Colorings of the n-sphere and inversive geometry

Abstract

This paper shows that in dimensions n ≥ 2 for any partition of the set of points in the standard n-sphere Σi=0n xi2 =1 in Rn+1 into (n+3) or more nonempty sets, there exists a hyperplane in Rn+1 that intersects at least (n+2) of these sets. This result is used to prove a result in inversive geometry. A mapping T: S2 Sn, for n≥ 2,not assumed continuous or even measurable, is called weakly circle-preserving if the image of any circle is contained in some circle in the range space Sn. If such a map T has a range T(S2) in circular general position, meaning that any circle in the Sn misses at least two points of T(S2), then T must be a Mobius transformation of S2.