English

Semidefinite Programming and Ramsey Numbers

Combinatorics 2022-05-03 v2

Abstract

Finding exact Ramsey numbers is a problem typically restricted to relatively small graphs. The flag algebra method was developed to find asymptotic results for very large graphs, so it seems that the method is not suitable for finding small Ramsey numbers. But this intuition is wrong, and we will develop a technique to do just that in this paper. We find new upper bounds for many small graph and hypergraph Ramsey numbers. As a result, we prove the exact values R(K4,K4,K4)=28R(K_4^-,K_4^-,K_4^-)=28, R(K8,C5)=29R(K_8,C_5)= 29, R(K9,C6)=41R(K_9,C_6)= 41, R(Q3,Q3)=13R(Q_3,Q_3)=13, R(K3,5,K1,6)=17R(K_{3,5},K_{1,6})=17, R(C3,C5,C5)=17R(C_3, C_5, C_5)= 17, and R(K4,K5;3)=12R(K_4^-,K_5^-;3)= 12. We hope that this technique will be adapted to address other questions for smaller graphs with the flag algebra method.

Keywords

Cite

@article{arxiv.1704.03592,
  title  = {Semidefinite Programming and Ramsey Numbers},
  author = {Bernard Lidický and Florian Pfender},
  journal= {arXiv preprint arXiv:1704.03592},
  year   = {2022}
}

Comments

17 pages, 2 figures

R2 v1 2026-06-22T19:15:09.638Z