A Characterization of Similarity Maps Between Euclidean Spaces Related to the Beckman--Quarles Theorem

Abstract

It is shown that each continuous transformation h from Euclidean m-space (m>1) into Euclidean n-space that preserves the equality of distances (that is, fulfils the implication |x-y|=|z-w|⇒|h(x)-h(y)|=|h(z)-h(w)|) is a similarity map. The case of equal dimensions already follows from the Beckman--Quarles Theorem.

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