Rainbow arithmetic progressions

Abstract

In this paper, we investigate the anti-Ramsey (more precisely, anti-van der Waerden) properties of arithmetic progressions. For positive integers n and k, the expression aw([n],k) denotes the smallest number of colors with which the integers \1,…,n\ can be colored and still guarantee there is a rainbow arithmetic progression of length k. We establish that aw([n],3)=( n) and aw([n],k)=n1-o(1) for k≥ 4. For positive integers n and k, the expression aw(Zn,k) denotes the smallest number of colors with which elements of the cyclic group of order n can be colored and still guarantee there is a rainbow arithmetic progression of length k. In this setting, arithmetic progressions can "wrap around," and aw(Zn,3) behaves quite differently from aw([n],3), depending on the divisibility of n. As shown in [Jungi\'c et al., Combin. Probab. Comput., 2003], aw(Z2m,3) = 3 for any positive integer m. We establish that aw(Zn,3) can be computed from knowledge of aw(Zp,3) for all of the prime factors p of n. However, for k≥ 4, the behavior is similar to the previous case, that is, aw(Zn,k)=n1-o(1).