We provide some constructive characterizations of the notion of bar subset for the complete binary tree, alias Cantor space, for the complete countable spreading tree, alias Baire Space, and, more generally, for an inductively generated formal topology. Moreover, by using a completeness theorem for inductively generated formal topologies, we prove that such characterizations are classically equivalent to the standard one.

Constructive characterizations of bar subsets

VALENTINI, SILVIO
2007

Abstract

We provide some constructive characterizations of the notion of bar subset for the complete binary tree, alias Cantor space, for the complete countable spreading tree, alias Baire Space, and, more generally, for an inductively generated formal topology. Moreover, by using a completeness theorem for inductively generated formal topologies, we prove that such characterizations are classically equivalent to the standard one.
2007
ANNALS OF PURE AND APPLIED LOGIC
WOS:000243828800008
2-s2.0-33845880636
W2076172147
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11577/1777183
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