广义坐标对系统动力学的影响

Altay Zhakatayev, Yuri V. Rogovchenko, M. Pätzold
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引用次数: 0

摘要

本文以单杆球摆为例,研究了广义坐标的选择对动力学系统行为模拟的影响。具体来说,我们将重点放在数值误差和模拟系统动力学所需的仿真时间上。应用拉格朗日方法求解运动方程。采用广义欧拉角作为GCs。GCs依赖于定义它们的轴的方向。因此,通过参数化这两个轴的方向,可以得到具有相应非线性微分方程组的不同gc集。对于球形摆,我们证明了使仿真时间最小的最优gc集合是正交集合。然而,与我们的期望相反,正交集并没有产生最小的模拟误差。此外,固有广义欧拉角比外在广义欧拉角的模拟速度更快。因此,从数值角度来看,不同的gc选择是不等价的,需要进一步研究如何选择最优的gc集合。
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Influence of Generalized Coordinates on System Dynamics
We investigate the effect of the choice of a set of generalized coordinates (GCs) on the simulation of the behavior of the dynamical system using the single-link spherical pendulum as an example. Specifically, we focus our attention on numerical errors and the simulation time necessary to simulate system dynamics. The Lagrangian method is applied to obtain the equations of motion. The generalized Euler angles are used as GCs. The GCs depend on the direction of the axes along which they are defined. Therefore, by parameterizing the directions of these two axes, different sets of GCs with the corresponding system of nonlinear differential equations are obtained. For a spherical pendulum, we demonstrate that the optimal sets of GCs leading to the minimum simulation time are orthogonal sets. However, contrary to our expectations, orthogonal sets do not result in the minimum simulation error. Additionally, the intrinsic generalized Euler angles lead to faster simulations than the extrinsic ones. Therefore, different choices of GCs are not equivalent from a numerical point of view and further research is needed to develop a strategy for selecting an optimal set of GCs.
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