Explicit 3-colorings for exponential graphs
Abstract
For a graph and integer , two functions from into are adjacent if for all edges of , . The graph of all such functions is the exponential graph . El-Zahar and Sauer proved that if , then is 3-chromatic. Tardif showed that, implicit in their proof, is an algorithm for 3-coloring whose time complexity is polynomial in the size of . Tardif then asked if there is an "explicit" algorithm for finding such a coloring: Essentially, given a function belonging to a 3-chromatic component of , can we assign a color to this vertex in time polynomial in the size of ? The main result of this paper is to present such an algorithm, answering Tardif's question affirmatively. Our algorithm yields an alternative proof of the theorem of El-Zahar and Sauer that the categorical product of two 4-chromatic graphs is 4-chromatic.
Keywords
Cite
@article{arxiv.1808.08691,
title = {Explicit 3-colorings for exponential graphs},
author = {Adrien Argento and Pierre Charbit and Alantha Newman},
journal= {arXiv preprint arXiv:1808.08691},
year = {2019}
}