English

Digraphs and variable degeneracy

Combinatorics 2020-12-18 v1

Abstract

Let DD be a digraph, let p1p \geq 1 be an integer, and let f:V(D)N0pf: V(D) \to \mathbb{N}_0^p be a vector function with f=(f1,f2,,fp)f=(f_1,f_2,\ldots,f_p). We say that DD has an ff-partition if there is a partition (D1,D2,,Dp)(D_1,D_2,\ldots,D_p) into induced subdigraphs of DD such that for all i[1,p]i \in [1,p], the digraph DiD_i is weakly fif_i-degenerate, that is, in every non-empty subdigraph DD' of DiD_i there is a vertex vv such that min{dD+(v),dD(v)}<fi(v)\min\{d_{D'}^+(v), d_{D'}^-(v)\} < f_i(v). In this paper, we prove that the condition f1(v)+f2(v)++fp(v)max{dD+(v),dD(v)}f_1(v) + f_2(v) + \ldots + f_p(v) \geq \max \{d_D^+(v),d_D^-(v)\} for all vV(D)v \in V(D) is almost sufficient for the existence of an ff-partition and give a full characterization of the bad pairs (D,f)(D,f). Moreover, we describe a polynomial time algorithm that (under the previous conditions) either verifies that (D,f)(D,f) is a bad pair or finds an ff-partition. Among other applications, this leads to a generalization of Brooks' Theorem as well as the list-version of Brooks' Theorem for digraphs, where a coloring of digraph is a partition of the digraph into acyclic induced subdigraphs. We furthermore obtain a result bounding the ss-degenerate chromatic number of a digraph in terms of the maximum of maximum in-degree and maximum out-degree.

Keywords

Cite

@article{arxiv.2012.09713,
  title  = {Digraphs and variable degeneracy},
  author = {Jørgen Bang-Jensen and Thomas Schweser and Michael Stiebitz},
  journal= {arXiv preprint arXiv:2012.09713},
  year   = {2020}
}
R2 v1 2026-06-23T21:03:12.764Z