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The Independence of a Strong Axiom of Choice
Published online by Cambridge University Press: 03 November 2016
Extract
There is a growing realization among mathematicians and logicians of the many-sided role played by the axiom of choice in various branches of mathematics. Many of them tend to accept the axiom of choice as a legitimate principle provided, of course, it is proved to be independent in a suitable axiom system. This tendency has been accelerated by Gödel’s proof of the compatibility of this axiom in a reasonably broad system of axioms [2]. Such a view seems to have been shared by Fraenkel and Bar-Hillel [1; pp. 44-80] in their excellent exposition of the function of the axiom of choice in the modern mathematics in general and the axiomatic set theory in particular.
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References
1.
Fraenkel, Abraham A. and Bar-Hillel, Yehoshua, “Foundations of Set Theory”, Studies in Logic and Foundations of Mathematics, Amsterdam (North-Holland Publ. Co.), 1958
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