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研究了Van der Pol-Duffing振子在谐和与随机噪声联合激励下的参数主共振响应和稳定性问题。用多尺度法分离了系统的快变项,并求出了系统的最大Liapunov指数和稳态概率密度函数,还分析了失稳、分 叉和跳跃现象,讨论了系统的阻尼项、非线性项、随机项和确定性参激强度等参数对系统响应的影响。数值模拟表明所提出的方法是有效的。 相似文献
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设X1,...,Xn是一组独立的随机变量序列,设EXi=0,VarZi=μ2,i=1,2,...,n,其中μ2是待估参数,当Xi,i=1,2,...n给定后,分别用Dn=n∑i=1Vi(Xi-X)^2-1/nn∑i=1(Xi-X)^2及Un=n∑i=1(Xi-X)^2及Un=n∑i=1Vi(Xi-n∑i=1ViXi)^2-1/nn∑i-1(Xi-X)^2两种形式的随机加权分布来逼近Tn=1/nn∑ 相似文献
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利用摄动方法讨论了一类耦合二自由度非线性系统,在小强度白噪声参数激励下系统运动模态的稳定性,获得了系统扩散过程的稳态概率密度的渐近表达式,由此获得了系统运动模态几乎必然稳定的充分必要条件。 相似文献
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随机ARNOLD系统的稳定性与分叉 总被引:1,自引:1,他引:1
本文详细讨论了当n=2时Arnold系统在小强度的随机参数激励扰动下,系统的运动稳定性及分叉。为了研究系统响应的统计特性,本文使用了Markov近似技巧。在线性系统的情形,给出了系统矩稳定及样本稳定的充分必要条件。在非线性情形,本文的结果表明随机扰动可使系统的分叉点发生漂移 相似文献
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本文给出了变系数线性随机微分方程平凡解几乎片处渐近稳定的充分条件,本文的结果适用于变系数线性常向分方程组。 相似文献
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本文利用随机比较原理及随机向量李亚普诺夫函数构造方法,给出了一类非定常线性随机系统指数P稳定的简明判据。 相似文献
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The resonant response of a single-degree-of-freedom nonlinear vibro-impact oscillator with a one-sided barrier to a narrow-band random parametric excitation is investigated. The narrow-band random excitation used here is a bounded random noise. The analysis is based on a special Zhuravlev transformation, which reduces the system to one without impacts, thereby permitting the applications of random averaging over \"fast\" variables. The averaged equations are solved exactly and an algebraic equation of the amplitude of the response is obtained for the case without random disorder. The methods of linearization and moment are used to obtain the formula of the mean-square amplitude approximately for the case with random disorder. The effects of damping, detuning, restitution factor, nonlinear intensity, frequency and magnitude of random excitations are analysed. The theoretical analyses are verified by numerical results. Theoretical analyses and numerical simulations show that the peak response amplitudes will reduce at large damping or large nonlinear intensity and will increase with large amplitude or frequency of the random excitations. The phenomenon of stochastic jump is observed, that is, the steady-state response of the system will jump from a trivial solution to a large non-trivial one when the amplitude of the random excitation exceeds some threshold value, or will jump from a large non-trivial solution to a trivial one when the intensity of the random disorder of the random excitation exceeds some threshold value. 相似文献