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The Weak Choice Principle WISC may Fail in the Category of Sets
Studia Logica 103 (5):1005-1017 (2015)
Abstract
The set-theoretic axiom WISC states that for every set there is a set of surjections to it cofinal in all such surjections. By constructing an unbounded topos over the category of sets and using an extension of the internal logic of a topos due to Shulman, we show that WISC is independent of the rest of the axioms of the set theory given by a well-pointed topos. This also gives an example of a topos that is not a predicative topos as defined by van den BergOther Versions
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Citations of this work
Broad Infinity and Generation Principles.Paul Blain Levy - 2025 - Notre Dame Journal of Formal Logic -1:1-63.
References found in this work
The Type Theoretic Interpretation of Constructive Set Theory.Peter Aczel, Angus Macintyre, Leszek Pacholski & Jeff Paris - 1984 - Journal of Symbolic Logic 49 (1):313-314.
The axiom of multiple choice and models for constructive set theory.Benno van den Berg & Ieke Moerdijk - 2014 - Journal of Mathematical Logic 14 (1):1450005.
All Uncountable Cardinals Can be Singular.M. Gitik - 1984 - Journal of Symbolic Logic 49 (2):662-663.
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