中文

Rerouting Curves on Surfaces

计算几何 2026-07-06 v1 几何拓扑

摘要

We study the problem of reconfiguring a crossing-free embedding of a graph on a surface, with edges represented as curves, into another crossing-free embedding of the same graph on the same surface with the same fixed vertex positions. In this process, we reroute one edge at a time while maintaining crossing-free intermediate embeddings. This problem was introduced by Ito et al. [TALG 2025], who showed that even if the graph is a matching of two edges, reconfiguration is not always possible in the plane, but is always possible on the torus. For matchings of two or more edges, they gave a necessary and sufficient condition for reconfigurable embeddings in the plane, but not on the torus. Our main result is that for matchings, trees and forests, reconfiguration is always possible on the torus, and consequently, on any orientable surface of genus at least one. In addition, we provide sufficient conditions for reconfiguration on orientable surfaces of genus at least one and in the projective plane. For more general graphs, we show that reconfiguration is not always possible.

引用

@article{arxiv.2607.05362,
  title  = {Rerouting Curves on Surfaces},
  author = {Timo Brand and Stefan Felsner and Henry Förster and Stephen Kobourov and Anna Lubiw and Yoshio Okamoto and János Pach and Csaba D. Tóth and Géza Tóth and Torsten Ueckerdt and Pavel Valtr},
  journal= {arXiv preprint arXiv:2607.05362},
  year   = {2026}
}