Broadening the Iterative Conception of Set

Notre Dame Journal of Formal Logic 42 (3):149-170 (2001)
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Abstract

The iterative conception of set commonly is regarded as supporting the axioms of Zermelo-Fraenkel set theory (ZF). This paper presents a modified version of the iterative conception of set and explores the consequences of that modified version for set theory. The modified conception maintains most of the features of the iterative conception of set, but allows for some non-wellfounded sets. It is suggested that this modified iterative conception of set supports the axioms of Quine's set theory NF

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10.1305/ndjfl/1063372198

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References found in this work

The iterative conception of set.George Boolos - 1971 - Journal of Philosophy 68 (8):215-231.
New Foundations for Mathematical Logic.W. V. Quine - 1937 - Journal of Symbolic Logic 2 (2):86-87.
Iteration Again.George Boolos - 1989 - Philosophical Topics 17 (2):5-21.
A set of axioms for logic.Theodore Hailperin - 1944 - Journal of Symbolic Logic 9 (1):1-19.
A Set of Axioms for Logic.Theodore Hailperin - 1944 - Journal of Symbolic Logic 9 (3):73-74.

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