English

On a Diagonal Conjecture for Classical Ramsey Numbers

Combinatorics 2019-06-24 v2

Abstract

Let R(k1,,kr)R(k_1, \cdots, k_r) denote the classical rr-color Ramsey number for integers ki2k_i \ge 2. The Diagonal Conjecture (DC) for classical Ramsey numbers poses that if k1,,krk_1, \cdots, k_r are integers no smaller than 3 and kr1krk_{r-1} \leq k_r, then R(k1,,kr2,kr11,kr+1)R(k1,,kr)R(k_1, \cdots, k_{r-2}, k_{r-1}-1, k_r +1) \leq R(k_1, \cdots, k_r). We obtain some implications of this conjecture, present evidence for its validity, and discuss related problems. Let Rr(k)R_r(k) stand for the rr-color Ramsey number R(k,,k)R(k, \cdots, k). It is known that limrRr(3)1/r\lim_{r \rightarrow \infty} R_r(3)^{1/r} exists, either finite or infinite, the latter conjectured by Erd\H{o}s. This limit is related to the Shannon capacity of complements of K3K_3-free graphs. We prove that if DC holds, and limrRr(3)1/r\lim_{r \rightarrow \infty} R_r(3)^{1/r} is finite, then limrRr(k)1/r\lim_{r \rightarrow \infty} R_r(k)^{1/r} is finite for every integer k3k \geq 3.

Keywords

Cite

@article{arxiv.1810.11386,
  title  = {On a Diagonal Conjecture for Classical Ramsey Numbers},
  author = {Meilian Liang and Stanisław Radziszowski and Xiaodong Xu},
  journal= {arXiv preprint arXiv:1810.11386},
  year   = {2019}
}

Comments

10 pages

R2 v1 2026-06-23T04:53:50.499Z