Proof of Nuprl Lemma : partition-split-cons-mesh

Step * 3 1 2 2 of Lemma partition-split-cons-mesh

1. I : Interval
2. icompact(I)
3. a : ℝ
4. bs : ℝ List
5. partitions(I;[a / bs])
6. partitions([left-endpoint(I), a];[])
7. partitions([a, right-endpoint(I)];bs)
8. partitions([left-endpoint(I), a];[])
9. partitions([a, right-endpoint(I)];bs)
10. left-endpoint(I) ≤ a
11. a ≤ right-endpoint(I)
12. partition-mesh([left-endpoint(I), a];[]) ≤ partition-mesh(I;[a / bs])
13. icompact([a, right-endpoint(I)])
14. i : ℕ||full-partition([a, right-endpoint(I)];bs)|| - 1

15. r0≤full-partition(I;[a / bs])[(i + 1) + 1] - full-partition(I;[a / bs])[i + 1]≤partition-mesh(I;[a / bs])

⊢ (full-partition([a, right-endpoint(I)];bs)[i + 1]
- full-partition([a, right-endpoint(I)];bs)[i]) ≤ partition-mesh(I;[a / bs])
BY
{ (D -1 THEN NthHypSq (-1) THEN RepeatFor 2 (EqCD)) }

1
1. I : Interval
2. icompact(I)
3. a : ℝ
4. bs : ℝ List
5. partitions(I;[a / bs])
6. partitions([left-endpoint(I), a];[])
7. partitions([a, right-endpoint(I)];bs)
8. partitions([left-endpoint(I), a];[])
9. partitions([a, right-endpoint(I)];bs)
10. left-endpoint(I) ≤ a
11. a ≤ right-endpoint(I)
12. partition-mesh([left-endpoint(I), a];[]) ≤ partition-mesh(I;[a / bs])
13. icompact([a, right-endpoint(I)])
14. i : ℕ||full-partition([a, right-endpoint(I)];bs)|| - 1
15. r0 ≤ (full-partition(I;[a / bs])[(i + 1) + 1] - full-partition(I;[a / bs])[i + 1])

16. (full-partition(I;[a / bs])[(i + 1) + 1] - full-partition(I;[a / bs])[i + 1]) ≤ partition-mesh(I;[a / bs])

⊢ full-partition([a, right-endpoint(I)];bs)[i + 1] ~ full-partition(I;[a / bs])[(i + 1) + 1]

2
1. I : Interval
2. icompact(I)
3. a : ℝ
4. bs : ℝ List
5. partitions(I;[a / bs])
6. partitions([left-endpoint(I), a];[])
7. partitions([a, right-endpoint(I)];bs)
8. partitions([left-endpoint(I), a];[])
9. partitions([a, right-endpoint(I)];bs)
10. left-endpoint(I) ≤ a
11. a ≤ right-endpoint(I)
12. partition-mesh([left-endpoint(I), a];[]) ≤ partition-mesh(I;[a / bs])
13. icompact([a, right-endpoint(I)])
14. i : ℕ||full-partition([a, right-endpoint(I)];bs)|| - 1
15. r0 ≤ (full-partition(I;[a / bs])[(i + 1) + 1] - full-partition(I;[a / bs])[i + 1])

16. (full-partition(I;[a / bs])[(i + 1) + 1] - full-partition(I;[a / bs])[i + 1]) ≤ partition-mesh(I;[a / bs])

⊢ full-partition([a, right-endpoint(I)];bs)[i] ~ full-partition(I;[a / bs])[i + 1]

Latex:

Latex:
1. I : Interval 2. icompact(I) 3. a : \mBbbR{} 4. bs : \mBbbR{} List 5. partitions(I;[a / bs]) 6. partitions([left-endpoint(I), a];[]) 7. partitions([a, right-endpoint(I)];bs) 8. partitions([left-endpoint(I), a];[]) 9. partitions([a, right-endpoint(I)];bs) 10. left-endpoint(I) \mleq{} a 11. a \mleq{} right-endpoint(I) 12. partition-mesh([left-endpoint(I), a];[]) \mleq{} partition-mesh(I;[a / bs]) 13. icompact([a, right-endpoint(I)]) 14. i : \mBbbN{}||full-partition([a, right-endpoint(I)];bs)|| - 1 15. r0\mleq{}full-partition(I;[a / bs])[(i + 1) + 1] - full-partition(I;[a / bs])[i + 1]\mleq{}partition-mesh(I;[a / bs]) \mvdash{} (full-partition([a, right-endpoint(I)];bs)[i + 1] - full-partition([a, right-endpoint(I)];bs)[i]) \mleq{} partition-mesh(I;[a / bs]) By Latex: (D -1 THEN NthHypSq (-1) THEN RepeatFor 2 (EqCD)) Home Index