Distributed Impulsive Control for Signed Networks of Coupled Harmonic Oscillators With Sampled Positions

This article considers the distributed impulsive control problem for a signed network composed by coupled harmonic oscillators based on relative position data, where the topology graph can be either structurally balanced or unbalanced, consisting of positive and negative links. First, an impulsive control algorithm is proposed for the network by utilizing both current and previous sampled positions. A necessary and sufficient condition is established such that the impulsive-controlled network can exhibit convergent behaviors, including bipartite synchronization, interval bipartite synchronization, and global stabilization. Second, some discussions are further provided to analyze two additional impulsive control algorithms designed with either current or previous sampled positions, in which it is shown that the former algorithm cannot lead to the convergent behaviors of the network, while the latter algorithm can solve the distributed impulsive control problem of the network under some appropriate conditions. Finally, simulation examples are given to illustrate the theoretical analysis.

[1]  Jinde Cao,et al.  Synchronization of Coupled Harmonic Oscillators via Sampled Position Data Control , 2016, IEEE Transactions on Circuits and Systems I: Regular Papers.

[2]  M. Holthaus,et al.  Periodic thermodynamics of the parametrically driven harmonic oscillator. , 2019, Physical review. E.

[3]  T. Carroll,et al.  Master Stability Functions for Synchronized Coupled Systems , 1998 .

[4]  Karl Henrik Johansson,et al.  Structural Balance and Opinion Separation in Trust–Mistrust Social Networks , 2016, IEEE Transactions on Control of Network Systems.

[5]  Sezai Emre Tuna Synchronization of harmonic oscillators under restorative coupling with applications in electrical networks , 2017, Autom..

[6]  Jurgen Kurths,et al.  Synchronization in complex networks , 2008, 0805.2976.

[7]  Maria Elena Valcher,et al.  On the consensus and bipartite consensus in high-order multi-agent dynamical systems with antagonistic interactions , 2014, Syst. Control. Lett..

[8]  Xiao Fan Wang,et al.  Synchronization of coupled harmonic oscillators in a dynamic proximity network , 2009, Proceedings of the 48h IEEE Conference on Decision and Control (CDC) held jointly with 2009 28th Chinese Control Conference.

[9]  Hao Chen,et al.  Convergence Analysis of Signed Nonlinear Networks , 2018, IEEE Transactions on Control of Network Systems.

[10]  Ella M. Atkins,et al.  Distributed multi‐vehicle coordinated control via local information exchange , 2007 .

[11]  Jin Zhou,et al.  Synchronization of coupled harmonic oscillators with local instantaneous interaction , 2012, Autom..

[12]  Jun Luo,et al.  Bipartite Consensus Control for Coupled Harmonic Oscillators Under a Coopetitive Network Topology , 2018, IEEE Access.

[13]  C. Abdallah,et al.  Delayed Positive Feedback Can Stabilize Oscillatory Systems , 1993, 1993 American Control Conference.

[14]  Deyuan Meng,et al.  Bipartite containment tracking of signed networks , 2017, Autom..

[15]  Wenwu Yu,et al.  Some necessary and sufficient conditions for second-order consensus in multi-agent dynamical systems , 2010, Autom..

[16]  Bo Wei,et al.  Event-triggered control for synchronization of coupled harmonic oscillators , 2016, Syst. Control. Lett..

[17]  Claudio Altafini,et al.  Consensus Problems on Networks With Antagonistic Interactions , 2013, IEEE Transactions on Automatic Control.

[18]  Jun Luo,et al.  Impulse Bipartite Consensus Control for Coupled Harmonic Oscillators Under a Coopetitive Network Topology Using Only Position States , 2019, IEEE Access.

[19]  Quanjun Wu,et al.  Synchronization of Instantaneous Coupled Harmonic Oscillators With Communication and Input Delays , 2015 .

[20]  Xiaoming Hu,et al.  Interval Consensus for Multiagent Networks , 2020, IEEE Transactions on Automatic Control.

[21]  Wei Ren,et al.  Synchronization of coupled harmonic oscillators with local interaction , 2008, Autom..

[22]  Mingjun Du,et al.  Interval Bipartite Consensus of Networked Agents Associated With Signed Digraphs , 2016, IEEE Transactions on Automatic Control.

[23]  Yi Zhao,et al.  The synchronization of instantaneously coupled harmonic oscillators using sampled data with measurement noise , 2016, Autom..

[24]  Yongcan Cao,et al.  Distributed discrete-time coupled harmonic oscillators with application to synchronised motion coordination , 2010 .

[25]  Jinde Cao,et al.  Reaching Synchronization in Networked Harmonic Oscillators With Outdated Position Data , 2016, IEEE Transactions on Cybernetics.

[26]  Jin Zhou,et al.  Sampled-data synchronisation of coupled harmonic oscillators with communication and input delays subject to controller failure , 2016, Int. J. Syst. Sci..

[27]  Aleksei M. Zheltikov A harmonic-oscillator model of acoustic vibrations in metal nanoparticles and thin films coherently controlled with sequences of femtosecond pulses , 2002 .

[28]  Jinde Cao,et al.  Bipartite Synchronization and Convergence Analysis for Network of Harmonic Oscillator Systems With Signed Graph and Time Delay , 2019, IEEE Transactions on Circuits and Systems I: Regular Papers.

[29]  Hua Zhang,et al.  Synchronization of Discretely Coupled Harmonic Oscillators Using Sampled Position States Only , 2018, IEEE Transactions on Automatic Control.

[30]  Fu Lin,et al.  Design of Optimal Sparse Interconnection Graphs for Synchronization of Oscillator Networks , 2013, IEEE Transactions on Automatic Control.

[31]  Xinghuo Yu,et al.  Synchronisation of directed coupled harmonic oscillators with sampled-data , 2014 .

[32]  Chai Wah Wu,et al.  Synchronization in Complex Networks of Nonlinear Dynamical Systems , 2008 .