Reflections on the Erd os Discrepancy Problem

Abstract

We consider some coloring issues related to the famous Erd os Discrepancy Problem. A set of the form As,k=\s,2s,…,ks\, with s,k∈ N, is called a homogeneous arithmetic progression. We prove that for every fixed k there exists a 2-coloring of N such that every set As,k is perfectly balanced (the numbers of red and blue elements in the set As,k differ by at most one). This prompts reflection on various restricted versions of Erd os' problem, obtained by imposing diverse confinements on parameters s,k. In a slightly different direction, we discuss a majority variant of the problem, in which each set As,k should have an excess of elements colored differently than the first element in the set. This problem leads, unexpectedly, to some deep questions concerning completely multiplicative functions with values in \+1,-1\. In particular, whether there is such a function with partial sums bounded from above.