Proof of Nuprl Lemma : fpf-sub-functionality

Step * 2 of Lemma fpf-sub-functionality

1. A : Type
2. A' : Type
3. strong-subtype(A;A')
4. B : A ⟶ Type
5. C : A' ⟶ Type
6. eq : EqDecider(A)
7. eq' : EqDecider(A')
8. f : a:A fp-> B[a]
9. g : a:A fp-> B[a]
10. ∀a:A. (B[a] ⊆r C[a])
11. ∀x:A. ((↑x ∈ dom(f)) ⇒ ((↑x ∈ dom(g)) c∧ (f(x) = g(x) ∈ B[x])))
12. ∀b:A'. ∀a:A.  ((b = a ∈ A') ⇒ (b = a ∈ A))
13. x : A
14. ↑x ∈ dom(f)
15. (↑x ∈ dom(g)) c∧ (f(x) = g(x) ∈ B[x])
⊢ (↑x ∈ dom(g)) c∧ (f(x) = g(x) ∈ C[x])
BY
{ xxx((D (-1)) THEN D 0)xxx }

1
1. A : Type
2. A' : Type
3. strong-subtype(A;A')
4. B : A ⟶ Type
5. C : A' ⟶ Type
6. eq : EqDecider(A)
7. eq' : EqDecider(A')
8. f : a:A fp-> B[a]
9. g : a:A fp-> B[a]
10. ∀a:A. (B[a] ⊆r C[a])
11. ∀x:A. ((↑x ∈ dom(f)) ⇒ ((↑x ∈ dom(g)) c∧ (f(x) = g(x) ∈ B[x])))
12. ∀b:A'. ∀a:A.  ((b = a ∈ A') ⇒ (b = a ∈ A))
13. x : A
14. ↑x ∈ dom(f)
15. ↑x ∈ dom(g)
16. f(x) = g(x) ∈ B[x]
⊢ ↑x ∈ dom(g)

2
1. A : Type
2. A' : Type
3. strong-subtype(A;A')
4. B : A ⟶ Type
5. C : A' ⟶ Type
6. eq : EqDecider(A)
7. eq' : EqDecider(A')
8. f : a:A fp-> B[a]
9. g : a:A fp-> B[a]
10. ∀a:A. (B[a] ⊆r C[a])
11. ∀x:A. ((↑x ∈ dom(f)) ⇒ ((↑x ∈ dom(g)) c∧ (f(x) = g(x) ∈ B[x])))
12. ∀b:A'. ∀a:A.  ((b = a ∈ A') ⇒ (b = a ∈ A))
13. x : A
14. ↑x ∈ dom(f)
15. ↑x ∈ dom(g)
16. f(x) = g(x) ∈ B[x]
17. ↑x ∈ dom(g)
⊢ f(x) = g(x) ∈ C[x]

Latex:

Latex:
1. A : Type 2. A' : Type 3. strong-subtype(A;A') 4. B : A {}\mrightarrow{} Type 5. C : A' {}\mrightarrow{} Type 6. eq : EqDecider(A) 7. eq' : EqDecider(A') 8. f : a:A fp-> B[a] 9. g : a:A fp-> B[a] 10. \mforall{}a:A. (B[a] \msubseteq{}r C[a]) 11. \mforall{}x:A. ((\muparrow{}x \mmember{} dom(f)) {}\mRightarrow{} ((\muparrow{}x \mmember{} dom(g)) c\mwedge{} (f(x) = g(x)))) 12. \mforall{}b:A'. \mforall{}a:A. ((b = a) {}\mRightarrow{} (b = a)) 13. x : A 14. \muparrow{}x \mmember{} dom(f) 15. (\muparrow{}x \mmember{} dom(g)) c\mwedge{} (f(x) = g(x)) \mvdash{} (\muparrow{}x \mmember{} dom(g)) c\mwedge{} (f(x) = g(x)) By Latex: xxx((D (-1)) THEN D 0)xxx Home Index