Improvement of generalization of Larman-Rogers-Seidel's theorem

Abstract

A finite set X in the d-dimensional Euclidean space is called an s-distance set if the set of distances between any two distinct points of X has size s. In 1977, Larman-Rogers-Seidel proved that if the cardinality of an two-distance set is large enough, then there exists an integer k such that the two distances α, β (α < β) having the integer condition, namely, α2β2=k-1k. In 2011, Nozaki generalized Larman-Rogers-Seidel's theorem to the case of s-distance sets, i.e. if the cardinality of an s-distance set |X|≥slant 2N with distances α1,α2,·s,αs, where N=d+s-1s-1+d+s-2s-2, then the numbers ki=Πj=1,2,·s,s, j≠ iαj2αj2-αi2 are integers. In this note, we reduce the lower bound of the requirement of integer condition of s-distance sets in Rd. Furthermore, we can show that there are only finitely many s-distance sets X in Rd with |X|≥slant 2d+s-1s-1.

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