Recoloring some hereditary graph classes
Abstract
The reconfiguration graph of the -colorings, denoted , is the graph whose vertices are the -colorings of and two colorings are adjacent in if they differ in color on exactly one vertex. A graph is said to be recolorable if is connected for all +1. In this paper, we study the recolorability of several graph classes restricted by forbidden induced subgraphs. We prove some properties of a vertex-minimal graph which is not recolorable. We show that every (triangle, )-free graph is recolorable if and only if every (paw, )-free graph is recolorable. Every graph in the class of -free graphs, where is a 4-vertex graph except or +, is recolorable if is either a triangle, paw, claw, or diamond. Furthermore, we prove that every (, , house, co-banner)-free graph is recolorable.
Cite
@article{arxiv.2312.00979,
title = {Recoloring some hereditary graph classes},
author = {Manoj Belavadi and Kathie Cameron},
journal= {arXiv preprint arXiv:2312.00979},
year = {2024}
}
Comments
17 pages