Proof of Nuprl Lemma : bag-moebius-property

Step * 2 1 1 1 of Lemma bag-moebius-property

.....equality.....
1. T : Type
2. valueall-type(T)
3. eq : EqDecider(T)
4. b : bag(T)
5. ¬(b = {} ∈ bag(T))
6. Assoc(ℤ;λx,y. (x + y))
7. Comm(ℤ;λx,y. (x + y))
8. Σ(c∈sub-bags(eq;b)). bag-moebius(eq;c) = if bag-null(b) then 1 else 0 fi ∈ ℤ
⊢ bag-moebius(eq;b) + Σ(p∈[p∈bag-partitions(eq;b)|¬_bbag-null(fst(p))]). bag-moebius(eq;snd(p))
~ Σ(p∈sub-bags(eq;b)). bag-moebius(eq;p)
BY

{ xxx((Assert IsMonoid(ℤ;λx,y. (x + y);0) BY RepeatFor 2 ((D 0 THEN Reduce 0 THEN Auto))) THEN Auto)xxx }

1
1. T : Type
2. valueall-type(T)
3. eq : EqDecider(T)
4. b : bag(T)
5. ¬(b = {} ∈ bag(T))
6. Assoc(ℤ;λx,y. (x + y))
7. Comm(ℤ;λx,y. (x + y))
8. Σ(c∈sub-bags(eq;b)). bag-moebius(eq;c) = if bag-null(b) then 1 else 0 fi ∈ ℤ
9. IsMonoid(ℤ;λx,y. (x + y);0)
⊢ (bag-moebius(eq;b) + Σ(p∈[p∈bag-partitions(eq;b)|¬_bbag-null(fst(p))]). bag-moebius(eq;snd(p)))
= Σ(p∈sub-bags(eq;b)). bag-moebius(eq;p)
∈ ℤ

Latex:

Latex:
.....equality..... 1. T : Type 2. valueall-type(T) 3. eq : EqDecider(T) 4. b : bag(T) 5. \mneg{}(b = \{\}) 6. Assoc(\mBbbZ{};\mlambda{}x,y. (x + y)) 7. Comm(\mBbbZ{};\mlambda{}x,y. (x + y)) 8. \mSigma{}(c\mmember{}sub-bags(eq;b)). bag-moebius(eq;c) = if bag-null(b) then 1 else 0 fi \mvdash{} bag-moebius(eq;b) + \mSigma{}(p\mmember{}[p\mmember{}bag-partitions(eq;b)|\mneg{}\msubb{}bag-null(fst(p))]). bag-moebius(eq;snd(p)) \msim{} \mSigma{}(p\mmember{}sub-bags(eq;b)). bag-moebius(eq;p) By Latex: xxx((Assert IsMonoid(\mBbbZ{};\mlambda{}x,y. (x + y);0) BY RepeatFor 2 ((D 0 THEN Reduce 0 THEN Auto))) THEN Auto)xx\000Cx Home Index