English

Multicolor Ramsey numbers for triple systems

Combinatorics 2013-02-22 v1

Abstract

Given an rr-uniform hypergraph HH, the multicolor Ramsey number rk(H)r_k(H) is the minimum nn such that every kk-coloring of the edges of the complete rr-uniform hypergraph KnrK_n^r yields a monochromatic copy of HH. We investigate rk(H)r_k(H) when kk grows and HH is fixed. For nontrivial 3-uniform hypergraphs HH, the function rk(H)r_k(H) ranges from 6k(1+o(1))\sqrt{6k}(1+o(1)) to double exponential in kk. We observe that rk(H)r_k(H) is polynomial in kk when HH is rr-partite and at least single-exponential in kk otherwise. Erd\H{o}s, Hajnal and Rado gave bounds for large cliques KsrK_s^r with ss0(r)s\ge s_0(r), showing its correct exponential tower growth. We give a proof for cliques of all sizes, s>rs>r, using a slight modification of the celebrated stepping-up lemma of Erd\H{o}s and Hajnal. For 3-uniform hypergraphs, we give an infinite family with sub-double-exponential upper bound and show connections between graph and hypergraph Ramsey numbers. Specifically, we prove that rk(K3)r4k(K43e)r4k(K3)+1,r_k(K_3)\le r_{4k}(K_4^3-e)\le r_{4k}(K_3)+1, where K43eK_4^3-e is obtained from K43K_4^3 by deleting an edge. We provide some other bounds, including single-exponential bounds for F5={abe,abd,cde}F_5=\{abe,abd,cde\} as well as asymptotic or exact values of rk(H)r_k(H) when HH is the bow {abc,ade}\{abc,ade\}, kite {abc,abd}\{abc,abd\}, tight path {abc,bcd,cde}\{abc,bcd,cde\} or the windmill {abc,bde,cef,bce}\{abc,bde,cef,bce\}. We also determine many new "small" Ramsey numbers and show their relations to designs. For example, the lower bound for r6(kite)=8r_6(kite)=8 is demonstrated by decomposing the triples of [7][7] into six partial STS (two of them are Fano planes).

Keywords

Cite

@article{arxiv.1302.5304,
  title  = {Multicolor Ramsey numbers for triple systems},
  author = {Maria Axenovich and Andras Gyarfas and Hong Liu and Dhruv Mubayi},
  journal= {arXiv preprint arXiv:1302.5304},
  year   = {2013}
}

Comments

20 pages, 1 figure

R2 v1 2026-06-21T23:30:11.258Z