| Sine-Gordon方程的截断系统的同宿轨道 |
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| 引用本文: | 徐振源,刘曾荣.Sine-Gordon方程的截断系统的同宿轨道[J].力学学报,1998,30(3):292-299. |
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| 作者姓名: | 徐振源 刘曾荣 |
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| 作者单位: | 无锡,江南大学数学物理研究所,214036 |
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| 摘 要: | 研究Sine Gordon方程的广义渐近惯性流形上的常微分方程组,证实了在一定参数条件下存在Wiggins[1]意义下的同宿轨道.计算表明,与Bishop[2]用数值计算得到的Sine Gordon方程产生混沌的参数值尚有差别,考虑到同宿出现参数值往往低于混沌出现参数值,故结果在定性上正确,而且改进了文[1]中的结果.
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| 关 键 词: | 无穷维 动力系统 S-G方程 同宿轨道 非线性 |
HOMOCLINIC ORBITS OF THE TRUNCATED SYSTEMS OF SINE-GORDON EQUATION 1) |
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| Xu Zhenyuan.HOMOCLINIC ORBITS OF THE TRUNCATED SYSTEMS OF SINE-GORDON EQUATION 1)[J].chinese journal of theoretical and applied mechanics,1998,30(3):292-299. |
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| Authors: | Xu Zhenyuan |
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| Abstract: | In this paper the existence of the homoclinic orbits defined by Wiggins is proved, by use of ODE on the generalized asymptotic inertial manifold for the Sine Gordon equation. We give explicit conditions (in terms of the system parameters) for the model to possess a symmetric pair of homoclinic orbits to a fixed of saddle focus type, chaotic dynamics follow from a theorem of Silnikov. This provides a mechnism for chaotic dynamics geometrically similar to that observed by Bishop et al.,namely, a random... |
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| Keywords: | Infinite dimensional dynamical systems generalized asymptotic inertial manifolds homoclinic orbits chaos |
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