The prose is correct. You (presumably) aren't your grandmother, so we have x=/=y... | Hacker News

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		wasabi991011 42 days ago \| parent \| context \| favorite \| on: Category Theory Illustrated – Orders The prose is correct. You (presumably) aren't your grandmother, so we have x=/=y. Therefore by the biimplication, (x ≤ y and y ≤ x) is false i.e. either x ≤ y (I am better than my grandmother) or y ≤ x (my grandmother is better than me). The "neither" case is excluded by the law of totality.

gobdovan 42 days ago [–]

> The "neither" case is excluded by the law of totality.

We literally said the same thing. It doesn't follow from antisymmetry.

My point is precisely that:

(x <= y /\ y <= x) -> x = y

does not entail

x <= y \/ y <= x

The second statement is totality/comparability, not antisymmetry.

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