Proof of Nuprl Lemma : equipollent-partition

Step * 1 3 of Lemma equipollent-partition

1. k : ℕ
2. [A] : Type
3. A ~ ℕk
4. [P] : A ⟶ ℙ
5. d : ∀x:A. Dec(P[x])
6. L : A List
7. no_repeats(A;L)
8. ||L|| = k ∈ ℤ
9. ∀x:A. (x ∈ L)
10. ∀x:A. ((isl(d x) ∈ 𝔹) ∧ (↑isl(d x) ⇐⇒ P[x]))
11. k = (||filter(λx.isl(d x);L)|| + ||filter(λx.(¬_bisl(d x));L)||) ∈ ℤ
12. {a:A| P[a]} ~ ℕ||filter(λx.isl(d x);L)||
⊢ {a:A| ¬P[a]} ~ ℕ||filter(λx.(¬_bisl(d x));L)||
BY

{ (GenConcl ⌜filter(λx.(¬_bisl(d x));L) = X ∈ ({a:A| ¬P[a]}  List)⌝⋅ THEN Try (Complete (Auto))) }

1
.....wf.....
1. k : ℕ
2. [A] : Type
3. A ~ ℕk
4. [P] : A ⟶ ℙ
5. d : ∀x:A. Dec(P[x])
6. L : A List
7. no_repeats(A;L)
8. ||L|| = k ∈ ℤ
9. ∀x:A. (x ∈ L)
10. ∀x:A. ((isl(d x) ∈ 𝔹) ∧ (↑isl(d x) ⇐⇒ P[x]))
11. k = (||filter(λx.isl(d x);L)|| + ||filter(λx.(¬_bisl(d x));L)||) ∈ ℤ
12. {a:A| P[a]}  ~ ℕ||filter(λx.isl(d x);L)||
⊢ filter(λx.(¬_bisl(d x));L) ∈ {a:A| ¬P[a]}  List

2
1. k : ℕ
2. [A] : Type
3. A ~ ℕk
4. [P] : A ⟶ ℙ
5. d : ∀x:A. Dec(P[x])
6. L : A List
7. no_repeats(A;L)
8. ||L|| = k ∈ ℤ
9. ∀x:A. (x ∈ L)
10. ∀x:A. ((isl(d x) ∈ 𝔹) ∧ (↑isl(d x) ⇐⇒ P[x]))
11. k = (||filter(λx.isl(d x);L)|| + ||filter(λx.(¬_bisl(d x));L)||) ∈ ℤ
12. {a:A| P[a]}  ~ ℕ||filter(λx.isl(d x);L)||
13. X : {a:A| ¬P[a]}  List
14. filter(λx.(¬_bisl(d x));L) = X ∈ ({a:A| ¬P[a]}  List)
⊢ {a:A| ¬P[a]}  ~ ℕ||X||

Latex:

Latex:
1. k : \mBbbN{} 2. [A] : Type 3. A \msim{} \mBbbN{}k 4. [P] : A {}\mrightarrow{} \mBbbP{} 5. d : \mforall{}x:A. Dec(P[x]) 6. L : A List 7. no\_repeats(A;L) 8. ||L|| = k 9. \mforall{}x:A. (x \mmember{} L) 10. \mforall{}x:A. ((isl(d x) \mmember{} \mBbbB{}) \mwedge{} (\muparrow{}isl(d x) \mLeftarrow{}{}\mRightarrow{} P[x])) 11. k = (||filter(\mlambda{}x.isl(d x);L)|| + ||filter(\mlambda{}x.(\mneg{}\msubb{}isl(d x));L)||) 12. \{a:A| P[a]\} \msim{} \mBbbN{}||filter(\mlambda{}x.isl(d x);L)|| \mvdash{} \{a:A| \mneg{}P[a]\} \msim{} \mBbbN{}||filter(\mlambda{}x.(\mneg{}\msubb{}isl(d x));L)|| By Latex: (GenConcl \mkleeneopen{}filter(\mlambda{}x.(\mneg{}\msubb{}isl(d x));L) = X\mkleeneclose{}\mcdot{} THEN Try (Complete (Auto))) Home Index