Martin's axiom and the transitivity of \(P_{\mathfrak c}\)-points (Q690062)
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scientific article; zbMATH DE number 446872
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Martin's axiom and the transitivity of \(P_{\mathfrak c}\)-points |
scientific article; zbMATH DE number 446872 |
Statements
Martin's axiom and the transitivity of \(P_{\mathfrak c}\)-points (English)
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7 December 1993
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Using an infinite game, the author defines an equivalence relation \(\bowtie\) between ultrafilters on \(\mathbb{N}\). Martin's axiom implies that every two \(P_{\mathfrak c}\)-points are \(\bowtie\)-equivalent. Finally, modifying a construction by B. Veličković, a model of \(\text{ZFC}+\text{MA}_{\aleph_ 1}\) is constructed in which every two \(P_{\mathfrak c}\)-points are topologically equivalent. The equivalence relation \(\bowtie\) plays a central role in the construction.
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topological type
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infinite game
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ultrafilters
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Martin's axiom
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\(P_{\mathfrak c}\)-points
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