Proof of Nuprl Lemma : rat-complex-boundary-remove1

Step * 3 2 1 1 1 2 1 of Lemma rat-complex-boundary-remove1

1. k : ℕ
2. n : ℕ
3. K : n-dim-complex
4. c : ℚCube(k)
5. (c ∈ K)
6. f : ℚCube(k)

7. ¬((∃c:ℚCube(k). ((c ∈ K) ∧ (↑Inhabited(c)) ∧ f ≤ c ∧ (dim(f) = (dim(c) - 1) ∈ ℤ))) ∧ (↑in-complex-boundary(k;f;K)))

8. f ≤ c
9. dim(f) = (dim(c) - 1) ∈ ℤ
10. u : ℚCube(k)
11. filter(λc.is-rat-cube-face(k;f;c);K) = [u] ∈ (ℚCube(k) List)
⊢ (↑isEven(||[u]||))
⇒ (c ∈ [u])
⇒

 (∃c1:ℚCube(k). (((c1 ∈ K) ∧ (¬(c1 = c ∈ ℚCube(k)))) ∧ (↑Inhabited(c1)) ∧ f ≤ c1 ∧ (dim(f) = (dim(c1) - 1) ∈ ℤ)))

BY
{ ((Reduce 0 THEN (Subst' isEven(1) ~ ff 0 THENA Computation)) THEN Auto) }

Latex:

Latex:
1. k : \mBbbN{} 2. n : \mBbbN{} 3. K : n-dim-complex 4. c : \mBbbQ{}Cube(k) 5. (c \mmember{} K) 6. f : \mBbbQ{}Cube(k) 7. \mneg{}((\mexists{}c:\mBbbQ{}Cube(k). ((c \mmember{} K) \mwedge{} (\muparrow{}Inhabited(c)) \mwedge{} f \mleq{} c \mwedge{} (dim(f) = (dim(c) - 1)))) \mwedge{} (\muparrow{}in-complex-boundary(k;f;K))) 8. f \mleq{} c 9. dim(f) = (dim(c) - 1) 10. u : \mBbbQ{}Cube(k) 11. filter(\mlambda{}c.is-rat-cube-face(k;f;c);K) = [u] \mvdash{} (\muparrow{}isEven(||[u]||)) {}\mRightarrow{} (c \mmember{} [u]) {}\mRightarrow{} (\mexists{}c1:\mBbbQ{}Cube(k). (((c1 \mmember{} K) \mwedge{} (\mneg{}(c1 = c))) \mwedge{} (\muparrow{}Inhabited(c1)) \mwedge{} f \mleq{} c1 \mwedge{} (dim(f) = (dim(c1) - 1)))) By Latex: ((Reduce 0 THEN (Subst' isEven(1) \msim{} ff 0 THENA Computation)) THEN Auto) Home Index