Proof of Nuprl Lemma : bag-summation-product

Step * 2 2 2 1 1 1 of Lemma bag-summation-product

.....assertion.....
1. r : Rng
2. Assoc(|r|;+r)
3. Comm(|r|;+r)
4. A : Type
5. B : Type
6. f : A ⟶ |r|
7. c : bag(B)
8. g : B ⟶ |r|
9. u : A
10. v : A List
11. (Σ(x∈v). f[x] * Σ(y∈c). g[y]) = Σ(p∈v × c). f[fst(p)] * g[snd(p)] ∈ |r|
12. IsMonoid(|r|;+r;0)
13. Σ(x∈v). f[x] ∈ |r|
14. X : bag(A × B)
15. bag-map(λx.<u, x>;c) = X ∈ bag(A × B)
⊢ Σ(p∈X). f[fst(p)] * g[snd(p)] = Σ(y∈c). f[u] * g[y] ∈ |r|
BY
{ (RevHypSubst (-1) 0 THEN Auto) }

1
1. r : Rng
2. Assoc(|r|;+r)
3. Comm(|r|;+r)
4. A : Type
5. B : Type
6. f : A ⟶ |r|
7. c : bag(B)
8. g : B ⟶ |r|
9. u : A
10. v : A List
11. (Σ(x∈v). f[x] * Σ(y∈c). g[y]) = Σ(p∈v × c). f[fst(p)] * g[snd(p)] ∈ |r|
12. IsMonoid(|r|;+r;0)
13. Σ(x∈v). f[x] ∈ |r|
14. X : bag(A × B)
15. bag-map(λx.<u, x>;c) = X ∈ bag(A × B)
⊢ Σ(p∈bag-map(λx.<u, x>;c)). f[fst(p)] * g[snd(p)] = Σ(y∈c). f[u] * g[y] ∈ |r|

Latex:

Latex:
.....assertion..... 1. r : Rng 2. Assoc(|r|;+r) 3. Comm(|r|;+r) 4. A : Type 5. B : Type 6. f : A {}\mrightarrow{} |r| 7. c : bag(B) 8. g : B {}\mrightarrow{} |r| 9. u : A 10. v : A List 11. (\mSigma{}(x\mmember{}v). f[x] * \mSigma{}(y\mmember{}c). g[y]) = \mSigma{}(p\mmember{}v \mtimes{} c). f[fst(p)] * g[snd(p)] 12. IsMonoid(|r|;+r;0) 13. \mSigma{}(x\mmember{}v). f[x] \mmember{} |r| 14. X : bag(A \mtimes{} B) 15. bag-map(\mlambda{}x.<u, x>c) = X \mvdash{} \mSigma{}(p\mmember{}X). f[fst(p)] * g[snd(p)] = \mSigma{}(y\mmember{}c). f[u] * g[y] By Latex: (RevHypSubst (-1) 0 THEN Auto) Home Index