On minimal non-potentially closed subsets of the plane

On minimal non-potentially closed subsets of the plane

We study the Borel subsets of the plane that can be made closed by refining the Polish topology on the real line. These sets are called potentially closed. We first compare Borel subsets of the plane using products of continuous functions. We show the existence of a perfect antichain made of minimal...

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Veröffentlicht in:Topology and its applications 2007, Vol.154 (1), p.241-262
1. Verfasser: Lecomte, Dominique
Format: Artikel
Sprache:eng
Schlagworte:
Baire classes
General Topology
Hurewicz's Theorem
Logic
Mathematics
Potentially
Reduction
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Zusammenfassung:We study the Borel subsets of the plane that can be made closed by refining the Polish topology on the real line. These sets are called potentially closed. We first compare Borel subsets of the plane using products of continuous functions. We show the existence of a perfect antichain made of minimal sets among non-potentially closed sets. We apply this result to graphs, quasi-orders and partial orders. We also give a non-potentially closed set minimum for another notion of comparison. Finally, we show that we cannot have injectivity in the Kechris–Solecki–Todorčević dichotomy about analytic graphs.
ISSN:0166-8641
1879-3207
DOI:10.1016/j.topol.2006.04.010