Volcels are dense in incels. Few know this.
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Replying to @InaneImperium
You mean incels are dense in cels, that's what your sketch proof would show -- that is if it was correct, which it's not
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Replying to @JimmyTrussels
It would have been less aggressive to say every volcel is an element of ℚ̅/ℚ. Were you thinking only subsets can be dense?
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Replying to @InaneImperium
It seems to me that all Cel-spaces are nowhere-dense closed sets. You're trying to get a complete metric by a countable union
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Replying to @JimmyTrussels @InaneImperium
of Cel-spaces, which is impossible according to Baire Category Theorem. I'm open to correction though.
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Is this just a worry wrt metric underlying incel-space or do you claim there are only countably many sequences of incels?
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