Proof of Nuprl Lemma : bag-member-parts'

Step * 2 1 2 1 1 2 of Lemma bag-member-parts'

1. T : Type
2. valueall-type(T)
3. eq : EqDecider(T)
4. x : T
5. bs : bag(T)
6. ¬(bs = {} ∈ bag(T))
7. L : bag(T) List⁺
8. ¬x ↓∈ hd(L)
9. (∀x∈tl(L).¬(x = {} ∈ bag(T)))
10. bag-union(L) = bs ∈ bag(T)
11. hd(L) = {} ∈ bag(T)
12. ¬(tl(L) = [] ∈ (bag(T) List))
⊢ (↓∃v:bag(T) List⁺. (v ↓∈ bag-parts(eq;bs) ∧ (L = [{} / v] ∈ bag(T) List⁺)))
↓∨ L ↓∈ [L∈bag-parts(eq;bs)|((#x in hd(L)) =_z 0)]
BY
{ xxx(RepeatFor 2 ((DVar `L' THENA Auto)) THEN Auto' THEN All Reduce)xxx }

1
1. T : Type
2. valueall-type(T)
3. eq : EqDecider(T)
4. x : T
5. bs : bag(T)
6. ¬(bs = {} ∈ bag(T))
7. u : bag(T)
8. v : bag(T) List
9. (||v|| + 1) ≥ 1
10. ¬x ↓∈ u
11. (∀x∈v.¬(x = {} ∈ bag(T)))
12. bag-union([u / v]) = bs ∈ bag(T)
13. u = {} ∈ bag(T)
14. ¬(v = [] ∈ (bag(T) List))

⊢ (↓∃v@0:bag(T) List⁺. (v@0 ↓∈ bag-parts(eq;bs) ∧ ([u / v] = [{} / v@0] ∈ bag(T) List⁺)))

↓∨ [u / v] ↓∈ [L∈bag-parts(eq;bs)|((#x in hd(L)) =_z 0)]

Latex:

Latex:
1. T : Type 2. valueall-type(T) 3. eq : EqDecider(T) 4. x : T 5. bs : bag(T) 6. \mneg{}(bs = \{\}) 7. L : bag(T) List\msupplus{} 8. \mneg{}x \mdownarrow{}\mmember{} hd(L) 9. (\mforall{}x\mmember{}tl(L).\mneg{}(x = \{\})) 10. bag-union(L) = bs 11. hd(L) = \{\} 12. \mneg{}(tl(L) = []) \mvdash{} (\mdownarrow{}\mexists{}v:bag(T) List\msupplus{}. (v \mdownarrow{}\mmember{} bag-parts(eq;bs) \mwedge{} (L = [\{\} / v]))) \mdownarrow{}\mvee{} L \mdownarrow{}\mmember{} [L\mmember{}bag-parts(eq;bs)|((\#x in hd(L)) =\msubz{} 0)] By Latex: xxx(RepeatFor 2 ((DVar `L' THENA Auto)) THEN Auto' THEN All Reduce)xxx Home Index