On the chromatic numbers of 3-dimensional slices

Abstract

We prove that for an arbitrary $\varepsilon > 0$ holds $$\chi (\mathbb{R}^3 \times [0,\varepsilon]^6) \geq 10,$$ where $\chi(M)$ stands for the chromatic number of an (infinite) graph with the vertex set $M$ and the edge set consists of pairs of monochromatic points at the distance 1 apart