Rigidity for sticky disks
Abstract
We study the combinatorial and rigidity properties of disk packings with generic radii. We show that a packing of disks in the plane with generic radii cannot have more than pairs of disks in contact. The allowed motions of a packing preserve the disjointness of the disk interiors and tangency between pairs already in contact (modeling a collection of sticky disks). We show that if a packing has generic radii, then the allowed motions are all rigid body motions if and only if the packing has exactly contacts. Our approach is to study the space of packings with a fixed contact graph. The main technical step is to show that this space is a smooth manifold, which is done via a connection to the Cauchy-Alexandrov stress lemma. Our methods also apply to jamming problems, in which contacts are allowed to break during a motion. We give a simple proof of a finite variant of a recent result of Connelly, et al. on the number of contacts in a jammed packing of disks with generic radii.
Keywords
Cite
@article{arxiv.1809.02006,
title = {Rigidity for sticky disks},
author = {Robert Connelly and Steven J. Gortler and Louis Theran},
journal= {arXiv preprint arXiv:1809.02006},
year = {2019}
}
Comments
v2, edits for typographical errors and clarity of exposition. final version