Proof of Nuprl Lemma : face_lattice-hom-fixes-sublattice2

Step * of Lemma face_lattice-hom-fixes-sublattice2

∀[I,J:fset(ℕ)].
  ∀[f:Hom(face_lattice(I);face_lattice(J))]. ∀[x:Point(face_lattice(J))].
    (f x) = x ∈ Point(face_lattice(J))
    supposing ∀i:names(J)

                (((f (i=0)) = (i=0) ∈ Point(face_lattice(J))) ∧ ((f (i=1)) = (i=1) ∈ Point(face_lattice(J))))

supposing J ⊆ I
BY
{ (Intros THEN MoveToConcl (-2) THEN BLemma `face_lattice-induction` THEN Auto) }

1
1. I : fset(ℕ)
2. J : fset(ℕ)
3. J ⊆ I
4. f : Hom(face_lattice(I);face_lattice(J))

5. ∀i:names(J). (((f (i=0)) = (i=0) ∈ Point(face_lattice(J))) ∧ ((f (i=1)) = (i=1) ∈ Point(face_lattice(J))))

⊢ (f 0) = 0 ∈ Point(face_lattice(J))

2
1. I : fset(ℕ)
2. J : fset(ℕ)
3. J ⊆ I
4. f : Hom(face_lattice(I);face_lattice(J))

5. ∀i:names(J). (((f (i=0)) = (i=0) ∈ Point(face_lattice(J))) ∧ ((f (i=1)) = (i=1) ∈ Point(face_lattice(J))))

⊢ (f 1) = 1 ∈ Point(face_lattice(J))

3
1. I : fset(ℕ)
2. J : fset(ℕ)
3. J ⊆ I
4. f : Hom(face_lattice(I);face_lattice(J))

5. ∀i:names(J). (((f (i=0)) = (i=0) ∈ Point(face_lattice(J))) ∧ ((f (i=1)) = (i=1) ∈ Point(face_lattice(J))))

6. x : Point(face_lattice(J))
7. y : Point(face_lattice(J))
8. (f x) = x ∈ Point(face_lattice(J))
9. (f y) = y ∈ Point(face_lattice(J))
⊢ (f x ∨ y) = x ∨ y ∈ Point(face_lattice(J))

4
1. I : fset(ℕ)
2. J : fset(ℕ)
3. J ⊆ I
4. f : Hom(face_lattice(I);face_lattice(J))

5. ∀i:names(J). (((f (i=0)) = (i=0) ∈ Point(face_lattice(J))) ∧ ((f (i=1)) = (i=1) ∈ Point(face_lattice(J))))

6. x : Point(face_lattice(J))
7. (f x) = x ∈ Point(face_lattice(J))
8. i : names(J)
⊢ (f (i=0) ∧ x) = (i=0) ∧ x ∈ Point(face_lattice(J))

5
1. I : fset(ℕ)
2. J : fset(ℕ)
3. J ⊆ I
4. f : Hom(face_lattice(I);face_lattice(J))

5. ∀i:names(J). (((f (i=0)) = (i=0) ∈ Point(face_lattice(J))) ∧ ((f (i=1)) = (i=1) ∈ Point(face_lattice(J))))

6. x : Point(face_lattice(J))
7. (f x) = x ∈ Point(face_lattice(J))
8. i : names(J)
9. (f (i=0) ∧ x) = (i=0) ∧ x ∈ Point(face_lattice(J))
⊢ (f (i=1) ∧ x) = (i=1) ∧ x ∈ Point(face_lattice(J))

Latex:

Latex:
\mforall{}[I,J:fset(\mBbbN{})]. \mforall{}[f:Hom(face\_lattice(I);face\_lattice(J))]. \mforall{}[x:Point(face\_lattice(J))]. (f x) = x supposing \mforall{}i:names(J). (((f (i=0)) = (i=0)) \mwedge{} ((f (i=1)) = (i=1))) supposing J \msubseteq{} I By Latex: (Intros THEN MoveToConcl (-2) THEN BLemma `face\_lattice-induction` THEN Auto) Home Index