Proof of Nuprl Lemma : ip-five-segment

Step * 1 1 1 1 1 1 of Lemma ip-five-segment

1. rv : InnerProductSpace
2. a : Point
3. b : Point
4. c : Point
5. d : Point
6. A : Point
7. B : Point
8. C : Point
9. D : Point
10. ||A - C|| = (||A - B|| + ||B - C||)
11. ||a - c|| = (||a - b|| + ||b - c||)
12. a # b
13. t1 : ℝ
14. t1 ∈ (r0, r1)
15. b ≡ t1*a + r1 - t1*c
16. t : ℝ
17. t ∈ (r0, r1)
18. B ≡ t*A + r1 - t*C
19. ab=AB
20. bc=BC
21. ad=AD
22. bd=BD
23. b # c
24. A # B
25. B # C

26. ||d - c||^2 = (||b - c||^2 + ||d - b||^2 + ((t1/t1 - r1) * (||a - d||^2 - ||a - b||^2 + ||d - b||^2)))

27. ||D - C||^2 = (||B - C||^2 + ||D - B||^2 + ((t/t - r1) * (||A - D||^2 - ||A - B||^2 + ||D - B||^2)))

⊢ cd=CD
BY
{ ((Assert (t - r1) < r0 BY
          (All Reduce THEN nRAdd ⌜r1⌝ 0⋅ THEN Auto))
   THEN (Assert (t1 - r1) < r0 BY
               (All Reduce THEN nRAdd ⌜r1⌝ 0⋅ THEN Auto))
   ) }

1
1. rv : InnerProductSpace
2. a : Point
3. b : Point
4. c : Point
5. d : Point
6. A : Point
7. B : Point
8. C : Point
9. D : Point
10. ||A - C|| = (||A - B|| + ||B - C||)
11. ||a - c|| = (||a - b|| + ||b - c||)
12. a # b
13. t1 : ℝ
14. t1 ∈ (r0, r1)
15. b ≡ t1*a + r1 - t1*c
16. t : ℝ
17. t ∈ (r0, r1)
18. B ≡ t*A + r1 - t*C
19. ab=AB
20. bc=BC
21. ad=AD
22. bd=BD
23. b # c
24. A # B
25. B # C

26. ||d - c||^2 = (||b - c||^2 + ||d - b||^2 + ((t1/t1 - r1) * (||a - d||^2 - ||a - b||^2 + ||d - b||^2)))

27. ||D - C||^2 = (||B - C||^2 + ||D - B||^2 + ((t/t - r1) * (||A - D||^2 - ||A - B||^2 + ||D - B||^2)))

28. (t - r1) < r0
29. (t1 - r1) < r0
⊢ cd=CD

Latex:

Latex:
1. rv : InnerProductSpace 2. a : Point 3. b : Point 4. c : Point 5. d : Point 6. A : Point 7. B : Point 8. C : Point 9. D : Point 10. ||A - C|| = (||A - B|| + ||B - C||) 11. ||a - c|| = (||a - b|| + ||b - c||) 12. a \# b 13. t1 : \mBbbR{} 14. t1 \mmember{} (r0, r1) 15. b \mequiv{} t1*a + r1 - t1*c 16. t : \mBbbR{} 17. t \mmember{} (r0, r1) 18. B \mequiv{} t*A + r1 - t*C 19. ab=AB 20. bc=BC 21. ad=AD 22. bd=BD 23. b \# c 24. A \# B 25. B \# C 26. ||d - c||\^{}2 = (||b - c||\^{}2 + ||d - b||\^{}2 + ((t1/t1 - r1) * (||a - d||\^{}2 - ||a - b||\^{}2 + ||d - b||\^{}2))) 27. ||D - C||\^{}2 = (||B - C||\^{}2 + ||D - B||\^{}2 + ((t/t - r1) * (||A - D||\^{}2 - ||A - B||\^{}2 + ||D - B||\^{}2))) \mvdash{} cd=CD By Latex: ((Assert (t - r1) < r0 BY (All Reduce THEN nRAdd \mkleeneopen{}r1\mkleeneclose{} 0\mcdot{} THEN Auto)) THEN (Assert (t1 - r1) < r0 BY (All Reduce THEN nRAdd \mkleeneopen{}r1\mkleeneclose{} 0\mcdot{} THEN Auto)) ) Home Index