English

Digraph analogues for the Nine Dragon Tree Conjecture

Combinatorics 2022-05-06 v2

Abstract

The fractional arboricity of a digraph DD, denoted by γ(D)\gamma(D), is defined as γ(D)=maxHD,V(H)>1A(H)V(H)1\gamma(D)= \max_{H \subseteq D, |V(H)| >1} \frac {|A(H)|} {|V(H)|-1}. Frank in [Covering branching, Acta Scientiarum Mathematicarum (Szeged) 41 (1979), 77-81] proved that a digraph DD decomposes into kk branchings, if and only if Δ(D)k\Delta^{-}(D) \leq k and γ(D)k\gamma(D) \leq k. In this paper, we study digraph analogues for the Nine Dragon Tree Conjecture. We conjecture that, for positive integers kk and dd, if DD is a digraph with γ(D)k+dkd+1\gamma(D) \leq k + \frac{d-k}{d+1} and Δ(D)k+1\Delta^{-}(D) \leq k+1, then DD decomposes into k+1k + 1 branchings B1,,Bk,Bk+1B_{1}, \ldots, B_{k}, B_{k+1} with Δ+(Bk+1)d\Delta^{+}(B_{k+1}) \leq d. This conjecture, if true, is a refinement of Frank's characterization. A series of acyclic bipartite digraphs is also presented to show the bound of γ(D)\gamma(D) given in the conjecture is best possible. We prove our conjecture for the cases dkd \leq k. As more evidence to support our conjecture, we prove that if DD is a digraph with the maximum average degree mad(D)mad(D) \leq 2k+2(dk)d+12k + \frac{2(d-k)}{d+1} and Δ(D)k+1\Delta^{-}(D) \leq k+1, then DD decomposes into k+1k + 1 pseudo-branchings C1,,Ck,Ck+1C_{1}, \ldots, C_{k}, C_{k+1} with Δ+(Ck+1)d\Delta^{+}(C_{k+1}) \leq d.

Keywords

Cite

@article{arxiv.2201.10791,
  title  = {Digraph analogues for the Nine Dragon Tree Conjecture},
  author = {Hui Gao and Daqing Yang},
  journal= {arXiv preprint arXiv:2201.10791},
  year   = {2022}
}
R2 v1 2026-06-24T09:03:14.965Z