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Sampled-Data Consensus of Linear Time-Varying Multiagent Networks With Time-Varying Topologies

Wenbing Zhang, Yang Tang, Qing-Long Han, Yurong Liu

2020IEEE Transactions on Cybernetics53 citationsDOI

Abstract

The main purpose of this article is to investigate the consensus of linear multiagent networks with time-varying characteristics under sampled-data communications, where the time-varying characteristics include both time-varying topologies and the node's linear time-varying dynamics. By using the decoupling method, we prove that the sampled-data consensus problem of multiagent networks is equal to the stability problem of sampled-data systems. Then, the globally asymptotical consensus is investigated for multiagent networks with time-varying characteristics by virtue of the Lyapunov function method. It should be noted that when the Lyapunov function method is utilized to investigate the stability problem of control systems, it is always assumed that the derivative of the constructed Lyapunov function is not more than zero. This assumption is removed here and as a replacement, the average value of the derivative of the Lyapunov function in a period to be negative is needed.

Topics & Concepts

Lyapunov functionNetwork topologyMulti-agent systemMathematicsDecoupling (probability)Lyapunov optimizationFunction (biology)ConsensusComputer scienceControl theory (sociology)Lyapunov stabilityMathematical optimizationStability (learning theory)Lyapunov redesignLyapunov equationComplex networkDerivative (finance)Value (mathematics)Stability theoryLinear systemAlmost everywhereExponential stabilityNeural Networks Stability and SynchronizationDistributed Control Multi-Agent SystemsStability and Control of Uncertain Systems