刚柔耦合多体机械系统动力学微分方程组具有刚性和高频振荡的特点。
The dynamical equations of rigid flexible coupling multibody systems have characters of stiffness and high frequency oscillation.
文章的研究方法,为求解耦合的非线性微分方程组的行波精确解组探索了蹊径。
The research methods in this paper provide certain ways for obtaining the traveling wave accurate solutions of the coupling nonlinear differential equations.
看出,截谱模式方法的最大成功之处在于揭示了大气中多重平衡现象。 利用此法可将模式方程转化为耦合常微分方程组。
It is shown that, the method of truncated Spectral model clealy exhibits great excellence for establishment of the multiple equilibration phenomenon in the atmosphere.
通过变换,给出太阳帆板、航天器中心刚体耦合运动微分方程组。
By transformation, the differential equation group of couple motions of solar wings and the central rigid body of the spacecraft is obtained.
通过变换,给出太阳帆板、航天器中心刚体耦合运动微分方程组。
By transformation, the differential equation group of couple motions of solar wings and the central rigid body of the spacecraft is obtained.
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