Proof of Nuprl Lemma : iota-two-face-maps

Step * 1 1 1 of Lemma iota-two-face-maps

1. I : Cname List
2. x : Cname
3. y : Cname
4. z : Cname
5. i : ℕ2
6. j : ℕ2
7. ¬(x = z ∈ Cname)
8. ¬(y = z ∈ Cname)
9. (((x:=i) o (y:=j)) o iota(z)) = ((x:=i) o ((y:=j) o iota(z))) ∈ name-morph(I;[z / I-[x; y]])
10. ((y:=j) o iota(z)) = (iota(z) o (y:=j)) ∈ name-morph(I-[x];[z / I-[x]-[y]])
⊢ (((x:=i) o (y:=j)) o iota(z)) = (iota(z) o ((x:=i) o (y:=j))) ∈ name-morph(I;[z / I-[x; y]])
BY
{ ApFunToHypEquands `Z' ⌜((x:=i) o Z)⌝ ⌜name-morph(I;[z / I-[x; y]])⌝ (-1)⋅ }

1
.....fun wf.....
1. I : Cname List
2. x : Cname
3. y : Cname
4. z : Cname
5. i : ℕ2
6. j : ℕ2
7. ¬(x = z ∈ Cname)
8. ¬(y = z ∈ Cname)
9. (((x:=i) o (y:=j)) o iota(z)) = ((x:=i) o ((y:=j) o iota(z))) ∈ name-morph(I;[z / I-[x; y]])
10. ((y:=j) o iota(z)) = (iota(z) o (y:=j)) ∈ name-morph(I-[x];[z / I-[x]-[y]])
11. Z : name-morph(I-[x];[z / I-[x]-[y]])
⊢ ((x:=i) o Z) = ((x:=i) o Z) ∈ name-morph(I;[z / I-[x; y]])

2
1. I : Cname List
2. x : Cname
3. y : Cname
4. z : Cname
5. i : ℕ2
6. j : ℕ2
7. ¬(x = z ∈ Cname)
8. ¬(y = z ∈ Cname)
9. (((x:=i) o (y:=j)) o iota(z)) = ((x:=i) o ((y:=j) o iota(z))) ∈ name-morph(I;[z / I-[x; y]])
10. ((y:=j) o iota(z)) = (iota(z) o (y:=j)) ∈ name-morph(I-[x];[z / I-[x]-[y]])
11. ((x:=i) o ((y:=j) o iota(z))) = ((x:=i) o (iota(z) o (y:=j))) ∈ name-morph(I;[z / I-[x; y]])
⊢ (((x:=i) o (y:=j)) o iota(z)) = (iota(z) o ((x:=i) o (y:=j))) ∈ name-morph(I;[z / I-[x; y]])

Latex:

Latex:
1. I : Cname List 2. x : Cname 3. y : Cname 4. z : Cname 5. i : \mBbbN{}2 6. j : \mBbbN{}2 7. \mneg{}(x = z) 8. \mneg{}(y = z) 9. (((x:=i) o (y:=j)) o iota(z)) = ((x:=i) o ((y:=j) o iota(z))) 10. ((y:=j) o iota(z)) = (iota(z) o (y:=j)) \mvdash{} (((x:=i) o (y:=j)) o iota(z)) = (iota(z) o ((x:=i) o (y:=j))) By Latex: ApFunToHypEquands `Z' \mkleeneopen{}((x:=i) o Z)\mkleeneclose{} \mkleeneopen{}name-morph(I;[z / I-[x; y]])\mkleeneclose{} (-1)\mcdot{} Home Index