Integer colorings with no rainbow 3-term arithmetic progression

Abstract

In this paper, we study the rainbow Erdos-Rothschild problem with respect to 3-term arithmetic progressions. We obtain the asymptotic number of r-colorings of [n] without rainbow 3-term arithmetic progressions, and we show that the typical colorings with this property are 2-colorings. We also prove that [n] attains the maximum number of rainbow 3-term arithmetic progression-free r-colorings among all subsets of [n]. Moreover, the exact number of rainbow 3-term arithmetic progression-free r-colorings of Zp is obtained, where p is any prime and Zp is the cyclic group of order p.