The displacement response variance of the rotor system under random excitation was investigated numerically by solving the variance equation.
通过求解方差方程,用数值方法对对随机激励作用下的转子系统的位移响应方差进行了研究。
A fundamental nonlinear motion equation about motor protein subject to random force and random potential is derived. The expression of the probability flux of this system was obtained.
考虑在随机力和随机势的共同作用下,建立了马达蛋白所满足的非线性运动方程,并得到了系统的几率流密度。
At last, based on the discrete state equation, two kinds of adaptive inverse control system were set up to control the acceleration of the countertop under the random excitation.
最后,借助于振动台的离散五刚体模型,将振动台的台面加速度作为控制目标,进行了复合实验系统在随机输入作用下的控制仿真。
A 4d dynamic model has been established for the vehicle suspension system. No-linear random vibration theory is used to discuss how to solve this equation by FPK based on filtered white noise input.
建立了四自由度车辆悬挂系统的动力学模型,并应用非线性随机振动理论,在对模型输入进行过滤白噪声简化的基础上,探讨了用FPK法解方程的可能途径。
A 4d dynamic model has been established for the vehicle suspension system. No-linear random vibration theory is used to discuss how to solve this equation by FPK based on filtered white noise input.
建立了四自由度车辆悬挂系统的动力学模型,并应用非线性随机振动理论,在对模型输入进行过滤白噪声简化的基础上,探讨了用FPK法解方程的可能途径。
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