| 混沌振子的广义旋转数和同步混沌的Hopf分岔 |
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| 引用本文: | 马文麒,杨俊忠,刘文吉,包 刚,胡 岗.混沌振子的广义旋转数和同步混沌的Hopf分岔[J].物理学报,1999,48(5):787-794. |
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| 作者姓名: | 马文麒 杨俊忠 刘文吉 包 刚 胡 岗 |
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| 作者单位: | (1)北京师范大学物理系,北京 100875; (2)吉林师范学院物理系,吉林 132011; (3)郑州轻工学院基础部,郑州 450002 |
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| 基金项目: | 国家自然科学基金(批准号:19675008)和吉林省教委科学基金资助的课题. |
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| 摘 要: | 对应于混沌振子的各个Lyapunov指数,在切空间中定义了广义相位和广义旋转数.广义旋转数和Lyapunov指数相结合,可以更完整地描述混沌吸引子的各个运动模式的运动特征,包括伸缩与旋转.用耦合Duffing振子研究了时空混沌系统在同步混沌失稳时发生的分岔行为.结果表明,耦合振子的同步混沌态可以发生一种Hopf分岔,在Hopf分岔后,系统的功率谱中出现了一个特征频率,其值恰好等于分岔前临界横模的广义旋转数.
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| 关 键 词: | 混沌振子 广义旋转数 同步混沌 Hopf分岔 |
| 收稿时间: | 1998-09-24 |
GENERALIZED WINDING NUMBER OF CHAOTIC OSCILLATORS AND HOPF BIFURCATION FROM SYNCHRONOUS CHAOS |
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| MA WEN-QI,YANG JUN-ZHONG,LIU WEN-JI,BAO GANG and HU GANG.GENERALIZED WINDING NUMBER OF CHAOTIC OSCILLATORS AND HOPF BIFURCATION FROM SYNCHRONOUS CHAOS[J].Acta Physica Sinica,1999,48(5):787-794. |
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| Authors: | MA WEN-QI YANG JUN-ZHONG LIU WEN-JI BAO GANG and HU GANG |
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| Abstract: | In describing various modes of chaotic oscillators, generalized winding numbers are defined in tangent space corresponding to Lyapunov exponents of the chaotic attractor. Bifurcation behaviors from synchronous chaos of coupled Duffing oscillators are investigated using these concepts. The results show that a kind of Hopf bifurcation can take place from the synchronous chaotic state. Analysis of power spectrum indicates that the characteristic frequency created by the Hopf bifurcation is equal to the generalized winding number of the critical transverse modes just before the bifurcation. |
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