Proof of Nuprl Lemma : exp-convex

Step * 1 1 1 1 1 of Lemma exp-convex

.....equality.....
1. a : ℕ
2. b : ℕ
3. c : ℕ
4. n : ℤ
5. 0 < n
6. |(a * a^n) - b * b^n| ≤ (c * c^n)
7. c < |a - b|
8. c^n < |a^n - b^n|
9. (|a - b| * |a^n - b^n|) ≤ |(imax(a;b) * imax(a^n;b^n)) - imin(a;b) * imin(a^n;b^n)|
⊢ |(imax(a;b) * imax(a^n;b^n)) - imin(a;b) * imin(a^n;b^n)| ~ |(a * a^n) - b * b^n|
BY
{ xxx(Decide ⌜a ≤ b⌝⋅ THENA Auto)xxx }

1
1. a : ℕ
2. b : ℕ
3. c : ℕ
4. n : ℤ
5. 0 < n
6. |(a * a^n) - b * b^n| ≤ (c * c^n)
7. c < |a - b|
8. c^n < |a^n - b^n|
9. (|a - b| * |a^n - b^n|) ≤ |(imax(a;b) * imax(a^n;b^n)) - imin(a;b) * imin(a^n;b^n)|
10. a ≤ b
⊢ |(imax(a;b) * imax(a^n;b^n)) - imin(a;b) * imin(a^n;b^n)| ~ |(a * a^n) - b * b^n|

2
1. a : ℕ
2. b : ℕ
3. c : ℕ
4. n : ℤ
5. 0 < n
6. |(a * a^n) - b * b^n| ≤ (c * c^n)
7. c < |a - b|
8. c^n < |a^n - b^n|
9. (|a - b| * |a^n - b^n|) ≤ |(imax(a;b) * imax(a^n;b^n)) - imin(a;b) * imin(a^n;b^n)|
10. ¬(a ≤ b)
⊢ |(imax(a;b) * imax(a^n;b^n)) - imin(a;b) * imin(a^n;b^n)| ~ |(a * a^n) - b * b^n|

Latex:

Latex:
.....equality..... 1. a : \mBbbN{} 2. b : \mBbbN{} 3. c : \mBbbN{} 4. n : \mBbbZ{} 5. 0 < n 6. |(a * a\^{}n) - b * b\^{}n| \mleq{} (c * c\^{}n) 7. c < |a - b| 8. c\^{}n < |a\^{}n - b\^{}n| 9. (|a - b| * |a\^{}n - b\^{}n|) \mleq{} |(imax(a;b) * imax(a\^{}n;b\^{}n)) - imin(a;b) * imin(a\^{}n;b\^{}n)| \mvdash{} |(imax(a;b) * imax(a\^{}n;b\^{}n)) - imin(a;b) * imin(a\^{}n;b\^{}n)| \msim{} |(a * a\^{}n) - b * b\^{}n| By Latex: xxx(Decide \mkleeneopen{}a \mleq{} b\mkleeneclose{}\mcdot{} THENA Auto)xxx Home Index