The axiom of choice in metric measure spaces and maximal $$\delta $$-separated sets

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Archive for Mathematical Logic 62 (5):735-749 (2023)
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Abstract

We show that the Axiom of Countable Choice is necessary and sufficient to prove that the existence of a Borel measure on a pseudometric space such that the measure of open balls is positive and finite implies separability of the space. In this way a negative answer to an open problem formulated in Górka (Am Math Mon 128:84–86, 2020) is given. Moreover, we study existence of maximal $$\delta $$ δ -separated sets in metric and pseudometric spaces from the point of view the Axiom of Choice and its weaker forms.

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10.1007/s00153-023-00868-4

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Separablilty of metric measure spaces and choice axioms.Paul Howard - forthcoming - Archive for Mathematical Logic:1-17.

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