Proof of Nuprl Lemma : no_repeats-rat-cube-faces

Step * 1 1 3 1 of Lemma no_repeats-rat-cube-faces

1. k : ℕ
2. c : ℚCube(k)
3. l1 : ℕk
4. l2 : ℕk
5. (l1 ∈ upto(k))
6. dim(c l1) = 1 ∈ ℤ
7. (l2 ∈ upto(k))
8. dim(c l2) = 1 ∈ ℤ
9. ¬(l1 = l2 ∈ ℕk)
10. ¬(lower-rc-face(c;l2) ∈ [lower-rc-face(c;l1); upper-rc-face(c;l1)])
11. upper-rc-face(c;l2) = lower-rc-face(c;l1) ∈ ℚCube(k)
12. (snd((c l1))) = (fst((c l1))) ∈ ℚ
⊢ False
BY
{ (MoveToConcl (-1)
   THEN MoveToConcl (-6)
   THEN (GenConclTerm ⌜c l1⌝⋅ THENA Auto)
   THEN D -2
   THEN RepUR ``rat-interval-dimension`` 0
   THEN SplitOnConclITE
   THEN Auto) }

Latex:

Latex:
1. k : \mBbbN{} 2. c : \mBbbQ{}Cube(k) 3. l1 : \mBbbN{}k 4. l2 : \mBbbN{}k 5. (l1 \mmember{} upto(k)) 6. dim(c l1) = 1 7. (l2 \mmember{} upto(k)) 8. dim(c l2) = 1 9. \mneg{}(l1 = l2) 10. \mneg{}(lower-rc-face(c;l2) \mmember{} [lower-rc-face(c;l1); upper-rc-face(c;l1)]) 11. upper-rc-face(c;l2) = lower-rc-face(c;l1) 12. (snd((c l1))) = (fst((c l1))) \mvdash{} False By Latex: (MoveToConcl (-1) THEN MoveToConcl (-6) THEN (GenConclTerm \mkleeneopen{}c l1\mkleeneclose{}\mcdot{} THENA Auto) THEN D -2 THEN RepUR ``rat-interval-dimension`` 0 THEN SplitOnConclITE THEN Auto) Home Index