A LOWER BOUND ON THE HYPERGRAPH RAMSEY NUMBER R(4,5;3)

The finite version of Ramsey's theorem says that for positive integers r, k, a(1), ... ,a(r), there exists a least number n = R(a(1), ... ,a(r); k) so that if X is an n-element set and all k-subsets of X are r-coloured, then there exists an i and an a(i)-set A so that all k-subsets of A are coloured with the ith colour. In this paper, the bound R(4, 5; 3) >= 35 is shown by using a SAT solver to construct a red-blue colouring of the triples chosen from a 34-element set.