A resolution of Erdos Problem #190 via Erdos-Lov\'asz, BCT, and Baker-Harman-Pintz

Abstract

Let H(k) be the smallest N such that every finite coloring of [N] contains a monochromatic or rainbow k-term arithmetic progression. Erdos and Graham asked whether H(k)1/k/k ∞ (Problem #190 of the Erdos Problems database). We prove that there is an absolute constant k0 2 such that for all k k0, \[ H(k)1/k/k (1/e - (k)) · k/ k, (k) = O(k-0.475 k) 0 as k ∞; \] in particular H(k)1/k/k = (k/ k) and k∞ H(k)1/k/k = ∞, resolving the positive direction of the Erdos-Graham question. The argument combines three standard ingredients -- the symmetric Lov\'asz Local Lemma applied to the k-AP hypergraph on [N], the restricted form of the Blankenship-Cummings-Taranchuk recurrence, and the Baker-Harman-Pintz prime-gap theorem -- together with the pigeonhole reduction H(k) W(k-1,k), and uses BHP as the only analytic black box. Previous applications of Erdos-Lov\'asz had fixed r; the improvement here is that the rk-1 base dominates once one allows the color count r0 = k / k to grow with k. No matching upper bound on H(k)1/k/k is known.