Ramsey problems for Berge hypergraphs

Abstract

For a graph G, a hypergraph H is a Berge copy of G (or a Berge-G in short), if there is a bijection f : E(G) → E(H) such that for each e ∈ E(G) we have e ⊂eq f(e). We denote the family of r-uniform hypergraphs that are Berge copies of G by BrG. For families of r-uniform hypergraphs H and H', we denote by R(H,H') the smallest number n such that in any blue-red coloring of Knr (the complete r-uniform hypergraph on n vertices) there is a monochromatic blue copy of a hypergraph in H or a monochromatic red copy of a hypergraph in H'. Rc(H) denotes the smallest number n such that in any coloring of the hyperedges of Knr with c colors, there is a monochromatic copy of a hypergraph in H. In this paper we initiate the general study of the Ramsey problem for Berge hypergraphs, and show that if r> 2c, then Rc(BrKn)=n. In the case r = 2c, we show that Rc(BrKn)=n+1, and if G is a non-complete graph on n vertices, then Rc(BrG)=n, assuming n is large enough. In the case r < 2c we also obtain bounds on Rc(BrKn). Moreover, we also determine the exact value of R(B3T1,B3T2) for every pair of trees T1 and T2.