TWO TOPOLOGICAL EQUIVALENTS OF THE AXIOM OF CHOICE
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Publication:4295255
DOI10.1002/MALQ.19920380152zbMATH Open0797.04004OpenAlexW2017568032WikidataQ114696409 ScholiaQ114696409MaRDI QIDQ4295255
Publication date: 8 June 1994
Published in: Mathematical Logic Quarterly (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1002/malq.19920380152
topological closuretopological spacesaxiom of choiceproduct topologyTychonoff's theoremcomplete uniform spaces
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Title not available (Why is that?) ⋮ Title not available (Why is that?) ⋮ Closed products of sets and the axiom of choice ⋮ Excluded Middle versus Choice in a topos ⋮ Kelley's specialization of Tychonoff's Theorem is equivalent to the Boolean Prime Ideal Theorem ⋮ Filters, Antichains and Towers in Topological Spaces and the Axiom of Choice ⋮ Alexander Subbase Theorem for Filters ⋮ Title not available (Why is that?) ⋮ Restricted internal choice in a topos
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