带未知耦合权重的领导-跟随多智能体系统的实用一致性

张文; 马忠军; 王毅

doi:10.16383/j.aas.2018.c170193

带未知耦合权重的领导-跟随多智能体系统的实用一致性

doi: 10.16383/j.aas.2018.c170193

张文^1,,
马忠军^1, ,,
王毅^2,3,

1.
桂林电子科技大学数学与计算科学学院, 广西高校数据分析与计算重点实验室桂林 541004
2.
浙江财经大学数据科学学院杭州 310018
3.
桂林电子科技大学广西可信软件重点实验室桂林 541004

基金项目:

桂林电子科技大学研究生教育创新计划资助项目 2017YJCX79

国家自然科学基金 11562 006

浙江省自然科学基金 LY17A020007

广西可信软件重点实验室基金 KX201612

国家自然科学基金 61663006

广西自然科学基金 2016GXNSFDA380031

广西自然科学基金 201 5GXNSFAA139013

详细信息

作者简介:
张文桂林电子科技大学硕士研究生.主要研究方向为多智能体系统和复杂网络.E-mail:zhangwen_2623@163.com

王毅浙江财经大学数据科学学院副教授.2003年获得浙江师范大学硕士学位, 2009年获得上海大学博士学位.主要研究方向为多智能体系统, 非线性系统与控制, 复杂网络以及生物系统.E-mail:wangyihzh@gmail.com

通讯作者:
马忠军桂林电子科技大学数学与计算科学学院教授.2004年获得昆明理工大学硕士学位, 2007年获得上海大学博士学位.主要研究方向为多智能体系统, 非线性系统和复杂网络.本文通信作者.E-mail:mzj1234402@163.com

计量
- 文章访问数: 1765
- HTML全文浏览量: 277
- PDF下载量: 532
- 被引次数: 0
出版历程
- 收稿日期: 2017-04-12
- 录用日期: 2017-09-15
- 刊出日期: 2018-12-20

Practical Consensus of Leader-following Multi-agent System With Unknown Coupling Weights

ZHANG Wen^1
,,
MA Zhong-Jun^{1
, ,},
WANG Yi^{2,3
,}

1.
School of Mathematics and Computing Science, Guangxi Colleges and Universities Key Laboratory of Data Analysis and Computation, Guilin University of Electronic Technology, Guilin 541004
2.
School of Data Sciences, Zhejiang University of Finance and Economics, Hangzhou 310018
3.
Guangxi Key Laboratory of Trusted Software, Guilin University of Electronic Technology, Guilin 541004

Funds:

Innovation Project of GUET Graduate Education 2017YJCX79

National Natural Science Foundation of China 11562 006

Zhejiang Provincial Natural Science Foundation of China LY17A020007

Guangxi Key Laboratory of Trusted Software KX201612

National Natural Science Foundation of China 61663006

Natural Science Foundation of Guangxi 2016GXNSFDA380031

Natural Science Foundation of Guangxi 201 5GXNSFAA139013

More Information

Author Bio:
Master student at Guilin University of Electronic Technology. His research interest covers multi-agent systems and complex networks

Associate professor at the School of Data Science, Zhejiang University of Finance and Economics. He received his master degree from Zhejiang Normal University in 2003, and Ph. D. degree from Shanghai University in 2009. His research interest covers multi-agent systems, nonlinear systems and control, complex networks, and biology systems

Corresponding author: MA Zhong-Jun Professor at the School of Mathematics and Computing Science, Guilin University of Electronic Technology. He received his master degree from Kunming University of Science and Technology in 2004, and Ph. D. degree from Shanghai University in 2007. His research interest covers multi-agent systems, nonlinear systems, and complex networks. Corresponding author of this paper

摘要

摘要: 一致性理论在许多领域有广泛应用.现有很多研究成果是关于恒同一致的.在实际中，由于任何系统都会不可避免地受到一定的外界扰动，要求误差函数的极限等于0是难以做到的，但当时间充分大时误差函数在可接受区间内是可行的.本文首先给出多智能体系统的实用一致性概念，然后研究含未知耦合权重的一阶非线性领导-跟随多智能体系统的实用一致性问题.通过设计合适的控制协议，运用图论、矩阵理论和强实用稳定性理论，得到该多智能体系统实现实用一致性的充分条件.数值模拟验证了理论结果的正确性.
- 多智能体系统 /
- 实用一致性 /
- 领导-跟随 /
- 强实用稳定性
Abstract: Consensus theory has been widely applied to many fields. Most of the research is on identical consensus. In many practical cases, it is impossible for agents to achieve identical consensus because any system has certain disturbance. In this case, it cannot be achieved that the limit of the error function is equal to 0, but it is feasible that the value of the error function is bounded within an interval if the time is sufficiently large. In this paper, the concept of practical consensus is given, then the problem of practical consensus in leader-following multi-agent systems with unknown coupling weights is investigated. By designing an appropriate control protocol and using graph theory, matrix theory and strong practical stability theory, a sufficient condition is given to realize practical consensus of the multi-agent system. Numerical simulations are given to verify the theoretical results.
- Multi-agent system /
- practical consensus /
- leader-following /
- strong practical stability
注释:

1) 本文责任编委郭戈

HTML全文

图 1 拓扑结构图

Fig. 1 Topology mode

下载: 全尺寸图片幻灯片

图 2 理想系统随时间变化的偏差轨迹

Fig. 2 Error trajectories of ideal multi-agent systems

下载: 全尺寸图片幻灯片

图 3 真实系统随时间变化的偏差轨迹

Fig. 3 Error trajectories of real multi-agent systems

下载: 全尺寸图片幻灯片

参考文献(24)

[1]	Hu W F, Liu L, Feng G. Consensus of linear multi-agent systems by distributed event-triggered strategy. IEEE Transactions on Cybernetics, 2016, 46(1):148-157 doi: 10.1109/TCYB.2015.2398892
[2]	Lu J Q, Ho D W C, Kurths J. Consensus over directed static networks with arbitrary finite communication delays. Physical Review E, 2009, 80(6): Article No. 066121
[3]	Xiao F, Wang L, Chen J. Partial state consensus for networks of second-order dynamic agents. Systems and Control Letters, 2010, 59(12):775-781 doi: 10.1016/j.sysconle.2010.09.003
[4]	Li T, Xie L H. Distributed consensus over digital networks with limited bandwidth and time-varying topologies. Automatica, 2011, 47(9):2006-2015 doi: 10.1016/j.automatica.2011.05.017
[5]	王沛, 吕金虎.基因调控网络的控制:机遇与挑战.自动化学报, 2013, 39(12):1969-1979 doi: 10.3724/SP.J.1004.2013.01969 Wang Pei, Lv Jin-Hu. Control of genetic regulatory networks:opportunities and challenges. Acta Automatica Sinica, 2013, 39(12):1969-1979 doi: 10.3724/SP.J.1004.2013.01969
[6]	Lu J Q, Zhong J, Huang C, Cao J D. On pinning controllability of Boolean control networks. IEEE Transactions on Automatic Control, 2016, 61(6):1658-1663 doi: 10.1109/TAC.2015.2478123
[7]	Lu J Q, Ding C D, Lou J G, Cao J D. Outer synchronization of partially coupled dynamical networks via pinning impulsive controllers. Journal of the Franklin Institute, 2015, 352(11):5024-5041 doi: 10.1016/j.jfranklin.2015.08.016
[8]	赵俊, 刘国平.非完整性约束的平面多智能体位置时变一致性控制.自动化学报, 2017, 43(7):1169-1177 http://www.aas.net.cn/CN/Y2017/V43/I7/1169 Zhao Jun, Liu Guo-Ping. Position time-varying consensus control for multiple planar agents with non-holonomic constraint. Acta Automatica Sinica, 2017, 43(7):1169-1177 http://www.aas.net.cn/CN/Y2017/V43/I7/1169
[9]	Wang Z H, Xu J J, Zhang H S. Consensus seeking for discrete-time multi-agent systems with communication delay. IEEE/CAA Journal of Automatica Sinica, 2015, 2(2):151-157 doi: 10.1109/JAS.2015.7081654
[10]	Zeng L, Hu G D. Consensus of linear multi-agent systems with communication and input delays. Acta Automatica Sinica, 2013, 39(7):1133-1140 doi: 10.1016/S1874-1029(13)60068-3
[11]	Guan Z H, Hu B, Chi M, He D X, Cheng X M. Guaranteed performance consensus in second-order multi-agent systems with hybrid impulsive control. Automatica, 2014, 50(9):2415-2418 doi: 10.1016/j.automatica.2014.07.008
[12]	杨洪勇, 郭雷, 张玉玲, 姚秀明.离散时间分数阶多自主体系统的时延一致性.自动化学报, 2014, 40(9):2022-2028 http://www.aas.net.cn/CN/Y2014/V40/I9/2022 Yang Hong-Yong, Guo Lei, Zhang Yu-Ling, Yao Xiu-Ming. Delay consensus of fractional-order multi-agent systems with sampling delays. Acta Automatica Sinica, 2014, 40(9):2022-2028 http://www.aas.net.cn/CN/Y2014/V40/I9/2022
[13]	Li L L, Ho D W C, Lu J Q. A consensus recovery approach to nonlinear multi-agent system under node failure. Information Sciences, 2016, 367-368:975-989 doi: 10.1016/j.ins.2016.06.050
[14]	Wen G G, Peng Z X, Rahmani A, Yu Y G. Distributed leader-following consensus for second-order multi-agent systems with nonlinear inherent dynamics. International Journal of Systems Science, 2014, 45(9):1892-1901 doi: 10.1080/00207721.2012.757386
[15]	Ma Z J, Wang Y, Li X M. Cluster-delay consensus in first-order multi-agent systems with nonlinear dynamics. Nonlinear Dynamics, 2016, 83(3):1303-1310 doi: 10.1007/s11071-015-2403-8
[16]	Peng K, Yang Y P. Leader-following consensus problem with a varying-velocity leader and time-varying delays. Physica A:Statistical Mechanics and Its Applications, 2009, 388(2-3):193-208 doi: 10.1016/j.physa.2008.10.009
[17]	Wang Y, Ma Z J. Lag consensus of the second-order leader-following multi-agent systems with nonlinear dynamics. Neurocomputing, 2016, 171:82-88 doi: 10.1016/j.neucom.2015.06.020
[18]	Dong X W, Xi J X, Shi Z Y, Zhong Y S. Practical consensus for high-order linear time-invariant swarm systems with interaction uncertainties, time-varying delays and external disturbances. International Journal of Systems Science, 2013, 44(10):1843-1856 doi: 10.1080/00207721.2012.670296
[19]	Li L L, Ho D W C, Lu J Q. A unified approach to practical consensus with quantized data and time delay. IEEE Transactions on Circuits and Systems I:Regular Papers, 2013, 60(10):2668-2678 doi: 10.1109/TCSI.2013.2244322
[20]	廖晓昕.稳定性的数学理论及应用.第2版.武汉:华中师范大学出版社, 2001. Liao Xiao-Xin. Mathematical Theory of Stability and Its Application (2nd edition). Wuhan:Central China Normal University Press, 2001.
[21]	Liu B, Lu W L, Chen T P. New conditions on synchronization of networks of linearly coupled dynamical systems with non-Lipschitz right-hand sides. Neural Networks, 2012, 25:5-13 doi: 10.1016/j.neunet.2011.07.007
[22]	Wu W, Chen T P. Partial synchronization in linearly and symmetrically coupled ordinary differential systems. Physica D:Nonlinear Phenomena, 2009, 238(4):355-364 doi: 10.1016/j.physd.2008.10.012
[23]	Bhatia R. Matrix Analysis. New York: Springer, 1996.
[24]	Shil'nikov L P. Chua's circuit:rigorous results and future problems. IEEE Transactions on Circuits and Systems I:Fundamental Theory and Applications, 1993, 40(10):784-786 doi: 10.1109/81.246153

施引文献

资源附件(0)

访问统计

点击查看大图

图(3)

计量

文章访问数: 1765
HTML全文浏览量: 277
PDF下载量: 532
被引次数: 0

姓名
邮箱
手机号码
标题
留言内容
验证码

留言板

带未知耦合权重的领导-跟随多智能体系统的实用一致性

doi: 10.16383/j.aas.2018.c170193

通讯作者:
马忠军桂林电子科技大学数学与计算科学学院教授.2004年获得昆明理工大学硕士学位, 2007年获得上海大学博士学位.主要研究方向为多智能体系统, 非线性系统和复杂网络.本文通信作者.E-mail:mzj1234402@163.com

计量

Practical Consensus of Leader-following Multi-agent System With Unknown Coupling Weights

计量

目录

留言板

带未知耦合权重的领导-跟随多智能体系统的实用一致性

doi: 10.16383/j.aas.2018.c170193

通讯作者: 马忠军 桂林电子科技大学数学与计算科学学院教授.2004年获得昆明理工大学硕士学位, 2007年获得上海大学博士学位.主要研究方向为多智能体系统, 非线性系统和复杂网络.本文通信作者.E-mail:mzj1234402@163.com

计量

出版历程

Practical Consensus of Leader-following Multi-agent System With Unknown Coupling Weights

计量

出版历程

目录

通讯作者:
马忠军桂林电子科技大学数学与计算科学学院教授.2004年获得昆明理工大学硕士学位, 2007年获得上海大学博士学位.主要研究方向为多智能体系统, 非线性系统和复杂网络.本文通信作者.E-mail:mzj1234402@163.com