Coloring and density theorems for configurations of a given volume

Abstract

This is a treatise on finite point configurations spanning a fixed volume to be found in a single color-class of an arbitrary finite (measurable) coloring of the Euclidean space Rn, or in a single large measurable subset A⊂eqRn. More specifically, we study vertex-sets of simplices, rectangular boxes, and parallelotopes, attempting to make progress on several open problems posed in the 1970s and the 1980s. As one of the highlights, we give a negative answer to a question of Erdős and Graham, by coloring the Euclidean plane R2 in 25 colors without creating monochromatic rectangles of unit area. More generally, we construct a finite coloring of the Euclidean space Rn such that no color-class contains the 2m vertices of any (possibly rotated) m-dimensional rectangular box of volume 1. A positive result is still possible if rectangular boxes of merely sufficiently large volumes are sought in a single color-class of a finite measurable coloring of Rn, and we establish it under an additional assumption n≥ m+1. Also, motivated by a question of Graham on reasonable bounds in his result on monochromatic axes-aligned right-angled m-dimensional simplices, we establish its measurable coloring and density variants with polylogarithmic bounds, again in dimensions n≥ m+1. Next, we generalize a result of Erdős and Mauldin, by constructing an infinite measure set A⊂eqRn such that every n-parallelotope with vertices in A has volume strictly smaller than 1. Finally, some results complementing the literature on isometric embeddings of hypercube graphs and on the hyperbolic analogue of the Hadwiger-Nelson problem also follow as byproducts of our approaches.