English

Rigid partitions: from high connectivity to random graphs

Combinatorics 2023-12-13 v2

Abstract

A graph is called dd-rigid if there exists a generic embedding of its vertex set into Rd\mathbb{R}^d such that every continuous motion of the vertices that preserves the lengths of all edges actually preserves the distances between all pairs of vertices. The rigidity of a graph is the maximal dd such that the graph is dd-rigid. We present new sufficient conditions for the dd-rigidity of a graph in terms of the existence of ``rigid partitions'' -- partitions of the graph that satisfy certain connectivity properties. This extends previous results by Crapo, Lindemann, and Lew, Nevo, Peled and Raz. As an application, we present new results on the rigidity of highly-connected graphs, random graphs, random bipartite graphs, pseudorandom graphs, and dense graphs. In particular, we prove that random CdlogdC d\log d-regular graphs are typically dd-rigid, demonstrate the existence of a giant dd-rigid component in sparse random binomial graphs, and show that the rigidity of relatively sparse random binomial bipartite graphs is roughly the same as that of the complete bipartite graph, which we consider an interesting phenomenon. Furthermore, we show that a graph admitting (d+12)\binom{d+1}{2} disjoint connected dominating sets is dd-rigid. This implies a weak version of the Lov\'asz--Yemini conjecture on the rigidity of highly-connected graphs. We also present an alternative short proof for a recent result by Lew, Nevo, Peled, and Raz, which asserts that the hitting time for dd-rigidity in the random graph process typically coincides with the hitting time for minimum degree dd.

Keywords

Cite

@article{arxiv.2311.14451,
  title  = {Rigid partitions: from high connectivity to random graphs},
  author = {Michael Krivelevich and Alan Lew and Peleg Michaeli},
  journal= {arXiv preprint arXiv:2311.14451},
  year   = {2023}
}

Comments

30 pages. In this updated version, we have added a theorem concerning the rigidity of dense graphs and incorporated references to Vill\'anyi's recent resolution of the Lov\'asz-Yemini conjecture

R2 v1 2026-06-28T13:30:23.279Z