Proof of Nuprl Lemma : vs-lift-unique

Step * 1 1 of Lemma vs-lift-unique

.....assertion.....
1. S : Type
2. K : CRng
3. vs : VectorSpace(K)
4. f : S ⟶ Point(vs)
5. h : Point(free-vs(K;S)) ⟶ Point(vs)
6. ∀u,v:Point(free-vs(K;S)).  ((h u + v) = h u + h v ∈ Point(vs))
7. ∀a:|K|. ∀u:Point(free-vs(K;S)).  ((h a * u) = a * h u ∈ Point(vs))
8. ∀s:S. ((h <s>) = (f s) ∈ Point(vs))
9. x : Point(free-vs(K;S))
⊢ (h []) = 0 ∈ Point(vs)
BY
{ (Assert {} ∈ Point(free-vs(K;S)) BY
         (RepUR ``vs-point free-vs mk-vs`` 0
          THEN SubsumeC ⌜basic-formal-sum(K;S)⌝⋅
          THEN Auto
          THEN Unfold `basic-formal-sum` 0
          THEN Auto)) }

1
1. S : Type
2. K : CRng
3. vs : VectorSpace(K)
4. f : S ⟶ Point(vs)
5. h : Point(free-vs(K;S)) ⟶ Point(vs)
6. ∀u,v:Point(free-vs(K;S)).  ((h u + v) = h u + h v ∈ Point(vs))
7. ∀a:|K|. ∀u:Point(free-vs(K;S)).  ((h a * u) = a * h u ∈ Point(vs))
8. ∀s:S. ((h <s>) = (f s) ∈ Point(vs))
9. x : Point(free-vs(K;S))
10. {} ∈ Point(free-vs(K;S))
⊢ (h []) = 0 ∈ Point(vs)

Latex:

Latex:
.....assertion..... 1. S : Type 2. K : CRng 3. vs : VectorSpace(K) 4. f : S {}\mrightarrow{} Point(vs) 5. h : Point(free-vs(K;S)) {}\mrightarrow{} Point(vs) 6. \mforall{}u,v:Point(free-vs(K;S)). ((h u + v) = h u + h v) 7. \mforall{}a:|K|. \mforall{}u:Point(free-vs(K;S)). ((h a * u) = a * h u) 8. \mforall{}s:S. ((h <s>) = (f s)) 9. x : Point(free-vs(K;S)) \mvdash{} (h []) = 0 By Latex: (Assert \{\} \mmember{} Point(free-vs(K;S)) BY (RepUR ``vs-point free-vs mk-vs`` 0 THEN SubsumeC \mkleeneopen{}basic-formal-sum(K;S)\mkleeneclose{}\mcdot{} THEN Auto THEN Unfold `basic-formal-sum` 0 THEN Auto)) Home Index