Proof of Nuprl Lemma : factorit

Step * 2 of Lemma factorit_wf

1. ∀[d:ℕ]. ∀[x:ℕ⁺]. ∀[b:ℕ].
     (x - b * b < d
     ⇒ (2 ≤ b)
     ⇒ (∀[tried:{L:{p:ℕ| prime(p) ∧ p < b}  List| ∀p:{p:ℕ| prime(p)} . (p < b ⇒ ((p ∈ L) ∧ (¬(p | x))))} ].
         ∀[facs:{p:ℕ| prime(p)}  List].
           (factorit(x;b;tried;facs) ∈ {L:{p:ℕ| prime(p)}  List|

                                        reduce(λp,q. (p * q);1;L) = (x * reduce(λp,q. (p * q);1;facs)) ∈ ℤ} )))

⊢ ∀[x:ℕ⁺]. ∀[b:ℕ].
∀[tried:{L:{p:ℕ| prime(p) ∧ p < b} List| ∀p:{p:ℕ| prime(p)} . (p < b ⇒ ((p ∈ L) ∧ (¬(p | x))))} ].
∀[facs:{p:ℕ| prime(p)} List].

      (factorit(x;b;tried;facs) ∈ {L:{p:ℕ| prime(p)}  List| reduce(λp,q. (p * q);1;L) = (x * reduce(λp,q. (p * q);1;facs\000C)) ∈ ℤ} )

    supposing 2 ≤ b
BY
{ (RepeatFor 3 ((D 0 THENA Auto)) THEN (Decide x < b * b THENA Auto)) }

1
1. ∀[d:ℕ]. ∀[x:ℕ⁺]. ∀[b:ℕ].
     (x - b * b < d
     ⇒ (2 ≤ b)
     ⇒ (∀[tried:{L:{p:ℕ| prime(p) ∧ p < b}  List| ∀p:{p:ℕ| prime(p)} . (p < b ⇒ ((p ∈ L) ∧ (¬(p | x))))} ].
         ∀[facs:{p:ℕ| prime(p)}  List].
           (factorit(x;b;tried;facs) ∈ {L:{p:ℕ| prime(p)}  List|

                                        reduce(λp,q. (p * q);1;L) = (x * reduce(λp,q. (p * q);1;facs)) ∈ ℤ} )))

2. x : ℕ⁺
3. b : ℕ
4. 2 ≤ b
5. x < b * b
⊢ ∀[tried:{L:{p:ℕ| prime(p) ∧ p < b} List| ∀p:{p:ℕ| prime(p)} . (p < b ⇒ ((p ∈ L) ∧ (¬(p | x))))} ].
∀[facs:{p:ℕ| prime(p)} List].

    (factorit(x;b;tried;facs) ∈ {L:{p:ℕ| prime(p)}  List| reduce(λp,q. (p * q);1;L) = (x * reduce(λp,q. (p * q);1;facs))\000C ∈ ℤ} )

2
1. ∀[d:ℕ]. ∀[x:ℕ⁺]. ∀[b:ℕ].
     (x - b * b < d
     ⇒ (2 ≤ b)
     ⇒ (∀[tried:{L:{p:ℕ| prime(p) ∧ p < b}  List| ∀p:{p:ℕ| prime(p)} . (p < b ⇒ ((p ∈ L) ∧ (¬(p | x))))} ].
         ∀[facs:{p:ℕ| prime(p)}  List].
           (factorit(x;b;tried;facs) ∈ {L:{p:ℕ| prime(p)}  List|

                                        reduce(λp,q. (p * q);1;L) = (x * reduce(λp,q. (p * q);1;facs)) ∈ ℤ} )))

2. x : ℕ⁺
3. b : ℕ
4. 2 ≤ b
5. ¬x < b * b
⊢ ∀[tried:{L:{p:ℕ| prime(p) ∧ p < b} List| ∀p:{p:ℕ| prime(p)} . (p < b ⇒ ((p ∈ L) ∧ (¬(p | x))))} ].
∀[facs:{p:ℕ| prime(p)} List].

    (factorit(x;b;tried;facs) ∈ {L:{p:ℕ| prime(p)}  List| reduce(λp,q. (p * q);1;L) = (x * reduce(λp,q. (p * q);1;facs))\000C ∈ ℤ} )

Latex:

Latex:
1. \mforall{}[d:\mBbbN{}]. \mforall{}[x:\mBbbN{}\msupplus{}]. \mforall{}[b:\mBbbN{}]. (x - b * b < d {}\mRightarrow{} (2 \mleq{} b) {}\mRightarrow{} (\mforall{}[tried:\{L:\{p:\mBbbN{}| prime(p) \mwedge{} p < b\} List| \mforall{}p:\{p:\mBbbN{}| prime(p)\} . (p < b {}\mRightarrow{} ((p \mmember{} L) \mwedge{} (\mneg{}(p | x))))\} ]. \mforall{}[facs:\{p:\mBbbN{}| prime(p)\} List]. (factorit(x;b;tried;facs) \mmember{} \{L:\{p:\mBbbN{}| prime(p)\} List| reduce(\mlambda{}p,q. (p * q);1;L) = (x * reduce(\mlambda{}p,q. (p * q);1;facs\000C))\} ))) \mvdash{} \mforall{}[x:\mBbbN{}\msupplus{}]. \mforall{}[b:\mBbbN{}]. \mforall{}[tried:\{L:\{p:\mBbbN{}| prime(p) \mwedge{} p < b\} List| \mforall{}p:\{p:\mBbbN{}| prime(p)\} . (p < b {}\mRightarrow{} ((p \mmember{} L) \mwedge{} (\mneg{}(p | x))))\000C\} ]. \mforall{}[facs:\{p:\mBbbN{}| prime(p)\} List]. (factorit(x;b;tried;facs) \mmember{} \{L:\{p:\mBbbN{}| prime(p)\} List| reduce(\mlambda{}p,q. (p * q);1;L) = (x * reduce(\mlambda{}p,q. (p * q);1;facs))\} )\000C supposing 2 \mleq{} b By Latex: (RepeatFor 3 ((D 0 THENA Auto)) THEN (Decide x < b * b THENA Auto)) Home Index