Proof of Nuprl Lemma : get_face

Step * 1 2 1 1 of Lemma get_face_image

.....assertion.....
1. X : CubicalSet
2. I : Cname List
3. J : nameset(I) List
4. x : nameset(I)
5. i : ℕ2
6. bx : open_box(X;I;J;x;i)
7. K : Cname List
8. f : name-morph(I;K)
9. c : ℕ2
10. y : nameset(J)
11. nameset([x / J]) ⊆r name-morph-domain(f;I)
12. ¬(filter(λf.((dimension(f) =_z y) ∧_b (direction(f) =_z c));bx)
= []
∈ ({f:{f:I-face(X;I)| (f ∈ bx)} | ↑((dimension(f) =_z y) ∧_b (direction(f) =_z c))} List))
13. (∀fc:I-face(X;I). ((fc ∈ bx) ⇒ (↑isname(f (fst(fc))))))
∧ (map(f;J) ∈ nameset(K) List)
∧ (f x ∈ nameset(K))
∧ (f y ∈ nameset(map(f;J)))
14. ¬(map(λface.face-image(X;I;K;f;face);filter(λx.((dimension(face-image(X;I;K;f;x)) =_z f y)

                                                   ∧_b (direction(face-image(X;I;K;f;x)) =_z c));bx))

= []
∈ ({f@0:{f@0:I-face(X;K)| (f@0 ∈ map(λface.face-image(X;I;K;f;face);bx))} |
    ↑((dimension(f@0) =_z f y) ∧_b (direction(f@0) =_z c))}  List))
⊢ filter(λx.((dimension(face-image(X;I;K;f;x)) =_z f y) ∧_b (direction(face-image(X;I;K;f;x)) =_z c));bx)
= filter(λf.((dimension(f) =_z y) ∧_b (direction(f) =_z c));bx)
∈ ({f:I-face(X;I)| (f ∈ bx)}  List)
BY
{ TACTIC:(Symmetry THEN EqCD) }

1
.....implicit subterm.....
1. X : CubicalSet
2. I : Cname List
3. J : nameset(I) List
4. x : nameset(I)
5. i : ℕ2
6. bx : open_box(X;I;J;x;i)
7. K : Cname List
8. f : name-morph(I;K)
9. c : ℕ2
10. y : nameset(J)
11. nameset([x / J]) ⊆r name-morph-domain(f;I)
12. ¬(filter(λf.((dimension(f) =_z y) ∧_b (direction(f) =_z c));bx)
= []
∈ ({f:{f:I-face(X;I)| (f ∈ bx)} | ↑((dimension(f) =_z y) ∧_b (direction(f) =_z c))}  List))
13. (∀fc:I-face(X;I). ((fc ∈ bx) ⇒ (↑isname(f (fst(fc))))))
∧ (map(f;J) ∈ nameset(K) List)
∧ (f x ∈ nameset(K))
∧ (f y ∈ nameset(map(f;J)))
14. ¬(map(λface.face-image(X;I;K;f;face);filter(λx.((dimension(face-image(X;I;K;f;x)) =_z f y)

                                                   ∧_b (direction(face-image(X;I;K;f;x)) =_z c));bx))

= []
∈ ({f@0:{f@0:I-face(X;K)| (f@0 ∈ map(λface.face-image(X;I;K;f;face);bx))} |
↑((dimension(f@0) =_z f y) ∧_b (direction(f@0) =_z c))} List))
⊢ I-face(X;I) = I-face(X;I) ∈ Type

2
.....subterm..... T:t
2:n
1. X : CubicalSet
2. I : Cname List
3. J : nameset(I) List
4. x : nameset(I)
5. i : ℕ2
6. bx : open_box(X;I;J;x;i)
7. K : Cname List
8. f : name-morph(I;K)
9. c : ℕ2
10. y : nameset(J)
11. nameset([x / J]) ⊆r name-morph-domain(f;I)
12. ¬(filter(λf.((dimension(f) =_z y) ∧_b (direction(f) =_z c));bx)
= []
∈ ({f:{f:I-face(X;I)| (f ∈ bx)} | ↑((dimension(f) =_z y) ∧_b (direction(f) =_z c))} List))
13. (∀fc:I-face(X;I). ((fc ∈ bx) ⇒ (↑isname(f (fst(fc))))))
∧ (map(f;J) ∈ nameset(K) List)
∧ (f x ∈ nameset(K))
∧ (f y ∈ nameset(map(f;J)))
14. ¬(map(λface.face-image(X;I;K;f;face);filter(λx.((dimension(face-image(X;I;K;f;x)) =_z f y)

                                                   ∧_b (direction(face-image(X;I;K;f;x)) =_z c));bx))

= []
∈ ({f@0:{f@0:I-face(X;K)| (f@0 ∈ map(λface.face-image(X;I;K;f;face);bx))} |
↑((dimension(f@0) =_z f y) ∧_b (direction(f@0) =_z c))} List))
⊢ bx = bx ∈ (I-face(X;I) List)

3
.....subterm..... T:t
1:n
1. X : CubicalSet
2. I : Cname List
3. J : nameset(I) List
4. x : nameset(I)
5. i : ℕ2
6. bx : open_box(X;I;J;x;i)
7. K : Cname List
8. f : name-morph(I;K)
9. c : ℕ2
10. y : nameset(J)
11. nameset([x / J]) ⊆r name-morph-domain(f;I)
12. ¬(filter(λf.((dimension(f) =_z y) ∧_b (direction(f) =_z c));bx)
= []
∈ ({f:{f:I-face(X;I)| (f ∈ bx)} | ↑((dimension(f) =_z y) ∧_b (direction(f) =_z c))} List))
13. (∀fc:I-face(X;I). ((fc ∈ bx) ⇒ (↑isname(f (fst(fc))))))
∧ (map(f;J) ∈ nameset(K) List)
∧ (f x ∈ nameset(K))
∧ (f y ∈ nameset(map(f;J)))
14. ¬(map(λface.face-image(X;I;K;f;face);filter(λx.((dimension(face-image(X;I;K;f;x)) =_z f y)

                                                   ∧_b (direction(face-image(X;I;K;f;x)) =_z c));bx))

= []
∈ ({f@0:{f@0:I-face(X;K)| (f@0 ∈ map(λface.face-image(X;I;K;f;face);bx))} |
    ↑((dimension(f@0) =_z f y) ∧_b (direction(f@0) =_z c))}  List))
⊢ (λf.((dimension(f) =_z y) ∧_b (direction(f) =_z c)))
= (λx.((dimension(face-image(X;I;K;f;x)) =_z f y) ∧_b (direction(face-image(X;I;K;f;x)) =_z c)))
∈ ({x:I-face(X;I)| (x ∈ bx)}  ⟶ 𝔹)

4
.....antecedent.....
1. X : CubicalSet
2. I : Cname List
3. J : nameset(I) List
4. x : nameset(I)
5. i : ℕ2
6. bx : open_box(X;I;J;x;i)
7. K : Cname List
8. f : name-morph(I;K)
9. c : ℕ2
10. y : nameset(J)
11. nameset([x / J]) ⊆r name-morph-domain(f;I)
12. ¬(filter(λf.((dimension(f) =_z y) ∧_b (direction(f) =_z c));bx)
= []
∈ ({f:{f:I-face(X;I)| (f ∈ bx)} | ↑((dimension(f) =_z y) ∧_b (direction(f) =_z c))}  List))
13. (∀fc:I-face(X;I). ((fc ∈ bx) ⇒ (↑isname(f (fst(fc))))))
∧ (map(f;J) ∈ nameset(K) List)
∧ (f x ∈ nameset(K))
∧ (f y ∈ nameset(map(f;J)))
14. ¬(map(λface.face-image(X;I;K;f;face);filter(λx.((dimension(face-image(X;I;K;f;x)) =_z f y)

                                                   ∧_b (direction(face-image(X;I;K;f;x)) =_z c));bx))

= []
∈ ({f@0:{f@0:I-face(X;K)| (f@0 ∈ map(λface.face-image(X;I;K;f;face);bx))} |
↑((dimension(f@0) =_z f y) ∧_b (direction(f@0) =_z c))} List))
⊢ True

Latex:

Latex:
.....assertion..... 1. X : CubicalSet 2. I : Cname List 3. J : nameset(I) List 4. x : nameset(I) 5. i : \mBbbN{}2 6. bx : open\_box(X;I;J;x;i) 7. K : Cname List 8. f : name-morph(I;K) 9. c : \mBbbN{}2 10. y : nameset(J) 11. nameset([x / J]) \msubseteq{}r name-morph-domain(f;I) 12. \mneg{}(filter(\mlambda{}f.((dimension(f) =\msubz{} y) \mwedge{}\msubb{} (direction(f) =\msubz{} c));bx) = []) 13. (\mforall{}fc:I-face(X;I). ((fc \mmember{} bx) {}\mRightarrow{} (\muparrow{}isname(f (fst(fc)))))) \mwedge{} (map(f;J) \mmember{} nameset(K) List) \mwedge{} (f x \mmember{} nameset(K)) \mwedge{} (f y \mmember{} nameset(map(f;J))) 14. \mneg{}(map(\mlambda{}face.face-image(X;I;K;f;face);filter(\mlambda{}x.((dimension(face-image(X;I;K;f;x)) =\msubz{} f y) \mwedge{}\msubb{} (direction(face-image(X;I;K;f;x)) =\msubz{} c));bx)) = []) \mvdash{} filter(\mlambda{}x.((dimension(face-image(X;I;K;f;x)) =\msubz{} f y) \mwedge{}\msubb{} (direction(face-image(X;I;K;f;x)) =\msubz{} c)); bx) = filter(\mlambda{}f.((dimension(f) =\msubz{} y) \mwedge{}\msubb{} (direction(f) =\msubz{} c));bx) By Latex: TACTIC:(Symmetry THEN EqCD) Home Index