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by upquark
3363 days ago
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I said "and other groups that reject all infinite constructions". Some schools of thought within that general intuitionist/constructivist/etc branch of mathematical logic do reject all infinite constructions:
https://en.wikipedia.org/wiki/Finitism Either way, my point above was that this entire branch is not "mainstream math" by any means, AFAIK |
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I just wanted to clarify that intuitionistic and constructive mathematics don't have any problems with infinite constructions either. Finitism and ultrafinitism do, but they're not what's usually called "constructive mathematics".
There are at least three orthogonal axes which you can classify mathematical schools of thought in:
* Is the law of excluded middle accepted? ("Any statement is either true or not true.")
* Are infinite sets accepted? (They are not in finitism, but they are in constructive mathematics and of course in ordinary mathematics.)
* Can constructions implicitly refer to the result of what is being constructed? Is the powerclass of a set again a set? (Yes in ordinary mathematics and in constructive mathematics, no in predicative mathematics.)