Proof of Nuprl Lemma : term-ext

Step * 1 1 1 1 1 1 2 1 2 of Lemma term-ext

1. opr : Type
2. coterm(opr) ≡ coterm-fun(opr;coterm(opr))
3. y1 : opr
4. u : varname() List × coterm(opr)
5. v : (varname() List × coterm(opr)) List
6. Σ(coterm-size(snd(bt)) | bt ∈ v) ∈ partial(ℕ)
7. coterm-size(snd(u)) ∈ partial(ℕ)
8. 1 + Σ(coterm-size(snd(bt)) | bt ∈ v) ∈ partial(ℕ)
9. 1 + coterm-size(snd(u)) + Σ(coterm-size(snd(bt)) | bt ∈ v) ∈ partial(ℕ)
10. (1 + coterm-size(snd(u)) + Σ(coterm-size(snd(bt)) | bt ∈ v))↓
11. v ∈ (varname() List × term(opr)) List
⊢ [u / v] ∈ (varname() List × term(opr)) List
BY
{ (Auto THEN All Reduce) }

1
1. opr : Type
2. coterm(opr) ≡ coterm-fun(opr;coterm(opr))
3. y1 : opr
4. u1 : varname() List
5. u2 : coterm(opr)
6. v : (varname() List × coterm(opr)) List
7. Σ(coterm-size(snd(bt)) | bt ∈ v) ∈ partial(ℕ)
8. coterm-size(u2) ∈ partial(ℕ)
9. 1 + Σ(coterm-size(snd(bt)) | bt ∈ v) ∈ partial(ℕ)
10. 1 + coterm-size(u2) + Σ(coterm-size(snd(bt)) | bt ∈ v) ∈ partial(ℕ)
11. (1 + coterm-size(u2) + Σ(coterm-size(snd(bt)) | bt ∈ v))↓
12. v ∈ (varname() List × term(opr)) List
⊢ u2 ∈ term(opr)

Latex:

Latex:
1. opr : Type 2. coterm(opr) \mequiv{} coterm-fun(opr;coterm(opr)) 3. y1 : opr 4. u : varname() List \mtimes{} coterm(opr) 5. v : (varname() List \mtimes{} coterm(opr)) List 6. \mSigma{}(coterm-size(snd(bt)) | bt \mmember{} v) \mmember{} partial(\mBbbN{}) 7. coterm-size(snd(u)) \mmember{} partial(\mBbbN{}) 8. 1 + \mSigma{}(coterm-size(snd(bt)) | bt \mmember{} v) \mmember{} partial(\mBbbN{}) 9. 1 + coterm-size(snd(u)) + \mSigma{}(coterm-size(snd(bt)) | bt \mmember{} v) \mmember{} partial(\mBbbN{}) 10. (1 + coterm-size(snd(u)) + \mSigma{}(coterm-size(snd(bt)) | bt \mmember{} v))\mdownarrow{} 11. v \mmember{} (varname() List \mtimes{} term(opr)) List \mvdash{} [u / v] \mmember{} (varname() List \mtimes{} term(opr)) List By Latex: (Auto THEN All Reduce) Home Index