Proof of Nuprl Lemma : member-bs_tree

Step * 3 1 1 1 4 3 of Lemma member-bs_tree_delete

1. E : Type
2. cmp : comparison(E)
3. x : E
4. left : bs_tree(E)
5. ¬↑bst_null?(left)
6. value : E
7. ¬0 < cmp value x
8. ¬0 < cmp x value
9. right : bs_tree(E)
10. bs_tree_ordered(E;cmp;left)
11. bs_tree_ordered(E;cmp;right)
12. ∀x:E. (x ∈ left ⇒ 0 < cmp x value)
13. ∀x:E. (x ∈ right ⇒ 0 < cmp value x)
14. z : E
15. bs_tree_max(left;value) = bs_tree_max(left;value) ∈ (E × ordered_bs_tree(E;cmp))
16. ∀z:E. (z ∈ bs_tree_delete(cmp;x;right) ⇐⇒ z ∈ right ∧ (¬((cmp z x) = 0 ∈ ℤ)))
17. ∀z:E. (z ∈ bs_tree_delete(cmp;x;left) ⇐⇒ z ∈ left ∧ (¬((cmp z x) = 0 ∈ ℤ)))
18. v1 : E
19. v2 : bs_tree(E)
20. ∀x:E. (x ∈ left ⇒ (x ∈ v2 ∨ (x = v1 ∈ E)))
21. (¬False) ⇒ v1 ∈ left
22. ∀x:E. (x ∈ v2 ⇒ (x ∈ left ∧ 0 < cmp x v1))
23. (value = z ∈ E) ∨ z ∈ left ∨ z ∈ right
24. ¬((cmp z x) = 0 ∈ ℤ)
⊢ (v1 = z ∈ E) ∨ z ∈ v2 ∨ z ∈ right
BY
{ (SplitOrHyps THEN Auto) }

1
1. E : Type
2. cmp : comparison(E)
3. x : E
4. left : bs_tree(E)
5. ¬↑bst_null?(left)
6. value : E
7. ¬0 < cmp value x
8. ¬0 < cmp x value
9. right : bs_tree(E)
10. bs_tree_ordered(E;cmp;left)
11. bs_tree_ordered(E;cmp;right)
12. ∀x:E. (x ∈ left ⇒ 0 < cmp x value)
13. ∀x:E. (x ∈ right ⇒ 0 < cmp value x)
14. z : E
15. bs_tree_max(left;value) = bs_tree_max(left;value) ∈ (E × ordered_bs_tree(E;cmp))
16. ∀z:E. (z ∈ bs_tree_delete(cmp;x;right) ⇐⇒ z ∈ right ∧ (¬((cmp z x) = 0 ∈ ℤ)))
17. ∀z:E. (z ∈ bs_tree_delete(cmp;x;left) ⇐⇒ z ∈ left ∧ (¬((cmp z x) = 0 ∈ ℤ)))
18. v1 : E
19. v2 : bs_tree(E)
20. ∀x:E. (x ∈ left ⇒ (x ∈ v2 ∨ (x = v1 ∈ E)))
21. (¬False) ⇒ v1 ∈ left
22. ∀x:E. (x ∈ v2 ⇒ (x ∈ left ∧ 0 < cmp x v1))
23. value = z ∈ E
24. ¬((cmp z x) = 0 ∈ ℤ)
⊢ (v1 = z ∈ E) ∨ z ∈ v2 ∨ z ∈ right

2
1. E : Type
2. cmp : comparison(E)
3. x : E
4. left : bs_tree(E)
5. ¬↑bst_null?(left)
6. value : E
7. ¬0 < cmp value x
8. ¬0 < cmp x value
9. right : bs_tree(E)
10. bs_tree_ordered(E;cmp;left)
11. bs_tree_ordered(E;cmp;right)
12. ∀x:E. (x ∈ left ⇒ 0 < cmp x value)
13. ∀x:E. (x ∈ right ⇒ 0 < cmp value x)
14. z : E
15. bs_tree_max(left;value) = bs_tree_max(left;value) ∈ (E × ordered_bs_tree(E;cmp))
16. ∀z:E. (z ∈ bs_tree_delete(cmp;x;right) ⇐⇒ z ∈ right ∧ (¬((cmp z x) = 0 ∈ ℤ)))
17. ∀z:E. (z ∈ bs_tree_delete(cmp;x;left) ⇐⇒ z ∈ left ∧ (¬((cmp z x) = 0 ∈ ℤ)))
18. v1 : E
19. v2 : bs_tree(E)
20. ∀x:E. (x ∈ left ⇒ (x ∈ v2 ∨ (x = v1 ∈ E)))
21. (¬False) ⇒ v1 ∈ left
22. ∀x:E. (x ∈ v2 ⇒ (x ∈ left ∧ 0 < cmp x v1))
23. z ∈ left
24. ¬((cmp z x) = 0 ∈ ℤ)
⊢ (v1 = z ∈ E) ∨ z ∈ v2 ∨ z ∈ right

Latex:

Latex:
1. E : Type 2. cmp : comparison(E) 3. x : E 4. left : bs\_tree(E) 5. \mneg{}\muparrow{}bst\_null?(left) 6. value : E 7. \mneg{}0 < cmp value x 8. \mneg{}0 < cmp x value 9. right : bs\_tree(E) 10. bs\_tree\_ordered(E;cmp;left) 11. bs\_tree\_ordered(E;cmp;right) 12. \mforall{}x:E. (x \mmember{} left {}\mRightarrow{} 0 < cmp x value) 13. \mforall{}x:E. (x \mmember{} right {}\mRightarrow{} 0 < cmp value x) 14. z : E 15. bs\_tree\_max(left;value) = bs\_tree\_max(left;value) 16. \mforall{}z:E. (z \mmember{} bs\_tree\_delete(cmp;x;right) \mLeftarrow{}{}\mRightarrow{} z \mmember{} right \mwedge{} (\mneg{}((cmp z x) = 0))) 17. \mforall{}z:E. (z \mmember{} bs\_tree\_delete(cmp;x;left) \mLeftarrow{}{}\mRightarrow{} z \mmember{} left \mwedge{} (\mneg{}((cmp z x) = 0))) 18. v1 : E 19. v2 : bs\_tree(E) 20. \mforall{}x:E. (x \mmember{} left {}\mRightarrow{} (x \mmember{} v2 \mvee{} (x = v1))) 21. (\mneg{}False) {}\mRightarrow{} v1 \mmember{} left 22. \mforall{}x:E. (x \mmember{} v2 {}\mRightarrow{} (x \mmember{} left \mwedge{} 0 < cmp x v1)) 23. (value = z) \mvee{} z \mmember{} left \mvee{} z \mmember{} right 24. \mneg{}((cmp z x) = 0) \mvdash{} (v1 = z) \mvee{} z \mmember{} v2 \mvee{} z \mmember{} right By Latex: (SplitOrHyps THEN Auto) Home Index