K = {e st e belongs W(e) is given as an example with creative function
f(x) = x
It is stated that naturally occurring non computable sets ar usually
creative.
Is K(k) = { W(e) st (k belongs to W(e)} creative?
The creative function should be f(e) = k. However for some values of
k , { k belongs W(K) and so f(k) belongs K(k) and the set is not
creative.
What have I misunderstood?
Can you give an example of a creative set with creative function
different from f(x) = x?
Dick Batchelor
>I am trying to understand computability by reading "Computability
>Theory" by Cooper. I am stuck on the concept of Creative Set.
>A creative set, A is defined as:-
>A is creative if
>1. A is c.e.
What does "c. e." mean?
>2. There exists f(e) s.t.
> W(e) belongs ^A => f(e) belongs ^A-W(e)
What is W? Is ^A supposed to be the complement of A?
>K = {e st e belongs W(e) is given as an example with creative function
>f(x) = x
>It is stated that naturally occurring non computable sets ar usually
>creative.
>
>Is K(k) = { W(e) st (k belongs to W(e)} creative?
>The creative function should be f(e) = k. However for some values of
>k , { k belongs W(K) and so f(k) belongs K(k) and the set is not
>creative.
>
>What have I misunderstood?
>Can you give an example of a creative set with creative function
>different from f(x) = x?
>
>Dick Batchelor
David C. Ullrich
"Understanding Godel isn't about following his formal proof.
That would make a mockery of everything Godel was up to."
(John Jones, "My talk about Godel to the post-grads."
in sci.logic.)
>
> >2. There exists f(e) s.t.
> > �W(e) belongs ^A � => � f(e) belongs ^A-W(e)
>
> What is W? Is ^A supposed to be the complement of A?
W(e) is the "halting set" of e. Thus W(k) = {1,2,3} means "Turing
machine k halts if it is started with 1, 2, or 3 on its tape and NOT
OTHERWISE.
^A is the complement of A (I think; I may have misunderstood the
notation)
The critical statement is f(e) belong to ^A - W(e) which I take to
mean:-
f(e) does not belong to A
and f(e) does not belong to W(e)