isabelle: src/HOL/Data_Structures/Tree2.thy@b7554954d697 (annotated)

71796 641f4c8ffec8 tuned document nipkow parents: 70762 diff changeset	1	section \<open>Augmented Tree (Tree2)\<close>
641f4c8ffec8 tuned document nipkow parents: 70762 diff changeset	2
61224 759b5299a9f2 added red black trees nipkow parents: diff changeset	3	theory Tree2
70755 3fb16bed5d6c replaced new type ('a,'b) tree by old type ('a'b) tree. nipkow* parents: 70745 diff changeset	4	imports "HOL-Library.Tree"
61224 759b5299a9f2 added red black trees nipkow parents: diff changeset	5	begin
759b5299a9f2 added red black trees nipkow parents: diff changeset	6
70755 3fb16bed5d6c replaced new type ('a,'b) tree by old type ('a'b) tree. nipkow* parents: 70745 diff changeset	7	text \<open>This theory provides the basic infrastructure for the type @{typ \<open>('a * 'b) tree\<close>}
3fb16bed5d6c replaced new type ('a,'b) tree by old type ('a'b) tree. nipkow* parents: 70745 diff changeset	8	of augmented trees where @{typ 'a} is the key and @{typ 'b} some additional information.\<close>
61224 759b5299a9f2 added red black trees nipkow parents: diff changeset	9
70755 3fb16bed5d6c replaced new type ('a,'b) tree by old type ('a'b) tree. nipkow* parents: 70745 diff changeset	10	text \<open>IMPORTANT: Inductions and cases analyses on augmented trees need to use the following
3fb16bed5d6c replaced new type ('a,'b) tree by old type ('a'b) tree. nipkow* parents: 70745 diff changeset	11	two rules explicitly. They generate nodes of the form @{term "Node l (a,b) r"}
3fb16bed5d6c replaced new type ('a,'b) tree by old type ('a'b) tree. nipkow* parents: 70745 diff changeset	12	rather than @{term "Node l a r"} for trees of type @{typ "'a tree"}.\<close>
61224 759b5299a9f2 added red black trees nipkow parents: diff changeset	13
70755 3fb16bed5d6c replaced new type ('a,'b) tree by old type ('a'b) tree. nipkow* parents: 70745 diff changeset	14	lemmas tree2_induct = tree.induct[where 'a = "'a * 'b", split_format(complete)]
3fb16bed5d6c replaced new type ('a,'b) tree by old type ('a'b) tree. nipkow* parents: 70745 diff changeset	15
3fb16bed5d6c replaced new type ('a,'b) tree by old type ('a'b) tree. nipkow* parents: 70745 diff changeset	16	lemmas tree2_cases = tree.exhaust[where 'a = "'a * 'b", split_format(complete)]
67967 5a4280946a25 moved and renamed lemmas nipkow parents: 62650 diff changeset	17
70755 3fb16bed5d6c replaced new type ('a,'b) tree by old type ('a'b) tree. nipkow* parents: 70745 diff changeset	18	fun inorder :: "('a*'b)tree \<Rightarrow> 'a list" where
3fb16bed5d6c replaced new type ('a,'b) tree by old type ('a'b) tree. nipkow* parents: 70745 diff changeset	19	"inorder Leaf = []" \|
3fb16bed5d6c replaced new type ('a,'b) tree by old type ('a'b) tree. nipkow* parents: 70745 diff changeset	20	"inorder (Node l (a,_) r) = inorder l @ a # inorder r"
62650 7e6bb43e7217 added tree lemmas nipkow parents: 62390 diff changeset	21
70755 3fb16bed5d6c replaced new type ('a,'b) tree by old type ('a'b) tree. nipkow* parents: 70745 diff changeset	22	fun set_tree :: "('a*'b) tree \<Rightarrow> 'a set" where
3fb16bed5d6c replaced new type ('a,'b) tree by old type ('a'b) tree. nipkow* parents: 70745 diff changeset	23	"set_tree Leaf = {}" \|
72586 e3ba2578ad9d tuned nipkow parents: 72080 diff changeset	24	"set_tree (Node l (a,_) r) = {a} \<union> set_tree l \<union> set_tree r"
70742 e21c6b677c79 added function nipkow parents: 68998 diff changeset	25
70755 3fb16bed5d6c replaced new type ('a,'b) tree by old type ('a'b) tree. nipkow* parents: 70745 diff changeset	26	fun bst :: "('a::linorder*'b) tree \<Rightarrow> bool" where
3fb16bed5d6c replaced new type ('a,'b) tree by old type ('a'b) tree. nipkow* parents: 70745 diff changeset	27	"bst Leaf = True" \|
72586 e3ba2578ad9d tuned nipkow parents: 72080 diff changeset	28	"bst (Node l (a, _) r) = ((\<forall>x \<in> set_tree l. x < a) \<and> (\<forall>x \<in> set_tree r. a < x) \<and> bst l \<and> bst r)"
62650 7e6bb43e7217 added tree lemmas nipkow parents: 62390 diff changeset	29
68411 d8363de26567 added lemma nipkow parents: 67967 diff changeset	30	lemma finite_set_tree[simp]: "finite(set_tree t)"
d8363de26567 added lemma nipkow parents: 67967 diff changeset	31	by(induction t) auto
d8363de26567 added lemma nipkow parents: 67967 diff changeset	32
70745 be8e617b6eb3 tuned nipkow parents: 70744 diff changeset	33	lemma eq_set_tree_empty[simp]: "set_tree t = {} \<longleftrightarrow> t = Leaf"
70744 b605c9cf82a2 added lemma nipkow parents: 70742 diff changeset	34	by (cases t) auto
b605c9cf82a2 added lemma nipkow parents: 70742 diff changeset	35
70762 d4a23cc9aabc added lemma nipkow parents: 70755 diff changeset	36	lemma set_inorder[simp]: "set (inorder t) = set_tree t"
d4a23cc9aabc added lemma nipkow parents: 70755 diff changeset	37	by (induction t) auto
d4a23cc9aabc added lemma nipkow parents: 70755 diff changeset	38
72080 2030eacf3a72 added lemma nipkow parents: 71796 diff changeset	39	lemma length_inorder[simp]: "length (inorder t) = size t"
2030eacf3a72 added lemma nipkow parents: 71796 diff changeset	40	by (induction t) auto
2030eacf3a72 added lemma nipkow parents: 71796 diff changeset	41
62390 842917225d56 more canonical names nipkow parents: 62160 diff changeset	42	end

author	wenzelm
	Sun, 13 Apr 2025 12:23:48 +0200
changeset 82497	b7554954d697
parent 72586	e3ba2578ad9d
permissions	-rw-r--r--