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Constructing Cantorian counterexamples
Journal of Philosophical Logic 26 (3):237-239 (1997)
Abstract
Cantor's diagonal argument provides an indirect proof that there is no one-one function from the power set of a set A into A. This paper provides a somewhat more constructive proof of Cantor's theorem, showing how, given a function f from the power set of A into A, one can explicitly define a counterexample to the thesis that f is one-oneMy notes
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Citations of this work
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