English

Cubic graphs with colouring defect 3

Combinatorics 2023-10-03 v2

Abstract

The colouring defect of a cubic graph is the smallest number of edges left uncovered by any set of three perfect matchings. While 33-edge-colourable graphs have defect 00, those that cannot be 33-edge-coloured (that is, snarks) are known to have defect at least 33. In this paper we focus on the structure and properties of snarks with defect 33. For such snarks we develop a theory of reductions similar to standard reductions of short cycles and small cuts in general snarks. We prove that every snark with defect 33 can be reduced to a snark with defect 33 which is either nontrivial (cyclically 44-edge-connected and of girth at least 55) or to one that arises from a nontrivial snark of defect greater than 33 by inflating a vertex lying on a suitable 55-cycle to a triangle. The proofs rely on a detailed analysis of Fano flows associated with triples of perfect matchings leaving exactly three uncovered edges. In the final part of the paper we discuss application of our results to the conjectures of Berge and Fulkerson, which provide the main motivation for our research.

Keywords

Cite

@article{arxiv.2308.13639,
  title  = {Cubic graphs with colouring defect 3},
  author = {Ján Karabáš and Edita Máčajová and Roman Nedela and Martin Škoviera},
  journal= {arXiv preprint arXiv:2308.13639},
  year   = {2023}
}
R2 v1 2026-06-28T12:04:42.584Z