Proof of Nuprl Lemma : member-rat-complex-boundary-n

Step * 2 2 1 of Lemma member-rat-complex-boundary-n

1. n : ℕ
2. k : ℕ
3. K : ℚCube(k) List
4. [%1] : no_repeats(ℚCube(k);K) ∧ (∀c,d∈K.  Compatible(c;d)) ∧ (∀c∈K.dim(c) = n ∈ ℤ)
5. f : ℚCube(k)
6. face-complex(k;K) ∈ ℚCube(k) List
7. dim(f) = (n - 1) ∈ ℤ
8. u : ℚCube(k)
9. v : ℚCube(k) List
10. filter(λc.is-rat-cube-face(k;f;c);K) = [u / v] ∈ (ℚCube(k) List)
11. (u ∈ K)
12. ↑is-rat-cube-face(k;f;u)
⊢ ∃c:ℚCube(k). ((c ∈ K) ∧ (↑Inhabited(c)) ∧ f ≤ c ∧ (dim(f) = (dim(c) - 1) ∈ ℤ))
BY
{ ((Assert dim(u) = n ∈ ℤ BY
          (Auto THEN RWO "l_all_iff" 6 THEN Auto))
   THEN (RWO "assert-is-rat-cube-face" (-2) THENA Auto)
   THEN D 0 With ⌜u⌝
   THEN Auto) }

1
1. n : ℕ
2. k : ℕ
3. K : ℚCube(k) List
4. [%1] : no_repeats(ℚCube(k);K) ∧ (∀c,d∈K.  Compatible(c;d)) ∧ (∀c∈K.dim(c) = n ∈ ℤ)
5. f : ℚCube(k)
6. face-complex(k;K) ∈ ℚCube(k) List
7. dim(f) = (n - 1) ∈ ℤ
8. u : ℚCube(k)
9. v : ℚCube(k) List
10. filter(λc.is-rat-cube-face(k;f;c);K) = [u / v] ∈ (ℚCube(k) List)
11. (u ∈ K)
12. f ≤ u
13. dim(u) = n ∈ ℤ
14. (u ∈ K)
⊢ ↑Inhabited(u)

Latex:

Latex:
1. n : \mBbbN{} 2. k : \mBbbN{} 3. K : \mBbbQ{}Cube(k) List 4. [\%1] : no\_repeats(\mBbbQ{}Cube(k);K) \mwedge{} (\mforall{}c,d\mmember{}K. Compatible(c;d)) \mwedge{} (\mforall{}c\mmember{}K.dim(c) = n) 5. f : \mBbbQ{}Cube(k) 6. face-complex(k;K) \mmember{} \mBbbQ{}Cube(k) List 7. dim(f) = (n - 1) 8. u : \mBbbQ{}Cube(k) 9. v : \mBbbQ{}Cube(k) List 10. filter(\mlambda{}c.is-rat-cube-face(k;f;c);K) = [u / v] 11. (u \mmember{} K) 12. \muparrow{}is-rat-cube-face(k;f;u) \mvdash{} \mexists{}c:\mBbbQ{}Cube(k). ((c \mmember{} K) \mwedge{} (\muparrow{}Inhabited(c)) \mwedge{} f \mleq{} c \mwedge{} (dim(f) = (dim(c) - 1))) By Latex: ((Assert dim(u) = n BY (Auto THEN RWO "l\_all\_iff" 6 THEN Auto)) THEN (RWO "assert-is-rat-cube-face" (-2) THENA Auto) THEN D 0 With \mkleeneopen{}u\mkleeneclose{} THEN Auto) Home Index