English

Towards the linear arboricity conjecture

Combinatorics 2018-09-14 v1 Discrete Mathematics

Abstract

The linear arboricity of a graph GG, denoted by la(G)\text{la}(G), is the minimum number of edge-disjoint linear forests (i.e. forests in which every connected component is a path) in GG whose union covers all the edges of GG. A famous conjecture due to Akiyama, Exoo, and Harary from 1980 asserts that la(G)(Δ(G)+1)/2\text{la}(G)\leq \lceil (\Delta(G)+1)/2 \rceil, where Δ(G)\Delta(G) denotes the maximum degree of GG. This conjectured upper bound would be best possible, as is easily seen by taking GG to be a regular graph. In this paper, we show that for every graph GG, la(G)Δ2+O(Δ2/3α)\text{la}(G)\leq \frac{\Delta}{2}+O(\Delta^{2/3-\alpha}) for some α>0\alpha > 0, thereby improving the previously best known bound due to Alon and Spencer from 1992. For graphs which are sufficiently good spectral expanders, we give even better bounds. Our proofs of these results further give probabilistic polynomial time algorithms for finding such decompositions into linear forests.

Keywords

Cite

@article{arxiv.1809.04716,
  title  = {Towards the linear arboricity conjecture},
  author = {Asaf Ferber and Jacob Fox and Vishesh Jain},
  journal= {arXiv preprint arXiv:1809.04716},
  year   = {2018}
}
R2 v1 2026-06-23T04:04:41.198Z