Characteristic Modeling Approach for High-Order Linear Dynamical Systems

被引：2

作者：

Chen, Lei ^{[1
]}

Yu, Xinghuo ^{[2
]}

Sun, Changyin ^{[3
]}

机构：

[1] Beihang Univ, Beijing Adv Innovat Ctr Big Data & Brain Comp, Sch Automat Sci & Elect Engn, State Key Lab Software Dev Environm, Beijing 100191, Peoples R China

[2] RMIT Univ, Sch Engn, Melbourne, Vic 3001, Australia

[3] Southeast Univ, Sch Automat, Nanjing 210096, Peoples R China

来源：

IEEE TRANSACTIONS ON SYSTEMS MAN CYBERNETICS-SYSTEMS | 2021年 / 51卷 / 09期

基金：

中国国家自然科学基金; 澳大利亚研究理事会;

关键词：

Mathematical model; Dynamical systems; Linear systems; Sun; Feature extraction; Automation; Adaptation models; Compression; linear systems; mathematical modeling; order-reduction; DESIGN; REDUCTION;

D O I：

10.1109/TSMC.2019.2956484

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 article presents a full mathematical proof of the characteristic modeling approach for high-order linear dynamical systems. It explores the nature of the characteristic model in rigorous mathematical forms, also showing why and how the high-order dynamics can be compressed into the lower-order characteristic model. The relationships between high-order linear continuous dynamical systems, discrete-time characteristic model coefficients, and sampling-time intervals are investigated.

引用

页码：5405 / 5413

页数：9

共 50 条

[1] Characteristic Modeling and Control Approach of High-Order Nonlinear Systems
Chen, Lei
Xin, Xin
Long, Xu
Sun, Changyin
[J]. 2018 IEEE CONFERENCE ON DECISION AND CONTROL (CDC), 2018, : 3777 - 3782
[2] On Characteristic Modeling of a Class of High-order MIMO Nonlinear Systems
Jiang Tiantian
[J]. PROCEEDINGS OF THE 38TH CHINESE CONTROL CONFERENCE (CCC), 2019, : 225 - 230
[3] Fully actuated system approach for high-order linear systems with high-order input derivatives
Zhang, Lixuan
Zhang, Zhe
Jiang, Huaiyuan
[J]. INTERNATIONAL JOURNAL OF SYSTEMS SCIENCE, 2024, 55 (12) : 2506 - 2517
[4] A novel modeling and controlling approach for high-order nonlinear systems
Chen, Lei
Yan, Yan
Sun, Changyin
[J]. ASIAN JOURNAL OF CONTROL, 2020, 22 (03) : 1295 - 1305
[5] HIGH-ORDER EIGENPROBLEM SENSITIVITY METHODS - THEORY AND APPLICATION TO DESIGN OF LINEAR DYNAMICAL SYSTEMS
CROSSLEY, TR
PORTER, B
[J]. INTERNATIONAL JOURNAL OF CONTROL, 1969, 10 (03) : 315 - &
[6] A generalized PID controller for high-order dynamical systems
Ablay, Gunyaz
[J]. JOURNAL OF ELECTRICAL ENGINEERING-ELEKTROTECHNICKY CASOPIS, 2021, 72 (02): : 119 - 124
[7] ADER: A High-Order Approach for Linear Hyperbolic Systems in 2D
Schwartzkopff, T.
Munz, C. D.
Toro, E. F.
[J]. JOURNAL OF SCIENTIFIC COMPUTING, 2002, 17 (1-4) : 231 - 240
[8] ADER: A High-Order Approach for Linear Hyperbolic Systems in 2D
T. Schwartzkopff
C. D. Munz
E. F. Toro
[J]. Journal of Scientific Computing, 2002, 17 : 231 - 240
[9] Development of a tangent linear model (version 1.0) for the High-Order Method Modeling Environment dynamical core
Kim, S.
Jung, B-J
Jo, Y.
[J]. GEOSCIENTIFIC MODEL DEVELOPMENT, 2014, 7 (03) : 1175 - 1182
[10] Pole assignment of high-order linear systems with high-order time-derivatives in the input
Zhou, Bin
Duan, Guang-Ren
[J]. JOURNAL OF THE FRANKLIN INSTITUTE-ENGINEERING AND APPLIED MATHEMATICS, 2020, 357 (03): : 1437 - 1456

← 1 2 3 4 5 →