有向网络下线性多个体系统的整体行为--矩阵方法

Collective behavior of linear multi-agent system in directed network:A matrix approach

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摘要研究了有向通讯网络条件下一阶和二阶线性多个体协同动力学系统整体行为的矩阵代数性质.利用矩阵分析的方法将系统的系数矩阵变换为Frobenius标准型,由此将系统分解为独立基本子系统和非独立基本子系统的组成结构.通过研究行和为零的对角占优矩阵的性质,得出了对线性多个体协同动力学系统整体行为起决定作用的系数矩阵的性质,从而将这一问题转换为普通线性代数问题. This paper studies the matrix algebra properties of the collective behavior of liner multi-agent dynamic systems in directed network,where the agent is with dynamical order one or two.By means of matrix analysis approach,the coefficient matrix of system can be transformed into Frobenius canonical form.Thus,the system is decomposed into several basic independent subsystems and basic non-independent subsystems.Based on the study of diagonally dominant matrices with the sum of entries in each row being zero,some properties of coefficient matrix are obtained,which play a key role in the collective behavior of liner multi-agent dynamic systems.Thus,the study of collective behavior of system is reduced to some elementary linear algebra problems.

作者金继东郑毓蕃

机构地区上海大学数学系首都经济贸易大学计算机科学与技术系

出处《控制与决策》 EI CSCD 北大核心 2011年第5期661-666,共6页 Control and Decision

基金国家自然科学基金项目(60674046)

关键词 Frobenius标准型对角占优惯性带权中心凸组合 Frobenius canonical form diagonally dominant inertia weighted center convex combination

分类号 N941.3 [自然科学总论—系统科学] O231.5 [理学—运筹学与控制论]

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1Olfati-Saber R, Murray R M. Consensus problems in networks of agents with switching tpology and time-delays[J]. IEEE Trans on Automatic Control, 2004, 49(9): 1520-1533.
2Olfati-Saber R, Fax J A, Murray R M. Consensus and cooperation in networked multi-agent systems[J]. Proee of the IEEE, 2007, 95(2): 215-233.
3Zhiyun Lin, Francis B, Maggiore M. Necessary and sufficient conditions for formation control of unicyles[J]. IEEE Trans on Automatic Control, 2005, 50(1): 121-127.
4Wei Ren, Ella Atkin. Second-order consensus protocols in multiple vehicle systems with local interactions[C]. AIAA Guidance, Navigation, and Control Conf and Exhibit 2005. San Francisco: American Institute of Aeronautics and Astronautics, 2005.
5Peter Wieland, Jungsu Kim, Scheu H, et al. On consensus in multi-agent systems with linear high-order agents[C]. Proc of the 17th World Congress of The Int Federation of Automatic Control. Seoul, 2008: 1541-1546.
6Jin Jidong, Zheng Yufan. The consensus of muM-agent system under directed network -- A matrix analysis approach[C]. 7th IEEE Int Conf on Control and Automation. Piscataway: IEEE Computer Society, 2010: 280-284.
7Jin Jidong, Zheng Yufan. Collective behavior of second- order multi-agent system in directed network[C]. 8th IEEE Int Conf on Control and Automation. Piscataway: IEEE Computer Society, 2010: 376-381.
8Jin Jidong, Zheng Yufan, Shao Haibin, et al. Consensus problem of second-order multi-agent system in directed network: A matrix analysis approach[C]. Chinese Control and Decision Conf. Piscataway: IEEE Computer Society, 2010: 3970-3975.
9Biggs N Algebraic. Graph theory[M]. Combridge: Cambridge University Press, 1994.
10Horn R A, Johnson C R. Matrix analysis[M]. Combridge: Cambridge University Press, 1991.

1金继东,郑毓蕃.有向网络下多个体系统的整体行为[J].系统科学与数学,2011,31(1):114-122. 被引量：3
2金继东,郑毓蕃.有向网络下二阶线性多个体动力学系统的渐近性[J].控制理论与应用,2011,28(3):294-299.
3武宏琳.可分解成不可约矩阵乘积的非负矩阵(英文)[J].华东师范大学学报（自然科学版）,2008(5):35-44.
4桂曙光.M-矩阵的判定[J].安徽理工大学学报（自然科学版）,2004,24(2):63-66. 被引量：1
5付文军.不可约非负矩阵指标集的分类理论[J].内蒙古大学学报（自然科学版）,1994,25(5):482-487. 被引量：1
6金继东.对角占优矩阵奇异-非奇异的充分必要判据[J].中国科学：数学,2014,44(11):1165-1184.
7胡苹.计算机网络条件下高等量子力学教学改革[J].电子测试,2015,26(9X):115-116 68.
8李莹,刘曾荣.Synchronization between different motifs[J].Chinese Physics B,2010,19(11):149-155.
9房喜明.修正Gauss-Seidel迭代法(MGS)的收敛条件[J].华南师范大学学报（自然科学版）,2004,36(4):37-41.
10金继东,郑毓蕃.有向网络下仿射非线性多个体协同动力学系统的整体行为[J].控制理论与应用,2011,28(10):1377-1383. 被引量：2

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有向网络下线性多个体系统的整体行为--矩阵方法

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