Every set can be well-ordered and you cannot convince me otherwise. AOC good.

  • Puffin [any, they/them]
    hexagon
    ·
    4 years ago

    Honestly I'm pretty comfortable with most of the equivalent statements. Here are the statements I find especially intuitive:

    • The axiom of choice itself (the cartesian product of an infinite number of sets is non-empty)
    • Every surjective function has a right inverse
    • Trichotomy of set cardinality
    • Zorn's Lemma/Every vector space has a basis/Every ring has a maximal ideal/Every group has a maximal subgroup/Every connected graph has a spanning tree
    • Tychonoff's theorem
    • This one is equivalent to countable choice, but that a countable union of countable sets is countable
    • Well-ordering theorem

    Some of the weirder statements implied by it like Banach-Tarski/existence of non-Lebesgue measurable sets I just personally chalk up to general infinity weirdness in the same vein as something like Hilbert's Hotel.