English

On cyclically 4-connected cubic graphs

Combinatorics 2021-12-17 v1

Abstract

For k4k \ge 4, let Q2kQ_{2k} and V2kV_{2k} denote the ladder and M\"obius ladder on 2k2k vertices, respectively. We prove results that build on a result by Wormald that states that any cyclically 44-connected cubic graph other than Q8Q_8 or V8V_8 is obtained from a smaller cyclically 44-connected cubic graph by bridging a pair of non-adjacent edges. We introduce the concept of cycle spread, which generalizes the edge pair distance defined by Wormald, and show that the set of pairs of edges that needs to be considered in order to obtain all cyclically 44-connected cubic graphs is smaller than the set of all pairs of non-adjacent edges. We prove that all non-planar cyclically 44-connected cubic graphs with at least 1010 vertices, other than the M\"obius ladders and the Petersen graph, are obtained from Q8Q_8 by bridging pairs of edges with cycle spread at least (1,2)(1,2). Moreover every graph obtained in this way is non-planar, cyclically 44-connected, and cubic. All planar cyclically 44-connected cubic graphs with at least 1010 vertices except for the ladders are obtained from the ladders by bridging pairs of edges with cycle spread at least (1,2)(1,2). We implemented an algorithm based on these results using McKay's nauty system for isomorphism checking.

Keywords

Cite

@article{arxiv.2112.08825,
  title  = {On cyclically 4-connected cubic graphs},
  author = {R. J. Kingan and S. R. Kingan},
  journal= {arXiv preprint arXiv:2112.08825},
  year   = {2021}
}

Comments

16 pages, 18 figures

R2 v1 2026-06-24T08:20:14.516Z