Step
*
of Lemma
nearby-separated-partition-sum-no-mc
∀I:Interval
(icompact(I)
⇒ iproper(I)
⇒ (∀f:{f:I ⟶ℝ| ifun(f;I)} . ∀alpha,e:{e:ℝ| r0 < e} . ∀p,q:partition(I). ∀x:partition-choice(full-partition(I;p)).
∀y:partition-choice(full-partition(I;q)).
∃p':partition(I)
∃x':partition-choice(full-partition(I;p'))
((partition-mesh(I;p') ≤ (partition-mesh(I;p) + e))
∧ (∃q':partition(I)
∃y':partition-choice(full-partition(I;q'))
(separated-partitions(p';q')
∧ (partition-mesh(I;q') ≤ (partition-mesh(I;q) + e))
∧ (|S(f;full-partition(I;p)) - S(f;full-partition(I;q))| ≤ (|S(f;full-partition(I;p'))
- S(f;full-partition(I;q'))|
+ alpha)))))))
BY
{ TACTIC:(Auto
THEN ((Assert r0 < (alpha/r(2)) BY
(nRMul ⌜r(2)⌝ 0⋅ THEN Auto))
THEN (Assert r0 < (e/r(2)) BY
(nRMul ⌜r(2)⌝ 0⋅ THEN Auto))
)
THEN (InstLemma `nearby-partition-sum-no-mc` [⌜I⌝;⌜f⌝;⌜p⌝;⌜x⌝;⌜(alpha/r(2))⌝]⋅ THENA Auto)
THEN ExRepD
THEN (InstLemma `nearby-partition-sum-no-mc` [⌜I⌝;⌜f⌝;⌜q⌝;⌜y⌝;⌜(alpha/r(2))⌝]⋅ THENA Auto)
THEN ExRepD) }
1
1. I : Interval@i
2. icompact(I)
3. iproper(I)
4. f : {f:I ⟶ℝ| ifun(f;I)} @i
5. alpha : {alpha:ℝ| r0 < alpha} @i
6. e : {e:ℝ| r0 < e} @i
7. p : partition(I)@i
8. q : partition(I)@i
9. x : partition-choice(full-partition(I;p))@i
10. y : partition-choice(full-partition(I;q))@i
11. r0 < (alpha/r(2))
12. r0 < (e/r(2))
13. e1 : {e:ℝ| r0 < e}
14. ∀q:partition(I). ∀y:partition-choice(full-partition(I;q)).
(nearby-partitions(e1;p;q)
⇒ (∀i:ℕ||p|| + 1. (|x[i] - y[i]| ≤ e1))
⇒ (|S(f;full-partition(I;q)) - S(f;full-partition(I;p))| ≤ (alpha/r(2))))
15. e2 : {e:ℝ| r0 < e}
16. ∀q@0:partition(I). ∀y@0:partition-choice(full-partition(I;q@0)).
(nearby-partitions(e2;q;q@0)
⇒ (∀i:ℕ||q|| + 1. (|y[i] - y@0[i]| ≤ e2))
⇒ (|S(f;full-partition(I;q@0)) - S(f;full-partition(I;q))| ≤ (alpha/r(2))))
⊢ ∃p':partition(I)
∃x':partition-choice(full-partition(I;p'))
((partition-mesh(I;p') ≤ (partition-mesh(I;p) + e))
∧ (∃q':partition(I)
∃y':partition-choice(full-partition(I;q'))
(separated-partitions(p';q')
∧ (partition-mesh(I;q') ≤ (partition-mesh(I;q) + e))
∧ (|S(f;full-partition(I;p)) - S(f;full-partition(I;q))| ≤ (|S(f;full-partition(I;p'))
- S(f;full-partition(I;q'))|
+ alpha)))))
Latex:
Latex:
\mforall{}I:Interval
(icompact(I)
{}\mRightarrow{} iproper(I)
{}\mRightarrow{} (\mforall{}f:\{f:I {}\mrightarrow{}\mBbbR{}| ifun(f;I)\} . \mforall{}alpha,e:\{e:\mBbbR{}| r0 < e\} . \mforall{}p,q:partition(I).
\mforall{}x:partition-choice(full-partition(I;p)). \mforall{}y:partition-choice(full-partition(I;q)).
\mexists{}p':partition(I)
\mexists{}x':partition-choice(full-partition(I;p'))
((partition-mesh(I;p') \mleq{} (partition-mesh(I;p) + e))
\mwedge{} (\mexists{}q':partition(I)
\mexists{}y':partition-choice(full-partition(I;q'))
(separated-partitions(p';q')
\mwedge{} (partition-mesh(I;q') \mleq{} (partition-mesh(I;q) + e))
\mwedge{} (|S(f;full-partition(I;p))
- S(f;full-partition(I;q))| \mleq{} (|S(f;full-partition(I;p'))
- S(f;full-partition(I;q'))|
+ alpha)))))))
By
Latex:
TACTIC:(Auto
THEN ((Assert r0 < (alpha/r(2)) BY
(nRMul \mkleeneopen{}r(2)\mkleeneclose{} 0\mcdot{} THEN Auto))
THEN (Assert r0 < (e/r(2)) BY
(nRMul \mkleeneopen{}r(2)\mkleeneclose{} 0\mcdot{} THEN Auto))
)
THEN (InstLemma `nearby-partition-sum-no-mc` [\mkleeneopen{}I\mkleeneclose{};\mkleeneopen{}f\mkleeneclose{};\mkleeneopen{}p\mkleeneclose{};\mkleeneopen{}x\mkleeneclose{};\mkleeneopen{}(alpha/r(2))\mkleeneclose{}]\mcdot{} THENA Auto)
THEN ExRepD
THEN (InstLemma `nearby-partition-sum-no-mc` [\mkleeneopen{}I\mkleeneclose{};\mkleeneopen{}f\mkleeneclose{};\mkleeneopen{}q\mkleeneclose{};\mkleeneopen{}y\mkleeneclose{};\mkleeneopen{}(alpha/r(2))\mkleeneclose{}]\mcdot{} THENA Auto)
THEN ExRepD)
Home
Index