Natural deduction based set theories: a new resolution of the old paradoxes

Journal of Symbolic Logic 51 (2):393-411 (1986)
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Abstract

The comprehension principle of set theory asserts that a set can be formed from the objects satisfying any given property. The principle leads to immediate contradictions if it is formalized as an axiom scheme within classical first order logic. A resolution of the set paradoxes results if the principle is formalized instead as two rules of deduction in a natural deduction presentation of logic. This presentation of the comprehension principle for sets as semantic rules, instead of as a comprehension axiom scheme, can be viewed as an extension of classical logic, in contrast to the assertion of extra-logical axioms expressing truths about a pre-existing or constructed universe of sets. The paradoxes are disarmed in the extended classical semantics because truth values are only assigned to those sentences that can be grounded in atomic sentences.

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10.1017/s0022481200031261

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Citations of this work

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Wittgenstein on Incompleteness Makes Paraconsistent Sense.Francesco Berto - 2008 - In Francesco Berto, Edwin Mares, Koji Tanaka & Francesco Paoli (eds.), Paraconsistency: Logic and Applications. Springer. pp. 257--276.
Circumscribing with sets.Donald Perlis - 1987 - Artificial Intelligence 31 (2):201-211.

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On Denoting.Bertrand Russell - 1905 - Mind 14 (56):479-493.
Mathematical logic.Willard Van Orman Quine - 1951 - Cambridge,: Harvard University Press.
Natural Deduction: A Proof-Theoretical Study.Richmond Thomason - 1965 - Journal of Symbolic Logic 32 (2):255-256.
Mathematical Logic.Willard Van Orman Quine - 1940 - Cambridge, MA, USA: Harvard University Press.
The Calculi of Lambda-Conversion.Barkley Rosser - 1941 - Journal of Symbolic Logic 6 (4):171-171.

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