Proof of Nuprl Lemma : bag-moebius-inversion

Step * 1 of Lemma bag-moebius-inversion

1. X : Type
2. valueall-type(X)
3. eq : EqDecider(X)
4. r : CRng
5. f : bag(X) ⟶ |r|
6. g : bag(X) ⟶ |r|
7. g = (f*fps-moebius(eq;r)) ∈ (bag(X) ⟶ |r|) supposing f = (g*λb.1) ∈ (bag(X) ⟶ |r|)
8. ∀b:bag(X). ((f b) = Σ(s∈sub-bags(eq;b)). g s ∈ |r|)
9. b : bag(X)
⊢ (g b) = Σ(p∈bag-partitions(eq;b)). (f (fst(p))) * int-to-ring(r;bag-moebius(eq;snd(p))) ∈ |r|
BY
{ xxxD -3xxx }

1
.....antecedent.....
1. X : Type
2. valueall-type(X)
3. eq : EqDecider(X)
4. r : CRng
5. f : bag(X) ⟶ |r|
6. g : bag(X) ⟶ |r|
7. ∀b:bag(X). ((f b) = Σ(s∈sub-bags(eq;b)). g s ∈ |r|)
8. b : bag(X)
⊢ f = (g*λb.1) ∈ (bag(X) ⟶ |r|)

2
1. X : Type
2. valueall-type(X)
3. eq : EqDecider(X)
4. r : CRng
5. f : bag(X) ⟶ |r|
6. g : bag(X) ⟶ |r|
7. ∀b:bag(X). ((f b) = Σ(s∈sub-bags(eq;b)). g s ∈ |r|)
8. b : bag(X)
9. g = (f*fps-moebius(eq;r)) ∈ (bag(X) ⟶ |r|)
⊢ (g b) = Σ(p∈bag-partitions(eq;b)). (f (fst(p))) * int-to-ring(r;bag-moebius(eq;snd(p))) ∈ |r|

Latex:

Latex:
1. X : Type 2. valueall-type(X) 3. eq : EqDecider(X) 4. r : CRng 5. f : bag(X) {}\mrightarrow{} |r| 6. g : bag(X) {}\mrightarrow{} |r| 7. g = (f*fps-moebius(eq;r)) supposing f = (g*\mlambda{}b.1) 8. \mforall{}b:bag(X). ((f b) = \mSigma{}(s\mmember{}sub-bags(eq;b)). g s) 9. b : bag(X) \mvdash{} (g b) = \mSigma{}(p\mmember{}bag-partitions(eq;b)). (f (fst(p))) * int-to-ring(r;bag-moebius(eq;snd(p))) By Latex: xxxD -3xxx Home Index