Necessary and sufficient condition for the group consensus of multi-agent systems
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摘要
This paper focuses on the group consensus issue of multi-agent systems, where the agents in a network can reach more than one consistent values asymptotically. A rotation matrix is introduced to an existing consensus algorithm for single-integrator dynamics. Based on algebraic matrix theories, graph theories and the properties of Kronecker product, some necessary and sufficient criteria for the group consensus are derived, where we show that both the eigenvalue distribution of the Laplacian matrix and the Euler angle of the rotation matrix play an important role in achieving group consensus. Simulated results are presented to demonstrate the theoretical results.
论文关键词:Multi-agent system (MAS),Group consensus,Normal consensus,Fixed topology,Directed graph
论文评审过程:Available online 11 July 2014.
论文官网地址:https://doi.org/10.1016/j.amc.2014.06.069