English

Subgraph-universal planar graphs for trees

Combinatorics 2024-09-04 v1

Abstract

We show that there exists an outerplanar graph on O(nc)O(n^{c}) vertices for c=log2(3+10)2.623c = \log_2(3+\sqrt{10}) \approx 2.623 that contains every tree on nn vertices as a subgraph. This extends a result of Chung and Graham from 1983 who showed that there exist (non-planar) nn-vertex graphs with O(nlogn)O(n \log n) edges that contain all trees on nn vertices as subgraphs and a result from Gol'dberg and Livshits from 1968 who showed that there exists a universal tree for nn-vertex trees on nO(log(n))n^{O(\log(n))} vertices. Furthermore, we determine the number of vertices needed in the worst case for a planar graph to contain three given trees as subgraph to be on the order of 32n\frac{3}{2}n, even if the three trees are caterpillars. This answers a question recently posed by Alecu et al. in 2024. Lastly, we investigate (outer)planar graphs containing all (outer)planar graphs as subgraph, determining exponential lower bounds in both cases. We also construct a planar graph on nO(log(n))n^{O(\log(n))} vertices containing all nn-vertex outerplanar graphs as subgraphs.

Keywords

Cite

@article{arxiv.2409.01678,
  title  = {Subgraph-universal planar graphs for trees},
  author = {Helena Bergold and Vesna Iršič and Robert Lauff and Joachim Orthaber and Manfred Scheucher and Alexandra Wesolek},
  journal= {arXiv preprint arXiv:2409.01678},
  year   = {2024}
}

Comments

19 pages, 10 figures

R2 v1 2026-06-28T18:32:18.993Z