Proof of Nuprl Lemma : free-vs-map-into-subspace

Step * 1 2 3 of Lemma free-vs-map-into-subspace

.....wf.....
1. K : CRng
2. S : Type
3. v : VectorSpace(K)
4. f : Point(free-vs(K;S)) ⟶ Point(v)
5. (∀u,v@0:Point(free-vs(K;S)).  ((f u + v@0) = f u + f v@0 ∈ Point(v)))
∧ (∀a:|K|. ∀u:Point(free-vs(K;S)).  ((f a * u) = a * f u ∈ Point(v)))
6. P : Point(v) ⟶ ℙ
7. vs-subspace(K;v;x.P[x])
8. ∀s:S. (↓P[f <s>])
9. ∀p:Point(free-vs(K;S)). (f p ∈ Point((x:v | P[x])))
10. f1 : Point(free-vs(K;S)) ⟶ Point((x:v | P[x]))
⊢ istype((∀u,v@0:Point(free-vs(K;S)).  ((f1 u + v@0) = f1 u + f1 v@0 ∈ Point((x:v | P[x]))))
∧ (∀a:|K|. ∀u:Point(free-vs(K;S)).  ((f1 a * u) = a * f1 u ∈ Point((x:v | P[x])))))
BY
{ Auto }

Latex:

Latex:
.....wf..... 1. K : CRng 2. S : Type 3. v : VectorSpace(K) 4. f : Point(free-vs(K;S)) {}\mrightarrow{} Point(v) 5. (\mforall{}u,v@0:Point(free-vs(K;S)). ((f u + v@0) = f u + f v@0)) \mwedge{} (\mforall{}a:|K|. \mforall{}u:Point(free-vs(K;S)). ((f a * u) = a * f u)) 6. P : Point(v) {}\mrightarrow{} \mBbbP{} 7. vs-subspace(K;v;x.P[x]) 8. \mforall{}s:S. (\mdownarrow{}P[f <s>]) 9. \mforall{}p:Point(free-vs(K;S)). (f p \mmember{} Point((x:v | P[x]))) 10. f1 : Point(free-vs(K;S)) {}\mrightarrow{} Point((x:v | P[x])) \mvdash{} istype((\mforall{}u,v@0:Point(free-vs(K;S)). ((f1 u + v@0) = f1 u + f1 v@0)) \mwedge{} (\mforall{}a:|K|. \mforall{}u:Point(free-vs(K;S)). ((f1 a * u) = a * f1 u))) By Latex: Auto Home Index