Proof of Nuprl Lemma : rmul-rinv1

Step * 1 1 1 1 1 1 1 of Lemma rmul-rinv1

1. x : ℝ
2. a : {1...}
3. mu-ge(λn.4 <z |x n|;1) = a ∈ {1...}
4. 4 < |x a|
5. ∀[i:ℕ⁺a]. (¬4 < |x i|)
6. ∀m:ℕ⁺. ((a ≤ m) ⇒ (m ≤ (a * |x m|)))
7. a = 1 ∈ ℤ
8. reg-seq-inv(x) ∈ {f:ℕ⁺ ⟶ ℤ| 5-regular-seq(f)}
9. n : ℕ⁺
10. x n ≠ 0
⊢ |((((4 * n * n) ÷ x n) * (x n)) ÷ 2 * n) - 2 * n * 1| ≤ (canonical-bound(x) + 1)
BY

{ (Using [`n',⌜|2 * n|⌝] (BLemma `mul_cancel_in_le`)⋅ THENA (Auto THEN RWO "absval_pos" 0 THEN Auto'))⋅ }

1
1. x : ℝ
2. a : {1...}
3. mu-ge(λn.4 <z |x n|;1) = a ∈ {1...}
4. 4 < |x a|
5. ∀[i:ℕ⁺a]. (¬4 < |x i|)
6. ∀m:ℕ⁺. ((a ≤ m) ⇒ (m ≤ (a * |x m|)))
7. a = 1 ∈ ℤ
8. reg-seq-inv(x) ∈ {f:ℕ⁺ ⟶ ℤ| 5-regular-seq(f)}
9. n : ℕ⁺
10. x n ≠ 0

⊢ (|2 * n| * |((((4 * n * n) ÷ x n) * (x n)) ÷ 2 * n) - 2 * n * 1|) ≤ (|2 * n| * (canonical-bound(x) + 1))

Latex:

Latex:
1. x : \mBbbR{} 2. a : \{1...\} 3. mu-ge(\mlambda{}n.4 <z |x n|;1) = a 4. 4 < |x a| 5. \mforall{}[i:\mBbbN{}\msupplus{}a]. (\mneg{}4 < |x i|) 6. \mforall{}m:\mBbbN{}\msupplus{}. ((a \mleq{} m) {}\mRightarrow{} (m \mleq{} (a * |x m|))) 7. a = 1 8. reg-seq-inv(x) \mmember{} \{f:\mBbbN{}\msupplus{} {}\mrightarrow{} \mBbbZ{}| 5-regular-seq(f)\} 9. n : \mBbbN{}\msupplus{} 10. x n \mneq{} 0 \mvdash{} |((((4 * n * n) \mdiv{} x n) * (x n)) \mdiv{} 2 * n) - 2 * n * 1| \mleq{} (canonical-bound(x) + 1) By Latex: (Using [`n',\mkleeneopen{}|2 * n|\mkleeneclose{}] (BLemma `mul\_cancel\_in\_le`)\mcdot{} THENA (Auto THEN RWO "absval\_pos" 0 THEN Auto')) \mcdot{} Home Index