Chromatic Polynomial Evaluation Spectra
Combinatorics
2025-12-23 v1
Abstract
Around 10 years ago, Agol and Krushkal showed that the number of chromatic polynomials arising from graphs on vertices grows exponentially with , by establishing that the (dual) flow polynomial already takes on exponentially many values, if one varies over all planar cubic graphs on vertices. We show, more generally, that the size of the set is exponential in , for every fixed real number . In fact, our approach can also be pushed to show that already takes on exponentially many values, if we only vary over all planar graphs on vertices. The case confirms a conjecture of Agol, which was initially motivated by the -completeness of planar -colorability.
Cite
@article{arxiv.2512.19600,
title = {Chromatic Polynomial Evaluation Spectra},
author = {Rafael Miyazaki and Cosmin Pohoata and Michael Zheng},
journal= {arXiv preprint arXiv:2512.19600},
year = {2025}
}
Comments
20 pages, no figures, comments welcome!