isabelle: src/HOL/Data_Structures/Binomial_Heap.thy@188c7853f84a (annotated)

66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	1	(* Author: Peter Lammich
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	2	Tobias Nipkow (tuning)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	3	*)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	4
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	5	section \<open>Binomial Heap\<close>
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	6
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	7	theory Binomial_Heap
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	8	imports
66491 78a009ac91d2 reorg nipkow parents: 66434 diff changeset	9	Base_FDS
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	10	Complex_Main
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	11	Priority_Queue
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	12	begin
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	13
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	14	text \<open>
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	15	We formalize the binomial heap presentation from Okasaki's book.
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	16	We show the functional correctness and complexity of all operations.
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	17
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	18	The presentation is engineered for simplicity, and most
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	19	proofs are straightforward and automatic.
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	20	\<close>
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	21
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	22	subsection \<open>Binomial Tree and Heap Datatype\<close>
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	23
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	24	datatype 'a tree = Node (rank: nat) (root: 'a) (children: "'a tree list")
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	25
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	26	type_synonym 'a heap = "'a tree list"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	27
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	28	subsubsection \<open>Multiset of elements\<close>
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	29
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	30	fun mset_tree :: "'a::linorder tree \<Rightarrow> 'a multiset" where
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	31	"mset_tree (Node _ a c) = {#a#} + (\<Sum>t\<in>#mset c. mset_tree t)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	32
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	33	definition mset_heap :: "'a::linorder heap \<Rightarrow> 'a multiset" where
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	34	"mset_heap c = (\<Sum>t\<in>#mset c. mset_tree t)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	35
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	36	lemma mset_tree_simp_alt[simp]:
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	37	"mset_tree (Node r a c) = {#a#} + mset_heap c"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	38	unfolding mset_heap_def by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	39	declare mset_tree.simps[simp del]
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	40
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	41	lemma mset_tree_nonempty[simp]: "mset_tree t \<noteq> {#}"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	42	by (cases t) auto
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	43
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	44	lemma mset_heap_Nil[simp]:
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	45	"mset_heap [] = {#}"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	46	by (auto simp: mset_heap_def)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	47
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	48	lemma mset_heap_Cons[simp]: "mset_heap (t#ts) = mset_tree t + mset_heap ts"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	49	by (auto simp: mset_heap_def)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	50
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	51	lemma mset_heap_empty_iff[simp]: "mset_heap ts = {#} \<longleftrightarrow> ts=[]"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	52	by (auto simp: mset_heap_def)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	53
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	54	lemma root_in_mset[simp]: "root t \<in># mset_tree t"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	55	by (cases t) auto
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	56
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	57	lemma mset_heap_rev_eq[simp]: "mset_heap (rev ts) = mset_heap ts"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	58	by (auto simp: mset_heap_def)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	59
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	60	subsubsection \<open>Invariants\<close>
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	61
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	62	text \<open>Binomial invariant\<close>
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	63	fun invar_btree :: "'a::linorder tree \<Rightarrow> bool" where
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	64	"invar_btree (Node r x ts) \<longleftrightarrow>
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	65	(\<forall>t\<in>set ts. invar_btree t) \<and> map rank ts = rev [0..<r]"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	66
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	67	definition invar_bheap :: "'a::linorder heap \<Rightarrow> bool" where
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	68	"invar_bheap ts
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	69	\<longleftrightarrow> (\<forall>t\<in>set ts. invar_btree t) \<and> (sorted_wrt (op <) (map rank ts))"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	70
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	71	text \<open>Ordering (heap) invariant\<close>
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	72	fun invar_otree :: "'a::linorder tree \<Rightarrow> bool" where
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	73	"invar_otree (Node _ x ts) \<longleftrightarrow> (\<forall>t\<in>set ts. invar_otree t \<and> x \<le> root t)"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	74
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	75	definition invar_oheap :: "'a::linorder heap \<Rightarrow> bool" where
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	76	"invar_oheap ts \<longleftrightarrow> (\<forall>t\<in>set ts. invar_otree t)"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	77
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	78	definition invar :: "'a::linorder heap \<Rightarrow> bool" where
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	79	"invar ts \<longleftrightarrow> invar_bheap ts \<and> invar_oheap ts"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	80
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	81	text \<open>The children of a node are a valid heap\<close>
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	82	lemma invar_oheap_children:
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	83	"invar_otree (Node r v ts) \<Longrightarrow> invar_oheap (rev ts)"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	84	by (auto simp: invar_oheap_def)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	85
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	86	lemma invar_bheap_children:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	87	"invar_btree (Node r v ts) \<Longrightarrow> invar_bheap (rev ts)"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	88	by (auto simp: invar_bheap_def rev_map[symmetric])
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	89
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	90
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	91	subsection \<open>Operations and Their Functional Correctness\<close>
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	92
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	93	subsubsection \<open>\<open>link\<close>\<close>
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	94
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	95	definition link :: "'a::linorder tree \<Rightarrow> 'a tree \<Rightarrow> 'a tree" where
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	96	"link t\<^sub>1 t\<^sub>2 = (case (t\<^sub>1,t\<^sub>2) of (Node r x\<^sub>1 c\<^sub>1, Node _ x\<^sub>2 c\<^sub>2) \<Rightarrow>
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	97	if x\<^sub>1\<le>x\<^sub>2 then Node (r+1) x\<^sub>1 (t\<^sub>2#c\<^sub>1) else Node (r+1) x\<^sub>2 (t\<^sub>1#c\<^sub>2)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	98	)"
66491 78a009ac91d2 reorg nipkow parents: 66434 diff changeset	99
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	100	lemma invar_btree_link:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	101	assumes "invar_btree t\<^sub>1"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	102	assumes "invar_btree t\<^sub>2"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	103	assumes "rank t\<^sub>1 = rank t\<^sub>2"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	104	shows "invar_btree (link t\<^sub>1 t\<^sub>2)"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	105	using assms
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	106	by (auto simp: link_def split: tree.split)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	107
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	108	lemma invar_link_otree:
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	109	assumes "invar_otree t\<^sub>1"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	110	assumes "invar_otree t\<^sub>2"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	111	shows "invar_otree (link t\<^sub>1 t\<^sub>2)"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	112	using assms
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	113	by (auto simp: link_def split: tree.split)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	114
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	115	lemma rank_link[simp]: "rank (link t\<^sub>1 t\<^sub>2) = rank t\<^sub>1 + 1"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	116	by (auto simp: link_def split: tree.split)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	117
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	118	lemma mset_link[simp]: "mset_tree (link t\<^sub>1 t\<^sub>2) = mset_tree t\<^sub>1 + mset_tree t\<^sub>2"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	119	by (auto simp: link_def split: tree.split)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	120
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	121	subsubsection \<open>\<open>ins_tree\<close>\<close>
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	122
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	123	fun ins_tree :: "'a::linorder tree \<Rightarrow> 'a heap \<Rightarrow> 'a heap" where
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	124	"ins_tree t [] = [t]"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	125	\| "ins_tree t\<^sub>1 (t\<^sub>2#ts) =
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	126	(if rank t\<^sub>1 < rank t\<^sub>2 then t\<^sub>1#t\<^sub>2#ts else ins_tree (link t\<^sub>1 t\<^sub>2) ts)"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	127
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	128	lemma invar_bheap_Cons[simp]:
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	129	"invar_bheap (t#ts)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	130	\<longleftrightarrow> invar_btree t \<and> invar_bheap ts \<and> (\<forall>t'\<in>set ts. rank t < rank t')"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	131	by (auto simp: sorted_wrt_Cons invar_bheap_def)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	132
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	133	lemma invar_btree_ins_tree:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	134	assumes "invar_btree t"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	135	assumes "invar_bheap ts"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	136	assumes "\<forall>t'\<in>set ts. rank t \<le> rank t'"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	137	shows "invar_bheap (ins_tree t ts)"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	138	using assms
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	139	by (induction t ts rule: ins_tree.induct) (auto simp: invar_btree_link less_eq_Suc_le[symmetric])
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	140
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	141	lemma invar_oheap_Cons[simp]:
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	142	"invar_oheap (t#ts) \<longleftrightarrow> invar_otree t \<and> invar_oheap ts"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	143	by (auto simp: invar_oheap_def)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	144
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	145	lemma invar_oheap_ins_tree:
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	146	assumes "invar_otree t"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	147	assumes "invar_oheap ts"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	148	shows "invar_oheap (ins_tree t ts)"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	149	using assms
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	150	by (induction t ts rule: ins_tree.induct) (auto simp: invar_link_otree)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	151
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	152	lemma mset_heap_ins_tree[simp]:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	153	"mset_heap (ins_tree t ts) = mset_tree t + mset_heap ts"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	154	by (induction t ts rule: ins_tree.induct) auto
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	155
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	156	lemma ins_tree_rank_bound:
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	157	assumes "t' \<in> set (ins_tree t ts)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	158	assumes "\<forall>t'\<in>set ts. rank t\<^sub>0 < rank t'"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	159	assumes "rank t\<^sub>0 < rank t"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	160	shows "rank t\<^sub>0 < rank t'"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	161	using assms
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	162	by (induction t ts rule: ins_tree.induct) (auto split: if_splits)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	163
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	164	subsubsection \<open>\<open>insert\<close>\<close>
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	165
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	166	hide_const (open) insert
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	167
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	168	definition insert :: "'a::linorder \<Rightarrow> 'a heap \<Rightarrow> 'a heap" where
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	169	"insert x ts = ins_tree (Node 0 x []) ts"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	170
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	171	lemma invar_insert[simp]: "invar t \<Longrightarrow> invar (insert x t)"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	172	by (auto intro!: invar_btree_ins_tree simp: invar_oheap_ins_tree insert_def invar_def)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	173
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	174	lemma mset_heap_insert[simp]: "mset_heap (insert x t) = {#x#} + mset_heap t"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	175	by(auto simp: insert_def)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	176
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	177	subsubsection \<open>\<open>merge\<close>\<close>
66491 78a009ac91d2 reorg nipkow parents: 66434 diff changeset	178
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	179	fun merge :: "'a::linorder heap \<Rightarrow> 'a heap \<Rightarrow> 'a heap" where
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	180	"merge ts\<^sub>1 [] = ts\<^sub>1"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	181	\| "merge [] ts\<^sub>2 = ts\<^sub>2"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	182	\| "merge (t\<^sub>1#ts\<^sub>1) (t\<^sub>2#ts\<^sub>2) = (
66491 78a009ac91d2 reorg nipkow parents: 66434 diff changeset	183	if rank t\<^sub>1 < rank t\<^sub>2 then t\<^sub>1 # merge ts\<^sub>1 (t\<^sub>2#ts\<^sub>2) else
78a009ac91d2 reorg nipkow parents: 66434 diff changeset	184	if rank t\<^sub>2 < rank t\<^sub>1 then t\<^sub>2 # merge (t\<^sub>1#ts\<^sub>1) ts\<^sub>2
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	185	else ins_tree (link t\<^sub>1 t\<^sub>2) (merge ts\<^sub>1 ts\<^sub>2)
66491 78a009ac91d2 reorg nipkow parents: 66434 diff changeset	186	)"
78a009ac91d2 reorg nipkow parents: 66434 diff changeset	187
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	188	lemma merge_simp2[simp]: "merge [] ts\<^sub>2 = ts\<^sub>2"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	189	by (cases ts\<^sub>2) auto
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	190
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	191	lemma merge_rank_bound:
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	192	assumes "t' \<in> set (merge ts\<^sub>1 ts\<^sub>2)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	193	assumes "\<forall>t'\<in>set ts\<^sub>1. rank t < rank t'"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	194	assumes "\<forall>t'\<in>set ts\<^sub>2. rank t < rank t'"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	195	shows "rank t < rank t'"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	196	using assms
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	197	by (induction ts\<^sub>1 ts\<^sub>2 arbitrary: t' rule: merge.induct)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	198	(auto split: if_splits simp: ins_tree_rank_bound)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	199
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	200	lemma invar_bheap_merge:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	201	assumes "invar_bheap ts\<^sub>1"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	202	assumes "invar_bheap ts\<^sub>2"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	203	shows "invar_bheap (merge ts\<^sub>1 ts\<^sub>2)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	204	using assms
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	205	proof (induction ts\<^sub>1 ts\<^sub>2 rule: merge.induct)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	206	case (3 t\<^sub>1 ts\<^sub>1 t\<^sub>2 ts\<^sub>2)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	207
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	208	from "3.prems" have [simp]: "invar_btree t\<^sub>1" "invar_btree t\<^sub>2"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	209	by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	210
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	211	consider (LT) "rank t\<^sub>1 < rank t\<^sub>2"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	212	\| (GT) "rank t\<^sub>1 > rank t\<^sub>2"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	213	\| (EQ) "rank t\<^sub>1 = rank t\<^sub>2"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	214	using antisym_conv3 by blast
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	215	then show ?case proof cases
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	216	case LT
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	217	then show ?thesis using 3
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	218	by (force elim!: merge_rank_bound)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	219	next
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	220	case GT
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	221	then show ?thesis using 3
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	222	by (force elim!: merge_rank_bound)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	223	next
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	224	case [simp]: EQ
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	225
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	226	from "3.IH"(3) "3.prems" have [simp]: "invar_bheap (merge ts\<^sub>1 ts\<^sub>2)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	227	by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	228
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	229	have "rank t\<^sub>2 < rank t'" if "t' \<in> set (merge ts\<^sub>1 ts\<^sub>2)" for t'
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	230	using that
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	231	apply (rule merge_rank_bound)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	232	using "3.prems" by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	233	with EQ show ?thesis
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	234	by (auto simp: Suc_le_eq invar_btree_ins_tree invar_btree_link)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	235	qed
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	236	qed simp_all
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	237
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	238	lemma invar_oheap_merge:
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	239	assumes "invar_oheap ts\<^sub>1"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	240	assumes "invar_oheap ts\<^sub>2"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	241	shows "invar_oheap (merge ts\<^sub>1 ts\<^sub>2)"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	242	using assms
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	243	by (induction ts\<^sub>1 ts\<^sub>2 rule: merge.induct)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	244	(auto simp: invar_oheap_ins_tree invar_link_otree)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	245
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	246	lemma invar_merge[simp]: "\<lbrakk> invar ts\<^sub>1; invar ts\<^sub>2 \<rbrakk> \<Longrightarrow> invar (merge ts\<^sub>1 ts\<^sub>2)"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	247	by (auto simp: invar_def invar_bheap_merge invar_oheap_merge)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	248
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	249	lemma mset_heap_merge[simp]:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	250	"mset_heap (merge ts\<^sub>1 ts\<^sub>2) = mset_heap ts\<^sub>1 + mset_heap ts\<^sub>2"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	251	by (induction ts\<^sub>1 ts\<^sub>2 rule: merge.induct) auto
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	252
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	253	subsubsection \<open>\<open>get_min\<close>\<close>
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	254
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	255	fun get_min :: "'a::linorder heap \<Rightarrow> 'a" where
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	256	"get_min [t] = root t"
66546 14a7d2a39336 tuned nipkow parents: 66522 diff changeset	257	\| "get_min (t#ts) = min (root t) (get_min ts)"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	258
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	259	lemma invar_otree_root_min:
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	260	assumes "invar_otree t"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	261	assumes "x \<in># mset_tree t"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	262	shows "root t \<le> x"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	263	using assms
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	264	by (induction t arbitrary: x rule: mset_tree.induct) (fastforce simp: mset_heap_def)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	265
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	266	lemma get_min_mset_aux:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	267	assumes "ts\<noteq>[]"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	268	assumes "invar_oheap ts"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	269	assumes "x \<in># mset_heap ts"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	270	shows "get_min ts \<le> x"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	271	using assms
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	272	apply (induction ts arbitrary: x rule: get_min.induct)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	273	apply (auto
66546 14a7d2a39336 tuned nipkow parents: 66522 diff changeset	274	simp: invar_otree_root_min min_def intro: order_trans;
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	275	meson linear order_trans invar_otree_root_min
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	276	)+
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	277	done
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	278
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	279	lemma get_min_mset:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	280	assumes "ts\<noteq>[]"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	281	assumes "invar ts"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	282	assumes "x \<in># mset_heap ts"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	283	shows "get_min ts \<le> x"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	284	using assms by (auto simp: invar_def get_min_mset_aux)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	285
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	286	lemma get_min_member:
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	287	"ts\<noteq>[] \<Longrightarrow> get_min ts \<in># mset_heap ts"
66546 14a7d2a39336 tuned nipkow parents: 66522 diff changeset	288	by (induction ts rule: get_min.induct) (auto simp: min_def)
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	289
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	290	lemma get_min:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	291	assumes "mset_heap ts \<noteq> {#}"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	292	assumes "invar ts"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	293	shows "get_min ts = Min_mset (mset_heap ts)"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	294	using assms get_min_member get_min_mset
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	295	by (auto simp: eq_Min_iff)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	296
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	297	subsubsection \<open>\<open>get_min_rest\<close>\<close>
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	298
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	299	fun get_min_rest :: "'a::linorder heap \<Rightarrow> 'a tree \<times> 'a heap" where
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	300	"get_min_rest [t] = (t,[])"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	301	\| "get_min_rest (t#ts) = (let (t',ts') = get_min_rest ts
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	302	in if root t \<le> root t' then (t,ts) else (t',t#ts'))"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	303
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	304	lemma get_min_rest_get_min_same_root:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	305	assumes "ts\<noteq>[]"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	306	assumes "get_min_rest ts = (t',ts')"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	307	shows "root t' = get_min ts"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	308	using assms
66546 14a7d2a39336 tuned nipkow parents: 66522 diff changeset	309	by (induction ts arbitrary: t' ts' rule: get_min.induct) (auto simp: min_def split: prod.splits)
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	310
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	311	lemma mset_get_min_rest:
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	312	assumes "get_min_rest ts = (t',ts')"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	313	assumes "ts\<noteq>[]"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	314	shows "mset ts = {#t'#} + mset ts'"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	315	using assms
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	316	by (induction ts arbitrary: t' ts' rule: get_min.induct) (auto split: prod.splits if_splits)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	317
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	318	lemma set_get_min_rest:
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	319	assumes "get_min_rest ts = (t', ts')"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	320	assumes "ts\<noteq>[]"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	321	shows "set ts = Set.insert t' (set ts')"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	322	using mset_get_min_rest[OF assms, THEN arg_cong[where f=set_mset]]
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	323	by auto
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	324
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	325	lemma invar_bheap_get_min_rest:
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	326	assumes "get_min_rest ts = (t',ts')"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	327	assumes "ts\<noteq>[]"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	328	assumes "invar_bheap ts"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	329	shows "invar_btree t'" and "invar_bheap ts'"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	330	proof -
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	331	have "invar_btree t' \<and> invar_bheap ts'"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	332	using assms
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	333	proof (induction ts arbitrary: t' ts' rule: get_min.induct)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	334	case (2 t v va)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	335	then show ?case
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	336	apply (clarsimp split: prod.splits if_splits)
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	337	apply (drule set_get_min_rest; fastforce)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	338	done
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	339	qed auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	340	thus "invar_btree t'" and "invar_bheap ts'" by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	341	qed
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	342
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	343	lemma invar_oheap_get_min_rest:
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	344	assumes "get_min_rest ts = (t',ts')"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	345	assumes "ts\<noteq>[]"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	346	assumes "invar_oheap ts"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	347	shows "invar_otree t'" and "invar_oheap ts'"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	348	using assms
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	349	by (induction ts arbitrary: t' ts' rule: get_min.induct) (auto split: prod.splits if_splits)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	350
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	351	subsubsection \<open>\<open>del_min\<close>\<close>
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	352
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	353	definition del_min :: "'a::linorder heap \<Rightarrow> 'a::linorder heap" where
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	354	"del_min ts = (case get_min_rest ts of
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	355	(Node r x ts\<^sub>1, ts\<^sub>2) \<Rightarrow> merge (rev ts\<^sub>1) ts\<^sub>2)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	356
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	357	lemma invar_del_min[simp]:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	358	assumes "ts \<noteq> []"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	359	assumes "invar ts"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	360	shows "invar (del_min ts)"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	361	using assms
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	362	unfolding invar_def del_min_def
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	363	by (auto
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	364	split: prod.split tree.split
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	365	intro!: invar_bheap_merge invar_oheap_merge
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	366	dest: invar_bheap_get_min_rest invar_oheap_get_min_rest
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	367	intro!: invar_oheap_children invar_bheap_children
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	368	)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	369
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	370	lemma mset_heap_del_min:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	371	assumes "ts \<noteq> []"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	372	shows "mset_heap ts = mset_heap (del_min ts) + {# get_min ts #}"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	373	using assms
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	374	unfolding del_min_def
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	375	apply (clarsimp split: tree.split prod.split)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	376	apply (frule (1) get_min_rest_get_min_same_root)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	377	apply (frule (1) mset_get_min_rest)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	378	apply (auto simp: mset_heap_def)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	379	done
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	380
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	381
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	382	subsubsection \<open>Instantiating the Priority Queue Locale\<close>
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	383
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	384	interpretation binheap: Priority_Queue
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	385	where empty = "[]" and is_empty = "op = []" and insert = insert
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	386	and get_min = get_min and del_min = del_min
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	387	and invar = invar and mset = mset_heap
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	388	proof (unfold_locales, goal_cases)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	389	case 1
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	390	then show ?case by simp
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	391	next
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	392	case (2 q)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	393	then show ?case by auto
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	394	next
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	395	case (3 q x)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	396	then show ?case by auto
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	397	next
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	398	case (4 q)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	399	then show ?case using mset_heap_del_min[of q] get_min[OF _ \<open>invar q\<close>]
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	400	by (auto simp: union_single_eq_diff)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	401	next
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	402	case (5 q)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	403	then show ?case using get_min[of q] by auto
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	404	next
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	405	case 6
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	406	then show ?case by (auto simp add: invar_def invar_bheap_def invar_oheap_def)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	407	next
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	408	case (7 q x)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	409	then show ?case by simp
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	410	next
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	411	case (8 q)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	412	then show ?case by simp
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	413	qed
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	414
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	415
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	416	subsection \<open>Complexity\<close>
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	417
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	418	text \<open>The size of a binomial tree is determined by its rank\<close>
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	419	lemma size_mset_btree:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	420	assumes "invar_btree t"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	421	shows "size (mset_tree t) = 2^rank t"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	422	using assms
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	423	proof (induction t)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	424	case (Node r v ts)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	425	hence IH: "size (mset_tree t) = 2^rank t" if "t \<in> set ts" for t
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	426	using that by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	427
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	428	from Node have COMPL: "map rank ts = rev [0..<r]" by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	429
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	430	have "size (mset_heap ts) = (\<Sum>t\<leftarrow>ts. size (mset_tree t))"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	431	by (induction ts) auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	432	also have "\<dots> = (\<Sum>t\<leftarrow>ts. 2^rank t)" using IH
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	433	by (auto cong: sum_list_cong)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	434	also have "\<dots> = (\<Sum>r\<leftarrow>map rank ts. 2^r)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	435	by (induction ts) auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	436	also have "\<dots> = (\<Sum>i\<in>{0..<r}. 2^i)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	437	unfolding COMPL
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	438	by (auto simp: rev_map[symmetric] interv_sum_list_conv_sum_set_nat)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	439	also have "\<dots> = 2^r - 1"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	440	by (induction r) auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	441	finally show ?case
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	442	by (simp)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	443	qed
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	444
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	445	text \<open>The length of a binomial heap is bounded by the number of its elements\<close>
66547 188c7853f84a typo nipkow parents: 66546 diff changeset	446	lemma size_mset_bheap:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	447	assumes "invar_bheap ts"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	448	shows "2^length ts \<le> size (mset_heap ts) + 1"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	449	proof -
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	450	from \<open>invar_bheap ts\<close> have
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	451	ASC: "sorted_wrt (op <) (map rank ts)" and
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	452	TINV: "\<forall>t\<in>set ts. invar_btree t"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	453	unfolding invar_bheap_def by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	454
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	455	have "(2::nat)^length ts = (\<Sum>i\<in>{0..<length ts}. 2^i) + 1"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	456	by (simp add: sum_power2)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	457	also have "\<dots> \<le> (\<Sum>t\<leftarrow>ts. 2^rank t) + 1"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	458	using sorted_wrt_less_sum_mono_lowerbound[OF _ ASC, of "op ^ (2::nat)"]
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	459	using power_increasing[where a="2::nat"]
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	460	by (auto simp: o_def)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	461	also have "\<dots> = (\<Sum>t\<leftarrow>ts. size (mset_tree t)) + 1" using TINV
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	462	by (auto cong: sum_list_cong simp: size_mset_btree)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	463	also have "\<dots> = size (mset_heap ts) + 1"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	464	unfolding mset_heap_def by (induction ts) auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	465	finally show ?thesis .
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	466	qed
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	467
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	468	subsubsection \<open>Timing Functions\<close>
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	469
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	470	text \<open>
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	471	We define timing functions for each operation, and provide
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	472	estimations of their complexity.
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	473	\<close>
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	474	definition t_link :: "'a::linorder tree \<Rightarrow> 'a tree \<Rightarrow> nat" where
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	475	[simp]: "t_link _ _ = 1"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	476
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	477	fun t_ins_tree :: "'a::linorder tree \<Rightarrow> 'a heap \<Rightarrow> nat" where
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	478	"t_ins_tree t [] = 1"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	479	\| "t_ins_tree t\<^sub>1 (t\<^sub>2 # rest) = (
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	480	(if rank t\<^sub>1 < rank t\<^sub>2 then 1
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	481	else t_link t\<^sub>1 t\<^sub>2 + t_ins_tree (link t\<^sub>1 t\<^sub>2) rest)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	482	)"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	483
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	484	definition t_insert :: "'a::linorder \<Rightarrow> 'a heap \<Rightarrow> nat" where
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	485	"t_insert x ts = t_ins_tree (Node 0 x []) ts"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	486
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	487	lemma t_ins_tree_simple_bound: "t_ins_tree t ts \<le> length ts + 1"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	488	by (induction t ts rule: t_ins_tree.induct) auto
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	489
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	490	subsubsection \<open>\<open>t_insert\<close>\<close>
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	491
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	492	lemma t_insert_bound:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	493	assumes "invar ts"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	494	shows "t_insert x ts \<le> log 2 (size (mset_heap ts) + 1) + 1"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	495	proof -
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	496
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	497	have 1: "t_insert x ts \<le> length ts + 1"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	498	unfolding t_insert_def by (rule t_ins_tree_simple_bound)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	499	also have "\<dots> \<le> log 2 (2 * (size (mset_heap ts) + 1))"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	500	proof -
66547 188c7853f84a typo nipkow parents: 66546 diff changeset	501	from size_mset_bheap[of ts] assms
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	502	have "2 ^ length ts \<le> size (mset_heap ts) + 1"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	503	unfolding invar_def by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	504	hence "2 ^ (length ts + 1) \<le> 2 * (size (mset_heap ts) + 1)" by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	505	thus ?thesis using le_log2_of_power by blast
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	506	qed
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	507	finally show ?thesis
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	508	by (simp only: log_mult of_nat_mult) auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	509	qed
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	510
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	511	subsubsection \<open>\<open>t_merge\<close>\<close>
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	512
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	513	fun t_merge :: "'a::linorder heap \<Rightarrow> 'a heap \<Rightarrow> nat" where
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	514	"t_merge ts\<^sub>1 [] = 1"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	515	\| "t_merge [] ts\<^sub>2 = 1"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	516	\| "t_merge (t\<^sub>1#ts\<^sub>1) (t\<^sub>2#ts\<^sub>2) = 1 + (
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	517	if rank t\<^sub>1 < rank t\<^sub>2 then t_merge ts\<^sub>1 (t\<^sub>2#ts\<^sub>2)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	518	else if rank t\<^sub>2 < rank t\<^sub>1 then t_merge (t\<^sub>1#ts\<^sub>1) ts\<^sub>2
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	519	else t_ins_tree (link t\<^sub>1 t\<^sub>2) (merge ts\<^sub>1 ts\<^sub>2) + t_merge ts\<^sub>1 ts\<^sub>2
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	520	)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	521
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	522	text \<open>A crucial idea is to estimate the time in correlation with the
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	523	result length, as each carry reduces the length of the result.\<close>
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	524
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	525	lemma t_ins_tree_length:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	526	"t_ins_tree t ts + length (ins_tree t ts) = 2 + length ts"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	527	by (induction t ts rule: ins_tree.induct) auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	528
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	529	lemma t_merge_length:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	530	"length (merge ts\<^sub>1 ts\<^sub>2) + t_merge ts\<^sub>1 ts\<^sub>2 \<le> 2 * (length ts\<^sub>1 + length ts\<^sub>2) + 1"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	531	by (induction ts\<^sub>1 ts\<^sub>2 rule: t_merge.induct)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	532	(auto simp: t_ins_tree_length algebra_simps)
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	533
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	534	text \<open>Finally, we get the desired logarithmic bound\<close>
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	535	lemma t_merge_bound_aux:
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	536	fixes ts\<^sub>1 ts\<^sub>2
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	537	defines "n\<^sub>1 \<equiv> size (mset_heap ts\<^sub>1)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	538	defines "n\<^sub>2 \<equiv> size (mset_heap ts\<^sub>2)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	539	assumes BINVARS: "invar_bheap ts\<^sub>1" "invar_bheap ts\<^sub>2"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	540	shows "t_merge ts\<^sub>1 ts\<^sub>2 \<le> 4*log 2 (n\<^sub>1 + n\<^sub>2 + 1) + 2"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	541	proof -
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	542	define n where "n = n\<^sub>1 + n\<^sub>2"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	543
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	544	from t_merge_length[of ts\<^sub>1 ts\<^sub>2]
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	545	have "t_merge ts\<^sub>1 ts\<^sub>2 \<le> 2 * (length ts\<^sub>1 + length ts\<^sub>2) + 1" by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	546	hence "(2::nat)^t_merge ts\<^sub>1 ts\<^sub>2 \<le> 2^(2 * (length ts\<^sub>1 + length ts\<^sub>2) + 1)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	547	by (rule power_increasing) auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	548	also have "\<dots> = 2(2^length ts\<^sub>1)\<^sup>2(2^length ts\<^sub>2)\<^sup>2"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	549	by (auto simp: algebra_simps power_add power_mult)
66547 188c7853f84a typo nipkow parents: 66546 diff changeset	550	also note BINVARS(1)[THEN size_mset_bheap]
188c7853f84a typo nipkow parents: 66546 diff changeset	551	also note BINVARS(2)[THEN size_mset_bheap]
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	552	finally have "2 ^ t_merge ts\<^sub>1 ts\<^sub>2 \<le> 2 * (n\<^sub>1 + 1)\<^sup>2 * (n\<^sub>2 + 1)\<^sup>2"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	553	by (auto simp: power2_nat_le_eq_le n\<^sub>1_def n\<^sub>2_def)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	554	from le_log2_of_power[OF this] have "t_merge ts\<^sub>1 ts\<^sub>2 \<le> log 2 \<dots>"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	555	by simp
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	556	also have "\<dots> = log 2 2 + 2log 2 (n\<^sub>1 + 1) + 2log 2 (n\<^sub>2 + 1)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	557	by (simp add: log_mult log_nat_power)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	558	also have "n\<^sub>2 \<le> n" by (auto simp: n_def)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	559	finally have "t_merge ts\<^sub>1 ts\<^sub>2 \<le> log 2 2 + 2log 2 (n\<^sub>1 + 1) + 2log 2 (n + 1)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	560	by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	561	also have "n\<^sub>1 \<le> n" by (auto simp: n_def)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	562	finally have "t_merge ts\<^sub>1 ts\<^sub>2 \<le> log 2 2 + 4*log 2 (n + 1)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	563	by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	564	also have "log 2 2 \<le> 2" by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	565	finally have "t_merge ts\<^sub>1 ts\<^sub>2 \<le> 4*log 2 (n + 1) + 2" by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	566	thus ?thesis unfolding n_def by (auto simp: algebra_simps)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	567	qed
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	568
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	569	lemma t_merge_bound:
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	570	fixes ts\<^sub>1 ts\<^sub>2
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	571	defines "n\<^sub>1 \<equiv> size (mset_heap ts\<^sub>1)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	572	defines "n\<^sub>2 \<equiv> size (mset_heap ts\<^sub>2)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	573	assumes "invar ts\<^sub>1" "invar ts\<^sub>2"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	574	shows "t_merge ts\<^sub>1 ts\<^sub>2 \<le> 4*log 2 (n\<^sub>1 + n\<^sub>2 + 1) + 2"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	575	using assms t_merge_bound_aux unfolding invar_def by blast
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	576
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	577	subsubsection \<open>\<open>t_get_min\<close>\<close>
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	578
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	579	fun t_get_min :: "'a::linorder heap \<Rightarrow> nat" where
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	580	"t_get_min [t] = 1"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	581	\| "t_get_min (t#ts) = 1 + t_get_min ts"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	582
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	583	lemma t_get_min_estimate: "ts\<noteq>[] \<Longrightarrow> t_get_min ts = length ts"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	584	by (induction ts rule: t_get_min.induct) auto
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	585
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	586	lemma t_get_min_bound:
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	587	assumes "invar ts"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	588	assumes "ts\<noteq>[]"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	589	shows "t_get_min ts \<le> log 2 (size (mset_heap ts) + 1)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	590	proof -
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	591	have 1: "t_get_min ts = length ts" using assms t_get_min_estimate by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	592	also have "\<dots> \<le> log 2 (size (mset_heap ts) + 1)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	593	proof -
66547 188c7853f84a typo nipkow parents: 66546 diff changeset	594	from size_mset_bheap[of ts] assms have "2 ^ length ts \<le> size (mset_heap ts) + 1"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	595	unfolding invar_def by auto
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	596	thus ?thesis using le_log2_of_power by blast
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	597	qed
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	598	finally show ?thesis by auto
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	599	qed
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	600
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	601	subsubsection \<open>\<open>t_del_min\<close>\<close>
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	602
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	603	fun t_get_min_rest :: "'a::linorder heap \<Rightarrow> nat" where
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	604	"t_get_min_rest [t] = 1"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	605	\| "t_get_min_rest (t#ts) = 1 + t_get_min_rest ts"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	606
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	607	lemma t_get_min_rest_estimate: "ts\<noteq>[] \<Longrightarrow> t_get_min_rest ts = length ts"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	608	by (induction ts rule: t_get_min_rest.induct) auto
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	609
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	610	lemma t_get_min_rest_bound_aux:
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	611	assumes "invar_bheap ts"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	612	assumes "ts\<noteq>[]"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	613	shows "t_get_min_rest ts \<le> log 2 (size (mset_heap ts) + 1)"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	614	proof -
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	615	have 1: "t_get_min_rest ts = length ts" using assms t_get_min_rest_estimate by auto
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	616	also have "\<dots> \<le> log 2 (size (mset_heap ts) + 1)"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	617	proof -
66547 188c7853f84a typo nipkow parents: 66546 diff changeset	618	from size_mset_bheap[of ts] assms have "2 ^ length ts \<le> size (mset_heap ts) + 1"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	619	by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	620	thus ?thesis using le_log2_of_power by blast
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	621	qed
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	622	finally show ?thesis by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	623	qed
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	624
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	625	lemma t_get_min_rest_bound:
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	626	assumes "invar ts"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	627	assumes "ts\<noteq>[]"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	628	shows "t_get_min_rest ts \<le> log 2 (size (mset_heap ts) + 1)"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	629	using assms t_get_min_rest_bound_aux unfolding invar_def by blast
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	630
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	631	text\<open>Note that although the definition of function @{const rev} has quadratic complexity,
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	632	it can and is implemented (via suitable code lemmas) as a linear time function.
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	633	Thus the following definition is justified:\<close>
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	634
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	635	definition "t_rev xs = length xs + 1"
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	636
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	637	definition t_del_min :: "'a::linorder heap \<Rightarrow> nat" where
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	638	"t_del_min ts = t_get_min_rest ts + (case get_min_rest ts of (Node _ x ts\<^sub>1, ts\<^sub>2)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	639	\<Rightarrow> t_rev ts\<^sub>1 + t_merge (rev ts\<^sub>1) ts\<^sub>2
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	640	)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	641
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	642	lemma t_rev_ts1_bound_aux:
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	643	fixes ts
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	644	defines "n \<equiv> size (mset_heap ts)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	645	assumes BINVAR: "invar_bheap (rev ts)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	646	shows "t_rev ts \<le> 1 + log 2 (n+1)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	647	proof -
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	648	have "t_rev ts = length ts + 1" by (auto simp: t_rev_def)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	649	hence "2^t_rev ts = 2*2^length ts" by auto
66547 188c7853f84a typo nipkow parents: 66546 diff changeset	650	also have "\<dots> \<le> 2*n+2" using size_mset_bheap[OF BINVAR] by (auto simp: n_def)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	651	finally have "2 ^ t_rev ts \<le> 2 * n + 2" .
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	652	from le_log2_of_power[OF this] have "t_rev ts \<le> log 2 (2 * (n + 1))"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	653	by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	654	also have "\<dots> = 1 + log 2 (n+1)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	655	by (simp only: of_nat_mult log_mult) auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	656	finally show ?thesis by (auto simp: algebra_simps)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	657	qed
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	658
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	659	lemma t_del_min_bound_aux:
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	660	fixes ts
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	661	defines "n \<equiv> size (mset_heap ts)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	662	assumes BINVAR: "invar_bheap ts"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	663	assumes "ts\<noteq>[]"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	664	shows "t_del_min ts \<le> 6 * log 2 (n+1) + 3"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	665	proof -
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	666	obtain r x ts\<^sub>1 ts\<^sub>2 where GM: "get_min_rest ts = (Node r x ts\<^sub>1, ts\<^sub>2)"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	667	by (metis surj_pair tree.exhaust_sel)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	668
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	669	note BINVAR' = invar_bheap_get_min_rest[OF GM \<open>ts\<noteq>[]\<close> BINVAR]
5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	670	hence BINVAR1: "invar_bheap (rev ts\<^sub>1)" by (blast intro: invar_bheap_children)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	671
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	672	define n\<^sub>1 where "n\<^sub>1 = size (mset_heap ts\<^sub>1)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	673	define n\<^sub>2 where "n\<^sub>2 = size (mset_heap ts\<^sub>2)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	674
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	675	have t_rev_ts1_bound: "t_rev ts\<^sub>1 \<le> 1 + log 2 (n+1)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	676	proof -
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	677	note t_rev_ts1_bound_aux[OF BINVAR1, simplified, folded n\<^sub>1_def]
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	678	also have "n\<^sub>1 \<le> n"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	679	unfolding n\<^sub>1_def n_def
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	680	using mset_get_min_rest[OF GM \<open>ts\<noteq>[]\<close>]
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	681	by (auto simp: mset_heap_def)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	682	finally show ?thesis by (auto simp: algebra_simps)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	683	qed
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	684
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	685	have "t_del_min ts = t_get_min_rest ts + t_rev ts\<^sub>1 + t_merge (rev ts\<^sub>1) ts\<^sub>2"
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	686	unfolding t_del_min_def by (simp add: GM)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	687	also have "\<dots> \<le> log 2 (n+1) + t_rev ts\<^sub>1 + t_merge (rev ts\<^sub>1) ts\<^sub>2"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	688	using t_get_min_rest_bound_aux[OF assms(2-)] by (auto simp: n_def)
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	689	also have "\<dots> \<le> 2*log 2 (n+1) + t_merge (rev ts\<^sub>1) ts\<^sub>2 + 1"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	690	using t_rev_ts1_bound by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	691	also have "\<dots> \<le> 2log 2 (n+1) + 4 log 2 (n\<^sub>1 + n\<^sub>2 + 1) + 3"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	692	using t_merge_bound_aux[OF \<open>invar_bheap (rev ts\<^sub>1)\<close> \<open>invar_bheap ts\<^sub>2\<close>]
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	693	by (auto simp: n\<^sub>1_def n\<^sub>2_def algebra_simps)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	694	also have "n\<^sub>1 + n\<^sub>2 \<le> n"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	695	unfolding n\<^sub>1_def n\<^sub>2_def n_def
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	696	using mset_get_min_rest[OF GM \<open>ts\<noteq>[]\<close>]
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	697	by (auto simp: mset_heap_def)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	698	finally have "t_del_min ts \<le> 6 * log 2 (n+1) + 3"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	699	by auto
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	700	thus ?thesis by (simp add: algebra_simps)
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	701	qed
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	702
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	703	lemma t_del_min_bound:
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	704	fixes ts
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	705	defines "n \<equiv> size (mset_heap ts)"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	706	assumes "invar ts"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	707	assumes "ts\<noteq>[]"
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	708	shows "t_del_min ts \<le> 6 * log 2 (n+1) + 3"
66522 5fe7ed50d096 tuning nipkow parents: 66491 diff changeset	709	using assms t_del_min_bound_aux unfolding invar_def by blast
66434 5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	710
5d7e770c7d5d added sorted_wrt to List; added Data_Structures/Binomial_Heap.thy nipkow parents: diff changeset	711	end

author	nipkow
	Tue, 29 Aug 2017 15:37:02 +0200
changeset 66547	188c7853f84a
parent 66546	14a7d2a39336
child 66548	253880668a43
permissions	-rw-r--r--