Proof of Nuprl Lemma : vs-map-quotient-kernel

Step * 2 2 of Lemma vs-map-quotient-kernel

1. K : CRng
2. A : VectorSpace(K)
3. B : VectorSpace(K)
4. f : Point(A) ⟶ Point(B)
5. ∀u,v:Point(A).  ((f u + v) = f u + f v ∈ Point(B))
6. ∀a:|K|. ∀u:Point(A).  ((f a * u) = a * f u ∈ Point(B))
7. f ∈ Point(A//z.z ∈ Ker(f)) ⟶ Point(B)
8. ∀u,v:Point(A//z.z ∈ Ker(f)).  ((f u + v) = f u + f v ∈ Point(B))
9. a : |K|
10. u : Point(A//z.z ∈ Ker(f))
⊢ (f a * u) = a * f u ∈ Point(B)
BY
{ ((RepUR ``vs-point mk-vs vs-quotient`` -1 THEN Fold `vs-point` (-1))
   THEN (D -1 THENA EAuto 1)
   THEN RepUR ``vs-mul mk-vs vs-quotient`` 0
   THEN Fold `vs-mul` 0) }

1
1. K : CRng
2. A : VectorSpace(K)
3. B : VectorSpace(K)
4. f : Point(A) ⟶ Point(B)
5. ∀u,v:Point(A).  ((f u + v) = f u + f v ∈ Point(B))
6. ∀a:|K|. ∀u:Point(A).  ((f a * u) = a * f u ∈ Point(B))
7. f ∈ Point(A//z.z ∈ Ker(f)) ⟶ Point(B)
8. ∀u,v:Point(A//z.z ∈ Ker(f)).  ((f u + v) = f u + f v ∈ Point(B))
9. a : |K|
10. u : Base
11. u1 : Base

12. u = u1 ∈ pertype(λx,y. ((x ∈ Point(A)) ∧ (y ∈ Point(A)) ∧ x = y mod (z.z ∈ Ker(f))))

13. u ∈ Point(A)
14. u1 ∈ Point(A)
15. u = u1 mod (z.z ∈ Ker(f))
⊢ (f a * u) = a * f u1 ∈ Point(B)

Latex:

Latex:
1. K : CRng 2. A : VectorSpace(K) 3. B : VectorSpace(K) 4. f : Point(A) {}\mrightarrow{} Point(B) 5. \mforall{}u,v:Point(A). ((f u + v) = f u + f v) 6. \mforall{}a:|K|. \mforall{}u:Point(A). ((f a * u) = a * f u) 7. f \mmember{} Point(A//z.z \mmember{} Ker(f)) {}\mrightarrow{} Point(B) 8. \mforall{}u,v:Point(A//z.z \mmember{} Ker(f)). ((f u + v) = f u + f v) 9. a : |K| 10. u : Point(A//z.z \mmember{} Ker(f)) \mvdash{} (f a * u) = a * f u By Latex: ((RepUR ``vs-point mk-vs vs-quotient`` -1 THEN Fold `vs-point` (-1)) THEN (D -1 THENA EAuto 1) THEN RepUR ``vs-mul mk-vs vs-quotient`` 0 THEN Fold `vs-mul` 0) Home Index