Proof of Nuprl Lemma : homeo-image-inverse

Step * 2 of Lemma homeo-image-inverse

.....subterm..... T:t
1:n
1. X : Type
2. Y : Type
3. dX : metric(X)
4. dY : metric(Y)
5. h : homeomorphic(X;dX;Y;dY)
6. A : Type
7. A ⊆r X
8. respects-equality(X;A)
9. ∀a:A. ∀x:X.  (x ≡ a ⇒ (x ∈ A))
10. x : A
⊢ x ∈ homeo-image(homeo-image(A;Y;dY;h);X;dX;homeo-inv(h))
BY
{ (MemTypeCD THEN Auto) }

1
.....set predicate.....
1. X : Type
2. Y : Type
3. dX : metric(X)
4. dY : metric(Y)
5. h : homeomorphic(X;dX;Y;dY)
6. A : Type
7. A ⊆r X
8. respects-equality(X;A)
9. ∀a:A. ∀x:X.  (x ≡ a ⇒ (x ∈ A))
10. x : A
⊢ ∃a:homeo-image(A;Y;dY;h). x ≡ (fst(homeo-inv(h))) a

2
1. X : Type
2. Y : Type
3. dX : metric(X)
4. dY : metric(Y)
5. h : homeomorphic(X;dX;Y;dY)
6. A : Type
7. A ⊆r X
8. respects-equality(X;A)
9. ∀a:A. ∀x:X.  (x ≡ a ⇒ (x ∈ A))
10. x : A
11. y : X
12. a : homeo-image(A;Y;dY;h)
⊢ (fst(homeo-inv(h))) a ∈ X

Latex:

Latex:
.....subterm..... T:t 1:n 1. X : Type 2. Y : Type 3. dX : metric(X) 4. dY : metric(Y) 5. h : homeomorphic(X;dX;Y;dY) 6. A : Type 7. A \msubseteq{}r X 8. respects-equality(X;A) 9. \mforall{}a:A. \mforall{}x:X. (x \mequiv{} a {}\mRightarrow{} (x \mmember{} A)) 10. x : A \mvdash{} x \mmember{} homeo-image(homeo-image(A;Y;dY;h);X;dX;homeo-inv(h)) By Latex: (MemTypeCD THEN Auto) Home Index