Proof of Nuprl Lemma : open

Step * 2 of Lemma open_box-nil

.....set predicate.....
1. X : CubicalSet
2. I : Cname List
3. x : nameset(I)
4. i : ℕ2
5. x1 : I-face(X;I) List
6. (||x1|| = 1 ∈ ℤ) ∧ (face-name(hd(x1)) = <x, i> ∈ (nameset(I) × ℕ2))
⊢ adjacent-compatible(X;I;x1)
∧ (¬(x ∈ []))
∧ l_subset(Cname;[];I)
∧ ((∀y:nameset([]). ∀c:ℕ2.  (∃f∈x1. face-name(f) = <y, c> ∈ (nameset(I) × ℕ2)))
  ∧ (∃f∈x1. face-name(f) = <x, i> ∈ (nameset(I) × ℕ2))
  ∧ (∀f∈x1.¬(face-name(f) = <x, 1 - i> ∈ (nameset(I) × ℕ2))))
∧ (∀f∈x1.(fst(f) ∈ [x]))
∧ (∀f1,f2∈x1.  ¬(face-name(f1) = face-name(f2) ∈ (nameset(I) × ℕ2)))
BY
{ TACTIC:(D -1
          THEN D -3
          THEN Try ((Reduce (-2) THEN newArith Auto))
          THEN D -3
          THEN Try ((Reduce (-2) THEN Complete (Auto')))) }

1
1. X : CubicalSet
2. I : Cname List
3. x : nameset(I)
4. i : ℕ2
5. u : I-face(X;I)
6. ||[u]|| = 1 ∈ ℤ
7. face-name(hd([u])) = <x, i> ∈ (nameset(I) × ℕ2)
⊢ adjacent-compatible(X;I;[u])
∧ (¬(x ∈ []))
∧ l_subset(Cname;[];I)
∧ ((∀y:nameset([]). ∀c:ℕ2.  (∃f∈[u]. face-name(f) = <y, c> ∈ (nameset(I) × ℕ2)))
  ∧ (∃f∈[u]. face-name(f) = <x, i> ∈ (nameset(I) × ℕ2))
  ∧ (∀f∈[u].¬(face-name(f) = <x, 1 - i> ∈ (nameset(I) × ℕ2))))
∧ (∀f∈[u].(fst(f) ∈ [x]))
∧ (∀f1,f2∈[u].  ¬(face-name(f1) = face-name(f2) ∈ (nameset(I) × ℕ2)))

Latex:

Latex:
.....set predicate..... 1. X : CubicalSet 2. I : Cname List 3. x : nameset(I) 4. i : \mBbbN{}2 5. x1 : I-face(X;I) List 6. (||x1|| = 1) \mwedge{} (face-name(hd(x1)) = <x, i>) \mvdash{} adjacent-compatible(X;I;x1) \mwedge{} (\mneg{}(x \mmember{} [])) \mwedge{} l\_subset(Cname;[];I) \mwedge{} ((\mforall{}y:nameset([]). \mforall{}c:\mBbbN{}2. (\mexists{}f\mmember{}x1. face-name(f) = <y, c>)) \mwedge{} (\mexists{}f\mmember{}x1. face-name(f) = <x, i>) \mwedge{} (\mforall{}f\mmember{}x1.\mneg{}(face-name(f) = <x, 1 - i>))) \mwedge{} (\mforall{}f\mmember{}x1.(fst(f) \mmember{} [x])) \mwedge{} (\mforall{}f1,f2\mmember{}x1. \mneg{}(face-name(f1) = face-name(f2))) By Latex: TACTIC:(D -1 THEN D -3 THEN Try ((Reduce (-2) THEN newArith Auto)) THEN D -3 THEN Try ((Reduce (-2) THEN Complete (Auto')))) Home Index