Hypergraph Ramsey numbers

Abstract

The Ramsey number rk(s,n) is the minimum N such that every red-blue coloring of the k-tuples of an N-element set contains either a red set of size s or a blue set of size n, where a set is called red (blue) if all k-tuples from this set are red (blue). In this paper we obtain new estimates for several basic hypergraph Ramsey problems. We give a new upper bound for rk(s,n) for k ≥ 3 and s fixed. In particular, we show that r3(s,n) ≤ 2ns-2 n, which improves by a factor of ns-2/ polylog n the exponent of the previous upper bound of Erdos and Rado from 1952. We also obtain a new lower bound for these numbers, showing that there are constants c1,c2>0 such that r3(s,n) ≥ 2c1 sn (n/s) for all 4 ≤ s ≤ c2n. When s is a constant, it gives the first superexponential lower bound for r3(s,n), answering an open question posed by Erdos and Hajnal in 1972. Next, we consider the 3-color Ramsey number r3(n,n,n), which is the minimum N such that every 3-coloring of the triples of an N-element set contains a monochromatic set of size n. Improving another old result of Erdos and Hajnal, we show that r3(n,n,n) ≥ 2nc n. Finally, we make some progress on related hypergraph Ramsey-type problems.