Multicolor Ramsey numbers for triple systems
Abstract
Given an -uniform hypergraph , the multicolor Ramsey number is the minimum such that every -coloring of the edges of the complete -uniform hypergraph yields a monochromatic copy of . We investigate when grows and is fixed. For nontrivial 3-uniform hypergraphs , the function ranges from to double exponential in . We observe that is polynomial in when is -partite and at least single-exponential in otherwise. Erd\H{o}s, Hajnal and Rado gave bounds for large cliques with , showing its correct exponential tower growth. We give a proof for cliques of all sizes, , 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 where is obtained from by deleting an edge. We provide some other bounds, including single-exponential bounds for as well as asymptotic or exact values of when is the bow , kite , tight path or the windmill . We also determine many new "small" Ramsey numbers and show their relations to designs. For example, the lower bound for is demonstrated by decomposing the triples of 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