DP color functions versus chromatic polynomials (II)
Abstract
For any connected graph , let and denote the chromatic polynomial and DP color function of , respectively. It is known that holds for every positive integer . Let (resp. ) be the set of graphs for which there exists an integer such that (resp. ) holds for all integers . Determining the sets and is a key problem on the study of the DP color function. For any edge set of , let be the length of a shortest cycle in such that is odd whenever such a cycle exists, and otherwise. Write as if . In this paper, we prove that if has a spanning tree such that is odd for each , the edges in can be labeled as with for all and each edge is contained in a cycle of length with , then is a graph in . As a direct application of this conclusion, all plane near-triangulations and complete multipartite graphs with at least three partite sets belong to . We also show that if is an edge set of such that is even and satisfies certain conditions, then belongs to . In particular, if , where is a set of edges between two disjoint vertex subsets of , then belongs to . Both results extend known ones in [DP color functions versus chromatic polynomials, 134 (2022), article 102301].
Keywords
Cite
@article{arxiv.2203.07704,
title = {DP color functions versus chromatic polynomials (II)},
author = {Meiqiao Zhang and Fengming Dong},
journal= {arXiv preprint arXiv:2203.07704},
year = {2022}
}
Comments
24 pages, 8 figures