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Assuming the continuum hypothesis CH, it is proved that there exists a perfectly normal compact topological space Z and a countable set $$E \subset Z$$ such that $$Z{\backslash }E$$ is… Click to show full abstract
Assuming the continuum hypothesis CH, it is proved that there exists a perfectly normal compact topological space Z and a countable set $$E \subset Z$$ such that $$Z{\backslash }E$$ is not condensed onto a compact space. The existence of such a space answers (in CH) negatively to V.I. Ponomarev’s question as to whether every perfectly normal compact space is an $$\alpha $$-space. It is proved that, in the class of ordered compact spaces, the property of being an $$\alpha $$-space is not multiplicative.
Keywords:
space;
compact spaces;
problem condensation;
condensation onto;
onto compact
Journal Title: Doklady Mathematics
Year Published: 2019
Link to full text (if available)
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Journal Title: Doklady Mathematics
Year Published: 2019
Link to full text (if available)
Share on Social Media: Sign Up to like & get
recommendations!