Zero-sum Analogues of van der Waerden's Theorem on Arithmetic Progressions

Abstract

Let r and k be positive integers with r k. Denote by wz(k;r) the minimum integer such that every coloring :[1,wz(k;r)] → \0,1,…,r-1\ admits a k-term arithmetic progression a,a+d,…,a+(k-1)d with Σj=0k-1 (a+jd) 0 \,(mod \,r). We investigate these numbers as well as a "mixed" monochromatic/zero-sum analogue. We also present an interesting reciprocity between the van der Waerden numbers and wz(k;r).