Proof of Nuprl Lemma : partition-sum-bound

Step * 2 1 1 1 1 of Lemma partition-sum-bound

1. I : Interval
2. icompact(I)
3. f : I ⟶ℝ
4. mc : f[x] continuous for x ∈ I
5. p : partition(I)
6. y : partition-choice(full-partition(I;p))
7. a : ℕ||p|| + 1 ⟶ {x:ℝ| x ∈ I}
8. y = a ∈ (ℕ||p|| + 1 ⟶ {x:ℝ| x ∈ I} )
9. ||full-partition(I;p)|| = (||p|| + 2) ∈ ℤ
⊢ |(f (a i)) * (full-partition(I;p)[i + 1] - full-partition(I;p)[i])| ≤ ||f[x]||_I
* (full-partition(I;p)[i + 1] - full-partition(I;p)[i]) for i ∈ [0,||full-partition(I;p)|| - 2]
BY
{ (D 0 THEN Auto THEN (RWO "rabs-rmul" 0⋅ THENA Auto)) }

1
1. I : Interval
2. icompact(I)
3. f : I ⟶ℝ
4. mc : f[x] continuous for x ∈ I
5. p : partition(I)
6. y : partition-choice(full-partition(I;p))
7. a : ℕ||p|| + 1 ⟶ {x:ℝ| x ∈ I}
8. y = a ∈ (ℕ||p|| + 1 ⟶ {x:ℝ| x ∈ I} )
9. ||full-partition(I;p)|| = (||p|| + 2) ∈ ℤ
10. i : ℤ
11. 0 ≤ i
12. i ≤ (||full-partition(I;p)|| - 2)
⊢ (|f (a i)| * |full-partition(I;p)[i + 1] - full-partition(I;p)[i]|) ≤ (||f[x]||_I
* (full-partition(I;p)[i + 1] - full-partition(I;p)[i]))

Latex:

Latex:
1. I : Interval 2. icompact(I) 3. f : I {}\mrightarrow{}\mBbbR{} 4. mc : f[x] continuous for x \mmember{} I 5. p : partition(I) 6. y : partition-choice(full-partition(I;p)) 7. a : \mBbbN{}||p|| + 1 {}\mrightarrow{} \{x:\mBbbR{}| x \mmember{} I\} 8. y = a 9. ||full-partition(I;p)|| = (||p|| + 2) \mvdash{} |(f (a i)) * (full-partition(I;p)[i + 1] - full-partition(I;p)[i])| \mleq{} ||f[x]||\_I * (full-partition(I;p)[i + 1] - full-partition(I;p)[i]) for i \mmember{} [0,||full-partition(I;p)|| - 2] By Latex: (D 0 THEN Auto THEN (RWO "rabs-rmul" 0\mcdot{} THENA Auto)) Home Index