An analogue of a van der Waerden's theorem and its application to two-distance preserving mappings

Abstract

The van der Waerden's theorem reads that an equilateral pentagon in Euclidean 3-space E3 with all diagonals of the same length is necessarily planar and its vertex set coincides with the vertex set of some convex regular pentagon. We prove the following many-dimensional analogue of this theorem: for n≥slant 2, every n-dimensional cross-polytope in E2n-2 with all diagonals of the same length and all edges of the same length necessarily lies in En and hence is a convex regular cross-polytope. We also apply our theorem to the study of two-distance preserving mappings of Euclidean spaces.