对两激振器同一旋转轴线振动系统的自同步理论进行了研究。采用拉格朗日方法建立振动系统的运动微分方程。应用小参数平均法获得两激振器的无量纲耦合方程,进而将该类振动系统的同步问题简化为小参数无量纲耦合方程零解的存在性与稳定性问题。由无量纲耦合方程零解存在的条件得出了两激振器实现同步运动的同步性条件,并根据Routh-Hurwitz判据得到了两激振器同步运动的稳定性条件。分析振动系统选择运动特性可知,在远共振的情况下当激振器的旋转中心距离质心的距离大于机体的当量回转半径时,振动系统实现相位差为0度的空间圆周运动;反之,振动系统实现相位差为180度的空间圆锥运动。最后通过试验验证了理论分析的正确性。
Abstract
Self-synchronization theory of two exciters with the same rotational axis in a vibration system is studied. The motion equation of the vibration system is obtained by applying Lagrange equation. By introducing the average method of small parameters, the dimensionless coupling equation between the two exciters is deduced, which converts the synchronous problem of this type vibration system into the existence and stability of zero solutions for the dimensionless coupling equation. The synchronization condition of the two exciters carrying out synchronization motion is obtained from the existence of zero solutions, and the stability condition of that is acquired according to the principle of Routh-Hurwitz. From analyzing the selection motion characteristic of the vibration system, it is concluded that when the distance between the center of the exciter and the mass center of the vibration system is greater than the equivalent radius of the vibration system, the vibration system can carry out the spatial circle motion of the 0 degree phase difference, otherwise it can carry out the spatial cone motion of the 180 degree phase difference. Lastly, the correctness of theory analysis is verified by experiment.
关键词
自同步 /
同步性 /
稳定性 /
相位差
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Key words
self-synchronization /
synchronization condition /
synchronization stability /
phase difference
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参考文献
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