Kalman conjecture for resonant second-order systems with time delay

被引：0

作者：

Zhang, Jingfan ^{[1
]}

Heath, William P. ^{[1
]}

Carrasco, Joaquin ^{[1
]}

机构：

[1] Univ Manchester, Sch Elect & Elect Engn, Control Syst Ctr, Manchester M13 9PL, Lancs, England

来源：

2018 IEEE CONFERENCE ON DECISION AND CONTROL (CDC) | 2018年

关键词：

STATIONARY SYSTEM; STABILITY; COUNTEREXAMPLES; CRITERION; MONOTONE; UNIT;

D O I：

暂无

中图分类号：

TP [自动化技术、计算机技术];

学科分类号：

0812 ;

摘要：

We construct Zames-Falb multipliers for second-order systems with time delay. There are at least two equality constraints on the multiplier phase in the limiting case as the damping ratio tends to zero and the gain approaches the Nyquist gain. Nevertheless we demonstrate a multiplier exists for every system we consider. Our results depend on numerical examples and searches; thus while the Kalman Conjecture is apparently verified for this class of system, a formal proof is beyond the scope of the paper.

引用

页码：3938 / 3943

页数：6

共 50 条

[31] H∞ containment control for second-order multi-agent systems with time delay
Li Zonggang
Huang Wenpeng
Du Yajiang
PROCEEDINGS OF THE 35TH CHINESE CONTROL CONFERENCE 2016, 2016, : 7926 - 7931
[32] Consensus of second-order multi-agent systems with nonlinear dynamics and time delay
Yufeng Qian
Xiaoqun Wu
Jinhu Lü
Jun-an Lu
Nonlinear Dynamics, 2014, 78 : 495 - 503
[33] A Mathematical Approach to Integral Resonant Control of Second-order Systems
Namavar, Mohammad
Aleyaasin, Majid
Nakkeeran, K.
Aphale, Sumeet S.
PROCEEDINGS OF THE 2012 24TH CHINESE CONTROL AND DECISION CONFERENCE (CCDC), 2012, : 700 - 705
[34] An Analytical Approach to Integral Resonant Control of Second-Order Systems
Namavar, Mohammad
Fleming, Andrew J.
Aleyaasin, Majid
Nakkeeran, K.
Aphale, Sumeet S.
IEEE-ASME TRANSACTIONS ON MECHATRONICS, 2014, 19 (02) : 651 - 659
[35] Oscillation of second-order delay and neutral delay dynamic equations on time scales
Saker, S. H.
DYNAMIC SYSTEMS AND APPLICATIONS, 2007, 16 (02): : 345 - 359
[36] Oscillation of second-order delay dynamic equations on time scales
School of Sciences, University of Jinan, Jinan 250022, China
不详
Zhongshan Daxue Xuebao, 2007, 6 (10-13):
[37] Oscillation of second-order delay differential equations on time scales
Sahiner, Y.
NONLINEAR ANALYSIS-THEORY METHODS & APPLICATIONS, 2005, 63 (5-7) : E1073 - E1080
[38] Impulsive control of second-order differential equations with time delay
Zhang, Yu
Sun, Jitao
DYNAMICS OF CONTINUOUS DISCRETE AND IMPULSIVE SYSTEMS-SERIES A-MATHEMATICAL ANALYSIS, 2006, 13 (3-4): : 445 - 452
[39] Oscillation of second-order delay dynamic equations on time scales
Sun S.
Han Z.
Zhang C.
Journal of Applied Mathematics and Computing, 2009, 30 (1-2) : 459 - 468
[40] Second-order combinatorial algebraic time-delay interferometry
Qian, Wei-Liang
Wang, Pan-Pan
Wu, Zhang-Qi
Shao, Cheng-Gang
Wang, Bin
Yue, Rui-Hong
PHYSICAL REVIEW D, 2023, 108 (02)

← 1 2 3 4 5 →