Given two real, nonzero algebraic numbers a and b, with a > 0 (so that it excludes complex numbers), is there any named subset of the reals S such that (a^b) belongs to S forall a,b? I know it’s not all the reals since there should be countably many a^b’s, since a,b are also countable.

  • ns1@feddit.uk
    link
    fedilink
    English
    arrow-up
    2
    ·
    4 个月前

    Fun question! I don’t know the answer other than to say it’s not just the algebraics because of the Gelfond-Schneider constant

    Are you sure this is well-defined? You say that a and b are algebraic but “closure” implies that they could also be any members of S. This might mess up your proof that it’s not all the reals if you do mean the closure.

      • ns1@feddit.uk
        link
        fedilink
        English
        arrow-up
        2
        ·
        4 个月前

        You could say something like “the image of exponentiation over…” to mean the set of values created by applying the function once, but it sounds slightly clunky.

        Looks like there aren’t really very many sets of mostly transcendental numbers that have names. Computational numbers and periods are two of them, I’d guess that both probably contain your set, so you could compare with those to see where it gets you.