Proof of Nuprl Lemma : rv-line-circle-0

Step * 2 1 1 2 1 of Lemma rv-line-circle-0

1. n : ℕ
2. a : ℝ^n
3. b : ℝ^n
4. p : ℝ^n
5. q : ℝ^n
6. p ≠ q
7. d(a;p) ≤ d(a;b)
8. d(a;b) ≤ d(a;q)
9. u : {u:ℝ^n| ab=au}
10. ¬(q ≠ u ∧ u ≠ p ∧ (¬q-u-p))
11. v : ℝ^n
12. [%19] : ab=av
13. ¬(q ≠ p ∧ p ≠ v ∧ (¬q-p-v))
14. (d(a;p) < d(a;b)) ⇒ (q-p-v ∧ ((d(a;b) < d(a;q)) ⇒ q-u-p))
15. (d(a;p) = d(a;b))
⇒ ((u ≠ v ⇒ ((req-vec(n;u;p) ∧ (r0 < p - a⋅q - p)) ∨ (req-vec(n;v;p) ∧ (p - a⋅q - p < r0))))
∧ (req-vec(n;u;v) ⇒ ((p - a⋅q - p = r0) ∧ req-vec(n;u;p))))
⊢ SqStable(ab=av)
BY
{ (Unfold `rv-congruent` 0 THEN Auto) }

Latex:

Latex:
1. n : \mBbbN{} 2. a : \mBbbR{}\^{}n 3. b : \mBbbR{}\^{}n 4. p : \mBbbR{}\^{}n 5. q : \mBbbR{}\^{}n 6. p \mneq{} q 7. d(a;p) \mleq{} d(a;b) 8. d(a;b) \mleq{} d(a;q) 9. u : \{u:\mBbbR{}\^{}n| ab=au\} 10. \mneg{}(q \mneq{} u \mwedge{} u \mneq{} p \mwedge{} (\mneg{}q-u-p)) 11. v : \mBbbR{}\^{}n 12. [\%19] : ab=av 13. \mneg{}(q \mneq{} p \mwedge{} p \mneq{} v \mwedge{} (\mneg{}q-p-v)) 14. (d(a;p) < d(a;b)) {}\mRightarrow{} (q-p-v \mwedge{} ((d(a;b) < d(a;q)) {}\mRightarrow{} q-u-p)) 15. (d(a;p) = d(a;b)) {}\mRightarrow{} ((u \mneq{} v {}\mRightarrow{} ((req-vec(n;u;p) \mwedge{} (r0 < p - a\mcdot{}q - p)) \mvee{} (req-vec(n;v;p) \mwedge{} (p - a\mcdot{}q - p < r0)))) \mwedge{} (req-vec(n;u;v) {}\mRightarrow{} ((p - a\mcdot{}q - p = r0) \mwedge{} req-vec(n;u;p)))) \mvdash{} SqStable(ab=av) By Latex: (Unfold `rv-congruent` 0 THEN Auto) Home Index