Proof of Nuprl Lemma : free-iso-int

Step * 1 1 1 1 1 1 1 of Lemma free-iso-int_wf

1. S : Type
2. s : S
3. ∀x,y:S. (x = y ∈ S)
4. λx.Σ(p∈x). let k,s = p
in k * 1 ∈ free-vs(ℤ-rng;S) ⟶ ℤ
5. λk.{<k * 1, s>} ∈ ℤ ⟶ free-vs(ℤ-rng;S)

6. λb.Ax ∈ ∀a:Point(free-vs(ℤ-rng;S)). ({<Σ(p∈a). let k,s = p in k * 1 * 1, s>} = a ∈ Point(free-vs(ℤ-rng;S)))

7. λa.Ax ∈ ∀b:Point(ℤ). (Σ(p∈{<b * 1, s>}). let k,s = p in k * 1 = b ∈ Point(ℤ))
8. x : Point(free-vs(ℤ-rng;S))
⊢ Σ(p∈x). let k,s = p in k * 1 = Σ(p∈x). let k,s = p in k ∈ Point(ℤ)
BY
{ RepUR ``vs-point free-vs mk-vs`` -1 }

1
1. S : Type
2. s : S
3. ∀x,y:S. (x = y ∈ S)
4. λx.Σ(p∈x). let k,s = p
in k * 1 ∈ free-vs(ℤ-rng;S) ⟶ ℤ
5. λk.{<k * 1, s>} ∈ ℤ ⟶ free-vs(ℤ-rng;S)

6. λb.Ax ∈ ∀a:Point(free-vs(ℤ-rng;S)). ({<Σ(p∈a). let k,s = p in k * 1 * 1, s>} = a ∈ Point(free-vs(ℤ-rng;S)))

7. λa.Ax ∈ ∀b:Point(ℤ). (Σ(p∈{<b * 1, s>}). let k,s = p in k * 1 = b ∈ Point(ℤ))
8. x : formal-sum(ℤ-rng;S)
⊢ Σ(p∈x). let k,s = p in k * 1 = Σ(p∈x). let k,s = p in k ∈ Point(ℤ)

Latex:

Latex:
1. S : Type 2. s : S 3. \mforall{}x,y:S. (x = y) 4. \mlambda{}x.\mSigma{}(p\mmember{}x). let k,s = p in k * 1 \mmember{} free-vs(\mBbbZ{}-rng;S) {}\mrightarrow{} \mBbbZ{} 5. \mlambda{}k.\{<k * 1, s>\} \mmember{} \mBbbZ{} {}\mrightarrow{} free-vs(\mBbbZ{}-rng;S) 6. \mlambda{}b.Ax \mmember{} \mforall{}a:Point(free-vs(\mBbbZ{}-rng;S)). (\{<\mSigma{}(p\mmember{}a). let k,s = p in k * 1 * 1, s>\} = a) 7. \mlambda{}a.Ax \mmember{} \mforall{}b:Point(\mBbbZ{}). (\mSigma{}(p\mmember{}\{<b * 1, s>\}). let k,s = p in k * 1 = b) 8. x : Point(free-vs(\mBbbZ{}-rng;S)) \mvdash{} \mSigma{}(p\mmember{}x). let k,s = p in k * 1 = \mSigma{}(p\mmember{}x). let k,s = p in k By Latex: RepUR ``vs-point free-vs mk-vs`` -1 Home Index