H∞ synchronization of a class of complex networks
This paper deals with H∞ synchronization problem for a class of complex networks with each node being a general Lur’e system with infinite equilibria. On the basis of the Lyapunov theory, linear matrix inequality (LMI) conditions guaranteeing the global asymptotic synchronization of all nodes with desired H∞ performance are established. In addition, the following interesting result is derived: the synchronization problem for the whole Nn-dimensional dynamic networks can be converted into the simple n-dimensional space in terms of only two LMIs. Finally, a concrete application to mutually coupled phase-locked loop networks shows the validity of the proposed approaches.
Decentralized static output feedback H∞ synchronization infinite equilibria linear matrix inequality(LMI)
Pingli Lu Ying Yang
School of Automation, Beijing Institute of Technology, Beijing, 100081 Department of Mechanics and Aerospace Engineering, Peking University, Beijing, 100871
国际会议
The 31st Chinese Control Conference(第三十一届中国控制会议)
合肥
英文
1136-1141
2012-07-01(万方平台首次上网日期,不代表论文的发表时间)