A new proof of the Larman-Rogers upper bound for the chromatic number of the Euclidean space
Abstract
The chromatic number (Rn) of the Euclidean space Rn is the smallest number of colors sufficient for coloring all points of the space in such a way that any two points at the distance 1 have different colors. In 1972 Larman--Rogers proved that (Rn) ≤ (3 + o(1))n. We give a new proof of this bound.
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