Robust passivity and feedback design for minimum-phase nonlinear systems with structural uncertainty

被引:76
作者
Lin, W [1 ]
Shen, TL
机构
[1] Case Western Reserve Univ, Dept Syst Control & Ind Engn, Cleveland, OH 44106 USA
[2] Sophia Univ, Dept Mech Engn, Chiyoda Ku, Tokyo 102, Japan
来源
AUTOMATICA | 1999年 / 35卷 / 01期
基金
美国国家科学基金会;
关键词
robust passive systems; feedback equivalence; uncertain minimum-phase nonlinear systems; global asymptotic stabilization; state feedback; gain bounded uncertainty;
D O I
10.1016/S0005-1098(98)00120-4
中图分类号
TP [自动化技术、计算机技术];
学科分类号
0812 ;
摘要
This paper addresses several important issues including robust passivity, feedback equivalence, and the global stabilization, for a class of nonlinear systems with gain bounded uncertainty. A robust version of the Kalman-Yacubovitch-Popov Lemma is derived, which provides a necessary and sufficient condition for a structural uncertain nonlinear system to be robust passive (resp. robust strictly passive). The robust KYP Lemma thus obtained enables us to build a feedback equivalence relationship between uncertain minimum-phase nonlinear systems having relative degree 1 and robust passive systems. The importance of the feedback equivalence theorem is illustrated by solving the problems of global robust stabilization, for various interconnections of uncertain nonlinear systems. The global stabilization theorems developed in this paper neither require matching condition nor constraint the growth of the structural uncertainties. (C) 1999 Elsevier Science Ltd. All rights reserved.
引用
收藏
页码:35 / 47
页数:13
相关论文
共 24 条
[1]  
[Anonymous], LECT NOTES CONTROL I
[2]   ASYMPTOTIC STABILIZATION OF MINIMUM PHASE NONLINEAR-SYSTEMS [J].
BYRNES, CI ;
ISIDORI, A .
IEEE TRANSACTIONS ON AUTOMATIC CONTROL, 1991, 36 (10) :1122-1137
[3]   LOSSLESSNESS, FEEDBACK EQUIVALENCE, AND THE GLOBAL STABILIZATION OF DISCRETE-TIME NONLINEAR-SYSTEMS [J].
BYRNES, CI ;
LIN, W .
IEEE TRANSACTIONS ON AUTOMATIC CONTROL, 1994, 39 (01) :83-98
[4]   PASSIVITY, FEEDBACK EQUIVALENCE, AND THE GLOBAL STABILIZATION OF MINIMUM PHASE NONLINEAR-SYSTEMS [J].
BYRNES, CI ;
ISIDORI, A ;
WILLEMS, JC .
IEEE TRANSACTIONS ON AUTOMATIC CONTROL, 1991, 36 (11) :1228-1240
[5]   STABILITY OF NONLINEAR DISSIPATIVE SYSTEMS [J].
HILL, D ;
MOYLAN, P .
IEEE TRANSACTIONS ON AUTOMATIC CONTROL, 1976, 21 (05) :708-711
[6]   CONNECTIONS BETWEEN FINITE-GAIN AND ASYMPTOTIC STABILITY [J].
HILL, DJ ;
MOYLAN, PJ .
IEEE TRANSACTIONS ON AUTOMATIC CONTROL, 1980, 25 (05) :931-936
[7]   DISTURBANCE ATTENUATION AND H-INFINITY-CONTROL VIA MEASUREMENT FEEDBACK IN NONLINEAR-SYSTEMS [J].
ISIDORI, A ;
ASTOLFI, A .
IEEE TRANSACTIONS ON AUTOMATIC CONTROL, 1992, 37 (09) :1283-1293
[8]   Global adaptive stabilization of cascade nonlinear systems [J].
Jankovic, M ;
Sepulchre, R ;
Kokotovic, PV .
AUTOMATICA, 1997, 33 (02) :263-268
[9]   A passification approach to adaptive nonlinear stabilization [J].
Jiang, ZP ;
Hill, DJ ;
Fradkov, AL .
SYSTEMS & CONTROL LETTERS, 1996, 28 (02) :73-84
[10]   FEEDBACK STABILIZATION OF GENERAL NONLINEAR CONTROL-SYSTEMS - A PASSIVE SYSTEM APPROACH [J].
LIN, W .
SYSTEMS & CONTROL LETTERS, 1995, 25 (01) :41-52
123