> Zermelo's "Z" set theory proves that the set of all subsets of N (i.e.
> the power set of N) is uncountable, but it doesn't state that all
> those subsets of N are definable in a parameter free manner,
This is in direct opposition to Naive Set Theory where
EVERY MEMBER OF EVERY SET is DEFINABLE BY A PREDICATE
So Axiom Of Choice was added :
A CHARACTERISTIC ELEMENT DEFINES A SET.
e.g.
midpoint( L : LINE )
if a midpoint exists, then so does a line!
-----------------------------
Or in Cantor's Case:
if an Anti-Diagonal Exists, then so does a SET OF THOSE REALS!
--------------------------
AOC: E(X) XeS -> E(S)
If 1 element is definable then so is the set.
--------------------------
But A.O.C. only complicates matters further...
It seems to define uncountable many elements
with a specification of 1 element <=> 1 set.
THE GODEL NUMBER OF A CHOICE FUNCTION
2 1 3 0 4 1 5
a 1 ( 0 , 1 )
MIDPOINT(0,1)
But now you have uncountable many choice functions!
One for each SET!
| N | = | GODEL NUMBERS |
| GODEL NUMBERS | = | FUNCTIONS |
| FUNCTIONS | = | CHOICE FUNCTIONS |
| CHOICE FUNCTIONS | = | ELEMENTS |
| ELEMENTS | = | SETS |
| SETS | > | N |
Once of these must be incorrect!
The only further resolution for Z.F.C. is
Uncountable Many Functions
| GODEL NUMBERS | < | FUNCTIONS |
Which means the WFF include Infinite Length Formula!
Such As:
IF SET1 has 1 - then MYSET skips 1 ./
or
IF SET1 skips 1 - then MYSET has 1
AND
IF SET2 has 2 - then MYSET skips 2 ./
or
IF SET2 skips 2 - then MYSET has 2
AND
IF SET3 has 3 - then MYSET skips 3
or
IF SET3 skips 3 - then MYSET has 3 .
...
CANTORS MISSING SET FORMULA
when expanded out to infinitely many terms.
You probably recognise the above as:
{ n | n ~e f(n) }
--------------------------------
Herc
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