English

On generalized Ramsey numbers for 3-uniform hypergraphs

Combinatorics 2013-09-19 v1

Abstract

The well-known Ramsey number r(t,u)r(t,u) is the smallest integer nn such that every KtK_t-free graph of order nn contains an independent set of size uu. In other words, it contains a subset of uu vertices with no K2K_2. Erd{\H o}s and Rogers introduced a more general problem replacing K2K_2 by KsK_s for 2s<t2\le s<t. Extending the problem of determining Ramsey numbers they defined the numbers f_{s,t}(n)=\min \big{\{} \max \{|W| : W\subseteq V(G) \text{and} G[W] \text{contains no} K_s\}\big{\}}, where the minimum is taken over all KtK_t-free graphs GG of order nn. In this note, we study an analogous function fs,t(3)(n)f_{s,t}^{(3)}(n) for 3-uniform hypergraphs. In particular, we show that there are constants c1c_1 and c2c_2 depending only on ss such that c1(logn)1/4(loglognlogloglogn)1/2<fs,s+1(3)(n)<c2logn. c_1(\log n)^{1/4} \left(\frac{\log\log n}{\log\log\log n}\right)^{1/2} < f_{s, s+1}^{(3)}(n) < c_2 \log n.

Keywords

Cite

@article{arxiv.1309.4518,
  title  = {On generalized Ramsey numbers for 3-uniform hypergraphs},
  author = {Andrzej Dudek and Dhruv Mubayi},
  journal= {arXiv preprint arXiv:1309.4518},
  year   = {2013}
}
R2 v1 2026-06-22T01:29:12.730Z