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Full Idea
Impredicative definitions are admitted into ordinary mathematics.
Gist of Idea
Impredicative definitions are admitted into ordinary mathematics
Source
Kurt Gödel (Russell's Mathematical Logic [1944], p.464)
Book Ref
'Philosophy of Mathematics: readings (2nd)', ed/tr. Benacerraf/Putnam [CUP 1983], p.464
A Reaction
The issue is at what point in building an account of the foundations of mathematics (if there be such, see Putnam) these impure definitions should be ruled out.
10041 | Impredicative Definitions refer to the totality to which the object itself belongs [Gödel] |
21716 | In simple type theory the axiom of Separation is better than Reducibility [Gödel, by Linsky,B] |
10035 | Mathematical Logic is a non-numerical branch of mathematics, and the supreme science [Gödel] |
10038 | A logical system needs a syntactical survey of all possible expressions [Gödel] |
10039 | Some arithmetical problems require assumptions which transcend arithmetic [Gödel] |
10042 | Reference to a totality need not refer to a conjunction of all its elements [Gödel] |
10043 | Mathematical objects are as essential as physical objects are for perception [Gödel] |
10045 | Impredicative definitions are admitted into ordinary mathematics [Gödel] |
10046 | The generalized Continuum Hypothesis asserts a discontinuity in cardinal numbers [Gödel] |