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A Difficulty with the Frege-Russell Definition of Number
Journal of Philosophy 74 (7):409-414 (1977)
Abstract
An objection is offered to the Frege-Russell definition, which identifies the number 1 with the set of all unit sets. It is argued here that the identity conditions for sets require that if any member of a set had not existed, the set itself would not have. Therefore, had any object whatever not existed, the unit set containing it would not have either, and thus the set with which the definition identifies 1 would not have. But then, 1 either would not have existed or would have been a different entity than it is, and it is argued that neither alternative is acceptable.Links
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Citations of this work
A Metaphysical Puzzle for Neo‐Fregean Abstractionists.Thomas Donaldson - 2023 - Theoria 89 (3):266-279.
Sets, species, and evolution: Comments on Philip Kitcher's "species".Elliott Sober - 1984 - Philosophy of Science 51 (2):334-341.
Against the monism of the moment: A reply to Elliott Sober.Philip Kitcher - 1984 - Philosophy of Science 51 (4):616-630.
A new perspective on the problem of applying mathematics.Christopher Pincock - 2004 - Philosophia Mathematica 12 (2):135-161.
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