> If I can accept that there are more reals than reals with finite descriptions,... | Hacker News

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		martinjacobd on Jan 23, 2023 \| parent \| context \| favorite \| on: An intutive counterexample to the axiom of choice > If I can accept that there are more reals than reals with finite descriptions, why can't there be integers without finite descriptions/positions? Because the integers are defined as the finite successors to the number 0 and their additive opposites. See, for instance, the construction section of: https://en.m.wikipedia.org/wiki/Integer You can start talking about numbers that can't be constructed in this way, but then you've ceased to be talking about the integers.

phkahler on Jan 23, 2023 [–]

Is the size of the set of integers an integer?

martinjacobd on Jan 23, 2023 | [–]

No, usually the cardinalities of infinite sets are represented by things called aleph numbers: https://en.m.wikipedia.org/wiki/Aleph_number.

But it isn't, in any case, an integer.

phkahler on Jan 24, 2023 | | [–]

Thanks! That to me is the most useful response to my ramblings today!

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