Tower Gaps in Multicolour Ramsey Numbers
Resolving a problem of Conlon, Fox, and R\"{o}dl, we construct a family of hypergraphs with arbitrarily large tower height separation between their \(2\)-colour and \(q\)-colour Ramsey numbers. The main lemma underlying this construction is a new variant of the Erdős--Hajnal stepping-up lemma f...
Saved in:
Published in | arXiv.org |
---|---|
Main Authors | , , , |
Format | Paper Journal Article |
Language | English |
Published |
Ithaca
Cornell University Library, arXiv.org
01.09.2023
|
Subjects | |
Online Access | Get full text |
Cover
Loading…
Summary: | Resolving a problem of Conlon, Fox, and R\"{o}dl, we construct a family of hypergraphs with arbitrarily large tower height separation between their \(2\)-colour and \(q\)-colour Ramsey numbers. The main lemma underlying this construction is a new variant of the Erdős--Hajnal stepping-up lemma for a generalized Ramsey number \(r_k(t;q,p)\), which we define as the smallest integer \(n\) such that every \(q\)-colouring of the \(k\)-sets on \(n\) vertices contains a set of \(t\) vertices spanning fewer than \(p\) colours. Our results provide the first tower-type lower bounds on these numbers. |
---|---|
ISSN: | 2331-8422 |
DOI: | 10.48550/arxiv.2202.14032 |