Proof of Nuprl Lemma : fps-compose-mul

Step * 1 1 1 of Lemma fps-compose-mul

1. X : Type
2. valueall-type(X)
3. eq : EqDecider(X)
4. r : CRng
5. x : X
6. g : PowerSeries(X;r)
7. f : PowerSeries(X;r)
8. h : PowerSeries(X;r)
9. ∀L:bag(X) List⁺. (||L|| ≥ 1 )
10. Assoc(|r|;+r)
11. IsMonoid(|r|;+r;0)
12. Comm(|r|;+r)
13. Comm(|r|;*)
14. Assoc(|r|;*)
15. ∀L:bag(X) List⁺. (Πa ∈ tl(L). f a ∈ |r|)
16. b : bag(X)
17. ∀[f:(Top × bag(X) List⁺ × bag(X) List⁺) ⟶ |r|]

      ∀[b:bag(Top × bag(X) List⁺ × bag(X) List⁺)]. (Σ(x∈b). f[x] = Σ(x∈bag-map(λ₂p.snd(p);b)). f[<⋅, x>] ∈ |r|)

      supposing ∀x:Top × bag(X) List⁺ × bag(X) List⁺. (x = <⋅, snd(x)> ∈ (Top × bag(X) List⁺ × bag(X) List⁺))

⊢ Σ(p∈⋃p∈bag-partitions(eq;b).bag-parts'(eq;fst(p);x) × bag-parts'(eq;snd(p);x)). ((g

                                                                                    (hd(fst(p))

                                                                                    + bag-rep(||tl(fst(p))||;x)))

                                                                                   Πa ∈ tl(fst(p)). f a)

((h

                                                                                    (hd(snd(p))

                                                                                    + bag-rep(||tl(snd(p))||;x)))

                                                                                   Πa ∈ tl(snd(p)). f a)

= Σ(p∈bag-map(λ₂p.snd(p);⋃p∈bag-partitions(eq;b).

                         bag-map(λp1.<p, p1>;bag-parts'(eq;fst(p);x) × bag-parts'(eq;snd(p);x))))

   ((g (hd(fst(snd(<⋅, p>))) + bag-rep(||tl(fst(snd(<⋅, p>)))||;x))) * Πa ∈ tl(fst(snd(<⋅, p>))). f a) * ((h (hd(snd(snd\000C(<⋅, p>))) + bag-rep(||tl(snd(snd(<⋅, p>)))||;x))) * Πa ∈ tl(snd(snd(<⋅, p>))). f a)

∈ |r|
BY
{ (Thin (-1)
   THEN Reduce 0
   THEN (Using [`T', ⌜bag(X) List⁺ × bag(X) List⁺⌝] (BLemma `bag-summation-equal2`)⋅
         THEN Try (Complete ((Auto THEN BackThruSomeHyp)))
         )⋅) }

1
1. X : Type
2. valueall-type(X)
3. eq : EqDecider(X)
4. r : CRng
5. x : X
6. g : PowerSeries(X;r)
7. f : PowerSeries(X;r)
8. h : PowerSeries(X;r)
9. ∀L:bag(X) List⁺. (||L|| ≥ 1 )
10. Assoc(|r|;+r)
11. IsMonoid(|r|;+r;0)
12. Comm(|r|;+r)
13. Comm(|r|;*)
14. Assoc(|r|;*)
15. ∀L:bag(X) List⁺. (Πa ∈ tl(L). f a ∈ |r|)
16. b : bag(X)
⊢ (∀p:bag(X) List⁺ × bag(X) List⁺
     (p ↓∈ ⋃p∈bag-partitions(eq;b).bag-parts'(eq;fst(p);x) × bag-parts'(eq;snd(p);x)
     ⇒ ((((g (hd(fst(p)) + bag-rep(||tl(fst(p))||;x))) * Πa ∈ tl(fst(p)). f a)
          *
          ((h (hd(snd(p)) + bag-rep(||tl(snd(p))||;x))) * Πa ∈ tl(snd(p)). f a))
        = (((g (hd(fst(p)) + bag-rep(||tl(fst(p))||;x))) * Πa ∈ tl(fst(p)). f a)
           *
           ((h (hd(snd(p)) + bag-rep(||tl(snd(p))||;x))) * Πa ∈ tl(snd(p)). f a))
        ∈ |r|)))
∧ (⋃p∈bag-partitions(eq;b).bag-parts'(eq;fst(p);x) × bag-parts'(eq;snd(p);x)

  = bag-map(λ₂p.snd(p);⋃p∈bag-partitions(eq;b).bag-map(λp1.<p, p1>;bag-parts'(eq;fst(p);x) × bag-parts'(eq;snd(p);x)))

∈ bag(bag(X) List⁺ × bag(X) List⁺))

Latex:

Latex:
1. X : Type 2. valueall-type(X) 3. eq : EqDecider(X) 4. r : CRng 5. x : X 6. g : PowerSeries(X;r) 7. f : PowerSeries(X;r) 8. h : PowerSeries(X;r) 9. \mforall{}L:bag(X) List\msupplus{}. (||L|| \mgeq{} 1 ) 10. Assoc(|r|;+r) 11. IsMonoid(|r|;+r;0) 12. Comm(|r|;+r) 13. Comm(|r|;*) 14. Assoc(|r|;*) 15. \mforall{}L:bag(X) List\msupplus{}. (\mPi{}a \mmember{} tl(L). f a \mmember{} |r|) 16. b : bag(X) 17. \mforall{}[f:(Top \mtimes{} bag(X) List\msupplus{} \mtimes{} bag(X) List\msupplus{}) {}\mrightarrow{} |r|] \mforall{}[b:bag(Top \mtimes{} bag(X) List\msupplus{} \mtimes{} bag(X) List\msupplus{})] (\mSigma{}(x\mmember{}b). f[x] = \mSigma{}(x\mmember{}bag-map(\mlambda{}\msubtwo{}p.snd(p);b)). f[<\mcdot{}, x>]) supposing \mforall{}x:Top \mtimes{} bag(X) List\msupplus{} \mtimes{} bag(X) List\msupplus{}. (x = <\mcdot{}, snd(x)>) \mvdash{} \mSigma{}(p\mmember{}\mcup{}p\mmember{}bag-partitions(eq;b).bag-parts'(eq;fst(p);x) \mtimes{} bag-parts'(eq;snd(p);x)) ((g (hd(fst(p)) + bag-rep(||tl(fst(p))||;x))) * \mPi{}a \mmember{} tl(fst(p)). f a) * ((h (hd(snd(p)) + bag-rep(||tl(snd(p))||;x))) * \mPi{}a \mmember{} tl(snd(p)). f a) = \mSigma{}(p\mmember{}bag-map(\mlambda{}\msubtwo{}p.snd(p);\mcup{}p\mmember{}bag-partitions(eq;b). bag-map(\mlambda{}p1.<p, p1>bag-parts'(eq;fst(p);x) \mtimes{} bag-parts'(eq;snd(p);x)))) ((g (hd(fst(snd(<\mcdot{}, p>))) + bag-rep(||tl(fst(snd(<\mcdot{}, p>)))||;x))) * \mPi{}a \mmember{} tl(fst(snd(<\mcdot{}, p>))). f \000Ca) * ((h (hd(snd(snd(<\mcdot{}, p>))) + bag-rep(||tl(snd(snd(<\mcdot{}, p>)))||;x))) * \mPi{}a \mmember{} tl(snd(snd(<\mcdot{}, p>))). f \000Ca) By Latex: (Thin (-1) THEN Reduce 0 THEN (Using [`T', \mkleeneopen{}bag(X) List\msupplus{} \mtimes{} bag(X) List\msupplus{}\mkleeneclose{}] (BLemma `bag-summation-equal2`)\mcdot{} THEN Try (Complete ((Auto THEN BackThruSomeHyp))) )\mcdot{}) Home Index