English

Separating path systems for cubic graphs and for complete bipartite graphs

Combinatorics 2026-03-24 v2

Abstract

A strongly separating path system in a graph GG is a collection P\mathcal{P} of paths in GG such that, for every two edges ee and ff of GG, there is a paths in P\mathcal{P} with ee and not ff, and vice-versa. The minimum number of such a system is the so called strong separation number of GG. We prove that the strong separation number of every 22-degenerate graph on nn vertices is at most nn. Using this, we also provide upper bounds for the strong separation number of subcubic graphs, planar graphs, and planar bipartite graphs. On the other hand, we prove that the strong separation number a complete bipartite graph Ka,bK_{a,b} is at least bb if a<b/2a<b/2 and at least (6(b/2)+42)a(\sqrt{6(b/2)+4}-2)a if b/2abb/2\leq a\leq b, and we provide a construction that attains the former bound.

Keywords

Cite

@article{arxiv.2511.12781,
  title  = {Separating path systems for cubic graphs and for complete bipartite graphs},
  author = {Cristina Fernandes and Carlos Hoppen and George Kontogeorgiou and Guilherme Oliveira Mota and Danni Peng},
  journal= {arXiv preprint arXiv:2511.12781},
  year   = {2026}
}

Comments

10 pages, 5 figures, final version published in Discrete Math

R2 v1 2026-07-01T07:40:07.572Z