English

$\chi$-binding function for a superclass of $2K_2$-free graphs

Combinatorics 2022-07-19 v1

Abstract

The class of 2K22K_2-free graphs has been well studied in various contexts in the past. In this paper, we study the chromatic number of {butterfly,hammer}\{butterfly, hammer\}-free graphs, a superclass of 2K22K_2-free graphs and show that a connected {butterfly,hammer}\{butterfly, hammer\}-free graph GG with ω(G)2\omega(G)\neq 2 admits (ω+12)\binom{\omega+1}{2} as a χ\chi-binding function which is also the best available χ\chi-binding function for its subclass of 2K22K_2-free graphs. In addition, we show that if H{C4+Kp,P4+Kp}H\in\{C_4+K_p, P_4+K_p\}, then any {butterfly,hammer,H}\{butterfly, hammer, H\}-free graph GG with no components of clique size two admits a linear χ\chi-binding function. Furthermore, we also establish that any connected {butterfly,hammer,H}\{butterfly, hammer, H\}-free graph GG where H{(K1K2)+Kp,2K1+Kp}H\in \{(K_1\cup K_2)+K_p, 2K_1+K_p\}, is perfect for ω(G)2p\omega(G)\geq 2p.

Cite

@article{arxiv.2207.08168,
  title  = {$\chi$-binding function for a superclass of $2K_2$-free graphs},
  author = {Athmakoori Prashant and S. Francis Raj},
  journal= {arXiv preprint arXiv:2207.08168},
  year   = {2022}
}
R2 v1 2026-06-25T00:59:04.739Z