Progressions and Paths in Colorings of Z

Abstract

A ladder is a set S ⊂eq Z+ such that any finite coloring of Z contains arbitrarily long monochromatic progressions with common difference in S. Van der Waerden's theorem famously asserts that Z+ itself is a ladder. We also discuss variants of ladders, namely accessible and walkable sets, which are sets S such that any coloring of Z contains arbitrarily long (for accessible sets) or infinite (for walkable sets) monochromatic sequences with consecutive differences in S. We show that sets with upper density 1 are ladders and walkable. We also show that all directed graphs with infinite chromatic number are accessible, and reduce the bound on the walkability order of sparse sets from 3 to 2, making it tight.