The complexity of planar graph choosability
Discrete Mathematics
2008-02-20 v1 Computational Complexity
Data Structures and Algorithms
Abstract
A graph is {\em -choosable} if for every assignment of a set of colors to every vertex of , there is a proper coloring of that assigns to each vertex a color from . We consider the complexity of deciding whether a given graph is -choosable for some constant . In particular, it is shown that deciding whether a given planar graph is 4-choosable is NP-hard, and so is the problem of deciding whether a given planar triangle-free graph is 3-choosable. We also obtain simple constructions of a planar graph which is not 4-choosable and a planar triangle-free graph which is not 3-choosable.
Cite
@article{arxiv.0802.2668,
title = {The complexity of planar graph choosability},
author = {Shai Gutner},
journal= {arXiv preprint arXiv:0802.2668},
year = {2008}
}