Bounding the List Color Function Threshold from Above
Abstract
The chromatic polynomial of a graph , denoted , is equal to the number of proper -colorings of for each . In 1990, Kostochka and Sidorenko introduced the list color function of graph , denoted , which is a list analogue of the chromatic polynomial. The list color function threshold of , denoted , is the smallest such that whenever . It is known that for every graph , is finite, and in fact, . It is also known that when is a cycle or chordal graph, is enumeratively chromatic-choosable which means . A recent paper of Kaul et al. suggests that understanding the list color function threshold of complete bipartite graphs is essential to the study of the extremal behavior of . In this paper we show that for any , which gives an improvement on the general upper bound for when . We also develop additional tools that allow us to show that and .
Keywords
Cite
@article{arxiv.2207.04831,
title = {Bounding the List Color Function Threshold from Above},
author = {Hemanshu Kaul and Akash Kumar and Andrew Liu and Jeffrey A. Mudrock and Patrick Rewers and Paul Shin and Michael Scott Tanahara and Khue To},
journal= {arXiv preprint arXiv:2207.04831},
year = {2023}
}
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30 pages