Proof of Nuprl Lemma : brouwer_prin_for_num27_2

Step * of Lemma brouwer_prin_for_num27_2_equiv

brouwer_prin_for_num_27_2{i:l}()

brouwer_prin_for_num_27_2_orig{i:l}()
BY
{ (RepUR ``brouwer_prin_for_num_27_2_orig brouwer_prin_for_num_27_2`` 0

THEN Auto
THEN InstHyp [

A

] 1

   THEN Auto
   THEN D (-1)
   THEN InstConcl [

T

]

THEN Auto) }

1
1.

A:

((

f:

.

b:

. (A f b))

(

T:

List

f:

. (

!y:

. (T mklist(y;f)) > 0

(

y:

. (((T mklist(y;f)) > 0)

(A f (T mklist(y;f)--1)))))))@i'
2. A :

@i'
3.

f:

.

b:

. (A f b)@i
4. T :

List

5.

f:

. (

!y:

. (T mklist(y;f)) > 0

(

y:

. (((T mklist(y;f)) > 0)

(A f (T mklist(y;f)--1)))))
6. f :

@i

y:

. (((T mklist(y;f)) > 0)

(

x:

. (((T mklist(x;f)) > 0)

(y = x)))

(A f (T mklist(y;f)--1)))

2
1.

A:

((

f:

.

b:

. (A f b))

(

T:

List

f:

y:

. (((T mklist(y;f)) > 0)

(

x:

. (((T mklist(x;f)) > 0)

(y = x)))

(A f (T mklist(y;f)--1)))))@i'
2. A :

@i'
3.

f:

.

b:

. (A f b)@i
4. T :

List

5.

f:

.

y:

. (((T mklist(y;f)) > 0)

(

x:

. (((T mklist(x;f)) > 0)

(y = x)))

(A f (T mklist(y;f)--1)))
6. f :

@i

!y:

. (T mklist(y;f)) > 0

3
1.

A:

((

f:

.

b:

. (A f b))

(

T:

List

f:

y:

. (((T mklist(y;f)) > 0)

(

x:

. (((T mklist(x;f)) > 0)

(y = x)))

(A f (T mklist(y;f)--1)))))@i'
2. A :

@i'
3.

f:

.

b:

. (A f b)@i
4. T :

List

5.

f:

.

y:

. (((T mklist(y;f)) > 0)

(

x:

. (((T mklist(x;f)) > 0)

(y = x)))

(A f (T mklist(y;f)--1)))
6. f :

@i
7. y :

@i
8. (T mklist(y;f)) > 0@i

A f (T mklist(y;f)--1)

brouwer\_prin\_for\_num\_27\_2\{i:l\}() \mLeftarrow{}{}\mRightarrow{} brouwer\_prin\_for\_num\_27\_2\_orig\{i:l\}() By (RepUR ``brouwer\_prin\_for\_num\_27\_2\_orig brouwer\_prin\_for\_num\_27\_2`` 0\mcdot{} THEN Auto THEN InstHyp [\mkleeneopen{}A\mkleeneclose{}] 1\mcdot{} THEN Auto THEN D (-1) THEN InstConcl [\mkleeneopen{}T\mkleeneclose{}] \mcdot{} THEN Auto) Home Index