Proof of Nuprl Lemma : member-face-complex

Step * 1 of Lemma member-face-complex

1. k : ℕ
2. K : ℚCube(k) List
3. f : ℚCube(k)
4. l : ℚCube(k) List
5. y : ℚCube(k)
6. (y ∈ K)
7. l = if Inhabited(y) then rat-cube-faces(k;y) else [] fi  ∈ (ℚCube(k) List)
8. (f ∈ l)
⊢ ∃c:ℚCube(k). ((c ∈ K) ∧ (↑Inhabited(c)) ∧ (f ∈ rat-cube-faces(k;c)))
BY
{ (D 0 With ⌜y⌝  THENW Auto) }

1
1. k : ℕ
2. K : ℚCube(k) List
3. f : ℚCube(k)
4. l : ℚCube(k) List
5. y : ℚCube(k)
6. (y ∈ K)
7. l = if Inhabited(y) then rat-cube-faces(k;y) else [] fi  ∈ (ℚCube(k) List)
8. (f ∈ l)
⊢ (y ∈ K) ∧ (↑Inhabited(y)) ∧ (f ∈ rat-cube-faces(k;y))

Latex:

Latex:
1. k : \mBbbN{} 2. K : \mBbbQ{}Cube(k) List 3. f : \mBbbQ{}Cube(k) 4. l : \mBbbQ{}Cube(k) List 5. y : \mBbbQ{}Cube(k) 6. (y \mmember{} K) 7. l = if Inhabited(y) then rat-cube-faces(k;y) else [] fi 8. (f \mmember{} l) \mvdash{} \mexists{}c:\mBbbQ{}Cube(k). ((c \mmember{} K) \mwedge{} (\muparrow{}Inhabited(c)) \mwedge{} (f \mmember{} rat-cube-faces(k;c))) By Latex: (D 0 With \mkleeneopen{}y\mkleeneclose{} THENW Auto) Home Index