Zach Weber scite author profile

Zach Weber

3Publications

89Citation Statements Received

67Citation Statements Given

How they've been cited

237

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Affiliations

University of Otago, University of Melbourne, University of Sydney

Publications

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Transfinite Numbers in Paraconsistent Set Theory

Weber

2010

Rev. symb. logic

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This paper begins an axiomatic development of naive set theory—the consequences of a full comprehension principle—in a paraconsistent logic. Results divide into two sorts. There is classical recapture, where the main theorems of ordinal and Peano arithmetic are proved, showing that naive set theory can provide a foundation for standard mathematics. Then there are major extensions, including proofs of the famous paradoxes and the axiom of choice (in the form of the well-ordering principle). At the end I indicate how later developments of cardinal numbers will lead to Cantor’s theorem, the existence of large cardinals, and a counterexample to the continuum hypothesis.

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Transfinite Cardinals in Paraconsistent Set Theory

Weber

2012

The Review of Symbolic Logic

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Extensionality and Restriction in Naive Set Theory

Weber

2010

Stud Logica

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The naive set theory problem is to begin with a full comprehension axiom, and to find a logic strong enough to prove theorems, but weak enough not to prove everything. This paper considers the sub-problem of expressing extensional identity and the subset relation in paraconsistent, relevant solutions, in light of a recent proposal from Beall, Brady, Hazen, Priest and Restall [4]. The main result is that the proposal, in the context of an independently motivated formalization of naive set theory, leads to triviality.

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Zach Weber

Transfinite Numbers in Paraconsistent Set Theory

Transfinite Cardinals in Paraconsistent Set Theory

Extensionality and Restriction in Naive Set Theory

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