James Hanson has pointed out that this comment in the introduction:
In set theory, various circumlocutions are required to obtain notions of “cardinal num-
ber” and “ordinal number” which canonically represent isomorphism classes of sets and
well-ordered sets, respectively — possibly involving the axiom of choice or the axiom of
foundation. But with univalence and higher inductive types, we can obtain such represen-
tatives directly by truncating the universe.
is somewhat misleading, because if a set theory has as many universes as type theory does one can do something similar to obtain a more direct notion of cardinal number by simply quotienting a universe by the equivalence relation of equinumerosity. This is relative to the universe, of course, but so is the type-theoretic notion. So what's added by HoTT is not really the avoidance of AC/AF but just the fact that we can simply truncate the universe, referring to its intrinsic notion of equality and making it an -hset, rather than having to choose the appropriate equivalence relation.
I don't have a rewording to suggest at this time, and I'm not sure whether this is an allowed "first-edition change" either. Thoughts?
James Hanson has pointed out that this comment in the introduction:
is somewhat misleading, because if a set theory has as many universes as type theory does one can do something similar to obtain a more direct notion of cardinal number by simply quotienting a universe by the equivalence relation of equinumerosity. This is relative to the universe, of course, but so is the type-theoretic notion. So what's added by HoTT is not really the avoidance of AC/AF but just the fact that we can simply truncate the universe, referring to its intrinsic notion of equality and making it an -hset, rather than having to choose the appropriate equivalence relation.
I don't have a rewording to suggest at this time, and I'm not sure whether this is an allowed "first-edition change" either. Thoughts?