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Topic: Matheology § 291
Replies: 28   Last Post: Jun 19, 2013 5:29 PM

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Tucsondrew@me.com

Posts: 794
Registered: 5/24/13
Re: Matheology § 291
Posted: Jun 17, 2013 1:43 AM
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On Sunday, June 16, 2013 1:46:14 PM UTC-7, muec...@rz.fh-augsburg.de wrote:
> Matheology § 291
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> Only someone who (like the intuitionist) denies that the concepts and axioms of classical set theory have any meaning (or any well-defined meaning) could be satisfied with such a solution {{undecidability of the continuum hypothesis}}, not someone who believes them to describe some well-determined reality. For this reality Cantor's conjecture must be either true or false, and its undecidability from the axioms known today can only mean that these axioms do not contain a complete description of this reality; [...] not one plausible proposition is known which would imply the continuum hypothesis. Therefore one may on good reason suspect that the role of the continuum problem in set theory will be this, that ...



> ... it will finally lead to the discovery of new axioms which will
>make it possible to disprove Cantor's conjecture.


In some systems consisting of ZFC + Some "Large Cardinal Axiom"
CH, even GHC, can be proved or disproved.

Perhaps Godel foresaw the coming power of Inner Model Theory
and Descriptive Set Theory.

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> Regards, WM


ZG



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