Towards Esperet's Conjecture: Polynomial $\chi$-Bounds for Structured Graph Classes
Abstract
In this paper, we establish that the class of -free graphs contains a subclass , defined by certain cutset conditions, whose chromatic number admits a linear -bound. Building on recent results showing that broom-free graphs excluding as a subgraph admit a polynomial bound in~ on their chromatic number (A broom is obtained from a path with one end by adding leaves adjacent to ), we extend this result to the hereditary class of -free and \emph{-flag}-free graphs (where a \emph{-flag} is a triangle with an attached -path). We show that if is -free (for and , that is, if it excludes a generalized broom with an additional leaf), and does not contain as a subgraph, then is polynomially bounded in . Furthermore, for the subclass of excluding as a subgraph, we prove that is linearly -bounded in .
Cite
@article{arxiv.2512.09186,
title = {Towards Esperet's Conjecture: Polynomial $\chi$-Bounds for Structured Graph Classes},
author = {N. Rahimi and D. A. Mojdeh},
journal= {arXiv preprint arXiv:2512.09186},
year = {2025}
}
Comments
12 pages