isabelle: src/HOL/Library/Tree.thy@c5d0fdc260fa (annotated)

57250 cddaf5b93728 new theory of binary trees nipkow parents: diff changeset	1	(* Author: Tobias Nipkow *)
cddaf5b93728 new theory of binary trees nipkow parents: diff changeset	2
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 59928 diff changeset	3	section \<open>Binary Tree\<close>
57250 cddaf5b93728 new theory of binary trees nipkow parents: diff changeset	4
cddaf5b93728 new theory of binary trees nipkow parents: diff changeset	5	theory Tree
cddaf5b93728 new theory of binary trees nipkow parents: diff changeset	6	imports Main
cddaf5b93728 new theory of binary trees nipkow parents: diff changeset	7	begin
cddaf5b93728 new theory of binary trees nipkow parents: diff changeset	8
58424 cbbba613b6ab added nice standard syntax nipkow parents: 58310 diff changeset	9	datatype 'a tree =
62160 ff20b44b2fc8 tuned layout nipkow parents: 61585 diff changeset	10	is_Leaf: Leaf ("\<langle>\<rangle>") \|
ff20b44b2fc8 tuned layout nipkow parents: 61585 diff changeset	11	Node (left: "'a tree") (val: 'a) (right: "'a tree") ("(1\<langle>_,/ _,/ _\<rangle>)")
57449 f81da03b9ebd Library/Tree: use datatype_new, bst is an inductive predicate hoelzl parents: 57250 diff changeset	12	where
f81da03b9ebd Library/Tree: use datatype_new, bst is an inductive predicate hoelzl parents: 57250 diff changeset	13	"left Leaf = Leaf"
f81da03b9ebd Library/Tree: use datatype_new, bst is an inductive predicate hoelzl parents: 57250 diff changeset	14	\| "right Leaf = Leaf"
57569 e20a999f7161 register tree with datatype_compat ot support QuickCheck hoelzl parents: 57530 diff changeset	15	datatype_compat tree
57250 cddaf5b93728 new theory of binary trees nipkow parents: diff changeset	16
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 59928 diff changeset	17	text\<open>Can be seen as counting the number of leaves rather than nodes:\<close>
58438 566117a31cc0 added function size1 nipkow parents: 58424 diff changeset	18
566117a31cc0 added function size1 nipkow parents: 58424 diff changeset	19	definition size1 :: "'a tree \<Rightarrow> nat" where
566117a31cc0 added function size1 nipkow parents: 58424 diff changeset	20	"size1 t = size t + 1"
566117a31cc0 added function size1 nipkow parents: 58424 diff changeset	21
566117a31cc0 added function size1 nipkow parents: 58424 diff changeset	22	lemma size1_simps[simp]:
566117a31cc0 added function size1 nipkow parents: 58424 diff changeset	23	"size1 \<langle>\<rangle> = 1"
566117a31cc0 added function size1 nipkow parents: 58424 diff changeset	24	"size1 \<langle>l, x, r\<rangle> = size1 l + size1 r"
566117a31cc0 added function size1 nipkow parents: 58424 diff changeset	25	by (simp_all add: size1_def)
566117a31cc0 added function size1 nipkow parents: 58424 diff changeset	26
62650 7e6bb43e7217 added tree lemmas nipkow parents: 62202 diff changeset	27	lemma size1_ge0[simp]: "0 < size1 t"
7e6bb43e7217 added tree lemmas nipkow parents: 62202 diff changeset	28	by (simp add: size1_def)
7e6bb43e7217 added tree lemmas nipkow parents: 62202 diff changeset	29
60507 16993a3f4967 tuned nipkow parents: 60506 diff changeset	30	lemma size_0_iff_Leaf: "size t = 0 \<longleftrightarrow> t = Leaf"
60505 9e6584184315 added funs and lemmas nipkow parents: 59928 diff changeset	31	by(cases t) auto
9e6584184315 added funs and lemmas nipkow parents: 59928 diff changeset	32
58424 cbbba613b6ab added nice standard syntax nipkow parents: 58310 diff changeset	33	lemma neq_Leaf_iff: "(t \<noteq> \<langle>\<rangle>) = (\<exists>l a r. t = \<langle>l, a, r\<rangle>)"
cbbba613b6ab added nice standard syntax nipkow parents: 58310 diff changeset	34	by (cases t) auto
57530 439f881c8744 added lemma nipkow parents: 57450 diff changeset	35
57687 cca7e8788481 added more functions and lemmas nipkow parents: 57569 diff changeset	36	lemma finite_set_tree[simp]: "finite(set_tree t)"
cca7e8788481 added more functions and lemmas nipkow parents: 57569 diff changeset	37	by(induction t) auto
cca7e8788481 added more functions and lemmas nipkow parents: 57569 diff changeset	38
59776 f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	39	lemma size_map_tree[simp]: "size (map_tree f t) = size t"
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	40	by (induction t) auto
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	41
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	42	lemma size1_map_tree[simp]: "size1 (map_tree f t) = size1 t"
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	43	by (simp add: size1_def)
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	44
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	45
60808 fd26519b1a6a depth -> height; removed del_rightmost (too specifi) nipkow parents: 60507 diff changeset	46	subsection "The Height"
fd26519b1a6a depth -> height; removed del_rightmost (too specifi) nipkow parents: 60507 diff changeset	47
fd26519b1a6a depth -> height; removed del_rightmost (too specifi) nipkow parents: 60507 diff changeset	48	class height = fixes height :: "'a \<Rightarrow> nat"
fd26519b1a6a depth -> height; removed del_rightmost (too specifi) nipkow parents: 60507 diff changeset	49
fd26519b1a6a depth -> height; removed del_rightmost (too specifi) nipkow parents: 60507 diff changeset	50	instantiation tree :: (type)height
fd26519b1a6a depth -> height; removed del_rightmost (too specifi) nipkow parents: 60507 diff changeset	51	begin
59776 f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	52
60808 fd26519b1a6a depth -> height; removed del_rightmost (too specifi) nipkow parents: 60507 diff changeset	53	fun height_tree :: "'a tree => nat" where
fd26519b1a6a depth -> height; removed del_rightmost (too specifi) nipkow parents: 60507 diff changeset	54	"height Leaf = 0" \|
fd26519b1a6a depth -> height; removed del_rightmost (too specifi) nipkow parents: 60507 diff changeset	55	"height (Node t1 a t2) = max (height t1) (height t2) + 1"
59776 f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	56
60808 fd26519b1a6a depth -> height; removed del_rightmost (too specifi) nipkow parents: 60507 diff changeset	57	instance ..
fd26519b1a6a depth -> height; removed del_rightmost (too specifi) nipkow parents: 60507 diff changeset	58
fd26519b1a6a depth -> height; removed del_rightmost (too specifi) nipkow parents: 60507 diff changeset	59	end
fd26519b1a6a depth -> height; removed del_rightmost (too specifi) nipkow parents: 60507 diff changeset	60
fd26519b1a6a depth -> height; removed del_rightmost (too specifi) nipkow parents: 60507 diff changeset	61	lemma height_map_tree[simp]: "height (map_tree f t) = height t"
59776 f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	62	by (induction t) auto
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	63
62202 e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	64	lemma size1_height: "size t + 1 \<le> 2 ^ height (t::'a tree)"
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	65	proof(induction t)
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	66	case (Node l a r)
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	67	show ?case
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	68	proof (cases "height l \<le> height r")
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	69	case True
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	70	have "size(Node l a r) + 1 = (size l + 1) + (size r + 1)" by simp
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	71	also have "size l + 1 \<le> 2 ^ height l" by(rule Node.IH(1))
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	72	also have "size r + 1 \<le> 2 ^ height r" by(rule Node.IH(2))
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	73	also have "(2::nat) ^ height l \<le> 2 ^ height r" using True by simp
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	74	finally show ?thesis using True by (auto simp: max_def mult_2)
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	75	next
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	76	case False
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	77	have "size(Node l a r) + 1 = (size l + 1) + (size r + 1)" by simp
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	78	also have "size l + 1 \<le> 2 ^ height l" by(rule Node.IH(1))
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	79	also have "size r + 1 \<le> 2 ^ height r" by(rule Node.IH(2))
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	80	also have "(2::nat) ^ height r \<le> 2 ^ height l" using False by simp
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	81	finally show ?thesis using False by (auto simp: max_def mult_2)
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	82	qed
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	83	qed simp
e5bc7cbb0bcc added lemma nipkow parents: 62160 diff changeset	84
57687 cca7e8788481 added more functions and lemmas nipkow parents: 57569 diff changeset	85
cca7e8788481 added more functions and lemmas nipkow parents: 57569 diff changeset	86	subsection "The set of subtrees"
cca7e8788481 added more functions and lemmas nipkow parents: 57569 diff changeset	87
57250 cddaf5b93728 new theory of binary trees nipkow parents: diff changeset	88	fun subtrees :: "'a tree \<Rightarrow> 'a tree set" where
60808 fd26519b1a6a depth -> height; removed del_rightmost (too specifi) nipkow parents: 60507 diff changeset	89	"subtrees \<langle>\<rangle> = {\<langle>\<rangle>}" \|
fd26519b1a6a depth -> height; removed del_rightmost (too specifi) nipkow parents: 60507 diff changeset	90	"subtrees (\<langle>l, a, r\<rangle>) = insert \<langle>l, a, r\<rangle> (subtrees l \<union> subtrees r)"
57250 cddaf5b93728 new theory of binary trees nipkow parents: diff changeset	91
58424 cbbba613b6ab added nice standard syntax nipkow parents: 58310 diff changeset	92	lemma set_treeE: "a \<in> set_tree t \<Longrightarrow> \<exists>l r. \<langle>l, a, r\<rangle> \<in> subtrees t"
cbbba613b6ab added nice standard syntax nipkow parents: 58310 diff changeset	93	by (induction t)(auto)
57449 f81da03b9ebd Library/Tree: use datatype_new, bst is an inductive predicate hoelzl parents: 57250 diff changeset	94
57450 2baecef3207f Library/Tree: bst is preferred to be a function hoelzl parents: 57449 diff changeset	95	lemma Node_notin_subtrees_if[simp]: "a \<notin> set_tree t \<Longrightarrow> Node l a r \<notin> subtrees t"
58424 cbbba613b6ab added nice standard syntax nipkow parents: 58310 diff changeset	96	by (induction t) auto
57449 f81da03b9ebd Library/Tree: use datatype_new, bst is an inductive predicate hoelzl parents: 57250 diff changeset	97
58424 cbbba613b6ab added nice standard syntax nipkow parents: 58310 diff changeset	98	lemma in_set_tree_if: "\<langle>l, a, r\<rangle> \<in> subtrees t \<Longrightarrow> a \<in> set_tree t"
cbbba613b6ab added nice standard syntax nipkow parents: 58310 diff changeset	99	by (metis Node_notin_subtrees_if)
57449 f81da03b9ebd Library/Tree: use datatype_new, bst is an inductive predicate hoelzl parents: 57250 diff changeset	100
57687 cca7e8788481 added more functions and lemmas nipkow parents: 57569 diff changeset	101
59776 f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	102	subsection "List of entries"
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	103
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	104	fun preorder :: "'a tree \<Rightarrow> 'a list" where
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	105	"preorder \<langle>\<rangle> = []" \|
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	106	"preorder \<langle>l, x, r\<rangle> = x # preorder l @ preorder r"
57687 cca7e8788481 added more functions and lemmas nipkow parents: 57569 diff changeset	107
57250 cddaf5b93728 new theory of binary trees nipkow parents: diff changeset	108	fun inorder :: "'a tree \<Rightarrow> 'a list" where
58424 cbbba613b6ab added nice standard syntax nipkow parents: 58310 diff changeset	109	"inorder \<langle>\<rangle> = []" \|
cbbba613b6ab added nice standard syntax nipkow parents: 58310 diff changeset	110	"inorder \<langle>l, x, r\<rangle> = inorder l @ [x] @ inorder r"
57250 cddaf5b93728 new theory of binary trees nipkow parents: diff changeset	111
57449 f81da03b9ebd Library/Tree: use datatype_new, bst is an inductive predicate hoelzl parents: 57250 diff changeset	112	lemma set_inorder[simp]: "set (inorder t) = set_tree t"
58424 cbbba613b6ab added nice standard syntax nipkow parents: 58310 diff changeset	113	by (induction t) auto
57250 cddaf5b93728 new theory of binary trees nipkow parents: diff changeset	114
59776 f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	115	lemma set_preorder[simp]: "set (preorder t) = set_tree t"
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	116	by (induction t) auto
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	117
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	118	lemma length_preorder[simp]: "length (preorder t) = size t"
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	119	by (induction t) auto
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	120
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	121	lemma length_inorder[simp]: "length (inorder t) = size t"
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	122	by (induction t) auto
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	123
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	124	lemma preorder_map: "preorder (map_tree f t) = map f (preorder t)"
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	125	by (induction t) auto
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	126
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	127	lemma inorder_map: "inorder (map_tree f t) = map f (inorder t)"
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	128	by (induction t) auto
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	129
57687 cca7e8788481 added more functions and lemmas nipkow parents: 57569 diff changeset	130
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 59928 diff changeset	131	subsection \<open>Binary Search Tree predicate\<close>
57250 cddaf5b93728 new theory of binary trees nipkow parents: diff changeset	132
57450 2baecef3207f Library/Tree: bst is preferred to be a function hoelzl parents: 57449 diff changeset	133	fun (in linorder) bst :: "'a tree \<Rightarrow> bool" where
58424 cbbba613b6ab added nice standard syntax nipkow parents: 58310 diff changeset	134	"bst \<langle>\<rangle> \<longleftrightarrow> True" \|
cbbba613b6ab added nice standard syntax nipkow parents: 58310 diff changeset	135	"bst \<langle>l, a, r\<rangle> \<longleftrightarrow> bst l \<and> bst r \<and> (\<forall>x\<in>set_tree l. x < a) \<and> (\<forall>x\<in>set_tree r. a < x)"
57250 cddaf5b93728 new theory of binary trees nipkow parents: diff changeset	136
60500 903bb1495239 isabelle update_cartouches; wenzelm parents: 59928 diff changeset	137	text\<open>In case there are duplicates:\<close>
59561 1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	138
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	139	fun (in linorder) bst_eq :: "'a tree \<Rightarrow> bool" where
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	140	"bst_eq \<langle>\<rangle> \<longleftrightarrow> True" \|
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	141	"bst_eq \<langle>l,a,r\<rangle> \<longleftrightarrow>
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	142	bst_eq l \<and> bst_eq r \<and> (\<forall>x\<in>set_tree l. x \<le> a) \<and> (\<forall>x\<in>set_tree r. a \<le> x)"
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	143
59928 b9b7f913a19a new theory Library/Tree_Multiset.thy nipkow parents: 59776 diff changeset	144	lemma (in linorder) bst_eq_if_bst: "bst t \<Longrightarrow> bst_eq t"
b9b7f913a19a new theory Library/Tree_Multiset.thy nipkow parents: 59776 diff changeset	145	by (induction t) (auto)
b9b7f913a19a new theory Library/Tree_Multiset.thy nipkow parents: 59776 diff changeset	146
59561 1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	147	lemma (in linorder) bst_eq_imp_sorted: "bst_eq t \<Longrightarrow> sorted (inorder t)"
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	148	apply (induction t)
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	149	apply(simp)
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	150	by (fastforce simp: sorted_append sorted_Cons intro: less_imp_le less_trans)
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	151
59928 b9b7f913a19a new theory Library/Tree_Multiset.thy nipkow parents: 59776 diff changeset	152	lemma (in linorder) distinct_preorder_if_bst: "bst t \<Longrightarrow> distinct (preorder t)"
b9b7f913a19a new theory Library/Tree_Multiset.thy nipkow parents: 59776 diff changeset	153	apply (induction t)
b9b7f913a19a new theory Library/Tree_Multiset.thy nipkow parents: 59776 diff changeset	154	apply simp
b9b7f913a19a new theory Library/Tree_Multiset.thy nipkow parents: 59776 diff changeset	155	apply(fastforce elim: order.asym)
b9b7f913a19a new theory Library/Tree_Multiset.thy nipkow parents: 59776 diff changeset	156	done
b9b7f913a19a new theory Library/Tree_Multiset.thy nipkow parents: 59776 diff changeset	157
b9b7f913a19a new theory Library/Tree_Multiset.thy nipkow parents: 59776 diff changeset	158	lemma (in linorder) distinct_inorder_if_bst: "bst t \<Longrightarrow> distinct (inorder t)"
b9b7f913a19a new theory Library/Tree_Multiset.thy nipkow parents: 59776 diff changeset	159	apply (induction t)
b9b7f913a19a new theory Library/Tree_Multiset.thy nipkow parents: 59776 diff changeset	160	apply simp
b9b7f913a19a new theory Library/Tree_Multiset.thy nipkow parents: 59776 diff changeset	161	apply(fastforce elim: order.asym)
b9b7f913a19a new theory Library/Tree_Multiset.thy nipkow parents: 59776 diff changeset	162	done
b9b7f913a19a new theory Library/Tree_Multiset.thy nipkow parents: 59776 diff changeset	163
59776 f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	164
60505 9e6584184315 added funs and lemmas nipkow parents: 59928 diff changeset	165	subsection "The heap predicate"
9e6584184315 added funs and lemmas nipkow parents: 59928 diff changeset	166
9e6584184315 added funs and lemmas nipkow parents: 59928 diff changeset	167	fun heap :: "'a::linorder tree \<Rightarrow> bool" where
9e6584184315 added funs and lemmas nipkow parents: 59928 diff changeset	168	"heap Leaf = True" \|
9e6584184315 added funs and lemmas nipkow parents: 59928 diff changeset	169	"heap (Node l m r) =
9e6584184315 added funs and lemmas nipkow parents: 59928 diff changeset	170	(heap l \<and> heap r \<and> (\<forall>x \<in> set_tree l \<union> set_tree r. m \<le> x))"
9e6584184315 added funs and lemmas nipkow parents: 59928 diff changeset	171
9e6584184315 added funs and lemmas nipkow parents: 59928 diff changeset	172
61585 a9599d3d7610 isabelle update_cartouches -c -t; wenzelm parents: 60808 diff changeset	173	subsection "Function \<open>mirror\<close>"
59561 1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	174
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	175	fun mirror :: "'a tree \<Rightarrow> 'a tree" where
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	176	"mirror \<langle>\<rangle> = Leaf" \|
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	177	"mirror \<langle>l,x,r\<rangle> = \<langle>mirror r, x, mirror l\<rangle>"
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	178
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	179	lemma mirror_Leaf[simp]: "mirror t = \<langle>\<rangle> \<longleftrightarrow> t = \<langle>\<rangle>"
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	180	by (induction t) simp_all
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	181
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	182	lemma size_mirror[simp]: "size(mirror t) = size t"
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	183	by (induction t) simp_all
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	184
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	185	lemma size1_mirror[simp]: "size1(mirror t) = size1 t"
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	186	by (simp add: size1_def)
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	187
60808 fd26519b1a6a depth -> height; removed del_rightmost (too specifi) nipkow parents: 60507 diff changeset	188	lemma height_mirror[simp]: "height(mirror t) = height t"
59776 f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	189	by (induction t) simp_all
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	190
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	191	lemma inorder_mirror: "inorder(mirror t) = rev(inorder t)"
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	192	by (induction t) simp_all
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	193
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	194	lemma map_mirror: "map_tree f (mirror t) = mirror (map_tree f t)"
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	195	by (induction t) simp_all
f54af3307334 added funs and lemmas nipkow parents: 59561 diff changeset	196
59561 1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	197	lemma mirror_mirror[simp]: "mirror(mirror t) = t"
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	198	by (induction t) simp_all
1a84beaa239b added new tree material nipkow parents: 58881 diff changeset	199
57250 cddaf5b93728 new theory of binary trees nipkow parents: diff changeset	200	end

author	wenzelm
	Mon, 11 Apr 2016 15:26:58 +0200
changeset 62954	c5d0fdc260fa
parent 62650	7e6bb43e7217
child 63036	1ba3aacfa4d3
permissions	-rw-r--r--