The optimal control synchronization of complex dynamical networks with time-varying delay using PSO

被引：23

作者：

Chang, Qi ^{[2
]}

Yang, Yongqing ^{[1
,2
]}

Sui, Xin ^{[2
]}

Shi, Zhicheng ^{[1
]}

机构：

[1] Jiangnan Univ, Wuxi Engn Res Ctr Biocomp, Sch Sci, Wuxi 214122, Peoples R China

[2] Jiangnan Univ, Sch IoT Engn, Wuxi 214122, Peoples R China

来源：

NEUROCOMPUTING | 2019年 / 333卷

关键词：

Exponential synchronization; Complex dynamical networks; Event-triggered control; Optimal control; PSO algorithm; LINEAR MULTIAGENT SYSTEMS; EVENT-TRIGGERED CONTROL; EXPONENTIAL SYNCHRONIZATION; NEURAL-NETWORKS; SWITCHING TOPOLOGIES; CONSENSUS; ARRAY; OPTIMIZATION; STRATEGY; DESIGN;

D O I：

10.1016/j.neucom.2018.12.020

中图分类号：

TP18 [人工智能理论];

学科分类号：

081104 ; 0812 ; 0835 ; 1405 ;

摘要：

The paper mainly deals with the exponential synchronization of complex dynamical networks with a time-varying delay. Based on the event-triggered control, some sufficient conditions for exponential synchronization of complex dynamical networks can be achieved by using the Lyapunov function method, along with the Linear Matrix Inequality (LMI) and matrix analysis. The Zeno-behavior is excluded for the designed event-trigger controller. The optimal control parameters satisfying a minimal integral square error (ISE) index and control energy can be computed by using the particle swarm optimization (PSO) algorithm. A numerical example is given to demonstrate the effectiveness and applicability of the proposed approach. (C) 2018 Published by Elsevier B.V.

引用

页码：1 / 10

页数：10

共 50 条

[21] Finite-time synchronization for complex dynamical networks with hybrid coupling and time-varying delay
Baocheng Li
Nonlinear Dynamics, 2014, 76 : 1603 - 1610
[22] Time-Varying Lag Synchronization of Complex Dynamical Networks with Unknown Channel Time-Delay
Zhao, Wenjie
Li, Junmin
Shi, Naizheng
PROCEEDINGS OF 2018 IEEE 7TH DATA DRIVEN CONTROL AND LEARNING SYSTEMS CONFERENCE (DDCLS), 2018, : 783 - 787
[23] Local exponential synchronization in complex dynamical networks with time-varying delay and hybrid coupling
Wang, Junyi
Zhang, Huaguang
Wang, Zhanshan
Wang, Binrui
APPLIED MATHEMATICS AND COMPUTATION, 2013, 225 : 16 - 32
[24] Exponential synchronization of stochastic complex dynamical networks with time-varying delay and impulsive effects
Liu, Linna
Deng, Feiqi
2019 IEEE 15TH INTERNATIONAL CONFERENCE ON CONTROL AND AUTOMATION (ICCA), 2019, : 9 - 14
[25] Finite-time synchronization for complex dynamical networks with hybrid coupling and time-varying delay
Li, Baocheng
NONLINEAR DYNAMICS, 2014, 76 (02) : 1603 - 1610
[26] Passivity-based synchronization of a class of complex dynamical networks with time-varying delay
Wang, Jin-Liang
Wu, Huai-Ning
Huang, Tingwen
AUTOMATICA, 2015, 56 : 105 - 112
[27] Pinning impulsive synchronization of complex dynamical networks with various time-varying delay sizes
Wang, Xin
Liu, Xinzhi
She, Kun
Zhong, Shouming
NONLINEAR ANALYSIS-HYBRID SYSTEMS, 2017, 26 : 307 - 318
[28] Synchronization criterion for Lur'e type complex dynamical networks with time-varying delay
Ji, D. H.
Park, Ju H.
Yoo, W. J.
Won, S. C.
Lee, S. M.
PHYSICS LETTERS A, 2010, 374 (10) : 1218 - 1227
[29] Synchronization control of a time-varying complex dynamical network
Wang, Lei
Dai, Hua-Ping
Sun, You-Xian
Kongzhi Lilun Yu Yingyong/Control Theory and Applications, 2008, 25 (04): : 603 - 607
[30] Intermittent Control Strategy for Synchronization Analysis of Time-Varying Complex Dynamical Networks
Wu, Yongbao
Li, Hanzheng
Li, Wenxue
IEEE TRANSACTIONS ON SYSTEMS MAN CYBERNETICS-SYSTEMS, 2021, 51 (05): : 3251 - 3262

← 1 2 3 4 5 →