English

Induced and Weak Induced Arboricities

Combinatorics 2018-03-07 v1 Discrete Mathematics

Abstract

We define the induced arboricity of a graph GG, denoted by ia(G){\rm ia}(G), as the smallest kk such that the edges of GG can be covered with kk induced forests in GG. This notion generalizes the classical notions of the arboricity and strong chromatic index. For a class F\mathcal{F} of graphs and a graph parameter pp, let p(F)=sup{p(G)GF}p(\mathcal{F}) = \sup\{p(G) \mid G\in \mathcal{F}\}. We show that ia(F){\rm ia}(\mathcal{F}) is bounded from above by an absolute constant depending only on F\mathcal{F}, that is ia(F){\rm ia}(\mathcal{F})\neq\infty if and only if χ(F12)\chi(\mathcal{F} \nabla \frac{1}{2}) \neq\infty, where F12\mathcal{F} \nabla \frac{1}{2} is the class of 12\frac{1}{2}-shallow minors of graphs from F\mathcal{F} and χ\chi is the chromatic number. Further, we give bounds on ia(F){\rm ia}(\mathcal{F}) when F\mathcal{F} is the class of planar graphs, the class of dd-degenerate graphs, or the class of graphs having tree-width at most dd. Specifically, we show that if F\mathcal{F} is the class of planar graphs, then 8ia(F)108 \leq {\rm ia}(\mathcal{F}) \leq 10. In addition, we establish similar results for so-called weak induced arboricities and star arboricities of classes of graphs.

Keywords

Cite

@article{arxiv.1803.02152,
  title  = {Induced and Weak Induced Arboricities},
  author = {Maria Axenovich and Philip Dörr and Jonathan Rollin and Torsten Ueckerdt},
  journal= {arXiv preprint arXiv:1803.02152},
  year   = {2018}
}

Comments

13 pages, 5 figures

R2 v1 2026-06-23T00:43:40.458Z