When is a Planar Rod Configuration Infinitesimally Rigid?

Pub Date : 2023-12-19 DOI:10.1007/s00454-023-00617-7
Signe Lundqvist, Klara Stokes, Lars-Daniel Öhman
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Abstract

We investigate the rigidity properties of rod configurations. Rod configurations are realizations of rank two incidence geometries as points (joints) and straight lines (rods) in the Euclidean plane, such that the lines move as rigid bodies, connected at the points. Note that not all incidence geometries have such realizations. We show that under the assumptions that the rod configuration exists and is sufficiently generic, its infinitesimal rigidity is equivalent to the infinitesimal rigidity of generic frameworks of the graph defined by replacing each rod by a cone over its point set. To put this into context, the molecular conjecture states that the infinitesimal rigidity of rod configurations realizing 2-regular hypergraphs is determined by the rigidity of generic body and hinge frameworks realizing the same hypergraph. This conjecture was proven by Jackson and Jordán in the plane, and by Katoh and Tanigawa in arbitrary dimension. Whiteley proved a version of the molecular conjecture for hypergraphs of arbitrary degree that have realizations as independent body and joint frameworks. Our result extends his result to hypergraphs that do not necessarily have realizations as independent body and joint frameworks, under the assumptions listed above.

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什么情况下平面杆配置具有无限刚性?
我们研究杆构型的刚度特性。杆构型是欧几里得平面上点(连接点)和直线(杆)两个秩入射几何图形的实现,使得直线作为刚体运动,并在点处相连。请注意,并非所有入射几何图形都有这样的实现方式。我们证明,在杆构型存在且足够通用的假设下,其无穷小刚度等同于通过将每根杆替换为其点集上的圆锥而定义的图形通用框架的无穷小刚度。结合上下文,分子猜想指出,实现 2-regular 超图的杆配置的无穷小刚度是由实现相同超图的一般体和铰链框架的刚度决定的。杰克逊和乔丹在平面上证明了这一猜想,加藤和谷川在任意维度上证明了这一猜想。怀特利证明了分子猜想的一个版本,即任意度的超图都可以实现为独立的主体和铰链框架。我们的结果将他的结果扩展到了在上述假设条件下不一定以独立体和联合框架实现的超图。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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