English

Strong convexity in flip-graphs

Geometric Topology 2021-09-14 v2 Combinatorics

Abstract

The triangulations of a surface Σ\Sigma with a prescribed set of vertices can be endowed with a graph structure F(Σ)\mathcal{F}(\Sigma). Its edges connect two triangulations that differ by a single arc. It is known that, when Σ\Sigma is a convex polygon or a topological surface, the subgraph Fε(Σ)\mathcal{F}_\varepsilon(\Sigma) induced in F(Σ)\mathcal{F}(\Sigma) by the triangulations that contain a given arc ε\varepsilon is strongly convex in the sense that all the geodesic paths between two such triangulations remain in that subgraph. Here, we provide a related result that involves a triangle instead of an arc, in the case when Σ\Sigma is a convex polygon. We show that, when the three edges of a triangle τ\tau appear in (possibly distinct) triangulations along a geodesic path, τ\tau must belong to a triangulation in that path. More generally, we prove that certain 33-dimensional triangulations related to the geodesics in F(Σ)\mathcal{F}(\Sigma) are flag when Σ\Sigma is a convex polygon with flat vertices, and provide two consequences. The first is that Fε(Σ)\mathcal{F}_\varepsilon(\Sigma) is not always strongly convex when Σ\Sigma is a convex polygon with either two flat vertices or two punctures. The second is that the number of arc crossings between two triangulations of a topological surface Σ\Sigma does not allow to approximate their distance in F(Σ)\mathcal{F}(\Sigma) by a factor of less than 3/23/2.

Keywords

Cite

@article{arxiv.2106.08012,
  title  = {Strong convexity in flip-graphs},
  author = {Lionel Pournin and Zili Wang},
  journal= {arXiv preprint arXiv:2106.08012},
  year   = {2021}
}

Comments

56 pages, 23 figures

R2 v1 2026-06-24T03:12:52.384Z