Yeah, it’s hard to phrase this well and I don’t know if there’s a standard phrasing. What I was trying to get at was the idea that some computable ordering is total and well-ordered, and therefore an ordinal.
Yeah, it’s hard to phrase this well and I don’t know if there’s a standard phrasing. What I was trying to get at was the idea that some computable ordering is total and well-ordered, and therefore an ordinal.