)

关键词弹性弦 Dirichlet边界反馈控制镇定 Riesz基生成线性偏微分控制系统 HILBERT空间适定系统 Salamon-Weiss适定输入输出波动方程直接传输算子 distributed system riesz basis stability regular well-posed spectrum-determined growth condition

分类号 O231 [理学—运筹学与控制论]

引文网络
相关文献

参考文献13

1Ammari K. Dirichlet boundary stabilization of the wave equation[J]. Asymptotic Analysis, 2002. 30(2): 117--130.
2Ammari K. Tucsnak M. Stabilization of second order evolution equations by a class of unbounded feedbacks[J].ESAIM Control Optim Calc Var. 2001. 6: 361--386.
3Chen G, Coleman M. West H H. Pointwise stabilization in the middle of the span for second order systems.nonuniform and uniform exponential decay of solutions[J]. SIAM J Appl Math, 1987, 47: 751--780.
4Curtain R F, Zwart H. An Introduction to Infinite-Dimensional Linear Systems Theory[M]. Texts in Applied Mathematics 21,Springer-Verlag.New York,1995.
5Curtain R F. The Salamon-Weiss class of well-posed infinite dimensional linear systems: a survey[J]. IMA J of Math Control and Inform. 1997. 14: 207--223.
6Guo B Z. Luo Y H. Controllability and stability of a second order hyperbolic system with collocated sensor/actuator[J]. Systems & Control Letters, 2002. 46(1): 45--65.
7Guo B Z. Rugularity of the transfer function of a wave equation in a disk with Dirichlet boundary control and collocated observation[J], manuscript. 2002.
8Guo B Z. Riesz basis approach to the stabilization of a flexible beam with a tip mass[J]. SIAM J Control & Optim,2001. 39: 1736--1747.
9Lions J L. Exact controlability, stabilization and perturbations for distributed systems[J]. SIAM Review. 1988.30 : 1--68.
10Pritchard A J. Wirth A. Unbounded control and observation systems and their duality[J]. SIAM J Control & Optim. 1978. 16: 535--545.

同被引文献47

1郑福,李欣,徐双双.三边树形弦网络的适定性和正则性[J].系统科学与数学,2013,33(12):1468-1479. 被引量：3
2殷杰,姚翠珍.二维波动方程部分Dirichlet边界控制正则性的数值分析[J].数学的实践与认识,2005,35(5):190-193. 被引量：1
3Trentelman H L, Stoorvogel A A, Hautus M. Control Theory for Linear Systems[M]. Springer-Verlag,London, 2001.
4Wiess G. Transfer functions of regular linear systems Ⅰ . Characterizations of regularity[J]. Trans Amer Math Soc, 1994, 342: 827-854.
5Weiss G. Regular linear systems with feedback[J]. Math Control Signals and Systems, 1994, 7: 23-57.
6Ammari K, Tucsnak M. Stabilization of second order evolution equations by a class of unbounded feedbacks[J].ESAIM Control Optim Calc Var, 2001, 6: 361-386.
7Ammari K. Dirichlet boundary stabilizatoin of the wave equation[J]. Asymptotic Analysis, 2002, 30(2):;117-130.
8Byrnes C I, Gilliam D S, Shubov V I, Weiss G. Regular linear systems governed by a boundary controlled heat equation[J]. Journal of Dynamical and Control Systems, 2002, 8:341-370.
9Guo B Z, Xu C Z. Regularity of the Transfer Function of a Wave Equation in a Disk with Dirichlet Collocated Boundary Control and Observation[M]. Manuscript, 2002.
10Guo B Z, Phung K D, Zhang X. On the Regularity of Wave Equatoin with Collocated Partial Dirichlet Control and Observation[M]. Preprint. Academy of Mathematics and System Sciences, 2004.

引证文献4

1郑福,李欣,徐双双.三边树形弦网络的适定性和正则性[J].系统科学与数学,2013,33(12):1468-1479. 被引量：3
2殷杰,姚翠珍.二维波动方程部分Dirichlet边界控制正则性的数值分析[J].数学的实践与认识,2005,35(5):190-193. 被引量：1
3王军梅,董沛武,姚翠珍.一个带有小参数的二维椭圆方程的渐近性分析[J].数学的实践与认识,2012,42(20):234-238.
4李欣,郑福,方明.波网络系统的适定性和正则性[J].数学的实践与认识,2014,44(12):291-298. 被引量：1

二级引证文献4

1王军梅,董沛武,姚翠珍.一个带有小参数的二维椭圆方程的渐近性分析[J].数学的实践与认识,2012,42(20):234-238.
2李欣,郑福,方明.波网络系统的适定性和正则性[J].数学的实践与认识,2014,44(12):291-298. 被引量：1
3金雪莲.观测器具有时滞的树形弦网络的适定性[J].渤海大学学报（自然科学版）,2014,35(4):313-319.
4祁琪,刘东毅,许跟起.三边树形一维Euler-Bernoulli梁网络的L^(2)-适定性和正则性[J].系统科学与数学,2022,42(12):3173-3188.

1张新鸿,李瑞娟,李胜家,王耀庭.闭环系统Riesz基生成的条件[J].数学的实践与认识,2010,40(8):202-208.
2夏小华,高为炳.非线性控制系统的指数镇定和指数观测器设计问题[J].数学物理学报（A辑）,1990,10(3):343-349.
3白忠玉,王华.Petrovsky系统边界控制的正则性[J].数学的实践与认识,2016,46(24):273-278. 被引量：1
4李欣,郑福,方明.波网络系统的适定性和正则性[J].数学的实践与认识,2014,44(12):291-298. 被引量：1
5邵志超,张小燕.具边界控制和同位观测的变系数薛定谔传递方程的适定正则性[J].系统科学与数学,2016,36(8):1068-1080.
6贺彦君,池小波.双率控制系统指数镇定的一个切换系统方法[J].太原师范学院学报（自然科学版）,2013,12(3):74-77.
7洪裕祥.一类变系数线性波动方程的精确可控性[J].浙江理工大学学报（自然科学版）,2006,23(2):198-202. 被引量：1
8ZHAO Dongxia,WANG Junmin.SPECTRAL ANALYSIS AND STABILIZATION OF A COUPLED WAVE-ODE SYSTEM[J].Journal of Systems Science & Complexity,2014,27(3):463-475. 被引量：1
9王胜华,许跟起.具各向异性散射和裂变的迁移算子广义本征函数系统的完整性[J].上饶师专学报,1998,18(6):1-5.
10苏兆忠,郭雅平.R^n中三个平行耦合波方程的精确能控性[J].太原师范学院学报（自然科学版）,2010,9(2):25-30.

数学的实践与认识

2003年第3期

浏览历史

内容加载中请稍等...

弹性弦Dirichlet边界反馈控制的镇定与Riesz基生成被引量：4

参考文献13

同被引文献47

引证文献4

二级引证文献4

相关作者

相关机构

相关主题

浏览历史

弹性弦Dirichlet边界反馈控制的镇定与Riesz基生成 被引量：4

参考文献13

同被引文献47

引证文献4

二级引证文献4

相关作者

相关机构

相关主题

浏览历史

弹性弦Dirichlet边界反馈控制的镇定与Riesz基生成被引量：4