English

Non-separating Planar Graphs

Combinatorics 2019-07-24 v1

Abstract

A graph GG is a non-separating planar graph if there is a drawing DD of GG on the plane such that (1) no two edges cross each other in DD and (2) for any cycle CC in DD, any two vertices not in CC are on the same side of CC in DD. Non-separating planar graphs are closed under taking minors and are a subclass of planar graphs and a superclass of outerplanar graphs. In this paper, we show that a graph is a non-separating planar graph if and only if it does not contain K1K4K_1 \cup K_4 or K1K2,3K_1 \cup K_{2,3} or K1,1,3K_{1,1,3} as a minor. Furthermore, we provide a structural characterisation of this class of graphs. More specifically, we show that any maximal non-separating planar graph is either an outerplanar graph or a subgraph of a wheel or it can be obtained by subdividing some of the side-edges of the 1-skeleton of a triangular prism (two disjoint triangles linked by a perfect matching). Lastly, to demonstrate an application of non-separating planar graphs, we use the characterisation of non-separating planar graphs to prove that there are maximal linkless graphs with 3n33n-3 edges which provides an answer to a question asked by Horst Sachs about the number of edges of linkless graphs in 1983.

Keywords

Cite

@article{arxiv.1907.09817,
  title  = {Non-separating Planar Graphs},
  author = {Hooman R. Dehkordi and Graham Farr},
  journal= {arXiv preprint arXiv:1907.09817},
  year   = {2019}
}
R2 v1 2026-06-23T10:28:11.998Z