An improved lower bound for Folkman's theorem

Abstract

Folkman's Theorem asserts that for each k ∈ N, there exists a natural number n = F(k) such that whenever the elements of [n] are two-coloured, there exists a set A ⊂ [n] of size k with the property that all the sums of the form Σx ∈ B x, where B is a nonempty subset of A, are contained in [n] and have the same colour. In 1989, Erdos and Spencer showed that F(k) 2ck2/ k, where c >0 is an absolute constant; here, we improve this bound significantly by showing that F(k) 22k-1/k for all k∈ N.