Closed polylines with fixed self-intersection index
Metric Geometry
2026-05-19 v3
Abstract
We investigate the existence of closed polylines (also known as closed polygonal chains or self-crossing polygons) that intersect each of their edges the same number of times. The most general question in this corner of combinatorial geometry asks for all pairs such that there exists a closed polyline with edges, each intersecting the same polyline exactly times. For and , this is a very simple question answered several decades ago. In this article, we present a complete solution for , as well as the proof of some non-existence theorems. In conclusion, we show that, for an arbitrary positive integer , a polyline of the required type exists for any sufficiently large integer such that is even.
Cite
@article{arxiv.2605.05506,
title = {Closed polylines with fixed self-intersection index},
author = {Dmitri Fomin},
journal= {arXiv preprint arXiv:2605.05506},
year = {2026}
}