Embeddings of metric Boolean algebras in RN

Abstract

A Boolean algebra equipped with a (finitely-additive) positive probability measure m can be turned into a metric space ( , dm), where dm(a,b)= m ((a b)( a b)), for any a,b∈ A, sometimes referred to as metric Boolean algebra. In this paper, we study under which conditions the space of atoms of a finite metric Boolean algebra can be isometrically embedded in RN (for a certain N) equipped with the Euclidean metric. In particular, we characterize the topology of the positive measures over a finite algebra such that the metric space (At(), dm) embeds isometrically in RN.

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