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非线性动力系统多重周期解的伪不动点追踪法
引用本文:刘恒,虞烈,谢友柏,刘恭忍,姚福生.非线性动力系统多重周期解的伪不动点追踪法[J].力学学报,1999,31(2):222-229.
作者姓名:刘恒  虞烈  谢友柏  刘恭忍  姚福生
作者单位:西安交通大学润滑理论与轴承研究所
摘    要:提出一种求解非线性动力系统多重周期解的新的思路和方法,这一方法由寻找非线性动力系统同时存在的各个周期解的联系入手,引入一个反映系统全局瞬态信息的标量函数,将非线性动力系统求各个周期解的问题转化为此标量函数的寻优问题。

关 键 词:非线性  动力系统  周期解  不动点追踪

THE QUASI-FIXED-POINT TRACING METHOD FOR MULIT-PERIODIC-SOLUTIONS OF A NONLINEAR DYNAMIC SYSTEM
Liu Heng, Yu Lie, Xie Youbai.THE QUASI-FIXED-POINT TRACING METHOD FOR MULIT-PERIODIC-SOLUTIONS OF A NONLINEAR DYNAMIC SYSTEM[J].chinese journal of theoretical and applied mechanics,1999,31(2):222-229.
Authors:Liu Heng  Yu Lie  Xie Youbai
Abstract:The Multi-Periodic-Solutions of a nonlinear dynamic system means that there existseveral periodic solutions in state space at the same time, it is determined by the nature of thenonlinear dynamic system and is an important characteristics of the nonlinear dynamic systemdiffering from the linear systems. Today the research of linear system is mature, but that of nonlinear system is very difficult. The problem of Multi-Periodic-Solutions of the nonlinear dynamicsystem is a very important and very complex problem in nonlinear research. This paper presentsa new idea and method (Quajsi-Fixed-Point Tracing Method) to get the Multi-Periodic-Solutionsof a nonlinear dynamic system. In order to find out the relation among periodic solutions of thenonlinear dynamic system, this method introduces a scalax function which includes the globaltransient information, then the problem of periodic solutions is translated into a global (or local)optimization problem of this function. Using the Brussellator oscillator and a bearing-rotor systemajs examples, we get the T, 2T, 4T,' periodic solutions of these system. Some new phenomenonand results airs given in this paper. This paper offers some references for the problem of periodicsolutions structure of the nonlinear dynamic system.
Keywords:nonlinear  dynamic system  periodic solution  global  fixed point
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