Proof of Nuprl Lemma : permutation-reverse

Step * 1 2 of Lemma permutation-reverse

1. A : Type
2. L : A List
3. λi.(||L|| - i + 1) ∈ ℕ||L|| ⟶ ℕ||L||
4. ||rev(L)|| ~ ||L||
5. ||(L o λi.(||L|| - i + 1))|| ~ ||L||
6. Inj(ℕ||L||;ℕ||L||;λi.(||L|| - i + 1))
⊢ rev(L) = (L o λi.(||L|| - i + 1)) ∈ (A List)
BY
{ (BLemma `list_extensionality`⋅ THEN Auto) }

1
1. A : Type
2. L : A List
3. λi.(||L|| - i + 1) ∈ ℕ||L|| ⟶ ℕ||L||
4. ||rev(L)|| ~ ||L||
5. ||(L o λi.(||L|| - i + 1))|| ~ ||L||
6. Inj(ℕ||L||;ℕ||L||;λi.(||L|| - i + 1))
7. i : ℕ
8. i < ||rev(L)||
⊢ rev(L)[i] = (L o λi.(||L|| - i + 1))[i] ∈ A

Latex:

Latex:
1. A : Type 2. L : A List 3. \mlambda{}i.(||L|| - i + 1) \mmember{} \mBbbN{}||L|| {}\mrightarrow{} \mBbbN{}||L|| 4. ||rev(L)|| \msim{} ||L|| 5. ||(L o \mlambda{}i.(||L|| - i + 1))|| \msim{} ||L|| 6. Inj(\mBbbN{}||L||;\mBbbN{}||L||;\mlambda{}i.(||L|| - i + 1)) \mvdash{} rev(L) = (L o \mlambda{}i.(||L|| - i + 1)) By Latex: (BLemma `list\_extensionality`\mcdot{} THEN Auto) Home Index