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线性碰振系统周期解擦边分岔的一类映射分析方法

Analysis to grazing bifurcation in linear vibro-impact system with N-dimensions

  • 摘要: 擦边分岔是碰振机械系统的一种重要分岔行为. 以固定相位面作为Poincaré截面,建立了线性碰振系统单碰周期n运动的Poincaré映射. 通过分析该映射,得到了系统发生擦边分岔的条件和分岔方程,并以单自由度碰振系统为实例验证了分析结果的正确性.该方法不仅可以计算线性碰振系统擦边分岔的参数值,还可以计算系统的任意周期n解的分岔参数值.

     

    Abstract: Grazing bifurcation is an important dynamical behavior ofa vibro-impact system and is usually analyzed by choosing the impact plane as thePoincar\'e section. However, this plane sometimes does not meet thetransverse intersection condition of Poincar\'e section, especially whilegrazing motion or chaos take place. Moreover, the bifurcation of impactnumber instead of period of the motion is considered in former cases. Thebifurcations with time evolution are more attractive for a vibro-impactsystem.In this paper, the Poincar\'e map of period-n motions with single-impactis set up for a linear vibro-impact system by using a fixed phase plane asthe Poincar\'e section here. Based on analysis of the Poincar\'e map,the grazing bifurcation conditions and bifurcation equations are determinedfor the vibro-impact system, and a vibro-impact system with single DOF isused as an example to testify the obtained analytical result. A numericalsimulation is carried out for the bifurcation diagram of the vibro-impactsystem, which agrees with analytical results very well. This method canbe used tocalculate not only the parameters of grazing bifurcation, but also those ofany period-n motions, for a linear vibro-impact system.

     

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