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Compact and Loeb Hausdorff spaces in equation image and the axiom of choice for families of finite sets

Kyriakos Keremedis

Mathematical Logic Quarterly 58 (3):130-138 (2012)

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The structure of amorphous sets.J. K. Truss - 1995 - Annals of Pure and Applied Logic 73 (2):191-233.details A set is said to be amorphous if it is infinite, but is not the disjoint union of two infinite subsets. Thus amorphous sets can exist only if the axiom of choice is false. We give a general study of the structure which an amorphous set can carry, with the object of eventually obtaining a complete classification. The principal types of amorphous set we distinguish are the following: amorphous sets not of projective type, either bounded or unbounded size of members (...) Logic and Philosophy of Logic Model Theory in Logic and Philosophy of Logic Direct download (4 more) Export citation Bookmark 13 citations
Notions of compactness for special subsets of ℝ I and some weak forms of the axiom of choice.Marianne Morillon - 2010 - Journal of Symbolic Logic 75 (1):255-268.details We work in set-theory without choice ZF. A set is Countable if it is finite or equipotent with ${\Bbb N}$ . Given a closed subset F of [0, 1] I which is a bounded subset of $\ell ^{1}(I)$ (resp. such that $F\subseteq c_{0}(I)$ ), we show that the countable axiom of choice for finite sets, (resp. the countable axiom of choice AC N ) implies that F is compact. This enhances previous results where AC N (resp. the axiom of Dependent (...) The Axiom of Choice in Philosophy of Mathematics Direct download (6 more) Export citation Bookmark 2 citations
Products of some special compact spaces and restricted forms of AC.Kyriakos Keremedis & Eleftherios Tachtsis - 2010 - Journal of Symbolic Logic 75 (3):996-1006.details We establish the following results: 1. In ZF (i.e., Zermelo-Fraenkel set theory minus the Axiom of Choice AC), for every set I and for every ordinal number α ≥ ω, the following statements are equivalent: (a) The Tychonoff product of\| α\| many non-empty finite discrete subsets of I is compact. (b) The union of\| α\| many non-empty finite subsets of I is well orderable. 2. The statement: For every infinite set I, every closed subset of the Tychonoff product [0, 1] (...) Axioms of Set Theory in Philosophy of Mathematics Logic and Philosophy of Logic Direct download (6 more) Export citation Bookmark 2 citations
Products of compact spaces in the least permutation model.Norbert Brunner - 1985 - Mathematical Logic Quarterly 31 (25‐28):441-448.details Areas of Mathematics in Philosophy of Mathematics Direct download Export citation Bookmark 5 citations
Products of Compact Spaces in the Least Permutation Model.Norbert Brunner - 1985 - Zeitschrift fur mathematische Logik und Grundlagen der Mathematik 31 (25-28):441-448.details Areas of Mathematics in Philosophy of Mathematics Direct download Export citation Bookmark 5 citations

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