Counting Small Cycle Double Covers
Abstract
A theorem due to Seyffarth states that every planar -connected -vertex graph has a cycle double cover (CDC) containing at most cycles (a "small" CDC). We extend this theorem by proving that, in fact, such a graph must contain linearly many small CDCs (in terms of ), and provide stronger results in the case of planar -connected triangulations. We complement this result with constructions of planar -connected graphs which contain at most polynomially many small CDCs. Thereafter we treat cubic graphs, strengthening a lemma of Hu\v{s}ek and \v{S}\'amal on the enumeration of CDCs, and, motivated by a conjecture of Bondy, give an alternative proof of the result that every planar 2-connected cubic graph on vertices has a CDC of size at most . Our proof is much shorter and obtained by combining a decomposition based argument, which might be of independent interest, with further combinatorial insights. Some of our results are accompanied by a version thereof for CDCs containing no cycle twice.
Keywords
Cite
@article{arxiv.2506.10604,
title = {Counting Small Cycle Double Covers},
author = {Jorik Jooken and Ben Seamone and Carol T. Zamfirescu},
journal= {arXiv preprint arXiv:2506.10604},
year = {2025}
}
Comments
20 pages, 4 figures