Step
*
2
of Lemma
aa_bst_insert_sublemma_left
1. left_subtree : aa_ltree(
)@i
2. right_subtree : aa_ltree()@i
3. tp : aa_ltree()@i
4. val : @i
5. i : @i
6. aa_binary_search_tree(tp)@i
7. aa_binary_search_tree(aa_lt_node(val;left_subtree;right_subtree))@i
8. i < val@i
9. 
j:. (aa_bst_member_prop(j;tp) 
(j = i) 
aa_bst_member_prop(j;left_subtree))@i
10. j : @i
11. (j = i) aa_bst_member_prop(j;aa_lt_node(val;left_subtree;right_subtree))@i
aa_bst_member_prop(j;aa_lt_node(val;tp;right_subtree))
BY
{ InstHyp [
j
] 9 THEN D (-1) THEN Auto' THEN BoolCase (j =
i) THEN Auto'
}
1
1. left_subtree : aa_ltree()@i
2. right_subtree : aa_ltree()@i
3. tp : aa_ltree()@i
4. val : @i
5. i : @i
6. aa_binary_search_tree(tp)@i
7. aa_binary_search_tree(aa_lt_node(val;left_subtree;right_subtree))@i
8. i < val@i
9. j:. (aa_bst_member_prop(j;tp) (j = i) aa_bst_member_prop(j;left_subtree))@i
10. j : @i
11. (j = i) aa_bst_member_prop(j;aa_lt_node(val;left_subtree;right_subtree))@i
12. aa_bst_member_prop(j;tp) ((j = i) aa_bst_member_prop(j;left_subtree))
13. aa_bst_member_prop(j;tp) (j = i) aa_bst_member_prop(j;left_subtree)
14. j = i
aa_bst_member_prop(j;aa_lt_node(val;tp;right_subtree))
2
1. left_subtree : aa_ltree()@i
2. right_subtree : aa_ltree()@i
3. tp : aa_ltree()@i
4. val : @i
5. i : @i
6. aa_binary_search_tree(tp)@i
7. aa_binary_search_tree(aa_lt_node(val;left_subtree;right_subtree))@i
8. i < val@i
9. j:. (aa_bst_member_prop(j;tp) (j = i) aa_bst_member_prop(j;left_subtree))@i
10. j : @i
11. (j = i) aa_bst_member_prop(j;aa_lt_node(val;left_subtree;right_subtree))@i
12. aa_bst_member_prop(j;tp) ((j = i) aa_bst_member_prop(j;left_subtree))
13. aa_bst_member_prop(j;tp) (j = i) aa_bst_member_prop(j;left_subtree)
14. 
(j = i)
aa_bst_member_prop(j;aa_lt_node(val;tp;right_subtree))
1. left$_{subtree}$ : aa\_ltree(\mBbbZ{})@i
2. right$_{subtree}$ : aa\_ltree(\mBbbZ{})@i
3. tp : aa\_ltree(\mBbbZ{})@i
4. val : \mBbbZ{}@i
5. i : \mBbbZ{}@i
6. aa\_binary\_search\_tree(tp)@i
7. aa\_binary\_search\_tree(aa\_lt\_node(val;left$_{subtree}$;right$_{sub\000Ctree}$))@i
8. i < val@i
9. \mforall{}j:\mBbbZ{}. (aa\_bst\_member\_prop(j;tp) \mLeftarrow{}{}\mRightarrow{} (j = i) \mvee{} aa\_bst\_member\_prop(j;left$_{subtree\mbackslash{}ff7\000Cd$))@i
10. j : \mBbbZ{}@i
11. (j = i) \mvee{} aa\_bst\_member\_prop(j;aa\_lt\_node(val;left$_{subtree}$;right$\mbackslash{}ff\000C5f{subtree}$))@i
\mvdash{} aa\_bst\_member\_prop(j;aa\_lt\_node(val;tp;right$_{subtree}$))
By
InstHyp [\mkleeneopen{}j\mkleeneclose{}] 9 THEN D (-1) THEN Auto' THEN BoolCase \mkleeneopen{}(j =\msubz{} i)\mkleeneclose{} THEN Auto'\mcdot{}
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