As it turns out, proper classes are actually all the same size, larger than any set.
Thanks for the correction :)
No. For example, the power set of a proper class is another proper class that is bigger.
No, the power set (power class?) of a proper class doesn’t exist. Well, assuming we’re talking about NBG set theory—what did you have in mind?
oops...I was confusing NBG with MK.
M, I don’t know anything about MK.
As it turns out, proper classes are actually all the same size, larger than any set.
Thanks for the correction :)
No. For example, the power set of a proper class is another proper class that is bigger.
No, the power set (power class?) of a proper class doesn’t exist. Well, assuming we’re talking about NBG set theory—what did you have in mind?
oops...I was confusing NBG with MK.
M, I don’t know anything about MK.