Proof of Nuprl Lemma : uncurry

Step * 2 2 1 1 2 of Lemma uncurry_wf

1. T : Type
2. n : ℤ
3. 0 < n

4. ∀[A:ℕn - 1 ⟶ Type]. ∀[f:funtype(n - 1;A;T)].  (uncurry(n - 1;f) ∈ (i:ℕn - 1 ⟶ A[i]) ⟶ T)

5. ¬(n = 0 ∈ ℤ)
6. A : ℕn ⟶ Type
7. f : (A 0) ⟶ primrec(n - 1;T;λi,t. ((A (n - 1 - i)) ⟶ t))
8. a : i:ℕn ⟶ A[i]
9. uncurry(n - 1;f (a 0)) ∈ (i:ℕn - 1 ⟶ λi.(A (i + 1))[i]) ⟶ T
⊢ uncurry(n - 1;f (a 0)) (λi.(a (i + 1))) ∈ T
BY
{ xxx(All (RepUR ``so_apply``)⋅ THEN Auto)xxx }

Latex:

Latex:
1. T : Type 2. n : \mBbbZ{} 3. 0 < n 4. \mforall{}[A:\mBbbN{}n - 1 {}\mrightarrow{} Type]. \mforall{}[f:funtype(n - 1;A;T)]. (uncurry(n - 1;f) \mmember{} (i:\mBbbN{}n - 1 {}\mrightarrow{} A[i]) {}\mrightarrow{} T) 5. \mneg{}(n = 0) 6. A : \mBbbN{}n {}\mrightarrow{} Type 7. f : (A 0) {}\mrightarrow{} primrec(n - 1;T;\mlambda{}i,t. ((A (n - 1 - i)) {}\mrightarrow{} t)) 8. a : i:\mBbbN{}n {}\mrightarrow{} A[i] 9. uncurry(n - 1;f (a 0)) \mmember{} (i:\mBbbN{}n - 1 {}\mrightarrow{} \mlambda{}i.(A (i + 1))[i]) {}\mrightarrow{} T \mvdash{} uncurry(n - 1;f (a 0)) (\mlambda{}i.(a (i + 1))) \mmember{} T By Latex: xxx(All (RepUR ``so\_apply``)\mcdot{} THEN Auto)xxx Home Index