Proof of Nuprl Lemma : formal-sum-mul

Step * 1 1 1 of Lemma formal-sum-mul_functionality

1. S : Type
2. K : CRng
3. x : basic-formal-sum(K;S)
4. x' : basic-formal-sum(K;S)
5. k : |K|
6. k' : |K|
7. k = k' ∈ |K|
8. bfs-equiv(K;S;x;x')
9. x1 : basic-formal-sum(K;S)
10. y : basic-formal-sum(K;S)
11. s : bag(S)
12. x1 = (y + 0 * s) ∈ basic-formal-sum(K;S)
⊢ k * y + 0 * s = (k * y + 0 * s) ∈ basic-formal-sum(K;S)
BY
{ (RepUR ``formal-sum-mul`` 0
   THEN (RWO "bag-map-append" 0 THENA Auto)
   THEN Reduce 0⋅
   THEN Fold `formal-sum-mul` 0
   THEN EqCDA) }

1
.....subterm..... T:t
2:n
1. S : Type
2. K : CRng
3. x : basic-formal-sum(K;S)
4. x' : basic-formal-sum(K;S)
5. k : |K|
6. k' : |K|
7. k = k' ∈ |K|
8. bfs-equiv(K;S;x;x')
9. x1 : basic-formal-sum(K;S)
10. y : basic-formal-sum(K;S)
11. s : bag(S)
12. x1 = (y + 0 * s) ∈ basic-formal-sum(K;S)
⊢ k * 0 * s = 0 * s ∈ bag(|K| × S)

Latex:

Latex:
1. S : Type 2. K : CRng 3. x : basic-formal-sum(K;S) 4. x' : basic-formal-sum(K;S) 5. k : |K| 6. k' : |K| 7. k = k' 8. bfs-equiv(K;S;x;x') 9. x1 : basic-formal-sum(K;S) 10. y : basic-formal-sum(K;S) 11. s : bag(S) 12. x1 = (y + 0 * s) \mvdash{} k * y + 0 * s = (k * y + 0 * s) By Latex: (RepUR ``formal-sum-mul`` 0 THEN (RWO "bag-map-append" 0 THENA Auto) THEN Reduce 0\mcdot{} THEN Fold `formal-sum-mul` 0 THEN EqCDA) Home Index