Proof of Nuprl Lemma : biject-quotient

Step * 2 1 1 of Lemma biject-quotient

.....wf.....
1. A : Type
2. B : Type
3. f : A ⟶ B
4. R : B ⟶ B ⟶ ℙ
5. Inj(A;B;f)
6. ∀b1:B. ∃a:A. ((f a) = b1 ∈ B)
7. EquivRel(B;x,y.x R y)
8. EquivRel(A;x,y.x R_f y)
9. quo-lift(f) ∈ (x,y:A//(x R_f y)) ⟶ (x,y:B//(x R y))
10. Inj(x,y:A//(x R_f y);x,y:B//(x R y);quo-lift(f))
11. b : x,y:B//(x R y)
12. g : b1:B ⟶ A
13. ∀b1:B. ((f (g b1)) = b1 ∈ B)
⊢ g b ∈ x,y:A//(x R_f y)
BY
{ (DVar `b' THEN EqTypeCD THEN Auto) }

1
.....antecedent.....
1. A : Type
2. B : Type
3. f : A ⟶ B
4. R : B ⟶ B ⟶ ℙ
5. Inj(A;B;f)
6. ∀b1:B. ∃a:A. ((f a) = b1 ∈ B)
7. EquivRel(B;x,y.x R y)
8. EquivRel(A;x,y.x R_f y)
9. quo-lift(f) ∈ (x,y:A//(x R_f y)) ⟶ (x,y:B//(x R y))
10. Inj(x,y:A//(x R_f y);x,y:B//(x R y);quo-lift(f))
11. b : Base
12. b1 : Base
13. b = b1 ∈ pertype(λx,y. ((x ∈ B) ∧ (y ∈ B) ∧ (x R y)))
14. b ∈ B
15. b1 ∈ B
16. b R b1
17. g : b1:B ⟶ A
18. ∀b1:B. ((f (g b1)) = b1 ∈ B)
⊢ (g b) R_f (g b1)

Latex:

Latex:
.....wf..... 1. A : Type 2. B : Type 3. f : A {}\mrightarrow{} B 4. R : B {}\mrightarrow{} B {}\mrightarrow{} \mBbbP{} 5. Inj(A;B;f) 6. \mforall{}b1:B. \mexists{}a:A. ((f a) = b1) 7. EquivRel(B;x,y.x R y) 8. EquivRel(A;x,y.x R\_f y) 9. quo-lift(f) \mmember{} (x,y:A//(x R\_f y)) {}\mrightarrow{} (x,y:B//(x R y)) 10. Inj(x,y:A//(x R\_f y);x,y:B//(x R y);quo-lift(f)) 11. b : x,y:B//(x R y) 12. g : b1:B {}\mrightarrow{} A 13. \mforall{}b1:B. ((f (g b1)) = b1) \mvdash{} g b \mmember{} x,y:A//(x R\_f y) By Latex: (DVar `b' THEN EqTypeCD THEN Auto) Home Index