Proof of Nuprl Lemma : member-fpf-vals

Step * 1 2 3 2 2 1 1 of Lemma member-fpf-vals

1. A : Type
2. eq : EqDecider(A)
3. B : A ⟶ Type
4. P : A ⟶ 𝔹
5. d : A List
6. f1 : x:{x:A| (x ∈ d)}  ⟶ B[x]
7. x : A
8. v : B[x]
9. u : A
10. v1 : A List
11. ∀g:x:{x:A| (x ∈ v1)}  ⟶ B[x]
      ((<x, v> ∈ zip(filter(P;v1);map(g;filter(P;v1)))) ⇐⇒ {((↑x ∈_b v1) ∧ (↑(P x))) ∧ (v = (g x) ∈ B[x])})
12. g : x:{x:A| (x ∈ [u / v1])}  ⟶ B[x]
13. (<x, v> ∈ zip(filter(P;v1);map(g;filter(P;v1)))) ⇒ {((↑x ∈_b v1) ∧ (↑(P x))) ∧ (v = (g x) ∈ B[x])}
14. (<x, v> ∈ zip(filter(P;v1);map(g;filter(P;v1)))) ⇐ {((↑x ∈_b v1) ∧ (↑(P x))) ∧ (v = (g x) ∈ B[x])}
15. (u ∈ [u / v1])
16. zip(filter(P;v1);map(g;filter(P;v1))) ∈ (x:A × B[x]) List
17. ↑(P u)
18. (<x, v> ∈ [<u, g u> / zip(filter(P;v1);map(g;filter(P;v1)))])
⊢ {((↑((eq u x) ∨_bx ∈_b v1)) c∧ (↑(P x))) c∧ (v = (g x) ∈ B[x])}
BY
{ (((RWO "cons_member" (-1)) THENA Auto) THEN (D (-1))) }

1
1. A : Type
2. eq : EqDecider(A)
3. B : A ⟶ Type
4. P : A ⟶ 𝔹
5. d : A List
6. f1 : x:{x:A| (x ∈ d)}  ⟶ B[x]
7. x : A
8. v : B[x]
9. u : A
10. v1 : A List
11. ∀g:x:{x:A| (x ∈ v1)}  ⟶ B[x]
      ((<x, v> ∈ zip(filter(P;v1);map(g;filter(P;v1)))) ⇐⇒ {((↑x ∈_b v1) ∧ (↑(P x))) ∧ (v = (g x) ∈ B[x])})
12. g : x:{x:A| (x ∈ [u / v1])}  ⟶ B[x]
13. (<x, v> ∈ zip(filter(P;v1);map(g;filter(P;v1)))) ⇒ {((↑x ∈_b v1) ∧ (↑(P x))) ∧ (v = (g x) ∈ B[x])}
14. (<x, v> ∈ zip(filter(P;v1);map(g;filter(P;v1)))) ⇐ {((↑x ∈_b v1) ∧ (↑(P x))) ∧ (v = (g x) ∈ B[x])}
15. (u ∈ [u / v1])
16. zip(filter(P;v1);map(g;filter(P;v1))) ∈ (x:A × B[x]) List
17. ↑(P u)
18. <x, v> = <u, g u> ∈ (x:A × B[x])
⊢ {((↑((eq u x) ∨_bx ∈_b v1)) c∧ (↑(P x))) c∧ (v = (g x) ∈ B[x])}

2
1. A : Type
2. eq : EqDecider(A)
3. B : A ⟶ Type
4. P : A ⟶ 𝔹
5. d : A List
6. f1 : x:{x:A| (x ∈ d)}  ⟶ B[x]
7. x : A
8. v : B[x]
9. u : A
10. v1 : A List
11. ∀g:x:{x:A| (x ∈ v1)}  ⟶ B[x]
      ((<x, v> ∈ zip(filter(P;v1);map(g;filter(P;v1)))) ⇐⇒ {((↑x ∈_b v1) ∧ (↑(P x))) ∧ (v = (g x) ∈ B[x])})
12. g : x:{x:A| (x ∈ [u / v1])}  ⟶ B[x]
13. (<x, v> ∈ zip(filter(P;v1);map(g;filter(P;v1)))) ⇒ {((↑x ∈_b v1) ∧ (↑(P x))) ∧ (v = (g x) ∈ B[x])}
14. (<x, v> ∈ zip(filter(P;v1);map(g;filter(P;v1)))) ⇐ {((↑x ∈_b v1) ∧ (↑(P x))) ∧ (v = (g x) ∈ B[x])}
15. (u ∈ [u / v1])
16. zip(filter(P;v1);map(g;filter(P;v1))) ∈ (x:A × B[x]) List
17. ↑(P u)
18. (<x, v> ∈ zip(filter(P;v1);map(g;filter(P;v1))))
⊢ {((↑((eq u x) ∨_bx ∈_b v1)) c∧ (↑(P x))) c∧ (v = (g x) ∈ B[x])}

Latex:

Latex:
1. A : Type 2. eq : EqDecider(A) 3. B : A {}\mrightarrow{} Type 4. P : A {}\mrightarrow{} \mBbbB{} 5. d : A List 6. f1 : x:\{x:A| (x \mmember{} d)\} {}\mrightarrow{} B[x] 7. x : A 8. v : B[x] 9. u : A 10. v1 : A List 11. \mforall{}g:x:\{x:A| (x \mmember{} v1)\} {}\mrightarrow{} B[x] ((<x, v> \mmember{} zip(filter(P;v1);map(g;filter(P;v1)))) \mLeftarrow{}{}\mRightarrow{} \{((\muparrow{}x \mmember{}\msubb{} v1) \mwedge{} (\muparrow{}(P x))) \mwedge{} (v = (g x))\}) 12. g : x:\{x:A| (x \mmember{} [u / v1])\} {}\mrightarrow{} B[x] 13. (<x, v> \mmember{} zip(filter(P;v1);map(g;filter(P;v1)))) {}\mRightarrow{} \{((\muparrow{}x \mmember{}\msubb{} v1) \mwedge{} (\muparrow{}(P x))) \mwedge{} (v = (g x))\} 14. (<x, v> \mmember{} zip(filter(P;v1);map(g;filter(P;v1)))) \mLeftarrow{}{} \{((\muparrow{}x \mmember{}\msubb{} v1) \mwedge{} (\muparrow{}(P x))) \mwedge{} (v = (g x))\} 15. (u \mmember{} [u / v1]) 16. zip(filter(P;v1);map(g;filter(P;v1))) \mmember{} (x:A \mtimes{} B[x]) List 17. \muparrow{}(P u) 18. (<x, v> \mmember{} [<u, g u> / zip(filter(P;v1);map(g;filter(P;v1)))]) \mvdash{} \{((\muparrow{}((eq u x) \mvee{}\msubb{}x \mmember{}\msubb{} v1)) c\mwedge{} (\muparrow{}(P x))) c\mwedge{} (v = (g x))\} By Latex: (((RWO "cons\_member" (-1)) THENA Auto) THEN (D (-1))) Home Index