%0 Journal Article
%T One local bifurcation of nonlinear system based on magnetorheological damper
一类非线性磁流变系统局部分岔特性研究
%A Gao Guosheng Yang Shaopu Chen Enli Guo Jingbo School of Mechanical
%A Electronic
%A Control Engineering
%A Beijing Jiaotong University
%A Beijing
%A China School of Mechanical Engineering
%A Shijiazhuang Railway Institute
%A Shijiazhuang
%A China
%A
高国生
%A 杨绍普
%A 陈恩利
%A 郭京波
%J 力学学报
%D 2004
%I
%X Magnetorheological (MR) fluids is a kind of smart materials, it can be transformed from Newton fluids into visco-plastic solid by varying the strength of the magnetic field. The dampers made by MR fluids have a number of attractive features, for example, inexpensive to manufacture, small power requirements, reliability, stability, and can continually change its state. The process of change is very quick, less than a few milliseconeds, and can be easily controlled. MR dampers have been recognized as having many attractive characteristics for use in vibration control applications, it is a kind of ideal semi-active control devices. MR damper is widely used in the civil engineering, vehicle suspension system and its structural characteristics have been extensively studied. But, up to now, the dynamic behaviors about MR damper semi-active control system, specially, its bifurcation behaviors and global dynamics have not been discussed. The problem of bifurcation behavior for the MR damper nonlinear system is discussed. A dynamic model of the system with nonlinear MR damper force is presented. The system's normal form and universal unfolding of the double zero eigenvalue are achieved. The complex dynamic behavior of the nonlinear system will be shown by the analysis. By theoretical analysis, it is shown that the design of parameters has a close relation with the system's stability; the range of selected parameters are achieved when the system is stable, based on the condition of bifurcation parameters, bifurcation curve, bifurcation set and phase portraits. From numerical simulating analysis, the complex dynamics behavior is shown, and the result is in correspondence with the theoretic analysis.
%K MR damper
%K nonlinear system
%K bifurcation
%K center manifold
%K normal form
磁流变阻尼器
%K 非线性系统
%K 分岔
%K 中心流形
%K 规范形
%U http://www.alljournals.cn/get_abstract_url.aspx?pcid=6E709DC38FA1D09A4B578DD0906875B5B44D4D294832BB8E&cid=5D344E2AD54D14F8&jid=4100DA4A1A3BA1B0CE5AD99AE1DFB420&aid=E6BE75721D0B484D&yid=D0E58B75BFD8E51C&vid=933658645952ED9F&iid=94C357A881DFC066&sid=2497388423811B81&eid=6D6B4A516C7DB6EE&journal_id=0459-1879&journal_name=力学学报&referenced_num=5&reference_num=12