Finding Certain Arithmetic Progressions in 2-Coloured Cyclic Groups

Abstract

We say a pair of integers (a, b) is findable if the following is true. For any δ > 0 there exists a p0 such that for any prime p p0 and any red-blue colouring of Z /pZ in which each colour has density at least δ, we can find an arithmetic progression of length a+b inside Z/pZ whose first a elements are red and whose last b elements are blue. Szemer\'edi's Theorem on arithmetic progressions implies that (0,k) and (1,k) are findable for any k. We prove that (2, k) is also findable for any k. However, the same is not true of (3, k). Indeed, we give a construction showing that (3, 30000) is not findable. We also show that (14, 14) is not findable.