On the Ramsey classes of random hypergraphs

Abstract

Let r,s,t≥2 be integers. For r-graphs G and F1,…,Fs, we write G(F1,…,Fs) if every s-edge-coloring of G yields a monochromatic copy of Fi in the i-th color for some 1≤ i≤ s. Let R(F1,…,Fs) denote the family of all r-graphs G with G(F1,…,Fs). When F1=…=Fs=F, we write R(F;s)=R(F1,…,Fs). In this paper, we investigate when R(H;s)⊂eqR(Q1,…,Qt) holds, where H=H(r)(n,p) is a random r-graph and Q1,…,Qt are fixed r-graphs. Our main result determines the threshold for a large class of such Q1,…,Qt, including complete r-graphs. The key ingredient in our proof is a generalization of a result of Graham, Łuczak, Rödl, and Ruciński, which provides a necessary and sufficient condition for R(F1,…,Fs)⊂eqR(Q1,…,Qt), where Q1,…,Qt are highly connected. As a byproduct, we characterize when two tuples of highly connected r-graphs are Ramsey equivalent.