English

Counting for rigidity under projective transformations in the plane

Combinatorics 2025-03-11 v1 Metric Geometry

Abstract

Let PP be a set of points and LL a set of lines in the (extended) Euclidean plane, and IP×LI \subseteq P\times L, where i=(p,l)Ii =(p,l) \in I means that point pp and line ll are incident. The incidences can be interpreted as quadratic constraints on the homogeneous coordinates of the points and lines. We study the space of incidence preserving motions of the given incidence structure by linearizing the system of quadratic equations. The Jacobian of the quadratic system, our projective rigidity matrix, leads to the notion of independence/dependence of incidences. Column dependencies correspond to infinitesimal motions. Row dependencies or self-stresses allow for new interpretations of classical geometric incidence theorems. We show that self-stresses are characterized by a 3-fold balance. As expected, infinitesimal (first order) projective rigidity as well as second order projective rigidity imply projective rigidity but not conversely. Several open problems and possible generalizations are indicated.

Keywords

Cite

@article{arxiv.2503.07228,
  title  = {Counting for rigidity under projective transformations in the plane},
  author = {Leah Wrenn Berman and Signe Lundqvist and Bernd Schulze and Brigitte Servatius and Herman Servatius and Klara Stokes and Walter Whiteley},
  journal= {arXiv preprint arXiv:2503.07228},
  year   = {2025}
}

Comments

21 pages, 20 figures

R2 v1 2026-06-28T22:13:53.238Z