Proof of Nuprl Lemma : bag-summation-single-non-zero

Step * 2 of Lemma bag-summation-single-non-zero

1. T : Type
2. eq : EqDecider(T)
3. R : Type
4. add : R ⟶ R ⟶ R
5. zero : R
6. b : bag(T)
7. ∀[p:T ⟶ 𝔹]. ∀[f:T ⟶ R].

     Σ(x∈b). f[x] = (Σ(x∈[x∈b|p[x]]). f[x] add Σ(x∈[x∈b|¬_bp[x]]). f[x]) ∈ R supposing IsMonoid(R;add;zero) ∧ Comm(R;add)

8. f : T ⟶ R
9. IsMonoid(R;add;zero)
10. Comm(R;add)
11. z : T
12. ∀x:T. (x ↓∈ b ⇒ ((x = z ∈ T) ∨ (f[x] = zero ∈ R)))
13. Σ(x∈b). f[x] = (Σ(x∈[x∈b|eq x z]). f[x] add zero) ∈ R
⊢ Σ(x∈b). f[x] = Σ(x∈[x∈b|eq x z]). f[x] ∈ R
BY
{ NthHypEqTrans (-1) }

1
.....assertion.....
1. T : Type
2. eq : EqDecider(T)
3. R : Type
4. add : R ⟶ R ⟶ R
5. zero : R
6. b : bag(T)
7. ∀[p:T ⟶ 𝔹]. ∀[f:T ⟶ R].

     Σ(x∈b). f[x] = (Σ(x∈[x∈b|p[x]]). f[x] add Σ(x∈[x∈b|¬_bp[x]]). f[x]) ∈ R supposing IsMonoid(R;add;zero) ∧ Comm(R;add)

8. f : T ⟶ R
9. IsMonoid(R;add;zero)
10. Comm(R;add)
11. z : T
12. ∀x:T. (x ↓∈ b ⇒ ((x = z ∈ T) ∨ (f[x] = zero ∈ R)))
13. Σ(x∈b). f[x] = (Σ(x∈[x∈b|eq x z]). f[x] add zero) ∈ R
⊢ (Σ(x∈[x∈b|eq x z]). f[x] add zero) = Σ(x∈[x∈b|eq x z]). f[x] ∈ R

Latex:

Latex:
1. T : Type 2. eq : EqDecider(T) 3. R : Type 4. add : R {}\mrightarrow{} R {}\mrightarrow{} R 5. zero : R 6. b : bag(T) 7. \mforall{}[p:T {}\mrightarrow{} \mBbbB{}]. \mforall{}[f:T {}\mrightarrow{} R]. \mSigma{}(x\mmember{}b). f[x] = (\mSigma{}(x\mmember{}[x\mmember{}b|p[x]]). f[x] add \mSigma{}(x\mmember{}[x\mmember{}b|\mneg{}\msubb{}p[x]]). f[x]) supposing IsMonoid(R;add;zero) \mwedge{} Comm(R;add) 8. f : T {}\mrightarrow{} R 9. IsMonoid(R;add;zero) 10. Comm(R;add) 11. z : T 12. \mforall{}x:T. (x \mdownarrow{}\mmember{} b {}\mRightarrow{} ((x = z) \mvee{} (f[x] = zero))) 13. \mSigma{}(x\mmember{}b). f[x] = (\mSigma{}(x\mmember{}[x\mmember{}b|eq x z]). f[x] add zero) \mvdash{} \mSigma{}(x\mmember{}b). f[x] = \mSigma{}(x\mmember{}[x\mmember{}b|eq x z]). f[x] By Latex: NthHypEqTrans (-1) Home Index