Homogeneous Sets in Graphs and a Chromatic Multisymmetric Function
Abstract
In this paper, we extend the chromatic symmetric function to a chromatic -multisymmetric function , defined for graphs equipped with a partition of their vertex set into parts. We demonstrate that this new function retains the basic properties and basis expansions of , and we give a method for systematically deriving new linear relationships for from previous ones by passing them through . In particular, we show how to take advantage of homogeneous sets of (those such that each vertex of is either adjacent to all of or is nonadjacent to all of ) to relate the chromatic symmetric function of to those of simpler graphs. Furthermore, we show how extending this idea to homogeneous pairs generalizes the process used by Guay-Paquet to reduce the Stanley-Stembridge conjecture to unit interval graphs.
Keywords
Cite
@article{arxiv.2209.14176,
title = {Homogeneous Sets in Graphs and a Chromatic Multisymmetric Function},
author = {Logan Crew and Evan Haithcock and Josephine Reynes and Sophie Spirkl},
journal= {arXiv preprint arXiv:2209.14176},
year = {2022}
}