• affiliate@lemmy.world
    link
    fedilink
    English
    arrow-up
    4
    ·
    2 months ago

    i still feel like this whole ε-δ thing could have been avoided if we had just put more effort into the “infinitesimals” approach, which is a bit more intuitive anyways.

    but on the other hand, you need a lot of heavy tools to make infinitesimals work in a rigorous setting, and shortcuts can be nice sometimes

    • someacnt_@lemmy.world
      link
      fedilink
      English
      arrow-up
      7
      ·
      2 months ago

      Infinitesimal approach is often more convoluted when you perform various operations, like exponentials.

      Instead, epsilon-delta can be encapsulated as a ball business, then later to inverse image check for topology.

      • affiliate@lemmy.world
        link
        fedilink
        English
        arrow-up
        1
        ·
        2 months ago

        i think the ε-δ approach leads to way more cumbersome and long proofs, and it leads to a good amount of separation between the “idea being proved” and the proof itself.

        it’s especially rough when you’re chasing around multiple “limit variables” that depend on different things. i still have flashbacks to my second measure theory course where we would spend an entire two hour lecture on one theorem, chasing around ε and η throughout different parts of the proof.

        best to nip it in the bud id say