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James sequences and Dependent Choices

✍ Scribed by Marianne Morillon

Publisher
John Wiley and Sons
Year
2005
Tongue
English
Weight
240 KB
Volume
51
Category
Article
ISSN
0044-3050

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✦ Synopsis

We prove James's sequential characterization of (compact) reflexivity in set-theory ZF + DC, where DC is the axiom of Dependent Choices. In turn, James's criterion implies that every infinite set is Dedekind-infinite, whence it is not provable in ZF. Our proof in ZF + DC of James' criterion leads us to various notions of reflexivity which are equivalent in ZFC but are not equivalent in ZF. We also show that the weak compactness of the closed unit ball of a (simply) reflexive space does not imply the Boolean Prime Ideal theorem : this solves a question raised in [6].

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