English

A Planar Linear Arboricity Conjecture

Combinatorics 2012-09-06 v1

Abstract

The linear arboricity la(G) of a graph G is the minimum number of linear forests that partition the edges of G. In 1984, Akiyama et al. stated the Linear Arboricity Conjecture (LAC), that the linear arboricity of any simple graph of maximum degree Δ\Delta is either Δ2\lceil \tfrac{\Delta}{2} \rceil or Δ+12\lceil \tfrac{\Delta+1}{2} \rceil. In [J. L. Wu. On the linear arboricity of planar graphs. J. Graph Theory, 31:129-134, 1999] and [J. L. Wu and Y. W. Wu. The linear arboricity of planar graphs of maximum degree seven is four. J. Graph Theory, 58(3):210-220, 2008.] it was proven that LAC holds for all planar graphs. LAC implies that for Δ\Delta odd, la(G)=Δ2{\rm la}(G)=\big \lceil \tfrac{\Delta}{2} \big \rceil. We conjecture that for planar graphs this equality is true also for any even Δ6\Delta \ge 6. In this paper we show that it is true for any even Δ10\Delta \ge 10, leaving open only the cases Δ=6,8\Delta=6, 8. We present also an O(n log n)-time algorithm for partitioning a planar graph into max{la(G),5} linear forests, which is optimal when Δ9\Delta \ge 9.

Keywords

Cite

@article{arxiv.0912.5528,
  title  = {A Planar Linear Arboricity Conjecture},
  author = {Marek Cygan and Lukasz Kowalik and Borut Luzar},
  journal= {arXiv preprint arXiv:0912.5528},
  year   = {2012}
}
R2 v1 2026-06-21T14:29:34.839Z