English

Bipartite Rigidity

Combinatorics 2014-07-15 v3 Metric Geometry

Abstract

We develop a bipartite rigidity theory for bipartite graphs parallel to the classical rigidity theory for general graphs, and define for two positive integers k,lk,l the notions of (k,l)(k,l)-rigid and (k,l)(k,l)-stress free bipartite graphs. This theory coincides with the study of Babson--Novik's balanced shifting restricted to graphs. We establish bipartite analogs of the cone, contraction, deletion, and gluing lemmas, and apply these results to derive a bipartite analog of the rigidity criterion for planar graphs. Our result asserts that for a planar bipartite graph GG its balanced shifting, GbG^b, does not contain K3,3K_{3,3}; equivalently, planar bipartite graphs are generically (2,2)(2,2)-stress free. We also discuss potential applications of this theory to Jockusch's cubical lower bound conjecture and to upper bound conjectures for embedded simplicial complexes.

Keywords

Cite

@article{arxiv.1312.0209,
  title  = {Bipartite Rigidity},
  author = {Gil Kalai and Eran Nevo and Isabella Novik},
  journal= {arXiv preprint arXiv:1312.0209},
  year   = {2014}
}

Comments

Improved presentation, figure added, proof of the Deletion Lemma corrected, to appear in Trans. Amer. Math. Soc

R2 v1 2026-06-22T02:18:20.116Z