Bounds on Van der Waerden Numbers and Some Related Functions

Abstract

For positive integers s and k1, k2, ..., ks, let w(k1,k2,...,ks) be the minimum integer n such that any s-coloring \1,2,...,n\ \1,2,...,s\ admits a ki-term arithmetic progression of color i for some i, 1 ≤ i ≤ s. In the case when k1=k2=...=ks=k we simply write w(k;s). That such a minimum integer exists follows from van der Waerden's theorem on arithmetic progressions. In the present paper we give a lower bound for w(k,m) for each fixed m. We include a table with values of w(k,3) which match this lower bound closely for 5 ≤ k ≤ 16. We also give an upper bound for w(k,4), an upper bound for w(4;s), and a lower bound for w(k;s) for an arbitrary fixed k. We discuss a number of other functions that are closely related to the van der Waerden function.