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zbMath0562.54039MaRDI QIDQ3675176

William G. Fleissner

Publication date: 1984

Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.

zbMATH Keywords

ZFC large cardinals product measure extension axiom normal Moore space problem normal nonmetrizable Moore spaces normal not collectionwise normal spaces

Mathematics Subject Classification ID

Metric spaces, metrizability (54E35) Consistency and independence results (03E35) Large cardinals (03E55) Moore spaces (54E30) Consistency and independence results in general topology (54A35) Research exposition (monographs, survey articles) pertaining to general topology (54-02)

Related Items (28)

On \(\nearrow\)-normal spaces ⋮ Pmea and First Countable, Countably Paracompact Spaces ⋮ Hereditarily strongly cwH and other separation axioms ⋮ New proofs of the consistency of the normal Moore space conjecture. I ⋮ Hereditary normality of \(\gamma\mathbb{N}\)-spaces ⋮ Extending Discrete-Valued Functions ⋮ A Subcategory of Top ⋮ Classic problems III ⋮ If all Normal Moore Spaces are Metrizable, then there is an Inner Model with a Measurable Cardinal ⋮ A finite product of ordinals is hereditarily dually discrete ⋮ Monotonically countably paracompact, collectionwise Hausdorff spaces and measurable cardinals ⋮ On Collectionwise Normality of Locally Compact, Normal Spaces ⋮ Monotone normality ⋮ Nonequality of dimensions for metric groups ⋮ Two Moore manifolds ⋮ Large Cardinals and Small Dowker Spaces ⋮ Metrizable Spaces where the Inductive Dimensions Disagree ⋮ Fleissner's normal Moore space and lynxes ⋮ An example in the dimension theory of metrizable spaces ⋮ On first countable, countably compact spaces. II: Remainders in a van Douwen construction and P-ideals ⋮ A note on the Prabir Roy space ⋮ Weak measure extension axioms ⋮ Additivity of metrizability and related properties ⋮ \(\omega_1\)-strongly compact cardinals and normality ⋮ New proofs of the consistency of the normal Moore space conjecture. II ⋮ A Separable Space with no Remote Points ⋮ \(\omega {}^*_ 2U(\omega_ 2)\) can be \(C^*\)-embedded in \(\beta \omega_ 2\) ⋮ More examples of metric spaces where the inductive dimensions disagree

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