An Exact Solution of Synchronization State for a Class of Networked Mass-Spring-Damper Oscillator Systems
This brief paper addresses synchronization dynamics for a class of networked mass-spring-damper oscillator systems.The primary contribution of this work is to give an exact solution of synchronization state for such networked oscillator systems by using tools from matrix theory,algebraic graph theory and the Lyapunov stability theory on dynamical systems.It is explicitly shown that such networked oscillator systems can be synchronized by mild nonlinear network connectivity,even if the isolated oscillator is chaotic or other complex dynamics itself.Furthermore,numerical simulations are given to verify and also visualize the theoretical results.
L.XIANG S.CHENG J.ZHOU
Department of Physics, School of Science, Shanghai University, Shanghai,200444, China College of Science, Zhejiang University of Technology, Hangzhou, 310023,China Shanghai Institute of Applied Mathematics and Mechanics, Shanghai University,Shanghai, 200072, China
国际会议
Sixth International Conference on Nonlinear Mechanics(第六届国际非线性力学会议)(ICNM-VI)
上海
英文
410-415
2013-08-01(万方平台首次上网日期,不代表论文的发表时间)