Necessary and sufficient conditions for mean-square bounded consensus of multiagent systems with additive noise

被引:1
|
作者
Luo, Mei [1 ,2 ,3 ]
Wang, JinRong [1 ,2 ,3 ]
O'Regan, Donal [4 ]
机构
[1] Guizhou Univ, Dept Math, Guiyang 550025, Guizhou, Peoples R China
[2] Guizhou Univ, Supercomp Algorithm & Applicat Lab, Guiyang 550025, Guizhou, Peoples R China
[3] Guian Sci Innovat Co, Guiyang 550025, Guizhou, Peoples R China
[4] Natl Univ Ireland, Sch Math & Stat Sci, Galway, Ireland
来源
MATHEMATICAL METHODS IN THE APPLIED SCIENCES | 2023年 / 46卷 / 12期
基金
中国国家自然科学基金;
关键词
additive noise; bounded consensusability; consensus protocol; multiagent systems;
D O I
10.1002/mma.9273
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
Motivated from the mean-square bounded consensus (MSBD) problem of multiagent systems (MASs) with additive noise, this paper studies the joint influence of the agent dynamic structure and communication topology on the consensus. The necessary condition of MSBD is given under the output-based consensus protocol, which is also sufficient under some mild conditions. Furthermore, the upper consensus bound is given via the solution of the Lyapunov equation. Finally, simulation results are provided to illustrate the theoretical results.
引用
收藏
页码:13558 / 13573
页数:16
相关论文
共 50 条
  • [21] Mean-square stability of linear systems with small bounded stochastic perturbations of their coefficients
    Katafygiotis, Lambros S.
    Papadimitriou, Costas
    Tsarkov, Yevgeny
    Mechanics Research Communications, 24 (03): : 231 - 236
  • [22] Mean-Square Optimal Controller for Stochastic Polynomial Systems with Multiplicative Noise
    Basin, Michael
    Shi, Peng
    Soto, Pedro
    2011 AMERICAN CONTROL CONFERENCE, 2011, : 54 - 59
  • [23] Mean-Square Filter Design for Nonlinear Polynomial Systems with Poisson Noise
    Basin, Michael
    Maldonado, Juan J.
    2011 AMERICAN CONTROL CONFERENCE, 2011, : 612 - 617
  • [24] DELAYED CONSENSUS IN MEAN-SQUARE OF MASS UNDER MARKOV SWITCHING TOPOLOGIES AND BROWN NOISE
    Zhou, Xia
    Xi, Meixuan
    Liu, Wanbing
    Ma, Zhongjun
    Cao, Jinde
    JOURNAL OF APPLIED ANALYSIS AND COMPUTATION, 2024, 14 (01): : 543 - 559
  • [25] Mean-Square State and Noise Intensity Estimation for Uncertain Linear Systems
    Basin, Michael
    Loukianov, Alexander
    Hernandez-Gonzalez, Miguel
    49TH IEEE CONFERENCE ON DECISION AND CONTROL (CDC), 2010, : 5333 - 5337
  • [26] Necessary and Sufficient Conditions for Group Consensus of Fractional Multiagent Systems Under Fixed and Switching Topologies via Pinning Control
    Chen, Yiwen
    Wen, Guoguang
    Peng, Zhaoxia
    Huang, Tingwen
    Yu, Yongguang
    IEEE TRANSACTIONS ON CYBERNETICS, 2021, 51 (01) : 28 - 39
  • [27] Necessary and Sufficient Conditions for Consensus in Fractional-Order Multiagent Systems via Sampled Data Over Directed Graph
    Su, Housheng
    Ye, Yanyan
    Chen, Xia
    He, Haibo
    IEEE TRANSACTIONS ON SYSTEMS MAN CYBERNETICS-SYSTEMS, 2021, 51 (04): : 2501 - 2511
  • [28] Mean-square consensus of heterogeneous multi-agent systems with communication noises
    Guo, Shaoyan
    Mo, Lipo
    Yu, Yongguang
    JOURNAL OF THE FRANKLIN INSTITUTE-ENGINEERING AND APPLIED MATHEMATICS, 2018, 355 (08): : 3717 - 3736
  • [29] Mean-Square Consensus for Heterogeneous Multi-Agent Systems With Packet Losses
    Zhang, Liping
    Wang, Wei
    Zhang, Huanshui
    IEEE TRANSACTIONS ON CIRCUITS AND SYSTEMS II-EXPRESS BRIEFS, 2024, 71 (05) : 2779 - 2783
  • [30] MEASURING MEAN-SQUARE VALUE OF NOISE SIGNALS
    POVKH, IL
    EREMIN, GP
    KONDRATE.VG
    PLYUSNIN, NI
    YATSENKO, AI
    PRIBORY I TEKHNIKA EKSPERIMENTA, 1974, (02): : 122 - 125
12345