English

Short cycle covers on cubic graphs using chosen 2-factor

Combinatorics 2015-09-25 v1

Abstract

We show that every bridgeless cubic graph GG with mm edges has a cycle cover of length at most 1.6m1.6 m. Moreover, if GG does not contain any intersecting circuits of length 55, then GG has a cycle cover of length 212/135m1.570m212/135 \cdot m \approx 1.570 m and if GG contains no 55-circuits, then it has a cycle cover of length at most 14/9m1.556m14/9 \cdot m \approx 1.556 m. To prove our results, we show that each 22-edge-connected cubic graph GG on nn vertices has a 22-factor containing at most n/10+f(G)n/10+f(G) circuits of length 55, where the value of f(G)f(G) only depends on the presence of several subgraphs arising from the Petersen graph. As a corollary we get that each 33-edge-connected cubic graph on nn vertices has a 22-factor containing at most n/9n/9 circuits of length 55 and each 44-edge-connected cubic graph on nn vertices has a 22-factor containing at most n/10n/10 circuits of length 55.

Keywords

Cite

@article{arxiv.1509.07430,
  title  = {Short cycle covers on cubic graphs using chosen 2-factor},
  author = {Barbora Candráková and Robert Lukoťka},
  journal= {arXiv preprint arXiv:1509.07430},
  year   = {2015}
}

Comments

19 pages, 3 figures

R2 v1 2026-06-22T11:04:44.492Z