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The Linear Arboricity Conjecture for Graphs with Large Girth

Combinatorics 2025-12-15 v1 Discrete Mathematics

Abstract

The Linear Arboricity Conjecture asserts that the linear arboricity of a graph with maximum degree Δ\Delta is (Δ+1)/2\lceil (\Delta+1)/2 \rceil. For a 2k2k-regular graph GG, this implies la(G)=k+1la(G) = k+1. In this note, we utilize a network flow construction to establish upper bounds on la(G)la(G) conditioned on the girth g(G)g(G). We prove that if g(G)2kg(G) \ge 2k, the conjecture holds true, i.e., la(G)k+1la(G) \le k+1. Furthermore, we demonstrate that for graphs with girth g(G)g(G) at least kk, k/2k/2, k/4k/4 and 2k/c2k/c for any integer constant cc, the linear arboricity la(G)la(G) satisfies the upper bounds k+2k+2, k+3k+3, k+5k+5 and k+3c+22k+\left\lceil \frac{3c+2}{2}\right\rceil, respectively. Our approach relies on decomposing the graph into kk edge-disjoint 2-factors and constructing an auxiliary flow network with lower bound constraints to identify a sparse transversal subgraph that intersects every cycle in the decomposition.

Keywords

Cite

@article{arxiv.2512.11240,
  title  = {The Linear Arboricity Conjecture for Graphs with Large Girth},
  author = {Tapas Kumar Mishra},
  journal= {arXiv preprint arXiv:2512.11240},
  year   = {2025}
}
R2 v1 2026-07-01T08:21:41.766Z