Colouring Square-Free Graphs without Long Induced Paths
Abstract
The complexity of {\sc Colouring} is fully understood for -free graphs, but there are still major complexity gaps if two induced subgraphs and are forbidden. Let be the -vertex cycle and be the -vertex path . We show that {\sc Colouring} is polynomial-time solvable for and , strengthening several known results. Our main approach is to initiate a study into the boundedness of the clique-width of atoms (graphs with no clique cutset) of a hereditary graph class. We first show that the classifications of boundedness of clique-width of -free graphs and -free atoms coincide. We then show that this is not the case if two graphs are forbidden: we prove that -free atoms have clique-width at most~18. Our key proof ingredients are a divide-and-conquer approach for bounding the clique-width of a subclass of -free graphs and the construction of a new bound on the clique-width for (general) graphs in terms of the clique-width of recursively defined subgraphs induced by homogeneous pairs and triples of sets. As a complementary result we prove that {\sc Colouring} is \NP-complete for and , which is the first hardness result on {\sc Colouring} for -free graphs. Combining our new results with known results leads to an almost complete dichotomy for \cn restricted to -free graphs.
Keywords
Cite
@article{arxiv.1805.08270,
title = {Colouring Square-Free Graphs without Long Induced Paths},
author = {Serge Gaspers and Shenwei Huang and Daniël Paulusma},
journal= {arXiv preprint arXiv:1805.08270},
year = {2018}
}
Comments
An extended abstract of this paper appeared in the proceedings of STACS 2018. http://drops.dagstuhl.de/opus/volltexte/2018/8492/pdf/LIPIcs-STACS-2018-35.pdf