English

Improving $R(3,k)$ in just two bites

Combinatorics 2026-02-20 v3

Abstract

We present a flexible random construction which, for certain graphs HH, is able to produce HH-free graphs with edge density strictly larger than that of the HH-free process, while simultaneously preserving pseudorandom properties and allowing a much easier analysis. As our main application, we use this construction to show that the off-diagonal Ramsey numbers satisfy R(3,k)(12+o(1))k2logkR(3,k)\ge \left(\frac12+o(1)\right)\frac{k^2}{\log{k}}, improving the previously best bound R(3,k)(13+o(1))k2logkR(3,k)\ge \left(\frac13+o(1)\right)\frac{k^2}{\log{k}}. While the best known upper bound is R(3,k)(1+o(1))k2logkR(3,k)\le \left(1+o(1)\right)\frac{k^2}{\log{k}}, the constant of 12\frac12 has been conjectured to be asymptotically tight by multiple groups.

Keywords

Cite

@article{arxiv.2510.19718,
  title  = {Improving $R(3,k)$ in just two bites},
  author = {Zion Hefty and Paul Horn and Dylan King and Florian Pfender},
  journal= {arXiv preprint arXiv:2510.19718},
  year   = {2026}
}

Comments

18 pages

R2 v1 2026-07-01T07:00:03.014Z