Proof of Nuprl Lemma : interleaving_of

Step * 2 2 1 of Lemma interleaving_of_cons

1. [T] : Type
2. x : T
3. L : T List
4. L1 : T List
5. L2 : T List
6. ¬↑null(L1)
7. ¬↑null(L2)
8. interleaving(T;L1;L2;[x / L])
⊢ (0 < ||L1|| c∧ ((L1[0] = x ∈ T) ∧ interleaving(T;tl(L1);L2;L)))
∨ (0 < ||L2|| c∧ ((L2[0] = x ∈ T) ∧ interleaving(T;L1;tl(L2);L)))
BY
{ (((Unfold `interleaving` (-1) THEN D (-1)) THEN Unfold `disjoint_sublists` (-1)) THEN ExRepD) }

1
1. [T] : Type
2. x : T
3. L : T List
4. L1 : T List
5. L2 : T List
6. ¬↑null(L1)
7. ¬↑null(L2)
8. ||[x / L]|| = (||L1|| + ||L2||) ∈ ℕ
9. f1 : ℕ||L1|| ⟶ ℕ||[x / L]||
10. f2 : ℕ||L2|| ⟶ ℕ||[x / L]||
11. increasing(f1;||L1||)
12. ∀j:ℕ||L1||. (L1[j] = [x / L][f1 j] ∈ T)
13. increasing(f2;||L2||)
14. ∀j:ℕ||L2||. (L2[j] = [x / L][f2 j] ∈ T)
15. ∀j1:ℕ||L1||. ∀j2:ℕ||L2||. (¬((f1 j1) = (f2 j2) ∈ ℤ))
⊢ (0 < ||L1|| c∧ ((L1[0] = x ∈ T) ∧ interleaving(T;tl(L1);L2;L)))
∨ (0 < ||L2|| c∧ ((L2[0] = x ∈ T) ∧ interleaving(T;L1;tl(L2);L)))

Latex:

Latex:
1. [T] : Type 2. x : T 3. L : T List 4. L1 : T List 5. L2 : T List 6. \mneg{}\muparrow{}null(L1) 7. \mneg{}\muparrow{}null(L2) 8. interleaving(T;L1;L2;[x / L]) \mvdash{} (0 < ||L1|| c\mwedge{} ((L1[0] = x) \mwedge{} interleaving(T;tl(L1);L2;L))) \mvee{} (0 < ||L2|| c\mwedge{} ((L2[0] = x) \mwedge{} interleaving(T;L1;tl(L2);L))) By Latex: (((Unfold `interleaving` (-1) THEN D (-1)) THEN Unfold `disjoint\_sublists` (-1)) THEN ExRepD) Home Index