Proof of Nuprl Lemma : Wmul-Wadd

Step * 2 of Lemma Wmul-Wadd

1. A : Type
2. B : A ⟶ Type
3. zero : A ⟶ 𝔹
4. succ : A ⟶ 𝔹
5. ∀a:A. (((↑(succ a)) ⇒ (Unit ⊆r B[a])) ∧ ((↑(zero a)) ⇒ (¬B[a])))
6. a : A
7. f : B[a] ⟶ W(A;a.B[a])
8. ∀b:B[a]. ∀w2,w1:W(A;a.B[a]).  ((w1 * (w2 + f b)) = ((w1 * w2) + (w1 * f b)) ∈ W(A;a.B[a]))
9. w2 : W(A;a.B[a])
10. w1 : W(A;a.B[a])
11. ¬↑(zero a)
⊢ (w1 * (w2 + Wsup(a;f))) = ((w1 * w2) + (w1 * Wsup(a;f))) ∈ W(A;a.B[a])
BY
{ (RW (AddrC [2] RecUnfoldTopAbC) 0
   THEN RW (AddrC [3;3] RecUnfoldTopAbC) 0
   THEN RW (AddrC [2;1] RecUnfoldTopAbC) 0
   THEN RepeatFor 2 ((Unfold `Wsup` 0 THEN Reduce 0 THEN Fold `Wsup` 0 THEN AutoSplit)))⋅ }

1
1. A : Type
2. B : A ⟶ Type
3. zero : A ⟶ 𝔹
4. succ : A ⟶ 𝔹
5. ∀a:A. (((↑(succ a)) ⇒ (Unit ⊆r B[a])) ∧ ((↑(zero a)) ⇒ (¬B[a])))
6. a : A
7. ¬↑(succ a)
8. ¬↑(zero a)
9. f : B[a] ⟶ W(A;a.B[a])
10. ∀b:B[a]. ∀w2,w1:W(A;a.B[a]).  ((w1 * (w2 + f b)) = ((w1 * w2) + (w1 * f b)) ∈ W(A;a.B[a]))
11. w2 : W(A;a.B[a])
12. w1 : W(A;a.B[a])
13. ¬False
⊢ Wsup(a;λx.(w1 * (w2 + f x))) = ((w1 * w2) + Wsup(a;λx.(w1 * f x))) ∈ W(A;a.B[a])

Latex:

Latex:
1. A : Type 2. B : A {}\mrightarrow{} Type 3. zero : A {}\mrightarrow{} \mBbbB{} 4. succ : A {}\mrightarrow{} \mBbbB{} 5. \mforall{}a:A. (((\muparrow{}(succ a)) {}\mRightarrow{} (Unit \msubseteq{}r B[a])) \mwedge{} ((\muparrow{}(zero a)) {}\mRightarrow{} (\mneg{}B[a]))) 6. a : A 7. f : B[a] {}\mrightarrow{} W(A;a.B[a]) 8. \mforall{}b:B[a]. \mforall{}w2,w1:W(A;a.B[a]). ((w1 * (w2 + f b)) = ((w1 * w2) + (w1 * f b))) 9. w2 : W(A;a.B[a]) 10. w1 : W(A;a.B[a]) 11. \mneg{}\muparrow{}(zero a) \mvdash{} (w1 * (w2 + Wsup(a;f))) = ((w1 * w2) + (w1 * Wsup(a;f))) By Latex: (RW (AddrC [2] RecUnfoldTopAbC) 0 THEN RW (AddrC [3;3] RecUnfoldTopAbC) 0 THEN RW (AddrC [2;1] RecUnfoldTopAbC) 0 THEN RepeatFor 2 ((Unfold `Wsup` 0 THEN Reduce 0 THEN Fold `Wsup` 0 THEN AutoSplit)))\mcdot{} Home Index