Proof of Nuprl Lemma : nearby-partition-choice

Step * 1 1 2 of Lemma nearby-partition-choice

1. I : Interval@i
2. icompact(I)
3. p : partition(I)@i
4. q : partition(I)@i
5. e : {e:ℝ| r0 < e} @i
6. ||p|| = ||q|| ∈ ℤ
7. ∀i:ℕ||p||. (|p[i] - q[i]| ≤ e)
8. x : partition-choice(full-partition(I;p))@i
9. ||full-partition(I;p)|| = ||full-partition(I;q)|| ∈ ℤ
10. i : ℕ||full-partition(I;p)||@i

⊢ |[left-endpoint(I) / (p @ [right-endpoint(I)])][i] - [left-endpoint(I) / (q @ [right-endpoint(I)])][i]| ≤ e

BY
{ (CaseNat 0 `i' THEN Reduce 0) }

1
1. I : Interval@i
2. icompact(I)
3. p : partition(I)@i
4. q : partition(I)@i
5. e : {e:ℝ| r0 < e} @i
6. ||p|| = ||q|| ∈ ℤ
7. ∀i:ℕ||p||. (|p[i] - q[i]| ≤ e)
8. x : partition-choice(full-partition(I;p))@i
9. ||full-partition(I;p)|| = ||full-partition(I;q)|| ∈ ℤ
10. i : ℕ||full-partition(I;p)||@i
11. i = 0 ∈ ℤ
⊢ |left-endpoint(I) - left-endpoint(I)| ≤ e

2
1. I : Interval@i
2. icompact(I)
3. p : partition(I)@i
4. q : partition(I)@i
5. e : {e:ℝ| r0 < e} @i
6. ||p|| = ||q|| ∈ ℤ
7. ∀i:ℕ||p||. (|p[i] - q[i]| ≤ e)
8. x : partition-choice(full-partition(I;p))@i
9. ||full-partition(I;p)|| = ||full-partition(I;q)|| ∈ ℤ
10. i : ℕ||full-partition(I;p)||@i
11. ¬(i = 0 ∈ ℤ)

⊢ |[left-endpoint(I) / (p @ [right-endpoint(I)])][i] - [left-endpoint(I) / (q @ [right-endpoint(I)])][i]| ≤ e

Latex:

Latex:
1. I : Interval@i 2. icompact(I) 3. p : partition(I)@i 4. q : partition(I)@i 5. e : \{e:\mBbbR{}| r0 < e\} @i 6. ||p|| = ||q|| 7. \mforall{}i:\mBbbN{}||p||. (|p[i] - q[i]| \mleq{} e) 8. x : partition-choice(full-partition(I;p))@i 9. ||full-partition(I;p)|| = ||full-partition(I;q)|| 10. i : \mBbbN{}||full-partition(I;p)||@i \mvdash{} |[left-endpoint(I) / (p @ [right-endpoint(I)])][i] - [left-endpoint(I) / (q @ [right-endpoint(I)])][i]| \mleq{} e By Latex: (CaseNat 0 `i' THEN Reduce 0) Home Index