Title :
Consensus of second-order sampled multi-agent system with delays
Author :
Dongmei, Xie ; Shaokun, Wang
Author_Institution :
Dept. of Math., Tianjin Univ., Tianjin, China
Abstract :
This paper studies the consensus problem of second-order multi-agent system with communication delay under fixed topology. First, by the iterative product method, the continuous-time multi-agent system is equivalently transformed into a linear discrete-time system. Then, by algebraic graph theory and matrix theory, we analyze the convergence of the system matrix. Finally, an example is provided to illustrate the effectiveness of the theoretical results. We not only prove the existence of the parameter, sampling period and delays, but also give the approach of how to choose them. In our study, the eigenvalues of the corresponding Laplacian matrix play a key role in reaching consensus.
Keywords :
continuous time systems; delays; discrete time systems; eigenvalues and eigenfunctions; graph theory; iterative methods; linear systems; matrix algebra; multi-robot systems; sampled data systems; Laplacian matrix; algebraic graph theory; communication delay; consensus problem; continuous-time multiagent system; convergence; delays; eigenvalues; fixed topology; iterative product method; linear discrete-time system; matrix theory; sampling period; second-order multiagent system; second-order sampled multiagent system; system matrix; Delay; Educational institutions; Electronic mail; Laplace equations; Multiagent systems; Switches; Topology; Multi-agent systems; communication delay; consensus; fixed topology;
Conference_Titel :
Control Conference (CCC), 2012 31st Chinese
Conference_Location :
Hefei
Print_ISBN :
978-1-4673-2581-3
