Proof of Nuprl Lemma : sublist

Step * 2 1 of Lemma sublist_append

1. T : Type
2. L1 : T List
3. L2 : T List
4. L1' : T List
5. L2' : T List
6. f1 : ℕ||L1|| ⟶ ℕ||L1'||
7. increasing(f1;||L1||)
8. ∀j:ℕ||L1||. (L1[j] = L1'[f1 j] ∈ T)
9. f : ℕ||L2|| ⟶ ℕ||L2'||
10. increasing(f;||L2||)
11. ∀j:ℕ||L2||. (L2[j] = L2'[f j] ∈ T)
12. i : ℕ(||L1|| + ||L2||) - 1
13. ¬i < ||L1||
⊢ (f (i - ||L1||)) + ||L1'|| < (f ((i + 1) - ||L1||)) + ||L1'||
BY
{ OnMaybeHyp 10 (\h. (Unfold `increasing` h THEN InstHyp [i - ||L1||] h)) }

1
.....wf.....
1. T : Type
2. L1 : T List
3. L2 : T List
4. L1' : T List
5. L2' : T List
6. f1 : ℕ||L1|| ⟶ ℕ||L1'||
7. increasing(f1;||L1||)
8. ∀j:ℕ||L1||. (L1[j] = L1'[f1 j] ∈ T)
9. f : ℕ||L2|| ⟶ ℕ||L2'||
10. ∀i:ℕ||L2|| - 1. f i < f (i + 1)
11. ∀j:ℕ||L2||. (L2[j] = L2'[f j] ∈ T)
12. i : ℕ(||L1|| + ||L2||) - 1
13. ¬i < ||L1||
⊢ i - ||L1|| ∈ ℕ||L2|| - 1

2
1. T : Type
2. L1 : T List
3. L2 : T List
4. L1' : T List
5. L2' : T List
6. f1 : ℕ||L1|| ⟶ ℕ||L1'||
7. increasing(f1;||L1||)
8. ∀j:ℕ||L1||. (L1[j] = L1'[f1 j] ∈ T)
9. f : ℕ||L2|| ⟶ ℕ||L2'||
10. ∀i:ℕ||L2|| - 1. f i < f (i + 1)
11. ∀j:ℕ||L2||. (L2[j] = L2'[f j] ∈ T)
12. i : ℕ(||L1|| + ||L2||) - 1
13. ¬i < ||L1||
14. f (i - ||L1||) < f ((i - ||L1||) + 1)
⊢ (f (i - ||L1||)) + ||L1'|| < (f ((i + 1) - ||L1||)) + ||L1'||

Latex:

Latex:
1. T : Type 2. L1 : T List 3. L2 : T List 4. L1' : T List 5. L2' : T List 6. f1 : \mBbbN{}||L1|| {}\mrightarrow{} \mBbbN{}||L1'|| 7. increasing(f1;||L1||) 8. \mforall{}j:\mBbbN{}||L1||. (L1[j] = L1'[f1 j]) 9. f : \mBbbN{}||L2|| {}\mrightarrow{} \mBbbN{}||L2'|| 10. increasing(f;||L2||) 11. \mforall{}j:\mBbbN{}||L2||. (L2[j] = L2'[f j]) 12. i : \mBbbN{}(||L1|| + ||L2||) - 1 13. \mneg{}i < ||L1|| \mvdash{} (f (i - ||L1||)) + ||L1'|| < (f ((i + 1) - ||L1||)) + ||L1'|| By Latex: OnMaybeHyp 10 (\mbackslash{}h. (Unfold `increasing` h THEN InstHyp [i - ||L1||] h)) Home Index