Proof of Nuprl Lemma : partition-refinement-sum

Step * 1 1 1 of Lemma partition-refinement-sum

1. I : Interval@i
2. icompact(I)@i
3. f : I ⟶ℝ@i
4. mc : f[x] continuous for x ∈ I@i
5. ∀m,n:ℕ⁺.
     (mc m n ∈ {d:ℝ| (r0 < d) ∧ (∀x,y:ℝ.  ((x ∈ I) ⇒ (y ∈ I) ⇒ (|x - y| ≤ d) ⇒ (|f[x] - f[y]| ≤ (r1/r(n)))))} )
6. K : ℕ
7. ∀K:ℕK. ∀J:Interval.
     (icompact(J)
     ⇒ J ⊆ I
     ⇒ (∀q:partition(J)
           ((||q|| ≤ K)
           ⇒ (∀n:ℕ⁺
                 ((partition-mesh(J;q) ≤ (mc 1 n))
                 ⇒ frs-increasing(q)
                 ⇒ (∀p:partition(J). ∀x:partition-choice(full-partition(J;p)).
                     ∀y:partition-choice(full-partition(J;q)).
                       (p refines q
                       ⇒ (|partition-sum(f;y;full-partition(J;q))

                          - partition-sum(f;x;full-partition(J;p))| ≤ ((r1/r(n)) * |J|)))))))))

8. J : Interval@i
9. icompact(J)@i
10. J ⊆ I @i
11. [%16] : partitions(J;[])@i
12. ||[]|| ≤ K@i
13. n : ℕ⁺@i
14. partition-mesh(J;[]) ≤ (mc 1 n)@i
15. frs-increasing([])@i
16. p : partition(J)@i
17. x : partition-choice(full-partition(J;p))@i
18. y : partition-choice(full-partition(J;[]))@i
19. p refines []@i
⊢ |partition-sum(f;y;full-partition(J;[])) - partition-sum(f;x;full-partition(J;p))| ≤ ((r1/r(n)) * |J|)
BY
{ Thin (-5) }

1
1. I : Interval@i
2. icompact(I)@i
3. f : I ⟶ℝ@i
4. mc : f[x] continuous for x ∈ I@i
5. ∀m,n:ℕ⁺.
     (mc m n ∈ {d:ℝ| (r0 < d) ∧ (∀x,y:ℝ.  ((x ∈ I) ⇒ (y ∈ I) ⇒ (|x - y| ≤ d) ⇒ (|f[x] - f[y]| ≤ (r1/r(n)))))} )
6. K : ℕ
7. ∀K:ℕK. ∀J:Interval.
     (icompact(J)
     ⇒ J ⊆ I
     ⇒ (∀q:partition(J)
           ((||q|| ≤ K)
           ⇒ (∀n:ℕ⁺
                 ((partition-mesh(J;q) ≤ (mc 1 n))
                 ⇒ frs-increasing(q)
                 ⇒ (∀p:partition(J). ∀x:partition-choice(full-partition(J;p)).
                     ∀y:partition-choice(full-partition(J;q)).
                       (p refines q
                       ⇒ (|partition-sum(f;y;full-partition(J;q))

                          - partition-sum(f;x;full-partition(J;p))| ≤ ((r1/r(n)) * |J|)))))))))

8. J : Interval@i
9. icompact(J)@i
10. J ⊆ I @i
11. [%16] : partitions(J;[])@i
12. ||[]|| ≤ K@i
13. n : ℕ⁺@i
14. partition-mesh(J;[]) ≤ (mc 1 n)@i
15. p : partition(J)@i
16. x : partition-choice(full-partition(J;p))@i
17. y : partition-choice(full-partition(J;[]))@i
18. p refines []@i
⊢ |partition-sum(f;y;full-partition(J;[])) - partition-sum(f;x;full-partition(J;p))| ≤ ((r1/r(n)) * |J|)

Latex:

Latex:
1. I : Interval@i 2. icompact(I)@i 3. f : I {}\mrightarrow{}\mBbbR{}@i 4. mc : f[x] continuous for x \mmember{} I@i 5. \mforall{}m,n:\mBbbN{}\msupplus{}. (mc m n \mmember{} \{d:\mBbbR{}| (r0 < d) \mwedge{} (\mforall{}x,y:\mBbbR{}. ((x \mmember{} I) {}\mRightarrow{} (y \mmember{} I) {}\mRightarrow{} (|x - y| \mleq{} d) {}\mRightarrow{} (|f[x] - f[y]| \mleq{} (r1/r(n)))))\} ) 6. K : \mBbbN{} 7. \mforall{}K:\mBbbN{}K. \mforall{}J:Interval. (icompact(J) {}\mRightarrow{} J \msubseteq{} I {}\mRightarrow{} (\mforall{}q:partition(J) ((||q|| \mleq{} K) {}\mRightarrow{} (\mforall{}n:\mBbbN{}\msupplus{} ((partition-mesh(J;q) \mleq{} (mc 1 n)) {}\mRightarrow{} frs-increasing(q) {}\mRightarrow{} (\mforall{}p:partition(J). \mforall{}x:partition-choice(full-partition(J;p)). \mforall{}y:partition-choice(full-partition(J;q)). (p refines q {}\mRightarrow{} (|partition-sum(f;y;full-partition(J;q)) - partition-sum(f;x;full-partition(J;p))| \mleq{} ((r1/r(n)) * |J|))))))))) 8. J : Interval@i 9. icompact(J)@i 10. J \msubseteq{} I @i 11. [\%16] : partitions(J;[])@i 12. ||[]|| \mleq{} K@i 13. n : \mBbbN{}\msupplus{}@i 14. partition-mesh(J;[]) \mleq{} (mc 1 n)@i 15. frs-increasing([])@i 16. p : partition(J)@i 17. x : partition-choice(full-partition(J;p))@i 18. y : partition-choice(full-partition(J;[]))@i 19. p refines []@i \mvdash{} |partition-sum(f;y;full-partition(J;[])) - partition-sum(f;x;full-partition(J;p))| \mleq{} ((r1/r(n)) * |J|) By Latex: Thin (-5) Home Index