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Polynomial Lyapunov Functions for Synchronization of Nonlinearly Coupled Complex Networks

Shuyuan Zhang, Lei Wang, Quanyi Liang, Zhikun She, Qing-Guo Wang

2020IEEE Transactions on Cybernetics21 citationsDOI

Abstract

In this article, we search for polynomial Lyapunov functions beyond the quadratic form to investigate the synchronization problems of nonlinearly coupled complex networks. First, with a relaxed assumption than the quadratic condition, a synchronization criterion is established for nonlinearly coupled networks with asymmetric coupling matrices. Compared with the existing synchronization criteria, our results are less conservative and have a wider application. Second, the synchronization problem for polynomial networks is characterized as the sum-of-squares (SOS) optimization one. In this way, polynomial Lyapunov functions can be obtained efficiently with SOS programming tools. Furthermore, it is shown that the local synchronization of certain nonpolynomial networks can also be analyzed by using the SOS optimization method through the Taylor series expansion. Finally, three numerical examples are presented to verify the effectiveness and less conservatism of our analytical results.

Topics & Concepts

Synchronization (alternating current)Lyapunov functionMathematicsPolynomialQuadratic equationComplex networkQuadratic functionLyapunov exponentCoupling (piping)Quadratic programmingApplied mathematicsControl theory (sociology)Taylor seriesSeries (stratigraphy)Lyapunov equationMathematical optimizationOptimization problemComputer scienceLyapunov redesignComplex systemLyapunov optimizationTime complexityRelaxation (psychology)Complex quadratic polynomialNeural Networks Stability and SynchronizationControl and Stability of Dynamical SystemsDistributed Control Multi-Agent Systems
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