Proof of Nuprl Lemma : reg-seq-nexp

Step * 2 1 1 1 1 1 1 1 of Lemma reg-seq-nexp_wf

1. x : ℝ
2. k : ℕ⁺
3. 1 ≤ 2^k - 1
4. v : {3...}
5. canon-bnd(x) = v ∈ {k:{3...}| ∀n:ℕ⁺. (|x n| ≤ (n * k))}
6. 1 ≤ 2^(k - 1)
7. n : ℕ⁺
8. m : ℕ⁺
9. ∀n:ℕ⁺. (|x n| ≤ (n * v))
10. 0 ≤ (v^(k - 1) ÷ 2^(k - 1))
11. 0 ≤ (k * ((v^(k - 1) ÷ 2^(k - 1)) + 1))
12. B : ℕ
13. (k * ((v^(k - 1) ÷ 2^(k - 1)) + 1)) = B ∈ ℕ
14. c : ℕ⁺
15. (n + m) = c ∈ ℕ⁺
16. 0 < (2 * n)^(k - 1) ∧ 0 < (2 * m)^(k - 1)
17. M : ℕ
18. (2 * m)^(k - 1) = M ∈ ℕ
19. N : ℕ
20. (2 * n)^(k - 1) = N ∈ ℕ
21. r : {r:ℤ| |r| < |N|}
22. ((x n)^k rem N) = r ∈ {r:ℤ| |r| < |N|}
23. r1 : {r:ℤ| |r| < |M|}
24. ((x m)^k rem M) = r1 ∈ {r:ℤ| |r| < |M|}

25. |(M * m * (x n)^k) + ((-1) * M * m * r) + ((-1) * N * n * (x m)^k) + (N * n * r1)| ≤ (|(M * m * (x n)^k) - N

                                                                                          * n

                                                                                          * (x m)^k|

+ |-(M * m * r)|
+ |N * n * r1|)
26. |N * n * r1| ≤ (n * |M| * |N|)
27. |-(M * m * r)| ≤ (m * |M| * |N|)

⊢ (|(M * m * (x n)^k) - N * n * (x m)^k| + (m * |M| * |N|) + (n * |M| * |N|)) ≤ ((2 * B * c * |M| * |N|)

  + (2 * c * |M| * |N|))
BY
{ ((Assert ((m * |M| * |N|) + (n * |M| * |N|)) ≤ (c * |M| * |N|) BY
          (SubstFor ⌜c⌝ 0⋅ THEN RW  IntNormC 0 THEN Auto))
   THEN (RWO "-1" 0 THENA Auto)
   ) }

1
1. x : ℝ
2. k : ℕ⁺
3. 1 ≤ 2^k - 1
4. v : {3...}
5. canon-bnd(x) = v ∈ {k:{3...}| ∀n:ℕ⁺. (|x n| ≤ (n * k))}
6. 1 ≤ 2^(k - 1)
7. n : ℕ⁺
8. m : ℕ⁺
9. ∀n:ℕ⁺. (|x n| ≤ (n * v))
10. 0 ≤ (v^(k - 1) ÷ 2^(k - 1))
11. 0 ≤ (k * ((v^(k - 1) ÷ 2^(k - 1)) + 1))
12. B : ℕ
13. (k * ((v^(k - 1) ÷ 2^(k - 1)) + 1)) = B ∈ ℕ
14. c : ℕ⁺
15. (n + m) = c ∈ ℕ⁺
16. 0 < (2 * n)^(k - 1) ∧ 0 < (2 * m)^(k - 1)
17. M : ℕ
18. (2 * m)^(k - 1) = M ∈ ℕ
19. N : ℕ
20. (2 * n)^(k - 1) = N ∈ ℕ
21. r : {r:ℤ| |r| < |N|}
22. ((x n)^k rem N) = r ∈ {r:ℤ| |r| < |N|}
23. r1 : {r:ℤ| |r| < |M|}
24. ((x m)^k rem M) = r1 ∈ {r:ℤ| |r| < |M|}

25. |(M * m * (x n)^k) + ((-1) * M * m * r) + ((-1) * N * n * (x m)^k) + (N * n * r1)| ≤ (|(M * m * (x n)^k) - N

                                                                                          * n

                                                                                          * (x m)^k|

+ |-(M * m * r)|
+ |N * n * r1|)
26. |N * n * r1| ≤ (n * |M| * |N|)
27. |-(M * m * r)| ≤ (m * |M| * |N|)
28. ((m * |M| * |N|) + (n * |M| * |N|)) ≤ (c * |M| * |N|)

⊢ (|(M * m * (x n)^k) - N * n * (x m)^k| + (c * |M| * |N|)) ≤ ((2 * B * c * |M| * |N|) + (2 * c * |M| * |N|))

Latex:

Latex:
1. x : \mBbbR{} 2. k : \mBbbN{}\msupplus{} 3. 1 \mleq{} 2\^{}k - 1 4. v : \{3...\} 5. canon-bnd(x) = v 6. 1 \mleq{} 2\^{}(k - 1) 7. n : \mBbbN{}\msupplus{} 8. m : \mBbbN{}\msupplus{} 9. \mforall{}n:\mBbbN{}\msupplus{}. (|x n| \mleq{} (n * v)) 10. 0 \mleq{} (v\^{}(k - 1) \mdiv{} 2\^{}(k - 1)) 11. 0 \mleq{} (k * ((v\^{}(k - 1) \mdiv{} 2\^{}(k - 1)) + 1)) 12. B : \mBbbN{} 13. (k * ((v\^{}(k - 1) \mdiv{} 2\^{}(k - 1)) + 1)) = B 14. c : \mBbbN{}\msupplus{} 15. (n + m) = c 16. 0 < (2 * n)\^{}(k - 1) \mwedge{} 0 < (2 * m)\^{}(k - 1) 17. M : \mBbbN{} 18. (2 * m)\^{}(k - 1) = M 19. N : \mBbbN{} 20. (2 * n)\^{}(k - 1) = N 21. r : \{r:\mBbbZ{}| |r| < |N|\} 22. ((x n)\^{}k rem N) = r 23. r1 : \{r:\mBbbZ{}| |r| < |M|\} 24. ((x m)\^{}k rem M) = r1 25. |(M * m * (x n)\^{}k) + ((-1) * M * m * r) + ((-1) * N * n * (x m)\^{}k) + (N * n * r1)| \mleq{} (|(M * m * (x n)\^{}k) - N * n * (x m)\^{}k| + |-(M * m * r)| + |N * n * r1|) 26. |N * n * r1| \mleq{} (n * |M| * |N|) 27. |-(M * m * r)| \mleq{} (m * |M| * |N|) \mvdash{} (|(M * m * (x n)\^{}k) - N * n * (x m)\^{}k| + (m * |M| * |N|) + (n * |M| * |N|)) \mleq{} ((2 * B * c * |M| * |N|) + (2 * c * |M| * |N|)) By Latex: ((Assert ((m * |M| * |N|) + (n * |M| * |N|)) \mleq{} (c * |M| * |N|) BY (SubstFor \mkleeneopen{}c\mkleeneclose{} 0\mcdot{} THEN RW IntNormC 0 THEN Auto)) THEN (RWO "-1" 0 THENA Auto) ) Home Index