I considered deleting the post, but this seems more cowardly than just admitting I was wrong. But TIL something!

  • FishFace@lemmy.world
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    10 months ago

    There is a function which, for each real number, gives you a unique number between 0 and 1. For example, 1/(1+e^x). This shows that there are no more numbers between 0 and 1 than there are real numbers. The formalisation of this fact is contained in the Cantor-Schröder-Bernstein theorem.

      • FishFace@lemmy.world
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        10 months ago

        This is pretty trivial if you know that the cardinality of (0, 1) is the same as that of R ;)

      • lad@programming.dev
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        10 months ago

        Isn’t cardinality of [0, 1] = cardinality of {0, 1} + cardinality of (0, 1)? One part of the sum is finite thus doesn’t contribute to the result

        • lemmington_steele@lemmy.world
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          10 months ago

          technically yes, but the proof would usually show that this works by constructing the bijection of [0,1] and (0,1) and then you’d say the cardinalities are the same by the Schröder-Berstein theorem, because the proof of the latter is likely not something you want to demonstrate every day