Complete Acyclic Colorings
Abstract
We study two parameters that arise from the dichromatic number and the vertex-arboricity in the same way that the achromatic number comes from the chromatic number. The adichromatic number of a digraph is the largest number of colors its vertices can be colored with such that every color induces an acyclic subdigraph but merging any two colors yields a monochromatic directed cycle. Similarly, the a-vertex arboricity of an undirected graph is the largest number of colors that can be used such that every color induces a forest but merging any two yields a monochromatic cycle. We study the relation between these parameters and their behavior with respect to other classical parameters such as degeneracy and most importantly feedback vertex sets.
Cite
@article{arxiv.1905.08670,
title = {Complete Acyclic Colorings},
author = {Stefan Felsner and Winfried Hochstättler and Kolja Knauer and Raphael Steiner},
journal= {arXiv preprint arXiv:1905.08670},
year = {2019}
}
Comments
17 pages, no figures