Infinity does not have a predecessor, so it makes no sense to count back from it a finite number of steps.
If infinity does not have predecessors (ie is immune to normal arithmetic operations) then it is not possible for a sequence to approach it by adding a finite amount to succesive terms in order to approach it. This means that a sequence can not meaningfuly be asymptotic with infinity (meaning I have to be able to draw a asymptote, at least in theory, in order to demonstrate the limit).
If one constructs the Ordinals, which are isomorphism classes of well-ordered sets, and the Cardinals, which are equivalence classes of equipotent sets, one will automatically end up with all sorts of transfinite numbers.
If infinity is not a number, how is it possible to have a definite number (ie transfinite) which is larger than it? My contention is that number theory as you present it is playing fast and loose with the concept of infinity not being a number or visa versa. Jim Choate CyberTects ravage@ssz.com