Colorings with only rainbow arithmetic progressions

Abstract

If we want to color 1,2,…,n with the property that all 3-term arithmetic progressions are rainbow (that is, their elements receive 3 distinct colors), then, obviously, we need to use at least n/2 colors. Surprisingly, much fewer colors suffice if we are allowed to leave a negligible proportion of integers uncolored. Specifically, we prove that there exist α,β<1 such that for every n, there is a subset A of \1,2,…,n\ of size at least n-nα, the elements of which can be colored with nβ colors with the property that every 3-term arithmetic progression in A is rainbow. Moreover, β can be chosen to be arbitrarily small. Our result can be easily extended to k-term arithmetic progressions for any k 3. As a corollary, we obtain the following result of Alon, Moitra, and Sudakov, which can be used to design efficient communication protocols over shared directional multi-channels. There exist α',β'<1 such that for every n, there is a graph with n vertices and at least n2-n1+α' edges, whose edge set can be partitioned into at most n1+β' induced matchings.