共查询到18条相似文献,搜索用时 140 毫秒
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本文利用sine-Gordon方程的广义渐近惯性流形上的常微分方程,证明了在一定参数条件下存在多重脉动跳跃轨道,本工作与先前工作(1-4)证实可用sine-Gorodn方程的有限维形式来讨论其的动力学行为。 相似文献
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非惯性参考系中弹性薄板动力系统在纵横振动相互耦合时的全局分岔及混沌性质 总被引:3,自引:0,他引:3
讨论非惯性参考系中弹性薄板动力系统1∶1内共振时的全局分岔及其混沌性质.首先对系统的奇点进行了分析,进而得到了奇点附近同宿轨的参数方程,再用Melnikov方法研究了系统的同宿轨分岔及其混沌运动.研究表明,对各种不同共振情形,系统将由同宿轨分岔过渡到混沌运动.最后用数值仿真证实了理论分析的结果. 相似文献
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非惯性参考系中弹性薄板动力系统在纵横振动相互耦合时的全局分 … 总被引:2,自引:0,他引:2
讨论非惯性参考系中弹性薄板动力系统1:1内共振时的全局分岔及其混沌性质。首先对系统的奇点进行了分析,进而得到了奇点附近同宿轨的参数方程,再用Melinikov方法研究了系统的同宿轨分岔及其混沌运动。研究表明,对各种不同共振情形,系统将由同宿轨分岔过渡到混沌运动。最后用数值仿真证实了理论分析的结果。 相似文献
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IntroductionAsearlyas1895,Blackstudiedthephysicalbehaviorofhumanteeth[1].Since1950thestudies Fig.1onmechanicalpropertiesofhumanteethhaveappearedinjournalsandmagazinessuccessively[2~13].Humanteethareverysmallandthespecimensusedfortestingareevensmaller… 相似文献
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促进其线性频散特征另一种形式的Bousinesq方程 总被引:5,自引:1,他引:5
Bousinesq方程能够用于模拟表面重力波传播过程中的折射、绕射、反射以及浅化,非线性作用等现象.用不同垂直积分方法所得到的二维Boussinesq方程形式具有不同的线性频散特征.采用两个不同的水深层的水平速度变量组合,推导出一个新形式的Bousinesq方程.通过对其参数的设置可得到精确的线性频散解Pade近似4阶精度.其适用范围已由原来的浅水,向深水拓进.相速误差小于2%,其拓展适用范围可达到08个波长水深.应用所得到的新型Bousinesq方程,采用有限差分法,对经典工况进行了数值模拟,其计算结果表明,计算值与物模实验值吻合较好.这说明本文新形式的Boussinesq方程对变水深非线性效应所产生的能量频散有着较为精确的描述 相似文献
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促进其线性频散特征另一种形式的Bousinesq方程 总被引:1,自引:0,他引:1
Bousinesq方程能够用于模拟表面重力波传播过程中的折射、绕射、反射以及浅化,非线性作用等现象.用不同垂直积分方法所得到的二维Boussinesq方程形式具有不同的线性频散特征.采用两个不同的水深层的水平速度变量组合,推导出一个新形式的Bousinesq方程.通过对其参数的设置可得到精确的线性频散解Pade近似4阶精度.其适用范围已由原来的浅水,向深水拓进.相速误差小于2%,其拓展适用范围可达到08个波长水深.应用所得到的新型Bousinesq方程,采用有限差分法,对经典工况进行了数值模拟,其计算结果表明,计算值与物模实验值吻合较好.这说明本文新形式的Boussinesq方程对变水深非线性效应所产生的能量频散有着较为精确的描述 相似文献
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sine—Gordon方程的动力学行为讨论 总被引:1,自引:0,他引:1
本文以sine-Cordon方程为全了把无穷维动力系统理论和非一动力学方法结合起来讨论无穷维动力学系统的动力学行为的一种方法,首先证明了有限维广义渐惯性流形的存在性。然后给出了该流形上常微分方程组,且讨论了解的不变子空间结构。最后用摄动和数值计算讨论了动力学行为,所得结果与(6)所得的一致。这种方法也许为时军蝗分析提供了一条有效途径 相似文献
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奇妙的软弹簧──Slinky刘延柱(上海交通大学工程力学系,上海200030)半个世纪以前美国人R.T.James发现,在极软的弹簧上可以观察到十分奇异的力学现象.他将这种弹簧称作Slinky;并于1947年作为一种新奇玩具正式申请了发明专利[1].... 相似文献
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We consider an autoparametric system consisting of an oscillator coupled with an externally excited subsystem. The oscillator and the subsystem are in one-to-one internal resonance. The excited subsystem is in primary resonance. The method of second-order averaging is used to obtain a set of autonomous equations of the second-order approximations to the externally excited system with autoparametric resonance. The Šhilnikov-type homoclinic orbits and chaotic dynamics of the averaged equations are studied in detail. The global bifurcation analysis indicates that there exist the heteroclinic bifurcations and the Šhilnikov-type homoclinic orbits in the averaged equations. The results obtained above mean the existence of the amplitude-modulated chaos for the Smale horseshoe sense in the externally excited system with autoparametric resonance. Furthermore, a detailed bifurcation analysis of the dynamic (periodic and chaotic) solutions of the averaged equations is presented. Nine branches of dynamic solutions are found. Two of these branches emerge from two Hopf bifurcations and the other seven are isolated. The limit cycles undergo symmetry-breaking, cyclic-fold and period-doubling bifurcations, whereas the chaotic attractors undergo attractor-merging and boundary crises. Simultaneous occurrence of the limit cycle and chaotic attractors, homoclinic orbits, intermittency chaos and homoclinic explosions are also observed. 相似文献
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Nonlinear Dynamics - We study the multi-pulse jumping double-parameter homoclinic orbits and chaotic dynamics of the eccentric rotating ring truss antenna under combined the parametric and external... 相似文献
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The multi-pulse homoclinic orbits and chaotic dynamics for an axially moving viscoelastic beam are investigated in the case of 1:2 internal resonance. On the basis of the modulation equations derived by the method of multiple scales, the theory of normal form is utilized to find the explicit formulas of normal form associated with a double zero and a pair of pure imaginary eigenvalues. The energy-phase method is employed to analyze the global bifurcations for the axially moving viscoelastic beam. The results obtained here indicate that there exist the Silnikov-type multi-pulse orbits homoclinic to certain invariant sets for the resonant case, leading to chaos in the system. Homoclinic trees which describe the repeated bifurcations of multi-pulse solutions are found. To illustrate the theoretical predictions, we present visualizations of these complicated structures. 相似文献
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Sliding dynamics is a peculiar phenomenon to discontinuous dynamical systems, while homoclinic orbits play a role in studying the global dynamics of dynamical systems. This paper provides a method to ensure the existence of sliding homoclinic orbits of three-dimensional piecewise affine systems. In addition, sliding cycles are obtained by bifurcations of the systems with sliding homoclinic orbits to saddles. Two examples with simulations of sliding homoclinic orbits and sliding cycles are provided to illustrate the effectiveness of the results.
相似文献15.
Global bifurcations and multi-pulse chaotic dynamics for a simply supported rectangular thin plate are studied by the extended Melnikov method.The rectangular thin plate is subject to transversal and in-plane excitation.A two-degree-of-freedom nonlinear nonautonomous system governing equations of motion for the rectangular thin plate is derived by the von Karman type equation and the Galerkin approach.A one-toone internal resonance is considered.An averaged equation is obtained with a multi-scale method.After transforming the averaged equation into a standard form,the extended Melnikov method is used to show the existence of multi-pulse chaotic dynamics,which can be used to explain the mechanism of modal interactions of thin plates.A method for calculating the Melnikov function is given without an explicit analytical expression of homoclinic orbits.Furthermore,restrictions on the damping,excitation,and detuning parameters are obtained,under which the multi-pulse chaotic dynamics is expected.The results of numerical simulations are also given to indicate the existence of small amplitude multi-pulse chaotic responses for the rectangular thin plate. 相似文献
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The global bifurcations and multi-pulse orbits of an aero-thermo-elastic functionally graded material (FGM) truncated conical shell under complex loads are investigated with the case of 1:2 internal resonance and primary parametric resonance. The method of multiple scales is utilized to obtain the averaged equations. Based on the averaged equations obtained, the normal form theory is employed to find the explicit expressions of normal form associated with a double zero and a pair of pure imaginary eigenvalues. The energy-phase method developed by Haller and Wiggins is used to analyze the multi-pulse homoclinic bifurcations and chaotic dynamics of the FGM truncated conical shell. The analytical results obtained here indicate that there exist the multi-pulse Shilnikov-type homoclinic orbits for the resonant case which may result in chaos in the system. Homoclinic trees which describe the repeated bifurcations of multi-pulse solutions are found. The diagrams show a gradual breakup of the homoclinic tree in the system as the dissipation factor is increased. Numerical simulations are presented to illustrate that for the FGM truncated conical shell, the multi-pulse Shilnikov-type chaotic motions can occur. The influence of the structural-damping, the aerodynamic-damping, and the in-plane and transverse excitations on the system dynamic behaviors is also discussed by numerical simulations. The results obtained here mean the existence of chaos in the sense of the Smale horseshoes for the FGM truncated conical shell. 相似文献
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The global bifurcations and chaotic dynamics of a thin rectangular plate on a nonlinear elastic foundation subjected to a harmonic excitation are investigated. On the basis of the amplitude and phase modulation equations derived by the method of multiple scales, a near integrable two-degree-of-freedom Hamiltonian system is obtained by a transformation. The energy-phase method proposed by Haller and Wiggins is employed to analyze the global bifurcations for the thin rectangular plate. The results obtained here indicate that there exist the Silnikov-type multi-pulse orbits homoclinic to certain invariant sets for the resonant case, which implies that chaotic motions may occur for this class of systems. Homoclinic trees which describe the repeated bifurcations of multi-pulse solutions are found. To illustrate the theoretical predictions, we present visualizations of these complicated structures and numerical evidence of chaotic motions. 相似文献
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We consider an autoparametric system which consists of an oscillator coupled with a parametrically excited subsystem. The oscillator and the subsystem are in one-to-one internal resonance. The excited subsystem is in principal parametric resonance. The system contains the most general type of quadratic and cubic non-linearities. The method of second-order averaging is used to yield a set of autonomous equations of the second-order approximations to the parametric excited system with autoparametric resonance. The Shilnikov-type multi-pulse orbits and chaotic dynamics of the averaged equations are studied in detail. The global bifurcation analysis indicates that there exist the heteroclinic bifurcations and the Shilnikov-type multi-pulse homoclinic orbits in the averaged equations. The results obtained above mean the existence of amplitude-modulated chaos in the Smale horseshoe sense in the parametric excited system with autoparametric resonance. The Shilnikov-type multi-pulse chaotic motions of the parametric excited system with autoparametric resonance are also found by using numerical simulation. 相似文献