Proof of Nuprl Lemma : general-partition-sum-from-bound

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

1. I : Interval
2. icompact(I)
3. f : {f:I ⟶ℝ| ifun(f;I)}
4. b : {b:ℝ| (r0 ≤ b) ∧ (∀x:ℝ. ((x ∈ I) ⇒ (|f x| ≤ b)))}
5. e : {e:ℝ| r0 < e}
6. ∀p:partition(I). ∀y:partition-choice(full-partition(I;p)). (|S(f;full-partition(I;p))| ≤ (b * |I|))
7. ((b + b) * |I|) < e
8. p : {p:partition(I)| partition-mesh(I;p) ≤ r1}
9. q : {p:partition(I)| partition-mesh(I;p) ≤ r1}
10. x : partition-choice(full-partition(I;p))
11. y : partition-choice(full-partition(I;q))
12. |S(f;full-partition(I;q)) - r0| ≤ (b * |I|)
13. |r0 - S(f;full-partition(I;p))| ≤ (b * |I|)
⊢ |S(f;full-partition(I;q)) - S(f;full-partition(I;p))| ≤ ((b + b) * |I|)
BY
{ (UseTriangleInequality [⌜r0⌝]⋅ THEN nRNorm 0 THEN Auto) }

Latex:

Latex:
1. I : Interval 2. icompact(I) 3. f : \{f:I {}\mrightarrow{}\mBbbR{}| ifun(f;I)\} 4. b : \{b:\mBbbR{}| (r0 \mleq{} b) \mwedge{} (\mforall{}x:\mBbbR{}. ((x \mmember{} I) {}\mRightarrow{} (|f x| \mleq{} b)))\} 5. e : \{e:\mBbbR{}| r0 < e\} 6. \mforall{}p:partition(I). \mforall{}y:partition-choice(full-partition(I;p)). (|S(f;full-partition(I;p))| \mleq{} (b * |I|)) 7. ((b + b) * |I|) < e 8. p : \{p:partition(I)| partition-mesh(I;p) \mleq{} r1\} 9. q : \{p:partition(I)| partition-mesh(I;p) \mleq{} r1\} 10. x : partition-choice(full-partition(I;p)) 11. y : partition-choice(full-partition(I;q)) 12. |S(f;full-partition(I;q)) - r0| \mleq{} (b * |I|) 13. |r0 - S(f;full-partition(I;p))| \mleq{} (b * |I|) \mvdash{} |S(f;full-partition(I;q)) - S(f;full-partition(I;p))| \mleq{} ((b + b) * |I|) By Latex: (UseTriangleInequality [\mkleeneopen{}r0\mkleeneclose{}]\mcdot{} THEN nRNorm 0 THEN Auto) Home Index