Four plane unit vectors generate a 3-colorable graph

Abstract

We show that given an arbitrary set of four plane unit vectors v1, v2, v3, v4, the Cayley graph generated by \ v1, v2, v3, v4\ is always 3-colorable. Indeed, we show that this is a specific case of a much more general result wherein we determine the chromatic number of an arbitrary abelian Cayley graph generated by a set of four elements and their negatives, subject to the constraint that the group of relations between those elements has rank no more than 2.

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