A proof of a Dodecahedron conjecture for distance sets
Abstract
A finite subset of a Euclidean space is called an s-distance set if there exist exactly s values of the Euclidean distances between two distinct points in the set. In this paper, we prove that the maximum cardinality among all 5-distance sets in R3 is 20, and every 5-distance set in R3 with 20 points is similar to the vertex set of a regular dodecahedron.
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