Proof of Nuprl Lemma : fpf-split

Step * 1 2 2 2 1 1 1 1 of Lemma fpf-split

1. A : Type
2. eq : EqDecider(A)
3. B : A ⟶ Type
4. d : A List
5. f1 : a:{a:A| (a ∈ d)} ⟶ B[a]
6. P : A ⟶ ℙ
7. dec : ∀a:A. Dec(P[a])
8. <d, f1> ∈ a:A fp-> B[a]
9. <filter(λa.[dec a]_b;d), f1> ∈ a:A fp-> B[a]
10. <filter(λa.(¬_b[dec a]_b);d), f1> ∈ a:A fp-> B[a]
11. x : A
12. (x ∈ d)

⊢ (x ∈ filter(λa.[dec a]_b;d) @ filter(λa.(¬_ba ∈_b filter(λa.[dec a]_b;d));filter(λa.(¬_b[dec a]_b);d)))

BY
{ xxx(((RWO "member_append" (0)) THENA Auto)
      THEN ((RWO "member_filter" (0)) THENA (Reduce 0 THEN Auto))
      THEN Reduce 0
      THEN (RW assert_pushdownC 0 THENA Auto)
      THEN ((RWO "member_filter" (0)) THENA (Reduce 0 THEN Auto))
      THEN Reduce 0
      THEN (RW assert_pushdownC 0 THENA Auto))xxx }

1
1. A : Type
2. eq : EqDecider(A)
3. B : A ⟶ Type
4. d : A List
5. f1 : a:{a:A| (a ∈ d)}  ⟶ B[a]
6. P : A ⟶ ℙ
7. dec : ∀a:A. Dec(P[a])
8. <d, f1> ∈ a:A fp-> B[a]
9. <filter(λa.[dec a]_b;d), f1> ∈ a:A fp-> B[a]
10. <filter(λa.(¬_b[dec a]_b);d), f1> ∈ a:A fp-> B[a]
11. x : A
12. (x ∈ d)
⊢ ((x ∈ d) ∧ P[x]) ∨ (((x ∈ d) ∧ (¬P[x])) ∧ (¬((x ∈ d) ∧ P[x])))

Latex:

Latex:
1. A : Type 2. eq : EqDecider(A) 3. B : A {}\mrightarrow{} Type 4. d : A List 5. f1 : a:\{a:A| (a \mmember{} d)\} {}\mrightarrow{} B[a] 6. P : A {}\mrightarrow{} \mBbbP{} 7. dec : \mforall{}a:A. Dec(P[a]) 8. <d, f1> \mmember{} a:A fp-> B[a] 9. <filter(\mlambda{}a.[dec a]\msubb{};d), f1> \mmember{} a:A fp-> B[a] 10. <filter(\mlambda{}a.(\mneg{}\msubb{}[dec a]\msubb{});d), f1> \mmember{} a:A fp-> B[a] 11. x : A 12. (x \mmember{} d) \mvdash{} (x \mmember{} filter(\mlambda{}a.[dec a]\msubb{};d) @ filter(\mlambda{}a.(\mneg{}\msubb{}a \mmember{}\msubb{} filter(\mlambda{}a.[dec a]\msubb{};d));filter(\mlambda{}a.(\mneg{}\msubb{}[dec a]\msubb{});d))) By Latex: xxx(((RWO "member\_append" (0)) THENA Auto) THEN ((RWO "member\_filter" (0)) THENA (Reduce 0 THEN Auto)) THEN Reduce 0 THEN (RW assert\_pushdownC 0 THENA Auto) THEN ((RWO "member\_filter" (0)) THENA (Reduce 0 THEN Auto)) THEN Reduce 0 THEN (RW assert\_pushdownC 0 THENA Auto))xxx Home Index