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谐和激励与有界噪声作用下具有同宿和异宿轨道的Duffing振子的混沌运动
引用本文:杨晓丽,徐伟,孙中奎. 谐和激励与有界噪声作用下具有同宿和异宿轨道的Duffing振子的混沌运动[J]. 物理学报, 2006, 55(4): 1678-1686
作者姓名:杨晓丽  徐伟  孙中奎
作者单位:(1)西北工业大学应用数学系,西安 710072; (2)西北工业大学应用数学系,西安 710072;陕西师范大学数学与信息科学学院,西安 710062
基金项目:中国科学院资助项目;陕西省自然科学基金;广东省博士启动基金;西北工业大学校科研和教改项目
摘    要:研究了具有同宿轨道、异宿轨道的双势阱Duffing振子在谐和激励与有界噪声摄动下的混沌运动.基于同宿分叉和异宿分叉,由Melnikov理论推导了系统出现混沌运动的必要条件及出现分形边界的充分条件.结果表明:当Wiener过程的强度参数大于某一临界值时,噪声增大了诱发混沌运动的有界噪声的临界幅值,相应地缩小了参数空间的混沌域,且产生混沌运动的临界幅值随着噪声强度的增大而增大.同时数值计算了最大Lyapunov指数,由最大Lyapunov指数为零从另一角度得到了系统出现混沌运动的有界噪声的临界幅值,发现在Wi关键词:混沌同宿和异宿分叉随机Melnikov方法最大Lyapunov指数

关 键 词:混沌  同宿和异宿分叉  随机Melnikov方法  最大Lyapunov指数
收稿时间:2004-12-28
修稿时间:2004-12-282005-12-09

Influence of harmonic and bounded noise excitations on chaotic motion of Duffing oscillator with homoclinic and heteroclinic orbits
Yang Xiao-Li,Xu Wei,Sun Zhong-Kui. Influence of harmonic and bounded noise excitations on chaotic motion of Duffing oscillator with homoclinic and heteroclinic orbits[J]. Acta Physica Sinica, 2006, 55(4): 1678-1686
Authors:Yang Xiao-Li  Xu Wei  Sun Zhong-Kui
Abstract:In this paper, the influence of harmonic and bounded noise excitations on the chaotic motion of a double well Duffing oscillator possessing both homoclinic and heteroclinic orbits is investigated. The criteria for occurrence of transverse intersection on the surface of homoclinic and heteroclinic orbits are derived by Melnikov theory, and are complemented by numerical calculations which display the bifurcation surfaces and the fractality of the basins of attraction. The results imply that the threshold amplitude of bounded noise for the onset of chaos moves upwards as the noise intensity increases beyond a critical value, which is further verified by numerically calculating the top Lyapunov exponents of the original system. Then we come to the conclusion that larger noise intensity results in smaller possible chaotic domain in the parameter space. The influence of bounded noise on Poincaré maps of the system response is also discussed, which indicates that when the noise intensity is less than some critical value, larger noise intensity results in larger area which the map occupies in the phase plane.
Keywords:chaos   homoclinic and heteroclinic bifurcations   random Melnikov method   top Lyapunov exponents
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