Constructions in Ramsey theory

Abstract

We provide several constructions for problems in Ramsey theory. First, we prove a superexponential lower bound for the classical 4-uniform Ramsey number r4(5,n), and the same for the iterated (k-4)-fold logarithm of the k-uniform version rk(k+1,n). This is the first improvement of the original exponential lower bound for r4(5,n) implicit in work of Erd os and Hajnal from 1972 and also improves the current best known bounds for larger k due to the authors. Second, we prove an upper bound for the hypergraph Erd os-Rogers function fkk+1, k+2(N) that is an iterated (k-13)-fold logarithm in N. This improves the previous upper bounds that were only logarithmic and addresses a question of Dudek and the first author that was reiterated by Conlon, Fox and Sudakov. Third, we generalize the results of Erd os and Hajnal about the 3-uniform Ramsey number of K4 minus an edge versus a clique to k-uniform hypergraphs.