Off-diagonal hypergraph Ramsey numbers

Abstract

The Ramsey number rk(s,n) is the minimum N such that every red-blue coloring of the k-subsets of \1, …, N\ contains a red set of size s or a blue set of size n, where a set is red (blue) if all of its k-subsets are red (blue). A k-uniform tight path of size s, denoted by Ps, is a set of s vertices v1 < ·s < vs in Z, and all s-k+1 edges of the form \vj,vj+1,…, vj + k -1\. Let rk(Ps, n) be the minimum N such that every red-blue coloring of the k-subsets of \1, …, N\ results in a red Ps or a blue set of size n. The problem of estimating both rk(s,n) and rk(Ps, n) for k=2 goes back to the seminal work of Erdos and Szekeres from 1935, while the case k 3 was first investigated by Erdos and Rado in 1952. In this paper, we deduce a quantitative relationship between multicolor variants of rk(Ps, n) and rk(n, n). This yields several consequences including the following: (1) We determine the correct tower growth rate for both rk(s,n) and rk(Ps, n) for s k+3. The question of determining the tower growth rate of rk(s,n) for all s k+1 was posed by Erdos and Hajnal in 1972. (2) We show that determining the tower growth rate of rk(Pk+1, n) is equivalent to determining the tower growth rate of rk(n,n), which is a notorious conjecture of Erdos, Hajnal and Rado from 1965 that remains open. Some related off-diagonal hypergraph Ramsey problems are also explored.