Symmetry, Cusp Bifurcation and Chaos of an Impact Oscillator Between Two Rigid Sides
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摘要: 讨论了一类单自由度双面碰撞振子的对称型周期n-2运动以及非对称型周期n-2运动.把映射不动点的分岔理论运用到该模型,并通过分析对称系统的Poincaré映射的对称性,证明了对称型周期运动只能发生音叉分岔.数值模拟表明:对称系统的对称型周期n-2运动,首先由一条对称周期轨道通过音叉分岔形成具有相同稳定性的两条反对称的周期轨道;随着参数的持续变化,两条反对称的周期轨道经历两个同步的周期倍化序列各自生成一个反对称的混沌吸引子.如果对称系统演变为非对称系统,非对称型周期n-2运动的分岔过程可用一个两参数开折的尖点分岔描述,音叉分岔将会演变为一支没有分岔的分支以及另外一个鞍结分岔的分支.Abstract: Both the symmetric period n-2 motion and asymmetric one of a one-degree-of-freedom impact oscillator were considered.The theory of bifurcations of the fixed point was applied to such model,and it was proved that the symmetric periodic motion only has pitchfork bifurcation by the analysis of the symmetry of the Poincar map.The numerical simulation shows that one symmetric periodic orbit could bifurcate into two antisymmetric ones via pitchfork bifurcation.While the control parameter changes continuously,the two antisymmetric periodic orbits will give birth to two synchronous antisymmetric period-doubling sequences,and bring about two antisymmetric chaotic attractors subsequently.If the symmetric system is transformed into asymmetric one,bifurcations of the asymmetric period n-2 motion can be described by a two-parameter unfolding of cusp,and the pitch-fork changes into one unbifurcated branch and one fold branch.
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Key words:
- periodic motion /
- Poincar?map /
- symmetry /
- pitchfork bifurcation /
- chaotic attractor /
- cusp
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