弹性吊衣

Alessandro Cazzolli, Francesco Dal Corso
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引用次数: 0

摘要

本文分析了边缘受一对滑动套筒约束的柔性弹性杆的非线性力学。研究发现,这种可变长度弹性体的平面平衡构型的形状仅由两个约束的倾角决定,而它们之间的距离仅负责缩放尺寸。通过将等距约束下系统的理论稳定性标准扩展到变域情况,揭示了不存在一个以上的稳定平衡解。确定了失去稳定性的滑动套筒倾斜对的集合。最后,在物理原型上进行的实验验证了理论结论。目前的研究结果提出了一种新的驱动原理,它可能会作为一种机制应用于能量收集、减波装置和软机器人运动中。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
The elastica sling
The nonlinear mechanics of a flexible elastic rod constrained at its edges by a pair of sliding sleeves is analyzed. The planar equilibrium configurations of this variable-length elastica are found to have shape defined only by the inclination of the two constraints, while their distance is responsible only for scaling the size. By extending the theoretical stability criterion available for systems under isoperimetric constraints to the case of variable domains, the existence of no more than one stable equilibrium solution is revealed. The set of sliding sleeves' inclination pairs for which the stability is lost are identified. Such critical conditions allow the indefinite ejection of the flexible rod from the sliding sleeves, thus realizing an elastica sling. Finally, the theoretical findings are validated by experiments on a physical prototype. The present results lead to a novel actuation principle that may find application as a mechanism in energy harvesting, wave mitigation devices, and soft robotic locomotion.
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