Proof of Nuprl Lemma : bag-parts'-no-repeats

Step * 1 1 1 3 1 1 1 of Lemma bag-parts'-no-repeats

1. T : Type
2. valueall-type(T)
3. eq : EqDecider(T)
4. x : T
5. bs : bag(T)
6. ¬(bs = {} ∈ bag(T))
7. bag-no-repeats(bag(T) List⁺;bag-map(λL.[{} / L];bag-parts(eq;bs)))
8. bag-no-repeats(bag(T) List⁺;[L∈bag-parts(eq;bs)|((#x in hd(L)) =_z 0)])
9. z : bag(T) List⁺
10. v : bag(T) List⁺
11. v ↓∈ bag-parts(eq;bs)
12. z = [{} / v] ∈ bag(T) List⁺
13. bag-union(z) = bs ∈ bag(T)
14. ↑((#x in hd(z)) =_z 0)
15. ({} ∈ z) ⇒ (¬({} = {} ∈ bag(T)))
⊢ False
BY
{ D (-1) }

1
.....antecedent.....
1. T : Type
2. valueall-type(T)
3. eq : EqDecider(T)
4. x : T
5. bs : bag(T)
6. ¬(bs = {} ∈ bag(T))
7. bag-no-repeats(bag(T) List⁺;bag-map(λL.[{} / L];bag-parts(eq;bs)))
8. bag-no-repeats(bag(T) List⁺;[L∈bag-parts(eq;bs)|((#x in hd(L)) =_z 0)])
9. z : bag(T) List⁺
10. v : bag(T) List⁺
11. v ↓∈ bag-parts(eq;bs)
12. z = [{} / v] ∈ bag(T) List⁺
13. bag-union(z) = bs ∈ bag(T)
14. ↑((#x in hd(z)) =_z 0)
⊢ ({} ∈ z)

2
1. T : Type
2. valueall-type(T)
3. eq : EqDecider(T)
4. x : T
5. bs : bag(T)
6. ¬(bs = {} ∈ bag(T))
7. bag-no-repeats(bag(T) List⁺;bag-map(λL.[{} / L];bag-parts(eq;bs)))
8. bag-no-repeats(bag(T) List⁺;[L∈bag-parts(eq;bs)|((#x in hd(L)) =_z 0)])
9. z : bag(T) List⁺
10. v : bag(T) List⁺
11. v ↓∈ bag-parts(eq;bs)
12. z = [{} / v] ∈ bag(T) List⁺
13. bag-union(z) = bs ∈ bag(T)
14. ↑((#x in hd(z)) =_z 0)
15. ¬({} = {} ∈ bag(T))
⊢ False

Latex:

Latex:
1. T : Type 2. valueall-type(T) 3. eq : EqDecider(T) 4. x : T 5. bs : bag(T) 6. \mneg{}(bs = \{\}) 7. bag-no-repeats(bag(T) List\msupplus{};bag-map(\mlambda{}L.[\{\} / L];bag-parts(eq;bs))) 8. bag-no-repeats(bag(T) List\msupplus{};[L\mmember{}bag-parts(eq;bs)|((\#x in hd(L)) =\msubz{} 0)]) 9. z : bag(T) List\msupplus{} 10. v : bag(T) List\msupplus{} 11. v \mdownarrow{}\mmember{} bag-parts(eq;bs) 12. z = [\{\} / v] 13. bag-union(z) = bs 14. \muparrow{}((\#x in hd(z)) =\msubz{} 0) 15. (\{\} \mmember{} z) {}\mRightarrow{} (\mneg{}(\{\} = \{\})) \mvdash{} False By Latex: D (-1) Home Index