Proof of Nuprl Lemma : first-success-is-inl

Step * 2 1 2 1 of Lemma first-success-is-inl

1. T : Type
2. A : T ⟶ Type
3. f : x:T ⟶ (A[x]?)
4. u : T
5. v : T List
6. ∀[j:ℕ||v||]. ∀[a:A[v[j]]].
(first-success(f;v) = (inl <j, a>) ∈ (i:ℕ||v|| × A[v[i]]?)
⇐⇒ j < ||v|| ∧ ((f v[j]) = (inl a) ∈ (A[v[j]]?)) ∧ (∀x∈firstn(j;v).↑isr(f x)))
7. x : A[u]
8. (f u) = (inl x) ∈ (A[u]?)
9. j : ℕ||v|| + 1
10. a : A[[u / v][j]]
11. (inl <0, x>) = (inl <j, a>) ∈ (i:ℕ||v|| + 1 × A[[u / v][i]]?)
12. 0 = j ∈ ℕ||v|| + 1
13. x = a ∈ A[u]

⊢ j < ||v|| + 1 ∧ ((f [u / v][j]) = (inl a) ∈ (A[[u / v][j]]?)) ∧ (∀x∈firstn(j;[u / v]).↑isr(f x))

BY
{ (RevHypSubst' (-2) 0 THEN Reduce 0) }

1
1. T : Type
2. A : T ⟶ Type
3. f : x:T ⟶ (A[x]?)
4. u : T
5. v : T List
6. ∀[j:ℕ||v||]. ∀[a:A[v[j]]].
(first-success(f;v) = (inl <j, a>) ∈ (i:ℕ||v|| × A[v[i]]?)
⇐⇒ j < ||v|| ∧ ((f v[j]) = (inl a) ∈ (A[v[j]]?)) ∧ (∀x∈firstn(j;v).↑isr(f x)))
7. x : A[u]
8. (f u) = (inl x) ∈ (A[u]?)
9. j : ℕ||v|| + 1
10. a : A[[u / v][j]]
11. (inl <0, x>) = (inl <j, a>) ∈ (i:ℕ||v|| + 1 × A[[u / v][i]]?)
12. 0 = j ∈ ℕ||v|| + 1
13. x = a ∈ A[u]
⊢ 0 < ||v|| + 1 ∧ ((f u) = (inl a) ∈ (A[u]?)) ∧ (∀x∈firstn(0;[u / v]).↑isr(f x))

Latex:

Latex:
1. T : Type 2. A : T {}\mrightarrow{} Type 3. f : x:T {}\mrightarrow{} (A[x]?) 4. u : T 5. v : T List 6. \mforall{}[j:\mBbbN{}||v||]. \mforall{}[a:A[v[j]]]. (first-success(f;v) = (inl <j, a>) \mLeftarrow{}{}\mRightarrow{} j < ||v|| \mwedge{} ((f v[j]) = (inl a)) \mwedge{} (\mforall{}x\mmember{}firstn(j;v).\muparrow{}isr(f x))) 7. x : A[u] 8. (f u) = (inl x) 9. j : \mBbbN{}||v|| + 1 10. a : A[[u / v][j]] 11. (inl ɘ, x>) = (inl <j, a>) 12. 0 = j 13. x = a \mvdash{} j < ||v|| + 1 \mwedge{} ((f [u / v][j]) = (inl a)) \mwedge{} (\mforall{}x\mmember{}firstn(j;[u / v]).\muparrow{}isr(f x)) By Latex: (RevHypSubst' (-2) 0 THEN Reduce 0) Home Index