# easy way to see this, is to ask yourself: how come in mathematics # there's no such thing as "addresses/pointers/references".
The whole point of Goedelisation was to add to name/value references into number theory. Thus Goedel was able to add back pointers contrary to the set hierarchy of the theory of types and reintroduce Russel's paradox. -- SM Ryan http://www.rawbw.com/~wyrmwif/ The little stoner's got a point. -- http://mail.python.org/mailman/listinfo/python-list
