Nucleation-free $3D$ rigidity

TL;DR

This paper introduces methods to construct nucleation-free graphs with implied non-edges in 3D rigidity, advancing understanding of rigid graph characterization and providing new inductive constructions for independent graphs.

Contribution

It presents general inductive schemes for generating nucleation-free graphs with implied non-edges and constructs new 3D rigidity circuits and independent graphs.

Findings

Dependent graphs in 3D without nucleation identified

New inductive construction for independent graphs in 3D

Demonstrates rigidity is stronger than existing tractable approximations

Abstract

When all non-edge distances of a graph realized in $\mathbb{R}^{d}$ as a {\em bar-and-joint framework} are generically {\em implied} by the bar (edge) lengths, the graph is said to be {\em rigid} in $\mathbb{R}^{d}$. For $d=3$, characterizing rigid graphs, determining implied non-edges and {\em dependent} edge sets remains an elusive, long-standing open problem. One obstacle is to determine when implied non-edges can exist without non-trivial rigid induced subgraphs, i.e., {\em nucleations}, and how to deal with them. In this paper, we give general inductive construction schemes and proof techniques to generate {\em nucleation-free graphs} (i.e., graphs without any nucleation) with implied non-edges. As a consequence, we obtain (a) dependent graphs in $3D$ that have no nucleation; and (b) $3D$ nucleation-free {\em rigidity circuits}, i.e., minimally dependent edge sets in $d=3$. It additionally follows that true rigidity is strictly stronger than a tractable approximation to rigidity given by Sitharam and Zhou \cite{sitharam:zhou:tractableADG:2004}, based on an inductive combinatorial characterization. As an independently interesting byproduct, we obtain a new inductive construction for independent graphs in $3D$. Currently, very few such inductive constructions are known, in contrast to $2D$.