English

Separating Matchings in Cubic Graphs

Combinatorics 2026-04-21 v1

Abstract

We study separating matchings in graphs, that is, matchings whose removal increases the number of connected components, and focus on determining the maximum size of such a matching in a graph GG, denoted by mms(G)\mathrm{mms}(G). We show that every subcubic graph admits a separating matching, except for exactly eight graphs, which allows us to focus on bounding mms(G)\mathrm{mms}(G) for cubic graphs. Our main results show that every cubic graph GG on nn vertices that admits a separating matching satisfies mms(G)n/22\mathrm{mms}(G) \ge n/2 - 2. For bipartite cubic graphs, assuming a conjecture of Funk, the problem reduces to a recursively defined class F\mathcal{F}, for which we prove that mms(G)n/21\mathrm{mms}(G) \ge n/2 - 1, up to four exceptional graphs. In contrast, we show that every claw-free cubic graph satisfies mms(G)=n/2\mathrm{mms}(G) = n/2. These results extend previous work on matching cuts and disconnected 22-factors, and provide the first systematic study of maximum separating matchings.

Keywords

Cite

@article{arxiv.2604.17226,
  title  = {Separating Matchings in Cubic Graphs},
  author = {Juan Gutiérrez and Renzo Gómez},
  journal= {arXiv preprint arXiv:2604.17226},
  year   = {2026}
}
R2 v1 2026-07-01T12:16:29.419Z