English

A note on pseudorandom Ramsey graphs

Combinatorics 2019-10-01 v2 Discrete Mathematics

Abstract

For fixed s3s \ge 3, we prove that if optimal KsK_s-free pseudorandom graphs exist, then the Ramsey number r(s,t)=ts1+o(1)r(s,t) = t^{s-1+o(1)} as tt \rightarrow \infty. Our method also improves the best lower bounds for r(C,t)r(C_{\ell},t) obtained by Bohman and Keevash from the random CC_{\ell}-free process by polylogarithmic factors for all odd 5\ell \geq 5 and {6,10}\ell \in \{6,10\}. For =4\ell = 4 it matches their lower bound from the C4C_4-free process. We also prove, via a different approach, that r(C5,t)>(1+o(1))t11/8r(C_5, t)> (1+o(1))t^{11/8} and r(C7,t)>(1+o(1))t11/9r(C_7, t)> (1+o(1))t^{11/9}. These improve the exponent of tt in the previous best results and appear to be the first examples of graphs FF with cycles for which such an improvement of the exponent for r(F,t)r(F, t) is shown over the bounds given by the random FF-free process and random graphs.

Keywords

Cite

@article{arxiv.1909.01461,
  title  = {A note on pseudorandom Ramsey graphs},
  author = {Dhruv Mubayi and Jacques Verstraete},
  journal= {arXiv preprint arXiv:1909.01461},
  year   = {2019}
}

Comments

10 pages, minor changes to the first version

R2 v1 2026-06-23T11:04:39.621Z