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1.
参数激励与强迫激励联合作用下非线性振动系统的余维2退化分叉 总被引:4,自引:0,他引:4
在本文里我们首先研究了具有Z_2-对称性的范式理论和退化向量场的普适开折理论。然后利用上述理论研究了参数激励与强迫激励联合作用下非线性振动系统的余维2退化分叉,从而解决了当解具有两个零特征值时解的稳定性问题。最后利用Melnikov方法求出了参数平面上的同宿分叉曲线,讨论了全局分叉的存在性。 相似文献
2.
非线性参数激励系统的动力分叉研究 总被引:4,自引:0,他引:4
本文针对弹性梁动力曲屈分叉问题,建立了系统的非线性Mathiue方程,较全面地讨论了此类参数激励系统的1/2亚谐分叉特性,指出以往对此类问题的研究得到的只是一种退化情形下的分叉特性,阐述了分叉方程的截断对分叉结果的影响,得到了一些新的结果。文中还介绍了一个模型弹性梁系统分叉响应特性的实测结果,证实了理论分析的可靠性。 相似文献
3.
本文研究一类阻尼为线性,弹性恢复力为非线性的振动系统在随机外部激励作用下的随机分叉。文中采用广义稳态势和方法,求解系统响应的稳态联合概率密度函数。在此基础上根据由不变测度定义的随机分叉,讨论了具有权式分叉的确定性非线性系统在随机扰动下分叉行为。 相似文献
4.
考虑一端具有干摩擦的屈曲梁在轴向激励下的非线性振动系统,利用Floquet理论和谐波平衡法,研究了系统中初始屈曲度、阻尼、频率、激励振幅等各种物理参数对1/2业谐共振情况下倍周期分叉的影响,其规律与以往的数值模拟结果具有很好的一致性。 相似文献
5.
本文利用平均法研究了一类多频激励滞后非线性系统的组合共振,得到了该系统产生的组合共振分叉解,并讨论了该系统的奇异性,同时,本文还研究了系统参数对组合共振响应的影响,最后,数值仿真验证了本文结论的正确性。 相似文献
6.
本文应用Normal Form理论和退化向量场的普适开折理论研究了参数激励与强迫激励联合作用下非线性振动系统的余维2退化分叉,用Melnikov方法讨论了全局分叉的存在性. 相似文献
7.
一类强非线性振动系统的分叉 总被引:18,自引:0,他引:18
对于参数激励和强迫激励共同作用的一类强非线性系统,本文先用改进的L-P方法求出了变换参数,使该系统的解能展为小参数的幂级数.然后利用多尺度法求出了该系统的分叉响应方程.研究了这类强非线性系统的余维1分叉问题,画出了转迁集和分叉图 相似文献
8.
为了研究单自由度线性单边碰撞系统在有界随机噪声参数激励下的最大 Lyapunov 指数和稳定性问题,用 Zhuravlev 变换将碰撞系统转化为连续的非碰撞系统,然后用随机平均法得到了关于慢变量的随机微分方程。在没有随机扰动的情形下,给出了系统最大Lyapunov指数的值;在有随机扰动的情形下,通过求解FPK方程得到了系统的不变测度和最大Lyapunov指数的解析表达式。研究结果表明:随着系统阻尼项、有界随机噪声带宽、碰撞恢复系数的减少和有界随机噪声振幅的增大,最大Lyapunov指数增加;当随机激励的中心频率等于系统固有频率的两倍时,系统的Lyapunov指数达到最大,从而使系统变得更不稳定。根据系统的Lyapunov指数得到了系统稳定的充分必要条件,即当Lyapunov指数大于零时系统几乎必然不稳定,而当Lyapunov指数小于零时系统几乎必然稳定,Lyapunov指数等于零为系统的稳定性分叉点,并讨论了相应的稳定性分叉问题。 相似文献
9.
硬弹簧Duffing方程的全局分叉 总被引:4,自引:0,他引:4
唐建宁;刘永明;刘曾荣 《力学与实践》1987,9(1):33-37
本文采用Melnikov方法讨论硬弹簧系统在周期外激励与参数激励作用下的全局分叉,给出了相应的结论。 相似文献
10.
随机干扰与随机参数激励联合作用下的Hopf分叉 总被引:1,自引:0,他引:1
本文研究van der Pol-Duffing型的非线性振子在随机干扰和随机参数联合作用下的Hopf分叉现象。本文所得结果证实了当系统处在于Hopf分叉点附近时,对系统的参数的变化具有敏感性。在研究过程中,我们利用Markov扩散过程逼近系统的随机响应,得到了沿稳定矩的概率1稳定和矩稳定的条件。对于非线性振子,我们得到了振幅过程的稳态概论密度函数。研究发现,确定性系统的Hopf分叉点在随机参数作用下具有漂移现象,这种漂移是由系统的性质所决定的,当分叉点为超临界的,分叉点向前漂移;而当分叉点为亚临界时,这种漂移是向后的。当系统处在外部随机干扰作用下时,系统出现非零响应。另外我们发现,稳态矩的分叉与其阶数无关。 相似文献
11.
本文研究了非惯性参考系中弹性薄板在范围运动与变形运动相互耦合时的1/2亚谐共振分岔,在建立了该系统的动力学控制方程的基础上,利用多尺度法得到了参数激励与强迫激励联合作用下非惯性参考系中弹性薄板1/2亚谐共振时的分岔响应方程及其分岔集,讨论了该动力系统的稳定性,给出了它的五种分响应曲线。 相似文献
12.
13.
The nonlinear response of a two-degree-of-freedom nonlinear oscillating system to parametric excitation is examined for the
case of 1∶2 internal resonance and, principal parametric resonance with respect to the lower mode. The method of multiple
scales is used to derive four first-order autonomous ordinary differential equations for the modulation of the amplitudes
and phases. The steadystate solutions of the modulated equations and their stability are investigated. The trivial solutions
lose their stability through pitchfork bifurcation giving rise to coupled mode solutions. The Melnikov method is used to study
the global bifurcation behavior, the critical parameter is determined at which the dynamical system possesses a Smale horseshoe
type of chaos.
Project supported by the National Natural Science Foundation of China (19472046) 相似文献
14.
Local and global bifurcations of valve mechanism 总被引:3,自引:0,他引:3
In this paper we study in detail problems of nonlinear oscillations of valve mechanism at internal combustion engine. The practical measurement indicates that stiffness of valve mechanism is not constant but is a function of the rotational angle of the cam. For simplicity of analysis we replace valve mechanism of internal combustion engine with a nonlinear oscillator of single degree of freedom under combined parametric and forcing excitation. We use the method of multiple scales and normal form theory to study local and global bifurcations of valve mechanism at internal combustion engine. 相似文献
15.
J. C. Ji 《Nonlinear dynamics》2014,78(3):2161-2184
Stable bifurcating solutions may appear in an autonomous time-delayed nonlinear oscillator having quadratic nonlinearity after the trivial equilibrium loses its stability via two-to-one resonant Hopf bifurcations. For the corresponding non-autonomous time-delayed nonlinear oscillator, the dynamic interactions between the periodic excitation and the stable bifurcating solutions can induce resonant behaviour in the forced response when the forcing frequency and the frequencies of Hopf bifurcations satisfy certain relationships. Under hard excitations, the forced response of the time-delayed nonlinear oscillator can exhibit three types of secondary resonances, which are super-harmonic resonance at half the lower Hopf bifurcation frequency, sub-harmonic resonance at two times the higher Hopf bifurcation frequency and additive resonance at the sum of two Hopf bifurcation frequencies. With the help of centre manifold theorem and the method of multiple scales, the secondary resonance response of the time-delayed nonlinear oscillator following two-to-one resonant Hopf bifurcations is studied based on a set of four averaged equations for the amplitudes and phases of the free-oscillation terms, which are obtained from the reduced four-dimensional ordinary differential equations for the flow on the centre manifold. The first-order approximate solutions and the nonlinear algebraic equations for the amplitudes and phases of the free-oscillation terms in the steady state solutions are derived for three secondary resonances. Frequency-response curves, time trajectories, phase portraits and Poincare sections are numerically obtained to show the secondary resonance response. Analytical results are found to be in good agreement with those of direct numerical integrations. 相似文献
16.
Global Bifurcations and Chaotic Dynamics in Nonlinear Nonplanar Oscillations of a Parametrically Excited Cantilever Beam 总被引:1,自引:0,他引:1
This paper presents the analysis of the global bifurcations and chaotic dynamics for the nonlinear nonplanar oscillations of a cantilever beam subjected to a harmonic axial excitation and transverse excitations at the free end. The governing nonlinear equations of nonplanar motion with parametric and external excitations are obtained. The Galerkin procedure is applied to the partial differential governing equation to obtain a two-degree-of-freedom nonlinear system with parametric and forcing excitations. The resonant case considered here is 2:1 internal resonance, principal parametric resonance-1/2 subharmonic resonance for the in-plane mode and fundamental parametric resonance–primary resonance for the out-of-plane mode. The parametrically and externally excited system is transformed to the averaged equations by using the method of multiple scales. From the averaged equation obtained here, the theory of normal form is applied to find the explicit formulas of normal forms associated with a double zero and a pair of pure imaginary eigenvalues. Based on the normal form obtained above, a global perturbation method is utilized to analyze the global bifurcations and chaotic dynamics in the nonlinear nonplanar oscillations of the cantilever beam. The global bifurcation analysis indicates that there exist the heteroclinic bifurcations and the Silnikov type single-pulse homoclinic orbit in the averaged equation for the nonlinear nonplanar oscillations of the cantilever beam. These results show that the chaotic motions can occur in the nonlinear nonplanar oscillations of the cantilever beam. Numerical simulations verify the analytical predictions. 相似文献
17.
The bifurcation analysis of a simple electric power system involving two synchronous generators connected by a transmission network to an infinite-bus is carried out in this paper. In this system, the infinite-bus voltage are considered to maintain two fluctuations in the amplitude and phase angle. The case of 1:3 internal resonance between the two modes in the presence of parametric principal resonance is considered and examined. The method of multiple scales is used to obtain the bifurcation equations of this system. Then, by employing the singularity method, the transition sets determining different bifurcation patterns of the system are obtained and analyzed, which reveal the effects of the infinite-bus voltage amplitude and phase fluctuations on bifurcation patterns of this system. Finally, the bifurcation patterns are all examined by bifurcation diagrams. The results obtained in this paper will contribute to a better understanding of the complex nonlinear dynamic behaviors in a two-machine infinite-bus (TMIB) power system. 相似文献
18.
Principal parametric and three-to-one internal resonances of flexible beams undergoing a large linear motion 总被引:7,自引:0,他引:7
A set of nonlinear differential equations is established by using Kane‘s method for the planar oscillation of flexible beams undergoing a large linear motion. In the case of a simply supported slender beam under certain average acceleration of base, the second natural frequency of the beam may approximate the tripled first one so that the condition of 3 : 1 internal resonance of the beam holds true. The method of multiple scales is used to solve directly the nonlinear differential equations and to derive a set of nonlinear modulation equations for the principal parametric resonance of the first mode combined with 3 : 1 internal resonance between the first two modes. Then, the modulation equations are numerically solved to obtain the steady-state response and the stability condition of the beam. The abundant nonlinear dynamic behaviors, such as various types of local bifurcations and chaos that do not appear for linear models, can be observed in the case studies. For a Hopf bifurcation,the 4-dimensional modulation equations are reduced onto the central manifold and the type of Hopf bifurcation is determined. As usual, a limit cycle may undergo a series of period-doubling bifurcations and become a chaotic oscillation at last. 相似文献