English

Flipping Plane Spanning Paths

Computational Geometry 2022-09-29 v2

Abstract

Let SS be a planar point set in general position, and let P(S)\mathcal{P}(S) be the set of all plane straight-line paths with vertex set SS. A flip on a path PP(S)P \in \mathcal{P}(S) is the operation of replacing an edge ee of PP with another edge ff on SS to obtain a new valid path from P(S)\mathcal{P}(S). It is a long-standing open question whether for every given point set SS, every path from P(S)\mathcal{P}(S) can be transformed into any other path from P(S)\mathcal{P}(S) by a sequence of flips. To achieve a better understanding of this question, we show that it is sufficient to prove the statement for plane spanning paths whose first edge is fixed. Furthermore, we provide positive answers for special classes of point sets, namely, for wheel sets and generalized double circles (which include, e.g., double chains and double circles).

Keywords

Cite

@article{arxiv.2202.10831,
  title  = {Flipping Plane Spanning Paths},
  author = {Oswin Aichholzer and Kristin Knorr and Wolfgang Mulzer and Johannes Obenaus and Rosna Paul and Birgit Vogtenhuber},
  journal= {arXiv preprint arXiv:2202.10831},
  year   = {2022}
}
R2 v1 2026-06-24T09:49:32.442Z