Thrackles on nonplanar surfaces
Abstract
A thrackle is a drawing of a graph on a surface such that (i) adjacent edges only intersect at their common vertex; and (ii) nonadjacent edges intersect at exactly one point, at which they cross. Conway conjectured that if a graph with vertices and edges can be thrackled on the plane, then . Conway's conjecture remains open; the best bound known is that . Cairns and Nikolayevsky extended this conjecture to the orientable surface of genus , claiming that if a graph with vertices and edges has a thrackle on , then . We disprove this conjecture. In stark contrast with the planar case, we show that for each there is a connected graph with vertices and edges that can be thrackled on . This leaves relatively little room for further progress involving thrackles on orientable surfaces, as every connected graph with vertices and edges that can be thrackled on satisfies that . We prove a similar result for nonorientable surfaces. We also derive nontrivial upper and lower bounds on the minimum such that and can be thrackled on .
Keywords
Cite
@article{arxiv.2506.11808,
title = {Thrackles on nonplanar surfaces},
author = {César Hernández-Vélez and Jan Kynčl and Gelasio Salazar},
journal= {arXiv preprint arXiv:2506.11808},
year = {2025}
}