Proof of Nuprl Lemma : aa_kleene_fan_contra_partial

Step * 1 3 2 2 of Lemma aa_kleene_fan_contra_partial_imax

1. f :

bar(

)@i
2.

b:

bar(

).

a:

. ((f a) = b)@i
3. T :

@i
4.

indx,input:

.
((

nsteps:

. ((

(T indx input nsteps))

(f indx input)

))

((f indx input)

(

nsteps:

. (

(T indx input nsteps))))

(

n1,n2:

. (((n1

n2)

(

(T indx input n1)))

(

(T indx input n2)))))@i
5. x :

@i
6.

y.if T y y x then

(f y y) else ff fi

7. ||mklist(x;

y.if T y y x then

(f y y) else ff fi )|| ~ x
8. ||mklist(x;

y.if T y y x then

(f y y) else ff fi )|| = x
9. y :

@i
10. y < ||mklist(x;

y.if T y y x then

(f y y) else ff fi )||@i
11.

(T y y ||mklist(x;

y.if T y y x then

(f y y) else ff fi )||)@i
12. f y y = tt@i

mklist(x;

y.if T y y x then

(f y y) else ff fi )[y] = ff
BY
{ (HypSubst 7 11 THEN RWO "mklist_select" 0 THEN Auto THEN Reduce 0)

}

1
1. f :

bar(

)@i
2.

b:

bar(

).

a:

. ((f a) = b)@i
3. T :

@i
4.

indx,input:

.
((

nsteps:

. ((

(T indx input nsteps))

(f indx input)

))

((f indx input)

(

nsteps:

. (

(T indx input nsteps))))

(

n1,n2:

. (((n1

n2)

(

(T indx input n1)))

(

(T indx input n2)))))@i
5. x :

@i
6.

y.if T y y x then

(f y y) else ff fi

7. ||mklist(x;

y.if T y y x then

(f y y) else ff fi )|| ~ x
8. ||mklist(x;

y.if T y y x then

(f y y) else ff fi )|| = x
9. y :

@i
10. y < ||mklist(x;

y.if T y y x then

(f y y) else ff fi )||@i
11.

(T y y x)@i
12. f y y = tt@i

if T y y x then

(f y y) else ff fi = ff

1. f : \mBbbN{} {}\mrightarrow{} \mBbbN{} {}\mrightarrow{} bar(\mBbbB{})@i 2. \mforall{}b:\mBbbN{} {}\mrightarrow{} bar(\mBbbB{}). \mexists{}a:\mBbbN{}. ((f a) = b)@i 3. T : \mBbbN{} {}\mrightarrow{} \mBbbN{} {}\mrightarrow{} \mBbbN{} {}\mrightarrow{} \mBbbB{}@i 4. \mforall{}indx,input:\mBbbN{}. ((\mforall{}nsteps:\mBbbN{}. ((\muparrow{}(T indx input nsteps)) {}\mRightarrow{} (f indx input)\mdownarrow{})) \mwedge{} ((f indx input)\mdownarrow{} {}\mRightarrow{} (\mexists{}nsteps:\mBbbN{}. (\muparrow{}(T indx input nsteps)))) \mwedge{} (\mforall{}n1,n2:\mBbbN{}. (((n1 \mleq{} n2) \mwedge{} (\muparrow{}(T indx input n1))) {}\mRightarrow{} (\muparrow{}(T indx input n2)))))@i 5. x : \mBbbN{}@i 6. \mlambda{}y.if T y y x then \mneg{}\msubb{}(f y y) else ff fi \mmember{} \mBbbN{} {}\mrightarrow{} \mBbbB{} 7. ||mklist(x;\mlambda{}y.if T y y x then \mneg{}\msubb{}(f y y) else ff fi )|| \msim{} x 8. ||mklist(x;\mlambda{}y.if T y y x then \mneg{}\msubb{}(f y y) else ff fi )|| = x 9. y : \mBbbN{}@i 10. y < ||mklist(x;\mlambda{}y.if T y y x then \mneg{}\msubb{}(f y y) else ff fi )||@i 11. \muparrow{}(T y y ||mklist(x;\mlambda{}y.if T y y x then \mneg{}\msubb{}(f y y) else ff fi )||)@i 12. f y y = tt@i \mvdash{} mklist(x;\mlambda{}y.if T y y x then \mneg{}\msubb{}(f y y) else ff fi )[y] = ff By (HypSubst 7 11 THEN RWO "mklist\_select" 0 THEN Auto THEN Reduce 0)\mcdot{} Home Index