Counting subgraphs of coloring graphs using shadow graphs
Abstract
Given a graph , the -coloring graph is constructed by selecting proper -colorings of as vertices, with an edge between two colorings if they differ in the color of exactly one vertex. The number of vertices in is the famous chromatic polynomial of . Asgarli, Krehbiel, Levinson and Russell showed that for any subgraph , the number of induced copies of in is a polynomial function in . Hogan, Scott, Tamitegama, and Tan found a shorter proof for polynomiality of these chromatic -polynomials. In this paper, we provide a method of constructing these polynomials explicitly in terms of chromatic polynomials of shadow graphs. We illustrate the practicality of our formulas by computing an explicit formula for -polynomial for trees when is an arbitrary hypercube, a task which does not seem approachable from previous methods. The coefficients of the resulting polynomials feature generalized degree sequences introduced by Crew. In the special case when , the corresponding polynomial is dubbed the chromatic pairs polynomial. We present a pair of graphs and sharing the same chromatic pairs polynomial but different chromatic polynomials, disproving a conjecture raised by Asgarli, Krehbiel, Levinson and Russell.
Cite
@article{arxiv.2505.05807,
title = {Counting subgraphs of coloring graphs using shadow graphs},
author = {Simon MacLean},
journal= {arXiv preprint arXiv:2505.05807},
year = {2025}
}
Comments
20 pages, 16 figures