Title :
H∞ synchronization of a class of complex networks
Author :
Lu, Pingli ; Yang, Ying
Author_Institution :
Sch. of Autom., Beijing Inst. of Technol., Beijing, China
Abstract :
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.
Keywords :
linear matrix inequalities; network theory (graphs); H∞ performance; H∞ synchronization; LMI; Lur´e system; Lyapunov theory; Nn-dimensional dynamic networks; complex network class; global asymptotic synchronization; infinite equilibria; linear matrix inequality; n-dimensional space; Aerodynamics; Complex networks; Couplings; Linear matrix inequalities; Output feedback; Phase locked loops; Synchronization; Decentralized static output feedback; H∞; infinite equilibria; linear matrix inequality(LMI); synchronization;
Conference_Titel :
Control Conference (CCC), 2012 31st Chinese
Conference_Location :
Hefei
Print_ISBN :
978-1-4673-2581-3
