First non-trivial upper bound on the circular chromatic number of the plane

Abstract

We consider circular version of the famous Nelson-Hadwiger problem. It is know that 4 colors are necessary and 7 colors suffice to color the euclidean plane in such a way that points at distance one get different colors. In r-circular coloring we assign arcs of length one of a circle with a perimeter r in such a way that points at distance one get disjoint arcs. In this paper we show the existence of r-circular coloring for r=4+433≈ 6.30. It is the first result with r-circular coloring of the plane with r smaller than 7. We also show r-circular coloring of the plane with r<7 in the case when we require disjoint arcs for points at distance belonging to the internal [1011, 1211].