Proof of Nuprl Lemma : vs-map-from-subspace

Step * 1 of Lemma vs-map-from-subspace

1. K : Rng
2. A : VectorSpace(K)
3. B : VectorSpace(K)
4. f : A ⟶ B
5. P : Point(A) ⟶ ℙ
6. vs-subspace(K;A;a.P[a])
⊢ f ∈ (a:A | P[a]) ⟶ B
BY
{ (DVar `f' THEN (MemTypeCD THENW Auto)) }

1
1. K : Rng
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))) ∧ (∀a:|K|. ∀u:Point(A).  ((f a * u) = a * f u ∈ Point(B)))

6. P : Point(A) ⟶ ℙ
7. vs-subspace(K;A;a.P[a])
⊢ f ∈ Point((a:A | P[a])) ⟶ Point(B)

2
.....set predicate.....
1. K : Rng
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))) ∧ (∀a:|K|. ∀u:Point(A).  ((f a * u) = a * f u ∈ Point(B)))

6. P : Point(A) ⟶ ℙ
7. vs-subspace(K;A;a.P[a])
⊢ (∀u,v:Point((a:A | P[a])). ((f u + v) = f u + f v ∈ Point(B)))
∧ (∀a:|K|. ∀u:Point((a:A | P[a])). ((f a * u) = a * f u ∈ Point(B)))

Latex:

Latex:
1. K : Rng 2. A : VectorSpace(K) 3. B : VectorSpace(K) 4. f : A {}\mrightarrow{} B 5. P : Point(A) {}\mrightarrow{} \mBbbP{} 6. vs-subspace(K;A;a.P[a]) \mvdash{} f \mmember{} (a:A | P[a]) {}\mrightarrow{} B By Latex: (DVar `f' THEN (MemTypeCD THENW Auto)) Home Index