On the cover Ramsey number of Berge hypergraphs

TL;DR

This paper introduces a new cover Ramsey number for Berge hypergraphs, establishing bounds related to classical Ramsey numbers and maximum degree constraints, advancing understanding of hypergraph coloring and structure.

Contribution

It defines the cover Ramsey number for Berge hypergraphs and provides bounds connecting it to classical Ramsey numbers and maximum degree conditions.

Findings

Bounded the cover Ramsey number by a cubic function of classical Ramsey numbers.

Established the existence of a constant relating the cover Ramsey number to the maximum degree of graphs.

Demonstrated the applicability of the bounds for hypergraphs with fixed uniformity and degree constraints.

Abstract

For a fixed set of positive integers $R$, we say $\mathcal{H}$ is an $R$-uniform hypergraph, or $R$-graph, if the cardinality of each edge belongs to $R$. An $R$-graph $\mathcal{H}$ is \emph{covering} if every vertex pair of $\mathcal{H}$ is contained in some hyperedge. For a graph $G=(V,E)$, a hypergraph $\mathcal{H}$ is called a \textit{Berge}-$G$, denoted by $BG$, if there exists an injection $f: E(G) \to E(\mathcal{H})$ such that for every $e \in E(G)$, $e \subseteq f(e)$. In this note, we define a new type of Ramsey number, namely the \emph{cover Ramsey number}, denoted as $\hat{R}^R(BG_1, BG_2)$, as the smallest integer $n_0$ such that for every covering $R$-uniform hypergraph $\mathcal{H}$ on $n \geq n_0$ vertices and every $2$-edge-coloring (blue and red) of $\mathcal{H}$ , there is either a blue Berge-$G_1$ or a red Berge-$G_2$ subhypergraph. We show that for every $k\geq 2$, there exists some $c_k$ such that for any finite graphs $G_1$ and $G_2$, $R(G_1, G_2) \leq \hat{R}^{[k]}(BG_1, BG_2) \leq c_k \cdot R(G_1, G_2)^3$. Moreover, we show that for each positive integer $d$ and $k$, there exists a constant $c = c(d,k)$ such that if $G$ is a graph on $n$ vertices with maximum degree at most $d$, then $\hat{R}^{[k]}(BG,BG) \leq cn$.