On Leader-Following Consensus in Multi-Agent Systems with Discrete Updates at Random Times

被引:3
作者
Almeida, Ricardo [1 ]
Girejko, Ewa [2 ]
Hristova, Snezhana [3 ]
Malinowska, Agnieszka [2 ]
机构
[1] Univ Aveiro, Ctr Res & Dev Math & Applicat, Dept Math, P-3810193 Aveiro, Portugal
[2] Bialystok Tech Univ, Fac Comp Sci, PL-15351 Bialystok, Poland
[3] Univ Plovdiv Paisii Hilendarski, Fac Math & Comp Sci, Plovdiv 4027, Bulgaria
来源
ENTROPY | 2020年 / 22卷 / 06期
关键词
multi-agent system; communications at discrete random times; leader-following consensus; exponential distribution; differential equations with impulses; CONVERGENCE; NETWORKS; AGENTS;
D O I
10.3390/e22060650
中图分类号
O4 [物理学];
学科分类号
0702 ;
摘要
This paper studies the leader-following consensus problem in continuous-time multi-agent networks with communications/updates occurring only at random times. The time between two consecutive controller updates is exponentially distributed. Some sufficient conditions are derived to design the control law that ensures the leader-following consensus is asymptotically reached (in the sense of the expected value of a stochastic process). The numerical examples are worked out to demonstrate the effectiveness of our theoretical results.
引用
收藏
页数:24
相关论文
共 50 条
[41]   Leader-following consensus of delayed multi-agent systems with aperiodically intermittent communications [J].
Guo, Ying ;
Qian, Yan ;
Wang, Pengfei .
NEUROCOMPUTING, 2021, 466 :49-57
[42]   Adaptive Leader-Following Consensus of Multi-Agent Systems with Unknown Nonlinear Dynamics [J].
Wang, Junwei ;
Chen, Kairui ;
Ma, Qinghua .
ENTROPY, 2014, 16 (09) :5020-5031
[43]   Leader-following Consensus of Multi-agent Systems Using Output Error Feedback [J].
Ran Xiaohong ;
Wu Qinghe .
2013 32ND CHINESE CONTROL CONFERENCE (CCC), 2013, :7045-7048
[44]   Finite-time leader-following consensus problem of multi-agent systems [J].
Sun, Yongzheng ;
Zhao, Long ;
Liu, Mei ;
Weng, Wenting ;
Meng, Qingxin .
PROCEEDINGS OF THE 31ST CHINESE CONTROL CONFERENCE, 2012, :6043-6046
[45]   Stochastic averaging approach to leader-following consensus of linear multi-agent systems [J].
Ni, Wei ;
Zhao, Dongya ;
Ni, Yuanhua ;
Wang, Xiaoli .
JOURNAL OF THE FRANKLIN INSTITUTE-ENGINEERING AND APPLIED MATHEMATICS, 2016, 353 (12) :2650-2669
[46]   Consensus of Second-Order Delayed Multi-Agent Systems with Leader-Following [J].
Yang, Hong-Yong ;
Zhu, Xun-Lin ;
Zhang, Si-Ying .
EUROPEAN JOURNAL OF CONTROL, 2010, 16 (02) :188-199
[47]   Leader-following consensus of discrete-time fractional-order multi-agent systems [J].
Erfan Shahamatkhah ;
Mohammad Tabatabaei .
Chinese Physics B, 2018, 27 (01) :318-325
[48]   Leader-following Consensus of Multi-agent System in Noisy Environment [J].
Sun, Zhifeng ;
Zhang, Menglu ;
Lu, Lingxia ;
Peng, Junmin .
2016 IEEE INTERNATIONAL CONFERENCE ON INFORMATION AND AUTOMATION (ICIA), 2016, :739-743
[49]   Noise-induced consensus of leader-following multi-agent systems [J].
Li, Wang ;
Dai, Haifeng ;
Zhao, Lingzhi ;
Zhao, Donghua ;
Sun, Yongzheng .
MATHEMATICS AND COMPUTERS IN SIMULATION, 2023, 203 :1-11
[50]   Consensus control for leader-following multi-agent systems with measurement noises [J].
Cuiqin Ma ;
Tao Li ;
Jifeng Zhang .
Journal of Systems Science and Complexity, 2010, 23 :35-49
12345