Proof of Nuprl Lemma : partition-sum

Step * 1 1 2 of Lemma partition-sum_functionality

.....wf.....
1. I : Interval
2. icompact(I)
3. p : partition(I)
4. q : ℝ List
5. ||q|| = ||p|| ∈ ℤ
6. ∀i:ℕ||q||. (q[i] = p[i])
7. f : I ⟶ℝ
8. x : partition-choice(full-partition(I;p))
9. ||full-partition(I;q)|| = ||full-partition(I;p)|| ∈ ℤ
10. ∀i:ℕ. ((i ≤ (||full-partition(I;p)|| - 1)) ⇒ (full-partition(I;q)[i] ∈ ℝ))

⊢ λi.((f (x i)) * (full-partition(I;q)[i + 1] - full-partition(I;q)[i])) ∈ ℕ(||full-partition(I;p)|| - 2) + 1 ⟶ ℝ

BY
{ xxxMemCDxxx }

1
.....subterm..... T:t
1:n
1. I : Interval
2. icompact(I)
3. p : partition(I)
4. q : ℝ List
5. ||q|| = ||p|| ∈ ℤ
6. ∀i:ℕ||q||. (q[i] = p[i])
7. f : I ⟶ℝ
8. x : partition-choice(full-partition(I;p))
9. ||full-partition(I;q)|| = ||full-partition(I;p)|| ∈ ℤ
10. ∀i:ℕ. ((i ≤ (||full-partition(I;p)|| - 1)) ⇒ (full-partition(I;q)[i] ∈ ℝ))
11. i : ℕ(||full-partition(I;p)|| - 2) + 1
⊢ (f (x i)) * (full-partition(I;q)[i + 1] - full-partition(I;q)[i]) ∈ ℝ

2
.....eq aux.....
1. I : Interval
2. icompact(I)
3. p : partition(I)
4. q : ℝ List
5. ||q|| = ||p|| ∈ ℤ
6. ∀i:ℕ||q||. (q[i] = p[i])
7. f : I ⟶ℝ
8. x : partition-choice(full-partition(I;p))
9. ||full-partition(I;q)|| = ||full-partition(I;p)|| ∈ ℤ
10. ∀i:ℕ. ((i ≤ (||full-partition(I;p)|| - 1)) ⇒ (full-partition(I;q)[i] ∈ ℝ))
⊢ ℕ(||full-partition(I;p)|| - 2) + 1 ∈ Type

Latex:

Latex:
.....wf..... 1. I : Interval 2. icompact(I) 3. p : partition(I) 4. q : \mBbbR{} List 5. ||q|| = ||p|| 6. \mforall{}i:\mBbbN{}||q||. (q[i] = p[i]) 7. f : I {}\mrightarrow{}\mBbbR{} 8. x : partition-choice(full-partition(I;p)) 9. ||full-partition(I;q)|| = ||full-partition(I;p)|| 10. \mforall{}i:\mBbbN{}. ((i \mleq{} (||full-partition(I;p)|| - 1)) {}\mRightarrow{} (full-partition(I;q)[i] \mmember{} \mBbbR{})) \mvdash{} \mlambda{}i.((f (x i)) * (full-partition(I;q)[i + 1] - full-partition(I;q)[i])) \mmember{} \mBbbN{}(||full-partition(I;p)|| - 2) + 1 {}\mrightarrow{} \mBbbR{} By Latex: xxxMemCDxxx Home Index